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</div><h2>HL Paper 2</h2><div class="specification">
<p>This question is about the reactions of halogenoalkanes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare and contrast the mechanisms by which 1-chlorobutane, CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>Cl, and 2-chloro-2-methylpropane, (CH<sub>3</sub>)<sub>3</sub>CCl, react with aqueous sodium hydroxide, giving <strong>two </strong>similarities and <strong>one </strong>difference.</p>
<p><img 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"></p>
<p> </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>Outline why the rate of reaction of the similar bromo-compounds is faster.</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>State the organic product of the reaction between 1-chlorobutane, CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>Cl, and aqueous sodium hydroxide.</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>Suggest how this product could be synthesized in one step from butanoic acid.</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>Deduce the name of the class of compound formed when the product of (c)(i) reacts with butanoic acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Geometrical isomerism and optical isomerism are two sub-groups of stereoisomerism in organic chemistry.</p>
</div>
<div class="specification">
<p class="p1">Compound <strong>P </strong>has the following three-dimensional structure. <strong>P </strong>also has geometrical isomers.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-15_om_18.37.34.png" alt="M13/4/CHEMI/HP2/ENG/TZ2/08.d"></p>
</div>
<div class="specification">
<p class="p1">Menthol can be used in cough medicines. The compound contains C, H and O only.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe what is meant by the term <em>stereoisomers</em>.</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">Geometrical isomers have different physical properties and many drugs, such as doxepin (which has antidepressant properties), have geometrical isomers.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-16_om_13.17.23.png" alt="M13/4/CHEMI/HP2/ENG/TZ2/08.b"></p>
<p class="p1">For each of the carbon atoms labelled <strong>1 </strong>and <strong>2 </strong>in doxepin, deduce the type of hybridization involved (sp, sp<sup><span class="s1">2 </span></sup>or sp<sup><span class="s1">3</span></sup>).</p>
<p class="p2"> </p>
<p class="p1"><strong>1</strong>:</p>
<p class="p2"> </p>
<p class="p1"><strong>2</strong>:</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">Clomifene, a fertility drug, whose three-dimensional structure is represented below, also has geometrical isomers.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-16_om_13.22.28.png" alt="M13/4/CHEMI/HP2/ENG/TZ2/08.c"></p>
<p class="p1">Identify the name of <strong>one </strong>functional group present in clomifene.</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">Draw any <strong>two </strong>other isomers of <strong>P</strong>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Apply IUPAC rules to state the names of all the straight-chain isomers of compounds of molecular formula C<sub><span class="s1">4</span></sub>H<sub><span class="s1">8 </span></sub>(including <strong>P</strong>).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural formula of the organic products, <strong>Q</strong>, <strong>R</strong>, <strong>S </strong>and <strong>T</strong>, formed in the following reactions.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-16_om_14.46.40.png" alt="M13/4/CHEMI/HP2/ENG/TZ2/08.d.iii"></p>
<div class="marks">[4]</div>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest <strong>one </strong>suitable mechanism for the reaction of <strong>Q </strong>with aqueous sodium hydroxide to form <strong>T</strong>, using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural formula of the organic product formed, <strong>U</strong>, when <strong>R </strong>is heated under reflux with acidified potassium dichromate(VI).</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Apply IUPAC rules to state the name of this product, <strong>U</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.vi.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">When a \(6.234 \times {10^{ - 2}}{\text{ g}}\) of the compound was combusted, \(1.755 \times {10^{ - 1}}{\text{ g}}\) of carbon dioxide and \(7.187 \times {10^{ - 2}}{\text{ g}}\) of water were produced. Determine the molecular formula of the compound showing your working, given that its molar mass is \(M = 156.30{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\).</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Menthol occurs naturally and has several isomers. State the structural feature of menthol which is responsible for it having enantiomers.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the instrument used to distinguish between each of the two enantiomers, and how they could be distinguished using this instrument.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Compare the physical and chemical properties of enantiomers.</p>
<p class="p2"> </p>
<p class="p1">Physical properties:</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">Chemical properties:</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">But-2-ene is a straight-chain alkene with formula \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{8}}}\). The molecule contains both \(\sigma \) and \(\pi \) bonds.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-25_om_13.53.05.png" alt="N10/4/CHEMI/HP2/ENG/TZ0/02.a"></p>
</div>
<div class="specification">
<p class="p1">The polymerization of the alkenes is one of the most significant reactions of the twentieth century.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Explain the formation of the \(\pi \) bond.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>For each of the carbon atoms, C(1) and C(2), identify the type of hybridization shown.</p>
<p class="p2"> </p>
<p class="p1">C(1):</p>
<p class="p2"> </p>
<p class="p1">C(2):</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">But-2-ene shows geometrical isomerism. Draw the structural formula and state the name of the other geometrical isomer.</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">Identify the structural formula of an isomer of but-2-ene which does not decolourize bromine water, Br<sub><span class="s1">2</span></sub>(aq).</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">(i) <span class="Apple-converted-space"> </span>Outline <strong>two </strong>reasons why the polymers of the alkenes are of economic importance.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>State the type of polymerization reaction shown by the alkene in part (a).</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>Deduce the structure of the resulting polymer showing <strong>three </strong>repeating units.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>Explain why monomers are often gases or volatile liquids, but polymers are solids.</p>
<div class="marks">[6]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">But-2-ene belongs to the homologous series of the alkenes.</p>
</div>
<div class="specification">
<p class="p1">The time taken to produce a certain amount of product using different initial concentrations of \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\) and NaOH is measured. The results are shown in the following table.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-13_om_09.42.07.png" alt="M13/4/CHEMI/HP2/ENG/TZ1/09.c"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline <strong>three </strong>features of a homologous series.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe a test to distinguish but-2-ene from butane, including what is observed in <strong>each </strong>case.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">2-bromobutane can be produced from but-2-ene. State the equation of this reaction using structural formulas.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State what is meant by the term <em>stereoisomers</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the existence of geometrical isomerism in but-2-ene.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the order of reaction with respect to \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\) and NaOH, using the data above.</p>
<p class="p2"> </p>
<p class="p1">\({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\)</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">NaOH:</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the rate expression.</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">Based on the rate expression obtained in (c) (ii) state the units of the rate constant, \(k\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Halogenalkanes can react with NaOH via \({{\text{S}}_{\text{N}}}{\text{1}}\) and \({{\text{S}}_{\text{N}}}{\text{2}}\) type mechanisms. Explain why \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\) reacts via the mechanism described in (d) (i).</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the rate-determining step of this mechanism.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Existence of isomers leads to diversity of organic compounds.</p>
</div>
<div class="question">
<p class="p1">(a) Describe what is meant by the term <em>stereoisomers</em>.</p>
<p class="p1">(b) 1,3-dichlorocyclobutane exists as geometrical isomers, a form of stereoisomers.</p>
<p class="p1">(i) Draw and name the <strong>two </strong>geometrical isomers of 1,3-dichlorocyclobutane.</p>
<p class="p1">(ii) Identify the isomer with the <strong>higher </strong>boiling point and explain your reasoning.</p>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Below are <strong>four structural </strong>isomers with molecular formula \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\). State the name of each of the isomers <strong>a</strong>, <strong>b</strong>, <strong>c </strong>and <strong>D</strong>.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-07_om_05.51.25.png" alt="M10/4/CHEMI/HP2/ENG/TZ1/07.a"></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">Identify the isomer(s) which will react with aqueous sodium hydroxide almost exclusively by an \({{\text{S}}_{\text{N}}}{\text{1}}\) mechanism. State the meaning of the symbols in the term \({{\text{S}}_{\text{N}}}{\text{1}}\) mechanism.</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">Using the formula RBr to represent a bromoalkane, state an equation for the rate determining step of this \({{\text{S}}_{\text{N}}}{\text{1}}\) reaction.</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">Identify one isomer that will react with aqueous sodium hydroxide almost exclusively by an \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanism. Draw the mechanism for this reaction using curly arrows to represent the movement of electron pairs. Include the structural formulas of the transition state and the organic product.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain how the rates of the reactions in parts (b) (i) and (b) (iii) are affected when the concentration of the sodium hydroxide is doubled.</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">State and explain how the rate of reaction of 1-bromobutane with sodium hydroxide compares with that of 1-chlorobutane with sodium hydroxide.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the isomer of C<sub><span class="s1">4</span></sub>H<sub><span class="s1">9</span></sub>Br that can exist as stereoisomers. Outline how a polarimeter will distinguish between the isomers, and how their physical and chemical properties compare.</p>
