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</div><h2>HL Paper 3</h2><div class="specification">
<p>Insulin was the first protein to be sequenced. It was determined that the end of one chain had the primary structure Phe–Val–Asn–Gln.</p>
</div>
<div class="question">
<p>Describe how DNA determines the primary structure of a protein such as insulin.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>triplet/genetic code</p>
<p><strong><em>OR</em></strong></p>
<p>sequence of three bases/nucleotides</p>
<p> </p>
<p>instruction for <strong>«</strong>particular<strong>» </strong>amino acid</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>DNA is a biopolymer made up of nucleotides. List <strong>two </strong>components of a nucleotide.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any two of:</em></p>
<p>pentose <strong>«</strong>sugar<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>deoxyribose</p>
<p> </p>
<p>phosphate <strong>«</strong>group<strong>»</strong></p>
<p> </p>
<p><strong>«</strong>organic<strong>» </strong>nitrogenous base</p>
<p><strong><em>OR</em></strong></p>
<p>nucleobase</p>
<p><strong><em>OR</em></strong></p>
<p>nucleic base</p>
<p><strong><em>OR</em></strong></p>
<p>purine</p>
<p><strong><em>OR</em></strong></p>
<p>pyrimidine</p>
<p> </p>
<p><em>Accept names or formulas.</em></p>
<p><em>Accept “ribose” for M1.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “phosphoric acid”.</em></p>
<p><em>Accept the four bases together: </em><em>“adenine, cytosine, thymine, guanine”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>DNA is a complex molecule.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how its structure allows it to be negatively charged in the body.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the nucleotide sequence of a complementary strand of a fragment of DNA with the nucleotide sequence –GACGGATCA–.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>phosphate groups «in nucleotides fragments are almost completely» ionized</p>
<p> </p>
<p><em>Do <strong>not</strong> accept just “phosphate «groups»”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>–CTGCCTAGT–</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>A hemoglobin-oxygen saturation curve does not follow the same model as enzyme-substrate reactions.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_14.26.13.png" alt="M17/4/CHEMI/HP3/ENG/TZ2/14"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the shape of the curve from 0 to X kPa.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why carbon monoxide is toxic to humans.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>oxygen binds to first active site «of deoxygenated heme» <em><strong>AND</strong></em> alters shape of other active sites<br><em><strong>OR</strong></em><br>cooperative binding</p>
<p>affinity of partially oxygenated hemoglobin for oxygen increases</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO is a competitive inhibitor «of oxygen binding to hemoglobin»<br><em><strong>OR</strong></em><br>CO has greater affinity for hemoglobin «than oxygen»</p>
<p>less oxygen is transported<br><em><strong>OR</strong></em><br>uptake of oxygen decreases<br><em><strong>OR</strong></em><br>causes hypoxia</p>
<p> </p>
<p><em>Do <strong>not</strong> penalize “CO binds irreversibly” if included in answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The heme groups in cytochromes contain iron ions that are involved in the reduction of molecular oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the half-equation for the reduction of molecular oxygen to water in acidic conditions.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the change in oxidation state of the iron ions in heme groups that occurs when molecular oxygen is converted to water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>O<sub>2</sub> + 4H<sup>+</sup> (aq) + 4e<sup>–</sup> → 2H<sub>2</sub>O (l)</p>
<p>Accept any balanced equation with any integer or fractional coefficients.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>+2 to +3</p>
<p><em><strong>OR</strong></em></p>
<p>+1</p>
<p><em><strong>OR</strong></em></p>
<p>increases «by 1»</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Anthocyanins are naturally occurring plant pigments. Depending on the solution pH, they can exist as quinoidal bases or flavylium cations as shown in section 35 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why anthocyanins are coloured.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the blue colour of a quinoidal base changes to the red colour of a flavylium cation as pH decreases.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>highly conjugated systems</p>
<p><strong><em>OR</em></strong></p>
<p>alternating single and double bonds</p>
<p><strong><em>OR</em></strong></p>
<p>many delocalized electrons</p>
<p> </p>
<p>electron transitions occur when visible light is absorbed</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>gaining protons</p>
<p>decreases electron density/extent of conjugation <strong>«</strong>in aromatic backbone<strong>»</strong></p>
<p>increases energy of electron transitions</p>
<p> </p>
<p><em><strong>[3 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The following graph shows the effect of substrate concentration on the rate of an enzyme-catalysed reaction.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-18_om_17.16.36.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/B4"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the relationship between enzyme activity and concentration of the substrate.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the Michaelis constant \({K_{\text{m}}}\) from the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe why competitive inhibition may take place.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the effect of competitive inhibition on \({V_{{\text{max}}}}\) and \({K_{\text{m}}}\).</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">On the graph of effect of concentration on rate of reaction on page 10, sketch the expected curve for <strong>non</strong>-competitive inhibition.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">As [S] increases, more enzyme molecules can link with substrate molecules (and rate increases);</p>
<p class="p1">once all enzyme molecules are occupied/enzyme sites used up, rate cannot increase anymore/has no effect;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{0.7 (mmol}}\,{\text{d}}{{\text{m}}^{ - 3}}{\text{)}}\);</p>
<p class="p1"><em>Allow 0.6–0.8. If wrong units, then no mark.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">inhibitor molecules are very similar to the substrate <strong>and </strong>the enzymes cannot distinguish them / are able to bind to/occupy the active sites / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">same \({V_{{\text{max}}}}\);</p>
<p class="p1">at high [S], impact of inhibitor reduced / possible to reach same maximum rate;</p>
<p class="p1">the curve is less steep (than without inhibition) / the enzyme is less effective / <em>OWTTE</em>;</p>
<p class="p1">so \({K_{\text{m}}}\) higher (than without inhibition);</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">curve on graph levelling off below original line;</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-19_om_05.20.24.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/B4.e/M"></p>
<p class="p1"><em>K</em><sub><span class="s1"><em>m </em></span></sub><em>should be approximately the same, V</em><sub><span class="s1"><em>max </em></span></sub><em>should be smaller.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Instead of explaining the relationship between enzyme activity and concentration of the substrate, many candidates just described the relationship indicated by the graph.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates were correctly able to describe why competitive inhibition may take place. On the other hand, others misinterpreted the question and wrote about the need for the inhibition.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Where they had to explain, in several cases it was not well answered.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">When drawing the graph several candidates did not take into account that \({K_m}\) should be the same.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">DNA is the genetic material that individuals inherit from their parents. Genetic information is stored in chromosomes which are very long strands of DNA.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the structure of a nucleotide of DNA.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline how nucleotides are linked together to form polynucleotides.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">phosphate group <strong>and </strong>pentose/deoxyribose (sugar) <strong>and </strong>organic/nitrogenous base;</p>
<p class="p1"><em>Accept suitable diagram</em>.</p>
<p class="p1"><em>No mark for just sugar or just base</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">condensation reaction / covalent bond between phosphate on one nucleotide and pentose sugar on next;</p>
<p class="p1"><em>Accept suitable diagram</em>.</p>
<p class="p1"><em>Penalize just sugar only once</em>.</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many scored the mark for the structure of a nucleotide of DNA - usually the ones who did not score the mark failed to mention the base being organic or nitrogenous or the sugar being pentose or deoxyribose.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">About half the candidates incorrectly stated hydrogen bonding in relation to how nucleotides are linked together.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Outline the process of hydrogenating fats and name <strong>one </strong>catalyst for the process.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">addition of \({{\text{H}}_2}\) (to C=C bonds);</p>
<p class="p1">finely divided Zn/Cu/Ni;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">Anthocyanins and carotenes are both coloured substances found in many foods.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain, in terms of their molecular structure, why these compounds are coloured.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify <strong>one </strong>other coloured compound commonly found in uncooked foods.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">both have extended regions of delocalized bonding/conjugated double bonds;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">chlorophyll / hemoglobin / heme / myoglobin;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">In part (a), very few candidates linked colour to extended regions of delocalised electrons or conjugated double bonds. There was much general discussion of absorption of visible light. Some were confused with colour in transition metal compounds.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many correct answers appeared in (c).</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Stereochemistry is the study of the spatial arrangement of atoms in molecules. A molecule containing a chiral carbon atom exists as two enantiomers. Three different conventions can be used for naming purposes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Use the CORN rule to determine whether the structure of 2-aminopropanoic acid (alanine) represents the D or L form. Justify your answer.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-03_om_11.46.51.png" alt="N11/4/CHEMI/HP3/ENG/TZ0/F5.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the (<em>d</em>) or the (<em>l</em>) convention.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">L isomer;</p>
<p class="p1">molecule is viewed with C–H bond pointing away from observer/viewer and COOH, \({\text{R/C}}{{\text{H}}_3}\) and \({\text{N}}{{\text{H}}_2}\) (groups) are arranged <span style="text-decoration: underline;">anti-clockwise</span> (around the asymmetric carbon atom);</p>
<p class="p1"><em>Accept converse description.</em></p>
<p class="p1"><em>Award M2 if there is reference to groups being arranged anti-clockwise without identifying the groups.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>d </em>rotates plane of polarized light clockwise/dextrorotatory/+ / <em>l </em>rotates plane of polarized light anti-clockwise/laevorotatory/–;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The vast majority chose the correct “L” isomer for the structure given, but only about half of them could give a convincing explanation or justify their answer.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">About half were correctly able to state the (<em>d</em>) or the (<em>l</em>) convention.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A food product is often judged simply by its colour. Natural pigments that give rise to food colour include anthocyanins, carotenes, chlorophyll and heme. The structures of these pigments are shown in Table 22 of the Data Booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why these natural pigments are coloured.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce from their structures whether anthocyanins and carotenes are water-soluble or fat-soluble.</p>
<p class="p1">Anthocyanins:</p>
<p class="p1">Carotenes:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">contain alternate (carbon to carbon) single and double bonds / extensive delocalization/conjugation/\(\pi \) bonding;</p>
<p class="p1">absorb in the visible region <strong>and </strong>transmit complementary colour;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Anthocyanins</em>:</p>
<p class="p1">water soluble;</p>
<p class="p1"><em>Carotenes</em>:</p>
<p class="p1">fat soluble;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Candidates could not relate the length of conjugation with absorption in the UV/Visible spectrum.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many were able to deduce the water or fat-solubity of the two natural pigments given.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain how the rate of an enzyme-catalysed reaction is related to the substrate concentration.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">When an inhibitor is added it decreases the rate of an enzyme-catalysed reaction. State the effect that competitive and non-competitive inhibitors have on the value of \({V_{\max }}\). Explain this in terms of where the inhibitor binds to the enzyme.</p>
<p class="p1">Competitive inhibitor:</p>
<p class="p1">Non-competitive inhibitor:</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Sketch a graph to show the effect that a change in pH will have on the rate of an enzyme-catalysed reaction.</p>
<p class="p1">(ii) Explain why changing the pH affects the catalytic ability of enzymes.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">at low substrate concentrations/at first rate is (directly) proportional to (substrate) concentration / <em>OWTTE</em>;</p>
<p class="p1"><em>Do not accept only qualitative statement such as “rate increases as concentration increases”. </em></p>
<p class="p1">at high substrate concentrations/eventually rate reaches maximum/levels off/becomes constant / <em>OWTTE</em>;</p>
<p class="p1"><span style="text-decoration: underline;">active sites</span> become blocked/saturated / <em>OWTTE</em>;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Competitive inhibitor:</em></p>
<p class="p1">\({V_{\max }}\) same;</p>
<p class="p1">inhibitor occupies active site;</p>
<p class="p1"><em>Non-competitive inhibitor:</em></p>
<p class="p1">\({V_{\max }}\) lower;</p>
<p class="p1">inhibitor binds elsewhere causing distortion in shape of active site / <em>OWTTE</em>;</p>
<p class="p1"><em>In each part, explanation mark cannot be awarded without correct reference to V</em><sub><span class="s1"><em>max</em></span></sub><em>.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) sketch graph with rate and pH labels and bell-shaped curve (showing rate has maximum);</p>
<p class="p1">(ii) (at higher or lower pH value of) charges on enzyme/amino acid (residues) changes;</p>
<p class="p1">so (shape of) active site changes / tertiary structure lost / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Although most had some idea of what sort of answer part (a) required, it was rare to find full marks being awarded – the most common reasons were a qualitative answer for the first mark, and the absence of a reference to active sites for the third mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (b), the distinction between competitive and non-competitive inhibitors was well known, although a surprising number of answers contained explanations without stating the effect on \({V_{\max }}\).</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most sketch graphs in (c) were sufficiently well drawn to score the mark, although many would have benefited from a scale that indicated a narrow pH range; the explanation was generally well known.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin contains a heme group with an iron(II) ion.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how the oxygen saturation of hemoglobin is affected by changes in the blood plasma.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why foetal hemoglobin has a greater affinity for oxygen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 19">
<div class="section">
<div class="layoutArea">
<div class="column">
<p>low CO<sub>2</sub> level causes more oxygen to be bound to the heme</p>
<p>high pH causes more oxygen to be bound to the heme</p>
<p>low temperature causes more oxygen to be bound to the heme</p>
<p>organic phosphates/2,3-BPG/DPG can decrease affinity for oxygen</p>
<p>CO decreases saturation/binds to active site/acts as a competitive inhibitor</p>
<div class="page" title="Page 19">
<div class="section">
<div class="layoutArea">
<div class="column">
<p><em>Accept reverse statements for mark.</em><br><em>Award <strong>[2]</strong> if the effects of CO<sub>2</sub> <strong>AND</strong> pH are discussed in combination.</em></p>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 19">
<div class="section">
<div class="layoutArea">
<div class="column">
<p>contains two gamma units <strong>«</strong>instead of the two beta units found in adults<strong>»</strong> <br><em><strong>OR</strong></em><br> differs in amino acid sequence «from the two beta units found in adults»</p>
<p>less sensitive to inhibitors/2,3-BPG/DPG</p>
<p>receives O<sub>2</sub> from <strong>«</strong>partly deoxygenated<strong>»</strong> blood so can work at low pO<sub>2</sub></p>
<div class="page" title="Page 19">
<div class="section">
<div class="layoutArea">
<div class="column">
<p><em>Accept reverse statements for mark.</em></p>
</div>
</div>
</div>
</div>
<p><em><sub> </sub></em></p>
</div>
</div>
</div>
</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>An inhibitor reduces the rate, <em>V</em>, of an enzyme-catalysed reaction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain with reference to the binding site on the enzyme how a non-competitive inhibitor lowers the value of <em>V</em><sub>max</sub>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the significance of the value of the Michaelis constant, <em>K</em><sub>m</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>binds at allosteric site</p>
<p><strong><em>OR</em></strong></p>
<p>binds away from active site</p>
<p> </p>
<p>changes shape of active site</p>
<p><strong><em>OR</em></strong></p>
<p>renders active sites ineffective</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>K</em><sub><em>m </em></sub>is inverse measure of affinity of enzyme for a substrate</p>
<p><strong><em>OR</em></strong></p>
<p><em>K</em><sub><em>m </em></sub>is inversely proportional to enzyme activity</p>
<p><strong><em>OR</em></strong></p>
<p>high value of <em>K</em><sub><em>m </em></sub>indicates higher substrate concentration needed for enzyme saturation</p>
<p><strong><em>OR</em></strong></p>
<p>low value of <em>K</em><sub><em>m </em></sub>means reaction is fast at low substrate concentration</p>
<p> </p>
<p><em>Idea of inverse relationship must be </em><em>conveyed.</em></p>
<p><em>Accept “high value of K</em><em>m </em><em>indicates low </em><em>affinity of enzyme for substrate/less </em><em>stable ES complex/lower enzyme </em><em>activity”.</em></p>
<p><em>Accept “low value of K</em><em>m </em><em>indicates high </em><em>affinity of enzyme for substrate/stable </em><em>ES complex/greater enzyme activity”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Polymers of glucose include starch and cellulose.</p>
</div>
<div class="question">
<p>Outline why cellulose fibres are strong.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any two of:</em></p>
<p>long straight/unbranched chains</p>
<p>multiple hydrogen bonds <strong>«</strong>between chains<strong>»</strong></p>
<p> </p>
<p>microfibrils</p>
<p><strong><em>OR</em></strong></p>
<p>rigid/cable structure</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">DNA and RNA both contain a pentose sugar.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the names of the sugars in <strong>each </strong>nucleic acid and outline how their chemical structures differ.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>one </strong>other structural difference between DNA and RNA.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">ribose (in RNA) <strong>and </strong>deoxyribose (in DNA);</p>
<p class="p1">deoxyribose lacks an oxygen atom (on C2) / ribose has an OH group on second carbon in ring while deoxyribose has only H;</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">DNA contains thymine and RNA contains uracil / DNA is a double-strand</p>
<p class="p1">nucleic acid and RNA is a single-strand nucleic acid / <em>OWTTE</em>;</p>
<div class="question_part_label">a.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Knowledge of RNA and DNA was generally good. DNA profiling was something most students were familiar with, though some had troubles indicating the stages of the process and few candidates recognized that DNA fragments are negatively charged. The use of DNA profiling presented no problem.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Knowledge of RNA and DNA was generally good. DNA profiling was something most students were familiar with, though some had troubles indicating the stages of the process and few candidates recognized that DNA fragments are negatively charged. The use of DNA profiling presented no problem.</p>
<div class="question_part_label">a.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The kinetics of an enzyme-catalysed reaction are studied in the absence and presence of an inhibitor. The graph represents the initial rate as a function of substrate concentration.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-23_om_08.00.16.png" alt="M11/4/CHEMI/HP3/ENG/TZ1/B4"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the type of inhibition shown in the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine \({V_{\max }}\) and \({K_{\text{m}}}\) in the absence of the inhibitor and in the presence of the inhibitor.</p>
<p class="p1">Absence of inhibitor:</p>
<p class="p1">Presence of inhibitor:</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the relationship between \({K_{\text{m}}}\)<span class="s1"> </span>and enzyme activity.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">non-competitive (inhibition);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Absence of inhibitor:</em></p>
<p class="p1">\({V_{\max }}{\text{ }}4.4\)</p>
<p class="p1">\({K_{\text{m}}}{\text{ }}1.7\)</p>
<p class="p1"><em>Accept 1.6–1.8.</em></p>
<p class="p1"><em>Presence of inhibitor:</em></p>
<p class="p1">\({V_{\max }}{\text{ }}3.0\)</p>
<p class="p1">\({K_{\text{m}}}{\text{ }}1.7\)</p>
<p class="p1"><em>Accept 1.6–1.8.</em></p>
<p class="p1"><em>4 values correct, award </em><strong><em>[3]</em></strong></p>
<p class="p1"><em>3 values correct, award </em><strong><em>[2]</em></strong></p>
<p class="p1"><em>2 values correct, award </em><strong><em>[1]</em></strong></p>
<p class="p1"><em>1 value correct, award </em><strong><em>[0]</em></strong></p>
<p class="p1"><em>Ignore units.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">higher the value of ({K_{\text{m}}}\), lower the activity of enzyme / lower the value of \({K_{\text{m}}}\), higher the activity of enzyme / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">This part was generally well answered with full marks awarded to more than half of the candidates. Those who did not score full marks usually failed to give a correct answer in (a) and (c).</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">This part was generally well answered with full marks awarded to more than half of the candidates. Those who did not score full marks usually failed to give a correct answer in (a) and (c).</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was generally well answered with full marks awarded to more than half of the candidates. Those who did not score full marks usually failed to give a correct answer in (a) and (c).</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A large proportion of the food we eat provides energy through the process of respiration. Carbohydrates and triglycerides are the food groups mainly responsible for providing this energy.</p>
</div>
<div class="question">
<p class="p1">Compare the behaviour of enzymes and inorganic catalysts, including reference to the mechanism of enzyme action and the ways in which this can be inhibited.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1"><em>Any three for first three marks: </em></p>
<p class="p1">both increase rate of chemical reactions;</p>
<p class="p1">both reduce activation energy;</p>
<p class="p1">both provide alternative pathways for reaction;</p>
<p class="p1">enzymes more specific;</p>
<p class="p1">enzymes have active site that substrate bonds to / “lock and key” mechanism;</p>
<p class="p1">enzymes much more readily denatured by changing conditions;</p>
<p class="p1"><em>Both required for final two marks: </em></p>
<p class="p1">competitive inhibitors <strong>and </strong>non-competitive inhibitors;</p>
<p class="p1">competitive inhibitors bond to active site <strong>and </strong>non-competitive inhibitors denature/alter shape of enzyme;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">The final section comparing enzymes and catalysts was generally well answered, though quite a few neglected to discuss the similarities of the two.</p>
</div>
<br><hr><br><div class="specification">
<p>The structure of DNA (deoxyribonucleic acid) has been studied in many different ways.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the name of the component of DNA responsible for the migration of its fragments to the positive electrode in gel electrophoresis.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>In 2010, scientists claimed that they had discovered a species of bacteria capable of incorporating arsenic in place of phosphorus into the bacterial DNA. This claim has since proved controversial. Suggest <strong>one</strong> technique or evidence that might help support the claim.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>phosphato/phosphate «group» </p>
<p><em>Do not accept “phosphoric acid”, “phosphorus” or any formula.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mass spectrometry / X ray diffraction/crystallography / nuclear magnetic resonance «spectroscopy»<br><em><strong>OR<br></strong></em>bacteria able to grow in absence of phosphorus<br><em><strong>OR<br></strong></em>reproducible data</p>
<p><em>Accept abbreviations (eg, MS, NMR). <br>Accept “elemental analysis” or “atomic absorption spectroscopy/AA(S)”.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The stereochemistry of molecules affects the way they interact with taste and smell receptors in the body.</p>
</div>
<div class="specification">
<p class="p1">The stereochemistry of carbohydrates and amino acids is usually indicated by the D/L convention.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Alanine has the formula \({\text{[}}{{\text{H}}_{\text{2}}}{\text{N}}–{\text{CH(C}}{{\text{H}}_{\text{3}}}{\text{)}}–{\text{COOH]}}\). Deduce the structure of D-alanine and complete its structure below.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State which convention is usually employed to indicate the stereochemistry of molecules other than carbohydrates and amino acids.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Based on the structure given in part (b) (i) comment on the statement “D-alanine is a +(<em>d</em>) compound”.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-10-23_om_11.42.19.png" alt="M11/4/CHEMI/HP3/ENG/TZ1/G4.b.i/M"></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">the R– S– convention;</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">not possible to tell;</p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">This was a low scoring question, particularly parts (b) (ii) and (b) (iii).</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a low scoring question, particularly parts (b) (ii) and (b) (iii).</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a low scoring question, particularly parts (b) (ii) and (b) (iii).</p>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Amino acids are the building blocks of proteins.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the structures of the main form of glycine in buffer solutions of pH 1.0 and 6.0.</p>
<p>The p<em>K</em><sub>a</sub> of glycine is 2.34.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAxMAAADgCAYAAAB4tDt6AAAXEUlEQVR4Ae3df2yU930H8M8ZVPUPQqouVbGTaiiLEjLVWyZY9gerlIQOj2mZohSlaxpEyrSk20RYqwgLkk1rB0FhKFmydFMXFUHNpKpVWapEy0iLl0itNKF4QqV/YIRQpAW7UtGUUv7ootk3ne0jx33P8AEO7PO9kND5+dzn+fX6Hs/xfu55zpVqtVoNfwgQIECAAAECBAgQIHCZAj2X2a+dAAECBAgQIECAAAECUwLChBcCAQIECBAgQIAAAQJXJLC4PlelUqn/6JEAAQIECBAgQIAAAQItBRrvkjgfJmrFWqBofLLl3IoECBAgQIAAAQIECHSdQKus4DKnrnsZ2GECBAgQIECAAAEC7REQJtrjaCkECBAgQIAAAQIEuk5AmOi6IbfDBAgQIECAAAECBNojIEy0x9FSCBAgQIAAAQIECHSdgDDRdUNuhwkQIECAAAECBAi0R0CYaI+jpRAgQIAAAQIECBDoOgFhouuG3A4TIECAAAECBAgQaI+AMNEeR0shQIAAAQIECBAg0HUCwkTXDbkdJkCAAAECBAgQINAeAWGiPY6WQoAAAQIECBAgQKDrBISJrhtyO0yAAAECBAgQIECgPQLCRHscLYUAAQIECBAgQIBA1wkIE1035HaYAAECBAgQIECAQHsEhIn2OFoKAQIECBAgQIAAga4TECa6bsjtMAECBAgQIECAAIH2CAgT7XG0FAIECBAgQIAAAQJdJyBMdN2Q22ECBAgQIECAAAEC7RFY3J7FzM1SKpXK3KzYWgkQIECAAAECBAi0UaBarbZxaddvUR0dJmpMnQp//YbYmggQIHDlArWTNo6zV+5nTgIECGQEOvkEucucMiOshwABAgQIECBAgACBQkCYKEgUCBAgQIAAAQIECBDICAgTGSU9BAgQIECAAAECBAgUAsJEQaJAgAABAgQIECBAgEBGQJjIKOkhQIAAAQIECBAgQKAQECYKEgUCBAgQIECAAAECBDICwkRGSQ8BAgQIECBAgAABAoWAMFGQKBAgQIAAAQIECBAgkBEQJjJKeggQIECAAAECBAgQKASEiYJEgQABAgQIECBAgACBjIAwkVHSQ4AAAQIECBAgQIBAISBMFCQKBAgQIECAAAECBAhkBISJjJIeAgQIECBAgAABAgQKAWGiIFEgQIAAAQIECBAgQCAjIExklPQQIECAAAECBAgQIFAICBMFiQIBAgQIECBAgAABAhkBYSKjpIcAAQIECBAgQIAAgUJAmChIFAgQIECAAAECBAgQyAgIExklPQQIECBAgAABAgQIFALCREGiQIAAAQIECBAgQIBARkCYyCjpIUCAAAECBAgQIECgEBAmChIFAgQIECBAgAABAgQyAsJERkkPAQIECBAgQIAAAQKFgDBRkCgQIECAAAECBAgQIJARECYySnoIECBAgAABAgQIECgEhImCRIEAAQIECBAgQIAAgYyAMJFR0kOAAAECBAgQIECAQCEgTBQkCgQIECBAgAABAgQIZASEiYySHgIECBAgQIAAAQIECgFhoiBRIECAAAECBAgQIEAgIyBMZJT0ECBAgAABAgQIECBQCAgTBYkCAQIECBAgQIAAAQIZAWEio6SHAAECBAgQIECAAIFCQJgoSBQIECBAgAABAgQIEMgICBMZJT0ECBAgQIAAAQIECBQCwkRBokCAAAECBAgQIECAQEZAmMgo6SFAgAABAgQIECBAoBAQJgoSBQIECBAgQIAAAQIEMgLCREZJDwECBAgQIECAAAEChYAwUZAoECBAgAABAgQIECCQERAmMkp6CBAgQIAAAQIECBAoBISJgkSBAAECBAgQIECAAIGMgDCRUdJDgAABAgQIECBAgEAhIEwUJAoECBAgQIAAAQIECGQEhImMkh4CBAgQIECAAAECBAoBYaIgUSBAgAABAgQIECBAICMgTGSU9BAgQIAAAQIECBAgUAgIEwWJAgECBAgQIECAAAECGQFhIqOkhwABAgQIECBAgACBQkCYKEgUCBAgQIAAAQIECBDICAgTGSU9BAgQIECAAAECBAgUAsJEQaJAgAABAgQIECBAgEBGQJjIKOkhQIAAAQIECBAgQKAQECYKEgUCBAgQIECAAAECBDICwkRGSQ8BAgQIECBAgAABAoWAMFGQKBAgQIAAAQIECBAgkBEQJjJKeggQIECAAAECBAgQKASEiYJEgQABAgQIECBAgACBjIAwkVHSQ4AAAQIECBAgQIBAISBMFCQKBAgQIECAAAECBAhkBISJjJIeAgQIECBAgAABAgQKAWGiIFEgQIAAAQIECBAgQCAjIExklPQQIECAAAECBAgQIFAICBMFiQIBAgQIECBAgAABAhkBYSKjpIcAAQIECBAgQIAAgUJAmChIFAgQIECAAAECBAgQyAgIExklPQQIECBAgAABAgQIFALCREGiQIAAAQIECBAgQIBARkCYyCjpIUCAAAECBAgQIECgEBAmChIFAgQIECBAgAABAgQyAsJERkkPAQIECBAgQIAAAQKFgDBRkCgQIECAAAECBAgQIJARECYySnoIECBAgAABAgQIECgEhImCRIEAAQIECBAgQIAAgYyAMJFR0kOAAAECBAgQIECAQCEgTBQkCgQIECBAgAABAgQIZASEiYySHgIECBAgQIAAAQIECgFhoiBRIECAAAECBAgQIEAgIyBMZJT0ECBAgAABAgQIECBQCAgTBYkCAQIECBAgQIAAAQIZAWEio6SHAAECBAgQIECAAIFCQJgoSBQIECBAgAABAgQIEMgICBMZJT0ECBAgQIAAAQIECBQCwkRBokCAAAECBAgQIECAQEZAmMgo6SFAgAABAgQIECBAoBAQJgoSBQIECBAgQIAAAQIEMgLCREZJDwECBAgQIECAAAEChYAwUZAoECBAgAABAgQIECCQERAmMkp6CBAgQIAAAQIECBAoBISJgkSBAAECBAgQIECAAIGMgDCRUdJDgAABAgQIECBAgEAhIEwUJAoECBAgQIAAAQIECGQEhImMkh4CBAgQIECAAAECBAoBYaIgUSBAgAABAgQIECBAICMgTGSU9BAgQIAAAQIECBAgUAgIEwWJAgECBAgQIECAAAECGQFhIqOkhwABAgQIECBAgACBQkCYKEgUCBAgQIAAAQIECBDICAgTGSU9BAgQIECAAAECBAgUAsJEQaJAgAABAgQIECBAgEBGQJjIKOkhQIAAAQIECBAgQKAQECYKEgUCBAgQIECAAAECBDICwkRGSQ8BAgQIECBAgAABAoWAMFGQKBAgQIAAAQIECBAgkBEQJjJKeggQIECAAAECBAgQKASEiYJEgQABAgQIECBAgACBjIAwkVHSQ4AAAQIECBAgQIBAISBMFCQKBAgQIECAAAECBAhkBISJjJIeAgQIECBAgAABAgQKAWGiIFEgQIAAAQIECBAgQCAjIExklPQQIECAAAECBAgQIFAICBMFiQIBAgQIECBAgAABAhkBYSKjpIcAAQIECBAgQIAAgUJAmChIFAgQIECAAAECBAgQyAgIExklPQQIECBAgAABAgQIFALCREGiQIAAAQIECBAgQIBARkCYyCjpIUCAAAECBAgQIECgEBAmChIFAgQIECBAgAABAgQyAsJERkkPAQIECBAgQIAAAQKFgDBRkCgQIECAAAECBAgQIJARECYySnoIECBAgAABAgQIECgEhImCRIEAAQIECBAgQIAAgYyAMJFR0kOAAAECBAgQIECAQCEgTBQkCgQIECBAgAABAgQIZASEiYySHgIECBAgQIAAAQIECgFhoiBRIECAAAECBAgQIEAgIyBMZJT0ECBAgAABAgQIECBQCAgTBYkCAQIECBAgQIAAAQIZAWEio6SHAAECBAgQIECAAIFCQJgoSBQIECBAgAABAgQIEMgICBMZJT0ECBAgQIAAAQIECBQCwkRBokCAAAECBAgQIECAQEZAmMgo6SFAgAABAgQIECBAoBAQJgoSBQIECBAgQIAAAQIEMgLCREZJDwECBAgQIECAAAEChYAwUZAoECBAgAABAgQIECCQERAmMkp6CBAgQIAAAQIECBAoBISJgkSBAAECBAgQIECAAIGMgDCRUdJDgAABAgQIECBAgEAhIEwUJAoECBAgQIAAAQIECGQEhImMkh4CBAgQIECAAAECBAoBYaIgUSBAgAABAgQIECBAICMgTGSU9BAgQIAAAQIECBAgUAgIEwWJAgECBAgQIECAAAECGQFhIqOkhwABAgQIECBAgACBQkCYKEgUCBAgQIAAAQIECBDICAgTGSU9BAgQIECAAAECBAgUAouLSocVKpVKh22xzSVAgEBnCTjOdtZ42VoCBAhcT4GODxPVavV6elkXAQIEukqgFiQcZ7tqyO0sAQJzINDJJ21c5jQHLxirJECAAAECBAgQILAQBISJhTCK9oEAAQIECBAgQIDAHAgIE3OAbpUECBAgQIAAAQIEFoKAMLEQRtE+ECBAgAABAgQIEJgDAWFiDtCtkgABAgQIECBAgMBCEBAmFsIo2odrIHAmhgdXRaVvewyfnWyx/JnnB/bGiVZPt5jjykvvxcieP4y+weE4e8mFvB/jI0MxeG9f1L4ZolLpi3sHX47vjYzHNd/MS26bBgIECDQKTMbZ4e3RV1kVg8NnGp+Y+bn+/EOx98QvWzzfntLk+JHYPzjQcMwcipHx9y++8MnxGNk/GPdOHWdrx9qBGNz72qXnu/hSPUugIwWEiY4cNhvdPQJn4/j+XbH9X/8rtcuTp1+Lp+8/EPHoKzE2UY3qxEg8u+yH8Wf3/0O82TIUpRariQABAgtSYPL0wfjTT309Jr7wnamvQK7+Yjg2x4FY9eiBi5woej9Ov7Iz7t8X8ejbYzFRrcbE2F/Hsre2xf1//8PESZ8FSWmnulhAmOjiwbfr81tg+mzZ9njtzj+Kzy7JbOsv4+Shb8Xe/s/Gn2y4O3pr/7p7euPuLdtiR/9bcejt/8ksRA8BAgS6ROBMvPniM/H6Zz4f61csnd7nJSviwacGY+uxf4xvvNnq05KImDwVh77+79G/4QuxYWVvTB9qV8eWp74U/UM/iLeduOmS14/drAsIE3UJj10i8MHH5i8Pfz+e39g/89H2QAzuPxLj8+VaoMnjse/Rr8bowLb48qpfSY7NuXh39FT03rU8ljX+y+65KZbf9b8xdOjHzpglJbURIHCVAmeHY7CvLwZe/n785/Mbo+/8ZZeJS4iuctXp2c/+OA4NRWwY+I2YiRLTsy69L54dezueve+m1os6Nxajxz4Sdy2/aSpI1Jt6li2Pu+INJ27qIB67RqDxvxxds9N2lEDEd+KxRw5E/MUbMVGdiF+MPh6x7+F4+LkjcW4+8PTcEuv2fSueue/mC96sLrppk2finaNjs7aMH30nfjpfwtKsW+kJAgQWjsB4vPHYl+Of4rEYqV12Wb+E6OGvxci5uT8YTf70nTg6fmvccePpGN5bv/+hPzbuORQnLrJ90/PNNkpjcfSdM+5Rm41HfUEKCBMLcljt1KUFPhmbXvpqbLm79hF1Tyy5/YF46q8eitHnXokjjR9Rj++KNTcumvn0onaTXf3vx2LN7pHZVzN+MDae763P0/x4b+wZmS26LIne3tS1TR9sw9TZsvEPpv1EgACBORbo3fSVeGbL6unLLuuXEI3+S3z7SONllyOxe83HGo6v9WPlorhxza6Y/aj233Fw420t5qvPP/14256R+L/CYTLOvXsyjsWpGHryb+IHy5+Iw9VqVKs/im0f/Xb8wZZX4nTLvFOfr1igAoGuFRAmunbou33H74zVn/x4w1n/nlhyy23RP970EXXvtjj884npG/Om3mhqbza1vz+Lw1tXzo7Y+2Dsv6C/Pl/j43/EkysvMzDMvkbPECBAYJ4J9Eb/6l+fDhL1LVvSF3f0jzVddrkyth7+WYvj7ET8/PC26K3PWzx+Ih7cf7LFfI3H2WqcfHJlLC7mrRfG4kMbdsWO858CL40V6z8fn3n9mXhxtnsm6rN6JEBgSkCY8EIgcIFAB39EPfUmPfvb7gW7aYIAAQJzKDB/LrvsK+59iKlj6XuzXK40c+JpDu2smsB8ExAm5tuI2J45FmjxxnIlW3TVlzldwUqnbrTum3XG4sbsWTs9QYAAgWsr0J7j0dVc5tQTS1d9OjZcwfmXqRutZ52vTe8h15bf0gm0VUCYaCunhXWOwKkYfbfxfoWZ62B718bAqo9e/W7MyWVOS+KWO26N4ozf1I3Z70X/HX3hoqqrH1pLIEAgKzAex0bHLvxSi6l7u/rKb1DKLvKCvqu8zGnJr8XvrGvxTXdT27gifu83lzVcCtuw4lk+uTh/Q/ctjrQNWn7sAgFhogsG2S62EhiJ3X/7XBw8Ufud0pNx7vhQbH7k1Vj30uNxz9JO/Wfx4bht4I9j07HnY+e+n0y/gU+Ox5EXdsXTxx6KwfW3t35jbMWjRoAAgTYIjO9+NnYePD59PDr3k9i7eUsMrdseT9wzy9eutmGd6UX0fCLW/vmmuGP3c/HPI+9Nz1Y7Zn5jf3x33ab43G99pPWiem6Ngcd/P449/Xex73jtPSRicvxH8cLO5+PY1i/G+ts/3Ho+VQILVKBT/9e0QIfDbl0/gbWxdcOdcWrn6qhUFsUN9w1H//7vxgsP/mrn/Id78njsHeiLSt/2GJ75Bqqemz8dgwe+FMuG1sYNtW+TWtQXDxztj5de3dzBIen6vSqsiQCBdgr0xj1b18dvn9oVt9eORzd8Lt7q3xNvvvBA3Dwv/vfRE0tWbolXRzdHvPip6W+FWrQ2vjbxcPxbwzZOntgbA5VK9A0Oz/yung/FzWufiAM7boqhO2+cmm9R3xfjaP9X4tW//N0Lf2dFOzkti8A8FahUa19NM/On9rWXDZP18rx97LTtnbeQXbVhtV9a93SsWHMydox+MzY5g9RVo29nL1/AcfbyzcwREbVfWrfikTi6Yzhe37Sic07SGDwCcyTQKcfaVts5L84NzNG4WS0BAgQIECBAgAABAlchIExcBZ5ZCRAgQIAAAQIECHSzgMucunn07TsBAgQuIdDqI+1LzOJpAgQIELhMgU451rbaTp9MXOZgaydAgAABAgQIECBAYFpAmPBKIECAAAECBAgQIEDgigQWX9Fc82im2sct/hAgQIDAtRNwnL12tpZMgACBThfo6DDRSV9j2+kvFNtPgAABAgQIECBAoFnAZU7NIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJCBMpJk0ECBAgQIAAAQIECDQLCBPNIqYJECBAgAABAgQIEEgJVKrVarXWWalUUjNoIkCAAAECBAgQIECgewVm4sMUwOI6Q2OxXvNIgAABAgQIECBAgACB2QRc5jSbjDoBAgQIECBAgAABAhcV+H//R/BHxmYRwQAAAABJRU5ErkJggg=="></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the pH of a buffer system with a concentration of 1.25 × 10<sup>−3</sup> mol dm<sup>−3</sup> carbonic acid and 2.50 × 10<sup>−2</sup> mol dm<sup>−3</sup> sodium hydrogen carbonate. Use section 1 of the data booklet.</p>
<p>p<em>K</em><sub>a</sub> (carbonic acid) = 6.36</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch the wedge and dash (3-D) representations of alanine enantiomers.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>UV-Vis spectroscopy can be used to determine the unknown concentration of a substance in a solution.</p>
<p>Calculate the concentration of an unknown sample of pepsin with an absorbance of 0.725 using section 1 of the data booklet.</p>
<p>Cell length = 1.00 cm</p>
<p>Molar absorptivity (extinction coefficient) of the sample = 49650 dm<sup>3</sup> cm<sup>−1</sup> mol<sup>−1</sup></p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A different series of pepsin samples is used to develop a calibration curve.</p>
<p> <img 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SMBEiABzybwyy+/IDs7GzfffLM8QjF//nx07NhRPi7gp59+wtWrVykmPLsJq62joKhGwRsSIAESIIGGJCDWRzz22GMYPnw4pk+fjrNnzyI5OVlenHnq1CmcOHFCngIRIxccmWjIlnGvLK6hcI8bU5EACZAACbhJQOzcWLlyJWbOnInevXtjz549CA8Pr87t119/RZMmTeSRigsXLuDy5cvVz3jjuQR42qibbaPGSW1umuJUMi3ZS1udalKXI2mJq6icluylrc53RzG9IaY1du/ejczMTIwYMaLGIssdO3YgNTUVer0eAQEBcsanT5+Wd3+InSCeun5CS31Arc8Xpzyc/xwwJgmQAAmQgJsESkpKMHbsWHl6IyoqCsePH5fdalvu2LAlJkRxbdu2lddRTJgwgaMVbvJviGQUFA1BmWWQAAmQgI8SEIsuV6xYIe/Q2LdvH3JycpCWlobg4OAaROyJCXMkigozCc995RoKz20bWkYCJEACmiaQm5srT1+I6Y3ly5djzJgxNaY3LCsnxEZFRYVlkM17cfqoECmeOvVh02gfCeQIhY80NKtJAiRAAg1FQOzOSEpKQkxMjLwWori4GBMnTrQrJoRdYjpD7PYQUyHl5eVWpop1FMKDZnp6Om666Sar5wxofAIUFI3fBrSABEiABLyCgBg5WLNmDTp06ID8/HxkZWVh48aN1d4uHVVyypQpNkWFpZgQizV5eSYBTnl4ZrvQKhIgARLQFAHhU2L27NnyeRxz587F+PHj0bp1a5frIESFuIQYEcJEbBs1j0xQTLiMs0ETcISiQXGzMBIgARLwLgLCp4SY3ujZs6dcMeFTIiUlxS0xYSZjHqn4/vvvKSbMUDTwSj8UbjYS9xy7Cc6JZFpiS1udaFA3o5Ctm+AcJFOSq/ApIdY9iEuMKMTGxta5TsKBaVaP77zzTnz++efyOgyrhx4WoCTXhqiaGvZyhKIhWo5lkAAJkIAXERA+JYYOHSqLCbPL7GHDhikqJgSuAwcOaEJMeFHT1qsqFBT1wsfEJEACJOA7BMT0xrx582SfEmL7pvAdIXxKuLNWwneo+U5NuSjTd9qaNSUBEiABtwlY+pSw5TLb7YyZ0GsIcITCa5qSFSEBEiAB5QmYXWYLnxI9evSA8CkRHx+v+PSG8pYzx4YmwBGKhibO8kiABEhAAwSET4kNGzYgISFBPhFUuMyOjo7WgOU0sbEIUFA0FnmWSwIkQAIeSmDnzp2YOnWqfCKo8Ckh7i0P8fJQs2lWIxPglEcjNwCLJwESIAFPIWB2mR0ZGVntMlv4lKCY8JQW8mw7OELh2e1D60iABEhAdQJiemPLli01fEqIbaC8SMAVAhyhcIUW45IACZCAlxEQLrMfe+wxK58SXlZNVqcBCFBQNABkFkECJEACnkbA7FPC0mU2fUp4Witpyx7vERQmIwozk9Hfzw/CpaifXwySMz5FodH6GNyaTVQOY+FaJPfXX0uXuQtGU81YfEcCJEAC3kJAuMweNGgQZs6cCeFT4v3330d4eLi3VI/1aCQCXiIoynFy41wMWQ08WWBAhSShwvAi2m2fgSFLdqDULlwTygrfwONDvsQ9647Kh9BIFX/HPf/+Mx5/fRfK7KbjAxIgARLQHgHhU0Jc4vyNqKgoHD9+nD4ltNeMHmuxdwgK0xHkvPUZwuKeQlyEDqJS/rq+mDxzKsLWfo6CUnvDDeew68N3URw3DPe3D6hsJP8OuP+JaBS/vhG77Kbz2PakYSRAAiRgRUAsulyxYoXsMls8NLvMDg4OtorLABJwl4B3CIoyA4qLWiG8UxtZTJhh+LfrhHDkIqfgnDnI+VfjIRw95Wi6xPnsGJMESIAEGoOAcJndr18/TJo0CcuXL5dN6Nu3b2OYwjK9nIBXCArTqaPYa7TXUgbsPXoGtscoWqPPyCcQujYbn5+sEg8mIwo+34/QhdMwMqSZvUwZTgIkQAIeTUD4lBg7diwsXWZPnDjRo22mcdom4AV+KEwoO3EIRQBcX1Lkj8CIZ/HWnHiEBl9/rSWj01G8pQ8Cr4XYvBOLP7V0acle2qpOz9ISV0FAS/Z6sq1vv/02xD/z5cm2mm00v9JWMwnPf/UCQVEfyBdQuGg0hhSNwIFLH6BboBiwKcXBjKn441NN8OkbcVVhtsuQJMn2Aw8MFR9KrdhLW9XpQFriKghoyV5PsVX4lHjmmWeqXWaPHz/e6mhxT7HVmV5OW52h5F4cwVbpywumPPwRGNwVYe6QKf0KH75+CnEJgy2EQxC6PfoEhm9djnd2ubH2wh07mIYESIAE6kFA+JRISkqC8Cmh1+vlE0GFy+zWrVvXI1cmJQHXCHiBoADkxZc6exXXWy3WrIxpQmnB51hra+1FoB6hYQaszdlfx5ZTe+UxnARIgAQahoDYvSF8Stx8881YuHAhsrKyZJ8SISEhDWMASyEBCwJeISggC4ALVosvKxdrdkZosK3VEP4I6nU/4mwJEXnXiB5xMXchyAIWb0mABEjAUwgInxK2XGbzIC9PaSHfs8M7BIV/Z8SMG4Si1IVYfbDSjZXJuBNL5y5GUdJ4PGpvt0ZQLzw1pxf25nyCvBKz+6tSHPzoXawNfQIj+3C40Pc+EqwxCXg2AbPL7NDQUBgMhmqfEpze8Ox28wXrvENQIADto5/DujltsPaOlvJirib68dgb9jI2TYmsHmUwlWQgxs8P+uS8qqmMIHRLTMPyGCBnXLcq19t98dq5kcjfNBkR8iJNX+gGrCMJkIAWCAifEpYus7dv3w76lNBCy/mGjX6SVpb+e1h7aGn1sUCnJXtpqzqdXUtc2Wdr9gExvSHWSIitn08//TReeukluOvlUkv9gLbW7AdKvlODrZeMUCiJmXmRAAmQgGcQsHSZvW/fPuTk5GDVqlVuiwnPqBWt8FYCPu6HwlublfUiARLQOoGdO3di6tSpsk8J4TJ7zJgx4IJLrbeqd9vPEQrvbl/WjgRIQGMEhMts4VMiMjKy2qeEcJlNMaGxhvRBcykofLDRWWUSIAHlCFy+fBlK+H0Q0xtr1qxBhw4dkJ+fL/uU2LhxoyJ5K1db5kQC9glQUNhnwyckQAIkUCcBISYmTJgge6RcsmRJnXHreihcZgufEgkJCZg+fTo+++wzDBs2rK4kfEYCHkeAgsLjmoQGkQAJaIGAWUwYjUb85je/kUcUXBUVli6zRZ337NmDtLQ0uszWQgegjVYEuCjTCgkDSIAESKBuApZiom3btnJkMVUhXF+La8qUKXVnAMgus+fPny8vuhTpYmNjuU7CITVG8GQCHKHw5NahbSRAAh5HwJaYEEYGBATI6x+EOKhrpEL4lBg6dCiGDx+OqKgoHD9+XJ7e4KJLj2tqGuQiAQoKF4ExOgmQgO8SsCcmzETqEhVi0eW8efNQ22W2uw6qzGXylQQ8hQCnPDylJWgHCZCA1xBo0qRJjekL4TI7NTWVPiW8poVZEVsEOEJhiwrDSIAESMAGgWbNmuGNN96ATqfD6dOnrWKUl5fLB3aJHRvjxo2D8CkxduxYxMTEoEePHiguLgZ9SlhhY4CXEKCg8JKGZDVIgAQahoA9UWEpJuLj46t9Sli6zFbCX0XD1JKlkIDrBHg4mOvM5BRqHKzipilOJdOSvbTVqSZ1OZKWuIrKebq9luspWrVqVT0y0b1792qX2XPnzsX48eM9ahuop3O17Ni01ZKGsvdqsOUIhbJtxNxIgAR8hIDlSMX333+Phx56CIcPH67hMjslJcWjxISPNA2r2UgEOELhJng11J2bpjiVTEv20lanmtTlSFriKiqnFXvPnz+PO++8E6dOnZLbRGwb9WQvl1rhqqU+oDVb1bKXIxTyVwD/IwESIAHXCQiX2U899ZQsJoTL7LNnz3q0mHC9hkxBAs4ToKBwnhVjkgAJkIBMQLjMFj4levbsKa+dEIF0mc3O4esEnPRDYcJl415s25KHf+/6Bqe7JuL1qTp88fevEfxoLHrccr2vc2T9SYAEfIRAdnY2zC6zMzMzMWLECNA5lY80PqtZJwEnRigqcP5/yzDqvn54cMx0pL21GquLfsTli4exdeYjiBy1ENuMV+oshA9JgARIQOsEhMts4VPC0mW22B761ltvVXu/1HodaT8J1IeAQ0EhncvHgqdmIe+3r+Dfx/6FtC5VxbWOQvL7qbjjXwswJeMr/FwfK5iWBEiABDyUgHCZvWLFClk0mH1KiOkNMSohzuzYvHkzbr31VghxYTAYPLQWNIsE1CfgQFCYcGnvNqw52Amjx45EpL4F/Kptuh66B57A+OgW+PqzfThaUf2ANyRAAiTgFQSEy+x+/fph0qRJWL58ObZv347o6Gi5bmYxIbxmtmzZUv5HUeEVzc5KuEnAoaD46cI5GNEGXXQtLcREVWn+N6JVuxsAYxl+kdy0gMlIgARIwMMICJfZSUlJsstsvV5v5TLbUkz4+1d+jbZo0YKiwsPakeY0LAEHgqIJWuo7ojuO46tDP6K2ZpDOfYv/bD2MwPs6Q9+kYQ1naSRAAiSgNAExvbFmzRr5GPL8/HwInxIbN26EpctsW2LCbAdFhZkEX32RgANB4YcbwgdjwkMVeH/WPPz9v0dwUUxt/HIWx/ZtwfKpM7DEGIG44b3R7tpciC9yZJ1JgAQ0TkD4lBCHeiUkJEC4zP7ss8+sfEqINRLr16/HzTffDPPIRO1qC1EhLiE8eJGALxFwwlOmhKvGz/HqE2Pwyr+O12LTA6MWrcDy5yNxi48JCi15mxONpiV7aWutj5lCb7XEtSH7rPApIbaBLly4EA8//DBmz56N8PBwu9R37NghH0UupkICAgKs4olTSMW6CnEqqXDP7WmXlvoBbVWv96jB1glBUVkh6fw+ZP2jEBfLzuF8uR+kk9/B+LuJeGVkdwT6mJgQRNRoDPW6jrbs1RJb2qper20ItsKnhNgGKi4xvREbG4vmzZs7rJQ9UeHpYkJUrCG4OgToZATa6iQoN6KpwdbBlIewsgJl37yLP8fE4rniThjx3DRMm/YsBoeewuI//REPzd4K49XaqyvcqB2TkAAJkEADERA+JYYOHSqLCUuX2c6ICWFiZGQk5syZI28TFceWi0sLYqKB8LIYHyXgUFAIPxRzHh2PlRf6Y2L/jqgc4Lset8X8BZlJv8XuV57Bs2sO4FcfBchqkwAJaIeA2WV2aGioLAbESIO7LrMtRYXRaPToaQ7ttBAt1TIBB1MeJpTmpaLbwH9gUFYO0ofdVnPraPleLOs/AJMDF6F4SyJCHMoTLaOqabsaw0U1S1D2nZbspa3Ktr05Ny1xFTYrba/wKZGamordu3fD7DLb2REJM0Nbr0KUTJs2DWJXiCeumahts9Jca+ev5HvaqiTNmnmpwdaBBDCh0g9FO9zZsXVNMSFsC7gZwV1bA4fP4ZKpprF8RwIkQAKeQMDsMjsmJgY9evSQfUoIB1RKiAlRPzFS8eWXX2pCTHhCe9AG7yXgQFA0QeuOXdEDxcjdfdRqWoN+KLy3Y7BmJKB1AmafEmJ6w+wye9WqVTV8Smi9jrSfBDyJgIPTRv1w/V1/xHMPv4Ex08fhmUsTMfq+29HqOhN+Nu7BpyuXYInxXiTHRdIPhSe1Km0hAR8nsHPnTkydOlWe3hA+JcS9UiMSPo6W1ScBuwQcjFAAuO4OxL/5DhYO/gmrkx7H/b/vjV697sEfhoxH2vYOmPLBW0jt39Z6OsRukSo9MBlRmJmM/n5+8tyrn18MkjM+RaGxcgV2XaWajLuQmRxTlU6P/slrnUpXV558RgIk0PAEzC6zxTSE2WV2SkoKxUTDNwVL9EECDhZlWhCRfobxQBEOHDHiQrkfbrylIzrf0Q1d2zRrfDGBcpzMfh69l9+I1xZNQVyEDjDuxNIXxmNhu6U4uGAAgiyqYnlrOpmNsf02o++ni5HYLQgoO4jsVydj+N5RdS40VWNBi6VdSt9ryV7aqnTrV+anJa7CYlfsFdMbW7ZsqeFTYtiwYeqAtJGrK8INNHkAACAASURBVLbaSN6gQbRVHdxa4ioIqGGvk4LiKsqM3+OwoRRXbbVFi47oEdIGDuZPbKVUJsx0EBmxD2L9qE+xJbEbzMMuppIMxEYdQvLBORgQZA61LPIM8pIHYTTSaoqO0jwkd0sC1n2GBQPaWCaovlejMaozV+FGS/bSVhU6gEpfIOpYWpmrs/1AuMwW3i0//vhjCJ8SL7zwAlq3bq2maVZ5O2urVcJGCKCt6kDXEldBQA17HWsA6SK+eWc6HhmzCt/Za4f4LBgyh0Fn77na4WUGFBe1Qnhym2oxIYr0b9cJ4fgbcgqexwBbwqB0P3LWAnHr7qo5ghE0AAsMBWpbzfxJgATqQUD4lFi5ciVmzpwpu8zes2dPnS6z61EUk5IACThBwIGgkFC+fw2eGbMKxt5P4tVxMbjzJmvf9f639MRNThSmVhTTqaPYawRse983YO/RMzChptgQtlSm64xRLU8iL2MhXh2Thnx0R/zCRZg5/gGEBNoa1VCrFsyXBEjAWQLCZbY4f0NpnxLOls94JEAC1gQcCIoKnD38Db5AT0x59TXMjGnnAeslalfChLITh1AEe4Kidnzze3O6IyifNhu/n7UC26QF8EcpDmZMxR8n/4Ttq4ahfR2aQgwZaenSkr20VZ2epSWugoAz9orTQcW/xr6csbWxbTSXT1vNJJR91RJXZWtemZsDQeGPG1u1hg7N0OKGAA8UE0ogMSAgbh3mDGhfNV0ShG6PPoHhqUlYlv8Hu2soRMmSpJ0zTERH14q9tFWJfm2dh5a4Cust7RWLLtPT0zFp0iT07t1bPkcjOjraupKNFGJpayOZ4HSxtNVpVC5F1BJXUTFhr9JXHX9/i6L8EXTvn/DiQ6exIfvf+OGyJ7rD9EdgcFeEuU1Gj/BOtaZDAvUIDbtQNVXidsZMSAIkoAAB4TK7X79+sphYvnw5tm/fDk8SEwpUkVmQgFcQcDBCAVT88C0KS/1xcMkj6Ph2BAYP/S1uriVD/MOexuvT7mu0dRTy4ku7K0JtCAa56fwR1Ot+xOlyvaIhWQkS8EYCSUlJWLhwIZ5++mmsW7eOXi69sZFZJ68h4FBQ4JfTKMyv2t9RVojN6wqtKh84bgTSrEIbMKBqRGF9rcWX1YsugwNtGxPYBffEXsHEnP2YOcDCV4W8a6QbHpjXrsauEduZMJQESEBJAmJ6Y8OGDXKW4sCtrKwsNKRPCSXrwrxIwJcIOOmHwtORVDm2mvgL5uRVOqgyOeXYyoSywqUY0msbBhesw7SIVoDJiF1LX8DjXz9c56JMLc6XcQ2F8v1YS/1AC7YKnxLPPPOMvHtDtNbZs2cb3KeEO71EC2zN9aKtZhLKvmqJq6i5GvbWmrxQFnDD5RaA9tHPYd2cNlh7R0sZVBP9eOwNexmbpkRW+5gQjq5i/PygT85DqWycPwIjJmNT8SRg2X1yOr8m0Xij4nH8c+nQOnd4NFzdWBIJeD8B4VNCTG/07Nmz2mW2qHVDO6jyftKsIQmoR8DJEYqrKDteguLTv9SypAI//3gIew1dMDrxnkZbQ1HLqAZ5q4a6U9NwLdlLW9XpCZ7I1ZbL7NjYWPnsDU+0117L0FZ7ZOoXTq7141dXajXYOl5DIZ3B//76Z4yevgGH7VgXOG4T/pRo5yGDSYAESMAGgZKSEnlUojFdZtswi0EkQAJuEnA45WH67hO8NH0D/q93PFJfGYeoQCAwahxemTUW/bsEAr1T8dFLD+AWNw1gMhIgAd8iIKY35s2bh9DQUBgMBuzYsQNpaWmc3vCtbsDaeiEBB4KiAmdL9uILdMfoF+fhldRpSBzYAWUBfTBq9pv4JGsBHjqwBR8XnoZ2XDx5YSuySiTgBIEOHTrg8uXLTsRUL4rwKTFo0CD5/I3MzEzZp0Tfvn3VK5A5kwAJNBgBB4JCwtXycpShDbroxGLH1uh0VzBQdAgnyvwQeFc0Hh14Gm++nY+jVBQN1mgsiARcJSBGAdq3b48JEyY0iqgQ0xtjx45FTEwMevTogePHjyM+Pl5eK+FqXRifBEjAMwk4EBRNEHRLO3TAGRw2XoSEG3Brp2DA+ANOnv0VQFMENGsCfP1/OFfhmRWkVSTg6wSEmBDHeuv1ehiNxgYVFWLR5YoVK+TpjX379iEnJwerVq1CcHCwrzcL608CXkfAgaDww409BuDJbkex7pXZWPHf82h/Z090x06sf28L/rvtE/wj9ygC+3TALU28jg0rRAKaJ2ApJlq0aIG2bds2mKjYuXNntcvsuXPn0mW25nsTK0ACdRNwICgABN2LSRlzMfhCDj49cBHNe8VhyYt3YHvqI7j3gclY/+tgzJg0EB2UP2ekbsv5lARIoE4CtcWEObLaouLEiRPy7o3IyMhqnxIpKSmc3jA3AF9JwEsJOOmHQsLVslMwXmmNDjdfD1w9jyMFu7H/FKC7+170uS3QS08itd/qauzhtV9a/Z9oyV7aWv/2ticmLHM+ffo0dDod3njjDTRr1szykVv3lj4lxImgL7zwQr1cZrMfuNUMDhORq0NEbkXQEldRQTXsdeyHQkZrwuVzP2D3ltVYsacEp37xx02dIvD7gfcjVH+jz4kJt3obE5FAAxI4dOgQmjZtiuuvv95uqc2bN8exY8cgtnGK9RX1uYTL7NmzZ4M+JepDkWlJQNsEnBihuALjtoV4Yugs/KusdmU7IGrKYrz12jCENPOtOQ811F1tukq+15K9tFWZll+yZIl8sJbYLhoQEFAj00uXLuHixYtYs2ZNvcSEECPz58+XTwR9+OGHZVERHh5eoyx337AfuEuu7nTkWjcfd59qiauooxr2OlxDIRk2Y+aIWdjdewY+2H0Ml341QZJ+xSVDEf45pzf2LZmGpPcOQOz54EUCJOA5BKZMmYLhw4fLWzTLy8urDVNKTGRnZ8s+JcTx4uJE0Pfffx9KiYlqY3lDAiSgGQIOBEUFzhd9gY3ne+Lp5OcwstdtCGwqRiKaIlDXHbHTZ2H2vRfx8Tv/xnfcNqqZRqehvkOgtqhQQkwInxJDhw6VxUpUVJQsWMTx4mIKhRcJkIDvEnC4hqLi13L8imZocUOA9VqJ61rh1g4tgRIRhxcJkIAnEhCiQlwfffSRvPjS3WkOsehy8eLFspdLsehSLPykl0tPbHHaRAKNQ8DBCEUTtOk7HM/3PooP3v0MJWWWwxAVKNv/T7y3+SY8lRyLO+mHonFakKWSgBMEhKgQoxPuignhMrtfv36ymFi+fDldZjvBnFFIwNcI2BihuILjeWux/qsLVSx+xeVObfHdW08gomADnvrjPbgtCCj94Uv8852NKNSNQLL0M64AuM7X6LG+JKAhAvv373d5AabwKfHyyy/j7bffxtNPP41169YhJCREQ7WmqSRAAg1FwMYujzIULhqCXtPznbchPguGzGHQOZ9C8zHVWCGrJhQt2Utb1ekJrnAV0xsbNmxAQkICxPTGnDlzEB0drY5hdnJ1xV47WTRYMG1VBzW5qsNV5KoGWxuCQjixOocfL11bFe6oSn7Nb8KtrZpZr7FwlFDDz9VoDDVxaMle2qpOT3CWq3CZPXXqVOzevRvCZfb48eMb5WhxZ+1Vh5ZrudJW13g5G5tcnSXlejw12NqY8vBD08CboQusNNB05D2MTTmIATOm4PEerX1KNLjeRExBAtolUNunRHFxMac3tNuctJwEGpyADUFhacNV/N/efyNj/TfoPOUvFBOWaHhPAl5CwNJltqiS8CkRGxvLbaBe0r6sBgk0FAHHuzzC++Op243Ytetb/HjZ1FB2sRwSIIEGICB8Sjz22GOyTwlxxPnZs2fl8zfoU6IB4LMIEvAyAg5GKPzQ5LrW6BgeiHcm34u2MyMweOhvcXMtGeIf9jRen3YfbvIyOKwOCXgrATG9sXLlymqfEnv27KGXS29tbNaLBBqIgANBAUjnDuDjDfsqzSkrxOZ1hVamBY4bgTSrUAaQAAl4CoHLly/jnnvukZ1RiVNGxfkbYtFlZmYmRowYwekNT2ko2kECGiZgY5eHhmvTgKarsUJWTfO1ZC9tVbYnCDExYcIEiOmNw4cPw2g0QkxvPPfccwgODla2MAVzYz9QEKZFVuRqAUPBWy1xFdVWw16HIxSVvCtQ9v1/sfmzbfjvriM4b2qKmzqG4a57+mNIzF24RT7fQ8GWYVYkQAKKEBBiQmz7FKMR3377rbz986677sJDDz3k0WJCkcozExIggQYl4MQIxVX8+O80jBo808bx5YG4/cmV+PTNx3l8eYM2m+uFqaFGXbfCuRS01TlOjmIJMSEO8frf//4nH1Uupjxuv/12VFRUwGAwyM6qIiMjHWXTaM/ZD9RBT67kKgio0Q9qLa+0Bi2d246/jnsN/wqdiPT/Hsa5Xyosji+PxpnVqTy+3BobQ0igUQmIqY0+ffogJycHQUFBeOSRR9CtWzc0adIEAQEBsgvu1NRUeU1FoxrKwkmABLyGgIMRChNK81LRbeAmPLzpM/ztwfY1fVGU78Wy/gMwOXARirckIsShPPEabqqoOzXpqKFG1bKXtrpP1tJldosWLRAREYGOHTvazFCMYBw7dkw+n6NLly424zRmIPuBOvTJlVwFATX6gQMJYMJPF87BiDboomtZU0wIiwJuRnDX1sDhc7hEFxXq9FLmSgJOEti7d6/sU0Kcv5GcnCyPUNjzJ2EymWSfE6NGjYInigknq8xoJEACHkTAgaBogtYdu6IHivHPnd/hci3DpdP78PnWwwi8rzP0PL68Fh2+JYGGISB8SiQlJaFnz55ygcKnhNgWKo4qlyQJYpuo5SXEhNjpMXjwYIhjzXmRAAmQgBIEHEx5APi1BGsTHkT8+zdg1Jzn8eQfuuGWGypw8dhX+GT5AizN74Dkbf/AawPaWo9gKGGhh+ahxnCRmlXVkr201fmekJ2dLXu5FClsucwWiy/HjBkjD2+2bdsWWhIT7AfO9wNXYpKrK7Scj6slrqJWatjrWFBAwlXjdiyZOgXT11c5uDIzDnwAU95+Ha+O7I5AP3Ogb7yq0RhqktOSvbTVcU8QPiXEqMTHH3/s0KeEpaj49ddfNTMywX7guB+4E4Nc3aHmOI2WuIraqGGvE4KiCuTVUhwvOYDvjhhxodwPN97SEZ3v6IaubTzk2HKTEYVrl2Dak2nIl02ORlL6JIyMjUaELsBxb5BjlONk9vPoPTEI6w7OwYAg+zNCajSGk0a6FU1L9tJW+00sFl0uXry42mW2uO/bt6/9BFVPhKgYPnw4xJoJrUxzsB84bFa3IpCrW9gcJtISV1EZNey1/4tpiU/6GcZvi3GpbQQGPBiL37f5AR/85Y+4e9DTmLfxIMoky8iNcV+OkxvnYshq4MkCAyokCRWGF9Fu+wwMWbIDpU6aZDr5KV6c+AaMTsZnNBJoSAK5ubno16+fLCaEy+zt27c7JSaEjXq9XvaUqRUx0ZBcWRYJkIAyBBwLCukM/vvaSIT0GIu/F56FZNiMmUOfw+pzt6Nfi11IfWQM5vzrNBpVU5iOIOetzxAW9xTiInQQlfLX9cXkmVMRtvZzFJQ6sQWl7GusTvkrjoRGKEOWuZCAQgTE9MbYsWMRExODHj16oLi4GPHx8S6fvyEWb/IiARIgAbUIOBQUpu8+weyZ26F7cgJG390M3332Ad453wEPv5SOTZszMaf7fryxdgdONaaiKDOguKgVwju1kcWEGZZ/u04IRy5yChx9kV5A4coXkNp0PFIe72xOzlcSaFQCYnpD7NQIDQ3Fvn37ZCdVq1atQkhISKPaxcJJgARIwBYBB4KiAmdL9uILhCNh3Ej0avMjvvzkfwDuxqAIPfxuCMYdd9+Ksv8cgaHCVvYNE2Y6dRR77c5TGLD36BnYH6MwoazwHUx7vRNWvPIwOnL7a8M0Gkupk8DOnTvl6Q3hU2Lu3Lny9EZ0dHSdafiQBEiABBqTgANBIeFqeTnKzBaeP4zCfx8Hut+D8E7NAdNPuHDqZyAoAI13PpgJZScOochso6uvZQVYOe3fGLxpDoa1d3bxpquFMD4JOEfgxIkT8u4NccaGWPcgpjdSUlJcnt5wrjTGIgESIAHlCDg4bbQp2nYLRyQ+xMf/2Iw+v/kca84HovtfonBXwHmUbMzEytxL6DYrHL/R4l/2pmPInvxnbB78N2yKaAVYue6qG7RYJaulS0v20lbIW0LFtlAlLy1xFfXWkr20Vcmeei0vcr3GwtPvHAgKoMkdQzH3pU8w+OUnIA+43v4s3nysB67/5m38afh8fNf/VWx89h4ENVpN/REY3BVhyHXRArEzZCEmHnkCm5b2QqCLqUV04YVQK5f4UGrFXl+zVbjMnj17drVPiRdeeEE+ZlzpvqUlrqLuWrKXtirdWyvzI1d1uJo/X0rn7lBQwK8d/pD6LvYN2o39ZwLQOaIPwnQ3wK9sAF5Zvx0h0b9HSKvrlLbLpfzkxZc6e0n0Vos15ZjyzpBsGPON6NXieavEA1uuRnR6HrYkdqux0NMqIgNIwE0CYtfFypUr5W2gDz/8MITL7PDwcDdzYzISIAESaFwCjgWFsK/pTej8u2jU2P8Q2B0Pjmxc46tLD9QjNOwC1suLL6/t9KhcrNkZo4JtjD/4d0NijgGJ1ZmIm8soyYhHaGpXbHPg2KpGMr4hARcJCJfZ4ryN3bt3Q/iUGDFiBNdJuMiQ0UmABDyLgHOCAhUo+6EAuVvy8OWeEpz6xR83dYrA7wfej5h7b0erxluRWUnTvzNixg1C6sSFWH3vYiR2C4LJuBNL5y5GUdJSbAhp5lnUaY3PEqjtMlsIi+DgYJ/lwYqTAAl4DwEHuzxERa/AuO01PPTb32H4+BSkvbUaa9ZkYOkrE/CnfvfjkenZKLnc2GsJAtA++jmsm9MGa+9oKc+9NtGPx96wl7FpSmT1+g5TSQZi/PygT85z2num9zQ1a9KYBIRPiRUrVsg+JYQb7JycHKSlpVFMNGajsGwSIAFFCTg8y0MyZGNM9+HYED4Db6eNx+DwDghsWoEy40H8J+MlPJH6Ff6QvhkbEu9E466kUJSLw8y0tFhIVEZL9nqbrcJldmpqqjy9sXz5cvn0z+bNmzvsY0pH0BJX9lmlW/9aflrqB7T1WrspfacGWwcjFBU4X/QFNp7viaeTn8PIXrchUJ7eaIpAXXfETp+F2fdexMfv/BvfNaJjK6VBMz8SUIKA2aeEpcvsiRMncq2EEnCZBwmQgMcRcLiGouLXcvyKZmhxQwCsvC5c1wq3dmgJlIg4vEiABAQBMb2xYcMGCC+XvXv3RlZWFoYNG0Y4JEACJODVBByMUDRBm77D8Xzvo/jg3c9QUmY5DFGBsv3/xHubb8JTybG4U4uOrby6aVm5xiAgfEqIE0HNLrM/++wzionGaAiWSQIk0OAEbIxQXMHxvLVY/9WFKmN+xeVObfHdW08gomADnvrjPbgtCCj94Uv8852NKNSNQLL0M64APrWGosFbigV6NAHhU0JsA124cCGETwnhMpuHeHl0k9E4EiABhQnYWJRZhsJFQ9Brer7zRcVnwZA5DHZ9Szmfk2ZiqrGgRc3Ka8lerdkqpjSGDx8uN5+4j42N9ch1ElriKmBqyV7aqs63F7mqw1Wtz5cNQSHhatk5/Hip3Mma/IqfrrZElw4trddYOJmDFqNpqaOr1XnUajetsBU+JcTR4uKaPn061HKZrRRnrXA111dL9tJWc6sp+0quyvK0zE0NtjYEhWWR9u+ly6dxYFce/vn+O1j58zj8hyMU9mF5wBM1Oo9a1fJ0Wy1dZgsGO3bsQN++fdXCoVi+ns61dkW1ZC9trd16yrwnV2U42spFDbYOFmXWNuMqyn4oxOa3ZmJUZDh+2+8xTF/5BfzbtQR9UdZmxffeSED4lBg0aJB8/oZwmS0uLYgJb2wL1okESMCzCDglKKTLRuzPXYM5Cf2g69gLD46fhy34A5KWZeGL4iPYP38gbvKsetEaElCUgJjeGDt2LMw+JY4fP474+HhFy2BmJEACJKBlAjZ2eZir8ysuHClA3uYNyFi6CpsPlwGBndClUyDKMA3/3D4L993olB4xZ8hXEtAcAeFTIj09HZMmTZJ9SgiX2dHR0ZqrBw0mARIgAbUJ2FAEV3Gm8H3MSYhChy73YvhzH+B03ySkb/ofDh//HGl/uBVociNuuN5GUrWtZf4k0IAEdu7cKfuUEGJi7ty52L59O8VEA/JnUSRAAtoiYGOE4jKO/evvmLVmP7qMSMNHc8ZiYEgrVEY8jr3aqh+tJQGXCQiX2cuWLaNPCZfJMQEJkIAvE7AxzHAd2oY9gBERLXB4QxIG/XEUJi16H3n7jqPsamOfKurLTcW6q01ATG+I48Q7dOiA/Px82WX2xo0b6aBKbfDMnwRIwCsI2BAU16NDTArW79iLb7a/j4UPAFunP46B4XciPHoyMorOeUXFWQkSsCQgXGY/9thjsoMq4VOCLrMt6fCeBEiABBwTsCEoKhP5NWuLO//wJ0x7czP2HivApyufw92lX2LznvPA4dfx7JhXkbG5ED+UXXVcCmOQgAsEAgMDXYhdv6jCp0RSUhJ69uwpZ7Rnzx6kpaWhdevW9cuYqUmABEjAxwi45NhKuvwjvtvzH+R8mImlSz7BYQErsDdGpf0Nbz/bCw33M9D4raSGUxA1a6UVe4WTKPED/9FHH0Gv16uJRJ7eEOdv7N69W57ecMdltla4CpBaslVr9mqJLW1V52tFS1zV+nzZHaGwhdyv2S0I+f0wTFr8D3xt2IeczFcRf8cJrP/fD7hkKwHDSMAFAkJMpKamok2bNrKPB4PB4EJq56MKnxJDhw6VpzeioqIgfEqI48WbN2/ufCaMSQIkQAIkUIOASyMUNVKa31w9j6PHTQj+zc1VO0HMD7z7lWpU2fY1iwkxKhEQEIBLly7h4sWLWLNmjWIjFWLR5eLFi2Uvl71795bv6+vlUkv9QEu2it6lJXtpq7LfB+bcyNVMQvlXNdjWX1AoX09N5KhGY6hZcU+2t7aYMHNQUlQIl9li9ENMbyxfvhxjxoxRZETCk7maOZpftWSrsFlL9tJWcy9T9pVcleVpmZsabF2a8rA0hvckoAQBe2JC5N2iRQu0bNmyXtMfwqeEpcvs4uJiTJw4URExoUT9mQcJkAAJeAsBCgpvaUkN1uP8+fPysd9BQUHyNIetKghRIa6pU6faemw3TExviOkS4VNi3759EC6zV61aRZ8SdonxAQmQAAnUjwAFRf34MXU9CNx0002yN8off/xRXjNhK6vTp0/LwWLtg7OX2WV2QkKC7DJb+JTg+RvO0mM8EiABEnCPAAWFe9yYSiECkZGRsqgQOzrEmgnLS4iJ8vJypxdmmn1KiDzF4k4xvZGSkkKfEpZQeU8CJEACKhHgokw3waqxoMVNU5xK5un2irUUwkOlEAJimsMVMSGmN7Zs2SJvAxUwsrKy4I5PCadA1ork6VwtzdWSrcJuLdlLWy17mnL35Kocy9o5qcGWIxS1KfN9oxCwHKkQCymdHZkQPiUsXWafPXuWPiUapQVZKAmQgK8ToKDw9R7gQfU3i4qffvrJ4TSHmN6YN28eQkNDIaZL6DLbgxqSppAACfgkAU55uNnsagwXuWmKU8m0ZK8jW8WJoGaX2ZmZmRgxYkSjbQN1ZKtTjdNAkbRkq0CiJXtpqzqdmFzV4arW54sjFOq1F3NWmICY3hA+JYYPHw6zy+z4+PhGExMKV4/ZkQAJkICmCTTVtPU03icIiEWX6enpmDRpEoTLbOFTgttAfaLpWUkSIAENEaCg0FBj+aKparnM9kWWrDMJkAAJqEmAUx5q0mXebhMQOz3EMeYxMTHVPiXoMtttnExIAiRAAqoT4AiF6ohZgCsExPSGuITLbDG9IXxKiKPFeZEACZAACXg2Ae8ZoTAZUZiZjP5+fvLqcD+/GCRnfIpCY3ndLVBWgrwMy3RhSFiUg5IyU93p+FRxAnv37pV9SoiM586dC+Eym2JCcczMkARIgARUIeAlgqIcJzfOxZDVwJMFBlRIEioML6Ld9hkYsmQHSu2hMx1D9uThGL39NiwwXIEkp1uJ8KJpiJq8ESepKeyRUzTc7DK7Z8+e1fnSZXY1Ct6QAAmQgCYIeIcfCtNBZMQ+iPWjPsWWxG4wqyRTSQZiow4h+eAcDAgyh15rF/l56N8Qvu0zLBjQpvqBvfDqCBrbIy/s9tT93MKnhNgGKi6zy+wbbrhBFneWvD313lO52uKlJVuF/Vqyl7ba6nH1DyPX+jO0l4MabK1/Ze2V7snhZQYUF7VCeKc21WJCmOvfrhPCkYucgnM2rfcPSUSOVFBDTFyLaMDeo2fAQYprRJS8Ez4lhg4dKosJcYbH8ePH6TJbScDMiwRIgAQamIBXCArTqaPYa7RHzl1hEIlRkZ1qCBR7JTDceQJi0aWly2xxKFhaWhqCg4Odz4QxSYAESIAEPI6AF+zyMKHsxCEUAQhXAq/pGDYuWIyixJeR0bVZnTmKISMtXZ5m7+7duyHO77B1eZqttmw0h9FWMwnlX8lWeaYiR3IlVzUIeIGgUBJLKQ6ufgUTjzyKde89iPYOxm/EIk6tXOILpLHsFdMbCxcuxNtvv42nn35aPqY8JCTELrrGtNWuUXYe0FY7YBQIJlsFINrIglxtQFEgSEtcRXWFvUpfXiAo/BEY3BVhyK0nm1IczJiKAanAnLypGKALqGd+TC6mNzZs2ICEhAS6zGZ3IAESIAEvJ+AFgqJq8aXOXkvprRZrWsU0GbFr6QsYurAp5uQtRmK3IKsoDHCNwM6dOzF16lSIaQ3hU2L8+PFo3bq1a5kwNgmQAAmQgGYIOBjU10g9AvUIDbtgtSujcrFmZ4QGB9qtiMm4FSkDI3DPJ+2xIp9iwi4oJx+YXWaLtRF6vR7FxcWgTwkn4TEaCZAACWiYgHf4oUA5TmY/m+TKIQAAHMVJREFUj94Tf6keYTAZd2LpC+OxsN1SHFwwADbHHMp2YdGQoZhePAxZu1/HsPbOT3Nocb5MzTUUYnpjy5YtNXxKuOvlUktsaat6335kqw5bciVXQUCNfuAdIxQIQPvo57BuThusvaOlDKqJfjz2hr2MTVMiq8WEcFgV4+cHfXIeSnEZJR8uwvR8I2B8A8ODr5fTCcjmf5Xx1Ol83pSr2WW2cFAlfEqcPXuWLrO9qYFZFxIgARJwgoCXjFA4UVOFo6ih7hQ2sUZ2atgrXGavXLkSM2fOxMMPP4zZs2cjPLz+m3fVsLUGDAXf0FYFYdbKimxrAVHoLbkqBLJWNlriKkxXw16vWJRZq135tgEICJfZ8+fPlxddZmZmYsSIEWjevHkDlMwiSIAESIAEPJGAl0x5eCJa77TJ0mV2VFSU7DI7Pj6eYsI7m5u1IgESIAGnCVBQOI3KtyOKRZcrVqxAaGgoDAYDcnJy6DLbt7sEa08CJEACNQhwyqMGDr6xRSA3Nxepqany9Mby5csxZswYjkjYAsUwEiABEvBhAhyh8IHGv3z5sltOpcw+JWJiYtCjRw/Zp8TEiRMpJnygz7CKJEACJOAqAQoKV4lpLL4QExMmTKieqnDGfDG9sWbNGnTo0AH5+fnIysrCqlWrUNf5G87kyzgkQAIkQALeS4DbRt1sWzW23Lhpit1kZjHx/fffo2XLlrh06ZIsFIQHS3uX8CnxzDPPNKrLbC2wNfOjrWYSyr+SrfJMRY7kSq5q9QOOUKjTtxo9V0sxERwcLAsKISrEjgyxqLL2JXxKJCUloWfPnrLL7D179tBldm1IfE8CJEACJGCXAEco7KKp+4Enq/zaYsLf/5puFKMUFy9erDFSIXxKCC+X4hLTG7GxsY26TsKT2dbuFbS1NhHl3pOtciwtcyJXSxrK3WuJq6i1GvZe+6VRjitzakQCdYkJYVaLFi3k0QoxUrFjxw4MHTpUFhOWLrPpoKoRG5BFkwAJkIBGCXDbqEYbzp7Z3333Hb799lt07NgRliMTlvGbNm2KI0eO4L777kPv3r1lYdG3b1/LKLwnARIgARIgAZcIcMrDJVzXIqsxXHQt9/rdiZEH4TdCLL4MCKh5gqrYCrp7926UlpbCU11mezLb2i1DW2sTUe492SrH0jIncrWkody9lriKWqthLwWFm/1JjcZw0xSbyWqLCiEgioqKcOjQIfzud7/Dhg0bIBZreuLl6WwtmdFWSxrK3pOtsjzNuZGrmYSyr1riKmquhr0UFG72KTUaw01T7CYToiIlJQU///wzCgsLERQUhMcffxxvvvmm3TSe8EALbM2caKuZhPKvZKs8U5EjuZKrWv2AayjU6Vsekav44vjxxx9x8OBB/OY3v8Gzzz4LsfiSFwmQAAmQAAkoTYC7PJQm6gH5mV1mR0ZG4vbbb8egQYPQrl07PPHEEx5gHU0gARIgARLwRgIUFF7UqsJltvApYXaZ/cEHH+CWW26Rhzh1Op1dp1ZehIBVIQESIAESaCQCFBSNBF7pYoXL7Mcee6zap8TGjRshTgk1Go1o27ZtDf8TtjxlKm0P8yMBEiABEvAtAhQUGm9vS5fZoirCZfYrr7yCWbNmVYsJcxUtnVpRVJip8JUESIAESEAJAtzl4SZFJVZKHz58GF26dHHTAsjTG/Pnz5f9Sph9Sgi7xOmi5pEJW5nbcr9tK15jhSnBtqFsp63qkSZbddiSK7kKAmr0A45QqNO3HOYqtnSOHj0aS5YscRi3doSSkpJql9lRUVE4fvy4vD5CuMw2e8ps1apV7WTV72+88UZUVFTIUyLVgbwhARIgARIggXoQoKCoBzx3k5qdTgn32Js3b3ZaVIhFlytWrEBoaKh8YqjIJy0trYaDqrCwMCxcuFB+Xl5ebmWiyWSSRy8efvhhPPnkk1bPGUACJEACJEAC7hCgoHCHWj3SmMWEcIvdrFkziN0XzogKscCyX79+mDRpEpYvX47t27fD3vkbYrvonDlzrESFWUwMHjwYU6ZMqUctmJQESIAESIAEahKgoKjJQ9V3lmLCfMaGOMCrLlEhfEqMHTsWMTEx6NGjB4qLizFx4kSHx4vXFhUUE6o2LTMnARIgAZ8nQEHRQF3AlpgwF21LVIjpjTVr1sg+Jfbt24ecnBysWrUKISEh5mQOXy1FhVhnwZEJh8gYgQRIgARIwE0C3OXhLjg/P0iS5HTqZ555BseOHZNHI8yJxKiB5RHjp0+flvOcPHkyXnzxRXn3xty5czF+/Hi0bt3anMzlVyFmxM4PIUy0cKmx+litetNWtciqswpdLWvZD9QhS67qcBW5qsGWIxTqtVeNnJctWyYvnhSiQVxiweSRI0cgtnCKS4SLMHHmRmxsrHz0uJjeEId71UdMiLzFSMX+/fvlcvgfCZAACZAACahBgCMUblJ1R91dvnxZHikQ6yJ++uknWSgIx1Riu6cQFl9++aVsTVZWliwqRLhSlzv2KlW2q/nQVleJORdfS1xFjbRkL211rg+6GotcXSXmfHw12FJQOM+/Rkx3G+P7779HXFwcbr31VtkdthiV+OGHH+SDu8SzF154od4jEjUMrXrjrr228lI7jLaqQ1hLXAUBLdlLW9lntdQH1Pp8ccpDnc+BzVyFu2uxY8MsJkQksdvjtttuw/r16/HQQw+pIiZsGsNAEiABEiABElCQAAWFgjDrykqIifj4eLRs2VIembCMK0SF8EuRmpoKsYCSFwmQAAmQAAlojQAFhcmIwsxk9Pfzk4dY/fxikJzxKQqN1l4m69O4U6dOlUcjxAFdti4hKoKCgjB9+nScP3/eVhSGkQAJkAAJkIDHEvBxQVGOkxvnYshq4MkCAyokCRWGF9Fu+wwMWbIDpQo22+LFi+VdHOZdHbWzFuE//vij7Db7pptuqv2Y70mABEiABEjAown4tqAwHUHOW58hLO4pxEXoIGD46/pi8sypCFv7OQpKTYo1npjSEI6qLl68WL1V1Jy5EBNiSkScwSG2ePIiARIgARIgAa0R8G1BUWZAcVErhHdqI4sJc+P5t+uEcOQip+CcOUiRV1uigmJCEbTMhARIgARIoJEJ+LSgMJ06ir1Gey1gwN6jZ6DcGEVlOZaiQjiz4siEPf4MJwESIAES0BIBHxYUJpSdOISiRmgts6ioqKjgNEcj8GeRJEACJEACyhNoqnyWvpOjcGRS30scS95QlxL20lZrAuRqzUSpELJVimTNfMi1Jg+l3mmJq1J1tszHhwWFPwKDuyIM7v2gu3IwmCVw3pMACZAACZCANxLw4SkPQF58qbPXrHqrxZr2YjKcBEiABEiABHydgE8LCgTqERp2wWrxZeVizc4IDQ709f7B+pMACZAACZCAUwR8W1D4d0bMuEEoSl2I1Qcr3ViZjDuxdO5iFCWNx6MhzZyCyEgkQAIkQAIk4OsEfFtQIADto5/DujltsPaOlrLr7Sb68dgb9jI2TYlEkK/3DtafBEiABEiABJwkwOPLnQTFaCRAAiRAAiRAAvYJ+PgIhX0wfEICJEACJEACJOA8AQoK51kxJgmQAAmQAAmQgB0CFBR2wNgKNhl3ITM5puqYcz/49U9GxseFMCrtn9tW4VoPc/eYeNNBZMTorzGvPmZ+JDJKLmudSgPab0JZ4WL016cgT8FD7xqwAo1bVNkuLOrfF8l5ZxzbwT7rmJHdGKUoyctAcv9rn3l9wmJsLVHy7Ge7hWv/QVkJ8jKS0b/6ezIMCYtyUFLm4EdKoT5LQeFsFzIdw8bUP2M1RqPAcAWSdAWGBbdh+7PjsCTfiS8ZZ8vxynj1OCZePsAtEunFv0A4E7v270MkcheOk73FhLKDH+DVlHeR72QKRrMgUPY1Ml99Df/Iv2IRWMct+2wdcOp6VI6T2SmIGr0d7RYUokJ83isM2Bi+FwlRKcg+WV5XYj4zHUP25OEYvf02LJB/oyRUGFYivGgaoiZvxMm6NIVCfZaCwsluaDq0DW9ldEbcmBGI0AUACICuzxjMnNMZa3P2g/q5DpBuHxNvQmnB51iLrujUTjDn5TIBeWQoFRM+1WPkqM4uJ/ftBOUwFq5F8oQ83DHyj3DOKw37rNt9Rv6eyAbiEjCmj67yBGh/HfpMnoE5YdmYuGwHv2frgFv5G3U94hJGoY/8GwX46/pi8sypCMuYh2V2//BVrs9SUNTRQNceVR0kpqv9wxaAdp26Ams/RwGHka/hqn3n9jHx5Th19BCMYV0RHMiuWhur4/eXUbJ6GqYV98f853+HFo4TMIYFAVPJOjw57Qhi5o9HrxZNLJ7Udcs+WxedOp/5d0NijgGGBQNsbtk37j2KU3X9lV1n5t7/0D8kETlSARYMaGOjsnWdnq1cn+W3tA301kFVwK0fVIYYD+HoKQ7H2cPj/jHxZThRfAS6dseR/VRY1ToKMSeYjUIjedvjfS08APrYxdg07wHo+Em/hsXJO3/9g1i9aRYGVP2151wy9lnnOLka6wZEj7oXXdmPXQVXFT8SoyI7VY76WOWgXJ9l81jBtRVQCdzWE4Y5IlCPY+JNZ3B07wWEtr8XCe8UVa2f2ImZnQsw7fE3UOhooZEj07z+uT8CdW2dHKr3ehiuVzCwLXSujoyxz7rOuc4UYv3VCqQWDcK4mM52fhDrzMC3H4q1fwsWoyjxT4jpasfzs4J9loLCt7ubZ9deHgI9hH/V+As7CCH3348+xQuR8mEJOALq2U3oc9axzyrY5GIx8ftImfgdnlw3A0Pbcx2Va3BLcXD1K5h45FGsm/Mg2tv7tVewz9orwjW7vT52IIJDuaDNvWY2HxPvXmqbqeRD3YCiYgPKbEZgIAl4GAH2WRcbRIiJtZgwYBEw569IGdCeoxMuESzFwYypGJAKzHlzqovTdlUFudFnKSicaqTKxZd2Tzq3WqzpVKY+E4nHxPtMU7OiJKAAgXIYd71ZJSbexxuJ3Tlt5wpVkxG7Fk+qFBN5i5HYreFOpaKgcKqhqv7Ktlp8qdzqWKfM0GokN4+JN5VkIMavl7UzIXnXiB5xMXfZXA2uVUy0W/sE2Gfr2Yamk8hLGQL9PZ+g3YoNFBMu4jQZtyJlYATu+aQ9VuQ7JyYU7bMSL+cIVByVshK7S7r41dKBSxWSJF2RDF+ukOJ1EVLSth+dy8NnY12RTmRNkHS6RCn9wEWZQoVhh/R6fHdJl7RNqgyxBee8VLBwsAVzEeeidCA9UeqSmCWdEM3Ay0kCv0jF6SMk6GZI2y4SnJPQqqNVFKdL0XDms84+Ww3N5ZtKdkB3KTHrqMRe6iLAS19KC6N0EnQTpKwTV1xIrFyfFSvneTlFoEK6VLxNSk+KlgBU/tPFSwuzCiQDe75jgpeKpW3pSVKUmR26S/ELs6QCw7WOX/mljZoio8IgFWQtlOJ1VcwRLSWlb5OKZVHnuFjGMBOgoDCTcOfVnqBgn3WHpu00ZpbV36/V3xXm71uKYdvkRGjV57s2M4v35j/ezJzN7+U8Ffqe5fHlLg4pMToJkAAJkAAJkIA1Aa6hsGbCEBIgARIgARIgARcJUFC4CIzRSYAESIAESIAErAlQUFgzYQgJkAAJkAAJkICLBCgoXATG6CRAAiRAAiRAAtYEKCismTCEBEiABEiABEjARQIUFC4CY3QSIAESIAESIAFrAhQU1kwYQgIkQAIkQAIk4CIBCgoXgTE6CZAACZAACZCANQEKCmsmDCEBEiABEiABEnCRAAWFi8AYnQRIgARIgARIwJoABYU1E4aQAAmQAAmQAAm4SICCwkVgjE4CJEACJEACJGBNgILCmglDSIAESIAESIAEXCRAQeEiMEYnARIgARIgARKwJkBBYc2EISRAAiRAAiRAAi4SoKBwERijkwAJkAAJkAAJWBOgoLBmwhASIAESIAESIAEXCVBQuAiM0UmABEiABEiABKwJUFBYM2EICZAACZAACZCAiwQoKFwExugkQAIkoC0CJpSVZCO5vx5+fnr0T85GSZlJW1WgtZogQEGhiWaikSRAAiTgJgFTCT6cNA9nJv0XFRX/xaQzf8Xc3JNuZsZkJGCfQFP7j/iEBEiABEhA8wT8uyExpwCJoiJlX+PC1UC0a9Vc89ViBTyPAEcoPK9NaJHmCIgh5Xx8tCgBej8/+Mn/wpCwaD3ySko1Vxtrg0X9crAo5T2UKDJSXoqSrcuQknkQldldRknGSPjpU5BXqkgB1lWwEWIqyUBMTIZCdbJRQAMHXS1chK7V/c/cD/3QdVEhrgKQn7cIw5gf7kXMHUENbB2L8wUCFBS+0Mqso4oESlGSnYohoa9h9y0TUFghQZIkSJeyMBr/xOjQx7Go8IKK5TdE1uewK30mphdeVqaw0gKkJ8xHYYU5u2YISfwQkmEeBgQ11FeSCWUnjuK6Ufeia0MVaa6uSq9NI6bhkOh7tf4dmhYBMRRd+fwKTkz6EaNf+BRGlexgtr5LwEs+Sr7bgKx5YxIwoawwHeOGb0LnrL/jtYQ+0Jk/UYEheGDaUmxaCEwfktagf3k3JhHtlH0OBTmnMSyyE8xNph3bXbTUdBAZMU8go0QIwqZo0SoIN7RrhRtdzIbRScARAa//LDkCwOck4D6Bc9j14bvIj56K5KEdbfwwtULPJ17GxhXRCK7+pInpgzxkJMdUTY2IVfcZFlMjJpTmpUDvNxKr8vKRWR1PTKHk1FqdXw5j4dqq1ft+8NMnYNHWEpRZVMhk3GWRhztlnUFe8iAMTCsEcscgtEkvJOedrrIxBsmr5iNBL4bXRfgZAMKmbCxKCKuqnx/8+icjI6/KrtI8JHcbiDSjEblj7kATeZrjZxtTHqUoycu4Vje/GCRn5FnUX9jVC34xbyBvV90MLHBcuy3dj5xv+iCya7NrYZZ3wk69HjEZ5mkZ8fBa21T+OFeGydNB5vqKNvholWy3PjkPdU141Wwby/Y1l/MIFmVbsoxBcuYuGEtLsLV6ei0MCYt3wljXTJF/CEYujcb2qObw82uCbpnt8d6USHDSw7LBea8IAYkXCZCAewQubpOSdJB0Sduki07lUCFdOrBaitd1l+Jf3yEZKiRJqjBIX74eL+kwWFpYcF4ESBe3zZB0gISoGVJWcWXOFYZcaUZUFylq4ZfSJbmsK9KJrAmSDtFSUtYB6ZJ0Le/ErKOSnPWJLCnRsizponQgPVHS6SZIWSeuuFDWj9K2pAgJ0elSscjYwkZd/GrpwKUKqcJwSDp06VfpUsHrUpQuXnr9S4NsgyRdkQzbZktR1fWTJEnmppOi0w9UxflFKk4fIUE3Q9p2URRgtvNaPhWGHdLr8d0lRL0uFVwScapsgk6KSsqSiuUwG2XZbBfBeJY0uLp8G5GsbLSs9wgpvfgXOVGFmXF6UWW7XCqS0oWdqLtfVKazsL0qnS4xSzpRYasPmOsGCdV8rdvcRk0YRAINRqD67yZF1AkzIQEfImA6dRR7jTqEheoR6FS9z2HXO8uxNfZlzJvct3J6xF+HPlP/inVJpzA9JdtigWAEkmY9j2EhlX9H+ut64v4+rZC/9WsYxF+jpiPIeSsbSErGzGHdEAh/BHYbjIS465Hx1jYcMp1B/rJ5yAibipnmshCEbokLsC7uf5i4bIfFX88OyrJbtwjEJQxGt0B/+Ou6oEvgBXnEpjguAWP66KpGbAKgixqFuOiD2LrvVNUiTLsZVj4oLcA7qbsQu+IVTK7Kx1/XF1OXL0VS8UKkfFhyLR/dk5g1cyhCAsVXWQB0ve5DH91XDsoS0x1f4bed2tgYVXJgW43HlYy3iPZ8sntlHwjsjkRhp65GxFpvLuNQzgfIgIXtgXfi0YQhQMYHyDlkXqti2S7muukQPWdGFRd/BIbcg35hZ7Hly8M1RqZqFci3JNAgBCgoGgQzCyEBAGKYfa0BYX3vvLbWQgYTiODQzkDRIZyw63CoZhzToS+wPhe1xEwbDFhQACknESFloqxC6MI7oV2NT3llPsa1n6PA7o6KmmU533aV5RsW9MKpvI+RnZ2N7OxVSB44AGNyf3YyGxNKCz7HWuMd6Nv91po/+IF6hIYBRcUG+z+ezsQxncHRb+5GTK/WTtpkJ5q99pRtqENRmI5ix/odQFhXBMtCSOTvj6AB82CQPkRiiJ1pGDtmMJgEPIVAja8aTzGKdpCAFgj4t+uEcJ2x7h84i4pUjmhYBNS+NR7C0VPltUPr9d6YNhAta2wlbI7QMRvqlaf9xCaUHcxEgr4lQgf+DV9eEEMpbRHzZjbSox0IgepMy3Hq6KE6dyAY9x7FqbrWDFTnZftGiLHs30ahV4PtKLFth+PQzggNdm7sy3FejEEC6hOgoFCfMUvwVgJBdyEmLgJ1/8CJRYo58qLLSgFSBwxdV3RqF1BHBFcf6RCdfgAVtbYRytsK1diiKTwyTp6BrbFZOFGRgwWJj2LYsIcxQP8ziouc3aQYgHaduqKOv+9tjLq4wuUyDu3Yhd/G3MVFia5gY1wScIIABYUTkBiFBGwTaI0+I59AVO5iLNh47Nq8fnXkUhzMeBYRQzbhwo3NAFmA6FG089taq/LLcKL4SK0h8OpMbN74d70Xo/6/nfMLaSqK4/h3u1BRzSIsciaI1OZLT9O9JDhWGkaQaNmLy39YSC3DtDWxhPw/hRikEpEYWwOtBuLDQEgGYYHMCDLzRvSUzd6ERoSwEefezdwf5Q5xbfK7L4Ozc8/v/D7nbud3z+9P1Ft/sECUrAIjyydw1hBL1grmBs5Dth0FnXw/wH9ElEsn8GsFLP9D2iVHWt4ZGDI+Y2b+ZzjT0PiSY1ZiSGTuBucRie6OyNOniNOT0HpGumCEeW5iQMmzUXC5IMrFJRTakomZJWslOmKoQE1EIFkJkEGRrCtD80oBAnLs19Rh+KkWrvKrMLOUvtBRvI+l9hmhr/uOarsZpZns5OEQtDVGFLna0WoNpfoxo8OESstR9HeXQSX1FynPQYnpGtSWPvROLwkbb8D7BqO299D1N6NClQXdzVaURMj64rSguQXxyUIwpkJYkT/w+VjdxRhXcIOdso3B7RVdNwHvDKyt7RhZv78KMQZ7xQF++xAVNpKWh5pOLVw37sM66xWNCt88RoyNsKhb0F2hCo+tiDGVDZvYZo/sdbELG/YUvvDanuPlIkv+ZO6cMXS1rXcXpYuMbX3oci6KcR2+RTi7+mBZr2+UiD04XlIPs3ocHb2vxWcmsAT36BimdKJ+XNQ91EAEkp+A1L+v5NeEZkgE/gsBljkxjDmPEeqFe1BywZLHinLYcQ52/gW69ZnBDZBlYhgw6LaicPlBsG8uGvhTsPMONGsOxqHBLmTozXB4KuHvyAcnk4FTDsBf7YCjSStkHMgzS2ENk3UAuolDMHqeoCkuWcENcLUNai4H5eNfEfsNOh26W0MY1b7FaeVuoQ7FsbvvkFU1hFd3NP90E4whA1ZZHYp9tRhfy2oIdWFMH8JtL8SySSPoJlPcBl9oBT/ZCM1aIGOov9RPFvDpxqcyqdUxM6Az5IBvyBXqNygaFlDQdCXMHSMybsLhiUtQsFgVVQ++6evRX7yZ0waQZxSh0+FAtX9AfA64fHT4K+FxXN+CflI5UD8isD0EZCxBdXuGplGJABEgAilKQCjAVYkPndNw1ebGdyLCKlOW1IE3TaBPn56iAGjaRCB+AnRCET8zuoMIEAEiAECs1qmseobFkN8m4MWstQdtqxdRod1iWioxJgIpRoAMihRbMJouESACyUKAuXge49HJaegVnFhqnCvGoP8CJsl1kSyLRPNIIAFyeSQQNokiAkSACBABIrBTCdAJxU5dWdKLCBABIkAEiEACCZBBkUDYJIoIEAEiQASIwE4l8Bdezr7T6y3hlQAAAABJRU5ErkJggg=="></p>
<p>Estimate the concentration of an unknown sample of pepsin with an absorbance of 0.30 from the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2018-08-08_om_18.45.38.png" alt="M18/4/CHEMI/HP3/ENG/TZ2/08.c/M"></p>
<p> </p>
<p><em>Penalize charge on incorrect atom once </em><em>only.</em></p>
<p><em>Penalize missing hydrogens or incorrect </em><em>bond connectivities once only in Option </em><em>B.</em></p>
<p><em>Accept condensed structural formulas.</em></p>
<p><em>Accept skeletal structures.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong><em>ALTERNATIVE 1</em></strong></p>
<p><strong>«</strong>pH = 6.36 + log \(\left( {\frac{{2.50 \times {{10}^{ - 2}}}}{{1.25 \times {{10}^{ - 3}}}}} \right)\) =<strong>»</strong></p>
<p>7.66</p>
<p><strong><em>ALTERNATIVE 2</em></strong></p>
<p><strong>«</strong><em>K</em><sub><em>a </em></sub>= 4.4 × 10<sup>–7</sup> = [H<sup>+</sup>] \(\left( {\frac{{2.50 \times {{10}^{ - 2}}}}{{1.25 \times {{10}^{ - 3}}}}} \right)\), [H<sup>+</sup>] = 2.2 × 10<sup>–8</sup> mol dm<sup>–3</sup><strong>»</strong></p>
<p><strong>«</strong>pH =<strong>» </strong>7.66</p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “</em><strong><em>«</em></strong><em>pH =</em><strong><em>» </em></strong><em>8”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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njssZXc86efYpkgss8++8jZZ58tSNc43tG8eXMnxZcpg9WxuMVMJGl+Ku2fcsopcv/998tbb73ldnfOmzdPlixZ4jYIPfDAA3LUUUe5cC0rdFgYRdd+3XXXOVMs/BQ3yqS03UvtzxBIAQToLzhtx1z33XdfZ5qLZRdO47iHOH/0k4cfftiZ7n73XYbFEpvrhg0bJqtXr47bN7TP+O+I5ZdoPuJkL6m9i86cOdMBpblUAHhes2aNPPHEE/LNNxm74jQOU59JkybJnXfeKc2aNZMWLVrIfffdJ++++65Ta2g8vULzl1+Wyn//+19p3bq1XHzxxXLppZfK448/LsuXLw8XENV0j3QcB/vGG29I27Zt3TswX0K9weKIMnEqDltUdoqRR2X6deqcLqyOY+uNI480LEyhiHPiiSfKgQce6OijAsGxQ7Nx48bhQHTAAQc4fx8P57GzwXJPPjp27Cj9+/eXGTNmOBOrCy+8UDp16iRNmjSRL774wu3w9Gm88MIL8v7778tff/3l8g4OLPxQdvLmx9X32dUQSFYE6IP6o8/i6BcIR2eccYYz0dW8R9v2559/7kwS/XCOvEDYOeigg1xf4OwieAaMHAdPuv7662XChAyDUmjSh1Gn4vQd9CXyQ95UQNJ8ajyN6xKm+l/fvn2DunXrOvmdaYyqDvBAdQA2jz/+uAvfunVrsGbNmuDcc891/qeeemrQtWvX4N577w2OPfZY53fjjTdmmQusWrU6qFKlSlCyZMmgQ4cOQZ8+fYLbbrstOPTQQ92C4SuvvBKmIQ8sHl544YXBPvvsE6CaePTRR4POnTs7NQb5GTZsWDjlIn6rVq2CSy+9NKTBIiXxRo4cGfo1a9YsQK2BI03Tpk1dnJ9++inTQiUqFMUhuihJmP6UsMbnmYVM8q7Ox9L3gz7p3nzzTafSKVKkSHDDDTcEP//8s4um7+eK06vSsKshkCwI0Db5odr84IMPgnXr1oXt9dNPPw2OPvro4IcffnB+tHl1tPWTTjopuPrqq9XLxfnjjz+C//3vfwG8Bte6devgsssuC1UtL7/8suu39HHtXy1btgweeeQR16fIC/zhhRdecPSIA73p06cHqFB51j5bkPoVC3rBOeecE4Lp33z33XdBiRIlApg9DhAGDhzogDz77LODpUuXhtFXrFjhmHOZMmXcAKAB6KivuOJypy/7+OOP1dtd33///aBo0aJB6dKlHRMDYH6jR49273j44YczxacyTj755KBBgwahP5XBwIAeHMczFigw8ttvv909489gcMYZZ4RxeMeAAQOCWCvnLlKMP8oPs8bRSH/99dewMcWInq2XNuq1a9cGzZs3d/k96qijgo8++sil4138cBo3W4IWaAjsRgToV8r4tJ9q+4Qp16tXz7XhJ554wrVXbbNYex1++OHB0KFDQ6sV1qqOP/54F3/ixImOrtKkCPourl999ZX74c/76tWr79LxTsIRnCpWrBjGQccO7TvuuCNE44EHHggOOOAAZ2lGmiVLlgR33XVXsGVLRl/WiIRpvvHjHj/e6/vjxy/qiBf1h/8pDaWp6TSull3x1PdG4+uzplM6XHPMyGvXru2kY0Y3LRyElfiVV14ZnHLKKW7BAr977rnHAU9Faoa5MuISDjM/7LDDnFSvNBo1ahQwysJkNY2GUYEsZrIgom7hwoXBEUcc4SqIeLrQAmPURdDvv//eDQAwYp8m8fWn9GJdiUM6rh9++KHL8/333x8rao78oEljHDNmjJNOjjnmmAAMkTholOYMgWRAgHavTvsLkjbC0oEHHhi0aNHCCTe0WZiX9rH58+e7MCRzJPDTTjvNSenMuJmRwryU2UEPp/T1fVyhB236Pj/4Dw5Dh+OOOy4UsN5+++2gePHirv9onjFauOmmm0LBCMHvrLPOcu+BBvGgj7Zh2LDhwUMPPRTA/N944w0nrJE/ZbKaF+J/9tlnQb9+/VxcBrDx48cHmzdvDukSFz5HevL79ddfO5rdunULevbsGbz33nsuPrSgz4+8zJkzJ0CIVlyggyMcfjZ16lSX353e7uIYOaNpLEcl+BI5GWF0xVIEp0D59ypN9+7d202zsOooV66cY64an4yTSa441CYAi8NKhNXuL774wtEnjaZzEeL81ahRw0nYGowdOFL5559/HqbnfdGfxk/kHcShoaAiKlu2bIBkkVen+VE6M2bMCE488USX9/r16wcrV650QYnioHTsagjsLgSWL1/u1Jn0L6RhnWkrI1LGp1fyQTunT7/77ruhChE/GB1XBDSk5ltuucUx1Oz6I2Gk4dquXTs3o+UdPDOgkC94F448HHnkkaEVG+/DQu3f//63C9c/NA2HHHJIUKpUqQBhlQEHTQFpVTWkcVEfXXfdde49CJDM9BmoeC9qXt/xPhyMm3B+DGjVq1d392gYsLAj7+CHg3f5WgfnufMPdTcCKuXynWPkbGypWbOmk6SRpmGK/KpWrepe9uSTT7o0r776alCtWjU/fXhPRvjNnDnTpUG3BQBkHLVH9MVhwiAIRo0a5QDDj/QMFmzSyYlDl86ApDpqpmS9evUKUPkoQDmhp3G1XDxPmjQpQHVEmRo1ushFITy/HaM6Uj96/IMPPthNE7Ux7Y735Xf+jV7BRQAmjoBBH0CFgRoT5/cTLX0sPw3jqsyYeyRNeAt0YaI64462d9Lg8Kdfoxru0aOH81MhkBm+zmZ//PFHN1tfvXq1i4NghMQOT4MWP4Qn3oual4GGWTs/1tjwv/POO8N3wphZa8Mf/T5qGvIBv0KKh7aqopWJozFA8IM5T5gwwUnh5BVpHjoIuosXL3Z54UUMTgxIsRzSeoUKFbLwU8fIa9Y81S0GILJ/+eWXrnKQvrGFRiJXRv7000+7kSTWC2DUZJwpAZljgULvL7roIgd8rHT4jRs3LkhLS3PB6MG5Rz2SE/fUU0+5dPPmzcuUDJC18jMF5OBBGxODG3hQvueee87R1bAckMs2KnmFptKlYTEC804aEAOTOUNgTyDwdztMD9BlN27c2EnNqD0nT/4wixoht3mCd9Dux44d66Rg2joSK+pGGKr2hSh90vBTdSlMe7/99nNSPf44hDk15uAZVQz0WeNSRosBBn179uzZ4bv0nTBzBFGEK2i+9dZbLj328So0ar5IgyaCGXv//v0dLWYaSN0ItlpO4sGX+MH7kPo7duyoZNwAAcaxnDJy0vrOMXJG2FgO1QGZ0hEGndYJJ5wQRlWw8CBzZJSBAKDatm3rpktYZFAQ/8UaV/2GDBkSVK5c2dFdtGiRk8gZxaCvYBPIs6YJM7HTnxFt7ty5vre75115cZqeUZ+yMGpTPspJeTU8L+/YVVp0cTp1O++888LZSiwsdkXLwg2B7BCItmdUFO3aXePaPHwCho6j7fPLD0c7pp9zhfHSv4oVK+au9913X/gKP2/cEx+eoHyBZyRkZg2EowJByr/55ptDGqg4mFVjqIBjHQ6LOyxdcJRJaUKDZ1UlE47ao1at2o6JR/PDgILEj3qGozuQutG3Ux5wgy70SEd5FT/UOr6mA0k/1iZD3g9/RCKnrL5ze2bVLjtqSulvdSeMQ244TIqDcOrUqRON7jbLcO4wm3DYUHPEEUdIjRo15IcffpCffvrJ2VSTCBtP/f3+++8yZMgQdxwsYZzjzcloH330kbRv3z48nErTYW998803O1t03eiDX4UKFbLkR9PEDEjQk68AYSv+4osvujxji8pn3NgM5Nu9J0guV9HOPPNMYYMEdul8So6vD51zzjlyxx13yHnnnedosnANpuYMgdwgQLum/cALuLLxjf0O7dq1c7bbV199tTz//PPu4CviEJ5f7Q1auo+CNj19+nR5882MEyvZx8LGOg7d8h351TR+24d/qMP2HLtzjtFVBx86+eSTnZ06fvA4eBC8DUdecFo2eJnuKcF/7dq1ctZZZ7p9KS6i90caTkNlbwsbFTl7XU93POyww8L8Eg+6+g4+E7lhwwb3412Ua86cOfL000+7j7nrK/DXfTdZbOBzYn7ICNC8eQunG2PkizpGHKRv9NU6YrCSy4ikeqZoGhYdCH/xxRdD6ZYVZvRGsdQIWLkwfYpK37w7P52OtqhQyB8/JHJmKJRJw/PznfFoqeRBOO9lTQE9InniWAF/tT8ejVj+Wga9ZhcnVpj5FRwEfCmU9ZlLLrnELWSy+Eh7VzNd4mXXXvKCCHShj778zDPPzNTvWLvDkII4+svuXcRB6oWHYI3CM45+8/zzz4fP7CNRY4zs6GkYe2i6d+/uHpWmhun1ggsucHlHo6HrjByyF8+RB9TJaBVw9Gn22KDKwnyTKz+sb1gHZAah/FVpCrplMoeLAuTbkWuYbrZh5ZcMqOOeaQdKfV9PTcXAxDFRQuflq0qGDx/uCszqMIXQaQ3MGiZFOqYrOOiwUEAhNL/6bq7xQPXjJHoPLd7H7/TTTw8bFHniOaobS5RubuP5ZdN7po266AK2bMbA6XRN4+FHJ2TNYceOjMZMuXD+AOE8svmDnk8zm6gWlEIIaFsgy/Tb66+/3gksWJGhc47lokwkVpzc+Pnta8qUKWG/Q82CEMVCIht/lCfwjuzaJWHEVXUG8dl86O9/YZES4wplon4elL5flvPPP98tavp+/j14si8HXgFNLFq4j2Xhpu+Cz5IHFVxRrbDGGMuhc8dSKFoHgn4m3gopUi+M86WXXnI0AYQfunJ2SkKQTLMYQEbQoaG89x2Z5aXomKHFyEo8rGQYrbAz5z1KGyAAf/DgwU5vhI0om48YODAPwoZU4/vvyc978gDjY6OO6sVpTEjjSAV704Gn/mDQMHA6H2sMs2bNclgr5s8++6wbwcGZBVP0cIzqmItpHLBGh4gdbCzHij6r7ehKSWMutRGgDmnfXOlz3OMQkuhfMB0EhD0trERRhWewn4T+R578H7yH/qlloBy5dWrp4m/EU1qKFWtU7DjFwSvhC+DmM1ONi7UM0jTCFYMEfYu8Y0iijrg4TY9BA3xO6wJGnuPFTkDQratKWF8IYSrUl6L9OKhXyASNAAkRp5nUe+Lzw58rtqQsLGA7CYh+PN7HTyuGlWKsWLDdxvRPFygI9/PkiOTzH9MnKgAGzgInP1bS97bTBkM+FFPuWWTxw+66q6M7/oCFahZICKeekChg6tQX8cGSVf1YRytAF9zBgXowVzAQoN75sYiHwMTxFghZt956q1OjwLToh8TZW45309+jM2L6IX0Sf6R22m9u80k6fth+Y1mnfcIvs0rLWPHh2A2+zz77ZNqzgr/mASGX/oI2AX6HGTRCrp4CSTywVZ5I38RuHasWdbli5JpYC6XPu7pqxqPxov76rNdo/FjPu4q7q/BYNBPxA1wcoypnw9BgqBT9Kdi76/2J5DG7OJovBj4kmU6dOmWJTufFAkb1fJQZvRtnvcRyaq5ljDwWOrnzo560reWOQuZU0NO6JyRKX8P1ShxUoTrthynqOgthPqPJ/KY99wQ+CGtYe2j/40q79vslDBgduOY7JzmEPpjoJkYEGn//CnptZrr+5hyO1MCPvKAa9h0zYixKmPUiHEMbhwkjzJ+jsf2ZDpoFdnJDC3NIdTBy1ihwSkPD4pofagS7ZjRgGJYutPgNBrD1sC4aerI6BiFUXqxVYMKpnZcrDZe8oyfk8CE6CxINaw7xJHIWvii7MfL8q3HqAtxRcdH5YzkkOQZkZqXZOa1X4qDTRqpG9QAjYP+HmuJR79pusXFmRyJmeMzYWFxMNke5aJ+o/ljoow36/VFVnvjrdwRIk6hT+mBCn9E+DzNnCz9nM3EoIPRZF1TsoI/pMWbYbNbj8D/UkghN7ExFSFIdPO/QdKhKoIWamEMIH3zwQUcDP6R1jQd91hopM87355kZAjPqqCBQhEA1bynsV84SxxRo/fr1zgRITbKAiHPJMV069NBDndkQpkDJ6DBbwjQS88QpU6aEJk5qrkVZNO/c43/BBRe4o4Dvvfde93UWv1x8Pen22293Jn84n1gAAA6uSURBVGG1atVyQWo25cez+8QRAHd+nKNfrVo1efbZZ7Mkxnx3zJgxsnDhQjn22GOzhKsHdDiuGbNUzu3G3PfII490ZoSYq/7888/sFZErr7zSJSH+5MmT3THPHAdLW6E+8U+2eiVP/OiPnTt3lldeecW1Vy077Vjzfvrpp0v37t1dW9bwXV1p+1puTBCnTp3qjuLmi16EVaxYUS6//HJ3HK+aSEKTMI7bHTp0qHz66afuS2N87Yj+cdlll0mlSpUcXY3LO/gaGfWJeTYmhNA76aSTHH2O1cYp/h988IE7grdp06bOX/srZp+c7z527Fi55pprQlNJF8mxfftzCLAizgjp/3SxhQWOVHBM0cg/u9UScUg8bDLyyxzrnqMTdCrKlJBpItPeqGSQyDsLexyVBln0x9Q2ltMzQ9ChxnNIa0j2eiQzuw6jjg0p6L9Zj+JH/FRyvpSNJQ1SuS+Z+22Vo0bUMCO/2iXv9/PgYxfLXyVorppWr35a/564ms735973j/U+jZ/5I3qOtReuP0ZXRrxx48a5j2gwUvobpBhNOeS+a9euKQEM+cVxOL9KG9llHCmA7yvyQQw2YEUdG5EeeeQRJ4WADR/G4ItISB/jx4930sFTTz0VTWbP2SCgklc2UXYZRN3y++WXX5wUiRSoG+T8xGywee2119zXsfCvXLmyH5z09ypxc73qqquEj1HoZhpt61oIPjBx7bXXhhvn+JhMXl12dRUrTKVnvSby/uzi+mGx3qf0Cz0jB5zBgwdLhw4d3HQmFlg33XRTuPNLgUvWa/nyfJhY3BeLGJBo9FGnO3b147cwaJ1GRuMecsghjpHTafjiCr9BgwbJ0Ucf7aIyAGiHioVdlJ49Z0aAumCq7QsP4MiOYq6KKRjrvVKgk7ODkDDUX6VLl9YgN/AipPD1LKbzfBELp3UVRkyBG8pBvvmKF6oMdoJHsdBi4D9w4EBX3scee0y9C/w1ay8v8EXOXEA+GYWuUD9TFW3o6MRvueUW1zFoJPEaUGaqe+8JRo6edO7cuU6/yvZk8ky56BAw9oceesjpSNEJ7qqD++Xl811gwWfqkMb5vB7v0ji8g58vRew9JJL/zQyg6H2RmKPtjroCbxxMnrjgDVPmE2qnnnqqC9NPoHGMg9YDAdSB1gNHXqSyo+w4BiW+d4sAArP2He2a8jK7pA8wsBUmV6gZOcy7Y8dOoSQe7Uw0hHr16klaWlrIyJO9cSCVsfDFGSx9+/aVAQMGuCzTyWnoLH7BPG644YbwvImclolzIYYMGSqLFy+W6tWrhclVclIGEgbYTUwEaG8seJ1//vlZFplZGNOPhcPIWHTm+67cw7xh/pdccolbRIN42bJlY74DT5/Bx42UAgHgRVl69+7tzoEBHy0f/nxLmIXeESNGuGsKFCnfsljoGDmNAYaD44PRc+d+n6mh0yCIAzMiHoeDaQPKN9R3IyHyyqFeWKAwtaSDwwA4zAdrBZg8Eg26U238ikci2YI+6pbXXnvVDYAwEz5qjcNyICe0EnlfQY4DVggKTz75ZJZiom55++23XR1xUN2rr77qDm4766yz3AFqfMgc7DmMCbdo0SKpWrWqu6defYfFBFZXqe4oF7MTZpE9evRwazraN/HHUgs1KYds8ezjoPfEV6d++hzrmtP4sWjsCb9Cx8j9ysMki9PRhg8f7kZzKk0rjk7GgiE6YO51ercnKiWv76AM3bp1c1LJqFGjnNkTC0GcRom5GUxcT3SjbEzVWSyL5WDamMLReTDRQhVVt25dx8zBhyn+/PnzXVIYuY9vLHrmlxkBGE4sp7Ma6pLBmFMA1aHaYiGPMGXeMH3aKo46oF658sMk7oorrnBhnGaYyk77IeVANfjSSy85HGjbMHHWbsBF14aYdZPGb5f+vY8FmCnu+EMnZfq+mq8UpqtvGkS5MfBnA4WaGuqVHVrExWQrO9OfZMKO/GImqJt/NG++OZaaNFEm4iXq2K3GxgnOiAYTvk7O9mI2HvEzlzgC1Ed25odsG4eX+OaHHJjEZh8+FcY5OtQfm1nYxILpHVvW8dMfZ/FwqihbxNkRyE/rPvGcJm9Mdkl26dLF7bxkFyaYUnYchwGy6Y126rd9wtjcBi7q+HYm56DTvqP4sCGre/dHg3Xr1mr0pLwy6hQ6R2VphWvh8eNDsr5dqu7kJE60gjVdMl61I0fLqHn1GzblioWHxuWqZYfeN9/McrsCselldyCfpTKXcwSoAzCMZ0fOvgXaoj9A+vXJ4XF69hCn5rELkUOvsBtnN+5bb410DB4a9957b5hBv+5DzxS+ARMYMM4vm+7UhEFHHQcF+tvuEUz4Sg8Dg48x6cD4yCOPCndrRmkly3OhU60wZfKnT/7Uqk+fPtK6dWunipg2bZqws0qnYfHS+OmT5V7zHC8/Oj0lPJFy+XFq1jzFTWmxL0fvrrs9473L/LMiwJSdH1YY++23X9YIOy00sDZBRYAlBjsJUW+p2oCPF6BHR/WFWmH06NHSrFkzZ5GUQRA9eSDnnXe+U6XpS/y6V79UvtLW1brHL5v2AdYSsD8HI3WoBP02zb3G16vGBe9ixYo63NUvGa8pz8gBOgp+boCmMqGFnvf//u//XOdRPVtu6BXENKp3Zcs4X2Kh4+BnLucIgB2mdMqEohRYlIaBw6hXrlwpLVu2lNtuu00aN24sbCFnXYI6oM2iZ8fkjq9qcYzEunVrpXjxEm5rP1/O8plW9D0F+Zl1BSy0WEyGoWv7jVdmfyDQOKmCXVIzclbqWZxTm1kFl+v333/vdhWyEId0Eo+Z09DV5plFH3a2aeUQxoo+n3GrWPFYadGiuaODf8mSJZN+FPbx2BP32tDBRwc59dsT7y9I7wDD7Oy7kb6V8WBSxyaYhg0bCpvT2EREm2XBGjrUAe2fHcixPsFYkHBLtCzggm09fZ7zk9jxWaVKlZh9GuyIzwyHRWQVTvDnc204n2f4vEbriDi+f6L5zK94Sc3IOUyICojFyGfOnOnMB2HMrNzHApEVaxgOh9CwjZztvazu+5XClPWee+6RJk0ulpYtWzhclZZe8wvsgkLHcMlbTYJfIhjSTmEU/GBCEydOdN+AhLEzc8QlQidvuU3d1AhpYIVVFn0c+/JYeDEQwsQx7SRcGTklpw6YGcHocYTxzIY7zHirV68e7kNR4WZvIJbUjBwQlelGwfH9/Xs/nkqL6MRwkyZNcgy9U6dO7plK40e80qVL+Unt3hBICgRonzARNrug0lIzUfzNZY+A8gXOSeKEz7Zt27rjJcBTGTMUYM7MbtjxDC/QMDBG0PO3+r/zzjtuQxKaAk5lZHbExjutl+xztPtCk56R76rosRo0FYG/VqTa6jZp0kR69eolfBGcaSgjqFaqbtHf1fss3BDYkwjQjpW5xGrrezIvqfYu7feseaEvv+6666RFixaOLyhvoEwwcjZMYZseXbNAtYKOXbF///333a5SFvrhHRxRwZ4NdtruTZech2rvRASg2LDDrjUWcfTHGc2cyxt1ypTVn2ecXjt27OgsLR5//HHXOTQeV60o38/uDYFkQcDaZ95qgvO72RTF5j+EOJ+RK2Vl/PrMNeqHdA4Tx1EnLEYjte9tl9QSOZLI/fff737xgAJMZdSs2s+YMV0qV67iVvm18esV0NnpWL9+fTf6nnDCCaFEHo+++RsChkBqIwB/gHE/99xz7lwbVCEYM8RyxFV+4Yer3lwXmInDLmcsiBAM46XzaezO+6SWyBkN77zzTndW+HvvvSf6Y3rDOSk4ZeLovVkc3bp1m2PWjRo1cmc1E0crgXsWJ1hAxZxrxowZ4TRL6Tii9mcIGAIpjQD9GUEQBx/hGUkaPvHhhx9mYtYwZRh9LAaukruGwUu4h4GzgIrwyF6Kvc0/kloipxL4FBZMOerULAh/gGWEHTlypIvGWRScKsc5DOivtBKUBioWjsFkw88nn3ySJVzj2dUQMARSFwEV4HxrEs6jwZLFV5kos47FjHUQ8HkIAmCrVq3cUbl6Lr/S2FtoJT0jTxQYVpxxrO5TgQCrJ77hp46KYWR+8MEH5dZbb3U25ozcfkVpXLsaAoZAaiLAZit/N6dK0tju8y1TjBtg3PjffPPN7pumLHRG+QD6dMw+UcsSny+JcfLio48+6k4VxRQRXrO3eUjSM/JERzpMDKkUAO3fv7/74g1bc3H+l1OgR4VwHjfnavfq1dsxf52GpWaztVwbAoaAj0D0k3Y+H1Epmvj0e44C1uOAfRrcI82z4VAHAvTha9eudcdBszeFAaFBgwbOJDGadk8+JzUjh+Hyi+XUX6/EobKw8xw16m2ZPHmSe8bfn0bpiEsFdunSxZ3RvXTpL2HcWO8yP0PAECjcCMBb4CNYvqxatcqBAS+BwfMVLviQ8pa9gVRSM3KYrc+ofYAAjZ8CTFzsPTH+h5mrP1d+qiejMnhWh+0oCxbmDAFDwBCIhwB8A37DTB7HvTLveDwqHq3d4V+EYxh3B+G80gQ4ts1i7hPrM1bYbnKYEHowdOFMefieYefOd0uNGqe4kVJPOWMqxFdWmFLhRyXgKDoLo0uWLHHvgJaG5TX/lt4QMAQMgT2FQNIychYoYapI2rEcTJhpDY5tsmyR5QQ47vGHQTMN6tmzZ5icND49pcGVH5K6Hx4mtBtDwBAwBJIYgaRVrcBUs5OOlfGCLYwb+9CMw204ZChwixC1a9d2NDQu16jjPfhn965oGns2BAwBQyCZEEhaiTwnIMHIfUbs3xMGozZJOyeIWlxDwBBIJQQKBCMHcJg1P38hUyvCJG5Fwq6GgCFQEBH423yjAJQuFhOnWL6EXgCKaUUwBAwBQyATAgWKkWcqmT0YAoaAIVBIECgwjNyk7kLSYq2YhoAhkAWBAsPIs5TMPAwBQ8AQKCQIGCMvJBVtxTQEDIGCi4Ax8oJbt1YyQ8AQKCQIGCMvJBVtxTQEDIGCi4Ax8oJbt1YyQ8AQKCQIGCMvJBVtxTQEDIGCi4Ax8oJbt1YyQ8AQKCQI/D+Y4TZGEP1yxQAAAABJRU5ErkJggg=="></p>