<div class="marks">[5]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Alkenes, alcohols and esters are three families of organic compounds with many commercial uses.</p>
</div>
<div class="specification">
<p class="p1">An ester which gives apples their characteristic smell contains C, H and O. When \(3.00 \times {10^{ - 3}}{\text{ g}}\) of this ester were completely combusted, \(6.93 \times {10^{ - 3}}{\text{ g}}\) of \({\text{C}}{{\text{O}}_{\text{2}}}\) and \(2.83 \times {10^{ - 3}}{\text{ g}}\) of \({{\text{H}}_{\text{2}}}{\text{O}}\) were produced.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State what is meant by the term <em>stereoisomers</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the empirical formula of the ester, showing your working.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The molar mass of the ester is \({\text{116.18 g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\). Determine its molecular formula.</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">2-bromobutane is optically active. Draw the two enantiomers of 2-bromobutane and compare their physical and chemical properties.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>2-methylbutan-2-ol, \({{\text{(C}}{{\text{H}}_{\text{3}}}{\text{)}}_{\text{2}}}{\text{C(OH)C}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\), is a liquid with a smell of camphor that was formerly used as a sedative. One way of producing it starts with 2-methylbut-2-ene.</p>
</div>
<div class="specification">
<p>As well as 2-methylbutan-2-ol, the reaction also produces a small quantity of an optically active isomer, <strong>X</strong>.</p>
</div>
<div class="specification">
<p>2-methylbutan-2-ol can also be produced by the hydrolysis of 2-chloro-2-methylbutane, \({{\text{(C}}{{\text{H}}_{\text{3}}}{\text{)}}_{\text{2}}}{\text{CCl}}{{\text{C}}_{\text{2}}}{{\text{H}}_{\text{5}}}\), with aqueous sodium hydroxide.</p>
</div>
<div class="specification">
<p>2-chloro-2-methylbutane contains some molecules with a molar mass of approximately \({\text{106 g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\) and some with a molar mass of approximately \({\text{108 g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\).</p>
</div>
<div class="specification">
<p>2-chloro-2-methylbutane can also be converted into compound <strong>Z</strong> by a two-stage reaction via compound <strong>Y</strong>:</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_13.10.19.png" alt="N13/4/CHEMI/HP2/ENG/TZ0/08.g"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the other substances required to convert 2-methylbut-2-ene to 2-methylbutan-2-ol.</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 whether you would expect 2-methylbutan-2-ol to react with acidified potassium dichromate(VI).</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>State what is meant by <em>optical activity</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>State what optical activity indicates about the structure of the molecule.</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>Optical activity can be detected using a polarimeter. Explain how this works.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the structural formula of <strong>X</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why 2-methylbut-2-ene is less soluble in water than 2-methylbutan-2-ol.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the mechanism of this reaction using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the rate expression for this reaction and the units of the rate constant.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why, for some other halogenoalkanes, this hydrolysis is much more effective in alkaline rather than in neutral conditions.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why there are molecules with different molar masses.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the structure of <strong>Y</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the reagent and any catalyst required for both the formation of <strong>Y</strong> and the conversion of <strong>Y</strong> into <strong>Z</strong>.</p>
<p> </p>
<p>Formation of <strong>Y</strong>:</p>
<p> </p>
<p> </p>
<p>Conversion of <strong>Y</strong> into <strong>Z</strong>:</p>
<div class="marks">[3]</div>
<div class="question_part_label">g.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>One structural isomer of C<sub>4</sub>H<sub>9</sub>Br is a chiral molecule.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the three-dimensional shape of each enantiomer of this isomer showing their spatial relationship to each other.</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>When one enantiomer undergoes substitution by alkaline hydrolysis approximately 75 % of the product molecules show inversion of configuration. Comment on the mechanisms that occur.</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>Suggest why the rate of alkaline hydrolysis of an enantiomer of iodopropane is greater than that of an enantiomer of bromopropane.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">In some countries, ethanol is mixed with gasoline (petrol) to produce a fuel for cars called gasohol.</p>
</div>
<div class="specification">
<p class="p1">Deduce a two-step synthesis for each of the following conversions. For each step, state the structural formulas of all reactants and products and state the conditions used in the reactions.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Ethanol to ethyl ethanoate.</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">Propene to propanone.</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">The reagents used in an elimination reaction are shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-18_om_15.25.03.png" alt="M09/4/CHEMI/HP2/ENG/TZ2/08.c"></p>
<p class="p1">Explain the mechanism of this reaction using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe <em>geometrical isomerism</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the geometrical isomers of but-2-ene.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the two enantiomers of butan-2-ol.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The compound \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{7}}}{\text{Cl}}\) can exhibit stereoisomerism.</p>
</div>
<div class="specification">
<p class="p1">The reaction between bromoethane, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{Br}}\), and potassium cyanide is an example of a nucleophilic substitution reaction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structural formulas of the <strong>two </strong>geometrical isomers of 1-chloro-but-2-ene.</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">Explain why 1-chloro-but-2-ene shows geometrical isomerism.</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">Draw the structural formula of <strong>one </strong>isomer of \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{7}}}{\text{Cl}}\) that shows optical isomerism and identify the chiral carbon atom with an asterisk (*).</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State whether this reaction is S<sub><span class="s1">N</span></sub>1 or S<sub><span class="s1">N</span></sub>2.</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">Explain the mechanism of the reaction using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The organic product obtained in part (c) (ii) can be reduced to form an amine. State an equation for the reaction, naming the catalyst involved.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">But-1-ene and 1-aminobutane (1-butylamine) can both be prepared from 1-bromobutane.</p>
</div>
<div class="specification">
<p class="p1">2-bromobutane and 2-bromo-2-methylpropane are two isomers of 1-bromobutane.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the type of reaction and explain the mechanism for the preparation of but-1-ene from 1-bromobutane using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the equation (using structural formulas) for the preparation of 1-aminobutane from 1-bromobutane. State the necessary reagents and conditions of the reaction.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the mechanism for the preparation of 1-aminobutane from 1-bromobutane using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structures of the two mirror images of the isomer that can exhibit optical isomerism.</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">Describe how the two optical isomers can be distinguished practically using plane-polarized light.</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">Explain why the mechanism of the reaction will be different if 1-bromobutane is replaced by 2-bromo-2-methylpropane to form 2-amino-2-methylpropane in the reaction in part (a) (iv).</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Consider the two-stage reaction pathway below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_05.15.16.png" alt="N13/4/CHEMI/HP2/ENG/TZ0/02"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the structural formula of compound <strong>X</strong>.</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>State the reagents and conditions required for stage <strong>II</strong> of the pathway.</p>
<p> </p>
<p>Reagents:</p>
<p> </p>
<p> </p>
<p>Conditions:</p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Consider the following reactions.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-02_om_18.52.53.png" alt="N11/4/CHEMI/HP2/ENG/TZ0/09.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the IUPAC names of each of the compounds, <strong>D</strong>, <strong>E</strong>, <strong>F </strong>and <strong>G</strong>.</p>
<p class="p1"><strong>D</strong>:</p>
<p class="p1"><strong>E</strong>:</p>
<p class="p1"><strong>F</strong>:</p>
<p class="p1"><strong>G</strong>:</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">State the reagents and reaction conditions used to convert <strong>D </strong>to <strong>E </strong>and <strong>D </strong>to <strong>F </strong>directly.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss the volatility of <strong>E </strong>compared to <strong>F</strong>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Some reactions of but-2-ene are given below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-07_om_13.55.12.png" alt="M15/4/CHEMI/HP2/ENG/TZ2/10"></p>
</div>
<div class="specification">
<p class="p1">But-2-ene can exist as two geometrical isomers. Cis-trans is a form of stereoisomerism.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the full structural formula of compound <strong>A</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Apply IUPAC rules to name compound <strong>A</strong>.</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">Describe the colour change observed when excess but-2-ene reacts with bromine to form compound <strong>A</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Outline <strong>two </strong>reasons why the polymerization of alkenes is of economic importance.</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) Identify the structure of the repeating unit of poly(but-2-ene).</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">Compound <strong>C</strong>, \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{OH}}\), can also be formed by reacting compound <strong>B</strong>, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{CHBrC}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\), with aqueous potassium hydroxide. This reaction proceeds by both \({{\text{S}}_{\text{N}}}{\text{1}}\) and \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanisms. Explain the \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanism, using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why the hydroxide ion is a better nucleophile than water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Compound <strong>C</strong>, \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{OH}}\), can be oxidized by acidified potassium dichromate(VI) to form compound <strong>F</strong>.</p>
<p class="p1">(i) <span class="Apple-converted-space"> </span>State the name of the functional group present in compound <strong>F</strong>.</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Deduce the structural formula of an alcohol which is a structural isomer of compound <strong>C </strong>and <strong>cannot </strong>be oxidized by acidified potassium dichromate(VI).</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why but-2-ene is more volatile than compound <strong>C</strong>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the equation for the complete combustion of compound <strong>C</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>stereoisomers</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the conditions needed for a compound to show cis-trans.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structures of the two geometrical isomers of but-2-ene, clearly identifying each as <em>cis </em>or <em>trans</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">In an experiment conducted at 25.0 °C, the initial concentration of propanoic acid and methanol were \({\text{1.6 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) and \({\text{2.0 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) respectively. Once equilibrium was established, a sample of the mixture was removed and analysed. It was found to contain \({\text{0.80 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) of compound <strong>X</strong>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Two compounds, <strong>A </strong>and <strong>D</strong>, each have the formula \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Cl}}\).</p>
<p class="p1">Compound <strong>A </strong>is reacted with dilute aqueous sodium hydroxide to produce compound <strong>B </strong>with a formula of \({{\text{C}}_{\text{4}}}{{\text{H}}_{{\text{10}}}}{\text{O}}\). Compound <strong>B </strong>is then oxidized with acidified potassium</p>
<p class="p1">manganate(VII) to produce compound <strong>C </strong>with a formula of \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{8}}}{\text{O}}\). Compound <strong>C </strong>resists further oxidation by acidified potassium manganate(VII).</p>
<p class="p1">Compound <strong>D </strong>is reacted with dilute aqueous sodium hydroxide to produce compound <strong>E </strong>with a formula of \({{\text{C}}_{\text{4}}}{{\text{H}}_{{\text{10}}}}{\text{O}}\). Compound <strong>E </strong>does not react with acidified potassium manganate(VII).</p>
<p class="p1">Deduce the structural formulas for compounds <strong>A</strong>, <strong>B</strong>, <strong>C</strong>, <strong>D </strong>and <strong>E</strong>.</p>
<p class="p2"><strong>A:</strong></p>
<p class="p2"><strong>B:</strong></p>
<p class="p2"><strong>C:</strong></p>
<p class="p2"><strong>D:</strong></p>
<p class="p2"><strong>E:</strong></p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce an equation for the reaction between propanoic acid and methanol. Identify the catalyst and state the name of the organic compound, <strong>X</strong>, formed.</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">Calculate the concentrations of the other three species present at equilibrium.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the equilibrium constant expression, \({K_{\text{c}}}\), and calculate the equilibrium constant for this reaction at 25.0 °C.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">2-chloro-3-methylbutane reacts with sodium hydroxide via an \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanism. Explain the mechanism by using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why the hydroxide ion is a better nucleophile than water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">1-chlorobutane can be converted to a pentylamine via a two stage process. Deduce equations for each step of this conversion including any catalyst required <strong>and </strong>name the organic product produced at <strong>each </strong>stage.</p>
<div class="marks">[5]</div>
<div class="question_part_label">d.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">There are several structural isomers with the molecular formula \({{\text{C}}_{\text{5}}}{{\text{H}}_{{\text{11}}}}{\text{Br}}\).</p>
</div>
<div class="specification">
<p class="p1">All the isomers react when warmed with a dilute aqueous solution of sodium hydroxide according to the equation below.</p>
<p class="p1">\[{{\text{C}}_5}{{\text{H}}_{11}}{\text{Br}} + {\text{NaOH}} \to {{\text{C}}_5}{{\text{H}}_{11}}{\text{OH}} + {\text{NaBr}}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the name of <strong>one </strong>of the isomers which can exist as enantiomers and draw three-dimensional representations of its <strong>two </strong>enantiomers.</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">The reaction with 1-bromopentane proceeds by an \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanism. Describe this mechanism using structural formulas and curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The reaction with 2-bromo-2-methylbutane proceeds by an \({{\text{S}}_{\text{N}}}{\text{1}}\) mechanism. Describe this mechanism using structural formulas and curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why 1-bromopentane reacts by an \({{\text{S}}_{\text{N}}}{\text{2}}\) mechanism whereas 2-bromo-2-methylbutane reacts by an \({{\text{S}}_{\text{N}}}{\text{1}}\) mechanism.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain whether the boiling point of 1-bromopentane will be higher, lower or the same as that of 2-bromo-2-methylbutane.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The product \({{\text{C}}_{\text{5}}}{{\text{H}}_{{\text{11}}}}{\text{OH}}\) formed from the reaction with 1-bromopentane is warmed with ethanoic acid in the presence of a few drops of concentrated sulfuric acid. State the name of the type of reaction taking place and the structural formula of the organic product.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.v.</div>
</div>
<br><hr><br><div class="specification">
<p>Iron rusts in the presence of oxygen and water. Rusting is a redox process involving several steps that produces hydrated iron(III) oxide, \({\text{F}}{{\text{e}}_{\text{2}}}{{\text{O}}_{\text{3}}} \bullet {\text{n}}{{\text{H}}_{\text{2}}}{\text{O}}\), as the final product.</p>
<p>The half-equations involved for the first step of rusting are given below.</p>
<p> Half-equation 1: \({\text{Fe(s)}} \to {\text{F}}{{\text{e}}^{2 + }}{\text{(aq)}} + {\text{2}}{{\text{e}}^ - }\)</p>
<p> Half-equation 2: \({{\text{O}}_{\text{2}}}{\text{(aq)}} + {\text{4}}{{\text{e}}^ - } + {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} \to {\text{4O}}{{\text{H}}^ - }{\text{(aq)}}\)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Identify whether half-equation 1 represents oxidation or reduction, giving a reason for your answer.</p>
<p> </p>
<p> </p>
<p>(ii) Identify the oxidation number of each atom in the three species in half-equation 2.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-22_om_05.46.30.png" alt="N14/4/CHEMI/HP2/ENG/TZ0/10.a.ii"></p>
<p>(iii) Deduce the overall redox equation for the first step of rusting by combining half-equations 1 and 2.</p>
<p> </p>
<p> </p>
<p>(iv) Identify the reducing agent in the redox equation in part (iii).</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The oxygen in half-equation 2 is atmospheric oxygen that is found dissolved in water in very small concentrations. Explain, in terms of intermolecular forces, why oxygen is not very soluble in water.</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>State the relationship between the electron arrangement of an element and its group and period in the periodic table.</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>Transition metals and their compounds often catalyse reactions. The catalyzed decomposition of hydrogen peroxide by CuO is an example. State <strong>two other</strong> examples of catalyzed reactions giving the transition metal or its compound acting as catalyst.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State a chemical equation for the partial dissociation of water into ions, including state symbols.</p>
<p> </p>
<p>(ii) The dissociation of water into ions is reversible. State the expression for the ionic product constant of water.</p>
<p> </p>
<p>(iii) The ionic product constant of water was measured at three different temperatures.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-22_om_06.07.14.png" alt="N14/4/CHEMI/HP2/ENG/TZ0/10.e.iii"></p>
<p>Deduce whether the ionization of water is exothermic or endothermic, giving your reason.</p>
<p> </p>
<p> </p>
<p> </p>
<p>(iv) Use the data in part (iii) to determine the pH of water at 373 K, correct to <strong>two</strong> decimal places.</p>
<div class="marks">[6]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) An aqueous solution of sodium chloride is electrolysed using inert electrodes. Explain which product is obtained at the positive electrode (anode) if the concentration of sodium chloride is high.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(ii) State the half-equations occurring at the electrodes during the electrolysis of the <strong>concentrated </strong>aqueous solution of sodium chloride.</p>
<p> </p>
<p>Negative electrode (cathode):</p>
<p> </p>
<p>Positive electrode (anode):</p>
<div class="marks">[5]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how electrolysis can be used to electroplate a bracelet with a layer of silver metal. Include the choice of electrodes and electrolyte needed in your description.</p>
<div class="marks">[3]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Ethanol is a primary alcohol that can be oxidized by acidified potassium dichromate(VI). Distinguish between the reaction conditions needed to produce ethanal and ethanoic acid.</p>
<p class="p1"> </p>
<p class="p1">Ethanal:</p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1">Ethanoic acid:</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">Determine the oxidation number of carbon in ethanol and ethanal.</p>
<p class="p1"> </p>
<p class="p1">Ethanol:</p>
<p class="p1"> </p>
<p class="p1">Ethanal:</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the half-equation for the oxidation of ethanol to ethanal.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the overall redox equation for the reaction of ethanol to ethanal with acidified potassium dichromate(VI).</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Ethanol can be made by reacting aqueous sodium hydroxide with bromoethane.</p>
<p class="p1">Explain the mechanism for this reaction, using curly arrows to represent the movement of electron pairs.</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">Determine the orders of reaction of the reactants and the overall rate expression for the reaction between 2-bromobutane and aqueous sodium hydroxide using the data in the table.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-03_om_07.27.54.png" alt="M15/4/CHEMI/HP2/ENG/TZ1/07.ci"></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">Determine the rate constant, \(k\), with its units, using the data from experiment 3.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the molecularity of the rate-determining step in this reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">2-bromobutane exists as optical isomers.</p>