<p><em>Penalize missing hydrogens or incorrect bond connectivities once only in Option B.</em></p>
<p><em>Wedges <strong>AND</strong> dashes must be used.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>\(\frac{{0.725}}{{49650{\text{ d}}{{\text{m}}^3}\;{\text{c}}{{\text{m}}^{ - 1}}\;{\text{mo}}{{\text{l}}^{ - 1}} \times 1.00\,{\text{cm}}}} = \)<strong>»</strong> 1.46 × 10<sup>−5</sup> «mol dm<sup>−3</sup>»</p>
<p><em><strong>[1 mark]</strong></em></p>
<p> </p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>0.65 <strong>«</strong>μg cm<sup>–3</sup><strong>»</strong></p>
<p><em>Accept any value in the range 0.60–0.70 <strong>«</strong>μg cm<sup>–3</sup><strong>»</strong></em></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Lycopene, whose structure is shown below, is a carotenoid and is responsible for the red colour in tomatoes. When bromine is slowly added to some tomato juice, the colour of the juice gradually changes from red to yellow. Explain this colour change in terms of changes in bonding in lycopene.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-19_om_06.05.08.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/F3.b"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">\({\text{B}}{{\text{r}}_{\text{2}}}\) reacts with the double bonds / amount of double bonds in the conjugated system decreases;</p>
<p class="p1">absorbed energy shifts to violet/higher energy in the visible region is absorbed;</p>
<p class="p1">resulting in complementary yellow colour;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates were unable to relate the addition of bromine to bond saturation, the shift of energy absorbance to violet/higher energy in the visible region and the transmittance of the complementary yellow light.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are protein molecules that catalyse specific biochemical reactions. The phosphorylation of glucose is the first step of glycolysis (the oxidation of glucose) and is catalysed by the enzyme hexokinase.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain how enzymes, such as hexokinase, are able to catalyse reactions.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain the effect of increasing the temperature from 20 °C to 60 °C on an enzyme-catalysed reaction.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">enzymes have an active site (where the substrate can bind) / explanation of lock and key or induced fit model;</p>
<p class="p1">lowers activation energy (by providing an alternative pathway);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">increasing temperature initially increases rate of reaction;</p>
<p class="p1">because more molecules possess energies equal or greater than the activation energy;</p>
<p class="p1">at a temperature around 37 °C, the highest rate is reached;</p>
<p class="p1">at a temperature around 40 °C the enzyme is denatured / shape of the active site changes/tertiary structure of the enzyme changes;</p>
<p class="p1">so rate decreases/reaction stops;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">In the explanation of how enzymes are able to catalyse reactions, many referred to active sites but fewer made reference to the lowering of activation energy.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Though candidates seemed to understand enzyme activity at different temperatures, they often omitted details on the exact temperature ranges. Some were nicely able to illustrate their answer with a properly labelled graph.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p>Explain how the structure of vitamin A is important to vision using section 35 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>vitamin A oxidized to <strong>«</strong>11-<em>cis</em>-<strong>»</strong>retinal</p>
<p> </p>
<p>extended conjugation</p>
<p><strong><em>OR</em></strong></p>
<p>extensive delocalization</p>
<p> </p>
<p><em>cis</em>-retinal converts to <em>trans</em>-retinal through absorption of light</p>
<p> </p>
<p><em>Accept “vitamin </em><em>A/hydroxyl/hydroxy/alcohol/CH</em><sub><em>2</em></sub><em>OH </em><em>group oxidized to aldehyde/CHO </em><strong><em>«</em></strong><em>group </em><em>in retinal</em><strong><em>»</em></strong><em>”.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Vitamins can be water-soluble or fat-soluble.</p>
</div>
<div class="question">
<p>Retinal is the key molecule involved in vision. Explain the roles of <em>cis</em> and <em>trans</em>-retinal in vision and how the isomers are formed in the visual cycle.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any three of:</em></p>
<p><em>cis</em>-retinal binds to «the protein» opsin</p>
<p><em><strong>OR</strong></em></p>
<p><em>cis</em>-retinal «binds to opsin and» forms rhodopsin</p>
<p>rhodopsin extends conjugation in retinal</p>
<p><em><strong>OR</strong></em></p>
<p>rhodopsin allows absorption of visible/blue/green light</p>
<p>when visible light is absorbed <em>cis</em>-retinal changes to <em>trans</em>-retinal</p>
<p>change «to <em>trans</em>-retinal» triggers an electrical/nerve signal</p>
<p><em>trans</em>-retinal detaches from opsin <em><strong>AND</strong> </em>is converted back to <em>cis</em>-retinal</p>
<p><em><strong>OR</strong></em></p>
<p><em>trans</em>-retinal is converted back to <em>cis</em>-retinal through enzyme activity</p>
<p><em>Do <strong>not</strong> accept “cis-retinal to trans-retinal” alone without reference to absorption of visible light.</em></p>
<p><em><strong>[Max 3 Marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">The nucleic acids, RNA and DNA, are polymers which are formed from nucleotides. Distinguish between the structures of RNA and DNA.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">DNA is double-strand nucleic acid / RNA is single-strand nucleic acid;</p>
<p class="p1">DNA (base) is thymine / RNA (base) is uracil;</p>
<p class="p1">DNA has deoxyribose as pentose sugar / RNA has ribose;</p>
<p class="p1"><em>Accept suitable diagrams.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates were capable of describing all three differences between RNA and DNA. Candidates must be aware that they should use the names of bases not just what they think is an acceptable symbol such as U or T but rather uracil or thymine.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">In aerobic respiration, the metabolism of glucose takes place using the processes of oxidation and reduction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the molecule that undergoes oxidation and state the half-equation for the process.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the molecule that undergoes reduction and state the half-equation for the process.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">glucose/\({{\text{C}}_{\text{6}}}{{\text{H}}_{{\text{12}}}}{{\text{O}}_{\text{6}}}\);</p>
<p class="p1">\({{\text{C}}_6}{{\text{H}}_{12}}{{\text{O}}_6} + {\text{6}}{{\text{H}}_2}{\text{O}} \to {\text{6C}}{{\text{O}}_2} + {\text{24}}{{\text{H}}^ + } + {\text{24}}{{\text{e}}^ - }\);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">oxygen/\({{\text{O}}_{\text{2}}}\);</p>
<p class="p1">\({\text{6}}{{\text{O}}_2} + {\text{24}}{{\text{H}}^ + } + {\text{24}}{{\text{e}}^ - } \to {\text{12}}{{\text{H}}_2}{\text{O}}\);</p>
<p class="p1"><em>Accept equation divided by 6.</em></p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>if (a) and (b) are reversed and all 4 marking points are correct.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Majority of candidates identified that glucose was oxidised and oxygen was reduced.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">It was very rare to see correct half-equations.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are biological catalysts. Catalases are highly efficient enzymes found in cells. Each catalase molecule can decompose millions of hydrogen peroxide molecules per second.</p>
<p class="p1">Metal-based inorganic catalysts are also common. In 2009, at Cardiff University in Wales, a new catalyst was developed by Hutchings and co-workers using gold–palladium nanoparticles in the direct synthesis of hydrogen peroxide.</p>
</div>
<div class="specification">
<p class="p1">Enzymes are affected by inhibitors which can be either competitive or non-competitive.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the characteristics of an enzyme (such as catalase).</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State how inhibitors affect the initial rate of reaction of an enzyme with its substrate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the action of competitive and non-competitive inhibitors on enzymes in terms of where the inhibitor binds to the enzyme.</p>
<p class="p1"> </p>
<p class="p1">Competitive inhibitors:</p>
<p class="p1"> </p>
<p class="p1">Non-competitive inhibitors:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State how inhibitors affect the values of \({V_{{\text{max}}}}\) and the Michaelis constant, \({K_{\text{m}}}\), by completing the table below.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-14_om_10.54.56.png" alt="M13/4/CHEMI/HP3/ENG/TZ1/B4.biii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">proteins;</p>
<p class="p1">enzyme activity depends on tertiary and quaternary structure/nature of active site;</p>
<p class="p1">lock and key / induced fit (hypothesis/theory);</p>
<p class="p1"><em>Allow enzymes are specific (for a particular reaction).</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">initial rates reduced;</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Competitive inhibitors: </em></p>
<p class="p1">(similar shape to substrate so) fits inside active site instead of substrate / <em>OWTTE</em>;</p>
<p class="p1"><em>Non-competitive inhibitors: </em></p>
<p class="p1">binds to enzyme not at active site <strong>and </strong>changes shape of active site so substrate no longer fits / <em>OWTTE</em>;</p>
<p class="p1"><em>Allow at allosteric site instead of not at active site.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-09-14_om_10.56.36.png" alt="M13/4/CHEMI/HP3/ENG/TZ1/B4.b.iii/M"></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for both V</em><sub><span class="s1"><em>max </em></span></sub><em>correct. </em></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for both K</em><sub><span class="s1"><em>m </em></span></sub><em>correct. </em></p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">In part (a), many candidates managed to score both marks, and most stated that enzymes are proteins, which scored at least one mark.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (b), (i) and (ii) were well answered though for the non-competitive inhibitors some did not state explicitly that they change the shape of the active site so the substrate no longer fits, in addition to stating that they bind to the enzyme but not at the active site.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (b), (i) and (ii) were well answered though for the non-competitive inhibitors some did not state explicitly that they change the shape of the active site so the substrate no longer fits, in addition to stating that they bind to the enzyme but not at the active site.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (iii), the better candidates scored full marks, though many scored at least one mark, usually for getting the two \({V_{{\text{max}}}}\) correct.</p>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Amino acids are usually identified by their common names. Use section 33 of the data booklet.</p>
</div>
<div class="question">
<p>Amino acids act as buffers in solution. In aspartic acid, the side chain (R group) carboxyl has p<em>K</em><sub>a</sub> = 4.0. Determine the percentage of the side chain carboxyl that will be ionized (–COO<sup>–</sup>) in a solution of aspartic acid with pH = 3.0. Use section 1 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>«–COOH \( \rightleftharpoons \) –COO<sup>–</sup> + H<sup>+</sup> (–COOH = HA ; –COO<sup>–</sup> = A<sup>–</sup>)»<br>pH = p<em>K</em><sub>a</sub> + log \(\frac{{\left[ {{{\rm{A}}^ - }} \right]}}{{\left[ {{\rm{HA}}} \right]}}\) / 3.0 = 4.0 + log \(\frac{{\left[ { - {\rm{CO}}{{\rm{O}}^ - }} \right]}}{{\left[ { - {\rm{COOH}}} \right]}}\) / –1.0 = log \(\frac{{\left[ { - {\rm{CO}}{{\rm{O}}^ - }} \right]}}{{\left[ { - {\rm{COOH}}} \right]}}\)</p>
<p>10<sup>–1</sup>=\(\frac{{\left[ { - {\rm{CO}}{{\rm{O}}^ - }} \right]}}{{\left[ { - {\rm{COOH}}} \right]}}\)</p>
<p>«percentage ionized/–COO<sup>–</sup> = \(\frac{1}{{1 + 10}}\) × 100 =» 9.1 «%»<br><em>Award <strong>[3]</strong> for correct final answer.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">The enzyme hexokinase catalyses one of the initial reactions between glucose and adenosine triphosphate (ATP) during the process of glycolysis.</p>
<p class="p1">The graph below shows how the rate of this enzyme-catalysed reaction changes as the glucose concentration is increased.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-17_om_06.58.57.png" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">From the graph, determine \({V_{{\text{max}}}}\) and the Michaelis constant, \({K_{\text{m}}}\).</p>
<p class="p2"> </p>
<p class="p1">\({V_{{\text{max}}}}\):</p>
<p class="p2"> </p>
<p class="p1">\({K_{\text{m}}}\):</p>
<div class="marks">[[N/A]]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why a <strong>low </strong>value of \({K_{\text{m}}}\) is significant.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain the effect of a competitive inhibitor on the value of \){K_{\text{m}}}\).</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{(}}{V_{{\text{max}}}}{\text{:) 7.75}}\)–\({\text{7.85 (mmol}}\,{\text{d}}{{\text{m}}^{ - 3}}{{\text{s}}^{ - 1}}{\text{)}}\);</p>
<p class="p1">\({\text{(}}{K_{\text{m}}}{\text{:) 0.12}}\)–\({\text{0.14 (mmol}}\,{\text{d}}{{\text{m}}^{ - 3}}{\text{)}}\);</p>
<p class="p1"><em>Accept 7.8 for V</em><span class="s1"><em><sub>max</sub>.</em></span></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">hexokinase/enzyme (with a low \({K_{\text{m}}}\)) has a high affinity for glucose/substrate / hexokinase/enzyme is saturated with substrate / hexokinase/ enzyme reacts quickly to form an ES complex which breaks down rapidly;</p>
<p class="p2"><em>Do not accept strong binding/bonding between enzyme and substrate.</em></p>
<p class="p1">hence needs a lower concentration of glucose/substrate to achieve \({V_{{\text{max}}}}\) / a fast reaction occurs even when substrate concentration is low;</p>
<p class="p2"><em>Accept “enzyme is efficient even at low substrate concentration”.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>First mark:</em></p>
<p class="p1">\({K_{\text{m}}}\) increases;</p>
<p class="p1"><em>Any two for final two marks:</em></p>
<p class="p1">inhibitor has similar structure to that of substrate;</p>
<p class="p1">hence inhibitor occupies/fits same active sites;</p>
<p class="p1">inhibitor does not affect \({V_{{\text{max}}}}\);</p>
<p class="p1">substrate must wait until the inhibitor leaves the active site;</p>
<p class="p1">reaction slows down/rate decreases;</p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The determination of <em>V</em><span class="s1"><em>max </em></span>and <em>K</em><span class="s1"><em>m </em></span>from the graph was done very well overall.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Answers were often poorly presented but many candidates scored the second mark. The high affinity of the enzyme for the substrate was rarely mentioned for the first marking point.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates obtained the first mark for \({K_{\text{m}}}\)<em> </em>increasing and a good number of candidates managed to achieve the last two marking points.</p>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Calculate the number of carbon-carbon double bonds in linolenic acid, \({{\text{C}}_{{\text{18}}}}{{\text{H}}_{{\text{30}}}}{{\text{O}}_{\text{2}}}\), given that 7.7 g of iodine, \({{\text{I}}_{\text{2}}}\), react with 2.8 g of linolenic acid.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><img src="images/Schermafbeelding_2016-10-12_om_09.09.54.png" alt="M10/4/CHEMI/HP3/ENG/TZ2/B4/M"></p>
<p class="p1">3 C=C double bonds;</p>
<p class="p2"><em>3 C=C double bonds scores </em><strong><em>[2]</em></strong><em>.</em></p>
<p class="p2"><em>No ECF.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many candidates were able to solve this straight forward calculation question. The major errors candidates made included comparing the ratio of the masses provided rather than working out the ratio of the number of moles of linolenic acid to iodine. In this instance candidates were not awarded any marks because they clearly did not understand the concepts involved. Candidates could also calculate the number of carbon-carbon bonds from the formula of linolenic acid.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Vitamins are organic micronutrients essential for good health. The structures of vitamins A, C and D are given in Table 21 of the Data Booklet.</p>
</div>
<div class="specification">
<p class="p1">Vitamin D is the only vitamin that can be synthesized in the body, by the action of sunlight on the skin.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify by name <strong>two </strong>functional groups that are common to all three of these vitamins.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Only one of these three vitamins is soluble in water.</p>
<p class="p1">Identify this vitamin.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why this vitamin is soluble in water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>one </strong>effect of vitamin D deficiency.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest why vitamin D deficiency diseases are becoming increasingly common in young people.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">alcohol/hydroxyl group <strong>and </strong>alkene;</p>
<p class="p1"><em>Accept carbon-carbon double bond.</em></p>
<p class="p1"><em>Do not accept just double bond.</em></p>
<p class="p1"><em>Do not accept hydroxide.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">vitamin C / ascorbic acid;</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">several OH groups / polar molecule;</p>
<p class="p1">able to form <span style="text-decoration: underline;">hydrogen bonds</span> with water;</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">softening/malfunctioning of bones / causes low/deficiency in calcium;</p>
<p class="p1"><em>Accept rickets.</em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">less time outdoors / skin not exposed due to clothing/sunscreen / <em>OWTTE</em>;</p>
<p class="p1"><em>Accept answers that show link with outdoors/sunlight.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin is often described as a carrier of diatomic oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the structure of hemoglobin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the role of hemoglobin in transporting diatomic oxygen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(hemoglobin large protein molecule with) iron(II) held by <span style="text-decoration: underline;">four</span> (nitrogen) ligands/coordinate/dative bonds (to form heme);</p>
<p>porphyrin/heme encapsulated in protein/polypeptide unit;</p>
<p>hemoglobin comprises four/several/more than one of these (protein/polypeptide) units;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(during respiration) oxygen bonds (temporarily) to iron (while hemoglobin travels through bloodstream releasing oxygen molecule when and where needed);</p>
<p>decreasing pH causes change in polypeptide releasing the oxygen;</p>
<p>each hemoglobin bonds to four oxygens;</p>
<p>iron stays in \( + 2\) oxidation state;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The structure of hemoglobin in Q9 was not well understood and its role in the transport of oxygen was superficial with very little mention of the change in pH. The question was based on B.9.2.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The structure of hemoglobin in Q9 was not well understood and its role in the transport of oxygen was superficial with very little mention of the change in pH. The question was based on B.9.2.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The following products result from the hydrolysis of a triglyceride.</p>
<p class="p1" style="text-align: center;">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{31}}}}{\text{COOH}}\) <span class="Apple-converted-space"> </span>\({{\text{C}}_{{\text{13}}}}{{\text{H}}_{{\text{27}}}}{\text{COOH}}\) <span class="Apple-converted-space"> </span>\({{\text{C}}_{{\text{15}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH}}\)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw a possible structure for the triglyceride.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the other reactant and one essential condition that would favour this hydrolysis reaction in the body.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify which product is polyunsaturated, and outline why foods containing this type of fatty acid are important for health.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-08-25_om_15.35.55.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/08.a/M"> ;</p>
<p class="p2"><em>Accept alternative orders for the hydrocarbon tails.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">water/\({{\text{H}}_{\text{2}}}{\text{O}}\) <strong>and </strong>enzyme/biological catalyst/lipase;</p>
<p class="p1"><em>Accept acidic/alkaline/basic condition instead of water.</em></p>
<p class="p1"><em>Do not award mark for lipase alone without water/ H<sub>2</sub>O.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{31}}}}{\text{COOH}}\);</p>
<p class="p1">they lower level of LDL cholesterol/low-density lipoproteins / reduce (the risk of) heart disease;</p>
<p class="p1"><em>Allow comparison with saturated fats with explanation.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are catalysts that increase the rate of all biochemical reactions, including those involved in respiration.</p>
</div>
<div class="specification">
<p class="p1">Cytochrome oxidase is a complex enzyme that catalyses the reduction of oxygen in the final stage of aerobic respiration. This enzyme is inhibited both by nitrogen(II) oxide, NO, and separately by cyanide ions, \({\text{C}}{{\text{N}}^ - }\). It has been suggested that NO acts competitively while \({\text{C}}{{\text{N}}^ - }\) acts non-competitively in inhibiting the enzyme. Experiments were carried out to test this hypothesis.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The graph below shows the effect of substrate concentration on the rate of the reaction in the absence of an inhibitor. Draw and label the results of the <strong>two</strong> experiments showing how the rate of the reaction changes in the presence of NO and in the presence of \({\text{C}}{{\text{N}}^ - }\), if the hypothesis is correct.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_16.22.59.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/09.b.ii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest a reason why it is more likely that NO, rather than \({\text{C}}{{\text{N}}^ - }\), acts competitively.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The reducing agent in the cytochrome oxidase reaction is a species that can be denoted as \({\text{X}}{{\text{H}}_{\text{2}}}\) in the reduced form. Using this notation, deduce an equation for the reaction of \({\text{X}}{{\text{H}}_{\text{2}}}\) and \({{\text{O}}_{\text{2}}}\), and outline, using oxidation numbers, why it is a redox reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iv.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-08-25_om_16.26.18.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/09.b.ii/M"></p>
<p class="p1">line labelled NO/competitive reaching \({V_{\text{m}}}\) but with lower gradient;</p>
<p class="p1">line labelled \({\text{C}}{{\text{N}}^ - }\)/non-competitive not reaching \({V_{\text{m}}}\);</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">NO more likely to fit into active site / NO (structure) similar to \({{\text{O}}_2}\) / \({\text{C}}{{\text{N}}^ - }\) structure different to \({{\text{O}}_2}\) / <em>OWTTE</em>;</p>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{2X}}{{\text{H}}_2} + {{\text{O}}_2} \to {\text{2X}} + {\text{2}}{{\text{H}}_2}{\text{O}}/{\text{X}}{{\text{H}}_2} + {{\text{O}}_2} \to {\text{X(OH}}{{\text{)}}_2}/{\text{X}}{{\text{H}}_{\text{2}}} + {{\text{O}}_{\text{2}}} \to {\text{XO}} + {{\text{H}}_{\text{2}}}{\text{O}}\);</p>
<p class="p1">oxygen changes from 0 to –2;</p>
<p class="p1"><em>Allow X<sub>2</sub></em> <em>instead of 2X.</em></p>
<p class="p1"><em>Do not allow 2– notation.</em></p>
<p class="p1"><em>Accept “X changes from –2 to 0 in X or X<sub>2</sub>“ or “X changes from –2 to +2 in </em><em>X(OH)<sub>2</sub>/XO”.</em></p>
<div class="question_part_label">b.iv.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Cholesterol belongs to a class of substances named lipids.</p>
</div>
<div class="question">
<p class="p1">Describe <strong>one </strong>negative effect of a high concentration of LDL cholesterol in blood.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">LDL can be retained in the arteries / block arteries / start formation of plaque(s) / increases risk of atherosclerosis/arteriosclerosis/cardiovascular/heart diseases;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">The most common answers were in terms of saturation and the sizes of the molecules.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Nucleic acids are natural polymers with exceptionally large relative molecular masses, made up of nucleotides. All cells in the human body, with the exception of red blood cells, contain deoxyribonucleic acid (DNA).</p>
</div>
<div class="specification">
<p class="p1">James Watson, Francis Crick and Maurice Wilkins were awarded the 1962 Nobel Prize in Physiology or Medicine “for their discoveries concerning the molecular structure of nucleic acids and its significance for information transfer in living material”.</p>
</div>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Explain how the two helices are linked in the structure of DNA.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Describe the role of DNA in the storage of genetic information. The details of protein synthesis are not required.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(i) bases;</p>
<p class="p1">held together by hydrogen bonds;</p>
<p class="p1">(ii) coded information lies in sequence of bases;</p>
<p class="p1">each sequence of three bases represents one amino acid/triplet code;</p>
<p class="p1">allows for up to 64 permutations/codons;</p>
<p class="p1">represents 20 naturally occurring amino acids;</p>
<p class="p1">human genome / complete sequence of bases in human DNA;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Usually candidates had no problem scoring both marks for (a) (i). In (ii) however, many answers were too broad in scope dealing with transcription and translation, rather than concentrating on <em>how </em>the genetic information is stored. Candidates clearly did not interpret what was being asked for explicitly in the question.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The colour of olive oil is due to pigments such as chlorophyll, pheophytin and carotenoids.</p>
<p class="p1">The absorption spectrum of one form of pheophytin is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-08_om_08.31.40.png" alt="m15/4/CHEMI/HP3/eng/TZ2/28"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural feature of a pheophytin molecule which allows it to absorb visible light.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-08_om_08.37.15.png" alt="m15/4/CHEMI/HP3/eng/TZ2/28.a.ii"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Carotenoids may lose their colour and develop off odours when they are oxidized.</p>
<p class="p1">Identify, using table 22 of the data booklet, the structural feature that makes carotenoids susceptible to oxidation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">List <strong>two </strong>factors which increase the rate of oxidation of carotenoids.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce, giving a reason, whether carotenoids are water-soluble or fat-soluble.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">extensive conjugation/delocalization / extended system of conjugated double bonds/delocalized electrons;</p>
<p class="p1"><em>Accept “contains porphyrin/porphin ring”.</em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">multiple/conjugated <span style="text-decoration: underline;">C=C/carbon to carbon</span> double bonds;</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">light;</p>
<p class="p1">higher/increased temperatures;</p>
<p class="p1">metals / transition metal ions;</p>
<p class="p1">hydroperoxides / peroxides;</p>
<p class="p1"><em>Accept acidity/low pH.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">fat-soluble <strong>and </strong>many non-polar groups/long non-polar chain;</p>
<p class="p1"><em>Accept fat-soluble </em><strong><em>and </em></strong><em>absence of hydroxyl/OH/polar/H-bonding groups.</em></p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Though appreciation of the issue of complementary colours was widespread, hardly any candidates identified <strong>both </strong>absorption bands in the visible region. In the next few parts of the question many students lost marks by failing to answer fully, not referring to the <em>extensive </em>conjugation or the <em>large number </em>of <em>carbon-carbon </em>double bonds, as well as referring to temperature, rather than <em>increased </em>temperature, as a factor in the rate of oxidation. Lack of polarity was widely given as a reason for the fat solubility of carotenoids, though lack of groups able to form hydrogen bonds might have been more accurate (many quite polar molecules, such as \({\text{CHC}}{{\text{l}}_{\text{3}}}\), are insoluble in water). The features that lead to phospholipids acting as emulsifiers were often known, but again students tended to lose marks because their answers did not contain enough detail of their interaction between the phases present.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Though appreciation of the issue of complementary colours was widespread, hardly any candidates identified <strong>both </strong>absorption bands in the visible region. In the next few parts of the question many students lost marks by failing to answer fully, not referring to the <em>extensive </em>conjugation or the <em>large number </em>of <em>carbon-carbon </em>double bonds, as well as referring to temperature, rather than <em>increased </em>temperature, as a factor in the rate of oxidation. Lack of polarity was widely given as a reason for the fat solubility of carotenoids, though lack of groups able to form hydrogen bonds might have been more accurate (many quite polar molecules, such as \({\text{CHC}}{{\text{l}}_{\text{3}}}\), are insoluble in water). The features that lead to phospholipids acting as emulsifiers were often known, but again students tended to lose marks because their answers did not contain enough detail of their interaction between the phases present.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Though appreciation of the issue of complementary colours was widespread, hardly any candidates identified <strong>both </strong>absorption bands in the visible region. In the next few parts of the question many students lost marks by failing to answer fully, not referring to the <em>extensive </em>conjugation or the <em>large number </em>of <em>carbon-carbon </em>double bonds, as well as referring to temperature, rather than <em>increased </em>temperature, as a factor in the rate of oxidation. Lack of polarity was widely given as a reason for the fat solubility of carotenoids, though lack of groups able to form hydrogen bonds might have been more accurate (many quite polar molecules, such as \({\text{CHC}}{{\text{l}}_{\text{3}}}\), are insoluble in water). The features that lead to phospholipids acting as emulsifiers were often known, but again students tended to lose marks because their answers did not contain enough detail of their interaction between the phases present.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Though appreciation of the issue of complementary colours was widespread, hardly any candidates identified <strong>both </strong>absorption bands in the visible region. In the next few parts of the question many students lost marks by failing to answer fully, not referring to the <em>extensive </em>conjugation or the <em>large number </em>of <em>carbon-carbon </em>double bonds, as well as referring to temperature, rather than <em>increased </em>temperature, as a factor in the rate of oxidation. Lack of polarity was widely given as a reason for the fat solubility of carotenoids, though lack of groups able to form hydrogen bonds might have been more accurate (many quite polar molecules, such as \({\text{CHC}}{{\text{l}}_{\text{3}}}\), are insoluble in water). The features that lead to phospholipids acting as emulsifiers were often known, but again students tended to lose marks because their answers did not contain enough detail of their interaction between the phases present.</p>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Deoxyribonucleic acid (DNA) is the genetic material that an individual inherits from both parents. DNA consists of nucleotides bonded together.</p>
</div>
<div class="question">
<p class="p1">Outline the essential features of the structure of a section of one strand of DNA.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(backbone of) sugar-phosphate;</p>
<p class="p1">nitrogenous bases attached to sugar;</p>
<p class="p1">four (different) nitrogenous bases / C, T, A and G;</p>
<p class="p1">sugar is a pentose;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many students discussed the structure of DNA as a whole rather than that of a single strand, as requested in the question. Nevertheless in the course of this many gave enough detail to gain some credit. The role of restriction enzymes and the polymerase chain reaction seemed well known, though the order of these was less clear. Details of the separation and detection of the fragments were however often less accurate. A significant minority of students attempting this question displayed some confusion with proteins and the electrophoresis of their component amino acids.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Olive oil is a complex mixture of triglycerides, some of which are derived from oleic acid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why oleic acid, <em>cis</em>-9-octadecenoic acid, has a lower melting point than its <em>trans </em>isomer, elaidic acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss <strong>two </strong>effects on health of consuming <em>trans </em>fatty acids such as elaidic acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">kink/shape of <em>cis-</em>isomer prevents molecules packing closely together / reduces area of close contact / <em>OWTTE</em>;</p>
<p class="p1">so weaker intermolecular attractions/dispersion/London/van der Waals’ forces;</p>
<p class="p1"><em>Accept converse argument based on trans-isomer.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">hard to metabolize / accumulates in fatty tissue / difficult to excrete;</p>
<p class="p1">increases levels of LDL cholesterol / increases risk of heart disease;</p>
<p class="p1"><em>Do </em><strong><em>not </em></strong><em>accept “increases level of bad cholesterol”.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most students correctly identified the compound that combines with fatty acids in triglycerides, but explanations of the lower melting points of <em>cis</em>-isomers usually lacked precision. The relationship between <em>trans</em>-fats and HDL/LDL levels and disorders arising from an unhealthy ratio of these seemed well known, but the difficulty in metabolizing these was rarely mentioned. Candidates either knew, or did not know, the mechanism for free-radical oxidation of fats with very few gaining partial marks; most however could identify a factor relevant to reducing its rate.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most students correctly identified the compound that combines with fatty acids in triglycerides, but explanations of the lower melting points of <em>cis</em>-isomers usually lacked precision. The relationship between <em>trans</em>-fats and HDL/LDL levels and disorders arising from an unhealthy ratio of these seemed well known, but the difficulty in metabolizing these was rarely mentioned. Candidates either knew, or did not know, the mechanism for free-radical oxidation of fats with very few gaining partial marks; most however could identify a factor relevant to reducing its rate.</p>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are proteins which play an important role in the biochemical processes occurring in the body.</p>
</div>
<div class="specification">
<p class="p1">The graph below shows how the rate of an enzyme-catalysed reaction changes as the substrate concentration is increased.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the major function of enzymes in the human body.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the mechanism of enzyme action in terms of structure.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Use the graph to determine \({V_{\max }}\) and the Michaelis constant, \({K_{\text{m}}}\).</p>
<p class="p2"><img src="images/Schermafbeelding_2016-10-03_om_18.17.40.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/B2.c.i"></p>
<p class="p1">\({V_{\max }}\):</p>
<p class="p1">\({K_{\text{m}}}\):</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw a line on the graph to represent the effect of adding a competitive inhibitor.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain the effects of heavy-metal ions and temperature increases on enzyme activity.</p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">catalyse/speed up chemical reactions (in the body) / catalyst;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">binding on the active site / lock and key / formation of substrate enzyme complex;</p>
<p class="p1"><em>Do not allow bind to enzyme.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({V_{\max }} = 0.5{\text{ (}} \times {\text{1}}{{\text{0}}^{ - 6}}{\text{ mol}}\,{\text{mi}}{{\text{n}}^{ - 1}}{\text{)}}\);</p>
<p class="p1">\({K_{\text{m}}} = \left( {{\text{[S] when }}v = \frac{1}{2}{V_{\max }} = } \right){\text{ 1.5 (}} \times {\text{1}}{{\text{0}}^{ - 3}}{\text{ mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{\text{)}}\);</p>
<p class="p1"><em>Accept any value between 1.2 and 1.5.</em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">line on graph showing reduced gradient but same final \({{V_{\max }}}\);</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-03_om_18.28.36.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/B2.c.ii/M"></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Heavy-metal ions:</em></p>
<p class="p1">react (irreversibly) with –SH group / replaces hydrogen atom with heavy-metal atom/ion;</p>
<p class="p1"><em>Accept heavy metal binding to active site.</em></p>
<p class="p1"><em>Accept poisons enzymes.</em></p>
<p class="p1">decrease activity/rate;</p>
<p class="p1"><em>Temperature changes:</em></p>
<p class="p1">increase in temperature increases (initial) activity/rate;</p>
<p class="p1">more reactants possess (minimum) activation energy;</p>
<p class="p1">at high temperature enzymes become less effective / above 40 °C activity/rate decreases / denatured / <em>OWTTE</em>;</p>
<p class="p1">for both (heavy-metal ions and temperature changes) (tertiary) structure disrupted / change of shape means active site stop working / <em>OWTTE</em>;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The major function of enzymes in the human body was very well answered.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most candidates were able to describe the mechanism of enzyme action in terms of structure.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In addition, the idea of a competitive inhibitor, \({V_{\text{m}}}\) and \({K_{\text{m}}}\) were all clearly understood and many candidates scored full marks in (c) (i) and (ii).</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In addition, the idea of a competitive inhibitor, \({V_{\text{m}}}\) and \({K_{\text{m}}}\) were all clearly understood and many candidates scored full marks in (c) (i) and (ii).</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (d) the answers tended to vary and many candidates did not distinguish between the temperature effect below and above 40 °C.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Many lipids are found in the human body. One type of lipid is a triglyceride</p>
</div>
<div class="specification">
<p class="p1">To measure the degree of unsaturation of a lipid the iodine number can be calculated.</p>
</div>
<div class="question">
<p class="p1">Calculate the iodine number of linoleic acid.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{C}}{{\text{H}}_{\text{3}}}{{{\text{(C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{4}}}{{{\text{(CH=CHC}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{2}}}{{{\text{(C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{6}}}{\text{COOH}}}&{{M_{\text{r}}} = 280.4} \end{array}\]</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(amount of linoleic acid in 100 g =) \(\frac{{100}}{{280.4}} = 0.357{\text{ mol}}\);</p>
<p class="p1">2 double bonds in molecule so 1 mole of lipid reacts with 2 moles of \({{\text{I}}_{\text{2}}}\);</p>
<p class="p1"><em>Can be implied in working.</em></p>
<p class="p1">mass of iodine that reacts \(( = 253.8 \times 0.357 \times 2) = 181{\text{ g}}\);</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for correct final answer.</em></p>
<p class="p1"><em>Award </em><strong><em>[2] </em></strong><em>for 90.5 g.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">In (b) many candidates could not define <em>iodine number</em>, with many referring to moles instead of grams. This then meant that few were able to calculate the iodine number successfully.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Proteins are polymers of 2-amino acids. The structures of the common amino acids are given in Table 19 of the Data Booklet. This question refers to the two amino acids alanine and cysteine.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural formula of cysteine as a zwitterion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">With reference to the isoelectric points of alanine and cysteine, describe with a reason what pH value would be suitable to use in an electrophoresis experiment designed to separate these two amino acids in solution.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Cysteine is responsible for a specific type of intra-molecular bonding within a protein molecule. State the name of this type of interaction and outline how it is different from other interactions responsible for the tertiary structure.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-08-25_om_15.24.00.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/07.a/M"> ;</p>
<p class="p1"><em>Accept full or condensed structural formulas as long as correct charges on N/NH<sub>3</sub> and O are represented.</em></p>
<p class="p1"><em>Accept NH<sub>3</sub><sup>+</sup> for H<sub>3</sub>N<sup>+</sup></em> <em>in the diagram.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">any value or range from <span class="s1">5.1– 6.0 </span>;</p>
<p class="p1">alanine positive <strong>and </strong>cysteine negative;</p>
<p class="p1"><em>Accept biggest charge difference/opposite charges between isoelectric points so </em><em>move in opposite directions.</em></p>
<p class="p1"><em>Need reference to charges to score M2.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">disulfide bridge;</p>
<p class="p1"><em>Accept S–S.</em></p>
<p class="p1">covalent / strongest bond;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option B was a very popular, and question 6 was well answered with the exception of not listing alkenyl when identifying two functional groups common to three vitamins (A, C and D). Some students did not read the question on formula of zwitterion carefully and instead have the formula of the amino acid itself without any charges. In the separation of alanine and cysteine, the first mark was well scored by many while the second mark proved to be more demanding and often candidates lost this mark as no reference was made to charges or charges inversely stated. Although the disulfide bridge was correctly identified by even weaker candidates a much few were able to identify this as a covalent bond. Structure of the triglyceride was better answered than in past sessions but drawing the ester linkage correctly was still challenging for many candidates. Although the identification of the other reactant (water) was identified by many, the one essential condition (enzyme/lipase) was done poorly. Identification of the polyunsaturated fatty acid was done well by most but the second mark on its ability to lower LDL cholesterol was missed by most. The question on enzymes and inorganic catalysts was done poorly since comparison was often missing. While some candidates were able to suggest a pair of ions in cytochrome oxidase, only stronger candidates provided both pairs. Competitive and non-competitive inhibition was generally well done; however, the reason why it is more likely that NO, rather than the cyanide ion, acts competitively was not done as well. The redox reaction of the reducing agent \({\text{X}}{{\text{H}}_{\text{2}}}\) with \({{\text{O}}_{\text{2}}}\) produced a range of possible equations but rarely did candidates scored full marks.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Compare the structures of the natural pigments, chlorophyll and heme B using Table 22 of the Data Booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">both contain planar heterocyclic unit/porphyrin;</p>
<p class="p1">conjugated double bonds (in cyclic system) / alkene (groups);</p>
<p class="p1"><em>Chlorophyll:</em></p>
<p class="p1">only chlorophyll has magnesium/ester (groups)/R-group on C3/long hydrocarbon chain;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates could compare successfully the structures of chlorophyll and heme B.</p>
</div>
<br><hr><br><div class="specification">
<p>Retinal, one of the many forms of vitamin A, reacts with opsin to produce rhodopsin. Refer to section 35 of the data booklet for one structure of vitamin A.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the structural feature which enables rhodopsin to absorb visible light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the change that occurs in the retinal residue during the absorption of visible light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«extensive system of» conjugation/alternating single and double «carbon to carbon» bonds<br><em><strong>OR</strong></em><br>delocalized electrons «over much of the molecule»</p>
<p> </p>
<p><em>Accept “delocalization”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>cis</em>«-retinal» converts to <em>trans</em>«-retinal»<br><em><strong>OR</strong></em><br>one of the C=C «fragments in retinal» changes «its configuration» from <em>cis</em> to <em>trans</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Nucleic acids, which are polynucleotides present in cells, transmit essential genetic information.</p>
</div>
<div class="question">
<p>Explain the double helical structure of DNA, including the importance of hydrogen bonding.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p align="LEFT">DNA made up of two polynucleotides that join to form a spiral/double helix;</p>
<p align="LEFT">two strands of nucleic acid interaction through hydrogen bonding network between</p>
<p align="LEFT">bases / polynucleotides linked by hydrogen bonds between bases;</p>
<p align="LEFT">alternating phosphate and sugar groups form the backbones with bases on the sugar;</p>
<p align="LEFT">thymine/T bonds to adenine/A <strong>and </strong>cytosine/C bonds to guanine/G;</p>
<p>double helix stabilized by dipole-dipole <strong>and </strong>vdW interactions between base pairs;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>In Q8 the best understanding was that of the complementary base pairs and the hydrogen bonding between them; the rest was not well explained and very few understood the importance of the hydrogen bonding. Candidates were either well prepared for DNA profiling – or showed very little understanding. The order of steps seemed to be incertain. It is accepted that “describe” followed by “explain the importance” would have been a more effective wording of the question.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Limonene is a chiral molecule. The enantiomer found in oranges is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-26_om_06.09.19.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/26"></p>
</div>
<div class="question">
<p class="p1">Identify the chiral carbon atom in the structure above with an asterisk, *.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><img src="images/Schermafbeelding_2016-08-26_om_06.23.16.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/26.a/M"></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Option F was one of the less popular options. Identification of the two functional groups in the three antioxidants and why they contain <em>tert- </em>in the prefix to their name was generally done well. Strong candidates were able to provide the correct formula of BHT but many weaker candidates were not and this is a source of concern as it involves skills that should be basic in chemistry. Explanation of how natural and synthetic antioxidants act chemically in the process of auto-oxidation was generally done well. However, the mode of action of \({\text{S}}{{\text{O}}_{\text{2}}}\) as an antioxidant was not as successful as expected. The question on beta-carotene was done well.</p>
<p class="p1">Identification of the fatty acid with the highest melting point and the reason why was correctly answered by many but then many also failed to make use of intermolecular forces and therefore did not fully score. Another disappointing result was the equation for the complete hydrogenation of linolenic acid and once again related to difficulties in writing and balancing chemical equations. Many candidates were able to score the second mark by providing two correct conditions. The meaning of the term <em>trans </em>and the associated structure was answered very well.</p>
<p class="p1">Many correct answers were given for the meaning of a <em>dispersed </em>system but also many did not make use of subject specific vocabulary or repeated the word <em>dispersed </em>in the answer<em>. </em>The idea of an emulsion and foam was well understood as was the part on the structural features of an emulsifier.</p>
<p class="p1">Many candidates identified the chiral carbon atom correctly in the structure given and two different ways in which enantiomers might affect the properties of foods. However, the reason for the difference in optical activity when carvone is synthesized using limonene from natural or chemical source was poorly answered with many not scoring at all.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Stearic acid, oleic acid and linolenic acid are all fatty acids that contain 18 carbon atoms. Their structures are given in Table 22 of the Data Booklet.</p>
</div>
<div class="specification">
<p class="p1">Partial hydrogenation of linolenic acid may lead to a product known as a <em>trans </em>fatty acid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain which acid has the highest melting point.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the equation for the complete hydrogenation of linolenic acid. Describe the conditions used for this reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the meaning of the term <em>trans</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structure of a possible <em>trans</em> fatty acid product.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">stearic acid;</p>
<p class="p1">saturated molecule / more closely packed / greater surface area (of contact) / not “kinked”;</p>
<p class="p1">more/stronger van der Waals’ forces;</p>
<p class="p1"><em>Accept intermolecular/London/dispersion forces instead of van der Waals’ forces</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({{\text{C}}_{17}}{{\text{H}}_{29}}{\text{COOH(l)}} + {\text{3}}{{\text{H}}_2}{\text{(g)}} \to {{\text{C}}_{17}}{{\text{H}}_{35}}{\text{COOH(l)}}\);</p>
<p class="p1"><em>Ignore state symbols.</em></p>
<p class="p1"><em>Accept either condensed structural formulas or molecular formulas.</em></p>
<p class="p1"><em>Any </em><strong><em>two </em></strong><em>correct conditions for second mark:</em></p>
<p class="p1">high temperature/heat;</p>
<p class="p1"><em>Accept any temperature value/range greater than </em><span class="s1"><em>100 °C</em></span><em>.</em></p>
<p class="p1">(high) pressure;</p>
<p class="p1">(finely divided catalyst) Zn / Cu / Ni / Pt / Pd;</p>
<p class="p1"><em>Accept room temperature only if Pt or Pd is given as catalyst.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>trans </em>fats have functional/bulky groups/hydrogen atoms on opposite sides of the carbon-carbon <span style="text-decoration: underline;">double bond</span>;</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-08-26_om_06.20.58.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/24.c.ii/M"> ;</p>
<p class="p2"><em>Award mark for structures showing one or two double bonds with trans arrangement correctly shown.</em></p>
<p class="p2"><em>Accept R as long as the trans arrangement is clear.</em></p>
<p class="p2"><em>Ignore errors in hydrocarbon chain/position of double bonds so long as trans arrangement is clear.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option F was one of the less popular options. Identification of the two functional groups in the three antioxidants and why they contain <em>tert- </em>in the prefix to their name was generally done well. Strong candidates were able to provide the correct formula of BHT but many weaker candidates were not and this is a source of concern as it involves skills that should be basic in chemistry. Explanation of how natural and synthetic antioxidants act chemically in the process of auto-oxidation was generally done well. However, the mode of action of \({\text{S}}{{\text{O}}_{\text{2}}}\) as an antioxidant was not as successful as expected. The question on beta-carotene was done well.</p>
<p class="p1">Identification of the fatty acid with the highest melting point and the reason why was correctly answered by many but then many also failed to make use of intermolecular forces and therefore did not fully score. Another disappointing result was the equation for the complete hydrogenation of linolenic acid and once again related to difficulties in writing and balancing chemical equations. Many candidates were able to score the second mark by providing two correct conditions. The meaning of the term <em>trans </em>and the associated structure was answered very well.</p>
<p class="p1">Many correct answers were given for the meaning of a <em>dispersed </em>system but also many did not make use of subject specific vocabulary or repeated the word <em>dispersed </em>in the answer<em>. </em>The idea of an emulsion and foam was well understood as was the part on the structural features of an emulsifier.</p>
<p class="p1">Many candidates identified the chiral carbon atom correctly in the structure given and two different ways in which enantiomers might affect the properties of foods. However, the reason for the difference in optical activity when carvone is synthesized using limonene from natural or chemical source was poorly answered with many not scoring at all.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option F was one of the less popular options. Identification of the two functional groups in the three antioxidants and why they contain <em>tert- </em>in the prefix to their name was generally done well. Strong candidates were able to provide the correct formula of BHT but many weaker candidates were not and this is a source of concern as it involves skills that should be basic in chemistry. Explanation of how natural and synthetic antioxidants act chemically in the process of auto-oxidation was generally done well. However, the mode of action of \({\text{S}}{{\text{O}}_{\text{2}}}\) as an antioxidant was not as successful as expected. The question on beta-carotene was done well.</p>
<p class="p1">Identification of the fatty acid with the highest melting point and the reason why was correctly answered by many but then many also failed to make use of intermolecular forces and therefore did not fully score. Another disappointing result was the equation for the complete hydrogenation of linolenic acid and once again related to difficulties in writing and balancing chemical equations. Many candidates were able to score the second mark by providing two correct conditions. The meaning of the term <em>trans </em>and the associated structure was answered very well.</p>
<p class="p1">Many correct answers were given for the meaning of a <em>dispersed </em>system but also many did not make use of subject specific vocabulary or repeated the word <em>dispersed </em>in the answer<em>. </em>The idea of an emulsion and foam was well understood as was the part on the structural features of an emulsifier.</p>
<p class="p1">Many candidates identified the chiral carbon atom correctly in the structure given and two different ways in which enantiomers might affect the properties of foods. However, the reason for the difference in optical activity when carvone is synthesized using limonene from natural or chemical source was poorly answered with many not scoring at all.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option F was one of the less popular options. Identification of the two functional groups in the three antioxidants and why they contain <em>tert- </em>in the prefix to their name was generally done well. Strong candidates were able to provide the correct formula of BHT but many weaker candidates were not and this is a source of concern as it involves skills that should be basic in chemistry. Explanation of how natural and synthetic antioxidants act chemically in the process of auto-oxidation was generally done well. However, the mode of action of \({\text{S}}{{\text{O}}_{\text{2}}}\) as an antioxidant was not as successful as expected. The question on beta-carotene was done well.</p>
<p class="p1">Identification of the fatty acid with the highest melting point and the reason why was correctly answered by many but then many also failed to make use of intermolecular forces and therefore did not fully score. Another disappointing result was the equation for the complete hydrogenation of linolenic acid and once again related to difficulties in writing and balancing chemical equations. Many candidates were able to score the second mark by providing two correct conditions. The meaning of the term <em>trans </em>and the associated structure was answered very well.</p>
<p class="p1">Many correct answers were given for the meaning of a <em>dispersed </em>system but also many did not make use of subject specific vocabulary or repeated the word <em>dispersed </em>in the answer<em>. </em>The idea of an emulsion and foam was well understood as was the part on the structural features of an emulsifier.</p>
<p class="p1">Many candidates identified the chiral carbon atom correctly in the structure given and two different ways in which enantiomers might affect the properties of foods. However, the reason for the difference in optical activity when carvone is synthesized using limonene from natural or chemical source was poorly answered with many not scoring at all.</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option F was one of the less popular options. Identification of the two functional groups in the three antioxidants and why they contain <em>tert- </em>in the prefix to their name was generally done well. Strong candidates were able to provide the correct formula of BHT but many weaker candidates were not and this is a source of concern as it involves skills that should be basic in chemistry. Explanation of how natural and synthetic antioxidants act chemically in the process of auto-oxidation was generally done well. However, the mode of action of \({\text{S}}{{\text{O}}_{\text{2}}}\) as an antioxidant was not as successful as expected. The question on beta-carotene was done well.</p>
<p class="p1">Identification of the fatty acid with the highest melting point and the reason why was correctly answered by many but then many also failed to make use of intermolecular forces and therefore did not fully score. Another disappointing result was the equation for the complete hydrogenation of linolenic acid and once again related to difficulties in writing and balancing chemical equations. Many candidates were able to score the second mark by providing two correct conditions. The meaning of the term <em>trans </em>and the associated structure was answered very well.</p>
<p class="p1">Many correct answers were given for the meaning of a <em>dispersed </em>system but also many did not make use of subject specific vocabulary or repeated the word <em>dispersed </em>in the answer<em>. </em>The idea of an emulsion and foam was well understood as was the part on the structural features of an emulsifier.</p>
<p class="p1">Many candidates identified the chiral carbon atom correctly in the structure given and two different ways in which enantiomers might affect the properties of foods. However, the reason for the difference in optical activity when carvone is synthesized using limonene from natural or chemical source was poorly answered with many not scoring at all.</p>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>The structures of the amino acids cysteine, glutamine and lysine are given in section 33 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>An aqueous buffer solution contains both the zwitterion and the anionic forms of alanine. Draw the zwitterion of alanine.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the pH of a buffer solution which contains 0.700 mol dm<sup>–3</sup> of the zwitterion and 0.500 mol dm<sup>–3</sup> of the anionic form of alanine. </p>
<p>Alanine p<em>K<sub>a</sub></em> = 9.87.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<p><em>Penalize incorrect bond linkages or missing hydrogens once only in 8 (a) and 8 (c) (i).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«pH = 9.87 + log\(\left( {\frac{{0.500}}{{0.700}}} \right)\)»</p>
<p>«= 9.87 – 0.146»</p>
<p>= 9.72</p>
<p> </p>
<p><em>pH can be deduced by an alternative method.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Strawberries have a bright red colour and a distinctive smell.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Ripe strawberries contain the flavylium cation, an anthocyanin. By referring to table 22 of the data booklet, explain why ripe strawberries are red.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the difference in solubility in water between anthocyanins and carotenes, by referring to their structures in table 22 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline another convention used for specifying a molecule’s spatial configuration and its relationship with the (\( + \)) and (\( - \)<span class="s1">) notation (previously referred to as \(d\) and \(l\)).</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">red light/radiation transmitted;</p>
<p class="p1"><em>Accept “red light/radiation reflected”.</em></p>
<p class="p1">green light/radiation absorbed / green is complementary colour / complementary colour absorbed;</p>
<p class="p1"><em>“Light/radiation” only needs to be mentioned once in either M1 or M2.</em></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for “red transmitted </em><strong><em>and </em></strong><em>green absorbed”.</em></p>
<p class="p2">(as) electrons promoted into higher energy levels;</p>
<p class="p2">(in visible region due to extensive) conjugation / alternate single and double (carbon–carbon) bonds / involves delocalization (of \(\pi \) <span class="s1">electrons);</span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">anthocyanins are (water) soluble but carotenes are insoluble;</p>
<p class="p1">anthocyanins have hydroxyl/OH/polar groups (so are water soluble) / anthocyanins can form hydrogen bonds with water / carotenes have no hydroxyl/OH/polar groups/are non-polar (so not water soluble) / carotenes do not form hydrogen bonds with water / carotenes have long hydrophobic parts / <em>OWTTE</em>;</p>
<p class="p1"><em>Accept “alcohol or hydroxy” for hydroxyl but not hydroxide</em>.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">D/L used for carbohydrates <strong>and </strong>amino acids / D/L uses glyceraldehyde as a reference;</p>
<p class="p1"><em>Accept Fischer-Rosanoff/Rosanoff (convention) for carbohydrates </em><strong><em>and </em></strong><em>amino </em><em>acids</em>.</p>
<p class="p1"><em>Do not accept just “CORN rule used for amino acids”.</em></p>