<p class="p2">State the essential feature of optical isomers.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">2-bromobutane exists as optical isomers.</p>
<p class="p1">Outline how a polarimeter can distinguish between these isomers.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the formation of \(\sigma \) and \(\pi \) <span class="s1">bonds in an alkene.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The two most abundant isotopes of bromine have the mass numbers 79 and 81.</p>
<p class="p1">Calculate the relative abundance of \(^{{\text{79}}}{\text{Br}}\) using table 5 of the data booklet, assuming the abundance of the other isotopes is negligible.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Consider the following sequence of reactions.</p>
<p class="p1">\[{\text{RC}}{{\text{H}}_3}\xrightarrow{{reaction 1}}{\text{RC}}{{\text{H}}_2}{\text{Br}}\xrightarrow{{reaction 2}}{\text{RC}}{{\text{H}}_2}{\text{OH}}\]</p>
<p class="p1">\({\text{RC}}{{\text{H}}_{\text{3}}}\) is an unknown alkane in which R represents an alkyl group.</p>
</div>
<div class="specification">
<p class="p1">All the isomers can by hydrolysed with aqueous sodium hydroxide solution. When the reaction of one of these isomers, <strong>X</strong>, was investigated the following kinetic data were obtained.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-25_om_14.18.46.png" alt="N10/4/CHEMI/HP2/ENG/TZ0/05.g"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The alkane contains 82.6% by mass of carbon. Determine its empirical formula, showing your working.</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">A 1.00 g gaseous sample of the alkane has a volume of 385 cm<sup><span class="s1">3 </span></sup>at standard temperature and pressure. Deduce its molecular formula.</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">State the reagent and conditions needed for <em>reaction 1</em>.</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"><em>Reaction 1 </em>involves a free-radical mechanism. Describe the stepwise mechanism, by giving equations to represent the initiation, propagation and termination steps.</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">The mechanism in <em>reaction 2 </em>is described as S<sub><em><span class="s1">N</span></em></sub>2. Explain the mechanism of this reaction using curly arrows to show the movement of electron pairs, and draw the structure of the transition state.</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">There are four structural isomers with the molecular formula \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\). One of these structural isomers exists as two optical isomers. Draw diagrams to represent the three-dimensional structures of the two optical isomers.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Deduce the rate expression for the reaction.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Determine the value of the rate constant for the reaction and state its units.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>State the name of isomer <strong>X </strong>and explain your choice.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>State equations for the steps that take place in the mechanism of this reaction and state which of the steps is slow and which is fast.</p>
<div class="marks">[9]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>The reactivity of organic compounds depends on the nature and positions of their functional groups.</p>
</div>
<div class="specification">
<p>The structural formulas of two organic compounds are shown below.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce, giving a reason, which of the two compounds can show optical activity.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw three-dimensional representations of the two enantiomers.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the reagents used in the nitration of benzene.</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>State an equation for the formation of NO<sub>2</sub><sup>+</sup>.</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>Explain the mechanism of the reaction between 2-bromo-2-methylpropane, (CH<sub>3</sub>)<sub>3</sub>CBr, and aqueous sodium hydroxide, NaOH (aq), using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Organic compounds often have isomers.</p>
<p>A straight chain molecule of formula C<sub>5</sub>H<sub>10</sub>O contains a carbonyl group. The compound cannot be oxidized by acidified potassium dichromate(VI) solution.</p>
</div>
<div class="specification">
<p>A tertiary halogenoalkane with three different alkyl groups, (R<sub>1</sub>R<sub>2</sub>R<sub>3</sub>)C−X, undergoes a S<sub>N</sub>1 reaction and forms two isomers.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the structural formulas of the two possible isomers.</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>Mass spectra <strong>A </strong>and <strong>B </strong>of the two isomers are given.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_16.37.09.png" alt="M18/4/CHEMI/HP2/ENG/TZ2/09.a.ii_01"></p>
<p>Explain which spectrum is produced by each compound using section 28 of the data booklet.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of bond fission that takes place in a S<sub>N</sub>1 reaction.</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>State the type of solvent most suitable for the reaction.</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>Draw the structure of the intermediate formed stating its shape.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest, giving a reason, the percentage of each isomer from the S<sub>N</sub>1 reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nitrobenzene, C<sub>6</sub>H<sub>5</sub>NO<sub>2</sub>, can be converted to phenylamine via a two-stage reaction.</p>
<p>In the first stage, nitrobenzene is reduced with tin in an acidic solution to form an intermediate ion and tin(II) ions. In the second stage, the intermediate ion is converted to phenylamine in the presence of hydroxide ions.</p>
<p>Formulate the equation for each stage of the reaction.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Benzene is an aromatic hydrocarbon.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss the physical evidence for the structure of benzene.</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>State the typical reactions that benzene and cyclohexene undergo with bromine.</p>
<p><img src="images/Schermafbeelding_2017-09-20_om_16.35.41.png" alt="M17/4/CHEMI/HP2/ENG/TZ1/07.b"></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>State the reagents used to convert benzene to nitrobenzene and the formula of the electrophile formed.</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>Explain the mechanism for the nitration of benzene, using curly arrows to show the movement of electron pairs.</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>State the reagents used in the two-stage conversion of nitrobenzene to aniline.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Bromomethane was used as a pesticide until it was found to be ozone-depleting.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the equation for the reaction between methane and bromine to form bromomethane.</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">Explain, using equations, the complete free-radical mechanism for the reaction of methane with bromine, including necessary reaction conditions.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Bromomethane reacts with aqueous sodium hydroxide. State the organic product of this reaction.</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">Explain why the rate of the reaction between iodomethane, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{I}}\), and NaOH(aq) is faster than the rate of the reaction between \({\text{C}}{{\text{H}}_{\text{3}}}{\text{Br}}\) and NaOH(aq).</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">Bromine can be produced by the electrolysis of <strong>molten </strong>sodium bromide.</p>
<p class="p1">Deduce the half-equation for the reaction at each electrode.</p>
<p class="p1"> </p>
<p class="p1">Positive electrode (anode):</p>
<p class="p1"> </p>
<p class="p1">Negative electrode (cathode):</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Predict the products formed at the electrodes during the electrolysis of concentrated <strong>aqueous </strong>sodium bromide.</p>
<p class="p1"> </p>
<p class="p1">Positive electrode (anode):</p>
<p class="p1"> </p>
<p class="p1">Negative electrode (cathode):</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Bromine reacts with aqueous sodium iodide.</p>
<p class="p1">\[{\text{B}}{{\text{r}}_{\text{2}}}{\text{(aq)}} + {\text{2NaI(aq)}} \to {{\text{I}}_{\text{2}}}{\text{(aq)}} + {\text{2NaBr(aq)}}\]</p>
<p class="p1">Identify the oxidizing agent in this reaction.</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 class="p1">Define the term <em>standard electrode potential, </em>\({E^\Theta }\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw a labelled diagram for the voltaic cell in which the following reaction occurs.</p>
<p class="p1">\[{\text{Mg(s)}} + {\text{C}}{{\text{u}}^{2 + }}{\text{(aq)}} \to {\text{M}}{{\text{g}}^{2 + }}{\text{(aq)}} + {\text{Cu(s)}}\]</p>
<p class="p2">Include in your answer the direction of electron flow and the polarity of the electrodes.</p>
<div class="marks">[4]</div>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A student measures a voltage of 2.65 V in the voltaic cell formed between magnesium and copper half-cells using a digital voltmeter.</p>
<p class="p1">State the random uncertainty of this value, in V, and the number of significant figures in the answer.</p>
<p class="p2"> </p>
<p class="p1">Random uncertainty:</p>
<p class="p2"> </p>
<p class="p1">Significant figures:</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline how the student can reduce the random error in her results.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the standard enthalpy change of formation, \(\Delta H_{\text{f}}^\Theta \)<span class="s1">, of NaCl(s), in \({\text{kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}\)</span>, using a Born-Haber cycle and tables 7, 10 and 13 of the data booklet. The standard enthalpy change of atomization (standard enthalpy change of sublimation), \(\Delta H_{{\text{at}}}^\Theta \), of Na(s) is \( + {\text{108 kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}\)<span class="s1">.</span></p>
<div class="marks">[4]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>\({\text{25.0 c}}{{\text{m}}^{\text{3}}}\) of \({\text{0.200 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) ethanoic acid was added to \({\text{30.0 c}}{{\text{m}}^{\text{3}}}\) of a \({\text{0.150 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) sodium hydrogencarbonate solution, \({\text{NaHC}}{{\text{O}}_{\text{3}}}{\text{(aq)}}\).</p>
</div>
<div class="specification">
<p>The molar mass of a volatile organic liquid, <strong>X</strong>, can be determined experimentally by allowing it to vaporize completely at a controlled temperature and pressure. 0.348 g of <strong>X</strong> was injected into a gas syringe maintained at a temperature of 90 °C and a pressure of \(1.01 \times {10^5}{\text{ Pa}}\). Once it had reached equilibrium, the gas volume was measured as \({\text{95.0 c}}{{\text{m}}^{\text{3}}}\).</p>
</div>
<div class="specification">