<p class="p1">no relationship <em>/ OWTTE;</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The same general comments apply here in part (a) as in Q4 in Option A. In (b), some excellent answers were seen and differences in polarity and solubility were correctly outlined. Many students seemed to have an outline understanding of the CIP convention, though many lacked the language skills to communicate their knowledge succinctly. The ordering of groups by atomic mass rather than atomic number seemed a common misapprehension and many referred incorrectly to molecular mass. In (d), few managed to score both marks. D/L and d/l were often mixed up and few realized that there is actually no relationship between the (\( + \)) and (\( - \)) and D/L conventions.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The same general comments apply here in part (a) as in Q4 in Option A. In (b), some excellent answers were seen and differences in polarity and solubility were correctly outlined. Many students seemed to have an outline understanding of the CIP convention, though many lacked the language skills to communicate their knowledge succinctly. The ordering of groups by atomic mass rather than atomic number seemed a common misapprehension and many referred incorrectly to molecular mass. In (d), few managed to score both marks. D/L and d/l were often mixed up and few realized that there is actually no relationship between the (\( + \)) and (\( - \)) and D/L conventions.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The same general comments apply here in part (a) as in Q4 in Option A. In (b), some excellent answers were seen and differences in polarity and solubility were correctly outlined. Many students seemed to have an outline understanding of the CIP convention, though many lacked the language skills to communicate their knowledge succinctly. The ordering of groups by atomic mass rather than atomic number seemed a common misapprehension and many referred incorrectly to molecular mass. In (d), few managed to score both marks. D/L and d/l were often mixed up and few realized that there is actually no relationship between the (\( + \)) and (\( - \)) and D/L conventions.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>The most important components of nucleotides are the nitrogeneous bases, which consist of pyrimidines and purines.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Thymine (T), whose structure is given in Table 21 of the Data Booklet, is a pyrimidine.</p>
<p>Describe how thymine forms part of a nucleotide in deoxyribonucleic acid (DNA).</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Adenine, A, whose structure is also given in Table 21 of the Data Booklet, is a purine found in DNA.</p>
<p>Draw the structure of the organic product formed from the condensation reaction of adenine with the sugar D-ribose (whose structure is given below) and identify the other product.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-15_om_07.26.30.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/07.b"></p>
<p> </p>
<p>Structure of organic product:</p>
<p> </p>
<p>Other product:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Adenine (A), guanine (G), cytosine (C) and thymine (T) result in the double helix structure of DNA. Using the structures of adenine and thymine, draw a diagram to explain how thymine is able to play a role in forming a double helix.</p>
<p> </p>
<p>(ii) Compare the bonding between cytosine and guanine with the bonding between adenine and thymine.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>thymine (covalently) bonded to deoxyribose/pentose sugar / thymine bonds via a condensation reaction with sugar / N from thymine bonds to C on sugar / thymine joins with pentose sugar;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-08-15_om_07.30.12.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/07.b/M"> ;</p>
<p>\({{\text{H}}_{\text{2}}}{\text{O}}\)/water;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) <img src="images/Schermafbeelding_2016-08-15_om_07.35.03.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/07.c.i/M"></p>
<p>drawing correctly showing two hydrogen bonds;</p>
<p><em>Do not penalize structural error in bases.</em></p>
<p><em>Do not penalize if lone pairs are omitted.</em></p>
<p>(ii) both have hydrogen bonding;</p>
<p>C and G have three interactions (and A and T have two) / <em>OWTTE</em>;</p>
<p><em>Do not apply ECF here.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Parts of this question proved very difficult for candidates, in particular part (b) (most got water however) and (c) (i). In Question 7, only a tiny number of candidates were able to draw a correct structure of the nucleoside. Many students knew how many hydrogen bonds were between adenine and thymine but couldn't draw these bonds and often had no idea what hydrogen bonds were. In (d), most candidates suggested forensic and paternity cases as to possible uses of DNA profiling.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Parts of this question proved very difficult for candidates, in particular part (b) (most got water however) and (c) (i). In Question 7, only a tiny number of candidates were able to draw a correct structure of the nucleoside. Many students knew how many hydrogen bonds were between adenine and thymine but couldn't draw these bonds and often had no idea what hydrogen bonds were. In (d), most candidates suggested forensic and paternity cases as to possible uses of DNA profiling.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Parts of this question proved very difficult for candidates, in particular part (b) (most got water however) and (c) (i). In Question 7, only a tiny number of candidates were able to draw a correct structure of the nucleoside. Many students knew how many hydrogen bonds were between adenine and thymine but couldn't draw these bonds and often had no idea what hydrogen bonds were. In (d), most candidates suggested forensic and paternity cases as to possible uses of DNA profiling.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The graph below shows the effect of substrate concentration on the rate of an enzyme-catalysed reaction.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-07_om_16.15.46.png" alt="M15/4/CHEMI/HP3/ENG/TZ1/08"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the relationship between enzyme activity and concentration of the substrate.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain how competitive inhibition in an enzyme-catalysed reaction takes place.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Sketch, on the graph on page 13, a curve which shows competitive inhibition occurring in this reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Silver ions bond with sulfur atoms in an enzyme and change its tertiary structure and activity. Predict the effect of silver ions on the values of \({V_{{\text{max}}}}\) and \({K_{\text{m}}}\) of this enzyme.</p>
<p class="p2"> </p>
<p class="p3">\({V_{{\text{max}}}}\):</p>
<p class="p4"> </p>
<p class="p5"><span class="s1"><em>K</em></span>m <span class="s1">:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">at low concentration, as [S] increases rate increases/is first order</p>
<p class="p1"><strong>OR</strong></p>
<p class="p1">at low concentration more enzyme molecules can combine with substrate molecules as [S] increases;</p>
<p class="p1">at high concentration rate reaches a maximum/is zero order/is constant</p>
<p class="p1"><strong>OR</strong></p>
<p class="p1">at high concentration (all) active sites used up/occupied;</p>
<p class="p1"><em>Accept “at high concentration enzyme is saturated with substrate/saturation is reached”.</em></p>
<p class="p1"><em>There must be a reference to low concentration to score M1 and to high concentration to score M2.</em></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for stating “as [S] increases rate increases” if no other mark scored.</em></p>
<p class="p1"><em>Accept “(enzyme) activity” for “rate” throughout.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">inhibitors have similar structure to the substrate;</p>
<p class="p1">they bind to/occupy/compete for the active sites;</p>
<p class="p1">fewer substrate molecules able to react / inhibitors blocks active site;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-08-07_om_16.26.41.png" alt="M15/4/CHEMI/HP3/ENG/TZ1/08.c/M"></p>
<p class="p1"><em>On the graph look for:</em></p>
<p class="p1">same maximum/\({V_{{\text{max}}}}\);</p>
<p class="p1">the curve is less steep (than without inhibition);</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>if curve does not go through the origin</em>.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({V_{max}}\)<em>:</em></p>
<p class="p1">decreases;</p>
<p class="p1">\({K_m}\)<em>:</em></p>
<p class="p1">no change;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Overall this question was well answered. In (a) many did not refer to the areas of low and high concentration in the graph. (b) and (d) were very well answered. In (c), the most common mistake was candidates not drawing the second curve going to the same maximum.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Overall this question was well answered. In (a) many did not refer to the areas of low and high concentration in the graph. (b) and (d) were very well answered. In (c), the most common mistake was candidates not drawing the second curve going to the same maximum.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Overall this question was well answered. In (a) many did not refer to the areas of low and high concentration in the graph. (b) and (d) were very well answered. In (c), the most common mistake was candidates not drawing the second curve going to the same maximum.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Overall this question was well answered. In (a) many did not refer to the areas of low and high concentration in the graph. (b) and (d) were very well answered. In (c), the most common mistake was candidates not drawing the second curve going to the same maximum.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how genetic information is encoded within the double helical structure of DNA.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the name of the bond between complementary base pairs of DNA.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the bonding between base pairs by drawing the complementary base next to thymine below and by showing the bonds that hold the pairs of bases together. Use the structures given in Table 21 of the Data Booklet.</p>
<p><img src="images/Schermafbeelding_2016-08-22_om_11.51.37.png" alt="N14/4/CHEMI/HP3/ENG/TZ0/07.c"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>coded information lies in sequence of <span style="text-decoration: underline;">bases</span> / <em>OWTTE</em>;</p>
<p>each sequence of three (bases) represents one amino acid/triplet code;</p>
<p>allows for up to 64 permutations/codons;</p>
<p>represents 20 naturally occurring amino acids;</p>
<p>(sequence of 3-base codes) gives amino acid sequence/primary structure of protein;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrogen bond;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-08-22_om_12.10.01.png" alt="N14/4/CHEMI/HP3/ENG/TZ0/07.c/M"></p>
<p>selecting correct base pair, A/adenine;</p>
<p>A–T with 2 H-bonds connections;</p>
<p><em>Allow even if the two bonds are in the wrong place.</em></p>
<p>correct placement of H–bonds;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In (a), encoding is determined by the base <em>sequence </em>and each sequence encodes for one amino acid. Unfortunately many candidates described base pairs and how nucleotides are connected rather than how information is encoded. The mark in (b) was invariably gained but whilst adenine was usually correctly identified in (c) and sometimes that there are two hydrogen bonds involved, the positioning and linking of the hydrogen bonds was less than perfect. This included hydrogen bonding to a carbon atom on the ring rather than to nitrogen. There were no “tricks” here; the structure could be copied directly from the Data Booklet in the correct orientation.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (a), encoding is determined by the base <em>sequence </em>and each sequence encodes for one amino acid. Unfortunately many candidates described base pairs and how nucleotides are connected rather than how information is encoded. The mark in (b) was invariably gained but whilst adenine was usually correctly identified in (c) and sometimes that there are two hydrogen bonds involved, the positioning and linking of the hydrogen bonds was less than perfect. This included hydrogen bonding to a carbon atom on the ring rather than to nitrogen. There were no “tricks” here; the structure could be copied directly from the Data Booklet in the correct orientation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (a), encoding is determined by the base <em>sequence </em>and each sequence encodes for one amino acid. Unfortunately many candidates described base pairs and how nucleotides are connected rather than how information is encoded. The mark in (b) was invariably gained but whilst adenine was usually correctly identified in (c) and sometimes that there are two hydrogen bonds involved, the positioning and linking of the hydrogen bonds was less than perfect. This included hydrogen bonding to a carbon atom on the ring rather than to nitrogen. There were no “tricks” here; the structure could be copied directly from the Data Booklet in the correct orientation.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p>Describe <strong>three</strong> characteristics of enzymes.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Award </em><strong><em>[2] </em></strong><em>for three correct, </em><strong><em>[1] </em></strong><em>for two correct.</em></p>
<p>enzymes are proteins/polypeptides;</p>
<p>activity depends on 3D/tertiary and quaternary structure;</p>
<p>specificity of action / lock and key/induced fit hypothesis / <em>OWTTE</em>;</p>
<p>catalyses/speeds up rate of reaction/lowers activation energy (of reaction pathway) / are regenerated;</p>
<p>pH dependent;</p>
<p>temperature dependent;</p>
<p>has an active site;</p>
<p>can be inhibited;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question was generally well done although some candidates need to note that <em>three </em>characteristics are required for the two marks.</p>
</div>
<br><hr><br><div class="question">
<p>Compare the structures and chemical formulas of the two essential fatty acids linoleic acid and linolenic acid.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Similarities:</em></p>
<p><em>Award </em><strong><em>[3 max] </em></strong><em>for any three similarities of:</em></p>
<p>both contain 18 carbons/same number of carbons;</p>
<p>both unsaturated/contain C=C/carbon-carbon double bonds;</p>
<p><em>Do not allow just double bond.</em></p>
<p>both contain carboxyl/COOH/\({\text{C}}{{\text{O}}_{\text{2}}}{\text{H}}\);</p>
<p><em>Allow “both carboxylic acids”.</em></p>
<p>both have first (carbon to carbon) double bond/C=C on C9;</p>
<p>both have <em>cis</em>-configuration of (all) C=C (fragments);</p>
<p><em>Differences:</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for any one difference of:</em></p>
<p>linoleic acid (omega-6) contains 2 C=C <strong>and </strong>linolenic acid (omega-3) contains 3 C=C / linolenic acid has one more C=C;</p>
<p><em>Allow linolenic acid more unsaturated.</em></p>
<p>closest C=C on linoleic acid is on sixth carbon from methyl end <strong>and </strong>closest C=C on linolenic acid is on third carbon from methyl end / <em>OWTTE</em>;</p>
<p><em>Accept linoleic acid is omega-6/</em>\(\omega \)<em>-6 </em><strong><em>and </em></strong><em>linolenic acid is omega-3/</em>\(\omega \)<em>-3.</em></p>
<p><em>Award similarity mark M2 automatically as long as either difference mark is scored.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Candidates must remember that they are describing <em>carbon-carbon </em>double bonds; just “double bonds” does not score. Few candidates scored all four marks because some obvious similarities, such as <em>same number of carbons </em>and <em>both contain COOH group </em>were omitted. Some candidates found it helpful to tabulate the answer.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Pepsin is an enzyme, found in the stomach, that speeds up the breakdown of proteins. Iron is used to speed up the production of ammonia in the Haber process.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the characteristics of an enzyme such as pepsin, and compare its catalytic behaviour to an inorganic catalyst such as iron.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Enzymes are affected by inhibitors. Lead ions are a non-competitive inhibitor, they have been linked to impaired mental functioning. Ritonavir<sup><span class="s1">® </span></sup>is a drug used to treat HIV and acts as a competitive inhibitor. Compare the action of lead ions and Ritonavir<sup><span class="s1">® </span></sup>on enzymes, and how they affect the initial rate of reaction of the enzyme with its substrate and the values of \({K_{\text{m}}}\) and \({V_{{\text{max}}}}\).</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>characteristics </em><strong><em>[2 max]</em></strong></p>
<p class="p1">enzymes are proteins;</p>
<p class="p1">enzyme activity depends on tertiary and quaternary structure/the nature of the active site;</p>
<p class="p1">lock and key/induced fit hypothesis;</p>
<p class="p1"><em>comparison </em><strong><em>[2 max]</em></strong></p>
<p class="p1">enzymes function within a narrow pH range;</p>
<p class="p1">enzymes are denatured by high temps/temp above 40 °C <strong>and </strong>inorganic catalysts can be used at high temps/are less affected by conditions;</p>
<p class="p1">enzymes are very specific <strong>and </strong>inorganic catalysts often catalyse several reactions/non specific;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">initial rates reduced;</p>
<p class="p1">lead binds to enzyme away from active site and changes shape of active site so substrate no longer fits / <em>OWTTE</em>;</p>
<p class="p1">ritonavir is a similar shape to the substrate and so fits inside active site instead of substrate / <em>OWTTE</em>;</p>
<p class="p1"><em>lead:</em> \({K_{\text{m}}}\)<span class="s1"> </span>unchanged and \({V_{{\text{max}}}}\)<span class="s1"> </span>lower;</p>
<p class="p1"><em>ritonavir:</em> \({K_{\text{m}}}\)<span class="s1"> </span>higher and \({V_{{\text{max}}}}\)<span class="s1"> </span>the same;</p>
<p class="p1"><em>Accept competitive inhibitor for ritonavir and non-competitive inhibitor for lead.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (a) the answers of many candidates showed that they had not properly read the question, and the comparative descriptions were not done well, candidates seldom including both the enzyme of the iron catalyst in their answers. Very few scored full marks here; the most common omissions were to mention that enzymes were proteins and that they had a tertiary and quaternary structure. Several referred to the denaturing and specificity of enzymes without comparing these features with iron and so failed to score marks for these correct statements.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (b) candidates showed a good understanding of competitive and non-competitive inhibition and how the inhibitors attach to the enzyme. However many neglected to say that initial rates were reduced by both, and many candidates were confused about how <span class="s1">\({K_{\text{m}}}\) </span>and <span class="s1">\({V_{{\text{max}}}}\) </span>were affected by the two types of inhibition.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Linolenic acid (omega-3 fatty acid) is an essential fatty acid.</p>
</div>
<div class="question">
<p class="p1">Calculate the iodine number for linolenic acid, \({{\text{C}}_{{\text{17}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH (}}{{\text{M}}_{\text{r}}} = 278.48{\text{)}}\). The condensed structural formula of linolenic acid is given in table 22 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">\({{\text{n}}_{{\text{iodine}}}} = {\text{3}}{{\text{n}}_{{\text{linolenic acid}}}}\);</p>
<p class="p1">\({\text{iodine number }}\left( { = \frac{{3 \times 100 \times 253.8}}{{278.48}}} \right) = 273{\text{(g)}}\);</p>
<p class="p1"><em>Award </em><strong><em>[2] </em></strong><em>for final correct answer.</em></p>
<p class="p1"><em>If alternative definition, in terms of moles/C=C bonds is given, award </em><strong><em>[1 max] </em></strong><em>for </em><em>iodine number = 3.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Quite a few candidates were aware of the benefits of linolenic acid, though identifying the number of carbon-carbon double bonds present, and using this to calculate the iodine number, was rather more challenging.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The structures of some natural pigments and three preservatives are given in Table 22 of the Data Booklet.</p>
</div>
<div class="question">
<p class="p1">When the flavylium cation is placed in alkaline solution the structure changes to the quinoidal base. Explain why the colour changes from red to blue.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1"><span style="text-decoration: underline;">increased</span> conjugation/delocalization (due to removal of \({{\text{H}}^ + }\) from OH group on benzene ring) / light of <span style="text-decoration: underline;">lower</span> frequency/<span style="text-decoration: underline;">longer</span> wavelength absorbed;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates recognised that there was a change in the extent of conjugation but did not elaborate on whether conjugation had increased or decreased.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Proteins are made of long chains of amino acids.</p>
</div>
<div class="question">
<p class="p1">(i) Pepsin is a protein which functions as an enzyme in human stomachs. Describe the mechanism of the catalytic activity of an enzyme.</p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1">(ii) Discuss <strong>two </strong>differences in the catalytic action of an enzyme such as pepsin and an inorganic catalyst such as nickel metal.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>E–S complex forms / substrate attracted to active site of enzyme / substrate held in active site by intermolecular forces;</p>
<p class="p1">induced fit / lock and key / <em>OWTTE</em>;</p>
<p class="p1">product released (from active site) after reaction;</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for answers giving at least </em><strong><em>two </em></strong><em>characteristics of catalysts in general.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>enzyme specific <strong>and </strong>Ni non-specific/can catalyse many reactions;</p>
<p class="p1">enzyme works in narrow temperature range/37–42°C <strong>and </strong>Ni is effective at high temperatures/wide temperature range;</p>
<p class="p1">enzyme is homogeneous <strong>and </strong>Ni is heterogeneous;</p>
<p class="p1">enzyme produces intermediate with reactant <strong>and </strong>Ni adsorbs reactant molecules onto its surface / Ni weakens bonds in reactants;</p>
<p class="p1">enzyme denatured by high pH and Ni is not;</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for any </em><strong><em>two </em></strong><em>correct catalytic action characteristics for either the enzyme or nickel.</em></p>
<p class="p1"><em>Do </em><strong><em>not </em></strong><em>accept a difference based on reaction rate, such as “enzymes increase reaction rates anywhere from 10<sup>3</sup></em> <em>up to 10<sup>20</sup>, whereas inorganic catalysts increase rates much less”.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many students misread the first part of the question and gave details of how chromatography is carried out. Those that did read the question often failed to gain full credit either through forgetting to mention that the protein needs heating with the acid, or though failing to mention which bonds were being hydrolyzed. Candidates generally scored quite well on the remaining parts of the question.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">A natural pigment found in cranberries can exist in two forms.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_14.52.12.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/05"></p>
<p class="p1">Explain, with reference to hybridization, which form is more likely to be coloured.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">M as it has more delocalized pi electrons/extensive delocalized pi-bonding system/more conjugated;</p>
<p class="p1">M has many (linked) \({\text{s}}{{\text{p}}^{\text{2}}}\) carbon atoms / presence of \({\text{s}}{{\text{p}}^{\text{3}}}\) hybridized carbon in N limits delocalization/conjugation;</p>
<p class="p1">M absorbs light of longer wavelengths/shorter frequencies in the <span style="text-decoration: underline;">visible region</span>;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Option A proved to be very popular. Most candidates were able to state spin as the property of protons that allows them to be detected by MRI but stated molecular spin. The advantage of MRI over X-ray of being able to detect soft tissue was well answered although some did not read the question carefully and stated the reduced health risk which was already mentioned in the question. Part 2 was generally well done by many candidates but with the following concerns: most arrived at the correct molecular mass, but then omitted positive sign on the molecular ion; a significant number drew the correct formula but with some fanciful formulae. Explaining the splitting pattern for the quartet caused the biggest challenge with very few scoring full marks; the H was incorrectly assigned to the OH (with results in no splitting due to rapid proton exchange) rather than the one attached to the C atom and the relative heights of the peaks (1:3:3:1) was not identified by almost all candidates.</p>
<p>Identification of infrared ranges was generally done correctly, but occasionally the wrong value was given in the similarities. The suggestion as to why HPLC is used for the detection of drug in urine sample was not done well with few scoring full marks; the understanding that the substance is non-volatile or decomposes at high temperatures was rarely identified. Also, identification of features that allow molecules to absorb UV radiation was not answered well. The question on atomic Absorption spectroscopy was answered with mixed results – some failed to specify that it must be an aluminium lamp and the idea of absorption of radiation (at Z) was missed by many. Most graphs were correctly drawn; however, some did not connect the line to the origin which was the first point in the data table; others blundered at reading off the graph. A significant number of candidates were able to use arguments related to delocalization and absorption in the visible range. However, hybridization was not often identified or used usually correctly.</p>
</div>
<br><hr><br><div class="question">
<p>Vision is dependent on retinol (vitamin A) present in retina cells. Retinol is oxidized to the photosensitive chemical 11-<em>cis</em>-retinal and isomerizes to 11-<em>trans</em>-retinal on absorption of light.</p>
<p>Outline how the formation of 11-<em>trans</em>-retinal results in the generation of nerve signals to the brain.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>11-<em>trans</em> retinal no longer fits into the rhodopsin/protein<br><em><strong>OR</strong></em><br>11-<em>trans</em> retinal is ejected from the rhodopsin/protein</p>
<p>leads to conformational change in rhodopsin/protein «to opsin generating signals»</p>
<p><em><strong>[2 marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">State <strong>two </strong>differences in composition and <strong>one </strong>difference in structure between RNA and DNA.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">ribose in RNA <strong>and </strong>deoxyribose in DNA;</p>
<p class="p1">uracil in RNA <strong>and </strong>thymine in DNA;</p>
<p class="p1">RNA single-stranded <strong>and </strong>DNA double-stranded/double helix;</p>
<p class="p1"><em>Accept suitable drawings/diagrams</em>.</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin contains an iron ion that can bind to oxygen as part of the process of respiration.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Hemoglobin’s oxygen dissociation curve is shown at a given temperature. Sketch the curve on the graph at a higher temperature.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_18.58.13.png" alt="M18/4/CHEMI/HP3/ENG/TZ2/11.a"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>two </strong>differences between normal hemoglobin and foetal hemoglobin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>curve below original curve <strong>«</strong>showing lower affinity for oxygen<strong>» </strong>beginning at 0</p>
<p> </p>
<p><em>Award mark if end of student curve </em><em>does not finish at same location as </em><em>original curve.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>foetal hemoglobin has higher affinity for oxygen <strong>«</strong>than normal hemoglobin<strong>»</strong></p>
<p>foetal hemoglobin is less sensitive to inhibitors/2,3-bisphosphoglycerate/2,3-BPG/DPG <strong>«</strong>than normal hemoglobin<strong>»</strong></p>
<p>foetal hemoglobin contains two gamma units instead of the two beta units found in adult hemoglobin</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Amino acids, shown in section 33 of the data booklet, can be combined to form polypeptides and proteins.</p>
</div>
<div class="question">
<p>(i) Serine is a chiral amino acid. Draw both enantiomers of serine.</p>
<p>(ii) State the enantiomeric form of serine found in proteins.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>(i)<br><img src="data:image/png;base64,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" alt></p>
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<p><em>Accept un-ionized or zwitterionic forms.</em><br><em> Accept any other correct representation which clearly indicates 3-dimensional structure at chiral centre.</em><br><em> Accept Fischer projections with the chiral carbon atom represented by crossing lines or shown as C.</em></p>
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</div>
<p>(ii)<br>L</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Biological pigments include a variety of chemical structures with diverse functions.</p>
<p>The graph shows the conversion of hemoglobin to oxyhemoglobin.</p>
<p style="text-align: center;">Hb(aq) + 4O<sub>2</sub>(g) \( \rightleftharpoons \) Hb(O<sub>2</sub>)<sub>4</sub>(aq)</p>
<p>The partial pressure of oxygen gas, p(O<sub>2</sub>) is proportional to its concentration.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_11.43.40.png" alt="M17/4/CHEMI/HP3/ENG/TZ1/16"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the shape of the curve at low oxygen partial pressure up to about 5 kPa.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a graph on the axes above to show the effect of decreasing pH on the binding of oxygen to hemoglobin (the Bohr Effect).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the effect of decreasing pH on the oxygen saturation of hemoglobin.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>binding of O<sub>2</sub> «to one active site» affects shape of Hb/other active sites<br><em><strong>OR</strong></em><br>binding of one O<sub>2</sub> «molecule» affects binding of other O<sub>2</sub> «molecules»</p>
<p>increasing affinity of Hb to O<sub>2</sub><br><em><strong>OR</strong></em><br>enhanced binding of «further» O<sub>2</sub> «molecules»<br><em><strong>OR</strong></em><br>cooperative binding</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>sketching right shift of curve on graph</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>decreases «oxygen saturation»</p>
<p> </p>
<p><em>Accept “hemoglobin binds to O<sub>2</sub> with less affinity".</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Anthocyanins are pigments that give colour to many flowers and fruits. The red colour of ripe strawberries is mainly due to the anthocyanin pigment whose structure is shown below.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why this molecule absorbs visible light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>With reference to its chemical structure, outline whether this pigment is found in aqueous solution in the cells or in the lipid-based membranes.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A student investigated the ability of anthocyanins to act as pH indicators. He extracted juice from blackberries and used a UV-vis spectrophotometer to produce absorption spectra at different pH values. His results are shown below.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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"></p>
<p>Deduce the colour of the juice at each pH, giving your reasoning. Use section 17 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«extensive» conjugation «of double bonds»/delocalization «of electrons»<br><em><strong>OR<br></strong></em>«many» alternating single/C–C <em><strong>AND</strong></em> double/multiple/C=C bonds</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>in aqueous solution <em><strong>AND</strong></em> hydroxyl/OH/ionic/oxonium/O<sup>+</sup> «groups»</p>
<p><em>Accept “polar/hydroxy” for “hydroxyl”.</em><br><em>Do <strong>not</strong> accept “OH<sup>-</sup> /hydroxide/ oxygen”.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>pH 2: «absorption peak 520 nm» red <em><strong>AND</strong></em> pH 11: «absorption peak 620 nm» blue</p>
<p>complementary/opposite colour observed «to wavelength absorbed»<br><em><strong>OR</strong></em><br>pH 2: «absorption peak 520 nm» green absorbed <em><strong>AND</strong></em> pH 11: «absorption peak 620 nm» orange absorbed</p>
<p><em>Award <strong>[1 max]</strong> if colour absorbed and colour observed are correct for either at pH 2 or pH 11.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Glucokinase and hexokinase are both enzymes that catalyse the conversion of glucose to glucose-6-phosphate. The enzymes differ, however, in their affinity for the substrate, as shown in the graph below.</p>
<p style="text-align: center;"><img 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"></p>
<p> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Estimate the <em>K</em><sub>m</sub> values of the two enzymes.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(ii) Suggest, with a reason, which enzyme will be more responsive to changes in the concentration of glucose in the blood.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Outline what is meant by product inhibition as it applies to hexokinase.</p>
<p>(ii) Product inhibition of hexokinase does not affect its <em>K</em><sub>m</sub> value. Using this information, deduce the type of binding site that the inhibitor attaches to.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p><em>K</em><sub>m</sub> <em>hexokinase:</em> approx. 1.7 «mmol dm<sup>–3</sup>»<br><em><strong>AND<br></strong>K</em><sub>m</sub> <em>glucokinase:</em> approx. 8.5 «mmol dm<sup>–3</sup>»</p>
<p><em>Accept answers in the range 1.0-2.0 for hexokinase and 7.0-9.0 for glucokinase.</em></p>
<p> </p>
<p>ii</p>
<p>glucokinase as it is not saturated «with substrate at normal concentration of blood glucose»<br><em><strong>OR<br></strong></em>glucokinase as its saturation increases with increased glucose concentration in the blood</p>
<p><em>Accept “at the normal levels of blood glucose concentration, relative velocity of glucokinase still dependent on concentration of glucose”</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p><span style="text-decoration: underline;">glucose-6-phosphate</span> lowers enzyme activity/acts as enzyme inhibitor</p>
<p> </p>
<p>ii</p>
<p>«inhibitor binds at» allosteric site</p>
<p><em>Accept “outside/away from active site”.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Analysis of amino acid and protein concentration is a key area of biological research.</p>
<p>The titration curve of aqueous glycine zwitterions with aqueous sodium hydroxide is shown from pH 6.0 to 13.0. Refer to section 33 of the data booklet.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the pH range in which glycine is an effective buffer in basic solution.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Enzymes are biological catalysts.</p>
<p>The data shows the effect of substrate concentration, [S], on the rate, <em>v</em>, of an enzyme-catalysed reaction.</p>
<p style="text-align: center;"><img 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"></p>
<p>Determine the value of the Michaelis constant (<em>K</em><sub>m</sub>) from the data. A graph is not required.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the action of a non-competitive inhibitor on the enzyme-catalysed reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The sequence of nitrogenous bases in DNA determines hereditary characteristics.</p>
<p>Calculate the mole percentages of cytosine, guanine and thymine in a double helical DNA structure if it contains 17% adenine by mole.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«pH range» 8.6–10.6</p>
<p> </p>
<p><em>Accept any value between 8.2 and 11.0.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>K</em><sub>m</sub> =» 0.67 «mmol dm<sup>–3</sup>»</p>
<p> </p>
<p><em>Do not penalize if a graph is drawn to determine the value.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>does not compete for active site<br><em><strong>OR</strong></em><br>binds to allosteric site/away from «enzyme» active site<br><em><strong>OR</strong></em><br>alters shape of enzyme</p>
<p>reduces rate/<em>V</em><sub>max</sub></p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«% cytosine + % guanine = 100% – 17% – 17% = 66%»</p>
<p>Cytosine: 33 «%» <em><strong>AND</strong></em> Guanine: 33 «%»</p>
<p>Thymine: 17 «%»</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>The graph of the rate of an enzyme-catalyzed reaction is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_13.52.27.png" alt="M17/4/CHEMI/HP3/ENG/TZ2/13"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the value of the Michaelis constant, <em>K</em><sub>m</sub>, including units, from the graph.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a second graph on the same axes to show how the reaction rate varies when a competitive inhibitor is present.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the significance of the value of <em>K</em><sub>m</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«<em>K</em><sub>m</sub> = [substrate] at \(\frac{1}{2}\) <em>V</em><sub>max</sub>»</p>
<p>4.2 x 10<sup>–3</sup></p>
<p>mol dm<sup>–3</sup></p>
<p> </p>
<p><em>Accept answers in the range of 3.5 x 10<sup>–3</sup> to 5.0 x 10<sup>–3</sup> mol dm<sup>–3</sup>.</em></p>
<p><em>M2 can be scored independently.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>graph to right of curve <em><strong>AND</strong> </em>finish at same <em>V</em><sub>max</sub></p>
<p> </p>
<p><em>Do <strong>not</strong> penalize if curve does not finish exactly at same V<sub>max</sub> as long as it is close to it (since drawn curve does not</em><br><em>flatten out completely at V<sub>max</sub> = 0.50).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>K</em><sub>m</sub> is inverse measure of affinity of enzyme for a substrate / <em>K</em><sub>m</sub> is inversely proportional to enzyme activity<br><em><strong>OR</strong></em><br>high value of <em>K</em><sub>m</sub> indicates higher substrate concentration needed for enzyme saturation<br><em><strong>OR</strong></em><br>low value of <em>K</em><sub>m</sub> means reaction is fast at low substrate concentration</p>
<p> </p>
<p><em>Idea of inverse relationship must be conveyed.</em></p>
<p><em>Accept “high value of K<sub>m</sub> indicates low affinity of enzyme for substrate/less stable ES complex/lower enzyme activity”.</em></p>
<p><em>Accept “low value of K<sub>m</sub> indicates high affinity of enzyme for substrate/stable </em><em>ES complex/greater enzyme activity”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Spinach is an excellent source of vitamins A and C.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify one structural characteristic in vitamins A and D which makes them more similar to each other than they are to vitamin C using section 35 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The pigments from spinach were separated using chromatography. Identify <strong>Z</strong> by calculating its <em>R</em><sub>f</sub> value and using the data table.</p>
<p><img 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" alt></p>
<p><em>R</em><sub>f</sub>:</p>
<p>Z:</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
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<p>A and D have one/few polar/hydroxyl/OH groups <strong>«</strong>but C has many of those<strong>»</strong> <br><em><strong>OR</strong></em><br> A and D have hydrocarbon/six-membered <strong>«</strong>carbon<strong>»</strong> rings <strong>«</strong>but C has heterocyclic/five-membered ring<strong>»</strong><br><em><strong>OR<br></strong></em>A and D have long hydrocarbon chains/consist of mainly non-polar components</p>
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<p><em>Accept other valid similarities or differences. </em></p>
<p><em>Accept “hydroxy/alcohol” but not “hydroxide” for “hydroxyl”.</em></p>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
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<p>0.47 <em><strong>AND</strong></em> chlorophyll b</p>
<p><em>Accept any R</em><sub>f</sub><em> value in the range 0.44–0.50.</em></p>
</div>
</div>
</div>
</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p>The stability of DNA is due to interactions of its hydrophilic and hydrophobic components.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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"></p>
<p>Outline the interactions of the phosphate groups in DNA with water and with surrounding proteins (histones).</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Water:</em><br>hydrogen/H-bonds</p>
<p><em><strong>OR</strong></em></p>
<p>ion–dipole interactions</p>
<p><em>Proteins:</em><br>ionic bonds/interactions</p>
<p><em><strong>OR</strong></em></p>
<p>hydrogen/H-bonds</p>
<p><em><strong>OR</strong></em></p>
<p>ion–dipole interactions</p>
<p>Ignore “London/dispersion/vdW/dipole–dipole interactions” stated for water and/or proteins.</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Enzymes play an important role in the functioning of our bodies.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The graph below shows a Michaelis–Menten plot for an enzyme. Sketch and label two curves on the graph below to show the effect of adding a competitive and non-competitive inhibitor.</p>
<p><img src="data:image/png;base64,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" alt></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Enzyme solutions are prepared in buffers. Determine the pH of a buffer solution containing 2.60×10<sup>−3</sup>moldm<sup>−3</sup> ethanoic acid and 3.70×10<sup>−3</sup>moldm<sup>−3</sup> sodium ethanoate. Refer to sections 1 and 21 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
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<p>graph showing competitive inhibitor eventually reaching V<sub>max</sub><br>graph showing non competitive inhibitor not reaching V<sub>max</sub></p>
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<p><em>Curves must be labelled and should not cross given curve.<br></em><em>Penalize one mark if one or both sketched curve(s) cross the given curve.<br>Award <strong>[1 max]</strong> if curves are not labelled competitive or non-competitive <strong>OR</strong> are labelled the wrong way round.</em></p>
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<p><br><br></p>
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<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\log \frac{{\left( {3.70 \times {{10}^{ - 3}}} \right)}}{{\left( {2.60 \times {{10}^{ - 3}}} \right)}} = 0.153\)<br>«pH=4.76+0.153=»4.91</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em><br><em>Accept other method of calculation.</em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
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<p>An enzyme catalyses the conversion of succinate to fumarate ions in a cell, as part of the process of respiration.</p>
<p style="text-align: center;"><img 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"></p>
<p>The rate of the reaction was monitored and the following graph was plotted.</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the value of the Michaelis constant, <em>K</em><sub>m</sub>, by annotating the graph.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The malonate ion acts as an inhibitor for the enzyme.</p>
<p style="text-align: center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGUAAADNCAYAAAChM75MAAATXUlEQVR4Ae2dD2wTV57Hvza9XhcSiCKgjKEtSiJSeuEONYHekUgxZOu02uaKQBRdBUnXtGVPtMdtjzobpGV1bZddSETFoXbZIkdJg1ZLg6NwXK8kbAKpklaJnLbaIIJzCQpLsOnyR/lX/m3td3q2Jxn/mbEd/5k32Wcp8sz78/v93vcz782M582LjhBCwD9MKaBnKhoejFcBDoXBAyFqKB5XL06drEGFQQedzv9nqEDNyfMYmPQw2LREh/QArt7/xcmaChjE9ut0MFTU4GT7ACYT6Y6eU5Q/bjLRX0fKBRAYLaTO7iRub4Ux4mizEotRIBDMxNo/pmxG07ljpN9qJgIEYrR8TOzO+77WTDhIm9VCjAARyutI/4RPmbKyMiL319zcHFEJRCrhHrERsxfIIWL3O5XWiZQvLavN7ftkxLbLB6S6m0yENCJSfkiFiAkRoNwlDusWAuQTS9sNGWNiGYGYrP3+XiRTVIvJ7n5iNdHRoIq0jfl6QkgzxDLYQqyOuyHZsSYon1M8w+g80QmgAM+szJAZNR9BTtFzMMGF1o6L+FamlFaTPYNf4ESrC3i2ACvny8ilX46irUUAvkLHhRtxN1XGi9+u5zvcHnIBQiYy5skX1adnYAmt0nUZzu/jjokpA56J2xgCICzJwDzZyB5CekYmgCF0Xf4z4pVAXmlpAHMzsWBudEWl1WbT9txFCzA3RQ1SVlo/D5nZAjA0iCs35Pl7JkZxnQZcmAXDQymKPEVu9OmZyKZ9oO8K5Aem7zExehtANgqzFiNeCSJAEcdKO7r7R2VkuIfBzjNohQBT8VN4VKaUVpP1Oeuw1SQAZ+3oH5e5H5s69z6N4rxF8Tc10pVBpEtepfxbt25FMq+B/EiXvJHyY29ihEtianBmN49Hjhwha9asIVevXo09KuZqxHbzGG/4UUDxu6B3r43Vvjt7gP6yTCCUk+rGc8QR5qaSQqFltAwm8IBykwnHOdJYXU4Esf3eO/lq0tjmCHNTOXM00UOZgQ8tgxFj//rrr2fQ8viqJBRK4JHlC0xsnJZ6jNoxJwxKfX29d7jq7OwMOUzUbmRIQAoJLMSaMCgUhvc8AxCtgmEBCD1eEgaFGtMyGFaAJByKVsGwBCQpULQGhjUgSYOiFTAsAkkqFNbBsAok6VBYBcMykJRAYQ0M60BSBoUVMFoAklIoaoPRCpCUQ1ELjJaAqAIl1WC0BkQ1KKkCo0UgqkJJNhitAlEdSixgXnzxRVo8qo+WgdAGJvRX4qgUC1Mo0q/L9FlNtE8AtQ6EGSg0kEhgwrAMSaKzZ+gTTi095QxpBCFERxPjn6iUGAtdXV0oKqJzcoHOzk4UFhbGbHhkZMRbZ9myZTHXZaZCOFJqpkl7TOC8sfvEaT9NrBbT1BNOeN8X+Yg0T70zo2bkifPNxDkluDkUjMPhmE52O0n3ITq1J4+UV5+ZmtLkdnaTOi+kPGK2Dc+a1zCYhDJNg25FmIHoHiY2cx5Bgt4NCfStzl68c5GTPwx7LqPlt01wCa/g+OsFSAv2qH8MpsojsP3oDp5IV54aHVyV1X3moUy9tFMu99KOHmkrjNi0glWJY4+L+UNLfGkne9UTSMB89tgVUqEG81BU0ER1l8xDeciQBXq3ovzSjuo6JjQA5qHg0adQHOmlHYxjoP0UTvW6IPNaT0JFS7Yx9qHos1C6cxMEVx3e/cgeurKD5xra925Bbskx/B9+APYbFAVSda7EY/TqHiFtVfROXv7msdzal9B3RGKMMKHFNXDzKLaXLjvye1JdTm8U/S8tzdKfWZj6QTKKjv1XUWRWDMGzjZQmoYhLW802GGJ7NAlFDH62fnMoDJLlUDgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTeUzgUBhVgMCTmX9kOpxlDy8mECy/uND58xS1h4g1wKInXNG6LGoJC//X4/6C2snT6X6/rDFhfeSzoreDv4Wr6CXS6HFQ0XQ0jkJi/HjW9Cf2H5WF8zSxJG1A8LvS8/xryC6rQsegtOCbc9F1NuJ3NeAUnsbHAhNearsyK17UpRg1AeYBrzb/ExrfOIrfaig/2lGJFmi9svbAWFb/6CDYzULv5bdQN3JvZoclYLfavvvgqRowdMgBiX8VI/n8cs9e68BExP3zNfBWjIXy8+XHJRYHOv/03MGz+rUQNegHRgMr1Bn/+KlTUtGBgUr0FRZiHIlEvxs1slNv+5L0g8C/169/+C5y2nVO2PAPH8UrBQVzf3ooJ78XDISz9dBd2Hg2z5MhUreRuMA8l2asY6VeY0UL6UG/O8666pxf+CZt/9BjOH/0cDpVGQuahqLaKUXYm1Fr9kH0oqV7FaPIizn06AfPOEuSopI5KbmMZkx/G0o1VOF61Cuff3oFdkpOwx9WD+iozSn7lRLn11/hJfkYshkPL0mWq9v8ch7L24p2NT6h2E8f+fQqVTr8UG/Y3wvHDz/Df9XuQm37BL6gAo+U/0Wx/AWX5QpwijuNS3T5s+/I5nD69EUtVPFz5KkYU7+QlNL27G5t71qHtd1XYIDwc2otSmKLi8ZDCViq5muxBTdkGZoB4QxWXONPSt7gIW/wxu8lYWxURphZ1Exd3o987ic35l/hdzMCCJocvurQU/czWJ5B8+FIa2lTK41BUEl7JLYeipI5KeRyKSsIrueVQlNRRKY9DUUl4JbccipI6KuVxKCoJr+SWQ1FSR6U8DkUl4ZXccihK6qiUx6GoJLySWw5FSR2V8jgUlYRXcsuhKKmjUh6HopLwSm45FCV1VMrjUFQSXskth6Kkjkp5HIpKwiu55VCU1FEpj0NRSXgltxyKkjoq5XEoKgmv5JZDUVJHpTwORSXhldxyKErqqJSnjfdTgsSZrXOIxWbyniIqwdC3hqBEu2AOQ+rOMBRtQPkrWzCHvuPB+Oc+GbHtIgIEYqzuJhPB0bqHic2cR4AtxOq4G5yryX32T/R8wZwZDoJJrBb7gjlJDCZFppk/p8x8wZwUKZgEN8xDSUKbmTfJPJRkL5jDIiHmoai2YI6KtJiDcvfuXdy+fXtaklQvmDPtWb0tli7k79y5Q1599VWyZs0acuvWrenQ3COkrcpEgDxSXn2GOCbc3jy3s5vUWfzp1r7Qe5hpC5raYubmUQRC1yygYOh+4GeMONp+T6rL6Y2iuDKEQIyWj0iz3Ul8mHw1QusGWmJ9jwkokYFEL6No68iRI9FXYqyk6lBEEeV6yNWrVwn9i/ZDy9Lhj9rTKhhVoUQDhAocco6JQEjrYFSDEi2QmR7xWgajCpRkAxE7klbBpBxKqoBoGUxKoaQaiFbBpAyKWkC0CCYlUNQGojUwSYfCChAtgUkqFNaAaAVM0qCwCkQLYJIChXUgrINJOBStAGEZTEKhaA0Iq2ASBkWrQFgEkxAoWgfCGpiEQGlpafE+vwj3xFBrPwqyEG9CoNAjzWazhTzCZaGBYi+I5VvtuBMGJbjRajcsOJ5Y98X4Y33AFqufcOWTAkVs0EwfUIULVI002g76l+pP1FDcTjtpbqwm5YI4kwQEQjmpbjw3NeVHDL6+vl7Tz8jFdgR+3ydO+6eksbo84P+tCOXVpLHNETC9qaysjMj9NTc3B5oNsxcFFDeZ6K/zwTBaSN3UdB465cdKLEaBQDATa/9YgPnOzs6AfW3vjJF+q9n3jozlY2J33vc1Z8JB2qwWYgSIUF5H+v3z0eJta0Qo7hEbMdPeYTxE7GGcRsqPN0D160d4aYlEyo+9BRGg3CUO6xYC5BNL2w0Z62IZgZis/QGT4mQqaCvZ3U+sJjoaVJG2MemUP0kzxDIJeptMeS6xZxidJzoBFOCZlXL/Q/ER5BQ9BxNcaO24iG/Vm4GbFM9TLy09W4CV82Xk0i9H0dYiAF+h48KNuOOQ8eK36/kOt4dcgJCJjHnyRfXpGVhCq3RdhlOl/7cbtxIyBsSXloQlGZgnUwZ4COkZmQCG0HX5z4hXAnmlpQHMzcSCudEVlVabTdtzFy3A3BQ1SFlp/TxkZgvA0CCu3JDn75kYxXUacGEWDOy/2hqTtPr0TGTTPtB3BfID0/eYGKWvb2SjMGsx4pUgAhRxrLSju39UpjH3MNh5Bq0QYCp+Co/KlNJqsj5nHbaaBOCsHf3jnvDNmDr3Po3ivEXhy8SSKrmGCLsZ6ZI3Un5Yo5pKjHTJGyk/9sZGuCSmBmd28xh7KCzXYOzmcUoqevca5c8sU3Vm1YabTDjORfUzS7zN1uS/qY1leNZiWeUTvRZbNAti5lAYhMihcCgMKsBgSLyncCgMKsBgSLyncCgMKsBgSLyncCgMKsBgSLynsAzFM1CLUp0OOp0Ohsp2jIcL1nMJtaUG5TKy9XJQWnsJMk8kwtVKYNo4Bs7+F/bWx+v/HgZqX4LOsBftcs9WEhB1UE8RsM64Dmj4A+xhnHonEUzmwigkwHMqTYzbYa34NXrd8Tp9BCvMn4A492OD3CSKeF0ACIICpJWW4V/Qiha7ZHU6ryP6hLEHq39qxtoEOOYm5BUIgYLF/4jntgMNLX8MHMLoI8+mxSh9xjtvJcCix9WLppoKGPzDn05XisradgxMKgxWkwNor63EerHO+krUtg9gUrQ83o5KgwGlx86ip366nKHifZwdkA6udA38JtRUrPIOq3T41UltUTtPluCgy4XWHSsxRzL0eFw9qK8s9dczYH1lLdoDbIvBiN/hhq9xDLTXonK9b1gPbftNtFcWQFf6Adp7GqbLGSpQc1bSXtFFuJ4CLMaaUhPwzTCuSzSlQ1fT3xlRsGCOpDqAyR4cenknTs15Hb1uQp9kwu3cgzkNr2PnUfu0yNJakxdQu2sztnU8jgPO+yDkPpwHHkfHNiPKanokdVxofb0GtvQf4zQhIO4RHF96BqadVvR6gXsw2fsBXi47hTm7WuGmZaitn89FQ8lbONo7CszfgAOX2mARBJis/XD7hx7PtSa8lr8D7Uv2wemN+xJ+k9uFbca9aLr2QBqtwvY4LtX+FMZtHVhyoNfr3+3chyUdu5Fbdtgfo7966y/xrm0edpwe8cV4PAufmvwxBnsQn5K5HVZign+W41gbsQjStePpLMidvlmS3jwQwdJGxoibjLVVESFk9qB/1qTJShx0UqF3BmG2fwalWGcXsY345+R6g/Cni7MMA/xMRenzJ5YhN0ibJd8fi1gm2B8hxGtLOoPTVw9ifFNVZexN5fvbJbbXazePmG3DgTNDA/z5fYl1RFsBZcRE33fo8EWpzf97lG6/hhOdw76rJXHoKqATzqQfPeZv2A+n8z2svf45mpqa0NR0ErWVLyJ3R6O0oGT7NuwtrXCtehp5wsOSdD3SluVgFS7DMTI1iEny6WZwmYXYcMAO54ECXG8/5fd/DJUlG7Cj9U5QXcnu+B/R0tALYfVyLAlQIA3LcrPgkrnQkVgA4MG4/Q9ocK1EYd6jgSfnNANyVwF9Dqek1wfWhkKZgJCmq2WioLQYfSe+wKAH8Ax2o8v4AtaGu+KgQ1HFPyA992Uc6b7lFS6j9CDs1i1A3yBGgs8rnpsY/sY57Spky4lvhm9GeensweSlelQYFiC35EN0j9LxdjFKf9MEqymCKABcB0uwQDyneb9/oHAwBQf6ANeHB+EKTpbsu4JOAZIsxU2ZeWN6zC/4Ibb3HUXn4CagcwiF/7wVaSGm7mHgk3ew42wxbCOHsGmpeOTTk9tlADkhNaBfiOWrDcA3oVm+FANWL18IPZTA+et6BvDJ7iqcfd6GkWObsFQ8xOjJvc8FrJbzQdPpOaYdn5mfDDzKlaoE5D2MJctzIGAwIFW6I/bEEWliFNtiM0KLikNYRws6erJRlPNIaBlMYsRxGQgeijzfYfTm/TDlaRLthSYIfV/hgkt6QvVgcmQQfchC7rJQ/GGNTTrh6ANWFT4FQdISOmPzZtgK/kRv2wzo67oIl+RiBhhFb80L0JXWYiAgPZwx/4Er9KPrwreBPVuMK9cQ5kAOZyswTdKUwAyfeMUY+l0tOtc+g5ywJf0Ct55A3flr/vOPCz2H9+GN2gvBBv37esxf+zLee7YDb+w9hh4vGDoMNeDNbXXIrd6Dl1aEOwDCmPOL29pwAuf9gD2uLhze+wvUSscV7/jtnwl8ZxKTnoUw/ttePP/ZL7D3cJcfzDgGmg5iz9tA9f5NWBG2vUExzC/Aj99bi8/e2IfDPS5f++lw/uZuHMx9G/tfWjGjXqjg2nckbHYsQHHRchnjesw3vonTdavxZckyzKHj8rKf4fPHKtBss0D2xj8tD+YPbDhe/CdUGv4WOt0cpP/rRRQfP4/Te9bGcHQthPHfP0Td2i9Q4rWjw7KffYnHKj6EzZI/raA+C89XbscDep8yz4xPBu9Bv3QjDp8/jOLr78Awh/68tADGU5l4034Mb+XLvfYxbdK3NR9Pmt/H+ePFuF6Z72t/+n/AUXwYjtO7kZ+mIG+wKck+n/clEYOVzZmhZCX6WRoHh8IgWA6FQ2FQAQZD4j2FQ2FQAQZD4j2FQ2FQAQZD+n+TDtl1fQdO1AAAAABJRU5ErkJggg=="></p>
<p>Suggest, on the molecular level, how the malonate ion is able to inhibit the enzyme.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a curve on the graph above showing the effect of the presence of the malonate ion inhibitor on the rate of reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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uCwk2dHpT7441yO3Cp8wJEF9BqX1/qIh3Ltmn7txeO685Hn9K6V+q1v9rfGI8caI326vkWya/EvtiNY4hGLw/m1sa6P8ppdN0f9us6fLX7mud7YVsLZsq8vHNBjl09H4qfLdvQHzi3CZ2KjYnxbi27BwnNzN9y9OPmv/8brFl/Y4gU/fLCxPCow2OaHsbo2rkt9sAkDnuMWnN55Yguj+99Sn+rwRnfkjx0Z/VmzV9+cau0wX8rzLbvafu6lfDX3UCkZx4HyFvX3fu/3Xr7+67/+8mmf9mnTRxI+PvvUT/3Uiy/F00e2d8h8p0g9QdiTn/zky+d8zudMb4PCPEJilLHJHwPoaEDTuVbWrwF13IKhj+zG/sfza36wT/hRkh7BGO2dj7bjeXpbJX3cKo1j8W3ZzNss6Owd2Tu/JnOdJhu7EWsJJx7TS2fECGcs06sMpxIXMOa+pb9WZl+761swiocPjcutOHxp3sj/W3BgsBttx/PiXSvlVPZ8iacjGPmAEwfMW+OZ93/LODUu/Brtt2LSls9sGpcRQ/2IN3KazaiDiyXZ8qP+6odu83cJ61od+2K51u8ciw9JY+v6KE4Y7Ebb8TydrTJ/RrvxfMu2Nvr4HMfmKAYsnMJgu+RX/W2Vow+j3hF/6Jbv+QFrDUN999r6bGznNnBHzPSV5jjJxsbaJn2v3NMbMKSMi4UdvY8g/dshX5b0nRAbsN66RqSk86seH1H67Nq1L4f3S5C+J7CXwPTmmwK+rQ1aNktlNpKhga9uSX+prkSsTXLc4k9JquRPMYa7t+RPUtIfiSn/lfmUfWX4W6WxTl8Ji29tLue22kfpugUDxhhb2KONc3bx57qFT70jHNysYbDX5sgO1pr+3IelazjGVAwtJEt687piYc82f476wo4NvFsx+DbaNh5H4oHBD7aVcqI45/Ffu4bDtrziX3l/zVa7V9Wta6P+Lfzqm7Adz0fczrWPHPDBtXwVC4w42fIljMaAzVyucQKD5LdynL9zvKVrfeRneGEu6W/V5Qcfwgp7y25s409cOE+O4ug/e+fsj2LkC3+O2uY3DAcfHHLE9VE8NuUa7ObKLTj1z9Y5WcIRt35qKwblyIl2183lYq+EoZ/6am2v/Vp5z27A5kQjDll9tOPdsPmXNrUj0ibLpsyX/hJfNtfuc/CjEvmjHX9auMb6a+d8IDaTLXrXbObtMBww+HGriMtbqhbSMG/B6q3uYjuKwa63dvNDucT7FjY+4eSHspvEkl0LwVg6F09SW9dLpX7o1W8YXSs7luzVaa8v52Ip19dsrtWL/RYM/ecTjMb3Wn/z9uawuMZxmetdu447fvDn1pyP03GsrvU9b29sx7Ga61y7Fo9xEUtcX7NZap9j5NOSbnVxSXcpFnXXfJrrlB/ZKelsSbp0nMsP43Or6A8GTm8VfvDh1vxi78BHsbi+RcZ5d3Qd1F9+3BpLGOIQT3FUHolJLMaGlBdHcUY+6jusrscy/Eq6xTKOsfY9OOUVW3uLvXJ7Ru/t4Y2oN0+8cadq84O4uQ6ifN6tnr4Syb0D5pqtpDoiYz/69VakX0ON9dfw+OHVr0H0awzXfFEeEZNKnH7BZLPJB5hHfNGfGLxLiItbMeDA4I9DPMojE1/8+BCDn/jiKJ+OcONdUb+28TNwYwSHL2sSj/KEvmt8+nVZX7JmC8Pbzms5gzsHjIQffpGJD21j7qYzlvmQH2IxvmI5IsXE5r777pv48CvG0bdreM0PWM7FYlzW4l/DY1tewvBz9iN+wDX+cSdH+CFv4R4VY4vT+CjPjuCwiQ+x8M/4HslT8RhfsbSYH8Xgs1jkWN+NiaeteBoTY4vDOM1GvVjW4uEnnfIUBj7aQDX36W2NtXa+2ETCg+H7vc73Sn3wFRZOm6t7Meixjzt8ON9aN9aw48Z6KK7RvzWbpfpiwQV+lWvjsWSvDvc4tW7Jd77AUO4VunILTnNmr+2oZ87ghE/i4cfRmNxrzfvypXEOb+zPuTG0XumnvnxiZnw9o7E1RIxb4x3vdJyzf7P4CLLAkWfgXDehEVCCI1u9pB2FHZLbebNHtuPojWTEHfuTnPk511m6ppvv2vnoplBcSzZLdexKLnHDkIhHhS+wJJdJonR9VNiJAQZOcH4Eh236fLJxGMdtrz/GFg57E1TZhF3CoEuP/5VsiFI8eHWIC9aS6JeUY+UXXDmoNE5riwVbvrAPg77z/Fnqd6mufhoPvuEU1l7hb0d2xbEXgx5f4oIfYlHieq/ony+NIz/gHM334tEvDFLO7/WFnnESQ7bN3XjaiwUHBjt4/DvCS/3g2PyPp2u8lB/67FA3+gJ7LR5+aiu/Gt/GRAxxFDf5OpZxqA5mNkfyHUZ9sCdiOYLBRjxyYnzhbr6HPQHv/MMPBz/Mu605vwZpLNgT53w76kt5gCN+wDM2rvcKXWOjjNOjfuiLPU5glC9wj2DxHwYucAKnuJZyla5+2emrvORPvuAo37Z80RYe+7X7wBKvx+/KSyhvwrolYiIA8ZFfwuUqwue//KCr/qiwaxCUBpUPHnB3q3iXxYPpfIftqEgaPnlV4lWjBzpWdxTLPzH3Ua1X4rdgSEyc+GjXozmWxmuPTz4iNjY90LFx3WObjncUvNLyqJE99sVb2cT81//6X995iCrsLazRlq74TXivtt75nd/5DqctOGtYcOrLuVdpDr/8PSL5wwan3iGBsdbvFnZ8eNCm54C1eG7ZzNvKDzc0D3O9GzFn7ibX2cfHyNMRn9wAPMwVHzh1HMWi38M6zV9yFIONV+NyzMOcSTea6WLhjz4aj/IBJ55HNt6g5PCaP9lX6gYnckx+xAf7vWsBXQ9RtX7c8rDO4m7OeTzRLSIm66BclWd7/a+vOMNH61hte8sw5IcNBj9uETjigCFXbxU5xpfm7jjuezHxYYze533eZyrjtRzcg+Pdc7G827u9251510Zsy56/+nGY+zDGdTm+tzDSUVqTvfO8V37uM5G9FqfeycDJwMnAycDJwMnAycDJwF0xcG7A7oq+0/hk4GTgZOBk4GTgZOBk4DgD5wbsOGenxcnAycDJwMnAycDJwMnAXTFwbsDuir7T+GTgZOBk4GTgZOBk4GTgOAPnBuw4Z6fFycDJwMnAycDJwMnAycBdMXDP/wryrqL/BTL264d+xdYvIvyqws+/l35VSWdJwmHD3i8y/FJlCYM9nSXxK0ziFx5+YeLnvfw78is1th1s+cG/+a9Jl/of69g6/Kf5t3mbt5kwi2/U63yJm3hRjj93dt0vZrJXrvHiVzEEr2wdZI1fbbDwSSc+8wPeGMuSL/URl/jLP7Goh4Ej9UsYk5OvH0/nMBtj43tE4kA/zovpCAbd/O0RB0pYRwQGETfbkY+9OLiIQ5yU6+O47MHii7wg5Zi6tTnTuM6x8WCMzZfGki9rUi6M7bAdxgdefa3NvdpHDOdzjHjKr7l+NtrFroSBV9fKMPi95Lt29dmHiVttMJUk/Oli9ocOjGLmh1xvjGbqi5dsHKRzY3sEI+DisY7xDU6+pXOtxF+cwWHPr638mGPCYCM3nIuFb0cwYLIRh6Mc28LI79EftvrXJt+Jc+O6JEsY9Njyhx+JGI/wy97BH7blGR+XhK54tdPnW2upsVUPA8f01mJKz3iEsbZmLPlxbsCWWDlYh/iSxUAZUD9pfeELX3gnMUfIdMc65x5dIQkNoJ/V+rm087XElRxLko0k62GdfJIke0XS8dMjFzxojz28tYTewvVTdlgei2GCePyHRyAsyRI34vdTZ/zwhXgOmAnDr7ms8ULvFa94xcQpnSbPWkywx0lIz+TEo4c6Giu+deBnLuxxGXdiEOOrXvWqiQN8aBeLcVvCgKlvB1sHO4u4PDsieGMvBn15zAj/1/pdwoahfzjk5S9/+Z1FbEl/rS5e4BhffI6L8JrdWI9fvns8gEcV4MQY4XJtXEf7znFgvF/2spfdGS914lySYp+3hWGc2cIQ51JONqZzjLd927e9vOhFL5rGCE56a/N3zRdz1zwzXvp3wFsba77rA3fO2XmkBj5dGxul/vJp7rtrdvqgS8xZY8MOF2y1Gbs1aU7w1/mP/diPTb69+tWvXjN5g3r4+uSLw1yxBh39bydyS+x8Me/xKJ6lMX0DJ4YK9vzBqcc3iKub/aC2eYpbY8SOeKzOWo5uAekbH+KSI8ZEnOGOtmtj3fhZyzqHu8bLWr1+zX/3KuOkP7rKvSIOfYvFIb/wgi9zcC5ynH6bLuPiMSU40TdbMeEaRnpzHO3GlT4Mfel/r5wbsL1MXdEzaAZM0hhYz6x5+MMfPiX13HQtEdmZAErP/7IB84R+A7ska/VNSFiSyrNz+CVR9kqLFtuerVJsezHowfGUYr6KqYRuws6xlrjRr0XLpHmXd3mXycQ57KXJtcaLRQ+fv/E3/sZpgpqk7Nd80ZF2PhkT+ji1CD/wgQ+cJp36ZAmnPsTg4DdM7wZ6NhJs/jaBlzDg06ELDw4f3Nge8pCH1P2uUj98xp2xcDPCx1FhyyelmN7v/d5vWqiO4IiFH2J2Q/N8Nngjp3vw8MIH88UzjdrMLuXGGl58uBk84hGPmHima/FdEn0uCX7NM5waJ7IWj7iXxpsd/Ic+9KHT+oEnx9r8XfPlJS95yTR35dqIsabPV23GtVy1jnnGEz/xql48a9ziMfv69Pw9c98YwYGhDY5ySdTrD/9x5LmK/m/vUYHFLznWv6g7glHs/LeW4Ug8a+Oxhi0eWJ7LZk2Fxzd87RUY+reu49EzGpuLezHosbVBt3Exvvzgj/q58LkxGNtwarNhDfmAD/iAKSfkxVpurMXJB/cZzzSrf9jz53SOfc/PbaytzdZlGPImXsIcbcQr/+gQ5zaActWa2jzA95rf7OjJA6V+bIhh7JX9I78X8c1QD/GSTpIaWNeS2WK+lIxrA8peMsOQGErXSwmE5iVs9fpl0ztXEgTWEeGjoz74JqmP4rDhi3hw4iBrOEvc8KGFRyyuHWsLeD7P43VzNFH40FjRXeOXfX2lz7aFFM98SNZw2BLt8JqsbOO4uNd4Ya9v9nTYWqRcH5FyoXHhS33vxdFnvvj4AK/wjuLECx/kR3ys8bjkH1/0TSzkzh042uJyjsVGHOVp4z3X63ot1mLRd09Ob9yzHcu18VOvj2Ibbebna77IUzjGnPAp3DlG17DoyC2iZIePcLSvjVH+sjOebI2LfIEdr2Eql0QfsOoLr8ZnLdY1DPYkP2x+jmCw5XM2rcuN7VK/a3X4izfc4GQt/jUMaw6xWYhXOOGu2S3V27CIJ0w6azjxOOLghL01wFiJac2e3RKG+nIsTtI7wk26uDBeCazxunql+nLUNQzxiEE82h0wwh/tneNAmxIWXe/C75VzA7aXqQ09CdSCU/I0cF2P5kt1tTfQBhMGqUxnTwlHMvIr2eo3nbGEwaZD2y2+sBEPGTHHvjpf8pGNBHeMMvo11q+dN0lqz5drMY39Oqevb/aJ8yWcUYduPtN1mOzqlNWFuVbSH7HW9Nbqs9feuCz5vmbfIgsHHw7nRzDCxo+jxUv9LTjsuqE1FmOc9bdV8kEsjdmW/VqbejhjDOrG6y0ftNEf8cfzJdu1djcR8RAx2cTMb1BLeOqya2zTqy9l57WNZW36hTH2Wxv98Xy0dz6uqY3NER5HPH60obsFgz1fxdKauuX72Pd4zqZD/S0Y5h8+cEr4djSmxkVOFBusozh8yI984dsR0adjzsX8egsz3Uq6S5hhtIaJPWnejhi1bfECw8at/uTZXvn5d7S9Vqfez2NAApqYBtXh3GAamHGAM1qq08bG5JYAXpXAhbemv5QocKr3cRu87Eu6/NgqYTj4JJ4SsMVny3ZsY++VHwzCB3VrvuTriEEXH3Bq55v6rkf94h/rnHs3EcbcdismuhYpPuvLuwp8qY/6Vy7FRG+ui4smafaN+xIG3+s/LLmx9e7oPPau80d/xjROtzjIthJG9rjwbkB16ewpxYRbtn3csMbjGh5bnEkSU9AAACAASURBVOFUvhOYruN2zXasxwVO8UHEdzRP2bFp7hbLFjfa5gLD0YKuHdZaPGv1OBjxYZKtsXYjibvWNdeJvmAql3JVPf3WCzry1LtX8NSro8cf5ZLQawy0Gxc5suX7HIefox/+rVO4c92ta37yWWls5RdZin8LJ3/m/GzZzNv4r//G5hY/2IilOSeOfFvjV/tc1OEDr42juiMYMI1tuQHHkU/zPteuGxv9s88PfOXbaEuf1OaaD9ZlZfXKrZwxFvwPj6183ys/N7P2Wpx6iww0QTVaxL73e7/38mEf9mGrybgI8vrNEywYBpNIpiNSEsJJJNERoW/RhGWiert7XIj3YkngFlJJGk9rk3QJNwxtTY4mhnKv6BOvJkh26ta4SSc+u1ayUd8xcj36Q5eOdqX+8Oltan60mI86o/38fOQPdhN/rrd2zcYigwd9GleL6BGBIRdg4AFGi/kRnGI2pj7GUJYjR3Bwwva+++6bYsmvIxjiMDZi6YaylRtr2HwRi+9O8YfAxtleoWvuNS5xja8j4sUCW3Z8ILhZm8eNq5xkQ08sNrZ4MTZ0imfJH3V4oxt/YukFRzaVa7xUX5/NlyPxw8gXPouBH3ExxzJ28rg84rc6kr/OYbrpKpcEPn22fHDEGX31xlY/OHbwjY14y2XX9RuOfo1P81c8+QibffnfeT6G5Zo//C/f01FHr/bR9/wZcfTh+6hyxHm5A0dc+QZPeznpmq5Y1dFzsKlvPhW3tvim0zndOMhXdnRc03OMnOiXwOQTsRbTMyZ+BIMXXLNzwFoS/RO2veHxqZ/6qdP3v5f053XnBmzOyA3XBqfBVJpc/rHoJ37iJ06DeAQSlqMEkOwlyREcCdivQSSXJJfse4UPEs/C54urEs013COi3xZg/UtUMR3F8eVG3Pryqwnk3MQbF4NrfvHfF/F9cVV8TVLnS1K9PpzrszL/jQ1uWniWcNjjQPx0lf5pq++j4ENdcdTnHEc/+o9LC4VrY3tEjIf+4PGZH/7Zcv3vwYoD9sbAF2BxejRP9QkDH75ULBbY/NsrOIhTX5Duhx7VH8HRt5vJO73TO03cHsXQlxzzi64HPehBd+af9WBtXJf8w6MvSMcpP+TJUX7lupsJO/1fy3f90BEDG7ziY+RUmxvTWjzGFA77ct4mrg16eaZMd4kDbfWh7Iv8zbslm6U6+vzhNw6JnF0SevKR6FMMox/y1HpIRzyul6Qbd5tX/dK1pssFeerHBHzCcRtcfvluF3sHf/KFP3D0y8Z6aM74gYW6/OUfHHXsjYF+lOa+dYP/SnlOfHFdG//MQb7C+I7v+I7LM5/5zDvjAI8P+iIf9EEfdPnsz/7sKR4/jtJHuSa+F7zgBZdv+qZvuvgVPJ/FpA/n9PwQ4bf9tt92edSjHjXFjQfjxT+8OzeX/HiCf2LFH14JDHWto67FTdg69N2vPfmvjv/x6doLLlzoA7YfBIiFn+XDa1/72gl3/sf8wBkb8eHfj0X2yrG76V7UN0O9JotBk9wW4Kc85SmHmJB0RJL7aa8kbpIcAnr9AiJ5JZjkkEgS9Kj8xE/8xPTrst4VOGpP3yM19C0W/uCqWPfgmSz4YOOXcq6d4/qIuKmZjH6xky1fOr+G1cQVz3u8x3tM6sZqyz5f6RW7iW7TEoZYHHTXJByl/sThBvvgBz94zWSxXrxhWGz8uvR93/d9D+VG9koL1Utf+tLpF3sWoCNSHrhB4NQvGOUJ3L1CF3ewXvOa10z5gZ/q9+LAcPOT7zh1EzJnjNkRMff/xb/4F5dHPvKRk19HbNPFh8eD4KNX1fzbyrNsx9JjcMyX8ZeDW7xo00fjok83HhtBN2RtrSNrOGzo0M1fc9cvfkehR+AsCR9ar8ydH/3RH53Wj34FvWSzVMeX+nrlK185YbhhL8no+8gFP/gjHmuIc5uHNd+b67Wb7/gj5pxHaeCjsVUf560Rz372s6eNjfll0wJDbtmIwvAr28/8zM+cXhyP9s75+bSnPe3yp//0n5585Af8Dtc2T+5P/MKpfE+PD7ig751cmx56dGxwbDhc++Xz4x73uOlxSzZR+oUhf7V/7Md+7OXjPu7jJiyxwrRGsHdOR26J0XpmIwijeYdHeHQ7+FReONfOxnrq2j2Gn/RJ9mHlo3Z1Yan3YpQffhXKTzowy/kJcPan3KCHN35Yh/bKsdVlL+qbmZ6BMoAG1LmElYQWL4O3V2CYaAbS5snEc1NQf0QkneSWUM5N2HCP4EhkN0ZxeTfNAuD8iODDqwSc4EKi8uVITPhoEycu3LIXG7y9wn8bDq+aWiSaZEsY8Amd+lJ6VcVe3yYg/4yVcknU94qK/ziUGzBaAOCKaS0eY4E/3FkccNrz1Zb6XKuLdyWfvLocbwRrdmO9ePiNT6WbQq9CR71r53xoflj4YMlVHO0VfOEGf2KBabzKkb04xoQv5p0bhGtxro3HGq6+8WEhlhON75F5w0aeigUXfIDrOCL8gGWjDqP8XPOlHKxkY8NBH47cUyf/Gre5P9qLWX6Z990c6RZD8dBfEu1wygfzxTVOj4jckAti8qtwfiuXRD7bcNCx0XCNf/Fah+WFHKutWOZYniX3wz/8w5Pv3qnCIR+884WLxz/+8Zev+7qvm+rFZJxbI2CbC1/4hV84YZQD5XX+uH70ox89vQvWeIox321m/uAf/IPTBs0YeCfUPLcZby32bo18d41X9sUkdl+h+YRP+IQpf+YxuuYDe2Pzzu/8znf4Eov7Bd68yKTXfGwM+alfm3M50L1KLNrYsJdz3S9cs5dX5Q+fG1s2/K7ONWy6ztk610ccaO/a+FhXccQHOOzid4kDmDD4hsPuDUu6S3XLd4wlzbNulYESpAGWBCaehW9r8OaAJZDBlAhdK4+IxDFRvUVdMvPjCA59yWpimFAOcYrxiLAxGSU8XvhjAllojojJYTHFDd+cH43JRLH4WkxNFlg4Ub8k6pvozh24FQ8RC575os75XBoLPLDXpzrja0HHp2uHvpRLAtsiBgeXYjDZLapHJM6UDou9j5jW+l3CFrc4LOD4g+EZXEfyC66cEhPBh3dZxXUkN/gdh/gw51pklXuFH7D4wQfXYsy/vThx2gasnDjiC1744XCO1yPjk6/mPwzzjcSTPFyT5oN+jbP5Ylz4D0e7mOThUkz40q7N5slY4hMeUZ+dcisuNn00LQ5zzBqyV/hqDPmtH3nKb/NuSbSxef7zn39ncyCn9Kl/fPDHd3xscNbWQh+7fc/3fM/URTEqm/v4sCmzBumPGBN4+lJ+7ud+7uUP/aE/NPmKf5w6zH26eJbr4wYTX2z57EXmR37kR07xxrGyGOhZ23Fqc4YjL6Jc89W18dOHed6c1EaKCx/iEBN853TFgU+25oS6YuQzX9nQg4Vfa5m4XPMTHj/ps5WLStdEe/7Acq6v6sZr59Wzo5c9TDmBN/cZ3JUz+hJH+Tt1PPxhS9LTx5ruYHbn9NyA3aHi9hMTw4A6mlBeSX3gB37gYVADCsNE8/bsLR9BSixiwZHQvuNDSsDp4sqfMLxCsdiIkRTfFfM7zXAsNhJUPK7FaGLtFfotQj6WIUfs68diYmIbF37ER2V6lfod21zjUzw+54fhwImxX/Kp+nTh8cFi46Ou/Kivsb/8UNKrpGODbwH1McARqT9+WSzlGT6OjCv/LTIwWkBhtDAe8UfcDnmGD+dHfKkvvriRGBf2azymv1S6mYihB/Xe4ofF2uEhzOwdR2MSi8NHw25c8uoohvjMWQ+3dGMdx30pT+nTSS/+/OcIH7e1eeBHYz/yzI7P7NSHpS//KWFpXOqjPkd7ORZ3+hOLdcy6Sp9k77yc9NGtG6mNhNKNXZ47F8vv/J2/8/JbfstvmeyX/vh48C/8hb8wbQ7kgpuxOSJ+c1adr3R492lN2H/e533elI9sYYjBYTy9Y+QrKjCJOPK/m/37v//7vwH8GLc1yOYGr+wd2nGGx3FsRqAw1OEDTz00uHEbx5jeWr5os2GxeXnYwx42cVOeiic7vlWvJNXR4YN7lY/LtReLNv461DnmUpsXPLiTI+zoznko9rENXhh8MFesqerqH47zJYEVrnbvOuN1r5wbsL1MXdEreRuMyitmb9AMhxj0uxGJIZnHhD6Cx56wF0vxHcFIF0bxwFpL5vTnJV9sfODcjcDIj3jewtOvg8+d82H0Qz1Zi6l+ygf66ixQo9THWLd03jiIo1iW9K7V5a9XesVwzaZ2NxISJxa+uxG+FEt8HcWDYXyVcX0Ug90tfMz74Yc44rVyrrd2zZYfpHE6isEWp3FRfm3xO/aRnZu8TUdt87Gn54CrrX6aJ41Lm31YpBs03PoqVvxVD8eGxXfAbNI/4iM+YnoxVr/h6Fsfn/VZn3V5znOeM23YmiP69LGSjZCNsS9+r4nvZnn3yqazMWijJM+98JnP3TmWjbNjLmLBE38c8UYvXnuhO7d1HSedw4iz6pRjnetRGkd984euumyclyPVjfbzczh4Sjf84kk/zEr12ajDaX6MvKgLM6yxrM1Ywxjxiy/9dF2H25ikEwYfknks1Y8lPDbhjm1b5+cGbIuds+1k4GTgZODNhAE3HzcRN5xuVt3k3ai0a+uG6QbqXBvpRmwToa0brA2MzQ97m5jau8l10/SR19/7e39v+l6R//3oXQ0bHt8z8sVm70D5YYF3w/XJR/614eWbL4U/5jGPmd6l8m6Z7yB5F8onCd4x9o7gmhSfd/wJPDHMb6z6szHlzyknA3fDwLkBuxv2TtuTgZOBk4FfJAzYbNjYtOEYw1JvQ5LYNI36rm2IbGJ81O/jXJsn383xpXQfM33Kp3zKtCGyCbNxauPVO1U/8iM/cvmqr/qq6WM6v8zrf3v6gjccH1H7mDnRH1t+tCH6oi/6ognXJqnNojYf/fFha9MEp80cDvIvPvhs80hn7Xtk+XaWJwN7GPi5GbVH+9Q5GTgZOBk4GfhFyYANzbgBc22zQdqc9BFZmzH6NiY2SD7+e+5zn3vnY7o2LnDo+J6Q7ywRbW2eYDse+9jHXn7oh35o2txkS9eG7XnPe970/R7vZI1tbQzzq02Ta/ikzZ532HxncU3yE76NpCN7PMz5WcM5608G9jJwbsD2MnXqnQycDJwM/CJmwIbDBsZmKLF5efGLXzxtqj70Qz902gzZfNkU+WjRZoX4+PFFL3rR9A6R71F5ELXvQflitXetPHvPO1j6YNuPC9ja3MCxafLOku9yabe50qbex4n9mCg/87WNEyw2o//qbMTYqO/7XOrn0rto6sU9yngNq83jqHOenwwcZeCe3oA1EU3AXp2YlCaHUl2vgky+Xjkp1VtIWkBG4mob6/ac6w+eyeqAM18MruGwgcM35S3CB4e+cWRRugWLHR4dLWC3+MOPuFni+xpmiypO2RfLeH4NQzu7eR6Etdc+PT7pHzfk2lgXP13nvYMQ3rUy3vJXWd/XbJfaywl8xO+S3lLdyDs/3NTEP96kluyW6mBd427JbqybxwJTXEcFn+zGdeUohljwwSd4jdcaDl/jk65zG5Tewaltzb56/dZffCrZE2U6+abeuTbfsfq+7/u+6QvvHkbrV3Y+RvT8PRsi71z5fpZNEBv+8Vceu/YL52c961nTxsnmqQ0UHV+etxErX7WNcbXWwaFfe/3Q5YtfNNqgtQ5oLyY6jsbd+dgfPd9DY7MmfaxIp3kRho0gP137Tln9rGEt1fMpfxvrJb1rdTDY84Wvzh1HRQzsbsWIJ+PhPK6O+tG4iYvcDQ6skYv59dw3unSI8R1za88Yxx17OA44e2W/5l7E+1GvQC2YnesecQYTOerHAbGYqEO0t6NNpqTEHrFqu1aOfZisvgfxkpe8ZFpMr9nWzie2SouWn/h69VhipnetFLdFzCs633vwJdajSV0y8QFP/SKoZL3mQ+3Gws97cQrLzcW5OPcK390U2FmIG1cYR+ISh6dhtxDLmy0Ra7lUKX9wgVfnbkT5wK+5zOvS91NlXDjoGOMm/xzDdeOBA7nWDUlMR4StQ58w/WyfT3M/tzDx1rsf7OQqjKO5kS9i8ku38iw+t3yorVjMYxj4NC7G66iISyzmnNxyDf+I8B2G+ZfgaAlH3PTryzk9/Zuz6sVxLRa56KM5scsj+rA9esFGyuYKP9rp8k0/DmOm9P0rD+60wfIkcIfvYTl8B4uOjxltyODI1SW/9MsHMTvkiS/T9zxBNur1uzXO8cLeuTxlB2uv0Bcrf/nvERM2cfLkiIhVLshxa5lz5dF1WcwwjImxtT6TLR6W/BQXW3jGuLV5SXetTp/Gkh+4gaGEuVeMJbvWEJiN7V4MevqVH8aGPb6N2RFe5DVbc9/Blm+wlnCMYS+UjCMfYPjeomu2xqr1VV4vCRw84LE55t6/V5ZR91q/CfUiTcJEjgFARJO2BYKuc6UJqaRncAgMdS0eBnBcQK+Fqd/s6Rpwr6YsZkuDv4ZHFw6/YPofjI4jk6J4JI8F0/cevH0vwY5IfYrDL4f4E/YRHLq9anWTkLB8CW8PVr4bn/4FCK5g1LYHx6bFuHs13phv2dGpn8bGhDRR3ZhMUj5pI0sxxWNtxoXP/PALLeOdrRxNf6qc/dFWvBZeN+r+ndFMdfUyewoWOQu5j4y2+p2DiaW5ZTxh4HTEntusXbPBn/494w0ft+A0Z/hxdPHON+Pp4IcYy9Xa95TiMO9wKo4tXrU5yh/6Dv77sjg/rENyTN4pl4Sv/Lbw2xjYpPh3SDYcNnJubF/yJV8y/WsYuQunMdS/a3PTiwL9upGU7174mHP8MjaegUV/jZvW2WIzLuEr4eqbwFwTbfpovrgxWoe8eNorxaY/eOacXzj2TtdenPKT//iBg6+jwh98wDO2xoxs8bDUBxxjajysQ/w5Kvo0VnLNnME13CMiDnPfPabnkTW2R3DYyDlj4xzu0XXAi/vGl63YxKRciouu3KoNH+Zt8y6MuIWzJOVGfcE4Issz+gjCm0gXIU0sLkSUzZdz7z5ZbCwYEkwdktX5GTPxbBmLlsWSDrH5qn2q2PHHIDhIA2qS2/gclfw02S2+brJh78XCiwTiCxzPwFlLoC1MGB4sR/jSYrhlM2/ji40P7k0yPlmEjghO4tgEcS4uWHD3irHHAz/YN9nXMGpX0lG6Edr88CNf+KEN5pbkr3j4YGyrw7W4tnyBrZ2uRc+k9+DAI6I/ohSHPsVxZExGn3u1KXbxHBWx4NS4uLny56jg3sEvvLZpOYpj8cQvH8zfW3yBIZbmCx/24uDCYb7i0pEfWxsPufCJn/iJlx/4gR+Y7I2lOGxYPuqjPmr6Z8cf8iEfMvmEH1wVp/7415pXfqjrpsKPIzGMc8G5PryQlCNw9OHYwtSufzb5wecj+Q6DDR8cxsVxBKMcGtdlGMZoy//sxjI/+GUtNRawjgo+rWV4cb8rR47g8AW34uKLNQBXR0T/5r8Y2MMjR3FsJnGZD/F6BAcfxDxh5zAvxJZfk8Lr/5QbygQX5k58iiu9dOalDahxrE/XxmevbN8x9qK8ifQEijCvJBCAbM+P8VPm7/zO75x25zZBX/7lX375A3/gD0y7/RYaTyv+si/7ssnWz51//+///ZNOX/Q8GtK4SEhug6ksmfbiiYcdEdNR++zgOMieRJoUZ3/0DQOvDv4cFRjZjedHcEwghzgct0pxxAu/rk2wpb7cXPnROInLsSTjBB95qL66yiUMdfrSJz1ciGFpYVmzH+thOODdgpOvYm5ccHuL8MEC1pjcMmfinw9w4vaoP+JyQzO+zm/JDT6ICS/8Kke2fMlfdg43DpvSMLxItEatSTeMRzziEdMT2j/6oz/68pt/82+ePm735XebBX1YJ+GTSj56FyTe1I83kD5NUEe3sV/zJdy4cx2f2cbtGkb19Bx8a+7WdqSEcbd5yr5xgoeLo5If4onvoxj09c1ebilvkXy5G15xEq/GGWYcHfGpeQuL3IKhf1zgBi98cR3m3B/tSeetPcWiXZ3rNWkT3fzQ35ExuWc3YAapDRhyDKLPoj3lGClf/dVfPb0Dpe4rv/Irp3fCnvCEJ0w79r/9t//25a/9tb92+TN/5s9Mv9Z5wQteMG3GfA/i277t26YdMLy9YpD40kCycz5e78USFzuJ5LzrvfajHr/Y3yr8gOEgt/hSDJK4mG7xB87oxy1x5YuysbkFJ/9hjFjVL5Xyo4nNrv6XdJfqWgTGGPB5i4w+x+ktOGxgie1WYR/O6NcteGK5Gwy2HUfHJ3/Zx2lYyjU8ug7j60WczZZ/+OyxC894xjOm75Op+yt/5a9M79TXz7z8O3/n79x5RzUffK8mX+jLFzeIxmuek3TyOX0bwfwvhuzmPnRNn6Tfde1j21g3no82zjtGnSPn7Ecujtimiz+H+OEVX+17y8b8lvlbv3cbT/bKu5Fw7gaD7eiH86Pc4rRxyRcYa1j08T+2u1avrrFxPuqEPZa1K9l782Wv3LMbMOTaaCE9svwM2hcL/+bf/JuXJz/5yRMH9NR/y7d8y+VJT3rS9J2IP/Wn/tTld/2u33X5E3/iT0w6/js9LP+B/p/9s3+2+a8qxsWnQdSHV4oGQLtzC2rteweDvUW4Xbu4SqK9GPRKhGzzWf0R4T8MR34dxdAf+8ZoxDziy6gbL7COCB464tg4rcVUvTIunTfB4oU/cItx9Cnb+mEz5oV2B37pLGHAYzcKGzjKWyTu4JYfe3HYFo/+nd/iS1zon4gd3tGY9A2LfX7w6YiwH/1xvuWHdqI//XrXyjtRXv06r/94Gn3p3XEv8uDIxW/8xm+8fP/3f/+06fKRvb79k3T/l+7DP/zDJ+wtf/r4F56DT97xig/9q6uE5VrZK3Z25cKYj+r4OOeZ/lzUFXvtxRtX+ZTeHGP00Tn9bLY4WMLJXinOcNZ0l+rFwU6pf2XnS/prdTDEjHfnXa/pL9WPvizl1pLNUh0fygd+xGt1SzbzOnb8KZ5sw5rrr13TDyM8urfg8Ck/YK3hjHrOCbs47X4Hw7HmS/OlvpT1P4Fe+XPPbsCKq8Bd970L31tCahMcmT5fJn4BY5PmVz4tMuz8c1Q2XjVuSZgWlYjmw3gTsfB55ZjuFt7YBseibLD5UmKMMY76W+dsOvLjKI74HOwqt/pcaxNP/OTLmu5a/ehDvFeu2czr3UQswm2+tDeB5rqu87WSnfOx325e6cxxRs47H+3VOeDUPsdwPfpJr1i2bJZwqmPHD2VHbdfK+iwOeRrWNdt5O97gie+oH2HFPXt+yLd8TGdvyTaf2FzDKXabL9Jaw84aYZzowBQj/HImn7xA9AR3XyT2fVQvFG2+PDn+N/2m33QH95ov4VWW69npm3Sd3lgWe3PEdeNceQ2jeMPlRzj6dn5NxjGkH8aW73PM4mXv3NjcTZ7ChxPuEV/Yxh+7/DiKEQ67jnnce67FIB/L3z02c53GEUZySzzFET+3YI05kn2xLflUfo99juNabJVLGPpxv9aPj/FhmvPO98o9vQFrgSvwRz3qUZcnPvGJl7/8l//y9CsR3//yk3CbLq8wJZx/i4Ewv7iIVBPTQgeHbgO3RGKTuAlER102BrFB0984wEt48zr2+eW8pJjrbV3zhWTPDz4dxWIXRvFt9bvUJha2cEaMI77kQ/j4juPq9pTsHPD4NfdpjpG/lfiYj2lYdBq3EUe7HNBOnKsbjzjaGiP6+ZGta+e3SHhsw9uLEwf6d8TlUV/M3z7qhwN3i4M1//JB++jTmv5SfTFU0smfJX398JW+OBpX1+wswupsquj6MRB9bQRXctHGwgNKvWvvl3F+DETPOuTxD6T4jvIbF42vMqwJePan9vxUZpsfyvJZrHOBH452h2txO48ndc7XJJz0x7m7ZjOvj1/18Ebu57pb18XJ57A637Kbt/GhmJ0THB8RvohD/45w8nEvFrt5DPPra1hL+nCP+lIcjU9jfgRHv2NMbOEu+SgufbUJc81Wvqh3zgcYo09LfOQjLGNpPremLenP6+7pDRhyIwBRft3i1aMHAv7Fv/gXp3fE/MLiYz/2Y++8w+XdMQR5R6zkh+OLquz9iqkBmJPlGu6zn/3s6VdD/aLSAgxL6eMHvvg1ho8S6mMJa15nEL1z1qs97T/1Uz81Xc91t67F086cL3w6KiWupMSHGwrfjgpbYyQ2v5iB492CQ68SXv8ugljGdxcb+yM+jXyUP2tx8d34sTEhlXTV41QMMHx87bzFde4PfTzyty8k04cFE4Z2fa3FJCfo0HXggW6//pn3uXbNlh1f+QCzj6rWbOb1bI0l342rI6y57tY1P9q8iB2ma3hHRb7zh33crHG5hM3/eGmMG/slfbrG1S9JvdAzrvxX51EQ3/Vd33X5u3/3704PN7UmfemXfum0JvDPWNJzEGvRb/2tv3XiUF6F65eD9GE3Xku+rNXxUVzWIeJarq7lO53GVCl+XPIBjvjkj/FZy3VtY54WqzzVBlN8cNYw+EFPn+wJH9gcyXf65Tcc/cM5gqFvdjjDnXP+u684PyLsrH3lKV+IcdkrYiJs4eAonL0Y9ODgBIZf7uGp6yM4YoofvpiH+bgXB0bj5Jx9+bcXIz7kaLGo4xusuagTLx38y0V2+lZnHpb/MNZyVczmLxuH/tntlWMZtBf1ftJrk4Eck+MHf/AHL5/2aZ82/U+xr/mar5leWT7zmc+8/LE/9scuX/u1X3v54i/+4mkilSgGG/klHvINwhrZwvrH//gfX/7+3//7U38WJ2SXMNr7laUvznoUxtLgr9FjoA2guDysr59u8++I8Mf30PjAx1sehwEDN/yAQ5ocR3wRvwVPDL6nIj43FDzvFbx4RpHSzaQkP7Jw6csE8aMMOPoXD1kbb+3GVwyV+rZgeb6SPCJtwNYmHhx989cCrL+Xv/zlUxxN+vJuzRe2/FA6LBC4aGwmR3b8Ma76gCE3/GrY9ZE8+ZYs5gAAIABJREFUFSd/HfLspS996TSvYB4R46Bf/fviuRcb4oJ5VNjIEbkmrqO+uMHKURh8cpQnS76UG8bAx4Ve2Hng6T/6R//o8j3f8z1TbtHxVQdj7pE31gZ5QLQl6hzyCLdKz/CSa80d7X2NIrtrpXfRcNrmtHVha6yLW8kXMbUpVMLA01qeameLf4dx8ZUP6wg+YYq9PFyLQXvrNDs5hgOx7BX987M1x6chxsl4HBE+yw/rlg13Y8GvIyJuY2gNgtP6cSRXYdC3ATT/bPZvyXd+sxWXNx2MGW5hHhF945VfsOSu8yNirK2nnvXGthzC+17BBzvrIT+Me/mjfi7lOR18GktzLT7nGGtjJH5jCkef+oKzV45l0F7U+0FPoEiJXAPnX2X4aPGpT33q9AwcA/hxH/dxU8L/+T//5y+/5/f8njv1Bps9O6XFBXE2K2uLi7C+4Ru+4fIVX/EV0yLkWsLqx6T0rpdN18d8zMdMfj3ykY/cxJrTpF+JoXRj5IvF/ajETU+e97C+kuMIFhwLsAcxitER30dwTC62PlLBF74dR8Q7lBYID/yT9M5hHPHHmFt8jQtp7Nd80c5vZWNjMcerB6DGMx0+bW2U8zM8m9GHPOQhE3a+6GNNsk9HLBYL/2/vVpHz+PDIgjUOlrBHXiw8YvIIhCM3R7iNHzy57nuYcbrU71IdjMYHp/4HYddL+mt1+sWHG4j8CHeNlxZwdt/0Td90+ZN/8k9OL5jEYJ3xj6Uf+tCHTi8CLdA4skYYP5itG+ot9riDWb9w/fNqN303B9eOI2LD5yNNcwcnjrDWcIpLyTcPHBVT+c9ujRNtzW+2+iM+WTBf2rhVD3MrJnyxoa9Pc//IegibH/GKD/cHL2yPCiz+esgtPDhbvi/h08e/+4SNeZhLult1+jf38eNZb3C2xmQJi40XG+bv+7//+9/BUH9EbHzkqK//4OcWsabi1UfwRCxHuWGPj3Fdbo4t+SSnxtzQp1jcq6zL+q9ducaLerb6IsbFw4v3yj27ARsTzs3PKy2vKizAfXcCCSawZNfmkCgS2IAZeDcgC++P//iPTwuhhN4S3+VwzMVAOGAZDAv51g15bt+1CUpKHoN/VEoKJWnRvWWChCEW50cxJDq+jQ/7WzgRA9uSHLfj+O/lB8Z4E7zGrVj10xGXYopTddr5tCT61M4mXWX19aFuPJ+Uhz/0CSzn8XothgFiOq3fsODAgLtX5n2af/iY1+/B07+ckCO32OujnCyWLR7pt+EZ7Uac/Khd3sHOV+3Ocen8Iz/yIy+Pecxjpg2C9eQ5z3nO9MtFnDZe8MfcHzer5U79wXW4Hm1qh7VH+EjYOXC8haFPwuf6ZVNdtkq6SzmjTntcTcav/0gRV9odxVf7UjmOQ3O/uiX9tTr9scvnWzBgF5M1hBzFiV84bPl1VGCwbSyO+lB/ceE6rNqOlGLAR/kitqN43fPuBoPP+ib651fjvhTPyFu67OVZa3v1yi3B5Xh/y48tm9pu27Jm/SYsBe0QbANn5+pZXk972tOmjZCF1rtaPjL0RVcPWfVuju9bqLO4eAXgYwSPoLCT90q+RedNGN7Z9cnAycAbgQFrgg2PdcP6kVi0zXuLrRuKF2v//J//88vf+Bt/Y3qosw1TG392FvAWce/MPPzhD7/pnZX6P8uTgZOBNz8G7tl3wCyCFk2bL7tW577/9a3f+q2XT//0T7/41xvefv8n/+SfTIupL8R6C9omyxfpvWr1Fr+PGyy03gHzfDCbuBbWN790OCM+GfjFzYCNVBsvm61e8Ra1X0n/0A/90PQ1huc///lTtS/Rf/Inf/KddaFXxnBs1noF793vzsM7y5OBk4GTgTUG7tkNWAFZBHuL0EePngjt3wz5Hthzn/vc6V2vP/fn/tz0PRebNOLfc/zxP/7HL1/3dV83/VrJd6R8af9zPudzzgU0Ys/yZOAXIQOtATZK3vHyYsu75B7A/N3f/d2Xr//6r59ezPnekl9P+wGP79n1oqzNG2qsO23onPv40Tvqp5wMnAycDOxh4J7dgFnw+hihxdGrUR8H+Lcd/s2Q76b4wqPDwtlns171fv7nf/7lMz7jM6bvg/howRdVLc4wlGHuIfHUORk4Gbi3GDDP++qCX0//7t/9u6d3xH/v7/29l0/6pE+a3gn3hV5rhs2ajZU1xHc9rB/Wh1782cjRO9eMeysHTm9PBt7UDNzzGzCbJYtf74Ih1AL5gAc8YOK2xbHFVmWbtx7zYHH1KtirXrbkXEwnGs4/JwO/qBho49VHheb+R3zER1xe/OIXT/Pfx45+qENssOix8U5XL+DU9YLO+hOWOuvNKScDJwMnA3sYuGc3YIJrk9Tmq02WV6kJnfTGOucWT2JxdZDRdqrY+YcPHXBt6CzqR8TmDwZ7jxno57nFtxfLjQCGG4cvE/uRgRtD8e7BgeHm5JlXcJx7p/DoDcZNy3NmjI1ntIipcdrjRzqeI2SMcMQf43Q0Jt/R8TNhjwrBhXdIYYp1SdTLHf1U8h8XsOLZDZhfa/yGbxzxoU/xiAGeen009ku+9CIjDOPCh6M5BkcscMQRH0t9rtXBEHM+e9ZUzxNbs1mqH8fPoz1cO47kB85xyCe2nrfF3rUv3Ptagu93+om7PtbGiH9+Ge05UfLDmOGndWHJ/6U6dvjwXbKtnFiyrc7YGJdXvvKVd/Jz5Cq9a6V/q8YfeQYTRpvFNVs+02GHR3kqX3CBO/UE3jVho29rWd+PC6M8XMPQj3neDybw4dwY7hV9iEEeiEksMD1q4Kiw8/1hjypwbl3dyqUlfPpsrYM45Ze6PVyGRxdG6w+OHUcwwpIf2fJDfvDriPDFmFiHjBmccmQvDn2cWNOa+0fz3XjIXZyWd3wrl+e+yI3uJ8XNVq56ThtfjDeM4ppjuGaL+3ToHxmLe3oDtkTIm6IO+Qa0CcYHz/7pXbi9PjWYcCSD5xp5V+6o8McBQwLyg39HEkOfEtnk8owmeN3YjvjDTr8mtmf4bE2KLdwWcM8lgimuo5PUjdFEhdFNRbnGi360148SpzA8ikT7Hl/SM671BcPYyhP15U/tcy7yIV03Ar4dzTG+wCBiwQk+1vqd++GaL+WCRU+eGltjckSKSexyrVjybw8WWzHxx8NtfZ/Thgw/foDj2YBi+6qv+qppzNbihIEPC3DPApSr3RD2+EIHH77O8A7v8A53eIa91u8SrpjcHPlh00HUHcFgY2z54cdHhG9b8fCTjnHUH10v3vhBtOfHmi/q6RAlLGMrx+Bph+PYGme28qMXWjbHeD2yHrJ3kzWOxAtBfPhKyhHhc9zll1xd42ANmz5fYPCDf+qO4NDlSw9PNTbwbhHzhD/WMmPRfDyCZV02Lsa38TS2RyROYLSGwDjCi7UQDgxxyDV5F97cn3Rw59CXXPeiXI7JkXJH25ov5XExu1/avO2VYyvmXtQ3Mz3kjwnj3MLpprQ2cGsUheUVX4m9prtVLxkllMTkx+jflt3YZqKbpBJSIjfBRp09525sbC065BZO3BhhWHCaVCbOEZ/EY8NjkvLBJMRLePNY4qxSf2KB02bBOfstX9jry1jUrxvsuAizr33uh2v2Yo07ZQvOkv61Oj5ZPPGBU33vlWKBgQ8YcqTNwl4cMYsDh24o4yK+F4Ne44NPj6F5+tOffvn2b//2aTP1uMc9bvpVtAdnmk9rccKwaRMDHAt4cR7xxXyJj949y7+9OMY1DF/sb8z32qfngZDGxcGHcnUNz3ikI3Z5bR1ijzcYcbKGoW86JK69u9HNVQ7DcWzNXb7AMQ508eGmCGev5Ct959758rWT1qG9OPT4QIwv35r/RzDoGlvzbuR0i8sl/PiFVSxHMcRgszC+8Fnqa6sOJzb5xqY1RN1RX/CRH+Mat9X3vE3e2jzxg8DBj/xZkvK8NnwQ90xjkx9zvfTnJXtxWw/l+145N2B7mdrQGxOuhaoB3TBbbAqrSbaotKNSArVoUA93h+kdFQtwEwre3cotPuiTXXyOGOP5Ht/E0kShP+dojhF+JX1HvoShTGeOUZu8SGfEcF595RJGN7OxbfRjrN9zri+HPOPDEcmXMEZOj+DUb3x0fQSjBfKHf/iHL9/4jd84/fpZTB4n47EyvlTfk8+3+CqWkY/iPOIPXXk2xgL7iOiXH/l0xHbUHccFFp+2fNGmb3rNe3jFUvsWxqifL7DCVcf+GkZ9pS8WOEckv9k43xr/a7jX/L1mXzseRj9uwYVBxvENf2+pX3we5XTEz/cRo7pR79o5G7EU1zX9pfZ8mI/5kq66eV/s4kRZHCPeGpZ6/rtfOrLd0q/t3IDFxF2UES4JOreAjtd74b0S6NU3m1sw2DjcnJrsyr3JNPYrDrbwSPFNFzv+5AvVzo/4kR0/EufzCVTbVsl3nORH5Zo/caZkq4wP/Yy8wF16taWPOAsvH7URJVx66aZTOfraObxbpH7Zy7ejwp6fox9hHsWKQ/HDcH1kbOn63pZfPXs1/iVf8iWXRz/60dMX6X00SsRIb41bOmNMxbalvxZnMYQpHvl1FIvPcQPrqD0b9mHwy7El6VSOuR5eftDpfI5ZzNXnRzzkx5o9Ozr6J/TMry39+loq9U+UYS7pbdWxrf/46XrLbmwr7niVk3DX1p/RdjyHUyxh3o0vMPhk83BEsptzc4svxpcUj/MjOCMfMHCqbm0toQOfzsi/c221K7ekdjjZbOnP244xPrc+r+8wgHxJ3IAYyCMJFBAMN/Lst5Iom3nJh+zzYZ5oc5v5df2OOMU21926rt8mQtdbNmtt+YKjztd0l+rzQRs/4mZJV13xKtN1Hs4Yi/MlyZZ9Os7n/tfXEoa67PM7jDX9vfX5t1d/9IWtOBy3ShzGh4U4fvdgsvcdlu/4ju+Y/umzf0UGy8cPOOpjiPhbwxSLfosnntf01+r1Ew5MOEfigcsHtncrcQqHH9eknFImI0bjrc35qJe+Ur2jGJbi2bIPi87I31Ee8w+GzcUYS33sLfODD3O/9mKwm/ug7ojQLy524/kRHLpiidNbNmD6dsBQwqjuiC+35sfYh37jdg+ndOeirnvvnOe5btflxfh1A3V75Q292Gt56t1hwGAZvN5+NIj98uiO0s4TGPDYNzl2mt5RKxndzErGpYS7Y7Bwom8TisA4klRzOFhH+x8xiqdY4rnrUXfrHB9sxRKGck30Syo777qY+GG8loSO/ryjkR398WCHo2vxxCO8cWyX+l2r0wc/OvqS85r+Wn2LbZwW25r+Un3v8rDt3cNiK/eUc170qZ5uY+CL5upd029c4eZbuku+aMsedjhLult1+oYTz0rHUeG3+PjO3vlREYeDyJ042cKJK2Xn+e+6MdviEj6bMPBRXX2H2fW8hJ/PYud7OHPdtes4y7YcW9PfU59fe3TnOmy9IBi5i+O57tr1yFvnlWs2a/X4wTEfrAO34MgvMbGFdYsYV2MEC055cwSrXM+e7Va+lxvK4la2TjvX1rHmSzGHUQxr+vP69bvPXPO8XmWghDEIJYIvBEqsBmjVeGiA0yIRDvsGd1C9esqGbQlh0h/FYV//bG/F4AMRX5PiqC/ZKtkqyRGc4hkXQBMsrAlw48+olw/Vbfmhv8Y1n/HAll22Xa+5UF/i8IoLZrZrNvP6MNR3DgMPS5LOvK142Mpzekd9EUO54cvNxJfg+SJGuH7e7gn199133/QxI97KIfr6rN8xV4/6Qx9uOQ7zKAZ/2Igrn0aepgCHP+kMVdOp+IuTTvm6pj+375ofcPhE9qxH+q4/ZXzAcIhHueaLekd9Oh/HK9/G9urWSj40d9f6XbKtD20w8uMIBls42d7Nugwnn8byiD/jePAp28olHpbq4BjL7g/5dgSnPB1ffObfUp9r2PXN9lZe4iJ7/YtN3ixJvmhn49rRuTJ/alvCaa3S5pxdc35Jf153bsDmjNx43eBJBIeBkADKuWwlhUWSPR0JMC6Ic5y1axj8kQhenTgsxku+rGHwnfCBwCwhp4qdf0rKEaek3wlxZ2KE4VWKeLqe4+T7vJ4v2hw4JmsY2sRM6NPLtoXLNT/SXZp4dOJd/419pTpjRY/9lj/lGBsHqZwuhj/hD1XTaf7wKTznW/3OMfRZnmpjG9Zcd+uaDVvj6Zk7RB0f/8E/+AfTLxk9RkIsH/qhHzr9yomvjR1dR7mJP+fsb/lFJl/0lQ/6WuNxLS625Qed8Jb4hb8k5mtrCG7KqyUM9uJdEvj8GXNkrU/2uGtc2fG9+OOED85rn/dbn0pxkGxrc82nEX+Ok51SfA42YyzZwF3jRl+EHR26jiOS/8YERn6s9bmGzQ7W2L+6OF6zm9f3Lg1/GvvmxFx37Zof8V885dyazbwehtxs3pWnY3yjzbV6eHyhl3+jfefF3LWSDdvWgnFslvqlF+/O6y8e1Vnb1Xc+9tf5iJHv44Y0vbXy3ICtMXOgvsQx6JLDBPHYhJ/8yZ+cBm8OtZRAdAy+V/oGnq3niXhcwVGRcBLDT2r9xNdP/GGv9buELybx+Om2eFwTSXZU/Lzf5OSP+CSopN4rfH/Na14zxcAPMTXZ82vEalKMdc71LZ5Xv/rVU/9NmLle1+J30GtsvVOjf1gOfmjjxxI3xiIMOm0cX/WqV01j5Cal3tjA6qaVD2MJX2zw5IZniTlfkq2xZgOH/3j1K8El35e41ZcY2BaXXD36bCU48I0tPs0X/wT7hS984eV5z3ve9H2uhz3sYXe+VO/xA/rB57igjtx54Kq45av41vxf4kudnISBDziux77W7Ob1r3jFK6YNIH74gNs1nKV6nMhRPGsPZ95P12v5bu1g60cKYuGHubeWG3Do6Z+ufJQffHDdjb9xX+OXLh0iBv3L6+aKdkJHf0uiT/2x549563EHcn4u8NZ8GfnDqQdk8+eI6N8nGjb11jKxLPlxDTNf5DGfXcONq2v22o2R/q2lMMwd4xmnezDC8ZgS/bfu8OcIDr+tAx4Y7HEprtlvjcWSf/Q95604XDvnz5Is5bt7XDkuJjpKY7cmcisb+rjkh1is8+r40rGGQ0+umlvs/Bhor6x7txfh1JsGSLI4DLiEdsN4z/d8z8XJtZZYqJR4TUjP7/Jcky39JfphSArP8JEYHk4pidTtlSaBpPI/8UrGfDuC09O0PZXcBD2KoS92fHjv937vadI4j/O5L3xfEguvSQajxWLLl3xV6ktpwfGcl3d/93efFkL2+bE0TvnSuNJXZ3F4r/d6rzu5U/sSxjwW9sbWDfbBD37wvHm6XsPRjzZ+4EI8MNb0l8D133jYCMapXDki8StHv/Zrv/byBV/wBZP5H/kjf+TyxV/8xdPzePjbIhqXYx/q+O5wLpYxxlF365wvYuHLgx70oEkVzpE5w8gC7CbND7bFeIRfODDkh00HP8QWD/M4lnihY1ze7d3ebXr+WRxt+QGncdWnHHHND3bOa4e/hhUOnTD8J4JxA0bnGrfxr0/PrPJjC8eSLPnCTr0jDtn37KwlnLU6WGJpo/Cu7/quq/FvYYgbD/gQfzGu2czr6ZOe4WUdyre57tY1P/Ay5vuW/lqbzYac9w/ryZ5xnWNZg2x6cMKeiOlIvvdGAQy2uC3GeX+u451uOYJTYyzfx/Y9MdkUs3WPsbbvlXMDtpepDT3EJwbCYQAb2Nr2lCWOpDSQMI5KC1t+jP7txdIvu/EVwq04Yxy3YPC5hcdksIBtyRpnbPU/+sC3tY1DOMrxsGgRC0SYa/6EYUw6L0fYVFe5hmMcWpDoOvR9zW6OV26oZ49Xx8hJNvXTdSW7cMRiAVZ3VCx+xCtRH0E+8YlPvDz5yU++POlJT5pihW2s4WvXx9zPMX76hG9H/YHLHxhK18U4ge78g0sYcQdn9HGE4eOSn2zyg77rJb2wtvDHOMYcynYs4RRzmHKdL8aoWGobbTvHXf3QT7J1vWWfPoz02DpwUF16WyXdUd/YbPG4hVUs5fqIu2U3tsEQ1+hHuKPe1jl9fZdndI9ihM8XY3s3wj4Mfmzx23yf9ycWbY2v+LZiWuJ+yVZ8a/eK8GGF515gfMXTWnstJn2YM/QcbGHslXMDtpepK3oNaAkooQxs11fM7zTTd8CzMThqDyiM+ucLvFuxxoS84+jOE31K5jYrJhu/4msPDIyRz8732I46+jXJ2Ccm6Bov1VeyyRcYjr28Zmey4mLer/bGK9/GUj/FTfea/mg7nrPLZ2PhIPpeEvpLEofiiAeLkdiUxaKvsV78+dC5MXn84x9/ecpTnnLHDzrljI9+XIc5+lN9dXyZ19V2rYTfzSSur9nM221Usp2Xc13XS7zjQwwdxe36iNDng4OEt4WRz/lljBwknLDSGfH0EQfpz/0vjsrRvnN5Q8LASTjpXCvhs5F/8Iytuq1+lzD5wAYP1mR46pbiX7KvDsboh7nn+og/dB367zjqB39gNFdbk2/BYePIJ2VjV9yVa/hsmnfOw1DuFbrGZYwlv7YwGke68tb4ti6xq30Ngx2dxpH9WpxLGOcGbImVg3UGP9KV43EQalIf7cM9gpM/ksIRRuVerPwIJ9y99vTCGMvRpz1Yo+14vsd2SSeMpbZ5HV2iLP6Rj9rmdlvX9R82XZhkrBsxxvq181F/7TxbpaOxqH7NbqxPt8UpLDoWUpjdtH1XxffDLI4WOOJmqj2cfIiDsa9r52HQMz4wGqdrtvN2WOzvFiOc0Y/Rz3m/8+t8YJOdululeEbO17Dqs367pj8/X8Jo3OsTB6NtGCM3Szj1ry2McJb0l+rCUPJnLJf01+rYznNd3S3Ch9EP50clez7c6oc+R1+6vsWXcIqlci9WcRRL430EJ11lOMrq13wZ9Z133Xhfw5Dv81y+1ufoy21ZNCKc52+wQBwZgDl92So7n+vsuc7+bjD0E86ePtd0Roxb/TERmlhr/eypv7V/2NmOZefX+qaX7ng+2tU+1r0xz/Pj1n6zC6d39ixKvlRvM9aX87/yK79y+j+N4pm/+3dtkdvLwejPXpu53i9EjoV5qz/xmX14d1vuwZvr5Mutfc/x3pQ4d+NLtnfLh/h/IfKdH3eTq8UxxnXL2ITDNqyjOL8QfCz1v8efUWft/Fo8c7vx+prt+Q7YNYYOtiPfjtgO2nFEsmUThtJxREb9cCT5WH8EL3/YH8Uopmyzr9zjRwmdDV5viSecMZ782/Jj7Nd5Ns67XrOvzzBc8z9bduHl1xJWONkrO1/S36oLKx2+HMnV7IthtPf9B+90eTDqs571rMtf/+t//fL85z9/+gXZIx/5yDsfeRq/sc9fqFhGzOI7Wo5x3WqbH/M49+DFL12+jOUe+3TgxKvSxzM2yfmWXiWd+lPXtTrnhG312c3Lecz02YWtdFybw/UZfjhd7ynroz6Va/Fv4Y324/mWzVYbDBLWlu7YRn/k5aj9HCv7cJV7hR/0G9ux3Isx6tU3nMZtbN97nn1luKM93/O/enrjUfuSfTZ0Enqu+b5X9mvuRXwz1BsJb9AsdhLgiMwHk+1YdwQr3fzZSqJ0x7JErC6cro+UYRXLUV/mfYV3FMc4jWNlfHw0tiaNn1JfyupGPmpfwynusR3eWH8tlr7fAIOdY4xlxN4652v21/rcwqkNRjh89GX5l73sZZeP//iPv3z0R3/05UUvetHl8z//8y/Pfvazp+95eXeMD94di0tY4YQV/rUy7sUEGyfqRuxrGPWfHqz8qe5IWQxw7kbgNFZH49EvLrKHZU1ybMncd9fVVW7F1XxKlw8O143VeL7my3z9DGdNf099Pu3RHXWyE7fzrkedPefijzsY8bHHNp25TT7VvrfMbowl3/Zi0Bvtl66PYKU7j7H6rZLvY77TlYuw9sgSH3vsxD/mKh+sQ3vlfAdsL1MH9Qy8n4H3i7k95t2c6Pp5ry8fq7u2aM6xJYVEgKH/o18MhAdDUsLwbgZfjvoBJz+88nZzvhsMWH6eb2I5z8d5/GvXbB2eGcMPODD4tiTxaCz1x8Y7PDh5+7d/+2kT0cRl73wu6ti2EBhP/cJwFAPsrbEu5j6+KxaPxDgi/Chez0TKjyMY4kk8uiEM/v/AD/zA5Yu+6IumJ9j/jt/xOy5f/dVfPT06QB56dIYcwGGcKHEQRrh7y8YGL3HSnBv9vIbHB/OVH3CMB+ylMd3CYjfG0nhv2Sy1hdGXkxv/Jd21OnkuFnE48GLs13jRpp9yVim/+IJfsZWv8JaEv9Ybuvpx8MH6AcM1Wzi4US4JP7TTVza2R8dDTMUtDmvZWp9Lfox1/IDBNzhrHIw247l++dPYuhbfEdEnGxi+S+mZdfw5KniEcd99900le7jGba/khxwxPoR/R8dIzoyclDt7/aDHHs7bvd3bTT7wTWz4XvJHu/Es3+MjP2COfKzljPrGBAYezLu9snzn2Wt96k0MNDgGwLnSwBrMo9IC1mJoQCXCEZEQ7CWySeqhgd24l3Dyf2xT54DFJzdaHy0t6Y5283P6Jbkbr0mBH8eSLNWrE4uY+CEmi3w+LuEs1YlDPL4YXmwmIbw10d6CoOS/0rhY2G0oiBiXxkk/6pXFYCz4gQ8+5Uv1S77EgTbn/IBhE7UkSzzSY4NHJf/5hNMlyXdY4nOND36y7dpYuH75y19++fIv//LLB3/wB08br4c85CGTvo1XYpOT4IUf4feCBf4R4Qcf+Fh+8POI8MNBesglv6qbY23x65lG/GDb2M/tr12zxeme+b/mi9xqvuHIQdQvSbmuDaY8YcMPY4Nfddd4oS9uZbmCD+eNuT62uOGL3Lbm1B+/13J1KR51/MVBOOXImv5SfdzZRBoXc6Y1ZEl/rU4c4mps8eO6cVmzG+vpiqExxFE4o96e8/ptHdryJd0lXBz3YFoxOo6IeMQglvrBsfxYkiV8GA4YbOWadV1MS2IM+M0GnnN12cmzcgbX13DKdbrdE5b6ndedG7A5IzdeSxwDqTRY3iHxANNrtYrxAAAgAElEQVSlZNnqQhIQCeBBrI6jUhL7IrTF54EPfOBhP/QZjge5lqRHfaFfIsO5RXDSAu7Bkkc5rU8PhPVgW3ysTe5010qT+rWvfe300EA6t/giHguWhznGsbq1Sb7ki00NWw/7vVUsvG7wOF3rW7xiNIZLYsHxcMoHPOAB08Npn/GMZ0wcs7Mpqlyyrc4iyBfz5W7EK09ji5dbxkWOeRijBwZbkG/BMN/MO36scXotRou58YXhpn+LH/poXI4+eHTkzw3Nw0tvjYUfeO3hx9diX2o3Nzy13bs95sytItdvfRBrfTZfb/EjXluTwzxa4kN+mDd3k+/NOxi35FjrmHnXw7qPxkLf5l7/dzP/bZzi9da1vfulHOHPLZy4xxz5VOLcgN2SMTOb+WBJbAdpws5MVi/Td2NzdL1qsNDAxsEHk8RhAT2KxS4MN6Sj9lzDjRuKSQHvlqSGg4timfO9QMFmVfx4pQTT5F0SevqqjA+xVK8uXrYmPr3swmHnnHS+xg89bTDG/jpf8n+rrv6Mr/MlHH3aRBGLpFd29OUCYWNcjC8uCZ3w2nwtYU/Kr/+jvTwb4xt1ts7D50t+bI3FEhZu2TvyX/xHcfQvbmWblvxb6nepji/4gNG4r+XFkn118/6Nk7Fbi2n00zk9PlSvdGz5op3P+k7PORzXjnDgO1+SYjc3R53xfMlurKOrD/4QN+gxnlH32jksh/wI74gv4bPhw8hHbXvK+GNfvsfzHvt0+CFPiyeMyvSulfIUTlxUXrMb29k0/9XzwXEEi26+d84v+VP9vM8x/9jgND/mc2e0nZ/LB3ZepMLMdq63dH1uwJZYOVhnAAzeONglT+UeSLoOA2ggCdzO92DQ4U9JUPJJkCM4+VKfbG/xJRz2DtdHcYqBrfNiORJPXLZ4wnHkU3GOJT/xWNk4K/ky+gEr7BFDfTHXZ++uFA8f9JHuaN85P+iHRT8/0tlT5mN4bNb65VcbLx+rveQlL5k2ZN51Y5M4p+sGR68bnX+j452tNnHpV4qhDQEMvm2NR3ZjiY9y3Xn2sJ3vlbhlA0/p5jTGuQeLPqzsGtc9tungBEZ8KDtPZ08ZBlsiLkfXcwz6c87EMfIrnjZF9OeSvT7YunYeD67za247XqcXj2Es9TnajefFqW+cknBHvWvncMoJ9vDCvmY7tvM9LovrSDyw9J2w5c8tvmTDPk7UOd8r8xjY868Y9+LQLxY2XijYzBzhpr6Ly3g7+LiEUx19/dNzyG124ohb7eHOY4q/7v3WDOvfXjk3YHuZ2tBroKiUlOoa1A3TN2hqgrGXCCXHGyheqcgPavmn3CsSjr6jZO16L0Z68xjm1+ltleLJbjzfspm35X/cuO58ruta23ioMyYEJ9pGDOdLQq/FoPZwuw5H/ZrURlf/jdGa/lp9vsPrfM13GyrikRKf+ZmfeXnCE55w+Ut/6S9NdWyNSePSRsvHZkS7hWkNe1Kacanumn52S2W8Vi7prNWJY+yb77eIvuFc43YLmy0pjjC3bOZt2YgrPDpjjKONfGIzynjtvPx3PraNNuHP+1R/Cy/6yTbssb+183StqWHQrX7Nbl4/xhmXRzFgdhOPl1sw4OQPHOd8ukXYxc3IzxGsfCgWmJ3vxSme9LOvrH6rhDHnIl7m+Gs4YWjvPIw1X4q/Puit6S71e09vwEpogQlaMkXYPNiSXj27US+7kvEIgfVjAMY+vDvS4KSzpwyHj7fY10f2YYy+pbOnhIOXW+3rY/TnKL/67ghPqa7EH+vXzvU76udTN5U1u3k9jA7cwIW1hJPfo69xqgwnvTVuRl028ndNd+7v2jVMB6l/516B2kT5TsTTn/70yz/8h//w8tznPvfy2Mc+9vLJn/zJPw+OHQ7CkffNLW1LnAQgDkLvVmEbThi34rEbD3hz7PpYK9nHh/G5xRc2+MxWedQP/um/HAnT2Gxh1VfjqXQ0ps7Zd8x5GO3YuM6Hue7WNbvmlr5g5MOW3dhWLMXr2nFU2POHbet62Eew6htWvFQewaELK59cF+MtOLfEkg9si6vyqA/G+Vbb+pIf1prGSmms1tYf/c0540dHOQvDedf1Ny/ry4u2XojOdZau79kNGAKRgrCIVLpekiavpHXOPgwlScfbiLe++g2zL54v+bJWxzcDmX+uxZNfa3bz+ngZk2YtEee2XY+26sR11I+w2DmMT2NV254SB/p3NN5wXB+RMPJBjJ0v4dCvn/RGH8Q06ixhsAujduOqb/ZjvsJaE/q1lxfKozKOK7/kBRxlb/3bfD3vec+7fO7nfu7lhS984bTxeupTn3p53OMe9wbdhRHumGfatiRexMU+jC2beVt9hCEWddXP9beu2Zr7bUBv8ceYWjvy4RYMfox8wLxF7rvvvmk9YcsfHG3xok3f5TUfsqv/6rqel2O84Y05Ptdfu573w3fHLcIP6yp75a0CBzc4ukXYtn4Vy8jXHsz0+TLnaI99OmKAQYrnljzjQz7dYl//47oxnufvtRKv5u0YVxwv2WqLw9r5r07b2F586Y2lfDLf2bLhg++e7ZV7dgNWgCOJCFhLghLfAmuH6tpAs0GwgesGdMvmCwZf4DiHf3Qjx56wt4G7xY+RF1+IbnJVf7TE1ZEd/RI+nv8/9u7/eZ+vruv49Qc0MZOlzpQpBDbyTUKNtFJDM7+AIelkmV9KsSwDTQjFMBsKyVLRJA0iQmGs0QaRpGT8QlKOOoBhaDgqSOow+Rd8fmxuO5/7u8O2u9ee643Ih15nZl9n95zn8/F8PJ/nec7utdde+7plUoUlLi4Kikdxqv9sDWPmwjg71ezYh1GpT5z3ci89MuTFIoz0kwn3qKYjFvy5n4IDjHg79itAr5J47Wtfu/xC8oUvfOHli77oi5ZfOOKfn/GmK8/CuIWPeNxPjrVY8gWvOM5yKablWbgzOMWjfC9OMxh0xLQcmdEdZX19PPKAe+TTyLX1DIcwWitHG+v98MNSNy5jG7mzhV65elaH3JqLeNxPTONhbb+14GRsi+mtOPTh3Fo6x5gr91PM28b3Vhzz7X7mP7sw+GKM1nnW8RY/feVJPMzh4iJOR6X+cGD4te7Z8pC9ACuoAiCAXWDZ3yr6C3B3mdT0YQm4RKKvfWaCNCENHDzHXjPw67/+68v+Fp+tNjZdBOL5rne9azkB+l96JcOWzlYb+Xj4ibCvkrTNnCTJ2/yk1oWkh6lhzhax9ZNpvv2hP/SHFv/sF7MzeHj/1m/91hIXPIwRDLxmOLkj8M53vvPy+3//71/GGAdYe3Gpj1zxhIGDzScd/lnU7W8t7mJYrvLV2MKSG/rCsL/Hgx4uChl43kPkZ/VydabkC3t4iIeF3KsCFHx+9Vd/9fKkJz3p8iVf8iWXj/7oj1589UZ7tvFg01yBZd/7v5Qj/ovA6g9dOhZfrxlgW1zFaKbIA3zkSLlqLMa4X8MrjjC8qsQ8tMmzmVI8RvviNMOFTfNfHBqna/mxxfF3fud3Fv24wICt3iryQfyyq/6N3/iNZZzp6KvIA/LrUnvxJNOLOuE5zr798noLhz25gbP5ohjns0XcycMRf6+PMabvec97zkIscnjyB38fUOyrZ8YUEF/57v2Q1hE4jmfmDQx65oniPMMnHGcKm7/927+94MSLf+MYX8PjP9vGxjjBbGyv6Y79cOSqc5Uxk6/ioz5brIfFBSd81Dht5Rg7ZPClh4M10LmSTus5DPratoq4w0rGj5a8uuVsmVtdzqK+H+QELqcFyyQViL1EFGAbGcW+ZBNgJ+QCLLF78PisG+MgN6FgeveNpJ4pOPGFH04E3ie259MRLj8lgqS65Z01Yb/73e9e3hPluBjVd7b+3//7fy+63mlmzMR+pjSuYvkRH/ERSzzEZBar97O4qFCu6dc/1vLDYrF+/5ZxuzbWcqOxVMuP2tRK/cvB8AeHeJDli5PAx3zMxwxS53dhyX28xcOYWIiM8etf//oFiB39FirF4mJRxNEGgw45PK75v8WOLhw5//CHP3xL5GobDPxxL6bwZou5Yi3pnUYwZ3NVTPHxEtrGsnE7y4e8WD/qUY+6F/uzuqMcLvLUGtJYiVG8Rtn2cW9s+S6Oj3jEI5bu+pLdqte+OnYR511zsIrnWm4Ly7xvzXGhwRdr4tkSX7bsq72LcPa9aOyF1QWYd8XdUswXF/kf+ZEfeS8Wszj88KHW3Lz1PWBia1670DH/Yc7OGTFxjuHTox/96MO8OvIRB/9ZoHc8liNHOus+F9XNXfo28RlzbtRpPMc2F4BwzDvxOJon6bVmOqbj3OB8d7bMr1JnkX+X5QSYw4p9gf5P/+k/Lc+sbJnW/6Vf+qXLXRj9Pg29+c1vXuSdPD7t0z5t6Zv5hDXaaUANmn0Lx+wJiZ6i7uSYj6OtM/swLOJw7qdIahPk1tvd+OPQQurYeM0WFz4mlHJrTPiBy60csismlbCuTdbk6Fn8wghTTBr/sMeaXLLlB39mSzzYw0FcxUSuGiPt4uzY4mKRdkzGayWUeKjJwODTbL7HHf4tvqRf7PAQG8e3lHi0qN6CIw7mHQzxwOdabqy50ilXu/hdy5w5dkHJJ+Nkg9s83NJvXPXZ579x51O5UfuWvrZilly+jPL66h/b9/ZhtA7tyWy1j1z0j2vIlvy1NpzxwGeG/4iLk7EtP8a+mX3jAudWHq1B+cM2v2ZzFQdxxePWki9i05jNYsnzfIEhX/lzrYzxC0NsisPYv4VF1rWFml2++GbibHlIX4AJkgC1SPka461vfeu9pNRv8xN6AXrKU56yXGT92q/92vJrLoHzidnzLt/yLd9y+bIv+7LL13zN1xwmYok2DozAm1BKA2cR3kvoMNaDlG44ksi2J7+XrNnVD5O+Nlhny+gfDFgw9mzutWcP3ohZ+7omsy6wi8UYI3Jb8mv9junyQammv8ZMfqxHO06sjtviNsqkqw3/au2NQ/K4jP3pruvGQe1O1NEFDzy4bMnNYmjfp2d3RcnYwmnhga+drto8sVmglPyPH72wahvrvdygoy+8xmRvPMivSxh08I07rC27W21h0uWn9eRIjvwWF+3sthiTSa46W9V7dsJoTMjvye5h+9DU1zhkxvhkf6yLP1n76vSSc1zZ46Ofvng2LumoR70Rb5TRDoOszXFjO8q1P2LWVp1eeVz7ut7jEoe1/OyxsTQGSrbUR9zXNhqjYhvWHkZ21jjmXBjikv6efP0jjjYY9dG1adsqe9itM+GM476Fs9XGBzdP1PTZghvmWieO5JKJO4y4worfGsPxOJ4wzbmuR7bk120P2QswgeFwg8Uxz6x8xVd8xeKjq2HB+Imf+InLz//8z1/8isvXAr66efazn73cun3lK1+5fN3oX3Z8zud8zuU5z3nO8p4jt6mvfQ3ZADapLHQGzRXwyGkdcMcN+LqPXniw7He8lj06LnnowrzGZwuLjuSCoThW8ns5OPFntG8ft6OJsRcbPPQVlxaNPfktanRdgKjzR91Jaq1DLpvV2tpgNVn1b3Ehq6j50MWGY/Liqc6/NYeOs0m2mNa3VcPDzSdU8bYv97/ne75n+T+N3/u937vkuouqxrQ6vBaXjnFXso9TcdS+5X+6W3V+6+siUb3mke4ePg764qMuP9K9VrOrqMOBsVf2uJCPCxzjwJ89n7bw6eFRnMkc6e9xST9/HB/FJd7qNrbpO25sRrkt/uRGGTHYK+S2Stz18z2MPfk9DDkcH5h82St72HTY1z/Gcj0/9nBrh0EnHrBse3bTW9fFJi7697jsYYsJPnGAeYSz5uA43er82svVPS6jH40Vbq03W7bXbTDyB49yZm8Os9NYxIveiFFMtbW/ttsxXTiuO1wDnC37K8xZhN8juQZZXfA7kWpzNewrxq/7uq+7fMZnfMblEz/xE5eT0a/8yq9c/uN//I+X7/zO71yejXAC8j3685///Mtf+St/ZdFZv+todLHBMijsNNg4xMUVsAEjq31dttrI0KczbtlYYziOy7ovHLUNlxJrLbt3TA9PupJY7Zi/W2WPCz0lrHT3YrDVXjz04YWDfe17fLIz1uTHT37hbNmMs75stc+n4kou37e4jNyLRZxGu/CyWf9YF//wyNtGjFEeFxt/3Rl+9atfffmpn/qpi/9V5vUST3jCE5Z+Yys38mHE2NuHmy9dwNHf8h/GHjbu+d1Cqd7zaa89LrDSx2XL7lYbjsWXfnja92zutTcudNd8tK3LFh8cbPqMX3Hds7nXzg8c4LTPfnhrLmT1jXgjPxhjXEe5sMi3wVMaE/L61OlWpz/W7NFVxIHuHnd961IbHja2qteyjve40IlHMri1v4W11UZHwcu5Sg1jBocsHJzox2MPY6+92KhhKWRviS+9+Njfs7nXzgfjq4RTbJbGE39GP2DYyrstdVzosK1W6NRuX9FnO4oLHfJhhbcAXPnzkL0A45erTUHmeMGzL1geqHvmM5+5POP1ile8YgmDPi+UNNi+ehQ4++rHPvaxy61Dvz5qELZi58qZzQaFPnt+heGOW/Z9L67AWpcGd93eMTxbg783oGS2Svhjf7y25Lfa2HRiVrrYhDHLZc+HrbiwFfc9Ttphkgt7S3arTTzojeN7NEmztcbqq7i45kvHa/ns1U+/2NZXjNe6HY++2ueLT1rZTq7aAs/Oj//4j1+e9axnLQ9Cu8v7ute9bsl9cr4mh8V2H17SP6rjnO345N9ad8zDdR9dPNVKWGs5x3v4yY525OpWGWXG/rDZb47rz8dR1n7y6/bwixEe7a9ltW/ha4Mf1ri/xjjiwg9jy6cxrnvc2SWP81gbH/lBb+S8xT1bow08tkqyW32w899+MRhx0xs51aaGP9b292T1bWEvAMOfkTOsmRI+PTjpV5/BgpFf6TkuVmuMbK7b0x31Rt9GebLJj+3ZrW/Na5S1v8dFfuirjsfIbY21Ppav9HHJzhGfUYYOWzDU2Y1H9dqmY2swrM4j6W7JbrU9pC/AuvjhWAG1WGj303gvk3zqU596efzjH79crFlEXBgZKPsPPPDAIit4H/qhH3p52MMetly4CeLeAl7A2YNj0AyQ10Voc+xCzB24o4HbGoza6OG0xyG5fO64WkLBcCfORWplT77+rXpceLf6azvCNh75Ercj+TDHGg84xVQ9W+jDqZzFirsxgWFTxskuZ444jf6SW+cHG0f6ca4m39jUNtbuenmf16te9aolr1/+8pdfvviLv3gRceFFX/7yaYzJiLG3P/pyjQeMUX7EFL/yAYf835Mfdbf2e/YizC2ZI2yxCCPdI/lkxrp4qCv51XG19q0+49LzLNdk69+q+cKnswUX8upyAsbIsXhoG9tHG+t2WM1dcke64axlwqh/rNeyY5/9+PAF/3xYyx0dl1N4WOOVW3DoFVs4M+MTP1zkV7nqeJaLmORLvoW/rvfiSw+GXK3syda/VfNFfqz9mPFJHK3Ba509PmxV2odRjjTG9I9KY0kmnLHtSFff+dl5Den93F+AxoUOBQEzED/4gz94+bAP+7DLC17wgqVNcAXIBcl44jFg5F1YuSCD63iNm3teTPnGN75x+UUYrIKuH5aTm7th2n3dOfaHsTeo2vGQBN7RAssD03vyW9hsaMcfP1w8+2OSFLN4HNUwXMzSx6kL2yObe3jee2OCwcLJ/h6XLV+1+XmwxDZ2tjDWE26Pg3bx9BNwP3mmFxfjvVXKA1zJq+WIeNC1GSsxidMejvZ8k4vGl245B9vxHhf6+vCw+YWbn+a/4x3v2DJ5ec1rXnN505vedHna0562XHj5pS9ZGP2aEYb88qOUvfHYAs9XOnzii2cm8doqezkDx5g2vuJKdg+n+I02tDVn5Ah9MZXvW3a32sLDB4b8IAdXnm2VLS7k6Mkxr6ER6+SqR6w9LvQ8lyofGu8Ra8Swv4WtvXdVdUJo3Nb6HeOTjH16fFG0K3Hes1m/HKcDgy/mnljyhy/k9sY5O/SNI3k82LSWrUs21+305Lp8sI+HdWzvNQF7PuFJz3hYy+z7huWWAiv71kPzZo//Fr513U0EPuFr/2juHvnkcYTmilzfO+cd8WNbXK0tnWP35Pe4GBvjaj2DocA9yo91bOjSsfEFDt/4tGWXnNxk235xtR66mWJt1M+X8NY2x2M4Cr2+/Rr79/Z/1y7AxkEQAMdtewO9R3KrfQ+DLQPnq5fnPve5y3uj6AsQnd4jYwI5FlyBVgyE4Hdi3rL7p//0n17uKJg4DRy/2HTsvSge+rfYeH/OGIctvLEN9zaT0y/VXESa8DMlPk4mFiDvzuI/7NnipZzeeeOu3owv2WHT4mlCeNauRK1O7lptMomvd0UV61l/LHwmeu+b4g+MPb+0yxF2s4mHuBpbJwj9MGx7PmVDTd54OiGN7/DJxh4X8i4MWgz4Aqt3NK3j59lH27rks/Hwc2nvrZEfuJ0tycLCy902787au1jZwy0W8OD88T/+x++d6Pd01u10jY0CY5xze7FcYziGY+56EaPHEyrGZabICa+4Kcf4OIuBt3HxYyBv1YbZuM1wcbFg/fAeMP7hYYz2+JCRw+JpXxET+ZFePPZiC9uFSjbIWU+9w0vOiQcb2tnZmzNsx8G+HPMeQf7MFPaaM3y55T1g8eCTC0In2Nk5kz98xoe+UjzO+lT8XfRYi+TZUQz3cPGQVzC8k0zR1rjt6Y3t4uIi34eN8d2Ke7kx6o77ONB55CMfeS9PxWUGx8WkPLOm4iVf4cq5LRwybFiL+e3YnDM2csTxmXjEk7xxgOED7dly3xdg40mIUc4ik9P2FXX7Z8ndIicgnuOSoP53nZfu4WJAcJWwBqWkdfFloJyYTVAnOdte8UD/p37qpy4XJCVrA0jnl3/5ly/uksHFZabgVJzGGt+ZAgenkkMNT9vZ0vjRbWtsz2KQW/ukDZdZn3BQ1PlRvXSc+JMfYV3zB/dks7XG0N5YJTNSyUY1mRGjdjpb+mE5EeMjj+k7Ebgono1j4zHygMGH2YJ7vsCY5YIDDAVOnG7hAqNxWO8vBq78KS4jBpVZn8aY0OeXMuNTeTfGBO5RfixGVn8aG3X2x/2V+HJIjp1RPh4E8NBXvYUx8iQnhmsu+TPKjlhr/PRnxgNGemM9gzFysj/i7HFf64zHdMIIbwanPA1DbTwar9HW0X7xHXXtz8ZmrZ9PR7bXfVu+zMQEHt7Ox7Do4hXu2l7H5Ojlg3066nInWTJHJYzqI9mxb+7MPmpu7EuOFo+RMGeUsW1D/X3S5IrWrx/dyfLsFz7aGgyvovAvcch4KFnR5yWuymMe85hFZy8BDLITX4VcyazN4LmQcwdrPYjpXKvFCW4cqq/p1V8S8Iv/9GtL5mxdUsIY/TyrT47uyKH9GQy+KGM9m090+XM2FsnRy1YYfFCSaX9p3PnTPIAR5ojb/pZ6uvqMqWOf1uKxpbPVNvKNxy3jARuHMNSzXGDQ26qXxsk/7NvwGv08A0MnfXXz5ozuKEO3mNSejx1fq3EfMezn0zXdsT+M9NUKjntlHbcwyOs70iWzZSOMdKvD3ONSO9/Hdaj2szX7bK55nNVPbhwXWI5nCj+UfEm/+gwWWVv+2Mdltqzznf44Lmfx6NjiFO5ZfXL4FxPH+TiDUTzgVOBe8ynudMin01iN/eGu62SLwTWbo/7/ZTu2TuyPDlPjACLrguRIdN3/vjp2h+DHfuzHlq8zBMLtYncLcHLCcgHmXWHeg+SXj5/92Z99+dEf/dHl60r/TuETPuET7vHc4tT3wl1tj7660LNwK+62sZ/PW1jrtnHg7Ic9gwGTPF31uK3tHR1ns5N9uEc6W314tOlvP/wtna220Q8Yt5wg6TQ+bMCEtcdl3R+HMOIAI7wt7msb4aSz7t/C0MZeC4T/zejrYTk7U/I1myOXszhrXbxsYc/g0FOqZzHo4qOMc8bxDFa6YVXPYCwkHrSbXrGq70xNty0/wjujn0wY1WLMzyOs+kb/tY3HRz6xIUfDwUXbeJxPRzhkshnGFo6+o5IN9tNfcznS1xfGqG9fLG8pI87o4xks3MeNzqw/2WG7vK9tFgvGuN3Ch81iQt/+Oofit1eHQTc+2vb8IaPobz8O6Wnf049HumqxXMczub36vi/ARrJjQnJGQSySObi+aNsjd2v72972tuUCjP4Y4IL5RV/0RctDyi7E3A3zTI/nC772a792ubtl8PeKCys4BTr/XZDZd4HGPxeCJcMe1lZ7sYormXF/S2fdFqd1vZY7Os5mGI1n7Ue6Y1/+jG32Z3HikV7Ha9yj43TOYjR+5PmhLodHrFFuz3424ZC3jaX+sW3c93Bnzyf+9E//9PKKFR8svvIrv3IUu7qfnfzJj6uKg0AY6Y71IHZ1Nw4EwyyWV5UfFIBRCWPvuPateuQy9q8xx76t/XUs4M76RD4cNsb9LZt7bempwxnrLT2yY0xxsVnvwjnCSKY6Wce24gzz7Ek23eot3ntt2Uu3ek9+rz29db0nv9c+8iHT8Z78ul3c0rEfn7XctWMYCv2xrI/HvvV+GOv2GQy6az/yaQZnrVOMjjDWMiNGetVrHztex+CafHrV930BBojRiLjL5Os3FyCKC5LuQK0ncSTelzXbf//v//3lYXsXRV0IsWEfVw/7+pWkX4n59YSLLw/XewjQXazubm3xyk99Eoc83C4q6SoWl/GCdAtr3YZbsVTDV0aba52tY/JtXSjO4mQzfcdx27K515ZPaqXj8Pf01u35Ux2vtdzRMZ30zthfy9IZMcb+I7x1XxgjVzJrubHfxdcP//APX77ru77r8pa3vOXymZ/5mZe/+Tf/5qHOqD/uZyeb1aPM2X26+RPuWV1ydLfqGYxkyy31rE/NtTFPZzHwSGeMRT7G81pNPpwwx/qafv1hxCUeHSd3VNNZ6x3pr2Vha4uLY/tbcmseox3y4azlrh1nO/0R95qu/uRH/fbP6K9l0g23ei23dZyuuv0tuQAju9kAACAASURBVDNt43whj8cMFzojRvuzGGtfbvGLzXDy/cifOI4y2a1vNibrC8l4HNX3fQGGLMNq791y8eP5qqc//emLXW/d/vZv//bLS1/60uVizC8mfjeLE9UXfMEX3DOxdzfLV5G2denCcd3e8RqvVwd00SYW7pJ1QZbemVoCKJ0MXMyW1Gf0kzEWdHFwgeh4FmfUyWf84GyVvXY63TWkF1Y+rrHY3Sr8gEWPrbjsyW9h0DO+6exx3tId29KbwcE73+nLF5t2nPKHHfHS1msu/OLR3VkfGswrr5jwrKKfTMdl5He0z45Cz/61fN/CSpf/8VfvlT2O9PWN8yXMLazivdVXWzJw269PvcfF2JSn8TE+Wxhw9tobO/PP2pDNLfk9LtrHnKBr24vxFnZ24wqTfjm4EFv9gRMnfiRbm/7WuRF/hLHmFLdyDRbbcPLDfvij/rifLTriEY9Rxv5ROxvxJhuPNYZjcnulPr+0zb89u3sY4iEWsPAQK/VMgZGO/ThUr7HivW7HQ46qG6e1TMd72PrTxUmsye7J73Ghmy9kwtzDiddYZxcWDFu4o1z78R1tiYdifDt/k7N/jUt49K/ldRzU930BBsTk8L6tF7/4xctPwbUZWEXCOmH4afc/+2f/7N4vDZfOD6I/LhAMkoFvEdLmDuBMETcD6DUXHvYfk+EsDh44sN04aJtJDLbo9JUqv5TqNZe9dvbHX+u1qJb4a5y9Yycz/NkpztV7Out2PMbxoI/HHvf048q+uLqjq+QL/WsYbMUXTv7UbgIr+swncSPj17xf9VVftdz98s/izSF3bP38m2zcFuUTf9hT8M3WLAbdfMdVrsLai8FeezyMSeMiDjN8ih8bXfCEsWV3qw0Pc5W+17awD1e9J78EceOPOIgHf+K2588RtrgW08ZsD2eDxtLUvKNffunYsxvfsT8e9OoPY5RbDD74R3uy9vGAE//qcEbd9uMsBop4wtmyudVGJ59hsYnDyCNbZ+ryXX7IFcfWgpmCB3/GmNIf43EWL5xiPYtB3q/9fcjjCxxtW7HcaouncRETsRBvskfy6Y21eNAffWgOj3JH+3iwKy7WznwZMUf9MTfibF03d3ExVqMf4/6IU150/neMy9kyl0EbqAbwrW996+Xbvu3bLk9+8pMvL3rRiy6f/umfvny1R9z/YPTJ3f9a9F4i75T6YCsG2eLdRDcI3jP2zne+894F0BmfDbwfDRhA7zWBccuCIQlx8tyQzdeyxmmmtFh4Pg6nEpJvW0X/ViHvV6H88I6lfhTRheFaZyvR+eI9QOLDD7bsS/ot+TVmx3S9o8VC3gSEvcelGLQY8AX/Bx54YMlveI0P2a0Y4MdGcZMnjn/91399oeVTFxkc6MPTZgwtkP/lv/yX5UPMd3/3d1+e9KQnLWMpFmz3CTb/ztRsxYm+/xghHnsx2MKUn+LAD0Wea9vyX/9eewud2ruz8BFb/LbKVrs2sWX/3e9+9+JH47Jld6uNLf6LuVfYiAfMFvOzXMjBFw9jxxeFf+XbiLXHxUnAuIgvv+iS3ZPfigs7eDTfsi//zJutMsYy/8VUO31xVcRF/xYf+Vsu0cHfWmbuN1fyB84WBhtiJn7p+MEJWfzXZQ+DHPvlgzknHlsYZPfiGBd5YU0WP3efy/81n71j/tIxf8tz3PbsbuEki4c4u8Fh3hiPrZL8uk+7MaHPH/ouQLZyYy++fGHbnHERxhfxbvy3bK7bHOPSeabc2PNnS1+bdxrSda5pvJvTW1jGwrjiz75950kxsS9P1OKh3sJgly1znS3xcIzD2XLfF2AmyC/8wi9cnvjEJy4XWoLAOQOh6P/8z//8y/d///cvF2qf9mmftjsBzpL+QJPjswHgq2Q1oN7b5Jkyg3e20DXQ4mdzp8O2NwGOcHHyfJtE8kJXx3idLcmbWL2Yjn97GHsctXtTOn/g8E+i7uFstYutRVNOuYCnDw9H+2eLRZN9Xz2z06Q6wiDHBzV7Fk44YkofL/32xWddiqP2+JK3/6hHPepem+Pa+Wbiw/beOv8c3uJvcssnbTjYvOF+prBRkRsWIM9EbsU9uXWNqw0Xi41FnC/N+bX8aHPsG8dA7Hqp5B6XvXZxETN8vBDWWIjXVjni4sMKLPFQ4OzN3z0u8gPO+L5Bsls5tseFbe8ltH6MfuzZ3GvHXzx67MPx3hixOY4rbnDJe4mqff35Me4vwXrwDz0buU5KxhYPsYQzyoy64z58fOmSd3KE4UdT66J/q6x5wLQGeTHtVtmLIxy6cswdabx6ifIWzlFbPnn5qXg4LqZHemMfLua+NcILXR3vcd9r55MLdPneozh7PPbii5MLQWuIF7Gmvye/x8U65ENHL4Qlx6fwRt/39j2mIR5/5I/8kXtj1cXTlo64iz87CpteXOx8J9/1y301f/bWgWLPFr54iMfZcv7qYAeRMROtgUBCohpYhRPIWaQ5uffpYwf+IdPc4mJAGhRxmCkGWvzU4idutxYcjIsEuqXEAwasrYuLM7hwcCiRHe9NxD088k5sMOgrYjSLU65mBxbfzpbswTG2caE/7o946TS2jsXU2Gpro6NPnOG3OI+xN5fCE49b5lL62YVvv/aR+9F+uU0f35k4hkuHXfGAgYc4qs8Wsp2kYdAPY9Yn+uYdXvyb1ceZrrGVq3jF5aw/5OjCKQ638ICTLzgoYe7haY8vWftbviS3gK7+6It3J62tdWyPwwhXjmkrR8b+s/tw+FM8zuolxx98w8i/+mdquq2F9Bqbsxh4xKU8ORPLNT4e1hA5X8nPjq/V5I1LceWLGM3yyY/R/mxcYPBltH+GBxl286XzTLkrBkdcskGeXOv2tdjVf/72QRqrmsE/8Sf+xHJ361u/9VuXCy5XtE4ONgF57Wtfe3n7299++azP+qxlwFYQD/lDg7CeVA3sjHMGUCIoFu8xCWZw2LbBUytHSbSHnW5cOt6T32un38UDjFmcFlCTPd1bcMTTFga+4yK/5t9Y1N5EpSOejZd6D2fkmV0c6NRXOzvuKIlV+GKn30lMLQYKGR96Zks244z3aP8MXtzJ8sU81zZbxJMejHHhnMHBPV/iA2+2xKVxhHsLDi7GJt34zfDBoQ0eDNtskTvj+Ia1h5Od0Za4jL7QHfvXWPrYSc4xDs2d5B0flZErDBzicaQ39skpJb6O4zbKXdunE99beIRfbBrb2mdrfMIY4zSDg0t5mm/FaQaH/dYoeo5nS76o82eWS7FN/xqHkad9Gz/Uxrj+cPfwxI6M3LJtfdjY09U+tVK50jVojCDIuAsPLzT9lE/5lMs3f/M3L044SbhlrPgFpOe/nvKUpyzHs5NoUfoA/9MAiIUkEheDof3WEqZYS4yZUlLQxUOJ21kcesbYWMJTwt3C2POVXRusYkJ2T34Lu7b05KE8mo1Lkyo/io0xO1OyHw79MU5buV0/HXGAoW6ieiZNm6/wxNrzBIq2Cn7pwaHLh3HhS/Zanc9w7Hdn+preup8uDvkV7lrO8ejL2M+v9MRE8SnWGnO2NJbk46RN2bK71UaWXX3GoNio9+QXAxt/cBjz3f5enh5h+xqTrq044zNTikc4jq/lepyqx/iKTe14jPsjrzizVQzJJl896qz3cWVPLjSee/7v4eWrsTUGjkd/1jaPjvMDBl58DP9Ib+wr/uYvfZi1jXJH+/Gn3xpCfi8Ge1h8YFvZi2u6e9jaYeAEAydt1/DCrabvpo0SJ/XWeprOuo4HrMZGfQ2jeMJzXhl9aXz4tBcDNpKDQU7b2XL6Asxg+6SrblIwJrEdv+xlL7u84Q1vuPzQD/3QchLpIeMf+IEfuDzjGc+4fM3XfM29250zC+xZR36v5UxGg10ixMeAzpRxsIvvLRhs0q9IkhmcdNd6Mxhs0x83bbMYdOJDV/6seeXnUW0htvDAgAdD2eNjLMlUm1j2W/hgNMFb3Nf2ybjI8YBrnOng8X3f933Lh5PP/dzPvfyTf/JPlhetHnGBlU327O/Jr3l0TGcscRrbru3DGPXiUH1Nv344+VBtPZnFSX7kFF62rtXsPvDAA/dygr4S9jX9sZ+ODZ+9vBjl1/t06Sl4tM1yKdfxgLFem9Z2HZfr6mKQXJw63uJDZ5QjY77AG7FHH8MbazjGRCHLF/N3y+aoN+6TDad9xzMY8OjYFD4oY64tDSf+0FHCan+GT7ojJzgzGOTHMXKszGI8qLbo0c2/WRy+tI7CdDwb3+Kh5lsYW3kc72x1PMaE/bD07/mUjpoOP4pDuEf16QuwJgMDHhD1sJoLMsRMDg+L/52/83eWl0OaKB6qU+w7YTaBaj8i9VDsK4EaKLVtZjD4bdAVuu1Xz8SlhSKdWzDo0oPl4qNkC/NsDaPtrM5argkBZzamYRmjcYLk194HgvytTr+xxqMJLs/Nh61CHu8+vPzO7/zOcuH1+te/fvllsFdLKD4Fjg9dj1hsjX4XT/X9lHzIxzNYfI6L/XL+Fi7p5M8Z+3syxWicO3uyW+04wBi5xG9Lfq+N/eYL/Vk+5MvT4rxn66hdPhrXfGjcjjDLg3LccXrhsDnujxz6kFLO63PucBx29ai33g+HLr70R8y1/NHxyNX+eHykt9VXvt+K4Tw46t7CR36UU2plxNzivW5LPpx1/8yxmNiMzy0Fh3Ki3IzfWbziWE3PfnhrHHzXNsjiUkzDOIpRstlVz8RhKmKSB8k/8Af+wPIeIicSP9v0izBEfuu3fmsZCP1+Fqp4pgUp/X6h4G7AB9tFmMXC1olcMjUIBnqmwKFPr8GdxaBnrJQWMm3rhDvitcYgO6MfNh0c0rUPe29ipLeumzDFQoxG3LX81rE7HDYXQn2gKNZb8nhmB1/2xNWtahdc2vJrDwdGeSEnfvmXf/nykpe8ZPn/o8961rMuX//1X3/PtLtk+Xev8cEdtmCxhwM/XLDtya/1Oy6OjvlTnR/JHdVdSMIKA6dZLnTFhG5+OZ7BoQcn/vEwvuJ1tohvsYERL+M6U3BhN4x8gX+2yK38yjfHM/6wJUfkKi7st8Vpi09jUp0v4knPcbGuHnHyk5w8UeQpDor+cMR2z6cRGw5fbEfcFwPDH7LGUWlctM1g0MWRDk7qON+Cw5fw4lTMBuqHuzDi0diO8TpUHjphhJNPQ/fV3VHfvhKfq8qDQHHgFz/EA58Zn8qRHk+RW+Fs+UbeupztcWzLVTmv31YeDbSX3WwUR7lu/p4tpy/AkEICcUa/4zu+Y/m3KC6mCr6aIwjkhGdatPtk759eP/7xjz/L7SEjJx5jsvDXKyBckBq8s8WAi6/aizYljkVnBoMtyUdHMrgA7iQyg8MfY9j7e/hk/Gcw4uJCvcWWf+XR2biIr59di4t3CuHV5MDrbBEPD677qTC9cnQcuzVWscSB78bD8zl8Mj7a6Fev9dMjI//9UMUi8Y/+0T+6fOEXfuHCxxjRh0d+q+hX+A2rd7t5T9NMgZ8NvvjptTw9isEWvjEshjDENNwt+a02/rYIyjNrSbHckt9qa3yaM+7MW3/it6Wz1QZHPNzdl2OOuxDakt9rE5MxHvzRxtezhaz5791I4x3R8vUsjjyFI++V4rKnjysbxU5tXOOAF1/KlT2ftJcLMPDwnjf72ouHGNvfKnGRH3TMWziz+d67rXAytvCszTMFb/NPLU+bi3vc97D5a/3DQ6435/fkt9phGCPxiBMes1zMF77Iea8JgiXOMzlmjOSWfDdnGvPis8V/q408LgpeCn/28msRWP1xwweOfOcDLm72lHMr8QWbLTbyvfeA9SoJuvWX81s49RmbxmUtt3d8+gIMGSXHnv3sZ198gncyqR0Rk9wiWCA5ZRKQcwcMwYc97GGLzgfLHwNu47MYmOT2fQVQHM76Kk70vUfMv1Wyb5spTUZxlxTGQyI1Qc5gkTc58TBeXTid0R1lxIUf8sdCjs/RnZ5Rt31ccBBPCxde9sW65E/2qDYWuIhHExwf+FtFu36yYmeiGgtt40mJb8V8jZP/Xqhqzjzvec+7+CfwFi3vNbJwwGt+7XFh3xjot8kTMZidS3xgS9zEwzuRvCdqJjf4BAMWnA/5kA+5N8Zr/4+O+dD8wENMxXEm38VCXOQUP4yteMKY8amLE3fvYShwxHimiAkM4yJOOMzmKX/MOx9esy8u+MwUuW6+wMBDLd5Hc6axFdfyAw6/tOVTObTmA5usojYO9I0NPDz4Aos/e/OGnHmeThj8OVtg03eRwFYxhTVTcJEfcoxP7cOeLcaWvnjwDy/4Z0tjQN4+HHizuSE2cpRPYorX3pjucWNfTpn/ctUxX47yawuLbZv5X0wbuy35rTb65Qs/8LLZ3ypipp+dctq+dUhcXOwX0yMu8PkNr/Wsc8OW3XXbNru11HCMlAFrIjCuNPHUBqFJaGC00ROk2RPGYPoDdlfSNBB8NRBi8GEf9mE3c/apROw8WzdbjAkeXhponEyQ2maxvIFaQknMWzAkrwUQDwvgzGIzcuWLHMKDb7bZIv9g4HFGP3+r+SIWJlsxrQ+XMMnlp3nA5p/9s3/28spXvnJ5FYtF06dgi58coUeOThhr39jJRvsWHCf7mTLydedN4cue3SNsfuIgHsalxfNIZ91XrNxR/NAP/dB199SxT+HiMfo4A+DOiMW4lx/fEhOxsJVjMGb5kPcjJnliDVBmMejIO+utsVHKxeVg4w8bjUe+w8BDrU+Rp3t80q8mb2zLj+JBvzmyQeW9msiyL79m8x2QGNKXHy6+bsGAwydru+KFsGf5LwrDGJr7YnrLubC4uzuKyy0Y+MDxIdB4lB+NeXzP1HxpzpAfx/2MPhlriBsz4wvDZ7k4xzgHm7t0bdb7a2sSvsnjgocc6bqleB/5koxarovJ2TJ9AbYGzlGf8P1LIv9Cw+LT4q7fyfc3fuM3ll969dbdNc7d8V0EHuoRMOEVk95kbHI7Ibur8rSnPW25I5DcQ93fO/53EbiLwF0E7iJwewTu+wLMp6p3vOMdlz//5//8wsK/8fiVX/mVe//ewMnof/yP/3F5+tOfvnzCdbW8d1vwdjfuNO8i8HsfgfHTlg8e3dGqXZvi2Cfyu3IXgbsI3EXgLgL//0bg/JfPOzFyIvnZn/3Z5f8n/dzP/dzlZ37mZ5bbgH/qT/2pi03fv/t3/265zecrl9nbtjtm75rvIvABFwG30pXucPlw4i5Ymwuvse0DzoE7QncRuIvAXQTuIvB+i8B9X4Bh6nvPRzziEZc/+Sf/5PJ1o39N9Ja3vGXZnJT8M2HfN7szdncB9n4b2ztD7+cIvO1tb7vYuuPlTq+7Xj6kqLsD1p2x9zO9O3N3EbiLwF0E7iLwARSB98kFmAfWfLWo+NWL/zjva0ebk447Ah/+4R++PATpDsBduYvAB2MEvIjYv97ycGzzoYd2zQPPgvX1e/0fjHG48+kuAncRuIvAXQSuR+C+nwFzIvnYj/3Yy9d+7dcuP7P/23/7b18+9VM/9fLqV796sf6mN71p+WfdXkDZL3qu03roSfiayZ2OfhHh2K+qZu74dbHqDgp9v+zoxwwzEaELy8WuCwC/7Jh95ggG7sbXXUw4sxhxdgHODw+iwytO9V+rxZQen7zbxb4LmWJ9Tb9+F0D8gjE+JA93q4RfTVcs8sexuLz85S+/vOIVr1heK/HMZz5zadPXOOKrwGmfTePbsbHq4myLS/rGBA5f6MzmB10YdIsHjL0YbHGhWy7Yh+d1MzOvj8gfdosLHiP2lu2ttnTUeIhpdyG35Lfaiqk+GI4Vvs0UucG2uV+MivlZHLlTrqnhqGfGiC3xkK/iigOM5s0WFzJ0kinX+hChLw5k2x+xtCv6yOOu9rN+uNpHmVF3vS+W5RTu8nUm3+kYC/mQb7esqfmCfzlqDZkt4tCaIMcaj1kc/hhXeOXqbJ7yqXWdL7homyliaozYvuUcky3jyic5Um7gM+OTHMWluNB1bMy2SrEXQ37bWlPliP3mAW57OPT1sSXX6Tbvt+yu27bZraUOjgXskz/5ky/f9E3ftLxc0k9J/d/HH/mRH1m0PHyP5Md93Mct2wy5A7MfcF3iUNLYN1H9lNyAnC0mpwSy6HgNhXdEeVdJSXkWBw/P2zkJmFxe4VCSncUwZpLY18t8gantlmKRkKR+niseuEnws0U83vWudy0Y/BEjeDjNFDb982uvkjCpGq89DP3yNTn+46/2k3Y/Rf/Gb/zGy+te97rlQ4e32sP+xV/8xeXDBp5NTBjGQL+4+rUwPjZ9+LC1t+jEAwYZY9L47vHfas8nfbjhIe9mxpZ9OHTo9g/F97hv8dAmr+V3GGKL0wyOeMARV7+0Fk9x1z5TYPDJnPUzdDgW9Rku2YPBr3jMrnl0/bAJH7FRxHqWy2/+5m8uPsCTX8Wbb3ulkw3b5hgMY+LY+MDAQ70VY21jLrFtrlhH+EIXFn1xUW8VfeJv7uMhprDxOVvYsdbwiV0Y5g28mYKDsZRj1mR4/Jkt4uJDqDxtHcNrK4572GT55WJFbQ0Qp7047uGIgReOtp7xiZ/GeqbIJXE1tjDUeM0UMZAjnWfow5oZJ3EQA3HhE90wxnyMlziSwb999nvht/1iDRfHrSJe8qK1wjEuZ8tcJm6gFvCv/MqvXH7l6DUTyH7Xd33XIi0g73znO5f/fecOGGc49sFWGiDJY2C9iuPRj370shDP+GoAxdQFh/ezeF9M2GdxcBBjbwWWYC6Kb4m5scLDC3QtiLMnEnxxwUNMvH+nSXHWl+ScFMXFs4YwZ2MCx9uWLYA+DNA3MY98Kler2TW5vTner33/+T//55cf//Efv/y1v/bXlnw35hZWc4COsXQCUOhqy5658MhHPvLefBAXnI78iofaM5UuaGHcUmDwxeJRPM7i0LXxSeGjXLeA31LgGJdbfcmmHIEB7yiOya9rYycej3vc427ShyemLjo8BytGeMzOPXnJh8c85jELn1n9/PqlX/qly0d8xEcsF5S4wDnCakzlaDH0IeOP/bE/tkDiRf9abOGMWK0h1gC69V/Daa0gr5j7M+/wope/9s25P/yH//BN786Ky/jeq2v8G4fqYipPxRSn1oNkztT0XABaX6zNo59n9MnQsY65sGx8Z/2B4ULFOeoJT3jCkjP8KeZnuZgz3of4UR/1UYsK/Vmf3GQQD/leOVrf6xtz2l08MTHvGu9rPJxfW/fIOtfhcrbc9wWYpOKEieplkxZSRDwHprzgBS9Yrko/6ZM+aQmQk+gHW+E/ny0wascGxeb4bJF4MMTUVbSF3El9BoOtElgSlWDaZ3HyBZ8WilkMk9okVbugvAWHTZ8w+FK+zU5y/ltsTNJ0cYK5t/CwpW+scfFvVf7u3/27yy98n/vc5y5fvRsrck7gajZcmIz42cHBokOu8SJv24tvHBaFB+9ejbfsaz9bswVTjrC5Z3cLj0/yFAYOxlfbDAbc5HEwvvlY+5btrbbkyxHHuM0W42JBxcc6dQsOH8QDlpyAoW2GT+OSXv7N+mNs8FDY59fRCZKdNrYVMYUhHvK3/qVz5w9dss11GOmp9auPYpJ9JsjC4E8vDd0x/V7N2QjL/De+2mcKnnyhZ12G56XBt+Cwa64oxXOGC5u2cc7M6CfLBx/ijG3r0qw/sMR0/Do1ftk5U4sHPnTHnJjhIx7GFg4MG9z21zzC5jsZetZkG6xiQg/OeDxiOcfTtckR+i7Czpb7vgBDzAC8+MUvXl606t+tvPCFL1wWaCS+93u/9/Jv/+2/XZ6T+Rt/42+c5fWQk2tADab9TgZOVDOlhDGw6WqbLXRKjnRvwbHwOpGkWx3mmRqPEj35GRyynQCaCDP62eQHLqOu/fE4WXUnkLG273a5V6544L5/K+Rlw01+Mn0ySldOZIcvxjZfRluj/XF/jB8cGC7wwhxlj/bLUzK44RHHI72xb8zLEeMWLvwyJuUIO7M4ycPIlzHeI/ejfbrlyC086MDIn2yN41zbUV1+5Euy+dnxtVp+wEoPjyMu5Opn27GxhqE4PhPX7FWLaba1wb6GQy59ujBuyXe88ylfwr0Wv7E/HWNrniu1jXJH+8098YzTtThs4dHlS3HdkrnWVkxHH8b9a/r1wzGe5eotGGI6xgT2LA4MOvgUZzFyvFXWfMmRh6Mei74jPvpb++WoO4Jnyza7s9oPfkLyXfI3f/M3L58KPv7jP365YnRlbfNQ/ud93uddXvKSlyxXhxPQDxlRg9kgGHwDOC58M46ImcGEZ+vT0gxGnyh8pQIPp1twfBIYPxW08MxyGScGPrcUFzT5gsctXGD0iZ6+mDRZtzjVV03GvtetuAD78i//8oVTn8rjBHdcqLXjnu99Uhttwh3tjH32xbB+eMbGNlvShYWHT7CzuQHD1ocM3GYxRt782IrJKHNmHx+lOJ3RGWXwEI9b4hoOP8TCBqcxr/9MTQcPWHyBI96zJQ7qWX12s42HUg5fw2JvlG1cZviPORWe+paSL/y4dWz5A8eaPHKb4RN/67J9cYR5S+HHLXHNFttdoNiPW/1n6vTEw/6tc4ceX8SYX2Iyy4cuDLr4KDD24tt4sjfaLUe00b/Gg5ziGoBs+kvjiT/vfal3QmEtwtmf+qmfunzkR37k5Q1veMPyDIa2rjD9QtIdsM/5nM+5vP3tb59+3mRt7wPxWPLZ+qRoUB0rewmw54e4iR8MA2rCz2LQZ99FgKR0DOMWHJO0iRrOHvet9rioFf4os1zo2YorDPvhLqBX/tAX32KcLi6w9JtAfZqKY/30jItPOQ9/+MMXHW3JtQ9HW76jpc+miKe+9Nqv3nIjWX328ZUfY/uW3rqNjezbxzW+a9m9Y/LiIE7iZZvFgF3M45G9W3xKpxrWuB/2tdoY8eVWfbFV+ATrljGyjoxzzjFfZv1JHhf7rScLwYM/yRMRi3xSw1D25t44lnSLw8g/XgcUli66CpywzurSI5sv6rYZDDj02Ff4ne+zEACIXAAAIABJREFUOGG4c6U4hjWLk27rieNbMLpYiNcshrgo5QS/YMziyKs2usV7BmeMo30+pV+9kH3wTzdIyOW/rtrFFg/r3JZ+WNkhs45HMkf1fd8Bswi7ovcw4Ed/9Ecvd0wMrOcgbIi5JechOxdgo7NHxB5KfQJf8Mf9o4Hb8i9dCWTreEv2qG2LS21Heuu+W+2POMbbp4QuBMdFY5Q72hdHOGPu3OJPJ0M4+abNvrYuKsKuTXubPmOjhGO/trUfuK/72GzR0m+L21q/4+TZb3FY4yZ7VOcbGft8YH+2xCGc++GCx8hrlksc+KLc4g+9cTwXoBv+rGN6i1/436J3RDe86i1ZYyjP1eWo43IvHf3XYjzasZ987dd8ZKPxTH/NIz7X6mzez/iW792pids121v9+bPVd6at2OVXsT2jm0yxEGebEl4yZ2o4xYL+LRjZya+OZ+ot20dcyqVkxMDYrvN9jM8WH3lBhp44dLwlu9V233fAOOJXX1666mtIL6P0lUxX+Z4P80sxv8j5ju/4ji0OD/k2g1gSSqKScispjpxtsA1id2HE1/FMwQHWWONUsp3BajKocaDrU8oMBjt05QIfwrI/g8MX8nyIVz7M4BTH/IHR3QU2ipEPEHx1XCGnwNAOw1ZM0k2+OpuNB77axGTknv7YFkZ2i1/t2e74TA2jjS2b49HXazj8Toe+XI3/Nd2xn464WLwqcPdikMy6bjzpwVPsz+BkV42P2CozcSHPPrtw4hKfBfDEH/mXzujbjD/0+YFHhT5Oez41huryv7kLA5a+PX0yo8/Fgg9hk8EjX6rjWE2enpIPI0ZyR3V61ead/T2be1h0cKHvRzb2O97T2WoPpxreGIstnXUbXXG1tU/maEzWGI7psz+eZ3CZwWl8iys+thmMuMBSwrA/izPqjlhbOOVAOo79gFC+y/3i0zxYyG38aa2gb59ea8eG+P/TdN8XYILvH3F/7ud+7vIesO///u+/eA6sE5Z/P/TmN7/58g//4T9cfiLK4Zz/f9g8RBsE3YQ00Db7XnngHUu+3z5bxNIg+orLu5VcyPrJspjNFlhsuwD281p3obYScQ+XT+T93NkJIR9nuZDHQVL6dQhOkpyfZwtf/PJQ3fMTxUp9toiBn8SLaZOFjzhZiBT4fnkK1/ttvMLDeCp8EAu/xrLRIyefxWcrr7Ur9VvA2fzVX/3V93r2gA34yS9Kwx9x1EfXhmfjOoid2o0nm14R4wcE+XgK4EEhfMVAnhvTPe57mOTpWSvEursLM2MKW2zE9d3vfveyLzZilJ979sd2XMTAO5rMO+OMzywXdvmCT2PGjvazRS7CEN/sw5rxhy3P5tIrr+jj1QXemg+O5oXxEAu1eDRXPA8KL1+qRxy2zLPyyVqGh1zVR0es4eTbqN8+rnjiQE88tL3nPe9J5GpdfuHDFgz5ai2ZKezLBb7wQzz4NDse8fGORzmqiNNWHPf4iRsc6081brNcxEMcxIauWoF5toiLeIqrNUThzywX/htX+UUfBzGGf7b061RxxUne8EktZuvChr5ymy0xdd4WGzhqOajeGyM41jDcFTbfr+8BYxSJF73oRctXkN7/9ZrXvObegJrwfv3oPWFIIjs7QOvgfaAdt6iMvAyaCWuQzxbyBtAC7CTgnTe+vjXBZgp9SQcPD1jGCPZMwV0CPuxhD1vwYO4t3nu4XdhIcP60qJawe3pjO10+qHsth/3ZuJhsfCkeLRZiI07w5KsLtNe+9rWX5zznOcuHCs8vaqdvksaDfBO8hWPk3T5ssZP35OULP4oH+za4e2MUhpp+ccV1prCPB3s4iYUc49vZAkPBxWJXnorBTIEDg994wOE/bmcLfUWuW/jEtTVmFgd/73kqHmJyi098waMyE1s6+MOwGWubsZrFkRt4yBWxMO7i1Mk/ftX62TAe7BkfsTBn6DvJlsd7ccFdH3mbYzni7gJc46UdDr/2CtutheRwwKXc29Nbt7NrzeGbeMIpZ9aye8fmflxwF6M/+Af/4PRaWK5bQ/DgFyyxOFv4T0eNi/HFTdtMkQceEbKG4WLM8DFWZ4vxFJvyXYz5gs9MgSMn+VJuzMaFPbZx6RzDNz7BXBdcmxd8d4wHu/JM3ooxjPxaYzgmwwZ5+uI3M57nLzG3rD/oNALuFDz/+c+//K2/9beWq9mS3KT1wDLHyNneVyVHBUhx3L5PKJ0sPZ/GbgtDMu7ueLOxgcdfKRGTWRpP/FkvLBY/P0yY9bdk8EnLc3NOSrNcxEG8vefFRPNyujE2J9xZROiYTDhIVj7ewoUOfe/OUWYxxERiiyVf6Nuf9ckL8hprGOk36WFqf9WrXrW84f6JT3zi5dM//dOXl4yS0W9Celmf99xpM+no1L+ObTbU7ZN1VxBG7dqO4qtfwcG+u4nq2ZeXxqGYmidi2nxd8986Zrf4GRdczB+L0GyBZTMPx5cozuDQV8wZ/3PWsXGZLU5I3oTtnYbibJstTiROaF74KaYwivlZLCcQd0nMfye4eIj5TBFTvpi/OIgLrD2cLRn5jsfoR2O/hdP6lQy+1mEv+2yusKNs6edfXMQQ7+5MGt+zBQYb5YcLdBdOH/IhH3IW4p5cnPExPs4pR/zvKQ47MMRHjsgPJ+9bMPhj3uIhHjDKkcHc4S4u5q6td3bOYvBFTF30iIfYFPND46tO+eE8Yw2hH4+Z2Hg1UL7Qpys+ci680Szu8WVT8eFLbFuX6z/ikW5+Gxfr0Nkyv8JsIDex/tt/+2/Lid9bwiWXzb8l+ot/8S9e/uf//J/LyWtD/aamHG5yNfGBeRbNc2kmvYsgL81UXJTghK+7G4961KOWVwo4iT3rWc+6d1v5KODXyNLFCZ+tgb+mb9Dp4ZqP13S2+vmJx/36Egcxu6XQx4NPYc3ipGtCFR8Ys741NtlPH77NwujO11d/9VdfPv/zP//i63RvNDcWxlPBgR94jDGhf1ToKNkMTxvd2vcw9Cejhhfmns5Re4tLY3Mku+5b8+2T5lru7LE44nFrwceWL3y7pdA3LvgU61kcuuXprRjNXbb5civOGIdydtYfua/E4VrOkTMW5BoXbWu99fGaF534p6+eKcnHxdjWNoNDNg7l2TX+e/jlujG+lcuYE/ZxuqWIR3PmFgy2xaF8x+GWuISDQzGpPutXdkc9+3t+sRnf5GDMxiN72XE8ru3X+N92Vh1QXXVKpn/wD/7B5aUvfenle77ne5aT1zOe8YxF6r/+1/+6TCRX6v/iX/yLQfP+dlsoBUww1RYLz5r903/6T5f/zefN/F6N4UT61Kc+dXlWjdWf//mfv3zf933f8k/E/ePwN77xjcu/koHj38vclf+/IuDrUDksL3xd7l+e+Erdp+Vup1s4lSbu/18RuvP2LgJ3EbiLwF0E3tcRuO3SeWDhFvlP//RPX77t277t8hf+wl9YHsD3HJgLL5u3hb/pTW+6uDvmQTsXSu+LMl55unJ1gvRyTBdfX/AFX3D5oR/6oeWikN0v/uIvXi6w3OHA4XnPe97lMz/zM5cLr3/8j//x8o/DHb/sZS9bfs3Z1fT7gucdxgd+BOTSj/7ojy4/JPE12Ctf+crla4o+MY93JLog+8D36o7hXQTuInAXgbsIfCBH4L4vwHz98N//+3+/PPnJT778m3/zb5bvgr141YWW7WlPe9rFszS+ynnLW95y747C/QbFnQh3vNz660TpdRee8XEXzPf8njsi853f+Z2XH/7hH14erv7FX/zFy0/8xE9cPvuzP3uhQN8zEn/v7/295aHEt73tbe+zi8T79fFO//0TAc8PeHbRw/Y/+7M/u/wz5r5W645Xt5jfP4zurNxF4C4CdxG4i8AHewTu+ytID966g+Bhe3fD/CTVRY7nq5Q/+kf/6PJwnIf13EnohPa+DGxfD3k4+nGPe9zy38x/8id/cvmZrYurP/Nn/sxykeW7aq8hUH7f7/t99y7Q8PfgHW4ewnXR9rvB833p8x3W+y4CHpr2z+L931I/WuiOqrzobqh9+WO7K3cRuIvAXQTuInAXgfuNwH1fgCHwUR/1UZdv+ZZvWf7fo/douFvQg++O3XHyPrCP+ZiPea8Hl++XfCdItbttfvWj/PW//teX92i5+HJB6CLx5S9/+eWxj33s8gsFF4J+nqzg6oLLLzDcPfNLOXfO9op3HpGB6S4JLF9LdaLW5+INH/24nS3dNeyCEi/PJ81eDI4PAcLwnB7scM/wIU9XgefrW7GavRMEQ2zEyMULXDErXme4kIXDtpjCEBPtW/HF1/jEnw2yjQdf9MMh6xerfvkIE0dt9pOPq9oHDb9yiQf7/GFriwsddtTjODqmE8ds7sU3nHwRT7izF4R04knXvvwYuV0bE1zxVONPFwaOM4V9OYmDrVeTzHBhE49yG6bYhHuWj7jQ4xdfFLjGdqbkk/zALd/2xnULu1zCB54S1pb8XhsdGM1dckc8imXxV+O/zlNtcNR7pZwnB5cf+aC2neVCFh4exWPP7thORx6IgdIYz2DQ42e5ocZHjpRzo82jffkUnvyoHMUhmWoY/FDjwRf7jVly12oYbWE0rtd060+f7eauvlkurR1+DSkWxeMov+JQLQbyo7nbuOO4hUOeTHEkY1+BY5z5kY9HY03XWNAxrkey8a2+7wswRt1h8g+KPVvlTteXfMmXLL8kY+QVr3jF8k+LfcU3+5P5SO7VBah+QfC8mbtZP/IjP7L8PFaf57u+7Mu+7PIzP/Mzy0+icXYCVhpwdz6cXGFuDVg2nvvc5y5fZ3YRwaaBcwy3QZXUvnIdJ1oYe7U7iDBcALpwdAHpnSQzGLDh4CUZve7A6zYcj5Nkj0Pt/JB8XmXhIjofTZKZIs5eUyCuPdTOvxkcGL/5m7+5xFZ+leQmCr/WBW/j4bUCxpUvycEx5o7JqZt4Wzh4668WQzpiggcO8LSztS7Z0j5OTHdijY08iQPO8LZKOSl2uDipioWfTs8UujZ4cg0PNvfsbmEbj7iKoQ8lCryZIh6w+O/utQ9Q4sW3s6WYiosXsZYfcGZ88oGMXS+mFRsx4o/xmSl4iIf4KMV5hgvdd7zjHQsfeGIsB8uBs3zMXT7Boy9f+bWX78YBz+YLPTGV65X8wAWvdSkHYLBlTviKH05tzTtjtFf0kbOWiYE8hVeu7emN7TgaV5zgeZWF/NjiPeqt93uXmHhYy8TPWja7Lrc++JAu1/GDsTceax6OnaP4Y+3gR3xm1nY44upFrM4R4zrWBcyW7XWb8cTdS6Xt88c2M39h+gDsmye+NG/Ls7XNvWM26Vrz+RAPbXvF2iOGfCAvpl4jQd/WvDkaH/h0FXjWCxzOlvu+AEPAu2Y8bP9jP/Zji/Fv+IZvuGffqyC+7uu+7vLsZz97aePwUVDuKZ7cCc+AmajeSeLBehcuklKiPf3pT1/+RZKTryCZyA2w4Eoei4SFpiDC2irurvkH4+SagGThwJQIfgmKx8d93Mct2Fs4W20wTC78THrPscGRCDOF37Bc5EgG72gRJ7E4W/JFQvbuHX7ye6bwp7uC3icE1/jP+MQXXxnT8U45x/Yl/l4ukTE+4kjOsUmOv/Fz7IRjI7NVxMxYkGVHbWJaPMXUsUJm7wJMPxthdeydaP53qnjoh9UitoCu/lgc+MGWgoN8dVd3prCnsClXi8devm9h40KeT11APuYxj1nm3Jb8XpvcbBE3Br03rxPVnt7YHgc45rz8kHMw9nJj1G9frpgv8urRj370wgu2E95McXdUjN3tL8eNWftnsHDBX36w3wJ/RneU8Wyu9005wRlvcRGnPZ/GPOQ7Wd8M+IYjDs2Fjkd79vmeLjwYLnx8KLZvTLSTKZfXGI7lJix5xpaxMbatRVs667b8Fc840cdlpsBJ33ooBnBmxpQ9awSc3hMnHrfkBj4ursWHL+I5s7bjQtc3PtYzr2yCYWxwOlviQd78pwtnZv7SNWfMXWuieBhvcdpbl7f4OX/Lmc51uDgWl61zVrllLHFWXJz7kZ75zzfji4dtL1f1wZJjePtA7ELybDkf7QNETlgsbBFK3N2xT/7kT16SNqfqe1/VAiDg7hgZfAuMZOqkIuHJOFn4N0n49i924uDFh4JoANOrb6yf8pSnLL+Wg6eUdLANmE9oHvp3knK8t1CNmO0b5BJQTX8reZLfq12siDVOxYNsibanN7aLAfsSShLzE6cZDHj4pwvTvjITF/L0bDBwOOLShBGHJrOafpMShjbjeHSiri++ji1abNi36ROjZBYHhz/Z0kSerq1jNd2wlo7VHwsUmWz0KYvOTCmfcOI7POM8g2NhpNM4iGtzboaLeQnDfITnQkHRdrbgLRcU++XtjD908TcmfOEfTLGZ4QJHHvAFXrkKo3FbiF75w7b5S4cfM7ojNLs48Me+DZ76qBQ7dsUkHvaLyx4n+RW+caVjvsCkqw7TcbJrPuZufLNLN25r+a1jvqeDL2635CkcBZb8CGvL5lFb4wBPnqj3/N/DKU+tY3g4vqWwzRdjMPo3w0c86cr35syMfrzp4zGucbM4YgHD+c44OcZtL1/IKvrZIq/I2dq16Q9v6Vj9ocumjbx12XXE2XLfF2BdVCGeMwa2gqAJKOHIjM4mcz81m04kbLq48iC111/4lSOb+LkocnHmjhI5dw28OuMv/+W/vJiWzK9+9asXbq7k8WyA1twEWX8+dgIfT2z6G5AGdo2zdyw+ClzcHfNxtrBr4RrLLBfyeChxmMXAAYba1vjP4BgLGGNs7GvfwtFWLso9Y6FYrMRUqT0+S+Pqz+gzzHBbvIjzSbu6nFjB3OOYLbzzZW1jrdsx/8mWl2xZuNieKY0DHfsWC7gzOGs/4eTbDBeyxbQ8q20Gh22bDxy4VGZ8ogNjnNvabsHAYdRrjON1re4ixljP6o7Y9MsX7Xy7NtbkcY8/X8K4ppttduiUJ+bLiBk2+XE/fTW7NjZtsOI2yp3ZzzZeyp7NPazyCx/rh1obXjMlHTzsK7Nc6GQXj1v0YeBgvozzDqdZPDp4VGb16ckPhV/wwizvwj6q6XYhR1/hW7m31h1zqXhmu+N8qV5jOC7HraPs001/S37d9n+vlNY9J48tFgaAQyWEJB2DZ782Ax/pkyY2xQSrwHBccdHljttXfdVXLa8V8PWnr79cXHnBqgswt9S9NNbXpM985jOXizE/EPjX//pfL3e23H7EceS/JpCvOLTvhI4H38TBViKs9feO+QNPXTLZn8WBX2yy1dh0fK1mUyJV3w+PEhNG26xPJbZ6zJ8tnHzX1zj6+tHXx766e8ITnrDkAjlYWxjio53M2G/fxK6teg9H3HFWK/isMdY2tsZGDLMFS46qa9vS2WvDh81y7Yz9EYt8Zdyf5ZIuPulWh3+mpq8Yg3EcZrDWso5n44IDHXwa52tryZZ/bMuxW8c3TLbzSy02Sm3J7dXsx4Ff9hX+2S/uoz45vuu3b+skn911Peq3Ty988nwZ511yRzU9OJV8yX7t12o80jEP8622a/r10xMbJV6zGKNuuOpZHD7h0toc1iwOPVj8oWvLtzCv1Y0tuXDGmF/T1y+25XscjvI9GXWlOQerAlNp3GqvplMMZ/2Gcd8XYAUMWEFT2xRX2a5COVVbnyJcvHFQu7auhBfFK39yNkzivg/3EL73kL3whS9cfgnpK8Vv/dZvvXzhF37hPUT/ZsatQs+KveQlL1n+ZZGXb37WZ33W8jVI2PcUhp36RrsGx0Bqs7nzdsutbmbEiY3q7A0Uru7iglN8KMTvqvKDAtktiTXXdhYjOXq4qEv4W7DoFhd4eyUZNuJvrL1s1b/Gcje04rmMvdv4cRxt2Rfbrb7awlaTxUeex0W7STvKwyVDfq8kT1YsTP7a9nS22tOBseaxJb/VRhcODvyyhbslf9QmPngot2LQxeVWDHbLG3VjPstHXIoNLnBmMci3FqY7Yi5OnvjTOltMwqo+gkhmzEdt5dzYvsYhZyun4167ura17nhMTiFrU2pbDib/3A8G3XEsb+GRjnpcC2qfdOe9YnELhjEsR+i3zfIgP+rOciHfN0hhzXIoR0bb13KUjcbVvjWo9bBcsRY0F4840SNrO7K7xrjvC7AHhq94gJugLaajsRY0t+r6ek5/ZKtHnVv3vfneSzVxM7CdcAsqW36p+Rmf8Rn3vh51oaZcu+Ld49Tk5J+Tugs8yT1OtD3dsb0EotsJJd6j3LX9JpaEUODegkMnHrO+ZBeX4noLDz7gsdbd86cYlot+jeriy53RT/zET1zys7jIjz2cJhPunUzsFw/92drDKAZyLll62Yenb8u/ZeAe/OODDLnGoP0ju6P+uD/asj/6Mcrt7SfPH/z76m+WC31Y4jnqjvt7HNbt6eCjtN6s5faOx7Epb/Zkj9rxoC8mnVSK15He2EceTj6t61H2aN86XBxgWJvkj9zZKo0HHfLp4kNHf3Wc1jh8J0OHPh02HYejHvHXGI6TzweYtj27Wxhk2VenJz/a39LZagtHn3Etx2ZxcKHLN3Vx3rK51zb6Uxz3ZI/acZcP/FHgKrM+4dD6bpzjt4Cd/CNnbGJCv7yb4UJHfuQDHOf/8mdNBTadbOkv5xobbfqPeDSWZMvRta2j4/u+AHMx9ZrXvGa5y+SfcLuL5H8w+rpP6YQhwJzpWB/HOKC9BDgie6ZPQrli9evBAgmfnZKDXcHydaTSxJZIZG0zZRwg/tE38HBn/MIRFp1RdwYD7+IqDuLh+FafGq98nOWCD9v8iZt6BodtvtiM6Yi15Zc4eq5Pbv7AD/zA5Zu+6ZsuT3rSky5f//Vfv3wFWc6NWAu51Z/sjLV9Y0sXjn3FcbEaYXBvPMnbt6WnX3tye3FJHvZaZ7R3Zp++XMcXLvtb3PewyBd38bDFf09nr13clNG/vRjsYchxfIw3bjDtzxR6/BAHvsCAmZ9nsWDIU3jFZIzXGRxrpXjg0jjNxoQd3PmRL/Dw28PK77Efj47101fybe1PMaPDb/wVesVSvacfXjKOyY7xTOZaTa9STsDNn/qu1XDCipfjWRw+dH7KJoxZHPlBpzyD1biEe63Gn056+TfDhY78wCP92VzHU0zX4wJvhgv98s2+It/XuMWFrMJG3MWCL3TGtuTSHes+wMsvOrO87/sCDJlP+ZRPWd5b5d1bX/qlX7pMeG2Kf/Hyl/7SX1r2JQ4H1TaLZAkwE+wFbOdP+HANgFJSqNlZ28KFLF1FMGcKPBj0bOz4Kar/CDDzviv2fSpRey+S55a8l6hkOMvJpKBj8fPTWs/BdXwWg094+HkvX0osC8hMMQ44iC8ePpVIWvXZYkLgwS8/A1fs72Hg6hd2/rn2V3zFVyyvSfmrf/WvLu8S+7Vf+7Xl4gxGJ+51PsQLDv7GFAc1m8ZaTIwVX+gb863Y0OO7fnh4w/SeN7nhbin9bJDbKtmABdMFprusYjtT2M8ePc8/lrtncczb7qbQ8SOXEfMsDl8UtXznixjic7Y0Pjh5zYyftItpMZ/BYZcvdI2HbW889nDxkWMw4DmGAetskVO/9Eu/dC8OMOROFzNncfzSW46Zxzh0MQdrq8gNnHEvV3t3Fv70jbP8I7cXm+KnJut1KcYXvmN68PNri4s+uSAW+HvXlGLezBS/zpOr7PFFTODNlNYrj5Z4hlQcrEd7/u9hsytu1g6/LscJlvpsae6Z+/Ssh3hsrT1HmMbC+cU6Yr4YX36K1dnSWBoT46WoZzDoyBPnBrEtN/CZmTPyXDxgsI+HtTpea59w56/xYIecOIgJPZvxMj5k1VuFbj/24wc5a9DZct8XYIj6+bj3fHnZ6g/+4A8uz1Z5+73yxje+cXkNhQff3RlTEOW4VzX0qoCl433wxwAKGHyLBVsV7ZUmpYQe2+nvDVq6W7XBZy9dCe4uoHebzBRJ0ALhLh7+EmWm8AEXYyO+3r8lMcZYXMMLg1++nlUX22u6Yz+78kM8/MyYf565mplcfGEff3ct8bDfxBnt2TchTMh/9a/+1fLy3xe84AXLHTCTU7v3GjXBjD28raLdeLJDTk2PD8bVPh5j/qxx8Lblr7Ekj4dnFuUh/+pv7Nc4uJAha7NwumDxnqeZEgYd+zDEYy8GW9h8Zp8fNvPYuGifKezTbyzFQ740h85gFVtxpSseYnptXNbYdG1ObPIdN8fydqbQM7b+qbv8yL8ZDNydoMWjWPCz/Rksc19OlYd7+QVTDlg3+cwPPPjQnBNXBY/ycM0FBp9dEJDLf++cakxwIXfkDxn28KXnxMgX6/XZwhf6xhHffLEmzhQ+yHe2XdDBs6YdxXILvzEQ3+YtjkdxWOPAMDbmnLq1HceZQtec4Zfxdcw/+GcLWeMsruZMF8xn9ZMrZ8qzfDTuZ0vvRbMuyxsxNk57Y9TcFn/2jIF5q8aDT2HgIX+2inNBF2DGgO2ZHD3v4Zb1B9/zxIE2D7h/3ud93r1PKv4FkAfdvT/Le8K8bPHLv/zLl+PZAd+h8F7NgtCEE0y8FLUkq01dUNX61bW9F+iVgxYTmIq6l+3N4uHIBxPMBYuLuHCv0LjXjQ+7vVi2E9tMQgODIxG99RkHMZqd6DB8WqRncsAI6x7hEztOSDD4Mo7VVnzF0Ccq/voF7OMf//h7J1IxbdEywY5K/hbP4tHJgB3241C9xoQTZz7Qg+EFxjC16VfsHxVydIytPBePmUJXYceCUzxmMPiZ7y5YXFB3op/BwQUWn3xqLD+uxWC0QddGp3EppnvjMeq3T8ecc3dCvtPVNjv3WpCNrQJjdt6x3dx3woehzMSFvHnn+VdrkSJOuKi3yhjLxte4tAbhQQa/vdjW7sRmn7w8c1Jjmw/ZSXaLi7bir3bR5Hwxk+/02FOz5W4RX3omeM/uup1u/ogLPBccs+MRDxc98kNuxXFtc++YvOJOnpO9eRfuns5WO3/kKh+6GJz1B651qHHJl2vjuuaDh7XM/K/IkRlB58nfAAAgAElEQVQ+5F0AtoaIrbHam7/1jbETU2MjR/hAV5zw2POJXQUeOTkG52y57wswxMYr37e//e2XF73oRcu/4UHCrWPJ9pznPOfyiEc84vK6171uef/Wv//3//7eC01LxNmFas/J9Ym14IXveBzc+uGN+3v463ZYBqLBNBgSarSx1tk7jmMJ0vGe/FY7u/yAUYLAmfXNuNCHI6b2b8HAESebGCmzOOTzq3rkY6IUK7U3kfvXU2PhBzll75PRKN8+2+MGZ+Rj/6jU31jgL7ZqmzL6cg0rvTgdya/76MZH363jUW6ItfnveMRd2906DoOemBaLLdm9ttFmcbkFhw4+4hGv8mnP9la7eeLEGIewRp5bemObXBjH5RYMePEf/dK+x0V7OZpuMU0vv0a+475xZC99fY5hZ3ddj/rjPj2FfOOS7ii3t5++frxxoj+DEXZxgGENGbGTuVbDYFuM7atnccIYbWmbLfwIq3oWI/kxZ+zPxpd945sfxSf8M3XjOsazti398nP03dyloy+f4B35o49s58dRd8vuuu2+L8B8hcGJ//yf//PyAtSXvvSlS4K6klT878Sv/uqvXv51A3JPfvKTl+/iXYj5H41OhCZtDq8JPpSPZ30i32BLyBbhW3HojdtMLLOJw60Y7NENo+OwZ/kUD7WJoZZ78YOnrRiu8fXZyDdx1jLjMVl24qtOP1stGkd49WU3HjBqy8Zof2s/rDDO6oWVPJx8qS2ZszU9261c4sAejGrtMyX50Z/azuKMvow6s7EpFvkz5s+Ie7SfH2HE7Uhnq6+x0Tf6Me6v9dgsp/U5to1+iO0exlp2xKhPTX/EXPNw3BiSpZPeluxeW1zDUNtmSzrh4BK/s1h06eQLvVmM7MYDRtzO8kguHvRtraX1n6nXGLdwGTHYdHwtN9bc2A1HTG35tZZ1XNzJtE8/ndrVRyVdMmTDONIZ++77AsytchdTz3jGM5Y7XM961rOW1zv4/1KK55gE0x0hBB17QL/nmvq+1hXkB2O5NoBrn8mXPPXNYtCjk964H+aZetRPvraOr9XJV5Mf96/p6y8e9MbNgtEE6BNNslu46a45HPFJZ41be3bWx7VXH9lY80lnXefriDXur+W3jpMfsWrbkt9qKxb01tuW/F7byGGUmeETl/Tj0/HZOr2xpjvDJfkw4jaLEU7cw+v4bD3aHTHG9hFrzbfxGWXSrR777NdeXVvH6q39Nc76OL101/17x/mk/1aMETv71WPftf3sx6X4zmKN8iPmNfvr/i2csW0tvz4utums67X80THdUX88PtKrL/kw4qa/tmSrkxn7w0lm7KttXSeTbsdrua3j+74A82yOfzr9+te/fvlXQIy4CuxTlH1fUThBPvDgvyR6/vOff+8WNbICMepsEX0otvHLdktx0VoMq2dxYNz61U622IaTH9X1n6nDIEv/Fn/CSBdOnza0lWe4djG25qYvX0Y/xv1Rp9yko6jZstFZY+3h0NXXxAyj9rDVZ0r61Wd0ksknx/Tz6Yh7umOdP/Tb4M2WdNb1LA55GOHcqj8zpls2ioVaESecZuJrjOjni3octy27W21rjDhU7+mM/WzHQ3t91WuM/E5Hv7a40LOfP3s4W7hhrPuuHdPL7ujPNb2x3/qiwLKvni35jEP6eJ2NAXth0IEzqz9yxiEMtTLDhTwMW3ziN9q5tl88Rg6zfoVRXON2DYdePoeh5ocy9u/5kX6xGDns6dR+3xdgHvD0kstv/MZvvLzqVa9aXnS5TlBOKIj1/bk7YuR6ZqI7YhH7YKgbxLO+JG9Axcam1D6DA6OvdunDahzO4GST3ohzRneUgWMbMWCWtKPs0X46aqWJAVsuueiSS9rjvsaja6tffcSDLLxqPowYta/tjMfZyOY4trWRP4NFLn26dEaM0e7ePh0Yxalx2ZM/amd7HZMj+XVfvmjHq1r7LQVGOLMY9MaY2p/FiP/IY8yfsz7RH8clbrBmSmNDhz+2a4Utfrfli7U7DH178SGfbHbDUJd39I/8GfHth2H/bMmGOOAMQ9sMRj6k17jAgjlTRv/tK7dgFP/Rn1kc/tC/Hwz81xiOj8Z1K15hqPlxC8boDwxb475ls9iPucBu46sdhrr9PZz68wPG2XLfF2AmmxOgZ8H82sXdLr/cqUTGoHjeq68i6TlhkvcrioKf3gdD3YDO+mLgxcnFqvgVw7M4EkK86bfdGt94wIE7W+g05vzA45bCfvFUyx9xcgdW3vllk6/Ds7VlA4b+4tnE2fNLOzvkxVMdhtoWD1z2fGsiq5V04cUhG3tc6NGPR+OininZc8E6YsTtDFaysPJllgc7YkcPHhzxU8+W+MQlH2dw6OBSTNLVPlPCyC/jxa84nsEqrjCKyS0+iQeM8hYXZc8n/XTUydLXhv+Yr3sYZJoz2QrDMVw+0Se3h0N2jFkY6pnCBv5K8ZjFyB6uMMIZ+SVzVNPnP/s2+tqOYrDGI0svHuItnrcUHPKFPm4zXOjkCx5jfszwiYOab+XQDJd4FFfXFvCULRx2Wn/47XiMh2N6uByV8pl8czW7R3r13fcFGGMerPcWfL90/PZv//blvUK9awUpjnoo3z/Hto90pV+jjW31PdTqBgNv7yV585vfvPwi6qwfYmXAXZB6aaCf+HpRppjNFGNSArow9mJI7yrZSkRte+1wHnjggeUVAT2rd8tkFwt3OL0awmsLlD2ftvJAmwstPqhh4WH7yZ/8ycuLX/zi5X9/PvGJT7z30+q9eL3rXe9acFz4x2PLf33w8TQmOKjFQ+2VB71ywOQTqy2fmshs2LcZXzxcOIorOzBdFG1h4AI/Hl08mVNenTBT2O+DEEwvyPy5n/u5GYiFL39wxd0LUH/hF35h2Z8BsuA1//18W56EexbHuIih3PDzbzEVFzHeG9ctbLElzxcv8C334c4UfH77t3/78ta3vnXBcAx3lsu73/3uZbzFuA+qe7mxx6/33llDjLt44yN/tgqfbcYEX/V73vOeJb7yPj/K4y2fxFE/O7DMVa/28EoMdotHc2uLhzZy5hff8TBf7KvPFlych3BnT455rUY5dxYnP91YsCbLN2MMc6bwH5Y8x0m9ty7v4RYXYykfxNa+mM+WXmUhzvjAgz9T2P1f/+t/Lb84z7/idRaHzV7fAMPaXI5tYWxxNOeNh/OD8THG/NrziQ0ydGzs0jO+bJs78s3+uE5t8dEGg63WjT25dfv2TFxLHRwj7lUTJqrk9h4wxDmj6BcwL67znNhjHvOYA7SHZleDaAAU/nuXyOMe97hlf8YrWAZdvLzzxgsMZ0sYkkgSejcKTjMTA4YxNEk//MM//N6CvJX81/hZfMUGThcR13TGfjouIp1cP+ETPmG56LBw+cfrLvhd2P+5P/fnlnfM4bfH0UUTHh//8R+/+MNHMRGbvWIsyKjJW6jg9LJOk1g/jo3/Gqu442UfjvF91KMetejVZq4cFXJ4KBZeWz92OdIb+9jGQy03nFQe+9jH7p6UR91xHxc4YTz60Y+ePrGVCxY4F4JeCLs3dqPt9X4nIydnGF1EFKu1/N6x/HIXlS/GAr9rY7LGatH/2I/92CUf4lC9lt86lmMuHOSHd6zRHcd+S2er7W1ve9vyQliPiYhr8d6LMRtix2f5YV54y7l3N9LBQ7uy549+OGHQMy7eNQUvX8of9VbBFZdR5+EPf/jySqMt+a02XPCQH+z4LwfWoNn3gMGxmd8+RNq3Nu/FcYuLNnqKD9d8sb76oDBT+OHiwdouPnho21t7jrCNi1yzhsCY9ccY+QDI9hOe8IR7HGZxxMEFGF+MN9xZf1x/8MULkNmnLz72t3K1mDW2ZNyscGFtPaQLg9wRH/2KGpbzpfPD2XK84p9E8X/23vCGNyyJjayE7w6YBYlzrlAf+chHLgv27KfKkzR+z8QMcknHVzGQSCbX1uAfEW0gTTJxhNMgH+mNfeyzKyElRXeMtk4me9hkJSB9+2178qP99b5kxklxwYIb3K2yFa9sOzmKixOKfHre8553+aRP+qTLv/yX/3I58dIVM/JbhU0yLeqObXuTvT7cG181DmzYh2ezn8xoW7xsYZE1LjBGvfpH3XGfX/DZJauI656vo+56Hx8xgAlDfuBytmQfH/vjh62zGMnBEF/xsH9LvtNR+DJ75yseajyMTTzUe7kx6o37LdpqcVVm5wx/rJtK4wQPn5libMy3YmKMr8WXDFtiqRiX8kVtw4PcVs7op0um3JQf8ddOBjdte0UfrmrybNEJc09v3U6vuMl3eLdgwMUjLq2pa3tHx+ziI8/s9+HtSGerj56LBTi35ljztnnXmG7Z22vjg5su4opHY7Unv9cu12HAa6zsi/VW2co7beyP1xb04WwVsSM/5iMO5r/YyD195NTxWmPJdTbiBBPG2bLN7qz25bIkgoutPokjZML1HJgBtnljrzJ7xT9B5fdUtImJhAFsAWtgzpIjb7DFyURTZjFKOpNinGBbHI6wSzpJ1YQ4kt/C19bkjJe2sPd01u2+unQB1oLzspe9bPl69j/8h/+wfJqU9GIGd48j+2u7ZPfk+a1U0zcxTXJttnHc15wdhz3yamy1xad6C0NbuWCfrDiYY+Hv6a3b8bUpdO1fs73GKB7a8bLhM8tFLBXxhNHxDE6+wElPbQ7O+hWH1qgxXxeiJ/6wuRXTuJ2AuDf38aEnLjP62TBOxUA8KkdYjUFzBYfiQU/7kb4+OmMxvnDjQqb9UW7cF8NxbMlfsz3q209/HA+2j/ivMcJJDw8nZeWaD2ssY5Dtdb2W3TvuwkF/GPxrf09v3Y57+XVLnofHbvbVY6yTuVY3/8ub1pcZn/iTXnOf/h5GsskUD7neHMBb+x6G/vSzCfdIfh2L+74Aa+H17IRnDXwHi4yBUATXrX3tT33qU5c7FWsSD/VjvrrQ2Vooi8Osj2I4xnFGn01JkL7j2s7irOXDOKufXDxKyvxqAiR3VLNtIviEIpf8b8fv/u7vvnzDN3zD8k45i5LYGwOLCfmt0mQa+/Eaj0c9XOmMNQ7s0bHPjy3ccMiFoS2/YcBVihG5vTLypMc2f/e47+Fkjx7MEfdIZ92Hv1jj4sOGepbLyKGYqovR2ubWcTb5UfyKa31beuu2+PfBaUZ3jbXFZS1zdEy/mMZLm2220LfRLa57vmknS678VFfa1x9mfdXskItvx/JVvhgjdmyNV7pjTU9J1nG6o9zRPt2K/dF+7WfqcHDge5zO6G7JhAEv7C25vTY6xYPMLRjGj171nq1r7f+HvXv/3ucr6zp+/wO1lllLO1mmorKSEA+geEDzlKgRykHIM2pCpogaLUHs4CGPiBqaKKaZaB7QFFJUxFQ0UwMSDZRFZf8DP7Yes3h+3Ywzc8++P98Qvr6vtea9Z/a+rtd1nD37nnvuefOlBQu8tmty4zgbzGUom45qY5RtPzlY0VG94Gs8XTDEFVXD+hoPd2z5j/AlH8bIt7d/zwswRe35jcc+9rHLQ+eOGeCEQ4y3CGPoYx7zmD073q77+TsWIWckA80kA38nxC3JXBS+WbcJHAY8W4USz7W2ApXH8e7SUTFuYbJhtEM81MgMscVCn27/5P3rv/7rl2e+nvGMZ9z3HAX/bHj3Yu5rS744ueQLL9v27KEPVm37YmtzPMZ1Sy98hK8LGL22MZZk8Y59Y4zkwVh+jjaNfNf22QDDhMeHFnF7eo/w8k17FPc9DD6Xg+RhbcXxCENsyPGnr0PVywzlf7klu1cXR7hsgZE/2lkcMm1jrc7EhY3lpX25Zktz1dqPbKZHPGxhFJ9r9Q4TLwyyNjEJc/Rh3N+ypdiJp/PW+Xsks4XBFjGExRYxmMGASY4NqFqzP4szYrDD3ZZZjM5d8mzR6is/i5En/ow5Ku+zGPwR23Jcnc/6BKPYkG074cZbsPAjXwyYC9xVG2s2ga0+evmCik/8e62a9JxmcrO2z10JN6zgiP//6Bd/T37yky8f/dEfffnMz/zMy9Oe9rSF20tan/Oc5yz//9EDcgJdojbg3m67+GVikwCkqG6hEiiuiukWgsEWGGId1swJlowLmQX0rTljCyy6Z/SPfpN3Mvmfoj/6oz+63EV93vOet9g18tk/0mHCG28x4+3EWeMcHTupxdfkJ+/sK+9rOf1dALrw6bOV3+zYw4B5pGOt8+iYDj7zgf0tbI9ktsbYAwde/m3xXevjuzgUm9prcuN4Mmq0hVe2jXxH++WjeJzJyRYeW8SmfLFj1ha65UcLj/wtxAYxyTdYR+dxPtNFZxcz8gieiz4+2x5VD3joKz97/Fv9dGYr+c7dLd69PvbyAU45OLJ7D2f0F1Zx2ePf6w+n+QMfrBmb8JO38Ul7C8EhT7c43WKLWCTLjups1p61H8W3ujuDxw42sMmcDFPdZN8awzj8WuPk0JgTcyScPVtcG5OhSzxhnqV7XoA5IX316Ndp3/RN37T8au9Zz3rWcleMEd/6rd+6fE30lKc8ZfnZrQeoH4gk8UjyJMJELhEzycDbBb2TsuOZmLEBwbNvQpwtjFFeEcK5ZSLNFgXMDmR/r6AXhtUfGD5lsMMLf33q8NqTmdiCxM8GmxzBPYoLfnamR9sGT87LUzwr05fDTsz0acmG7diG7wgn3Xj5oD3i37IlnWHhgZUfWzLrPrLFjc3d4b7FFvXdxEc++9Y6j47Tq+WL9lost/DoJt+km49bvHt95OHwabwAZOOe3Ng/xkOO0S1x4Yf5GfEFLjxYe8ROGx4y4kimdqzbLZ+Saz6kJ8xwR7lxf21Tdam1hbPmOzrOV3HIhyOde1jZUk10vMe/1U9WTugnzx40Y8+YR3mBw8f83NK71YefXjXRopo9M7bQXz3lT7hbOo/61EtY1c6MLfSLrVaM2DHat9ZtjL/Zq3W+jvk1Ptb7GsOx2JHDx142lNct/nXfPS/AmmS8LsGD9gywGPPPuZFfa/hpuP8B+cpXvnL5B9xrI97ejyUdjYn36xA/N5bYsyRxJdTPcp0cFhszhUiX4vKJ0a9L/EzY3aOZooDBJ0XlXTUWP47hztqC389yYbFDfaiZGRwx8X4Wz3/9rb/1ty5/8S/+xeXVJ9Xe2fjS7VlEP1nmTxe6vRx1kuIVP22/2JFbX4uwgTxe+V+T/hEfPz42+PGKmIgFbGN7hMfWhCCvamzmvUiwYdBPnxaGRwgcnyVxU19acmrVe6vYNkNkxRWWOmOHmM7UqtjCgSEmXnkiR7O28EVszFe9S0jdzeKwhy9+zo6yb6yBazHySV5enDdiKx7rOrqGYVy9+1m8VxbQD0ONabcITz6LBTu8dsH5T8ZYVB11PLbVEhl5oV+dimW+HMnDyhYfZMnIiddHyO1ZYged6pzt7IBlHpkhMSMvHl79Ut3n51mscqBOm99hsekswSDjuoDMI/I8S3DMqWTlOAz9Z2mMq3eBjbk9ixGfWlcvYirO5kXtWXLeios5hC9ktfKv1tZEj9rS2vitLsTEHJL+5ue9eUAM6KUDT3lZ69s7npsxN1Ao/it/5a8sL2L84R/+4eVBewuwF7/4xQu3E8+7vxTutZNuA/7tomssWj46lly/UnN8lshJqBNeAWnhjPhnsBSyYnAx03aH4oxsPDDY4qSqbWymZbvCZod48Mu+oj9L5GCQ5Qt7/CISzkx8TaL8gcM/8UV78S2XtWTwmkBdWGDZ9MWz9mm0z3785Zcv+sWDP0e24MOP8NrvFvha794xDDr4Uo7ZMkPZKn4mHzXKDjbNUPHkR3mxn49nseCwhV/ldNYWPqkPGPTLLyx2zZB4jL6QLeZncbKB/uIxi0FXcbGAQuXtyI58pi8/9HXMtmjcr09LLyIz1ikcMvpt1/JMthiwhexMvbODDnJaGLYZDH4kO9qj5vkwS3KA+AUvG2dwYFhcaIvPXi6OcOlXryPGDA7/2SA+zhftLTHJhhb6csQ221my8BFLcxk5GOzZw2C3MfaS4zc79MFwHA4bYG0RefFDZHxAgHOWznu4g0jpIx7xiGUR9sQnPvHyghe84PJZn/VZy9eRRD7ncz5nebGZF/q993u/9w7K23e35EioZIgHUkxe+jdD5CtoK3Gf+Dz3tJf8PWw4YSkOLw29hRSmTxa+Nm7BcAsOn5wQfLmVfNIzcXqhYzQ7eeG3cHMHTUxn5cXUCaadzS2byakPeuXXHeP6ynv1k49jO/Lq9+nMywtnKAwycqtO2TFbY+RhuRD4xOhlvy5KsyQWMNw16lU1sxjZ4q4CO8TwKI57+O46Wey7m6/eb4mJ16W4s9nLj2drjG0mcHlx3qnX/Jv1yYdf3zyod7nqQrfn/6gnu901ag4aa+cIYz0mtz6ku6Dlwxms5g22iIO4ztZ7tvDdOSemt5y7bGA7HHap1XxJx5mWvPPO3K7GbiGxQz5gl5tZHP7ICxvUh/l51h8YbqzIi3jAuIWcM+YyNXIriat4lBe++EDV4miNW/3VGlcf7Oj6AGMcX2M4Tkc5KSZbvFt928u6Lc6dPga4KHrW61GPetRiMAee//znL5uvavyT7k/6pE9avj7agXm773ZSIkmTBBdq7QyRHScpx7dcBOgkN67gK5Bb7OluwIzsyCsOxWfsn9l3ctvUG4I5Gxvx6NMejE6wGTvKERm2XPNL3NlqgiCL2K1/zMk1W/AmLw782JtczvoDR0xm4zji880CSnsL0W3hxpZ7IbEpt8XpFjwXJPbcGhN+kBVXdEtcyNruNSYWcdUIO675NNajfTLa5MRVHde/F1/nxHhuFIs9/q3+US/9/LgVB75Ysv/WmLKhutK2v2X7Xp+48WH0ZYz5ntzYj5/ucMrNyHN2XyzUOyyYs7bQTVabHbMYbCU7yl2bU7f8E9PuwolzuFu8+rbyl172NK7ej6jzq/l99lp5z3fAJPG1r33t5fd///cvP/iDP7ishhn/uMc9brHbv+Sw0u71/hL2QCRJk/iS34k+FtaM33DWhXlWPp2KQlE5rm8GQx7Z4ZOFu08V5VmM+NJfew0HnwlcrWR3togrn7SNpedaKx5dGMoP3D0cvqev/NJtKz/60R7G2J/dndTrOBzZEk5xoN9W/zXfx3EycEZf1raM/Ot9vD4pmnzst92LLcWETzO2ZBvdtmJSXhq/1pIjww76b7WDXBs8WLfEpdywG94tJEdw6M8nOHv26Ld1bqRTTJyLsKI9DHrIF//0J6cdZcf9kSd7tTCct+zY4x9l28dbTtkvjo5nMEasbIJzC0ZY4wcWmDNYaxvYou8WSveof9w/g1l+yc3Khi8nY42HUxvfUVuNlON4jzD4X20XCzjZoo7Ha1CYY+scs4ilx6ZObWfpnldDgvczP/Mzly//8i9fvop0e5cDDEMPetCDllZfJ9CtBXPWqT8tPrGIJGU8rv+olcBioxWzjo/ktsbIKaARYwYr/bBdaDtJbvFJEbMlzCMMxUufuxCf//mff/GuL//CyomBYHRSzfhDlt5RpniPfYuSN/9hMxpbviBYTT7k9zD00yMPyRaPBejNf45igmXEx2srpiPOtf18DjPbR/xrGKNsMWDPLEa1Ocpdi8OebTDYcqs8XLEp13DGWO3pXfcXB76FhWf0cS2zdUw2X8jeYos6yx4YI96WztHG5NhR3RoXY30j7xZW/o84ydSSG/fXOHyO8IVV37U27PwuhvVfkx/H+QPH3CQGaBYnf8ot+VkMevPnXuqdLevzr/iMfl/brxbI2r/FprXeYlJ7zQbjeIsrPOT4GmU/PnXuuq0vjGs2uOOF+jBKTlzP0j0vwCjyvIPnJt7whjcs/8i225rGrPYZ5YKq3/ffPddw1si3dT4LS4UngSWsT2wztndiwSAPU+y0M5QNCoEs+2DP4MRPBo6NLbBmSDGrAW2FGd4WTjH4iZ/4icv3f//3L++Tqy/5YivebJqhYkMOXrHZwjDObjEoHj5YjDrxGA93jUMO/yiDX0zo1o8HDn+MbRF824iX/Vv8e33ZAQfB3NO5h8HOqDq9xRYY4isObLB1HP61trjxJ5/g6e/4GoZxcSA3ysIoXmcw8PAhHJNyfWfl8dEJh35tBHeG4GS/ljyb9nDEy5j8qk/H2vJCNxx2iZd2TfpRMh07b+iGWVzHOWGNE0Y5DGfP9i15Mja2wKlWZzDgZgO7i4f+WZx8gMMmx8Vjy/6tPjqrq/D41f6WzF4fLLKoWmHXWaITPxw+yWd1dhYDHxxbNsCzP0PZQCZZfXs1NtqbbjXqYX5y2RTfXlycK3jIWuPQTedZ+uOZ9KzEis+zTr5m9DCgfw3j149euJrBikXRMs4D+e/yLu+yQnj7P5SELkolTBIksZP3jJcVQkm0YNU3k1B6KkA2yQMbbLBmiAwMbX7NyONNJ3k4Uf0d15oQ/sN/+A+XZz7zmZfP+7zPW364kWwxFhdY+ZnstRYOGbLFtf0tWWON47exAQasMMge2QJDDkceOLZ8C38v12TxROSaYOo704aRXrahPb17mGyH5fyWj1swyPNLjcLJthlb4oXDl/yqf8/+df/oC3scF5s179ExOXMd/WyqPZJZj5kvxZfsaAe8GeKHjdyIsxcbPOmUD/6zI8o3x/nW2NiOuuQDrf3JJrx7RH9Y+GHt2b6HQZ7caO8tGOHnD9xZHDbYxCLfZnFGnTDCy76zLb3O22JDLpvOYhRT9Q4P8U3/DJnz8wUOPDSDQ656z4/aMWbZVV3TQdam5vHGrw8Gqi/52uqhGITT+LX2j8+ua5w7454Nev3rX788J+TXDD/+4z++3A3zU33EUatDd8k+9VM/9b5E7cC9XXZLYpO2fcnSKqwuTmccq4DIt8hwka0IzmDg6cIs9mwwoY8XuDM42VJRwkCztihQGBU8HEW6V9D+q4L/pOCr7C/7si+771MrDEXOt+wQ4xkSU3rHXPFnD4ftbNXi0+aPuNrvJ+0wt2KTLnbipx9fdUE3n/DxcY/I4mUPggOqE9AAACAASURBVOMh6z3b93D0w6IPjf4dyYxjZKttdrgNz45ZW4oNOb7DLD6jvqN99ptfyMEoltl0JDuOiQksNVZ8YJWnkfdoH0Z5zB/8+s8SXv5oR4yt+jrCVB9k+KEdc74lZxwv++WE/uYhY7ZsMM7GNeFJPhkYYmojoyUPS7tFdDdvpQvOHv8WBj3mHXaQ8wtX+mcw4IoJGfrVlWOYbJwhcvSzafRvBkfM3PQgU73bLy9n7RGb8lKe2DaDU3zZYV+t3mJL+WAHYscsjb6whU3hbcXXWLWRThh+0Ylf7TlG8rYXF7w2PlQXyZ3x4Z4XYAz9+I//+MtDH/rQpTj/3J/7c8sLBH0liSzKFL7k+LWkn3o/EN+GL0G2kudFjL/1W7+1JOVMIuJRPE5yvx71a9KZZIahGGC4nSr+crJXQMmsWwVKxg8o/LwflhODfTPEFrL84JOFuf1OujXWi170okWHH3F4uecf/MEfLCeKlwWS80/f2Wa/E36NsXfMH/+1gby6ZQOf9mxpvFho3/SmNy329dLQLvR7J2kYWjzsJsMvP+G2eBBT2CaNI8LHBxMH+03EXgExQ2GwB5YPT7DYdpbyhR9ITNWZ/hlyrvCFTfIrptk3g8N+E6d4qtXe0zaDwRa61Rx5vsBl3wzBEQ+5kVPHs3FRBz6IiCmSJxizOH5W7wWmnbfOF9h7OPyvRulVq3ICR90XDz7l2zo2yaeD7R476TzOFuPG6NwiY2LIBpsfetG/x7+FQYdFKNvhmZPNqbfklG7zqNqw77wRh1nii3PWi0fNizBmcZoz+KFe+SeuM4TfS3phmeOL0QyGmKoDsfCeRvHmS7k/i2UeUWfmgOYhuDM+sV9t9GJacRZfNm7FF7740WfceYHf+WKNYoNhDA+cLTIOi88+vNmHc5ZOzy4UcDCHCjIDBO5Xf/VXL5/xGZ+xGGDB1cXEQgyv/+H3sIc97PJe7/VeZ2075INJN5u07bNPwEqeScf+OE7W1onYxFQg8SZ/aMQwWILIIu/fed/3fd+pYoTRBGPfe1FMGPUN6g53i40LksnC3aTsOxQcBmEgz/X5StlJIj75N7Ae7uJ3coknf2BE9tUJG91JetWrXnX5uZ/7ucs3fuM3Lg/gs1lunAguSDD6F0TGsjG8a20LnvIirjD2YmOcTnbi0TrR4XgjP9v4V7y3YqPPVg5HvPG9eLCNxbf2pUlAzdJnojCJ9yOXNf/RMT0wXEzgPuQhD9mNwRbO6KeJ1wXWYwidT1syW318LY8u0H5sgUb8LbmxLww++SW2+UVe0F5eR/n26bTgIWueEp9bSDzFVY3BrG5msOh2YVQfLvqo/M/gvOY1r1n+C4lnbmE6z+RoLy7Zmt1a570aq27pxwdvK0bq2PnKXvI27yPrPWCj7J4ddJTXMFzUPL5iPpwhdsuplj4Y5uYZyk8YFk989G7F+s9i8Un8LQrNH+RhzhDd/HDum4ve9V3f9b5Yz+CIa99ceUMBgsvGGTIPia96N5ezb5bUpZi827u92yKajzM4Pnixw7VKXPniHGodssbiPx66qjEx9QHfi+NR42vZ8ZisWo+///ow8hztn16Acc6JhUy4LpiK0YvxfumXfmn5tdqHfdiHLS9Cc9KamJEAOHme/exnLxfW+2sBxvExeHQ5/rVf+7XLj/zIjyyFJDBswesC8aQnPWkJqqL3ycFrM0zaD3/4wy+f9mmftvw4gAyc2RNjcXb440SjWxJvIZ/oLWT7imsGQwHy2QlqaxKfwYiXHTZ5DLexs62TizxfwnBy+MRQf//M3QLLLx+RyYAs6i6eY77dQmJxa0zpYzt7fTKXW1v+nLFn5BXTW3KbHjaQ58+tJL7l95aY8kd9w2DH7AJstDs7xr7ZffEoL7Oy+ItHNXcLhvlDrd5LXugtHvdSI2Rt+WN/dj4qt2wa63cvNls8YiEm5tTqbItvD1M/jNGWI971mHmG3uRvyU32wnAtLKZrXUfHYRSPjo9k1mPJuL52jVnznD3mC4xb4pEOi6fiOltbYVhXwCim+dj4mZZsC7n4zQXVW33rdtTFBnUKa+xfy6yPR17XtdZJa76t49MLsEBNMD5RuSX8iZ/4iUvgrPoE/+M+7uPuU84opF8gLHisTsnfy0Q9OkEHfK0N7kte8pLLt33bty0XdyeKPol56lOfennyk5+88Fu1f/EXf/Hlp37qpxa4H/iBH1hepfFP/+k/Xf5xOLkZontMtP0WcBZzZ4kvfQIRJxvs+s7ikEH8gKFlT/1ncPKJ7C3y6RCLFsowi4dJcSRfD7hT9pVf+ZVLt7sIXTBGG8TCNusP0HCKZ+2Yu9Em9tLDZrnRFk9j9pOtHeXt67elCx45GwwbbMfV8hojHG128EVdF88tma0++pwT2Q8n3Vv8W335CiN5dtS/JbPVR54M2XBmMfDbYJn8ZuMx2iVHYqGFdwvlS3ZUPzNYYYhJduibjY36gJGstvrZsqcxeuxry4uaqYaNsSvbRiw8PqSIY/bCsCGyxffoHIZNfo3Bhxmig272s4n8LEZ+du6Sz4cZW+DAKC9kj2KwhU2vGPIFDkx9txCMYkK+3JzFonvEID8bW7qKR37AmI2LHIejZuQbDpvK3+gXnvytzvgCp9yy4Yw/yeM1B/lwfJZOL8AAO7EYzVBfaz3taU9bFmIunr/wC7+wvO0eTxM8Izij7ylPecpya28rGGeN3eLjvMALFl3+CbgH/v0YoH9tgMcCsqR8y7d8y+V1r3vd5aUvfenyldZv/uZvLguyz/3cz728/OUvf4t/d7Olc90Hf6QSIlazlIyWT7C0M1Qhk4XD77WNZ/HIhyN3t+DACGeNVbF7jtBXkHLmJJCv/Gb/iKHf8aw9dG9te7EIvzzgS3d+1O5h1J+9awzy9WnxXaNswGt/hjr/6CXbdkbvWo/c3Yst8NhTnOX5VioP7AlvFisMseDbvcQkO9gApzyfsYnubEnultjQa8sWLardsiVb04s3fn3jtie/1kGG/XDs03EtR+N4+2SzZUv3Xh+ZYlE89ni3+ukfcxLWFu9RX34kXyyOZNZjZMkle2tM2JIdWjSLNWKQRdm3HJz8k8xoR3gnId7Cl3CqtyMMeuLXVivyjfRds0Uc4sUf3tJ55c/pGW+8Y8Eg36N/yZd8yQLvYXNfRX7v937vcvymN71pueu11q3fYuz+ooLEHoHzlejv/M7vXD70Qz/0vmdSuv1MJ34X+W/4hm+4POtZz7p81Ed91PLcx2Me85jlIVGv0fi93/u9yzu+4ztu2r9n916CJKbk7Mmu+/PJatrW8Zrv6JhOcuOnExPgLBacEYOfs/5kS76wwdbJUbE69gxAfPJmn7wx+4isvuzYi/1WfPIFRr4cyWenlp1adlggam1sG/G29Ga3Fk6y5BAb2AYrv5aB4U/9ox3kwxhYD3fxp4fObDkUWg1mi+7ki8WK9eohe0Y7+DfiXwPAWw7ts6O++q9hGCfDFvLaNvbMUPHgE/3la8YWssUkX+DOYLA5H8girfkX5h7hYTNdNse2cf44igmd8dpH+UKueLChOtyyJb+N2S8mYW7JrPvSwX6ULzMYyWmLB3lYs/lgD8qX4lz/MnjlT7z0Nw/N2kEFnOKhRUd53TJrxBCTjmdx+FFM+AKnGtrSu9VH/7ipc5hw4G3RWIvltpjgzx9jezHGYwurOGzp2+o7vQBjGCU589u//dvLV0Yf8iEfstxx+tiP/djlmSonVRuF7pwJgr6P/uiPXr4a3HNmy8CjvpwOz9ecLtx/42/8jct3f/d3L7+6873uox/96MsHfdAHLbZbYLlj5gFXwfJ1qgL4lE/5lMtznvOcy6tf/erLR37kR+6qLeAY6IXBNyThxvUZa9sF2xjIJ5jkHc9SBUEWTkU4iwWHvGImy557ofyBKUZIXaVH21fd1Vs6059sxzP2kIGfLBvo2ftQQHc2a4ul1gZnpPXxOJYf+tof+bswNjbK2h/jkR3kR4y1zNZx/PTY1275siW77qvO2R7emufaMblw7Lddk9sa5w9f1BGcWSLjXEFwbsEYZdlTbc/Y0t3f8lN8HM9Q8SgmcNhzhFP88aKO7cOpb9nZ+WMepKOati+uWnjpH7HXUOnHy2bzOv3JrvmPjummC436j2TGsWwgyxZULEa+a/tkbWSLh+MZn/CzA0bbNb1b4+GEpb2FyI0YnT8zWPwvHuT4NRuXYjrqz6ej+JLDlz4tIpNfjsNaBoc/5mUYiG77XcMGtt3d0wswixRGAbeA8Q+2v+d7vmd5iP2Xf/mX7/sF5JYmxnvQz/NZ7k7dn8SmTlY//7bg86+Rfvd3f3f5xYyvGr/v+75v2SwA//f//t+LH35NU1BhePjOM0d+mtvFbstOvhdo4zDERp+tRLYY28LY64OVvDhnX0WxJ7fVTxZGscEzi4PfJHovtrADBjvsizWqrXj1Fb9xPJthkIGhr/4F7OQfsqM+Yl0ktiDoSJ9xPtjEo+NxPJ+2sKop/PiyIx2N7/kVP2w8ye3xb9lQHxtQNTv6EM9RS2e+ssvFEd1qixys/TvSvx7Ln/Jyqy184ku+VbNrfUfHYgCjWGjbP5Ibx8SCL8UkjPwceY/240+/fF/LNZ/5TwYvG4qHPuPZtaUbbzrCwld9NwYLTratseCQR9mR7Jp37xh29pDl/5HOPRyyNiQvfEF7ti+DG3/ir8Zgwgp7Q+RPdIXBF89Wo/r+BPOVDrGoJmKdxSI/YszK0+v8t4kDeXm/VmfZu27HWLIL3pZN4m58JLLNRcarFfKdAyO/fTyIvfj68LHm2zt+Swv2uC6XJdmUUMBId4z8fN2+Xz9+13d912IkHo5ZCCFOKRRyft59f9J6MeRt/H5l+Qmf8AnLm9R9leg1Cv/wH/7Dy9d93dddHvnIRy6/4GSDgHYitc/WFpp7dr7yla9cFp0VHRuclPntFQVOMInx/px07OGN/dlB3i9NOx55zu7LCwwPBLIF1lYh7uHhFQ/vQ/GjBVSR7cls9cNhB1lYfhELtzujfDVm079FYg2jmCY74w9ccn49VF7SuacXvrjhKxfiyYd+Bj7GFs+aiqM6sN8vc/xwhR0t1I3L2ZFP2cHeXpngA8MMkbXRo9bFlS9Hetf47OA3YjcM7xLai+NavmM65VbcYJSXW3DUkZio1Tfd8F6k4qFG5UZers0F+TG2cPyAxDxQ7Rif8alzlx18gmnbqq9R93qf/dWJPMlbc9Wat+PqkP9ywwa5pV9c+SH3jrd80kcW2ZcXcuqUX8WEfDjpHluyza34nLfO35l656/zTRyQWPAH7gyJAx9gsQOeVy9t+X8Nl0znnH2xmskrGTlSY1o3DfLvmu5xnE61LhbyG4a8nCUY5sLqnW1ifgvJi2+ryLOBb80xZ/DElBwcdcI2vu3Nqfw1Rh9eG1n5FQ/zvL7iYX+LslF9qBNybD9LpxdgDKagk+YDPuADlgUNZYrI28uNeSDfOzkiD+t7KJ4DnZiN3Utb4ATIJtgf8zEfc/n1X//15WekbBFM71v5gi/4gsunf/qnLwsnD3mTLUn42KV4bH6Cqm+PXvayly0P6osFHJt9cTDZKEbYMNk0kwz6xZmsRLIFlv4ZKh4tFpykbJuxhV/0whBHJC4V5Fl72O8kVeywKlRYdBjTVuxbhS6OZF088PODHeRmyATMFzYgOFv6woTPTny12QLDvrjis23liZ35Zp9ceZZrG9l82ouv/rDYV17YMEPZSC88+YF1FIc1/tpXNpTjNe/RMf1k6WZHtZ+NR7KNFUvxE1v5halWZogt9IuFOuEjmrEFPwwbW/hlW8frml1kbWLCF/PLLSQW8oLO1Bgem1iIp3362VKfeMS3Fxvj/DaP2djhGxAYxaP9Pb9g043PvpyYW/d0buGwA7982C+/s/Ekxw9Y48JnxpbsgyOe8mJOmSUyyfNJbG8htqsvWDDkW25mSG46b/kjrvpmSXzJV2fk+cams0RWbJ2/8PiifuBskX4xIIPiLyZkW7zh2csVXfi07C0eWzq3+k6f2ZRkLGNMcBywL/C+2nvhC1+4PHtlERZ56/0nf/InL68X8GwWx2Ynx7DGVsB8IhF4LfsE1QUxWzvRLAIRXm/jVyRWu8bJaB0Lorto/Ex21Gn/q77qqy5f/dVfvXSPwWePWHjG7P3f//0XrHd6p3eaKmrxFB+tFT1bZl88yDA+2cTBxMdn/syeHDDEjA3kb8kbXzybR54/YuSlqr7C9v8e+48J2Y1/TQrbpzX6W0DzbdYfdemuKAz54h/a0qkffnx48DvB3THyIkbH/Im27AkjPDj8MZGrS+O2NVaY65Y8fncCyLBjlsizQW7hiMdevW9hkxcXGJ0zat0HhlniAxwXAT/kyb8ZHPLIOVNM1ccM0Ssn4qHeyfNxllxI1AdfYOSP9iyZxN1h8cHV3KbGwjmLgc8HYedcLx4Vp2vzAB76qkf+yK0+ec8P4+2PNukzJnZdLyye1GkxNQ4rzFF+3M9e7V/4C39heV53pt6rU/ps8ium5oBbiU/s8UJX+LNkfnfOqA/XqlkM8SXfi0fVu1jfUqvmMhsMuNfysfZVHMzL7jqbQ2bPufD6wNP5ny8zsWG/86abPcXpaF7DQ0d63KiQ3+aQ7OBn+9lcS9aY+iLrTfzWEmfp9AIMYCcvwxlFqaBLwBd+4Rcu79VywnsfmIfbkTfkW5g5ib/ma75m86Q9a+zIx1n2mKCQwv6O7/iO5deMX/u1X7vczixoJlX7bCLjQuHtzIgviJ0uAk6so6SFSUbBIvxOCliwJUVf4wvTyT/k4GRX7UnxhY2NNnaQz59ZLPw2fmTXjB3xZotjJ+zznve85S3MFb7+CnhrkUc33vWJMOuPWjHpjTmkt/hk77otDsXVeH0j75Y99Y2+jvEIp3bEG/fZGZaWzWJV38h7tF9NOG8twNBsbtOZHzBnMbJRbYVX3/q4/r22/I25nMUYseHdcu7CEJPsKD7aGRovzPlGftYn9VFexvo7wmGr8XjIjfZXP2Pf6Jtx/qNs75wLk2z21Ddi2HeuxyMXMJy/e/xr+fGYPhvMrXobea/tj/K32FJMxsXKLA6MYjjiXLN9HBdbG923+kQOhriOdTbrT/nRjrLj/mj71j796i6b8FQ/WzjjWONj27h2bdeov2sSHrmw2T9LpxdgnGOMjZOIMv2veMUrljfQf/M3f/PyvJVPGAxD2p//+Z+/fMVXfMXlCU94wuV93ud9lv57/cNJi7BaJ6e7Kd/5nd+5fC/+RV/0RcsnHQ/m+0Uk3RZX+LwR/8d+7Mcuf/fv/t3Le7zHeyx3rb792799eVGs59r4tBdEvltsGU+3vmLiouZThdiIVUk96y/dFRP5I1uuYdKdfnnIxmtyxulFbMjXW/yBQd6nE63/miAffhjhk7l+/sLeWnxlw7q9xRYxoI+sLduWnY0/6YhXTOwXm9rqgB9rGmWNlYNk4y8/5av+WjpGGfw+dNxC2UTWObSncw87+eyp3ePf64djoz+MPljtyWz1Z09+hLnFu9dHf/bI0S0YYeeL1rZVF/FutfwQB5Rv9vNvS2arT33AyS81dI3ixWc/Xxy3H86WPfqq8Ww3X4ZrfNzfs6d6T6fzVs3fQp1b2vBmcMiwmU22M/Zv4ZOrtuwj2MVrS2bdh7/4r8dmjvMhO8QG7lZO93DHXOIptjMY5OhNNnv0z+CwX62HQ9Z5t4eBT9y1YzztZ4O22jmKgTG86SJzlv7kFWNHMiM5SRHjnVgWGv6dj6/dnv70p993UWjSweeheL+Y9DWlfwl0f1D2sKWAPf7xj7/4lzYveMELLs997nMXO/F5VYaLvk9R+L3v64lPfOLl/d7v/ZY+E5WFmDtn/Y+/8Lds5XOUn2wgM8rpy7b4j1qy8ZdEfRXVkew4VkzI2kfaWZzRl3BmMchZlLr7aN8i3Y82fC0dqRETrDb/G6tlS+P5dWt82WHLl9p01ZYDLZ1aW/zZgZ8t9SevTRfbG9e3RaNN63G6ULIdh7nm3zsebbZP/pY4wiefHXv+79mRfLq1+TbjE5nkamGHe6R/HAuHbvvk0Ywt4SVffGZtKabZFO4ttsDKnms+xbvW6xhpsw3Wlj2NJ5Ptzht9xYKsc2LNF3/6asnh3dI5yoz7Ydca27N7lFvvk2+j3+Z4xhaYY2zYEc3gjBijXzMY9CabL7fGlz3FRntrfNNfTLQzPpFni80+0raNuPbVHioOjXdcnPNvz5b4jcO0HhjXB+HutacXYBZbFGgRhX2y8bWjryF91ec7WAua7mZ08RII/4rI3SHftd4fBFMAbC7yXiXx/Oc/f3mPl38vxJ6HPvShF3fDPAtl8cgHiyz/8NmLYz2P5J+RfvZnf/bFDwvguEs2SyWKTSi7StBZPPJiy9Yu9hXDDEay2mgWh1w4+TWLwReyngX8jd/4jeVFuP5Xp1+8+MrXmFrJ706MbNbCYEc8xdTxjD3VK7kwYLeIHnXaD7uWbdkSL7uSj68xLV2IXGS/T2vsyK8jf4yFpSVv29KZnr02rGxyPIODv/hVp7MYo21iWH7ZMWsL3ci8k0+OZ3HyZYzrDAadbAlHXWTbDA4ZG1/yh/wMBlvGuDqGpYb3cOgkYzy9ju0nM+7XB3ukMBoXD+f41rk9yo37MNgznh9jXkbevX22krfBW/uyJ7fuZweCxwYtyr/l4MSfcpodRNh2Kw47sm0Wgw3mQ/6EMesTuTGu5XfWljGm5ewWW0accs4m+2titzE+NE7eHNKYfvbwZ8+nciCW8es7S6cXYBnQieRhMw81WrA86EEPWv6LuLsa7oJZ9HiwDuF50YtetLT+y/iMcUdOFDh4bBK8EuAVGY997GOXgMQnsE2IZNwVe8QjHrH0ORY8Pgo+nC6qRzY0Rt5GPn3Fy/EMpbdVNLtmMcjYYPAF3YJDL3vy5RYMuj0X95/+039a/iG7/zrg16qwLXQ7CXruZc9XfDaUPXj3+BfG1R9yYsIPpNW3h6HfePWhVR/laJTNj5XK5TA78Uf4R+x8u2YLeXbj58sef3rWLdn8p1/c0QwO3hFDPBzPYGRX9lTvY0zjOWqzBQ7ZUX7GnuSzw3ET8ZH+9Ri54mEse2Zswdu5AQ/NyGdT524Y2ms4o71qrFqHSd45EEZt+uKBMRIMsSQ/4mfXyNu+sTZ95njHWzqTWbfxhsMOW/1r/r3j9GrZr0W34qixzvew93Sv++Pv/G981hZysLLjlrjAIBfGrbaIqfw2z94SXzas665YZddWm4z44W+L95otjcupfT7M0OkFWEFupefrOv/02t0sd7WQX+64y4FHYpAJ3p0OX0H5CtJzWPcHFagmhPTBrhgFly2CI8F+0WMxkC/6PBTubow+X4N1QZqxkb50kqPXwseibwbPJIX4ZgLupKhIztpUEfCbT4h9szjsFyNyLTwquLO24PerkGc84xnLL0R+6Id+aFmcuyMp5vIDv/hv3X1kOzuKR7awYcYe8vIBj9z6hF/7FHZxYyMMthTj8r4XX/3VaHrpgYH4Aj9b0rW2RT0Vp3j5ko1r/r3jZI2TLd4zONmSz3whP4NBv9yLKRwYxWIvBns+kYPDF1jsk6cZe/IlDMdjne3pXvfTyZd8gBP2mnfvWI7G3IbBxxkKAx7Ssivb1ljG02WfPnNINI7B2IsvPlRe2AErveT2ZNNFvw3BE9MucvFca7MjrPJyTfcWbjVVnebbFu9eH3vYkh8w2FJc9uTW/TDIhNPxmu/a8Vgf8gNnpsb403w46pqNL1/gjDGFPRMX8uJRjMnaR1v25Gv8+GCsY9L4ni1sNpY+7cw3fKcXYAypWCh53OMed9+LVfVzXvIstjhSIt0h4xSHPZxv7P4g9rRAEAS43eViH5v0s4tux+zQZ2Of1kIAv4uBkyte/GeJvC2CYbH3xje+8b47UI0dteTCcofRC+FmX5IZPvvFwx1Ii0y+zvgER0z8tF9OTUDip50hPvnFqa+m1YwY/+Ef/uGSl3LRiSMn+NfEbq+QIGuxzwb72hmfyP6f//N/7ru7YHFKNzu2SI1VJ1r61DO5XvxHv9o7Y4vc8g9//5EBHozys+dP559xGO4wy4sczxI74PBDbmbPSbaQKW5eMyIfe7bv2cePzhuPCzhn9In1WSIvBmrT/4ItRxZSsGZIvVcffGmBOINBp3h4HKL4iNcM8b9faYsrTFjF6iyWGlNfYkFWbORtzx48xuIVU/EQB7L6r8V0rAFy7JdbH8Kca8bpSM+eLXwkXx7NpWIA6yyxlQ9iIKbycssjMGJGji3mUrHwot2ZOmUzfj6Rde7ZxGOM2TXf5ACGc59/5nf2HMVxC5MtzhdYqJzP2ILXuSc3rqNI37UaWRiHP2z3CJPrnRpBcj1jS9e45kR55xs/t+yhs2sIXfjMP3LDhvINA++eLbAbE0Nyffs3uLi7e3o1lBKGIv9SqH8r9N//+39fflXoZaz+oTLiFCKXkQUjrIXhxj8wBBl1ARHQSDCi9rN93eIr8bfYRkaS+EmXfSfre77ne2bCdCvx3q1yy3vAKhh3JC16PXtX36whr3/96xd5/tyCISbufvr3UGwpFzN2pFdNPfjBD54RfQte785xgvhvCWfynN5avpjMTVzv/u7vvsSDgiOsURYv//lhc6407tjYHha+dNl3IbL5Wn+G0kemRZyY7uk9wi4eJi213jl0JLMe65yh/15yCxeW//E6+rjWd3RsUS0m7LgVwwXJhyY/6uGTbRYLvwuSZ1XdnUezGGTUKozxPWDNfVtxoGPMBx7zkFpv7tbXHLdVM8nXxv+u7/quS30UD7rOzgV4/ZcE75H0OqNZcm6x30LFXOidYrcQn9jhQg3nrP3pKofeFVl9NHa2DcMHdAu4v/k3/+ZZ0bfggyMmMJwzaCufbyG0caBOLa47d8e8b7BvdjlnLI7FpHkQ44w9PqAXD3I2tXttTmJv/M5bNQjQ9QAAIABJREFUawl2FOfaTcPf3BmP1pz8B3/wB0fsbzH2x6uUt+g+f2Dy/c3f/M3l122SwemRGMXJToDZoh2x7vbvInAXgbsI3EXgLgJ3EbiLwAMhAve8APNpwq8g3XL3/JdPB1a0FlptAmVhdrf4eiCUzJ0PdxG4i8BdBO4icBeBuwjcawROfwW5p8iiystVfZ3ibfh+8eirpr4OdEvPvkWZVz/4Sq2vDvcw7/rvInAXgbsI3EXgLgJ3EbiLwAM5Ave8ABOc17zmNZdXvvKVS5zcBfNde+T7VV9DukP2pV/6pcv/wGrsrr2LwF0E7iJwF4G7CNxF4C4CfxYjcM8LMHe2PviDP/jyX//rf12e8/IQnQffehbMHTALMnfK7uWh9D+Lybnz+S4CdxG4i8BdBO4icBeBB2YE7nkB5utFrxiwudPVT2L7CtIvE8avHC3YGnughNSik+8Wm35wgEafb/HTghXuLeSuYwvh7kbqmyU+sSM8P6Q4IrrwvOpVr1re9+b5QPI2daC9hfpljfersKkfdcxikfPhoFjAysctLGN4a/HYl2cUjn2+178Mrv7wnWw0yupzvO6Lt/GO4x3xGrvWjjrsy9fo3zV54/laPsW0ejsjH095vcWPMMY2X2b9CYNcGGOcGj/TioP5zQfQ5oBZe2CwY7Rh3D9jRzyj3Ljf+Ngaj6dzmR3ROF7fuq0mao2HcWscYNxyzai+6Ldvy7+13WeO+dQ8Nvp3RhYP3Z07cmy+mI0JDDLhaWcxFuE3P5fNnnuJCd38yK9bsMa5o1rJxrMtO+QXZcPRLyCLmTza73iNA6vzcc8WPNWaOMA4S/e8AKOIgX4B6b0z/vm1C2Xva/EvaGw/+7M/e3nqU5+6vDX/rHFvL3yKxoRbEiTVT8D9IGFm4oBjgaqgFU/Ht5zsclIxadk3gzMWUQUmH2P/mB/vcPHP0N/whjcszwJ++Id/+PLmez60iQ87mnhG+TP75PmlyNGeLXtYYioGMBC8sV0Ohj/42F5eHbNfPNig3z7cbBrEl1022uId60F/cumCt0XZyn487PJS4eS3ZK71FT/Y4V+TMZ7do0/1nZGPpzg6FkMxsM3UafaoqfblSHxmiC9ksmNGds0rx3xgh7jYn4lvNXBLTEdbOs+qETawreOR1z594r8VA2PmpvxhY3aOOGNO7ZcXsUDFAs5RjvDRxxYU1p7tC9PqT7ZaNJVbfTMY6SbDlmIzi5Fp9PNFKx9w+DpD1RIc+x3PYOD1AYEdcg5DjGax2F6O5GvWF3Zkg1gUH3bMYKkz6w4yak0r72wTpzXxmUx5TFc1GUbxYNcWGacj2+H06pgt/nXfPS/AGOq9SP79j5cH/uW//JeXf8791/7aX1t0uUi89rWvXf5Zt2fAGNpJuTbm7fm4k6FkW4CJSwk845u4kJNQst5ZZd82QxWLdxr1q9QWdmdxwmBHxJf666tl4x/90R9dnvWsZy2vJbHY9sJV5GWBJn4vyeOfd4pV+MkftU4Ki3vxYQPZJovifSTfmHiy0Z05JyBywuz5pJ8evPi07BdXNnRB4s/R5AOnE9okweZe+AnTODw69vzJDrx42OC9VTP1VRzy2wTFDj+MKR4jz94+W9hrk1c14hnPPdv3cJoA+Q2DvBx152hPbqufHXKr5ResGXvkh1/s8EGCb47Fe4bkA4aYqhXEppk84ZcXE7lYzMiOtnrvndiGwRf7fNsi43Q5l9WD/LCDjDG5aXwvtvSJJT48ZOVFTuCJqTF4eLVbZIyMWNhnh33v4TpL9JM1B7oOeXcW23pp6FkcdjdveeGnc927r/TPEnvEA7EPlpicpeLVC2HFEsYt5CaJnIqrfJf3GSxxEVfXfvmqVmYw6PbOyuqCj9XfWRw3AMjJLzvE2T6fitmIFb5zQR7k0nWKHW4YqZkIFp4tokttVfPioTbO0nwFrZAZ9wu/8AvLIuuFL3zh5VGPetTysrzHP/7xC+ezn/3sy3d8x3csd8Ysyjj+QCM+dTFq4pFELx8Un7MkybDIaC0UTOR7yd/Dxc8eF2iFJO5bRbgnrx+/TWH20sGjiUIhOglf8pKXXJ70pCddnvCEJ9znhwsSHItzmOybtYc/9IspaiKfiU1voPaLXXLV4l6O2GisnGqdYHC8FNK4vmu20IUPpUu8+FI8jBvbi0sxC8uFqBd+LsATf9KhNiyK2QH3LImbfLKZHyY/8TD5ztAYO5heGjpjR7rCcSHyYkq1wr4ZgiEWzhl2jHmfwREPE7BzphjxacYvtrg4iqnJHc3IZ68Lyl/9q391WVCGAaf8x1drjO7aYtDLPo2ha3Uql9mL1745SDySZUP76R9bumwuoMg5Z/7wqMtZIt+5SUZ+5cUCe4bYz16txYb68pJs9s8QDDbBkVvxEKtZHDLi4aLf3A5zhtiBnDNetJv8Xm3sYTv3xdU5U6zD2pNZ9ztnfDAVE0S+OK15945dY+DIL3kxPcKQwxZn2Sum+tghxvwRj3K/pTtZeMgCbmZBPFdBGxYw0tePD3/4wy8WXRYND3vYw5Y3n3v7OYfc+fJ2WHcxZhO8ofJtrkuy+6TGP8nTzp5Yo4wk3nJyFhzFpyhgoAql8Wtt/OFoj0iev/mbv/nyER/xEZd//a//9cKa/ezgD//CPcJaj2VDcb0FA6bFk0mLHQhO+2udHY/j6e0Ec3w2x3iTLy9h16Zzq+0TlrFwruVkC2fso5ctszjZyw7yJr5ZDHbAsZG9l/pgB4ziWnxGX6/tm8fUV3Zc498bhyEebGGH+iheezLrfrK2Wbk1jmM2FA81ZDtD5YY/bFlj7WGQS6fWcecLmXDb38Mh27lVbs/avsYsB+y4pU7hjb6IR7atdR0dwyie7ChWRzJbY+GMc8IW31EfDHUqJvbRbGzYLxb3Eld6YYjLWBvZdOTDOEYWkUsWbv0jr/3yFy8+NvBFW/9abn1cPslbUJOj9yzNfUzcQHUL09cPktcJ8qAHPejy4he/eOG2OvYVjU9R3pj/yZ/8yRsob99dgr5OtHhIjqTMkOQpDgsaGzpbDOlhS1t97Kno6rvW0kum7ciOn/7pn7786q/+6vIyXp/K+GHB42sUfqQ7O46w1naN+rMJj/0ZHLlwoR1lYI/Ho+5s1eLRrvPMT/7pz8cRY8yD/XSlt3E4bLNtUbVgDAa57NriP+pLXls8sutIrrHRRjH14YP8DAasUfdYI7M4sMhUJ2Ocs/lMy4ZyWV62cnqExQ7xGM/7cn0kN47hH2NzSzxGvORhjrkbeeyrQTUlBmM84yuuWhRu41ryNj7Er794kmk/H0f59vGxJxLP7KrvWjvmDl7yW3Zfw+pcg9H+NZmtcTa1ZUftFv9WH34Y4pePt2C4LiP+IBizOGwQk+yoXQBP/qkeimvHM1h421K7Pq5fm5905T/+sT9+4+P5XH+tMdd6WOIx803A3OogjUPr1qHb3K94xSsuL33pSy+PfvSjLw95yEOWF7Jic8vW/6t73etet9xm7Pv4AeIBsSt5aGwlQ1LOkuRLZkVRYcxg0AVHEYwTGLv2cCq6tZ1ksmFdgLD1eRbJBee5z33uche0/+cFq4cR6bXRs6cr3Xs2ZkcxDWePP7yxJWtL1li2jXztj7kk49hmwomyp7b+sSXL/vTSWW702cQQ7fmTbLj0sWOPP751G06tT8F8msEpLjBsfNHOYIx2lRPyt+CQQSbBbJu1BQZ5eYLh+Cino/3r/bUdsz7JaxN6vq11jMdHvhYP/GHt8Y/neDb7UB1/fTD11T/aYmw8V42JYwQjO/RtYaz7y8e6P8wzbTqL6xmZeMgWxz2/4z1qycrtOBfg34vBFla2kOm8m8UId6z3+mZsIcMXOMX3FluaT9f1l03rdstGfdmw3l/LOx55q0++rHOD92ge4LtxeDb73Yja0rvuu+cFmAn8kY985MWv3p74xCdeXvCCF1ye/OQnL88CUeYfdL/zO7/z8j2xryZ7pmFtyNvzsaS5dTleEDvRO3HP+ldxVSDkxv0zOBWRYqioyG3ZQl86R+z6yNgcw7JfsTm2yHrZy1623P36/u///mXMXdEetB9Pqi38sc/+NV/Z0QmfLWuMvWNytvxI355OfMaKhbY4GLPPhmgLB19bsdDKzUjp2sIY+ezj5cc4Aa959o7JspseW5PHHv9WP3mkbd/xGdtHPLag8hLeDM6ov1zMxDJ74KzjASfM+M60cPIl3Fmf0hsOvXsYe/3sL8Zwoj3+dNEdv1qtbsnLlTEY2RhubfjxFcf4G69Nbq+F03l7VgZW/uePWrc/g7Fnk/5idMQzjhWHzn3ytuIy8u7tiwP7bXBuwYBdXaxjsT7es0M/3dnS8aw/4cPJlzVuPLVbNpKpNke+LV7j/F+POV73wUV7OWrxmO7xA0t2HLX3vADrVw8/+ZM/efm1X/u1y5//839+eQfUL/7iLy56//E//sfLs18exLcQeyDeAZOcbjt2krmjsZe0o4RIOLkmiyPeozEXZ8XQanzPlnXBhalfUVlYvulNb1pODj7FD699/4rqu7/7uy+f9EmftCwKLLJHfXxp0hnx27/W8qUFrvjaFH76r8mP4+JrC6d4jzzth68dN+Pk2NXFyXH7yWuLA//phFM78l3bH/OY7ddktsbZk//sl+PRjy2ZdR/+/MkX7SyxA5G131bcz+DFS5YvtrE2z2DggUOueKivcncWA18+wRlznZ1nsJxv8g0DXrK1ZzDwrH0Q5yOf4Ge//eJITr6NdcE5soHsaKvzYjwe96/hGMcPY+v8uiZP1qZm+aG9F2KDvKCzfqRPDOXWTQv57SvAxs+0MOgnb07sXDwjO/LI7ejLOHZ2Xz1UL2yC6fioxrawxYQfNrK22djyRX7JZdOWrnXfqEdsO2dgoWt4bJfHfJaT5uq1rq3je16AZaSf9v69v/f3liBklLHnP//5S6G4eEvSA/UOmOJRBBKhlTh9Y4K3EjD2dXKNMgphpqDgsUEhyYlcVBxNHKNOukZ94xh75AsODHzZAouf8C2sP+MzPmPx1+RSjvEkk1xx6njUZ7/CH/vphsknNmXzbGzItsE/iotxNuLnB16tbcSwHxlbE1vJjraOvudvuB2vccYLH51ib9vSuZYdj8mySetDgzuYjmdwqm9yMDyGwL4ZDDYVO3OD/MJFMzhsEDMtebE1AbY/+n60Xy0Un3K0l489LHEQjz6swIMx45MJ3TkHJ7voy6a17j0b6RSL5iExQnu2GO/8LKajXvr1r+t5tIe/xvGmlw02fY3BKf+jfPvG8hdOGHu2Jze2/Cl+6kFcuw6NfNf22VJc2GQb43NNvnH20C+3fWAPK55rLVtsfOFT88JMXOioFuzzhR3l9ZoNjcNghzplS5iztpC35Uv4bNoi9q6JTjmy8YMttnxb8+sfazHb44NXPPYw8LIbyQk+PnT9C+uovecFmCAJPmKAreLSxxFJcgIxzgpRET7QSAxKPB+9IsBrGcTjLElicXrjG9+4vJfEz3xnMOhShGLu+Sw/goChwOCvSf62Cr1+fsghnxAf5c+dTG1Fz0bFaJwPyBgeP6kXH7YYsx/Pwjj8Ib8mdvsFrZYtFnnV3PrEWcuOx74a7b1XbGMDP9cn/iiTTi0ZC06+Zwd77du26hp+Nmrp0vKn80LsbHzayzVbk6dTbuV1K16j/et9+GRgiWPvm9qqgbVsx/kKi13e98b3chLftZZOtticK3DFmG1nCQY7xNJ7r8RXntkyg1MO/Zzdqw74peZnfWK/X3x3LrBhJrb8VmvOf/NouTrCwLNFfp0uL16LwT/5hr3nExx+i6GYatUpDPqNZYd2K778N1b8yTr/9eujAzayH97afjxk5JXNft5v4eLVGmcJNh35pdadN3BmqHNfPMyH7DKXiekMVQvFo5qDf5bIiI05iH/mI9sMBl341ZiaUGdwx9yctYcd6l1MYbJpL6d7mPwRE36wA844x6/l2LkmNQ6nXBtvHtiKDV5+a+mUG7XlmXUfSunvPGh8rdMxOeNqAj+dauMs3fMCzEnpxGphJQCMiTrZGYfXCflAowpX4YkDX9/hHd5heUfLjL/kxwnwHd/xHZdfmG4V0FEMFZVNUSoId6hMZAplTQrItkX58k7v9E4LnpU9G2HzUaFpbWKgaMko4PjwOubDX/pLf+m+i9qeT/jXxG64Tph3eZd3WYbpxEvPWXJyOcm8w6cLBDu24gJTHTfOP3wmCZOwmDo28RhDWzjsqz7YGy9//DJYi4dscdzyhx35i9fFFb93+MySfMNyMZIzv1oV27MkBk3abIHBFzU2Q2wYffIuIcd79biFjZcNWvlSHzDEZqY2xFc8bBZg6qMa29K71ycWzjnxkOt8gX+WnFdqlC9ssFU3Wxj83SK2eHeWx0LoZwsc8doi/WLId7HLf/WB6CFv28tTflYXdKoX8YCbLPx4t2wx5tzQsqmX2zrvztKogw10eweYdyvOEBw2mMvNZXyDIT4zJGZyyw4xJQ+7GjmDJR7qy3sA2SEe+mYw6KGXHeUGlmPbWeKPBZjY9F6zMeZncbxUVmz9mI8f5ha534svvWvy4atrHR/gscs+m9YEnx5YfKdXblzjvBdRXMoPnD1b4NJBHp9rzEwuphZgLbYYjCjiKAebfDnEWMaMxGH8ZBXMA40q3JJhshEbvkqmtrgYUyzdvqxQ8NhKZgvWCki/+Nris09nCzdxxUdXY3JTQRsbecNLTpsvCpRuLZuR/PGrfRMS+/VX0HTwOf/oYE88xu2zg2106EPFz77+cMSLDDvGeGRrGHjEZovYgNiZPsd7/NlSrLV8IdtidNSzhZNd+ODZ2Nj5wabikb4Rs/1wwiDDli2dyWy1I45Yqgt5GuOxJTf2dQchXyxqq/WR79r+GE++5Ns1ufU4OSSm4pmPa75rx2yQm3IrJrPxFVMvc63GYMza02t9yDavHmHs2ej8Mjaer2Kwxy+OxrTVQ/O2fvFBjcczxrU8GhPH+MmLjX7y/NEeUXbHT37P9iMcOVXj5hL1cQsG3fkGJ1+O9K7H+GEx/H//7/+9rz7WPNeOxY0vfFDv6uwWgqM+YPDFNktsEFsLl3Guv5bXtR514iWoal2M2Vbu17yOt/JHRm2Rqy717dmSveGRsRD0oQV1/sK4Fhs84dAvHmfp+AwYUBimeEuYuyuckwBBc4GUUI7g0dfGQEGrHWAfELvFgN/8N2mJR4UwFoU4iIsCICeu4ig25PXZihVe+8g+KpbFV1+5KAf1kbUpIvzGy2N5ipe9eNOPFy4+ZCzd+lwo9JGDyRd+0dPCCpYJC44N5QeZqD54iG4kdvbh8oHecGCPvMVy6bz7cxeBuwjcReAuAncReBuOwOkFmItsizALjC/7si+7fOAHfuDla77ma+77B9xd2F0oXThtyG19F00X7wci8Ut8+OjugNVziwP+Wlzke4uaFhp9gik+YheWPguOFiOObeWifbr00WGTH/jjYsU4aqFEjw0GmfTYp6+FlXFjHbewJKsfLv8ssviSTn3ZpJ98fTARXVF9+PjDTi0e+7DUEb2IHWRa3Blfxz3su/YuAncRuIvAXQTuIvC2FoHTCzCLqRYL9j/0Qz90uUB+3dd93bLvHWD/7t/9u+XZFE66QNpcQN1i7GJsEfdAJP5ZEHgwmo+OLSaQRYNjCwixa8FkvAVLixn8FioWURYX5MRdi1qMuSOER3zHhUxfB+FnT7ph4qN7XKjQiyxybIhctrPX14zwYNDbv5UylmxfldCXXZ4PsKEWX8vBm4/d8hUT/IhtdOdrra906OqOG9v4gjf/xR3pu6O7CNxF4C4CdxG4i8DbegROf/Hroue7TRdvF71P//RPX/7psocBX/va115+/dd//fLyl798eR8Upx/84Acvvj/0oQ+9fNAHfdDykJ7/E9lF/m09MDP2WTggcbHYtAh5zWtes/wPTAsCCzKvaXjf933fZWFjweGlpf/jf/yPZbEhtl7h8XEf93H3LSr8Kuw7v/M771ss+W8Cn/3Zn70sRCxmPITtfy9acDn24PDTn/70ZbHEFotfL0j95V/+5cUmNnphrn+UTZ/Fzatf/erLv/23/3bZZ6eHD//RP/pHiw7jFkjf+I3fuCyQ+OQfjH/u537u8j8/H/GIR1ye97znLfbCs5DjPz7+Wox7Ke8zn/nMixpoDC9bfuInfuLy7//9v7/8s3/2z5b64AMbtHgtNB379ZPYPe5xj7t87Md+7KLHYswGRz394A/+4ILlXWQ9MDyTvzveuwjcReAuAncRuIvAWzsCpxdgLsg9cG0B4Y6Hi7xftn3kR37ksnXhdNF08Ucuik972tOWX8FYULiIPtBIbFqAdPfHz2otSC1I3AXyPzDtW1i4i/Rbv/Vbl1e96lVLHC2i/P9MCw6LCnju6PRiW3G2cOmOEz6x/u3f/u1lIWbR4tcwxvXDoMMvMvx/Rosz/f2CsEUOvewwZtHkuDtZMOxbpLkDxXa//JHL//k//+flq7/6qxd7+cNeC3O+s9si7b/8l/+yLNg9cGqxZgzxA5Z/2O3uqcW5+NAFxxYfP/n1R3/0R8vrEoyRRcXb/xd96lOfevmsz/qsZfHVQm5huvtzF4G7CNxF4C4CdxF4G43A6QVY9rsAdhEcf63ThdPYX//rf325IJL5tE/7tOUnxL/xG78x/fPfdM60Fg4uwtno2IXchZ+Njt01waPPmIs5fosJixFUe0Y3jO7shfcRH/ERl2/7tm9bdIRhIYHoftaznlX3fa0FExvY8m7v9m7LXR0xzpfkE3D3aiSLPsRPOv7BP/gHl4/6qI+6eI1E/o8Yfjr8Iz/yIyPEstCpA45FkrtKFmG+enzsYx974dt7vdd7Xf7X//pf9/lNnwWgu2Z//+///eVfUHkzvoWd1zaIzxve8IbFji/4gi9Yvrb+23/7by93uPhMnp/slA8LOn326beYpRvli4XpU57ylOX4Ez/xE5c6aywfxpYPFpl+sgxbLfDRtkfyiVeL39fCcPwsvnohb6w8jVjsiezjwe9HLOzgn/7R//jH1jhiR/JibYF7C+V/vhzFYI2fT2wRD5va3fKfbPx7OGInL9d82bNRHtSXmMKw2Fc/W7RnC2wfBHwlrq75wq69eeDIFjXPjnJF5xb/ni365cW3Cz7QwNnD4OMWtn4Y5gTfXOBRa/yBt0VqAk/zoxioMb9Qo99Yuo7sMYa0YVQf+XIkn2y2kFEfYiEna0rfup8/fCFjn7xj88YW5dvWWLaIhX1xPOLfwtBHVo2JB2LbXj72MMjIC5/c7IC5Z8tev5iJh1h4Pxoq72u9e/HVT955A0NM9nhh7tnCfvl1beJT595MXJwrnfdhON7LEx7+srccsMEmps0pbEN7tuSvFo+YztD0AmwNnqGCywiOMSTD8FuQudi/NUjAbQJXAhy7SHSHKJtHe0ya492fcezavgTyV+Hw3bHCpHOr6Lb66BA7trUPi81wtmgPh37FZdxWLNi3pjFP4xjdJu7ujHmPz1d8xVcs9lh8mQC8t8U4DLFmuxh+wid8wvK1dPpgGXNRtGgk+4xnPGO5YJK1yDTObjFgM1x2+1GD90P96I/+6LKQ8x4fsfVzbl9jukP3VV/1VcsdxDD24kIXfLh04XesPvbIGN5auYDDPvHhozE68a1JH34Un33yxcw4PljxrnH0Zytd9sV1rzbW8h0nF4ZjurdsT2bdih9iL/3yUezXvI7p2CL96psfMMWEHY63aKtfXGzVOzlY+rbqYM+W5Mjwix38sr9FW7bgo1dei5FjtGWLscZHHWJSPOjBw+5ZW+AgcU0PPMdbRAe9Wv6LKd584ddYJ1sx0Nd5RYc78UidsN85AJ89W/LZRU+6Rpkt22HlX/Ja8nSxJ7uyZeRrf88e/cWgeIw+Jn+mhVV8YcLh31niE1/LE3l1uoex55N6LL50h8e2Ne3FVz7xk22DuVXrMPdsMaa2qq/29z5Ere1zzMbqRDw6h/SPfiabT8b4wGZy+SGuePShzqXka50jZNiMh49HfiZXuz27NHqipbSAc8TGAA4gBtpXuC6aHN4rlhPqrrKEz47eQ0PIPjvYxhY2FCiFxE6TxOjPVWVvZoBDb0mF7Xm3Xk53Fgdf8WMLDFt2nsVhi6KwmlfEFsD69ibwI1xvwvbVo7i4A8a37/3e77084QlPWL5+JjvGXAx8IvLVtHiLOx/45U7WK17xiuXrR/v64JHBKweRmuIDm9/jPd5j+dRoMeYFldWU5w4f/vCHXz71Uz910dcCOox167k5ttGN6KVHu0eNa9krL+7oyS2/5aaxa3kqt3SxQ17SXQzP2EHGJy3+WpzOEFsj54Ea6avp+q+19Jc78TBJWaDL5Rbl43qs2BqXa88goiP+NYbj8sAXLx51PNbSKHOE7c4EjF7EineM14iz16+O3YkTj/wjt8W/Zwt+d67kZazpPf4tbBg+6Lj77UML2c6nPX481WH5deyDFhrr98iWkY8cDLXuXC4m5GfOF3eL+WIuWdOeLfjyFY9aNX94lnWL4t0aI2/cglIc1dmR3i0M8mKjNQdpb8EgYw5Sa3JzhEHHFskJOXNAGM1la/4jfOeLrXonu8e/Zwsb6G4eim8PZ22fY3etLIKa22GIz941Dzad2vQ5b10vx3isa3lLdz7DUqfm9rN0zwuwlGs5VBKbADnAKRfwkXc5+P/wh346Bf51r3vdxT8B97ZwX3uVDJOauyc/9mM/ttzFMEE95jGPuXzIh3zIMlnBmCEJdPHR2iruPRz2bRF+STTuJIdj/xYc9qQn+7Z07vWRtZm05PLbv/3bFzv8c/Wv/dqvXXLaoonNbfRadImxeLb4U9xf8iVfsnx9+eEf/uGX3//931/+zYm3/Vtg9YZp8i2Qy5evY/V5Zu793//9F5P9s/f/9t/+2/IAvufn2IK6yGz5ZaHAn2LKZlS7JSN2xrXxOtHXMo1vYSSVOcBtAAAgAElEQVQXj7xm7xp7T57N5MNggwXD2o49+XU/HBhjPNY8e8dkq0m+wOCP3G3Rno1wjIVBlp97lO/rcf3k+FOc1jwd79linB3qDOHj4549e7awQZ2N50axyoax3bNHHdsifHu8e7bIC5/Qnmz46xY/3/kBQ27p0Z++LUxj8cG0LyZ4R9m1vvUxXvrLAV+6G7Hmdbxliz52w7FPPlu2MPJrPUZWDNiiPuDZbiFynS+uiVt2H+EWX/bki749e/Z8ooN8NVJ+93Rv2amPvI3+6nyLF+6eLWqsWh959nC2bCQPhx0wwpnFEJNyvaVn3cd365vRfxhnaW6lsYHKQQYjTju2AhQMW5NyPF1UN6Duly420OWC76spv9Tzi0R2Nbn+5//8ny+f//mfvzyn4UcBvo/3vNRznvOctwjkWYMEvxNzTHzxoHvc9G9t8TSmoMWr/nUb37rlP1522RD71vIdb/kpd3RbfL3yla+8fNM3fdPlYz7mYxa79Sn4cstOWE12Wp9mPIjvl514/YLTr2W/9Eu/9PIf/+N/XB7M9+tGP+DwQD4ZfrDXficz2yyw4P/0T//0MubBe1+HeoDfIm/0E8YewV1jw13HbzyGNWLaFxftGb3w8clJOPm21p0ufOtt9MlYtbHmu3ZMpy1dcLJn1HFtPwwt/+jdoz2b8BtTT8kXpy2ZPXz2yyscuemc2eLfwtXHh2I62rPHv4WdP2ICi+w12sJPNnl4ti3eeLb0+BAkFpEYHfHjW+uuT0tWfsSq47VN+qsJLep8SXcyy+DBn/jZ1Lm7xx7m2MbLjvwabRl505XM2BobYzfirTGOjsnRzxZbdCSzHium+vMJzpqv43Ss22zovBntWfPu4ZMhP46zL93rdgtXH4zkHI8+rjH2jsXVQih7wt3j1z/qst88BqN4dC1dmDf+OMdgjTa3v8H+J7r+uAr+xNC5jhKZQ1aEvurx6dzWoucc2r1zCZgJ9Pd+7/cuP/RDP7QAuruizycOn4K8/sBF/Zd+6ZeWh7i/53u+Z/m1nVdD+MptlsRA8rUFv3g4Xm/Gtrb04rdo4Qtay3e8haGvSaaCgsG+5MY2neu2VT0b/IrR3atP+ZRPuW/y1V+RdvGCoW+0my2vf/3rl7tV//yf//PlmS7t53zO5yy3jS3I/FLTbWyFb5MrbTi+MuCXu2bqyd0vv95011I/f8iMi8K1P47xjcRW214cR177+FCfcMYTdc3bMZl01Cde+VZf7Z4toy5+7PFd689n+vDeSnwII517WI2v2+S15UYe13wd7+HXLy/hkNmisLZaPpXbZLf49rDJiK9c2a7REbb62IrxlsyeHnNddUau2Ozx61/7xobsaLx63rOlGGjROqZL55U/sNcx3LN/y45RHo7jaI+/8a12lMmvse/MfnLiiR/pOyM78pCTVx+So3F83G983Y71tRfXZEa89X6y+tGRP+Gt29EWY2GtdR0dm/urs+TZdiSztgM/W2xR/nS8bq13ovSO8o3ttfe8AAPMcIsZX0+9z/u8z/KVn9cV2Nw9ee/3fu/l7oWLZ0HaM+hsf4lvcpAA+042d7TcIfk3/+bfXN7zPd9z+ZrRGBnv3vrJn/zJ5Rkmukz4nvl47nOfuywYvdohzC1bjIVVoB3TLxn62BCGBK63LVx9EtikoyWH1vId7+HQjadPW45hJze2Fc0WlniR1f6Tf/JPLh/wAR+wLFhf8pKXXLyXLMIjt2Jgg29ygO27eV9Z/viP//jyKg5jP/uzP3uxCFMbXmnxfu/3fvd9BRmmlv3Iqyg8+C+vZL7yK79yscW70+gWK3qRY5tc1Kfm+EC3vni0+hEePuhLbhkY/sRbjvinL7yB9S12k8MXtUjuGNZRLtRV8md0hrtuySa/Zdeaf+uYLexnj5i2v8V71EeeDcU7e45k1mNkkpMXMQx3zXt0zA+bD2nZU7yP5NZjbGGD+s+u2jXv3jH9bLnVl3BbzHbMjms+NV48OgdhNHbkjzH2x0sO1kh4jjDSVR7O8I/47aeDLWHUF8/ZNnn8t2Kwwyavt+Y2O8iLa8dn/YivnNzqC5xyDKv9W/Gcu81xMMLL3mtt/oxy4W3JGovI2NgAJ1vYIc4jbzK1zrF8hoFX31n64/vTZyVWfH7q7E6XVw84YbzWwL8p6kE0F84P/uAPvnz5l3/5csdiJX7zocCMZKKg3y/T/sW/+BfLw5qe+3r2s5+9TKoCQ8bdFjzugLnr4nklk65XIgic58ZK5og/7hunq8nJcfgwxgSOBTFibO2TY2NJL/G1WzJbfewJx74NzeCQryDD0noey8avChR+saCn2HhQXA48POsrXoscvB6UfNGLXnT54i/+4qU2vJLDQ6UWwls20uuryu/7vu9b/vWVB/y/9Vu/dXleb/SfPfkqp1F2artlrGY91A/bYk2/iyZ59iO2lEv9jm35ShZpYe/Zbpx8/GJHF/5srt3CoKNx+7DKzR7/YtjGH3Iom2Dt2b4h/hZdZPPFwKwtZGCIJ5ziM4OTH7DKuT4+wTxL4pJM+SU/YwtdMFrws8M2i5FPYmOLZnH4kTxM5HgPx1gxcA44VqfiUL0ZR/raXzre/Adf9tevD179o+wWBrl42w93z/Z0jS2MEcfcfOT/KDvup1sf/dk8YwtZutc2iYXtLLEF5ZcWzdpCrjkojFkccja5LSazGPjVKb/yTR/cWZ/GeoeB2LWFk71yguTAeWvjTznPvy0McviMkaffdWT0YwE/+HPPCzC/bHzpS1+6FJc3sz/60Y9e3v3lrgXyaxHPYfkay0PUf+fv/J0Dc84PcbiTqSBy3EXaqw5+5md+ZlkYCog7G4IjmBaMyMXXhgTQw+Beh2BxdobgZQN+xdzXfBVPdp3Bw6MobOQqAMczCYXDHxjs6Nj+DA69cMLIVwtrcctO+MVCn81X0H456QcQL37xiy8///M/vyywLJzgeBbM/xB1l/ILv/ALl6J38YRtQbxFD3vYwxY8z5X19nwnC/tMrOTTTwdfW1jJixrAS4d9uSbPR79sshjvhwDwYPAr/7Riqp8erRMVL9qLL15j2ojM3om6lyN2jliObXv86Vq32T/aNNbKmn/rmN8on8ijWVucM8nAyJ/6FtATf7KjxYLjWQxq1nJiVX5PmHEfS/EIU6zHvvsYd3boTXbM16xP/CEfHjvQEU4132LWubOOQTh7PhmvXuliB5z4axdjdv7kt2Hy8PQd2b6GIpd8sajG1rzXjsOiP9tmbIGf7uLnPBKLGZx0wyiOs3FhSzLaqL6Oz7SjHfhvweircvEZ8WbiQo68DZHVt4dRPvNRLNW8Tb2P42HFu24bJ+P6wp+zdM8LMMrcvXjIQx6yvAHdRc+izAUOmRRdsN1x8oJDX111kp81cotPcBHnu9C60Pt6ysP3j3rUo5Z+F9X0SQ5eASbfpt8FURLss3k96WSDxeSv/MqvLBMKLDJwtBLgzooTi06vbRgTGcZeC8OiwGTlZ+js8FNy/TNEJwx3oNioKJwYMzgw+OVrP21+8MvXuBZYFjL0dEEWMzaLpX9FZAHmq12L2z/8wz9cXujIHu8AY5N8/cAP/MDyr4rcIaVnnBDyWZ88qiFY3jPmuTI2WbB5CZ9FVAsprTG2OKHYB9vi2746xMN+8mKsRr08k5w4qSu1sG7VOznEF/Eorlu2w7MZY4N4adlgn43ZSldY+T62+MgiC0Y/NBGHGQqDHrXm5YdyWQ7PYLGTP+IDx/nPnyPbt3DhsIecehcPMd0797YwxAOGPPsJuHzKz6wt8gALhn8DVr74OEP4xaMX9bJNjWzVxh6u80de1Dy/yJa3PZmtfnaIZS9ShQFb3reIHhud1f4b3/jGxX6y4qoVW7GqFkcsvlbT+mE1l7GFbP4c5cgYO8moE/OQc/TsB2S66ekcgwcD1uzLMtngvIdlrnCumL+O7B9j0n7xl1tYxXMrjsmsW7xyYy7T8lG8Z4nt5k3nmxdkw5itUxji0PkfBj9nSW7gVRt8m4mvD/3N8+pGntnT+bO2hx7+Nu/hF1N2eCuCuIh1vuzZQpdrCV341WeYa51bx/e8AKOcM05yxWnhpc/FAXFSkkzQHqZ2fH/QWLQmFQHz1nZ3VHzt6Nmj3jsmmR6u9+4mfYJloRSG4Aucjf17wWa3CR6/xNLLd/x0wKuAjPlKzcl7lshLqBg54S022JudZ3HYQq/NSc4OdOTXGpsfSOvOFRvY9fVf//XL81yer/Nsn3jR1wSl+PS50+n5LrXgoiZmXeg9RD8SG+HLy5aNTgLy7qZ5ZQU71Jtc2HzF6d1kfh1p0fv4xz9+yY9XjXhthcWdBYv/TOB/Y3otCT/cTXOB8ZW1rzTlzIP9LnzsSC//yrE6c6K6s9sFQoyK+eiXfX6xvbqo/sXLV7HiZUyLby/X8PGxAw8b2Nt7b9Z6945hZJe4m7hm32nUpMQmZCKHMVPr2ZA94gFDHIrRAn7iTxOt3KgFfjk/92K5BUkvHPMWDFQNbPHv9akJMYXBN7Ga9Yde56xvEVyoi7f+GTKfwbBwYQsfxeWIquPqUUyqMX1iyg582TXiVadqOd9hiIf6IFtc4hnl2ycrluVRbfDF3HKW2Ct+cFDxcH7PEFv4xRab/ebEGRx+qwVzkXgUz5k6xcsf8yo74LBvBoPN+Ol3zogr2+RjhujlS/PhLRj0sQMWO7Q2vs3MJ/KszrznTavOmge2zhv+ywXdiO/WL3T6BT/ZatU4m/aIrPkLicUR7xpjajUUMOPtayn2taO7Tn4l53kehS4gyAXP/4Bk5Id92Ictid4KyNqwa8fZIoBOChdenzr9wtE/gaZfkbrzYgHgRwIeBHcXhS0myRIEwwJNYUug8T3y673P+7zPW4YVCV62SLrkuSPhIX8LvJnJAqB4FreK2QIjX/dsWveXG7YpMhhHFD9/EDn65alJk12OxcwdMDzv8A7vsPCzu5c9Zqt/wN0+LETeokF/GxzYdMtjMovA8MeJnh/yZDGH1J88+4Wk5/j8EESdecjf5p/G+9dJ+Cy8LM68DPZbvuVbljtxcun1I/LvxwLh8gmxmf2O88MnaHEpNsb27IbReDEd4wzfuD771yg7xEPdiuetlD3iDvcs8bW4mMDZzg7xuIXg0Q9DexTLLXz1Q6Ya4s+ZWK6xnLNwsmM9fuaY3uYktY3y74w8nvIinmr7VmIHe8IQHzYdxXfUPdYEOcfwtEeLynJIjw0mG8iQd4zs79kCQx7iZ3t1NhOP0Vb74c5gsJEc4kP+zGCMvGKpRm23kLpwjWVX14vsuwVPbpLfy8cernm1vBzlc09ePwz678WXdMtP85k47dUpP8nYEP365NZ+c0i1Wnz2/MBP3hwiN2dpagHm4uuk6ESuEL0F18LHHSiLMQHt/0tZ+PjEYVHCCWNdSM8aucUHy6KHLcjF1y8YFZNPsZJpNWoh4P8EusPRJODXfD/3cz93edKTnnTfZOAVFDDhuGO3Z2OTKp3tk5NsCcguibc/S8mERb6+GSwyMJIf8UYcOVSE4jgWq4W0B+ctrMSyMYWGt8KEOxZxttaHDw8MY43XZssYy/rGtgKHG68LjJyqA2/I9oJXn9bdOfTLSr/ItVhzW/kDP/ADl9eSqFP8FmM+VX/DN3zDcrdOv09gcs/X9LEhu2v1saH4xjPa23482uS19cdXa2yLRv4RZ49/C0NfdjTe8QzOmlcesincs231lx3k1vjXsEb+8jL2XZM3Xny1amy054x8PPS28NGXHbXxHbXpH+VvsYfOLb1bfXQVA/vj+RuOdrRjC0c+4wsjvrFNV31b8Rjl8Ts+4t/CyC91Ua3NYsRPvvrKnj2dW/3F7ozvW/KjL+0Xoz3+vf7RhvzDO+7vyY79+Iur/lvi0rWFL64t2VA76tvbx7tVH3sYY7/9jse40DWO7elOxjhfZnJy/SP3oJUxAuTT9xh0i6qP//iPX37Z9vSnP335ZZsLns0/4/bG+Uc+8pHLynBvYTOoOb27/oTooskWiwZBcBvfhZndLtQuxl5L4eWrvgbzFRQ+d0TcpXMB9q9d7k8bTzvzp8zoToYLB/LMhq/0+prWpIPk3CJ8JIuZsQDHsbfmvrqUSzb6yoU/bFUP6sIC290tL+D1Sg1fUaPv+q7vWhbdvr5Ecq+u4N3RXQTuInAXgbsI3EXg/1cETt8Bc2HrroAFThcora/4fviHf3hZbP2rf/WvljsMrQKNu4B72NovIS2A7g9iTxd+ulrBdofORdRC0YrUBRl1YfW1k0XGk5/85OWCTcb/E/yiL/qi5e5JNt8fdr6tY4ibWLpDpbVg8QtFC1H/Z7H/UI/P5nUj8u+up/iLb7F/a/vagkvbnTC1ZrOYZJvnDtnr61LPjbkz63lEd8C8CsMi0/+U/Jf/8l8u/57KA/78atH51vbpTt9dBO4icBeBuwj82YjA6QWYcLjQdnvdRcrFzP/688oHD7571sZdJM9X+RoIuaC7S+L5GpuHqFuc3WuIWxRo6Wgh4OJpEeUB9pe//OVLv6+WXKTxeM7LA9me/XGnxMUZL3LXxELzzwrJo9hZgInZy172suXrWg+pt3CVLzwWsBZlNncT1YK+Py0a68i/OvJgLOKDu58WlB7c99yfX8X+7u/+7uXVr371knf/KcHXlRbh/PZqi341xtcR+0/Lvzu9dxG4i8BdBO4i8MCNwOkFWBckF1wXtt/5nd9Z3nTvgTOLGs9buZhZwDjGg7S+1vGLOA+lu+DfH5Q9sCwEXDQtnLSocc+f9b1sNrXI6hck+tmlbSHyZ+UOSD6LmUWVd6ghXxmLidjhsYmt1h1D8WnBq694L8JvpT8WTmyUzxZfFtQW/8bYZfHFL/sW2j4AIL/gxMuPfHFXDK86wp9/byV37tTcReAuAncRuIvAn6EInF6AiUkXWhdbF7LHPe5xy68PvT3e3ZIHP/jB990RaSHUV1Sf+ZmfubzN/P6MrYuvjT095G3fxlZkwTjy6esOl/4Wi+y1sLCYu/XCSw4mciH38/wtrK0+Mskm7yvUo4VgPi4Khz/wbRYm7vz51d4eL7+LmRfl/tRP/dTy8L3FiK/syPtRA9vYIp6+vhXDs7GCYUFElgycPXvYskXupJLPF3VV/vBbTKFiC7846Hds84HBHVpjbBLj+NgGV39xr5a0+ukRV7ktJmtdiyFv/lNOa7ORP71TiH4YdIx8Iw4eY1rED7awY5bogcMGddorY2ZwspO8GuJLMVvj8O2I2CKm8lIst/jZvUVk6OYPX9jjuFiNMnu28IcN/Ok9UfK9hQFvzxa61ZEPpKOuLRw6i+NoI2x2qE1YeEaskffIljDI0q/tvFljODZOF/3xqjG5He2ENR6PWKOfMOSh3Dp/wyaDd+QfcfKZvXD4oubLzZp3yx595KsH9SGmW7zw9nJqTC3AIs+fLTtGm7b28528+pDbWQrDoxPk5YZtt/jU+d98KM5bMYC9h29uF9/iccS7hc1/fjSXVQ9HOPGMsRMPdjj/q93yvme72ix2bFNf6qw5pBs6xrZ00k9XY/TA2PNztLf90wuwnNBS6M6SfzOj9Y+RXbj9Y+W+5uMc4mABEWTj9xexI+fXmAVhi2ctY2KwISfZLImJjc5aOixgJOQskY28UsPJ7vmlsb9x7V5//nWii7scbJGFa1gvfOELl7uUfv3oxHZxd2IpZCeJgvR/IP0vx2c+85n33XUSM3neI3EQ3yYv+3v2ZPsay0tSybGFrH06y/Oaf+vYpAdHTLswsP0ojp2k9NAnlk52k1d2iA2792zJ17E+fH0vnnJEFs+efL6wMx6xlJuO4/l/7N3/831fWdf/5z/Q9GWaaRp/MNMKKygLFS0aC0Ulo9RGyMy+WURqFjnKGBpKFDSa2ISamCHZFw3N0tE0MkWEcDJRzNQRKpumf6Af+PEzt/3h/m6xWWufvc/rnfGm15rZz7X3Wtf1uB7Xta61zjr7nLOfZ2o6bPLFL0T7+P2MLpniVQz9oMHz1FZckt/j57N+3yMV39HHvfwqN8pN31fEwSIqP2ZlxUU7PfNOPMJZrQdHXPjiYa4KXMdMfsWFbTG1VsoRcmI1w2Bj1c4XsfHGkgyco7nHBhn26VkbxJRu9tVHNukmYzzZ44tcE8v62ZE/yW6gwx/95roYwOEL+dmbBbKzApsP5hi7fIG5+pHVKo7a6cGyJjq38bhaiquvOsCUb+qV3Rl+GG3wYTRvZvJH2NZCvogrXDjqfVnFl1xriPnPlpiv5Fdc2BVXa6ocuQenTRN/HG2e+DbjgycZtvPba7XNqJwVVzeVjPNqDeA/HHzZUFuXvXaeLad3GwzkCEMcazPlUQ8evIkoQg5OKWoOmdDkBTm9syQ/0OXyueQVH5PVF9XV+1Icj9q9CNgo+GhtJb/X75o8TpLHZsF33lzjtS8lq+RzJ/PzPu/zHl74whduE9ED6Sye9OkaXz+meOtb37r9utS/B8rnFUftXuTli4985QOclfyen2uy4gHDdw7LPzmlbV9mfpKx8PWQWHp8xz8fbuHgYcGB4/tjxVQ7mysc/WTZJOfcGxd3kflAr0VghUFHqd9CYdHqI9U999V1XPU3Fz16JdyV3tie33RaoDzywzy/Uho/vtuQyrejOK6w4cgpMf2wD/uwLaYW16vFXLFZ8V89yo+rPvViLx7luXhdjS/7xhYfY+a4gsF3a488FReltXgVFzwdbIupGJovYso2DuXpao5pp1s/LC/OH/IhH7LFo/byUD0reLDViyQ5+dFz+mY6+zb6xiC/xBIPP8y5UvKJL71R8AibfLmCZc2xHlrHisEVHLIwvPniHx78u4KBLx1rKiw/jDO+je1Zf/C34ZBnXv9h3MPFmupNuu+PizFfYK/yXd++WJNtmnqtM+6uV/NXjuqDFZ5NnE93WlNxEZ/k9jbH6/zmB4yz5fQGTFAa5Agj6NzA+bKzOyMWZKS1KcgjZ1f4NV/zNdvidpbcU0VujA3O/JUAFo9iNfpSHMc259rpKpJSDOmv5JOd4dDr3VHYMy4tUGobL48Tca4YOxj0avOuwDXb8ZLMq8miXX9c5Ywy46J9hYNHfWMdhw30vX9W2PKyF0iiuOC1ktfOVr66dsQlPTJ4zLiwU3u1NlzikIz+MLfO3Z/skJEbfDmS36lvlzDS4ZdNmDJym+mNbTAqI48VRmOfTnU55bpxgb2SH+2Goc6nYur6KpfsmneV1reux3rFRWz5Ii75t+JDtrEYsZ3jURz4Er+9nOsVF2OLR3leTKr3WHDwyZ7zYkq29uRm3Ml0xKs8Tb46zD2P2tNXw8AF9r7AGzHrTza+jctMlk720h/r1i0cjAvZxmeUOzqng5P1g678UK/4zLDo42JcW5u1rTBWPsVDTMjQz8e9XX0zfBjWdhjF5B4udMWVffoOZWZz1U7foeTzEc4ok5yYNv+LxSi3gS/+xBsHdyfPlksbsEAFTGHUhsvT31/wghdsd2w8hdzHkZ/4iZ+4yXjB9s+6/YsX7ywNWAtTeE/1ukEqJhJnjNEV/+g2+A3qSr/E2fdrhzEm8EqWronsXYxnuJHz7soX1p3DUKffRwJNFvrGc7Q14zNi6A9vL7u6hu8Q63THuI969Y9tzrU3LvVpW8nvfYpDuuqRz9i+Px+5Og872+qx/Uh/5Jz+Xv7oOh11L9BH8vs+evHPrzD3sq5XfbWXq2ewZvjNF5xghDOTzeaqT36U2/Gayd5qi8ORPRizfrrWSX1j/3h+y75+vqQDU3y6nunr6ygGxTT5/HK9wiIz9pUrow5uI1b4Yz1ijL6MMp2PsrO20dZMNp1VnY56PF/Jr9r3d1PCWsnP2vPl1njOdGvbj1Htq/qI58jjSG6Fjcs+H+CMeTPqzmwkW2zIdz6Tr2+G23oyYoxys3M2OqypZ8v/fit7Q8OCkJOjQz5Pf9vb3rbdCn3729++PfDSx2Zu9Tq+4zu+Y3vqvNv7fVxxw9RTslvQx0VCrIrXFYfaxdMRZ3G/WrJbTX+VFGRsvrLDvo8+Rx7hqN2u9nBdvzTsndwKm91iIuHpH8ke+Um3vIvrkfysDwd8FDxgOs6W7FePMVr5lb2979mujs+KS3L6YbqOx0pn1R6W+t5Y3uK7sr1vLz61y6krJV/ohDW2ncUqDnRHrLP6ezljg88qL/by+2t8Guc47WWuXMMqPis9duLrHIfR9jjmY/seT1+HvjFP09PW+V6/a/big/vsRTPZozoMMrdsrnDyHYfGdiW7as+2uvNbY7LHSk/7eL6Xu3U9xhPOuJbd0l31F6NV/1F7Y4SL42pcwh51jzDIKXuZ2evUXiZb6njnO/1xAzfKzs5P3wEb71pJwCaV2sbK3S0P7+SY75T4OFJB3r+Iec1rXrP9q6Df+3t/74zHU7qNj+LQAiFWNjXajgZv5jTd8MSy65lsY7DvK7mq4ZUU3XL2TsztVh+TetEb3/FaePX3IkBfgrH3/Oc//+EzPuMzttvOdBV2sjXjAjv7K7n0ZvFiNy7F1DXMW3jhqvlQPOkWlxWG/uwZW/ra4ihGlfC6rk4fX7YV9rRXnN/ypdxKB97VzQrdfGKTP9ldxSB7+5pe+vJgjMtedvR17EtfrcBYfWxf/6jfebEprur8TKZ6xSV/GufyZCUPf1XKCzzispJd4Y/22cq3Gc6KCx2xTTdeK3m+lw/0XDvSx9ULNW4r3iO/ZJq77MLPn7BHnc7j0riwidOKe7bSV8e7tvJM+6ys2sOa6VxpG/ngW4yP7M7w6dIpFs5XGKt2unCK763cmPHQxgc4xss4O3fMSnz3fTAa37D2MuP1zCdt5RmfFJjKTB6X+uPFdnGh5xy3cnYD2/3J12prMh5ny+kN2AoQSYPni4Uc8qLuS5tvectbNhXXvvyozxeHTeAGe4X5VGtvITHQ/DMANqXqq77CElO1Q6m+EhcJ0ZE+bjaGiu+H6NeHYwk08pV4xm3ECegaBuEAACAASURBVKu6JB319jzJhFHSZ28vu2qnl646+yv5Pa5rL+6OJqg2YxTuXqf2aracF0M4xpx/juT2OPT28aE7cnfesdePZzp8x8HHwSPGTG/fNsrDi3Px3MvPrhtP+uI3LsIz+VUb/YrzOIwc61ev2pO5x5d01cYIj+zEZ5TpPJmuq7WLj5J/cmQln95Yk6eb/hEPeits6y6f6m/zdIRH1sE2uVFW+4g3cu5cLuznglzNn7BvxQQGGYVuc3fkk81VzVb66rhfwQg7HZwcXdd/pS4G8au+B4MO/asY+OdL8wbWVb+ShyW+R2XFUTscRzLVM7xZHx/ke3OGXmt7HGdYYx8fwlaf4WNOkcuuPMXjbHlSNmD+56MniXsu2Ktf/eqHT/mUT9n+lyAS/g+ku2M/8zM/s/2iZhzssySfCnINnCQ0CBYdbQb1bCE/Lt4G9op+dvY6MGGLvTtgOOIH34Kpzm5+pCOx4PUiy4bE1u6Xk77jd8tP+nEKN65najpiiveIFeYZDDLenTjg8VkRkxWO9nxT03Pw36EfJ33J7bmMtjpXN2GdwxHf/Ntj7HmSH4+Z/K02/MUAD+dX5iXO+Rv/+NyyO/aPMcUlDO1XSnzEb7YBOIuFQ/kQ5lnd5PhAdx+X8i25o1qOGhc6bZqO5Fd9xQInBV7jNtOJ9yhDR/tY56O2fYk3DPYV+VU8XMdnrztew06ObnO3tlF2dU42HBheGEffVnr79nTUHWSucEk+HTg4Kc7PFrJyQhHrYjwbiyNMOHSKD15XeMCm03gbY2s0n67ihAUvHtVHPox97OJAT8EhHrXt5fneGNRXPLQ7V47WR2uOQt5hPNLbOm78eeQNmAXL4wj8m6Ev/dIvfXjmM5/58JKXvOThZS972Wba/10UCF/O96+KJE+kb3B7SnWXMAbAYuFnsT/3cz936TlgHDbYFgo/3fZFeD8hnyUQ2VW7PjH2ZXp3ID3/RpEY/TKKDdfkStx8MF6SyeRyZ5MvinZ3MW2mfZRsLG3AYJKdFTh+3suOZ/ngY/PXwrHXadKM7Xj6/40w/MwXX+crjFF3PDcuv/iLv7gtFDDos7eaMOLRIkeGPP78Fgfn4wv2ahPDBiyxwBvmu971ru0uqQ2xPtj6yMyKdgddhzusfgJ+5Rc3cIsve+z6DxXFYWZ31lYs6OHi3zrFbSbPzqzg4oDx7ne/e8tXsXU9K3Ef+3Axlhb/X/qlX9owjLNYzuzO2sLjj0exhLkaC/IzLtphiAc+xpZcOZKd6hUX9v3bLH6QWemHs+Li0R7yBBdxFafeGKa7r/lMnh/sep6ZPHMNAzf2VrEhh3NjCMu8t4bAo6//KF9w0s9/fOmVp3zal1UctfuOcnPMmupROFcfg8S+uW7N9Gt+cej5aHsut67FxVpmzXTcisMeT/z4Y0z45zFBq7HY647XxrDns8GTG/w0fmcL+2JhLXMOs/GdYazyFH+vM9ZU57DwgDUrMxzjQk8trkr5M5PXbyzw1893MfUICbbNG20wcVpxoU9OLVflCT/sg86UR96AMWyS/cW/+BcfPuqjPmp7Qbb4+T+LisCaxO6QfbAWg+QwkA2UQbGB6n9invHdQDv6pSH9o3/fxOaqGBPPeZEQnp1DtiSDCdsir5aI+pp8/MCjds8SysfXv/712w8rXve6123jrd2itkpyOJ67Iyd8ud/ksJCZ8LMyw4mb2rOATCznsGfyM1xtYuGAwddb+nwTA7LV+Fuw/K9J59ob85Vd/TDg8R1nGJ4FJA7a9efnDCcMffQtEDZfYn+1FDO24fjKgFicLcWiRRvGh37ohy7jwL9Z0S4v4MEyLupVPOM9YmnDXb7Dw0NsYc7KigtZa5kxhWE8XM9skl210yseeCh8nMV3xYUvxlZ+5AfZlc1VOx3PVuoNj+vON2K7P+UYvvxoXMSDrrnDlnb+aNsXGMYwTuyRt87I71F3Nc4w6YufWNDxZtI6ZP7sy4wHGRzJG0e21H4YNsPYY47X4mFM6VnL4FhDj/iP+uM5fxRjK564X8UxNm2KzX/xvlrYxUWMm3f8vIpF33rc8/eM8Wo8yok9V/LypGcruubjKi4zHG/yjbd8F1c5gxcfV3xwNZaKczHFQ75bB9hf6eYDm/jAoStP1GfLI2/AGPcMsNe+9rXbF+2f9rSnvc9i44UaOYPbC+dZck8Vuf0gGTibH8mwSqKVb7DE1E4chl+UzhJupa89DLUJMm6QepChf0rtf3f6J9Zf8AVfsCWNpKcTZ8nl16s2ThJUsfB4AKgH3pkwZFusV5x6Ue2hsvxh50rxbs2kgiGf2HV9pcDAv5jyz7HCKRZNMtcmprERx9rPjA9ZnMmKhzubv+bX/JonxupoweEj29lx7k6ghcaDGK+UcGBZcPCwmbxScG2hFQ8vTN5oXFl42Cv2ai9s92wm480fd1mMLX6ui1cyR7W4FA+bhfJafaUYE/Ewd3uxLeZncfA2LnioxQfGVS7e/IqrA2bxhrUqzeXyUZ7xpfGGcYtHumyw646APIVBl/1bMUnG3HRu3oqrNfVsocdefDz5XSzE9UopdnTaFPZw6is48bGZtKZ2fRWDvAfC4tKaegWDrHG0aeEbDAUf11eK1wKv7daQdKvP4lhD+NJrE/2rXMjDaGzHcZ/xkBPltH76DmMj3+XJ2VzFF57a3V7nZ8sjb8C8GLpt71EUDHNCGV/UDJCiv0Vpa/gg+WOgBF9SV3uRHWNw1lX6Svqw7ylwGo8xkcJ75Stf+fCzP/uzD8961rOeeOHc8022RdfY9o7CmCavPd57rnQVi2c4rlfye/2ucckPtq/qw6EvXythdr2q2XLkp7i6pq8ccUln1B919zaPsEZbcMu3Pcat62zEacS9pavfwqXgoIipXAh3azzxh045ca8vo5n4GJerXMg7erMAq/webdw6p+ONZmtePKpv6etvbJPlj7YrGOGoy9PwVjijjXGMk6/fdedhVhtHuo2rdrJKOMnur2ufycqxq+M64jtvPMf20ebROdt8so65yzHjeKQ/9skxHPbjMsocne/576+PdOtjW47yqXIPn+JSbOFd5SNfmnetrTCu4MixfZ7hEq98rN7nNz8c2umERf5WXMimI6ajbvZW9X2v7gOaj8s++ZM/efvo8eUvf/l26xwZzjuQKZjeIV/534iDmcenT1IELGTu4LzjHe/Y3i34p9tXijtiinctCrySeWt4/OdxBB5H4HEEHkfgcQQeR+BmBB75DphNlh2iW3ae/eUjLbcje1G2AevO15d92Zdd/sjkpgePBU5HwFjYofv40ZfR/9yf+3NP3PY9C+IXrsa274XRO3qncRb3sdzjCDyOwOMIPI7A4wj8vxSBR96A2Xz5roEXYQ9g9RmoX3n4PFZxy9a5z/B9P+LKbcX/lwbil9NXjwbxRUO/VF3dol3xee5zn/vw7Gc/e9vIuQvmV0ZXbrmucB+3P47A4wg8jsDjCDyOwP9LEXjkDZiPpJ7znOc8/OiP/uh2N8X3H2zG+ojKC7Q7Jr7c5ouYPuvt7tj/S4H+QPDV5tdmyc/kPdG+X79cGQ/6fdna2CqPN9UfCKP7mMPjCDyOwOMIPI7AUykCj7wB8ysdHzH2CyYfcbkr5vlQFS/a+t0J68W7vsf1L18EbIz9hwL/PP1bv/Vbt03y1WfiGEvj25diXSuPN2G/fOP42NLjCDyOwOMIPI7AUz8Cj7wBs/nyMZY7X16Y+5WjO12KNv3kbL7IJfPUD9//7wHfurNnQ8I/1x7Wd+UjvjYzavp+4mvTKoZXio1WmyQPpnOHC0e4X/VVX/Xw9Kc/fWvzUbFHIejbl9r84sfP831xn1+eHeZn5T5u9iwbdzaP7qDZqPnhhXGH2ceWOF4p9Nj3cTdMuZSfZ3HwEFcY4iO2t3Kx3CWPv4/R+SJ2ruNhAzoba+14OsQpOf74iT8O2oyN2jEr9etj15jQ5cuVQhdPdvghHh7PcaXAKKfi62fxM/+PcNkut42p+QL71piMmM2Vfp3WwyVhxG2UX52z3zj5GoWi7QoXOnxi19jSr+Rn10d1uWae+YQBr2J+pLfvM754yBWYePEHx1kRSwdZ3MVUvpvj7Bdr/Q7X+zK2sc8eLPkhZ+jxh5x8cT4r2uPgHGd+rORXGOzzgV1rWWvqTH7Vhisu3qyKBS5y5Gq+w6fbuMQLt7OlWFjL8BJX3K5yMZ7iOfqi7QoX9ltDxod9X5l3/OaTWHiQshs4Ci5XfPLcPFzM//KGb3JuljNkWrv1lx/sepwNrNYUctpnpfWBPEwxZfNsOS+5QDQIHC1YSHCma2o5qC7AC7inZLOEa3EpHjliYO4pFl4x9DGf+F4p+BgHSe2gL/bwXvWqV20LsXNyfVQ8w6djosOQgDC//du//eGbv/mbH974xjduC5JNgERdFRgWPvbIiQ+cVUKvcGCIpWe0wIjPlQWDLw728YFxa3zEiD01X8gbm777Jrb68TjyiQz9Ch5iT3+04XxWyLHRgtL43uI/w8KDHWOHR5vAmeysLT/UeIkHjCsLD1z6fFLD8EMe5YpP/MCB/XKk3JhxX7XBked4sI8X3KuleBhbGI37alxX+MZljIMYOa6U5r41ly5uRz7FFe9yWUwdFThHvqRLBh4cL0o2L+lqdxSfsMc6XXxhiIfjyutH9tQwjK3vIveiOdo7OscThvHAAVaf/Bzp7fvgmLfi2ZoK6yieewyyYpI+Tvm3l711zRd84IVxhYsx4ou4jmvqLbv7fvbh9KkZDvHZy66uzX8cxNMhLtpW+QJff7nIJg5y1dzVrw+3ZGa26RhX+q1/47yd6Yxtj7wB64UcYSRcI+1cQV5AWgSQ/WAs/Bx9tuB4aGBtZ3xuotMxOTyYzi9Kxe9KMQaSUTJZKPrFojHCqURxXqLt8XFo7MjBxO83/sbfuOm7+9WTusfx3uPQS9dTqBXYV32S6HD4Ev8ju3seruWgyYU3X3AYx22mwya55C183iH9ht/wG7bY5c+RT3Qr5PA2vngUBzVbqzL24eydr1o8rhRcGlsx9TBGGNrOFnaNgbp4GNvVYneEi494WAx9J7E4H+mMffmiFlM85LR44Xe2kHe3uHjw72p+sWXxdbfY9117oW+Mz3IhJ8dg9D1Lbfy6UvDwkE13uYvTrfjimu9q88VDRxvv7K+4iGP+lrMwmrfsG5fGaIWDL5xeN9zp5UtfdYnHUV2ekoFlbMXUQ1CvlH0u4SxX8/MsFhzrMl5iOsbqCoa8NLawWlOv5Dpb4mtc5CtfFBhXccTUXUFrmRwRm6sY1hCxaF3GTbkSX/rWEOMrxxzl1owPG2MusscPJYzGZ8TaBIY/ZBS2YDq87p4tj7wBY5CDCIxkIqBPIA1ODiWXzFO9bsDzg88miaLvbGkA1SXPVYxslVxdhy1JcRtvvxqbWRkx8sOEM/FN3BL77HjiUAmv61s1W44R46zdsItrtvNvxEx2rMmRYS8d/eEku7+ufY+/x9DPt5U+HGOm30HeC5MX+COd7I91XNQOczPMUe7ofI/R4nMvF3qj/1dxkg8j3+J55MvYR54v4e03HaPs0fk+T8M70tn3FdPRh6s4csRBDyc5xKcjnGKYXNf4neUCf5QNo3Z9HUdcmt9kiseR/D6G7FbouWb3Ckb6oz+13YPDpz2v8M7WMPAprvRGzDM4+VNc6YR5Rj8Zdh3hFef6z9R08Gi807kSX7rWw3HOHuV7fNWjXTzYra16xcX6mQwsr6td58dRPX/lPdLY9dm9chwRn7/aRSLCkYpFwIv2M57xjGmgk3uq1hKQfy1a/OCzgbg6Mdqsih/dMY5n40PPASt9taN31PqN05iwI/44hhKZL9r8zy+PovCvZyRlHPWtSnzispI7audLNuA4h3u18CUe8VpNLtjZqaaDSzVdfXGa8Rl1R/kRP1+q9zjFWr+DH+beSn6vP16nww95q9Q2yq3OyY4+ue5Y6aza0xM/R9gr+Vk7HWXM95ncUVs8Gtty5Ehn1ZdumCu5o3ZvcIoJueJ9pLPvc4dDnsQDhlK89vLlWO3ZT8+181tcRrnsjRxG++N5dquNRYUfypF8stXJ4uPc0XkyZ+uwkodztcShPLWmFquzWGHQg+NofM5ikCsWxUO9H/8zeOGQDesqHxj7PNV2pdBvzqQXjxVWeTzK8cF18eh6hbGXw6M1NR5H9SNvwOz43Lr3TKk3vOEN73f7zaAiaZP2wz/8ww8f+7Efe8TnKdlnwBrEagPR4Jx1iq4JZfMWpsEUuytFsoi7Ep8SSZLCK6FWHMOg7zw+L3rRix4c7qSNNrKz55ke2XIh7L3s6jquYYmRjePK5gqndyb0xoXrFs7YP54bG99r02a8j8ZJnPN7xMDVdceKu/Y4k+U/e3usI/1sJUO3vKjtTJ3e3p97uJR/dOWHvDqK44zfaBfGmC8z+Vmb8QsnjOqZ/FEbPViNeXl3pDP2pastTvvzUX51Lo69cZI7+Fhbis9ML3vq5GorV8Jc6ZMvds7Hg47rsJzPCtsOcsXvyO4MozZj25ra2NR3psZR/Nh3xA3WlUIvX0a9VQxGmc7FY/QhPvWfrfc4Y5zPYiQXHzHqvL4zNR2x2cdhf32EJQ7dAMFD4ZO2WcleNRn2HPjA0Ff/ikv9avbUV8qc3QUExPxPwW/5lm/ZPlP2b4l8hurduZJDNmo+w+fcL0cRiHaiTb4Wd5wEq3qcFA3e2HaLb8EnR9/C14sjG1cKPdxaPMXtarHgiDMf8geG6/y6NQ5488tR/GAYV5sO/BQxhrXC4wv9+uHFYQM48QeXUQfePSUuOJiY6qPxKUdGuXTp+Z6fa+XWOJEbfSh+YRfvIz6j38Z43DScjQd7DuPBFh5HNme4coovcJQWvqs4dOGIc3i34jjjU1s+3cNDbN0xKsbl61UsesXUeeMbxzO1+Laxv2p/xBfX5r8x6sXoCFMfznLLmKQD13V4ZzCSoQOzWKgryXRdrb28at42H5O5VYc9zrU43NLd9/MdnjF17ri35Ft5fwWHffpxoev8asFfXBqb8v4KFv7GqPiGcZULHBjj2FzhwR4MOTvG9GgtKQdHO2Iivor28Vj5NPrOtmOcMyu92h95A+aOyk/+5E9uL0Y/9mM/tn3M6EW5wShhuvNSHYEnuzYIShNFoAVFjVMBb6AEXRKqk70SwPgbiLD5GI/6r9YwxBGncM9i5LvNEl9KzLP65IqF8zaysEpqMXPd+K6w9fNFDVN9tZTYxkhhO5wrsSmWdPIPdrl6xIu8QymeruNRDu0x4LOX/87pO+IQn73ueE2eXHkKr3iMcmfPiyn5FfcV1hh/ueGNjbZ7Ch7lVzEupmfw0iErPvGA4fpsgZM8PuVEbWdx2BcP49XizMcrPsFwlB/5dpULm45iBNP1Km+SY48ce9r4Yq47H/Gc70t5nXzc93K3rnFt7uARl1t6Yz++9OAozZ1R5sx5POBZy1yHfUY/GToO+nG6Byf7cJ0Xn+ycqel5feCPgocC60ox3vIdnnyovoLRWNNVyrFZfq1wyTrKEzXfeo3a6zUXtDcm5PmjT1v2x/Vgj0Oe3F5+L7e6fv8ZtJJctFtkkPAT8o/6qI/apASSEwVWYwtaA72Ae+Rmk6ygj+e1Zd+1QZI8Bdp17VeJiIECy1EMruDgJmaKeD3KggGDvuejvP71r9+eB3SFC/74FLeu3SX4qZ/6qa0PHpleQFf4Nm2P+o6+sWxi4eP8SsF1Py7l5QynvFCz1di686Wc5ZAu+4qYtmEP85Yv/CeTD+r4baAn/6QnX+HxP14nId6HBw4wbvGfYbMbjzHPZrKrNnbln7HAQ20hvcqH3phj49q1sj1rZ7exgum4WsoJ8RmPe3Do46CO2xEOmeTU8tTYKDBw074qZMd8oON61MvGCkO7GFYaC1hXSrGnJ8+sQ0fcj7BxoMs/3K5ygY1PY9v1kc1ZHw7lt7GB2WvGTP6ozbg4lHLkSH7fh0tz5l4Mes2X8MW2savtVt240m1stIn3rIz5pd+1ePqO9Ng35u0MZ1y3GodiOpPftz3yHTCAn/AJn/DwDd/wDQ/f9E3f9PAn/+Sf3AY1EhIfsZxqIuyJPFnXgu7n6OwLqGRlGwdt+htc593R0Vawj3a8M55wYBv48P0U9Rd+4Re2Z4vMdGZtuHhXovZgOw9i/O///b9fnmC49FPYt771rQ8vfelLt+/o/eE//Iffz2zJ+n4d790E+vm3TVy+eYL+93zP9zy84hWv2B7FQM/marUJo9fDYH/1r/7Vm3/GpWSd2d238ee//Jf/ssXYBtDjE4r3FRxc/ut//a/bs4DkYXlQvbdLvtyRG2wZH/b94MTmvUV9hQFTTsAiw3dY73rXuzasNg/q5sieh2s69Mk4cDDGcv1KsWA4+M+mHM23szjGWyxgwHr3u9+9jceVsWCrMYThIYzGtnfTZ7nQLa4wxMOcz8crOPwRD/6VH1d9Ekv/6N4zjfBQtME7W7wI/NzP/dyWN7jwT/5cwWDLo0rwF2dj7Vz+rXDKUfJsiqF5Z/675g9fyueZP2zAoatmz0NLPTZBm9zNH1hkZoUse/Sdm7fq//E//sdMfNnmMTxyih0Y1lT+XSnGwLz3xqtfgfPnam7w3dj6TyR8a+6Lx9livaFr7vPJg2Xpw7pS4Fjb+cUPOVHMz+LwR2ytZfxqvNRXCru4mLvlBk5X4iIe8gkfa6McdQ57lWP4ixtZcjB6vAcu6eIBe1b4aq7jS0Y8e5zFTH7f9sgbMAPHAbUX5R/6oR/anudRQnCCA+ov+ZIv2X49tyfxZF6zZaIIAg7uzAm0iazPga9akAVdAD0bpgl1dYLC4j87BttAmLQ9P+usf3jhnH0bFgvIavBXuHjg43j1q1+9Pfn+T/yJP7E9U2yls2/nhwOW57Pg5lptwvme32/6Tb9pazO2R8Uzjch4rln+Fesjvfr4X3w9s0bS46Xgc7ZYPD00sOfelAsrff3sNLnUJpi84b8Jrr/xEZ9ZwTEMY0vO9Yd/+IdvfrnOvyOM+JKxqZXnnkd2pYSPE/58waP2M1j8Leedm0NypLw9g0GGTfoO8fCsKHVjewVHftH1nDr5AfNKbvCnxbtnvBkTOFeK/LZhEQ/+OfhzJb7kvRB86Id+6LaOhHPFH5z5ZA2yvmXfGInTrJSnYlk+kpMf+vgG88gffXQVNtkTQzzgOs+fo9hmr5yyhngm4pVneOFKv3E0d42LNfVK4ZPcgNWLrbVZ+5WCj40PLGsQXvx0nC3Fzusbfc8TC+csRnLij4t8lxNH45HOWONtPYUhV8O44g88emLbnKntSnz7zxPiEQ81jHJ/5F5uip3Cd2uq121riFzXZsyOStzJKzCuxPH4lfPI8nv7GPYuSW2z8+/+3b/bdsMGRRFYziL14he/+P/4Bsy/yvnGb/zGh3/wD/7BFryP/MiP3K4/7uM+7n0C447dX/2rf3Xj7ccBL3/5yx9e8IIXPJhY9xQbPMWANNE8quHeIoklj4coXi2SCg93FLyT/uIv/uKH3/ybf/NVmM0Pie3djXHESe3Qln/G92jS9WgST6G+t9hsiMc9G9JsiocFtCeuGyd5a1E8U/hpEfcCz5d7/TE+8oVPt2IXL1zHiW18bZ6uvCDBYg+WWNLnu/8ucDR+cageucCga1z4c0/hSzxGH69iycvG5GxcRxsWT+Mit+/l0btv/hSPMV6jvdW5/MBBTOXrvUU8YJQjcG2CrhQ+eFE6qyfu2SmnYFjH5Fxtt8YHBlk6ijiIab5c8SHZ5tw9GOWVN3F4tfaFfabOZ/E0LsrVPAvDOuSI1xn7o0yvU3xpPRz7z5638TA+8u1qrrNjDZHvfMHHcbWYd9Zla1mlPOx6rIvj2Nbcla9X5h2fHeaIfU97nxF7dX5tNk5QTIpP/dRPfXjnO9+5DQDHkDEYSu9GtQnyPcGdmN1sNEklsYn6tre97eEP/aE/tL27+Dt/5+9sifVv/s2/eXD3501vetP2Dhu/f/gP/+HDa17zmm1j8tt+2297+Jmf+Znt7pyP1v7RP/pHm14Tf2+bH3yAo4yDrM0g6JfgyewxVtfh0nNuoipXccQDj+/4ju/Y4vK5n/u5d+HgACs+apPEOwSFj+IkJkcLCZnyofhtABf+4NIx8rkAsenLx+IJz6Lc9R5LO7/i7Nq5o/M4qVc4cOuDR7a41pcNfbMSfjW8jpn8qo1OYxUnsuP5Srf2kYPz5sAVDFh0+R0fdXHI1pkaTmXkMJ7Xf1Q3JtX5eaSz7zPv+GBdHH27woX9cf2g6xj93NudXaeX7fS7numwy/4o2zl/lK5X+uZ6tpMfY6HtiIP+1t/kzFt2u57ZnrXRySeY92DEV1ysFzYdV3mEEcf0q2u/VSfPD4dS2y3dsZ8vNho2ccYmvKtY5MUVXrrVo72jc7pxIFeuXMUhn87Z2GSXvLkrd52f5VDc6LJNv9e6I5/re+QNmORm3M7TbfPXvva1268iOaC48/LCF77w4ZnPfOY22DZhT0ZpMsCyg7Zjfctb3rJB+yjU4zDw+uN//I8/fMzHfMz2/wv9I2rfR/j6r//6rf9v/I2/scmb3DC+7uu+7uE//+f//PCsZz1rSVHABbqEa6GgoK/J2cAsgRYd9BT4nVcvVN6v2Quid/M+fvTcNTHH60pivB/oexv+2l/7a1tMu+Ws2ViPcdjr7n256s8er+urOPE4q5ccvcqIUXty1cmOtb5xcXA9yu+xRt39ebpx2fffus5uOF3f0pv1043HPThxyP/qma1bbfG4JTfrb2zqy5fq2m/V5PFwhJmPt3TrTz7b+zq5W3XxSN+10vVMf69DNvnxfKarbWZD2x73Fo89Ptth7PtuXcc7/fy5pTfrfxQe8EYuXc/srNriHo97MMKejUv4ydyqnyyM4jL6c4VL8Rh1Gu8jH0a7oy/pjHi1reorsmE88gYsoB/5kR95+Mqv/MqHZkrw1gAAIABJREFUN7/5zdsLvc2P8n3f930P//Sf/tOHf/JP/snD7//9vz/xR667++XFv9uFn/3Zn/3wtKc97eH3/J7fsy1+vTNPxoL40z/909sm6wu/8As3Dt4B2Dw873nPe/i7f/fvbl8Gpr8qMLrt6t3QuPGIU4PaArzC2rfTa+NqY9v5VRyx/4mf+Inty8Bf8AVfsJmRXFdwyDr45LB5c83fvjMQR7xX2NrJlZx8wuVKCUNN31Hcwz2DF1/6cT7Szw49nNUdccqX8PY8yClqMo54aKs9G3v9/XV2Rh57maNrPuEcj7i4vlpwjwdc11cKm40FHEVdTM9ixZ3uGNOz+tmlL9dxqoTd9a2aLhyHIk+vxmWPQV/b1bjEI3/U1oYVH+10yg++h6EtHsWkeoxJ+tkIUzt58cBD+5E/+sN3TgeG8ysFRrbV2b6CQZYe7jDCid9ZrHwKg17r2FkMPNgtHnG7yoVePPByNMZnucwwro5PGOO4FOsrWMVDLRYO/h3FRV82kqejzaENnrLC0U9W7OJgDTlbHnkDJoF8z8ivH30x2cdeNkEVvxbzkZ8v4HsSvtueRxMvvVt1iVtgbIrYt5HS59cyfm3yoz/6o1tgPudzPmez2/fV+rIeWYcvAFqc/Aqq4M84GCAfLygNtjaFfh9p4RO3rfPkn3TEqDjVdhJi+1L0V3zFV2wf//ZokCOfVrjsFh/nDncL+ejcpqzEc70qZOAo4axkZ+10wnAOK3vVM719GwwHnY69zHhNVkmHXefZrz0O1SNG52NfOLWp91jpzerk05nJrNpGHef5EpeV3qo9X0bcleysnZ4y1vdyGTlcxaDryJ975kt+hJW/uFzhM/KAQVfbFQx6fBn9gRHedjL5E/dshZFe7V3vIbJRf9zDHdtHrD3Ovi/9ffteb3bNh3io78FIB1brfm0zm0dtjQmZqxjFl17n1Uc2931tGuiOHMbzvc7smn4Y6VbP5GdtI4Z+18oVHLLxyEbj3vWsppcd+nudsX+mT6e1onFVny2PvAFDwBfvfZHvn//zf/7Er10i4PtCf+AP/IEHX4J/xzvesd2dqu9RaoExEdhXbAZcKwLi40aPxVC+7Mu+bPtyvY2Sn+3q97GcQDlc+5WOX+n1JctNcfKH3b40aKdr01XA4ftFmDZ8bMLqm0C9X1M+6YDlwM1xpdD7g3/wD24fP9poKngUnytYdNLDw+bLR81+kcSO4kuHbUr32HTINU6uw9vLrq7Fhd54NG7azhY8HOlUr/TxZIdO9YjhnF/4xXGPlQ01mREHfu0j1h5jvGaPXjyuxjJ7cEYM3K4WWGHE/woGm/Sq6d6Lk+4Y0ytc+KKoO7q+gjPGg57xxulKfMfxhXGvT3GhrxTbrrfG3R8y/C+vrXGjnr58qR4hyPJ5jKE2B/nikY1Rd38ePtkwjrjv9V2X585h0L+KQReHMMKJ39Zx4k8+F1MqMMI+AfFELvEBD7pX9Ecb+5iK1VWsMOjhpL4alzAaF3U5NPI9Oi8eavYdcFclmb08HW38KFdv+ZPP6bk+Wx55A8aQjYaf1foZ+d54TrjD1DNLDPSjFoEKuwCpm3DuyPnumafzf/VXf/XDR3zER2x36eLXhs0v49yVU/PDF99tola/LvElfV/s7xcbJhObuLxnePK8jYo+mGcL/gZRgYWTOs5XcHxXy908HDwPyK9uitNZHHL9qoMuHm984xsf/v2///cPf/7P//mH3/JbfssTiY7nrPBHHx78cX2VB3kYYuwOHIx7FgsYHbjy54gLO2zKtfKKPj8ctcNwzMaptmzBkRPj2NIdsWZxrG3kMfpS/626+HuTkC/qozgcYeYHDD5cKfmtzpfm0xUcsmHg0/UVDOMTBznfeInXlSI/w6E35s9ZHDaLq/VITPAx9lcKDAeMYm2Mjnwq/uTHmGqnV1zw0L8vcS0XxrjKOT5ogyU2qzLaIVNM1WcLjNaM8j2csxjJwcJdPPmovjoefKYzcjiKQbbHGkbjEk5to9ytc/6kr1Yam1u6Y/+IgVc+jjK3zmGIZzzuxTBvG5fGW70qYm8s8S6mIw/xKI/1z8ro8xjTmeysbc1uJ41IhCLDAS8mfpLru1Vvf/vbty/bk81xsh4q6mGN7pog+WSUMVnCVAuozY8v3hvIZz/72VsQ/9Jf+ksPz3nOc574f5Q9r8Pmi5yF0+HOWN8pm/G0OWsCssd/vuLj3E9Zm/Qeoqr9bBErHNxNkgge3yCpivdZHP54fASeMPxAwl077WcLm8aRnme9uOtlIffdMo/w8MvXHqzK/8Zgj6/dXUUbXodJBvtKXGDiYFx9tIxXG9wrsRFb8bQhFRvcjnjoN5Zj7rdY4AFPTMiRIbsvYSRTHPjj2UYwxr69ftdkjB++DuNC149KrhQ4OOArX8WBL0dx2OPTVeAURzG9gkGfLgycxBUPxfXZYvyNqTmj7uGS5vVVHPF0mLdw8WsdO8uHTYd4lDdndZOjb6zNXc8Uk1e4XI0vX8w9a4livGHN8lQ/uzg3JuaYccGDfQUvsXGQ35dyQ9waX7kqT+HyAQZdPGYYMBtXOrCMLS5X8h22vKDHrrXZg1hdXynxNde9bhRHHK8WPouHmHotaf04i8MP/I0p+/JdzK9ygSO3Wg/z6SwPcuIrNnS9xhsr11cLHP54kHLzjU+rPJ3hNy7mHQ5yFyaMWWzgk1GTJ0fenJEj1mf+KPJ4xQW2A45ibFefBm0Cuz+nN2CIARYgAXO08PnSusH060H/9sZGpztI7kD5taEBP/p14Y7XzUv2KwIgCf7lv/yX2x2vv/k3/+YWXAEm99t/+2/fAuoOnDthAm6DIuAWaro2iHxwJw/XVXnRi170YDOnCDp8MYFhwHzv7Hu/93u3Qbvn2VsGmz+42bB6RtnVwj8YfLT5+pAP+ZBpEt7CzTc8JCA/G1e8/BLyTBFjpY9Dj+I7w+OPRUd8faQt7k2OmfyqzeKNtx8RiE855PxMIY+HF2g8is+RLpnwO8ffBBe/xkq9muQzfN+tpCOfr5Q40PGChAdfWviuYllwLH7mjReTqwUfc0f9YR/2YYdzb4VdDOHwxfU9/pj/XhTdrbd2KFdz1bz14ioeODT2K+6zdmstLnh4Myg2ylUsLyR9tYK+vLuVY8mIId+t8eZt8+0MFzIjVxjydIzHXmYfh9GOc/nu+V2tIXv5o+teQI0tfV81uVrEQyl+Pu25WvjhwMfYqovrFSxcevMGB+YY7zNY8ZCv1iH6V3MdDxt8+e6h3Ff149mmRa6Kx1Vf4FiTrc18ae6Xw9k5qsWDH/K/T/LicTa+7HmNMX/PltMbsF5EEVQEu52excYjD/76X//rD3/qT/2pbaJEnlNetP3CULHg9xC6reHOP3gYrPhYMD2F30eEn/mZn/nw8R//8dtu1AJmc6XYjLhrY5H2w4F8MmA/+IM/uA28ATQxGsQ9vSagIDs3OM6T9yJgILQ7rha6YgfT0fVVHLYlZPG5ihN/GBZQcYTh4Lfxh+38CJsv9NXJVV/xCY9eqI0PflcXr3zKLv6wyuPaq/OVXP46hzNek1PKgfTVZPU76mdTTGBpLzYwV4W8WMMITw3/SkkHDh4W4H1czuBlV44am3DP6CYDg+/q4iEGYSd3VCcbRteN2ZHu2Edv74s2/K6UxlYtxjDE5mhsZ/jGhQ8KLPpXMRqTYmL+wDyaN3T4zKZ8a1zowIkLmVls9GeDvlIMikPX9W9Cuz9wyLURdt6xE11eJh9nMQ13qTTpCEctR9RK9URl2hQODGMhflcxGh/65l361VPDk0ZxoI9L4xL2RHzZJD9aQ+grs7xYArw3v/FQ5I684M8VHLbjD4Mubtb2GQ6Z5idbdMn3OoMDPXLKau6JY/MpmXzZFG/8Ob0BM+AtAogxgqTDue8EecyEXzr6n1uIKTY0v/t3/+7t3+Fw7sl6Dhi7Ci64CbQn2fuO0hd90Rc9/IW/8Be2X0X+/M///MPrXve6h1e96lXbtU2XX2TaMNoI/tbf+lu3fy7twa2f+Imf+PCMZzxjOmCbseFzcvbFw8AZSDzy2YCwUzKle6YOiz/O7ym4OCxeYuP8nsI/GLjwl68f/dEf/eDBru4khVs9syG5+dHh2nGlwG8i4VSMrmCQhdFkcc2n8miGxS6u+Vf+96Kg3RHmzK9kxr546GNfDfuojB9VkBcDOFcLO3GBwb76SmEfBiyxoF9MruLA4gcMR4voFZxihwN/cMvHszjkjaPDGnUPBlv0iwff7vGHH3wqN+HdU+CUm3ErPis8/XhX0+/OppjEaxVf8vEmAyt/nFcas673NZ9HG3DvyXc2YbGnvjeW9GHhYJ0fue25H12LDV/idBUHh3wRV9dXMfCDgYeihnEVh+1yDJ5yFYOO/BIXWPfow0gfDxjq4rMR2/0h08EP+saktUifuRvWTv2Jy+Lfa33XTwjcODk9sw1S74YsUJKQgz7W698yuA3pUBBXEOKIjzuerM3XBvze7yMINBs2d/4p+A/8wA88vPKVr3zw/CscfXzm2jPC+EDWx4i+0/TlX/7lG5SNmPOXvOQlNydoiWbAxsW1wBtEm55xQOJ7pi5u7HSc0Rtlwhjb8Lta4NDLN/Wnf/qnPzz3uc994qMRvjaRV/h722Gu5Gft4u1Q6Dvf4870xjZc2yTXfoSR/2PtHIaxd4y+H2Ht+1wb3xE73+K2r/cY6e7ljq7plMPk7sGgx3c4jYnre17cRvv8G6+P/Khvr0Mfl3gld6Ye40J+f30Gg30lXq7v4cIH5Wo8NqX3/pGn6cMrf6pH2dGWfsfM/7FthZNMsTDvOk8nXnsOq2u+wEl/JbdvJ59tcxW3qxgzzEfB8NoQp6s4M/lZ257z/loc5CUuCoxHweFP434Vh27r8qg7nu/576/JwnGkdzTWfE8neZjp7NeQUWa03ZpXbU/kOFtOb8AAItW7ob/1t/7W9swvd7x898pdJ3fCEFH3wlRA3BFyd8q//rlnQdo71GDjxJYAOffcq+/8zu/cvgRrU4avTZj+kg0nvxL8/M///O0zbP+nzMekYepfFRjsFHC1a+3009WW7yusVTs9+rcKmRJDAvu41/ckcIIRTuf5dwtXP9z02HHQtwm3ke7aWHZ+hBsGmSs8yMejc/r5fWTzVl/xWeVjNqrhOW/yOodRGeVqG/trE4vaZzrJjbX8Ipvv1aPMmXO2swkTD0dtZzDIkE8XjuOeAqPcUF8tcVDjUGzVV/KMLAwlzKsxocuuuZj9MK/4RTesUf8ePqOODczRXQE2k1ezjUu+xGmU2YgOf4qdupiO8yXRMLre19ltndU/xmIvf3Sdrbgdyc766ONzr36Y9GGNOLUlc6amEx81zHw8oz/KhKPtKgbd5n4+3eNPGDiEc5WLXJNnarwU81D+zLDIzUr263fd+UzeXsecau9TTGays7ZLGzCbmRY5H/e54+S7QT6W8u99OMtpgVArzh1IemyBL0Le889QZ+S1jcEZz3/dr/t176eCh2JAHDZes392PRuwwPInHDW74qKmq+bvyCf9o7rBo9c53HjPdMWZ/Fvf+taHv/JX/sq2qfyzf/bPbqKSR8nfmf6qrUSsJufcLVpf7jWGkk4bX48Kfny4Go8wxaJ8ct74sN15skc1+bE0VmPbmfPG+ow/8RtlRx75wC8yye95aCdbXtgIi//VMtqA5zoOZ7HIG8/GwvmK9xnM7myMMTqjRya7uDjy5SoWHPq4eON2z8dd8RGPeGgbz8/4VXzJXvVjxOePHGnu8LF4jXLjOZ1yQl1c4uG681Gv82zks7ni2Jf69+1dx8E12ca2/jN1Nug6xOGeOZN9vjl33FqXZ/z41NoBQ4F5T4EjV+8tYjH60rhe5TOOC92r+viPMbkXo3nLLxhijduq6CMz8u08PuHUPsNqHM15xbp8ZVwubcAQcSDoTpZfFzLm7lG/TpHgHHMoCHK2Re3ehW0D+wD+02A2sE2Q7gSeoQ6jwbep6c7eSneMs/9h+ZM/+ZPbL3zE3Dj1I4OV/pl2PBww2ftv/+2/bf9d4NM+7dO2TViL+xEWP8Z3skeyqz6+FMujCbHS1+4NBF/u1U+vHC7OsMfzGQe6ckNtsuJRoauEX/tY16c2DvS7Gz3K3ToPh01+iGttt3Trz1d6xhVGC1AyZ2sYxrWYntUb5fAREzzU4nxPwUNMy9X8vIJFFwYexQfOlUK3XL2it5d1p3qcM3CPCr5xda7Is3Fsb2EUs/TzZbRb39h2dA5DftyT73DpywnxGOfdkc2xL77NW2t0baPcmXPxGXPsjM5ehi/8wOFeHvnSmsTGPVh8uWcNGX1qLdvn3ihz61ye88VY54fzWyVZcq1DYnOWS7Js0eHLlRtMpzdgnGMAYcZKQqR978qX2P2/R0/EtwiNDtiU+XWkL8Z7Kj7SH0xFLBR+FRs/I3/Xu961xemsr+ImVmLqXyb5ia/NrdjPSnZ9h+27v/u7tzuSHrHwzne+c1uw/DrFr049GyVuM5xZGz/Y9fNvm2e8TDYPtX3DG96wHU9/+tO3dkkXlz2WfPE4DPZ9cR8OP1fye33XdHvOjO8Syi0YNv94ni38MCZiauOIAyz4s1IfucYVhnc54urcWPFRrGY42veTHNYv/uIvbrbFgwwb4ti82fOpnQ147iTLD7pXSr7Qw0OeGdcrOGJHB5ZzvsCa+X/EjT4dfnsGkFjIWddXijzAR47gE8YY91t49BQYvtOKS7l6S3fs55NH0fBBTBzarhS5bVzkVuOkvhpfz1XjlxdIhT/lz4wPrmKZXbUfVOHPvr6KfCS/L7UXTzLumMtVeK7LNefl9QyHPRsv8fBLduNpPTpb8OY7vxWPKoB5BYMe+/zBv+cr8mfFfcWPPN99VcTaAfPquIoBPfrw5Hr+rezO2uWBXIej4MG/cYxnemMbLmwbG/MPZmM7yt06h+M72V4zjZm5g9eVdcB6WFxwkjdqnGbjxA4ZfOnh4HEYvtMuL63x7MOgD2dWyMJKpkf7zGRnbZc3YIwJtkXmFa94xUbSYuF/Lr70pS/dHEKGnMIx5L/ru75r+96V6w+2Mg5yE8ojLz78wz98S+qz/oqbCdBC5YXAbno1+HAlj+T72Z/92Ydv+7Zv235tKsaOJrrnq1yNOy588RFzz5rBo2ekqPlHRiIfFRtAixh/4F7lIpfoiItHnjgv5lewvBCw3/PZbnGpv5qvFgaLMB61812fyXhU9jJ+sAJD4SOfjvzJHhy+WCx8rH9vsbjIH/+79cjuHj8e6ua5XxMb46sFhoOu54DdU+IDo5w8mjMrGzbVFl5j21hciQtc89f4+ITgqm686FvI5cetuZXOrIZj7lqLFHG6FZfysJiac40LvFs5nl41HXfNrRfGp5hcwcLdGufxQR4jdLZkAxfniv8XPPvayREmfXHB3w0G577iciuWM0zzzcanZ2/NZG61se85YLA84xG/W+Oyx4Qht6xn1kMY/LtS6JgzsB4l3805b4rl6r3Fprq5W46JT/N4j1tuaOcHHc8z9Bwv807/mfHle3JwbCS93p0tpyPOCGMNNGc9d8u7LOQZ90+3DaK+BlMQTGKLvIUt/bMEnypyDSj/Gjx+XyliqND34njm3Yg4v+1tb9vkvQiyD8dhcsEoIe/hgofDuwGYFkLjyw7/tOX7Cr8XpVX/rfZ8kUuK63uKePCF/pmYJFedbf4rI8atvB4x+IHHvowy+77xmpyY8udRCg73YIx+WxO8C1c3569yEo9ielWXPD5iwhf1rbFY2Sim6tXCvdKtnS94tAbcmhvpjTUfurPxKBswm7hxzsA9KmN/vOVI5+O4r3CSgbUfl7FtpT9rp3dPru65iKmxvVrYd8hxPNT3FpzwMC5XXx+yCaNcbWzqO1vTM+f4wzdFXczO4sBo3l3VzQZfHmX+w4Ex+oLLGX9GmXgY39aQW/HVb60ohjDcHT1bTm/AOGSBZcjhxd7DS9228y+IPGj1m7/5m594PEG7wpLVd8SufDZ61oEPNDlxMiglw5WkNOi9iNFzXRxnfrLj+Nqv/drtXy55d2hi03OUFOoSZYYza6OvhNO1cfSfDnzsCTMbM4za5EActF2JCXkxYd8hHnxk+ypO8nGOfzGPb3Xy1XFvwo0TFeZsrLR3FEO1NvYV16ON7I/16G9xCG+Uu3U+2nTeC/QtvX1/eSYGFs9w93JnrvlePJzfisWIyW7xg+E8rKvxMX5eFL3ZiNMVLnjhYxFW8HBcLXjDKaZijMc9/jR38DBm6pVP7OV3/OOQD8m4nuEknxyZ2bwIb1XTdzQ3Z7ZWuvv2cGCEt5c5uhb30b7re3wyjvTGMcDtyri25sCJxz05NvJ3Pvp3FIt9H9t8UKqv+EOP/LgOOb86Tnwwb2HhwZ8jn+ojWyzEtrEZ++O4Obn7E0+6znG48qbp9AYsuxFT24Qpv+N3/I6HP/2n//TmvNurbuHZmCn+R6QF2qMgvCPrdvjW+UH0p4HLJYNRrGo7U8ORRA76e9w9hu/fvOUtb9m+m0VeMo0TQVvHXvfMNd24kP/Lf/kvP7z4xS9+4va1j6NtNkviGWYYcPhzy6c9Bnk+5Vd4e7lb1/RhKcXkiPcKr4k64qxksxN3cuLArr7KGOPaxlp/hQ84jJj13arphnVvHNlg/1FxcIlDcRpjcssX/XFw3iIe1hn9UWbPpVwZZW6dh5HcVX/ohZFudZhX6jFHzqxJ2WpeiO8Y4/itOCSrLtdGDiu9fXv62uHAuDoe+XJVb88lfXjiUp7t5W5dx4dvY5xu6e378YnLvu/KNQw84nVFlyy9jqu6o/x+LRz7zp7LD+NSbOi1OZphzHzGowMemSOMETe57qKNfUfnlzdgMzCk+w7Yp3zKp2zfDfPdIeUbv/Ebty9sf//3f/+DPi/WdokfTGVcHJqstXV9xl+yyZdQ4wvdHsPk8YX797znPdvzz5rUdEoweCXmXv/WNd0RCyc27PD12Xypjae+Vdn7sL9e6Y3t7LCRHddK9Si7Oie7lx/92+vpk9tj3eIrvrCKieu4jTjJ0RtfAEcu6Yrtnl9YYx87dLTNbKYzq5PnVyW8rm/V8SVHN1/CvqVfv5j0MbYYF+dVDNIba1wc6eRL16Ps0TmMOOSPxbSF9Uh330cfDzFWX41LPsGNy1V/0mWbX13z54iPvuI55lz6Yx7POJWT+kY/4GZXX+cbscmfxqM6W7f0Riiy+CijzSsYdMk3X8RSDK5ixEHNp3C3kwt/2E0/NZzys7ZbNRx6arEpPldw8EgPDt1y7Zb9sR/GWGAp1WPf6jwfsi/Pi8seH4a2xjTMMOp3jUPzOLmx5nN6zslf4f3IGzDG3/GOdzy88IUv3O6EPe95z9v4+Zxb8Y+rvVC/7GUve/iYj/mYS1+iHB39QD4XeIciHkqTpHprvPGHbAPYIO6TZITwAuELsp707zt2LQx0JF+JAfcIZ8Qcz9NXl8wtwOHn3wpf/+jXPVzYN6GKMQxtivOzBcfxBRWGOI9tIxb5+KrZ16Z2TS8MevEbMZyPGK7FkJ529otlbXt912RGDiOPmfyqLV/ZDY/dFfcVjo1TcYBzxH2FwQd6uMQB1pVCz6F06z/frmCRddB18K3xv8oHTpzy8QqG/ICBQ75cHR/2wkjXm9/aZnziPNbOm/N0x5i43pfiN8oVy9pgxiNbexz5rsS9emZzr9s1nfSyUzyTOVM3hvl2i/sKk148isEVf+Cad60Xrp3z8SpOcdn7dAWHbiV/GuPaz9StbeHxUbnChT9sj7GQt7COcMjj3uE1lV5+1L/CoIc3HTci2LPfOVseeQOG2Jve9KbtOWD/6l/9q804Mv302f+B/Pt//+9v/2fxzW9+88Mf+SN/5Cy3p4xcg2ewFC9yvdCtBm7lXPIG8lbySBLxfeYzn/nEpBztOr93guIHHwc1H3GDOf6qSXsTaOWTxKRbfFZyq3YJTr943IsDPz+c88uxKo1FNVn+4wNHOctltEMHzhgTmEdYo358isuK/1E7DBzCDfNIZ+xLT23BoX8PRuNhbPP/Cs4oG1Y4I98z5+JRjsG9B0c8bASLD7sjxzM8+NHY4HBVPxvm5Wi/DWr9+zp/iyO7/Ki9673eeE0m+drxgJMf6vE8ubHmf4WsXL+a79mIjzwdeYR/pg5LflRq6/pWXVxxcNxb2KUvRvl2lQt5+dC6c1UfdzriIa54uL4XZ/SluFzBIiu+8VIf5XvYY72P6Yi1AS/+jOMpns27hfj7NP/vLH+f5msXHPXzbw+687NUX9Cu+P6Xfl8Q9x2wJmP9Hyz1OJASga++B3dlNywW3qVKaoMK03WTbB8r7e40irsiiW1+W6j042IMYJagI86srX59YXhngM/f/tt/e3vmmOe+2fxpt9lmd1Zg4IObOn+K115n1i5ntOPiHIa4wnOcLfkychDn1YTBvf5si6U2Nb1iz/8Zd/yyWzxdk3UtfsVoXNz3PmVfe/JiSn9WZlzI4aNPnd/VM5xZW7zxHfFWOTDD0JZP8JzTx0V8z5Z8oR8eTjDgni3s0oNBD5fGfoZxK77w8uUKD7bwUOjLM5xW9sit+przzV08tK3GST/bajblV9h09Ll2FKuN6PCn+JFpnsF5z3ves+GJ6WhjUH2fU3J8b92Ae8T9fZTfe8GPbNOFoaz8n2Fog2MsvJHEi75D+5VSLNXwYMC7WoynGCrxyLezWLjjwT4ujqtcyge28YABMz/PcoHjGNey+M0wZvja4kHHWJV/Mwz25EY2+Q6DnuJ1tQ0cGbKzwm9y+Q6nr1/N5Pdtc9S91I1rj5f4sR/7sYd/9s/+2cNnfMZnPJEc1CT+f/pP/+nhF37hFx6e8YxnXB7kG6Y/ILr3CWEwLDieF2UROVtKIDHzwFAPpvN8lJIxO6476DjYM/gOfWrPNZFINoJktF8p7PlRRT5IQne/fvzHf3x7Do0HGyqSEP6qeDYxv1XXAAAgAElEQVSKxMYlrHxZ6YztfGGLfT60MI8yZ87FAY5n+OBsEharlT6/yKmNa/HUZoIXb9fOZ0W7fgcfYHnApXOYinq83uPQjavYeRyInzsfxX2P4ToMNf4eonj1hzHs48svGJ4J6E3XlTHFZeTuWYIK3Cs4/CBvQ+4ZPt4MGKM9/tZw8Ed85YR4eE6Ua6X6QPV9uvCx1okp3cZe+9kiLnhY2M0b/sG6Ehe2egCzsTFOCj4rLvJPDBQcyBqXdPThEJ9NcPcHTzhsdG5crE9tgrRnY8WFDfbYhmfeGuMrP/Fng671Qhz54vzKC+TonvEQUy/I1pIV91Fnf44PHnThFNu93OqankMcxIc/jdlKZ9YuvmJK37g0n9VnixwRB7nqdQrmPTGRD3JEcQ5DPa4Ptzh55qU40CuufBPvVdFHB2/j4PXyf/7P/7mtIenGZYWRv+ImjtaeKw/6XbNbWdy1m9geS+AO2B/7Y3/s4bM+67MePumTPumJOz+eUfX617/+4fnPf/72r4sQ5vAHa8k3k9XDB68kEVkJpLiD5pEPv/bX/trtWlKVnJLFebXFRQJoazLhYQNofDyI9QqP/dh4QJ7Fz9h58J9iE+PXrhLOi16897p46Jfs/GmCF6e9/OyaLD/44GGMbDm/mkseXIovDAUXGOI4K8WYHHtqLyRw/MeBfIGhzGKMu6P4kHFuguORD9kIa89HPxxxJIODu2/G4Eqhm782+DZy5u6M+woXDwWWPPVQSL4cLXYrLO18c+ABexWDGQZZOvgbW+PSC9JVn8TCIty4zOzdamPbi0m+4NbY39Ktn0/lmBc2Be4Vf+jIMXO3x9Nog934b8DDn7gWzzA8NLS1RhseK5+M47gGwXJYN+QHXRzor3iwoZ8sXcULI4zWw63xxB8YYseW8XWz4MrDXJnAV4FhrYUnrrWfoLGJ8EkM6MvTo7FYYYovn7ypNb6tQ8VppbdvT9561noIdzWue/2ubXxswuQ73/ALO5lbtbVdzsBQGq9bemO/TQ8cuarg0CZqxkebg7+dW8eUxuZsPEYMD8gW07PlkTdggm6R8BBWd8F8D+zv/b2/98RA+vcz/kl0/yDaANH5YCoGwGApJpUBNVlrO+vrOKFhhAcfniRtsCUpfHL0Otc/lvgkN/adOY9HssbP4oPP2QJjtL/HPIuTXHhdn63FZoxPMRvjPmI1fsmpHWKQDi7J1TZiOJ+1j/Egcysm45yB5xh92dtcXWeHfufVK52jdrqPog/7UTDG2BsXMantiPe+r3g8qi/5ow5zb+vsNS4wlHt8GvMdVhhhznjkf9xd16bWfqSfjXRGHH21d77CCmfG8d62bF/VH/12fi8On/I3nLDPcipuyRffrs/W6Y2+xO0sBrn8cH6P/sxWPl7BIyvf08HLmjnGfGarNnqjL7Xfqun0WhgH69DZ8sg7IQRsBjzn68/8mT+zHd5Z97FGu1u1EtmzBJ9qcg2kgXdcLeI5YjTA2hR3wrwLsxmr9EKcPdf0FLV2dW3pnanTS/flL3/5w2d/9mc/8a6pu1/ZnmGOGOP5TPaoLQ73+lMM2YhH5zO7jUMy2d23x6t6hqUv++GM8s47ZvpjG31YDudXShyyFZerONkcce7FwAlO+s7vLWHcq58/9O/hkf7IYzw/w8t6WolDde1n6saabLw6v6WfvVGPTr7Uv8fJZnL6tbkOS92YH+HUF+Zof2/36Hq063zkdqRXX/b3OPFL7ladz+TSDfOWbv0jRjhhJXO2znZ1eGf1k0+/+mp8s0dfGXOlvit19s/gxBl+5/EY287aNz69Hp/RubZ6TxAj221di4fNl9t/4y1At0x9XJH8BOop2zT6ZAAc95Z09zgG1ebLrv49wz9Qzc5+0NMPL7mz9ZG+/x1mQ218yY0vGDP8sPTdy4d/ex9ntm613Wv/Ubinm+0xHiPf+se2/5PnKx5nbcb3Xpz0xvqs7ZncyGfWf6btycDIzr1YT1Y84qGOy9g2O9/LxWUme9SWXvWR7Jk+OI86/2HcW9J9MvzhR3iPwudR4pEf8ai+yiecq3qj/JMRD3h7H/bXo83OR5nVebKreq83Xq90an/kO2But9kQfPmXf/n2L4n8b0ibhEj0sYA2H09+xEd8xOV3IJH9QK1nGzD+F4MrvNMbaxsc8VPcQfz2b//27fDdOv/gWhsOoz3nErvk3vff4hRWPJrsavZ8x01tfN2NS36Pm/5Yw+hdyl5+dj3qruzM9FZt4dU/jl9t6mxV11YstfPF9QojvNFm5yNuMRnb0s2uOtv1reTr39ejvPPx2Muurp8MDNjhjByc34rlyGuUpyeOtV3F2fNobEd7t87DoFvRdqXQzY98uYcLm6PtOB3FZZRPvza1g3713q/ak9U/+hLmXm9/Tb/ifI9R31FNzzoz6odzpLfvSwdOh7ajOO4xXKcbn7jNZFdtYbDfcZXHjMujYsSresV/1p4f6ko51vWtml1FDUds1Ud+ZSO5uMcjLHIrnGTHsYzLLc76H3kD5kX4R37kRx5e/epXbx8/vuhFL9q+jO97X8rHfdzHPXzFV3zFw6d/+qdv/3U9wmfIPZVk+GUQGqgGRH2l0C9GNl7hqW10/YLne77ne7ZE80X4inGopCMRnMeh9uTO1CUhDLzYcSfTBkxxPW4Q95hs6rdRc95Gci93dJ0POHR+JL/q4wvexYM/7irmy0yPPUVdPLvmu7bwZvpjW3Li0djuMUf58Vz8ih0uez6j7K3zfCJX3uKxL9nZt48+ix+/4Iy4e53VdX6MmCvZWfveZjEe4zrT27fFozFV31PcGcaB/bDitMcj49gXb2iyn38rjL3ueD3mDLzuoIc5ynauj60xL+DQzy8yKwz+iIFczQdt6aRXW3b3desFDDp+BKSkv5c/usYFnrjG40h+35cf2rvrf894sG3exwPurTjsubiGw37HTOZMm9cTYzX6d0YvGTzE1YFLvNSzIqdmhbyYKM7Tr57p7NvIlnNiqhzF1jgkTxY388P48kcfzFtjRJZM8wXGFd6PvAFD3l2vj/zIj3z40i/90u2XKr4XZHAVD161Ufiar/maLSD3JO4G9AH8R/AbAInkaOBKhpH+0QCVzL7n1cQoObWZMH4+7HtYM2x2cKFLj4xrdXgjl1vnbLZBwfvf/tt/u/0T9i/4gi/YfuVZIq9w2KWf7eK0kl+103fgIMk7n8VyFRey7I8c8m1mFw6d8NQOMVH4Lp/hkTvi0riSL0eyGa56hkHOglBJfuRWX/UKJ654iCEuZFfy4Y012RYe+ub7Ff2wYLQI4hK3K1hiodDBRYHr+gpOOQGjNSofN9CTf4ppYxTujMsRRzh45J86XnsqyezbybNffy8qe7muyTUGo05x1efATZn5xCZ5+mP84kFHX/jZ3te40leym+5e1vWMSzbqw7vzGcZRGw58k+t4wb6KBYPOyENb8TyyXx95hc44LqvcSG9W84XePb6Eh8PIA9bKnxVH8vrEhr6Dn+Oalz21/n3Z68Jc6Y+6jQl967qY8Kfc1X/kU68FXpMUdo9eU0bbzv/3qr7vOXmNoJ/3+omw7wbZePmXQ9/7vd+7IXhg5+/7fb9v+/+Q//E//sft4Z0noZ8yYuPge1E2GH7S6llPrvelhWXfDoe8d3u/9Eu/tMXVz1q1lVD+7ZNncT372c/enje0x3BtTMgbF3erPDNmXNBmOvs2XByeeyMB2/R813d918M3fMM3PHzsx37s9tBddlqQ9hhdsy+p8ZEfEnQWl+T3Ne6enaPGiU9N+tlkxGlW2PaIAM9YY7/JN5PVZlFwkFPz06MO2FfDw0MfHuT2Bd8wyJiwro1hcdCOD/+O4tK40vfTbz928cypWTnKMZxgOeSZ72zO4jhrY4sPfM8vbwjGhy/P+Mza8DBWDnOFPXkG92yJg3Hgi9K7+hX/FbbYG5df9at+1TbWrnG8Wjw7DwZuOIjzCmfWXr5bB/iV/sqfVb5bg2Cp+SInjB28WYFDhk3yjQsMOuKKbzGf8dEPI7/kuDWEbnMl+3DYmRX6dPBl37z12BWPCdkXeDMu5OKrX46Zu1ee0wSDfXdGjIe1TI7OeOx57a/jIj/KLbjicLYYE/atpfw2D8W7mJ7FwUUcWsMad9hnC970zf/y/dZYzLCNDS5spz/m0F5nlu/GoxwXUzJqYzcruBdLsSAnpnLVemh9149bxwyHbrbkuvyyLp8tc3Zntd/7IuXBhQbBs1p+/a//9dsmy8eSiueEaPMrSS98v/N3/s6N8AUTH/CiTSxEDYZFw3ezPAdslgBkVmV88YDxK3/lr9wSwOIlEV7zmtdsmy93HA34rJQwbcDEHqcrBYYJwQY/Oo+PZ3rZcB/5wp4JZfEUB88ja2EXs7MFFxOSD55ZY2I5Xy1cZGfFD0FsXPz/THxwW2HQ5zP/4JFTW3Aswj3TrLjyyxjtC518ZQ9e/uChTSkuR/GkB4uO50R5zpvvVM7KCgeGg2+4iaXn78y4z3C1sU9XDMWz5wCt8nGFox1OnIwt7NmcOcIwZ4yPw3OeYPaR1ZHe2MeusYXlWULi7FjFcdQdzy3AcMSUroN/R3k26jvHwboJQ37Rh7PC4O+seBHxyJjmLJkjf+A4xL98FAPPRVLri0OcZna16ecHPbHFAy59fdqKzwoDh7jYRFrHHPvCRrz2fWwpuJPzHDHr6pUCo7jYKOBl/q9srrD5DIffYsq3rlc6s3ZzVn7Q7WsosK4UPpnzsDxLEDflCo44yHc8xjVEnK8UGOZrz9+ij98qV9nbF2u7eSfPjItjzOG9fLkVFptiag3Dw/po7okL2db5PQ6edMmTdcPkSjm/9T5ANYA///M/v30E6eNId8AMrsNdLy8U/+E//IcHzwRbBfUA/inRVdIZBIMiASRzyTDWRw4ZaFjhiFcvjjYy3//93789SLDbxyPueE5P4ijpH9nd9+EAD4YjbHYV+PmcnT2Ga3p8KdHFJL2Z/KpNTB0Kf+CuSlz3dZOlHLzFgxyMfc1fbXjAcIS55zRyIEMWDzFRXI8ye/3xmqxC3jmMUXc8H/XG8+zhjodxCXeUOzonn+/3YoSPc/FwfuUFIAxcxHYcl/rO1iMPOvBWY3qEKTZiCq/xdn61iIkiHvw7wtA3O+RH4x2XIx5h0Ml/PBy1JaM+KuStZfjTJx/meH6EQV6JezgjB+dsrYo+B7l8Wcmu2umXl8a2ebeSX7XHFY9KPnZ9ph7nLsx7MPjEl3KVf1dxRozGSNvVUjzowrnlk/790XrKD32KesWndvbiDqPXssYbhv5VGe3SEU+b2rPl2rZ5gsqg/wn4spe97OENb3jDw/d93/c9vOAFL3j43M/93E368z//87fdrXeV/mn0vck7Mf0B09TENlj8E5MxqfZE69u3u9YHJ8wSBe53fud3bh+zPPe5z90SxURcFXp40HN+ZHOFIfHowbDxcv70pz/94TM/8zOfeLp2E3eFr70kd+7Iv5XdWTs9kyN9Ms5npZjt+/DIdjGBsZLf65NLL504hLvXcU3GWJChpxbT+tR7vK1z9ycZuunXthNdxia5OIhp5/WN9QxfW/7QlQN8LBaj/tE5efqO5gzsqzhxjNM9XPJJXPG5hwdf2e6OnOs2hbM4rPxs3vFnLCv5/B9lnecDn0aZFU46ZEd58VDo4YRf19vJ8IdevJ0XyxFvPD/iAqfcgsPuqJtZGDMcbSP3XlxnsmHNajaLYb53PZNftcHZ274Hh09wmrvO97grDrWThxMWbjN+yc9quu782HDQVY54rPpqr77FI1szTnuMrmeye77Zrabb+NzCoSMe6vJsZXNsf+QNmIR02+4Vr3jFw0te8pIN22eo3/RN37Sdezq+72Z82qd92vbE/NH4B8u5oFt0xcIgGDSDoH1WVu1k67PwODfwDrdpv/Zrv3bD/eiP/ugnFsEj/BJixJ3Jz9r4UNLBcVgQP/VTP3X7t1J0tPFztTBmN5/U4/nM7qqNbXzom/RsH9md4eSHWoHFz65nOsmNvMfb0Tiln8wMpxeS8JJJly+3Sv6zQy/dmd4Rl+Tpn/E/+bHGFx+xUCtnbI4Yyee763v5wC0e4Y62bp1nly8jn1t6+3626Rcf1ys+q3aYjbW8v5cPjPKEf5Uju9mKQzxc05PHZwrZxgOm6+xWhznDazz05UN4e/kRb+yrHVbjEZdR7sz5aBvueH1Gnwwe+zfN9+DAGjnk51keybG9j8dVLPnQHVq5ErdsjPUK23f7Rn/geF3Zx2rE2p+nrxbnbFXv5fmt7Ptb2xsX/Z3vMVyXW+ObruIwk9+3nZtNe63JNQI+IvvhH/7hh5/7uZ/bPoYk5svivnSIKBklJycwT9kmPhkoA+Yosa8MBj0Lrtq7ijYdcH1G7t89+bKh7x8oK2ztMCSxuK/kjoJNX2HbAUddm02QQm7s2xp3f8iKBx4OOFc5sZP98fwKznve854n4hqfIy75VW08nPtujdr1uLHaub1d5i955+ymG3f+NO7OZ6V+fOkbW3ENY6azaktHHa+V7FE7XRwcj4LDBv/w6Tiyu+ob871cWcnO2vNHbRwcxWomP2sLw1rnBeRef8QDlrqcWeXGjIc28Rhj4vzW2stmOcZePMa28XxvO45qWErzZcQWF36tyqiPg/XQ/L0yHmTLA+f35mlc1GKIzxUe+UjHAQOXW2tHevsaRrlxDw949OWouIbBv873NlfXfIEjJvTvKW4u4KHgBaf1+Swe+7jQzwfXjf8eh0x5nEwxocc+HnD1h7nHKYfV5IxpeHvZ2fWTsgFD0v9//Kqv+qotAL787U6J4ntfHpngERWvetWrlo7MyD3V2gyYwTNYTfYG6KwvyTegDaYk/4RP+IQNBr6YG+xZaSL0AtD1TPaojV66nbvbaUFlm68WdHVyMzyy/AmDzJH8HqPkpzOeX8GA6RlqPkotxtrgFeO93eSq+eGwGaaTHowVThyTZUObsalPWzb2HLrWn7zzMabJnK3Dwakvztd2FoMcHjBwUd+DAUfs5BH9W3E44iemY5yPZPd9bDt6I1X/VZ/YLy50xeZq8UJgXOAUj3v8KkdG3Vv+ZC/eY57Wx58Rc/SvF0B2smXOxYXsiDPqjudyokIehvkbZn1n6riqHY+CwY/RtzP2k8lvMS2+93ChA2scm2ycremLhXrkMJ6fwWpc6RXnM3qjjFw3vkoYxv8KF37gkj6svW+jzc5HG+lrq12Mla7Tqy5P01E3tskc1ddXhx2aF2N3uL7yK79y+5nwG9/4xu1BrAXCF/K/6Iu+6OFf/It/8cQGbOXMDvopc2nRqQi+RdxtVTFogOpXz9q0i0s77hay9OBV6LMz2q1PHb7aYYN0JD/qjufwO2wA+eUXgH7h+pznPOeJj5SPsMUARmPOP6Xr0d7qnE6+OG/DB2OGM2uDLVe9iy4e2uI3s82mSdyYZDsMfrVxYNP1vsDQV+28zTnZdGCztSrNJ/1kceAP3FlZtRcb/XAU8TiyvcenZ2HC3XlY+bKXv3XNPgz6R+MxwynuxRgfOHJyFYMZzmi3/DBOV+ICl01HGLi4Lu4z2/s2c02hyx8cnK/KCluOuLOAC//KoSMs9sSumqw4GO98K9Yzu9mIP53mi7birJ1f6lkhVx/+R/me3B4Hd74o/FG0Hfm/Ce3+hN84pF+9Ez+8xAMeXXXYh0pDp7iIR/r3cADXGIZzlQeM0Q84je1A931OZ/lC4H/9r/+13UWT98YLzhHWDEdMrIfyXa6GsYoxeWt3/sN07jBGajjk9M1s4s7OGAccmr/v4/zi4pE3YO4GvPnNb96+lO1fDXk0gVLC+wn0V3/1V2+/hnzTm960vXAvuDxlm8fB4bcFy89RPZrDQO7LKtlNcLqS0PNIDL7bsxYfGzDYDnLaxH5VJIaPK0sImDMuR/p4+nmvRGVX7T8efOu3fuv2r5A8RsE7l5J+hiU2MHDmjwMXeGcLDL+kNSG8C6abP7NYjuMx2jDR4XhcCgwHfdxWRR858VSLOxwY/I6H2M5wcNG3t+Pn7L/iV/yKLR76YMOa+YObvFDEAKa7zMbWc6tmZYVDt/jQNzbytLYZ1r4N13LCeHpEQP+CbC97dF1M4IkHzOJ9pDf24U1fXPgiHy2ArlcxGPU7h2Ns5Yd4GG8xn41pOrN6jEe6V3jADEN+8ENctK3KauyMr8eVWENwKF/l2azAYaecVhuX7pLSEWtyvfDscfSzlQ21n/f7HrBzeuN8WK1JMHApJ4yL15Lmwd7uLMbaip3z1qErz2lixzgWF7nOx/zc87h1jYe1HWaxWI3fDKu8tLY3FuqrBY54yHljYxzicwVLbokJjPJ9NaYrP42p8VXKG3Fayc/ae14mn4wVGflv/sRr9EvM5AauDvLWVL5Y22HQxU1cVmXkyU7jspLft89n4l7q4JqTjHoOyDOe8YzNGeIFEinO+CiSoxzi+AdT4VcDxm8bow6DuC8GbVboWiTFR7z8g3M4nl0jOfy4wWIo5h58t8LR3sLtGU0WLuOwkp9x4ZMk9SLAbu9O4ML0QoeDfpN4NinChcM38nD4dOVdAmw+sO2Bn3LIOX9mk2PFJQ6w6PJRWcVFu7iRY6dJa3zEhN/Gg70RL7/V+ug7YLnGw4uA8RUHfbDzadTvXJ8cY6fDNV9mhcyssN9hHDxXCYa2swVfPuBMz7OI+DIbiyNM+uKnltN4wIB/trAfjo0xHsYFvyuFTW9yPKsOhiLPjNmVIu5i6llTxudqTNjCxfz3fEX2xci6sBqjVbsc9YaFX+KBm9w9mns4Jyvn+JEv9MWaT45ZjjV+OJUn/MAFXv10m1uz+OrDE19Y1g4Hf/ZlxoOMdjkut+DJU1z6uGuPs7rGQU6pYYoRf+4pfJFXeMAqnmex6I9jJFfhXS1w5Bi/xDVMfK4UueX1HwZ/jsaUzVmR2+yKqVwvt1ZcZjj4yxf5Ie96jSnf9nbJtPawA7O8l+9yxniLLYxVSYdtfsjxK/l1bZWasDAAgv/Wt751GwiOa+OgwjkkvZNSOPVklBKmGiZbrtmwIxYMSWFgBVi/BLGBMFACZufdpKRLvsE4yxNmSUPf4CmzhwYeYRpEWLgZeAkilo7e2asd+vk3K/ng3QkMG7jaZvJHbTYKxtREh6E2to27PuPLzqyQtXkkb/N0lMwzfW3s0jd+Jse9RXzZt2mcTeI9bjGr5ovY+7GJzUKL8BHWqAuf/eaEceZXualvhQVH0e9crrbh2PM+uo4PGbmGi/xf2T3CEg8LuEM8Vvl4C4Pf3nXi8ajFmJwd370tud4L0hinvdzRtRyD0ZrTeF2JL9v+w0Fzhj25cgWDjrji0Yay9W/Fn11jOuahczzkir5wV/FJv5q8tR8H+VE86MM+U5Klny9n9JKxRuHvLo35e0+eWbv45DXDuuo17yz/eBQz8bj6pmePYf7jItfvKbh47RPTM+vYyobXWTlfTMdxX+ns28XTa0QPlS1Oe7mjaxjGw7jIMcfRa2RY+CZvfrBtrJtvZ7gko3YHTkzOlnMz4ACNA/7VkN3085///Icf+qEf2t7dc97xlre85eGzPuuztnNykubJKO08TSwLngGw8Xnd6163/QDAM8ee9rSnbf8yxz8I9xGJpC1x/S9DT97++I//+O3OnWeXeViscnViPRn+wLBx7EXRoqFY/BSDy2fl1kK6Cf0f+mMBM47qXnDj9X/I5GPYxxF4HIHHEXgcgccR+KCLwCPfAbPx8ej+b/u2b3t45Stf+fC85z1vC5J3tIovbNtE/OAP/uB2vbpTsnVe+DPutG1O2PCg0i/8wi98+KRP+qSHH/iBH9h4eSyGh8HatLz2ta/dNjFf93Vf9/Cv//W/fnj961+/yTr3q82f+ImfeHj729/+SHdZLrjwfqLeSdiE2ZHbKCp+4GAz5i6WDa1io2nT0yZta/xl+vPFX/zF20N2x3c8v0ymH5t5HIHHEXgcgccReByBD5oIPPIGzO06xV0RX8D3j5p/6qd+6ol/SOnfFH3e533e9hR8d6psLJ7sOybdsfIlfxuxl770pU/8GMBT4z/5kz/54R//43+8fYHcxvC7v/u7t42ijRo+ftH3R//oH33wC07/sPVRPuZ6lMywkcwXmzHlW77lW7ZN4dd//ddvt2jddSrmj2LrUXR9tIqrjeLj8jgCjyPwOAKPI/A4Ao8jcD0Cj7wBY9LdJcVnuC9/+cu3TY2P0hQbHJuGd7/73dvn3u7kPBnFiz+744bOvz961rOetW0GtdvM2Cj4N0i+L2NT89M//dMP73znOx++5Eu+ZLujRIasjyRtwHwM+bt+1+/6v7K5sDF1Z8/h3N1FG6/udrk7xh/l/9bmp3iLPQ7FuI3jkzG2jzEeR+BxBB5H4HEEHkfggz0Cj/wdMHdoPudzPufhxS9+8cOP//iPbxsEGy7f9XLYPPx/7N3t635fWtf/93+ghl2YmdqIM2NezDgSaWOIWUSKjEFS0lDoLYsiELsRiRHi1I2hsgKjyCJDQSEKJYIujAhLSGdqnLGZcdIu5lbdn5s/Hudvnp/fcrvWPvc6v99fc3Uu2O+199rH8Tpex8Vae59X++0dJ/8+x5cPu1l7rYGF4yav7025afHMsT/xJ/7EqxsrNwVk/sN/+A+3h5j6npqf7ePkIzS9Gwof5X3Jl3zJ7XtNvkQH6xPR+v6XGxvbhz/84dtPlr/t277t9h07N5DGuwn7RHBkPx7sO362ZwSeEXhG4BmBZwSeEdiLwNY7YL6D5CbBDcCHPvShl2/+5m++/SLMu07ve9/7Xn7sx37s5e/9vb/38of/8B9++cAHPnBj8q53vev2faw/8kf+yO0dMvqvR3PzVOuGJG5uAI15ns8P//AP37h4d4uOL+O7aehXDvFxE+YXFH4JdfZuznve856bz/TciMAkb9/NIJvG3CB61223uWnNDz9owMs/v/bLTTeLcsA3NpCqQtoAACAASURBVFY3iuRwIuv7Yp7DA/PMryNPNuDwy+bdOP55ppvngPnOn8eOiCVf8Zk1HOmT8cX9bpxnsqsxXMRFXuVnxNjxCQZdsYRZ/KqBo33n4dfT7WN0PIzzn++wxefYyLCl6cnq5UZMYTrWO7e6oXVey18xhb1bY3Bg6GHIsV8ghXszcucP7sUsXuKx+/1OuvkLEw9jq1qa0SqWYi8eeMBSKzs+FQ8YflZfy8+O7/XVKQz282+Xi7yoDz0OeO1yEQfzP9swxEnMZs04e9Uoe+KChzbmy/GMDxs2fscZD3UKFxd2bPGacaGLizzCYltsd+qdDpv68FrHZjbPxmDwtxrF44z/DKtc6umLSzGZyc/G8kNecVLvYjnLxUy/MTowiqljca5ekzvrcaGveUB38ag/0x3PWVPhiC0eGmyxudpgiGdrKg7VzwyDbGsGW/zGwbjrg32155w4z9Z2uGNO2WR/J4bXPfz4BaRk++K6jxXdYPnOlYfL+WfcP/ETP3EL4h/7Y3/s5rdfGvo3RX5lKKAc2k3QLIAcb3Lpc1oS/awWN7/K9C4STl/2ZV92u+B454ushGmK0I2BXuAFOqyZXf9uyVP93RiFofj5pfGtCe8mFM+rzQURFxgmlh8Q+PdDbhbd8Cryfg4Ns2I94uODHwwFQY9PO1xwsHnXUlHSdQzLu4huZPsumrg5N2stWnKEj5i5UBe7mc5xjHzvXOJCFx5OqxgcMRyT9VN0N9p0q0WYs+Y8/vLJPz3bYmmC2ocpZzBWOHSzJS+OPWagGyAYsPm0ai0GdG1iXn5XOrNx/tg0fH3nUX3hcrXJB39wxssPRbq5vopBjh+wYOAhJzjt5BSGfLAvt3ipeW0Xhy4M3wEVDznewWCTP7/8y798+y4q3eJ0I3Txj3klHtYisdHE2rbTrMnsqyu9WInT6iYG3+owPfO8OaDew9Hbjq25AAeeYzw8EBYPHIpLdXjEcMx38dfTkxf7+Oy0+LDlmgDTi+SdZs7S07uxVqde1O7mAwcY2VenYmG72sql+S/+3UThtNPUqbzQlxP64ivHVxsuYiAnHodh7hpbrYMrXFw82geH6sr+TlyqafOWT3jAEPMZH+fMrWyS71rpe+TwrCv4nPFwXo2pD3Fky7p8ta1X/AMCYAZsmo/qPHzVTY5zvv/1jne84/Zdqp/6qZ969XwSvzz8g3/wD96cEBzBfj1aPASgZr9nmvhF5i/+4i++/MW/+BdvX7jHUcBdbARL4LWeoyLgitoNmoAL/qy5yfTFfkmCgYdeAukopB/4gR+4xcPHrjstjvDccHieyHd+53fePr5tQWOHn2ytOHbec1746p93F6+rfGDYXFy/4Au+4KYGw8fJitqYm1qT9qzhjQfeLmz5eKYzOyfeMNQcTPu7zUVADfTOHf/4crWpCwuUhcsvf7VqpRqYYZEpf+yzayH2A5WasXs5IiPn8FwA1MeIEdaVHoYFh/9vfetb79oeMfHQ+KTh/eY3v/mhuY0HPHHpv2jcQDf+FDtri3g8Wh/mv7ry+Bo+rebXGTX1oRbU2FijO1j4wzG/1P2O7sjNu/X+W4VnTlWDI6dRtv1iSZ5dN5NeRNsv32dzpnySCcuLYPPFWL6En91Zb63Al6x9PHZ+IJUNvc1a9fmf//kPPUusdcsaIr++y3wWh5k/4sF/F+zqdBcDrjx4YjtOv+23/babqeI6szsbw8WNoDrz9RvxGfMz0zmO4eENDzl6y1vecjv9yLxxw+T5bq2pfCl3R5urYz+uE4/f/tt/+yvde2tydmDad+PkumvewRrnymptdn217uArpq513rS42i5fxSQHCUG3uQCY2G984xtvxhGQBIu6d7/8823NpBEIuohG+CrBlVwFJ0jwBcwE++mf/umXH/qhH7q94vIMMpzI4k/ua7/2a283aRYFOhpu73//+29yEhj2zLaPW9/+9rffsJo8Aq+QXUS8cv2+7/u+20VaTHbaaNerNa+2vumbvunVwocnTFv7M3w4OPFPrmqP8OmdgG6cxdDiw77NMXv2Z824mtCbZC2oM9nVGN58yXdyu77QMdHLOc428VlxF0Pnxp48jMZGzitO7FQrZMpNfjg/+jZijvtxJivu/FnZHPVm+yOPK7ZHDPz5Y3PTYhE2tsslv+mKK/3GRnv39ukc8/IIFxjiis8Y63v2x/P0q7FxfIcP+9XYjt5ozz4MPo3tHp7ztmJg/vPJvBUT7Qyjc3ry+YKHY/MpmZHXcZ8MWTr2+fJa6h1+8bhi/8iH/3zxQl1/1Y8jDt2xxna5iIfttdY7Xm44xIQvtR0+eKgPMaHX2r6DwW7xEBuYtR2cce6O/hwxR+xs6dlynRIPOta2MccrLu45nGOfjnj4lOhqu3wDFhlkGbXZR1ZjGHlvn7sB6uOpJq8bFETd/b8e7RhYuD/7sz/78s53vvP27oL/T+lmCid29d51+J2/83fe3pH75//8n98+FvXOnZsxN00C2J38iqMi0+rt0/POWpzciLFVgldYx/EKR8x+/ud//nbz6l+jwK9VHI5X+MUcXpj8x2unwa/wyv8P/uAP3t6V88vSJlx+r7DhjNtKbjWen9nRa+LSuZXuOI4vP9KBYxvjO8onW0/Pfjgmna25EO6I0eTUVzOjvXTGsVG/fXbIxqH99JO718Phs1oII//u6XY+vWqj410u1gw8igteu1ziUC3o+ajButqKS/nlS/PoKkY2+aHhFsYOl3zBgZ65q79XI0eeXjTRKx54FeujbMfZGHMaHzL8gWmb5dsYvmySYc826pARm5l+PMpHtsM600m3Hgb96orNFe907vXst92TPZ7HZ4xFPt7LyYhTLRRP/uXnKHdvv5g86gv8dIup+ObjPfvj+XJsDIZ2pVZHDDFkG6fmHIwRe5QnNzbH+UEnHjC1sxyx07wg59p/tV2+AWMEGcRccLyTFTmELaRuupzzSqWP9jg1vutFh/xrbWGMifIgVnefnu/1r/7Vv/o1r5jw+JN/8k/e3rXT+6GAB7T6ONHHat4B8wvKPm5b8Su5zrfv5pL/OJkgjp3bbWLjoiSBPr70vC2LKMwKQKHIgXceusk92klWbMjy3bbb2OITvOzyzVvWctxF/AwbBz7AgfF65B+Wbbexb6vhXawaG3uxy2/jjm1j3Ye3ioHzuKoHsSBXXo62HIc3nrM/+ouDtrJ51B2P6Yw2whpl7u3HhR9qQL0+wqX6EU88wr1nfzw/+jLmZZS5ss82rHJj/6w27mGKhw3GI7EZ8xK3ezaP560b2tW4ZpPv7dMfYwzrnj/xTa/8wjRWjM94iVv5jEN4N6cu/Am/nv3RrwsQr0RwgaPW7fPhXhxeKX98p3qiq8Hb5WPOaPRGnNvgxh/cvWmhhyO2u/GNO07hFOsNKq9iEAf9bmz5kB/FGZeVT7g7RyfO9cXWMR5nXLoHUBew6J7JH+Ny+QaMYpOCoYLuhsdNlzHfC+OUi/T4/5CMeZuyp6cfSTxyXABNBg5bbFzov+VbvuUG56PIsZH3L5EEyk3XP/pH/+jFd9W8E+bxFG7Cfs/v+T03v2BV6COG/ZI77neTxM/OS56YGLva2CTPJ9/b+qqv+qobRpgjTu+4jWPtw+Bv+TLu2LbTyIeVnvhpxafFqOJNbuzJHO2LzazN4kVXjtnIh/Bm8jNcY2SP8uHMdJJNDwf78Si/I6cVThjxgJVe5+A1dsQZ5Ysd2faP8mfH7NXK28pucmNPv3nHvhcN2gpjNT76pFZhwV7Jj7xHPtmGVzxWsvew6d3jwd4K3zgeerbajnzjPBunX16ydYZDftZGX4sLuXF8pmcM/zby9kfdFR9cbOqjeSK3YY3YI94N/OTPqH8UW3Ehh0u+50PHR5zOr8bZ6YUUmRXOUb/j8HHqwr2LQ1c7xmPFJZtxqJefNn6F2X5y+tlY5/HpfLZ2uVQn+QYP1gon22N/1ImL8fiN8tmq79yRCw6jj8nVj+fYdLzD+/INmJsS5EYjPibzkZ53Y9yE+AK8L7F598ZNmGbyIaX3seCjXxrO4foC7EaAw7j58nvjyR17Rad58r3HOzjGTeOjrZuM2+CFP2y2JX6PR3JjXxEZ83m0d5l86XRWQKPecV88+KWvGEx4Mbra8oeeTZzlUXOj7d25FpFszLDp8AMeuQp8JntlbDWhruh6J1Z+a7DcPHgBMWvFTCzx1hujM/Iw5niGw+dkix95PJyr/ophMkc+dJyzFUNjuy07+cM+fjv1CoM8Lua5/OLSTfkuJ/I4jP0OxpE/frjt+FSO4lG97mDgLK/ld1YPV/zCX17KjV7j06x1/njOOC42fsGV91Vz3mY9pMv3/MkX54vRjI/zWvr6eBhnPwz6MwxyOCevx2P81OV2cvgzy1M89bPzg/rpLv3mi3XZMd75eqo8nMxvvZgU51UMBtVXu/Q0GG2vTm7ssGnuimk1UbyuwoipPI3zX57Cu4pDh1/80fSwd3KGe/zpi61+FVu8u+5nkx/WdnysZezjBXeUPfqVHFtxOMqsji/fgI0XYEnz8Zef83ej1Rf6jLtA10xcBL1j40vlCO4ENpyznuMCei/xBV2AJcext2EF2cZH21niVjyyXbLckK6Sv8Iwno6bwBa9VbxW43DwgJUMv3ZbcYDTvv8i4BEkPq7tXxLdwy4WxQineF3h1OSkP/q1g8EO/eLbcZxmPOJZT8ZETMe4/Y5nGOM53DUcxMw5GOUp32Y4ZNKXC1tYM/nV2Og/XzrG42obZdWoOQRrHB+xVuNk+GTRq75GvZ395rCeT/l1xDjj4pw1wfpAf8zdEWd1LK/qvXicYay45EMY+keamLKRfjWzsls9Om9fDPgzxvLeXI9na5djdnHIH/hntU7naKd8nMUz2/XNF7r5Lr+jP8le6dm2Lof1CA77xZfNcnPF/igDw/YIBzhiw3Zrq7EwRzuNH8ccl0O5jscxbzO941jxCKP+KHd2LCfmbX6Nsmd4bGtkzNvqvnFjZ616osd268eZznhue2Y3mTz763u+53tuTktAhcURm+OafYX7en8EOU6EiqnAZXvsnaPTJNbjVvBa+OpH3bN9mBUjG/TdbPo5qvGrTdzc0OLTz3vdlY+L2Yi1wo6LV2s++jUpdn3Kjo+YfZ+Pj/h5rIj/fuBn9n6wwBbsVdzpiYX8iEfvOBmftRmOseLh5p5NMdr1yTu1uHiMBAwcZvbi5Ryfk9PLDy54eCEyLjhnWOzZyMMUVzyKXTayfexhjzJe8ODisSc7DYd4qn3x8JN22Fcbfbr8wF+dwXA8a2zOGpw2/ogH3PgddVbjOIgrHh4ToMbU20x+xcW4fJovuIjHWX3NsPGl4xfifCGTvZl8545+4i4vfNFrZGcYzq3i7oKEizqhbxOnlV34+Jtb/NerU5tjeGRsK4y4dBNLVl7M/XKS7hkOv2DgS04czN/ZT/zhhXkL1sf/4EyfT5q8Wss6HmXtszNrxlu3zH016vE8+TrTORtTYx5XgDMuOzj5Kh50rUP4rNrKJ7ryojY8wgGu68wsNrPYZo++axQe93w546LG5FbOyN3Dyn693IqDdUivdqufGX9j6pEd++Tlli+4yLcxWPKz4k7XefKtQXy42i7fgBWYiqWLsqQhgSAZRNxslUjjkkRO77k2r0eDK0AauzbH+lkjH3fncbbg4qpJRuNkd1s6etgSZ8Gwf7XhoAAqBsdwFNKsrbDFnq5cwDPh4eTjDOs4lh/0TVT6cuhdT3xgmzAeLWF/xcV4N09eTYj5mXxxHPkYoyO3uOiLzZjTUWe2T7cNRrUys5m+XLQY6NUwDLntBoyPzpmAx8ZGsdSLoR6G2MJwTI4v9meNDRu/ydCz4bHTRj7w+KM+7F9tcREbHOiX4xnGCpsftrFW4a1yOosNbLE3j9WlmNq6cB/5rLiICxwYYtK84+OszbiQo8e+mOQfmzP5FRc2q7MRYxWX1Thf1JleY28Vl3xsnRCPLigw6DZvcVr55Bw+8hj3akSenYNNn5/6VWPPfKGDg23mK4wZDjvqAg4uenFdNTKrJoZi0w2YtexMfoaDjyYefFFvxXsmPxuDQU+N8dn859csLvRXHI3j0HyBhYvt2GaxDZsvOIhL7cxmMmPPJzx64aPu+KRerjY8xIVP9tWNnMGY8SdLpniKnzmLx4gBS1utA87xV13Bw7s8X+F+2UOORNb+GGSOMm5MwXO483o3XcbqO3eF4EqGTRt7giegtrNAVVzxpavxqwImowB2WrphwXVj4heV4vJo846hbcS/isUPhaSofKH/kVYsPOzPPl+K2ed93ufdHlgnVmO+Z3Z8/CwvHqlxT3amL1/sW/Q8SBGWmOxieXVkQnk2nXZPv/P16sREgyMmjndqpTqDxycPHlSz5kPnVrl2Xstv747Ix6PfqYSHgwWnh2TeDFz4Ixctji1Wfhnb2AWIVyKw2noQ46uTF3f4IYb68nLvo4MZdBcSj6bhyyP+WIDVmAcGy9Ujax0M73B4iKr6WtXEzIdxjD8exeNFk1atrfDUZbm1X61Zx8YaHW0c96vjxsODIZ5hhp/crCdT/LxjZB3zg6mrLX09HuJKfwcjW2G5homjdeiRpjasofeeN3mGLcbigYd1OG5nOqtz5r/1sLytamOmz64bL2uAej+79s70G6Pvawx8ke9HcLyLJ7bqLH35tt9x9vTWitZuftjMObmB4XimN2LYZ8M6HIZrg1hebZdvwABKTgkaHesmo8mibz8iHdc3/mgveAUQxpVgtaDWZzufHI+Ynb/SlwBYLtLdEc90FYoLhEQVD/qOLZqKoOOR2wxrNkaXjwrbJNWMZWumMxuDoVBtJggME80/B/cOaHhsHGMaHp8sfmrE/iP+yAkM9uU5u/XZutezL/bFYlc/fPHAgy9hde7Yd57tWjwcw8AjuWSO/ZGrmIvJbssOu/ywAO/mpFznk1eucB9pbKt3eXm0NWf5Y/9RLmIKo/n3KB83x2O+ivlVPD7ICy7dSO5isMWfcqRXs/diUy3UW8fShWnfuXt8klMr1ekYkyuxSJ4t9QFzp6VPT0zF88p1YmYDFhz6cSlGM/nZGD/k07r8aIPBrtw2Z/JzBxOOvJSnXV/YYheGa1ZxDW+HC1l11rqC265P7NropW8/Xkc+rRnp8J8vYmofhhbWUb/jbr5Gvt70uNrmX9q4qv2UeygCJa3klzwXMv8z0z+61iwYn2ztO77jO15+/Md//PbqvAnzycbxyecZgWcEnhF4RuAZgU/2CDxvwD4BGXLD1d25O+xuxH7u537u9gBZ57y16dVSd+KfAJpTk/i4gXTzZd9N4vNGbBqq5+AzAs8IPCPwjMAzAssIPG/AlqH5/++Et4/dvLjRst/bv3/rb/2t27F/jtzbumQ+mVo3W24aNW/ltv/JxPPJ5RmBZwSeEXhG4BmBT+YIPG/APgHZcfPV1g2WLwD6d0i+W+VLwL7E33cnPgEUlyb9rP1nfuZnbjeKcX/egC3D9TzxjMAzAs8IPCPwjMA0Altfwp8iPAd/3c2Ud4ncnPhC3+xLgN71cnPlnJsX+x/60Ide/tt/+2+3p/N7+r1/5eQm7ZGbMDrse2cNPh6wevfqSsrI40nf5kvB+L773e9++Zt/82++/Mt/+S9fvvRLv/T2gF1yq+ZcfuAFC043byu9cZx+ejDyRb/TYGjH79b1DuQRC34x1Jc348WUH/zBaxVfdsMqHtksdno4qxYGe7A6Znen0dX0PubW82XFfYbdx8444E0X1k5O4eKeP3o8xGUXB4f0cIPbl2xn/GdjxXT0Jd9m8qsxcZBHvvCjrXyv9MZxGGLLj2Li/G5c6PCh3BTvMxzy1SHOtmpNrxkTrxkOfc15W/rGyXc8ytwUDn/o0iFfKyYd3+thNDfjpReHnQaHbVzSVWfF6SpWunDkVROTHRw8bPzAS27z8yoPcjDo2fjiuPxcxaFLD39foufXI1zY1/w4wfzDA86Y+3uciol4aM1j+/COjTwZvS1bZKsRfo0+HjEc0w2f3jhfZ/LHsecN2DEiDxxLQEkwyWwexOhfNc1+8SLxkithNj9t9r8ota/5mq95+cAHPvDyX//rf335lV/5ldsNjiTvNP+NgI5i8DNhXBTSzq8zfM/LRcyDPnvon2M/f/ZjARz15Cr6GUfv6HlIH5/9/JssHJhXm8dY+JmxmPHHZLcPS/yuNr9u+8hHPnL7Lw50xUecVhjOlad6N6J8FksYLarGq4GRDz3j4i8Gesd4uMmGYQwH51dc4Fgk2LbvI2ox9LPnneZ7hfRtFj41ponp1eYXsXjgavulX/qlbQwK6p7PYvi//tf/utUTXju1oZZgyO3/+B//4zbf5ELuWtiv+PVZn/VZN115kR885AbWThNfcxcv+YKlzna4eAGGBw5qQxNnfHaaOFp/cBLjLpIrLuyRE0/x44P66P/6OscfGwwyx9aFrDplW27hwGWDHr+SPWI4ZptctSYe5H1KcLWx5d/jiRvOXuB6yCY/dpraoIOT+SYX1tTx2VdX8NS75vmJYlpt7PDpMRjyKoZw1NdunfZvA+mKD5/Ey5p+tbUGfPCDH7zFhj5Ou3ERX9cVsRUTXMREf7XxX31ZF/mk2deaQ7eDj/8xpjbZsLFrTcdBbGFUg8mM+u3Lh7mAb08KyG4yZ/3zBuwsOhfPVSwKUhHY3Gz4P5nGjs1CYlyi7EvcT/zET9yeDfOOd7zj9hwS4xZi226rIBSSovLMGgWnoK42ix+/TFTPVqLPL5NF7zk2b3vb225wJh6+s4aLj1PpjP8/ks7VhovJgv8XfuEX3grePps7OD07xzt3/OGf5uI9a+zCNwHrTXQ4Ymq8uLq4uVE8NhjJxZWOOL7xjW+8+eKYTD4dMRy3wIbhQmLxfdOb3jQTX47x2WKj4QzvK77iK7biiEuLLzw+4jHzf0lk+Ok5371okFs5VStXG10XEHxsniVm8VQvuzjmitioD7rV3VUu5MxpnN785jfffIG36xN/XMQ8401NwLDZ32nve9/7bnVaXuSKX+I0a3iTYce+3tz1nCj2ndPiUy2OWGJP1zl1nb2eA2ZcXJ1brRnwxMDaIY/siYf6+NzP/dzR3Ok+ffZhaWx7ltjuf2Thd3Gha9/XRFZxXJHCg+9elFo/cOOb/morvuIhznjgI047jY51D565i9dunbLvho0P6r2c79apOSMmrg8wNHxW6/LMTzfEfBFXunCsb3I0i69cOMcH8nzgizccXLed54dzZM7iq5bJ663Jrg9X2/XMX0X8DJSTYJsESJbmzthFRWKPraQrAIXigvbhD3/45Ru/8RtfPNDSRIClAGxnC9UR27HC7SbMzR0eGsyrjaziU3jwcLBZkE02i7pJww4fZn6yRddiQYYOzPy7yoVOMYaB225M2MJBPMXkCofssM8/vTFcejVr3Nbxyid6WrzFtcUh7M7NMMYFQP1YtOiN4zO949hRHkb5PcqujvHGVTwsPDDVmPGdRi/fcVBPjovVVSyxTwdO+b2qTy4e6oMvcvxoY58v6g0v2DuNPPt8ae7Sz8erWHDkZMQ4q3v4tnJLH4dqW761Mwzy8Wze5Is+XTJncVEbIxd5Ec9j/Z7FovqSD1zYt+1gwOeTOcd++2J6xn/Giy4eeuuY3BSrmfxsjC4d1wyc+LbLA64Y0OUTLhqcXT7Wf5zUe7md8T4b60bZi1IcHuHBD/Zbmxzb189a9VRNk3EDxxdxSVc8yMCeNdxhkcfbtc7Y1fb4KnPVwmeAnAR1xyzhXl1IpuTNEmcRoCNxZCT8z/7ZP3t7V8k5CSzpFeRuGJsM9GvjfmNnPQw8bHjR9z9A3/nOd95eadDNhzNsPtq04nEmf+QkpuzQtYnvKrZH3fEYBj/icOQ0ytrv/HE8LkeZM5+O58KOy2qhyLbFFgZ5PpjwTfpkrvRwNFg2ub1n+4ibL7jYHzGPsleO4eRf3K7ojTJ4iIfYiG0cR5kr+3Tl97W01zp3XRzHOsXlEZ9gVKv0xbiczfwbYzarCbq1Ubax+riGsYrnPQw4Grv5cqaT/Xp5IA8Hhu2ROQMvX8IeY9HYlZ5efMjv+BM+HfGozhrf6XGwFaN0d/nQb/7D2NWn46aH3hjTMUZxO+vpViM40XedMD7ihlE+x3M40NM6b6z9dMdePWlskcNhxBxlZ/vPG7BZVDbHBFwi9GPwz4qxC45XMl5hvv3tb7+9KlEAkmjTzjBWNGHYFKJNc7yDRXaU5xcMzdu83WD2imyUvQkNf8YJOgxv7bopVeD5Mcb5KpC3pHurOP/OeHcuWTbtwzi2ZI/jJqZzYoC7iyt9eS83cM8WC5jjIgBHPGY8jvaPx+HAwKk8rvgf9cdjGHzAPV/G81f2YbANQ+v4iu5Rnm5j+h2f4j9i7OjfDH/8o5NybQzubq3SkdtiEvZuL7fj3Cv3Kxx2beTY5r86NW/UrTF4/Dm70Bz9xQNW8axf8TA+ysuJeODxSKum+FZ+H8Gh81ow6IqN3vZIK/78CCPcHTz6sMb62NFP9ohRrDt/pZfb41p2rKF7OHioz+yrn158zHTJq/N6ejj4ZKF6HedBN1pHLDrOmQ/ky+9RbnX8/72kWUk8x+9GoGI2EVq4JONsoanAenWoh9OXK51XHGcYK2JwmpzJwNptMGxxiB8f8XPzBfdoa7RDRwvrER5HjBFvtHVvH+d8IQuXL1dbPJJ3nO/Hc8k0KU3QJrEx+yOXcT/dscez2GXrns6oP+6P+tXfeP7ePn1c9MUvzHu6x/Nh8cV+8TzKrY7pVVsWw3it5Ffj2Y5Pxyv5s/F09Vr9mc7xXOsDXT7txgVeMYVhc9N+xmU8x75N3aoRWO07jt+Rt+NqNTy6Y2t8HDvul9PGYZzZTG7ss6uvLvSPtPjgfoX/ykb2w9jNqxjQhSPO9vNzZfNsnP7o25ns8RzdNhjtH+XuHdPjA4xH8yQuxQaeFtaZ8ojhUgAAIABJREFUfXaTb12uzh2P6/YMp/Uz38vvTHY29nwHbBaVzTFJLBFUJeOsIEs4GUVT0uz3Hadk4JGbtdW4oqmYwjbWxXKGdRyroPWwNPverfMrHl+Y1CzqbsRW2OzSEyN9bSU/yiRLNxxj8eH/LAazMXqw4cDr2NiKS7bEkJzeln044/7MLpm2m9GBR8d6Mmdc8K6RY5fOGffkx370337vYI71NsrP9rPvXLzV/8x/Mqtx9mGxHS9+rXwie2zZN96NQb7M7M7G6GafjTDh7HCBU2xgtMGZ2TUe19EvGPjwB0Y19giX/IGTjzMu7LOjvsnmC32bNnKBMcNhwza2ERdW8civUbb9o12YxmY2z+KIc1v+PxpH3GAVjxVOPhx79sVXP14vdnDyQe9dSXy0FUZcj1yKb33nd+OLhzwWY/0jXPgycoW5wonr2KuBoy+4GRfzY8tWvfO4F9/iWo3O4pIOG8XAC+teaB9tzo5/7UyZSTzH7kZAgiVoTF6JGxMckITNGgwbHTIlfYZBvyI5YtGLk31YFclRdnVMHgbbvXLm37ve9a6Xn/zJn3z5kR/5kduvRbrw5u8ML5z8IbOSn/lEH5/igs8Y66PNGQYZGMWDTPsrLnTIOa9v33jxxaPj9m8DH//DBj2t/bFvPx9XXCxGcIoBPW0lfzs5+SMGNo1Nm7aqsdvJw5902MYDnrHxojKq5P84Zp8Ou/py43jl0wyHXrHBBZYel5lPM4x40WsjB3eWU/IrnPTxoIufbcbF+KzlQ30yO3GhA3/EyJ8ZF/Jx5xu9+Bkv16PujA/Z/LUfD7I22J1fxXDkUgxH3Bvo8Ceew9BtN/sOioOxGW8yKz4jjv2OVzhHHh3jmT4+2dvFyZd6+CuMbMShPh5xMk52zG+yq/imCysZ+7tc6PLFpuFgbIUTr7HHne0w6FbvMxyyWj19G9n4tO94FpfsZ1et+vjS9elqe96AXY3UiZxEleSKx89RPftGUo+tpB/H6fqegztoT5zX/KpidWFTGKsGy8/q+0hTYcRxpTOO4wjDz3vzSe+ZPr/wC7/w8qu/+qu3R1QourOCMwn8vLcbNd8p8WpnxX0WL2PedRMX9nzUVExm8itstvmDO/+aWCt542JWLExuGDZ25apXoWRmXNIV2xYE3PHw44vGYNGfYdAVe7IaGXXhOU+ebbTT4gNPTXi+2v/8n//z1cJ1BUsOxKC6UKvqwvGsreIrDnIpxuaL53j5DoZ35WZtFhvYNrUhpn6dxi9cZnxWXOjAj4c4lfurXMipERi4wNT4ObM7GyOvptT7Z3/2Z9/2cSlvN8DDn1lciMiLWHpkCX0NdhepA8ztkBy+ZOSZH96VdyxXbJX3mV3nwtfLi5/l8xWu82w4Ft9VDGCLXzp4+KWdeXJsZxg4sMeWeJA1d2Zt5k9yuJivYmm9cyw+u43/cssv9mAZu9ryteeZ8UteVm3lk5jAMI89Y02cVutyNo82YNOHYw0RE/k+kz9iOMbFOiSe9jV8duJizlkfxaO6cSzOYY62ybFXTdtXF54D5tFL/OJL+VlxoWN+sAFzVp+j3eP+fgUdEZ7HtwhIQImWLMXp5meWkOSOobNYlng3T4qH/moSrQqdnmJwMbP52FBRruweeXSsAN08uaixhUeLDn6Knq+K9IwjDjiRFRMLGT6zNsNpcsCwCJs09k3SWQxmY2yRN2H4ZF9rws64wHFe3HCnIz8mtlzJjePyPVsI+eM8LPoWOf6InYk7Lhpk2Zs1emQ1cmIqB//n//yfmfhyDH525EAsLKAz7isQ9SSP+YaLuMbvqLfKh7oSQ5z4AsMGb9bYO7Y4iE+5rbZmdmdjMHFXU6Mvjmfzl/yMi3G5zpdiJN+z2Ky4qPFi0bxVg9XsLAbHMcd42MzP5n5rzEwePjnzXi8vblrUiGOxwJk/jm3HBp+vnSsv5MRTfJyDA38VA3rmFh1yxcPYsa0wRp5wxAKWeMzaKqfiwS49PIrnSn6GbQzOWB/0Z/6s9I3zScNDnOVGjczqi9yKYzzUqBdycr9al1fxLZbiiof6kP/m343o8GfFhU8w+FRt4LOq9wHy1S77eMLAQ77FJI6vBIcddo83YGIBQ17SDWtQfbWbfjXFd/pX2/MG7GqkTuQUjWQ34Yl6pokH3Enisa0K2qRQdArVAuQhrB48aHynwcdJUSqkHhq6gxNHFwMPYuUHfX4Z83DGr/qqr3q1kK4mF3+8OhKbHpK3w4PfuJjYML74i7/4lU3jK7uzeHkiP/kv//Ivv52mb5vlKH3yZDS9CeYVLB5y7nxbOmM/6hpnS270HrSZfXE6iws5G1uaGziv1nYfxMp2GGoDpng0NnI/24eDrwXcIvRlX/Zlt0XvTOd4jk04msXfM/DCPcqeHadTTMVSrew0GG6+6HoQI25ic5aTGb7FX43IbXUFaze+FnExFRc8tF0MMfBgWq/oYfDxXlz4j3e9FwkeTMu2MRijX7MYjPOCrLUMD7bh4FJs8+2IY7w11Tm1CqPvnh7lZ8e4anFn/7f8lt/y0MOtYakF7/Ti1Zo4s3s2JoZewPBFbODu5FVc6HhX0bzzgFtjOxj48cE7X2pVvWu7tU7Hizd8mjPGdrmYM97t9aDdfKm/Ebvwx5osHh4QXq7G+jlCkBF/dmrWUzitqfw4w0iPnLxqrjGud1fb3ip1FfUzTE7hukuuaCRX4lqojuGo0P0/xe/93u99+YEf+IGXP/SH/tCrySih7qj1K4wj5vHYYqMgcdHYhHe1JauwbF698c/zyv7oH/2jL294wxtu3Mg5n09HfPzbyLYd5e4dsyEm+dEkm+mNk+p4Xkyuchhx6Di24aKVG+fOmvPlgVwYfBltOHeG5ZwtfTW2aiuc4hcPGOGusGbjfOcTXQvoIxjh0o1HMe3clT6d45yBu9tg5Fu4Oxh03Cx0s4GDfO1wIY9H8b2Hcayh+KpTcZVz+ziRdTxrI0+yGj08+IWHvrqd+UTWWqjPTn5kk1669Z2rN27N0fAyb8/aDId942LAn+pjJnuGXXzphVl/pnc8BwcPvhSb+qPs2XF5LK67/sCWR3xsOIz7Z7aP58S2uRvOLh+2x9zE6WirY+ePTSzUarpxqD/K818jT6YtXxpPboUTRvEUg3u1OnJ53oCN0fi/tN+i5v+a+T963lX6VGnelfOqXMG1qJ8V56eKXzOeTcJ6Mvaf7RmBZwReWwTGOfXakJ7azwh86kbgeQP2Cchdr3re8573vHzlV37l7X/xndF4vS76uzizGyuvEPpSbq8O3IjNZF8vn1a8V+NndmfnruCQaZthGLuCs9Jt/PXAeITLjt1VrncwcPxkwykHY7/r06jb/uuBAetTGWfFfTW+qo1ieuxXOEe5T7Y47vCe+dLYJxPOpwKX16u+dnHKV/38vejOPvv/XyLgJsZN2H/+z//55bu+67tuX3I39qnQ+kJiN184j/ufCj5c5dhCcuyv6j/lnhF4RuD/jYA5NM6j9p/xeUbgMzkCz3fAPgHZdxPTl7n9Y2ufX/e9iRmd3cVqdVe+g7PCcNP4cz/3cy/f+q3f+vIbfsNvuH2nAecV9gpnJT/z/2xshrOyucKZYeTT8dzxeMRcndvh83pgxH3k1v6My8pmOsd+hkHmE4HzenE5+tjxrk/pHfsdnF2fVvJHDh2vuOzgrDCyca9Pv/4o/3pxmeGsbB45dDzDcO4TgfN6ccm3Y7/j0yeKy8ru0ZeOZz69Hhjwd3HiVP98B6xI/F/u/92/+3e3d47e8pa33N4N8zHep0L70R/90Zc/82f+zMsHP/jB200kzp8q3B+Nrwnc9ijGU+8Zgc/kCIzzpwti/WdyXJ6+f2ZH4NPyHTDPrvGzVhPc80U8NsGdqo/5/ILEu09+Gu3Gwcdn/YrLWDI7ZeEdLLZg2dc8T+Q//af/NP1FhHe7PE3eT2bf97733b5T5ZERxv0axJfc/dzZT3x/+Zd/efuVVu+o8QUPGDB3bpTyx+MOxNAvu3oejnh5ACi+xnBefYTqo1YcyHrYHhz7K/lZ3Ml/9KMfvdmSO48+6FeZO4u4uHjYp7yoB36ccSkG4sYPPR04fq7MBzw6v3o1BMfmvE2d8UfceuZVtqqfYxzUFjv07YtDz6w6yp4ds1mds6XOdhse5lF+qwWc+m7jVTz2caErnuokH69i0PWrIz/t9xNw+VEfcGFdbbjLgbyoD7qw+LnT5MeDfv/jf/yPt/oo5/qrjW0/ZRcfGx/rr2KQM3fVyYc//OGbbzDu1TvbZDS1rT7MWTjHOp5xYUMTT/NDHjyrzoNUxTJfYJFJ/ojlPJv08fGCz5i17GqD3YN57XvMgDmzW6fioMasodZkc0i97tQXzjiwLR49N0s8dviIoXzgQI9P9ncbHI+ykKN+tbeLU22rd1xgytEqpyuOdNVqNUJfbMXmajPntR69hIv6gYHTsbHR2p0t8929A104zpMTH2OzFkdxFA8xlJ+rbY56VfuTVM6XxCsqE6VFXoCMS7iAWVwEzCT1S0SJKqA7rh0XVxjwPAtoljiLwL/+1//65ff9vt/38ra3ve3VQl8C6dPzDLDP+ZzPmRbQGT9+8NFioRg8Owfe7sQg74bF87tgKkgcLUSe2cI/z+cSw5mfcTSx+IRHsrNJkfysZ9vmplXuLMq7GCa5uPR8Njh4rXD477wJSk9vkorrb/2tv/VG03hxPdZBfoRP1j55NSl+4kHPmPOrNmKQsVBYfGHsNDjxUBti6hk+Z7aP+MUfZ/v4+yi9C/dRfnXcwqdXR55ptMMDLts4qD8x7flsu/UBp0VcTMu7fqdZ9PlTTOHuNjWBv+eiiQsMedvF+sAHPnB7XpXngGnV+4oPG2Nui6m5Li/sX6l1OM0rem7QzRd4jp3X8mvFpziQE1fPHvTC+mrDVX3DYdONqOeAFY+rOOwXF3POvrXM+G6j6ybfmqrt1hebrmHmvzr7vM/7vIdqA47/1CKu6kxuyu1Vn8TUtYxPfkwGw1j5vYpjHXJT+ht/42+81T1uMHbWAnkRF89n0+h2AzbLk9iZY3y2kfHsPW8SeO6dmuGPRnaG4Rzdat0+Hm5sr7ZPyxswCXUD9D3f8z0v//Af/sOXn/mZn3n18M0K/gd/8AdfbArIoxW+8zu/8+XP/bk/9/Kbf/Nv3p4UY7AlyuYmZTXRJfT7vu/7bom2QCgWOrg5rhn3yn63oCsWk1SReQdQ28UxsWDBUIz6b//2b7/dGJq0Ylw8V9j5xRcXk/GCkp/3ethwFLiLLAx2mzj39DvvBgwWff7Ig+N8SK7eObyzoyfrnZr+O0Dc8LO/auk6b6EgK9dimg3n4MwafXLZcRNoTH3sNHZtxS8M2FebusCbrhtSnMrLVQxycPCw2MEyZ1rEr+LwpZiF0VjjV7DI8gUGX+QmnCv6owws+upMg7nDhd0uEOrsEQw64iuvzTmYq1q/Gfn4xYYOWb2teJBpPPljz8+jHWNeFMttcSi2+lWDUz3gTXen3mHjn90uqjsYuOVTPGHCyJfG7/XkceCLmNrO/J/hVZ9uFmCZM9ouFzhs2/hSXezwIevTEXUGQ1yM7XKpXtQ6HrYdHvxnWzPv6OMQ1oxPa1h2xMO9gGMYttGf5G5Ghj9xZwOGmy84V9un3Q2YgnBj8O///b9/+Tt/5+/cglGRujGz7yOGv/bX/trtBujrv/7rbx8XOBbkv/JX/spDRTQmSHJt2iz5bsze+c533hYqMgpF8trXt2jYn2HchBd/cKEz6sGvSBdqv264AnaxtcF9+9vffruZHV+J8hXfVcOD7ZHPuL/Sa5wsLjBGHOM7ON3sxJVuscrWrM9OffrlPA71Mwyy2cIj2TEn4c/0+V8jh4NFIpzOXelH3vZH7Cv6yWdbbZ1xX2GW0xa7I+5K7zgej/CcL9ZH2bPj6suFUQv3TOd4rnzWj7E+yq6O2aU3YjwS3+YtnPDu+UQ2W3rHcDQYtnsYzo9y8hJmPodR33h9NeWYzMgrmat9uvr2r+omN9ZmfDp3tRcT85b+6Pe4fwULFxss/oyxvqJPJh/CSm+HC9nk9XjYcNpp5j8e+lq4Hd/rxUKdwqnZX3EZx9nqeNwPR7/iQ8+5/OYDLlfbdcmriJ9gOd+d8Cs9N1IS4q7aKwXNwupt17/wF/7C7eO/f/AP/sEt8D7v9XT3v/E3/sbtxuiRj1OONzhuSo5jY2ickzStG5gKuCKQ3GRG3Xv74+JFP1s7WMniMOrj6ubLuziKjVwFOOMVjnP2k5/Jno3lE1tedYyFf6Y3nks3HmM/yrXPZv7XG6v1itpx/DpXP/rbK/rOFTcynbN/r4Vpgbkif8RjF1+69UeZs+ORN7kwdrmIaTr6eOl3WhjliG4cr+LASN9+x2Hv4Iz2zZfdPGW/eIx4V3mkUxzK0RjzFdYq/mpUG/kdMbLXuGNb9jt/Jb7FPt1sh32vp8+eBoPvWri3gwt/4q8vfrsYzOCgFvS2xuJ1gcor+yMXeo/wKTZ0d9afkSfu1Tc8WI9wGWsrf+I32jvbx4XOGNt7GGTH+NvPh/aPMiMHvMl1DRcL29X2aXcD9qf+1J96+Tf/5t+8/N2/+3dffuqnfurln/7Tf/rqzlqwfB/B969++Id/+BYjNxHeFfMvgej9/M///O3z7KsBJCfJtorI2FkifDbdq2yybhRLcsWjCMLd4RKfUR/OWGRX8ehpigvHEaP9fEn2iM2f0Q/HYrOSP+o75ovYVtiOsz+TPxuDQ7/49Ip0psMGnse+HBmP0+jjiDXaSS9McmMcxv0Rwz6c5JOTl/aP8mfHdHAZY/gIDk698ixGZ3ZX53ApNmR2ueBBv57+6NvK7jhOx6Y+XguX+PcqWH3scsEBF7p8qsZGvlf21Ud84MHq+LZz+ON8XOM/yjvXebIwZ+3IVzzTG/GO+yMW7PDbrx/lzvZHfRzw0jd+pns8V2zKScdHubPj4jLGrrEzveM5+jYtrEd8oqPWwtHv4IilOumdq7E+bqAX/+DQmySpjPXS2FmPi03jg63YzPSKe7Jk+GI8XWP3eGQzuTE3M7vHsU+7G7B3vOMdt+9Xfd3Xfd3LP/kn/+Tmb0UmuB/60IduNxO+8Oe7EQLo5sIX7yTAF8bJl6BjwBx794dsCRZ88m5G4NkvIekn63i8+TIennPZpe+cVn87uPBHAdGvuPR46XcbnW6+YPiisl8i+UfBmhiK19Hf7ORP/oubtuuTm+T469nUN5a9ez2cuMZpxaU6GHsxKH98cVysZzjxS27kZywfYHQ8yrRPLnxyWjWYzJU+n9mzL7da2Fcw8omshTM+OxjZgaVG8CjOOzhk+QLDVn2dxTLbY1981fNYs6PM1f34F6eOr+rzQTz48Fq4wIgD2+KkrfgYz6a8jrrpOw+neN0Ahz/GycCKuwt0N4PGOh/OoP5qd7RtP9kV91eKh538YVc89LsY7OcLvPjs4qBG19YasouRvl67l9NDOH7NIdtqDZbYaDt86ImHWolH8fk1hu4ciEU3cTAfWQfoxYEPjm0rf5zT6u3jnvyIdUa/PNJNp1ie6XXu0+4G7Lu/+7tvgRiDWXAFu0ch9AV5yRYwXyL0caUvNzfZCtLYf+xjH7vddEiUwpMAGPYVsyTo3aiUzJITpwqDrP0SRh6WcbKasbFIRi6rfRh0KoiOd3Digkf+iYvvyv3QD/3Q7Z1FN7ktrCts+nGxb4Ozkp/5xIZNnOjzy7YbG/JxSD8+M7vxrJdXmxoIx7nazCc228qDY3pxoE+3Lbyx57/z6ZSTmc1R77gfl3rnz2Jw1HeMC/4w4gRjlwsdGHyphdnxvZ5NOrDMweI05uUehvMwtHDSF++dRp4uHmqluOzg0NVwipfj3fiKqy2MuKxwjJPRcHfMFxj2w6k/wxmxvDCFBytMGCt99vGwFUP793RuxA9/ymNxqD4OYncP6cuhLawz/jPAYuscXxzD28FJDwY9x+3fdi7+GW0X210uo17xeYSLL63DKjd4PIJDH4/iko/hjaHpek2mRs+xDY7aE19bdZRsfTjJOvaGytX2aXcDVvAFzFZR6QXH+d75Etgu6sba7/tNsyD+s3/2z25f4nfDVtHBtcjA8A6a5p0W3y0z1jtc9biUePtjkuHgDdvmhwM47zSFCFez7xczXmHs4OBUQePRjSef7Bvza0A/eIjnjKNz4gOP/8Vgh4tY8cdmstKVK/xWE2PGBQ4u+Gs4wVpxcb5c1MuHfXmCFQ9c5HrWyMPKD/bs2+A4J06w7M+a8/HRs00fn92WPkwYXixYQK42vhYzWDCK6VUMcvToa9WJvtq9gkVfTfUq2j4ujndwcKne5UTj4w4GnXSbt+V+BwdG8TDf1EXxvhKTZOiIh/yyzz/9GRcyXUzYFRdcyjNduMZmjT2y1TL/6VRjjsu78fK/woKjPVLvOLKHr5jq2X5kzrDfO3liZB2CvdOKI53qVKzP8jHD5ws+YtcL/V0u5RMn80WPxw4XOuKp4VHOxXmn4cJuPODIkWvs1SYntnIrV3Ga+YS7hj89nONRTKwhxhyf+QSDLY3cDu/rq+4N/pP/z3ghEVjBUZwCqZdc42NQnTNmsbsXvB//8R9/9dFm0YBpQki0n1ubIB4B8Yu/+Is3uwrLOUWBn/MamyVd4lzA4Ui876p5Btj4TLPs3evZYEsx+lWod/tGu/f0nRcrnDzcUlxw5qef2cL0MSSubjQV36zI4fDJs1HY97Gvhcd+BXuFC7ue56Z3gytm9vln/2pj17OAcMbDpg5W3GGLgxoiQ5ZNceGTvMJ03ub8rFV/zpGH5aNwNSKu7NDl0z1/6NvwcGMNY6d1k8geW7/0S7/0aj5cxVFbxQyGhwmrhZX/K9xwxMePY1zU4MjL1VZszdseXgwHPzm52nAxHz3wUx74Qn+HC1ty4/lbsHCwVWc7XN7//vffMNQaTE297TS1IRb5g0f1vMLBmz15pechmx7fIhbOaTitcp0uv2FYy8xd+YVXXpw745INc1VuzFstDreDO39gdCOurnz64d+n4bDT1BZ9PHp4qbVsNx/VOx7mrjVQHHbq1PyVx3Q9QklMduuUT//9v//3mw/WIPkUF+vK1SbX9HpIbvns+nYVR47E1bUGHpyza8oMl7x8d62yzxc+2Z81dtmzkTFXXF9gjWu7+K4wcGWDvFola9599Vd/9czkrxv7tLsBU9DHojZ5mkAe5Om8ZGsK18LgIiJhHgZpoqzaX/2rf/X2hX1BN3GyJUHGLFjf8R3fcXtn6Hf9rt91G1OQLaJ+GPCN3/iNt2SRx6skKgSY+Pg41GLhJozcTquIFYLC8NBAjZ2rLb88iFVMKkC/EP2iL/qi24MmFVmcV9hwLDjOe8Ya/3b9gWGSi6EHbeYLrHhd8cuFANZXfMVX3PTohzXTdx5vPuLsWI1YLMRE7uQqDvUjFnu2sODZ987hG9/4xts++XI26o77YRiz76Lo4YXysdPYrrXIfM3XfE1Dl3oYfMVDDOyLqQVtpxVX+p5V94Y3vOGGuVsf+NCxAPoup+NVPa740ZFbF7i3vvWtvyZnK53ZOAz+mBs4iBFuxq42OuR9zxIf+8Z2fXrve997e2ByX7e4giEnXVjZc6MhL3xwbszZyiexZEsP6yMf+chtvhxvwM7yTNdWDF0UrTsepHq1FUfyeFtDrIVuWnYaHBu+1hBYHoB6xn+GX+zEQ0xdrGHs4BQXc9/c8+BRuLu1wR9rkGuTOnOsrXI688dY/+XEA8X5UZxW8rNxuXXjI7/0cSj3M/nZmGsMX6zLGi7i0nX3qOOcetTXrKnyay2TGzHV40J21uizRQZv9xWexHC1fdrdgAmCTSIFTxNIN1UK9hu+4RtuT2XuVbvAugn72Z/92ZteT1pfJc4DSD2RmQ14sJPtZqd3GSomFwbNK/Tv+q7vuv3SUtJcdPRxDkcyJdb47kWNnYpFQeIQnxuJzT9x8U6c9uf//J9/+eN//I/fFkLc+Y+rftXIafFayZ2Nl1N55FOYZzrHc+KLAwx4eJ9NLufYsZFPlp682HCpkVm1asF5+8WsuJX7FYYaxTu/7WuvJabqwxxhe2V35k++iIc54BiPXS7J4yAejnd4zLgVl9m5e2PmLy44xO2ezvG8PPEFj+ZGuT3Kro7FtbWruVvMVzqz8eq1NUSuzvxio1oQAxtf9HyxXeGBO1l6mmN2YatfvOCQWTV24082/TP+MywYbLJtn81djHDx0PhVTDt3pc+ueYdT14UrukcZXODwK9yjzNkx/fx5RD9suVVX49rUuat9c7Yer2rnKkY5br7QKz4zrHym13n7fNFwMT7W8YxLMjjTp3dW10eMT7sbMA6aaGMTnCaiV3Tf//3f//KX//JfvhWvV8z/5b/8l5e//tf/+su3fMu3vHg3QCBXrYA73yQMW/IVpFfBbEqyc3T0v/ALv3B7Relfe2hjodm3acnHo/HbyQt/solfFwSYtp1mEdQUVfz0XoXGyUWLnY6P+Gw6xxe82j/KnR3TCb+e/Lh/pj+ek590cbKtcIrX2NtvMefPONnu4TgfFr3kjXWusZGz/WMOyI0YR/nVcfhs0ofLj2ptpXccH3EsdPlwlDs7DoOMuTIen+mtzpXLcIr1Sn4cT1Ys5BfGI3HJj3IT1mjr3j7b5tSo+wgXHOjZ+FeOi8+Mh3M2sqMO2VFv3B9xjDc/krEuwirG9UfMEYfM6L95ayzMUfZsnx/WsXzX72LAH2OYfv2Z/fEcefZ9/MeXMEeZe/vZlNvx+jPG9B5G59OBGW5jyZz1dKwfePCltoORzpiXuHTuSl9+4+FY/WgrPDzHc3TEVYNjn8xZnqr1Ecv1/2r7tLsB83amAndR8A6T/0EmIIJrEisY70L5rPjd73737a1PMu9617tu/47IR38l82oQx4Ibk1YxWABsP/3TP337v1sr3JJNj3z6Y5GsdI/jdPlro8+nFc7If8TUuTxhAAAgAElEQVQhj4dXBWTGAnVj57ibzlXM6MHQ7MPEqUIf7Z3t02vjm/0wz/TGc9kPJ4wVd3bw1JPRj3mBDaPxXlWNNtsno8FLx3EcspH8sRcz/LsohZH+UX51TB5OnOHyydhOK2b01QeMFryrOPGAYYvbrk9w6MAozo3tcIHBj+Kxi8EW3eJRjHb9KR56DQ9tF+cYC7xgxOsGOvxhB//xPIzshud8Y4P6bTf9YkdnjAfdMJM5YnScDT1cW2PJ3OvZYE9fXHcxRp/icc/u6jzbYzzuxWCGUzz4ky/1M/nVmLjkDx5neZ1hsIkDf2CZ//B2W3kpT3DPuMx8pXscx8uazLdZM06PLftxh2Nr7T/iHrHo0c8OvKvt0+4GrJsvd+V/6S/9pduXHfuejABJtkL503/6T7/8/t//+29fuPOOjo8eNV+O7H8nXg3iKCdZ7EjemAjj73nPe17e8pa3vErUqNd+Sdd3QRtxkjvrKxgYbWOBnOmO59i3sd/mvM/b+yewjtk74zhySK5+tHe2n31+4KTfbSPGFfvFjKz9/BhxjHf+DJNueSmu4fPDecerNsqyk/yZzRVW4/mjfwQHp3Trw77a50tc6J3FYYUbFziPtrgUi0d45Ic+/fCu8gpjrPNH/GKfbb2tujvjQUaL+6gT1nh+hZVNOjb807dvLiSzwmicLB1cYOw2evkfjx2M1jcY9GuOd1ry+dJx/Q5WfjwSj+yIyxFnh0t5wSEeY3yyc6+n0zbKrrjMxuMQDzj5N2Ie99kNj7wbNr0bM23EO+p2TD4MffudP+s/7W7A3I0KmgD6cmH74yRyE2b8TW960y1Y9j/2sY/dgu8dsO6KzwI3O0dvvBuOi4R89KMfffGlWP/M+qzBiGtyjnda8hUCTIXW+BErueM4vc617981/eiP/ujL3//7f/8WX+MKcIUdphhr5No6d68nn/1R9p7NUdY+jDZ+jZyOssmLGx2y8pm+ffb5rjm/4sPWWBejLTrOr3STLQ+OyWb/nl769dnruH4XZ+R8L47ZuNfH7REuYdMNp7GrPZ/GPI4+XsUgN8bjUQw4YxzkO9yrXOjTCyv9EfeIVa0fx8Nw/mwtCbueHrv0GtPb4jOz1Vg6x9x0/l5PL59gPZKP+Mahued4p2U/Dh3vYIyy4YxjO/v5g8cYo0cw4vJafKKr6c9qI7mRpzF5aZ6Mvo1y7TuvhRX/+qvxoB8WHfcWzblsnfX7LyfO0D4Jzlkc3MWWDMGRTL3gaC6aNuPGnPNRmrcsbWfJP3ORXhdsN3SwJMjm15HOfeVXfuWrsc7Vh40PfvqdZKZf8cBgUzvDyf7Yw9CKFS6aG0n/zNzHus6dvcVLnl0cyGpw278NXPjDdq9MwojrBfVXIt4V9RE0PPr5+ErgsJPPx16tlGcYsO61MMjZr8Yarz/DYatNDB/5Em984wAnLme2x3N0m1/0xXUXAx4usGCI55WcjDzsj7GHUxxh7zT+8GGMx4h9FQuGeOBhbXkEA4eRB9u7/tBRH+YN3bYzP3AufsnxZxwb95MZ+86LJ5uOzbla5x2P+50fe/rFTzz4stPS1bOlxh6pU7Zx0ezD4R/c3S2MR3jQzS59XPiVnzeCF//wh34YF9V+nRj9sd5/ncCFARhiyhcbbuV+Ft8ZZDzKDZlyNpMfx9isjTwau9cXf71Y9IO1e3rOf1q+AyaIx8lawXG6z4b1AqY578Kq+f5Y47eBO38EviSaGI59R8rPWk0YzXOfPD+LTc/EmbWKD3+Pf8DDO3KKa6dZ+C167MPoS4Fwj63iOY5XvH5Smwx+YfgZtGeVxXm1oPCXrHzgIS64hX+0OzvmPx5syQsM+yOfmd5xzHNe4PjOH1444J1PR3nnnZNDcno31vIoJvaN46HNcDpH17440PUMHhdI+8azsYoLOTIaeRx8j3G3NviNJ95qA4/P/dzPveFe/UO3+NER00d+lq9OxYM/eODFz1kcV9zKoTiYM76CgJuG59VGBx8Yn//5n/8KA7edho94eKEiR/zDg19XG//Fw0LOH7r4wdppviqAvzrDS/2crWvsigG+9GxeOFoX7eMw5mfmkzE8zQ06zV21Zp8NXMid5ScZ/tITD7HokRpX4gCDjdZDGDh5dMJOg9G65fl/4uC7xnjtND6LJR508cLHdrWxTdeaKqZxO4vlDFstqFMY4tr6M5NdjfFHHOB4XFI1+ggX845fMOHAWMVlNi4e4inn1ZqcreodvlrMFh/l1uYrSHSdx+esOc+mDS/XuB5xdabXub0KSuuTuBe0YxOYMWktZGNyxqIZx49Ys2O6EsGGRGiNKQr2FMXXf/3X357Lk/0jVhjOmxQ2XEbuR53ZsRjYusArbJhxm+kcxyo8FwGLRguQhdVzdOArXsU6FvERh90WKzdecMVmjPdR53jMf77Q5ws/xAVWPI86s2NcwnAeB350Y3PUge38KEcWhjFc8NJaTFcYZFvk7IsrHLFjh4/5dsRwfOQpH/yhs9PwpocLu/g73oljuc93NYAH7J1WDvkuHvBa+K7i0MWdD/TxcLzLhT1+9SMcuYG9M2dgiKubBHrmzaM8mvv08bLhs9PERIzxwKc4qdVZc748ssWmvMCgg0vn+blqZOSCzeLQvIPBTjlyftbIWTP5YF9e8IC907JHT17isYNBFg+6YglLfviw0/JZbPCywd3BIW/NEAv7cqTfrQ2+yC1f6Gv2d7jQ4YuYwHiER3bxsRWjXX/YFk9xKbb8EZ9VjWVDT1883EDBwKN4rPRxd270G5Zavdr2qvkq6megnIQJvl7SvSLwSrrml5ff9m3fdvlBgv4npUdmwNltcfEOmBsm7/g82iy8eChqfn3v937vyx/4A3/g5e1vf/utYOGSUayrRs8G55HGH+8mmKBjTHexvErC4dF44CGeHtbnAYiPNjhehXswbbkykcX4avNKTdxfCw8XODXyyLtXLsByioN4iOlZDZz5BUt+8XgtzZx5LRheKKgRP8rZycXIWX3IDR7i80gTD3UKwwXu0eYdMC+Wrq4hsxr0Lqt3SB+NB+5qxI+cXguGZyh6MPWjawgeHkxtzn32Z3/2oyG95VR+dh4IezSm1q1j3QAcz1859i6LuL6Welerr+X6YO3yozVrCH8eza91yAuv1xJTsYQhvzttrHk3Xo7V2Dh+FU88PFB2J6/rq+ZVq0+5WwQqPkkwQSVQ3yLsLrkCMz5rZOnTdSeuMLWV/AyjMRgmFwwT1cVxB0cR0XNRguPmx5gLradJx9WY/RW2c3wRH75p+vbje9aTxcErP5xg2fi4g4MHHFzjgz+cWSOXb+Qdm+Rwjj7c48EGLDgwxNUYTBz0amSFw2/68kjPsY3eTmNfg6E2iuvOzRO+5UEs+MIn44+04gHzkToth3yB4di2iuWMo9jiAUOv3rUdDPL5IrbdPIn1Tht5qAk5y8cdHLGw8cGGk/hWA0es6tE4e2Iiv/nivC39WWziqi7psw/D3M02PTjO62cNDl3+6+UFzm69Z4PN6nQXo3rCs3lrfxcnP6sxPuI3i2Oyx568WMqJ3lY+jrL3jn0lA474lrdVPmZYZPkiJjDMGWM7/sDFwSaeYq3hsxNfsjjkC331on7CHH3AUz2O/pKvRugU1zOf+Mq2vNBh3/y92p43YFcjdSJXgiShJhESUnIkyjHZEptsvXNk4HTDQ28ln96xp6O4KjD6Z3aP+h3joYBt+MDt4lSh43uPI5k2su1n50qPCz9sMIoVrKstX8Z4nnGP59iLqbfcjcWB/RHzyIcNW00sWxjgwaKfneTGno4Wjnj0dvsod29/1K9G4nJPt/N4xjvO5SeZK31zo3gUw/orGPzBoVrFy5htB4ct8tU6zEfmDPtw9Fo1Au9qk1f6Nn7B0Hb9Caecw+Nfx0c+5bLzjuUGTs25fKnvnL6xMPA3X6qPzju2v/KJfufI4m1rbLS52ofRln0x2MEYsfFtM76Lk0/VmONdnOZMedRXYyPXe/t0xKK+OO34RLa46h/BwJMPtmw/gpMvYcA1hteslUfn7bNp34ZL7d7cozvaMFfU+9X2vAG7Gqk7chKozRJrvMLo/AzOuVqJHcc6d6WnNxbyI5O0gmQvHhZkbzv7nBumjZ38m3GD0/lwZnJnY2zQhdOr6V2sUb79+pntbNbPZI3Nxo94+T+Oj3qz86PsbD9es3OrMTpjqy5GLuP51X449ORXv4thgdTCKAa7OHHkS3iPxCYf6OJie4RL/sQrvzq+0o/xTX6Xy3Fupl8f7tjPzsWF3NWY5HO69TDY6HhmLz7ls2OyZ/LJ1Sc72rLfeHI7fbVOZxcnHnGg3/5VDnTSC6+xqxjk5Mf8c0OnPYJBL/70XwtOujeQB2JLr3hUe/yLV7j1jY/8y61z47qYbLrHvvOw4nCUWR0/b8BWkdkYl/CSTq1E6CXVu0WKwdus+lF2NCOR6VYA4Y1yV/dNrgoi7Ku65CqscBx7mKxfrHzd133d7Uut/NGyc8SnY8vnldxR73jcxWS0tYtFvg1O/u3ijPEIY8zXyB0239VBdujnT/rpJNPx2Cerh6k/kx91Z/t08bCVn5nccSy79LR47XIJRzzGtouTbnw63sHBxQYDn0fjS3+0m49xutLHYfTnERw+jHnll/k68pvx6fwYD/Wr1Sdz1Kej1ZNjV2/Lj3H/iJF+GMU0jJn8aix7zqevf6TBEs/0669i5U/x6HgHh46NDhyt46s80hntj/s7OOWGDk6PcIERDv1HuczqvXqd+ZSdzjmOR2P1qxyR19iJ+xE3jFl//Vu/M+3n2C0C42SoCEtGN11uwrw96fxqK5x0LZRNsHvy6dWT1+LguEJJZuyTG3vn06u4YPzjf/yPX97xjne8fPCDH/w1i/uId9wP58hrtNc+meMGrwuJc/iEdZRt/MjBsXPeXh5tncUlnbG3jwsM/ai/4kLGRif9MNJpUb4JTP4k51T7o+2Jyt2h6guvMK/0gItjF3RcVrorIuTZls9itJI1fg8fTnL1R52bwOQP++KBD5/0xWcivuRSXo86Rx4dH+UcHzEcazjNthmGsbE+7NPVsn3s0xnl2C6uxq1j9M7aGLdxro62x/0jj47jUTw6PrM9notnHOifYWT32KdjXBzDDe9qH676KjdhjbzP9pPPJtnGZnrZPPbsy+VYF2EdZc/w8RjPj/tHPjNcYzDKMZ1ik4/H/og78m5/JjOOjTzjVd0ez+GTzLFXW7jTdW7n+1/4PN8BG7Py4L4CGRcpMD4m84U+k02THIl0XKKP5pzv47UK0iSBv9Pg2HCiD9MFE4djW2GTpYuHrRtJP9V1rPEDto8lZ9jJFJ8wxSCMI58ZTr7wwT67+TOTP2KOx+Tp42R/5T+d7OrxpWefTouX8c6tfMpW8QyPDRxGTiPXcR9GtvV0urCMclf26cobvnKBV/V7Rf9jH/+vEXiUizhd0U+mPDjOl2KUzNjjfWziwhc9DPu4VB9H+dUx/fIHA5bjmU0Yq3HnxDSM7IXd8VlvEU/ePi742WZtxaX5ggs8cSnOKxw5aY3S2+JC37HG5swuGZtzerp4Nx4P58+4sMH38pit+hn/41j26VSn9lcYq3E46pLvce74aPPesbkjHvSLS/G9p+s8HWsxTvbLrf1ZW/lElj94iE2xmmGsxujhLkdw9NrK5mocTn7Rdz05i+8Mh75xehrfznwKIz09uz0iBCfNOJxV88X93ljJ3vidyZVe488bsCLxGnqBrwAVpOT6npSf5/tJuoewfvmXf/ntsQ0tKjNzisaEUsg+5nMD56f1ZwUww1E8vgioOPzk+eyBnbhWjCNWfvDBebwVVg937GfhxhXuqsH53//7f98mBD7k+amfNfLHRt7Pe/UmRBji4vhqs/jh70GI8iVOfLOozhp85/R4kecDHE2u6ONlfBYH50eOcgvLwwvliC/wbXDIr1q24KkvtTGL10rfOIx8gSOuHrbJ/tUmdriLh3214LlI+O+0uOt7ECPMHS58wMHCaa6Jr1x0MbjKR1zYFQ81Ire4jLm7gkVHbj1zil9jrK/ok1FzeHzWZ33Wq3yd1UVxPOJ7VIFzfSmYT6taT5dMdSiGHhoNg33natVRx/VyodElo+eLOrcPS5ydw0U/a8bZs+bgIydqbOchqnKhLtiWR2uZ5lEjO419fpnf1jL7aixfr2LhwHePwxAH+o7v5WTEF5fs2+cj/+DtND6Zc9YyMYIDQ3+18UeO5MZDuflRbq9ikIOjVmGxL8544ThrM1/H66T40HX9xAn+sbGjtvQ2Mn4VqkaMt54X71WO6OHTmqPH5Wqbe3hV+yl3i4AESIRkKUDJ98yaL/qiL7p9ZOf/J/7Yj/3Yy1vf+tbb+VkBAVIIitBCpfcMH8+scbzT6GomuodkevwFTiu7M2xcFDLbnjXFN/vf+q3fensUxe/+3b/7Nl7xrrBxMcEVsGe0wLS/KugVFxOSfTFl076Y2642k8sk+4Iv+IJbLPikrSa68+W13gSz4MCQa37jYhGc3YCR0XCGR96YV7F8qYXV8bF33oaH3rN32HvjG994FD09posHPjhYLPDgw9VWLmDIr5jC8O7oTqNbXNWFZ0XhtsOFvS5AeJWXbjqu8hEXfrjAmy/V6KquV7gw3Bx/8Rd/8av5BmNVYzMcNeZC79lK/KAvTjtzBi4cj43pZnCcNzO7xsiwU+2zK7c4OBeXlb48jnVKXn7e8IY33GIATwt/hQODnlqwb+5aP3qUz0pvHM8XnNhTH56btfufH+DY5LAXHrjs1imMPkmwpqa/k1d+iEvPAex5Yjv1JUblqXWonO3gwLB+eIE/riFyvtPo0zF3NXERq+JzBcuaLL89F5Fu9VPNjTi481U8bZq571r1O37H77jFp/PlftRvP5ziqU7xuNqeN2BXI3VHziRSRCVU8oy9733vu10sLYKaYlDssxbGeE4hreQrnFHefoWrcNjrxsDxsTk/K1C+eCWgOd/+N3/zN7987dd+7e0G0zkc8DvjEj7MuKzkZ+P