<p>Bromoethane, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{Br}}\), undergoes a substitution reaction to form ethylamine, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{N}}{{\text{H}}_{\text{2}}}\).</p>
</div>
<div class="specification">
<p>Many organic compounds exist as stereoisomers.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how electrical conductivity can be used to distinguish between a \({\text{0.200 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) solution of ethanoic acid, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{COOH}}\), and a \({\text{0.200 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) solution of hydrochloric acid, HCl.</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>(i) State an equation for the reaction of ethanoic acid with a solution of sodium hydrogencarbonate.</p>
<p> </p>
<p> </p>
<p>(ii) Determine which is the limiting reagent. Show your working.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) Calculate the mass, in g, of carbon dioxide gas produced.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Determine the amount, in mol, of <strong>X </strong>in the gas syringe.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(ii) Calculate the molar mass of <strong>X</strong>.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the mechanism for the reaction using equations and curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Outline the meaning of the term <em>stereoisomers</em>.</p>
<p> </p>
<p> </p>
<p> </p>
<p>(ii) Draw the structures of the two stereoisomers of dichloroethene, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{l}}_{\text{2}}}\).</p>
<p> </p>
<p> </p>
<p>(iii) Explain why this type of stereoisomerism exists in \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{l}}_{\text{2}}}\).</p>
<p> </p>
<p> </p>
<p> </p>
<p>(iv) Draw the structures of the two stereoisomers of 1-chloro-1-fluoroethane, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{4}}}{\text{FCl}}\), showing the relationship between them.</p>
<p> </p>
<p> </p>
<p>(v) Outline how the two isomers of \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{4}}}{\text{FCl}}\) could be distinguished from each other.</p>
<div class="marks">[6]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about carbon and chlorine compounds.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Ethane, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{6}}}\), reacts with chlorine in sunlight. State the type of this reaction and the name of the mechanism by which it occurs.</p>
<p><img src="images/Schermafbeelding_2017-09-20_om_15.22.26.png" alt="M17/4/CHEMI/HP2/ENG/TZ1/06.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>Formulate equations for the two propagation steps and one termination step in the formation of chloroethane from ethane.</p>
<p><img src="images/Schermafbeelding_2017-09-20_om_14.32.42.png" alt="M17/4/CHEMI/HP2/ENG/TZ1/06.bi"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the splitting patterns in the <sup>1</sup>H NMR spectrum of C<sub>2</sub>H<sub>5</sub>Cl.</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>Explain why tetramethylsilane (TMS) is often used as a reference standard in <sup>1</sup>H NMR.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One possible product, <strong>X</strong>, of the reaction of ethane with chlorine has the following composition by mass:</p>
<p style="text-align: center;">carbon: 24.27%, hydrogen: 4.08%, chlorine: 71.65%</p>
<p>Determine the empirical formula of the product.</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>The mass and <sup>1</sup>H NMR spectra of product <strong>X</strong> are shown below. Deduce, giving your reasons, its structural formula and hence the name of the compound.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>When the product <strong>X</strong> is reacted with NaOH in a hot alcoholic solution, C<sub>2</sub>H<sub>3</sub>Cl is formed. State the role of the reactant NaOH other than as a nucleophile.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Chloroethene, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{3}}}{\text{Cl}}\), can undergo polymerization. Draw a section of the polymer with three repeating units.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Propane and propene are members of different homologous series.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Draw diagrams to show how sigma (σ) and pi (π) bonds are formed between atoms.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p> </p>
<p>(ii) State the number of sigma (σ) and pi (π) bonds in propane and propene.</p>
<p><img 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" alt></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>Construct the mechanism of the formation of 2-bromopropane from hydrogen bromide and propene using curly arrows to denote the movement of electrons.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>A compound with a molecular formula C<sub>7</sub>H<sub>14</sub>O produced the following high resolution <sup>1</sup>H NMR spectrum.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce what information can be obtained from the <sup>1</sup>H NMR spectrum.</p>
<p><img 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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the functional group that shows stretching at 1710 cm<sup>–1</sup> in the infrared spectrum of this compound using section 26 of the data booklet and the <sup>1</sup>H NMR.</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>Suggest the structural formula of this compound.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Bromine was added to hexane, hex-1-ene and benzene. Identify the compound(s) which will react with bromine in a well-lit laboratory.</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>Deduce the structural formula of the main organic product when hex-1-ene reacts with hydrogen bromide.</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>State the reagents and the name of the mechanism for the nitration of benzene.</p>
<p><img src="data:image/png;base64,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"></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>Outline, in terms of the bonding present, why the reaction conditions of halogenation are different for alkanes and benzene.</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>Below are two isomers, A and B, with the molecular formula C<sub>4</sub>H<sub>9</sub>Br.</p>
<p style="text-align: left;"><img 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"></p>
<p>Explain the mechanism of the nucleophilic substitution reaction with NaOH(aq) for the isomer that reacts almost exclusively by an S<sub>N</sub>2 mechanism using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Phosgene, COCl<sub>2</sub>, is usually produced by the reaction between carbon monoxide and chlorine according to the equation:</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Deduce the equilibrium constant expression, <em>K</em><sub>c</sub>, for this reaction.</p>
<p>(ii) At exactly 600°C the value of the equilibrium constant is 0.200. Calculate the standard Gibbs free energy change, <img src="data:image/png;base64,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" alt>, for the reaction, in kJ, using sections 1 and 2 of the data booklet. State your answer to <strong>three</strong> significant figures.</p>
<p>(iii) The standard enthalpy change of formation of phosgene, \(\Delta H_f^\Theta \), is −220.1kJmol<sup>−1</sup>. Determine the standard enthalpy change, \(\Delta H_{}^\Theta \), for the forward reaction of the equilibrium, in kJ, using section 12 of the data booklet.</p>
<p>(iv) Calculate the standard entropy change, \(\Delta S_{}^\Theta \), in JK<sup>−1</sup>, for the forward reaction at 25°C, using your answers to (a) (ii) and (a) (iii). (If you did not obtain an answer to (a) (ii) and/or (a) (iii) use values of +20.0 kJ and −120.0 kJ respectively, although these are not the correct answers.)</p>
<div class="marks">[8]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One important industrial use of phosgene is the production of polyurethanes. Phosgene is reacted with diamine <strong>X</strong>, derived from phenylamine.</p>
<p><img 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" alt></p>
<p>(i) Classify diamine <strong>X</strong> as a primary, secondary or tertiary amine.</p>
<p>(ii) Phenylamine, C<sub>6</sub>H<sub>5</sub>NH<sub>2</sub>, is produced by the reduction of nitrobenzene, C<sub>6</sub>H<sub>5</sub>NO<sub>2</sub>. Suggest how this conversion can be carried out.</p>
<p>(iii) Nitrobenzene can be obtained by nitrating benzene using a mixture of concentrated nitric and sulfuric acids. Formulate the equation for the equilibrium established when these two acids are mixed.</p>
<p>(iv) Deduce the mechanism for the nitration of benzene, using curly arrows to indicate the movement of electron pairs.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The other monomer used in the production of polyurethane is compound <strong>Z</strong> shown below.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAqYAAAG+CAYAAABBFsb0AAAKqGlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUU1kax+976Y0WiHRCDb13pNdQBOkgKiGhhBJCIKjYlUEFx4KKCFhAhqrAqBRRERHFwiCg2HVABhF1HSyIipp9yBJ2ds/unv2f8533y/fu++73bu495/8AIF9j8fmpsBQAabwsQbC3Gz0yKpqOGwEQwAACIAJ1FjuT7xoU5A8QzV//qo93kdGIbhvN1vr3+/9V0pz4TDYAUBDCcZxMdhrCZ5BoYvMFWQCgOEhec1UWf5a3IywrQBpEuGyWE+e4aZbj5rj7x5jQYHeE7wOAJ7NYgkQASH8geXo2OxGpQ0YjbMrjcHkIWyLsxE5iIfOQkXvAMC0tfZaPIawb9091Ev9SM05ck8VKFPPcu/wQ3oObyU9lrfk/l+N/Ky1VOD+HBhLkJIFP8Ox8yJrVpKT7iZkXtyRwnrmcuZ5mOUnoEzbP7Ez36HnmsDz85lmYEuY6zyzBwrPcLGboPAvSg8X1ealL/MX145lijs/0DJnnBK4Xc55zkkIj5jmbG75knjNTQvwWxriL8wJhsLjnBIGX+B3TMhd6Y7MW5spKCvVZ6CFS3A8n3sNTnOeFicfzs9zENfmpQQv9p3qL85nZIeJns5ANNs/JLN+ghTpB4vUBXBAAWICdFb96dl8B93T+GgE3MSmL7oqckng6k8c2NqSbm5rZADB75ub+0ve0H2cJot1YyG1tBsCxQyQSnVvI+e0B4DQDAGL/Qo6xFwBJJQCulbOFguy53OxWR04yEUgCWaAAVIEm0AVGwBxYAwfgAjyBLwgEoSAKrABskATSgACsAuvAZpAHCsAecACUgKPgOKgBJ8Ep0ArOg0vgKrgJ+sEQeASGwRh4BSbBRzADQRAOokBUSAFSg7QhA8gcsoWcIE/IHwqGoqBYKBHiQUJoHbQVKoAKoRKoHKqFfoXOQpeg69AA9AAagSagd9AXGAWTYVlYBdaBTWBb2BX2g0Ph5XAinAHnwLnwLrgYroBPwC3wJfgmPAQPw6/gKRRAkVA0lDrKCGWLckcFoqJRCSgBagMqH1WEqkA1oNpRPajbqGHUa9RnNBZNRdPRRmgHtA86DM1GZ6A3oHeiS9A16BZ0N/o2egQ9if6OoWCUMQYYewwTE4lJxKzC5GGKMFWYZswVzBBmDPMRi8XSsAysDdYHG4VNxq7F7sQexjZiO7ED2FHsFA6HU8AZ4BxxgTgWLguXhzuEO4G7iBvEjeE+4Ul4Nbw53gsfjefht+CL8HX4Dvwgfhw/Q5AiaBPsCYEEDmENYTehktBOuEUYI8wQpYkMoiMxlJhM3EwsJjYQrxAfE9+TSCQNkh1pKYlL2kQqJjWRrpFGSJ/JMmR9sjs5hiwk7yJXkzvJD8jvKRSKDsWFEk3Jouyi1FIuU55SPklQJYwlmBIciY0SpRItEoMSbyQJktqSrpIrJHMkiyRPS96SfC1FkNKRcpdiSW2QKpU6K3VPakqaKm0mHSidJr1Tuk76uvQLGZyMjoynDEcmV+a4zGWZUSqKqkl1p7KpW6mV1CvUMVmsLEOWKZssWyB7UrZPdlJORs5SLlxutVyp3AW5YRqKpkNj0lJpu2mnaHdpXxapLHJdFL9ox6KGRYOLpuWV5F3k4+Xz5Rvlh+S/KNAVPBVSFPYqtCo8UUQr6isuVVyleETxiuJrJVklByW2Ur7SKaWHyrCyvnKw8lrl48q9ylMqqireKnyVQyqXVV6r0lRdVJNV96t2qE6oUdWc1Lhq+9Uuqr2ky9Fd6an0Yno3fVJdWd1HXahert6nPqPB0AjT2KLRqPFEk6hpq5mguV+zS3NSS00rQGudVr3WQ22Ctq12kvZB7R7taR2GToTONp1WnRcMeQaTkcOoZzzWpeg662boVuje0cPq2eql6B3W69eH9a30k/RL9W8ZwAbWBlyDwwYDhhhDO0OeYYXhPSOykatRtlG90YgxzdjfeItxq/EbEy2TaJO9Jj0m302tTFNNK00fmcmY+ZptMWs3e2eub842LzW/Y0Gx8LLYaNFm8dbSwDLe8ojlfSuqVYDVNqsuq2/WNtYC6wbrCRstm1ibMpt7trK2QbY7ba/ZYezc7Dbanbf7bG9tn2V/yv5PByOHFIc6hxeLGYvjF1cuHnXUcGQ5ljsOO9GdYp2OOQ07qzuznCucn7lounBcqlzGXfVck11PuL5xM3UTuDW7Tbvbu6937/RAeXh75Hv0ecp4hnmWeD710vBK9Kr3mvS28l7r3emD8fHz2etzj6nCZDNrmZO+Nr7rfbv9yH4hfiV+z/z1/QX+7QFwgG/AvoDHS7SX8Ja0BoJAZuC+wCdBjKCMoHNLsUuDlpYufR5sFrwuuCeEGrIypC7kY6hb6O7QR2G6YcKwrnDJ8Jjw2vDpCI+IwojhSJPI9ZE3oxSjuFFt0bjo8Oiq6KllnssOLBuLsYrJi7m7nLF89fLrKxRXpK64sFJyJWvl6VhMbERsXexXViCrgjUVx4wri5tku7MPsl9xXDj7ORPxjvGF8eMJjgmFCS8SHRP3JU4kOScVJb3munNLuG+TfZKPJk+nBKZUp4hSI1Ib0/BpsWlneTK8FF53umr66vQBvgE/jz+cYZ9xIGNS4CeoyoQyl2e2Zcki5qZXqCv8STiS7ZRdmv1pVfiq06ulV/NW967RX7NjzXiOV84va9Fr2Wu71qmv27xuZL3r+vIN0Ia4DV0bNTfmbhzb5L2pZjNxc8rm37aYbinc8mFrxNb2XJXcTbmjP3n/VJ8nkSfIu7fNYdvR7ejt3O19Oyx2HNrxPZ+Tf6PAtKCo4OtO9s4bP5v9XPyzaFfCrr7d1ruP7MHu4e25u9d5b02hdGFO4ei+gH0t++n78/d/OLDywPUiy6KjB4kHhQeHi/2L2w5pHdpz6GtJUslQqVtpY5ly2Y6y6cOcw4NHXI40HFU5WnD0yzHusfvl3uUtFToVRcexx7OPP68Mr+z5xfaX2irFqoKqb9W86uGa4JruWpva2jrlut31cL2wfuJEzIn+kx4n2xqMGsobaY0FTaBJ2PTy19hf757yO9V12vZ0wxntM2XN1Ob8FqhlTctka1LrcFtU28BZ37Nd7Q7tzeeMz1WfVz9fekHuwu4OYkduh+hizsWpTn7n60uJl0a7VnY9uhx5+U730u6+K35Xrl31unq5x7Xn4jXHa+ev218/e8P2RutN65stvVa9zb9Z/dbcZ93XcsvmVlu/XX/7wOKBjkHnwUu3PW5fvcO8c3NoydDA3bC79+/F3Bu+z7n/4kHqg7cPsx/OPNr0GPM4/4nUk6Knyk8rftf7vXHYevjCiMdI77OQZ49G2aOv/sj84+tY7nPK86JxtfHaF+Yvzk94TfS/XPZy7BX/1czrvL9J/63sje6bM3+6/Nk7GTk59lbwVvRu53uF99UfLD90TQVNPf2Y9nFmOv+Twqeaz7afe75EfBmfWfUV97X4m9639u9+3x+L0kQiPkvA+mEFUEjACQkAvKsGgBIFALUf8Q8Sc574h6A5H/+DwH/iOd/8Q9YANCCXWSvk3glAExI6LgBIIL9nLVGoC4AtLMTxD2UmWJjP1SIjzhLzSSR6rwIArh2AbwKRaOawSPStEmn2AQCdGXNefFZY5AulAefE9lg20G6yCfyL/g6ASgOXEKUHbQAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAxppVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6dGlmZj0iaHR0cDovL25zLmFkb2JlLmNvbS90aWZmLzEuMC8iCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPHRpZmY6T3JpZW50YXRpb24+MTwvdGlmZjpPcmllbnRhdGlvbj4KICAgICAgICAgPHRpZmY6WVJlc29sdXRpb24+MTQ0PC90aWZmOllSZXNvbHV0aW9uPgogICAgICAgICA8dGlmZjpSZXNvbHV0aW9uVW5pdD4yPC90aWZmOlJlc29sdXRpb25Vbml0PgogICAgICAgICA8dGlmZjpDb21wcmVzc2lvbj4xPC90aWZmOkNvbXByZXNzaW9uPgogICAgICAgICA8dGlmZjpQaG90b21ldHJpY0ludGVycHJldGF0aW9uPjI8L3RpZmY6UGhvdG9tZXRyaWNJbnRlcnByZXRhdGlvbj4KICAgICAgICAgPHRpZmY6WFJlc29sdXRpb24+MTQ0PC90aWZmOlhSZXNvbHV0aW9uPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+Njc4PC9leGlmOlBpeGVsWERpbWVuc2lvbj4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjQ0NjwvZXhpZjpQaXhlbFlEaW1lbnNpb24+CiAgICAgIDwvcmRmOkRlc2NyaXB0aW9uPgogICA8L3JkZjpSREY+CjwveDp4bXBtZXRhPgoYd2fOAABAAElEQVR4AeydB4Ad1XX3zzb1ijpIFAnREc2F7t6wMcbYBrfEBhwnTnHa53xJvu9LnMROc4+JE2wnhOCYJDYxxXRMEdU0I8AgJCRQQb2t+tbv/O555819T7vSrrTafSudC7P3zp3b5j8zmt87t0xdpzoJFwqEAqFAKBAKhAKhQCgQCgywAvUDXH9UHwqEAqFAKBAKhAKhQCgQCiQFAkzjRggFQoFQIBQIBUKBUCAUqAkFAkxr4jJEI0KBUCAUCAVCgVAgFAgFAkzjHggFQoFQIBQIBUKBUCAUqAkFAkxr4jJEI0KBUCAUCAVCgVAgFAgFAkzjHggFQoFQIBQIBUKBUCAUqAkFAkxr4jJEI0KBUCAUCAVCgVAgFAgFAkzjHggFQoFQIBQIBUKBUCAUqAkFAkxr4jJEI0KBUCAUCAVCgVAgFAgFAkzjHggFQoFQIBQIBUKBUCAUqAkFAkxr4jJEI0KBUCAUCAVCgVAgFAgFAkzjHggFQoFQIBQIBUKBUCAUqAkFGmuiFdGIUCAUCAVCgVDgAFego6NDNm7aJA31DelM6+rqyn5nZ2f57MeMGV0ORyAUONgUCDA92K54nG8oEAqEAqFAvyoAdK7fsEG2bNkqy5Ytl6FDh0p9fZ3U1dWXfACVrVNIe9SRR2p8vYwaNbJf2xmVhQK1oECdPgTFz7RaaFG0IRQIBUKBUCAUGKQKrF6zVjapVXTjxk2ChXTr1q0KmQ0abpempiYZMmRIgk7Ak62hgRF1daU44FQ0rb2Wm5oaU3ryDR8+TIY0DUl+Y2PYlJJQ8eeAVCDA9IC8rHFSoUAoEAqEAv2pwKZNzbJ9xw55/PEnZMeOnTJixAi1jA6RxsamBJ/AZUNDQ9oaGxsya6nBKd36WFBLvfvqG6RiO8J81NraoqdTJ3TzT5w4QYap1TVcKHAgKhBgeiBe1TinUCAUCAVCgf2uwPbt22X+SwtlxYoVaiVtTtA5cuTIZOXEEoplkw0gBUbxsZ5yzLvx2YdBsZ5Wg6nDKSfinZtYYdva2lO5wxR8AVXqDBcKHCgKRH/AgXIl4zxCgVAgFAgF+lWBZ5/7ZbKQTpw4UbvYh5e66pvKEFqAKd32BZQaoAKi1oVv1tIizEkAqji3oKYd/UM3P/kBVSy0bIce2hgWVBco/EGvQFhMB/0ljBMIBUKBUCAU6E8FXl60WO6/f652r7fKuHHjkoV02LChyYrpMApYEmacqEGpddkDlWw2rhQYLSymZjW1LnwH0nrt3q92qXtfJ0oBqW1tbdLS0iKHHTotLKfVQsX+oFQgwHRQXrZodCgQCoQCoUB/K8BST3PnPiRLlixNFlKspMywt80mNTmYAp+E8ZmBb7516ReWUpuV70BKOpyONpW61LXPuFOL6+pcAdSO9nbpUL+lpVXBdETq2h+qE6x2l6+rsiIuFKgVBaIrv1auRLQjFAgFQoFQoGYVaFcAvOOOu2X58uUyfvz4ZCV1i6hBp3fXYxkFRr2r3ic1GYQm7FTYtO57H1ta2gdIAVHdyG9lFJI4bPp4U+XRlL5eA2Tbtm2bMO518iQbWlDkjFAoMHgUCDAdPNcqWhoKhAKhQCgwAAps2LhRfvSj/5E1a9bojPiJZUsoE5qsm95B0oEzHy9KOI8vwWcJQg1QiTPIJEAcUIpzGPXTzvctT32atc/xoUPqpF0nR61Zu04OnzHds4QfCgwqBQJMB9XlisaGAqFAKBAK9KcCy5a/Jv/6r/+Wln9iPCnLPhVd9MVMe0XIMlC6pRMgtXABngaiWFMNOm0/5SaiXAbHc+dAauntoFtOrawGaSd/mrXfJq+8ukSmTJ6Uhhzk5UQ4FKh1BXYdVV3rLY72hQKhQCgQCoQC/aDADp3x/r3v/UsC0WHDhlVAad5dDyxWQiiAaV351ky3gBa06YCZA2gRZ4Bavc9EKD1S/o99Pm/q8IsF18e4DhnSJCtWrkoL/PeDVFFFKNBnCoTFtM+kjIJCgVAgFAgFDhQFNm/eIl/92jeEsaVMbgL4HAAdGA1OgUizfnLudqxQwcHT43PfUyXULCXkeO5SekVRXPWxcjoda0rbsKAyAoB20b/PSgFr161PVlOOhwsFBoMCcacOhqsUbQwFQoFQIBToVwVu+elt+gWnHQnq3DrqvsFlAYtdAaPFFWm6anxX+UhXxaa6MJR9ojQvI89L2OGWcLLeMgGrZLV9bcXKNDEqzx/hUKBWFQgwrdUrE+0KBUKBUCAUGBAF7tM1Sp988kkZNWpUefY9Fkff+HKTfb0Ja6l12Sc4BBAzqizienYalL9Lfu+4L5XtbSBdHk51aVpglPjUra/jYZvU0svXolauWi0tuu5quFCg1hUIMK31KxTtCwVCgVAgFOg3BRYsXCQ33XRTGk+KhbSAS4POHBxplE9AqmxgZXd85bGe7+V1eTu6yu3HPH3haxe/noOfR3Pz5q6yR1woUFMKBJjW1OWIxoQCoUAoEAoMpAI/+9m9Wn1dGlfqXffuOwBa+yqto8Q5ENpx+9s1uOYpSuHM0kpMsoaWrJ+ErW7r5idpvpHe25Z8rKyagA3LKe0foovuNzc3y079SlS4UKCWFQgwreWrE20LBUKBUCAU6DcFXlqwUJ566skEhQ52QGFPXQGhNibU9/l0aE+c1WlQ2tjQWIJKHzZQWQJpq523mfj8uEEuoFov63UylLerOn/shwK1oEDMyq+FqxBtCAVCgVAgFBhQBfhi0q233p6si11bSHvXPIO/Akhtv64EheZ7nJcMawKRTY2slaoz60uupyDp6YBSD3sZxDU1Nco2PU/GmvLZ0nChQC0q0POfgrXY+mhTKBAKhAKhQCiwjwqwJNR1P7hennnmaYW3IeUxmW51dL+ymgI683iAUP831/a4fPPiC+TC97xb3vOO35MfLWvLk1aEAVKspEN0wtKQoUMUTBu1Hbot/Te57PgT5OQTTpSTT/9/Mre9Z69ttY+WLb+UXacbs/WB7g0bNlbUHTuhQC0p0LM7vJZaHG0JBUKBUCAUCAX6UIFWtSAuWLBAx5UO0+7uYrzmnqoAQh1amflebaVMx6sKsTTAq9OrJaCc8lYeI2pjSYsiNA2QSSPVuV8c33MISOV8w4UCtapAgGmtXploVygQCoQCoUC/KMDY0g0b1icLJeCGZTF3OUR62LgSwKwEUo7bRrzO2s8LEktblFFYV6nTwVRjUy6smw2AaLkM0mj7NJ7N03O4skxKoGwrpwzbJSvqjh07ZcPGjeXj5eIjEArUgAIBpjVwEaIJoUAoEAqEAgOnwFNP/SJ1nZshEgw0SHSw85axb5uBYIn7yoDnx0nvxzxvNaLmx90K6hbQvJyScbRcTFo832frl+DUQZp83TmA2x1rsK5cuTp91crjwg8FakWB4k6tlRZFO0KBUCAUCAVCgX5UoEWXUMISabPngbvC2ujNyKGPMF33OOvCL0DUj+FXc6LH4TuoOnia9ZNyrG6H1FRJ+Y915RucZhbWqoq0hDIsk9UPe5mcK5benTt3lkuOQChQKwoEmNbKlYh2hAKhQCgQCgyIAgsWvFRRb768k4NitQ9YFlAKCHaU9g0KLb1155cLLwFpXhbH3JrJYeCxoV676unCd2otF2DHbbgBXfw2+572epkd2g53HofvIF2UWScrVq5K+Tx9+KFALSgQYFoLVyHaEAqEAqFAKDAgCsx98GHZvLnyi0jAm0OdwaeBXx4GIh1GqyGVE7H8ladUAKQdpx6HS9LDoXTr++dOK3NX7tEWILS9vRi3qq0st5vycufn43EsHZUW3A+rqUsSfo0oEGBaIxcimhEKhAKhQCjQ/wps3bqtYqwlAMfyUTnIOZDSOo/H965/jtsxg0RPn9KmI6U/Jasqew6/HZRTrk8PVAFlKWeFR/ntgGk5n5ahZedt8wwUV45XcMWZIZavQtmSVJ42/FCgFhQIMK2FqxBtCAVCgVAgFOh3BTZtapY77rhd1y5tKtcNxCnKlbvlc8gkvOuGldJ40o5ZXg+XC07WTMakcrw9wS8A3NbWplBJnOVra2tPC+A7HBf5CWld2oY2zdeu+bCWtmtZOZSmVFoe51FYaEsN1IO0i/ZSFmNN161fz064UKBmFIgvP9XMpYiGhAKhwGBSYMuWrbJDu0H5Qs9rr62Qdfqpx2HDhpW6YW18IHAwceIEGT9uXAKR0aNHlccTDqZzPVDbitWyek1PoM2BziDOgJEw6T3OrZDsWxzHmVTkUNghuqf/Fc6WliI9M/+xsjKBiUlXCpu6tiiTmlgiijKgx2TRzAvQHAlGxaC0rb3N0paqSPk0bNktY2qblo8r4otCfXxrShB/QoEaUCDAtAYuQjQhFAgFal+BtQqey5YtT+CwcuXKBASACtY2tiFVn3iku5SX/oYNG2S9WqWAAkCDuPHjxsrYsWPSV4YY6xduYBSY9+xzCUyBQXdYM92iCehhuXTLJtfO4xxSOUY8AIizePvqEpbQAgE1nCCWmHbdWIdUgVQtnwaslpL1SbknqIcy61v1OAUnp3FtrWCpWk0NSrmvcA6lHmY/xVFOaUKUx+Vpvd2pkPgTCtSAAvEvYg1chGhCKBAK1K4Ci195VT9V+WwCmNGjRye4HDJkaIIHgCQtgq4w4WHAxMJmNWXfLGPFOW7ZulU2ajcyADThkENknIIq1tZw/avA88//Uq9ri17DEeWKrUvdoM6h04EOiGNj330PY8nEYQGtq4MW1YJaAsJ0QF6Qa3/jg3Kt7ezlXwVSBdXWulat34i0K7BM4Fki1gJKDV7zc2GSFT+apk6ZvJftiWyhQN8rEGDa95pGiaFAKDDIFWjRbtUXX3xJ5s9/SVjjcsyYMTJy5AjrWlUIxfJpE0cKIAVG0/qSyQdO2MyCxjHgFEcczNDYaOMaN+uQgA0bNymYDpVDD50mQ6ssrylT/NkvCtiPhl2LLmbb25hMB9LcN8toMebUgM/hj3i9/nqhSwbNXSvZqxgsrGoxrbPJWamIEoBWF5faU6qdJOwbTNtQBQfw3FpcXUbshwIDoUCA6UCoHnWGAqFATSpAtypd9vPmPZvGjNLIMWNGp256h1G3jPJCL8IGoligiHOrKX71RpnEAQo48lA21tOVuq7kyJEjE5yOGDE8WWNTovjTbwpwXbB+AnFYTLlWDqTsc90T9JVAz47R/U/XPMM3SI/VvDRLvi9brhbY9ha1ljYWuLsn9OU2MyAtde0nWCVs50h7w4UCtaRAgGktXY1oSygQCgyYAvNfWiD33z83Qcc4naw0fPjwBKSM92MMKUDiPjBpYKrfMi+FARig1MDUrKcOpRZnp8a6le4cUBsTaDQpQHTKVu3mZ31Jyp82baoMyWaMe77w968CBqdMMGpLYAqQerc+Pj9gcH7NsY4Sb65d7xPg1CympUj1jpOPffPP5AMzhpXukcohH9wjXHMs6wBuQwNLOamlfen18tmPXSX2CQCD5XaNpu7dOf/hk0MpYYdus5gCz1jzw4UCtaNAgGntXItoSSgQCgyQAg89/KiOI50nI0aMkKFDGT9qE5ocPh04bR/oxFqKhcxmVXMcoDAANSi1sFtME24YTJSAwsHC8QKQqNexiViwsKC2qGXsFR3fOv2wQ1O7Bkiag7ZawA2Iqyt1mxvUFRZTBz582wxMua7sm+VUj5UVNCunWVuJtc+CmnXVrJp2P3FH1GnduowUllctq3DWHe9R5XuodE85jJLew/ici8aU4mzf4ml7YX0t6olQKDBwCgSYDpz2UXMoEAoMsALLdZmnX/7yBXnhhRfLFlLvsgdCzRpqVlD2HRzgAMLAh3WFmpXLjtuxirTJCqZpSt38nLbBbCEAoMBWpxYsZm8PGdKkdUgaWjBJA1hww/WPAtbNXWkl5fq75RTw5PrmVlS7ngapAK1eSliwwnWWLK/MyKerH6sqM/SxWlp+hg4UP2xSGQqORTEKlQwzKC0iQBtw7hPmHqr0ifMJWw62tvIA58GxcKFALSkQYFpLVyPaEgqEAv2mwHpdxukHP/hhGtOJpRTww1LqYMr6pMACW2EptX2zmNqak5bGLaNmNfU4TkaPJCAlDoAAZHOQKE7YIMPAQqFYgYR6gdSVq9bIsKFDZOrUKd3kLUqJUM8VYA1TB7k8F1ZEuuttAptZsL2rHr+6K5/rmR+368uPDAW/csFAocEuUQaj+NwTKaYUxw8UrK5mPde1nsolaGo9BlTaPVS03e6dImEBp6SxDaus1Q8429auqxJU5y1KiVAoMBAKBJgOhOpRZygQCgy4Ag8++EgCDEC0GjwNLAwyCftGo0tGKkKlcyiOW75SdEpRHCO2+nh1HADhaagnhZVagORt27enLwLFrH1U6xs3efJkvfZdvwYN5szSSNgdYeu6L45ZWovnh4dZKFnbtMiX5/cyuL5cZ9vHim5QCoAahKa/njX5VldFVCojjyENzsr1Njig4mMltfZyb4ULBWpJga6fyFpqYbQlFAgFQoE+VICvNf34xz+RxYsXy/jx4yvGkwKotll3KvBZWDrNWlp0tTp0VgKnwYYe4z/AQ8HSyyjDpp5Pgs7M5xQ9jrDat3SfGeC2x7CC1avXpK9IjRo10iLj7z4p8O53vUMnvN2XQJNr7c7AzqygrHPq148fMTiuE2k83vNx77jjujWkLvRyTPq2PZZVz+s+2bg3cEAj5WNFpYyOtkqrqy3ST+KivZ43FZDKIFSAKIBMXZRN/Wytuh7qzp0tcpiOYQ4XCtSSAgGmtXQ1oi2hQCiw3xW47bY7dUzpCzJhwoTUbe/WUoMBuu29u97h1ECEl79tBgSkZytcCUQr4uyopfVysvwZXBTlWAjoMZiwT1MyERxQWbV6tdY7OQ1BqM4T+71TIH1nvgurJqWgvVtGHeb8mvgYU7r0ibOxmpaea+1jRzWUbJ/eKsAQSGQBfs9DesqnHPsxwn1EDiZTKaBWtc/aVHnvcV/k96LfN+ZzLmbdpR7qpxufttt5xRhT1A5XOwoEmNbOtYiWhAKhwH5UoLl5s1z93e/rWqErZdKkSSXLqFlIeakDBvZyhwps2zW+Ei5J53kMJuwECKd4DdjxyhMjLv2XZ6pMgsEr5e0sfUXIrXV8IWr1mnUyavsOmTRxQnWu2O+FAowrPuWUU+Spp57ssksfiLPNQI6i/XoCfek6lq4hYQdX0iXQ1Bn9BfapxVLHCwODZhW1H0E2ltXGKwOd5GM4gM3Wt4lweiuUnIKt5m9L91camOoHuvDNSkr7CzAFjDvSV8ywmLa07JTRo0d1kTeiQoGBUyDAdOC0j5pDgVCgHxV45NGf67ful6qldGIZSh1GzWpqYOFx1dBBUx1KqsN+Gnmeyrgib15GXo7HAzzuEvyU4BeDGu0EboYObZIt+sWoAFNXau98xutOmTIlwWJ3Y02ZMGRbQ4I6wJLrgG8QWQzV4McD1xH4w4Gl2dVMM+rNasqPIFu8362kpKdc8tqEKCyxmgaw5GDJpVn5aQKd1dHVbxu/hbh/KIN9ymWj3RZul+3642a4fnEsXChQSwrs6SdXLbU12hIKhAKhwF4r8Pjjj6t1aEwZSoEIBwsDSreYApFFNQ6M5vsB94t0vQlhLcVZvZVW1TyuGpKxpNUrvJi1VWTZ8td6U22k7UKBN73pXF0ntvsxuw51AJ1t3gVugOfxQGDRPe7wVwmVnQqJbW1mMbVyKbMARi/LIdKsnRmW0iWfANPLJ691zRcz7YmjXNZBJZ3DKensHGjDjh07Fcon66dwh3WhSkSFAgOnQFhMB077qDkUCAX6QQHWKv3hD/9TPzG6Vic7HZLANAe+vAkAqUOp+/nx1L+eIjJYqEyg1qliZn3VIQPREpR6GzzNrvXZBJsEqrp8ENkIM4u6Xf0hakfbubNVli5bLocdOi1BtpcVfs8VGK9f+TrssMPk1Vdf7TKTWR2xNNrXnixRXZo0V50Bi6c78ikKVnTlt+vyVG1tNnaY6894ZsabYiHl2vq9wzHf2qsmP9GVz5efsLTiyOeO/OYo00IF5Jq1FChlQteOHTtkzpyT0vPg+cMPBWpBgQDTWrgK0YZQIBTYbwr8+Mf/o4voPy+TJ09JL+EEevoydzD0F7v7fdYQrcPr8jIb0hejio6qjCk8SYXvbUq+gobvJ2jRhdiB1J26ygBbLMBfIV2vdqZNm6Zf2Vqs+hbXJi8AuLNjrG1afByB64EVEp9r4mDp1wnoLBywaHBox+2YLRFVTLTjF0iCWiVL6q2c/GRxWmWqk3IKGLWaPC97hHMwBUppL+NLh+gwhkmTJhbNi1AoUCMKBJjWyIWIZoQCoUDfK4C19Lnnnk0z2HmJs7klqqe1+Yu//MJv+7l88yN/LnfvpIST5DPXfk0uPRwoKSxeqWyFApaKwlEnUGoWMiWbV6+Ry97z9/I8B4ddLFc99ldyfpOBBFHVzkBGY0uco6cBmaTyGJKwddv2ANNq0XqxP2vWTLnvvp9pt/aILnNhfTTI03GjCUTNeupd42TiGmEx9fss3TeNR8tFf/7XcrFe/3QPqEGVPDjf5ytQjDfVGK0jXdaKcOfkC+SL//HecrmkZWJU7vz+yO9VjjuUWtutS5/hBtt1TdxjjpktsSZurmKEa0WBANNauRLRjlAgFOhzBR7VCU/AAhvWRX+B96QiIMGdvfAtwl/+fizRRHln1wD1Nik8pm7eRJSaRseKFi4PF7Eeyuuj/b4P2DDeEDDdsmWLTDhkfK/Oz8sPX+Tkk05M40wBOUXDXSRBc8ZrMkGKNG1tfDHK1hslMV8My68NcVwXd1wr9v3a4dvMe1vGycLE2ax8xoXmYcomDY4w2+4c5ftm41RtLCpQykx88h977OzdFRHHQoEBU6B4cgasCVFxKBAKhAJ9r0CLjuf7+c9/nqCBT4j65yWpqasXu73IsYz5VrzcvXV+zPfxLY5xpWZVo5wENxqBhRRLaSOfOlU4tmN6mLGFZE5OQUPBxbt9y2n8sPp5nLcdn80Bh0+sTjjkkCxXBHuqwJgxo+XSSy+Va665Rlc8YJZ6cXW8DABPxNYt9WtOOr8O+Fwnv1YALMCKSz8i9Fj6caL7+Fg91UvpzXrK/cHQAINTLKgGqNYW+wxp1xP0UiWlP0XbvBvfhxDYMlHMxJ8xY7oMKbUtzxvhUKAWFAgwrYWrEG0IBUKBPlfg6aefkfXr16Uu7nIXutYCQOzJGVwUFlIgA3gwpy/6PRQAHJDewdGhxeM6qyymCUz5HGXqJi6sog453VbHuWhdgM66detljK460NQU/6x3q9duDpx37tny8MOPyKJFL6ueXWvIdTVwBPa4vm06XhPfrrcXz/V2CCWOcHfXknuL+5Pj3B9shNnsXvX7jh8hxZ1Hutx5HuJoJ/vcHIwrpQ4mb7W0tMrWrVtl2rSpedYIhwI1pUDlnV1TTYvGhAKhQCiwdwrsbGmRBx6Ym17yXVm/7KVtZXvYX+y8xHHsm5WsSOdpLMb/GkT4MXxABagwsLCyHBZSPJY2z66+feZUoQQTWtrPj6ao1B7Kdudls+/hFfrxAG+/pwu/5wq8970XdAullOL6c1/QtU/XeGuaaQ/0taQwY0iJ943jbD4e1eO5ToTNr8wDRJLe6rAlpjw/6Ys8dswnNRFv6ax+r5u2AaXMxB8xYoRM1WWiwoUCtapA1z8La7W10a5QIBQIBXqgwKOPPi7PPPMLGTNmrKYG5grQc4CkGAcN8w0wLR44td/tnr7wSZG7PJ/Fg510sTswssSPznHREh088/yWFiNqXRpyoBbTBB/2TXVSejurw2XIVQi2saZbpVVhJya15Pr2PHzSicfLmWeeqZbTh/T62bWqzl1cC+t2F2ktJ/F7hC58ANHHlRpkGlASB0Bi8cSSyjG3lLqVFR9rrA1BsfuIa+1WUn745Pe03ePcJ9YUyqQt+GwAMD7W0ks/8qFYu7R8xSJQiwoEmNbiVYk2hQKhwF4rwEv/pZde2uXl69BAwYRJ5z4vfaxg9ulG60plv67OvsLjec3Pm+bW0lQqJScYdSB1uyhd9fW6FJGDRV4CgJGOazctbYKj8VO4lFBrSSHqx+XtSRH6x8ClTjZv3iJDJ8RYU9elt/473v5WeeihBzUbWhc/aKrL8WuBtdLTNTbadeOYQyZhrjs+1xRABFyJI0w6wmwct3vRwJX7j3icwyjHfUsHSn/I620i7PtAKZZTn4k/duyYPFuEQ4GaUyDAtOYuSTQoFAgF9kWBrVu3ybPPPlueeGJlOUCaTxwv8eqtgFGzlvlxXvIAgu9r1rLrTJNiKMsgBmhwp7EJIpj4ZFaw4pinwScPFtb0FSCFFdrhzuv0ffeJ10q1BquDeMZGNjc3y8QAU5ep1z7jL88773yZO/eBpGdPCgAwuX5tbcUPEwdDrhPXF9+B0e8nt6ja9Tc45T5j3+8Xwmy4POz7+Pk9ktdBGDDdtm1bGmpw6qlzSB4uFKhpBQJMa/ryRONCgVCgtwosWLhQNm3aqGuXjipnheHMAla8xB0UPJHvFwCKBQoYrcyTIMAzUaouG+SgQXQqJy2kXsBsNVBk2VOQPOmTkukTkmb5snoAXts8j+37Xu53Db15igjvWYEFC1+Wu+66s+L+2VMuu362PikgiDNLp1273Hrq17O4zwxc2feN+8XvKb938HPn8V4exwg7mALLbHx8geXEPvOZy+WQ8ePzIiIcCtSkAgGmNXlZolGhQCiwtwps2tRcZS11sHTfXt7+Qs99TVECwRxKCRegQPrClayWJXgEBOjWBRqKcnUUosIK+24FK/IT0jrVstWu3bbpc5O6XFDKW26L1ef1Un1Rdn7MwnTZhts7Bbh+Dz74cGnJqN6VwQ8Lv0bkLMDUFtV366hfO447RDqQ+v3BPveQ+3m4ulVeJz7l4XMeALJ345977jkBpdXCxX7NKhBgWrOXJhoWCoQCe6PAkiVL9XOLrEVZOH9ZOwj4PrDAS5wXvx0D7mzcn3fr67tej2PNshd/xVcmNXUBBFYfX+Zpb7eueWIcUtvr29J6piy2X70cSoKINMtb86qPo9xKvxJIgVlFWk1XpMWoZp/OTFnjTy8V+Nu/+2r6NGljoy2YzzJO1cC5uyK5Z9xiatZ2s4QDmAaLrWl4APcdcYCowydhNlwe3xWU+j3lbfF70O9v2sBM/E2bNslHP3qpnHjC8Z40/FCg5hUIMK35SxQNDAVCgd4owEs7d2ZFKpaA4hgvct+q0/qC9eQj7M5BMZXnkfJLuebXLpJryvt7E0hkmdoDlHo9lOThEqOW2+zxXhv7ttnEKZbLipn5rk7P/ObmzfLaa8sTFHIP2W1kYz0dNntSEtfKxgjbPUc57e32I8Py2yz8vCyrz+41h1iuJ/Hse7j63qYMv/aAbw6mzMAfPXq0HHnE4XlVEQ4Fal6BANOav0TRwFAgFOiNAhs3bqxIDiSk8ZulF3f+AifMhnMIIC2fg+SFT9igAauqdcnWa3k5ZlRUtlc7OkFF15hsaaAtBUBTf+4cQLRhBiMla6mBt3fj2mSX1avXyIzph+XZI7wbBR7RT9ded90PVH9boomkLNXEDxPAEL+11YZj7KaYdIjrBMhaXltYn3uI62T3EpOkWvW4WUjdOko9hP0+9LTuU3geZt/viRxIuZ+Jf+c73yGvf90Z8cEFhAo3qBQIMB1UlysaGwqEAntSYOnSJbsksWWgiiV0KmHOrY2F7y96YNS7ZL1rXwljl/L3LQIA1vGApUlUXhZwsYurglIHE5LaZnkAmHA9V4AvPuF83VD/UhiwqDiYxiyzxNPOnS0JKonbkzOrKT96sHxSjlnguTbcX/X1NmSEbn0uFysqAJUGwsUYU6+HeK53fm0pB4cPDLMsFBOdzjrrLDn7rDd61vBDgUGlQIDpoLpc0dhQIBTYkwJdfU4SSLDN4JQXORDgE1LY56WP7+BQhFmHEvAjDZOaQA13x8snr/pLuXjGkAQfBjRYvrCyYf2y8YLlMYVYxRREGpb/QH7loq/LC6kYbYta49obS3TpRVf5CUJLNTuE0kZrO4Bi50i6cD1X4Jaf3i7z57+o8Mk1tC58G1MMfJrF1P2RI0ekRept7dI918E9x33D+GTK1MuljjD3HxZ4G3tqMMr9yBhTGz5AnLXHIDgH0nQvlK4z9zH3AGNKd+7cIYcffoRcdNH79ty4SBEK1KgCAaY1emGiWaFAKNC3CthnHtvSyx5Q5GWOlYnuU/YJ+8sfn/Q4gwNCWLYUTpl9zW5yBh7W5U+sQSyHgAezcplFizB1NWi9dTtb1X5Wcp104eunKTGqqcu5ErDN9+24WXYNSq1OCwPOBXinwuJPtwrwIYKrv/t9ef755/RjDMNTOvT2LnyD08Jy6fcGy5DRFc8yTD0BVO4DxpjWZbPmqMddXV1rusesS9+GD1A3P26AVK+X9Pajo/iRpTHpvgWqjz/+eHn/+98rEw6Jjyu4tuEPTgUCTAfndYtWhwKhQC8VAPAAyIYGs4wCcwYN1n3qcGcwCfwZUBJvs+xJDymm/8u1OywAEdZ9i9WVvN59a+FOBVAc6TtbdRxgUYIuF0WbLKISRCzO6rC8xKQyaKCWYudhcW4Vtlzxd3cKPPHkUwqlz8rw4SNTskoo9bGl9mvBfpwYJBIeNmxYWvlh8+bNCVK59ntyXDO/tlw6v6ZcQxzXkbHNPjZVfyel9OyTnuM4fnxgJcVxPwPJl19+mY4nPT39EEoH4k8oMIgVCDAdxBcvmh4KhAK9U8Be6nw3vDGBAS94LFVuOTUIteWjHCKIw3plVlG1oJWWc7KaFTL1OEDon48kPXmBjI4OAxaGAgAvWNiIr9P0hVO41HZor27K5/UWxy1UwKhBDfvU5d3F5ltcdd7Yr1QA7W688UYFzBHpPrDrZROPTH/v0i+A06+L+wDjmDFj0leVduxg7dgibWVtxV4Bo0Wch+xHhVntGX+K5TZ3bg03SLXv3h922GG6HNRHZc7JJ+ZJIxwKDGoFAkwH9eWLxocCoUC1Alg8q51BHIuOAw912nUPnBqAVvvkpQygDweIsGlvfwJNHS6YWTs1TrvhAd0CWGzcoI4u1dwGoMCEFlEqVwPatVugqQMmbQNwqXVXRxnmsObaZjBjs/k5jw6FZvPLAwU8U/glBVavWSvf//6/yo4dO/QHh70CgUyun/nWjU53Oo447hm/D1Jk6Q/XatSoUcmCiu5sW7duKSexe6KbC1pOVRng2tL1zw+h3AGmjCNlCahjjz1JLr74Ipk6ZXKeJMKhwAGhQIDpAXEZ4yRCgVDAFTjxxBPloYce8t2yD8QBDsBCW1sxA7qIs/GmAClxDrh+3CBDJ6jo6NAyI2oofbUpS0+FltZglH2b/GJdsgl+shKAUaAjDRMgcYXlzaHGQJSjDqW5b5bTAlA5Fm5XBRYtfkW+/OW/TmOK3SIJXBbjSq0LHyjlGnYFpaQvHNfUxvV+/vO/JYdOmyZLli6Tf//3H6T7Z+HCBeWvkNn9VJG5KKaLkJfLWFau53HHHS8f/vAlcvSsmV2kjqhQ4MBRIMD0wLmWcSahQCigCgCSXTle7maFAkBtaR2DD7eM1acu/eqJUaQx8LMu+jYWwS9XQDe8gWwOgw61BqisK+mgA2AqnLTlcGvjBxnHiqsEH4NcL9t40yDV2mRQ65ZSzo/z9/TlZkYgKXDnnXcnUMzB08KmM4Bq18z29W/aL+KqhbTJR+9733sTlHL08BnT5U//5I9SwvUbNuiPpEfTNXniiSeSlXbbtm1q+dxZXVC6ZqNGjU7t43rOnn2MHHHEEXLmma9Px2JS0y6SRcQBqkCA6QF6YeO0QoGDVQG3cHYHZ8SThkkjjC91kLU4m4nv2gEkXp7HMVHJALEUkyxmoKpPTjFwJC91AaKMLgA4AVSgta6ygGR1dYtpfsjL8LqBUSsTmAVAHWoBUltlgPJnHnWkZwlfFWBx/H+++nvyzDO/qFgWykDUhlg4lKJ5ukZ6vTyMiFw/d8As14F7aNq0Q+Xcc87yQxX+IePHy4Xve0+K+0BpCSdgdePGTRXp2OHazpp5VKpzl4MREQocRAoEmB5EFztONRQ4GBQ49thjZO7cB8pLAOXnDEwwdNS6zs26ChAAIACoT4QCTIh3KCWMM1CssnamMs0qmtfFhCrK8bLwqTeVo0BZWF21KxhLp45lpOuYhdytHrPGkd7rB0St7ZwHWw6ntp4lEBauUoFXXl0ijz76iE5WGlsGvxxK3YKK7rZxre3aUVIOpexzH+HGjRsvv/Hrv5bCPf0DrLKFCwVCga4VCDDtWpeIDQVCgUGqAEv5AJTdOaDCurxtBjQwSpxDCV35fEHH4dDL8S7+NAvfIxkfyhqkHUx+ok6zllKeb0BlUYdBTZ2CaO7a1fLWrt3I9fW2vqoD7dChQxOAMlHHIdTKtdn4lM0+EOxbU1P8s55ri4Xymmv+rQJK7UMIZhlV7Ew/CPz6m2/DO/JyKsOdaaH9yy77iP6QCL0rtYm9UGDfFIgnat/0i9yhQChQYwrMPnqWjB07TuGyRWGxa8DA6gjIGZQUY0wBQhxwwnFgFMgl3mG3vmT1TAkVRAFGNgPZUmyybHLMoNRi7StQLCtVB1B6ZGeLtOqnLlvrbAmrIUOAVztogGrrZm7fvl3b1FI+Rp0ANnUYlLYnoJ4wYYKXfND7QPt3vnO1rFmzOnXhIwg/EtIEtGQG5StLjP/1McD017vVFL9aQhuewReWPvjBD8qJJxxfnSD2Q4FQYB8VCDDdRwEjeygQCtSWAiNGDJfJkyfL0qVLEnR01brcmgngsYwUEAhc4vKw7+Mn+ARE2UlO4TON7TR4VeZRWAR+6H6nK7gYLgAQOeTyEaAymGppbboMUKsu/I8DmvgIgH1pqpjJP3z48ASg7e2tCU4pCyjFZ31U/G3btsvRR0c3MToypOGrX/uGvPzygvIi+g6kXEdg1KGU9BzLoZS4SsdxW87r8ssvl+OPO6bycOyFAqFAnygQYNonMkYhoUAoUCsKAJXnnXeeLtlzrYIHa4nuYvZKYIdV0iyn1u3f1mZgCrTkYGoQY2UQbmg4Xi750lfkI1o26RoabHyqoyZVAqcsEcWEJgDIoKcEtlpx/ZQL5fPffmOycI4YMUKGdrToTG0DU+pwi6kGUx1ALmGge8uWjvQ5TKDUwZRPmjL8gG38+LG1cikGtB0PzH1IFi16OY015oeIQaldi+KaFteVxhbxXTWdIRPtMmvWrIDSruSJuFCgjxQIMO0jIaOYUCAUqA0FgIs3nX+OToCaW7Ka7vrPHKACzHV22vhSAK8r55ZVfHekBUiJ87GjBomAKrAIrFIuMMnGOFAmU5m1jeEBW7Zskddee01GjhyZygGQ3QJqbcMa2qTHsL7WpyEFiqjJHz9+XBrfuHbtuhKYdiQg5fOYhx8+Q8boAuwHu5v37PPyox/9t+plE8kM8BuSlvZDwX6E+A8Qjtu18m78XEHgtVM1bpMZM2bIp371E/nBCIcCoUAfK9D1AKw+riSKCwVCgVCgvxWYNGnSbqt01jT4BAwBSANE4gw2bXKRhx0eKbgAyCIN+SkXCPVybfa8lc0xyli2bHmCSZ+w5GNEqcfrIGzlWVvyk6FbH/i1NHachdiH6ABVYOtgdgDknXfelYY9uA67t4SSqtJy6vlyn8+OnnHG6aUfCfmRCIcCoUBfKrCrKaEvS4+yQoFQIBQYIAU++YmPypIlS2SDzsruyhl80o1Pdz8TiFpTssZGs546eBpgGmiylJPDIPEAjx8n3NHBOFKb8ESYOLOu2iL9wORTTz2j1tLl2uV+SCrLQXTIkNbSvk1moh42LKzUC9Q2NmKJtS7nqVOnyKpVq2XduvXCxKhp+tWhE044rqtTPWjiFr+yRP72b/82XZOmpiFJf7eGelc+FmhAtLCWmpXUgZ70la5TLduj5JJLLpGTTozJTpXaxF4o0PcKBJj2vaZRYigQCtSAAozdPOaYY+Sxxx7V1uxCG6mFZtkETumaJ4qJRYxHtK5eQNLDbnUDFLFw4jjujuPuKIPuX9bKNHC18uguBpRZ/mnr1q0pP+W79RN4Yj9vA+VY3VY6cMr50I5DD52W2tLc3CwnnXSCDGVK/0Hs/v3fr0vfkx8+fERSIYdR78LvCkr92mWXUPNzPW1psVNOOUVOPeXkg1jZOPVQoP8UCDDtP62jplAgFOhnBd761jcnMGXmPZDYncPKyVjQjg4mMpnF1K2VBpZmMSUOC6eDJD6ASDxAWX28vp61UgFPwLReNm3apFbOlckCunXrFk3PjHrWQe0QW7OUNnRqlzwWUhtewDqZcC77ajhVZ+DsC8QfeeQRMmHCITJ2zME7thSL8T9f/X25/gf/Lm9669tUa7vSrhHg6T8w3CeNAX9X40rR23Q+RYH0nLPP7O7WifhQIBToYwUCTPtY0CguFAgFakeBGdMPkyuuuEKuueaaBJRmBatsHwBizrrlOzqASYvxMZ7sAY9AaA6mDqMAKmE2h1bftzSAqShYNupC72OEiUq4rVu3lcGUDwM4pDJWFEAGUtvbbX3Tzs6hCZY6O4ck0GVJqYYGg2ImUS3Vcavjxo2TSRMPrnVMX1uxQj5w4ftl3dq1VaCZz8A3izXXIodR9nF+vdNOyVLKmN33v/9COe/csy06/oYCoUC/KHBwj5LvF4mjklAgFBhIBU47dY52eR9WAtPuW+KWUVJYFz+TisxS6uNAgVPSuU/Yj+H7MT/ux9inLCx4wK3VRU321aYW1jHVpZ5sElRbKpOw58e3jXKsLMogv3M15WKRPdg+STp//oIEpaiJ2759W9LZAZQfI0W4gFDiunb2QwXYP/74g3vMbtf6RGwosH8VaPhzdfu3iig9FAgFQoGBUwAAOe644+QXv3hG1//coQ3pDkiKNhpYFrPiOWIwaaCaA6hDqMe57/EGkg6UBrYbNqynxASr+EApcOqQCYS6s7BZcz0OS27hfAyqdVczdpWhAEyYOpAdOv/88SflG1//mqzUpbfcYTmdeuihOjRimEaZJm4p9TGn3BMWV4Cq5behHKNGjZJf/dVPyjSdYBYuFAgF+leBANP+1TtqCwVCgQFQYKROhAJSnn322WRN60kTgETGheJyi1ueFzhy5+FqS5zHO6jSlb9x48Y0k74ov7DSkp88DAnwsvCt27mw/mmUunzfhgtgmd2icDpa4cq7qr2NB5IPsH/00ktl4fz5FacF4NMNf+hhh6Vr7drh++a6mIaW3a6F/Ug4//zz5LRTT6koN3ZCgVCgfxSIrvz+0TlqCQVCgQFW4HWvOz11g7Owfk8ccOjd6fj+ZSWWlfJ44IhwfrxIZ/F+jLTeXT9z5qzUpU87qIfxpFhBma2/bdu2BK347LMBWjt27NT8QBdfiWop1+ufI7XxsEC0gfRaXUbqQHb33T+3wlKan+vypUvTqgdmFXUgNV26glLyun6zZ8+Wt7/tLXlxEQ4FQoF+VCAspv0odlQVCoQCA6cAk4vOOfccXdz+NVmzZnWPrYlu8aTlWNywfOKYUe9h0rB5t30edkupdcnbAvtYQ+kuph2UaeXZl6EcZInzclMC/WMWP4+3fdK4JTAPA8FA7PDhw3p8rl7P3vic3/oNG2WHDpfYoSCdYBqgLm3bdOZ8X3wAgHOkC//3f/fzskPL7M6tWb1ajjjqKB3SwHqmaJVPfNo1F5Zm2vyZz1yRPv26a4qICQVCgf5QoE4f8qIvqj9qjDpCgVAgFBhgBf7h29+R559/LnX19qQprB2Kpc2sbXWpm9272jnG7Hj2OZ77AKPnqw6TjmWOXnzxxYom+NJSQ4cOkdGjx+i33oelT5cyGYcvPo0YMVwBb2gaR8oSU4wlZWNcKWXa1phgzP5179TF/MfJuLFjK+rZ150lS5fpJ1+Xyb333pfaCAi/+uorCT5NAxuKUEBzh0yZMlXPyZa1eve736kg3ylHHjEjgXVP27Ng4SJ599vfttvk9aqDu7POPU+mT7c6rC1+xH37sYHOn7nycuHDBeFCgVBg4BQIMB047aPmUCAUGCAF1uh35r/4xb9I3eG7W980bx7A6Oti4jtA5jBKmNnx1XEOZ8R7mLJJu379ev0SFJN3sBGY9dQW2m9Ia5vyoQBgDgsrYeAUIB02DDgFTBvTPj7lFaCqy0ppfbhWHW7ARB6O761DM2b933rr7bJlyxa1PC9LRdEuzouNujk/wNTPM/fJgC2EjeEIDKtgxYTp0w+T0047VcboeY7ZzXqsry5ZKu9/73tlS2m5ra7OpaF0jvXaDuqmnpNPPU1OnjNH22XLfZnW5Da9sVL/3//zx0nfrsqMuFAgFOg/BQJM+0/rqCkUCAVqSAHGcH7t699Sq9+SBCw9aZrDKMADPOLoInYw4zjwwz4QaOnseA5oHiY/aekGX6HrcfI9doclh1PKHDNmbAJTrKZsdIkDqGwOplj8CG/evEVWr16TYDcHxGnTpsqcOSfL4TOmp3ZR957cRgXRO++8R4ccrNFVDZ5ObWW2O/VzfmadLazJnIufW3WYuvxYXq8PdQAOKW/8+PGpnXNOPjGdX572937/D+WmG36cR1WEKR9rqUOpW04BYWB+in62dZrO2J869dAEx7Rx5coVct5558unP/XJirJiJxQIBQZGgQDTgdE9ag0FQoEaUeCaf7tO7rvvXrWWjexxi3JAVRYquwRGpbVKgR4HQ/wc1LoCNOIAQCY7uXM4ZbjAqFFmNcV6CmQ5mNLlTxi3RC2KixYtSvvUCTxSr9fNUlJvetP58sY3vM6r2MUH4hjDeeONN5XHwDY2NmmdBqNYiykvH8Jg513U4/sUnofJ53EpUPpDGurFAaoMCyBurA4/OOecs+WE44+Vr3z1G/Kdf/hmKceuXqqnBKUcBUqJ8y3Faf2U36bl47CmfvijH5e/+eu/SvvxJxQIBQZegQDTgb8G0YJQIBQYYAV++cJ8ufrqqxMU9rRrH+DBlbxS2OK8q9/AFEAFyHy8aUayqSvZFskHzJhQxVehgCdzBlZmiTU4BUx93Cld+0AqwPnUU0+qxdQg1S2aDqY5GAN95513rpx+2ikJ2qjHYfihhx+Tm266SVbrZ1NHahc95VAmgExZVp6BKWXm5eYA7DDoQOz7uV86weS5lg6nRLolFf9n99wtz897Js9SESa/W0exljqUOgiT2NviGXfqD4CP/cqn5Hc//9s6VGKUR4cfCoQCA6xAgOkAX4CoPhQIBWpDgU2bmuWqf/ynNIHHIKZnq+k5VPlZOFwRD1BSlm02IScHWfL4UlFMBGLJImaG011vsOjwa2UBglhOsZAytpMNeHzwwbnqD01WTEDVxp7apCgHyBwimXQ1depUuezSDyXY/L//789T859/7lkZp13pwChWUkA0HzfqoMv5EE5AWDo/D1f7FGx6FudSvU+e3DmUku6ZZ56R22+5KT9cEU71qS44oNTHmBLv5eb1kY5r9N73f0C+/KW/YDdcKBAK1JACez8SvoZOIpoSCoQCocC+KjB27Bj5kz/+QurGvu666xIgMl50T85BtDod8awxWl/fkcBMETSBUs5g9F4zAQgfKKVrefbsY+Szn71SbrjhRnnssUcVbu0TpgAsbuvWLQmsgC1g8zmFSSYjjRyJxZWvPQFkxVhPb18OaYDtWv1C0hNPPi2nn36qvPDCL1PZY8eNK0OpAa1DtdVFnV6vg5/H+b77xOPw87rz+JQg++PpHKLR4547bstS7Bqso00lUd1qSiovqzrMeN5tamF+5zvfsWthERMKhAIDrsCe/9Ud8CZGA0KBUCAU6D8FXnfGaamr/OmnfyGLFy/WWfPrkvUSCyHQ11uHJZQuegM2y00YYOQYC/bTJT9t2qFyyimnyJlnvj4t7fSud70jzdh/6aX5yToJvGJJBHa3bduagI8JUy/Nf0FGafc+7aNMyrYxsGYx9DhqBvjcZzjAzTffksaS+vharKSAYwGlNk6TOBvvamBq52JDEwi783iPcyhlPw97Os9X7ZO2ublZHn/852m8afVx3++uHPLj3Pf0TLA6cuZM+fBHLpOzznqjR4cfCoQCNaRAdOXX0MWIpoQCoUDtKcDM9PnzF8gtt9ySQBWIBNywSvbWYRXFYQlkrOeUKVPk4osvlrN3A0lPPf2MXHXVVTqWlG+/myUQSCT//Tr2crR+4nT8hAnJH6rd+cO1fUAn3fl06wOsNlbU1jklvFS/jPTCL59LEMv+IRMmprLptic9G5ZazpMwAJiHAT72caaFgSfxDosOhfh5PHk8DWGcp7U9SeNsv/nVv/fdLn3KwEKajyklYV6Wt9ELQLNb77hDjjh8hkeFHwqEAjWmQFhMa+yCRHNCgVCgthRgYXqfxX7HHXemmepMUKI7HGukgVBhNey69VhHsXa2JevrjBmHp3GkZ599lvCp1N25006dI0cfPVtn27+cutmpE+spZQG4jEllIs+wYcNTW5o0nu5qrLT4tI+62YA54OyXzz8rG3T91KlqpU1wp2lwBozAZQGYFm/HUqLsD+l76jyt++Sz+qyMPJ6hCXtydOG787zuE58DKvvoNkfXM50yeRK74UKBUKBGFQiLaY1emGhWKBAK1KYCrH+KFfWFF15K1sJVq1alMZ7dtRYgYtmjSZMmyuTJk3WbJOPHjS1bHLvLl8cDmPfeN1d++tNbFERbEtAtWfKK/HLevJRsmELyIWo1HaGTppi1P2LkqATOZjFtShZUrKEtLTsVSp9XON6ux82yilVxTOmrUNXWUo7ZBK6uZ+ADf2wOmG6hdL/6uIOjp8/3/XwXLFggt996i2xUcO7OlWfdl6ym1eV5mzw/MH7Mccfr5LZvy6G6lmm4UCAUqF0FwmJau9cmWhYKhAI1qABd+Wz9CTiA3tvf9ub0ucyvfvUrCpUjpVMtoO74ZvyqlSvTLP32ZDHtSNZSoLixsS1ZVx+4955kNZyqC8wzprRJP2HaqLBK2b5EFmGspQ52BnwFeDoAdgWcxOFyv7KcylnypK0G05V6Dtdfdy2HunU+6z6fge91ksmhOC/g+JNOkv+8/oddHsvTRTgUCAUGXoGiL2Tg2xItCAVCgVAgFNiNAkcfPVOOOOIotZruSJCZJwVIWWKKpaBaW1sURlvThrV13do1OmFqW7KMGogaJAJ0jFelR9575XNYdBDN6/HjHle97/HuVx/3ffdJRxhrLV/h2p3L8+wuXX4Ma+k555wXUJqLEuFQoIYVCDCt4YsTTQsFQoFQIFdgmE5m4pvul19+eRofmh8jzFjT9boM1Fr9gtSmjRvTJKJ169bKgvkvavppaWJUWqNULaXMwLfZ+2Yhdeumz74HAg1YK2fUV9fp+6T3Mixv1+NPc7j0PMAy40rn6he4unOpTECaetg0Dy4vL7ecYi1mDO573vd++fjHP9pdsREfCoQCNaZAdOXX2AWJ5oQCoUAosDsFgLhzzj5Tli1bLvfdfdcuSYGxZh0D65C25