02MC/GBXrWWxmGHHFRW705PSzuCSfbT25ZIsxOY1fMy7wbfHNngnLPp3G4Ky45zcZ+3SKyY3AxT90w7D4wsjHixCv3lHJJxhiqp+1lU/FsPP5VYyPWHw+NmPVFPswjcEMd9SZjTlfXOzzxabtcCFfTPCAiVO5ugEOf1Zc+OMcrHyjtpJfxR13HHChm48reTLOsas+9S4mbpTjFCbZGZ/iNrh524UnDjDZGPkcZR2Ts+akU05X+Zhh0NHilG79USf547i4FTvnyBXTo+zZMQw3cHzHybFYrPjMsOiIS3HEQ1thnPkUPkybNquNWZ7JwnaODh44abtc0usaA8PYyu6MYzaLB4xyNJOHbaNXjNywqfewnFe32gzDeHGTT/J4p39TvPPneQN2J0BXTktOSdRLgFef3gJ973vfe3sX60u/9Etvd+QWsmRn2HQlUTGU9Ap0Jj8bG/Xa11cso46iOWvjjUJy3t3DMzz9GUe22bGd+Q5/hpMPzodjjOw9vDjr8YxDOPr8GGXtZ8N+vPR0asmIUwt95/TOZ2vEwNuWbTKOkxkxwtF3nizs9I/yq+ORO5nqDd5uowOvWo3bVZy48AOPjnd8opNePuTTDh8cyhW9cHe48JueWoiDMbzidiU2cSFrPz4r3RXH/EnPjZQaXcUFd+dwrZZhd2G0P8Z6hZPvo890yYefrbgde+fzHY5jGLarLa7HfgcjW2G0Hja+04tLLTzHO3zSExOxdGx/B4NNenwxd+3byk8c7/XZ1svVmKd7uuN5tUZfg6XBWrWZr6N8vFqT+XVs1SGsdMMd49o8SOaIwwZ5uSXrpm+8CTzKH49/PbOjxPP4bgQkpwTVKygfI/gOhY+JfDzj5ssieNb6WKaClODdNk6IcFYYcT/2TYSKuWPFNvrg2HbW4sDGyO1o0/GsZds5WHEKd6YzG6NnosRBfyW+R170tHFBPeNSfJKH136c7vFIh54tDjM/r4yFccZ7hYMrfbrhrGTPxvmUff6I0704zPDiUCw7nsmuxuLBfjjHvK90Z+Pw2nZzlX19GGzgM9tm9o3RHzFgOT5rY/zTTb644rDCMZ4ee482uuzFOds7eHEMK147GGTFZPQlXrNcnI3BKj4wOr7tbPzBpe1Rn9KDY3/M+1UqfNVGrKu6o1y+GIuP+KxiOeqO+/GoVmCt2hh/eum2Vo9jZzhu2uiQh+na6JOFq+38ynkV5TNcrkKsaApHXz5985vf/OqjhO6okzn2zsPrbjzso9y9YzgwuhtXIDstu4orPo195CMfecXPeW/b3mujP+Hc0+l8Re44PvZ3cejAGv2Bt2qdy45jWx8L5RP94nzECsP4cb+cwBmxjhiOR872Yd2rpRUOu9VH9TaTXY2xXRxxgTH6ttKbjed7/tfPZFdjo337tt1WjunGaReDPBybeigmYV/FY58uPXzCvKqfXDjx0LefzNiz0/mxNpPpnONxv/N6GOyOWHwgbyyZlX5Y4YSlf7SFRf8RHFzjX58vO5zoVF+tF7s48sKHOMVnh0eyxQUGXo+07OfXoxjFI992cUZfimncZlj5S7aNnPGOwzmrmWSKod52tT0W9avonyFyJkVJ627ZO15+ZSJ53/AN33C7O7bvlUbJP4YHBpkw9JLZYniUXx2n011+crs4yburN0Ecf//3f//Lj/zIj7z85E/+5Mvb3va2my99PyQ7Y19ccAnPWPuj7Nn+6Atd2y5O79wV1+K94kJOPtgWU8f2V68WVzjsaE3MMRb5fMUXMsnhwJ+VzXCPPfl06vkVx6P87Dg/wko3vJnO2Vi5pV/tnsnPztEVE/0jfMpvOPJuf7fREU8ND9sjOPTDaT+/buAX/vTRMNG42F/xSSYfioH82BejMVczCnGsJyMv9Ogb5xcbjldt1C8Oj9Q7fLZGuyv/V1zwLCb5D28XJ/z86fgRHDpxycfwrvT0s6svF41dwSCDw+jPI3FRpxrbY953uOAxzn8497h0frRZrar3sa248F3sRvliOeqv9p83YKvIbIxLfnfOJUoSPvCBD9y+//XVX/3Vr266utNfwSsGSfW9izBXsmfjFiv6CkrDZyy0M93O0XVzRdc+PF8i9dgBWIqO72PxpTv2vWMkNjbyO1zEA0Y3gXRxgrWDQz8u+NGHs2r5NfYwHGc7+2dYx3P8gUPXvj6c+iOn4m+cDN6P1kc+w+lLwY0d7d47xkGt5sc9+eN5erYxL6sYHHU7zjYeYu0Yr902+lKOd+OCOx75UO3scDF3/Ror22HVX8WSWzrVanpnOJ3T28REPPMDpyNeuPXVe3J01Xv+1Ce/6tmtNf/j1/hZz75Gx754sL2DEb75Vzwa28UhD6e5D+dqLEab5eO1zBlcqtPwyle27vXpiWttNyb0xEBMio2x6i3ce706dS0q58mv+HTdcj4dGOw6Z3zMzQpn5CkesPhyte2vUleRPwPlSpxkef6Wd8B6jISfDSt4RUZu1prk6esldSyEmd5xjA4sm5/FHxfRo/zq2A8J/KTe83e8SjHRPENHkfHHT241fq18Mu6nygoVj3BW8jMu/OGHwvaxrrhYfFyoxgkw0x3HYNj4QK+fhI8y4z4/yeEqB/qPfexjt9zyHQ+NjFjz79hg4K/BcExPXD1KAt6Y5xkGXb7SZwuen27TlYedRjcMufBDEd9V3KkxcSguuKt1MVUHOw0X+mIiHp4FVMx3cPihHvJFXseLwhUsXOipD3kRD7i7PoUhL3yzFa8rPMjINV/8LB6fsW6uYpDD36No1AmMeKxy7bz4J8t3dQajuhUnjQzfjg0GGefNifJivqht486XZ/2sGe9GFGZzd6fe2VcHcgJPTK1F8HYaztZC8VDrcPm+mqtn2HIBQ43Jj3kE/2ojGwafzF3xnOXiDJOOOSfGMOjza+fmQRzFlj/y0rqyy4VdtU6/GuHbDg5fxBMPvOQKN3gzHLJqgyz74qo+5FmNiItPsYytMMb4wsFZLMT2avv1V4yrmk+5VxFQOIJv0yRcgn/v7/29L29605tuiZQYRSI5q4lLXyHYyJOzgIX7yuCdHfbpKJ62Oyq/7jQMhWnhM+ErMIK/6Tf9plf4fGdDP2t4wDCxFbRJAct2teESRo/zwM3m3NVmcrmg4KCZZHivJoxxuajHWSz465+Rl5fyH+6RD44w9LZiho860bJxzx/n2aVrE5fdpq7Yw1dN8ilfrmLFg54Fix/ysdNg2Kr3asPY1Ua22pQXGLjwb9cnel2U6MPd9YlNFxMx1fCDwcerjQ4e8mveOIa764944EGfff5UqzMu2UhGDNSXuBRjMrBWXIyzV/z1eLSepRvOjIexEcOxeSseO3Fkg33zXOOL5yLuYNATj+pALPBw8d7FIQ9HLOQF1i5GXHCQE+tQubk5efGP+MIQGzzEyWZ/p/GjF4N8weWRJiZyIz64yZ3tapNbvpj/MPDgi3jNWvh8Jou7OrWFQ8Y+PHJnjSzeZGFcbc8bsKuROpGrYCTbvmS5cfr2b//2WxGNd9AStLoBG0141ekhirsPDYRRMXjVqag94K6x0caVfb644bLgwHj3u9/98t3f/d0vX/IlX/JK/cwnOvy1eQgivN1FhyETVHw9rFOMbbvNu2deefbwwnv6xawedwvORz/60duDB41rZ1xGXbItUhYtPDrfIrDCGm3Z924RWQ9A3GnZoyOmXjEW0x0cssXDfxZQYzuvnrNVPYgHHq+lwXi01sWleDyKgbtF31PBYciPbYz5Ff/I+5jfQ0ddYLVdDDrelTTnPudzPueGocZWF6RslI/qUExh0HNOU8MrPunXk3eh70GdxYP+1XWArJhaCz0AdbfltxtjMfUYnUcan7yz4gIrv1f5Z6uYuUm4ugalWx+GB4/C6cGjnb/aw1GrI0Y5v4pBznrqOvOFX/iFN7Ux71dxuhlVI/Tx2OVi7bzGCCAAACAASURBVMmX9N083VuTRnvWQteycV0u3me+JKO3LntBerU9b8CuRuoBufFGS3K0swXwARP/11VMWjdfipt//NpdiP6vk34afEbgGYFnBJ4ReEbgkywC198X/yQj/qlAx921V196rTvzTwXuK47e2dPcSLr5ciP2vAFbRes5/ozAMwLPCDwj8IzAPALPG7B5XF630W669G5YvMX5qd7ywY2Xt+S9K/Zszwg8I/CMwDMCzwg8I3A9As8bsOux2pZ0g3J8d+h4vA36CVb423/7b7980zd908v73//+VzeTn+ofq36CQ/o0/4zAMwLPCDwj8BkYgecN2OuUdO9wjTdXfecLvHP1o8zKdLqPvrPEXt/RykYcOr7S++gUF5z1MHyR/d/+2397+0VRN159xDrDjEu+XPF/htPHuc7FayZ3NtaPBYoFn3o3b6aXXD3uto7plKuZvrFki2NyjkfdPtLt/KwPq/4s7jN9Y6Pd7Ie30jmOF7Ny6YuuPmrfbeyzDa9aegQjnTEe+da5e308yPHF8Yh3T7/zdH1Mb/4V110usPp+Zbivtcfh3rzBt/oun/nAvnP5Mo6P3Mik2zidcI1lp/OzHtfiT148qruZ/Gxs5GrfGhTmTP7eGB98YTx/7skfz/ODD3wpRnE8yt47pvdafGFfPKrTVT6v8DB3y80jOLiICX/oP4JRHMcatb9qxb+6pC8WxosJXcdhr7CSwzsfzmTHc2uGo9Rz/24Emgwltu9K3VU8CFTInr3l472OD2KnhwpGQeOg1+J3qjg5GUaTYobTuYn6jb+HSvJHKz4z2bMxsbCNtmZczjDwGPMiTmeTtIk39mz6Rai2Yx9GOBYsPEZfzng7RzZ7cNz0FNN7uqvzakNMd1s3S/jwA4/GdrD4wS887v1a6Qy3uOZLcTrTOZ4zz/jSA1BhntXGUb9jcRAPWDBw2cURE/Fo7sLOx+xc6csJDvRhXq25OPMjHBhXeLAxyorpeHzFHxhjHsvNFb+TGbnCUx9jTJO70oclt+b/yO2KPhkYYikPY0yv6o9yj87dMMTDL2z5Y01+xB9Y8tL8L0bZuNpX62oOL22XDx7N/3jUz3hkJxnH8soXfBqnm+wMp/NkxJEPHrd0tT1/BXk1UidyklXCJMLkeO973/vyL/7Fv9j6mbDk+cm2YvKoAz8ft//IomGC+1m956P4Kbmf6DbpT1x5dcoEwMfPnXHiH9/8tF2hevSAQjPWuVfKw45XE3goarqwdhcwNtgTh16B2nfRxPFqo/vhD3/4xpt/8S53RxzjYmZi6dmDYev5WfJTDGY4ztm68bRI4Oz/aZL3KtRx8Z5hxKtFCV557Z3FZO718OMLDw+LTtj39J0vJuIhrzDkA+5uowNPfvlic3y10e/m6Vd/9Vdv+2odr53W/OCL+iznZ/mY4RdTFzd1ouGyE1819cEPfvAWB3FtYZ/ZOxuzhuAPT4xwUH8rn8SSDL75L6aacTHS5AfGDMc5ttJhGw+P1YFbrdO1P8PIhvjRJ2featajq40Pctkc+ZVf+ZWbD+p9p7XuuJH0KAt4HjewU6fsiS9fPKCbb45hGbvayFpTrT9yYm0t3lcxkvMAVo/UwKFY6a82/PnRGqI+1Bdeu63rDF01gcdOXDz6QRxc6/ijbvRqblZjuMsrmfbFVEzo8Esv1njMMPhoHe5ZbHDEQI1cbc8bsKuROpET+IpF//+0dxdgtxVVH8CPYisd0iUhSqMgktIhSMdHCNItLSgS0gh8INKNNB/dHZcWKQFBWloQUFTM/T2/gf/L9vWc977nBtx7z17Ps8+ePbFmzX/WnrXO7NmzKc8jjzxSOmKppZYaoOR/JulkSkQx3NwTTjhh2fsG/24IH4pMGTk89jXpVqGVVy8nyz5AwhRy5513bi277LJlk1m7/CNKSuZ2RBZ7GmkPPpGjmzbBRN1ubvsA4aW+8GpXb7s4N5cyM888c2mPMDk6yQIDdaUeZzdm9hIjF5mQsLz9CY/oRsIwcdjOIwNA0jrhiD9KHQya9sw000z9qxzqtbrx0x7HjDPO2Md3qIXfn8UkJ5nJzwjgYdDrhuBODvLo3+mnn74jjgPxJUN0wl5i2sTwdkNk0Q4DKExd40Oubkh5g/J0001XdBRGeDkGS+o1iAdTPLSvGx7qgov9mcYdd9xSNZz1m3M7Uq9DPzrLq15tUXd0VNl6uM4Lbwed17fOMLRfFX6ulZUnulwvXw8bV8gir7FM33azL2LakHapf+KJJx6mfcDSB/a8wi97RdXlHUxYWXjoF/K4zvgwmPL6gY65/8mUfdG64aEemHKcjGezzDLLoPqjnXzZhNk9oz/J1K2ekoFTnL3E+utau3r7x9nDCx97ZyLYwik61z8/3KWRF6kTppypjEO5D6R3wjdtpevC+ZpH//o6Xbe3mp1yN/FtEQj4FJBiO3SYmz0d1LZgv0h5Y8QoSPj0yzbUy3Z1Dm2w6880+cmAH2V1ppwcqcipXNL683CtDB7aEz7t8g0UB8vwMHjlZoiMA5Wtp9VvNvFDK5/0nLVT/fiISzxe0tpRPU/C2hJZlNOeXMOoHfXHGI/oXbv8A8WpQ/8ZsNSr/k71tuOTdqRfyIG64RG+9baL64Rj8rc7Rxe1RXnyDYssytPTevlh4YMHUhYvfdUNH5jUywfvEtnFT/o25V2Hbzs20cXILQ/ZUyZ8XNfDJcP7P/V2uldQvV9cdyr7Pou+U/o1PPFJuC/TAIHokvqUS/lueIR9ZNa3Q8MxZdqd07c5h2+7vJ3i/OlLe4alfPi6b6Pviev2nHEo5dKuXA/2rD31st22SzvIkj5Xb91W9Jcj/Ot1pi3O0d3k61++/3Xq1Q6O32CpvdUYbOkmX0FAJ+k0wOtQneDggInvhjJIKJeyOXfDJzdXjMGw8CCLf6HOkUeYsuGrrYmvK3JdTjikbmWCTT3P0MLKwFab8ErdQyvXP53syjqT1xnh347q+eRXFh6RgywpWw8PxEt+fM1OOCvnQPVwfx7Jo7wwGciS+P75B7pWBh/lM1h0w4fc0fmUS1sGqrdTGh5pS9rXKW+7+MgA04Rzbpe/XVz6RTv0cwbebvkoj3JWvlse8qd/OSFkGxbSDkdkSLjTvaqOel75yKEtwtISHkgeecgcudWLD8In2Awkh7zKGWvkF3Ymw2BJ3np9HrcFg8Hy6J+vXn893D9fp2v15wimnfJ2ilcvPOv63ilvp/jI7kyeofVFJz7pyzq/Tnk7xQcP57redMrfLh4e0VXp6ffoYP8y6opuJU1b8NAWYWOA64wFyVc/p/3iMiYOlL9eVrhxwPojMpTrdI4zoHVwOivPv6WZ9nd0UoCBqlEG73Rktzwol4FbebJQonjoA9VbT4sy1pU0yha+5HKIH0hGaWkP2YJdvb6hhRlohA+ngVzC3RBMMmiRYWhy4F8fFLTTId45A+jQ+ETu4KS8Q7ngF56dcEze+jlr8LrBIHIrE3m6HXyTX3nrYjzmFtdJ9k7y6Uf/NB2RRd5u+cifARWOdMW5W1ImfOA8LLIop3766axt6bPByhOdg6kwHs7dtin3SPBUPn3XThZ9IE/Gi8hB/uAhjzDe7Ui6Q3rqVWddduHwHEge5SOLsVXe8GxXd6c45fChq8p3y6Muq7Lah4aFT/SBTBzCbtejqTf9ghcZglGn9reLV86RJRR4durTduXFqVd593H6F1YD9Wk7XupVLvxy37TL2ylOnWTBJ7IM1J6kwUB9mW3Vt8qnj5OvU72pS3rKvvv+t5PDJ1i349H+LmqXs4krCARk5ygNoCkPJRaHrN+yiD7Xg4FPR1EkZXIo1w0P+fFBnA0UJemWTwZ+5SLXVVdd1broootau+++e98ze/w78Y4sRZD3ZZO3U/7kq59h7QYhQ25OYXg7D5b0UdpRvykGI4s86R/ydMsnZcgqjPDEp45RJ1mSJ3K4hkWn/J0wSf4MuAYYfIY20NT5qTt80pa0p55vaGF14pX7JhiF99DKJx0PZfFB6ZukD+acNtGR0LDwcc+kHfhER7tpE1lSNvdu5ItsgzlrS+p1rocHKq/dSH5tUbcj7ZKe+P585IvMSUu94dnunLw5KxP81aUtznVeyTvQWX4yRWZ5u+WhDB4pm/I5l4QufuiEIw5DF0WLHBlvh0fflXXfw0XbHJ36tJN8ykaG5MGnW1zkx8e9g/BF3fCJbqSM82BkkS/6mrJ1HOrhIlS/H3Wwsxk/hYOprMEo9chfp8YBq6MxiDAgdYoBITMqOhCwwLYA15nzlX8og2BbsmTwxx+5QRxRzMHyiXw88RDeUZLEDXTGQ7uUI4P2CQ8ZMqR10kkntTbeeOOyHgwPebW5HUmDmSOKik/+ebUr0z8u+MIbFjBWvpv24KkdyrjZyZu+7CS7MtqdQz71kx85S0vcQPIET+WE5VU/wiPnhEtE7UddyR9M0y+1bEMNhj9M4YBnt/qlEnUr6wiv8B6qELUM2uIfND546uNu+GiD+pUVruMkfrBUL0sWutqNjqaeyEMOfUwu1K0sdC36hSeZBtKv1F8/K5N2wdmB79DwTbry5K7fH9Ic0pKvXieZlXFWX38no85LuXY8+sdrg3za3yl/XYaEyUi36BQe5Okkd8q0O9MF94iz8o70b7v8neJShhx45e25bnSjzkOb8IFpt7ohf+pVnkyw7RZf+p3+hsuwyKJN2hI5XOPZjSww1wZlEX544OnoRGQODurTz/jUx8SB5JA3fkDsE57KBFP1k6cdn8YB69QzHeKBCFBgo1zr+HQa4E13y6MzBku5iZTxhqEbFM9ueKgrCuURFVnJiHc3fKK0HqNmmpwsY489dt/2GGlXve2Jyxkf7VB/MOsWF7yUh6tDu1AUPHUN7UyOCSaYoMhRvxkGwiVpya89ebSc9qh3IHyVJSte4cMwJRy5U1eu6+fwTxl9Qo6BytTLJ5x+NXDj2d9AJt9AZzLU2+7NtOHRU28s0vc4PN20Ke1RFg9tQnh0w8c9g4e21NvXDQ/14kM/Dbgwia53wwce9NSZLLmfu+FBFjyMQ9Edcfh14iNeekgYJomrlxOuX6dM8Nf2UPS0Xne7ssnv7H7RbmWc8R0WHYv8uW/hMbS663IIR9edxxlnnD7nq1s+wQYeeUuXXN3wCQ86hkdk64aHNqUvcv/k3A0fPMiR+z+4dcNDGX0CE0QOfYa64YOHssE1OOHRjg/Z+9dBz/Cpx3cqXzLVZtvTD8ZVmODPLiovLfWlXM6NAxYkBnk++OCDWzfffHPJrZMNtAjIwPYqu470qZ7llluuI/CdqtNReFpXgydeuTk6lekUjwd+GYQ65WsXH6U1i2bgc5DLHjZe19166637XgmvrwHozwuf/EvTDpj515QbpH/+dtcw8Fq+MhwPcsAG306K3Y6Pes2eudmVIxuZ0tZ2ZdrFwdWNTq44n2Rx3Y7IXU9XHx7aIhxZ2pVNHIOE9IN2wADunMpuiIx4wFP9trJgqLvBII6vMvjRB4ZpWPUUP3oW49gNHzLAFxYw1qbI141uwFBf2gvIyzP44dsNLnioW99agqBNrmHUDR99m/VBaYNzwoPtb22Bh3IwxTfhwfCQty6HNmiPe48OtqN6Peqja3gog59jsKQudTJoxp1JJ520tGGw5clCTjLo28hBlm5IOzLekCnX3ehp6tMechiTo1/dYkKf6Jj6hR3dkjLGQu0xHqafO/VrO/7aAgs2Dw/X3fYxvvpGvcZU5cnULbbuV6SfyJHykamd/PpAOXXKR46MIcmPjzYO1EfkzQHX2WabrWwhAxP8EN6of181DliBZfA/9pCyJ40BlgIDNApDgWxcyEGTPv/88w/Yce1qjQKms4bW+e14RAGdyYaHQahb0j6GNTyUNwjON998xUh5zBr5nNtR0mHDIMHLOf9y2pXpH0eOM888syjz+uuvX5wON6wBrL9C9y9bv3ZzchYM6MEmg2A9X7twMM3N6sbiMMRQR57+ZWGn7QbM6Iq2K08eWLjJ3aDSM3D05yNdGl4xJGTphHv/8rlOvdpz3333tR577LEWTDkdgyUya7u6tQEG3fRD6oENopt4aZ+2aeNgKf0C/8hEPnJ1S+onh/7RX6jbdr3wwgtFV+eaa67yzdQM8p36tZ2McFEv3WTclHV0K0vy63MYO8Or01iQ+zz1wTB6p4+jx5w6eLcjMkc/8aOj4pQP35Qji/ROJL967K10/fXXt2C75ZZbdsr+X/F4B8voqLiB6vwvJu+vpdV2WOhP+kV27eqWyJE/GsLd6qn2IPUbx9gicsCqGzKmnnDCCaXshhtuWGaP6Xw3bYIHXdDfypHJ0a0s5Kar+cOQNnbDR5+SgUx0Bq5kcZ37oI6POuCXvsxYJh4f8eHpvumES2SVn8N17rnntg499NDWeuut15pjjjlK3fKQoZ0cH6tI2dBwIxDle+qpp8pGjquvvnrrvPPOG26+HxUDikvpKLO2ZaCgqBQqg7hBRL52yjWiZCfDtNNOW4zj448/Xhww9ZGr28F0RMk0uvIJZs7nnHNO63/+53/Khow222xo+BG49957yx+UnXbaqWW2HAXz4efeOxzqmHG8pppqqtZiiy3WuuGGG3oHhJHYUs6WjU8tKfnVr35Vzt04PCNRtNGOdXTVmeN11llnlY3YbXCLkt6uYd25ze04NHFjJAKcKorjzMnxL4DjlZmKhDlmzY07RqpA06gGgQaBBoEGgZGIQPdzqCNRmIb1qIUAx8vsU2a7SMfh4nyZIcusmOtmJmrU6rtGmgaBBoEGgQaBURuBZgZs1O6fj0w6s18ojxbNfHG6QnHKrCVI3qQ15waBBoEGgQaBBoEGgYERaBywgfHp2VQzXz/60Y9axx57bN+CRI6W2S7rXLbaaqvWgQce2PXHR3sW0KbhDQINAg0CDQINAjUEGgesBkYT/AABb9fst99+rSeeeKK8/WSxvVmvww47rLXCCiu07r///tZmm23Wsni7WQP2AW5NqEGgQaBBoEGgQWAwCDQO2GBQGkoej+esgTI7lIXrCQ+l6CiRTH5E9sxyvfjii6VNX/3qV8ujR69OX3nlla2dd965vHb8k5/8pLx2622akb3+y2yc18C9EMARzGPR+iPRUQLI0UAIegk3fdbgN+I7jK66h9xTwo6GukcAhiEY0lfLHRoaMQjA19YJyHjqT3TswIipoXe40M1gB1cTFa6NtV5eG4gaB2wgdAaZFgeEgxCjpiPqg8ggWX0k2dx8ZNUOSuP6mWeeKTfmFFNMUfZEOvHEE8sePLYt8Cr4IossUvJl76WRKTi5fv/735cBmCMWo5Z1aCOz7jGNt8HW4BDdTJ+Pae38qNoDT/ePPwrOdDRYf1QyjY71wsxYhOis6/zxGh3bM6rJHJ2kp8bTYD2qyTmqyxM9zTjqmtOVcSDOWKd2NG9BdkKmi3hgh2xOusEGG7TmnHPOMgAnflQ+kz83JONsoHvwwQfLpoMcsCWWWKLsFbPjjjuWdV/aEifow2gXx3aTTTYpcpE1jhcZEv4w5BhT6vD2KhztrUZXbabY0IhB4Itf/GLLxpbzzjtvn8NQHx9GTC1jPpe6s2XDTH/8zMY3NGIQMKaus846ZTPSbCWUWZwRU0NvcMm97Qy/b37zm8WW+roIEp887RBpNmJth0qXcYD3b9e/CGDbGdgAYrZmIPC7rGakZueAkdUMnptz1VVXbd15551lsz7rvcRdffXVZXf/tFMZ8drvPLJIPR51wtQBa0dkHln1jol8/ePVV/DzT03fGYBHZv+NiTh2apM/BR7tmBlGuUdGl3GgU7s+7Hg4wg65593/HLEGxxHTE8bw2Cl/YjOOw7qhwSNg/KwT/RTn3H9MbWevmkeQdfSGIwzwKK/v8xmAR5fBIg6V5qcNv/3tb1svv/xyGfROOeWU8vjvtNNOK4ZbPm1z4zpnoBwO+AYsqg6zNHEcOA8NDRsCPqWij9N/cB3Z/Tdsko6epeio+98fGXqae2T0bM1HJzUc/TFw0Ndg+tFJNObVzEbF+dK6jP1jXktHbouMpbBjR42lwnUsM75K70+NJeuPyDBcA9vMAhoI7GFg/aEUiWKQnTKhP/zhD+Ujzbvuumtr7bXXbm200UatIUOGlHTtZVx8u4uhqSvbyBDYPwr/iFOPGYa60zgy6hxTecIti2+jq/3/qY2pbf8w2pV/v5n9jq5+GHWPaXUYW+CZhcychYZGDALufeOp8UDYW+8NdY8ADNn+4OmaDaW7odjX2NbEOzcOWB2NYQwD3+DgDGSDBopyO9fDw1jNSClGLgbYOXJbZG96+qKLLirrv7Rr3333Le3bfPPNyweC5WVk0q6017UDKdct4RtZlA//OAnw9a8YJc05R13xu617TMofbLQp/Zo4s2DRVenBGXaOXMvP8Q228rpuqFVwCl7OMOYoGIDh55quwhqJcwS/XDdYdkYAfnDKvS8cXQzmSsMarg5h+ZC8DX1wf8MCbgi2wrCFlxlGZ/g56nmDZ4ns4Z/cu9Gz6Bc7GIIdbE1QBMs8sXGtTPBVpnHAgtxwnCmowwAM4HjBWIpPh4yqisyDpyTkRtddd13rS1/6UmvhhRcusoubdNJJy4dGjzvuuNYhhxxSvH5OJ2dI+7Rb+/CJwonvloIVWQwQ4UfprQNRjzj56thSavFpQ7f1jmn5g5F2BZPgAzsHLJF4h8HYIQ0562NpGTTCq2To4R/YwIqO5p6HkXgHnOr6mTA85XOIa6gzAjCEMf1DcM39L146HKXD1YHiZJSLHv+J3gXD3PNggWHwk57xNve4sinf4zCWpwb0C0YwgZcDfohusqOZrY0OipcfKZ+xoUQ0DlhgGL5zQPVvl1JT8iizc6Yo5RvVKDdmnEdOjsX3E044YRGV7JF7mWWWKXEXX3xx6+233y4zYVE0fHLjRimjeN20OWWVeeedd/qKcvTq6+oikwwxgML1+L7CPRioY895zWPH9FcdEvjB3Tnl4FjHUv/iU4+r8+i1MDzg5d8v3YSfs/slj3NgJY+46DX841gE617DbjDthZ2xyBGc6J/xFZ7R5+hueGYMct3o6n/PAsIPwRR2nII4DXEQgm+uo7vBuBfPmcl232fSwX1O32Lj2ScHkr+ui8EY7vUxeKy99tprr14EdES3OYPtSy+91LKJqTVUFNibOzoN8PIIj2rkpqQs5Hv44YfLDNeSSy7Z4nBFZjflZJNNVuS//PLLW7bbWGyxxUq7tE27olh4ubljbLppLz7qUu8rr7zSGnvssYtsBl/1OPCG8wsvvFBeDnBDaIP6lFe21wkWGTidYfncc8/17aVGN4NnMFXGlw/eeuutgqXBJGnRD7g2+L732Ms9/uyzz7befPPNcp8bdOkfpwxuSB4vs8CUDnvUoz+E9UFD7RGAl/vbfZ2lDvCCHYzfeOON1vPPP19wHG+88QqTvNUXXdUHva6r2m9PRzbJGEAfhTmwtkqgh/CElfinn366YGzcFW8sNr72OrE5jmDiDMPf/e53RRdh5P6nnzA3ljrbv1IeExb0MmODNAfgGxpOBP7+978XDjfeeGP11a9+1chbjiWWWKK69dZbS9q//vWvSr6//e1vw1nbiC3+73//u3r33XcLU/L96U9/qm666abqtddeK3H/+Mc/qn/+859F9rTzkUceqR5//PHqL3/5S/XKK69U77zzTvXqq6+W/E8//XT15JNPDrOQeKEbbrihmn322QteZEjd6ttkk02qSSaZpPrYxz5WjT/++NU3v/nN6q677irlkm+YBRhDCgaHt99+u+A18cQTF5387Gc/Wy211FLV6aefXrCll+jII4+sFlpooerjH/94yTfNNNNUp512Wh8adKChDxA488wzK1jSQff7SiutVO4bOdxD6L777qvmmWeeaqyxxqo+9alPVV/60peq888//wMmTagjAmeffXb1yU9+stpmm22qv/71r0VXjTfPPfdcteaaa1bjjTdewX3ssceufvCDH/TxkTc63RfZw4E///nP1ayzzlr0L3bJeZlllunT09/97nfVGmusUX3+85+vPv3pTxe9Nkb89re/7WHk/rPpxlO2Mrp122239d3b8GSPrrjiilKIDaOHhx56aDXLLLOU+99YMcUUUxS7JlP4NA7Yf+I8zFdDhgwpjsCUU05ZHXbYYdV2221XnIPNNtus4pSEAnyuP+ozpaIsof6GVnpIWv36hBNOqFZfffVq5ZVXrjibBx98cDX33HNX3/jGN6rf/OY3fU5Tyg/2TLk5VRwwzldd8c8555wy8FL4H/3oR9Wiiy5arjMIj2oO7mDbPKLz0TMDAUfLwLrIIotU+++/f7XOOusUvPSTAVafcqbhaSD5/ve/X22xxRbVF77wheKoxRHHT1790VBVnKnJJ5+82n333atNN920+sxnPlMwfPHFF/vg2WCDDQqm22+/fbXxxhtXn/vc54q+vvHGGyVP/V7qK9QECgLGE/p4+OGHl+vXX3+9nOmzeH8Q9tprr2IEJ5100uqBBx4o6TDNGDaqjbVFwA/558033yxYsUNHHXVUdcABB5RxmoObP96nnnpqwXTmmWeu9thjj2rOOecs1/KiBseq6FT0Cibf+c53Ckbrrrtutdtuu5U/Yssuu2yfLb3jjjuqcccdt+TZaaedqtVWW604Yv6o5c8xPo0DVlRs+H4Y/eWXX74MsLfffnsxUjrLYPGJT3yiOvDAA//LkRi+Gj+60jEaDPFxxx1XGfyeeuqpas8996wYmrfeeqs66KCD+gbOTpIqnxs7ht0sGj4Ud6aZZioOWJzD1AtnTp+8ylHm448/vuQ32IRnp3p7JR5e999/f8VJMPjmpnc+66yzqnHGGacMxPLtu+++1WSTTVZdddVVRU/pMwd6hhlmqK699tqCKVzh3Wv4wkK7EZ117Y8GI8XZggdMjzjiiDJjY9ZQnFkFTsItt9xSruH86KOPVlNPPXV16KdxVQAAIABJREFU9dVX/8efil7RyXbthEt0ikPgYNCmm266YtT8yZKewyytPwlmwsWZbVx88cWr9dZbrzLbk77Ct5dIu+tthg19vfPOO8tTGTPhSJwj44EwTI3d/rDh8cc//rHaZ599qq997WvlKUcv4diprfCMbpnFnnbaaftmCMU//PDDZUwwbsJw2223LbNfd999d9+4yTdw/z/44IN9Oj/qLUgaDR82v/baa+XNwdlmm601zzzzlGfDnvcuv/zypTVnnnlmeX5sIZ5nx6MzebaNtMPzbp9emX766VuTTz552TV/3HHHbc0wwwxlAb1n5p1IeUfyWNBox/1f/OIXrZNOOqn185//vKw/8Mwcpd5f//rXrd133701ySSTlPqtC/GZIrLce++9ffw61dsr8dYXWKe3/fbbt7bZZpuy3giG/nStvPLKrYkmmqissbHGA27W+zmkW88w88wzt+aYY47W//3f/5X1C+mvXsEv7YSFexnBz7XPN1166aVF5y0Sl+7TQ9J9MBpWF154YdFRbxIj/THLLLOU8eHkk08uOEf3S4Ye/YELnYOFNTS2wDnggAOKzlqDCFvpMH399ddbjz76aGvTTTct446y1tjSWy8GGRvEBe9egjQ4GQdhCQfr566//vrWTDPN1BpnnHHK+i9rvsTDE1lL99BDD7V22GGHgqWy1n9tu+22Ze3i448/3kswdmwrvGBDB+0EsMACCxQ7Jw72s846a+uuu+4q4yaM2bLVV1+9jAvRX58pYhvrG5qP3t5AR7g+3AQLRjlXjBbFt7t4OmbKKacsiyA5GDpRZ4zO5ObVBoeNWDlADI/2u/kRhRTOTd6uvUnDB2Yct6985StlwFhppZX6PpOBj0MdFuUyeJw+b0gyhhwIdYt75JFHBqyznRxjahy8pplmmtZOO+1UBmDthLW+OeaYY8pi26997WslziJyTnT6Tz5hb8LefffdfRDFuPVF9ECAfsHDQd/omkXf9A0xUMcee2xrs802Kx+o//a3v13+gFl4Dz+DMdyix/44/PKXv+wzkD0A4YBNhCd8jJcW1XO+zjjjjDIWWORMXzNWWERubPVnj34j+PperbEI5smLb6+RtjuibzC45JJLyrjISZ1rrrnKn6oVVlihvGxFp5966qnyR40jqw+UF+9lEQ6wl0waem/shA09MybapunEE09srbvuui33/FZbbdV68skni14aJyy6Z89CsWETTzxxy1dmMtY2DlgQGo6zgQIZcIGvoyi/2RtvmnAW5Anow1HVR17UwOcGNTD6mPP8889frqebbrrWVFNNVRSQM8UZHYiCBT4IZsp701KcAcDZIc1gwNHl8ElzwDiv+4r3ZqS8Db3nBDNOwdYZRvZ48293kUUWaRmIDdb00x+F4C1OGOYwRQZnfdZr+ObNJlhqu/sbjg5vOHFwd9lllzKL4GPReWvXm2fKyhcnDK4whbc/ZO6jXqeMl8YVTqzZGkYNNvkTK0z34A1TfwLpp3jlxaG8aSqc8aXX8KVjDtjAlCPALv3kJz8phv+CCy4of77orXz+YNBrfyqc4SaeztJVT3fw6nWCCXr11VeLvpkF22OPPYqTtfjii7euuOKKMq7CipPmbVN/DBBc6Su9NR6YdYQ7GnlfUC7se+MHwMiAgaLEAM9AII/rdGTJOBr+UCCPWQx8q622Wst2FZTL41Y3uzZ67CJMGTu1N5iBQD444a08osQhA0nS6jzDW/2w9++4ofcQgBPMEPxgBOPDDz+8zCDsvPPOZdA10CZNXnn0jfIGCTzihMC7jv97NY3Zv/QKHjBCroODf7MHHXRQweSoo44qj82//OUvt7bccssyU5uZ8Og0PvBl2DJWjNnoDa51xhP4Pfjgg63tttuujC/Bx5+sjBXOdJleGn/gCs8YM2XST9J7iaKX9TFR+Nprry1YmTVEHpWdcMIJLU8Z/Amgo8YAB8yCtckDWIvrtXu+nd7Ayn2L6BuH9ZprrinLCmBv+dGqq67auuqqq1orrrhiGTeVgSE9dabLiI5mbG6mCwokw/dj+paymy0wIFBYimtgcfhXrPN0RAaW4avxoyutbdriRnVYZ+SsXWa+MmCKd1N3ogwU+CkfhRQPQ/woLR5R4Bg0/y6i2Jl9dFOYxcGvofec2uDnbC0Xxxiet99+e2vZZZftw5CDZY8waQYHGOoD/cLJgL94172GLz2kk3W9hAE9d7ZOzvovjyH9Iz7vvPOK+s0555xlxkaeOm4GZbO8zZ+F9+5SOmfvQdgZVywj8IjcXoPGhPvuu69lzRx99Jgc7nVHAb4ZU8041K+Fe4kybsKUzsElTxUyTsLj61//etE/WMMcTvX0hC33gClevU7W0BkD2Bh4mPWypjO6t8QSS7TMgFtPZ7zloFnaIa9r46d7np3iDBtTUYPsCNAsRooRu+OOO8oAYZDwmIECexRh4PDIrAA+miszJaRUFKpOuUkNjqF6OHH9zzFuiafQeBsYhA0mBhYKa+E4J89aEdfw9U/NbJvN7urrmMKvV88GVRgxYkcffXSZrTQonHvuueXRMUzThwZpa0HkF69PhK3/sHA0Bg/PXjNqsEibDaR0cu+99y4OgzTYGFQNrgZgfw7kn2+++crjChjTU5uEIg6YgVu/KN/rBAfYWFMD3yOOOKIc559/frn3b7755rLA3ow4jGFrDQ1c4U5P3fvG4KmnnrrEG4v0Uy/hq82wydgMS84Ax9aLCxkn3d/GS5ibOJh99tnLPW/ygN2SLi89ZsM8Em7oPQToGjtveQ2c6Z+zSRYknT7D0VrPIUOGlHS6KC+C69xzz92nm40DVmAZvh8zXBY0W4PAOTBQiKP4FNoCSB0l7MZoqDMCBlZOl39hlJ0jRrEpMeX2D8QbaBQ6Dp7d22HOkYhT0bmG3kiBGbrttttaRx55ZGv99dcvj3k4sQZqWCI6CVNv7VhQnni6bFHzggsuWPIpA1t63EsUfaJ/sKKbFtF748k1YugZtRtvvLEMvK45FNZ6WDhOh40HjJ6dxr/zne8UHDMo9xKe/dsKV+tIYWcmjNPw2GOPFV3lCHiD99RTTy0zCpwsa02vvvrqosPSkbcfzULmxQj9Ej3uX9+YfE1X44TBlQPlpQbrkxAdhAuM5fOHDMFNHmkZN2655Zayftkf3uh5ydyjP/ByGD/9KX3ggQeKfRIHV3+yPEXg0MKQLbJYXxw7FafWrCNd1T+oWQM2AhSK4lqIu9tuu5UtESwipfxeN1166aXLmhCDMuOlwxrqjAAHlQIbTDL7JbdrOK+11lqtLbbYogzSHqMxhrfeemv5LNKMM87Yc/98OyEJOwMAvYSb16YZLjjSRenWg3gsueaaa5Y3z2xPsc4665R/cL/61a9KORjLq08MxL3mgMHXPQs3bTeYMmqwsubDywzwvOyyy1ow+9nPflauvYHqU10eVcDUgGuLBQPxQgstVP6I5Q9Epz7shXj3uz9ak0466X/cu4waXOHuRSazCsLWLllQTreNrc6cYY+ALXvQV8oh+qpMr1DuzdyvtkSyZQ875M+AJwQmCGz1w7E1YwhX+vnDH/6wOBWc4XvuuaeMFV6K8OgtfHsFx3btpEt0y3nHHXcss1v0b7nlliuTAdba2WLCPU//jKneQDVO2I5Cn1x55ZUtSxOyFITeY9rQcCJgkzZkM7ZVVlmlfMrBp18233zzKhvg+YyGTe/qm+UNZ7VjZPFsIHjllVeWzW1trgg3ZFNWx7HHHls2X/TZDBs22mnYTtk2xMvGrWMkOF02yq7WPtVil3sbAk8wwQRls1BxsLPpbcjnp3y9YcIJJyyHrxv4lA6y2SW9zUaEKdMLZ/pYb3vudTuvr7DCCmVDW5jZePGee+4pkORzWj6bY5f8iSaaqPSBscFGjaHwynUvnusYRL9sBGqzWpsI+6oIyuedbCAqzieefFnAp14uvvjiPujCL7z6EnogkM1VNbXe/qOPPrpsquz+n2OOOapTTjmlbCj87rvvls1X2SabCy+88MLlk0Xzzz9/tffee1c2trbxcJ1vD8A4YBPpJvI5vvXXX7+Mrz4x5KsXzzzzTF9Z+F922WVlB3z3/1RTTVU2C7ZpeZ0+5qKdx9fEDRsCHit4VRVlsR3vF8xmIvLvbNi4904p/4ztq+KtMv/SMluQf7UeUVrkaGbGWgaPIMXlsUTvINW+pWZcvLZvatw/LdfW0fhHa1bAugVYefwA0+BrrzXhPDbLzIN/wb2ou+5bB32Ei3MwcT9bO2d9p4X1sIZtsIyu+sgx7OQRZ4ygs0lv34O9ERvzQz+F3c/IEwRbIJgJo7NltuD9N9CEYZiXcTzuQfBE+kB6ypTIMfxH2+v4wVOc+9ZhBkwcsj5J3tzPGV/haQx173s8KY+jl2YRB1KT4BmM5GWD6FpmcOksfDNesP0Zhy1LQMYJGKPGASswDP8PoA3IUWzKTvF1GkV3SBOfQWb4ax3zOMAIljFiwdUgAV+UgSMYiwvuFL/B9z29oHsGz+CUczCtY524/mViyIJveLxXQ2/81tscHJxR0uhkBmhnRxyAOs7yI3GNYftg25P6+AifdnoLU/lg6B6PzrrnUT1O3l7CN+Ne9LMA8v5P4pwdsDGWOuePVfIEt3ZpdZ69FqZzucfpWR2fYJ+xADbi6B9cEZyF5REfnBsHrNc0qWlvg0CDQINAg0CDQIPAR45Ab73S9JHD3QjQINAg0CDQINAg0CDQINDsA9boQINAg0CDQINAg0CDQIPAh45AMwP2oUPeVNgg0CDQINAg0CDQINDrCDQOWK9rQNP+BoEGgQaBBoEGgQaBDx2BxgH70CFvKmwQGDoC3pZB9XPe9hIvnLShc/sgR97KESOMjzdy8HJOet7Y+aDke/nr16nf22ionUz4OLy67Y3KkDhvtqozn+lxjepyJL84B1JWWP2RoR4n7AjVw2TMdf82J3/q0K7wz+dGIkM9bz2cdPm1J9jU8wxP2CvsyDYN2gJXdajXdcL1OoJrPnCfNgUHeYUd0hKfuDqvhNPOep+KU3/Ky1uPI1+oLoP8/cslPfmd67JFd8TX6+ufv34dHsEj+PXPE35kaqhBYGQi0LwFOTLRbXg3CHSJACNp7yPEUNiOg5Edkfubxbh5Nbo/SfO6dV65ZkDly6vXjFa2V8gWFXgoF37K1I1lthSp18XIqSPkWjn1IOUddZImnyN1JS+5Iqf0ujyph0HNVibhXecDb2XlER8eeEcujpU9vDqRNsBFfnzUjWdk6FSum/jIEP1QVlid5E6/kAXVX3t3HXmkk0sZcZw7egYnceQPBoXRUH7gpK5ObU29dRmUcdAR5dSNh0N+MqavlEuasDTXzmkLDFJ/0pVPHybNuS6PdPnIAUtheu7bnT7H01CDwMhAoHHARgaqDc8GgWFEIEbDB4c5YwyMT4bYGJFRYBhRwjEog61OOaRcjJA44RjixDNQqY+BIotvGTpPO+20fUZP+TgoeCtXp8gqPnXFcKqLwYuzknKpN9fOMZg54+VA6icjfr63ZtNT3w6UN/nrvNJG52BeT6/LLB3PGHebLvo8TjtKfZygZ555pmwkrA7H8BLnBB/YcZaEfb/TR8CF0wdk56T5PqVvetooNpuVSks7hB34IRvG+myNj1svuuii5TMqcbb7yx5MlVd32l3vN/FIHuQ6ecUlr7L0nR7YeJkuiKtTeIm3WbDNrrXbhpaRIfnlCe/E1c/SHSknrzAcbKzp4/Xk8QkZn+IaiFedbxNuEOgWgf/+C9wthyZ/g0CDwAhDgBGwa/WSSy7Z8i03H371oWLECHEGHDFI3VYcY4IHI4SPOhPvmjFKPeEvnUHfaqutWhdffHExgCnjjBenI7MHkTf8cx3jL696lDXrwFHwHcU777yzxHOmHJwOPOV3HaOJn7L4x/Fw9lFxH7vef//9y2M66WRLe/FLWBqKAyJf6hRG8jD2yyyzTPl2pu9n+qZmJ1KOXBdddFHrpz/9aZm9TD2dygw2nmOijZwrX3445ZRTyncl6Yt47UIclO222644XXPNNVf5/pzvJ2onHslHTnHkc/ggM0fTd+x22mmn1hFHHNFRNO1M/6W8OLzF10k96Stp8qSMa/KvssoqraWWWqo4geKSjo/r6AEd3Geffco3+O67776iF/Liqe+CvzKOyCRNHtfykyd6E8dWXSeffHLRRXjtt99+9WY04QaBEY5A8zHuEQ5pw7BBYPgQmHDCCQuDzTffvMw0feUrXykGiKPCcIQ4JuK6oRiizDjFQDFGMXwxmAxWSJpZuDXWWKN8YstjGWWR/NIzWxIjl7LkxD+yOzP84pL33nvvbe21116tgw46qDidMYryMJh1UsaRevHK2iif+9hhhx1ac8wxR8EmefFBdbzIjPCRz3XyiXetbv3hA7zqOP7448uMUinY5gdm+HGaOUn55EibrF1HZdbLjNbDDz/cOvHEE8sjQ3I69C0srrnmmuKczTfffOVj4UOGDGmdfvrprQ022KDok4rlDf7Kknm11VYr/esR68wzz1ycR+3Bsz/Jj+AmD17iEi8NX+nKc6DpHHIN18jrU0MccI4uzOo8kj8y6D9rBn3eBbb1/oxjpQwe6YuUFU+eum5Jq9fn4+k+qgzj2WefveSNXivfUIPAiESgccBGJJoNrwaB4USA0YiB+N73vldmwRgNRsJ6lNdff73UMNFEE/WtFeumyhgcvDxu4Uh5nKbeGEuG0SJvRtGaoHyLT/qGG25YDCt5YrjJK+zRlfz4MaTy48vwSjfTgSdjzalh6NUlXbxjyimnLM0hp0O6cmY+yKqc+Bj3OBExxIzyZptt1mfs0yZyvPTSS4V3vi/oAh8kHwMOE3Xh4zuZiHxmlJwvvPDCPmevJPb7IY/HtJdeemnr1FNPLTzDu1/Wri/JxJHxiMzsGkcEJvBA+kRfeIz4gx/8oDiN0n3jb6211iqzghzIV155pcyiKaPNOU8zzTTl+n//939Lupmw8C6Zaj/6Sr/AKN+1VA+9USdnHW9thzEnBq7KCNNfZ+1Rx/jjj1/S5RcHR/F4cDzznUKPlrMGTxoM6Jr8SNvE0UFy4Ecmzl1kFaef3UspR0Z8Oe4vv/xy69BDDy0zr0mvNb0JNgiMOATqX+Zuwg0CDQIfPQJ/+ctfqqmmmqq64447qnfffbcIdP/991czzzxz9fGPf9y0UzXllFNWV1xxRfWvf/2r+tvf/lbtt99+1dxzz109+OCDJf+///3v6ve//30133zzVaeddlrlGr3wwgvVWmutVX3605+uPvWpT1Wf+cxnqtNPP72k/eEPf6j++c9/Vttss001/vjjV2ONNVb12c9+tpptttmqhx9+uOTZaKONqhNOOKGEybfYYotVt912W7Xqqqv2ybbkkktWr732WuFVMlZVtcUWWxS5P/GJTxS+X/7yl6uf//zn1d///vcis7Zp1wwzzFDtuOOOKVbCykgbd9xxq4MOOqi0RbuRtgcDbYTXggsuWB1//PElTZ7LL7+8mnfeeYt8n/zkJ6svfvGL1dlnn13Kv/XWWyV9jTXWqE455ZSCibomnnji6mc/+1n1pz/96T/aMddcc1UXXnhhKdvpZ5dddil1vfzyy33998477/TJk3J//etfSxAGDgT/gejRRx+txhlnnOrMM8+s1ENPXnzxxYKBcsKTTjpp9fTTT1f/+Mc/+lgdeOCBBb/nn3++2meffapFF120WmaZZarll1++WnbZZat11123qstz5JFHFn3685//XNELtNtuuxXcjjrqqGqiiSYqfbLiiiuWtHPOOaeaYIIJKvjSqZtuuqnEv/TSS6VN5513Xl8Z+Kozug0bOkYf6Q1KGjzoFr7KrbTSSkVWOnHPPfeUvPT10ksvLbpBb90jk08+eeWegRE86PK0005b3XXXXdWbb75ZHXHEEUWGFVZYoWCw1FJLVfvuu2+lvYhe7b///tUFF1xQrpufBoGRgYB/CA01CDQIjCIIMMR//OMfi2G98847i1Svv/56NccccxSna7PNNqu23377aqaZZqq+8IUvVEOGDCmGdtNNNy2G79Zbby0OCmP6wAMPVJ/73Oeq3Xffvc+4MlYM2TzzzFOcohlnnLGabrrpqmeffbbUxVmTLp5RXmihhQrf733veyV9kUUWKYbYxVVXXVXyTjPNNEWeHXbYoeJ8MXY//vGPi+HlFDHm4hZffPFq2223LQZVHY7HHnusuuyyy0p7XXN8Ntxww1IXB438SyyxRDGk6pbnoosuKun9fxjrZ555pppwwglL/dJvueWWwoPBXmWVVarvfve71dRTT10cvSeeeKKw4Kzhy0Az9tttt12RRxmyxXnFXz+ce+65/avuu+YMfutb3yr4caSVrTtVDDzDfvjhh/eVkU85ziCsOhFHhVPF2UCHHHJIcSY5XSFOx2STTVZ0CE8H0sbPf/7zxVnm3MTBIV8cNQ59nDB1wIOzEuKkcoI5fRyh1VdfvTjynDhOztprr12tvPLKpa/jmClLR+HL6d51112rTTbZpDj2HMDnnnuuyDLnnHMWJysOWzCnLxyzNddcs0/v9S9+Dz30UAW75ZZbrjh/HGt9zKmSrq843vSObOK22mqr0hztd6/V2y+B45g/G0cffXRxVtP+5twgMKIRaBywEY1ow69BYDgQYDAZBk6RmSV09913FyN0zDHHlGtG/Lrrrqs4RTfccEMx8DEw8sbwPv7448VJ23PPPYuhYag5H5wssxrqefLJJ4vTxJli4Dlc66+/fnHIOA4MsJkgBpex41zssccepc5rrrmmGDWzF0899VSJY8DXWWed4oBwKMxoMIiZ1ZLuOOyww0rZ888/v7Tp2GOPLUb51FNPLXJccsklZaZnr732KrMSZiTeeOONYsA5ZDGgZNTeGOzMAHEAkbZwJjliysjH2VxggQWq1VZbreBw8sknl1kTzg9MHHBlsDkXrhFHZdZZZy2zTyWizQ+HguP205/+tKSSLw6O2TSyciA5FAw83uLM5pApzlUb1oUP+ZWhA/rBTI9ZrbSf3GYRI3OcP33OkTnrrLP60tSbdGEze2QwW8lpOfjgg0ud5MeP88ohPvHEE0v9yiy99NLFadZv8HWYbaMT+hl/usPhJ6c4dMYZZxScNt988+IscsDMtr766qt9uOEpjsOK6N+9995bZoLjgNEL+kWvOZBkpXdbb711Nd5441U33nhj9fbbb5d6tWv++ecvbSGXI32TazOjnEeOn7b5g9BQg8DIQqBZAzbinuY2nBoEhhsBa1GypirMrIuyFmXPPfds3XDDDa2vf/3rrY033ri1xBJLlCzyWwMlj3VADutc8vagTPYSsxjb2pi11167rGeyLsqi9csvv7yUt67noYceah155JEt64HIYi3P1ltv3dpoo43KuijrbtRjnY50a768sWlrBnK4nnHGGQtPeSxmth5KmnU31mE9+eSTRRZyWeNljQ+5nK3Dsfbn/PPPL3VMMskkLQv0rRfSBlsPnHPOOaWcurRTfrLgpc3aJYweeOCBshZq4YUXLvHStW2FFVZo7bvvvuWNwaw1gqd1Xsmjnd4o1GbkWn1Zb1Yi+/14M08b1ltvvZK3vocbLGCy0kortciz/vrrl7VP6vV2qfVZs8wySz+OH1yqX9ucyWlNmGtELnLqe2na7+w6JI8jbcRH2xE+K664Yuk766joxXTTTVdw1XdIWWuk1l133YIBnGz1YeuI7373uyWv+ixi12714OuFAWvW6DEe+mr55ZdvTTHFFK0zzzyz5Y3DyCkNX9dnn312CcuLtNdbqN/+9rfL9hvaqy+01dvCyy23XFkrRpfkg+W3vvWtkk4OLxb88pe/LPVru/LitY+sZLNWzssLt956a2v33XfvWwdYBGh+GgRGMAKNAzaCAW3YNQgMDwIMQ0iYMbJ4+Pbbby9vttmm4Y477mgdfvjhLVsM7LzzzmUrAoaUIeLExMjFQEljYDhAwowbvuHPiHEMOGDSpp9++mKklI+jxfgxqojBsvCZsRQnjTOkrDj1I9fqu+yyy1oHH3xwWZzOOFpwrQz+8pMjZWJ8X3vttdKeY489tvCOMceTY6CdkUG7xePDUUu9ZMjC/jgR+GgTx85ZPYwwOeAQhyl4WrAfPPFNu0qgzc9tt93W8vIE/sqpTzl1aS++2oivbR5smWHLB4u+ve0qvRNpp3Sy4mWfuLQ3snHybFOhvdLkQ+qHD10il7Ay2u5MTnw5Uw5hB8In1/jFaRGvLfiRLWl0QRhfaeSEhzzqIZv2k9WLG2STpo7IopxF8uLkTf3az8F3xhcvdbkWplt4wQBfsmprZIsM2iV/+kcYqd9Cfw6lsto3kMNdCjU/DQLDiMAHf4+GkUFTrEGgQWDEIcABYCwYIE4KYlzMNDDS99xzT+uxxx4rb7ndfPPNZaaFIfLml3yZEYjBwgdPRojzwwkTJ1/Otkzw5h6Dqk6be8ZgiWO0vP2HGKUYJIYW5W0zYQZMfgejxllcddVVi1P3xBNPlJkFswvbbLNNKYtfjL+yjLJ2qB+ZBeF0cmzw4ojaZsEskzzyJr/24OeMYOBtu0cffbTkiSHWpueff77k81ZljD550yZxSJwDL7zFO3eiX//616111lmn5FEOVuRUp3D6iCxmM22QajbT3mrpk068I7/2kSP9gL+6EOeUfDZVJXNw9Gaf/NlaAY84u8mjz9QRGdWR9jojfcXxdUZ4coZTTlltReoQT+/MqtV5eBuSg6X9MI88ZCePsw2IxXuDUVzqsMEtUi5yRB+SL/EwSDvFkUEeB1mRsHjp7o86rgmXjM1Pg8AIRqBxwEYwoA27BoHhQYBR4TAxchwrBuCuu+4qO5NzvhBj4bGgmYEYWo8AGS2v+jNUjAkHTVwMopkDRu/uu+8ufBgmRtds2t57713KeSzE2Ykhk5HxNKuTbSZiSBk3xACLYyyRstLUS3YyeOzE/p0gAAAHlElEQVSmbQylej2WlF8+MiDXeDGMHgUpZ2NVvPHkZHDIOHSuQ/ilTm3HAy/lGPhrr722xOEXmR988MHijHjUJg4PZUPykiN1y+NaPanLDAtSNg4QA+5Rl7wO8Y5gk3ycUXtzHXfccWX/M+VsAlqXIbLUz3F2Ujc59bW6EIeSLsAdrsEWjh4xIjolv3Mdxzgb9Tj5YYC0QVthIaxuh35OOFg4i5OXI6XftN3+XchjaI6Vx5KcfnXQjxD58ojdnwMyabOZLfcB3pFLXg5dsCObQzxsyJA+wz/tS3lx8iIOe+JzLgnNT4PASEDggxFnJDBvWDYINAh0hwCDyUBwwhDj4fEN4+JRldmVOGUer+2yyy7FEVt66aVbl1xySdm92wyBWTLrkZRzMFjWT1n/Ze3RAgss0Jp33nnLjJK8J510UjHe0tVjpmnBBRcseyLddNNNJWztFAeAESQnnmRlbBm8yMtwiZdnscUWK2t97C2VWRAO0XXXXVeMIyeTfIyv8y9+8Yuy7xhn4fvf/35ZH6QdnJqnnnqqPIa1PxUMYIOEY5Cd0171cxw9TrIWyNohM4l2sjfLZ60bJzYkf4x1wpwGbVGHNkpPHkZbnPaql1OZvabwVC5YCNuPimMNC7N41vTpWxgcc8wx5XEy3mbE2pE6OCvy1NvIMcGfzsBx5ZVXLmvK1KEPOSxm5uycr/3dkPY58Fev9uSMD5mkheTl9JAPdsLw32STTco6QmvfyHvCCScU2Tj/yUuP0i78fAqIbvpz8Jvf/KY8GqSX1iniq73qDy7K6Dc8HGaFkTC55Cd/Qw0CowoCjQM2qvREI0eDwPvGgkFjvBgOZ2uyGFAL4TlH4i0U9uiQI8Ug+lSODTh//OMft3bdddeyA7rZlUMOOaSkcxYcjBlHyiOvq666qixUtqP6IossUuri9Jg14pD5nI9NWDkue+yxR3FCOBiMOF5mPiy4dh2nQCdyAjwK0w5yXn/99a0tt9yyPHY0w2A2jBH1nT2L8pXVDrvsk4mR1B7G2boon54xc6IuC6PhwKDGwMtPHnxsMMtZ89hL/Rw5jukFF1xQdo73KM66qzPOOKO8zKAMp8isEVwR3nhOPvnkZTE6h5PBV4d49cojv/LCnCvOAkePk5rZnMiFr8er0jjC3/jGN4oDTEZ5OVZk5GB0Io4GfsqoV9/oK/JLS51mR4X1sQ1Z4WG9GWdMW8xCDpbUlfpgirRBW2ABt8xM4Usn/DHwrVAOlWuzmXT4hz/8YcvXHeiLPjzggAMKPzKZCcMnbYSpfD5PddhhhxX5OVD+IPhEEN3AG+7ksvYrbZNPedjgqe+0wQsl5G6oQWBUQaD5GPeo0hONHA0C7894MWwejXlENffcc/cZf8aEI8K4yuNxE0PDIDLCyI7hHjNyHhgbj3nkZcwQA8cYcUSUY/g9dmQsM5PEyHskJl1YWU4Ho8+4Ks/wMnQ+WkwOC5fJRzaPQZWVJwZVOTM95CQX4+kaX2vI1IM8bnJNLmUZTwvllVN/HhGpCw95YKCNDuTxFkfR7BYZyWRmRJvVgwfnKWXJSmY4RA48vQGpHIc1vDmEHFNOpPKwSBosOEUcAnIHs8iJtzYkf2TLLu1kIHPSS2P6/ZBLnUg/czo84iOnOuGibfKp67nnnut7zFevux/bjpfhQ3b10RO6pe0OceqlI5l9wsxsJR1G6kXRgeRXPk6vR4jSOe70UD1IWHmzp9rKkaM3Znlnm222Uj5vquq/tBEO+psjKKzO6Jv+b6hBYFRAoHHARoVeaGRoEHgfAQaEYfYavVf3GRmODEPEiCAG2MHAM2IMfIyMeEbTIV05Bp1xjHOR8uLUh6/8eCVN3jgI8siLl3McBPF1eYSl4YPicMgnHm9pwg51hiJryia/+urOkniEJ37hIywOz9SbcGZi8MYPXtIiP34pH+dF3vCX79lnny112b7Co0Pr0OSBHZ4osnEU8mhT2dQjXVg5MuIPY86l9qs714Vhv5/UI5/8eEQG7cHP2aEuvPRZ4pyViZz92He8jMzKOdIn4lMnvmRSh3i4JC1Yug6+eLhWTpmQuOSPnPilXvlcJy7tCw7S8YuM4l0rH7ycG2oQGBUQaB6Ijwq90MjQIPA+AgwFw8lIWAs000wzlfVCmUWJIYpRMbsTQ6ZMDDMDZRYJSXft7MA/xIAxUvjGmcDH+hm8zQ5Jk48jI8zZc3YwqCnvOvWrRzh5Ur/80iKXPK7VnbLqF8eIKo/EKesarzofcTG0cFFWfmF5yY5cJyy/PDlSTn5H8stnBs7Ml9kXjxnljRzSyeJArjlfHo3V2x/ZnfVl8uftPXLgmT4rzPr9yKMcXOClrpA49aVvxKfPlCNz/zIpO5izssEIPxg7ggUeZHPQm+CTdimfPiVj8td5aEPwTF1mrVDaLD/8tA1v+cXhj+rX8CCPNPLg2VCDwKiEQDMDNir1RiNLg8D7jxF9cNlWCda2WPcy55xzNth8RAh4PGY9ncd5nAtrmuaff/6PSJqm2gaBBoExBYHGARtTerJpxxiBgH/6/tmbhck/fOH8wx8jGjkaNcKsX2adzLqYvTED01CDQINAg8DwIvD/GfSxOjaLgJEAAAAASUVORK5CYII="></p>
<p><em>K</em><sub>m</sub> labelled on <em>x</em>-axis as the [succinate ion] at ½<em>V</em><sub>max</sub></p>
<p><em><strong>OR</strong></em></p>
<p>horizontal line at ½<em>V</em><sub>max</sub> <em><strong>AND</strong> </em>vertical line down to <em>x</em>-axis</p>
<p>«<em>K</em><sub>m</sub> =» 6.5 x 10<sup>–3</sup> «mol dm<sup>–3</sup>»</p>
<p>Annotation of graph required for M1.</p>
<p>Accept any specific value in the range 6.0 x 10<sup>–3</sup> to 7.5 x 10<sup>–3</sup> «mol dm<sup>–3</sup>».</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>similar shape/size/structure «as succinate ion/substrate»</p>
<p>competes for the active site «with the succinate ion/substrate»</p>
<p><em>Accept “competitive inhibitor” for M2.</em></p>
<p><em>Award <strong>[1 max]</strong> if non-competitive inhibition is correctly described.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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Oiv+yzty3W21L7bnyE20l/7vGRHfIrN0ac+dgQfx/q1FJ3K2D/q2/LWx/hja3CMDXW/7Ovfkv61vUv8LW99TLaJOv6Sk63ut7Svf4g/WTioj9y0K9XHf/ptfOn1rfl6+9HtZBmZM3Lw080G+/XW06dfj/A54dOdPrGn179XRwZS4mVXZPR8is362K/LJfm9Nvw28eNHbOj1HdXhscVW9jieoeSBeEaeMjjMyIpu9pCb454M8m1Z9MAifvT69+rwhPCSF39Sv68kAw877LO5lruPv24/KhdPEtCJltNKyej7TaeccsruVa96VXn2yTNIN7/5zY8kPB4LJleaPNjty+L4b3SjG5Un7k1wAHUv1INwsySQScJDApIkiE/kzRC+6LeP+Jwk6cnS30Z3aFYvvugjC60ZTNGXMrzK8LM/stMvZfrnOCV/8WuXG/aDTfq0ZS0rffE5STlmR41Ryw8zW7DWH/+Ian11n+jQjj8y6z779sNDVuxesmUkjy/Bn6y1MuKb0sYeGAZHcvdRi8O+/r32+M9udtA/othctwdHdWQs8dd87X7swG8/ctfiSR77xCIUe8nLftpSpo0++zP6IqMeS+QcQuyjHwXHJVkjf5KPZMGSDOWof89WfZPT2mPHSE6NW+LHhxmdtR1k4LdwqWXXfZb2YcBm/GQdQvEVDmQFzxlZ/OeHjU1k2MjrYaMP0r/WP6NT39gbXXywT+5a0peN9XYolkfl4qkGCghx3snSbTpbKIurXHIVSA+AX+Ma1zgSfAsnlxUB61moXgJE3qgkN4mhTMKM+rf1EoMNSiQp4lfb13GbqPrzNUnhODYtyYqvyvAcYnvkwBk5npFDdwYHvuyr71H0tW1iWOOofSRDGz01zhZMrmyq04bsk7Ekp3T8jN/2+TDyf2Q7Pm30sQH/oTiSkcUjux3PEN+zeLRfx6QnJ3brF32xPxg7Zke2nhxtZGXjA74ZwisPyJILsaMnR98exQ5l+OJXr/+ojnw2kBMc1EXmiK+uj/344FHb1stJJ1ekX9qVMzrx05eND7niNSOHXjLW4qjviDK3BEcxhsdaCo74g0u935ODJ321t8c1Dx97FHv5xl5j2/4MjuTGVnFAtV09vb06mNHPjmA9awu7+Rp/Y4fj7Ne6yddW+6tffVz3H+0HR2V4Z20nG4+NDT17R/rb+vWZ13J+Ho8zYACAMqhdgTLI1WdgeS3Tw95e8XSPFwmkCSbJiMexUv8M0tJ5z58EUjAtwrwNoY4tM4TH0/9/8id/cmRRlwD35MT3lHzyWjYsyHKsRBLEcUvqsnonx8b+4Nv2Hx3DOjrcBg2eM3LoFgP2e/aMbYlrT2/8btuCY8vf8x9vMEo7P7xEwHZ+qQ+e9tOv1otHvJXyQP/Eou6X/ZHt0UUOfq8zR25415R42AFHssQjfq7hTx+vt3/kIx8peW1MyG8x6VFwkU/BAI7xVV3207eVo52dSv1tbPDx2xnCzw62yucQLFqKTW29Y23JRzhkrPT6jur4Iw5OWOYWc1DyasTT1htT5jDPsWVei4welsYRfXTrZ//M4igfQz0c09Yr2RAcfbAYjj278Y7ioT8ck4dyOj96ezp7dfjxwTH6g2evvz5pV/Lbs7WjfIzMkSx+i6Uf6OTM4Ei2cS22eOGIRnj1bFBHhsdVYGd8oXpsjvjqeudSNsjJerza72GQ+CvZq98SjrWu3j4M2IDInCGY204//fSCJXtnMYy+o3LxxHgAOsFxPpOEgQEIbfaVAqz0oKO+bsv57ot+2iS0fYNbINQdAiYek6NXKAVmZuHAH7YZ1CY5CR57kuAJWMo26BLCA982diSp1evbI/X8jw59JaUBPkPBi8/4LQL5QN5aIgOPBUMmNxjwo0fR2bbRiR/FL3HNftu/lg8P/HLEZoJBGaDae1jiYTsdbNZHHEY4LtnOHjjSb4IRy57O1o8c6yv/nGSST+wa6QxfW7KBD2JJjpO+B4adiHsUG5NP/OCDeAZHfPrZevbgSTyMX1jSPcKxZ0d0iAcMfA8mYyk21nw9OyIj8wEb4MCPmZwmh3w4JB7mIRjNkDHFFvr5FX9GtuirT+Y2MZBHsziykQwxZ4OYkN3DcckfMsyrNY4jGaN4ZFyaH+Vh8pFNa0k+8wWOyTMlrHp66eSv8cMHuoytEY4jnzL3iJ2FS+I26t/zR192G5f8Nzckvr3+ozrnQnFgA59t7AseI766nh9ksAEeiF09DLUFY7rt03dIPpLPbjrJohMucFhL4hlfyRjZvEbeUbl44jDgQgCsg5fBkLr0xZcPXRpEjpPYZCWhIndNmYGgr2elrnjFKx4ckPe+973luSx28clmf0QSgW+SgR0+w3DpS1+67GfQL/GTL4FggN/g/KM/+qPyduJI5756NviuFpvIX0vsZIOB4VeVf6NTx2atHP1mcGRjsAqO73vf+8rbl8mR1I9saOOg/2mnnVZiOeLp1QcDbb5ZBke0FMORHPX88JzfbCwikw/yCbFhXzzTHry8tOG7Z0506mr/oqMu8cfWyJITwaHuu7RPRnKHD9/8zd9cTnyzOMYG8wkcD6XkAv2xIbLXyHQ12od4bSj4BqtWRvyvdcHRCzSzJLfZ6v+CeiPZAiJy18rK+Mj8NON7dODBLw722ZBxmz77SjhavPr2WDAkxzaySRvsnKDNtbFhn666PTLUuWrlO0/5GHLdb98+fy1YLMSNiZzf9vHV7Wz58Ic/XD5QaVFNJv9myBVlPwh8nRuOiIxRPsZ/ZXA2Jo455pgZtSVO0fOnf/qnRZ/vVc0SOyykPSOdXJqVof8caodo2Hg2BDYENgQ2BDYENgQ2BM5GCGyLp7NRMDdXNgQ2BDYENgQ2BDYEPvcIbIunzz3Gm4YNgQ2BDYENgQ2BDYGzEQLb4ulsFMzNlQ2BDYENgQ2BDYENgc89Atvi6XOP8aZhQ2BDYENgQ2BDYEPgbITA/39l7Wzk1P+mK3mDwFsL9r2CiRzPkLcIvPnmFVC83gLw9kLeFGxl5c2GvC1AtzqvsZJFhi1vZOQth1pO3iDBq59XUMlgwwzhD+HP67jsWEtksBEGZATHnt37ZPLLq9Uocke2pJ0eehEcYkdwDH/PHn2QtrSzYRbH6I8t3gghO2+OFSV7/vCHrey3zwZyY9ce9iPN+ueVZDY4Jm9kS3CMvY7ZAAc5qZ4d+NP3iLLP7GjXZoseMmZxjK1K/HlFndy1FFsyLtgQ39bK0A8/DNhQx4Ftayn5mE8W8MMbgOQlL2tZbbz0VzeLI5nJJTaIY/Kq1re03+JoXMMj8V3irdvYwQf8kamckUMvP2JD8kEsevEIbtroV5JxCI5kkUF/bIj+2s/RPl9t3oi2eSvZMZkzFB/kUvSry/4aWbFfTuNjBxnZWhmxU9+M/yUcl2xJHvBfPznZ69+rY5d6doqhMcSOxLa1e9/xtnjah9CedoFAAuH1Ta/JJ7H3sH5Ws88cfOxjHysThOT0mvy+QZpklRC2T37yk4UnJ61MLJI3+7VS/Oq15xsuPobnmzYz5NVZRJ7XWCUkG/ixlmKL/r6jYnDjZ9sM+Z4Mfjbgz8Aw4fSI/B6OBiUZtmCkr5NhS6mjy77tE5/4RMmHtu/SsZjTIZd8LwzJATasJXmQb9+IhVzkuxPPDPmkh3zki0kS2c+itpVFL6JHP8f5Jg/7+QVH9XKjR8lB8YCBDY77xkErCx+dwZH9ZM7gmPHiMwtwRLCckYEHv09vwCU48nNmbOCzwRB2bOPbCBdt/IW1nJKXH//4x6fzURwRvcZUFsEzuZSYey0ejuzK4qUIX/nHHMMHtvBbyb6ZeJiffarAPAlHuCQO7GrJXGLsBG9xO2Rc46cHv08NGFtky6e1xFbxJMuHX8li22gsjeTCDP95znOeIgt/ZI142np6xZBNfCCDXWLRyw125xxBltiZG/zI7pH+PUpe02mj04dPezkwkqE+bfjIyFjp6VyqO+OZYKn31nYGBCSCAEga32G53OUuV4KhboYkpMT27QyyJErKnhx6Bb0OvO93XPSiFy28aZfgIyIff/oa4Caob/mWbxmxdOvx0UOeieHiF794OebDWpLQ7DAoTG6+3wGPWRwNal+D9k0aNgWjkRw6g1EGFRzpN6kEG3JQytqvDN4MTCXefCOp7ru0D0fy8ZvkfZ+IfrLWkv5IPjlpk8G/+LhWjjjQm3yE35IcNrNdDuhn3zdtzne+8xU52lPPhp49eGO/PsH+2GOPXWt26Sce0efbPhe84AXLmJBPawl/4iqP4cCnGRl0ObHUsQyOZK2lfBvID6zwwQ9evTHGbv3gp59jds9+5ylylOaFC1/4wmU8zmDAhsg5MzjKZ99HMjclL/jYy6MRrnyQ0+c617lKF7zBqCentj0y9ZvFkRyxYq/vE1lI8mV2XMPRgsNChA1yaTSvxd62TCxhYGGfcTIjxw9si5ZLXvKSBf/I4J+tJf6TDwOklNPf+q3f2nZdPA6GfMh/Djjvec/bHQMjQWxlDxzZ4JjcGf8je/1sEo6t/CwEMugS2JmJpRaUX4j4beT1JsbwCHpIMiAnX/uZVEw4koK8XlKb2NOmnz70zhI7o5NMmCzZ3pOfpK7bah/r+qV9v+hgQD877CdGS3x1Gx/o5hNcLCTICFZ1X/vqa0ou1HVr9oMj3WxI7Nbwpk8wi/3KQzAwQfM5fpNv0prBUn/64aOUj7W82Jwy+pKryeW0ry3x00l/rnLIixkio87hen9GTuyQE/wj1zg13tcSHidaNsAxcRjFIjjKH4T/EIocuWgM8GHGbjrJqBcJZxZHvvPLJrYzcYV7xpTcqvOzhw/bxU95Zgh+8ZtOlOO1cpMDiSVM5cIs8QcOxiLs4HGInNhT6yenJwt+cofvyR+YjKgnI30Tk+Rj8Eh7yiUZfIY/Wfo5PoQ+e9Y/RMI5nCdBSiDODBwZUAb2voBKGjpRSokZGeqTICOb6kup+jj2K/nMkEG9z/aefD7Y8PpllkHW67uvjh8ZVClHPG27Y7iZZEL15J+6pZIfszytPPytbW2f3nGw96sSjnU+9Pov1SV/5DhbInuJR7/YLQ5sQOrafGvlZCyFH46H2B87xdDVmtjQ6lt7HLuDw1o+/fhiTNX5XO+vkdXmI1zQyJ7gmPZD8zF6+O9KiZw6hGLHrN+1LjGFYz2uZhZOZOmf+W0tJsEyttT6U7evrP2Wi2xIju/jrdudF+R0La9uX7vv7oDtkLFFh1iMeEd+4UmbfeNyRC3m6YcPZUwp63k6/VL25KTOQg6eyMIussO7pvz/Z4g1vbc+XQQExMB8+9vfvjv++OMP+qUvkJ7zkVR+FZiwrM5HyUGngCvxSmb3kQ2K/LKVXCYJcnrJoR1/fg3p63+B5d9AdJ3tVEq+2ONyqPvpdJI/Q3jYAAcTNd8dz5DnMuBhkgqObBvZom8PRycLOIoDXtsIR/axU3/92O25sVkcg5lYejbCv3CA7cj2Hi58xcMesfBPSGN/r/+oDnY2+cQuNpFJfo9Sr9SvzmdXCJx01LNFn5FPcjH8ThKek5FPM0RG7JAPtQ9r5bBPPNniGRt5cMiJkww28MEzN3yajYfxkIUCe8RCjG29cR38YCAOjpNPa/3XL/7j98yVXJIT9M8QOeyEIz/wJ/5sDC3lBb3yiA18MsbIVZKlDtlP/pNHrzYbfu3mhrQ5li94yIoM/cVb7uvrWOzcrjJHhz9lfNQvOsk1j5Gddrkgl5B++pBLT+rIgBGf2UQHii3ywb+YcSw2tpB9/HTyLZt2+9rEAQb0syvxiB5l9smzjzf1rvo4T7hlRl50pj26HGtnJx8d8wnZz0K2VFR/tMEFRb9j+yhxhC35vXEZ3cGhlkMGm4477rjdla50pSLzkD/b4ukQ1CqeJKRk8qzNi170onLyVz9DJhUnOxM9EnwkyCOS9JJHYtk3KJz01dGvXmIZsEm8WpaBqW8SS18yen1rvnYfH3vxZfGVCaPtOzqOL+xmLz/IWPK/J4stBqgJCj/KQOz1V6SP/ssAACAASURBVBfdh+LIb5ODicg+XE1wmYxHett6kxme4Cgn+GOyWEt4I8cJMycbts0QOZlYM/GJ8UiOuGlX2hJ/z1bg0QZf/ikdt6QNH5/F3eTIB/GZIXJsZMgFJwp5PptL9PKF/cH1EBlyweJJHMnhY3JzjV/0O9GEFw8M2cavHmnPwp8fdPcw7/GmLnlEj4WfRQO5h2DQ4tjmEd+W/IEXX80L5qjkhDp87CIj+WVfW/rh5786feSFPrZgKe/YhUdddDrWTz7CQakdsQUfrPQJ0aHOYitzunYLD22IPWzHH5vsR28WeX5AGMfq0+aHFVvZgce5w9xbz0Pk1xud/Ef0tng7DmVff37Ygo1ctpj245B+bXKCLv7BqNajvib2wlDZI3j78Zl5jy2tDFiaWxKrnhy2kMFG/WEXgpPngyM3/qZ9TbktntagtNAn4DvRXe9619s98YlPLINF4GZIAvrnmwJq0svgHsmgV/IpJbXgexjRrwG24Jcs2c+AreVpx68t+x7Eu8AFLlB3W7UvOQ0gD2X6Z7BsywBaIyDJbeGUhxElPlxmCA4elI4NiUPPf3L/J3Dkt5gpEb9NeGyYIXwmA7HwpptJyknT8VqKDLbAwYPzfJwlcvCf//znLxO3WIjRSBbc8Sj1M2F5Y9AvZDmYid6kxR99WoqfYqW/0ttNHlSeIXbIP7kkn9kwmqhHctnPVjgaV3AY5dBIRur9s20P7ucEBCPbWpJLMHTC5Btskrc9Gdr0waM/XPkw+09U8fIZFuIAg8w5Pb29uhGO8pydibl8sGUMtbL0zz8nZhcs61wkR51+8Zks9tv09SKKdvmQ+ZE/6lD4jDntMCRXO372+YEsH/XNgla7BbJj8w0ecvXnv4WGPuzwsDUSG5sFyNve9rYjfBYe9PrRkDefvfBwn/vcp/hnbsyPIv4ZY3L8uc997u5Vr3pVyXm5RW+P2EV+5lV+6B972axNqd78gSzkzEc3vvGNd1e84hWLv84T6c8W+7Fd6Zjf5MEEpsaUen765+890t/iSR8EN7bEVsfe/rSYN8fWeRB56sTC4pZt4SeDTe7SWMCxhW3aZ2lbPM0i1ukv2JJVYCS6YPmFNEN4z33uc5eBLfAGooBKlB4JuMAjvGyQnCZYyZGkUE9OLznw2bTRyQcnHJPLDOGLDMlqAYfoXkuxJb/SlAYsX2aILSYXPvBJHNg2suV/AsfICJYmDhPmLI7ksFnsTMbeVGP3KAd6uLCBDKVY+HUGE5PjDOHng1jiNdHDcckWevWx8cU4EEe8yUfx1N6jGkf6kV/UszjyF9HNhuTjTC7xxcam2MAH2wzxw0nAuETxcQnHVr58ctLJVUQ5wTa29LDUxu+00ymfZnHEZ6PP4tn8xO7RWGrtdjzCkd1pg5Fj20g2f2BoPOvDLic/9eElJ3nD9+QBm+nKAgeOeOQ1fv3wKW3GjWOLhcjgCx46jSlk0fPWt761zJlO1Bn3sELm0rvc5S7lRzV72WBMGQ+wjE2Pf/zjd+985ztLvVzRR3826CN/vQFMvsWThSy7XGniQ8bnVa961bKgkPewiq0wY7NjG/8shNmRDabBEXY2RJY2drAJWdho50N41NvXzzkw/ME1+a4POX6YjfJRuxiREZnkIPLVZzyRoa4ldeEhA4+61MPAQhiO2g+h/pn5EEnnUJ4Ab2J20vbrKK9RzkBiAPgVYUAYfOQJdBK2lZXESL3kNLAMCjz4LabIQCnTX2lQmDz0pR+fX7n5dVT3XdonJ4nuypPBT3c98SzxawuO5PADFuwyYcyQycDkYuIyoQXDyG9l/U/gyGYYwC+3C/3S9+tohsQAZnxwtcJJu47hGlmxhd95pTgYrOFPHzaIpYkSdolli1f660OP0gaLLBocw0c8+EiG9pb0E3M5abGAxwQnH2aIDnkjFnwwLpMLM3JgyR5XLPAblyP/R3LZIJfhCEMy4TQjRx74le3Ex4aMVTLIagl28p/t5gU62XBIPtLnR4wxZV4TI/GZoR6OZJCV3Mh+8qyVz3djykmvxi8LIzrwyiv74qWtzjN5YCHiFfVXvOIVu/e///3FF3mqDc7JFZ8CePazn13ksEUuwt0VYYswup71rGftXv7ylxd9TvYWGhYUfHNyF3txeMc73lF4xUUuG9Pk8Yc+Nl7sYhcr+MrbzHn8sOjhx2mnnVZkuzNxlatcpdwdkBMWKvCg25hNbPCSy06bevmin5jigZF6/kQnX+ucUp95WIzY4hylXkkHuTZtSvr4pz9ZSljQZdNmPDjX9Ii+yE1epNSfb2IGRzJg3CM8+trYQSbZbEDq2Fz725MzqtsWTyNkVtYnKAIkmX37QoJLkBmSdAacy6SSwkATbAnQI3qTUPZtBrZBqB6vOpR+rRw6JZKEMjFIeieb2dskdElCZBLxLRayZokcm0naJAcDNs4QO/zSYkMmBLbwsUf/EziyWfzZagKjVyzlwQwlbmTYfFtILgTbtbLYwiaxdPWK72TPEJ0mWt/sksvk8W+U1+RrV0a/ic0vQxOnGCQOSn1akotizmf+kyWWh+AoBk64+N0yy6Td6hwd80VuwM4JjAyT9Gws+CAXcovDMbk9/0e2WPjwgxw2JB769+KhDobGNF3wxp9bMCM9bT0b6XMV3O0lJ2p4kLmWRjiKc3JFqV9yrCdbm3j6NpAfqOLLx1NOOaXcgrGo8mPBAoi8pz3taSV/ybXxxQLQ/AQPY+OlL31pUQUnOcovvpp7zB+XucxlSt7EPu22fL/NPHn/+9+/4IKfPXDiGwpOFit+DNH55je/eXfyySeXOe5973tf+aGpL/vwuQ3Fx2//9m8vP4SPOeaYMqezSVz56cepfo7Fh57kUzDMfKee/dnYyEf5qI7vyiwoiuHVH/munVyy9Lfgs8kHbShj277Y6BvdbCEHDhn7fpCMHmvQVz8bIkedMvnkhwB55qf0K50/8wcmbLPZz4Zf/8Qk9fGjlrFvf1s87UNoT3sCJLkks+RK4u5h/axmQSUjiZbEE9wRadMvCZATBBkSRMIt8bNdPzKSmI5NBDNER5LPfnyYkaEvXkkNCxMlPGeJjODgBIzYpn5E2mocYYDHZBZ84l9PRvjZTU4G/yE44g8FxyXd6duWyScYkHMIkQGD2MTPfbZoD9bBMRNfJmr29OQEL+2Jh4k49Wt9oJ+u2C2PRjqXZLIRBjkZOOkcQsa1OCSf1+BY6wme/HEVaB/pr282ceAHHCOrxl975orEr25PGwxrGa0dxp2+kRE7gqErHa68GONOvkqLHVc+LArUeW7UogVv5NBjn/4PfvCDuwc+8IG7k046qajP7Sh5arFv8QKj5C0Malli4XbcT/7kT+7ue9/7lr7iYr4RIzLwsLnNV7zqyNbumR25gbS5mmKR5MOsbrP5Mev2lEWTBQ/7yc/CzPNDnkOziLAwtkBif/K1CP7MvBgfXHGhxx0G/TLHabexfYn4yYf4AVc8fBoRX9NuX77Y+JPcYAf9KH0jDzaIztgrV9KPDSj8jsltie74p68+2dq++47xwY+u6N3H07af0cK2x3a8FwFBEIAkwV6GTockxYyMJBPd+PGyBa2Vc2ji1C7UuiJvFo/4EPtr+TP7NQZrbNAfjqhnA3u01z629iQOqT+zPkQOnTZ2HULsMmEdyi+nkpdrsWRncLRf4xYZdV3tl/oa61G/mqe3T09iEJkmS/WzlHE1y1f3pzf6D7GBD60/7KqxqvUlbnQ5cSnJcMIKX05o7HISTF8nRSc1JZ3aXN3AZ+GUBZJ2MvEjVzRyMqz3tZHjpPn6179+95CHPKTYhD9EdsgVF1db2BPMtOcKi4XVL/3SL5VFjwWHtuiNDCX+EDsRecHRVbjYHl+0WQzBht/xgyz7dNnIs9j7wAc+sHP1yK27E088sVxNEhNkkcIX9j74wQ8uVy5dBbZYtIByJTDy9cdHD9mxtwj6zBhSx660saOmHl/dXu/TRRZ/kwd1e7tf68p+4hO7Ut/yOk5byrZPfKpj1vZxrB8ZyfvEstd3qY4eW3yP/iWeXtu2eOqhstVtCGwIbAgcpQjkaoiFs5ONxYGThQUByqIhJ3p1+mjPCUmZk4qFgFtlb3rTm8pzMq6muEpkAeEqiNuKFgY+0+K2GPkWWTnZRY4rNQ996EPLszu5QmQBZCFhAaTOIit87GIj29hgnx8ejVBGbk6m6kJpy3FkOWG2vDCyaYMB3Mi0WPQIgStHrii5kuS2m2P1Fj9uS7uSdJvb3KaUbuW5xcsXj3GQRy5M6HUrm6/qsuiL3WzY6OhBYFs8HT2x2izdENgQ2BDYi4CTP3Jyz4LJQsCCIgsQJ2r7ruhYGPifnPYtUkL1ouslL3nJ7oQTTihNFkpuG7n9ZSFzwxvesNzCyvNE9NCdW4yOyfLs2o1udKOil36LBjaE9FNv8RcfstBzy8+CI7LjFxlk47Pgc5zFSuSmpMuiDumPyHP7EK/FDD2uJr361a/e/fZv/3a5BWehSAednkfyBp3/t+iVfVeR9hG99Nj4Q7d9MpWOY08WUvtkbu2ffwS2xdPnPwabBRsCGwIbAv9jCGRBkhO1hYzbRa4eedPsve99b3nT6z3veU9ZODlx//7v/355/sYJHTmJ52qJY4sez+jk4XmLJyd+/Ww5+Vv4uHpk8ZP2LHrIs5+rW2lXX1Nk1XX6xC+lPjm2nytlWYz0FiHs8tyaPvwk077Nguk3f/M3y0PkrixZUOnjqthNbnKT3Q1ucIPdZS972cLjTbws7izG+GRxGopuclFs1y+Lyp6P2vEGn8jbyrMmAp+dtWdNGzerNgQ2BDYENgRWIuCknRO4h7F/4id+YufKkStLbiV5nd4Vk7xVZiGU22JO9E7iiIwsUCwYvNmU21DatemThYx9V2/UZ3FBFnv0SV9lrSN91COLBzIiF7+6yMxiJPK02a+33gLEbUYfR7SAede73lU2V9083K3OLberXe1qux/6oR8qb9R5XsnVMzjFfgtP+uliFzxiT2zmQ2KgH8KvLj7o61iZ/tFRKrY/Z3kEjurFUxLPQMkvCYgbjEnE/JKS5El4SRsKnza/IiR3Ej59lspapjchDEqXfumfJd/NMMHlsnX86MnhD6r1u58eP/jINxilTysHbnzORKP0NowJd5bow+8VUjJNRjMYsJGtfh16niA2ZJJdaw874CgW0U9ufGzl6IMnfbV75Tk+OF7CUDvZ+ptEbciruCbrGWIDXWTgh4lfwLOEjyxXG+QT/8idITaIg1zmh5MrWXlOo5UVDJOzSs/D4JULIf1sbGxJXWw3DuV4rgK0fZeOyZf7TnxwNJ7gWMd4iT9tZPA7MpZyms4Qu/ntqgXM5CP9+LWJRXBwrB5ecp+t8skVEvEjA47GJVvIsgCQo64ceWboVre6VdGTsSx29MKQDM/k3OMe9ygPYpPreRxxZAO9/PSGmK2mxFJMMi/oO0N08MmVmYwrto1iwfbkQOzjF3vNb+YF9fp5gw1m7OQr2+znKhBs1eF597vfXb7A7bktGMLYq/ZuO1osuQ3nrTd68NhgB3vPOrHBwjPfmprBgK1sFme6xcyibYbwG4t8Egs5xMZZgi0b3IqEgeNsa2WJJ+yVbMKfuNlvCXbJbTbD2PycOb7tv3Qsb+BIN53GAvlrKfYp5cqZoaNy8SQAGUC18wIJXJt2CWZQIQBLPKBrsy+AuS+fAVjLm9kn06D1PAC9AjxD+G342SIx0Cgx6slHIjjOhO2YrH3JgQeWkcVuGHqWYYZgSaeNPL/U6LY/Q/ob0CbXvEnDphniC9/dXohd+Ee2BDt8wc2JzkkrupWJT88WNouTkhy+y61DcaRL/ngYVb6ObO/Zoi6xYBMc5VJ8GfG09bDDL5ZsMfnJjRGxOb6nZAf9ykzU+NnSs4dO9fiDpYl+Fkc6xMAkbZLPw8lkriU28IlN8hEO4jAaU3zMCRze8sd8kM8b8EEfcuFKdo0p2fjZmBObK0JusznRnnrqqeUk7kvUFnPB7/rXv365pWbeEB+6yfb8Efm+++YBZguPfBsoOLCDP5HVYpMYxOd8zXkmH8kgn13yCI5LOQ0jmCeH6E4+4GMD/8iTW/a1OxFbXFrg0APD17zmNQU3H8T0UDvylt3Nbnazchvu8pe/fMEpOCTn6SSX7eyxrw88DxnX+G3BzVU/sVa3ltiC31bjYH+GEks4xQY+zhCsxVSOJXfEIPs9WbALznxBroDOkPjAjM9ssC8HZjCg22asWHihxHjGFn2PysUTEFEdLMEzWZlsTXaSxIfA9LEBWvAMuvwiJsfiyWCzj0+QZygDgA76TQ7qUr9WFtuctPPxssgYyYlP5Cf5JZEJN/gkKUYyal77EgrP7Mf0MiCVFnAmcjrFZIbwxwa3CNCS7T3ZJhcy/Ko0OQSnkS1ppyd4iYU4BEd98C/Zkj5sEgc5dSiOZNWTdCabnr9tXe0DLPKRy7bfvmOxYIN8QsFnrS3ssFnEGlPhj6xePPgd+/Wz7+rXLI7RTYc4yAX7PZ3Fuc4ftoTMF3Agd+R/xgDMs4CJz8a1BVz9vI02/aInfckxfujxVpuPMFosWfjISc8eial5xgPYuXoSvcr4mvnOgoMN+fhtrZOPdPdIP21kkmUBaEzN4Aiz6DM3s9vxPhzpre1ig4UwDCyKyWATW8w54uzfpbzxjW8sH8N0VQ6PuH3/93//7upXv3o50br9SEYwin2OyXRMb47hYp8sNrt6NpuP5MYfc4o8yMKvh3uvjl1ywwnfwoFf7Kkx6vG1dWxhQ/KRb2hGjjFJhnzCH95g1+qEXXJdH5tYzuLIf7r4YEw4Dg6tztFxYmxus7HlUDoqF08mAgsVjgPQgHbC/NVf/dXdr//6r+/e8pa3FIB9U+Tnfu7njiS/k9ov//IvlzpJSMZjHvOY8k8XyfHL5VAwJYjAIDKyvzYwkjFJFhkShV09SsKmL338o1tbsMng6MlIX20GIhlsGOnsyUgdfht+FP1p31eyOf6SYT/lPt663SDNSYMMFLl1v+ynj2M22/AjbY7XxDJ5GDmOZ3HMRBQb6JUXM3LCk1iSOcNfHP9MPuATU0TePhyjK2X4yQi22uz3bNJPPT2JC729vrGzV+KNHidVeeSEOyOHjXIpvtc+9XTqTy89yFh0LH42V6KQecpVoNe97nXlbS3fAmIfXbXP/HbVyL8IcbK1b75K3+hgF0qcHGfc2CezxjR2BlfH7OtR+JVk4Ml+r3+vrsUxPo5iET8iSz9bfgglJuqcxH1J3D/FdTsNWVj6AviTn/zk3bWuda0yp0eWh8LJIYMvCFbx03HkyxuxDF7a9EMj20vjwh++m1vITlwWup+hKdjQzxa2xY8zdB5U4MuYwI9mbaGf3vA7ZtvInmCqPRjSO4sjfraSZz96Z+Qkh+kX+/q4gDHx56hcPAHQloDx17NG97znPYvr1772tcsK/SlPecrue77ne3bXve51C+A+rvagBz2o3Of2YKBfJ49+9KN3+nsFFZErMLMkKbLN8rb9JQNZSY62vT2Gg/4mwUze/BhNii1//JWUeDJI236jYxNCzUM329fqr+Wa3MJ3KJ70h2JLBnDqeyV9SF92oLU4hhcP+/HXmBRhe/4YyLXt6T4jJ32VcoE8W21f5O4r8dWTi/19OEa/fnTGH7yhkT3yMP0iR9/sh39tiZcd4jErp56Q8YZGtsRu/fAmfxz7ofY7v/M75evYXoH3v85cPfDDzkPJ+tMBr4wleuxbCPiV7YRn8RT86dMn9uQYhrVu+slxokD0RNe+k0ftE94cR2cRuOdPD0c2xo8RO9vYzRcbntw282zWM57xjN3zn//8cvXA3QPz+R3veMdyZS5X/6MDL5/9OFZa2MYHZcaGNj46zhzkWH3IfnhTN1NmbsAzI4cdsSV8/Mr+jA1wgWnwmbWFD+aW8Ae/lK0twTT2az8Ex+Rw+KNvBgM8iacy+63Na46PysWTSQQZmBIIvexlLyuXEb1u6pslQDGYfIbfvW2XjB/+8IeXr766B+6SowfvPCz4hCc8oVyREpwa3CJ45Z8EMhNh7FrJXvyIDJNGTnz15FPLqgNPFx6Tgk1y80VS6Sdpe5TE0ddg8qvYJD3S2ZOhLnKyHz9m5PDBYGQLOxzbZmTEvthDFpn75KQ/nPQNjjChP/4s4agt/c4sjuImhpE3iwF/XJ3lBwzImZURf4IdGUty6LThU4aPXvsokxyb9GlJOx3pH55DbK9z39iYpfgQvvg1soU+bTb7/unswx72sHJFxDNLTvBO/n6kmXOucIUr7L7jO76jiBdrRIf9WocTfnCHiz7k21eP5JtcReptZCjJ04bPcfoo8cfu0tD8SX9Y6Beq7UvdqMRLty20pJNNGbfGroe1PeztLbff+73fKwtQC88rX/nK5cfyd33XdxUs3YbSH794Rw792cg1r8KDbza+aEfpl7a6jmwUnnKw8g+eyE5cRmNgJBI/OfzKnGZ/JhZkkxMblDY5UsdnZEPqMz+Ghwy2jEg7zMWdfnyH4Fjz02c7FMfYzp5D6ahcPLnHXT/oLfhA9CBe7iULlgFlEjMB/cEf/EE5oTzgAQ8o97wB5oE1V6Ue8YhH7B75yEceqdcm4JLEhEd2Bk8LdJJAf5QEnw1KnVQGeOQoe6S+1mFfMsEi9crU92QkgeIbXgm6NBB6cuK7tiQ0+yK3x9PWxU/8Nnazb0YGmeHDyx+27fMHT4gdMMCLyIk9IzmZrMmxZaIY9Y+utowd8o0d2Wbk4NEfbuQpyePTDOkPOzLIg0Nk9+Roi/1K/ZXJx1oWeelby4qO2tYlnTVvvd/Kpytb3S/7sYV+sTT+EN2ezahzEJba9fVDQ5m5KJjhs/mR993f/d27H/7hHy5vxMHCXBTZZaf6Ezvow5+ytd28JMfoRrW9sQEvzMmBR41p9ES19hHpC5N6HI36t3LJzNyJvz3mQ038IcMbu55fcrXuhS98YZmH+eEOwTOf+czy49hzXOxQX1NwU1f7rN6xmCHH0dfyO46PwRhvZKet5lvaj+/hixzlWqp57MeeyFwrJzEiA28wmJFDt40s/JG1zwY44KML74xOspODsdtxxsg+3WlnL/7aB218mKWjcvFkQYOAYIICyJ3vfOfy6fw73OEO5eFAD4P579VPfepTywTuypOAefAyCYTPA2fa9PcgoV9xZOpDj4kD0B4UHAVbvU0ABNOEMeo7ChCeekIM/1JQ2c/OlHhMrCZTdiD8IxmxOf2UdV0RsOJPeOrkZtdI70hk+sObT8rUjXjaejZkUsabWO+Tk35K2wyOwZot9KNg0tq3dBwb6eeDMrFd4qvb8MRv+LHnUByd7MmqbYiNtc7sa6s3thg/8LHFtpEMmKG0K88sjnxYIyPjXl/+2thsYWTfyyTefHOr31UQr7hbFLGRj/TAmo/KS13qUuVqtsUSPnK0IfIOIXzsi5zg1MrSL9hpsx/s275Lx+HDKx+TRz29dOqnD2p91JYcqOc6sixQP/KRj5TnwDwLBl94en7Jc6uu0Hk4nkx1ZCG8PVtKY+cPPv1rW+0vycATzMV1X/+O2sIfe+FD3iHnCHkW+zOulmzv2cIHcWAD3sRrRo6+2YLNEj/M6LHB03Hw6Nk4qosu/PbrMTfiaevxITJs7IZJcGj7Lx0flYsntyRMRhKQ4xY7nAemty18nyO/zrSpN0DVuRoV8DOIE1BA6h+5WYS84Q1v2N3ylrcszyn0wKTb5Hqd61ynXGZ2ZSwn8F7/Xh3dHiSV2PzDb4Bkodjy6G8L8cEDlPhhgvirnh9JmvRXkg8LRI8TiEXibCLlxIPPg5tsT12tb2m/tsXbTexOfJb4em1wDD7kkJ1f/G3/5IJ+oWCwFke+Iv7bYO3VaHk3Q/Qlpm5XkMX2GTn6k8Efv+Ajb0ZGbE4++rWemOYqS/qkpIfffEgJR/WxRzzZxZZRPuLXJ2Pa8z72ZwgGiM3eWKNfnHsY6Cv3jbnYio8NxjQf/JuOV73qVWURRK64+F9m/j2HvmyWX/jZatzhJcP2iU98ovDAMXU9/0c+GtcZm+yl35im135LiZe+MGeb567a7zi1fO1xcGSzOLBhFDu8fIYzDNiG8LKRHXDwijycyJHjL33pS8tLPuIEy2te85q7u9/97jufYPCmJizN3WTL5+QQmea6zF+t7b1jj2mwzQ9lGOFHbGFnS3ygT6zYrD8Zh+CYMcEH5yBzXC92rQ055icslD7DALtR/MPTK8WUD259wptdfJwZY3jZDw+8iJzEutXLbrrkD5vtH5KP5NDDBzkR28VmLWVMREbiOiMjuo7KxZMJPImTCdFbdBZOv/Ebv1G+4+Fq0u1vf/vdfe97390LXvCCEmjBBRLQkeCTE+CU+tgyKO2bqCR87/8Y6SeBDEb8SkliATVDdJjAs5ErwGT1iK7YrZ1Pklr/JHSSLYOulWPw0sNHhNdmcM4SW8jDz4eUa+Xg5wNbggE/ZnE0CYSfTPISn54t/I/e4GBgsn8tjuTi5T9ZSjbM4iiXY3MwzCDv2T6qY4MtOOjHpxnKgoIM+WOcwMT+iGCQcamUj/leFnv4ojRGtLeUyVgflHyaxREfEtvkof0RBuzBU9vnrV23jZzsnCjExm0jH6R09dpDyewUL3xZcKvjR/RnUUWHH3Xs8Pac47UEx/wAgj9b6eWbsiU2wJddSnE5JB/pwRt++sjr2U6nfniCO9tyrISFWPpW1XOe85yysHVVTo7A1t0DV+w8esF2H0hF8IocerRZTLEj83+LQe8YjmxiJ97EKX61PGSbA+iOL4fimJjgN0eRtzSWWlvwwxUfGTbHMzLI5At/+YafXD6St5aiX5k5klz77Gsptsdmeu3Pjmtyanvtx5ZW5+iYnTM5M5Kj/qhcPAHfAEoSCpoB6e262972tiWIFjr3u9/9dje96U13r3zlK8vzTcD26+dKV7pSCbJjEyowyXJsJ0CjZwAAIABJREFUclBaHUsEx74RctJJJx0ZbDWg+up373vfu0y0vl1hcKqfIT6ww+RBpyAjsnqUxKc7m38z4LJ2nRzayBjJCS97TUgmKl8kniG2kK9ExxxzTLFppLMnO3aY1EyaPuy3ZHdPhjrY8d9/cOdTbEjZ8gUf9faR/wHm1fC1OMb/yCDHxCyWMxQMlBYv+e/xM7kUH+BIBhyTSzO2JAflAplkJOd6cvSBcbBQOjG6Fc6O4J9+OW5l4UPx2bjwRtoM1TKM49zqicxalr5ZkPCRXSZkJ3ovnsgjGH7v935v+c4R+y1klDAS53rfvESPLXholwuxy/FMTNzScsXGFtwiu+cTG5K7dIXHN45mqLbXfJpvp0VeLQsWbKEPnz58FD9zritL3o7zpqGrWK7aeR7s53/+5498g4nN+GNzfCOPfDKNCRRdPVtqu+p9Npjnfa8Kny229uTEl8RKX3pncWRD/DK3mWPFMou32sbRPn4YWHCwRz7h79k9kqFePFy1gkFuJc/K8EPBD4q8oR59bEzMUhedGSf6oA984APlPFH327cfXnFwVRwefsj0dI5kRQYczU98h0liPOLr1R+ViycAGATA47RB51Is0gZMCaoeOG4l5ZVgzyz40Bw+QTAxXeQiFym/JE2ieMhFTkD0ZDLtAUyf/vrSS2avXxG48Edy5VcEfnKXkjptKdlgi89kkckmsnqkf/DSHl96fZfqojeYmrwRW9ZS7ICfZGZ3fRJYK4cNfI+8yApOrZy2Hp9tBsfooJs8PsBklvDa2C+fyIDDDMVvZSYFpVyYIb6wASWuZM4QHJKDZNknaySHv+34OQRHNsKRHnrlkUVUj+BrjMM82Fs4eUtXDpBhovc1ZcdkqbPpj+zzja32+Qhz7fbjQ2xSN0NkhpJbI3/0ix597ec4MmZK+CQf+WTh2KP4FH36/OEf/mH5pMAJJ5xQZLha503Du971ruUDifmBmpjH3hyTATuyYQB7bfbp0Tab12TyCS9ZaDRP0RF9s+OwCP7MH3aTxVYYHjIeiap9ZTPbyJ0hMoIjPvtLuTSSHb1wtJExwih9+Z08qXN6pKOtp4cOMuyzfaSz5c1xcgefLXE5xJ65GTUWfJ5LoAHQloD4HsqLX/zi8tqqK0uAef3rX18G2nHHHVeuJJgAn/70p+/udKc7HVmx+myB++v5NQnMBFgJVJMr6gGsTkImiClnIeITOfSb8EeTVE8uHnoNJrzsrW1SH59q/tTBED9fDrG/5pHUo8mo1t3uRwYbYhcfZikTExls2SeDPvgh+zYyZnFkf+TU+zP2x5acVPbZ3pMdHDMuyAyevf6jukyq+OVP5I76px4G2dThRXIiMvblY3DER39Lqav7tX3SZixkYvccmttFp5xyyu74448vny1JvuQEknGXHCaHvX6l05t+kU9v/IJzsE7syM+J7tCxUceALbHBfnTX/ifvY0vdNrNPry1Y0IfU8d+iCrEnNjp++9vfXt5e9sacxydcxfWD1WcF/GuUmsiJnfEl2OlXt6nXv26vZe3bZ2N0KCN7hGP6px/5wWCfrro9dquj1/FIZ81X7/NbXGO3/dquuu++/WAeW/b1b9vZTgbii23JHjimLz5j4hDiL3766URLens6+IzIsMW2Xt99dfNnp30S/xfa68EMTNu97nWv3d3udrfyYLfLiZ6V8VCahz2vcY1rlD6Pfexjd7/wC79QHux2O8IXZ71t540OQGYSmHGBbiSIZITq/dQtlRKDDCTAgroUWG11IjjZoQyoJEbdp3So/sT2VDkmd9b2np2HyMjgiD3wiP2p21eSEd9rf1pfI4ftacNnczyDI1n4ErfIUM4QW6IXn+MetksyI8PkEt5D5LAD/sGGjPjV06+d/4lZcrnm1yfHPWzqtuCQ+ONF6eM4dT17TNAe7D3xxBN3P/3TP12ev3IlxPM1bj+Fn56eLdrppk+74yX/ezaoC472g0986PEs+aR/8NUvtrVy6NSePvqN+uId6Yy9OTmaH+GamEQPnN2O8wFQC1O3VNxWMh/7SLHb+G4TuW1mnmJLZLS2j45jC97YGyxGPEv1YklmZPVyIJjFXn3x9Pru05WTPV5bZC/x9drw8vtQfvbjFUf+1FtPX68Ovy3420cjXIKz/sFBneMeRV7bFvzV483xSG/Ln+PYH99H+tJ/VB6ViycD0MBFguAX0Hd+53eWbzp5aNytOQusm9zkJuX/ROknWQzmH/zBH9y52mSA3/zmN9993/d9X1lAJZCABOosJZgJSJJkRk6CmMVhjnsy6Em7Eh7BRH/78amu78mKrbBEKXt9e3WxI7xsm5URzNma/cjr6dxXRz+7DKwl/7XXttqv+9tfiyOb6Iz9tdx99rbteA/BMRNJnUOHyGFPzWe/xqW1Vzvf2Z0yMpQ1Fkty2jayUB0DuoznXIEpHao/v/u7v7t74hOfWK6AeEjblY+rXvWqO/9hwBuxnsGixzN+btFFRyWi+J56uuNT6uq++/ZrHNt828ervdYZfNRlv5URrGs+fVLf9h8dwzhzA1muypl7yTHnen7Hg/XPetazynNNxx577O6GN7xheVEnz8MkVq7kemBbXtqP3JHuUX3tA1n18YinrmcPwsenFqO6r30Yp4+yjmXbd80xvWSs0d2Th/eQHKpl1Zglh+Jj3W+0X/eNH5Ez4lEfvmCwhqeWl3EYOXCI/rrf0n7mkfRJLHI8Ux6Vi6fWQYAkodyys5BCgDVQTbICZiJ1684/itTmkj7eTAhpb+WvOZYIdBw6KbBfIBPMlGt0x1c8JrycONUHlyTckjx9bYcS3fTM2k5f7DuzNtCNgkOOl3yq7Y394Q/fEo5ySOzjA3ly6lDK7ZA1trc6YkNwVKau7bvmuMam3l/ipc8WHHLbe4knbbUO++KAZnxw28jXqF1VNta9ceu/DIRgImZrx6r+szZElxI/Xw6l4Ih/DQ70yceagmNdt28fPhaY9SJFnedEPcfk8w2w9iyTq3t+jPoeU/6PH/nsxW+zUEW5NbpPf90OgxpD+2uwaGXAIbyR2WJV89iPHv3lzSzhr3UmHyJ3Rh45+HsxXiOH/fF7ZgzUsvHDseaPf3W/dj/+4jskH8NPbnBodew7zoIt52rlGtt7co/KxVN+cUogYBiMgBUUgzSLIaA41g95iPz06iOYqU8fg177zOAO8Gwizz1+dQlSD/RenWTiQx583zego1eJ4r/FYk7c8Y+sOvGiPzxJIDbg8QtxhmKD0uaWqbKnc0kuuyMDDrP8ZMsBhF8c+bMkJ+3BAC87ZnCkk47gzIdDcCQjEwt+ONZ2FcdW/MnERIZ8lN9smqHEwduo5MlvuCzlNfvpZDM/bHjYgC82LMVDH+3ZHMvH8JOP6BCjHv3AD/xAuV3kn+560+t85ztfWQSwJeM0ckYyyKWbXraIReLc0zmqw0MOHC2K5aTjEfWwCY551T74KnvEz+jBm0XiaFz3dJKrXu6YE11l8rxYboVaEHsJx6dhPBbhUy76wzVjN36yhw316+mxqWd/ry45DUfyMmePbB/J0J99sGNfjU/Lo6/25J52PCMcW/4cBxe8bIeRt734MEN4axziw4wM+Z58giUZs3LkMTvyuQj8GU+9eGiDYfrQj+jvUfKmbYtsOARHcwv9a4kN5NfjeaRvn8yjcvEkcIDMxGY/SQ4cSalOotgHjmNlBoLjBB2vY5OEX0czYOJDeATSc1SSKvX7ApB2/fF7TktisDt2pU9d8jM6lPzyTRq6TVJJEj5qH/kESxOZfmT4gBo5M0QXGTa8JgZYzk6Q4gV/VwB9GJA9GWhr7eEHHN2WxY/IUN8jtgcj7bA6BEdyEJ+duDyc7HXeGWJH7BEHfrB9FLuebPbD0clNHMg5BEf5JwZONCYacZFb+eHS6qaX/cFaKY5ONHIB8U2/EcVOvPTD0Wvt4pHFgIkbHjnuyRIDtrz1rW8tOmFAN/lKOW9fP/L07RE7PCgulhlXo749fnX0GNNi6WRBnvE9wqFXD0P4w4S9++YG/tVX1fFmXPbs7OnUj52++O0xB28c8t2zog996EPLlTz48cknUuzDNrFLrPGIv08dyCf99ZnJ6dicfIKHW6/sm4mHPJY38It9bGF7zx6ytaeU+2LJjhnCTz572eA7VuTOkBjBke3y2RgX51niNxvysVLHsW+tLDloPMCBT3Kcf2zs4aiO3frSp788gGWPejL0Y6fN+Y3/5BibM1hGNjn4HM/6H5uPysWTQIRqMOwbCMi+ZE97Sm11kO3bkAFZ9yuVK//gc0vQf/c+VIZ/S+DXHP7YtSRL8DNpSYBTTz21/Bf2JEaSeuQCHUl+PBLSPzH1gOehxIbLXvayRyanGTnsYYPvkPhe1j77R7JncKQTjnRlIrEApj8n6NSP9LVx0P+0006b/j6RWIsD8tweHNFSDpQOzZ/054d8Yg8/Z4kP3mJFZC7JqG0Pnk64/gG3kzcb6j49W/TJwgYO9i02jCvfanMi9z23W9/61uWf7tbzQC2PHPFEfPCdpnouqPsu7cdfOQ3HQym5wH8biuw1Ml3tcWXHhvgHH+VIjnGdhS4cxcJzSOENnzKYk238WXT6QKjbck5yvpP1oAc9aHeXu9ylvKU8wn3kS8ZH5qfoHvXv1eNJHOzDMXnW69+rg6O7D/4vXnBITEY2aU8ummtjQ0/+qC4ytOejoPkfrCOeXj1//SByNdXcwB6yZ0h/i10vTRhbZGbOWSvHD1M/qupvly3lY/xXBmdjYvY8Ezli5/NDSp8ZmiVy5LWXG5JLszL0PyoXT4c4uvFsCGwInLURMKk5MZuInfwtoh/zmMeUW0NOFNe61rWOvPRh4tyoj4ATYo2Pfdi64mDxkJOlhRK8ba6S+tTLc5/73PJP1N3q9OHf+9znPmXx6jkndTn59TVvtRsC5xwEtsXTOSfWm6cbAmdpBCyQnOD9Mn7GM56xe9nLXlZ+YbpV5MOK/hHvuc997uKDBcJGfQTgmAWSRZPNAioPcrtqoI8rgq46uaLnEy6uNiFX9u55z3uWf8irH163jFyJ3WhDYEPg/yGwLZ62TNgQ2BA4SyDgJO1Wk9fffWDxete7XvnEgP8n58RvEeB5C1c/nNQ36iMAJ5TSlSULHwtO2Lni5LbJb/3Wb5W3El3h8y+ofEDY28pu1eY2Jx5y8FloWZRlYdbXvtVuCJwzENhmoHNGnDcvNwTO8gi46uTB4kc+8pFlceS5pXzYMleanMidvHNCP8s79Xkw0CLUBj9YWfjAVumNOVeZPFPneTRXmG5zm9uU/0FowWSBpB8+MjwYnGf/YO526nYF6vMQ1E3lWQ6BbfF0lgvJZtCGwDkTAQsniyQn57zI4IRuP89C1Vc/nMw3OiMCFk0WQDYEJ2/73e52tysPgXtLyseBvTXnX6YgCyXY50F7OLu65xkpVMdjw71Asv05hyOwLZ7OZALkF15+5Xk2oJ641orP5OSSuokrl9lHl8ijj34bHicYtzVMeia4bNozkdb2ZBLUjoduxJYZIidXA+yzgcyR7T3Z+NhIN19sudrQ6z+qywlAHGLTUjz00c7ebOrsBwft5KrrkXrt+iHH/Al/j6dX1+J4aC7RL5ZyxJWDQ25xsSU+BFNyl2KqXQ6GVykXLIBg88EPfrBc8XAL7trXvnbpSzb7xDt89tkOPxtedSF6lojMxFWZvF7iadtiS/zlh7oct/33HYtlzZ9c2cennb/8JwMuCH+wiSzy9YWnzdtl/j3VSSedtHvta19b3rb70R/90fJfFrylpD+/aoJdiD7+Jq6uXs188DRy2J6xEF8OwTH2xl9yZ3IbX3C0b2NP9mNvXSb39YGV4/hS91var3XYt5HDnxlKDuKxT84hxBdjAnZsWPK/Jx8PDJI7kZGy5YG5OSA+64dmcQwfefG9HhOt3qVj/uccS9ZMHkXutngKEgeWmQQE1GukLof7lZdJbq1YJxQPynqYU1LiX5r0E2yJL/g2r2+ywX49WY+SOic6NpoU6fM9mE996lNrzS79DIwkoNdo2W+iVbeW+BE5vt3hVVJyMkDXyvFa+4c+9KESAzzhN3B7JH6JIZxsfPD2EfsTA30yeFs57A6vfmJDhu+xzFD8F3uxFMN8s2utHPrFlb9eKXaVofZjrRyf7fAsDP9zy4dfbOoRHTZ5lJOshZuxICdf9KIXla9S4/URS3j51kwmVGWuOOlDDj+82j37XR18Jmby5LPvyZBvmyFy4MAGfvNnVgY/xBKOsJDnHtSG0VoyJ8hrmOE318gReCfW6rx6Lkby3+cGPDsG+ytc4Qq7+93vfuUBcJjzx6cLXOljB5x6JB/JJROO+V7WDAbsZSsd3tgTF99pmpHBNjgaU/jNDbBg3ygfe/7II/Msv8WDbTBEPXvEXj9jig+w5sPs99vYzk78eMVJXeamnq1tHVtt7DQ/4oWFbYYSS59KQPx3dXEmH81JxkK+t8QmcpU9HKNDG7thCYfZ8wz85COCJ7nmOLasJXmTmCc32aN+lrbF0yxiTf9MaAaY77D4qrG62aTO4PBNGsGVjGQo91ESwoDwfSKEl8zwj5KDLm0SUxKaXHzXZYbIsNFnIF7iEpcoA8vktpYMLPwGhxMFP0xcsX+tHHHgDxvwZrCS3SN240H4bOLo/6GpZ09wTHsrR7s2PigdmxwTi7b/6Dgy8JvgxYH9YrOWgqOSH/5dhn0TxAyxwUkejjmBsG8UD1iZ0LTbnCxPPvnk3Ute8pLy1pwHlF3t8NbcLW5xi2JXeJT0sVHespcMx+qNiRkS0+BmcvVdHzSDI19RcPONJLnA1hliizElF5z0+SM3In+NLCcZeMJEXiB2sId8pN4C53nPe175vIMPUsrhJzzhCeUWnQWcY3q9vYgf1vwb2aI+88i5znWu8s992T+LIzn00QVHsZnFkQw+Zm5xDI8ZORYdsDe/8As/GmGgXe6H6FI3m49s5TNecbF4MraiP/L3leIth/D6RpJYzBI72CCe/JY/+d7TWlkW5Dbzk7GKkhN8bUkfuMMysRcLc9MMkc1epcUXuf410EwO6IvPDxnjBZF5CJb7z8wz3p0D+wb0BNWAEKAk01pIyDFBSmT7ZERmT4Y+rW78NrolWBI5ZSsn/JFFpwWPwTlD+MiQlHQZKH61sX+GyPBrhg9smD3J0MUW/BZxJgf7YsK2EcX/YIaHblikTp/s9+TUMvgtBofiaJKkC4byYRZHGGSyTj7NyoCdrc6HyOz5T2dsdfXVv+3w6jseH9P7qZ/6qd01r3nN8v/m2EK2mIhN4qMO8R2e+pF7CI6JVU6Yh+Qje8iRC2yIzJ7/ozr22+SDxax9cmaIHRZgNpjAVI6S44Tkaojbcy9/+cvLSeUGN7hBeZbJ24o+7aCfq29+XGXBBXMyloitCI8FXHCYyaV6XOAXh9i+pLttq3HET24Wf23f0TE+W57j0i851otJ4lbnZT0eRnra+uCoXhzIEMsZ4i8bjZn4kDEyI8cYdQVOLLIQJ2dpfmzl+5HNBzjGriVbgh8c6NTXAm52XOMjAw6uxmZczOQjX8jgrx9WchvFxtbXpeNt8bSEzso2wWyDcEgwBJSsJKLjNYuwDM4kF7Pth+zXx6mPPjrpcYxmbee7yZgciaxk06wc+smykWGblcF+ctiB1/6SLXTU2OjruMY07SmDX0pXXOiCgT5k0jtre3jCHx9m5OBhg9LJRbnkf3xoSzEIjrGD3JEtsZ2uV7/61eWNrjve8Y67Bz/4weVqgXq3BtgUbFPSbT/66KArWI50tjbnmBzy2G3ftmR7+OoyOYiPHKW6NeOxlkN3sGRT5MmVtWSx5EeFhQc+pRx585vfvHv84x9fruw5GXtrzkPg+UVvYRV7c5tl5oSV3Ek+HoIjHvz8to+UsWstBnh6ODqJryV22OrciI+9HKPPlnxMPvX6LtlARuLND3LQjJzwsR9/fJmRQWdwZBMZqYt9pWLFn9iQfA5LT07yUF8bYses7WxGtQz7M3Lo5XdskQu2YFEUrPyzfgSvFHhO7JYAJggSayagMEvw8CU5yBtR+te8EiO/xtgQOyKvlRUb9Qst6UyftiSfPXhN7OSSOStLf7zKkc3RXfufOmX44tu+ybWVw+4aR+22yKt1Zd+vOJS+9pf6tzojJzL47yRnItI3PtX9RvvpS3+2Ud+lenKc4PzKNfk5hmV8ZGPyxr5NG+x8zPJmN7tZ4XEiZ4e+fvWi2KgMj339yAmlLsdrS3z0wU9s+MAu8luiv0fsIAfFz96Jocdb15EBR9iRQ1/i6tgJIbjii//R6Ri/fFD6X3/Pf/7zd2984xvLbVG3sY4//vjdbW972yO3cnKyJpffbDAuyYhcuthS+1nbbR8ffvZm4YYnuLT9e8e1/GC9hGP6tLJqHO3rx79DKXaRY79H7EzOxK5R3x5/6sgIv1xc8j88bUmvjRwx3GdH9LVyYAc3NogtOfGx7bt0TE42/IlJj0fe0qMPYv8hOuM/OfjZb5uRFRlsIMdxcOjZvlS3LZ6W0JlsE4RMTvZnSAIkCSID/9IgyMSbyVL/yEgyx44kbm1TZEugmjc8dd+lffzks9uJFj87ZuSwBU9k0Vfj0OqPn22947SRaWNHfGz7a2d78MoxGcGMHUu+aCc/tkfeiCf2tbaEnw2nn3560ZlJru07OmaLyQpFzxKOIzl4xdKzAR4yJiOLqPhrErZYD77B2PMUnitxOym6Ewdy7dtqciyPlfoEe+UIx5q/3k8s1LGZTHU9OeTH7lpGfFKXk5262FX3XdrnCwzYgFdJjvr4qV4fxzBQssmVOhiLp/85+Y53vGP38Ic/vCygjjvuuPJRy+te97rFPnwt0WWLvJ7/iU/L6zh89uFIB1t7cnr86siHH77guE9nT1YwqnEMVr3+vTqYxga8ZIXq/dQp9RMD+vHP+k8G2dEb7GCb/VrfaD9+syHj+xAcyTdm+UXWIT7BgP2ID2wjZ4ShNpR44YXHjP/4ycdLf3QegmP8hh8bYl8xcuLPtniaAGupq2AmeQ4JBl5JEYqMyEx9XaZ/ytoGdUlw9ZFX82fwhV+prte35mv3a34DJDQjp/WfDPwjGbE9ulLqz57Y5HjkPx5y0j82KG1IW41j5EafMnxpU6o7xHby8GVSynGtb2k/NtR91PXq6z7tvjeiXLWxcEJw8qtZaWGnzSTspOrZh8QjupQ9HBOPnj2RUeO2hGNrc45r2clHdbXc9CU/elOnrGWkHn+vPu2jknybEwZ99UnDMRy150RAh31X6rSdeOKJu8c97nHlg6EXutCFdk960pN217/+9cvt0Ohkm62WXft7CI5kx9+R3OhfKiMjfWq7UpeyFwtteIKj/RxnIRH+fWXkwxcmNva1NpITzNKmxL9kf09/dGo7dFzH1lr+kh21zpZHG3n1vLYkq+bPPn6ELzilLn3aUv4Hy/C0fZaO8YT/zODI5thtfpBDkbukv23bFk8tIgceS4xMjqPEXRJtkpQckgJ/ZI14BF/A64RSh7eXWD2bwq8/XjagXt+RHemf5HNStU8WmTPEjnqL7J6M6GvbDAaY5KSZSXKfTyMc8dVY69dS/IxuPPqNdC7ZTjbe4EjmqH9rR45hCP+UcmlkS3ja0oOdnrNBbPBmipP40572tPI1al+p9gCyW0Hag0HksJkf7KgnJzap7/lEBjtreUs4RldbxlexD45L+dizhUy2alPaEHtmCF9OUhaa9vkZH+2TqT5YqfNQ70tf+tLdC17wgt273/3u3eUud7myaLrxjW9cvgzOrviEv5ZJNnnqbfDQN7istT+8ZFk400n2CK+R3BpHNpA7opFsz33xEcXv2bxmB/sTS7qWMKFPH/2DJf1LPCO/2EwWLPHLBfbPED4be8hbOkeMcOS/8YiXDH4tyenZR4YtcVQGo55eNtOpn30lfvszRHb0wtF+cmFGTvjIcFXxUJqL3qFazgF8guj1zfe+973lOyaziWGS91E7v/gzyUrIXjKCU8JLgtw6cew2Sb6BQoYkxT+yJQOZHvpNUE6S3oSYJXrI8y0WD6faZoiN+NnsezLepuDDiEa4OJn7XhYcM+GSY/D2KBMkeXTb+EC/fTKU+rHRfkvBMfViQYY3a3o0sj196fJquVgmjmnbV7IvOHpDih+ZJPfx1u38JsdDyaeccsruqU996u7UU08t3wy66U1vunv/+99fcksO8hexWy6lpN8iAG7k8Vtfx7aWtJHHhzwbIpZkzBL5ntMRB681w5FdPerFAz//jQu3zPDL6V7fnszUyTvPKYll3hBSF/nJLwtRfsv9V77yleWZpne+8527q13tarsHPOABu2tc4xrlbT1zhO84sYuMnDyyuCEPjmxnM4KDuYH+GYIXGa6AeWuRH8mttXL4RE6NYxblPRkjfPlkTIiB25n6jfr25KozP/Plox/96JF8iBxYtiRO/OdzNjiSM0N0iIu5Wi76YWKeUjdDbDS+xEHcjZWe3WSOsFFvjpdvGafyI7myxh4xML9mfmID38S6Zw/sYJm462tumP0OHnv5zQc20EXOLI58hKMtWLF9lrbF0yxiTX+gC6aEMDD9vyh1CUzTfXhociDDA7Zui9g3OEaDQCJp109Chd83SOjXhuxLsp4cMrTpY3KT3G7TnP/85x/a2WsgmyzEnkte8pIlocldS/qSo/RK9wUveMGC4UhG/Gvli4HB6ptCJgT2KOEzInqjmz6Tie/yqIse+6OY8r220zEZF7jABboqI7NtNMEERydDsdS3NyG1vO0xHrGEY2Lc9lk6httb3vKWcrXjFa94RfHH/0H7sR/7sfI8k2ehYGriggvc2W4/pTfA3GZC/FBvG9kjbvrBmn7HSCwPITLgaEyOYscWW0tsoB8/m+WDPFI/QzDKvGDCF+OQNnnDTmPPxyv9c17/sBfd//7339373vc+oldOHXvssYXHyctJmAx2iQOB32XNAAAgAElEQVR7yaPDvnnBsbGtX2IR/ftKfosHfrrPc57zFDxGWPbkZVzAkU35blivrzr6esQGC46Ma/7wWbmW/Jghw21m2AQvMY2dtaxgSEdy1758miU5htfJ3rgQu9mTPtzZzf7M873cZdsIR7lBv09YyDsy1Y369/y0aDL+fTeMD2wgC4Y9e+Ar/s5r2mODfJqhjD0254cAGTBZS4m1BbiLBJG5lr/utz7zaq5t/wwISByDQ2IaaLNBkQASzAnPZCvBEugzKPtMhSSiU2mg59sZmRRSsq1njzq8SjbT6VfVbFJHvtIvVBikbmR7rx6PAWZgmiDYM0smgeBooMJnny3a+a8/LGDgZJEJQZ1tRDW/PuT4hsghOMaO4OiY/BmiHw78kE9kxAdtjhG5sT06YvujH/3o8oFLC+k73OEOu3vd617l1lH6yVF9I5c8+2lXiqNYwDL4pU+Oa7/UkYniN/5ZHDMeyMPvRHVILsWXyJDXPbtr3/HEdn3ZIhfkcxY79Ziz8LE4PeGEE8qVvfOd73y7Jz7xieXf1/iYJd2uvvnQJ/14yXflIAsAcumNbWLP39iv3lwwiyP+5IvFi5cALD4it47d0n5s5ktwiK1LfHVb8pKvcho//2fiavHKBn7gh2PybWRP/Ffqg38WR35EvpM+LPlB/wyJq6uw5iX8mZ9mZPDDuJRLYiE2aMYWPPIWjii5l7JUVn+Sj2xGbHCuOhRH8sSeHH7M2M5GG+wsZO0fStvi6VDkPsOXQZGg5GQ9K9YkICnJI2OGYgN+k6RkyqAgJ+09mRIQD8piq9dvqS7ylXBIucTTtuFjty37bZ81x1lMkhO7IrPHrw8MQjlWhk97ZKVfXWrXF6Xkw6EUvZE1K4et8old8Kjtj0yTj351rgV3vyZf85rX7G5/+9vvHvnIRxb18snJx6IpFFk5VpLZ4iGv1JGv3bZEaVcegmOtI/yHyIp/wWXJZidFJwc44cPD5/wyr0/yJn/1Pmz5a7/2a+X/zvlff/e5z312d77zncvCiK6MYbZnP1iqs69EKe3H7tLwmT+9urq9tx+ZfLHVudLrv1QXTMiM3KX+bVv8js9rYtLKSF5Glna2kDWi2KsPvkMIb+1zZM7KqmUcEk/6yIDDmZVFf2RF7gjHGjc8jkd9lzAJjrXv9f4Sb9riN77MgYfYQt7cWToWbOWGwIbAUYeAk7bNL98s1lsnTC6uNr3hDW848j/ZTLauHvmleuhE0+o5ux1bOMEOPpnklXCz8EkdLC1CHvawh5U36OBgwfSQhzyk/NsUx/lVnZPM7Ani7Ibt5s+GwFkRgW3xdFaMymbThsDnAAEnd5erncCdzFFK+9q1WVzp58HSXDHRLwuAz4FpZwuRFqYWRnC0YFK6wmQBZUHkVuxznvOc8v/nYPmoRz1qd61rXas8hA9zfSyYLJbgrg85YrLRhsCGwFkLgW3xdNaKx2bNhsDnBAEn4Fw+97AxcgvOybm+HWMB4OSdy9r46vbPiXFnA6EWSvCtF04wtAj92Mc+Vj5u6Z/2enbplre8Zflff3nmA+aovhroAXLHZG6Lp7NBgmwunO0Q2BZPZ7uQbg5tCJwRAYskD4r6h71O4t6U+ZVf+ZUjV5acoJ3ss1DS37GTtysiyLFtozMi4CoRyuLT4udtb3tbeZ7phS98YXm76W53u9vurne96+7KV75yWbTq4wHkLJAsvOCrdLUqiybtG20IbAictRA4ahdPJitbJhYTjUmnvvR9+umnl0lIP/V+BaLwmuj8usPn8rp2bTNEb2zwi943cbyJEF0zsjx06ls6bDWpku0ktob44A0GtvClpZ5fTpTBS3+8vr3R42/l1cfksJMN+H0DiNy1tpMV+5w0fMdE7MRm1hY2wPHkk08u/jgZwdHWo+jVhld/b0exPbr10ZatlRMc8Saf3PKSCzMEf3aSxwa3cpxgR7aPZMePj3/844WX3Ne+9rW7Zz/72bv3vOc9u6tf/erlzbnTTjvtSO62stjAB7LyoDhb+Nij6ISbPkrftFHKBXVwrLdWjj7x1fiBpdfLD8GRTvjxgUx21LFudbfH/MEnH8n4wAc+UMY1DNQhMtmpn/Fq3HsbzWvQj33sY8siVT//IPmBD3xg6S8Wb3/720v/VufoWD57c5I/5iyxydWqnk/syvyhnU2H4JiYsctbXmTxcYbgyB42mJ/YTkbP7iW5bDG3KMXAVVMl+WvJ/AxDYyt8cMy4a+UkB+ShGLOdDbP5GH4+GxPeFmRDYtjq7R3z23ykTD4mr3v9R3V48n0mfdjEf+NlLYkfLPGyKTKWxphxop1+5IfcLI45p4q78wMsyInMNfaz1RZbcpx8WCMjfY7KxROHAYcymCW2OiUgJIiHOJNwAR6PpNVHnXbgG1QSSKKTfwjh9Y0igRHgGWJDBjI+vrBRYveotVHfbOxA7FAXrFo5ZIdHW2yosWp5eseRwaboFIeR7T0Z4Y1f4Z+1BX9wTCzZR16PMvD0QbCysZ1u9fEpMWnlxM/wnRkc2U9ncCB7ZHtrh2N8sdMtIsePeMQjypeqnVA9mHy7291ud97znreczHoy1JHBbyUclexYskWfeiMHFur4Ed9iZ6tbP/3jg3ZjcjYHIh+O5CnZrZyh2JE5hAzf7rKYMe+YM2KvydwCwcdEXWlykr385S9fHgz3Sje8LYDgkLlmxpYax/hS50ktS9xgprQhPhyKI902RLc4zRCf8YilMvPTjAx9+UJWnY//l737/77nK+v6f/6DXK1VIpotVy1F1FAUQUwJUEBbCIGakplEEggoXxQhhBA1yZJvCipCmssUKEwyUVDIAvxGaCLGklqpkasvv/SrP37WbXzfX26HmXNmnxef8PX2ea01Z8/s2dd1Pa7HvvaeOXNm5tieEXHQKRfKjeIbbcGaT6W21/BIjy351GJ7pj/YoIvDeBTHbPydsLEVD7Cwf1TkfnklHwhb7OxJ7YoDjpn42c2+/nd8hSG7e3636mHAoTGLh2tl+4hyrbX/R3pI9G0Y+ZH3tre9bTmb90QQUtRLdN8SvVDsXve6163k/+Vf/uXl7N27Uu573/veOuFhV4fUSUfCqa3Bx5cnlXROuI7Y0IY+He92SdixbIn27WsdH36OYUdSNOBhrO3aVrrqJSQbI4Z1+63tEtCA4NtLMs9h37NBv0H1CZ/wCUuz+N3S2aqDBQb6YmGPjT07cQQvXSU9LysdeYzDPR75aSJrcvukT/qkLYi7dfEIE/FCwVkeM64vX/CCF5ze/va3L2PlJS95yen+97//ku8mH3a9KO+cwCOGcJWjWzr24ah8UjpJMB6U/LETj1s21OVLezZM1Pe+9733mm/W08uOWL0c0okjm0eFfu3NI8ZEdr0kUR/LE33lW/hb3/rW06tf/eqTt4J/yqd8ygnfj3nMY5ac8Ebw/ixZTrGb7SN43DNlbtFf/JWXeza0kYtisI5zMVzDIx9i5f8aHnFWvPE4cnskfm3S0Q+tx8VRG67E6rPuNWPHgs89gZ+IQVvj/Boe9QF9J9jeTeTqU/PFnu+xni4srlyxZVzG69ju0jrO8OBLPiwwzNpx5cuXA8fVxnP8KPeEb/uV+mF2fqQXj36dsO2lqed8rrHgkbhi5aW04V63O7K9nzVHtD+CbRBX0rsc/KIXvWj57y2QJIT9XUp/9rOfvXz7fuc737mUv/ALv3BrcnnoQx96euMb37hcpaJrstaxs9IgM1lfI5LC5KI8Ijq9pCkBDOyxLn727Emksf1R32t72RD7TAyjHTbom6jHQTK2ObLODhvF3uSwp6t9cePDIob6s/21OWdHW3Kp7Tkb9sGsL0k293TW9fTE7oDu/qaHP/zhy9UPb8gmvliwT5xgOSjuCR75t+AlTrfajzjTwSFf+RvzbctGddnCY/3QviNl/POHj6N+R9ujjvXEOkyNcwcib17/2Z/92eXnUF/MfFELNyx4jIdyO3tHynjES1zSGzFu2dG+PgvPVru9unhk43Z4zE48XsK9hUcsMCgtpNi22m/V4QCWEc8RXmrPbzFs2d+rW+vXn3vt9+rHvmeTnbjY01nXs4FHuvib1Wev/pvlny7clmt4hLUFfmNpFn+c8U/fdv2z5urS9h178tSAVvp5wk8Trjo5+UGIS+VPe9rTlonrsY997ELyK17xipMTp2/5lm9ZJjpXq/zRqXfa+JdyieWE65qORTS/Jkoy2yHa0yeSu4FS3bJj9VHiSAIL30q6xaCNui3Rxn4+HAz4zdZW+3N1+aSf73PY17bo6Es6cBB1MzbowAEDvQYpO2Fa+9XOvnigi0cYurKQfu3WNtTTY4PP/CtnZNSna8neUTvaE2PiH/2jf7S86JJdJ4TicRWIGCf6fA8jO7ixv76Nh8XA6sO+sMYH3fovnqlZD+doBs5i5pNka2x3aT0ew1+MlZf07R8xwlCd3HDC6eT0la985emHf/iHl/uh3Az+nOc8Z7ny61utKwvufXJvDjwkO9ZnsGgLT3q4sT1iXHbe9QFj/I6+Z3wyNfLIV+Nyxo62sLBV/Nf06Trm4i++Mf69dVjCQN965ZYduHFp3LT/GuzwxAEMlvzuYV3X8xuHI262ZgSP+pGNFthm7Iz4YcJR/FSOmEbs6um3jO0urbND4LWOQzKDHT76Flwo1WV7MXjw4448eUJWl+EFbfG+lBLdgcI/krvHwBt8P/VTP/X067/+66e3vOUtpy//8i8/uRJlUvviL/7i5b4Pk+BDHvKQxaYOmTmj5hv5Y0fUQQf7YGnGb99mxcce2zp3T/ghlSWCurXulp30tE1HudV2abDzUfKyB7dSPDN2soH7cClb33H9IdXxSC8elXtYtGtfvmCoLzgoH/bs0GvBZXxm90NA7lSMenymX7mj9seq2TA5OjlyY7j+aFzAb3EwMH724mGwdq2zc6lP468y3HHCBomrZWP4UK9t+rXNztD07Cqc7NDTj/mdsVPb7CjZcZXbm8H9B50/DPaz/0tf+tLTgx70oFsnpk6czEFOVOkRZYvt7J8N5K6dIx9s2D4XU2Mo38zQmfFJJx75yqb6GTu1hcV65V2hHS5gkbPEunjYiocjhuKRXrr0s7e2MfKcXzEU07r93jZffMRjNtTPSDjhsq5PZm3wx3/zi3Fe3QyWsS17YjuHJcza8Gn7Gh7p0S8f2ZuxgzfzoaXYx1hm1vePzDNW/h+3RRYSk9Y74PnX7K/4iq9Yboz9tE/7tKVj/T+UCe2rvuqrlt962fCzhZMm9yt4mgSh2UCs/WzrIOXWAgO9zuZL8LAdLcfk6+pXcW3Z2EpU7SUVgQcWspdcYrS0f83rojzxUSKPvo+qF+sY1zXJLQZ6YscpLNnewjLus95S22wUW/VjKa9G3NdOamzkRxx8E3Vigq3BH06+q1dq28QodlI9m/J79LM02Phgo9yAo1zaaLpbFUZl/cK37XOSL23j4Fz79b7sw18urNu0Ha+VTaowhKN9XvHgJzk33Lv65H6yf/Nv/s3pYQ972LJdvHDjWcxhyZ992a3uUslOYp0Ny1jf/rHkR7trpXjiZB3LEbtxR7f12fj5EWu5HgezeOKLnnV4wrQXy8hh+ntt9+r5SEZ71R0p6cFd/hgXo90jNsY25dA1fQFHS3jOxaUtKQbYr+EyrMVePoxxXVrn19hkI1yXdPb2/9Go3GtxB9Uj1+JRYJ36uZ/7uUsnqfNNXJ2f8xBn3TdDi/0uw1tvMDl4uKGO3jmS7dMZ7PpGb7kmqfNbMurkc361sxCltkoJRZq8279Urj7wMCbRaHPV9OwmG8QkywbuLDMyDiY29MmsDf6cMLDFBoFttL3GVDv11vFo4Z8oR47W+rZxHVY2Wrbanqsb/VhnRzwW9ssROeZRZ+JEW59rTyrpkmt5zFd2cHiEx9or2RhP4IqvNgvA1Qfu49J6+bxqdnGTj2ydwx1fHkChg1v+1f/BH/zBYsOJkhvAv/Ebv3H5QuXvVLz2wc3L4svGFqiRR/bZPodnz0Y8xqHY9nisvrZspr9l/1wdW0d43LOxxc1W3Z5+9fDjrdisz9rZy8d8bJV81F98X8Nj+ZT9a+zAoB8I/ealbB4ty8dsNdaO6teOf7ZIHGWzNpXa1k4Jv2PFrIwc8GW5pj/yG4/X2pg7wuX1T2ipExHhp7qv+ZqvOX32Z3/20knqTcLI6q3K6khnoU3SOkhn61wHJvtdyfLT3hbJdaL7pjyN4n0qTriyf5Qqdlzp8hQDfX4l554dsYwCt8neFTS2SMlt3zlhiz/6DiJ+mpgR+gah0n0eYsj3UTt04ca9+D3RcY3Eg6dS6htYLnGgLQzaec2Fx9HVjXGEcY1LPaGbz2t45Et/s6cf/exsXb+od3LvKRNXQPx05N69L/zCL7yFccQXj/oSrjCuse9t0xGDvpT3+teYODfZip1fumKRCxZ2qo/nLb/p2Sdei9hn8zEc9H0pwqNyjwNxyX9zgDFonY2eyPE/dB/4wAdOj3rUo05f//Vfvzw5x9b/+B//4+I4ZUf85gX22d7DscWJOhwSYyIbtvfs4Fo/KS18inGWx8XpXR/xaGywOSNwwmBc42FrHr1kT27IhfT17aV8XNvEo7zEg5JN2CrX7fmAtZzV7loes2FeYUccswILDuKR/l4O7NnWd/LRmOiXFXXwHRUxyANz7Oj/nB0x1+905PFsPtZX/DSe1xguxcCGBY/Nt+xdI3erkyckvPe9711ekOg/pCS/TpMYlQgbE4WOOt84dW6TDoIJPQcs91AZOGuxn7gS4OSpidpkMSOw0nVyJ7nhkWD9zr+2NXZ48TngdnIIP7z27R3wSiS2HZglFAx7PtcY2oYFXlzQNzEY4HFTu3Nl/ULHQauDzNhX5/TbJ9ZigIs9PJzrDzzkRz8YkB4njsN4Utq/liZY+yx86otzT7Ktbdima4LvwYf//b//92LHo9VicM/ed3/3dy9/2Ouli/e5z32WWJsE9Zt1/sUDg365RuJRPnXAlh/yZE/4jHP9qR/Egh/442ZP337t2OiLi4l69kQ6HGJw8qdkW/+tBVew2sfvPe5xj2X8/czP/Mzpec973pKLD37wg5en6dyELzdhclWaHk70M9xbwi8e8KhvxEWP36NCn339ID/qA5jL29GWOOQ7Hb7gc7CZ5TGbfMQju2weFVjghEE+mhtwNhM/X/zGo7nFNjszcxV9OPDIhrwge1js13bMp2vyUfx84KKDfV8ojvKoHSxsyUH9wd41ggdjsjnbujw9Kk6c6ksYwqHc41I9zol1Mcz0HT15p0/glc/6BW7bR6XchbUxCw9eZ+VudfKEhB/5kR9Z3sPRCwKRYvGeFaW3Kn/WZ33WQjjiHaBMhCa3OqZBpb2OeeADH3j6tV/7td0E0+4pT3nKMjF494XtWSnx/BRQkrCxZ0t7yWPRxgJ37zeyPe6zvpbqamtAm5i9p2lW2JKM+Or9HezOCBsmRIO6d4jM2ogXj+abYIttz456eUPSxaP3ZdGvDrY9G3TH/XS0jYejHNTvdPH4yZ/8ycvB8qd+6qdOL3/5y5e3z/+Nv/E3Tk960pOWv/iQv+mYmPSdbfV4hB+Pts9h38InBiIfyaUJhn1t+K+E52M/9mOX8cUGjkicLhvDh/321R92OeHw3qQZGWM1QcOgHOuzx5+8lXMOCl458LrXve707ne/e/nZ/3GPe9wyn3johL68iM/iKK5sjqU22htT9c2YK2PbvXVXvs1PTqJhyF/+13pyR9+Pou4aHvmC20nHOR5HX+v18OK5fNrqi7XeuC1WOo0pNvfiH/XGde/LkpNeWJqcs1Hs+o/wr/0sj3TjQF/6QjH7nqf8O/kyPvBQHi7gDn7oSzzIJTgIbDP94SQcDn1ZXOdssA2zUju56N1n7h+clfz4k235JCfrnxlbTiC950l/Wq6xcfzrzwyyj1BbZ8M//dM/vUx2SNZhlQ5ExM3hOtEBEvnvec97Tm4qd7JF1Esw0jcc3/ZMHk6ythYTGzFh+XagM2ZF58EDLwxsnEvo4lJatIe7SZMtde3fwqO9JT/Ka7DHV7gNDsuM5BcG9vTdrA3+8KgPErayXd1Y4ifhU9vRr7qRo9qOJa5HnWt55CuB613vetfJ/TVf+ZVfuUx0PeXlZF6c2uNc2/o9fRhg0m7E1v5L5ZiP8cLmnsTjuqRbXTy2vWUr3PZZHznZar9Xx4e+NIYvxe+A6oDwpV/6pae/+Tf/5nL1+mUve9kyl7g5HG78shkv6uL2XH7VHk6xwHKu/bl47KOLF8sej9XHNz3tr5EZHrfsw5DUD2Nd+y6VeGxch+l2eMTHyM+ef23yE697bffqxV3MSotxOyNhUNKXS9mcscPvmIP1yYwNGPDX2MzeXo7VLrx4vIZL+nzQ5dO8O8ujOEf/1q+xwc5cD24wzLmglM7mXOExYfVNT71AEdi34w0zH5YqT9RZ3NhJkEsMPCdHD3jAA5b7Rbz518sDfbv0tIz34cAHJyLr7GJwwkS2kqMkklD0iXU+ZySO6LhqYEIvUS7ZwTF/2ovZt+gxjjCu7YQRXsJOy7rtuW066bN1TTJmA9b0K8/5Xu/j34GO7hEs/I0Cx1gnt8OhPpyjDr5HkT90ttpqlx1XVZyUK+tv+8oj34ze8IY3nL7sy77s9P3f//3LW4HDlu3K+rJyjD38I8ZL6zB0QsZnY+KSXu2UYU1nxFa79lWKp5iUzS3tP1KmX9z1D1sOwMYzfsLoZaLuafylX/ql5VUmz3jGM5a5Il99Q4+PSvuzXdt1yWdt8DHqrtvubY/8w1x8bMfpqNv+9b7qx7bn1nFkgV9+1mczduoDflpf4zqHYdxnrPAdH8oZLOmxSS8c5cLoy3rti9v2rE92xj633nFlBjuscpcOHsM8Y6P42IJj5GDWTu2V8LSdj7EMa/1v3zU8jvrW2XC8G/kd/e6t04NJGZa9tufqb/vkyYEecQJw4mTSlRxK9eMi+QN8DtS1+/whrXsWXBIlfBn4Jhn/c/ed3/mdpx/8wR88PfOZz1zw6QCX5R2cJJT22jZYjuAoaXRGPNBjZ0ZKBjqts7knsDaRasdfXNtXLOrGRFnbE7f92bJ/Fns282v7nM/aj6X24U93tDe2ta7tnsDPBmGj9a329he7dnTVjZK+csuv9mEffZ7jMZ/aGy/0qzOW9IuXu/qZyE9Gcpr/8vRcXNqwNbZZxzTGt7UOTzwWczxstVennTZ811ZdONQT21vc5FMZ/r22exjUpxsOc5ExRXBj24HIX6n803/6T0+/8iu/svwU477GRzziEUt/2E8HFu2L4ZzfrX3p46NY1Fk/KmNbWOSHuuyt7agf+Y/PLc7XuuN2OOk5SGVzxg4s+iFb4VbOCH19EobszGLhky475Ye6LTth1tZ65VbbS7HQt5R7Ybik136649i3fg0OMdPTn3E4iyVM9Ah77Lbd/rHEnaUYxHMtfn7oslc8o69z6/zSgcM6W8pr5LZPnnwjcUWps2IHgp6I8P85fhv1n0y3A/JoYE6E3ETbX1GYZDozhdGLNC2ukLm/wU3BvlUiUjtlnXvUZ+10pBgrr+kQ+qSTJ53M3p7U3v4SQft8G6glyZaNkp6f5Jy/2qzL/IUnu22v2+9tZ4e+9cqt9nu2xUvPfjxmY6892+M+fm3Tkz+28ThytIVHnTbpyqc9qZ227jOzbRzxWX+5GuUKyed93ufdygH7Lon+047NcLM7K2zQFz9bR23EpdJSPsbjkRj4I/SP+h3jo8OvL076sJMgdX2x879//nHAz/mvec1rTo985CMXX24IJnTCoS/htxTf6O/c+tgP2sGmbsaOtvoiSfecnfaJ2fo1PPKnv8TPf37DcaSkwz+BAYcwzQobYz+wwdaMxGN64djr15E3bcbtGb+1ZQMH4rjGlr4QQ325hzt/W2U6+rPcUDcjYYADJrFY2LNvLY35+r9+WLe7tJ3tfOU/Pi7p268tO+MyG39+bvvkqW9oEfTiF7/45EkVT595F4qfHZ761Kcuf3J6TcIH9EiJVDfzIcYVMROlyZNYd6CC0zuZnNgRmOpUSa3dNcK3TrC0PmsnDunVoWPdaK/EVyde7TrpUpdemLI32ljjtG1Jd2x7ZB2mDjr8zdipbRj4G9eP+K8NDAkc7OzJFo8OuvGVPnzV7dlSr82os9eWX7m5jjEf7qPTr7brX7acVKmjG2ejj2LNLl3r2R3bXlpnP3tbvkb9sPLTQlc9CcMlHKNOepd8jzis81kOOEhY2NCvv/Vbv7XcfO8KtKfo/K2T98ERc1nzwjghx0Hl2t+l7WLXDg4czMQ0ctJ8xtYel2Ff+5nxyX59xw4+43TGzshZeEc+LnE37hf7aGMcu2O7vfWRx2Iob/d0xJxPpSXdPZ11/eiDbn04a4dd/uO0cu3v0rZxkO9ia/uSrv35VcbJWL9nIx/pt73Xfl2vv8PLxjV20leONta+jmz/0VHmSOuNNiXC+973vtNzn/vc5TFeT5a84x3vWCYtd8V7QujNb37z6Z73vOetTtswddtV42CXICYRyW/yJJ0YaWdxsqQDdYrS/ibao2AaGPT565trWI7aoevqmKt2TQpjYq7taEO04UsiODn0CKcb3NU3icJmey0lI/3sOTi7Mjcj9C3F4MZ921s+9+ymT8eJr3eAjBPXWk/7LYHBQRCPcqAY97AUt/1sjjz2OGw27NuyE8/2J2I4xyNfv/u7v7s88utqqW39ZNGPHuUVg5zsG7d91o05bbaw8K8NkU9uhG6Mhu1IKWb6rhwbE7hktwPo2gb88NDDA07KRzmlThui3RZ2++kr41pfnuNxjcN2GJQw8//7v//7y1+qvPa1r11+wnefo38bcJLKPp9xTwfv9NXBIKfFNPbxlu91HZ14ZBePfG3Fv9ZtG346+iJuYNvjEV74teVfn8Ewy2Px6n8YXK0/l3fhHUsYYA0DHsM+tru0TkupMbwAACAASURBVKcY4JHT4pzJbTHQ9Zh//Rg/e/7bzz/Rh7M84oAocSinjO0wLDsvfGgrfnN7+ZjNC6p/bDddfdi8wu4MDsZgYENfJnJRfFt5HYdK+/UBHLM86gNY2eHftr7E51GpL8RAH57KozZqd9snTzn33plf/MVfXP7vyYTtlQGAuvL0+Mc/frlE7v6CwAfgw11GLkIaYJGrVF9nSiDrJrTEdu2rO1eO8TjY+r8rB869g8w5W5LRAJFY9GHZmxzEkegDcZdIJgn7YVNv/5aEvT7Eg76DYUb44gdm+uyyMcMjf+J2MBOHSWYvdm3DvsYJhxMPgyv/5/p0i0cx4CQe6BN1W1yaDAh/OIDbKzCqX3YOHzD+q3/1r07f9V3ftei86U1vWq54hIUPOeSGcXFaYOjmcn7UsbOWdP0MaHJip/brtue2xdFL7Ew0fkJs0t3TgwfOSv7hjEd6cah+LeKPA7mIRxi22q51x23Y5ZLx7R1tfpbzX3Ri8O4mf6fCppdc8odXGB0YtVES+8pHNo2rcmr0d25dvJ30mB/cJsD+Vt/t2aEHlwOuuPASz1s69mkj/8QpBrpxu6WzVUdXvPTos7eX01v61dHBcV+IcI2XGYEFBqV+ENNsf5hT5MTIhdhwxe5aymMciEFO6kv8zkg5o+/M8cYTmeFA2+I1rmDB40we8Sn3+LeI2VIfH41JHC4S0DO/EONji0P74phv6/T0RePsqF+6/IgbBrGLY6Y/tGWH8A/zTD+MWG/75ElSAeTmS4/6umm8dzA04dzvfvc7eWnlHrkjoNtd5wOpFusGRhJRcJHaKhNJOSNj8rqp9zM/8zOvjtNPCv3sqEMtI7Y1LryLRTLA4erfve9972XdPkl6Tp99CaQdfUnp5K/XOqz9HdmGwasfYJpJyvrCYPQulL/0l/7SguuIz3WbGR5hjKt4fP/737/cN2eihav6tZ+21/2gPU7d6I1TOWWc8GX7+77v+5an5/7CX/gLyxur3YfnYDD6+c3f/M2FRz7O9WEYxrL24pBP7M70Rba8E00+ETbP2bC/sRCfv/3bv30SowM/DGObfIwl+2HNF5vyaUtq0741RrZ8ifve7/3epT+8YPQJT3hCzZc+0U97kn1j7Jp3+2QXj41rGEm2a3Ou/J3f+Z3l5LqfFMWFl7ha66ofxz5f2svHWdGX9L2Xx72kcrkYjtpqfDQ/zcSeDzr08WgdhvKsNpdKPDp59eR1HLJj2cNkH+6MX3kQhku+xv3ZUOcLkXtt/+yf/bO7PkfdcV28Tpyc9BsT8LA9I9p7It37kcw5bIpvRtyS4+TJu6bwSM7lY/Er49mYmD3OZIdPV5KVH//xHz8DfWnLjpO33/iN37iVS9NGnDBeozTqGKTO/jzN5hs/chCpXsL5xqHe27dnk330c7N+w8CdyICDjby3/PiP//hyv43J5+u+7utOT37yk5dx0QR0J8b3kcSMtyZU8475xrzjapMrTd755kqB1xC48d5k78uCpavO2t/IDQM3DNwwMMvA3CnnhnUTlisuHqs2Wf3yL//y8m3TpOaEykTmPSqPfvSjlzPlDRM3VTcM3C0ZMDYc1H1LcqLkhZfub/qJn/iJ5bUZrsq4FO8bpMvQNzLHgDnGyQ8Oie1f//VfX1438O3f/u3La0s8tOJE1RU0bXHtSlgnW3Meb1rfMHDDwA0Df8jAbV956rd1N4sTf5zpcqDJ6elPf/rpgx/84PJ6AG/u7ZvhDfk3DPxpYKCTohe+8IXL/YC+RBgHDuKufrhy0qVzbW9kjgE8uqLn6p6fKL1I1J+CP/ShDz29+tWvXn5C91cU7tXShuCcTidRcx5vWt8wcMPADQN/yMBtz9i+MTtRcq+Tewrc++St3X6T9ZOdA4d7Ohwsrvm9/Kajbhi4Uxko5z3ZZd3v8w7c1rsXz7oDeeWdGutHAjfO3Hvxqle96uTvVMw3//gf/+OTv1RxdckVKfOT9VHcVmDOIje8j8zcrN8wcMPAUQZu++TJxG8yct+Tb9FumO6Pd9VbiG+JvvU1aR0FeNPuhoE7lQEnSG5M9JJY6w7USmPBjfGeiKveFwvj40aOM4C7l7zkJcvfK5mHvuM7vuP0tV/7tYsBJ1VuzMWrm2zdbO3Kt3bmID/x9bPfcY83LW8YuGHghoE/ZODQyZNvb132dgBwGfwbvuEbFgtuBjeJORgonSw1KSmJg4J7nr78y7/8lp0/dH/nf4rNwVDcJmXckE4aj0aIV/q+LZvk8e0qBdtbglvtte2gyyd9pTr7ky08bFj0r4MK7LY9ETYjYcmeXDiHfct2McASBvi3cG/pV0fHwg5O40J8WxJPdPgl6uiKodjUW5fj6i35ijt9pU6fEDzYV3t11hP7E/Vhqc7+0X/150rtLeKHx5camGZ5hIdO+VjcezyGs1IOxSMMZMQA01rCrt7+xkS22HPC6VUWXvXgSTonRs9//vOXv1j6y3/5L9/qd7HTY8NYktv81zdr3+vtsNCxzhZO9sbjWr9tmNngHxY8sjdjR3u5MPaFOrLFYz6V9vMlbjHMCH0xw0zEoG5G4KTTuIYDDzPx88cGHvFQP9S3M3jojPmY3S0e2eXLPgtd29fwiAf46VvwMSP0cWeBudzew71nu7zBI13b1/QF/PKRxKH1LTziNW9oZ6ndNTzSjUPrxbEYPfgBg1w2l4jfsoX7krntI8pKy+QT0UpPqnh6jnj00351yCjBA+bbnydetOvR75X5O3pTvEQyeYeHey98653tDDfXexzYO13YktDxuUWQCS0fOl9CuDHZxGCbbklhn/W1dEC0T3/RcWDynqMZ6YAKs3tM2JGcWz737GqbHRhwaGA02NZ6e7a9Pd5/HOIBj9oZbHvCJx4t2lo8ChyPbBD9DItteewnIleVtHfF1cQqbhzgFYfimJEmMSUMJic2z+Hfsi8muLxXR0426W+13aszXr22wpej8lFZzq31xNzBodJThT2BCwNM9MVjfS320R37hA3zB77lqDHifXEeTHngAx94+uZv/ublDeH6yx/7wsG2vqKDR7mExy2fawzjtn5gw+Pl9MuJsc2ldbnioRm5Akf5gY+j4gRRXsszdsy3RIxb44MPiwNtMXzgAx9Y+uKoT+3o6nN+vX5GPqmbwc6OPtV3XgpL1xw32xd4bH7TD2ySrfiXHRsfeDTPWsSVvrzbsoPncl/c8lIM7MxInMlNucy/n5LNb0cFRpwZO/pC38I2OzfAoB9dicWhuGExXx8VbeWh+QmG8qxxt7YDu/7X1joMxoR34c0I/uUPG3zDbn6Y5ZFPus1DeJjNRzYOnTxxBDAnCECEb3sEEZKDANM6ck3AiKVnETgC7o5ioEnI3qsTD0djxa8JwtvZ8YhXfB2xU9K67+wTPuETFh022KSv/7bEfvss/BkUktGf0c5I+UHHJC8GeXIEe35KXnoGlnfKjHZrV2nflpSP3iESB1vtqssHLmCweAcLDuJO7rZu4tZP6po0nKy56mFS7CBtksXDjISFjlzyrisx8DUjYjGheFgDj8bcHl97dvFQPlpno7G8paMNnOFV8u99Mvqk2GDbEzp4ZosvpQO3e8XUe5modzZ5ou5JT3rS6Vu/9VuXn0TFKm+c6NCrL41JfempRrZn5h6+2eEXD/e6173Oxr8XEzzGhL6UG7iAA56j4gTQXOrnX3GyET97uQF3BxrtLZ/4iZ941OXSTp+xYb73pcj7kXAxI3i0wKl/zI9iOJcHW/bF66luY+rovLi246RDLMYW/mEK27qtbRzCqkycaMyOa7HCz5+5TU7rz5l85J8N8w/8vc8P/hnRpzA4Vhgf9JUz84MTQCeQcpo+3ZGjNZ584NI6HsTwF//iX1w3PbtNr7zvpa0f/dEffdb3lkF970sdHtiEfzYf2T10JsNBCWsAcNYgQkYJJjAvItMeGC87lCQOyMpeFLcV0J1ep0NKErFbv0YMKAsO43HLDh91uP4oKdU1WdJTv5fY9PKjpKdOOSNhwYEDhG2TDFtHBU56bBQDfetbssevOEg8Znevvbbp5M82vyaVUfBoArevicCfy770pS9dnjJ9xjOesUyMYhj7YLRxbp1dC30nBNYbb+f01vvgH3mE+1z8a33b8SaOcO3lkfa1wSH/cWlfk3R2a68cpTmluYZNdkxy3/M937M8Qed+Sv9a8EVf9EVLH2vjgCjfxNzYUU/6acH+GQ60LQ/YWtsdcZ9bx595kQ0HTaWYZsYYHQv+cRmuMK7940Hb+usan2zSwy0xrok+gv+olEfaswd7OXXUhnbxaF1fkk5Gl40DH/V/49o2ruJzy4R+D6+4Z/uOTX7y2bjEKz5mRH92hShMM/q1lY/iMLcQ6+VKbc6V4Q4DfSJOXK4ljhvf9qujPyvpuGrFb/l51A4dfWH+to6LmdhHP4dOngRa51NGngmOcGyft3W6YdOfArvqpD5QAH7TN33T6R/8g3+wfDsfAdzd1kusrSS6FGuDO13bcbjW1fH5ap9tg736Jm3b2aytko217LVdtxu35QecDZ78b/kc9cb1NRY21DVYxrZH1sMQB3jZEj7grn3r4lFnW5vWffNzEPTNS06//vWvP73gBS9Y7ulrMuLT+JiJHza+KkfdcX0rhrGOb+3hr9Q/e/GPulvr4rbg4Fx/hJ0N622nbzse1Z2LqRzG9Vvf+tZlXpEHTpr8T6Z4nBSJ0UlmvLMZViWf2oTpnM917OVN9Wt71R8p+bXEAZ1wHdGvL7WFq75UD9da8EP4a79yJv70xz7L1oydsNCFJ7sz8S9Kd33JSQ8uMoNFWzgs9C0wVZ+fyrC3raQ745NOXwas021h66issdCFPT5m7NBNn571mZjSX/vcs1NfKcO713Ztc9yW+wTW7Mzgpouz8vAaDCOe7SPK2OKub/E6D3hnj5x3MoUQ+5w0/ct/+S+Xny+c1bnM+4AHPGC5N+HTP/3TT4973OOWp18CvnJxx2+KS4fqkDiZCYouHulbiEmyhFnbkjR81nbNa/vYhWfLTpOw/aRyq+3a/3qbLizyI2zrAb/WGbfppDeemO9hafCMNqzDMHKhHbt7duwj6VTGazZr5x4+B+wf/MEfPP3oj/7oktfPfOYzl2/DcDvIx8Gez8Xhxkc+7PKNqpwI04bKh1SNuOOfnVkscqM+ZRM2y54d++I+DHBbyqts2N6yUz7Sd3/Qu9/97uVnOvdt/eRP/uTpUY961PKzBX5dfWCveQgRbHaybZ09bZW4CMeHkLZRUQzZVbKzhXtD/VYVO3DWl9fYkVf1pfjYI+Kp/pbDu67StK0N3/phFjs/dHBcPrKz5TN/65INy+j/mnzEY1zmQ9/OxAQ3HC1w6dM9Hu3ThmhjITM+tc8H/NaJPs32UnHhQ1u8wZD/a3jkRn/KI7ZgmrVDD4dKuCzsjNjGcIq5NvaN+TC2PbeevpJP/cmn5ajQI3TDTp/NWTl08iRQjpBunSMlse5boIOJtyf/u3/3705ve9vbloOK//AyyfVkXjqzIO+U9sWHEwk5I3SaGLNDf89ObSrpk7ZbL7G27LRvUbyrL61vta3NVikR+WfPwA7DjB06FnYabOy2vuX3SF0x7mEZ/bK35lE81dn/H/7Df1j+7sOV1m/7tm87PfWpT12ufMDagduXB7Lnc9m58RFvdvELewN8o/lmVfHa2USh7hosa51Lduq/gPHPhtI++hZ8WtTbHsVBBcff8i3fcvq1X/u105d8yZec3vKWt9y6v8JVP7bKuWyzIVfisPqRx3U8o9/1+oirHFQ3Y4NNeIo9H7N2+CwHxZ2o28KDwzCHAR9bbbO1VcItp9nDYzJjp/jpwkDUzdhIJ1txAdOMnfwvIIYDOBt7dkYf/O5xns2tUn/nu7ya7Q+x0+V/tLWHewuHOnbkkD518hmXM3byHx/1C/uX7KTDRnbWWMO0rm/MF4dS20s+RzuwpofP+mNsc3T90MnTOWPAO1i4L8HfIPhmft/73ncZvG6afeQjH7k8DeNFga973euWzjtn707eZ6BJSp25lxh78dWJJWIJVLnWq736kmCsozceTLbswKq+5IOZ/622a//jdhM1PfchwJHNsd259eLWJv/K1s/prvfRKY70K9dtxwEZf+rC3wkRvR/7sR87ffVXf/USn0flH/OYx9yajMaYR/9rf5e26Vpc3WIzbi/ptb84i0WZzdocLfEgp+PAugl3S+LbvvypC0d19lcv3+y3sOvnfjeBu7/JTeL+k+5BD3rQcoOuNu730O5SnsYBX3gUx3iFagv/um60sbe+1tnapsu/pfGIxxk84rWMgkOyrlc3zkHlsfoxjkX5wkftleVjdRdUb+0e+79cVtf6rYYXVvilVz6K21wzY2fNIw7jcS+usb68HesuwF5200tH39iewc1IvsVQn6rb6v9LmByvy0e48HqNHTrpw0K24uIrzGGjFyfVVe7V258decDnubbZG0t6bFjiFObwj20vrd/2yRPiPWXkaZS3v/3ty1Uod/J7w7hHnQ06E57HTO/OMiY1TmY7Q0LT0bn0t5Jwzd/ooySib50NZfWVow2Y8ymZ0pXsM5IvZQcFk8TMgCwWvi3pz2IJNyzhYjv77V+X435cOJB3k7G+MFF7AOIrvuIrlv+pu9/97rd8aWgCoY8/UjmLPbxKY0afxcMa77ltfmFgRwn/LBZ65YfctI6XPTvll/3aKnGipE/iSp0TsrGtv1PxdnBXsZ/1rGednv3sZy9t/AN8tvRHMfGnfkuqh7cbc2GwfVRgrz9wYSFjnhyxVf/R62A/2x/iscCTjDFWV1m/wUyHv3N8pbcu88FGPLJZX6/bb23Ho33s2LZke0tnq45fcRGcwnAuH7ds8NnS/nBku3olvPya04r5Gux0R8zsOi72pWT0ubfOb/3Z+mz8bIuXX7owkfJlz/e6nn8CD7Edf/G57Ljrw9gzn2nXQnerLZW4Hm1UP2Km35hat93bZpseTNbh1h97PvfsqL/tkyfOgfHulS/4gi84PeEJT1huovUXCf5rSie99rWvPT3xiU9cAM8kzDngfxL3uYnYzzkegyzBjuJ0AupJRQdtA8uEJ8FK0LWdTlLU8yUBXP1zr4htSaUsWexfixtt9Z12Jkc63k3k0egZoUv0tXvdHABdJSjRj9iSR+WGdyT1viuYZsSJu1cH4NAAEZsY93jswIInbS3ju67YwJ0YnTBZYHUjsydI7XdQZ189e2z4suDR6BkxwRA86gMcin+GAxjkBgze54JH/TBjAwY/j4XBjdswEfFuCb8WXFfy79UZuC0XrONKO5x65Nj84Ke5z/3cz11OTn0R88VLHjlhNZ4IXViUuMrmGo/49Zn8FoN7psS/136tb1sM8hFGWOjDM2ODHTwal/pyfM8TW0dF/F65wJb5obGPx628loOw4wBXeBCDp55nJB7ZMyb1JzG2jgoe6eNxfM/TNTwaU3iTA+ySvXzcwod/T8viUQzZMFa28NQOh2LAh3yafQ9euapPxvc86cujYvzBYdyYV+AV++y41g/wmyezJz/ME0cFd/IZfhjkIHx78yyfYi/n8SGX9uZH/bEl7IgbbrbkNzszPNK1EPpjDmz5PFd32ydPjEssf8b5lKc8ZTl5UOdt4j/0Qz90es5znrO8n8TPd3dHkTAdWJwA9Q6QOuVozJJCUnn3heQ0UCWlA/OejEkgEXo/kfbjZACL5F0L+/BLVr4lpHfSOODNCF98sAN3b3qW7EeFjbCI4573vOeyDdeMxHvv1cERu3s8wtyAwiFxwPZuIJzZb4KIP7a0M+Eo6eov+OVBk4j95cJR/PzEI+56z1O+j9ipT2HzLhXvWbKuX2aEHTHIRxM0DGJ0QNkSuC34qXQifY973GPhKK7wqc2f+3N/bpn4fMHyX5j+MNlJlLj5cwJrgneC2nvH2MW1vmTHsiX07ZM77OlL/mdyqXykY37zvix2cTIjYhUDDMZXOTUzNpz08MuO+OmKT+4194yY8hPn+l7b2XwUL6FrXvBOHVxYjor4cSluCwzwzcTPFztyr3yEwXjZy8ctfB5vxwUe5XfcsSW3tgTfBAfayQe5MCN41Bf09aVbWxwr9nxu2RY/O2LuOCMHcDoj9PWld4bhgl024uKILSeAFjzQt9AXz5YduPGGy3gQQ+N67fPcuNaWPyfC+sQ8MsPjqO9LDV9yQd/MyrzGyoPOEAQAXmDnwIMsQfmHcz/leSeLF6zprD1iVmbvmE0dJ36LxDEw1c3GiT8Tim9GbOhMNiXbltjHB1+1kaCj/3DsYbFfIirZM4gMipkJCTa6STHwuee3tuuSHQPMN22DC5+zNtiEgb44ii2OtnziXuy4INYdrPBJj71xUpDzcrnS/rgWg4OF/bM8hhcG38rkAtnDvuxcfdQXsOlLE3XYVk3PbuJd/PQJG3Bkf62svj6vLV7ksZOd+lLpm+/LX/7y5elcGJ1AuX8M5+zQc8+TeYSEwbr8Jjjem/BGHsUgF/TpDI98FKu+ZMMyKzjhWwyWbM7ktThxIh/KCXb24in+fGh7TT7iuj7VT3yzs+d3i5twjhjgC9uWzl4dHvVB+XAuH7dsyD34nTzAYym+rfbyGAdjDNrBPyPZoGNuk+ezuQSD+clVVDGweU1O02NDaYnDmf5w5a9x1VhX7nHZ+OevOFwx6gutOnIJQ/owG//az/LID38WJ09kbx5Zdp75uO2TJx3p4CMh/NeU5ed//ucXl755etLOZTXveHJgRPrdScaO15kdJKo/GquBgEd6bCTn7EgiSUuU6dOxL7lkw35LA+Bc+2zulfnFxYyd2tPJBh8zNsLUSdCoO67XTtnJY3Vb/te6cp5U1g/FUP+t9fKxV9JPbpcDE4J8uDYf46H8gq31MI4lHvlUasuvEzgHXLFUZ+L+qq/6qtPP/dzPLTeD//iP//jpMz7jM26Z0jbezBWt32pw14rxsicjd/nWds/Wnp3aw976Xtu9err6Ie6Kb8Ze3KWTjb2YxvjDdW0M+WpM7fnMz1YZfmU4imWr/V7dOL9dY4eOfrAUV74u4dFefmt3qW02K8Nq27qFzNoZ9dOtXAwe/GiMZq/cPKh+q1m+cZON6m412lhpTmpXOpd4WfO47sPsXSqz4wSM7/xe0lvv375WuW51ZttvnwC4Z+HJT37yrUtzTpT8/POwhz3s9KpXvWq5IuXb043cMPAniQETosHciQZsnRT9ScL5Jx1LE6Bx72cZV41MqK5YKHH8q7/6q6ev/MqvXF5lYq7wdvZOnPB/IzcM3DBww8CdwsBtnzz5dmii9CoCl9q9KNOZnBMl9744qXr4wx++PElz7RnenULmDc47jwHfwiwO8G4C9xPzu971rjsvkI8w4sa2nzRcjncC6puhy+ou87/oRS86PfjBD14eivjn//yfn17ykpecPvVTP3W5/N4VhY9wCDfubxi4YeCGgcMM3PbJk0vzTp78y/lf+2t/bbkRzeWw8Z+z/R+Vb519Oz2M7qbhDQP/PzPgoO+qiHvz/v7f//vLlRL3693IPAO4tLj6ZKw7kfrpn/7p0+d//uefvvu7v3v5Cd884UlcX7qctOLe1b8buWHghoEbBu4kBm571jIBupHLnff+7dy3TROjb/JNih7v9OSQO+SvucHrTiL0BuudxYAcdf+NK6cO5H5K8oTYjcwxYLz35aif53/pl35peXGun+7c+4hj0j0SuHdVykkW7m/khoEbBm4YuFMYuO2TJ5fnTZovfOELl3+W97cKX/zFX7w8Ju1kyf9TvfnNb17+vsVTEl3ev12C2OG3iTi7fgJwM6n7LtzEbj/Rdqt9+7JzLS62XYXzKOo1P0PQd7XOEwCwOJgo1W/JOhYHL3x7isEJbXzE05Ydda4S8pU9T4P0FMKW3726/MBwDQf0s+GmYjbEpG5G6MQjvWyO8YvZCb6Dtysj3/zN37wcwP205BUJnnQb73ta59AaD74JH3KPTzxcwyM7YtAP+hLWGSleOmGY5ZCuWOj3ThlxwbLmJX/K8sgJUf/956c5f+b76Ec/+uSFl/S1M1bY5MdrCdRZuvfJPttjXx7loXjZwKOn+8J51IZ2dNjAg8fcrxnX7IgBj8V8blxv4TMe5Jg5TTnm8rieLvtyO7xy/Roe2WNLP8AgH68Zk3DAEI+Np/AeLembF+ShfsGnOI+KGOjCYxFXubLFo1jjG2Y+Pfx07biG03vNYOhJ0qPYtaMnZn0pH68RceABb+zY3or9nG36Fhjo42jkcq1rP+5wjm9tRx7zf64v2LRfn+CBf3ryAYajwoYF/zN6W/aPZ96W9l2P+QnIe528O8I3TC/MjEyTpf+489MdErW9XYnsyuyyXSe57wLJtpFVW7g6sYIDifbBqb39tT2CUwcUKz+wKCX5rLDlJw8iudnaExj5SWynX1Io1e/Fgy8JnR/tLdcM7HAo6WdzrL+0Dktx6wv4Zu3Egz4e+5Q99jtp0j/+h1G+PuQhDzk97WlPW66OegCCaH+URz61h12f0IN7lkd26BcDjLN5RB9v9SUe5GexXOqD9sMgBv4bI8ryk73xRIie93N50evjH//40/vf//7lf//8ZZN6vNY+XsbY+MKfPmJbHHDbrn3YjpTs1RdslE9HdLWpD9igD6vyGhFP3MUru0eFX7w3NirZ2pLixgFpnF/DI1v8FQNbM9j5pwurOFpmbRSTGMobZTFu8bCu45sOG+Wbco/H8q/5XRxszPKY/fT5vMZGOSiXrbPL5ozwTYc+YWO2L+pDMdC1ZHcLi/b8wK1dvIZhS2erjg1LPFiHYYYDvi2kK+TwszUrt33yZDAJxknK533e5y0HJG+z9S3BlaaP+7iPW17UJ8hAz4Jct68DBM2/TmHbBONbwfve976l3n/s+UkRDhi1dzDxh6O+RXmJoJM6ZR289nVpO9LZdqWrn3zgmhH68HtxWLpsq98SCTP61gYPrpzouvopvwAAIABJREFUC6JNtrZsrO3zz9/sSzLpsMUfDPrcdvi2fG/V6VcYlHjI7lbbc3X6mH4H4w42cqQB+13f9V3Lf6c56X/xi1+8vPuFTT5dIZnlceSaDxhmeSwmtvAAwyyH2WhS8RBHXyDad7QUg5cS4kQeKesTJWnbT/Pua/rX//pfLz/Ne/Gln+r9nI9/eeHkiVhXtxax5iN/fvKb5TEb+lsMeGTv3FhYY2Gj9q5e4VG/zPYHO/qCfjaLc+1zbxsOXwa7F++SPpzNtXxq7+reLI/wlNdy+mM+5mMWHGwelfzD4JjgZaEz+vmhg0f5SC5xkN5Y4sQB0zsHj9jgo2ON9o4RYriGx/DC0Pu61M0IDly5MjfIJ7ZmudTefOCY59hYjs/gcCXXWDbPpy+WvfHBp3ZhVerLWR6zw4/jvP4oH47ip0v0oyVMR/XHdh86g417D6yb3HyzJIA4KXnAAx6wbPsp741vfOPypI1L9ybND4fUYRLbJKwjXYJ82ctedvr2b//2hVRYPumTPunWk1Pa/uf//J+X/8xyc7ArEIj0lzLeNeMESwLokCaeI1jXAyDdOumIDW3EZFAk9C3Zq34sxci/UnzxW92IYY2THTrV86O9+NmbEXodDF1hmNUfffFvgWu2L9hZ8yhGdWPOyBcnVx6b/4f/8B8uk1m+XE6OE6VYLvFovyUfdNi7hgc2YJYL+rM8HTk6t84nG/DE44j/nO64j42+cITJfut4YbPc9DPd4x73uGWsPepRj1quNBtPXVLXXlvxKC1b3LA52tWGzlbbEet6feQAj3jQ5zN2yhu2G1ewiX9GRh6zJf5y7IgtWAgdWBpr6rZiUmeBl/DHxlbbpcGZj2w42MkHJ3EzdnDfl7l4HLk94/qP7cJj+nhgY8yVP9Z4ZyMdu+kWx14+8qNdfaX9NTzSq8/x0bjagblZzUZxxwMsYdtU2qjUXl/CUfzq6ucNlQ+p4tdC4iQcW+OjfXzG9TU80oFT/rOFh1ns8Qg7G+xtYf6QoDcqbvvkyYkTQF6I+bznPW/5LdI/zr/nPe9Zfr4zsar3xE0nWRs4rq5CqA5xYvSCF7xg+YNi/iSo8ju/8zuXKwsw+sd2J07+MuYLv/ALl7+FeM1rXnNyY6ttHaFjtJ2VOrbBdk2HmODFQpRslHjn8GhngZ0NQq9Ja083jMVLn071e3rr+jDCTJ+da4RfJwvFEAeztvppjl7xlCfdB+dFjV/2ZV92y1f97qDvW00YjvDITxzkE4ZZHouTb7jDcI0d+vWF/h3x5edSOcZQXtIxtmBi9yd/8idPr3vd607/8T/+x+VLkj/0xaX2TqRNcOI4yiO7YbU+YriEd72fnbgc8a/bXdqGgbARtks6435XO/JPf7Y/8RmGkR8+tvBkf2wLQ/Ujtkvr7Fv4l09kxg7sYSyGa3mkn61szGBpTLFRfxR/dtuuHPHzBcOMz+xUNibX/tt/qYSnfLp2XLNhXCiTmZjo4aEYcLfHX/aV9Gp3LY/hZKv1ytHX3vqIdVzfa3+u/o/YO9fqzD5nbxY3intqyV8tOLN14uJbqJMX6+6D+o7v+I5b5J0xeXGXExQdh0DfLK27evSgBz3o9AM/8APL+6UQCpd/a++PYn/2Z3/29KVf+qXL28499edeF5cgX/rSly6vWZDYdEqKi0CGBnVmJyIwzgodSwccB/ySbctWnZ+Og5rFwKBbUu1hybaY6eBS39GdEe3pE75wcAn72j4dHNKHgWRn3fbctpj5LmY2WvcTjkFrP55MQrXlO+7w0br9l3iERzs2CF021M2K3KNX7LbDf9QWvDCIly5bswKDpW93bGZHX/tS5KdP48vPEP6K6bGPfeySr3zqQ1cp4o4uTmzbX+6tcWmnTf7CsW53bpuNxrB1NrJ3Tm+9L5z0r+WR/zCwAQd7M6IP9CcZY8FncY72+CteJa7pz/plk29jJt9juVQe+BB3eq1XHlBfmoiJjpiJmMSzFf+eTbrykh32yDkbuBO/cc0fnWt4pGdhhz84Rgx7eNf1ccYWG/BVt267tx1vbMBicdybscM3XtJRwkLYXYv25ozaa3PNcQZ2NuiHH458r/1ubdePYbF9rdz2yRPyEfETP/ETp6/92q9dTkhcBfr3//7fL3/V4vdlJymvfOUrlxOpLXJnwesMgjQdT3zzffrTn778VPcv/sW/WH7PdPLm5lVt3vCGNyzt/u7f/bvLvUk2HABge+ITn3j6v//3/y5/RKqTYUQqPxJefMpznWQQp6tjtJ8R/ti3mKzYODcxwBgepbaW+NAvo80tLCVQWJVsZHdLZ6tu7FP69Y/1oxKWsf01PDphcHVJn43ftmG0TcRpicNw1n/2zfAoXpzhm036cT/Gc2mdDllzMdMf/OebngW+YryEof102MIDPPjsqt073vGO07d927ctY/ybvumblnHXv7TnCwfW44Jd60mxtq1UR8eiL8Y4xnaX1uFORi5neKTHfwtdY2rGBgz002tdX1g/KnziDia6Dhj4GbkdbeVPmbAxix2PxowThvqVvRk7MJR78NMNX9iOlHFXDtXHM1jYgCUMbKjbs2GfJdyj/hHMtcEdH/SJ0nYx1O5cWd8r4zRc5/TW+8LANwxshGfddm+bXvHAEh7tsz/qmkPU81nu60c2ZqS8YYMt2Nme4bG4+S8vwzaDRds/ms1mNe9q70DvgGWQuf/Jt1AnKiZTk616N7m5Qa2OutLVLbUmVkQInF33qsDh39ndtGqfk6h3vvOdi559yIcJcXSs+3Zs3T1TbogcO0I7V2P4u9TR9PigQ0Y7t4CfWYGtTqSbvz076i3pVJro9EkJGxb711Ly5COb63aXtsNqkmCDb5LdS/r2Z2NsG5dj3aV1/enm2P5BfhzYl3TDq5zhcYyXrnzK1iWfW/v1ldhxws5W323pqatt/mFhq+09vXW9HEoHjk48fUl5whOecPov/+W/LE8q+s/K7oOpfSXfeDwyfvLP19jvThSulZHHWRtw0K8vm7hn7azHtdjYjaMj9mBghxiz47itv0c72a6dfcbmNcLW7fA4Ysi/ujBWd6kceYTHMmsnHvkOV7zu+ZcHtaV3DY/1eT6yk93qz5VwJPTFMhs//Xgsb8axlv1LJRvxQD8bcG0JrOO4tn3NuBZvuMsBWEZutvyPdenD0AL3TF9k77ZPnkyO7tp/6EMfuvxs5/K9e54E9MAHPnC5r8hPah5Z/nAK0gSt49xb4c5534If+chHnv7tv/23CzF+JvSXED/6oz+6TOLIcsIU4YikjzjfrEdxImTSd2D8/d///ZO/lNgScbL3m7/5m8tTHE4U2ZrtDFj4dOCnzy+7e3bWiQqHE73efwErfXIpudjijz4u3fQ/I/UDHVfzxGBwlahHbBUPzOL3c6r+mhV+xeKJTy9f1L/nsPCLH1itK3Ewy2O69LMxyyO9xMm8LyP1YfWXynDgDo8wiE/9jMh9X0jqB5Odn7296NJ4/yf/5J+cHvOYxywYcdUEims5y7989qSaWGBQJ8Y9PPaFs3bFMIO9tjDx7apyvtt3pKQjl2DQF2KDfUbEIZ/MC+ZK9orxqB1jSn/IheI4l9fa2K8sBv03m48jvniUE2zOiHjjEQ94nBU8Nj+KRXzxedQWHmFvfqovx7wbbdlfPovB9rX5mA/HKXbwMCuwmKNhSH82l8QvH40JfMKlTnlU5AAbeCwXim/LhryVv/otHvXdNfnID3t4JMZlGLZ8b9XBAD88+mKWw2ze9skTUoB3/4OTl6/5mq9ZHh987Wtfu4DyB6Cf/dmfvXxbvRZkYCvZGW0h1ITtJmD3WNkHlyTzcr6f+ZmfudW+b9Qli7Zj5xrk4lF24vK7v/u7y58bI3wtyG8wOIHUqdqN+NY6W9t8SWgHfPrwSzB4t2RMGLHA4CBGXzz8Sw77TDRbok04XVkwMGHY87llQx1/9GGgb1Cxted3y454YIFXHDCwWz9t6WzVhcEj0e9973uXe3Ge+cxn7mLhl44lqR+O8hj27IhbDF2tye6lcowVh67i6sMZgYWdeJRH1wh9BxtigvLkrCvKfuI2zsWGJxMpH7giHWzgsL997LUPP+XdonTXhzZxaTxoZzw5gbtG+MajK2PX5BK84nQCyI7x2JxwFM84rh2syusx3y7Zkkva46cJHy541K0Fh+YvbcXtC6OTn2t55EP8+oPd+nrtd2u7/oRBHA765oaZ+NkdeTSvw4FPdo+KfKSLN6V4CCxb+ageh3zbr+ylq0d9akeXLVwYS7bN8bZnBG665eOsfr7wILeND7gal+2/VJoX4qFcKL6tfNRG3usvmPmlP3ucoRvevpDpw5k5Ms7EjE/CJl5nZfuoOmGlBPbot7cKu6T/V/7KX1nerWJidfXHf94RYBF3uyLYOostA8kE6Wc368QA9dMh+eAHP7j8jINoiaPUoQaDdoSeeqS2Xz2yvb/Kn8Zme1G464MdbdwDwpZ3V6iDb0bYwI1340iGfO11avWS1brShNp7ffJdu7bHskRPH35XFW7n/RtsfeInfuLi5pzvEUfr8MDgbcxhuMaGCdUDAa54/sIv/MJyQu1dP1vCfn1lHQaD+loe+WBHDnnH0YyM/aEv5cJs/PyxY6zhwbhs8p/BYnL35CFu/AzuarJ7CD0Y4sTUBOqdZnw5EPFlvYlYPv/e7/3eMibxaZ+F7MVkf30QVnbuda97tXmozAZ7xlHvgsn/ISN3NaKjL+uLWRvwi18uNLcwvcfBFjbz10d91Ed9yHt59uYZ9TCvxatbZiQeleaF3n02g52/OKN37dyAR33pz+atN/9n+0hcfkEwrrzMOTkXC9v5qj2/szyOGPWlcXXNXxLB0kmHMQHLOfxhHks5yL9jo2Nm2GbsOJF2HK0vsw9f9qpTjvnIj8UvA/pyRrLNj6tWyuagGTv8O5F3UYTNvXF0yeaHjrBLGqv9gHBuMcA98m+ybvL2/hdJ/+E6ceKeLz4Enl0k+m89J2wmciciXh8vwUxcJj/iQOC1CfSR/xu/8RtLEhhQ7NW59juJqc7fTOwJHYPSgd/6NcJP+ia+I3bohM+gcBCzTUoI23tJrT7RLhvVHS1HrPqDb4L7o8IGDHSdkJNiOGojHS+5/Nt/+28vDxF4kvJjP/Zjd/mML7owWMRQfRhs7/Gojf210U5fXCv6QS6Mdo/aisds6IM93Odsmlj9BO9pOvc3ec3Hs571rOVEgG0nBGxbrBO+xxKPZI0hjMvO1Uc5afyRbKyaHdrkB4/wbp1MnDMSRqV8VF4jcqJv3NbLpxlb5iELwQ8s8bNlJ6z1O78fjnyEoS91W3636mAIq74g4dpqv1cnhuZH+VSMe+236uGHhW76I74tHfsJ/+SafGwcww2DOGb/4xVeGORy8+M1PIq/MSEe2OqfJcADH3TgiMc4jKO1ierDa/taHnFood+YWPs7tw1zNqyH6ZzO3r7jR7cdCyZZYBBKIsrJC2AGmzrb7dsxdbia3Xw1mH0rfv3rX3/yNJ2zc2emL3/5y0+f8zmfc/qSL/mS5duCl3d+z/d8z/J/Zoh/17vetTwR6KDgm4CEyB6sJlyJJb4SZV2O5GtLbzYZxcIuXct4ErRHSm3jwTbRD2wpq9uzMSaRNvSukfo+nsQ/aysbY1zs7Yl28VQfqOPXT8je3aWvn/SkJ00dOMJdjtmOx+rWmMqRsT6dse7SehzIQX7Z3fO5ZysO2MIffaXJxr44oy/f1ZlMleNi7HzjN37jcuXI28JdcerqElwW7eFkP93WlZYkXtveK+EdYz6qN9obdeCMi7HNpfXiGW2pmxU6XXmrL2ZtjJyyIaZzMvIe5spzeut9fIm/OXzsl3Xbve2w6INwV7ens1UPv2MIgcP2LB465S1dOMzxe3bEbok7MYz5sIVzr44u4bNlr+1WPQzZsO74dQ2P6SjZuSaedOgXi/U9GX1qI45z7ffs0LHoL/2o78xhMzL6tR4PMzZqe9tXnkzKBpdgBNUyghyTc6wPxGzJhg7Mru2/9bf+1vJzj5/X7nOf+ywd1MlST/p5+/irXvWqWzev0/P3HN5Pg0Q2dUaD/Aiu4qFn6Yx69psunyVl6+LL/hqLfXW8dQv96uoPetld21A/2qcbD+u257bpJOFgd89vbccyG00Q7duzwY+rffgWKz2XYf1FiPd6eVXG/e53v4UXBy/tt2TkIOyV2o987MWkvX3jMupt+d2qiwP2wjBrRzz4KP/iBgf2qVeyz7af59S1/ba3vW152ex/+k//aXlr+POf//zlZzr7cczelrBJtAmzOpyQ6qzXdtkxfIwxD9W77cc243r9EGYl2fM76rZOBy9wE2V2anOkpNc3ZNzBMGuLTtjjs7rqRyz1QW3ts77VdtRbr8MZ1jH2GTvainvMm9HW2ufe9sijdXZnYxr9ZqO6vZjst097C9lru4cdzsZj9tiYsbNuy55+Hvt4z/9YH2d02bwmJjZGv+zE4+irdfvGOcZ6OGpzpIwDmNnsWF39URvai58+O2MsR2zU5rZPnnwbWHcE4wJswAB7TScFcl2OiejEzWVMl0Hdd/SiF71o+bmOb/8F1U2viPISTYub9nwDd0Chx54Jji3rM50RtnTSL972z5RwkPjb082HzudX+xLBusSozZYNmLWvTfptb+ls1eXTvmworxG2Rt1LWPo26r/V/N3Ku9/97uUE+a/+1b9660S2vt3Cs8UR//lVxtOIa7TVAIS9xf5sjG2PrqdbeVQPFlIOWa9/nGiyF8fGRFeTXH3yNJ2HLnzZeNOb3rTcd+beL+1wMNrcw6MdH3FWOz6r2+MxrGPM9Mbt7B0p6Y7619oZfV1jY8yP+mfGTtzBkZ46Y35L8Gv/WtJd1x/drt9m7BTv2seMjXTj0bb4wtP+S+Xos3XlFlfZGrnUtvxu/2zJVz7P+V3bFXvjr9jVFce6/bltMYmDpF95Tq992o7t64fGd+3OlfFwrs1635hL4c/3uu3edpzBD8MM5rXNP7pksN5zcLuTE3/T4L1KtiMWMMu4fdDsoWYlnwNAPtR99Ed/9PJXME6Q/BxHHGRhU+fg4OZyfxdTIpmInAReK3UG/7MdymdcKcmYKHuYams/v5ZisI+Nsc3ajvajH+vj9rr9pW26eOhk+lL79f6ww0XOYSmufv/3k60Tpy/6oi86ffqnf/rylJY+165JZ+2v7WzZjsfqlH1DqS69sbTPArM4zmEf9bbW6eORjXM+t3RH7sJTHR464DqR4sd4IL/6q7+6PCnrpbZe9eFLhpNO9xDSodtY3/K7hZNfPuwLy1a70R6d2qQ77j+yPvprXjiit9cmPPG41+5cPRvX9Gc2cUFm8yqfxZC9I2U6fF/L48hZMRzxvdVmzA3YrrFHZ4aTfOYvTrbw7dWNOtbZnMVOJ9zKWf2w8V9fsjFiq82Rkm76R21oB3vLET9jm9EPPopjbHNknW76bIx2j+jXZvurS3sPlB2YvDzPzdjeA+PVBPe///2X9zx9yqd8ymLl2kC3IJj4HRidpOjAMbHgMenbFzZtSN+ykeWASOCyX/tOoGawssU/fX6vee8EHPD49u8mdzbDULmAHT4k4Cjaeazbo8DW40Qb2Gxvidi15xP+ax5phoV9NvwMFAd72LdwqKtPYHDP2sjDWqcBKDZPfnzmZ37m8gi9t9x7kgKX8kRM9c/ahu3yZ+SHfzYTuMSyxyOcFqJk6xoe6cHLBh57l8uILUx7Zf7ZcbIjn4wDXLAjx50wGT+2tfFTt/+FvPe97738jZKnquCPBydQhA5c5wRXeIJDPhpzynJMeS4e/Uq3dvzNPmJPHw6xik8+hOEc9vU+dsRSX5Qr63bntsVTDM1bxXdOb9ynH/QnYU9cShxtCZz6XBs8WPclY5ZH+oQ9PLqX9BoeGz/x2PYW9r06WOKxmHDSHL+nN9bLY7kv/+KOXX28J3zZHxfmlVke9TefSvxZv4YD+YODeGiM7GHfqsdZX4hwcY2NxpOn7ootjrbGdvnIt3U+5dMsj/qALhvGBN+zNuhY9KM+IFuYt7hb1932yVPf7l/84hcvL85zc6mfz374h394CfS+973v6bnPfe7yviWBA367wmfJrDSA2DWpSCz3wtiObH5bH+t1uI7InnWkugn+qBSPDqDrT2Ul+bkBuWUbRhOckwb6YirRttrn1z6+6UtqjxTTV0df3O1f26HT5GCfbQPLI70z0sChL6kNKgOF76MCo5j8lCoOfRm+LRtw6yecu7ro8VsvYjU5Oelw0I4/vOrjLSkv+CdKJ39sN9HGdW3WdsKuHhf67hoe6TWh4VEc1/KIuw6Y8FnkBeEHP7/1W7+1/KWSCcgrRtwU7mRLDjfJ/q//9b8W7oppj0f+SPmEM/3ID1v2lw/xuSgMHzDqMyV/fInhmnzk0zwgH9hid8/vAOHWKgzwwh+P+mbGRsb0pXHtgGF84mjGDn3x6D+lsaGE0bIWsXafHz9y+Roe9Vk48YhPHMwIfPWFudncoNzCfckuHuSqWIx5ZXl3Sdd+Y7J8FJclPotztFOb8gfv1/BIXy6xZ0wo5YI8OCriNNcpYcADO42po3a0x0P8s2HOwsNRgaP5qTmFDXm3Jc3VfFjHhxyYHddi50cOxoV49vxuYdE+HXbwgINr5LZPnjgFRlDEk22PeMQjlhcUetrJf965F8W7nvx1ij/mdaDTgf2kBnydeSSIsb2Eto1YpcFBsqeOtN96WEc97S0zJ07ZVbJlYvy0T/u0qzvDwcyVOrbCE34+1iJpxI9/8b3vfe9bniq0bp84z+nzIaG1oyOZrH/yJ3/y2tXhbRjow8T+jGgPg5i8XgIWg822eOy37aB6Li6xHOWRzbiKR4Ob/26yrn4vlnU/aA9nV1339Nb1YoKdeGN9/XAu1rUN2/zj7gMf+MCtv6kpTiUf+v3rv/7rl0nY1Tr3Cnr3i/dCET79R6WrUW3TPSftjy/+P+7jPm4ZU+rG+Lbs0NdOmS2TpDE1I2N/sOM1Jfp0VsKgL2ff7TP6wmP5WF9me2y3t/47v/M7y60Gbjcg8RtXaz31+n/0hcdzr1tZ22i7ced1FcbEpbGX3ljWH+r8bdJM7NmhY26Rj9bFxq44jwoezdF+mo5DdixbmPKjbB7y4t3ZfGS/cf3f/tt/W45/bhnZ8nkuFvG6Ii5mc0PHvnM6W/u8Y8nVZce6kYettlt1vmD5ggnDyI04t6T4R56Niea3LZ2tuuzA7MRL6Z7MWWHH+YfXFN2ObF/3nbDYVQ6lzjVIBeZbs5fpeceOUkf7i5Mv+IIvOP3UT/3UrY6L/AmXN03/FDEgb0xcDXITh/Ub2WbAGDRRNxZxZfFND3e+MXri1E/rDiY/93M/d/JEnfek0TOx3PC7ze1N7Q0DNwzcMBADt33lyYTs4Gayfs973rM8Kv72t799may9gdRPAd7B5Kk2lxv9VYZvum5Q7Umea74VFsBNefdnQG7JEeXst7W7PzsfGiGOjEuidELkW6Zvi64weYeTt/u616k3ufvyoy1dC50buWHghoEbBm4Y2Gbgtq88OXEy0fr26u3intRxafUlL3nJMjl79LnLg35S+4zP+Izlpxm/+RL6N3LDwB4DTpj8fKaUZ66OdAl8T+dPc70TIFeZXAHuPVh4w58rvq94xStOD3/4w5crTl3ytt8Vvk60/jTzdxP7DQM3DNwwcISB277y5MDm/gn3L3lR5Td8wzcs/0Xl0r/J2CSutO3qgYnbb8buQzCh792AegT8TZs/PQw4YZJH7ntwX5QHEW7kQxkwppw04csXE+PrHe94x/K2cH9f9OxnP3u5Gmzckn6ic7XJusWJ1I3cMHDDwA0DNwzsM3Dbs2R/VPjGN75xOVHy1xh+AjCBm7yVTq5M1rbdA+WPOj114f/kfOu9kRsG9hhwwkQc3L053N/vOAl/5zvfuafyp7oeX8aZK7u+0Dhx8j9/6txz6OGNZLya1891N1f1YuemvGHghoEbBvYZuO2Tpx6Nd0+TnwtcFVDXTwEmaN9kK9VbPNlzdzhx8k3dgcdBx7pHUcnsQYguPtzQi0Mnm+r27OSXrzhV52SWTlcSzmFJT+mExFVCNmCYkfqWjoO0JxnUwXBU+CVOtJ18swGXWNj0EIInNfH7yle+chcjv/Q8lULXwrZyS+zrxCE+8O/+PGVxaBOeLTva5Q9e27M8shsGNuiHb+2TfePK/nTU6UcLHj3t+v3f//2nhz3sYctrRDzl6pHz0eZeH/GvHQz6wxUs23s8hi8eYIpHWGzzRb826Ywlv9qJTdt4GNtcWi8+J5Kwm5fIJexru3yzAW+8dTK/bru3LW76xiUe9I26GSxiwGWPueMHDva2rhLyZ3/9pb22s/kYj/Cmf83TdvDDw46+YOtaHsd+YAefR0V741pf1AfFiKO12GcJqza2b4fHfk4Xx0wO1Ae4lJfmR3i2cK/jGLfZkUv02TkX/6g3rtPHpS9oco2NYtnCo72LKNryfy2PdAk7eCR43PK57Nz4gNUC+zW5PJq87ZMniSWBn/Oc5ywvKfSqAk/Uecu3zhGY0ksMH/zgB4++7xbrkqYYDSqPgRqcW5PauYAll8dYJbXEwCve9uzw2SKpLP/zf/7PRZeeQSZJOghZ3xL1dPmn44qgG4tnhA088PXBD37w1sBq0jliSyzauy/OX604+VEHmxNJDxp49P1lL3vZcpOz/17bEm39x10nsfTP8Wj/msfe1UXPZGv/Xj/AIHaTydhOX8iDWTEx8BUGB5stHvniM96tE2NRH7rK9Ja3vGV5v5o/R/b0q0VuxQfdvbwwseBxJh/5ZxtevHqkmT4fcit+7LOsRdza4UA/wuCJQDZmhD9LuWSiNIFv8bhnN4zGxe/93u/d+mKIsxnhUy7IIxO97U6gjtrRb75s8i0OPMJVzq3t2E/qZz6NqVkecVA+eq/Q+OLYtc+97WzACwMe9MdMX7Bv5vAZAAAgAElEQVStvS9Q8pd+/VC553+sN6+5Guse3DEf2N4aB/IxvtmRjzDoxxnBQeMCh3/mz/yZJb9xe1TKaTrevcZeY+qojdrpS4s8Yc84af6ozbnSnIQDpf6ADTdErGtRJ+ebS7Xlf/Y4w245zxa/7ODiqMRjJWxyaAv3JZu3ffJkQHL85je/+eRdIMT7iiS4+g463inzwAc+8BbJl4DdKft1XAPYuzv8NYikbAKbiYO+p6DYjLe9TlWfH4lAnHx5emo9Me3ZCCN9MRgIJvre9XMUO/18OtjBIIbqjtqB0+DAg590DTKDzuP07nV66UtfutxTZ+CYjPeErhj4j6c9DmCPR20s8agP2s9XttZ+6Y/2xe4ksifZ1u3Pbefvv//3/77EYHIrv9Z6uMJRuLUzqT360Y8+/eIv/uLpIQ95yOnHfuzHlhiyMcYwYl7btg+P8hGG+vKcDhvh1c7Jl/c8ORGyXb7t2bBf/GFlzxXte93rXmt4Z7fZ4EP/4dGrUsYYziqvdsLkxMX7ieqbVZOzm/zC4B1JDnbyeZ0vZw2cTksueceTK/pxSCeu1/pwjrlv/2//9m+fPP08I+wk5gVfiJuXqj9Sxpsvlnjc6/9zttiQT90rK0dmeXTiY96Q10nY2h5L9td549aB2Xd+sZMfX4r0o5O4xtTo89w6G76QseG9YbPxs417+s2vbOrTmT7x5cyXU305yp4NHI55o51c0JezQtfipAl2OTnOF0fs4Q1+45Lu3ji6ZOu2T54kgoOF1w94CabJgZTcgJnkTWDtuwTqTtovKUpiPOjY2c4Ur0TAE/0Gm3rrW6Jd0jr9TlrYI2HbsjO20VZfOTGZleKFw8G7wRKuI/a0LZEdZMof/5f4rd/6rae//tf/+vIGcTGOA3FtW0z0lR1A2N6Kn676ltqVs01ubO3ps6E9Xe21s+5EdFbosqEP8ag8N7E5caoP+XQfmFcROMg88YlPPD3+8Y+/hY3t2h7hRVs8xonykvDRom08jid49l8SvvU/nzDMSrlDD49sdAI3Y6uYy6cZ3driup+qmv/wAuNRkQdhwB9c5dqWjZE/7fm7hkc+SPnoBE4M8bLle6sOBphcxblW8IXHxgQ7l+aCtS+6FviLQXkpJ2vL3jUx4D8uxYBDP6HPSn0JQ318jQ0YLMbEufllz3b5VB5f4jB+YSbaX8MjvcbNtRyMvLExm0MjJ7d98iQgHXCf+9xnOSt2SVKiFCRnAFrUaX93EzFJJElS3CXM0VibDOlZZ9OyZ2f0lU/9YECQdNOvHPGoq516ftnYajvq7a3Tox+eGTsNRAdaE5w4fuVXfuXkJydXH573vOcttn3z+qiP+qhdjPEYBvFZ38Myxl8bMcBh234Djt1sruPXTpv0tTVBtr1uf2mb3uhvz07YnSC89rWvXf4SSd2b3vSm5W3S3uJrG7diYtM2SXfPdv1ovyW9vfbF1H7lmkc29jhM3/7RV/3Q/tnyCI9bNsdJNi7GPt7S2auj34lTduNpT2esL59wQz9+9rhUz762xLbxNONz9F9fwkGusYMDS/LhsjFjh//yCYfxeM6GfdrFdfrFcaQc7cOAx7HuiI0w0KNvUTdrhy+6xWN71oYY5HM26J+zwR8p9+ldMz+Wz8Vwye/idPURFrrW2141O7T5R9l8qPmHNgLCGZzB6cTJf9uZzAmS1furCZf4PPVzd5Q6QlJY18nKGaHrpGEUdWPCjPusN3iUpG9WeA+L+j08tbE//9bP+VwcrT74l4T0GhSwsHlUSmIl7uj6s2k/C7/whS9c8kedb7/8FPPafnG0n636ZN3Wdra0oWPxLd3Jfljsq+2WjeLMp9jZtcxIOOld4pEvfowvP9E961nPWlx56tXfcMA//rTJppOoMabi3cIYj+O+8I116/VOgtnuS9N4wImjylGfT/XxbV/fMMd2R9bF2yTPXv15RHfdhi45Ev9aVzzFihsizpnciEd29F+6o+3Rr/18WIh2Xbka211aDzd78jFb1V/Stx9nFrF39et2eWQXJv0bF0ewxKO29UEcbsUUf5X0rs1HY7V5GRcWPByV2sZjfTwTf77kkJgaE2NO1eZcSa98opvEZduV8adtfZ9+bY6WeMwnLmbj5x9OdghsbMTvURza3fbJkwAE4z/snva0py1n9n76cbOo34bdJOik6p/9s392a/KeAXgntR2TZ7YzdCD9kiH9yi0etvY1SLW3Ljm022qr70j71uWWz606uAnsJhfbJorqt3TWdXTlEf3k7/ydv7M8aOD3fXEUG7sNyNqOpXYNMG3ZLraxnXV2shVebesHbWzv6dvPX23CVt3a37ltuuHGg/7pAFEM/ITTDZevf/3rlxdfPvaxjz099alPPX3+53/+gkWbP7jrj0TFR48tkv6lmOgVB1zwxNVWHHGgjD++8td67dY26GgT3vTO4VzbsM1O+Weih7uT0a32W3VhGWNRdy7+LTvhoZuIayYmPuN+LPd45Ccf8dl2GI6WfPApD8QwgzscIwZ1xXAUg3bxR7e4YWq8HLUFC1GOy1ZcfI7+bPO31faSf3r8ZY+txuMl3fDS4bscbPuIfm1wBgPJ/6yd+GcjDlsP2+Lgrg/+ij9d7WZ55Cv7MM/iDqOS72yMWGfWb/vkCQDEPPe5z10Avetd7zr9/M///HIi5WkfT6A95SlPOX3O53zOrQltBuCd1Fbn6hQdLElnhE5LduiX6GtbJaF6fZBOA8L+1u3fsqMNKSG1t77Vdu1/3M6PPOArmbETBvqtuy/AQwbECbmnQpI927CMB8p42mvPXtwpW++bNn1xEdjG+MJCB+Z8KW+HR/rwKhNxySmLq02eAPO3R/7c8slPfvLyf3W1VdKFW2mZzUf+xCq2+rft0U/rfBRzpTq6SqKe7PVFPmuf/l77xdjGR3jpi1vJ9ywH4Rhz4Ros5VV5ZHvGDhzpisO2ZSsX0aFNXI/0zPikF498d9VI/YydEbsrkETdjI2wiNdSf+zFvzjZ+BixWMcRHPpjy1bxa0sqZ7GP/ZGuGGbykW+LvsAjm7N5JAZ+YfClYsyRGSzs4KacXMi5a34svuqU8TaW9Lfajnrrdf6yob/gtz2DnU8csFW/w2J9Vm775AkIN595jPyrv/qrl39rdnO4n+7c1e+kyRM3b3jDG05/7+/9vVl8d0x7HaAj61TbM6JTJQN963XuETsNgiYVftmRECXYlh1taqudJOR7q+25WMLLHt18z9ih09UWPJqsiweuJl44imkPU/7H/TNY8kufLcJny2jXuvgTnF/LYzbqA7YsTRj8i8OTJi94wQuWJxDda+iGek+PONmEV+4oy0flTPzh4I9kC67xp8DajWV+6MJBJ37gKIZRZ1wPs3b8WrI5tju3Hm/a0K1PZuzQIem2PWMjjI1leVF8Y47Vbq/EBQ5hcNDrZ1B22VtLWOM9/7PYcV8/KLM7Y4cOO0rxJzM20oEh/uJknBdqt1emE5fZw885CX/lLPbxRCWf/M3awR8M7FmnP2ujPsQjHuCZxRKPMFhnE4eX8nHMBeuz2IsZB/m9BrvY+Ve2vpAw+TF3hN8wLghBeWRQIjsAerTYo7keW/+sz/qs0wMe8IDlf7WcXM1MGhvu/sRW6VCxexxWqXNmRCI52XRVwYmDbcmtc7ekeiXfFj+RllRswHBuYrCPD7r8/sEf/MHp//yf/3NWZwtLdew5sHsM16sqZvu6RPYorDjgKh7rYurAscevd7h4rLqnQLXLTjjXZVxqa/Gager4JPG45Tfc6cCMR18oZoR+WOOxXJIPTlz+63/9rydv8X/ve9+73AvmxaFuoqfnC4srdPzrVzzQs28L9zls9LxPRl+yCVt9saVnv4Xf8ko+86veHEHsU7eFR986MLAhd7T18/8sj/yw40qlXGpeEtNRgU+8dGHw0IK+EMuMsEEflt5vVJ8ctSOXnBj3lBRMexyyaR/ucMAX394VNctjPsTQmDyXA+fiKZ887CGOWR7Tl4/mqfrnnM/1PmPK/MC/cV0slev2OKydNjBcwyO78l9O60v3cRqz8nxGjGM5KJ9cecaBuhmhAwPfYoHL3N/4PGLLPGMxH9GDATfly9qGvpaz+o1oC8NsDmgfTr9o8Wt7hkc24ITFoo/ZmcWyxLEOdHbbADWxPOIRj1huFn/605++vE/EnwP7Ly1/B+H9TzoIaXc30RGIF5vB0bf/S9/Q1zxIAgepe9zjHssAoS8pDNot4bMO1/lwaP/n//yfX+ptE23s37KjjX2WTp60c6VwRuiXhA4QYpAX6o4K7OzgwYQljgaFEj6Cl05otmzrBxPTx3zMxyztiv/ciVxc4sMCA/+4sN1++KyvJZy1U5rkZnlkB2d8Gth45NPEA9P73//+k/elic8rHLy3x4FRzPhxgPPXR3FIVxwz/VBsMOhLX4rwnY2t+Omox5cYKtmgX0zaqbNkL3+VsLMlZqVYZ3kcbeiHeNzzme+xxB2ccJTTeJidw/BhLOgHfVoe7/E4Ymgdbl8G3DsKQ/mwx2NjTwzlhiuT1/AIQ1j1JXtth+9cCaP+MP6a35SzPLLjpEdf4iAMcu2o8Gm84BE3bMCG3y07fOISdvu1lwuzPLLT2IbV8VJ/bvnci4UNccNjHQ8kHvb01vXF7d1l8ogt8SmPihd94vGe97znEldjnv5WTHBrj2t+tLE+yyP79HHgJFgs3lc1O675dvInn9iDfzYfYfmwnM0I4vnPf/5yf9MznvGM01vf+tblj0jdwOqlYl7Q9r3f+70L0NnOPtqhH+l2ONCJBqYOmY2zCc/JgWQ+2pn88E34py85S1L19m/hSVdpoaOtRJ+V0ZZBCQd7a5G4Y2xNKiWwiVX8Jph4rCwOA2fLNl/swAIDOw2svfZ07MNZ9uFLP/xjfNWNZfyxxY5ylse4wBGBAX4nRa9+9auXEyYnhT/0Qz+0XNHNf7HZF850YYiD2h8p44QdS/Ep96Q29qevjj5+rVvieW1n1G/9Wh71YbzIA8s1wga89DvxmbFTrPGoL9gU31HBnSUbdI2vbK/t6PPs50tuzebjqMse/2yonxE46VjEb2zPCl0c6Ac4CLvqjoq24tCPStvnYtEmH8VwDY/wsUXkpQWPM9jpituJCyzxcA7/4nD1AYc+oG8ePcLDysTyhQZ2eOgX2x4W7ZpTtYHfIofTzYf967pxH7/mR1eetBPDLI/s0XVlnMB2jRzPvB3rOkHAH//xH3/6kR/5kWWCF9yDHvSg02te85rT/e9//9P3fd/3Lf+vdc0kvuP2T0x1HS0ZDCyyl0TnQOORPnt1Zrb39PJnvwSyrRz14Donaxvn2p7bNyY9DHt+xebbG4xOGG3D4OWOfuY1sXWQYiMuR/vVbeEZD05wnGtLH46w5iO/8dj+ttd+45A+n0f8rm3YZgcncqGTaWPJPU3ec2WM+b86P4WHcR1fMeCVrnLdZsv3uq5YxWI9u+t2beejtnGghIGEOdvpVrKhTXxf8pneuhztW29Zt7u0TQ9+UnlJZ72fnn7FwbV9gYfmTpjiZ+2r7fbXJ+qvxc8fGW3l52hJtxw4qrNuBwc74mg9bOu2e9vpx+Veu+rLRXr6kN6sT7boJ61fY0fsxX80hvxWiqlY2IAnTLU5UoZlRp9vevnNDy5m+Bj74RoeYObPHDvjN7yV151ypX06LWehrrZ83dd93fJfNU6UDBQd5MTJY+YuUUbcoHq3Xr0mIbcS8Zyd9qVXKSHGfXtE107bcT3dPb11fbrq063caisXRvFm7Fe84hXLk3V+GnD1iWjH9v/H3n0+XbdUZaNff4I5VyEqqcggOShscnpBJCMZNxRYgEQRJIogGUUlSkayCoiCgIKAggoIklRADOUHS8tvfDz16+J6zqDf7rlmr2d7is25R9W8u2f3CNcYPXrOXjPdq8R2b7/frzrTF7mUeFKvPFU2PCkrf2R6/tm+A0FOMllM+xSBHyE3velND8985jMPl7vc5Zp4jflIX3DoW8URfdGRMu2jstoIfy2Do/Kt6BnxHmsTo5o/x2zP9MWPWf+x9ip/CobIR7Yve/t9f3Il7T3/bB9/v+Fd0RPbkVuR7XEFS3T1/cf2R/JbeNIXuVoes1X7Z3oqz7F6zeNaj+5j8unvfch++veUVSb26zj3OsITuVpW3rTXtlqvftf26K9ts/pMx4x/q/28F0+e8XEJ7V3velc78HugL7+e/fK1cLKQciLkpJXn/x9odZDw51eF+OyRTyzxzuTDM4t5tale92cyo/bgjb2UPa8ckDNyA4+POj7hCU843PKWtzxc//rXP3cpmVwWEr2Orf1ZHGYy4dcf35XBn34l7MqeKm/466+jnn+2b45YOLqk72FvV5ve8573tOecnvSkJ7W5lLmVX48zXcGhP/hmvKP2yMfflCNebbVf3ZY4ps9+6jM9FWsvP5Pp22cH02O2ez3h34O7l637NReqf5Vnqw7HKBbag7HKx0btO8WH6I/tkd5qd1aPXPTM+I61X1RxZCeYaox6+/ryAw6//ZQ979Z+bET+fONQbUV3bduqVwz4gmU2Z0a6IhP58Myw4A9veKqOtOGp9eg9Vp4ic0znnv7zXjw5Cbp36TtPToLPec5zDve85z3bgslJwINZToLuc3/v937v0q+WPQ58q/KcOqC9XL9f/U1fLVMPn/3ZSR9P5U89ZXScUs50aHdAkhMegPYG5te//vX2D2wttD3fg7JIOMU2md5+v39Mb+VPPWUvm/ZZ2fPP9vMsh7f9HvvYx7ZnBZ/2tKe15weNodud5tHe2AQPe7U+sz9rJ7uVQ+RGB19y1W6/P7JX7YS/6hjJ9G3BIs9s9qvenv/YfnAc49vbv+pP7PdyaZ/ZrfzHeEc6Ese+r+rt+0b74T8Fw0hf2qI3+8fKkf1jOnqZfv+YTf01jlX+mO1ed/I4Oa1/VUcvE/mUvc1j+1Wu1kdy6VfWeni1bc1Tfocnsdjij96+JHNR0HkvnoDwK9jmV7PnM57xjGe0qwv6OOtEeZ/73Ofg13OCdlGA/1bWYaBXqV6h2xMn/FbwtVT3C4399MEx0pf+9JG1nYI9SUweKaO3xgGfPguF3//9329vPHjJwNuZyPNOFt1k8Z6S6PEhmKr9UR2/mAWz0pbn+RLLkaw2vGIZvsivxpHPf/M3f9M+eOm/jvskgZcu6LHAzMLJPDOnRrGpbXBUfDP8s3bybEfnaDwjiy+Y1PEmDuRt9sVpSw8e/clhP87oW6XYVMYH9VOoxmEL+0h3/A6exGZFT+KY2CiTbyM9bBiLxC3zPPsjnKM2mCMbDPhW9MBXcac+srfVdlHGkR04kmP2Z3FkN/yJxYr/ZPFnbiSOSvpWKHZhUlcG3149+IOBzKk4yCHzU+zq8bPHgjf98TkYyKYtPmW/1xNf8dVtNHa9bPZXeCMzK3ctnhIgTjEeJylNAvowpg/32bd5RVjCqDvY3+hGN5phWG4XeBic3JRwJbDwqdcghYchfTZtSej4RE/lXQFG1iuZbre4MpDk2qtDnPy7DVcd6LG4oIfeEcVPcsHsqo3vTNlPW/wd6aCbDXFIDGD46le/OmLfbCMPCwy+N2X8tfWkzSLA/63zL3tcebrf/e7X3nyAFZ68UUJW2wrxxfdLYBBH+8ZihIVe7Wz0cXT7GelLLLPfOsqf6I4eXVtxxEdG/ppbiP0PfehD7dtNXiv3Vf7b3va27TMfdXxiyzdrUi9QzvmjTxxP/R6M3Eg+GpPk48hm7JMRq5BvufCRjE1f6mLQkxgkHuSCYTUf2aDLlm/70BXdvd3ZPoxwyGnzMsfBGf+oHQb5+LWvfa3ldsYcxr3Evvnk8Yjkch/rXpecib9+kGzlYy+b/YpRHOmEf+XYBmfyRxy84QTXaPxjd1TSQ9445Jil1L6X+OBc5LiQY0PydYSH//qNYXwwN0/JRzjFzTea2Patp5HNmS/kycFhXosjfCtjQTcZcVTSE/kVLPnOkzsFMCG5IVYjPWzIQdjZFU+2zYlgUo5kG8M3/ohB4kAe0ZcxrLyzOn4b3CtyI327Fk8mTEgAOG9DAqPfv4pwsBcAfSaIjbO+1SJp1I8FKHa2Ss6H6LOvpB+xC2euYMSugPtIG3xkMpj6tdnnywpGtiQOGTqcZGwVY7BulQbSosKrl/TB7mpD3jzrZdmtxAfPEoUflkwMfbae2KQHL/w2OrwAsELiFv0mlIWHOPKjJ7Y++9nPHp7+9Ke374Q897nPbTadIODhtxOFOOBdjSN7PYbkaI/Ffs2B9JOHA63Ekb/hp2MWR3EWdyX7bmd7ZtA3nDz35WqTf4DM93zXJtiOlXSKo419t9RH43BMD3zJRwca8VDWY0GvA1525YKYyyXjiMRFH55ZPsKenM0c2opjbz/7yWk6+EAH3cnR8G2VsNLDX/J5lpPOFeIPDOInBuJxLI69fvPBOMJAn/FUzuIINx4lv8meEkcxsNGVXODDSj6xL8fJwGDj/4oO8eBLMJDnk7isjEfkjAU5GBLH0XGG7/pr7p4aR/rjAx3yamsu9Tkgjs4HdJCXR5lLPe/WvrEwL+WSGNCxOjfIiIs4Ot9U+dEcS/6yjcTzlDiyGZ/hR/JgNY7GFWbY1eFayaNm2IIxlWMlIwKjBFYiIoHQfo973KP1veENb2glcBxDr3jFKw4f/OAHD/7X3UVBbNrYyOBHr4ESFBglmgniWRHJZiMHu2DxBUbB007XKkWOLF0+PnaKHr5Y3Pnol/ooCSs22GMndfJOmPzXR08ovNkflSanWPFhhdiHVxwtgpz4Z2QCyAP/A9FtKf4iH1yjhw4fL/PWXcZ3pmvW7orHXh/ggV18Eke/LlfjmBjAJO/EYYYBL8oY//3f//3hMY95TFtEeW7wmte8Zrvi5NMEpxIMft1amMXOii4YxSHPKe7Jn14/+w7U5gUMyUe6Zvr6MTdnZ3Hs7WW/6jCO3/Vd37Ucg6pDPmVeznDHdl/SU+N4yliYD05UezHUXAyeHJuyv1r6AeyHp2OLY94KiQHKsaHGdq8ePsFQY7Cqx1UnccgxZ4/tGkv2tub1Hn3OPU788nI1jo5VcilxOCWXHBdgYB+O1XzmozjQYV5W+dl4JIa1/5Q4Rp4+dsXD8Wk1jnxIHMVwdSGfcd61eEqwTBzGDIADPvIqtf0PfOADzSEngSyuOMmxd7/73YcrXelKm1dSAmhPmSAqk0AOMHe/+90PnhWxMIIJXp9KeNWrXtX2Xf3yCx9mlx4F/va3v/3hwgsvbCdtuJ28V4KZ5CFnMBFcthXih8ULik/qYjgidmM7icTntLOfhQH5EZ5qJ7ZMipnNEQ5twUEfDLE7s3nHO96xLY7udKc7tUmIz5iRZ1ssUfTM7I7a6Ugc9dMXvSP+YE9f4mZfX/YzQUexob/qgds24qU3cRFrzzg98IEPPLjt/bznPa8tnMTQgR5feIPvWIkfViX9cM1wbOniE3l6EoeKfSSLL2Om9EMG0YUyFnTaegpfbOIXi1X8dSzkAh35sdTbnO2zmeNA8nGGe6ZDO59qHBKDFZ/YdyxDiU3qozjG//TZp2PFZrDHXo4LcmtFD/maj/SSD0b7eyj5iDeydMfHPTrEIGOKv8rWenSxGRuxmTiEZ2+Z3JaLcNhfiSM7ZMjn+BZsezHgMxbs2+Iz31awwGAjn7gEw0hPfK/85Ee80TMqydNlc3w5JY7RoSQPR+/DyPaobffiycIiQVb/4R/+4abP18M95+N+MocslPzatLKTqMBd6lKXOjz72c9uq36gz5cEXRLkQK3uHvA73/nOg//15TkaBxu/MvxiEyRYHv/4xx/e+MY3treX/DsZDyx7qwm+m9zkJg0W307BmAHoyxVfJUXkyWWgj+kgYyPvJIGSmNGXcqSLnegQS3pWiC3yZG1ohl0+XOUqV2lbJoBxUo9s7NOZ+gqe6iscMyzBGX5lYiEPEFzaK88xLDCT38LuAOjK26/+6q8erna1qx3++I//uF3KFp8c4KvdYzbTn3GPz3RkvoRnb2k84nfimDHqdSRuVUadL8GgFJPw9jrs93bIb8VxpmPUvqIHjlB81pZ6+vaUiUF4jccKFjaTj1VWPDM+0a0M9spLx4rN6EvukI2tFT3mD8rYB98pcawyfIQtcyV4t0ry0RF5/NriWy/Phr5seFf8p4+OENnkw8xmeGtJB8xkIm9/FUt0kqMrOlf0iEE9vsEWfVs+sRXiw4pNco6NwctOxm3LZuylTBzpybisyEePctfiyQTgKIOCxpj/1YTe+ta3tsWJxRGeRz3qUa1dcDiL10YuehrDefwRtBAb9j3Ep/TclU17BlSQ/J+9t7/97e3ZLG8EWlRdcMEF7UFKz934IjqceKv+2JmV+OMjnpxsVxMjchnQY/L4wmNckgz0iL399M98whPMZPClbebvqD0yYo7EY0Ziy44Nn8Ue+choD6Ut+3vK5Jw4oGM6gh1v/KfDljxIHCvOHgvZ8OOL/Z7PvttZj3vc4w4veclL2vetnv/855+7ssAWWXFxxUJ5zIdqAy/7uWqUOFeePfX4mvHYi4EcSgzEMWOcONZYVSxkglc9OirPnrr4GQuYq83U9+jAyz6quPbIVh6ycCQfqt7Kt1UXk9E4xM9edtRuHFYpfosl3KfoIAcP/Inn3lyqeGtepH1VD/uwVBz2YRzpCm7+JxYZh2DYW5KvNujO8WKPDrIuAiht9fi0Rz488NuSh6mnf08Juy3EtxrTtKeEO+uGtJ0SR5gR24nlKXEMVvqiM7hWyl2LJwdi90c5HMMe+kWuGvz4j/94u/XlVsOXv/zldvI2uBz0CxtA/3fLfdbzARvH3KLzLEQWZAbHfwz3bMMVr3jFw1ve8pb2RoFbcp6dQf4bvZPRAx7wgIYBNnhdcdLmbRTyuQqSBM1JjK0R9kwsJR6UGLWdnX8ykWLjWFL3NuzbklTib0FkS1sPhQ12YxvvKa3ebMgAACAASURBVBT95OEPNvqTM5I8tx7wxM/Yg1cbXXVipn9vGZ/x84uu3taWrmBPTOCHyX7i1cvHz+DXn5jIMQt1Jf+96eJr/D5+6fnA29zmNi3nYif+y1U2o6e3OduHHw6yqSe2M5lRe3AkdvClPuLXxl7lgyExUerTZhsRm3QkVyI/4t1qi83w8N88XqHEjgxcdJ6SlzWO8Y2uGYlRT8GiRI7HW4vqOo/ZR45rp5BjmuOrGOb4tqLn2Jjv1SVm/EZ8GsVpjy6ykacj+yNZ+WfME/+t3B3Jpy12yKvTqb5CMBhXZa2v6MCbPA4m/q8SHeTgiD9pG+lKPuIP4Sc7In0jwq8vcaRvNY4Zb3LBHF9GNrfadp0tLZwczAWBUQ9QekAcaffa+YMf/OB2G8wCxC9rJwwPH3t42ALKm0T+f1kN4BawrT4LJ0RXgukBNDjvfe97Hz7zmc+0/le/+tWH973vfe12CJzILUUnMQPhgGJT9xpw/ku0YNKbhVP4RwfP8NKdE576qp/46Yos+6m3yuBPlcFv3wFG7GGvOkZ4+sTDk21gbtoU3DnQRK/9TJwceGf6I8NIeOLT1PCgw1jCQweK3uwPRM41kYusEwbscMc/jCM9cEY2POEzFupKC/S73e1uh/e///1tPljc0+/ExFZk6Mj41bZzQDcqPVbx6HVviJ/rMnbJH42pr+Chw4bg2jMW7CRnyInNis3YUpKj6xTsiSMdNnGkZxVLzUeyYkD3TE/swh+iQxwjX+M40qMN1soX+ejcU9IDjy24yY1szvQl9nyIHF2pz+T69sQ/7dG7oqfmI3lbxRXdKfmNJ3HUfkocaz5HNz3xIW1bZc0LPsN9ShzpgSf6Uq7G0bxEMCQ+Mx3BWvnIx3bv90xPxgy/+iljEVvJhYx/sKV/T7lr8cTRAM9Xji2WkIWMBYiHrt0Gs4CwiCEDkH2yV77ylduAzwK2B2x4OEyPICvZsrnKdIc73KH941SLCP9E1e24N7/5ze3XE3mvSCZxyTp5wZlfNbAiuPXZfDPota997XCwY98D9N7isIgjO0uA+NCX7HqI3fNjsR2cPa/96GcfkbcAZF9dvzilr1UGf8jjM6EsGDyr5ltRK8RWJqQFAh+SM3SKOWwWBME90s9fY2Hx7XsuGYsR76ytxpFvtq048p1M4kgvrK4QocRRP2wj/PqS73jY80aMbyxZNPnxoO2Rj3zk4ROf+ES70nnf+9635VXiFl/xIW9O+pEiL9PXOo78gS8+88NYkh/h3lJFR5+PmXcjuWBMHPDKJWNPT/IBn74RwRj8+GxyYTUf47/YiqMfP7OxG+FIG5x0wCCnt/IoMqNSLvzHf/xHm9fH5gDsPZHXLo9gEhf+iOmInzweePXbToljxWE+wO54OBu/yl/rxhReGPKdoxnuKlfr/JFH4uiYQp/S+Owl+ZgfMxlL2OhW9qQ9tuKD899qPtLLXzrE0bg5xq/GgJwcMK/FAY1w937UfWMnDkg8+bg6nvKRDnMisnxRH/kEo7wRS3U2xdFzyiOa+RRZcWCfLflkfy/RQU785YA8ig97dYRvV+Y5gOdqj4URo1k8UeSWxPWud73DzW52s6bXAFtQBSjnAJwlacDsLemByYBkofHEJz7x8LCHPay9QWeQkInittzrX//6cw+4J1ky6eDijwMDnNozsfAityL941oD3hMeA2DRwJYDhNuKsK1QkkvsyMPDR+WMEl/9MMDNB6U+cZAo8bXXgy/JE//JGM8VYlOsxYI8H2x0muheJnBVz6SbxQVeeuQNXDDAblshvgZDcs7+zG54MtZsJY7k9MMlTnTDOaLwsBNfyMsHvtz4xjduC4l3vOMd7Z/7atOPlz1ybGmDxdjLbXGs2Ea2axsdiRu95E8h/sJCHlb47M/iGIxsqicG4qKNP3Qm30aYyMCPEm/77K8Q/4M1MSS/mks1HzMecK0Q/hpHsUiMRnoSx9qXGCZn6LQghGnmEz3s6lc/JY7BQAdbciH403eszJjCmzxwHF2No7wTBxiMqbmoTu9eShyrDrLJ114PjPxO/GDgz2o+kqEr/sNBb3K9tzvbN55k6BED5SoFgxhUXCt64KCHDr6gxGiUj+zgFzf4nReU5Ec0iwsd4pj4ZXzEYi8lhokjudn4H9O5a/HkxIgSBKCtWpHbYOm3/1d/9VeHj3/844cvfOELh5/4iZ9oCwr/ekPALAoqb1NwHn8MFExKk8inBwQYCU6+N+QKgOeyBCm/oGI2A2himJDk8UWPYN/whjdsz6jwuyd22PfRRxPiR3/0R5vtURL1snU/g3nJS17y3IGfbzNKX40BHd6CFGuEp/L1uoKRHJ8lofLHfuzHetbNfTYSMxOED0iS+5+HfiVZfOaZsi1lmYy+cbS1WJnpMG78ifyML+3xXSzUE0+LvbpQOBbH6KGXD/jlHHLL2iLSP/q1iMKLxAzh5ysiZ5Nrl7jEJc5hap07//AhB335SFfw71TRMMFZ8zH4ZjrYzfxhj38+8mluZp9s4tzrwWOr88wxw3FklYLDGHreUnzhWyFYyBgfccz+ig6+khNHepJT2kY0wkjGN5ZcxdMfnvjY62FTDJXGQGlbjWP8VcKQOTHD3uPo9+WkT3KgVR34+SuO1a/Eorc12nfFyI+z+p2nLRx0s1nz0RiuxrFidP7Lh1ur3hHevo3ffoAi+Whst/D38vbpcMXIuREW2GwretzdcDGlP0/QXX2N/T7v8bGX42P4Um5hod+Y+EGOz9ze4o/OWtLhylW+FA/f6ljQt2vxBJyNUY4bNAmAOJIB8eq1DyA66FtUfeUrXzk861nParfSvJLtqtVFQZy1QIDJgRke/zfvute9brt1qN3B0mSB7+pXv3obKDh9zsDtRTz6PvWpT7VPFdQJBaODBTtI6fX6ESUukim/JujNQXIkM2oTWwsP+nLg02YbET5+h9isK/AkRCbYSE/Gkg767PNhxBs7o5JciF1Y6PApCP8o2tfn4RCTHnfkyPCbPAxZOK1iYSe/DMnCppzp6dvxJ45Vnt7oCuZa8iuEz6L705/+dPs/debES1/60sPP/dzPNf/Dh6eftLGZX2nsrlBwxI/gXtWDP79O61j08Qq22K2lsbSZo/FLmS2yKbXLg+SCdvLaV4jv4gqLxZc45wfFXj1kxUApH9EM95ZOOiIvjrBpm/mU+FWdYpA5pb3q2NJTdZ0yr+Mz2+ThMIdnNivm1GHAr8y8Cv7w7CnJ5/gofojeFSzw21Bik1xpjYM/wRo7p8QxtuhgXz5u5cAARsNLxlgkjvQG10hm1GZemNf8IhsdK3rIwoHI22DLuPR2o5tM/BYDciMKf99HHn4befvB3/PO9oOXD8YymGb8W+27F08AM5iDEKNIu4Twq9rHJ/1/rmtc4xqtHThXepw83/a2t7X/YbYFZm+fgxDKoKlbTXuI3T8l9p0nt0v8R/ob3OAGrR1ei6sXvvCF7df/rW9963aFzHeffP8pV8TqgPItVNvTptSeJEwCKWf8VbbW6eCX0uTI7atjCRkdI3tJQr5XXyIT3fqzWIwv4dlTxjYb5GPLRx9vectbHjy4b+HMP7kSXCPddCW39Ef3iHfUFl/kKtnYmunRHx4luezTbz/5pp6Y9baNmQW0WxJ89Taqf4Zt/zWveU1bODn4V93RK17xOzlQ9c+wV56+bu6hyKbs+Wb7fIVLSRYusZ35H7/Sr9SWnCCbvKBzRPjTF162T8GeONIpt+kNxpHtWRvbiQH5U7AkjmIA1ylYImNccwxO2wg7rPHXWJwSx4w3/OTto1NiULEGzwj3rI0v1W86ak7N5Pp2cihjwbf42fPWGEZGear/deF5SgwSf7jU6VvFQtZYoOhZxUI+dqNDOSM5j9jBZ+GzxR/dvb7I5BxiXxxyrOj5Z/vkYIEruT3j3Wrf9bMWQL/g4pQJzKhNIOx/9KMfPdz0pjdtV3m0c1DpstrNb37ztniyf1GQExVM8LCPvMXk5OQ1cA+nX+5yl2sPHT/zmc9sn0hwy8gHNJUWWW4lek7LvhM8bPSuYqwDSt7J0sJtlehJUtdkO0UPGckRCsbs92V4j/H1ctknZ7xRTtoW0RYQd77zndvtBj4Zn2PxpSv+J99iZ09JvzhmopLZ8mtkQ1tkEht6ar1iMTcsnOSihRN5i3S54HtOfjzIDQt0bTOKTWXFMOPfahdDeLNt8Y76EkdYMmYz/8knjn0ZmZQjW2mLbOWt9fAdK3sZPvRtx3RULGRX5aNf7OgivyeOkasl/DZUcaSt8qpX7Omrcmk7VpKxxU7KY3J9Px18D4bg6/m29tkmp4yelFtyfV9kUkZnz1f34zcfUq/9x+pkckw7xrvVDzNdtuTSFv9WX8Ygcdji7fvYr3L291Bs1lzYIxee2Eks6VuNg/PU17/x3JxzlXXEqbTrypMVv81JiUHgs2jhECesgp0gAMPHqSyg8LiSkv1TwUaOffqz2HBC8lzSxz72sfbZBPcynags5iykENwWVt6+83/2PODtQ5/kcu82v2xiZ7WEy0lUPJIoe3WIURYgEjPyKbf0iENsJib0qSttW3r0o8hs8Y5w4A9mcbdw8kLB7W53u8M973nP1idJa9L3eoJBDFKHv07SXma0TzZx1B9fUvYyfbzC17dXTL2OXHFye+q9733vwUcvPeflo6w3utGNzi2o6M7zP70O+9UG+zZ5Hkwjmb4NL5kqJ/bR3fPP9msc1YMh5UhOX+KmXvfx6wuOLT3hicwW7whHlec7u8Ez4h+1kUnuxaeKfyQzaoPFsYd9+k7FkoN8fEtMUlbbsaEt/LWt8m7VI8t27OMf2Zzpid90wYDoSmxncn07+cRRPRhS9vyjffbjR3RoS30kQ78NDyK/YrPXGfno7ftn+8GgDGa6gmsm17eH3zEyevCs+BQMwbQVv+iuPMae7IrN6CFLF99znF/R47joPOQ4rEw8+jjt2d+1eKLIwsgCiUFBVw95kNFtOw9Ne87F/5jLwdur2R4i10d2xdHo70v26Q8OAbX5/3m2JIWFXC5tWhi58uEjmle96lW/KWgGgjw5+OhepToIdJ1CiRn5YJrpio/ssC22fK046KBTW20PtvgbG0r82Q/fsZIeMpLZw4QPechDDp/73Ofa/xTMmOOBz6K75k7VDW8lOlexkCcTf42n+paexEd5ShzllStOFuWuMsk7H8D02QzEZ3qDY4YlcyM5iD/+tMqOP9FBVswzNtG1Q8U5lj6OOraws8E+npTsB5MSz0wH/RVn8mGL/xzYUom94K24CtvuavTBUfHtVVDlyGdbkRfHSnTMjlOZ8/jJBfOpcaSjHhdW9GTMYalxXNERv+NH9umbxSA8tWSTL31Mer1Vpuqv+CvPsXqNQcYtMT0mm/7YVqbOny3ska0l2RyLKoaV8cBLT84vK7KwkCN/ilx8IZs8X4lBHXtyNlhWdATDrsWTk4MrCoxYRHnTzgIJ+RaNxZOrP56Ad8XBrbI49w//8A8NmH+A6irQ7MQZQHvKOJrgCyJsCFYLJScwV7sEy4a0J1hO9OQjZ0CDOW1N6MgfvHTC4CTpilbsHRH9pm4yMIunenysk7cK9Dbwe6PLd21C8TFJlvZa4okN9Yxj5TlWh8Umvh7I//znP9/eMPNmTfyhA48Vf489+sVPPPlBLjFI/95SHC3iyNuMrQPGiHoscmAWR30jTNr+7M/+rF3ZvPa1r93mgKuZrj4lLrliC8NIh/aKxTh4IwT2VTKOyO1E30Ex51ZymiyMiWMWvCm38CSf2HOccNzI92S0zWIYnWJQ+fjguLJC5MVNPpJPHGc5MNNNj7lBh2c36ZyN3ZYOxyT5KAdgondFj8cAxJWM+PBDOdMBpzHHQ04dhtU4kkf0yUdvemUsZ/6O2sknjo6P8WXEO2uDJbkQn/bkY9Unjs5f4iYPEb05/lVedXyw48Vn/5Q4ZryV4kcPH4Khtzvb568YJA7k6VwhOsRBDokFHfCsEB/oMJahLSww6uezulieep7JmMCAzKuVGOC1ObbBg1b9b0J737ZzAORwDLvd5fVrZGI6KHi2iSOCZFDywDMZst5WOxVkwKZkg86eDEieOXErBQ9eWyawEibJkzZ6ksyC6gS/l+hCfCPrw1/iMZuQW3olpJOdBHeQhW8vsS+Z+Z0DRMU20sMGW+KDlw4HSPsrRFb8/Pudr33ta+05J1ef5AMsniuzqPOGpviMTmJ02OSaOFg8oST4Xjx0k3eiIMtH4zHLPTZDePgujnD0cZzF5Td/8zcPL3/5y9tbnC9+8YubnBcYzA15wD4KhpSxmzLjwAcHBzgcrFfygI7MP/kojjCcTxwdrM0rWGYxSDs77ImrRYs4JscyZ2vM43viw1fxETtjx+bqRwlhgQPmGsdZ3CuG1PHCC39OmOI6wx65voTFYlw+yktzQDwSi55/tE/eD1RytmPjKYb5kQKvY8KpcYy/4uiYLgYrlLEgC4NjgjJ6V3QljuSP5eNIr/gnH9m3iaf5NsKTHJCLxgufObWaj5Fnw5xQOletzElxdBxR8l8+wbRybBATMuKQuQCLfBKHvQQH/I7p8oFOuJQj0p7zmTrbjimrcRR/svyHAW60gp19m7jBTt9o7Ed+9G3jn+MdF+WM2EwC+/75LtLGEf8VXru32DiJgKxBVT8VaFP4jT9shqo+B4nsK/FlP7aVoQTffibQysKJXPSx4wDntmBsxs7e0lfKL3/5yzd52Cv+kQ4JAHfi7AHty172sg2TPv5tYaE/B2N+SCYyHrY/lXzXSQxgoj/kuyRbBCcMDk5K3wCp47Ml2/etxBHGxCpxdMvxUpe6VDuB64MnYyHX5UgW6u9617vawum7v/u7D09+8pMPl7nMZdrkxnPpS1+6h7a5nxhggiXfk9kaw5HC8LsCKJ/6sRjJjNrEIblAZx3Pnr9iTzy/+MUvtu/65IdM5enl7dMfrLElH+TTCtGR3IHFVUAH78Rlr65gcJIzrqeSOHpBhf1giO49On3yxXd58t06/snJxKrXEf+rLXG8whWu0LMe3Rc/WN1BODWOdOQ4JadXfA9AMo5v4qjOt+RZeI6V4ugY7cd/YpgxmWHSL9ZyID6YUysUHWR8cNlnfPygnNmc6eavBQs5+Zhz1ox/1A6L//Pqe4AWoHTyb4VcUbeYhkEc0VY+xn9lfDYnnKsiq4yu8LTO8id68Fl4KX3Pb5XosYD0KZnzobWoDSwBwgkPYz/iEY9oJ2P7NkFwslEmAQcqzprOInCxiEAOoA44fk2+7nWvOzzoQQ9qb3H+0R/90eFa17pWy3sLJ7+OzugsAmcROIvAWQS+PSNw3osnlyFdjbrLXe7SFkqf/OQn2yo9q9ncNrGIslI+o7MIXFwjIH9zRcO/WfHRS18Mf8tb3nK45jWvee5HgtwP38XV1zPcZxE4i8BZBM4iMI/Aea9mXEq2MHIS+YM/+IPDne50p8OtbnWrc7c2co//Fre4RXsTaQ7lrOcsAt/aEXCL048BV1V9Od3tqEc96lHnQFs0mQt4ZpeezzGfVc4icBaBswicReBiG4HzXjx5TsZJ4zOf+Ux7KNztDLcs3FN0knEysblHiteJ5YzOInBxjIB89hV9/2rI7WpvkHoORH7Le7fzsrjSf0ZnETiLwFkEziLw7RmB81485WTx2Mc+9lyE8gvdySS3L5xMVt4uOKfsrHIWgW+RCLzvfe873PWud20LJAsnDzzmShOIFlAezD37gfAtMmBnMM4icBaBswj8L0XgvBdPTh55Q03dW0h5WFyJ/vmf/7ldnfIG07fbc098tEB0myYPyPMxz3ztHTdxE0f6xNErtWh2+8diNLHEY9/J29U9eqpcMI6w0JGrJBa9cFfZKmNhwAZ/LYRjEw9ZtvWzt+o/mxbbNrJZeM+wVFy1LnbxCUZ44Jzp0ZcFfngSx/hKv2f7/PNpbw364Ku30Fxd9fYOysPkeZ07OVGxHatnHM43BuLv6q845GpvfDuGIf3k+Z8xSW7OxjX6k2uJK3m5IR6Jc8Y2tmoZPdroQrWt8s7qbNvIxeYpOQknSj4qZ/7PsCQflTCJY3JlJtO384F84gEDXfZzDKgy9JOpcUs8Kt+xevRkvBKPqveYjvTDDzdZWE6NY45R/IZn5H9s9mVk6IicGMI08on+YMVPLvy97q19OlCNH11yYYViG9b4PsK9pZOc3KArFF3ZP1aSJ2Or9mdj6hjkuBjc5FDP3+/3OGIr8vblqOPUXorfSm8bInoyRnv14DvvxRPgJoaviD/lKU85eE08bxpJDqAAfepTn9q+7H0KyBWH/r/mzYDzi99eobTIWPXT1QqLTCTZMtGTML1f2tMnvuz5hhI9kosORE/6ex2wp89Ykakftez5s88ufl+T9wqzNy2z2IMBwbMSAzjgIeMbJsgBZpVMCN+aSl7SF90zXYllMPtGkzHkk8np38288pWvbN8m8ayTL9R/6Utfanj1w60U68SbjlUKDqU4OuDkpLtXFx8yrvnQqHzQvkLGVxxhgYFfycuRHjaRODi4sueV5sTUWNKVA/cIDxvkkTymUxy1rxL9fDAf2Y39vXrIsx8dSjlB1wrBnm+bWWzbp3fk/0yvD3R6vd13jnwfJ1c26RjpSZwzf+SxOeX18FVKHPL9OdjNpxWiA2Zj4TlBPxRPjaN57TgbHMq9lO/giWMWc2Sjq9ejXQyV8LJNxylxzDHIWMoD+ZRFQG93to/f/DAn8vmP1bHgh7GUR3KRTliSKzPbtV38PIYTuTrnK1/qiV3Oi+J4Sj7Sw1/5JIZKx6QV7MFETh7SQe8ptH5U6qwIpIfC3bbzv+U8NP7xj3/84MOBr371q9u3FN7//ve3EyzAmfidmov9rpOCqxA/8iM/MjygHXNQEovPJS5xiTZBxMnA2kaUg0YSSlKp/8AP/ECLcZVNX68nJzK2TSTJpM1zPCOS9MEjYf0Lkkte8pLte0SZiCaSNvjCO9I1azPByOa7UKs64DexxXHPgUXMMnkSM376DooxeP3rX3+48MIL28nrwx/+cPtuEoxOSJm0fFfPmIgB275VtUJ1nGBJLkTvXl38gVHpOyjw7YlF1c++k1TiSAe/ZljEHeVAyp627//+7z/3qzP6q59pU4o7efkYfQ6S+d5V5d2qk4c/xxpfuk+Ob8n1fckNGMSRzlVKLpA3v/mYubJXl5OUHwXf8z3f0/xInOBJ7lZdbMb3jMP5xJENGIwl7COb1X6t403uySdxgG+Vkhfy0VxLfqzo+dd//deWi+IIl43eWU6Lr7xJLO2bV6v5yA49SscN5wnjKZZ7KVidb8VTHOUBvStE1lj6Lh2/+KTMGO3RZQFoEelch+jgi9LWkxj7IagMD9yrcTRO0QGDupxczQW23UnwoyZjM8uB3pe6v3/0qlSpSwSOSMw73/nO7SOZHHrWs57VTjgWVX6l+2epvgM1Cm5Rd7GtmtAGxUAaiFU/yRjIHFwzmFt68KPwxrYySRqeUWDx4M0BMZMJhhmZZH61Pe95z2u/hJW5JBtbSnqzP9PVt+PPIgQGtk7RQSYHpq34xX5shFfpAOMf+7pV5zMcT3jCE859wNSBD84aJ/Zikz46an9sHSvJ8ttBGoltcB2TTX90KI2p0nisEJvkkhtkt3TgRcrYk5dkahz0bflT+fHZqvweH/gcyiLSL/Utu+FPiTfzSgnDinz0kHNc4Le8Qas+sW8zFqlvxYSt5CJb9m1bMsFbS/zknKQSR/NiNQ50kNmDvdqvdVjgQBYgyByMn63hyJ/Yz3EOuzb4RhTc+tTNSxhW41jHWy7YzzFzZHfWZm5YBMOSeQ3/CpHlA1/EMWO5Nbd7/YlZMESHkv6eEvccS8K3Gkd6M941jr29rX224XYOE4NcVd+SmfWd9+JJsBwUOONSoED5xe1fdfzLv/xLA+gbOO9+97sPP//zP98uN87AXNzbDYxNLFZJUpANGVhU29KnrEmKN/yZBPbhSLKN9KQtk4Fe8tFV7aVP6WrMr//6r7crMn7V44fHRmf0zvT0eu2TYTt6tMEP2wr1+OmosRrpis3gdVB+6EMfenjZy152uOMd79iuoDppOIEo68LJ5CNPNvjZgDv6RjZHbfGVXMW8ogdvTnoZ1xX54OJLxjH+bY1HsOPJGJBLTLTDYR9Fd+wpY0eZ7dQ4ko9OtmwrccAbn6JrTy5Vf9TjP13BoX3kfy+bffYzj534EkPtIz1pg1edrJxY8Z/t+E9HtbWiBy/75G3o1DjCE0z0wrWChWzimNjAI56JWQP4jT/agzV2T4lj4pcYKOmjey9VHWTpWPE9duIHfexH1woWuqJHPTiCMbZSZtzlLjmbcYhc+I6V9Pfzie4V7MGYMvqO2R71n/fiSQCson1u3jMWbv1YTPmMfp77sFp2n1U70N+OlITIhFOukLiIpWRIsm3JZ/DxsE1Gm0SSmLG/R1+SWElHZHv7+l16dzvW5WPf80LBa1GBh32YTqH4QJaOGZYt3XSE6NjCgjf48an77Mbv/M7vtCunj3nMY84tmPxiEV8HUAcCfmahoj16Yn8Ve8YBdnMKHm0reqqvMKL4lZjsLdmOT0r+Zn+mA9bY68eSbLaZPNnEL+WK//TCnXlgsUteLIzVXqp+0oXoqe17dCUv+KXOJ3FcoRrHzK3Eht6eKt70mZurcYweOuQjeXZX9CQX6Ig+bSPcwToqyYp9lTMfVyh5QUYc7fOn6hzp05+8JbPiP32xy6aNzRw/RvZGbRlvus5nXpMXNzgyHvxZ8Uks4KErsdmKYeywiS/+r9gUE3ps5CqGVT0ZD1jI0rmFfzQe2tZm8UBLBvUFL3jB4dGPfvThgQ98YPu3Ffe///0Pz33uc9tDp/51hX8kbNBXHR2Y/JZrSjIYhMQj5V6w4TewlSTJMYqssq/Tl4nf64mtaqPq6Pnx+R+GH/nIRw4PeMAD2r8j4TNKIqauWxQulgAAIABJREFUDJbGcMKfLSwzdfE1B6f4P+N35ahORldI3aK7zW1uc3ja0552uNKVrtQOEpHHC1dK7WyxG7zqNRcie6wkHz01rtr3UtVBZkW22hjp0bZ1kEnsYxe/LXmW/cpXbeKLDTxVT+U7VqcjJymLBrG0cNK+lyrWyMC35X/4ahmbciS4juVklU89eJSJU2IUnpQwxq42fJEJz56SXDCbJ3ywiKq6j+nBa4su/Gk7Jlv7Y9NY0mWDZ+V8Uu2mrpyNR3iCI3zaVwjWHC+Cv9d9TF/Pv4oh+tm3IXMExa+2s+MPflsl+zCtzI9TfIj+YKh5VfHM6rFJruqY8W+1n/fiyUHJ1YgLLrjgYJH0gQ98oNm7973v3d62cevDv7HwRhYK+C1QF7e+fnKYKEnQvb5IZLHMgY9O5AAxIv3hqYmbX2P66uQY4Yl8EhK/+ogXBv0Wyde5znXa25P8rAcv+J2sQjM96a8luzaYgmcLS5Wt9cQxuOizzeLoyoQHeZXeHvSF/J/+6Z8+vPOd72xq+fD1r3+9XTV1Agm2ajMHjdiKDyv+0wczWT6wlbmyoif46Ik+9Zn/1Y9ah4Fc9U2cEtfKq44345VSXian8fCJXjTySR97dCGlbcTbGCZ/YoMsv5UwrcaAHOIDOhULn2zRk4N2U7rjD/6MBwx0hUaxybiHJ+WIN32jMnHUV2O3ogfe5Ew9Nq3oYB+WxK3GcYR71laxqCdPxZPunuI/XpRyFTs7NhRZPtSYts6NP2zbxFIc6YM7+jZEv6mLXTKO08GEYQULfrHJuMaAGI7wJG61JD/ija5RWfOaLfjpXMHOphjQlXGHpc6pke1R23kvnihlnAPe9Lr73e/eEtG+h8Xvd7/7tSf78WnrAz4CdXFsM4gGMwkpJivkxGJgc4BIouzRE5tKMTa5cjAIpvBUTOFJIpKFYWbTbVmfJnjhC194+MEf/MFzyUeejASE2754zPRUDKmTyWQK1ugNz54yeuJHJsUMi4OIhRN68Ytf3DBb+COLJnJ+bSO4RnqCGw97x+LYlA3+JG70id8x7AMVLfbkoivlCPdIPm10RA+/k9/H9KQ/sar5SEe2jHHs1RJm/UoYorPybNWDHQ9Z+3Cs6CGDIpv9FR3ByGck18wP45uFRHi2ysjg4Yf9OiYzWfGz4Uer2ON7xjJ2VvTQkXGEPbSiIzLxmT711ThGhhxc0Zf4xE5fBn/KVex1oRKbbKzqET8Y6Es+r+pIHstJcYBnFUviCIM6nWJoS67XGMamMjFUX8Uen+mI3VOww8i+MvWKd2997Qw/0GoAErR6cADKgsCD42nX9u1GGQR+uQLnrUMn3VWyGvZdHG9A5Be62M5ilnalZLKxLSFhogNlcozwGDc2yFpAwG2BpH1G/jXJFa94xfZNKlcibE4EZNj6z//8z3arlq4tPb3+xBEWz8fxQ96skoWOOCrhEYetGLDj22QvetGLDv/0T//UFlA+1fDFL36x4Ycrk1Z9RMYg+PWzJ47eMl2hOqbi6IUL+NO+Rxcc7BvXfCNJTGfYZzqNnW+x+AyJvD42ljDacjxQ5jtP7KMcLMVz5BPc+mCVj/jFYTWObMkdc4m8/JSnsT/zubYnjmTlozjQMcJd5fo6m+Tr943oFJ+9xAfPi/7P//xPywe6xImOGR7jJXeU4uCN6FPiyGf25IJxPJYHM5/EQT58x3d8R3uxaIb7mLw4OLZkfGb8o3Y+8MWLTTkuRI+yp8RQXtr4cGocjZdjvOOCZ4CN5UoOwCb+xkM++SYgzJlbPfbZPhkY2M7r/uYafHvJp2BsjrHkYBAbukdxNNZyPudFvDCs5gD+4MwnG+yvxJEOGGHJOQr+VSxidd6LJ0YlFkrdAJuwPWkXxG8nEnj+851vDg5IgqxQBtTVu8RJUsz0sGdDMJBXktdOVpsNjQ56kSGXxRNf8v2OJlj+OIl61slJmZ/k+ZwTvH0vDLgqpW2Gvag8Vw0Wk0H9e7/3e5sf8fEc45EK/A5OMCBxoGPkv37/ZsWnCEykd7zjHe1Zpy984QvNvoMdfXKZHgddbT3pQ+xkM4azOPby2ec3eaVY++SHeKzEkS7jKf7K7/u+75v6Hruzkg7ySn5bkMzmL9xiJRYp6ZWP9hEemPg3Gg99GS/5SM5JZjWOYsYWrMYBBrpHNme+BycdcpqO1Zymu45lDtbGU/tewm/R4EOZMDhpGQsYR7mRnBFLPvPhv//7v5fjSN4We/JRfQU7Xnjkj5wWR+UI91Y86DH/Mg7GFyW3tmTTx6a57Ae92NEBmxiN9LApzjkO4JcLq/lIT8YCFgtxn/gZ2QzWvqTD2MOjLg4ocej5Z/vxu37niX907iW5JI4/9EM/1PziW3xJWXXBjV+s2cGjvhpHOsmLgUUwX3yza3Ves23xJ5/og381H2FZO8PXiHyjnkBwyAGPQznZcApQZJD1rwzSwNy3XFMGTvD5l0khDitkUoqlA51YiSHa0pNExSOusJClA9X+1tD9qf3qxjAHy4617UpYOE0avOyR4zu7GWv2TxlrfjjZ0WdC07OaL05QMJEPPthmcfQxVwfzPCTOPn6LQzKwmGR8d/Ia4Ukc9ZERh604jmKrjV0bWSUfnKxWiFx8hV0MT4mjA15yyokbFn7F1x5TsLMdDORtyeXwpL3X0esWhywWet6tfXLwIrbUxSBx2ZJNH6xkydAnl8ztVaKDX8ZCHJXaVgi/TRz5AUvm10hXjWP6T4kj3+mKPnGEYTWO4meLPouH4NobB/xw8F0c1XMM2quDDAzGwGaf3hmW9MsFxN4pcSRLF4LfZl6nrXUc+QOD+Pu4Ix+iY2UsmGCTrBKG1Ff0kBUzMZSHic9Mh5wNrzw43+OjcXDlqfpwJHzf1E0OuaKLYDuFdklxuCYv8AmUAc0AhEefui2BpQPftyNJBidYfvM3sdFuYOzbEqfwJT7KrKTx0JH4pTTg5OjTpl5PZuRM7CSzMYoM/vST15eEydiymV+V1X5wK+lz8KRPHR8MwRHsxhg/3Rl3fTb7ZHuikx4Y8MRPbcFAHh8a6dAOHxl5GV7tdNCpT/uXv/zl9qFP/1bota99bfuHv9pr/HKCSkkPn3uiM3gTA3wj3l627rNPJn7yAVU/Kv+sTod8Ms6w830VS3x24EMZg5nNYDcuGXM2xUUbeVvGbYYnWPWLgxjMeGdYYqPvP0UPXeT4cQqR5VPyI2O5ggVvFn/wJL6JeY+r9usjbzxXbJITf7qCObmwqoeu2I9syh77bJ/f4pj5Fd9X9JCXT4lltTXSw0bs5JhCdsRbdfX1xC/t5JNXadtTRoZ88vEULMaUvFioo1U9ZOkQU/7BNtMT3Xjxka0xiaz+mQ7tGQs5gPAnDq1h55/gcCEAtoplp4rGtuuIwDkGgXZA/upXv3q4173u1RTc7GY3a7c6rnGNa7R9g4E3AxNHU66AuzjwCnySiO8Gw9UPBwsTzVUNJ3QkdvrFIvEkk9joT7sSpc9As2NLMiqNDQz4g4OM+KNMenV4rNjrLz/2w6tOH70Wg3xIH/25KqQePjbZc3vFL8LgVaZuUUcnH5zUR6Q//PSnDnMWJ+JqX/8qwekev8vVHnq/7W1v20r/s+6e97xni2Em56mTaRXTGf9ZBM4icBaBswhcPCOwa/HkxGZzcnVice/b95yQh219D8d9ULc6fE38J3/yJw9XuMIV2v1IVxJyss3J6eIZqjFqPuXkrvQgn4WFhZDndnKlRp/Fh8uuYikmFhXu+9KRRZEH6fDiUVpEiLeFSeLvwXDtdJBlI/fxtZGFI1dx8HoGyOLDrQfYPBdkgcRGFkA+dAo7ssix2MgisP5ypK/6beHEL+NvsRjsSpjpUVq4JBf6aIoNv9waYzv64YnfHqCGd/V/IrFFP3zi+5CHPKT5+dKXvrRdcTIO7MBmccb2GZ1F4CwCZxE4i8BZBGYR+L/vnww4nUycMG1OtE7WPkFg8yHMN73pTYf3vOc97V92+E/st7/97ds/LvS9nJe85CXtH/DlBDVQf7FuctIVEydm37m68pWv3P6prY8r+kq1k7arPa7g+I6Qf2dy6UtfuvFc/epXP3g4GVnQ2PwLG//00T/G9Q92vfn1la98pfGw5arfta997bboogvvs5/97DY25PH89V//dfuApWeT/CNNX3v/x3/8x3O35Yyn/zNI3r/SsYCzGPYWhzG2yLIIevjDH974jJ2rRvosXrJAs2/B4xteD37wg9tiTG5YNIkJOxbVP/uzP3t41ate1RZi8I3IV72vdrWrtYUNG+yJGdt0uVoktnLOw36rZFHkDbpb3/rWrTRWfKZbnzKYZxhXbZ7xn0XgLAJnETiLwLdnBHZfeeK+k5qrAK5CKJETpSscystd7nJtseSfAPtS82te85p2UvUf6n1h3L+6+HYlJ3lXf65ylau0qzAWDq60iI1FBrJvAYDPokKfqyxO2shJ2xWiy1/+8u2EbvEg5nlQWZ0Oiy98FjhkXJlSGhe26LfwEnfj4jadq0oITnYtylwhtBCyWPL2hkVE+vHSb2H8yEc+so2tNjxkjL+37p7ylKe0f6B7i1vcotm2gEN0wuOBbFfBbnnLWzaM9OdWYGP8xh8LOTIWSeKBhy6LMfS+972v4bnvfe/bYiC+K+ThwIc97GFtYemfVltUouhhS+zE64zOInAWgbMInEXgLAJbEdi1eKLAydLJxUlaPScddSdUJx8nVSdMJ7w73/nOh5/5mZ9p3wf5+Mc/3hYBTv5ZSGyBOrWPfideOODMfrBHb7CPTpSRDe+xki6bW2BuWb785S9vsUhc3Gris4XBZS5zmbYYES/92ixkXE2C12LlF3/xFw+/9Eu/1GQsNGCk+9/+7d+aXosKV/OyiBFvcv/+7//ebklZKLnFZ+FKt3ERE1dy3LKyWNPmOR9f09ZHl9t48PgWC53I7TZXrdyWo58cPLAi30Wi09Wgz372s4f/+q//alfZYEUWPG9961vbAsuizxU0+MW4J/G47GUv23hcJUNZzMD1hje8oS1+bne727XvSI3Gjoyx4IsrYurJ16c+9alt4XThhRe2Z/RcZXNVkB54MiZs8jtvVmV88dns95Q2/eJp321MY79KdMBgcW1xKuarxD49xi0YgnGvLhj4kHEXn4z/SAd7Yl3HVhzloD4EQ3JnhIdNeaBPnoglH4zliEY6whcdctJYb/FGppYwR4c4GItgq3zH6vSQNyfkW/I/MTkmr58PYm8Oi+8xWTxiBy8ydjUX9tjseWBw7Ehc+v7ZvvF2HA4GY2F/dTzkBh8yJ8RRPLXvJT6QcVzNuaHm60wPn8k4rxnLU/IxY+ZbU3Q5pu2xHUziKAfIuvLuOI1WdOAXd3GgTzzJr44pOXdTjEXGkr4ZFjaTj+rskU8cE5tjOcEGXnFwfFSP3sTpWBlb8mCG95iO9O9ePAGOGA8A+0leyRznEyB9bh054QHK0fAEwEVZwuCAITC5opMAsy9pXMUxkXPVJj7AJjH1rWIUG3J0OFmo9wNjQYNyJUU9beQkBD05QGmzn/gGpzIPfEeGPUQmdp38+UE+Y8b38CnFiwxy29GE1kbv+9///vYNpHe9613tFmIeNDdZElOLnd/6rd9qm+9tmND8YxcmtxNdhXT71u1cV7ccPGsMmvFvYL/BDW5w+PznP98mNawOVK6Y+aI5TG5piq8xrjkYHUq28fIrfK54/sVf/EX71zJecNBPXvyNuTjbT6xhV0/8xFQ9+qs9dfLiQkad3Yxfz7u1DwNbNuNAH12rBKuNDmXNi726Ms7k4YFNPTHq9WjHg4KbffFIGz0outpO+VNtRU73zGb0FRXnquJGhx8C/DfOMz3nhEoFlmzBy96KDuroEIfEJmOhfS+RQfwhZz+5PdIRnGwmDmRqTEdyfRtbdSzVtcWXnn+2TyZ5nFiuYpGPZPhGl5iiFT2JAZlsW/7ET7xs8j/byNdZPpJnxwaDbRU7/qo/uOleIX44vkXulDGNP/BkPOFB0dtjis/aydVjQ3gT7+zPytjVz5+ZzZl82p1LUGKZ9r3l7sXTTCFHDIDkVq/JYRHjRMk5ff/b5OTvYGkBIiACC4+VssVEFjbBpcyVGz6cOgj84h9drrDQszcREhMndL8sLTAiz4eadOFVirfNRMhiwWLDIgYO9vlPx2zC6w+fZGZfm1t+/gGwZ7JcTTOGFjFs6bfBSC95tw29OHDVq161PcPlGaonP/nJ7bkrt/OQZ6v8WvCwN0w90eONzd/+7d9u+tkzZm63uerkOTpXwZD2WVz080Mc+PTnf/7nhze/+c3t7dD82xVjJXbRwbYNLiV54yiOoWBOmXalWCQm9uWVnPPDYYXYDja/Lr1wgEY2Z3rxwgODHwi5Hbs6/+SUBbOxpVOs+GjMR9THkD3z8Tu/8zvbvIMpfuAdERlb8lXdla9ZHPWPSHswuwopF7I/4h+1RTesrqCJo7aZ/yMd2sRMPomjupzMOM9k+nZyjl3ygR8waJvF0dgld8Pniscsjr297PPXuNFn8Zk5lf49JbyJpeOTOJh7q3GEwVjWfKxzeA8WsRCX+gFebXwckfjCnxgYO1faZ3GMn70uemxs8cMPQ8cw+laIrBialz5euyrPFgx8Mi+dJ42D/VkujfA5FvBVHNXJI22zcRVD/YmluymzOI5saosdPvihbvzlw0oc6LA5vorj+dBFsngCICciAeIcctI16QyM/lMmzYpzOWCYZP6NiJOHB9o9A8S2K09uZ3mOR/CcID3M7MFh/QYB/pVECi8/+W0/g7yCnW0YLFAqzXRJUoloI8OuTZwzIcKThKl61bXj4bMtE+FJT3rS4W1ve1t7XskYmrR4lVV/9OLJ+Iq5Z6T8Y10PZbud96lPfaphvO51r7sZm2td61rt4ObqFFsWAL5orn6f+9znXP7wme0R8SNXGT72sY81udvc5jaHZz7zmY09PtipYxVf4mf0JzZszghv4h8eY3kKZezIyyf7qwQLvDWnV3VkLuXAxMfkx0hX4lVL9pOT4ojsz6jXz4etsZ7pqXJyiO34MZPp26Mj7cZhC3v4+pJdORd9sKivUHKJnJwQ4+hIvKu+5Iw+mG05Jle+Y/XoYYsPdMiLjOUxef1s19jbj9498uFhlz/RpS5fVgj+xJ98jY96T7Bqj4x+YzHi7WXrfuzwmy7bKnb6cm4gn/oqFnYzlvyzGV86V4gvGYuqZ4Snz1X7yekVm7HDduqr+cge++Rh4Lf6KbSWfQMLAlgDlkBhlawZ5Nz2qbwDdefV5KQpmO9973vbydLVCoH2CxhOt28snDxXdPOb37xdkVB3VcStJUnV+7MXUAaz+r9XNnxJYDGiz/5Mn74+ljURxD5JkTJ2UqbdhCJrrHw80vNBns/yLaQPfvCDh+td73pNF3uxGWx0eL7tbne7WzsgeM7JlR5Xrjzn4cqTh9uNDfLvUPxqGhGbHrj/5Cc/2cbBLUNvccLjqpRf8LnVGey9HuPttqZFskWxcbWQgzeY42tkoyv+2c/BDS8yDvE9cinxh08bWXkUveE7VtIf2/UAcUxu1B89wTbLo5FsbQsm/tkSl8qTOlvhV2dTHEL2w5O2vkwc+U9X4tDzbe2zgYKBXRt9e8n8IVOJfN9W+2f1PheCb8bft4tBjqOJL55arzLByE5s9Rgq/1adPPvRiTc6t+TSl/HMvlIbnadQfKbDGNX8OqZP7opj8EcXubT1Ovr2Kt/zzvbZCfE7W21P/6zkb/AaC3VbHZeZbG3nj00sbMHQ+1ll+jqbFQNsOS5s6Ukf/0+JY+Zk9ARXv5/2UYl3hX+kI23nvXiy4LCCc/UBuaLjUrurB27j5FKtAP9vk4UTPL4YjZIcBtqzNH/4h3/YTs6//Mu/3G5Def7Fw8luC934xjc+6ddZfEpCZf+UMgcCsZJgSeyRrlEC9IlBB6JnxJ/+qt8Xt+G41a1u1R6wvutd73r48Ic/3G7BRRd8NnrpcGUv9Cd/8ieHZzzjGe2NwRe/+MXtVpsFlUWTq3xyw6XWEcHo6pQ37pDF00/91E+1W3bsucx8jPB94hOfODz+8Y9veektT0S3yac/E91VCTkTSoyUqddxTVv4a9n3VR2Vb2+dPNuo172lI7x8DdGT9rTtKckZY1vqx/T0mMmGqmytp78v8VT5UX/fZp9M9Fff0zaS6dvq3IicMvWef2s/MZF7qa/qCX9K9jIuve1ZzKpsLzPahxfBLB6RTzmS6dvIwjMbk55/az9jEr/hW8FCd2JDznZMR/Sn3MK3hyfxoGcPf+yRS/7k+KVtRUd0kamxtH+KnviSPDmmI/11DIJpTxmcGTP2UfTu0VF5oq+2rdTPe/HkRBsnXv3qVx98eNBT+N7ycdvGq+yem3ne857XTmYZtBWQI97RKtQtI7frnBB9uNNbfgIEoyf7LfLucY97tJN9TqQWCc95znPaLT3P2WRglfjJJmnTN8LDjn6LNz4mJj3vTEc/kPiis9dhP/3p6xNYf3ArR3FPDGDF73ZnrjS59WbRhMSgxpuuqk+f50J8lsDnEcRY7DxjdPe7370trF2Juv71r9+u8rE1IlcIL7jggsNHPvKRw6c//enDX/7lX7Y3C326If4mvvbhrn6Ll9x7wQte0G7J+s6WTyTghbHHbZ88ORQ+2MOvRLEV3tZY/uDLeJGnl74VCj8f6bPlB8CqnvhQ8a/oGOFPnoz0wM5/colVMGhLO9laH+mqbYlJbUt91sdnGOAJhuxHdk9Z9cOc8d0jGx5YgiF+02MbUbWZfjoyjvqDJWX4UobXPr+RnBrpjsyojC1lfDhFR+JWZWt9ZLtv4yuZKhe9Pa/9ypf+jEXihiexGo0HPlvmIJ7wR2ctRzb1B7vjjTgmlhmbqmOrHozVTq1vyaYPf+zDxZ/oDc+xMv7gq7IzLPj5qhQDNuWj/RFVnaN+bWzZ6FqJY+TYJhtsMztb7d98XXqL80ift668Bu4ZFVcMDJDFiAeH3XpxK2fFyS1zFkkSmj52nHQFwttYXuN/1KMe1d7uMlBIgDzoZ8A8V6PdRoeHmz1M6QqZtgSVbpcW3W7KgUdbvxkMg01WPYutDFJfzvxiFy9ig07lFtUkix1YUeKjji/9tYQZXiVbZD2UbTGZb0TpF2M81V7Fpd2HMt/4xjcefIeJHvbFzxUni2fyvv3lYUn8o83VS9+eMh6Pfexj21fq3TKETXziSyaMkj+Jlw+OWgx7MP3tb397e8uTHVeY2Icr8enxB09iHns1jlWm1smKk5J88FSeWo+tvowcrBmXKre3Tg/cSJ2+VYJNbONTypme+JL+7Gd8gke/vhFph7XizbyoeZv6SIc28oklu9mf8QfrrCSXvpmOWXtwZExOwRLd/E4+wkPniNI36x/JjNqCWQl3cnzEO2tL3OiAH23hCn9fRkaZreZUb7+Xtx8ib19JR+0LjzJjFd7wJf/6ssrWOj2xE+zRVfmO1cmaDzk2narDOAYHbKt6wp/xPJYXbJFRInU+KEfbLA5VDzkE/wqRI5MxoTN+rOjBe95Xnhh2cvKWlIWJWzP5FyWuZNzkJjdpVx+cWH33adXZkUPePLGokZAGwUnXrboPfehDB7eK3C50i8fJGz4B83S/QGknY0Ggnw7teSYnwcWjXWJ448vXwTNgFRN/yPqGkedx3K60P+Ktcn2dLbc8XTkRT3azSOh5R/vkPVcGa2yTR/pGBDue8OO7//3v326reZvB+Im1haVvOuXWbK/Lt5y+9KUvtc8SiAEcFkDGwzNl9IqJRa3vS42eeYLBmCiNmatermR6bgrGjBU9MFkEBT/9n/vc5859Jd1HML0MkG8U+QwDPLDxiQ3y/EmM4hNdq3Gkjx54yKuLWb53Fd0p8Y8ovutzJc8Y9PhGcqM2+csPV1xhWj1A8IV8vuViniTmI3tsIHhjTz7LR4tZlLlY/Wwd3/hT2+mwT8csjlW2r/PfHGLbDye5FYw9Lzsj4gsdiYP9Ge9IXht+uSCOcpe+rbEY6SeP/GjMcSnjMeKP7/Cm7nnBU+JIP7zyMXOQzhUin3w6dnwc+RNb4mBOG0v+r44peccOeMjCpB4fYyelfImN+OD4sRpH+m3i5jhkHjnGr5Lx/PrXv34uH8nDtUIweHFKKRaZqyt6vEmcnK5ydI7GL/7DH8zy0ViOqOqs/drhpce8pjdv3VW+rToZOswlY4tGmLd0pO+8F08MA2FS5G0pygXSgUKieMXVgEnWi4I4TxcbJpETxIte9KJ25QMGZKJnsCycJAp+SQuzfmRAtNvnB33kMlBKDzC7jWXijCgT2S0nB8gs1Ea8s7bEyuQgDw9dwdnLwRXij3jAL95JCvJiBd+IyOBHfMYvqd32dNLz/JGrhhYiYiThRuT2qFt2/qWM55VMLLr59Bu/8RtNpyT3Ve+ZHv7wA1bPKckZn0pgEy66jN0rXvGKhtnVTQszuH2T6u/+7u+a3z4w6hk2z15ZyFswkYHPYsz3nn7lV36lXRV1QvPKcOjUOJIXR9jh5KP9Wbxiry/ZD8kD/mZ80n6sZBsZd3kAQ9V7TD79NR/hsA9TfUYsvLGnNB5sG0/2beRg0CcvbMFZdYRHGx7xnOVLlRvV2YIVdjEQRzpXCHbHDbr4IA9XdeBPLiR+idEIi9j1lDiKRTDApT4aW3xk2GXLj4RT4wgLG7CLozygcy/JA/zGAiaYHWNOjWPGAY7k5QjLKI7iIaf4QVYdJV97PdrJ8J8fbJ4SR7J0ZfzozH5vc7ZPBzmlOIoDfatkLPgeeTFYGU/2jKGNHhiCQ8mvnsRPO34U32EYUfT1fXDKm+SRenD0vLN9GMSRDfYzNspVGp9VF7UIju/3uNIAWCaHdgnn+ZXrXOc6rc/++VImMVsODH/7t3/bTp4WUAmu7w5Znf6f//N/2rM3OUkm8BYl8GUAJZHNYCj54K0t+jy07NV97T0JOl1udeE4XP3dAAAgAElEQVT1b0YMDN0rREZy+MYSv8Rpa0CrDXzsafPtjLrg0oZGSc0eWbj1i4WFqCs1Fh30JCb68Y3IAsl3Q+hjj7zY+b97vYzkrfiijyxbMBgzCzHUx9H/7fPA+aMf/ej2Fp43/Sz0/DL2dp0vvHvzT855S8/nCtxS9JFOLwwYS89QsWWs2I2NU+OY2Cttxo8ub3GOSN+IgiNjJgbqaR/JjNrwi7OSDr7ObI7ktbHLD/mYsdmDBa9cYc/Y+z6SEz0stmM49Ndc9UNi9R9B0xH7fMmivc9FfTM8sPIXFseMWT7O4pd28aDHv0MSz+T+lt3IpnQs8FKGYxg8sKHEOnwpezv4zavVOGa8YZVDObbMsMd+X4bfsdWcy37PZ3/WBwt/5aO6sQy+kZ7EqPZZwNn8MEMZ4xFv5Njke0hsV+MY/XwzFxwbjWXVG/1bJSyuxNIjH8VgFq+ZHjFzbHe8du6ELfhmMn27Yy0d5lVklTMs2nNMwCeG9lePj3CQNx8d8/niTe5VosMP/Nwh28qjLd3/b1ZscW30CYxE+LVf+7X2zNEv/MIvtFfbifhAoVfGP/rRjx5+7/d+bzlZZmYNugBKRKVkdDsIGZj80nLQ8SGvlPpdSXFFRcAMoJOsyZAJxR/B5ZNklaDkb3rTmw7h0IPnZS97WfswIpl6gBsKDRrZtChkvx4YtM+o9rHrAIm0J0Fr0vZ69NnI8sMmniY1HbAkTlsTVfzZEyeXdHPSJ5vFKF1sOXmo9xQc2umKnHZ1eNRtnqvypqRPEJgErgz6rIKXE4yThbNnt7w56DK5q1D+hYxFmatV7POTLnS+cUycEqP4XfX2/m7tk7f4MS50rOhJbKODj+rxdctu7WOz5iO9W1jY0B/7Sj4gtuu82MKjD69YIrmw4j8ZtuMvH+iQdyt66Mh4Zl7RvaIDPxyJg3lV46C/p8SvtstVW2wnPvbTVvnTRlfqmUOV71g9+tnjAwynxFEMjGviUMfnGIb01zhGH52zBcgojvIgeUUveZu2xCn2lHToTxyVp8RR/OiHWwyDY2Sz2q91tiMvjmSDq/Idq9NhTnj2NHFUrlDyMTLJR/sjn+BENdbimPboSTnSoY8dWI0Xeftoxh99tWQzW3Ss+h99uxZPwAl4Jg5jAogkr8H0i/4DH/hAO0k95CEPaSdSt1D84nrVq17VTmaSZpbsAbSn5HwmgdK3fGwJImz+CawVsmex4LVi9+CyjyXe8IY3bG9hud30+te/vp108yyUXyb00xUbW8FNn5JMJltk9/iDhzyZ+BA5WEaENziV4ko2ePSnrt/4ZdGZMdAvgeyrGx8lPerG237sjHBow2MTdwuotNGTOFS/aj062cALD9vGATlxWSSbKMFnsRZcFuWPeMQjmm2LKZ+h8JmCG93oRoe3vOUtDbtfSH6puP3oF1PGqMcBA4o/6n0cw9MYv/GHnmyRV454q9yoTg+bOTDAAu+Ievw9Dz1kje8qFrqTF5HVNsOCB1bjDzvbNXb6yOPL1uNNO7kQOe0rxI4NRRfcaet1jdrTpowfcMz8D3+vOxjIkc9YzHwatYsBSizgEWO8I7vas6U/siN8szayNmMKf3xP2cvFVt8en+qxYVUH/sSO/sRkpqfHYB8+csGpTJxG/JEJT2Tjz0ymb6+xD262Z9iDr9djzMmLA1l5sKoj2I0FO7GV9t7maD9yKeFQh2WkRzvc8R1+/CPekb20kY9cdOlb0SOGwVpjqG2Vdi2eKM2JNJNWAJDngFylQd7Q+t3f/d32fSAP1XnbzscNLaDIGbAVR5vShT9OvPTD6kSeZ4eogMUzMJ7Juctd7tIu93nI2RUKVzEEr560F8w2VnYlUQ4Qp/iZBWkdyC09+vCmVI+sxKj76kligFMXK2OD3BrIw5AWWv5h8Z/+6Z+27yzlylxj7P7EZiZF171rNzowiyPil3gaV3gtolzZUvcxTw+xX+1qV2sPovs8gbft5JsrTJ6J8hC/hZYFlTF2ddBHOF15RG7NWkyFMsFzMNDOVo1jePsymCOzNW697Gg/801fPVCE95j++DCSjY6tso6HeuIw01fx4Im83CKrX5u+mY70RRc52/mSWNTxqfpiq7b1dccFBH/86nlmehKL+IzPNtMTvl5/4hBZ/sxsyp0QOTojn/aVkqy5nWP+COMMCzt81Z84ahvp0D7Tk2NLlcM7G9eRf8FBLvHfiiOenLPkMdszfCN7aav26GRTGQzhU27pJ2cs6nlipGNLDx+qHzP5imlUhzO5FR11bKpM307W1rdHZhYD7WzFXuoz/uirZWJvjqij6Kt8e+q7Fk+ClORhiNNf/8YtIlds9HkIFyAnKv8OAx85jvn2k7ehfOvpVKC7nPnGL2w2fN/HM0/B7QT80Ic+tH0M07eM3M7x7IwrFJ7NgdPVDomZoO6xGR4HBjaS2LPECH9fwlyTQL1v62V6fvu1rfri4CMWmYD49IuRKzLq+o0hPxw0PF/kCt6Vr3zldpk3B88eRx1Teo37KURPJiT5YMy4WAz7MvwXv/jF9i0pvvgUhgWQe98+U+CfET/xiU9szzXd6U53av8aho8eGHeVysPkl7vc5dpVuFyFYjexZjNbfKhx1NdTxa3f2IvViLeXrfvBoE0diUfqlXemW7u4xH6wVdk9dXLyIUTvzCYefcGZesr0iyNc4YvulGmvdsSy7of3WBldNRdHekZtdGvPcSBzecYb/hEmOPiN1INnS9dITzD0fTM9bOnLdkocgzeY7aORzVFbsJKzxYdZTs90ayefOFa+Lbuxn5KO5F/iopzFBn/Vv8UbG8dKOuhFVXfkRm3hhZOs0nZqHOmoczvjGwzHSrYTx2DrY1V1xN+cf+ybW1u+VvnUKz/MwV3bwzsrycAPS/KJfDDO5EbtuxZPjDmpMqLOqP9Zhnw92pUnbzQB5jV0J1+LK1cKyPlMgXus2nM7ZgTmfNtgQ24j+tcsyO06ttl1pcHDwq5WCFYGE9b8wuBbDppNwc4/CX4GMvs7xRsbPBlIOPgTn3o9Yh38+tjTxneJTc5+9GlD9rXz0dUaVwotOFyZEQc6jZlYKS0KxSbj3+OITvbZNsZszHCP5NPGlo3vcFSyb6Humbp73etebcHrW1D5CGa+JO47XxZX/tXLgx70oLZIspiHzXNP8oAN8eAvnLDb4LaxP4sjvp74LKZ061dnY8Tby9b9xI19V3QzX+jqCe5RjNlGdJCjw/itYqGDPH3swBa9rdL90Z95k7xUkmc7OrIf3qoGZv368KvDv4qdHIIpMaAj7dUmO7ae8JKvcvxJHHr+zK++PRj4xq/onPmEryc+2BB5Gz46RnGUu/18PSWO7GQc3PY3X+T4COMsjmIWSvxrW/pSzuJIhl0lWzUOkT1W1jjihUeb+TGKo5gh/XjF+9Q4Jo+CwRiN8m4rjnzntzL5OfN5FsfYVyaWdI38n+kmRx4WfgUXPSOf9CeGwWUsR3nEZnh6++yF6Iw8DCu0yj/TvWvxlCBREsMChV74whe2zxSYVMibTciCyoTjJPLck8VUDUDruAj/sGXwEny2LJwEWZsrDdqSeOGHC9lfxZjEo98mCcUocdrrHj31JKe+RbGDJ4lvDKKD/SRyjXnwSn5f/faKf+JVdTn4ihs+Jbnom+GiR/yCZ8Y3a6efDzZ1PkSXNvn0yle+sr2AYNF3hzvcoalKrB2QEOyIDrht5ENwJj6JV/qUblmmPXy1v6/HXtqDPbjSfqwMP9t0KlHKY/L6E6+MxR78M73iwBeUHNmDJRj4EJ+Ux2RjI3jYpis60n6sjH1ydSyP2a96K5boq22Vd6tu7ln0k1WPrpnMCKO2jEPktdE3ik2OZ9UGuRFv5ZnVYTeW8X+EcUtWX4476ivy0Zux5Ae/T5lj8CeO9NmPT7FTyzqv2T01HxN38jm+0bdlu+JQFzMxpIts2nq+PfvyA47oUQbjHnl+JBb4j/mhv+ImQ341D4KXfM3HFezBWvHM5tGxWOxePFlYAJ/yspe9bNPtAWz/H+51r3tdG1xvQnHML+csRLzi6i2oDP4xUKf2G5AaSCf+JIYFgH6BsmkXSDzaYasJuoqBDr/M/Fua2FrRQd7tJa/U11942kcEbxZ77PHHd4v4pI9ckkIdr9hoc0IxZv4NilfJ3bazr89D9nTZfFzQWLrF6bXOGdHNLjt4PWfEhxn2kR62+WEM2IWVPF+QfV+pt3jyb158idwza/ENTvJweG4rumBTJ4/HlUgL+8glVvptyMfb1NOXOKa/MZU/dCWPxA2/twA9c7VC7LFBh2e7jGcWhL2eGRa2bTD5tpr66kGKLfrlgnw2lnSII70zSl/iJo7a7MNhbFD6ez1siiNeB3f84rAaRzjF0PHH9+fokgf09jSLIz4yciavNSePeh32t/SIo/gZSwspZWLR6xphJG9OkbPxxxUQcRzpgVvc4dVvvsv71TjSj8TSsYkP6mmv2Gf+Z0zhEEefQskVnSqf+kyPuIiD45B85JMfUyu5TV78yfGBL2KEkrvBoUzO4JOXfnyfEke64Ld5ccXjB8ZwNNYz/+mAm4w5IQ5bvLM+Pjku8Edui4PxUN9LPhorDhlLOpOHI5/E2FxU6sfLB8+tjmiGHa+xMP7sq2eMRnpmbfQbAxsajf1MtrbvWjwxBmg1ZDIj/8dMnxOak5YvVHMoCW6QJEpoFNz0XRQl/YKhHE2sOjAZSHYjU/v34Al/BtE3jnIC2CMfnsTXid0krXrDU8skjqRnD35JaVyiCz9c9i1m8YqJRPb6vjZXcDzzJZH0m9yeBbMI8gajf6niFhiZGbENr01M4V+ZjNHrxEAOXjp9iwRGpTfnHve4xx0ufelLtzcoxXlEZOWhBSEsoRzwYasU7Nrw56DqIMtn8TPp6a36qg51esjKdblvP3Ok553tk0E5oLMPR/Zncn17xsLiy1hunax62ezHX/GCAdErHjOKjDjwxVjGB238oGNG4pt8JWt/K46z8WCDvHwi70SrbYt/hIkMeaUr2LCt6kg+ko+sOT6Lozj1ZOFiDMgpzffkBXw90W2es8e+44Jylo/B1euh28aeGBhL+WB/L5Hjk/GwmIbbeIz8pBP/iLSTF0d+kIdlpmekwwmbbccGc5ROsVKO7Ga8YVc3t/GtxpGMMRBnC8hTxoKs+DtOGxNx2KKRP/i1W0TSRUfOHfwb0UiPeUXeC0bqxgAmOpQ9sSF2+uUlnT6aPItjL599usXOuBs/dvkwwx65vsy8cJ6Ajc6Rn71cv79r8dQL1X1JAbwHr/0j1yc96UntIAmgwHoGyltQvhb94Ac/eBjcqu/iVk/iGFgJYjD5fspgmNQWCiE66JoR2wY+9sjbqu3gyz89dgKzIPHQvAfovXlmIQI3XvIOMHmI3kfpjDEaTYyKjV3y9NFVcVS+UR0uE0vOmFS+FaUNrk984hPtHz1bqFtAzT6uRm8w1DiO7PVt5GBGfpmJV07g9aAw8inxV4qRE4QTnlisEv3skYXB/lYO9PqDRTsdDnCrYxGd5PfGMb6TZU8cEkcHWv0VxyyOkU2usb8ax2ChKxjYG9mMr32ZOJIxDnBU/D3/bJ98xhJPsClHNGp3xSFzVL/8MCdneBLD6IfhlDiSJ8uehQc/MpbRvaeEx3EqcdwjM+JJPo5iNOLv2yw8HFts5qgciy5+9gS3ftgT8/OJI/1i4JimXKGMuysujt/kYR7hPqZXHG1iMMuhLR2JhThayCA4YBzhcRxPvoolks8wjGikI3yxk6uHxmOFYLSJoVyGy/4pdN6LpwTSs0/+d5nFktsuyNdk1X2oUl9O9KcA/VaVqQOdyTZLoi0fyIilMvIpR3L6clAi50CgtCVByeGRvPnVRM5r/F7z9wFTt1SrHvX4RBc5bfVA0+PpZfSTzaKr5x/t4/WQOqwWLSaHRZxvN9373vc+XOlKV2r/vxA2V1Kqj1Vf4sBPW0j7iII9/PZhV6Lsq7Od2FRdsYM39vkRHZV3qx7dsR99WzKjvtjNFQL7s3iN5LXxCY7ERdvM/5kO8lVH/ImfvVzaY5OssY4/Pf/WmGYc6CBP9ygGsdXrrvsZS7zBWPvVtzAGA/nQTE/6a0neWMJBruqpfKnjscGEl98XRRzhOIXIGY/EMfhGumZxJEMPf2wZ01kOjHQnjvrIR5buEWlPrMnaNw4zjNHX68JvDILbfvT1vGyM8ASLGCYXHCdnNMOIn20bwgf3yGb6G2P5EwzpJ0tHYlVYW1V/8LOH75Sr4WTFUZmNrhn2Hsdo/3xkz3vxxLhA+Me5VrJvetOb2pedPQvlVouvi7tF5C03l9qcjL9dyUBKSuXoQL3ltziSmU3AXrYOOrnIR0dNKld0kISzSPHld7fi+n8zYDIGN/lQJka1mT5lnXyRD6bKd6wOp18ybjfJE5d2/RsWV3EuvPDCc5PkWHwTg2P2euyJGfn4wbe6P4pBeNNHJnJ7MPQ8sRe9ff/WfjDgifzKIja66SHPD5TYpL8vq93U2SVf91Pv5bNPJrZOjUMwV3l2R7ZHbcGSssYhbX2JZ0bBod8cDL4R/wgPfhs9+iOfstcTHbU/8j3v1j4ZuoI/Pkb/lmztM6bBHR21v9a3+vXRU7cqe6zOn8Sk6prJBbN+/LZT40gHfdFzypyM/WCgb0Z4ZxQM+tVX9QRHL5/Y9nbja2zl+D3j7+WzH/7gr+MTnmOl+eccrYQD0ZP6Mfnaf5Esnlwl+PznP98+TniDG9ygLaL8XzGXGB/+8Ie323Zeh/cl6G9XMrCSpC5UVn01oLbQsUGVBOySSVnl6ckvjJyQ8lX1ZzzjGc1MEskOHr8qLIbp88q//wfnFX+XmrcWvtEf+ynjy55S7PILWe5YONl//vOf396s84sLLji2kp1tW+XZOkBU7JEVF+OZffjZrjrjE902vCY2WduINzKjMjgir5zZHMnXNrqMpXIVR/SQ4xNSPxZDWBEZvMaLD1VHeEaYEkM68JGzjXiDqRns/oQ/8jDQHdsd+1G/xJEuOqJ7RUdwRFaZeq9n1J4YKBGe5GYvn/3Ez35wj3RHX+RqiT962BZHFByVd1bPmCrJ2+icYcE3IvyJg3rkZ/wjHZHXp042ekb82vTDG9xVRy9zTBf+xCD6VnSQYcMGh21Gs7hELrLKGS/do75g0B/55MkID57ka/i08WdEI5uVL7JK2wqx7xjt8RAl2jNuIxsXyeKJYk4IEMfdrvOshROgA4+vOrsy9e24eKoDLQZJLIO0Sgazl6v6Z/rI4EtiVJleJx4LXP8LLoln0eKqIF74cznYs2r+1Yk3Ja94xSv+X9hGeJKQyopjxFvbcjCxELc4etrTntZu2fmHzBdccME3vVkjp+TajPho20P8DU4y6rAHf/Skb0tn9X0Pf68rOPgWDHjS3vNv7fMrGE6Rp5u8DdU4jezKpdhRRjZl8EQ2vNlPGXv6xSDHlPTXcqaDLUSePiXeGX/V2dfJxAd9p+io8onjTE+wVxyJgxJl3tIx04MvsVQ/NY70sxsMvV77x4gsPRkL/Fu4R/oir7QljiPeWVvvQ3TN+LXHjvjBf0ocq/7EUjkimGaUPIKBfB3fmUzfHrnYp2PLZi9vP3FQjx71Y/GMLTJbcZz5lbEgb2NvxjvCrc3ccf6wZTE64z3WPj8DHZP8Rj8H3Grx6rgHez1Y6K0QnzLwXI0Tsze4/Aqtgd6p/lueLYnnCkmSR5kD3F4HoidykiL1kQ594ZFUNm2SIle/rK4thNJPj3HyfSeUZFT38JwFVHBYxOgnr005w1MTOElprEf8dLHjeSbJi48dJbwW3d7w8zV6zzp5EYEeC6roi9/Nie6PPvrwqsdGZDv2c7twkUN4K7/2bOcEugp5G2J3C2Mnem6XDKJHLMwZY1mxnGOeVIKDvAPUXv97dcFvPHOg25rD8Z29yAZLfAqWWSzJRU/w9GOR9q0yccRDXi47Rq3EEcYcryKXcst23xcs4qhuW9VD1njGn2pjpit2+SGmyhlv1VfrVQcMkU9ZeWf1URy12VYIFjI1Hx1z5eZeijz+6ONL6r0e7clZ9cRgxX866zygL/Ipe7ujfTrkI3nHT3RqHMmaE475mW8rWNiVj2TEpdJIT3j0ZU6J5YxGOsIbvOIQHVv8kaulYypMHjPK+Nb+vfX9mTfRyAFAvAXlNotPFXjWydedn/70p7cvkbtV9IQnPOHcJJ6outg3SyjP6zjJJGH2OuUgYJHpLQQHBfIGduvgkERiQ0J7DdYnBtQllH4bPTM8+PBLKJPS80X+p53E8j0Pvni11fenkvi9T0lANrzF4CUBkzNXsCo/Wza42OafHLKfGLjlmy+Eez15lcTB94nohIn+WRzx2BBciL/eJNHOfzj5XnkbY/mDB9GBVxxXscc+O+JoLFdPEHDEZ/nkh0z0Fri7qnygQ17QaTtGsc8m+dzq5ZMx0D7Lx8SbDbnDnhw8JY7GXE6Tz3fDZjkw86nq8E2b+Dbjn7UnjnnNfOuHyEiHH6RiJhdsYmofntGc1MdX+BF+dwFW40iP8co4iKO6cdpLMGbsxcFzjObUio7YIm9uZvGwikUuO66JSzDwL3kZOynF1jGdHRs+Y7gaRzbY+3/Yu9dnC56qvv/nb8jVVFGlIKYiKhEUo2iiEhE0BqMgJhoxwVtQxHhDlHjBG2ohXlFKEkWiRkLEK6JlBDUqeEEUFbxE8yCXqjzMMx/+6jX1fX/TmV/PPtP7oOFLTlfN6ZmeXmt91met7uk9e/Yc8uYm9s2PqxzQIf78xyO9q0VM8cgfc4zj8YPpGX3ykR/eocYXOsrDmU/w+vCiH/xs+3HQNTzKJ3qMa/vN82dw64MzcuIIy1Hsz+i78+KJcSCe8IQn3LzpTW/avp5D5NOf/vRtwPra5TM+4zNu/uk//adb0JtMz4B7KPQRjCYH+w3M1cT2KUBJB522JooZF/UhY5NUEgMGx2LjWHxmpUFDTkKrFXKS24Trnz2XZAb8UWGHnBKWGXYXtM63Dy9Z/7TZ4tsF3wsxtc10HGHQ7sJEvw2mtiM9/I5HfZV4pAM2fZzTrm1fuhgm77z9I5t7+Y7Doh59WNHDF7yy3wY3P1ZKPNIRH8a1CXxW2FX0DX95WFvtR/k48sgWndfyyGYTermwwoHcCyfc+V3bjINZWzkOQzyu5nVy8NviCZZ4H23zm0z+lg8reUQf3XDDG4flw2jv0n4xT18+wLdS4pH9/OJn+2d0xaNY2idPX3dR9jrMycnoe20+4g/O5Nm0lVN7u7PjeBzjsKqDXn7QYeMbXPDh4GyBe5SnR8mvvZ44zB4Mymo+ygF42dn7sLd5dIxH8it5c6TrzosniiWFB8aR6n/KlSj/7J/9s20R5WFjRZDe2Yog5pu7FQ972MM2Plb9xJ3VsH9wK5ElmE2wZ0Ui4t1WIqm9FFGSOe+4PjM9Jbt+ZCyYFD6Qt+D1T4Ef97jHbZ/Y6JoVk3gTuk8z3lpOZ4NkJsO2QrYF9Qtf+MLtq94XvOAF28swZ3K3tcGNR8/d8XnUP5OFI27CpPbKjfDHMflZDjcQ68d3Mdz/mnFmf2yjp4lWLPAI2xHvo2z7+cA+ffKJfL7U77aaHhjwoMBBnzjPSrmGf30dq+Wj+DquDzzOzUpc4kF/dxqu4ZFudvCAg/EripndfRvbxiTe6JBPyiz+e9nxGI8uEnj0Xhv66F7R423S7pj8lb/yVzZMjTV2ZjyWR2JhM7bdKVjlMf/psC+Wvm5fycd4hLP5De5r8tGHtzEfbxvbYxzsywHceTcQH8QgH2c8ws5GMaPjGh7FY9TveugbhhUO5JHNe8vMsXcZ1/TIRXeD8ADHSkzdgTQum5/oy5eZnvIR14o+9lfzsbkBl+5aOfY+wGuKOPbGfXjEerXceTXDAURYNEmKN7zhDVuiAINQgx65EbgK8B29f4MiHtSrychHegqgya5krG3Pg/aCXh+2K+RnfTqvZjP8HYsVOROmAe4t4/azMcq33wWVLn3TOZMJU33JmqC+6Zu+6eZlL3vZzdOe9rRtc8FxbjYYszur+c0HhWzYZlj00a7/aCd/u4CnK2425cOffbz1S8fQ7dbdLqj0iSWOivGtwg900N9WDNS2I/+P9JKJxxHXkR7tnWufD/bDQl9Y6jvahztb2h0fcT7K7feLBxviECczm3vZ8bjcoSNcqzrikZxxDYv9FT3sK2TDdIlH/ivq9q/JR3grby8ew7PiPwzxmF/VK3riYPTrUlzxrS/bily8Sz7SUezxsIIdlpE7mMqBDdzJP8mwPfKwgiUO4IErfvJtDyWO9a9vc8O+76Xj7OkTBvsr2OVAGKxbbKPeS/b35+68eGJYEHwy++3f/u1tZW5F6xMKpxDnQjh+LbUH8c5wLJhxMQborG+SkJytIsFKvNqqJUBJUPKwT16tOO9c2JId65IwWefoMEk7p2QHxlkJJzl9wjPrXxsZhd3Xve51N9/4jd+4vZ3+K77iK7ZXJMgX9us/sztrC4NPqX2ysi8fZ4Vvow374dffPqz67fumz3lyzusPgzLqre+lmr90ZI8uOlb0kLHR1baqA8Z8aD/fbsMyxkzfMOQ3bMpMD7/1lxNjDs/6pm9W0wF//F2yOZOvrVxyHB/hqs9tNZ8q9pPH59liDsABP+BwnH+z+cGdMuNXf1t8XsMjGbizD/OKHjjz2YVKEZ8V/8mMPKaTbytY4iMMcGgbFxEbwAf+OMeu8+zAjNcVm9kiQ5+S3lnsHjA9rcQVFvNaHK5ioUPJdhwUo6nhXSMeih9fxCMcMz1s9ohIqthPprbb6vjzYZssHfb7QHGbvPP5bZ8P8OJghvs2fXdePDHAkSc/+ck3v//7v3/zoR/6odvboIEBVLDdrv3Yj/3Ym6c+9akPkn4bsIfa+ZJIIPChXikCaaCqydO3ooe9JpUwsC9x6dSmrtBfwozt6VBLTA8tewu5MvZLjzo94YWegbAAACAASURBVKY7m2M/+841EervZare4/SJn/iJ26ss4Oy8/dUCC9yem1L4sR+4M52wKPCN3Nhv8oRnhmnkJQ74MOs7s11bGNJB/ojHZPZ12MmWTzgYMe5lZscwJEeWXm1HPjln01etf1i0wSI2nZvpMV+QqejjgjvrW5+jOl1k07miJ+z04wF28is6yMJBJv7pxcGKHhyQscFC5yU85av+lWvysbixp7ANf3ym+0zN3/CQX/GffljYp8M+HeoVPeEmY3/U1bnRF/qzpS85H8RWbNKX39Xky4vR3qV9+MjIBdfTVd/TbS7EYxzQWy7V57aabDriiG90zbgZFzfxnPxttsbzZNlLHx32ZzZHuXE/f7XRpfD/mnLnxZNBqfjKzlc8PuH7PtHqWM05d55c0ICMvGvAviPLSB7BUDdIVvFK7AKa7P649jFhcBqvY41vA807k57znOdszzKZWMUirOlTOwcD/GRf+9rX3nzJl3zJzY/+6I/evPd7v/fY9f/Yh4UM2/lvf4a9PiYC/ybm+c9//vbdt19membMQ+pNLORnOv4P45ODBpdTxeJIz55HMnyHQSGXjnzbTgx/8r9+8XhkcxCd7mZfrazoKf7wj/m0oiNQo3xtt+npPOy2jqvhw1e+pVftnAlRX1yq+ZHs2PfS/hjTYqL/ih44KsnBN8Ndv6M6Hsgf5dCRrHby+ZF9Ph7habHlfNiv4ZHtxkHxWMUPgwKHcaGkaztY+GNc5w8dR/4fqeQLDOkgj0fH9O2L8+Wjc/mQ/L7/0XH5GHfk6V7RQ0dYy4EwHdk9asdBORWG6iOZsR2PYjHiiL/qsb81AplsOjfGcux7aV8s8KawE+bqS7L7c/QYJ32oMNetljsvnhoQn/RJn7Q9HO49PTMCV4E9FPsLroXJGNizfkgs8g00CUFPi9O9nlnCaKNDYhaDN7/5zTcvf/nLt9j4Z7+dLwnpta+/c7aOYfnP//k/b0nmDtY4WEY82dLWPh107Yt2+JRv/uZv3p6r8moCz1fpL4n5bJNbR/7v9XZskMZhbTAd6YlHuBQ1eXGExfFtPsVLOuLxyGa49nWTS/izvaKnvIFBzMjiZEUHXHEGi30b3Ud6Os9ueWhf/+Kdv/ya6YGzeOjL9lHfdM1qWMjFX31mNju3r8MBg0lWLT4rOuiERSGfDscresjhcl+083FfYI8DfRyrV2zSWV6nK1sresICvzGlaFvRQQYGOsLgeFVP+biBGGIz6u2cesxHduP7GuyjXtjTNbZf2h957KJvXK1iKab5wyY8K3rwZeMDWbou+VTM8q9cXLFJdpwf6cBDNwLSfVsdVv3w19y0x3ibHufvvHiiBJE9XxKhJm7AgLIJ/p8Nzz6dAfdQ6FMw+Gfjv7aS9KwPuJEMavItAuiclTHx9FfYdltZIivu4nz7t3/7zWMe85ibD/iAD9jOJ1efZOFlu8Wf92h0jl7nxXlWOq+/jQ1tR8UvJdxp8j4pb55//OMfv8nEQdzJoXAe6dq343DkkTxMRzzqO9rIB+32lWr9xr7Z1ldxjt82PB7xldy+pqccst/FZmZzL9tx8VXT1QJqRQddfOA3eX60AOvDUvaqR9+TJd/kJqaORy6TrU7OMez6sr3KIz3kYUoHHNnO3qU6HuG2ldOrPJKDvzjE34oeuOGnwz7/bMpMjz7sqp0vdqs8NgbIkw3DJd7250beYKFTm/islHKjfBQTurr4ndHFLnlzpALPmCt7HXzG4bhpW+Vx1JsfsM9iN/Yd97NbPOnhy2qJP7HEYRhW4hGP5uvk9/WIqxzA4+j/Ko/1p0OBOX2jvdv24SgPw7Tif/rvvHgShAxzTkAUn9oBbLIAsofIM/7OUJc0fPUz0re+9a3bV2WOV4qfz/7pn/7ptoCR4Hgck3Ova1yYSiA42LfosWjywLX/S2fz8tJf+ZVf2QabGOhLRrzEhS2LX7H0jJMXfYqbF5ApnmXrxWp7HI7ZKu7eKm9yMmB8ZbgvbH7d133d9s+J4dLvjW9845Yr+rILA9v0rvL4V//qX93ultGLP37aPyouDMUQF8p//+//ffvKWbvcTl7d/l6fvmICPy68VNTPeVeK2LAHR7kA/4zHI73k4YDHT4rlAh24WCmeGbO49boCecEv9SX/2WQLBnEuH9kNg1qJ6xETG86LiV/pqvEg91aKvIHBxgcvR8SJn3ifLWThoctPmrvoruYjP+SCcUmHeTEuzmIRQ/ODFyPSQR6OGYd0aoddPNiDAY/isVLIsUOH1yUYl/ZX8tFYwGU65IU4rPJofoIhWXrlI31nSzzyw3jAEx1HhQ1cG5f2bdeMazyKBaxi6NsZbS3ijuyP7caCAg8ddBmLKzrIGwfmBfkkJmKzmo9ysLm1/bBtIHd/YO3aj0O5yQfjcqWElz6PBOGUDmPrbCHLZxvs8hAnR2Ppkt47L54YBogjiBFQgQYGQMW+TZ93tpJfksO7Mx71qEdtfmpfKQYBfh7+8IdvHDZxSbRZ0TdeJb9j/8iXfUVyexhbDDzM73/TiZUiPiYN58SOPDsmRRdNX++xLzG9JPO93uu9tu3IJ9jFXmHjPd7jPbakdOHZF4u5X/zFX9yec/rCL/zCbdFGlu4uzp6fe9d3fdcNX3r3eo6O0xEGftHd5LOXc668zL+/9Jf+0vYeFfyQx4/9IyzjgkJfRV9vSV8pBnNc4I4P4nOUAzPdxRMOX4V6Hwzfj7DPdGgTU5NV+QhPE81MBoflU7ULDS6dKw7OwaPeF/zjUg0vOZzIv5XSWKIDbj94kJcrPMLBXzL0POIRj9iwGecrhR757NfIxiQcYjMbG0d63amFgR7c4E8N24zH8ohtHLLJ9iqP/KcLVrbNb2zKi7NFPtJTLOQ0nSs62BJT3HuvD7/I07uix4dC3PFFDPgSn3jaF9jZImNfX/3867GVwl+FTYsWiyecruQSWRzQZY7GIyx8WCl0eFcWDLiTP3Sv8Oi64IPhu7/7u2+yI4ezfDQn0w+7mOnDd/IrhR6Fjj5QeffZylgiD6+FtA/Jxobja8qdF0+BkWQSDDHA2DdgBEaQZ6ReA/gdTaZBJ6B8lhTXBEMCmCSbIOm9TRd7BjaO8UsHzsm6W/RzP/dz21diH/iBH/j/G6iSRj+4yZCny6cyA0v7U57ylO3N8TDpc1TG5KXD4IapQrfE9/yUr+u8E8xD7O4SKeG3YOsCY/+SzXTva1hMKD6pigMfbUcxcW7MVVjZ5YMBTy58e1sd7+OgPx5GXup7qW4y0wcGPihH2I901d/kYAEFDz9XCuwuNh7iV+i8bbLPBnv5gkex1EYHfo8K+bCmS55ewyNbOBQHCzglnUf29+31pyMe9n3OHMNCHhf2lXSfkdfXmHThVXCEx7ja68AZ30db4rHKo/5iF1YYrrnYND5gvgYH/+Se+RGP8PCtcbv3/9IxnxoT8NBjy8dRNjvqFlF4XeWRz3TY3DEpJ4vPaPPSPj0WDc0N9Fyjw+JHLppfcHhpTM7wmF/lAR0jN0dY4C72+ivuPGlXsi+flfpsB8Of9OhnEagWy9UCp3iu3EGd2bjz4gn5ShOVfbf6m/gRwUkXTyQJ+H3582MAz7h//etfv/H+3Oc+99aL3h5NnwwlmQsPneJYku/7Hx2TkeSKQe/f9JgEX/GKV2yToLxgQ07Yvy/3DNwzcM/APQP3DDwUGHi7rGRaEPnu0YsyfeJ1UXRBtEJ1AfVvPmza78ufHwPdxv3N3/zNmw//8A/f7hytfkLrE4G7QBY7FkHjJ9mz6MVa/OXHf/gP/+HmV3/1V29e+tKXbgsnd7boLXd8EtD3vtwzcM/APQP3DNwz8I7OwJ0XTy6ALs4ujl//9V+/PSfjOQsXW4snF2J3LvyfO98V318g//xSQhwsntyOtP+sZz1ru8W8umAVN3El52FZzz3VtoKejMXRb/zGb9x81Vd91fa/8rzSwsJJu/O2bomv6L7ve8/APQP3DNwzcM/A/y0G7rx4Atwdin/1r/7V9hCZZ20snhSLJoslXwO5SFpIrV7I/28R81C0a0Fi0eQ5hVe/+tXbQgr3qwtWX89ZgP3kT/7kja/9LIzf//3ff5kSel7zmtfcPPvZz94ePP63//bfPrgIszizaConHN+XewbuGbhn4J6BewYeCgzcefHkAuki6I6HO0ue5HcB167Nvot3d6i037VYgHVnhK721eNdDLaVvnJKTr9KWGtzrP/ZYlGoP3m+kU/XWR369eB2d2Jwd2mh2Tm1jVx6OqetGMx4h9OWLO4c88FDkRZjXhlQH/WskHeOXVx0Z8lXuJ/zOZ+zxcQ//tUOh37qsMkPbc6nqzjky8zurC3+6bEV+1lfbelX28gUR3yEN1wzPfUhT0bfUfdMZtYGe3jgpsfxEe8zHdrIhb2YHvU9ak8+TN0pvA1L+Mkp9JTbZONmpkcbeX1wWklnx7fVYdYP7nwZdd6mw3k4YLoN9yVd+Q4THHJeWfWJHjpGPHuewpFutS1ea6/fbTX9YZaP7GtbKXFHz4jD/krhv/gVW3HNv7N62CwO5cIlf5wjE27HtlUe4SPDtkKfGwt8OFvCXv9wrGIRh8ayfUUtvmcLm3ERj9qOsPAbfkUfsRz709W5befCH3Lh1o2uVR7JwbR6U2EP63z09pIPHHvOya8w/G8y/8bDL6r8RBs4AekigDz7RwQfqD9sLnhNRgXHcXe8BLYBR1EJ4jx8SK+Pu2ctGFYwljzw+CXF7/3e7131FL9ni/y0250iz4jxQ5IcYYGdzzZ9bJ4140dFYinOlaCdq905vHjIHC9+befhbrbhcd5Xd/ia6Uif83758Md//MebjOMv+IIv2HR+3ud93saz57D4Fa5k1fyg33kY/OgAhnGgjP2P9v0a54/+6I82Of7Qewn7EY/jLzHCe8Qj/fIAdhs+cbfy/hH+GMz0sOO9PPDjRE6cLfxtnPU+m2t4lI/ekSSf4ODXbThgjwu1PCJv30aPko8zn/QTE/nIpnf7yIWVgke84cHiv1843YZ/tIFHOPEgFnD1C5+x3237jWuyuOATbPSdLf/rf/2v7YcbvbeLDvL0wLkv8rVcwmUYruFR7rg7LA5+nm6O5MvZAp8tHeS8qwn2lcIHGMSQf2Jrf+b/kV4/T/fLYTw2T+LxSIf25kd4zS1+8bfiPyzNMXT1jiX+hOEI79guF8sbv1RTYG9uGvte2sdbGMQkvSt68N78qC4e7PJxX7ThAF41DH7xJx4rhSy8ctKYEB9jOyxndI15ZzyYk4yVGe7b9N158SShlL//9//+9hWNOwz/4B/8g+05mV5Kh+y/+Tf/5vZun9sAnTlfwJGpIBORSIRHcGpHlgEf4f3cVjs9CHTeFpGb8BV/6Pjrf/2vb0myGgyY4ffzfYPTMcwG2azkcwOcPUnMvn3nbXykS70v/NWXjgYzHe4e+pWdF16S836Xhz3sYYcJJvnE2AWPD97R9KpXvermDW94w803fuM33nzap33aluR0HyVqeIspDHTqv1JMCC7aeOSfOJcDMz1vDx7hxCGebfZNDN7ts1LKSbXJwTtMis9ZPfwhU4mHVR7FwdhInl/89JXwrLApV0yQ+qpd5OURf+BS0xtHez3yI3ljST/jdZVHOuAhLx/xCIu4nC2wKMaFRTAe6JJfKyUM5F0sHeNhRQ8ueuWDONr4YpuNa3HCMzv68MELMld5LG6wmsvNA+I/5tdtXBR3PjS/2V/xnw28lY9iwy9+mnPOFhdsXPCBLO7owZV6VhpPbIrBNeOaLfjZwKlXTrhOydOzBQ4bGbV8gkler5R0GJfikN+zPDrSazxYtPADn3ySk/G5l4PZOfmvtpF5l3d5l33Xi8fm82Qbz653fDpb+Gtzjf2f//N/LvM32rnz4glwg8nF0kXLBdOmDUhJo89nfdZn3fyLf/EvlgfNCHa/zwZCFXZ8QvQTfXdKJNdHf/RH3zz2sY/dkgwWE/Hv/M7vbHfIusB+zMd8zM2jH/3oDaPAwErX2dJEQr9kNFHbt60UyeSC6XkxyWZAK+nf6xpt1Mdg6kJBH3/0sz8rziWrbytxL8lUPviDP3j7/3NermcxU9+ZLvLs+2T3Iz/yI9s//P3kT/7kLe749KJCffg246Y2E6zJBg8jvpnNozYTA3l46bBd4iDb+bfKYzjCy0ex5PNqiSOxIJ/Os3r0t5kc8GiC6kJ6Vod++HLB7flFMTziUH/chV1fHMDgbqSLFUz1Ky5bw/BHHzbUdOnnU/I1PBZLHJB3sa5tMHm4C4ONjIuuSbrjQ6HJCf6UC41rei5xuVcjHy0SjEFy8awfXfuiT3NY+3y4hscwi6VcgGMFe/jIyCc+mJtXYsE/8i7Y+RCH6d9zMDs2t5ujYUiOf/Y7HuXCWC6qr+Fx1E2nRZhrUTEabR7t0xGH5oZrxzX7NteJPgjl35HtfbsxSYd8SDa9o6/Jwa2fonbNlk9+iDQrdB0V8mJmsabmR7qPZMb2cBqT8kmBb4Z7lJvt33nx1EXeP3n9lm/5ls1GziDIylTSAsjhS8TMAB610UdXn2B++Zd/+ebDPuzDNkLf8z3fc3vB3/d+7/duiymfuExAL3nJS27+5b/8l9tEaIHgK7bv+77vu/mFX/iFrQ2+PiUc2d23I73NYIiPfb/bjuNMnT7+1b6X538lTiVT8vuBeaQnHWp9bHwwQL0B1sPedIVp7N8+bsn5NOB1BO40uVP1ghe8YGsjD5tCzwwLH7JRHz7O+mb3qB51xc2RnrcHj9nLP8fsHdk8wl07/8MdJ527rU6umKnDc5vseD7s6hFP7WPfcb/8Z9cmJ8gUy3SpZ0V7NuyPx7P+s7b8VcdHumb9Z217OZjSO+t/1JYv1XSs+kQWl0q4Op7ZNR7HOCQXhpnMpTZ4w63fNXrgpaeyqqP+1fRcyyMd8Wh/1Bm+6vw+2z+5sU7H2LZ6x4gsnHy2Ff9L2Ed7435zHh320zn2ubRPbiWeYewaMJMf7cEzKyPuzpfnHZ+tya36vdd958WT1Zu7DYAgyarSc09ub1oV+gpHohjQFiYWKHctkpHzJTR9nrcSnG/91m/dfqLvDpPnsH7gB37g5su+7Mu2xcB3f/d3b6Zf+9rXbv8s97d+67dunva0p9388A//8Laook9gV0oY+MZHGHBhwbhSRl7I02ujc1ZKmvrqYz/84dIG0wwPm85XJCd7Fk7dDhdPffiXzfpXh52Nn/3Zn92+qvHrS58s3OKVHwr9cHW3MHk1G/JkxKN91neU2+/vfYqHP28eRxzxeA329ITb8YoeY1CcmrDwecR5tmZ1MR3jcZseNuVaNdxNeKM/2vTbFzbD3Tk5teI/ubCno3pFT/mYbPWKDjIjlmKhfUUPDuJr5FFb7eFT94FybNNvxSZZ2Iv/aHdFj3ju5w26jsbjiHncH3msXR7N5rXO7+t4ZN8GG/+OeBz9Z0t/9Yr/MPA/Hh23v6KH7eZ28rZreSRXuQZLPOINpnRc4jG/2W78r/hPPv/vgr18DAcsYUvv2frOiye35Q0ECfJTP/VTN1/xFV+x3dp08f2zBx7C/vRP//Qb/8cMuW+Pwl6DiU4E+P71RS960fY1EWIe85jHbF/H/cEf/MFm93d/93e3h5n99P593/d9t0GnfupTn3rz/d///Ztcr5snbyspqmfYnbN14RccsqufLMjwS61k/0hP58P0lre8ZXtG6ZGPfOSWZBK8xN5PXsnQkb18VIudxLaPZ33c7uZbsXaODbq12SxCLUi/8zu/8+bpT3/6ZsZ3+9lQ02GbFecbmJ0/8r/zs7pBzH86YT3SM2JLlzb+8L2chfmIx3EAkk3nkc3s7Ovk2LyLHnrhF8OwrWKhQyzI8x2eS7HTH8/6qHFvP1+00aG2zfDkc33iftZ3z914TC7M6aB7RY/+FTxUVnSQoSceO1av6iFTLIrpUTz4XO7HxRHn9B6V7KiLjb7XYpeTyjVY4lFNPi74ebYkF4b8OuJRP/yRi08yq/7DHF768KBtVU94GtfX8AjHuMXFKhY6Kny5pKfzaphteFi1ScZYKhaNyxU9MMCuDk9+rNZ3Xjxl8GUve9nNc57znJuv/Mqv3H6e7us6DxlaUPmq7P3e7/22r9UAvmtp4VQS+qT1vOc9b7vL4SLvbscrX/nKGwuml7/85RtZfqmB5A/6oA/agteA8TyPrxv9MskdEonpIqkuKBaB9jse8QsgPD1MKDEKztjvtn0JQT95pVrCzIr+JQ98X/RFX7R9RfoRH/ER2/fp+Ycj+7NCR3ac53d9+eTXVj/90z+93cGzOC3ZyOCnODi2cBX7Zz7zmTf/5J/8k+3ulVjsyzjoxnN0sI2DFimOj/wfZcd9MuHSzkflSA+7trE4Lk/D4vxRXPVlN13s8/3I19HWuB/W4tLxip4wxKVaOfJ/tD/u08OP5KuP9MRZkxvMuCunnVdw1Tba65x+2eI/DCv+0xNv2YTD/hH2PQ7Hydovn1Z1hCV/qrWv+MQf82ny+IMF1yNOehV+knGu/DVHrtikJx6z1/GKHhjCeFce8wm2uFiJKXk8hEeNwyN/nKc/3OzeZVyTpzM/VrCT47NtHFMrOoopHWIah9qPOHBuX+Kx3HKePjrg3BftMLPnPLlreUx/ethawS7ecJBxbaTnCPfej/3x22XxxLi7Dr6m85CwRUgPi37Kp3zK9iu8n/mZn9keQB4J34NZPZbUgiaBBNQFXvnYj/3Y7Vkn/4D27/7dv7v1gQdRHhZUShwPzZF3vqIfffxiw8LoqDSwfK1lQdFEk/4juX07WTLkBTW9cMwKzHCS8auBX/mVX7n5uI/7uC1J9R/lxv1RF/+ySVeFfcnu+SV36vxjYXejWgzBKI7x7kF9d5vY+aiP+qhNDfxHdrMz1nQqcNiX5Gys6CCPRzKw8S2/jvTohweF3TZt7ceRPjM9+mZHHzrhn/XdDN3yh91wsX2NHjrIFstVHRbk+c0X+aDcpkfMcEFWyb62cev81umBP3se+XANj+SKRzwycRv2EYt9sgpdcMC8qiMs5HFDR/t7e5eO8RgX+aae4WGzkn3ys771m9XJqnGR3lU9cJMlp25/ZvOordzgRzlWbh3JzNrJ0FX+qfEYp6MMnPXTTq4YjP1u2x/t5cc1HLANDx7F45r5MT/gGMtKTGHHozreysWOR93Zco4M7NfwmE46Rtsr2Ovb9RUO2+yr7uwd1XdePCHCBcs7fDw/5NcQHPNJqUT/kA/5kO0t1QE/ArPSTvc+YOwiwt2PT/iET7j5N//m32x3wzy4XFAtAvSReOqKpBRkpNLjYqHm3x/+4R/efO3Xfu22X/+xtqj4pV/6pRsPqvslQguhsc9t+2z5BaD/ZG8hRid84+AddWj3XJkF43/8j/9x+4rU6yI8r+RXLQq+4c/3Ud4+m/Tow1+c+hWC97n41ZtjtTuI/cJCkumv4IuOr/7qr96OPZDvQXHvIYH9yO7WefcnDHSyL07FZNf14iE8/O8TZnE+4lF/OG32k/d1ozZ48qO+ewDaK/oWG+/dWimjPZy7G1qen9WTD/qLpXzCwYjxjC5+7/PxUi6lUx95x17vBZKnI4/2j+JRP5jxQXaVxzgwlt2FxuMlm2Efa7Zxb1zgwQcUerWvFDJ88CstC9I+ca/owSP8xiJ9uLPBN5tTxQB/ZBRjAQ/X8Jiv8biaS/w0n+HR87HXzo98ikf6xFbbUR6Fe6zx6LqEl/KBDhhn8agfnxW2ruExDPT1Cy8f1lew0+G6IuZ0yEeY5cNK0d+8gD/5yP/G61k9/VJNLMnfFgeY5SD/63sXHl1bYFBWsfMfb8YSLGI7G0NnuLjz4olhYN7nfd5n+9WaicZPxQVaoiq/9mu/tn1th7xrgY7ONAlpo3NMQuT42ogdP+f8+I//+O0fEiMJJhfW+mtDoKK/doFWDHZ+OVa7mNV36/DAn/rApK+g0jPrO8rt9yUzGwaVyYEuSXLEF79hZOvHfuzHbh73uMfdPOIRj9gmelicw38Drglgbzef2WePfTJ4dKxuIWW/iUuc/eTYA/oeEve1rVcb+Pc8fHfB6qewe5uzYzIwswG/TZvjlcIPC0h+iA15eo541KdNX1sxsM9f5UjeOfLiob99XJMTz9WCczyo8c4Xx2dLYwwWsnDwZ7WwCb840CEf8ShfLpX6sA9//JHXhkf1rOCOvIJDm1xc5ZF+/PUBjv+NiZndozZ64OEHeT7AuFrI5gcsfTA6q4eMsSS29CguRkd44I47eHFxTT7GI11swaFtlQMc2hqX9NyWR3tu2C0G8gEGYx0nZ4s4sss+Humg9wiL8/yWs/rg4Roe6WGPHjX75flZ7PqRIY9HXDiGf6Wkg542+biCB348wEEHWdwcFTHShwwuzC3X8Ei/XFbI0wtLbUf2x3ZxtOEv7sqDsd+Z/WOPz0g/cPfCJPV1X/d128/aPRzuro/3WFjp++rnzW9+8/bun0sXoJPmtm7pQZqgGRQ/+IM/ePNu7/ZuN575QYbi60N9vffJawyQ/ba3vW3bdx55/+2//bft7o0FXwOpZDc4Ee0Fn/6/2yxB9BXAz/7sz94+GenLThg2ICf+6C+gXg8Ah+2Sjmz4BOKh+Be/+MXbS/BwACduShS6ZoUO/GSr5O5lehZC3hbvfR5wKQYLXvyK0vNQHrb3/q6nPOUpm01f3Vq0+qXdkd0ZltpwADd7+di5M3U89uC8QUvfUcl350e8ODDIYUjHkZ7k2LafjFxYKaM8Hb1v68jukW56mlze4z3e42oe6bAg55ON3ttK/dT4kzvmB8fKJR31yV8cGNurPLITDhc/uSrPL9ne+5V8XN4lH+mCQW1rzO1tHh1bKPlhTr9avU0H3rLR/rU8wtRcYkyMsTzCe9Ru7jA/wb9aip0xEY+1ndVlkQC/D31KOI70aDf21XJSf3P9aj5mhw7PkXoMxDxZ+1n8+rmDKabG5bUFBt9YzeNo7AAAIABJREFUwAFTvp3V54Oxa7tYHnE36uInG3BX5NQqj+TpYdN/DqC3fEjvbXVY3MW0+FNgMV5Wy6nFkwSaLRwYMyA4ZHHyute9bnvmyXt+tAPk4utdSmrOnyH7NifCUvL5VObui9vSLua+PnOBd0fE1z/uiPi/e76K8cZrv7DrpXde6OjZKJOTgQEzWRN/RMPDx6PSHRb98zFsRzKzdjyTT1Z9xBec+nswHtYnPOEJ292eMIS3T04ze3TU374kYi+bT3rSk7ZFEUwV/RR9vviLv3hL3i/90i/d9MDRRFud3G01HHSP/pPRvlLgoiNd+XKkRzusYl6eF4e93Us62HMe7+TpPOq/19tx8o7tw25b0aM/28Vp1N3+mTo9uCyX7GufFRizyX/7cCj5kE9H/mSnfmSv4ZEcXclmfwNz8g+ZfL2rHvJ7Hk/C2LqVjyMvThzxWBzgj1PzwFH/Iyz602WD33bJ7kxPHJLlh6ItXTOZWRuZMQ760Jd/M5l922ifrvE6MuOGzbisPx2zvntb4zE9NiX5a/wfZeiBf2wbbR7tw06GX8nzbZVHevILFvq0zbjJ92TU8XCEc9aePfjtZ6t6JrNvIxdn/FbwsKIjnacWT5RbDGWYIat4xUWnYkXvfUt+Nt9zJ37dZrWvAOsCe9eSnjHgnvfxOgT/T83P5Nl/6UtfeuOBdQ8xk/Egufc+6ePt47C6u/I1X/M1GyQ4x6Cs4MSJoLBDxzV+4nn06ZJ9yec759e85jXbwtCdPv9PjQ72K7fp07cJgqx9sRZXn3gVOrSVtPr4haLFKg7lQjrI0UnXNSUM2b1Wx15+5GSvs3Nh5kv7fL+Nw/Slh7ztrFzy1Xv59Hb+thp2+UiPci0OepKFIX2X7NdPTT6Z9JC9zZ/OkzGORtlLtvfn2G/bn1s5LqfJhG1FvnheK88HPMRlts/wEt678MjOyOMZu2Gshn28VlyrI3/UMK2UeCQzytKV3iN99b8Lj3STv1ZHeYTH8FzDI9lyifwZ/0deyPIhztJ1m576xcM12MmSC3fHI75L+66brtE21zPzZH5ckpudO5V9DHGcEQYBd9FWXDjddfJSSl8h6Vtw3fb371IUt+jcfQL2rgWOMKklwz//5/98ey7Ag9s/9EM/tAXXg8xekxDmF77whTceXv+Jn/iJ7ddh7jZ927d9280Tn/jEBxeHMI+D/DaskQ8THMmyuVp8OkyugB7xJQZev+AWrFdEkCNjkVNiO5Ys6drjoYP++CHbwgkWcvoo+eX2v7t33/AN37C9G0vsR/3sKfQeYd86TP6wxX5fOU263NrEJh18sg+b7RKWOCIjz+UUHX1FkZ5LOrKRD2G4FfDQgX05BA/5cvyS3UF824WDPF3XYEgfm3KArnLAuUtY2FbYjodxPF2STbc+zTX2r/Fh5JF9OvC6Utjmjw0PjunNxxVd5MUyHumg72wpH7PvuDxJ56jLeXNAhb278EifPOCHeWAFOwz1J6/Qtcoj38nHQTrz8Uwdj/qmJywzPPoo8tG++hoeYaXfBkPbLHaX/IC1ONABzzU88MHWTY1xjF6y3zkYyGc7Dp2f8QirfMQhn8ldwyP95NmjUz3aDt+lmrybAuyP88wlmaNzp2aUJh5O2/drqs/93M/ddPre0K/RPv/zP3/7xVkPMpZsAHLQM0Euut2xOgJ0ph0G5FUQ4Ttcz9484xnP2JKiIHq4UH/HnmvyP/Z8rajNYBRUNZy+tuuCme7b6uzwlx7P7CjdtblNfjxPl62kTPfYp32ceneWt6X7haNjiZGOUXbcT76aLdvYpzbciG+/ULRweuMb37i9U+tRj3rUzed93uc9eEFgXwl7AyU7t9X6V0Ys437nr6mP9IR3f35/zOasLSzO5UN8Xuqf3Jn6rnrgkRsrhS/s5pf6ko58zkay6jge+2jfF/qz65x9eTXru5edHY/2nF/RU186YIDlkv8z+9ryh772V/XAQDYMdNnoCedov4uCNrL5MOs7ys32k8+m42v04NBGftX//MjfMK3qIYfDUR+ujnwaz2XzmnxkMxvxCMMqj/rT5dqndg1bLfmRfXpGTGf00ZFPxeRSLPb5SDa7Z+zVh8xY4q96PHe0jzubNYO6uKhXyyn2gY4kQH099+Vf/uWbLcR4lsibxT3E5UJrJatfwCwqXOjHT0OrQPf9wyOB2LHBadHCNpsI6h1NkaO9/RYHnlkic5eFHTz03UVHSRZ3cNqfFefY82C0fX4Z2NqST7Z6pse5Eh+X8ekTpgfR3cX7nM/5nO0/qntg1bEY+5c3/ZPO+KSHD5VLdutTXV/yMNB1zQCjhw7y4WIj/dmr1t6grE881IeeOKptVo/yxWHW76gt7uiBYTw+kpm1kycLw7U8ki8O/I/LfJzZra0+8Vgs6HCu8/Uf65Fn+9fwmA527sIjXHTgoliMWM/sFwd1eZbeM/L6kC0W8ORf9V7PHiuZa3nMHp3sHdncYxiP6VDoaH88f2a/XCJvu2ZuiMfRXvrGtnF/xGv/Wh6bQ8pHPI66R5tH+/GfDv1WdcARl8k7XtETj+UC2Uvy+mdLP3KrNpNXk6ezelN+8o/42SycrsEwmjm1eBo/MbhIM/qpn/qpmx7HimdubP7lSQQ1WfoHvP/jf/yP7XUG2u5aDBzENYDYKznta0eQPopzyCrojm369nVU5905uuauEX0Wa95fga/VAptfAHjVAfw2OnE9K/nuPLvk2WWfXBj0O9Khn03Blztv7jTBQca7u9wtfPKTn7yd91WtX9h913d919bmuTLybCtk3J2iAyb8ni3whsHdQhjEpBie1QND8vFI9pIedtjWny84pIOMc50/8gcH5R37+uOgd7qcxZ4OOIoDXi5hn+kmw490wLOqQ/94pC9uZva04SAb+iYvH8wRMKTjiEftbNGFR8c+iK3yGMbiIJ726Txb8gGP5gQ6GmdndehHPh5hGMfLWT049KGMrj4kmaNgnHFZPpY7/Ib9Gh6LifHogyg99J8t9Y1HXIip45VSPokDv/Jt5v+RXjziAgYxLV+rZ3JxzB7Or+ERB+UTHq8pdMBgjoadD2Fb0deYIG+fDpyozxY8NibokJPmz6NY0C3ejZ9r85H/ZHERj/lxFnv94IcHtkvxr/+sPjWbIAZw5CBLEjGuGNTaPKxtsvZOpwYGkt2l+N7v/d7t656P/MiPnGFYboMDgQXLfqV2NVI6h/TKKFd7mK9ZONFLj0D6p8i4yUY2b6st4jyArcYb7HTQK8g41uZYLFpowK3NsRciKvUvocnOClm6JJA4kvMTVJOsuFnwalNbNHkdhXdoPfrRj96ecWO3+LPlWF8+yIWVpGyAkfG1sAnWPnwrBQbyfDPR5NcRFu3FSq7Y8Ej+LI9s6lu81J7/M6msFLbpsnmFBmzX5FK+9gxifq1gEUN3ksVVPir8iquZLpwpYmafD+LqWA5qI69tVpzHWfloLIrlag6US2LfT5rZx8PZgkMyMPRySThWdLBFHgYxbVzz88inGTc+pFg0kIMJh+IjN4r16Jc2feQku41lsislHtkVB7EpRmf16A9H81PHqzySM7eojWt+4fBSPu4xmtd8y+DRDLJ0lBdHenCAT/19wxIPe92Xjukurt6P51lb8VuJB3kY+G9cy+1r5obiIBf537dER/7P/CIrH8mQ5we9R/OM810n9NHX6w6aV/Y2ZjmtD3swkysHXGdWeMShopaXR7b2mGbH/3tFMTv7QBtDAiXxCtqb3vSm7aw7E77G+5M/+ZMtQfy6TXJyUKA9Z+QB7R4sXh00F2C9Q5wqcQT2L//lv7wtLK4JCI59svM1XJNeiebYYHNckrMrkRSTmn0x8D4ZffTFv9IkuB0Mf9KVvES0cPBuIPv+7YoJQwy9R0vxFZ67i4qckA8lIX368yGdW8cTf2CEmV/egeI9UXwK4wkVWxc8mpy8ByXetMXVXk+cstME5yF877TRdpZHuIs73/Gw+h4TOvI3HrUVxz322XE+kHOx8dUq38M2k5m1lY9yofjqd8TjmGNk2ZM3xRGPCv9sMzzaydJV7NVeM7JSwmuSxmPvgjnCfqQ77n1d3fuuVmJBL1+Ma++Jkhfk+V6c97aL39hu8eWuvkUQuXTE89jXfrrhV/jNple4rBTyxQkGr3cxD9V2Vlfx8FyquQHuVR5xJ58e/vCHbzyKLXzqs8UiWH84+ICX+I6zUZectelrkWAhbFsd1/xV2PILaflk3lzBTh4G11Xyfny1ms904Mz86t+UtaDRvqLLwseC3tyAt+bIxjh9YylO/I8Lc+zRu6qO8qu8wYNFKNt8Wc0lchbSrm8KXLP4jz7M9k8tnoAT6MgxgCSxIoiSEkFACIILLzCcRbL3KPlFmOMjYmbgHgptuMGLgBrgiuNVP/FFB1n8Oo7vdJU88YJzfHfewNJmUIRDDeMsOcQrrJ0nnw6LkMc+9rHbCzjdJvX/6xybDMsJnwBMKOTJWVCVB+kM76WaPnI4pL/BvKIjX/Gg4OE2LHFcTU4c4sBx54541FeBtY0fq9jzmSwei/eKnnIBZjyqta3oyBfy+DP2yds/0lN7XNFBHjfyQ2n861v/7cQDf5wnH8/5MOs7yu33GxPkxfK2HNjLOybbnCfHcahtFYv+YYhH+o/0FL8REw5xQ16xT75t7Gtff3rGuF+bj2ywVz6OOvd2Z8c464OfcUnfqo70xmPxLU86f1uNA7bjUV7YjvDwu5IMDHxYKfTb2ILBuHCDYUUPHpsjm2+00bta2IfD/IhLuFaw4AUGMsmVkzM8+sBqi0cYZn35ks69X/U3n8DP5moOjL7SoWijZ7WcWjxJmC7o9hnqH+z6KgcpXgMgGM973vMexIBgF12fGJBFTt93plICCSz/CoKArBRydCWfbAniuKRSS/puXSYjRpKzfriGS32ER9/6k7U1oHzNapCrv/u7v3t7HUS46KPX+Uq203lks/5jTQbWcSO/ooO+/FUrt2EpH+MgzvKFjtrUMzz4b/LQ37EBPuu7gTr4E+bG2m3YD9RsHMBPX36sYuED++VWHNymJ8xq9vMlrNou8Uh/PNBB/jab6a4Os2OyYVnRA2Mc5FP6snOmzpd00UvfEZZZu/59QIk7Y7T9PY78zZbzd8lH+hQ2L2Hf4+gYB2GqbeZn52a1PFDisT4reuCIR/L4UY58ah4Mu/qafCSnlAtq43IFe/LJkj+K/2bs4E/zgtPhsr+CRQzwkD/pomOmZx8z/cXBnDkro97xPH/35/gwsznKjfvFnB5yHY99zu6fWrZKIoWhSAM68rX59ZVnYT7zMz9zI8XCyfNPHjb+ju/4jk3Op5d3thL5/JUMbfFztsbLGEx66E6efsdud/Zc1TgALU6V8ISjxErPvh5l6LCRsb31rW/dfhjgzqH3aFmpaxdHyQeTwpbiHPuOndvbunSczb2+SzKzcxuQCQ+zvtr2pX7X8siPeEzX2Toe1fFo/6y8fsVATbZ6RYe+Srrad3ykZ8+j4/DYh6Wtc3tdtevHfznUJ/1930vH5BU64vES9pkucvuyqoNeJX/OYDGu9hu5cVyGa4ZbG3kF3uaNu/AY/ng9sjtrhx0OW0XbrO+ltlHPuH9JZn8OBjzwY/QFrn1fx7WTM/exa+6b9b3UNtqjq3nzkszsHDxwjM/5zPpdaos7mGCx2b8ksz9HRj52PaBTkXf7vh07X7/82Od5x8nsa/Ljthk9iN1etmMy+a1NqU7f2frUnSfGIoZiwW9BZVXJIW+cfv7zn3/zrGc9a/t0ICB/+2//7ZtnPvOZ22sN3v/93//m7/ydv3MW10OmXwnR6rogXRuQ5NQ4V9xhskDF+3Of+9ybH//xH7/57d/+7RvvWnIr3N0fOBoIfbqA6VIJe/FlT1xNMHS+6EUv2hZr/u2OPn3a6WtBfemAVd0gHNsv2R/P5S8M9Chjzo19L+2TLSdhKk+PZNhti498OcujuOCHXZir6V0pZLNNNj0rOvJFfRce2YRl9AGelUIeLwrf5PCob6aLTHFnL39mfY/a6Ah7MUzvkcy+vRwmp/DjGizp5VNl3K+tesZPfGR/xDSLiQsbv/XvfDqyc6YOp9qGg8bXGXl92CdXHmi7Bosxxu/8sc/HlZIfo30LADxpm5XiLh/iX71S6M5/+7Cv8hgO8jiw0XOE+wgfHpXRB+NypcRXnMAGi634jPpwLFbjOfur2MmwjTt1+6Pe0e5sn4xSPDqe9b2t7dTiqQsQcpSO7Uecf3viocgXvOAF25P4Hi73oOQnfuIn3vz6r//6zcte9rIb/6olHbcBe6icLwEEtIDwsf2zfkiAS0lAn196/PzP//zGoYc3TZJ4ds5t0AYGm5LCsRqeWZKwJ7ErElxfCyd3t37u537u5mu/9mu3h9D5ycd9YTvc5MPA3qz/Xr7j8KnLL1hWdNAFS4M6DNrO6tnbTEc4ZzVu9LMpeDgjt9cVj2qfcHFpYjuLnb4wtA+LsqJDfxhGXWOebwp3f/TNZ33Lg7o5h1vb0dioT7Yc21/FXv6wDQf5a3hkGwZ4w7SKBY8jnvZX9MRLNR14dDzTE8fOV67hsXwki0d2tc1sZmdfw0DeNsZ9RQedbO/90b6ip7lq1JOPMz3OkWkMsXctj+TGci2PdMCfDzPco539frkz5rQ+K3rkF/xhyDc6LumJ/zBd6lufsc7OGLNVHsNOFy72PIz2bts/tXi6pIRxtxH9t+e/9/f+3vbrli6iLu5+2eDXWe6WICsCLul8KJ4TRIFxl0i96idu8NV7K+gbk02iutvkvF80Wix1gTWxscdut1JLzAZaiT5ySy475ByzyY43sfs56qtf/ertfwP6YcBMB33ZSrd8oG/lE006cABHt6bHiSv9l2ocuHPmWbs40XabHr7pV8GDu3pwaY/HWVz1sTlns88POFYKOYWtxhAdYnS2pKNYyhe+mChWSj7IgfzXdimmcahmEwY5Ss6x4lw87fHoY2MPXv3oWOWRDJt0sAeDfFzhgA6FDEzX5DR5vtDVuOZTeredE39gN6/AwBcxoPcSj3GulkvX5CO7xZ6ta3gMR/MMP8TzUh7NKBl5FA944DMPni3iwIfGBDl6YSsuoy524C9nnaPjmnykQyl+YlnbaPNoPyxs85sPYT+SmbXDT5faOwXpkB8rWNgfeaQjjmY8siX/yBU7c+tdeKSPrmt4JMe+Gm4bH1bL2ow60W5y8XNgP4N10fUTQK8uKChEPPvUyzMnKt4pmgRCMr7tbW/bAiNhVoq7dN6LIyn6ms4+Pbh8l3d5l5vv+77v2/af9rSn3bz5zW/eEtjPl/UTBz9Nl6AGvLZKOjqu7qE9E5lkMoi8qsBza3zxWoKXvOQl2086m/yTHeu+xjMJ+X97MPBBfbaQ7ULlp7C9BI2elSIX8WhQNThwcWlwjANIPxxYNJDHnQlBH3q07Qve+KpuMhcLHyhWijt+7LDnp+Fsm2BWOMCjjR/si5t8WJ2o8OgfTfOLrBy5hCPcbMGv9s4wMjijBybbbflIFy7w+V/+y3/Zfpa8wuOY1+7W+lmzssJBPNLlOcN4UK8Ufvg1Mh5ccIyV1XgYi350Y46Q18YJHUdYcMxOeRuGeDiLv0UaLvzE3i+nxYYfZwtZMniUT3IBF+P8dEYXH4xrMSQLGxx4OFvMKV75gMfsy0WYcLYvbNCv5gPeYVjlsVjQhUe/YtZ2aTztsTSmxdR7ntR8WMlpOsXB/Oq1OnTmn7w6W9iEvfkJjnTN5kc2xM85uPHZ6w7O2tTPtyziIO+NCftisYKdHlgVfvDBPHNNufPiSQIz/nEf93Hb8zh+lfXsZz97G+wuyP732i//8i/ffM/3fM9G3CxJrwH+jiIjMQwqg8EvEB/zmMdsfq7iM7B7n4zkkCiKBKng8ylPecrNh37oh26DQPAtnvTXz1dtD3vYw7bkkKRwKTgvYdKlJiPx9ZOALpgvfvGLt4XL05/+9JvHPe5xW3fvPPK82lHs4JADBgcd3sujLwxnC1l+2EwO3g9E5wz3JZ0WPSZIPLBvsmjQzuRGnPkXj+FXO4evOB110W8QwhqnJujV9+rwnX45Ja7eJ0PfCgcjjyZqPJKf4R592O9bdImlV5LAIx/zcd+3Y1jjCQ4LH2OiOMLgvC1uk1WTZ8t5mKvf673ea+x26z4e0wcDDuTBNTzCLJ+8kwY2E/9KMT/iwBgyTrqI4ORssegwv7iLj1f7atvMJ/MEOwou9GFvNR/NDeLEjg9FeGR7FrsjX8h2ce09TzBdw6N3+niPnTwUT3rhOVt8IMFD73myTxd/jnwSc+fUfMGrZ01XChtyW20xL5/gL0Zndckl87TFl7mBjtWCMwtANzh65IOOlXw0r/hg1nueyJeH/NwXCy2+4hAHipwmv1Lwr/ChBaxF4Gou0UO+fCjGK1j0vfPiSfKaFPxTXi/k+6Zv+qbtDgkyDRIXAXcwnvSkJ23Hq5P4qkN/0f1LGkkhCCZ8wZkl0SVsrarxMw7kdP3RH/3R9g+Y//W//tcbp3RlA4b2JaljOCr2x+OxnS2yLpQ+Ib/85S+/+Yf/8B9uzzq95S1veVAv37KRfLWBFw9jIpbs9btUw2EQkLeZGNib4b6kh/9k8Gizf5uebFTTz6dRXpvzY58RBxvFofqo7yg37hd7vDXJaFvlEXdkumjlx2jrtv3yceSBzJFPcTyet4+LcXLT70iP/rZycqbzNtzOx6M8wgM91/JIXwsQvoz+ncGCP7EkKy58W9UTJ3RV+BQ/tVXrx46SjFy4Bjs98Mcj7NfkIyx4pE8+rGJpbhBHGOjh24qeeKQLd8olHuNXzRa/6VixyQbMCsxk5eU1HKQHjuK6iiXO6IhH2Fb18AUe3NBVvTm6+9Nczl75IxdWbbJhizt5CcOqnmJRPOm8ptx58WQV6pOVVbGL7kd/9Edvt3d9bWGF3dtYW31e4+g1jv1FyxgQfJMc1xRyOJSUtorASrRf/MVf3CbfJz7xidstUwnZxYGsfpKhidq+8yV4+sa6pFFbifvFpE+tr3rVq7YEtSj2D597Q/OIa9Rjn+829ti1NcD3fWfHZNNP1j6/6Vsp8UiGDjyo6Z8V7fHQ/sgdLI7jsb6jLvptzukrBrZZ31Fuv88+eUV8+RIX+75Hx3TAQrZcyK8jmVk7HeLPB/t00Hmp6JstNey2sVziJFtxrpYDl2RG3e3j0GIBbjlIPi7qc1sNP3klDPl2m+x4Xt6wTRccsLU/9ru0H4/k7YuD/fDtZRsz4dW3bd/30nF26YlH+OlaKeHEoxKuVR3FgT7YYLktJ0cbZMSC/eKAK8ezwk/69VXU8mrVf3ZHXY4v2Z1h0UYGB+bo8K9iIRdn4xg54mCGhQ482mAqn4vzXqZ2Nuqrzyp29uIx+3xZwc4uDHGwKjv6tnZlGiUf2Hf7T0DH26e+fnKLV3AUAFcupBMz79BN/BNMSWUT4NXEEFCJqNDh2MXLRdTxK17xiu3t3hY5bjuzaQVef33J6K/Yt8FRgqht2pzLjv7+d903f/M3b2+Cr7+vS977vd978+2SP87Z4E/3BuKKP+RL7OoVNfySayM3/NF+W9GviS4eYbDBFS8zPc4rarLX5HsY05W+mb2jtlEWhuJ81P9SO/n0xeElDuiqf/viEIbO0dH+zH5x1+daHslmVzzs34Z9hkVb4/Lo/G3tjQv9wrWChUz5OMod8cjXbIWNjtUCt7ldDM0V9ruzu6pL/7vyOOYjf1ZzAy8wlF9nfChv2CPXvHJGtj7pcAzztTzAQNa1Nt/HfMjepZoPZMgX10v9Z+fiIS7MmZc43ecpPi71n9nUVg4X+2t00AOPfKYHFvvXlDsvnnLI96h+Uefn7ZzqIgSoh7s+4iM+4uZLvuRLriLtGsf+ImUKpkDEx6p9AbTYVONuTDBtXkDqGSQLJ5PYOABLAnJ0NCjoqOxx0em8B/w9z+DXdV414dUS6R5X+uJ4VOgSc7jyYW/vSLb29PPBpmi7Ro+FZP7FTXZmdbbry+9x4TryOJOPJ/3YhR8XqyXM9OGRntUJIs7osNFZ2woeMunIf8dn8MQn22TkozbHyhGe+hQHx+XCCnZ26FCXk3L6DPbssF3hQ9jionO31WHgRzrDd5ts58nBoIw66Jn51PxQX5iv5ZGO7LO3WpJPRz6Iz0oZeSwGOGmuOqMLBnryo2McHuExDp1nk9w1PLKTfrGx0ZMfZ7CzTU+YydOZ3jM69CEfhnSela0f27iPR3U4quurZs9iLezq8nnsd9s+3TgbfbiGR3bCEo+32Z6dv/PiiVIJ7IWK3/Zt33bz4R/+4duvsyymfI33B3/wBxuxX/iFX/ggwTMgD9U2QRBUdWV/XPulWlJ4zmQ/oEqO7/qu79psWIh6GDm7dLbvItUnkiZV59Ix2ofRxODhw2c84xnbV6we9vf+KLJ/9sAPAeyX/A2WUY/9MHeByvZR/738Xsfow4qO9Ph0HKazsaifmh8jhvCOk0Rt2cwe39Mx5sTY/2ifnEKHLQwrHKQjHxzDtqIDBjIwqPNN+5FP2S0X1elwjq7x3EyP/uENAw5mfZ0/KmxVwp/92m+rR59hyIdreBSL/FIrK3qKAzm6FPjwcsQNO9nSvwXsJnzyDxvklPLJ/pHNmdoRR/nMnxX/6YWFXPrUl/yfYSEPwxjbfKke5djIrnby1/BIrkIfLrWtcBBmdT7At6IDhuyrR1wz/8O8r0cd6VTDMtOjP6zZ04cPs757W+MxHTYFh9fwSD7f01U92jqz/79vTZzpPemDML8U+/f//t9vvwL7yZ/8yW0RJcm+6qu+6ub1r3/99isPDx+/MxeBFJTVhIgTixVcdueGHslWbQFkszBQBNy57GW7n5DWv/OO7Zc8dEhgrz/4jd/4je05J+/pYl8/+vxE+9/9u3+3xZf8UfEpgkx97NtWyug7jOFf0aEvLGTpW/l0Ay+7NgWPfUKky3nXP21KAAAgAElEQVSczIpzbFazS2a1ZCceO17RQyb/+cKHa7DQURzo4Jt6pZDHRTGh00bXUSETXn1XbdI78k8fe9pWCgxkyIp7xys6whKPje1VLCOP+VZ8ZnjKU9jZJKP/aiFnK17qYnNWFxkxpCdc9ldL8sUhvSt6kgmPY5jwe1ScY9OGy2vysZyvLp5HNmftYVfDAod6tfAhn3BKx7XxCAMdNthmpXb+s2+rbdb/qK04wUsX+3StFrJjLK7hkc0733kC3sKBI+/zPu+zrcy908kv7/zk279o+bAP+7DteZpXvvKVV5G2Ss5fZP8CKhm8u8JCxM/laz+LxaLIzzf9TF+hT4A9P+Z9Oc4LssFuYWqxVT81e95P5AF+sraSNCxqW7q9l8u/1PGaCYuF3/u939t+cecnnOx5xYT/WegXeH4SOj7Xthl/4E8LR7r9NNzdMV97wX+28Et/C0Yc+MEBnPJqpeDLLxN9HQmDQm8czHQ518TuvF8d+km0ssfgeF/SjwcLUjUOxWOlkA1n7zcyUaxMbuRbdLPPF76t8giLfPSTZHkk55q0Zj7FIS6KpfcCeWVEk+uYj/k56iJrw59ff7L5J3/yJ8vvy8p/zwnhUT7BcA2PMJjH+AI/fCsFj+7CG5fGLH3KSjyMJ3ntl8t0yEG+4HnGo7FsrDqPC3e05SMMKwVW/tJB3rvmiu1ZPforeGhugO8aHmEoH+UIDlYufOZld9rNbR66hkEc+GfbF/GmH3/w46NY7vteOiar0CUGfkglPiv5KObk4ZTP8ONxtYgHDmHgj/yxreSjHPTKBDdNcEQWPlvxHnE5z198O88uHnC5UtKNB69Sgdt1AhdnS3mHR/sw21evljsvnkoCxr3DQkEOR5ErYSWrxG9Qr4J8R+5fQgukhPSOI0X7ShFIX8dZdApmAcWrt3srDXTJi1PF+QaAix15bfiHQU2Xop82tgzc5zznOVvtVRL+96CE1N/7N5x34SXrXT/ebeLcrIx2cKC/WJvgzhaYDcQGlola22ph0/bIRz5y02f/tljwCzeK2vtk/sbf+Bub/eJQn5kuk6P2NjqMixZgqz6wZZJ/t3d7t20BWPzO6IEhX3wFa+v4jPzYx4LZLy3FUlzkzVEOsOFcfdTmAz8osU+eH/qJ64xHFyk5IPfim6xYrhS6yYkBHr1jydhZ4QFGGx3GpZw27lZiEWb5BIMLTnPjSm77UGYhCAff6FD4w899kY82eG324ebDShGD5hy5IJfgXuFA/zCbG8QSDys6wjzmI5/4vqLHBRuPFuYw2S8nZgsZ58sbtWI+WeWRHHu4sAjHA/zZzr9LdbGwULCIdk2AZYb7kh6c+dGRxTjuGmeXZPbnXNf50fxGR1hmec2OnBV3eB3jwI/KVgo5+OmwrsBp7+w6q4cOGH0gMa4c07MSi2ydv7olsasj64u+6Ituvv7rv/7mW7/1W7eLsrsZP/zDP7xNvj/2Yz+2XZyR/M5W8kkA7Jus42TVV4O7iw1ZgVUki6Qx6AXZQG7yaHHAtnMlUxMLLDbntKnp9T4uq/Yv/dIvvfmAD/iATZ8Ed8fGRSwb7Ds22Ni8rdAPpwFuf6Xo726RgdngvoZLfsCQ3/Qe6XEuroohTsmbPMnVfuQL+TEO+uNWLFYKW+WTDxs4UI6wH+muv8WLCw48q7Gg250rPIxcHtnUno34csfUBV/+aBv9m+khL3bqdFm8XMMjW/LcBwAYRnwz27O2MIgJHemZ9b3UhkexjEd9031JrnPGpItNPMTvUVy1813+kmPrmnxkvznD3MQH8Sm/wndb3fjAo3j2we82ufE8H+QzDI2LI/9HuXEfj+Yli9k45IttFg9tnTMHG+PX8EhH49pFnx6xnNkc8e738ajgEAf00L1aupPZuIRtRY8PODB46z0f4uZIR/6TyWcLl/L5LP70iJ3rhNr8tlrS42aDEqZVPXdezTAMzPOe97ztq7k3vvGN26ed5z73udvtNL+y89D4V3/1V2+DeRXg/yv98SgZFMns2GCxWsevhYtauwlspZCR4On+wz/8wxsv2/Ri06/5mq/ZJloDUUKadNk38RokBlj2V2ze971n4J6BewbuGbhn4J2VgTvfeUJMdyT8zP2jPuqjtk872r/zO79ze3XBB33QB213ZN5ZSXx7+DV+ErLYcbvdJzSflDpnMdPCasWmRVh3quh+2cteti3KPv3TP31bLGlTWmDZJ/P4xz/+5ju+4zuWvzZZwXbf956BewbuGbhn4J6BhxoDd148ueC6+Lo74S7F6173uu0XXG4NPvOZz9yewfH8iAVAF+mHGkl/EXgtinBk85WZO0A/8iM/st1i9n/l3Alyd8h5XDt/tuhLJ/69qdxrD778y798e/s7XXQqbHRr2OLNw76f/MmffNbMfb97Bu4ZuGfgnoF7Bv6fYODOiycXZhdlvwDwzJNfZvlu03fk/ontp33ap23/LNdCoIdw/59gdtFJi5YWReq3vvWtN0972tM27n7+53/+wa/qWjTps1LIWaC98IUv3B4I/5RP+ZQHv6umx7meZ4DFHS8lO+56rX5duILvvu89A/cM3DNwz8A9Aw8VBt4uzzy5q/ELv/AL2x2nF7zgBTc/8RM/8eBDoq997Wu3h+z8DP6an1Y+VIi8K06LG1+t4dIdpn65+IEf+IHbg3Xd4bOIWS3uLFngvu1tb7v59V//9Zsv+IIv2P4fYc85WTgpbLTfoklNtkXbqu37/vcM3DNwz8A9A/cMvLMxcOc7Ty72HjS2aPJz98/4jM/Y3t/Qawke+9jHbnefPGfjfU9vr9KCwIV93Ke/r6FaCDhuMaC/Oys9p+WcftosJtTJncHa4kJfPHixJE7CcEaHPmx670W/SPCyUfseuP/jP/7jB3Hlx6iXT+T9usk7aRT2xztF3pfjLe/+X51n0P70T/90k9GPPFu+quudOOz4dcpv/dZv3Xh5Jr70m5XuajlH3i98cDA+QzWTG9vGGPQTUufpWSmeE8ODd8oo4lnMZ3qcyy8+2/yihk/a4eKHdvvqWamvPjYYvG9qpYwcu3Pr3+aIz8qCGQ7Y4fSTZPkAzyqPckcc8NhdR3Vc7f1iwzl8s6/uA4Bz2sjDdaSD/8XLV8jkvJNmlUe2FPrwSBe7dJ8tMNriwS9zjO+j+B/phQWPxh95WMTUdrbIJb/SEs8+RMXTTIdzzSPs8MEvWFd5NB8qeGhM4pQfZ4sY4ozfMPjloZ/br/jPFizmFuNbLvNpBQcd7PsBTj+Zhy0+Z3Fl03k+Oy+W5sRVHsnhkM/GhFfCiOUKB7CKq00+uFbYh2+lFEtzvZjABgddZwv+vK5ALMjmBx307wvu5GPjB5934ZHPHgtS6F7Jg+Ish+zDPsO892F2fOfFE8OA+EnwE5/4xC2pkSi5AZOAfhpqEisJZ0BW2pAlGOzSqZiY2WOXzZLBgOnn2r17SNJU6HBMJn0RXJ9LdeSTYfuv/bW/tgVjRQf9EgI+71KB5Xd+53duPumTPunmYz7mY7aLiIQNN93pL/DFAdcGGo68NsFA0/crv/Irb373d393eyatr0/ZTBfdJjWDig9+Vv3qV796W3B5Tso/CM7Wng+4DUK6LJxs+BejswX3MLMBg5/B0mGArhR6/KSc70046rjb62Ivv+ICL+LQpAeHPvTUd9TTS9rG8zB4t89K4T8dcspPkflg/wj7THfjgBxceFRWYqE/LMaOnxPjwzij++jn+vGDK7ypyZF3zC9tivxu3G4ND/zRvz7GkoKHVR7lj8JGPjhe4YCv8MAhn/mBk77O3gyc+EOPi6U42IdJnq3kNW7hgAE/uIQNj/E0QhnnCnnApnlglUfjmm14Ld7wIBdnsRvtj/vGow3WxiUdno9dKbhzwcYBfXJKW68tOKNr5BEvjvHIn5lP9OM7jvEgn1Z5lI/xaB+PuFjJRzjkn824xoMyw32JC7J0mFvkIFzKChYfaHBBhxKX8jKuthMP/JE79Iubop+2a3gk3xzBbjn5gKlTFewWX83b9Mmn1XLnxZNBIYEtnLzPyZ0nBAKEMJ8WXvWqV938o3/0jx4cRKsg9/3pb0Cyg0QB8cZsb/j2agSJ8ZEf+ZHbJmEbIBYl/nmxT9ReQmhx4s3o6SgR9jaPjpEuAdlng88NlCOZWbuAkoPbQtRXbF4jQKdzOC7RHdefLvsK7CZpE4L+MHnZpAfEvULCP2b2NaDzLgL7hHHsEwEdJs7iqDbh0TcrfHYODosuCR3GWf9ZWwPZxC+n6OAvn1YKrHSR588Y1yM9I6/6dFEaFy36xPNez3ghYK/cx8tKiQM68FjMVzhIh/g1NtUrOmCWd/HouPgecYCf4lWNP3mm1lb+HOXGaEN/PMJ+LY9w41AupPtsPOIxLorHKo98lx8thOGIn7NY5DQe+aKQV46wsCn38Wyss2lb5VH/sPZuIG1HdjdQuz/xKJZyih/4OMqjnfiDh3wa8zFcD3Y4sUMH/GKJDyUc1aMa9vha37hc5XGcH8xv4xw52ru0z194LIIV+10bLsntz5GzmJeP4eLfSkyLRdcYNuDD4YxHfLHRebbk9CqPsGfHAlA8LEL317G9z7Nj8viDi85ryvxquKBJMjDun8pajDz5yU+++fZv//bNoW/4hm/Y/j2Lhc6nfuqnbmAXVB92LaEFo09zr3nNa24++IM/eHvflDsl/iebBZv/3VaQYPRCSC/y9HWUB9w//uM/fvuahs4utoeGL5zgo2DSY6JYLWwXSF/ZufvzIR/yIRu3+LUJuFKwa1fjQjLgAw61YqD4h82f+ZmfuS3G9O3uAZw2mNMLA1mJSk/bbFBsQsMfeuJgaD61O3KWX3StFhfbBilZcRl1H+ljs4ID/qvbxvP1qy727Iad3GqJYzyGu7azusgmA4O8OuP/Xr9cGgsdMK0UONi3KWFTHxUycSiWexxHcmM7HdmQy7B3PPa7tD9yhkeYxrZLsuM5vhcPNR2reU2OnhEDf458GtvxR/ZaHsNcPo6+ndnnr61xRGbVfzIjj47pXM1HcjiEBUfpGPnSp6Jv5+zj0EV/tdBRDsB8DW46YDAmLF7gSOcKHjrGWF6jgz3xsCniicu42uPJX+ebk+BYLWzYwkzXal6TTR7usK9i0X99ht9Z8UkCAG/G9uJF/87hJS95yXaht6AB1LM2bjN2Qd+pWD6kJ/Jd5BRvM7fgePGLX7wtjNyBslDyz4k9O+KT0/d8z/dswfvxH//xmze96U03/+k//acNH9n0Sc5rCjnJpLbRt7KxaVC4lfizP/uz20K0IIcnbBIovM61Lzklap+wnPuhH/qh7Xa3Xz1KNJv++sIrAZMXRws07c7D4hMKHPocbeFTk6sc9Z+156u6fbpmfS+1kcVBOsbBekkO5s6Tb6GKk3SNfeqrHmOur/jQMfY5sx9vdPA9u2dk60MHuTbt1/KY7zi0XcrrsIdDf/LFAh5tzlfXt5qOztmH+xoe8538OOFm50ydP2r6qs/Ijn3Yl0vFgH+XeBxl2yeLS6WaHuO0PmPdPKGt0pw59rttn6w+/IchHm6TG8/DaSPf/H+Ee5Tb78NCR5iq9/0uHTcucZg/4xy4l2UjLu2TuUs+pgMOXO7tXTqOxzGftF2SmZ0Lg3oss75HbfFYPOC4xGMLHPrKJTE40n+pPTvF4hoe6bDBJb5jjEdObts/vVJo4FAYCSln3B2od3/3d7/5mZ/5me0rMd9Pu+PjbpTbex5w83/X3h6l23cCIHB/9md/ttl50pOedOMn+ApbFgxeBPlLv/RL2//h8fN/7zeyqEK+f1r81Kc+9eb7v//7tzszcPKzjW791JeKPhJKbSugl2T258jzwwO+b3nLW26e8YxnbEHVTh8MeKef3z552A9jMRm5ecUrXrH5i5P3e7/32zCyS07/faErO2z6FzvufvluOk72Mo7TpW6gwE3X2SKZK2QVbezOSjb357TLx/Q5pu9S/3RkKx607zHUJxl1ujtH5toBSR/7dBQL8TpbYAm/PIEJlrCd1ROGeCR/SUcclJP6hoNN57VVH+HIBln7Hc/6H53Lhlo+jj7M9Oi3L+xX4p+eI5v13ddkbOmj6za/9jrgS36fVzM82uKPrG3WLzuXzpENv1q51D+dYx3+fLikQ9+jwm7n6bK/gmXEkVz6Oh5tO1fs43M8v9+f6dj3oact3fs+l47ZaLtGnk/iGFbH6ZvZjZ/xHPzpcN5xJb0dqzufrmRmfUe52T4Z8ulQX8MDPa4LrSHoWS2nFk8U7y+GEcKguzx+vfWYxzxm+4eFLrY90Eb28z//8zd5X+ddQ9jeKWQ1oJ2zSPN8EEzO2Uyant/xacc/uu3/2PilGVmkmYj8+uxbvuVbtl+TWDz5ZEGPcz4xuouj2J/dstVfX98fs6fwkY2VwibM/uGjZ7Lc8fFQne/H9yVMJQ2O2+iByS/GvuzLvmzz3z/+1T4Wx2JaMsYnDPTyaXzOQ7+9jvTRk79hcgzT2VJekMnOuH9Wj37ZhQWOEd9eT3ZHOfK1209f9V6HXHIO7mo8HvXfy++Ps63dfnzs+106To7vYnkNFjL0qJNfwcLuPg/2+kYfYC1m2skac9ke+9o/aqejWJSPjlewj7ayo25/PH9pvzioR1wrevAQdpwquFKc2xcfwuItO5dyoD57PfDCXczUSlj2/S8dJ6sPe0c2L+kYfSUP39h2SdY5fW3hJ991oLZRB8zON5bJtj/2a//IJ3Y6pw77zGa6ZnV6kque9T1qkzdhKa5hOpLZt8ejWoGr+M4wdR3Vx3n25OOs797WeJz/2VJrW9Gjf1t41HEy2rtt/9TiKSWRzJg7S4qHwd3N8RNUD2Z6JcEnfMInbOf8LPOlL33p9m9a/Nrr7VUsDgQOjh4wbkHBhvOS/qd/+qe3Z7D+1t/6W9tD5M755R25Am/RI6E8YFsRDBOQPg2uUX/91CapyLdP1qZtpbBjsaS4g1c50qNdEsSD2NTXAP+pn/qp7WH9z/3cz715xCMe8eC59KrJ0tGAircm6BJKfckn2MPRpD7iGW0e7cNOFh6yFr1w5NNeTr9ZoQNWtU3c9L2kh7093lHGOSVse7udZyM/4Gd/pYy4s0cfbldKvpOzT28Yz+qBn5zYwiCnjvynUx8ln/W131ily6Y4Nysw2tKlH/l07mXSt28nVz7CT/4ol9jK3qgHjnDap4c9+yvFhYMcDHTIR/tH2Ge64aCHHKx8Cd8Mezg7p+81PJIPN1wdr2AnVw4VEzqPcjrO9zzQURz0KR9XsLCLhzEn6eRXXI12tcUl2eTVs3KEJf1w22dTPHsWd6Zr1gY3WdyVj7N+l9qM6zDAQ5/tqMziwTY96uJIR34e6dInHsnqv1rgwYOC71UeR1+NIzquwcH+6cUTkjLMcc8PKd7v5Gshd3T8FN7dDvveC/KsZz1rW1Q9//nP3+4+FaxN8A5/Wshw3DNX9BZkRHiHxhd/8RdvGPwC0F2cFkMWOPAbfOoKXXQ4L8CIzeff//3f336xVtCSUeNEXy8Jfdd3fdeb//pf/+sWjFH32P9onx4J6X0wFnQWhWGdyTSAWhzwx89o3WGzEPRVpF8SioG7gsVu1AU3n3FGDznc9W4fOj331K8yRtlxPw7U7r5ZNPOlmIx9j/bJ2vDGDxOLmBzx6NysaPeLFHkBg68xxZ7uo0Jm1Oe1Gj1Lx4fOyYvZQHNeez44xoNcWCnk08WH3rl1xMFMd/KwimV+OF4p9PhJstjLe/EwUR2VJlFY7eOt15OEiX94OsqLcUzKR/09q3jE45Ee9hTjh7y56Ch2xWzvV1iNEbHw4ZC9a3gkLw5N9HQcYd/jcIxHd4FxK6dxY58eOPdFG9zFQux82L2WR/rkAp1iNJsH9xg6Fgu+km1uMB5n44hMsUt+rGFoXOMAnzP/R5lxv3yO/+ZQfWZ4nNeXz3xg65p85DtZ8ZCLYuiD8szmiHfcxwt53BvX5th0jv1u26cHBsX44Fe6Z7KzeOBAPpmf8GPT72hssyEH411fOnoX38zurC0e8UeePRzQe7bob5ODrm3F9az82O/04onBgs2oO0qKhYl/+WGStYjyugB3mfw7lkc/+tHb3R9fjZGJ4BHANftwtI3BM6C0+2WZr75+9Vd/9cHnrNjW14W5iV4wIl6bPpKzSVyy8hv2X/u1X9sI3+NFvonN6wV8PVhCwrJS4ICHvH1fIQqwyWJW+AkzO6OsOPg1oeTysLhf1vFhVmCnx3mTe7WvXGF55StfucXWLxa950nSXirwwAsT7rpwX5LpXEmsJodTsTjiUb9ZMUhxSIc48kOp3stkl++4UOjAo3NN0HyjT47si35kbc6zFQ/7vpeOycMOCwx8oNt2ttBBnowJGo7y+KwO/fjAXzjU/K99poddRT8b+/kADwxhc5y+UVft+on7bTzOYkEf28YEHfIfj3J3lgNshX3Eoo3+cgmPcuHI5ig77rOZDj7jEj6+ni1s80NOKnTG3wxP2J3TTxzIH42lmQ52xAxeWHHYmOLP2RK/ZNjng7bw7/XgZlbgoIMvo//azxYfDnFZLMu3IyzOm4Ocj0uyqzwWD3K24iFHzxY69C+ecJTjZ3Xol3xclotHPs3iIQ/kBj+Mq7jBl21f9GXP+BE7MSsO+76XjuORDroU18nbrkujTv7EZXjV2lbLqcXTTLFPU4q3ihuYJaCvnCys/FNZF3ELJ0FG9NurWFTQx2Z2kWI1/KIXvWh7QNy/iPFAeAnq14CKB9eRJaCCYBUvcQSzQpdNwJXHPe5xN69//eu3oNenmg6vA3jOc56z3S3ycsVrigUaPeOLw/A+S0b6SwD2G1R8cffPQ/seEH/kIx+5JdnRwNjj5C8O1SY5X8P6dIBrbT3HtpfDVROwvPDVqL617fvPjungq0FhkqOjGB31n7WzaUCJd/zFz6z/iN2+Ig7edUUXWe3yDL6jeJBjT18yPuWu5kL66eADDJfsXfLHpM8PL02lbyUW6fXJknwY+CXfZoXvipjhyrG7p+NFP/9m8mNbcdMmd494PPIpLOz5sFQuzvrrW/8RwxhzC/nen3bk/yi735cL8pFOZYZjLzMem++MR2MClualsc9sP9/YM4ZXeSxvxN28gMfVeTwd8LmDZk7hwxEHcbT3R393TORj5VI+1mesXWTlEz9w07Vj7LPfLzfkkn13IFd5JNcYMrcZE2K5UuiwmeN9KLrLuCbvpgcct43JWTzIGOdiGYf5d8knMnxQjMsjHo90iLc8YAsuusTymuIuqBsMdIVpVc98JtxpATpyMlbyG9jt1+893/M9t2eh1JcugDszpw9NHmwi0MXWgLZo+Mf/+B9vAf3BH/zBmyc84Qnb+Yh++MMfvg0cb832KzIDGGlveMMbthdHmhz7dKrdJEl/A1SiHRWJyI6+ijpOZjL020ZOTY4ueCWr+pKObIw2JeRnf/ZnbwPsuc997oYj/7M14oGhwpZjdsMSx2S1jf2Tq3YOFvlAB5lL/ZOr1pe9dGgPe33G+hI3MNCXfBfzUb59fSphlrNiUZ5pj5+ZT8WAnXyIg3SP9WhzbE+GPhjUZ7GPevL9TCxm/tAFY5/o7IcFxqPC9ybT+CKbv2xlr7ZRFxv0G3vO6+uYrllJ1/6cdjJkcUBvx/u+7Mz00xHGPuUe6djrHI/pKB/Jw6Jcwj7K2ycTH7gZj2fYxa07MvmQzF73JSz1JUunGu4j7NlKbqzJ4KFylEczf8joLw70xKNcO9KTnbE2phrT5NrgPsJuHsDlaPcI4xEvMHSuuUV9pGeGJXl4LMCK54r/4WhuoZMtOmY29T9qJwt/8vAoM5+cw6G+zpOF4Qj7kc3wO08nLpQVPfqyb5PTyV6yuRmZ/Dm9eLJiHxMpspDAsE+Z7t4A5VUAfjWGKFuA9T37qWmC9cEmepqku4Xo2Su2H//4x2+DzFdWbBtw2izkPAPk60QLDG8fd3fKPy7+0R/90Q0XnXyhp3L2kyY++Ikj8uFLz1hnQ00ujsgLaAOcHudmBa7i0fnXve512zNT3m31qEc9asMARzbqVx2OjtnSf8RQHxMfrmcFTv3Ihn3W71IbeQWGONdW+yXZ/Tk49nL742RwPp6zTx4O+85Xxn61qccLmuN0jH3O7Kef/RHDkWz9x/PFAiYbP2ob+922T3fy+jqe2UsPGwp75Vs61M7jchabdLCXHm3jfn3G+hKe+sXDmb7JqMf+dOzbxr6X9umZ+TzqvyTvHB7wqpAbj2ey3WnGd5zP+tV2Gxb+58Olvreda0GXH9k/U/MfjpGHS/aOdI4ydNmO8kzfrldjTp/RPfahP7t4pFN9VOq7P08POTzUp3rf9+g4n9V0he1IzyVuspHOo76NH/31VUYf0lN9hMX55PVJ71H/WTufjQmyavqOcIfnqD61eGowUuKCPQ5IF1S3dLXnjH2LFl9FAetYv3HwHAE6015C0wubOy6Ku0e/+Zu/ub06wQKAPQsttwf94swLNPs3Ml6boN1Xi/75Lp+QDfPRIuESNkHgaz5eCsgY1PpZnGjHIV0Gq+POX7LNR7fEf+AHfuDGr+u8miAb9OLrjB42yPGDTg/A0+flo3i+TUd49Wv/Eu7ZuSapzt1ms37V7Noq9ottbft6tGF/PNa3WOzlOt7LZH+vp/5napgrq3r0h6GJ5pL80Tny+RGOEVNt1fSMumbH5OXW2C95NXv7WF3qP8oe7dPHXrqP+l1qj0d9jrAfycdhGBxf0jE7R8a8kA/y8RIv8QxT9i/1vw2782xWZhg7t6/rC8fbg8f0x0XHZ2oyeFDCta/3et4e+chGccjeKn5y6cGj/eo95tuOw6DfbTjGvullt1h2np7261e99732o/6d39fpqb3jFT3i2ZxQnb7V+tTiyULE4G1h4NhFWfEs0Pu+7/tuiw7Hbilyxp0PA87XPZ69ePazn33jq6SSdxXo2N+F3YKgRZ2Lu3/H0jH7I+uMVE8AACAASURBVLGOLbQ8T/RZn/VZ2wPlsNnI0KdYON329dSIw3622BMMi0b7Jde+v2NcwqOPvr5/dTfMM0ruGhXgFn8zHeTosXD1taWFITkc+y5afOjnI4zO7Qt57fwXF9ht9t1J9N4usWVLiae9HvoVeUGezmzv+x4ds0FPGMJ91P+onQ7c5kc48mEm51z2wyCPk4kjsrWNerTpY1PyoeOx7237uIcf12oxit/bZJ2HhZwSjmvGHP7F04bD23iEMW7yu3mieUMfftVv7w+bZPlcbv5/7N37z33NXdf/6/sPGFOClpYzUg6lSBqMEQ9gqYnSUrVRFANGjCiegHiIiWcxRkUiQikinkogUSytxgoiGkCoEQstWIGWivQuJv7gjyYm/GS+eazv/fwwLGb23rM/rd/ed69J1jVrzbwPr/dr3jN79tp7r0sM2ncLfTx07OrDCGv5IBY87owFn7DDkD4exbhjhz4e0mOzg71zIdsbzLi2HjQuZ/lL1+d8hHvHDv9hbSx3Yg8bnyOP2S2+5C7V8UgGhnC5nvFIXsElWb6K4ejY+ENXDPKADcfOvKRPd9S37u+MBbjk5bV4nONBnObLrSUcbNBTlxezmPSRUyfntXYXO3zGCX4Y2IJ9JwfYSF7tYOeecjtjzxLPEYL8HznFr+t8iU2bF1zfJRKYyYogwQlWicDj4in+tDAgH5l9ZJhJGB0NDmw2SSWMa6Rpg1MS6lPvloiHQ3ywNTiXbHlBoUvPl9j/2T/7Z8fT0F0rYWdzVujyw5/HG7zuda97eM1rXvPkS3hiEdv4RfiZHf7iEx9x0AteyaW+BYu7dvhVVvIzHLXRH23UvlPTF0slTru+VuMAJ/DjuTjifKZfzPriMb2Z/KU2+sZtjOGS/LmvePHQ2N6Sk2c73kikry+7Z7nzNV+OxiG9a/Gc+XKN13P72d/52jgpsOPReN4Tf3ZHHmu7tYYFj9div2TPXGzNwiU8yphzo/6Mr3t5xFv5GI8z+6P/8znfDvorzGed87X18N58zFb55LoYLuFJJn2y2s7t9V+r6YsBD8a0eXFNr3757Cgf6e/akI/0Heka487zdakWf1zQvcZH62avKXT5v6a3wkCPPrvOd+a2PLIncdBXtO3EH675K3O9z9aC5QBQtY/H3vCGNxy9Fie76AAAIRjgkNW5pLFBuQfkCc6xGYNJ8GzyY4M2DkbE6tcHB99k9IVDDbs2Nm04dha6Bo6+zWLP5nG9KvzQc3eDLw8ade17WR55ECZtl+zok0QeJSCuz/u8z3vy7I1iIsPfrMQhGRyK3UbYM0Rwpi07sDifFXg7/IIBB7vvrMLArztxftWiaJ+VVTvMMPhlzohhhV1csOeLXRx4EyB36JVXKxv64Y4DcjB4yvusrLDDEh4YxMDuSn7W3jhZZPHo41xxzGRhIz8rYopHb4bCtrKjvTzjz7mP0/uhhbb4WeHhU5/DOLJhTpkTu4UtmHCAR+vRKtZZTMXLTjwai90y8igfRw5mtmYYjQO98zq7wkOWHTE7t8bgcTcf4TMGbMlHOSWe1TyY8ch/c0gcfnk4vnCdOZjZIDPySF+BayV/tuua/3IPd+KBTduM99E+n9bae/KRHT7EYE6w5ViN3ywmNshbo8vHuJ3Fumpjxy+ijas5xuYY51lP37n4tMMv9owlfRyyB/cMuzZcJ8umT6N287G8ZgcH7BTDGaPrGZY4wyM7T1Nu2jxxGBiAEfURH/ERT+P3qXT5V8JVHVkwOlzrqz+n+hT9yFca/J2N06H47B8Lm8EwKI5LhX+TyYuSpPJUdrr+H59aMtpYmawtFGd78LLzzDPPHA/E9HGfj/3oidckZ0t85NicFRzob2EwKSS2iW5yvOc973nwhHabCTHOCn3y6iYW2cZppnNugw8G3PEvbrE0pmf585jWz4ZF0t1IGPC8kqWjD24HX4709Z1tkDsXccJLvjziXxw7JdtqPFog+MftToFB3PzjU5653il4hIG+cZBL5sYqH2Eudr6c8x8HbcDEguNZPurjR+GLDXmMy1mZ2SA35jz/9OGeycMd76OPYoADD3DgYSY76p3P3WWQT3QdY56fZVfX5iQ7eDMebHgzuooJb3CSdU7WeWOx8nNujy+2YPBGeRyjs/zqmh3rXPlwD4/08Wg+0C8f5dWtRQz4kB+wsKms8lF/+Sgf8CCXVvm4wkHPWOGOX9d8rubSyo528fOvhm13XsNAX07jgf7umNIVBz7F0FwR06xYF42THFT4NYbs7BT2cedI1yNddsYDFvkId7kjJ1bYL+HbW5UvWfoQ7UO6Q0J4l91zmgzItWLwPBFcUnkuk8cp+JK2oq/kntnRb0H1S0EL/Od//ucfi4Hna5kM+iWJc1gk3LmYfOG3UEhCsp7Vpc//LPzKr/zKh7e85S3HP16e2QgrP2zxKw7JCd+tpQkIg7g/+qM/+sDA7qy0qJ374Dep8UgGB9ou2WlCxoVr/unkx6TTrj6XJmMy6fiRwk7hP47Z9E+12bKRubXQK2YLrDi6vtUGOToWOPkcj8YlfGdbxhvPSmPp/MUvfvExnuzFX/XZBhm6eOBLsUiveLw0po0dX3KB3WyOfvl0nEtjISY5WT7NbJx1z9eNA474Ml93ivH3PJvuhoqFDbZm+dhYqPXDbPO34nGFhR/6uMCnN8z8Ns4rvbEdRjiMgzy6l8fsWN/gYktcs/hH/+O5zZ+jx9LQZ3eVj3T5UcRgHOTCLo/0YcabjazXCWO5yyMsbRrMS7HvxB8OcXtOlPW5MV7NpSP40x9vqh3WFrnhEMuKR9zxqVbI0fFQ6Z3itSVd48iGfNC2U/DoNcKhsHNPmb8y3WPpQ1jH4J0HUFLOimRv0bNh+fEf//HjlrjNT+8u2ZJsymqCWcR8Sf5v/I2/8fD7f//vP+4OsSUxTARHSc2f41yaMPWp4Vbrg9XHPor2c4zZaxKT4d81fCsO0hvr0XZ6MHQ+yjpf8UI+HTJssF3b2Q6s+h3iriZvDNKnFz9nG/lR4xwHFooVxrN+13ThSd95C1wy12r46cEKgzhcr+Jf2WOHPkw4qKzsiJWfivPikAuu2Rz5TbaazFnOxmPF4wrLaK8Y2JjJw7OyH1ZxxMPMRv5mNdujPjvKjh0xOBRjEV62ZnbgxiPeK5d4TOZcxw0fYpBT7M58nnW7ZgPm8rHrHRtsjTw6h0PZsePFt7tN5vYY38wOPw5y+sVwD4/hZ+dpeAyHXIAFrzPcBzGLPyOGeGRjxw7/4lBaG9iFaWanseo1LR5nsgvYT3yVf3IfBjb43inkxQ4HO66blzt2fn5V3NF6lH3CwHngXHc8EZqcGDgD6CGdbj1+wRd8wfFi3UCe7Z5N+JL5n/pTf+qw4d/RSGjJyaYiyUqIkvdso+t8mQgONuhKzBaZJkk6Y52f9LIXllH22jmd0deujfDDEA4+V3aMw6ykWz3GeJavTzt5GHCe7ln+2nXjFebqa3r1w8NGXGjPZjK31LMYVlhGDrJNVv6wM/avsDQW9asdKx6vYaGb32yG7daaXuNJZ+XzFnviKJYdO/w3D/m5ZqOYR0yj/th+6TyMajbDX/sl3XMfnfTY6fwsd+262Kt37OAAl0r6zm+xUR5fysdr2Mf+ezgwBrCO8/oW7KPfzos/HF3Xf6nGQThGOTYuzbNyiAw+d7GX1/TYwEPjOeK45Zw+e2G6Recs87h5OjOyeT0m3TgYq121gR+Txj/r9H/j3AJ1zkYboXbGM0h+5eiL3R5x4NalZKTbC5DazrxkHnFmT1s+6MPsqE1i/tyzT2hWk5kV8vp6J+Ca3xUHMxuw85d/Mpf0yc9KNkbd8MzkycVNNsc44rS+ceyyxz47YmbLOXl2dgpd9vOvLp4dO3w3trDdU+CgG3edx9XZpn46fIvfeTzEhWt5woa2c0lee7acr3hcYdHuiEd2jQ2M5zLDQUY7nfToZuds49J1PNAtJthmWFZ2yHbAxZY7KOpZIStvxM+Xc3orHmc2tBX/yKP2ld+ZHX4bj/Ssb2zvFPL0xZauc/ZvLaP8uMZqh/Fc2HY0hmRc38sj+2LoOPu7ds0v//A67i1n/+zG6S02889O40IPtpkdvGmPc9ds0N8pdHqdGsdgx05YdvyuZB83TytmNttLKLUySyLt3TomJ9n8iuULv/ALj8/iJZfBbZPi3MSdlW/4hm94+OzP/uzjuU58jZPaeYm80meTfUdYamNPcvqi+Fd/9VcfX2SHaRUTX4p+C7XC5kr+EFj8gWfEvxCbLnZkw+J89D+ejzbjYNQVA970Ka7DNep2znayjX96ydxSWwQat3zeyyM7xRa2WzAkk9/iVsM08puseuSAbNfJ01X0dYz6znHOr/4KO+nWVp3trs81O2w6yLI1K6O/+sl31DbmRG3Xajbg59t5ZYWl/rGGL1164VV3Psp3Dq9SHCsekz/XxsJBny36znewkw+/c+UeHunxf7a1g4UNGBxxw97I6QHw2T/5culciYdnRW6q4pENMRR/Nm8yMsQPr4OdOL3VBvkwxEX2brUx8sXGeH3JRnGTSe+S/Kov3kb8K9lzOx3rrDFR2HKezbP8pevHzdMldjb6GpAGRULNivZx1+zL2OfSgJId7dGT+L4k/va3v/34B8i+gOlz+L7sLTno56fEmCUHWUVSK+nU5tEJDoV+8kfD8AcmhX48ZHMQu3rKfj7iYIaboeTORsmHVQ3P7iKDM/bzjXexZfvsc4yZHH+7PtmMM374hCNuzz4vXdOXE3A1Juqdkh4d9saxWdkhM/qkN+qzWdvMRj7Cmqz2nTLqwfNzzz7vbGVn1q4tHHw7n8ldwwULDNloPu7aitf01asid3zfiW9+1J2vdGbtxc8e/9nawc5vJXtjW33XajowjLo7OLIff66LqXmXzFiTMQfHebjrF+Zwe/MsH+/JJzjhYSMuR6y3nMPhTbr1wZfXs3NPTHTZS1ddnCMWnF/ieJS95Ty/5UP+b9ElCwuczZExhltsJPO4eYqJO+sSxuQyCCaGxWY1oLPk4lpCSGjPAaHvWtKxq2bP+Tve8Y7jF3Ce6eTjOs+wISuR/DLJr2ocbJS0K5/as+3OEuwmFgy1s3PtS8tkYQgzHH6p1R20W6gNqzhsBMNwi+4oY2KIwx298ODO+argwUHOEYe38sg23EqcisHzVHZLXDaecmJcuK/ZK1bjRhcGbbtl5BEmcbF5bRHkKy7lAA7hEI++9GeY4lGfmF2zcQ+PsDZ35KPxuJQDM37CIZ/koxjEtltg8SspscBgXuD01gI/v+KBhf6Mv+zp44cP5z7iu4dHuo19+cjObmGjfPL4je6w79rBo8cV4EDBxyUezvbxCMu4xtJfjSkOG3Myru/hka6YcWDjY/ys2yu/Z9xdw24+sWV9c71bxAuDOekXc65tInB7a/ErNVzC0LzGzarwIfZ8kDWGu/OaHbpq/hX5lN2V/7E9nPIoPXXr0ih77fxx83SNoRv7JbIBfd/73nckeIN0Vl9NGAuB7zC1QEpok8Q1W2xL+i//8i8/Hm/w2te+9viOlEXZT1/1+WWchVJy0aXHXwl+xmIS64PdBklCm1BsebHxb29KLJP2UpF8sHqgIbv0V7HO7MAgZsV3vyri2Cl847HSpMXJrOiH00HG4cv4YrmVR7I4wzf/igeFNjlnfmdtsBgP9jxATr37YiUOOGDHQ/bu5VE8Yis/VmNae/mSf+OqT10+wqL/XPTTJ+9n4Xx7kdkt2ZFPOIBfgeHW0liYTx7Y6po+PncKLOal2hzGo/Od8fAi9Ut/6S899M1DeYGnOD3jgRF3+sniEoYZ52fd8RpONsTeg0b173BAF9ZyGp9i37HBp5yAgR08srOLxQutRwS0ltIv38rfw+izf7TFpXO+Ydjl0Viwg0tj6QdCbO3YMRawsiOn3TVib5dHdqzx1vpsykmbqVuLNQmHPT/MeLK1KvrlYFzjAwbXOwVnxoE9mx/n5nbz+xZbOE9PDMol7JdsPm6eLrFzQ18TwMDaxHgGiAVDsuwUyet/0vUxHH0TQ5Kza9K9+93vfvjJn/zJ43/OvfrVrz6SoMVN7UXf3Sj+4ZIU4dN2Luzrd0hok8ILhec0SWzvDP7Tf/pPD5/7uZ97YDjrdy2Z6bPjBeuTPumTjvOdpOSvhdYCh4cmS35uqfHohcYDR02SFi62ZgV2co64sLjxfyuP7OI/G202+shz5nfWlg3jYmG6h0cx0Men59n0bJ6dsYANj/HAlgW2cZ5hr60YXHuA6wtf+MJjDHATn2Rm+UhHnxJe1y996UuPtlv/iF/hUwyeNSUvXe8UHMBp/skH+qs8WtnFnTdUfhACFxx47MV/pTe2ezOBf+OJDzmtOI+nUZ5POOUCmXj3/0Z3Cjt04RYDHuHYLdYw3FnfrI8w7fJoTuHBOMSj8cHnrcX6iDs84k1ssMC2yg2+yJJzDvcuj/T4wicMntnVA0dvxW4s8Shm+D0Qmc3Z+F+yCQMeP/zDP/zIa9jY3hkPG0ivDZ7TxD/9SzhaN8g5V1vfXvKSl1yC+ov66Ck48HqofNiHfdjWXGLDWLt79l//6389bBTDcbHxZ/6KsmHgQ120SdckazKbbDtF8kosA9lCr83CzZYJ51/i2Nj8g3/wDw65Er7ktPkh2+IKm2RxzPCYfCVkWNkiy/Zb3/rWhy/5ki95+N7v/d7jIZ7JnOtw8EdfEcfM51m3a/L08UgPNtc7NtiiZ6FlDy421Cs75BxKXIXhVh7psj/6Y3Pl83A2+ROOp+GxeC2SxsKL9D1YxBKPvdBf4pHfeOAPlzDgwJhUyDlm3GinN8q7nslmb1azE5c4YGPlc6avjXzjz8bT5KPFnr1xXu/EJB/pw1BcYlpxk+10xLOSXcWvvZj5NJZsKNm/pFsfDPKHLh7DtGODLWMRj7fkY/7Hmk/+m6f6iql6lCdLBw9x4XoXOzsKv8YSl5fm0oihczbkjzv6eDAmjl0sYYBDYUPsO3aSpQuXg40Zh+GvNo7JZqe+a3W+jD9dMRiXHTtk2VF7vSyv8bJb9jV2PTzP5Q2EIiEkUwvuKpGSn9FyXlzYM7h07JK/4zu+49g4vfzlLz/8uYXPn4OcQtYhObSNCT7zmaxaMsItISUWXbc2JRZbxXa2w1dJ3CITlrPspWt2xkntGq6dAms8FtOI6RZbOKDruIXHM0YxNG63+Btl+KY/Tuaz/VH+0jk7Ylcby51CfuSxsbiEpT61OEYei6t8nGGhB2+FzzDUdktNz6HcyyO8cRZ/cXALhmTiAo44EKPzWwv/eFBgKJ/Dd7YzztN4uIfH8mf0yVfjfPa7uibvYE99D49s46z8CNsOj+YkHtKB5dJY1A8vrum1gVvFOmunz7cc4M+1wv5OgaFcCM+uDf7Shcl517digR+PxQTDJRzlI/7IPQ2P4cUD/5fGbxZP+vrgMiaNx0z+Utvj5ukSOxt9ksIgOJqcM3WDbeDJGbwSSjI2kNrIlZzkv/3bv/34KMpHaAoZH+2p6eZ7TOKStr4zHomkpMNn52zrdx0edmYlO/pgJU9vJT+zQZ4dOhYoxTV7OyV+cZkN9QpLWIvT9dnnNR7pOiowXPKZ3LmOf7Wxh9n5CvtZ33VY6MgLhY1zTDPdsQ33uKg0xis7+Y2HeByv4VBgG22PPopZG5+434mfXn6c48A1fzt2ws2GO3DKPflIp3jZjMcdLLD3cVn62ortADf8Ybu1Jfl7eDSH+FHLR/7g2ME+xsyGom3HBh1xyD146DfGO3bo4SFO6MKUrYHC41S7fjqK69346fHHt8KnGDo/Tm74Qz8bibtezcdkznUxwdTrDZldHt39iZcxD4tt5lcfvx07PtkbeRwx79gJHx328Ke+pzxunu5hbaFTgp+TfBS3EEvg84KsrQFN3qCSe9e73vXwd/7O3zm+LN53qUZfzumOCc2GxNBX0mZ3rEsmchaKDhOLf//nTs2+tlnRB3+LWwm5k5TpwDFOypXPGY6xrbjEwyZ8q6JfSefM4zgus5jiOZ7IX+J8hSM/6Xc983nJBj1FHHDAdyn+ma04yxYZXLJ5qcCabnzAMNqhP4uJnqO44Zb/M9lLGBoPMvne5SAb8DxNPsaFmOKgtksxjH3GDveKO8LWgBHXKOtczNVx6QVul8dyh148qnfs4DGd5rJYOj9jX13HGVthYaevSaz0xna44aEXL3CwvSr6+FPo3MNjuWQcR/w7PNKDGx4HLOodG2LIP0zj2OzYYQMPxRUm9p2fS23k4Vbzt+OTzeJPrxzq+ux3dR0e/c7FM7at9M7t81fDs9Tj9VUGkC8xLPbOVy9WEseXBv/oH/2jD9/8zd98fKHX4kzn5559mneTjKwXqze+8Y3HF+T8Cxf2aw8UvxJA0deCUFLpd5xLGNOlx19J6Uvpn/VZn3X8E8lsn224LvHYE0v6sNxawqrOHls7NviCQQzZyO4s/rCRdeChg9+wZIv8zA6fyeQPBzPZfM7qdEce2d3hgDw72RIPLDs2YMuOugOulZ1kxMy3mjzfZ1tslHMjD+Tp1hcP9/LIb/kYptHfpXPy9JXqe/KRPluOztlb8XgInf7Eh+Y2Ts5XvIy+yMTDSv7k7skl/umyF4+72ItdvMX8NDzyHyb4dmKKi9anOMTvyHEEsJ9sfl3v+GQrHp3TFz97O3bIs6M4V3Abp0fDDX/otMY7L+4dLPSKKVzFk70RijZxO+h27Phkjz4/7PGvZmPmc/Q/nuOLvI3Yjt5oo/PHzVNM3FkbPAPpcEv32jshi5/N0w/90A8dycBtk8GkamC1ubZZ8oXtL/7iLz7uAmk7F8lIHgZ4SihtJepZp+t8u07XeZtA/30bpuynN9b0lFGGDjw7ZfTjXNm1MS7St+jnM5zxxQ7f+uNXfa2QNzG9M9vFXszhbmx27dBvLLK5a6P42WGj+pqd+qt7px6vxXaNR/3lY7Zu0UlPDXNj53rXTv7Sw0Pn9V2r5UI64um8+pq+fnG06I/yt9iA+V4e6TqU9yeP7N2CfYy1fNQmHnh2xwOPdEdb7Fwq5T1fjcEu9pHHcnIXO4zl0vjmcBdL3BVXse/YiUe26LlWrnFZPx7Tzf8tNc4U9b08FicOHTDBUwy34EjmcfMUE3fWJYTE9vC1//bf/tux8ViZM0j+tYqfsbsF/573vOcQtSny7As/I/WLijZh/+7f/buj7au+6quOnwt7MZI8/LLlcO2gKylLhFF2hodstvx01HeNPA+Gnp/S/tyzPzEmQ7ZYz7a0S0py733ve49NoYTEyU7Jh5/CKk2yHRt+ndhzUGwAs7PCHocjjz/7sz97+I7ja3HEOQ4c9MTg49adki4ef+ZnfuawxfY1/6MPuo0FHpTGb5S7dm5hkU9syQf52a98Zrrx2BgaO/671m884sr1rNDj05sM9T08NtYwy0c27+EARm+IPHNLbT7slnhkC38w4QCeW4ufZctrPxDp+4DxNLMBJ/7iwVpibdnNR+/05R59PFqX2JUPuwUPnn3mMSTXnhk3sx2PYuIfNvlUjDOdc1s84icey8+zrGt9eDb2/MjHe3lkz5jLJY9ssL6yvVPIw+RxMtZrPOzkEV/y0Dh45lVxsbGDRR74qT8M8sPBhmM2HjDjjo/uHhmL3XxkG3526DvHQWN5C5cwpocDtmDTvlseN0+7jJ3kGwwLjIWh5wsZoFnxovijP/qjx/+l88yTftXGjsXAMzx++S//5UeSWbD+7J/9sw+/9bf+1uNZS2QliscWqEumBt51/iWppIVjhcVCLnkkoAQyKZz3DBH64kpmZcfkadLQ/6iP+qgnNmccrNosanyw1fOBVrKrdv493BMPcItRiaOzXvyoyTicez4SHPRrS+ZsY9TDmWKsjO9OGXmUC57ZxV7c3mILFjpsKXg0hruFfznm2T447UVTnsxKPIYX93LQnUs1DPqSm9nANV908+PFapdHNhQvuM7l45gLM9/ntniEwy9O5QP84TrLr67xCAMe8YnH8mmlc253p1os1gZcygc21fg8F2Mf33zS8VDBXR5xxpYXWbV5xe5uPsIKQ/kUpjPuS9djPhZfdi/pjX3x6NlAYoCJjVVOkuHLmJMzbjYNuzzKG6W89hw6nPJ/a4ERb3IRFq8RjfGtNsjhUS7BoBYbfDtY3CTwpsazonDEhlp8s3xkv3UUnzDcsz6ybQzo27g5t760xt/CAx04jWNje4veTOb20ZtpP7Y9SRYJbVBaHFFjkA1si66Be9vb3vbw0z/90w9//s//+WMStBiRoe9dSe+M/sSf+BPHu7Tf9/t+3zHQZFu8JT55SU9X8pZUJTJZPldFMrLROxBydJuUP/IjP/LwdV/3dQ9/9a/+1eOBaCtbsFTYEzPfs4mU3Llmm1+xKzAV61n20jUsxcAmDE26mV4c8BWPalgcbNQ+09d2Hgfy9EZeVrpjO95gV8LgnK2dkjxcHhLJ1s5Y8AU7O8bB4fzaApsP/lrQ6Fro4qT4ZvHQp8d3tozLLo9wljs4cD7Oy5nvWVsY9MmFewrsMPAfj+yMtq/ZJevOk7sVSvyuxrX4jRk+6Tt2eeQLdrp8GUc2yq9ruOuHx8GG8Wdnt+CfPg7hgYGtxvkWe/TYKR/TZ0vfrLBPziEG9S6PYWW/J73Lh5XPGQ5tfFsf1XiAZ3cs5IM7V3jo7hd7OwVuvuk7twlx7ZiV4lfzL/bm+Ux+1ZYduu4ayYfmxEpn1s6OvHazQHF9T9lj7R4PH6I6ksogGxhJ5V2DwX7Tm950TPjP+IzPOPqjp0nZAuHJ3t/1Xd/18KpXverhN/yG3/DkX760GKf3gahhsGh4p+YRCRIV/sfyyMAjA48MPDLwyMAjAw8Pj5unD1AW2IDYEDlsoGx63Bn68R//8cOjO0wKuWqy/b+d7//+7z90//Af/sNH7Q4COzZl7Hwgi42TXXnvDtQ77/A+kNgebT8y8MjAW1SauwAAIABJREFUIwOPDDwy8P83A4+bpw/QCNjo2BipfaRnY2Tj5B/nvuIVrzi+A9EGS21T5Jas2/P+b9Cb3/zmh7/21/7awytf+crjFmM23AG69yOEW0Pli48+n3aLc3VL9labj3KPDDwy8MjAIwOPDDxfGHjcPH2ARrLPym2KHDYiyqd92qc9vOY1r3mysbKpSsa543Wve93R5q6TjRVbNk02YuyQ+UAW/myWfBnvta997bGh+0D6e7T9yMAjA48MPDLwyMBziYH5N7yeSxF8kGK12fFxV3eX3FXyPafv/u7vPn6lEOw+iiPvi4x+Hu6hmGT7aM+dH7/ks3HyBTm2PpB3n2zO/Jz4cz7ncx5+/a//9QdUd6Me7z41ao/1IwOPDDwy8MjAhzIDz9nNU5sSd236RYjvAnnh16bfi71r50rf27EJ0WZzo9jAVDtP7mi88qfND582QO973/uOTU53mmbqfup5LnD6Jcbf+3t/7+Enf/InH/7kn/yTx7N+bFpmhTwffYFcLH4+6vEG3ckadYtxtIWfNmJixh9snj3FfrzGpetZoUte8QwRmz6+L3FwtpM/mHxs2disbMziYdMGFI8+/iwfVrjJx5WaTYdfo/CvLZ61uy6XzviTJe8QQ8/wOsuurvOpXwxyib9xHEfdFQf8K8bSP5QuhlH32jksMPhlDP99Z0+cs8KHPlw7V3vOkzZH+RWPMxt80iPvzQE7HlWwy6Mc4gdmc0IM7K7GbsUjHH7VBINnf5kr2mZlZUPcMHhEifVBXGRXeT2zz783M//rf/2vA0M8reLRDrfinPw9+YhHvMEsF+JDHLMy44BOevLR1xbwOJNlc9UOCx6feeaZJ/kIx4yvGTZteOx5WfinK7dXNuSfgj9y8ujefOQDl9ZH3yft12IzrDMOmlNsGEs/5nHumJWZDXJw4NHaaFzlpxxZ2ZnZhl8u4oOuQ1HPuGQbhzCJQy0Ga9OsrLCzwb6xwF8+Xc/KzE5tdJyvMM/snduek5unEr+BQoAkaMFAij61RaefM3q2hAE3gOTTNwlNTl/W9sXsndJgSBA2u1tk4d4pEvLtb3/7w7d+67c+/Jbf8luOj8vYluCzImY86FfDL6E9A0p8YosnfY5zEbdJpA92i5rjYz/2Y49Fwt0udkr+s37XeKUPr/gddBqP5C7VkrnFEAbPtGFjxSN/syJmuPHAJi5wtfp5NB9idMDv4L9nwfDBpmLyznjsoX/xTtYi7flCO0X84ZWHnsUC+8wnvGTPxXiKiZ5xwaMi73cKOx5Eh8fyC58rO+HhGy41eTHAr1+b4hqX5xJ27Y37PTyKmz9+8CgfjWs2R7/hHtuchwVO+SQObaucXuUjHetKz2Zjz9i0Jp39xtHYDjvexSE3xaGNzxmP/FkXyLBH5h4e+aLPnxcr/ls/R3zOVzzKAfkThnicjQU7l3hsfWOTHG5XPJ7xuS4HxGEMyklYZjyKn4484hOn9/LIF59s8g/3jIMVjzika43wjCI2FNhmZcWjtYoN42As+VNWeT2zbQOJFzaUuGRrhgdu7cmp5ahnp83KCjs7fDRHYLC+zdbBFY/80fPcs9Zt9lY+Z/hqmzNf7wdpPSa6gUCGQ/HuRlL+7b/9tx9+1+/6XcdGgIzkkyze+fhY7Kd+6qcePumTPunht//23/7wMR/zMceASAZEllC3hJ/suDjQa4BvsUHGi/s73vGOQ/w3/abfdFyLY2XHYIs5/xTFN07K+uLojOW8oTApxcGvB+JJeItmvJz1uzbxJDA844sVv7cWNiwIEpp/dmaTInsrXmBmi37x01nJ8zHKkcVhPI4c38IjP3JNDKuNbzGc6xYzfnDRAnmWc73C0ljYQMSjMV3FP7OtTX7BE4+XxmJlg74cC1M8r7Cf8xFm2Hd55E+BuXzkexbDCkuY9ePCi+alBXbFrzEQl7EsHthW8jMfctohlsaDjRX2kUe5KHb69/AY5ng0prOywjLyiH/zymZ0VVa8jDyak2zxORvTlW1YWqfxnO4K+8ijjRoO78nHkTNvkhvH/I94V1hgp+cOYPkIy6qseGQHBmt68cGxkp/ZjwNjiZNZHKPeON784JKNsX2UX2EJr/G3AbShFc8sr1c88kOfDgywty6NGG45f05unpo0SFCQgAA7U4n6tV/7tQ9/6S/9pYdf/at/9bFBIkPnDW94w8NXf/VXHwvhJ3zCJzz843/8jx++5Vu+5eGf/tN/ejxVO7u3EJdMxBtIA2qxUmaLYDqzWsL84A/+4MPv+T2/5+GLvuiLjqRkU3LOitjh5UcNBxslg3My2tUzPMlnhy9HC65/DeMXf9/4jd94PCRzZgO2xkGdX+3XJtUY12ijcVCvyso2jHFAFx5lJc+vI57SSR4GR+M844AP/Q56ZG5ZVA5gkz/wGPvGJ27OomEc20dZ57DE5yh37dziwr6DHTbkxSof2YtDNfmRl/GcvRX2uM53C9w1vGN/HKhh5jseRrnOV1jC6YX7kj47Mxva2RCTEi+X5JM9FJ79wzcM9MXjmt3wjbLOk3Eej/fkI/uKOh5dzzDm61AY/pANZ2O50l/ZyFx68dh1/ddqejA4YKLvwKe+c0kmDtVkV2N91u+aHfbDjcvOkxnrmX026OmDH45L8c9s8MEvO2fdlfyIq3O+YZCTI676Z3XxpisfzxjSW2GJN7YUtqxTO3YaCz7oObStfIZpVs9fmWeSH0RtAh4HAzQbF/9X7pu+6Zse/uE//IcHsXaqXoQcvsfyx//4Hz9un/tHu/5thfIbf+NvfPiar/mah7//9//+QSS7yNwtI/n36H/P93zP8b2Kv/t3/+7xhXJ3DmwEL9kqiWDFSS8SruGpf2VjlKFD37sC7Q63yW3o3GLN1iVe+JHg6lvkR1t88zliZcsEmZVL9o13GMid7Y72kqvNdfmljW4YRmzJJxOexgGG3RIWNlrgVtjzd/YxYiz2Szye9buGwZxSi59dC6brWeHLoV9N3jn8jvrpjhhHW2TIVuQEDLuF/TCMPM7skFuV+swJxfWl+Gd2xJNO+upsn3Vm3NB36Gss2Z3Jsme88kXGcQ+PYeM7HrXN/K7iIa8vDOqwZX+sV3ZGnc7hWsmPNjsXg3lJrzLmW23VbGe/mJ+GR3bltEPJZv7U+RvbOtfXnBCDcR5jSe6aHTzku3rUvXY+8hhH5fnMXutndmE2p2ayl7Dz1XgZR0dcZrt6xeOIF67srbBkb1Y/JzdPJU0DpvblVP8D7qUvfemxGbJRcnsygnzp1J0pX8T2f4GQjsjP/dzPPb6kTd//6kGiwdXn3MGGejUgbJWQYWNjxId8Mr1zr1+7L//9mT/zZ44niX/6p3/68V0VO+r8zwauJEgmfNl13bl6hr02NXnYe4d6TsrimmEZ28hll81by2ifniOuZjZWtvnOljpbK3ntxZ8svsSffvwle8aTvrrD2K98nvW7psuXwjcbivZZmdkfZRvDe7DQKZZ8r+If+8mEi37ntY9t6VWP2LXB0Bgks1OnP4tltBPGc5t2mMLQ9SjX+cxGfeWPa/bgaZyTqT5zoD2/dHq3n9zK7+iHTDHk55Z61KPvUPJ9trHCot1hPtMd+bjVBrmRM3a6g3S2cek67NXJzrCPMrCTuYfH0Yexb/xH+8moZ1i0l8fqe8eCnXTzo+58xLE6h9tBRw2PsopntGMM+c/G2Nf5JSzlTuNxyec1O2yVU5fshOtcPyc3TwL1wqB2h8Znrz7Dfetb33psjNRIsdAYWLK+3W/z8rKXvezQaxL4crTNi+/2uBtFL51evA2CoyQ5k8iWLxjbrMHkIGtn7JxNX74l41xbBTbPdXr3u9/98KVf+qWHHtzk2F35DCc7+YRXuzLqsXOppJ8OTHTGL9SN/la26OCp+KpX8rN2MYQ3PDO5VRv/TSwybBTfSic/dJXiSD+9Mbba1PjCj8WcL/772GuUu+Wcfjhuwb6ySfdpeGRXHI3hNQ7DEWa+nY+xJJPNrqvxSJ5fhX5zOJlb6nGcOo+LW/TPMnTDXH2WuXQdD+rKeF7bqi6fiqE5rq5t1PUm0XdBlPzcm49sNIb5yubo89r5eVyvyc/6+W08nbdOzWRnbeanY8TvNUFcY1u6+NUvByt4ncnWP6vDrK/zuJzJX2qTf+k6vycf08kOf7Vd8l2ffMRj+mLqmHHjLlPzOD9dZ3OnjsPzWN5iw9wwpjB1F7I4btEfZX5+No+tz4Fzg2CgGjRfprP5aXAMcMlPziZL8cVNOpUWGRNRyabzbguyeYlgfmw0shGG9F7/+tc/fMmXfMnDu971rgMTH/oMpC8A+u4VHL/iV/yKJwtCMuE813w6xljIdF2tjdyszNrhErfyK3/lrzw+6nzRi170pG1mZ2ybYRr7V+fhFbcyw7bSHdthN/bsORqLUeaW8+IIR/ZmunJjzA95YILeW2C+5O8Wu/Rx2VjeojPKWFzicScWfhW1OPAXl9mP066rzzxqb04ls1uvfN1iJ+xwwVFst+iOMnjAYVh2Y+KXfnrNkVVuG7dz2RnDsy7/sN8bP9yO5si9dsQbBzDuxhSPjQMbYTrH7Jq/sZ/+6H+mc61t9H1N9twvXmPfa9u5/9brkf97YhIDHrKDp44ZhnO+0r2Hx/zx7+CztpnfWZvXWT/+8JUYGzg27i2/eJbda+n/sl7E+V5TCYlIA6UvgnsBAM+5w8CNcu2iJWfybDhXfuInfuL40vRqshoQd7s+/uM//niOB99etEw8mL7t277t4Yd/+IePj+b8zFO7z8759V0nbX/wD/7B42NDD8lkr+Qs8c70FsPY7+6WTaSiv4lfop1txBdZsYrP95z8jNPHmJ4w7mNOdrSt4mefDCzuvnmOiPh3EhMGfLAlDs9DYc/1ThET/X7hAtcqfnbJw+lw7nCX0gTTNurqG/kecTUe+fPLxf/xP/7HKHL1PAwEfc9MXuzymBN43E01juV0fbfU4qZvc2+TX07CeKnEA67gt0DJHSXuRk7PtvQpzcl7eGwc+Y7HSz7PGFyLs/UAD/KR3Wvxn23REYOcMuf7OP4sd+naL4jZMQ5qBZfwybdzCXft8bCbj/kSczzu5hJdG3E44xG+e3lsToipDX5xXqvx2PdIy4fqGR7xty6xTeaefKTHjzGzvjrHgXqnWAvEbD7JR3Ybo1vtkDcO5ldv+I3Njh3+HdZ5/IxzfsYj3MaLj3iQT7v52BiYR8ah3J/5vMaH2M2n3dhHu8/ZzZOBMCgmcwQYED9/bJCQ2oJl0khYA+aOSu2SMTtsaZdY2iQFGxL+h37ohw6yR/Kck/FC64GGH/3RH31sHug6vODw92M/9mPH/7KzsfHCzo9+z7nwSz9PE/8jf+SPPNE1qMqlpNDXUeJLCPhdq5W4SeZoHP60CItZLO7QWegt8i3axPWvigkBS7zBYSwu6Zxt8U0eThhwYLxWuM/6XfdCAQNM9NnuhTu5av31OXeseEznXONYHvHnXI1/E3y3wFp+3MMj/DAYExvZcml3oYbBGDYW5dMqHjErxiz/dOnp067oi+ejYfijjxys8g8G+O/h0fzyxsq44JEd9nYKnPIpHtncLWLnGw5xwGJd2LFFx/olN9KDy3m8j7jw11yU23Tv4VH85aNxhEPbzOfofzwnywY8eCwnRplbzkce5aW4yqVb9MnAzw4s5aV4Vnb4MG7yht69+cgO/o0Zv9nbnZONf/PSNfw7hXxjaSzY8LUXbbcWPNI1nvTE0dya4dFvXuNSwf89+UiXLZjpZ2uHR/jow61+mrK3mjyNp/ejrqANlhpxEtshOZUG0qSwCCu+JK54ereHUOpTPPdpfKaOdsmeHrJ/za/5NQ//9t/+2yd3Mw7FZ//wJZm//Mu//KhtoOhY2CzeNksS51f9ql91/F877dmWfDZdX/ZlX3Zs6Dx76hM/8RNH88tzccOplDyufYdLgUF7cR6Npz/4058t2MTz4he/+FjgE2dLDJJ+VtLXRxYGtlbyKxvG0ASj93Ef93FPcM3kL7XB6i6g2JogKx5gL3+cK/nXri2eklv5FrsiBucveclLVqLLdnp8wuv5Y5d4nxmhKw9gYGP8KHgmf6mNLeNwjcPRBln+xWGT4EGhcootbatxGG2Qw7Vibnke2045+8Ijm60Lt9gir8AhJvlUHtyiP8qMY6l9Bwd5PFqjei4OTM390c/sPMxPwyMurFne7LV2zXzN2ugaDxw4tza4vhX/aJNOY8nGDg/suKsPvzvqsNyai2TLRy+69+Yj/F5vjKM30tkcY1ydw+DwekLPo3ZGXCu9czve8OD7tzbVuxyy546TN9he68R0axx8w6zIy10ey2V1T7zvV/PnOK9du/vmv3E8TXlOfufJICiS3+AZEIQ2sb1wN6gNmBcRRP+Tf/JPjn+VYAFzV+hf/+t//fCqV73qSCY2tGevmg1PCLaInQ9+fFm9iUjfeR8n+shP+bzP+7zDbhsKGD1SwYuj5zrxZTcdXu3FeRiY/IGXHjkH/XbU6SYzUX/SVPLDxIYY6dvYffu3f/txB+rSgg+Dwpd3JbDjZafAwI4X/XjY0U+WDRjgd15s9Z9rMh36nMPgnVUchk3frJBrw0TGNS53S/7UT8sjHE/DIwzpx2H4ZnHFTfORjlzEY330HV2f7eiTO/WrXe8Wvs1But6g3JOP+YShXIiH+m6p6RtLc6M1qfhu0ScDP30Fhs6rz3bKRf18Oe7JR75gZgeP99jgO8xsKLvxp9O8ds3mpXw8HJ3+xAddhX5tJ9HjEk79SvW9HLQemhNs7GKHAR65kI0D2OYfNtKPh2K71RR5OMQQJuermMgq9PDgkKO7JX/0u/O1awNexfqAB5hq27X1nLzzNL6QlwBqhNpN60e0NgPnjpR3LD4a++t//a8/fOZnfuaxc7ex8U7IQyDJS2r6SsnepmhFLDl+6BsILziubZK02d3aeP3aX/trj2vt/LiF70GenoLuXYBi85ffMcaZb3LFCCOfdMTqvCIxxuva1cVWP30bJ0Wb72n5BeD3fd/3PcE46nceZvbEdw17emPNnwP+kYdVYod5tOFcOwyOrlc29Dd+h/Cz1/FYXNUrO/rpJCeG/Gf3ljp9uqONld8ZB7Xh0Fhm8xb/o8w5pvquYcm/Wj6Uj67pXsKjb+yncw+PYWgce1NVDLfU2SArhnBdi/9suxiaa+f+8/XMfnFkIyxdn23gjN+xXwy7JQ7w58jGDCPbyY9+wqqtsdS2YyPb4zjwdcnOiKFz8mycuan/XJPDveLcUQxn2UvX4zjgkY2x7ZJufXzDD495HY5dHvnFARzs3VPY4D8M2YFlhicO1eJQ+J/J6kvmjI3f+vj2+qfs2Ol1Wu11mL1snv1du35Obp5WQfXC7x2Ofy+CFIkSYV/xFV9xbAL+1t/6W8eXwH2U98f+2B97+NRP/dSDSAO6WwxcA1BSSSZt/PZR3Kd8yqc8GWwD/853vvP44p6HdFZsvujQZdf5qugnD7Mk4NNu3mYRjorrkru2an4qdNjpXQLffNjkqfOX/FjrExNdm0e42MvWKLs6H23QV6pnOuRnxQSlN+rG6Ux+7MtmPLAVD/qcz7jUx5+xwKm4O2Y+L7XxaRzxyEYYzjphPbd3DYc44uGafHrV4qRfzPTZdD0r2o15XDT+/GsTS1hWdtggK+ZsNRYzn6s22B180sen/Mz/Sm9sL97swEbf9ayQn5XGE5ZiEv8Ki75zIeuIH+fWNTZnRb94xxju4RHesOLQ0Xp69ruKXzvOxjGHe5dHWPjHQbrxccayusYLHhTnbMIy2jzrwk+O/DiWZ7lL1/CG2by2TrC34mxliw6sYnBkcya/sm0c8BgPdJ3P8m5mN3m8wQODWmmsz3psk+NHXroulrNsdmbtYeSHvsM5Ts7lUvxyGAfZO+veev282jw1iK94xSuOL3j7jF5bye+u0h/6Q3/o4Qu/8AsP8rS7K4ToBlhSaN8tbHQYTHZMEneefMdKkUBkYHrLW95yfA/L5klSmZhhIEM2+RUW/XToOh9xa69PPSu1z5IvTPSSG+2P9uKdXJj0r+RH3fM5G+JPf4ZNHz+zQj4c9cORzdqqw0snX9mmM9rKdrpjnR1txbAbf/7pd2Rv9FUbmVkp1mpyxTSTX7XBf9Zb+Rxl86cuJjlajsM144YvfaNP+jPZFWbt+QxT9nbtsAVP9uCP07P/fJzbXetzxJ16hWVmX5sjXvO1spHc2dZKfoZ5bKPnyG9xjDLaZu3J4LD+e3ikO3LIbvbyca2Oj7gkD8uIbbTBvj5+ywG69/LIdjEUz+jvlnP+iwOOcJ11G6tzu2t9Y//5eqYztqUrBgcOlRWWdNs4FQPdWcn+rE9bY0Df+cyOtlk7jF6v4nDl45b259XmCekR6ouuCEKU3X53pZDiC3sGXLtNgr4SYEb4LUTSk8zZce4OGEw2SPph0Q7Xd37ndz786T/9p487ZOyvEu8SnvrOdYmhveOWGNKz8cMJvDaXdun6riU1X8UvnmvyM0xhqK/Yuq5etcejfufJVadfzV9955pMePTdEg/5/GYvX7fU4bHQKMZg5feS/XDn85JsMudariqjrV07dNMf45jZ0YY78s7VdGayZ6yza/rykY1szeRmbeSVs+/zdbqrdv14DAO7ZC/JZ3Os0xvbnM/sjONGz/U9PstjNvCYr+pbsJCRw2yNZdcG3eJwHraVndFX5+UfnRFP7cmNdX2t3a53fLLFV+MnhsZn186Iq/OVjVX7mA9suFZW8vkZ62Qbg/RrH2Wdx3X9fMbHWTZbs/bGoDUxe9VnnVl73BvHcW04695y/bzaPCHVi47BsilCnkNbxOtDoFp7k+PagF4j04bDd678CqHE4NMX1N0mrN35G9/4xuNXRL/jd/yO45cLMGr3EZnnZ3R7Gk62ZoUO+/T4FgddG7bip0dfkszsxAN5d8l8IVMM7JD3SAePUvCrCs9X4XNW8qGPf78IEQO/txYYxMK/XwbB4At9jc/ZziweMmzQh0EONO4r7HT0Odh0eDSFOGBhA7ZwzOxoI0fGQZ6uX6XslNF2MeBRTOeyij85uW085ZT8uCafXjV9v0hx0BfTpXwc++NLDDAYRzbEd8kG7sgpYibvDc49PPJj7GEohpHf4lzVxYMHYyknxMHurKz4pd+8ps+uNybyZVZmGMXQR8KtDWzE1dkOLLgsJ8kah10eiwmmYmCn9tHvrK1+OK0FdFsbdnkkD4NxwAGbcgSftxb6irVFXhkbuFc2YI5jtR8B3ZuPcWBdwSefK7+zeOB00McjHi5xvuprLHEnltbHlfwMS68zavriaDxn+asf18ZNIevca+KsrLDkR16b03z5NGkmP2vjiw7M5qJDITvDPcM2tt3+6jZqfZCet0noRewMcyQJWREW0V2f9S5dp8OnwbDJUFtw3eGy8JVYZPT/uT/3547/Y6fPgsa/ianPLwBNjvCF7YxBvyQwCVok/XzTT2D51ydhybUAnG3oJ+ewONODh38/jTa5/KxXkouH/KzwAYf4PLxNQpPf2TzBgAOxeLAjPM53FhjY6MHLxq08wq/g2oHHsMBVHHhMduRBf2PgHOYeYjfKXTtvkWFDLrRYz3xessWOF0xjqW7RuqRz7otH/1Abj4rxvZSP8lw/zpzjkX/XuNPGhuuZHXHDqp9/OYWHVd6dMXcdX2z0kNCVz3RmNTts4NGz3GCb4Z7p1jbq41H8eIDn1iKfydMrB3FivrJ3LvFVv+f43MMju+w78CivdrHjEGcwtT5ZG3Z5lAvGwZpKX8n2Of7VtefWWdPagBgbvIqrnBl1xWpew+qwthoLebpT2OZDsXn062zxrNblmW1jQN7R6wRMOzbYZcfaRM+YiG+XR3lsI2pOyLFsxdMMv3WAbHksF8jvFDgd/HntDDe7txbxGwtH6xocbO2WvSzYtf4hJO+F7gUveMHxXJ0GWS1ZGjDX/+gf/aMjYf1DYv/EWDGQZGw6PE9Gcpi41wrbvVizbWGhn80mOfv6z6W2EtrCYpH0C0RtChzXklw//IoJ2bOFajs6rvyBscXKxq2PXa+o/aJuMe3wOGIvTh9V9gyTcHHUWJ6d8llf58ZCDDuF/8akGMK0YwcWY29x8yvT8mvHxshjsV3TD3v+jONHfuRHHliyQWYVU/pky39tn/zJn3zN9S/oz35zCgdK9n+B8JULOl7o5LS4dm2Qbyyb19rCeMX90e1/b+LSJohu82plI4zhTUcMO4V+42BO+IENLlZ+V7bLBzzAsKufXWus9Y09pTjrv1Z7xlLr9JhjKzzZ12+TIXZl9/lEdNhw2LgYS5uJxvEa7vptErzgywMYzPEwJnOthsEbdD+oEg8elB0sNpA2op5jx14YnM9KeaQ/mWeeeWZ7fWSbL/MIBufiyObM96zNWNr83RP7aO9x8zSyccd5C4ONh0HpWjIaZLVBkujedXzt137t0f7Zn/3ZT/q5JeMdUTra2CoxL0EreWDwrswild9Levro8qHmmz6/zk0uO3yT1bvu3tGebeafjslN36Kr3i0WCHHg45bYz/b53OWRThywhwMYZjwW6+h3bHMuD9gY20f5a+f08YgD43iPncYiHndt4CQMjUM8rfCPHPKHQ4f8KR/JZO9sB1Z6xez8Xh75KAZ8yt1dDuBjA4an5dF4iCub59gvXZeLNsOKeMwv8cy4hLVNTzGbE51f8jX2sU2HPfpPw6P48YjPe0pj2Tg0vrP4V/atYed1iT0xNjajLswKnfwZi10e2QgnfeuqfKxt9Lk6JwujMbBGhnmXT/IwOMIQpyvf53Y8wkAPJjbhCdNZ3rU+cuSde11R75Z44J+9Xex8smFMcTni2sXyuHnaZewkLxkMRgMybjBsmJqc1Dw3yRPOPY28d9MSQDGYbNGpaLulhIGuW9GuFb6v2YC7Ans42Pk3/+bfPHzDN3zDw9d8zddcfLfVJODfkf/q7N8mpnuSAAAgAElEQVRS829xuYb7ki1+b+WxycReXNCFIfzaO1/5NY7p0x15WOms2vPNJ5vZXcmf28MKg2OM8Sx76ZqdcRzG85VeWNWNZW10LtngrwWZjqMN7Mrfpfb8shsnl+RXfTi8hHulVzvfbFTC1fW12rwceYijlV6xjn7GdWGlt2oPO7tsjnZXOud2/LETtnP/tet8j+Mwnl/T13/mURsbl+aHvjCr77ljFDa88ecwx3dL64raeCphu9VWPDaOY32rDf7xEP/lwyUe2R59sbGLPXz0OsJQ3y01nV7rYHIN+275+Rm9q/kofzDQ5sdO2I7cbtaAaJcgBqWBedvb3nYsIJ/zOZ/zZMKSsxiaDNli2Hl6K6rp8dFiOup416RdgWdmq/YmVPreIbLrOwb+LY1bpOJrET3joScZlWywnf+z/OpaEtMJ664+u2zAUAlP17Ma1rjge9Rxjkt2LxVYcaYUwy5+GFpQ4MhvfFzyXx/ZFpZ4qE7mlvrM4y2xxBF/zmEJO33HGN8ZBx0c0CenNp9u8T3aCoc2NhzKjh24y/f01cUz+rt0Dgu/9MQWB9m8pFufPLC2uIOXLX0rPOUR2c75d71T4pEeX2HetWMsG1f+d/XpwJJ/16vYL8WHR/mkOG98cTPazkY+9dEzv+/JR/bZavyLvzp/l+ripdPrTHPpkt65r3k1+p7FftYbr+ORjTCIbcVj40+vNZK9EcNof3XOfmMWH7t22HAYx8aSreyufM/aHzdPM1Y22koMk8O5WmniOZcwNh/f//3ff/wrlle+8pWHjOQh18AZ1IpzfWNbfdX1SVyHIkHpuWa39pI8XXV9ksd5kwhe174fYKLa2I1JP9oYz8+TYeZzlJ+dw5AdGMI4k121xYv+azzqD6fz/MGQnfgcZUff6SQvhpXsqDc7p1f8/MKW3Zn8ua2xzM69ONgtH/JxLR+TG/mIR230FefJpKPmzyHmZO7BHwdsNLeyO/q7dD5y3niQL1cu6Z772Creznfs0KXnGPOh65m/M1Yx7PikP3IWjyufZwxdkw9/PLqOj+Su1ew4Ks5vzcdRJxvxOF4nV13u8hNm8rs80sFldpyP3ObvUh2HZMIQpkt6s77ww6Dcaye94mMr26PfYpdDZB335iPd/JZPM5+j//E8rGzA05iMMree/+Kfatyq+Sj3CxjwrlAxKA1wk0+7J43/yI/8yMNf/st/+ehPNnk6ijr92o6OyZ8WNDbyZZMjmRwSQ90kOZugUwLWV6KPuGygLmEpecn0WXT2bq2zD7MNoHLGdost+NmCWRHHbmGDniMuq2e2egeTjroYZvKX2ugq7v7dYyMMxgF/q7G/hEEfDsf8aIyv6fFHNg7Jh6l6ZUO8o96tPs/26MXjzz37/yLvtcV245DNs79L1+KJS/U9OMyJeDEmcFyak/oa+zBXX8J67ht1yqex7Sw/uxazQu9peGQHBw4Fj9k+Gm74M3LvHB5xrexoN7fVt7x5vAQh38Ylm5fkz334Y2PkYHcs2KQjPxzZ3LVDPl02YRrXijP25jUZRRzxcZa99fpeHo2l+dSYwr4bfxgf7zzFxFPUBqLFzED4ebd/AePJ4r/5N//mw7LvD73oRS86fh3g+wtKg0Zf8dFXbdUtFofA8Kf+oelIivG685Kl62rtY3E9bsjE5FEFNob8hXPUcd5EoOtXZtldyZ/1x2uLVBvRFe5R/nwOC/0+RoynS1j0JcceDH2nwPXYN7OTr7DAoG0mm8ysHnn0i5wW7B07YeXfF4wbi1UezXBoi8f0s7vCUj9dMg66xdT12H/2XbxjO/2Vz1FuPB+x9Msm/bt2stkXte+xceYxmztYxnjYczQ3ZnZ8H6Win/49PNJR1Oa1O9HKzOfRMfkzYo9HbffmY5jYgONeLKCaI83TmR3rWethoT0Nj2xYV6xPxm+HA/E6zJGnmdds8O9wrqh3sMQFzuiK5VI+tpbijh969/IYZjwYu13s/GYDZtfKbPyLc1U/bp5WzGy0GwyD4BcEfgbqX698/dd//fGTVD959xPZ17/+9Q+f9Vmf9fC+973vsGw3XhJJKAseXZPVu2WJQabBncHh18GOg36T0rV3OGGb6Y+JbEPnXZif0mp35+MTP/ETH77lW77lsPPud797mWAw8se3+NR+qaXeKbB6R+G7VjZucDh2Cv5+9md/9sBMDzY8sr0q+hzx+N//+39/cj5yuMJClw/xGjdyNtAr+Us4wgwD7MbkniIWz1KBC6eud4o4ylUcWKxgWeUjDvTxVd2zgfg2nmOZ2dEGr2I+GEs2dvOIP9zLaTyyyf/M54hpPGdDTHCU0+altp1SPsKDPzziaKf4zqFNYA9vLcfCeLZlvLxglX9iMK93S3mNN3PSmuB8Bz+MCgzmpbG8J6fxaBzYM56u2dnJDTzaBPagTbjK19W46udLv9qc2skjPujSMR7GwXOebETL9YOgG/7AQsfaUg40xjeoHyKwiMFP9RtLuSJnbi1+eUmfnjGAyTis8lG/8TcH+YcdDzt5BBu89NnzkEzF68wO9nxmQ21c7yn3ad3j6XmqI3kljoSwWHvuhMTyXJRXvepVx3NNvu7rvu7Bs1q+6Iu+6PiVXQM4TnzPzZBcL37xi49k8O6C7UsTVSI5WqAkAf/sSuzaRz/nYWhCkjEp+PR8ol4ss8NW9s422uzRdW7DSPaS37MNOEwCBy7dpVPvJrbJxDf9Jirb4liVkUe6fHo+UdzrV+o729EOt3idG0c87D4Phh7fJrRFSS7wvcPBmUc2xGE8d0ofG+IBnjbX6lmBkx/+q42ffFTjpnxozpzt0HUoYsalRXKXR9zFWzzuchCPcBhLPGrzIrBTykc8Gl/8iX9nPGwA5a81BQbnxkTB7bl4E9c4kcO7ub3Lo7gbBzb8r1Dx7+ZjeW0s8FAMZ9yXrvGIt4/6qI865hoc7HU37JJufdZgfNm8yA8xxc8sJnMaVmNFTj6aF7s8sqOwwZaNsDHcwS52HIhZLstH+GfjX7yzOn3zkn92lZ18tJH2oE4YcMIGTA6YzkXutVnEJx1c3MOjcRODTTA7H/ZhH/Yk189+Z9f06XlskGLcYYJ9tzxunnYZO8kjHfkmlUQ2GL7f9MIXvvDhEz7hE45d/nd8x3ccd3E+/dM//dA2gBWJZzAlg4S0KEjkklHfrIw29JPT1i3hUWdlIx8wFwffJgBczumKbzYp8gFzOuw0oZuYyV2q446MOEw29Qr7ylYvGmGKp0t2ksm36/DQq38Vj9jJxJFz3KW3wnpuhzk78RivZ9nVNdwOL3zwWqSN7wr7yg4eYYEJB3AU30yH7MhVuYUHNpRk9M0K2bHATMexU8JOJx5xcikHzvbjUTscjeeODbphwQGbxkLZsUNWHPHj/NKYmjt8KcXNxi6PMJd/8SifdnKpmBv7YtiJXxxiUvhnAx7YdmOix4aabjzN8IhfrGRHvnd98qfAHeby4ui44Q//3lDbiME0js0N6k9E6LEVD+Kexf5EYXESJ/FIbGXL2PEZh/CT3eURf3TY6SGXuzwWDtz34sjG4+YpJp6itrkwCQ2sXbGPz37dr/t1x/eF3vzmNx8bq9e85jXHTp2bcacriUwog2kDprjWPibmNXjkvcMrKXvXKNGyNbMBc0ns3QAM/Juk9Nzq9mRhcZl4syIesi00rtlq0ZjpnNvS1c632NUtbmf51XV6+jtvws104qs+ssWiTRwOPDZOyY61PkXscBsL/ncKXf7V2cv3rXbikR0Y1LXdaiM5+gosMLFzbTz4q+ChPMQFXvE4yiQ71vyEm84ujzijBzd/Ciy9cI++VucjZ3RhGNtWeud2eiOPsGlrfM/ys2uxxAP9+FvxQlaJx3uxG3PYy8v8Vc+wnttGzqwhjeuOjWwaB/p08cD2zpjGIxtiUthyxGm+qukUv7YxnmSu1eVP8wj28vKabv2Nf2OivbZkbqnpi5eu8XB+bU6f7eKKPi4qYtO+4pFcuU/m/cXjzjwKqzo9cdxbHjdP9zI36JWIFhobBt9x8jgCyfmOd7zjSLQv+IIvOGpqTRx6JbKEOidgiT64+gWnY6KSVUqKcVHh51qSsAUXPbjF8T3f8z0PX/EVX/Hwpje96bjFurJB19Ei5ByOlfwvCOLZi1G2GOJmJr9q41vJhnNxjfZXumTw2CQnx553N4r+mR0y9Ph0WIxu9TliCbOFpYVJ28znqDeeF782GOjDtmODLjuN53h9yQ4d/dV8dxcEp8W3shF2tYO8YyU/xj2e08kWv4ox2bGTPt3O783HkUfnu3b4742IsTSuyiqekWe+lHt55KNcjsuV38PR6U/c0QmLth0bTNKhn70xxpPLi5dsZAeGjplSvvJN5h4e80l/tHUPB9lgx7FrA/7WKnPCuXKPnebUNRviD7fz/O/6fH/wyKcDBjUOw3OA3PjzuHnaIGsmingbDoubZPJlRHdr/PsVbf/+3//7hy/+4i9+8kTxVcIYROXcf74OQ/JdmxSSa9zRjzIrO/RHOddw20D5r9nvfe97j8/ayaxspK8fH653F5ls8J+fSz6L+1xn52yj65W8dro4hD07ceoat7Wf7YzX+aoe+66ds+9IN7/X9OoPX/rq0V5yt9bZyUbXK/3yj5yjTSAeldrCebajf+zLzlnu2nU26Cuuw3JNVz/ZNinmtVJu36J/likOOHax0A37LTySJxcHsOT/jOvSdVjVo77zW8uIJR7FMmK71RY59kbdXSzJZwOW2mY49I2cu74kP7ORr/qysWMnWWuT1xs2y4ns3lLTY6sxGGO7RZ/MiJ+9a1j4ys/oo5jGtmvnfFXSr679Uk12nBtdX9JZ9T1unlbM3NgumS2qvhTnDsU73/nO4/pTP/VTH37mZ37m4b/8l//y8LrXve54B25Dsvroq2Q2mA52lVnSae8WtmTinz49teJc0T8my9H47J980eHPdcmp1gazczK9mIw2nOsjM/p37bi1hDcMXa/iX9k965O7hMXdwvrpigW3Pm7qexZhaExmvsNbH5vp1XatNo580GUvm7t2+El3tHnN/9jvLsOIA4ZbYooj8g58hiX7KzvFrF/J/278fUzCRjad79hJtnxQF9sB7sY/I4+jjezfYoYsXSVu4nRmh0/tydIjP5O95J9PNhqHZHft0IPJuCj38ki38QzXDpZk4y576vqcV/I1XjufySYzq0d/+mHHR5vJmc6szXiYz9ase/TZZGOMSyyud2IqH+g5H8vMDqxjKZdnsqPc+Tzs6fPd+naWXV2HmW8HG8Wz0lm1P26eVsxsthsAGw2/mvNrDndvfvAHf/D41dfLXvayI2lXGyeu6BpYpaS6tMiMEy859tMtKdhzPiujjH5JKRmV8WM/NvOxsqOdnA3Wyt9MtzY6/PMjtntssGVhiUfXqw1ffme+jN3IY7KX6tHPyOMlnXNfMcfjJc7PuufrkcfsnmUuXYdB3YJzSX7WR8/C6YAnHNVnHe1jzE/LI/vGZbR59nntOh5WmK/p04OBHfHcYyce6bOjVM/8l4ujr+b1TH7VNuoXw0r2Wns8XJNb9dNvrpaPI76V3thODw+94GZzlBnPz/3vr3zE5S72cI3zurbdurGEIS53bMRj+XhtfpWPyeGf7m6Bt4OtznfswN5Bj417y+Pm6V7mntUzEJLDxsWv5WyU/ubf/JsPP/ZjP/bgEQX94s5Prk3+VdLQ9xNQdztsAMiqS7gzzNni6SfNJbSkGBfMmd+SiKy7Zu622Pz99E//9OFX/6tf/erj5+Luoo32RjywwEne97384s8L5kp+1O18xDs+k2bHBlviwGPfU+pdz6VJAv/Y7yfNtWlnQx1fYR5rMjaccgHXeHzPe94zilw9xyG/9GGQE853OWAHHs+DUbq+CmAQoNNPu4tNPq4KfmCHtdozmpyzpbSxJes4F23p90bAT4p3eWSHT2NhTjjP9tnn6tpYw24jLZ88o8j8mOFe2dDOdxjEL0fY3hlT64pfWtHv7o0aFhjPpfHih38+rT+7POIvW2Lg37ho2ylwxKOccpf+Xh5hwp0anh07vk7RL9bikS02ZnYaJ9j14/oeHss/c9mc9KgC67zrnQIr7stH+rs2xGFeeuxBbxLFuWPHozB8PcVYwuRQ2Jjlo37jVT6q7+GRDQUH1ld23HTI/9F55Q+M9Iy/GOiuxv+KqYfHzdM1hq70GwwDKGlseD78wz/8+LL4N3/zNz/86I/+6MOXfdmXHY8hkKgmUQlwNutXbu5YveAFLziSY9xEnWVdnxNGAlhMPBG8ZGiBgIvvc4HdwRYZEwoOz2mywHlCul8JetGAP3tnO/rF76Dn2Rvs9LHXWX52bULQgUNhQ5KPd8Bmeuc2YxGPTeSwnWVdi0l/nGkTj2fq8I83NZnV2OEQ/uywaXHwHJSdQo8tWCxQxlIb7m8t2SDPFh6VHRvkxSMf6Msr46BejSnM4pdL1fz/kl/yS454jGs89mJyABv+0OODb1yz6YVml8fu4orZL0XxCJcX/lsLeTjglgsO1/fwKK/xKK/wiJcdLHjBR8+2cY7LODrHFO645PMeHtmB2RsRuYBHPnc4ECscxjwe5dCODfHBUj7KcTjY9Ubt1gIDPRso4xsGbbOCY37lYfU9PMpHNnABOx6Mf2vdzPe5ja6xYKv1qbw4y166louKedk8hC0uLunWZ+NChw0FDrY6P06GP7CTgRvveHV+z7xmB4dqGLze5ntwuTwlC4P1mR3XxnbHRsbnWVPvY32VAYlhcWkgemfzAz/wA4euZztpkywmi0GfFQuKdwQmp+SSGNqcr4okMPFLTrWE5kOfhLikz0e46VhkvTtTOxR2LNom7eqF89wuXm3s31rgFDueeqd9T0Lz61ERNlDxCMeKB31xFY+4sChbUOjVvoplNg7eYZ55WenXzlf54V0d3pUV9vTOdfIw2IzDvzMW2YOlBZLNazbqjy/jVy5oG+PLx1jTx7k6W/Jwl0cvTOWOmj478TL6vHQeBnOssbgkv+pjR27jMgzZXumM7caBvhddJX5X46pd3N195eseHvkyD+jDYE7dw2PzA48w7Y4nHDCICQ+VVfz1n2s2+LeRjUPj4dB3Ltrq8wILv3m5i5/P5rUf4bAjF2Y+zxjGa3bciS0f1eXTKHfpnA2bH/PS2BqbsF3SG/t6urh8FEPcrLBo5wNvxex1BhYl/8ZESea4GP7EIzmvE+p75iU84vZpitJaMbi66fRx83QTTWuh3lEbEINuUJ555pmH7/u+73t46Utf+uQpqhad50ppErTAiGnnXdJzJc5HnI8MPDLwyMAjA48M3MPA/DbIPZY+hHXG3bsNh4/rvMPwkZ3deZuQNiUf7FS5HW4j6Db5f/7P//nYEIrxsTwy8MjAIwOPDDwy8MjAw8Pj5ukps6A7Tm492iS5lerZTv6pru8LabMRcWvzubIB6db8d3/3dx/f3/K4hW6tPiVdj+qPDDwy8MjAIwOPDDznGXjcPL0fhtDGYvzc9z/8h/9w/BNg/8RSscGyqXI8V4oNn7h8Ng3/vZ8LP1fifcT5yMAjA48MPDLwyMCtDDxunm5laiFnk6H0vSCbKD+194RxfTYePgZT3IV6LpTukMHvy7fPFdzPBW4fMT4y8MjAIwOPDDz3GXju3Ar5IOXaxsJdGcdP/dRPPfyFv/AXjl8xfPzHf/zxfJcz7DZb53Z2/JLCrzlswGxa+knmWdY1O/p9kdtmx0dtnlvheSzuGMEzboJmNrTZ3DnY8TNWP+H0qz94/KrCLxy0ve9971vefeKnu2rpw7aKdYaFbD/p7ZcYbN6zcfN9M8+bgsGvt9SrO2di59sRF/3aD4/a1Prjc4Y/Dsjy5xctMNxT+JQLfi0nfte3lmThkQ+Xxu2SzfJRDPIRj/3kfKYXh/zimo7n0circqMxIEP+XGDXh8N+dSefdnksZ/im780M2+zuFHbYaCzEdI8N+Whey2/zujGaYZn1mQ+49wsjNT7xRDZOR1tk+ugdz87v4ZH9xp6+GO55M1VO4FFO4OEeHsf1UUxxMcZ+6Zy+Nc78NLa4aUxneMrT8llO3sNjmPi0tvDvkS6zsUv2XMNKD3cw9Ay1cv0sv7oWr3xkTzziZmMW/8oG/w7zCkdxSJ7dc4HZ60g5S6Y1+iy7sjG248FYyk+4Zz5ndrXREa+5RBemndhHu4+bp5GNO84j3s8w3/72tx/Ha1/72mNQZuZWyT7+/NUAWxgcqwnWAloCSGB6Fnu1BBuTWtu50IVH8tFTnGtXv+IVr3h44xvf+OBfzbAHz6ywYTGDlR5ZybnCPrMBn4OO2NQm3Qz3TL+28bkvdGFhpxfw5KqLFe4RAz5MLLr66ItzNn7Jhl9NfsVXvs81LGyFxfjBMPN51u2aLN9ssOfAAUw7ZfxZMZtiucSj8eKrBVKtTV6kf41HuOk52HKt3uWRX0XMOIy/HTt0wq+GHY/qndLPscMDA9srO+I9F20w0GtO0HeNq3MhL/bipSuvuj7Lr67xz0488jXaXemN7eRh5f/9zSMucLBTxBSPeIpHeXIucrc5aOzFcA+POCj2+GC7Zy6d/a6u4YY33OXSSn7WDj87HfA4n8U/069NPPLBOk9fPNlKprp8JKvYtDXXkxlr9laFLf3xKB4/bLq18EtHvCOX7O2Wx83TLmMTeYNnInhXJkE+4zM+4+FjP/ZjJ5LrJoPnTsFHfuRHHolRwhngVSmB6jeZXvjCFx6TS4LRvaSfXrU4LBIePMa2CeJ7W84lm6SbFb7C6x1J3/WayV5q46cF0QPUzvFd0h378EgfLjGEb5S5dG5R6IGAuxjIGwf54O7jThlxGou43xnD/MFgzPBgbHaLOOLReYvWri3P1OluS3Fc43TsdwfvHh7LfeNgTrnexR5n3iV/xEd8xF35KBZ3GWAwHr2IZvuWGnabWfNyzJGV7shfMvfwyI654AVHPuHAWO6W8LiT/ct+2S874igXbrXFhgfHtj7Shw2ftxZPiffCjUf6OxjydQ+PIz456NlEPY9v7Lt2DoNcNBYvetGLtvBnWw6yY33rGV713Vr/z//5Pw/e78FQTlnf7nmNNGbmgLteag/B3RnHYvQ6ZX3L3j029lfVvD/WTxjw7tLGQlIrL3/5y4+BNbjn44nS6YRcG4dT1/KSjmIySEovFLO7DMmdDWmn66hIIgtS7yS0s20BvVSaFPl3vVPI8w3LvTb4o28cxHbLhCDHt8O5g34Y2CyW6nNcFiQ6+vm0QI6cnuVX13TZYGs3F842YWKDvRXus854HQ9q5ZqN5MRNtnGAo75rWOiQH8s9POZHzV6YRrvXzukq6qcZi3gYObjkm9zsSCdc7GazvurG3XXyK9l0ZnW6avPhPDYznVUbvHDdW0Ye4XHcMr9Hf8WTXnGtuOHTMfpayY5+zuf0O/DY+nSWu+XaGHiDHq5bdEYZsY9zgp3dIhalGicdM1utjXFnfaSbzrme2Rj9ORfDPTyKly6fcVg+rPyu2i+/Iq60HtufMCAJbFocBsQ7Kx9zrUoJd+63YemobyWr34A36GNt09P1aGdma/ZOXAzJsuOdjqf6StTVnafw2GCJIf3831LzSxcmdvgesdxig0w21AosHZds8Bdu/uNRW9iyd7Zz3ljmL3tn+dV141b85EZcK71zOx3xd8C/W3Z5DHs1f/FoTBtLduPnjEnfubTAndsvXY92+IqPnfFIL90W/B0bMOKAroOt9KsvxTH2JV99icfx7hDe+VbSHe1eOg9zY3qPHT7pwdu47OKAceQxzHIjbLVdqvnNd7isaWP7qB9ebXzdEz/dfDmPC/GEZfS5OicrVgdc9O+d12zA4cjGDpZioput2mZ2rKX13+JvZiN9NdzxgIuV/OH09Cc9NpR0te+Wx83TLmMneaQ73AI1IG5lurXc4JzEnyTruZ0N70pM0jEhGtyZfD7CQJa+icUWOw79MztktbNDTiHr3Lsbtzbd6vYvZizIJf4ZS9fs9S6DzZnPZFe1dwXjO9RdGyOP8cPXyk7ckem8dzXn76us7LBNB+9suMbhyucqdvJhxnU2V/Kzdv6VeAxD9Uxn1sbOOR+LbSYf7rGOx/NGdKavjX05pMRf9Upn1i7WeGDPwc695Wnykc94HPlbjUf8jVhH2Ww0F4tzlIe3DRR76Yx2RvlL5/zQj0ey99p5f/AIj5hgKK5L+Me+cMeZmNhb5QY5Ocxf40I+O6Pta+fhbU643rVDHmY8yqndDRiMbNCHw3lc7GCJg3RdZ7u2kQ+Y2+w1n/mL01HWefbO7a7DzCYOapvJztoa8zHeGeaZ7rntcfN0ZuTZATIw5zstM5INgoWKvMT43b/7dx8DPA7O6GJmo34vMk3kkqS+cy3BJJ+azW5hpi9ZTZCSdZao9Epq/nyvgj16YvK8KvH8x//4Hx8+8zM/88lEO2NxXcKzF4aZ3KW2YsK7JJ9hvqRfH/90xRePK97rbzFqcvXio18bmytMbBs7vPHrexXaVj7DOavzVe7dY6PcLQZ+7rFjLCvX9OORvHMYGgNtrnFUvmZ3rOnRKZdwoVzzPdpwXh6p8Wg8Rnxn+dk1ef759saoeODbKWFgr7lIfxUTuXNhY9zIp7vC0npk/MiWl+md7a+uYcmH2nd1VnNgZQP2YjIOrh27awSd8idMI58r/+d2Nirs4GbM8/qq80HWG0r5dA+P7OGBL2N5jw368LNx7xrJL3053bho28UzxkD3Eo/82bDBzicu6eQ/rqtXWOiZh+UOu8pKPntjTZe8gy2lNXeUu+V8byW4xeLzQKYFwmCNgz0LrX4/wZWQv+23/bYjSWayl9pMTANqkTCoLTKXdPSNCdiE0s5WSbayUfKwMfotKdXs4OFSoUsGb2yO7zAv6Y19+WEj7CbkbsEjLDaTyq085gcX4oZDCUv9s5psWOMx/Zn8qq1c0g+/g/+dAoc8UNPt2LGRf7rGs/bAlosAACAASURBVPwQ26qMfeQV+RcP5eKlePhKnr4YRrsr3+f2/NPHYXPrLHftGha5FKeXsK9sseHwsX5ld37wm06xZTebY01Gv4K/p+GR73iEYZcD/ungsWPEeut58T4Nj3zJB/HgyAFfnJ6xxF3t9/JIL95aH9neLdalERM+7ynw4FHcbJRbt9qiZzzEopQjK32Yi5fuvTzyaW1T2CvHV35X7fA6bOblQ693K/lV+8+/tVxJfAi2I9MgGyDJ9d73vvfhDW94w3SwyHlh8IwnA/Kt3/qtT/R2qGPHM0D8EkRSSpL8r+zwJ4F6kfI8GPpK+HshnU00ut4NSCD9dPyaJBvvfve7j8T6xm/8xuNXW5eSNX8jBvh2CvvwwtB/Hb/HBn2/8sILXCbrpQky8kjWM0T8GuVWHsm1ODhnr7E8jNz4Jw5h9YsW/xfxEu6VWf4tiBZI31djd5dH8RjLMLDhmOURHKMP5/T9msV/b+9OiPHQvsJSn36HfPCmxC9qdgo9vKnlwgte8IJDfYV9Zpt/8wJ2+SAf7ylhwKPcjpsdLPx7p+9gr/keT2dcbBv//OnHo+9j7pT3F49w+KWdX1iVT+bZTnl/8Wi9Gx8LU4wzLPiVkwpO5YOvMrQ+znRmbWzQN/bGUk6NGGY6s7bGVU7/y3/5L4/xhX+niEkuyGd5xKai/dbiV4/ekFhjFXbkW3eWznbY9ppmTjbH78lHduPSOODT3FbvFJzJv0/+5E9+eNnLXvYE244Nsv/P//k//2fP866H56D8OKEM1vd+7/c+/IE/8AemO3T9ksIDDS1ufhouMUyQnSLxJCRbEtGuWMJJzFmRMJKymgzc7EgMuPSxN8qMtui3KPBDTk2XDX0WPi/CfXQx6o/n5MlmUwwr7KNe53wqOLDI+lk0mzDtFJjx0KJAt4m7shOP+uGgb/xu5TGf9NkSNxu7Jd/GkE22YFffWsjCbcwscv7Hoi/9j3zcYksM7OQ7u6sxnY2TNvmnFAc72TzjgBEH9JyP12fZS9e4ZyMeye7mIx3Y5aIXK48AuacUC1s4gA2unfzASTwaE7zEIfvnQrZ49fcO+yx37RpGfoy5A478X9OtX8zWRfloM/4xH/Mxx6Mbiie5a/X7m8diu8RjMYs7zuGYcX4JP93WdjbvyWs+cWbzJSdthF3DtlP4Zkvcxkax1nV+qy15YFzFJZ9tLK3/Mzwjj+y7jv9b/ZELs7idiyMud+zQwaE3dt/5nd/58Gmf9mmHvR0bZB/vPE0Ya2JLEOWVr3zlsYGSHOciESwMf/Ev/sXjbsM3fdM3HQNqgHZKi6laInpn0jvfmZ3zBJZMJdSYwNqU6tGWCQOnuoS20Do3KcQrwbxrdB7G0YZz+i0wJbNrtm4tOLfgu8v1wz/8ww+vf/3rDw5g2SlN5sau+Ez0WWkhwQ/M5+t04q+6dvUYv2syjl3sxjse03U9y7vR/3ievHemOHzzm998LLLl9Ch76dxYtCiSgwenqzcF/I5F/M0BnM7ydZR3zv4oR3+0c5ZfXcPOjpjHfBTPrUU85N/2trc9fOVXfuXxTt93fhqXW+0YUzpxwC5Mu2Nq7sVN+cWO41xaQ/jgzzzE7S52cwmHcSmWXex0+X/Xu9718Dt/5+98eNOb3nRsRM/5co7hfP3/B4/mdSXO78lH3DsaLzbEv5sD9L/+67/++BTkX/yLf3G8UWdrp8BBp3xy3jy51Y4xHdcH49v1LB/5VMYxJ7e7JskBeOmyVew7dmCn923f9m0Pf+Wv/JXjNfvWuM9yj5unMyPPDjKSLTYGyfnHfdzHTST/v4QgZ6F1d8aDDXcXqdEwXxJ7JyHO+q5LrLFvds4XWZjHCV67Ph/9qJsYMCrqs5/6zu0z3+c2Om4nW7Q87mGcIGfZ1TXcYhlxzHCu9Gsf9Wv7v1nfgzl8eLT5xoU7T/fwSMd47/CwIxvWD+ZaPD4y9C5VPpb/92Aex3M8v9XWLrf3+LiEhT3HvRyY015gP+VTPuXYgN+zPsA3xjWeX8I+9tFR7vU/2rrn/B7M+aHrzay7Ty95yUuefBxd/601O457x5Kf1od87sS1I5t99ag3no8yt5zT9XGffLTxuzcXfvHbllu8P89lkFliVa9Crl8y2Xzcu+nJPt9PY4P+rclgQePLiyz8JaTJaQMiNraKTX8y4XU9lh3/o17n+XR9axzpqtu4jjjusTPqj/b/b53fg3nEhsfz2Iz9187L6x0edmSv+f9g6Tc3cKF+mjEZdcfzW+Pc5fYeH5ewsFdOXJKb9dH1QmWtGe/mzGSvtY1xjefX9Oqnc49e+k9bP43v+C8f78UCQ7butXHW34lrR3bEN+qN56PMLedezyrO77X1uHmKxQ/Buk1aGyW3kS1yvtSpeMftBZicPi8gvSBLuHuT7kOQ6seQHxl4ZOCRgUcGnkcMPH5s9zwazN1QbH666/Sv/tW/eviJn/iJh9/7e3/vky9r++jHrwjf8pa3HP+H6PM///MfN0y7JD/KPzLwyMAjA48MPO8YeNw8Pe+G9PaAunPk1uVXfdVXPbzjHe94eM1rXnN8EdFnwe985zsfvvRLv/T4tdZ3fdd3HR+JpXO7l0fJRwYeGXhk4JGBRwaeXww8bp6eX+O5HY3NkI/nPMvKs416zpQvwNtQ+bXRP//n//z4z/Z9ZMeJ8/F62/GjwiMDjww8MvDIwCMDz1EGHr/z9H4YOD+h9GXxNhPV7wfTH1AT7jjB/swzzxy/4Hj5y19+/ArhB37gBx5e8YpXPHhI5lvf+taHV7/61U9iA+gDsXGKs//9v//3Yb+ft35ACXgeGv9/27sPaKuqow/gx09NtySxRSOiGDuisYMFNbbYG7H3EmvsBYxKYiPWFU0wJooVbNiNXaxYkYgtsTfsFUvs51u/0cEr6/HwUQK8u2etc8+5u+//nr1nzuxycjGkdWw5JdsOqznBq4Qfc1objhY6F55sO+zZr72MFQzbjl/GSBzxIL70P90yTLmPGQF92WL33LjQKLfHHPubIaY87LDDDv+mU/nXFgQwsAXVLttwHbg1Liv425L3uIbFRMp96623xmFhzr2wxqlHjx5xANqAAQPim3bCjTpd539e41oO8eEoH0LfsRBdunQZuXNufKTfTGnAEo622S+11FKTDT9OSm2U/A5HR3Usu+yywZ/pPimVdVIuC7wILMsAKFBwNOYUHNvWaomjMdLxI8svv3zBsW0QRmj4pZwxPjIS5AaptiZXThhvK2KjhG/U/ilNGmZyGRjsrHPo4SGHHFIdf/zx8RFgp6m/8MIL1f77718dccQR8bZt4EvlZpTqj9e/Btm0mEjYc6G2IaCdkv/gSVB5uypYjh2OsGSdJfgLjm3DMEMnH3rbz4M7k0czTLmPGQE4wo2cKTiOGa/RhXD4K7mX8m9sjR1l2m50CH9Ld8yMqV3IADu5EKUImZ7DUHbV7bzzznH0f9++fatHH300LFD/K6FB8CsHIvQLtR0B/OjSZvB0+j2FvlDbEMgBVb+Go/+Fxg4B+KEcI/P/2KXWvLHg5io4jj0PwM7XJtz1affEs62pllG1rYiNEl4DeAtwEVre8CeXgVZ5kW/x+cjj9ttvX+25555Vr1694pMspvOQOk1opRADwxBj5+A6ofOMyrXDH7i5KKDF4jR2DQw3fAhHfFkU0LHDUazszwXDsccwcTRmFxzHHseUecZG/ZrcGdsxskzbjX07REwDgysbhWPj8zgmP0GjK6fTxH164oQTTqjWWGONyve7TFOYtrNwnALlszMIs00ogqFBwb1R+SwDRdsQhx/StnA0MBggCo5tw1HoVECzf+e97Sk1bwyY4b3GPj25jI+TUqsVHMdPa8ARL+LBfEEa25SL5akNyCXoOYiaM81GMECY008hxV04gsuzq3EAaUO2Eyyo8jgYU7ktnJt++umjzKw/Rx55ZFgujjrqqKiTNR/qQKBkfRRs1Dqmf+5mGLXwiQd3+Qvvnrh5Fhdjc8s8hRdWfoW+xA6WeBDBLfkxcUu/Rsyy7Rrdmh1POMLDZdo4eRQfJl6O80hc0x3m/AuWX3IQ3LL/c2nEBlYop+X5Jb/Cz3/xC1UjcYEJPEeMGBG8l3zHPcdLz152M6x7Yt3MWOIpO7ezj/q4Pf6CG9kCJ2FgmvyXuHHLr2u0hmFRnlpDZzR+ybhAx9xJLDMsOdwbG4p/NkyGnRTu6mG900wzzRRnPCkTxnr//fdjh9HCCy9cnX322dXTTz89srhZNw7qLg1uSblWSTotEXfxMKhnmOn8iY8B1WI+a3WSsYXjL5/EvqW0m80N1rDCa7DxnMIfXk6ITwUK5gYMYeGNGtut2bDL+sIAjvjK5cXBfzgmTrBkfTWgGoS9SHjGnyh5N9Nsxju84KavwpTgcvn/7rvvBlbwxZNw45eLdhPn0re/5BxjYvKUZ7s9kWfYpoIEN4qVtavwT34sOH7ZJ31EGf+RZz44jz9hlHILjvqyMVK/FtZz9vdsg9H157Iqd3TItOAObOAnEwMe4Kw3tvgbEOaee+5qvvnmi69fY2LMntekxtQEwMMPPxzb2dUDU6HsvHvssUd1yy23xPQdoeLCZLZ2mt57/vnnQ+nCmOqIpNE4iIZjw49wOr2BE5ae77zzzjieoFOnTjEQpD+lbfDgwRFujjnmqJZeeulg9myDhmSb8hGWb775ZpwEDyu4w2jeeeeNQUA74rkXX3wxcDTAzj777NWSSy4ZAzIcxSlUBV87EFZ/6NChQ7XooosGVgZTOCJ8effdd1evvvpq9AXHQMw666wFvqoaqbgnVgQXnOze9Vkn40L2W8LM1wzwpTEFjl7gxG12foQRuXL//fcHL+I5mOjrxkxfgICT8Vp/xrPDhw8PpVS/tv0+/ZuZMY17+i7syKzrrrsu1vaSMd26dQs8yXP+wiU/UkQXX3zxGAPGiN8XX3xRl2vMGHz++ec1+vTTT2vP7mjgwIH11FNPTXOop5pqqrgfeOCB4efnk08+iecMPylhrWAfffRR/eGHH0YZ857lzjoLs8QSS9TLL798vdxyy9Urr7xyvcsuu8T/ZZZZpn777bcDD3UV9rPPPov0Wqprpvnf//43wpxxxhmBmfv7778fbsI89dRT9QILLBCYTjnllIHx9ttvX//nP/8Zbdot5dee3W699dZ6zTXX/AbvTTfddPWZZ54ZGGnPJ554op5//vnr73znO/UUU0wReG666ab1v//979Lvvxr7YLTNNtvU//d//1d/97vfrX/4wx8G73FHyc+bb755YK2v48kZZpih7tu3b/B+e+azb1O37NfwMta99957tf6qDyP9nTssN9tss8Aajnjypz/9aX3SSSfFWPlt8mrvYeC1zjrrjJQrcHJ16NAh+vPHH38cmMIXfsmPM844Y8Hxqz5NDqFnnnmmXmyxxQKj73//+3Hfdttt6xEjRtTvvPNOhNl6663D/Qc/+EHc8WPv3r3HOD4yUY0xUAnzJUaQNkhQEmCCevToUXfs2DGY9rbbbqu32mqreu655x7ZMKk0GTwy3qSC51tvvRV18KNDGthcH3zwQbin0FDu7t2710sttVQMgoTGBhtsEIrSTDPNVD/yyCOBC2xyEBW3pXryT+wuv/zy+he/+EUw7IUXXjhSiZP5vvvuW88222z1pZdeWt91112Bq0Hi0EMPjTxaSrvZ3JZeeunA7oADDqiHDRtWw3PRRReNwUKbIH6zzjprfcEFF9R33nlnCDQ47rPPPuHfbJi1VN/9998/cNxuu+3qoUOH1meddVYIqr322iswwv8UqZlnnrk+6KCD6iuvvDIU1BRoL7/8cou83lJe7dkNWCnY+/TpE4J9kUUW+cZL0aOPPloT8onj6aefHtjPPvvs9fDhw5seR+Pm66+/HkrnHnvsUQ8ZMqR+8MEHR96DIes6Xn4oU3DU7/v16xc4GjNfeOGFpsdRP0N77rlnPcccc9T9+/ev77333nr33XcPnAYNGhT+sMaP3G+44YbAkUJK0aJ4tdZfi/LUBuUR2pg7FaLnn3++nmuuuerBgweHG/dXX3217ty5c00ZMOimApIWmdYa43/tl4pMljHfDNPdf88Uv65du9bHHXdcDI6E9sknnxz186yDo6yj50xj1Dpx91a6995716xWq6++erzFn3POOcGo8nz66afraaaZpj7hhBMiPxYUTE4pxehFWH0Rlrl55pknlNhUzOF+zTXXxOBA+TSIwpEgE4ZlD44LLrhgPf3009f4d9T2abb/r732Wr344ouHwuk5ra8EV6dOnYLX8Oyuu+4avIrH/feCcfTRR4dFj/BqNtxaqq9xBJ9ddtll9ZxzzllvueWW9cILLxxjI6VK395vv/3qlVZaKcLhV3ifeOKJgSMrfkvpNpMbDG+66aawEA8YMCDG1Mb650vuwQcfHDimhQXup5xySsQjexrjNOMzHCmUP/rRj2oKOt5zkc/rrbdefdppp4VsPuKII+pu3bqNVPDhKd60005bn3vuua3iWBaMj3Fi85sBcp7Uwtunnnoq1pSYs8+5enP31jxddNFF35h7Ng8t7qREWZ5cm2Ue3TP3vMy1K7vFc+oojHn4XIBnLQM3lOnk8+jqao7eWh0Hcf7+97+POX7pyFMecDVP3blz5/Az12+Nlfl+Z1KJ3+zkEzZDhw6NBf3w0U54Ek7IAmfroCy8t37HOgpuzvNyJMU777xTcKyqWL+X6/qs5bMGxyLchx56KHCyWNcaHWsmHOlhTQQ+1ye22267eHaYbDORvorXjAkuvKfvWhiOF3v27FmdddZZcWYcXPRp4YW5+uqrKxtRhEu/TTfdNPh22LBhzQRji3XFWwMHDoydz/DycXZjJB5FsDbenn/++SP5kbt4W2yxRax5sn6n2QkeMNN3V1tttapfv37VAQccEGvwyOZtttkmcPTRe59VywOjxVt//fVjnBwyZEirMBblqVV4vulpoMDQBgJMTAGwewTgBpQkAzDhxC0HGPFckwspt3rpqBhwttlmi6Jz/9nPfha7jdTvJz/5SQjmxEYcBKPRkQXNxx13XAyi0rbwkXDPeP5LhyIgXcQ/y0C4NTvBxZW7l+BDUTr11FPj+2G+T2ghpDai6Da2i/ZDsG92wt8uOD744IOxmN4Hsinpu+yySyhTsLO4eYYZZohFzzCjEIhD4dLXm4nglS9SnhE+0y8pQt27dw8ehKFx0iJoY6KXLp9+opDiXe7iU+pnnHHGiN9MOLZUV5jYAU22nHTSSdWTTz5ZEeI77rhjfP0hd3xSVBtxpMxTSL0clX5dxeYtL5c2Lmy55ZahbOK9Qw89tFpxxRWrZ599NnbGe0mHGcKT+NpYyo0cao3KVpvW0BnFj0KASRGQgW1gNUAk8Py4GUxGJfFzsBnVb1L6n4pelpfw1ZEJD/Xv379/CGRlprmrEwwalcN0G7VeGUaaBgoDQCpOwoonTOJJITC4+p/lklezEwwMDNrIs0H1mGOOiV063qwWXHDBEFTJbwRX4ox3U5lqdhz1U3ggOxH/9Kc/hRJ6yimnVJtvvnl1xhlnVHZ6wguWiafwhJVrTINse8NYP8R3ruQlz9tuu2312GOPVXfccUcoShQmfTzHTMo8HDNO9nPhXPybnYxzLCV2zrFs+ggw8ukslnd+q6yySmAPS1fKGjjDMf83M5ZwwF8Uya5du8Z3WuHxxBNPxEv7OeecUx100EHR17njSdgjffrb4FiUp4Dr2/0kuBoFGUgxqv8EU/obSBJ85sAM/+1ymfih1EmnzHKr189//vMYCAlqig8Szts3EibDh0MrP+LBRRwDpqtRIZJ3ppmCzX8KgnDp30oW7d6rES/85s10wIAB1dFHH10ttNBCUX848dMu2Tbc4J+82u6BGkMF8Vdiw4rKaoJYkzbbbLPKIHvYYYdF/6bIww2Gye+U0lQOxpBVu/HGe4mZSuEn05qm3WDVsWPHEEaEEGxYUYyHcEvsxGtMA7aNfb3dgNXGihgXTS859gZmb7zxRghz1tBZZpll5AtRyhfJN+JWcPwScEqTsY+MXn311cNRn6aM+m9JA/7zAgprhDeT4Nj4opTujfevQze6lucWEQCuNymgu3tT9db51ltvRXiDioHEYGF9RAq4vDc2TosZTCKOOqOyYj6Ugxz3rEsK5axzYzjPY3qLTOFN+Mgr04Ufk6lB96WXXgoli5v8vNUKy1rV7KQtdPDnnnsuzNKPP/54rH/aa6+9AnuYOfNF273yyiuBJ16FMxyRE+WbnQyy3uqdR4RSkfe2amC96667wvLJ+uQAXHybChQcCTd+zUb6oT7qjq9MkcCnT58+cWab8+5YSrzps6KYOvGiZVzUr/XnxNHZWnjU+VrNTvo0LE0xIWMdPoQ1Yc6fJX6eeeYJ3oOhPq2fO2vQ2Vrl7LEqMEsl3ss+BckdVpYtwJGiih89p4yBOZ59+eWXI1xr/FiUp9bQGcWPwErlCTNbiOu/OeocCAwgFjwvscQS8eYgCQOywcI1OVAyk85KuVFHdfCsk2JAzObZlcqWunFHo9PaxU0lzHMqThnPf0qptSTeZLlLy1sDAcc6MNdcc00OME7wMhLshDyL3D333FNtuOGGga1BAW4GD2+rwvkPd4r+9ddfHwNHTglM8IJOwhkQ5IS8tTq5dglPezOlWHXp0iX6rSkUBxKmhVlf9t1H/YKi0EyUfdY4AQfCfeutt45x8IYbbqguv/zysIJa7Mxi7b/PPcEVj1IOcmyBm4W9sLcWstmJMs7KtNFGG4XAJ2dgbI2OjTKEPZ5jPfnXv/71jfHz9ttvj7V6FKtmJ/JYn4bVTTfdFAonfrXG6aqrrgoFn1xbYYUVgh+NjeJwGzRoUChPsG6VmnEb49jWOc8wya39zklymNkss8wS5xE5F8I5T7Y4j20ezRDPFmUYOsrh5ptvjq31zuFI4r7DDjuMPAbijTfeiHOfHEzYs2fP2ObcDDi1VkfHDjhywHkkzsKyDdc5OY5xePPNN+PgUhjvuOOOcWbRLbfcUr/00kuBn007tozblttaHs3g57C8VVddNXjwqKOOiq3zDzzwQL3KKqvEduX77rsv+NS5WbA+5JBDAuc8EsKZZ/izGbBqrY45JurDOU7efvvtcQwEPnM54sFZY7aP9+rVK/jx2muvDextDXdURGt5NIOfIwecHaiPOgrDWIj31l133ThnzFZ75JgRmOFHR5LceOONEcdBjy+++GLT44hXHKhMPjsk2PE3DsU89thjAydntSFnPzlYGD8K46wncsZhuc8991yrOE4hk1a1q+I5EgFarHl8b/Heorw9+bTI4YcfHtYm5mtWk5133jkWT46MWB5GIsDa5EI0fVr+7rvvXvXu3TveFLjB1i4TOyO8TSEWJ28SzP/Mrt5+m5lYPazJwXPe/GHKAsWkz2Jip5j1J3A89thjw9oEMxa9jTfeOCwFrAKwbmaCm+mOSy65pDrvvPNiuz0Mbafff//941MN+rm+f/zxx0cY1mUWKNNRLC6sAM3Oj3DES2kpdr/xxhtjDd5tt90W/MmCIgx+hDUcWVZY6RNHWDczJT+aSj733HOr1157LazE+LFXr17BczAU7oQTTqjOPPPM2KXIzUzIDjvsUK266qqBazPjSI7gJX3bJhByhuXJlOb2228fxzrow+S5zVB///vfgx9ZoHyeJflRmNFRUZ5Gh0wL7hjWpVGY9zSQzm/gJLhMa1lHkgpAC0kUp6/OKoGf6SVk3Y7pJTjCk6DiZ7BNXM1X80MUhowbDk34gw/Ny1s46tnaCPwHM/P71o3BE69yM3DgS7gldtwMHs1MeAmGCN8R6DCzdR7hP/4wNLAiW/ApWLlZAu7JmxGgSX9SeUqcwGCa2IsPXiOIKFXuwpqigmHB8WuGSaHPBVbwg1euT+TWiK9weJZbnvGGV4syX4ec0C9deA22eBFWnmGk76aCZK2ysLkhiowaFeuvW6qqivLUiEYrzxgSEVQAzYGCWyPARSC1AuJXXjBMxiSoklJp8j+FlsEC1i7kPwbP/xm32e4wzAHSMzzc0z2Ve2Fc+NcgkYOFwaNxoG42/Brri+9gkUIcdvBMrIT1P91T+eROUYVr4xjQmHazPCffJQ/CNBV7vKefN/JbKgHCw1Z4fNrsOCZPwYSCjuCG92DmZSfHTLgKBzdh3Mkf42OGaRb+a6mesEk+a/TXrxt5De/hu+RRfuQPHFvjx+ae+2hEdAzPCTZAdXgEWEybA4aGahxYx5BkU3ondgQO5s7/BgLYYWQ45tsAhoazcNkGwhb6UpHHf/CCD1z8R7CCXSNu6Z7YJfb5v1nveI3iBEcY6uNw5AajFET4M5+FRUVx+pprkp/wXmIIx8b+Kkwq9mKmH1zFaXaCDz7De7BxwbNRmUoM3V0o76kENDuOcIMJPBLHHCvxGUwpmnhRH85xM+/CiNsaFeWpNXQa/DAvwZ5vn+ml02sEDQRs/q5Co0cgOzpGhat7uhk44Ii5k5HTT9i8Rp96c/gQ3rCAEx70jBKz9MuBQTg8muFgWoTVl8K7caDVx03lwS3f4rnBWL/GmzBOnGGYz83BeS3XspGvEqfsw7DEr4khvODIDR/m/4Ljl9jiqeyr7vgQhvgQwVcYmMMUwRGeGTccm/gHLvhJX84xksWJO9zgxTKaPJo4wps1+dvgWKbtmpjBStULAgWB9ocAwYBSSBAalJUUEO2pxllXgjIFpvoRikmNynG6lXtBYFwR+JrDxjWlEr8gUBAoCBQEJjoCFAdKhV2XyDqZtAxN9MKN5wKwwqRlgZKUloS0IKp3WrJT0RrPRSjJNSkCxfLUpA1fql0QKAi0TwQoERSGRspps0a39vDcWFfPjdY1dW7EoShP7aHFJ506FOVp0mmLUpKCQEGgIDBeEEhFwd2UFgtMo2IxXjKZBBJRP5e6uVOg3NPi5Fn9c1qvvVrgJoGmaLoilGm7pmvy5kqHEwAAFKFJREFUUuGCQEGgPSNAQcjF2JQKi18b1wC1p7qnUmiajqLE0uSe9aVMUZxygXV7qnupy8RFoChPExf/kntBoCBQEBivCDjsz6nKv/71ryvfmqNIUSDaK1GQKFGuK664otpmm23ipG0fG6ZMpVWqvda/1GviIFCUp4mDe8m1iRHwIelOnTrFB2V9VJawIwBSCNheS9jl23QKPkIQWSTLzRu2izvBgTINzyk0hUnynHEzPW4+MqpMPqkxahj/pSuey7MyIP+Vk5tdXe5Jni+77LLq97//ffgJizL9/O/OTR3Ecc86Cn///fdX3bp1iy3byixsY9nTLcvpf5bLXZqNlzR9EmjOOeeMr9PDP9MTPi/l8OzDyj4h4uO1WXZp8MuySp8fDDJ+1pW7cC7PmYY6Cu8jxEsvvXQI/EzDXZmuu+66as0116x8xNnndH7zm99UDz74YKSV+chb2CyLz0VxO+KII6o999wzFAplQfKzFVtYYbLNMq0sX0t4cMtwyp75SfeBBx6oZptttsgz/YSVHsr85OkD3z5jdfbZZ0d6jf7iIvHEz+csl3TSzbMwlCOWpkceeaTq379/9dvf/jbw9JmsUftQRC4/BYHxgEBRnsYDiCWJgkBbEHCWFSFx2mmnVQMHDhz5yYAUDPm5EGe7EAopjPKZu7D+ZxwKF0HIDXEnVAirpBSaBEqef0IgOkemS5cuVb9+/eKL7tJIgSRv//MNXh6e89wZ4fIiyPhleX02Yquttqr+9re/RdmyXCnwxMvnLLf/Lunn80ILLVSdeuqpcXCgOOrmUh/xclqKgJU/SmXCM7e80v2ggw6q/vznP0fdUylKzDJ9ceV3yy23hOLisw3yUy55NT5LH6bZtuK9++67UZaWfsRVxxEjRlS77rprde+9944suzSU88UXX4zvF2rDCy64IHiFm+87PvvssyNxlzcMkGdKk+8aInWh1HD3LG3fQvRpH2X0n5/yyNPdJax6qpNwnt1dWXbl8l9YcaXJ2uM/EkcY/ICyDNIcPnx41F2YzEu4rIfw+JRflol/8hb8M4zToJVjwQUXrE455ZRq+eWXj7xmmmmmOCman3JknIhYfgoC44jAN7dkjGNiJXpBoCAwZgRSoKy88soROIWureXPP/98CDsf8E0hRMhSFHyugQBIgUPo++YVN2EIGX6vvvpqKAWEJnckDKFJyBE2hBBlQJryJbS6du0a98yLe34igtD2UU2KnbjSswXeMyVJvtJmHSGsUApl35PK725JUzkIRsqF/3PNNVcIN/Gk60L+p/D0YVTpw0qZpO3+zDPPVDPPPPPI08Apd+K58xeepc+3/3xQWpm5sXw4xVlYbtKTr/rAkbs6eZbH+uuvH2XyIxx3pHywU588FVp6FNL8zuXIiA0P4vn4KwXaR56l5/tbScozbNiwwHafffapFltssfDacccdw0Llg+QwxQNI/uqsXr5rqOw+rD3vvPNW8803X9QL3ynbe++9F1j4TwmDU34LEcZpCaV88EtMlJGy58JX8scP2hDxp4ylApR3fjCnXGkr2IonfuIujfymmHDydSHfElQufCOOuqYbd+VDHTp0CMzhedRRR1V//OMf40PYwqtrY3kiQvkpCIwDAsXyNA7glagFgbFBgCAhfAg+QsPHP7fddtuYGlpppZUqisLaa68d0zOEoK/Sr7baatU555wTgkeeFIJ11lmnMkWDCK577rmnWnfddasVVlghvrAuHf6p3AwePDji/PKXvwx/Xw8/5phjohxPPvlk1b179+r2228PoXXIIYdUPXv2rDbffPOYzhOHAL/88stDYSAAWapMN5lS80V3ypf/1157bQi0Aw88MASttE09UcoIwNNPP71accUVq86dO0dZlffqq68OpYTwVZckiooPR6+33nrhROj6Urr0THnK2116cCIg77jjjmqDDTaojj766Ii3xhprRF5bbLFFKKcUCAKXskH4prLmLj6BjpSD4DWttuGGG460XohHGCNKkqk15U4hLk111V6jI8K/T58+oeSwKqUS5k65lbep1BlmmKFaaqmlopzyWnbZZSOOdpAHRYgSqpwZF38p43nnnRfYbLfddhFHvZ944olqrbXWijVRPXr0iPS0w2677RYWNmG1I2sf65x08SDl2Zfml1lmmWjjJZdcssKr6qhNlVc42MEGBu4ULVYwLwp4Q7zzzz8/cFNP5ZTGJptsEsreAgssELykza6//vqqd+/eUR68yqJEMYI1LLwkqL8+pJzwd+F7cfH+oEGDApdU0kbXHsW9INBmBL744ou6XAWDwgP/Ox548skn61lmmaV+++23a3TmmWcytdSDBg2qP/zww3rIkCH1fPPNV++zzz4R5oorrqinnHLKuk+fPvWnn35af/755/XQoUMjzvrrrx9p3HvvvfXcc89dd+vWrX744YcjzDHHHBNhLrvssnrYsGH1nHPOWXft2rV+6aWXIo705XvYYYdFnp4vvvjikX5TTz113bNnz/qxxx6rn3322XqOOeao11prrfB/7rnn6g4dOtS77rpr/cQTT9TvvfdefcMNN9RdunSpN9xwwwgzcODAetppp61nnnnm+rzzzgu3O+64o55xxhnrQw89tJbG66+/Xu+77771QgstVL/yyisRBi8meb7tttvqTp061R988EE4K8P3vve9un///vWIESPqq6++ul599dXrzp07h/+VV14Z9Zpuuunq008/PdxuvvnmKMuRRx4Z/z/77LP65ZdfjrINHz483Bp/Pvnkk/j70EMP1WussUY8f/zxx3HPNvDnrbfeqjfaaKO6b9++4Zdtuttuu9U77bRTtIP2SvKc/994441wlscUU0xRb7LJJiP9eOy8887RnsqSmLz66qv1j3/84+CPd999N+I3psnt6KOPrvEYvHr37l0vvvjitfriLe2oneGHn8S9/vrro006duxYH3jggbU8+vXrF26PP/545LH77rvX+OHwww8P3PDbtttuW88222yR1+DBgyNdbZn1ExE/yW/ttdeOePfff3+9yCKL1FNNNVV96qmnRrn++te/RphFF1000nr00UfraaaZJtx69OhRqxNe6d69e1z4V320w0cffRTlg88DDzxQH3HEEYGVtl155ZUjDwHUXbmEK1fBYHzwQJm2a7O6WSIUBMYNAW/N+SbsbZ1liCXHuhfWgY4dO4b1xLQFC5W3eFYFVpck8cRJi8cll1xSPfXUU7E2yDQNsmDWtI3Fzt7CWXC85c8yyyzxps66xBLAysACwOoiPWmzjLB4sD6wLLDK7L333rEgl8XD9BwLEquFKTFTPcJZhM2fBYAlC6mDhc7qceGFF8b6qs022ywsE6wmdkdZqH733XdXLA6wUd+0CKmnMikbawOLDAvEIossEmHF8cyywQokPyQPa64QCxXLhamwxDOtTCwkaUliQZF35nnVVVfFOjBpZLr8hXc3vXr88cdXrGzcWP5gZhrMtNHoSNicpmrkBbgpFxLGs3y0j/q7EOuSssKIP3w84xF5K5OysWpqJyQuC41488wzT/CH51VWWSWmTlmcevXqFZZH7aUeLDvKZJH3scceGwvt5YeHWIl+9atfVeeee25YAiMTmlLDRgbtwbKoDPhEPOmyNCFpqT/aa6+9gvfFZ9US14J3OOEt/HjRRRcFFton8VF3bWpa1porbSFd/KcPKL+6cytUEBhfCBTlaXwhWdIpCHxLBFIJokQRFKaELr300hAq/lOaCOHjjjsuBAKhTVAQoIQGISAuN8oWNzuNxLV+iL+L0DHdRXg8/vjj4WaKi5+w/AlJ/pQKQiinf5RxxhlnjDUmWS3rTQgpAlUZCedNN9008n7ttddCOFKcCK1UAJTTWiB3AmzIkCGV9ToEtWlLeRL24lGeTL8pl7opi7rLMxUFC42V3RSiektXWa3HsubFzjxTjIhSKAySjjJLh7CWr3oj6cGEH/fET/6mJk1tJvbSo7ikUiM8oX3yySdX1ib94Q9/iAXgBHimF5mM5kfemb+0lU085L8y8oedMiQm6gKXpIwjvnVR/NQj6y8ct2wXWFFmMm/ueCcxwlfqJl15UvApqdKj8IorLGXZFPLqq68eRREnSX6m+yi1eAlpVzsHkTylr47Kmuuh+KkHd9OWSLhcUxYOX+GT5Xe3Rks7NLaVsPKUlzCFCgLjC4GiPI0vJEs6BYFviQBrgMGc8CGEvFWzpBx55JEVC9Kjjz4a60IIE+tFCI4UEgQKRYAigwgyAovASGEpPIGRRNinspXuhGM+Szvj5Bu69PhnvtJKYZ6WK0Ka0maRMqsA647/uYhZeGVTT0SYSo/VI9fx+K9s6sMKRnHiJi5h6RlW0iFQlSkVA2nCAuU6IfFhhDJ8PquTeqaA9wyzlkg+FEpKp11c0sqwypP5pvJGyFPiKJGsYPC13kfbtkTqJz1X4qzciYd2oFSyAFrTQ1GVp7CsbzYD4J3RUaYNq8RLHWCg/pmnO//EJN25KYMLNda/MV/h1AWWSHwkf26w4kb5yraVFhKXX9Y73aTXyH/pDhuX8K7kC/koJz+UbZPhtUWhgsD4RuDrlZnjO+WSXkGgINAiAoSPwZ+AISQs4h0wYEB1wAEHxKJnAts5RCeddFII7xRswiL/LWJGBAjhYZEsoeQMIEKDUKJYSceUiwW3BIzF1oSW/Ak0U2ameLghd5ewhJi88uLPTfrXXHNNKAcPPfRQdd9998U2eovLlZFCkXGUzbP01Nc0H+uXYwJM95hGdDaP3WyUFGGV3b1RGEoHUdzU0/EB6pB1pZDaqcjaJC+UAtyzcOIRrNzzkk9LpJ4nnnhiKEJpzZOGS1x3Fhn4U5JYnSi7FqtbAP6Pf/wjlIWW0uYmX+kgaXiWpzKqq8v06wsvvBDKkvDqy8qjDqa1RkfaINOWJuVBup6l6zmtn8Jl26iTMNy0QSo24lPe8Gi6KQ8lDj/ZLJDtk/zIX1osgiyNeBFfcXvsscei6MKgrHOW2V06WeYMJ2/5KDs/7sIqN3KXB5yE5efyzN29UEFgfCFQlKfxhWRJpyDwLREwuBMiLAoEoV1R1ueccMIJMdgTyg8//HBMb7DSsDIgCgdFyK455x4hQkR6O+ywQ1hu7DCjWJgukd5f/vKXEO6/+93vYlrGDjoWFVvUKU1nnXVWWDdSmErPRdgRNspJYHlO5Y1AUm5WFuU0jWfKzRQexSEFlXSEo6RREAlh5SBMDz744NgRRfjut99+sZMrLWTipRAkILn7Lx1WLjvO7N6CB0EsT7sRTQ2Z9hMWiZfKgjLDSXrqQtByGx1ZO8MK6AymFM7CN16UDvWDOeXNlJ3pRGcNOYbA6d6tUaab5VE+ZZcuN2vVhDEFyBppTZt1VPPPP3+s5Rld2sokHiV21DpK38VSBwvti7J9ucGMu3Kol/aws1M97caj3ONDirl0dtppp7hnOtJQF/FMSTtkdKONNqqGDh0aFlY76JAyyqexXbLtlVE67tmGyig//UO9uIvrLq3G+nBDwmUdR8UiApSfgsBYIlCm7cYSuBKtIDC2CBBuBnpv1xQSSkffvn0rC7gdcEg4mOqyld20j8XZlIWbbrqp2njjjSOedSMERFoZKFmEmMW4tumb8nrppZeqVVddtVpuueViIS5hZ+E45YNQcsnb4l1CCUmTJUXZkHISTNwJ0xRK1iw5kZxwNB2T01fWGxFo/gvPKpFHB/zzn/8MwW+dlfONKICscBQ1xwhQCghPQpLAc2XeFK/MW1hHG1C6WEQoVUiaWWZhpdUoXFPgRqCvfqTfEllcbyouz1dqFLxZRtg4m4lSwyqjztJzrpUpTeWjMLREWRd+WVZtlsqEO4sXZcUhoxRm7aIc1sKx3o2u7NkWeCjrL71Gkk7ijA/4w1ia3N2TJ8TDU6yETgWnrCJpWNDtPCs87b82Fzf5B+95MWBdtC7K2jbTs8Jn+3gWXnwkf1gof/Kfu/JxR/heHPkJr56epZF5i5M4c8/0I4HyUxAYRwSmsGVvHNMo0QsCBYE2IGCqi6XE4YsEAuFlbQuLEYsHYWQKKy0PkiakvfGLy8JCKDmd3IJdO54IIsRC4awmQspOO+FSKBMePqNhUbU87erjb72R9C+++OIolzRzqsX30ZJYeeRPYSJsWa8odIS1xbqUMu7OeXImECFKsTCVyIJB6WHhYnEz1cePokjxM61IEUKEHkrBZ5G483rET4Hv7CjWLHfTZeqaC8RNdcGG4mhHWJKpRuXjrmwsZuIpS1r35A1LZbP70YJ7bZRlghthL34KY8obDLMNCHIC3DQiSxnKsOIleVZHyuMZZ5wRuxAbp+PkKa20JCqvc5asF2uNGsuWz+7SoxBZBE/50rbpbxcbnmvEi6LkTCgKvDprbxc+UD9h8ai6WedGuVI2ijXKPLWZHZJ4zzoubU2RZiWkMJuKtNvSJgkL2RGrnfY1FZxrrPAtSyeFn6KUeSS2/qujfJN3+PmPGsOFQ/kpCIwDAkV5GgfwStSCwNggYKqKoCBQCBbCiRJBQBWacAikMKdAwZ3CaJG7wzUpf9xT6KbAnXClKSkXBAoCkzMCZc3T5Nx6peyTJQIsQawSrD4sG97aU2hPlhWaTArNKsE6xAJhStQp5Rbes5yxpGgDliWWsUIFgYJAQaA1BMqap9bQKX4FgQmEgC+/W9CcUz0TKJuSbAMClCYKFLILzPSRtWSmSVmiKE+sT6YWhSsKbQN45bEgUBD4BgJl2u4bcJQ/BYEJj4DFrqbocg0GQe0iuAtNOARMxZkedc+FxyxNFFiKbC44VoIybTfh2qGkXBBoDwgU5ak9tGKpw2SHAOHM2mG6iOLkf7F0TPhmpLDCndLkGeZp/dMO/FC6TfgSlRwKAgWByRGBojxNjq1WylwQKAgUBAoCBYGCwERDoCwYn2jQl4wLAgWBgkBBoCBQEJgcESjK0+TYaqXMBYGCQEGgIFAQKAhMNASK8jTRoC8ZFwQKAgWBgkBBoCAwOSJQlKfJsdVKmQsCBYGCQEGgIFAQmGgIFOVpokFfMi4IFAQKAgWBgkBBYHJE4P8B43CJ65TWpWkAAAAASUVORK5CYII="></p>
<p>same<em> V</em><sub>max</sub> reached at higher [substrate]</p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br>