JVXEpAWM/OBO4NRn+SkeJfKYR/nQFrEF5Dp5SZQJGFKXxxPEaU4h8bufE9LmVh0t+iksu6cgyjHvW5vC3HVXfhYSt930cXypb/6C500Fq86NAoXCgwGBcJiOhiuUrQxFAgFQoEqBT50yQfkIx/7RFWs7WI5xWK64MUXUwSToBibmWbgK9j65CEAD7hz0COxw6mVVPx1uLQ0lSDqx6r9IveuIU+765FdYxxK3VLq+56yGkqJZwzuZz5zZUCpixR+KDBIFAgwHSQXKpoZCoQCoUCuADDGJzX/7mvfkKG6bmm1Y0IUM/FtTdMhyaLYUG/fuSdtDqRmIS1KcEsq8NgbgCxKsFB13q72iWMc7Bhdj3XcIYdUF1GGaKCUtF6GW0vd94x04WN9veiSD8vdd98jK1eu8kPhhwKhwCBQIMB0EFykaGIoQLYzoAAAQABJREFUEAqEAl0pAKRd8sGL5If/9V9pEf08DcdYRgpotQXzS19xKnXj26SnAvTIm0OeZt/FORT6Afar4/xYte/pct/DwCRgetj0XRe+Jw1QinNLqbcT38vw+hgOcNnHPynHHHNMWrv1+/9yjaxYsdIPhx8KhAI1rkCAaY1foGheKBAKhAJ7UuCUOSfLvXPnyu9/4X+XrY5pTdI0yUm/4JS+3sTXmgzkHOyqoY568rg83FUbAEq2fXXUw9jYs885t1wUEJqGH5Tgt7xMlMKou7x9tGPc+PFy+a/9uszUz47yQQE0YA3Zx594Ki2Z5fnCDwVCgdpVoHjCa7eN0bJQIBQIBUKBPSgwdcpk+c3PfVbOf/NbUsoEdgpxQKhvSp27gGcOd2Ss3t9DtT0+TLledh52qydx06dPlxNOPjmlY7/aUur5qbR6XGmLfgHr1NPP0OW0jkht8nMGTl9++WVZt35Dj9saCUOBUGDgFAgwHTjto+ZQIBQIBfpUgVWr18izz/wilQm4maW0Egi9wnySUw6Kfhx/X62hu8sPOAKNDpC0gTZ/6tNXyMzZs8vN8O77vI3kyR3WVj5ROnv2MWm8qh8jj5f/wAMPenT4oUAoUMMKVD7dNdzQaFooEAqEAqFA9wqwuP4XvvBHslitgw55CeYU2AzQbJxmHvbSAMjdQWSezsO573ndpxsdR125TxhQZFIWUJrgGYDWjf1hw4amdlz20Y/LeO2WZ8knd14W+T3MMf/c6Bf++E9Tt70fw2fz+hYvXixLli7z4sIPBUKBGlUgFner0QsTzdq9AmvWrtMJDStSos2bt8hV3/52lxlmH3OsXHLJxekYn5E8etbMLtNFZCgw2BX45reukgdLC9RjPQTIEvip3xsHVJLXho4WwAp0AnoOn3mZ1XEOh56HtJTpMIrf2NiQ6oBdWfQfWGUMbGtrmwwdOkT+95/+H+2CXyTXfP+75aoow8v2yFGjRsn7Lnx/mvxF2x1GHY5Jhw7DdSLY88+/IIfPmO5Zww8FQoEaVKBO/+HY95HrNXhi0aQDT4F5zz4nixa9Iv/1n9crlL4mS9QC0lv3xrPPkcuvuEImT54ks4+elV5WvS0j0ocCtaYAP9Te9fa3p7VLaRuL6Y9QYBs5cqRC3tA0M584uvaHKAQOUfCr16WjAERAjiWlcHwNyoEW38OAnQOfw6H7HMOltBOPkTccM0EaD5kpp84cJxVI3Nksy15cLpt3rpPFr6yXltLqALRvyBCzoPI6atNPq7K1txsgL1iwQG748X/Lq4sWJXht0vPAscQU67V+6spfk6OPPrrche+vNI4Dp2zE0d1PW6+4/FNaTthkkojxJxSoQQXi6azBixJNonuuTdatWydP/+IZmTfvWVmr3/p+4vGfy1ZdCmadfnJxb91jDz8kryxelF7Up+lEiTlzTtGX2iw57rhjZeKEXddQ3Nt6Il8o0J8KPPLIY2Uo7W29DnLkK8KV9griAVN8D3s9nZ2NMum418vZZ54qs8bv5pVSN0amHz8mZTv+lC2y6qWX5KXl+qUnhdIEzQqNwCTwCDAbnLbLrFkz5ROf/FX90tWy9InVtWtXl2B6hP7AnJwmO5EPV7Q/7Vb8AZy369qu/MA94/RTK47FTigQCtSOArv5V6R2GhktObgUeHH+S/KXf/GX8uhDD+6XE19VGgKAxfXGH/+oXAfW1A9/5FK5+AMXluMiEAoMBgVuv/32imYyYQiQZKt2wFtHB6Bp1kSATaOS2xXsiq58L4c0vtWNPFLOef+75I2HjfDDPfPrRsmUY0+TCYeukCXLNkpLfWNqk1k525O1lLGj7GPpnDZtaho/6hZQ76a3c7HxrNUV+/lzfpSDD/DeddfdWtaYGNZTLVjshwI1okCAaY1ciGiGyKZNzfLqkiXyne/8036D0t3pjDV1584dujD30XLiCcfvLmkcCwVqRgEsi1u2dP+N+d421OHU4NPAtgyiOeiOmCXvuPQCOeWQpt5WUUpfJ42jD5WjZg7XoTkbZWubjQ/t6ACosYAaLbN6ACDtztvi+73xgVP0WrJkqcyaeVSX4N6b8iJtKBAK9L0CAaZ9r2mU2AsF6Fp79LHH5cUX58u11/yLrF45sF9o+cWTT8r7L7hAph9+uLz3wovknHPOlnPOPrMXZxRJQ4H+VeChhx+Th+6/r1xptZXUQQ6rKOHdO46bRbW+3tIW+QvraadC6bs+2hWUbpPXnntRXtv4mjz33ArZqSDIpKa0TTxK5hw5TabMPFwmDCksuXVDx8mUSW2yfM22lI4mAo87dV1Sa/OO1GSsnR0d1mVPhFtP00H9k5+bt9mP5Zow7vbxx5+Q0047RcaPG+dJwg8FQoEaUSDAtEYuxMHYDNZc/OIX/0Lu+OktNXf6y9Ry+89X/UPa5px2unz5r/9ajj/umJprZzTo4FaAb8Jff/0PuxWhGtYgPeKAOuvqtm7wPB3WSeXJlM4Bz32raIyc8K53VFlKO2T78qfkttsel2XbbTwqINmoBXmXel3zclm4YL0sW7pUph13shw/Y6zYC0jXLx05XiZs3Slrd3Rqd3tDAlDq9K59LJ1MkNq5k7a3ltvmJ563v7KtnqLwGcPK+WM1DTAtdIlQKFArClRMmqyVRkU7DnwF7r7nXvnDP/xfct89d9f8yc57+in5yle+InfedU96IdZ8g6OBB40Cz8x7Th7MrKX5ieeAtmdwc0upzWD3vJavGFPKft2RZ8nbjxmVVdUq6+fdIv/2Xw/Lkq3t5WcEmCxDqQ4BYB8orK9vk+al82Xhyu2lznqKapQR40ZJo5bP2FIfX+rtJi/A7FZSjydnHt7dPmW4Y7LVkiXLfDf8UCAUqCEFiie1hhoVTTlwFXhVrRRf/8Y/yGevuFwefuD+tNzLYDjb++6+S37jM1fK9f9ZTJYaDO2ONh7YCnz5y1+SbVu3VpwkoJbDWntpuSSHuo5Og0/2SVeO131z5K+0pHp5nZ3j5XXnnSAjyzWqpXTpI3LzPYtki+b3MgHSHEzJ77PtWau0oaFOWta+Jmt2eJ26GP+QkTKqScvbvkO2bdueZtDv2LGzBKRMiGpPXfzeFpqQh/N94tm8PZ6OduFo28KFC1M4/oQCoUBtKRBgWlvX44BuDS+Wq6/+nlx37TWD9jzv0wXMV6wY2HGwg1a8aHifK8BHI/bkOksAuqd0HFeWS859jcni9OBoXVrtMFtHNCXsWCO/+Nkzsrq9lNGyV0wqyqEQLnQramfHdlm3ZouUR40mmLT1SQFK78YHkt1a6mVRTR4uVdsrD1AOFwqEArWnQIwxrb1rckC2aOWq1fLlL/+1/PTGnwzq87v79tvkXrWeXvKRy+R3fvs30zI2g/qEovGDVoEXXnxJ5j31VJft79AfgWxMIsI6CMQZ4FkY2vQ4tR8m8KOg+nqsqLZeqU00YtkpW+geg+pYHWc9PTNndCx/Xp5e1SLYPQE9K9PGhtIdTxwgis/Gov6Kpikd4NmycZW81rhBtm9Sy6hCK0tDYSVl4lNLS2tqv3Xtt2jYrKZeh/u0m3C173Een6cnjomXi19ZIkcdeTi74UKBAVGATwlv3rI1rdHLuGx7ZnhKqpZ70+eIZ2n8+HGpJ6CplHZAGr2fKw0w3c8CR/FmAfnGN7416KHUr2W7vuz/6z+ukxkzZsjnfuPXPDr8UKBfFQC0ALnuHMd5keEDqfg4/GIjBqzs6lixoD7p6+qGyRFHTsq+5tQiy+e/LL5QFVZOXqqkBToJ4/vi+doUfaECl3VpDKmN+dwmG9a2pAlPba2sWWrjSwFq3wxM+RKUfcmJFhftL9pNfLUjHQ4daF/uKH+zfrAjXCgwEAowcXGH/gB7UX9gAqf8IPMvoPFs2A85+/oa7eMeZtu4Udf91edk0sQJMmnSxJRuINq/P+sMMN2f6kbZslNfnFdc8Rl5ZO4DB5wa3/7m1+WMM06XN77hdQfcucUJ1b4CLHnUnfNxpfyI4mWGA8zY6NpvV0Ak3oDTfEvjM/KBODONFhA4Tl+GQ0lWchtlySvNqUyDzAIY2QcksQBRD+GdO1s0zCL3QK6N8/T6AWNA0SHUfLOYEk9+NgdNGuDt8tZ4nO/vKS3t2rRpU1kDzxd+KLC/FABEn3/+BVmzZq3ed/ROiH4OeGhaJm348OEJMs1iSi8DUGo9DrTHnzE+1UsaPkO8Ue9fwmPGjJEJh4xPz9v+ant/lhtg2p9qH2R1vbxosXzpS18+IKGUS8l3uj/2kQ/LhRd/UH73dz8vRx4RXYIH2S0+oKe7ZcuWbutP8FkCOQCtTcPMeLeXYWExTaCqXfduTbTF7IFWW7IJgMTQiN/ZMF4mjc/GZbZvlDXrWLrJIJQXJOU48DpIYhki3vdZ09Shke55wNPrJ4w1qKVlp0KqASmQSjwuh1Evw0Xo6pinwaeOPA0v+ocffiStU0ybw4UC+0OBhS8vUivnJlm/fn0aosIzNnToEIXRoQkkvfveQZTnqL4e6yhWU1/ZAr+wmvr96vd3c/NmaW5u1vKaZLiCLmPPR44ckaB1f5zT/i4zwHR/K3wQl/+tb31b7h8Ey0Ht6yW6+X9u0G92T5E/+eMv7GtRkT8U6BMFHMA6HMgyKNOoBGgJIjUeQPMXnB4pwZunYTY9YQBVj3XROvI6jOYvTOKpA7CkDjZeujjSsWE9bW3VMaqpfd7V35FAFJB1aOW4u6KtHmNtJT4/1lW4uhygIFwosL8UWLJ0mTz44MNqFR2WtqFDh5aHtrBeLz/SeCYcRhsaGhOU+vMCnBqkGqjmcJq3mdvY7/8tukrHJoXUQw45JHX35+kGSzieysFypQZZO6/7wfVy9x23DbJW731z/+Xqf5ILL3yfnHzSCXtfSOQMBXqhwO4sphTjE6A69G0GkOVbmqmvoAhx5rBGmJehveQ4jJWRyVHafbhL2xwEzdroL0b8HHbJy1hYh1aAE8c+0GqWVJt5n6cBSh1OSU+5uLy9KaKLP542b5MnI39ehtfpx8MPBfZVAXoLH3nkMdmqkAgg0l2PNbMAUfuRZkDqllH/8WY+9yXPEc8jQEoYZ3H2zBGfO348Uib3PVZaxqNOmTxZu/pH58lqPhxgWvOXaPA18Gf33i9/9qd/PPgavg8t5h+C3/nt35Kvfu3rcrp+6jBcKLC/FXjiiZ/vtgrGmQJg+ABeAlV9uTEBqaNDX3IaV58sMgaeFMbLEBg1dmR8m8Nn1xZTAFf/T/kcRq0My8dzQTz1M9Oe9vByxgGrHMcVL2Eb7+rwmNqteUjnaVOGbv7kaTyPl0UWj8OnToYZzH9pgRx3bHzVrRtJI7oXCtCl/rAC6eLFi2X06NEJSpn819Q0RMG0obwVVtICSm193+6h1IHUYVRtqOkezpuXFr3QCO5v0nPvr123Tmf9b5HDDp2WJ63psCF4TTcxGjfYFPj2P3xrsDW5T9q7RP8x+sM/+H1haaxwocD+VqDB30LdVMTLKXWFA6X6gsq7xZlAkUA1rRFqAEsa8uCbI8xm+Tvbt8nW7X5MU+gs/RHDK62l5K0uJ9/HQsoMZCxJbIQBVACUjTAA65u3mXbh8He3pUSldNSbg623w/OTlln5Cxcu8mzhhwJ7rcA6HUN6080/lVdffTVBKd32/AjzmfaFdZQxpEwCNJ8JTja+FCj1OLOUGqwWXf1Aqf2Y1B+NWkY9wwC0H796I55hKiwphbWW5471t5l8NRhcWEwHw1UaRG28+ZZb5dlnnhlELe7bpr66aJH85Cc3ya9/9sq+LThKCwV6qUACzxIoMju/Q1+SgB4vSL7+VF/qou9MVlEDTuANSyIwCsDpe03DdB+q37ZWVq5tFRlVmplfP1YmTWiU9uaim54XLo68uKI8K5944tj8Rc0L1GGReMK0ga2nzusjfXVZxHm5fgyfOE3N4XChwF4rwI+f2++4W57SNYUnTJggo0aNSkDKfc1m1lEHTQNP4nz8qE90Mouo9R74sfw5cAspQOrx5O3KAbg8gn6/k5cJkMuXvyYTtY1jx47pKlvNxIXFtGYuxeBvyLxnn5Pf/a3fTJaYwX82e38G/3PDj7T7ZP3eFxA5Q4E+UgAQTdZIhbAULu0DrcRbVzyg6NbRwnoKtBnQ2Quuo6NZVq3elrVsuEycNLz88vOXoEOf7xsAVsIhddOetI0+XOacMksm1dsapqm9pfZ5mDJ2t3mdnh6fOJydQ3eWVju37KQiGAr0SoE777pH5s2bVxpLOixBKeDpUGrA6cs/2djSyglNWErth5gDJ7/JPGzHbF8jk7WVMqvzWBzxvlmdyeqqgIz1doQuSbVBx51u2tScnv9enWg/Jg4w7UexD/SqmH0YTmTh/Pnp06v+Qg5NQoGBUsCBLbeeAoMGawZ7mFYc+nw5KdprcQCdgWtn5zZ5eeFrYgs3kWKozDhhtozKoNFh1OuthsOiHquzvb1Bppz4enn9GefKRZ/+jPzm5z4qbzqsKdWdQ2aC6hKsehn4eRrCxHmd+A6ohNk4jvOw7YfVNIkSf3qtwHO6JukTTzypSzONLFtJAUPvgids1s/CymmVAKIl2NQI0uleglH3HUxJj8XTodTiiS2cp819q9vKLLdHgXmojnll3Okrry5JPwyLUmonFGBaO9diULeEhfQfffSRQX0Ofdn4G9Vq+siju5+c0pf1RVkHnwJDdQmaPTksog6iZStpBmmMNU3jTTWdQV2lhbGwmhrYtSx8WZYa26Wq62ecIm+YyrqkxQQlh8Ac/vI4j09xw4+SObNGFaexbZksWLYjtSWHTBJ0W0bpfLwQL9/zez6DUAduay/gynqp4UKB3ijQomM277r7Z3LLLT9Nyz/l1lGA0BbGBzgNQCk7h8YibPHco3ty1XmKfQdaKwGILf9XsrCSlrakIQTaPpavoo1rdZF+fy72VH9/Ho8xpv2p9gFc1/XX/7c8dP99/X+GU98mn73yTJk08+3yK289smpJm3bZ+PTN8uMnl8qCm78r//1M5ecHeVh78g/C3pzU2jVr5Pd+57fl1jvu0DE9h+xNEZEnFNitAmeffY48eN+9u02TIC3Bl323nsS8RNuShcYsNZ6GY+2leGCWdIAbzt6bOi5u47Py8C/fLEedVBqjVj9NzvvQufL8VT+TFQq3PFM4XoDu/BmrfpF2dKi19JRTZOZwt490yLZFC2Vpm0KyZq5+Pj0/5Xk91OHlV79g83iH1NyqyjmOHz9ezj//XG9q+KFAjxT44Q//Sz8l+qKO1RwrfLHJP7vLfW9g6nBadL37/csjYvevAWXRJe/w6j7HNcx/peequnEe310a4nF1CqX60zJBaFOTfY2tXsvcrp9BXa1foZo6ZXJ10QO6H2A6oPIfGJWvXLlKvvm1r/TjyTTJ1LddIX/wW1fKB0+bsJt6G2TcaR+QK07TJFf+tnzplXvlmn/8hnzjJy/KEB2gzqzJzboQMTODsSb1tVu3dq3+Il0bYNrXwkZ5SQHAqicOQCtbTUthZvHWaX57ieoLSy2eOACOlx0vSyCOFy1x7DMhqq5uvTx95+PythPeJlNLPFk/+Sz5yIXL5Xs3zpetmocyyYtPWWwOid7ezs5GmfK698mH3ji59OFTKl+rEyeXS1sGuJ7ey/ByfN+Pu+/H2XcYJUz8rhvn1RjPJwKF67ECWEtffPEF7b4flZ4PB9FkjSw9O3bfU6SBYQrpMXMlWCzvl6L96G7irdzK/GX47CafPxOko608F7SV+KFDm4T1kJsVrmtprVP/qVqpTOyFAj1UgJv8xzf8JC270sMs+5asaY58+O/+U376/T/aA5TuWk3DkW+RK/7uBnnof74o7z9lpkyeMlUOnT5dpk6bJuNYBFkfTh78vnT33z+3L4uLskKBvVKAlxBwyux835ilC0C6FZFn2bv7mQxlY0u9i97GmQKnrUsekbufb87a0SQTX3ep/M6V75E5UxgfahOPHAyp28Pmj5Qjz7tYLn3rETK8XEqHbH/5aXlqlX0FKrWF9lRtlJWX5/t5nOfxOKvT2kDYz5chDA7s5WZEIBTYjQKLFr8i3/nO1SlFbh11YPT3h/vVRXUXX6Tbu/dPdbn5PuFd961Xg6WnkoFG4ZRno1Zcw5+rq5XGRDsGnwLbt2+XX/nYx9LLYr+3vuk0+ez135c/e8dM2fPouu5aow/i5JPkzW/XLzQtmi9r60bJ6DFj0+B1xuxhQe3LB3Tx4kXy8U98Qhqzrs3uWhbxoUBvFHjhhfly/70/61EWBzheUFhLcSlM173G0W3PeFQMPFhWunqZqd2RXLptkxUvb5fpbzxRpgzxF2mdNI2bLie+4UyF0xEyetIw2frqatlSGjpHefWTT5DzXv86Of8D75Gzjxontsw+LVHr5vp5ctNNT8jqFns50l5c7vs5eLzv5z7Pbr6fhzmWb6yZOm7cODn77DMrXtyp4vgTClQpwDyKv//7r8q6dWt1SajRaZymrVPK4vm2LJT5xTJRu1pTbcZ8eh702aMnwnoWLMxEKZw/f8n357GUnjhPA1hWpNVjtl+UYc9saT89v9kxytJnbWdLa/qRNnLkiFT2QP+JrvyBvgKDvP516zf0zxkkKP2ufOGMXbvu27WL/tq7H5WHv/ev8rOVus6iO6yrf3ChHHtMF+NPR50kl/3hp2XbX1wjj25qkFb9RwfHt8X70q1ZtSotctyXZUZZoQAKHH30rF4J4ZCGVbRTX6TJWgqMqsNCimNkKOkAOF5wvDjdEY/D62z+uQ6LGSWf+9x7ZdbIvONNracnnCXn6+++8998iWfdvb/9Fbn3xvvl5S02tKA6MfX6y5hj3o7qdL7vx3OfcL5xfpz/KTrGFTAIFwrsSQGWWFq/fl0al+wwSJ48nJdh8XnM7sI8W8WztkvKEox6vNeJX+26iEpt9OchT+/lMGufr6DViosnslauxCBtxx133NUPLR8tp/3Rl+UPqqF045Py/SvOk2PefLn81V9dXQmltKp1nvz333xJ/uryt8iJF/2J/PgXVWuLjjpDPvW775MZdXzLe6fsUOtvVw/vvpwgX9z4u7//WnoJ7ks5kTcUqFaAb3Az6aKnDoso3fhYCrkv23TjB1n68pJ2v7fr1qYz1PG9S7+tjSWYmLnemp4N66a3mfyty+6Vf/zHH8szq+1HXU/bkafrWPe83PwfP5Gfr9pZKr/oas+tm979nsf1JOz53DcgtfVTeeZHj85WBMgbFuFQoEqBa6+9TkaMGJmso1hGHepy37MAh/ZDyGP27Nu7x378dZXaIZQvvjU1NiWDhy0D5dZWILmrnBbn7ay0suoESO3N4ytU/OBc/EptLCEVYNr9dYwjPVBg6dKlPUi1b0maTv8d+dtPH5fNuNfZ9k9+VS5+/Yfky/cs61HhbfOuly/pBKivP7Q8zfj1TPWHninvmWNd+HwiMXVn+sE+8n96843SrJ8+DBcK9KUCRxw+XY4+7rgeF8mLr13hFB/w9DGmaZyl7idLaukYk6EcTs2aWqwJCuTZ+FMF1mWPyDV/9235wT3PyWozvvasPR3rZP5DN8n3rr5Z5mVQCjjiUhs1zL69sP1FX2n55Fi+efo8f3UcY0s5zou6VroueyZapBooBTZu2qSfGn0lAZwtBWVd8NYN793nBRXq7VXhuN9w7nuY/TwuJapK50CKz7hWIBIg9WEC1W1wAPWyuvIZruOO9MAqZfJvwfbtO/zQgPnRlT9g0h8YFT/5xP5eq/MI+cBvXSSz6GMsufaX/1WuvOzbMi/rtfdj3fn8KhzWtFju+pu/l3F/+0X59AljS0nHyus+9j457nv3yW0bNnf5j0R3ZfY0/rVlPYPnnpYX6UIBFBgxYkSauNAbNdxqynJRTfpCwoLKs+FAiLWUF1WCz3qDNwNRXly6nJRCKS9CS8/LTdO3LZfHb/lXefLW8XLs+WfJ7NHDZMrJb5ATJ+WjSGnlFnn1yXmyZMtqeX7u87KmNB9fq6tw1OEvV/zuXt4VmbId0vv5eF722exczB8+fIScMufkLGcEQ4FdFeAeuuGGG1PPgq3/Wdyw3J97dlWUmsZqk8th1YHVV68AdCvjHEgbG3Qsa8lam9dLG/VBKT8raT9PQG2kqXL2nGmkVkgdLCWFgWagexICTKsuVOz2XAFuYNbr3K9u+nvk0jdNKqpof1Gu+V/fkqd7AaVkZuYhD2FH63z5yVdvkLO++2k5zvsLxp0kbzmtXm69Z9cHt6h430L33/+gfOCi9+1bIZE7FKhS4Pzz3yxPP/54VWz3u7ycsIoAo+7qFdjo1sdVvGgb1Eqqz0xdu70w7VjxqU/LX68vvLZkbens3CDzH7hd5qs1puH2myktQay9/NzCxIvc4w18/Tjlef3Vvh/zePZxnE/1C9f38YFR94FS9jl/thNPPMkKib+hwG4UeOXVpfLgg3N1wtMovT/tS07V9yHZ/b7zMPt5HPceP+rS8dbH5dsf/0u5Zyd7J8qV13xFPjTdh+WQLyUr/6E+/sNaWp5I+8r35ZK3/408R6phH5J/eurLcn6j9YYQZfUTKtqWt4cyK/dtpv7WGhhr6q9ma338DQV6ocB/6CLDTO7Zf65Jpl/4dplTvEOlfd6Ncu1Tve8W364PW7N2x+B3rLlLfnRfDtST5U0XvL5ilnBfnxMvxXChQF8r8O53v1MmT53aq2J5GQFmjC/lvsRqyhhSNt9va9expumrUHT56ydMNR157GXnlkfv3mcfADSfcaiUQ1rCvJB982706ng/jm/5Kn2r10AzT+vp8+Oe39Olc9L2sM85sM/ajccf3/NhEL0SOBIfUAo89NDDpZ4JrIrWhV4Npn4fcuI8B+YnrxQuSNOh031Ly/FKkLV72spgEiIWTUtrP+AaFHILey1WVuuS50end+/nkxetpBKwZnWRxs/HYXXDxo2efED8ANMBkf3AqJSuxP3rJshZr5+VjS3dJvPu/JnsTcc4D/k2tfCu128EN29cLg/e9aQU6wk0yIQ3v1vOq+557MOTW7hwYR+WFkWFAqbAMbOPls/91u/0Wg5gFEhr2bkzdVEyAYptp35sIsEbxxVI02QoDbe2KbTi6+SofEIUL2QDPyuvHYhNccQbBHLc0+FTPmU4MJLOgbGIs+N5vupjXq6nYd/KtnqtTG+DwXebnsfOnQB5m0ydOqXXukWGg0+BRYsWJUupn7n/CGKfe8/38dmvjK887mk8XUqsfzp1VQzibP3gSotpHQCq0IlLdWVQmSJLfwDSNBlK0zdolz/75CtlTXnz9B6mzpQOm6wmJu+KFatkIOE0wNSvTvi9UoB/9FesWNGrPL1PPENmzxyZZVsmTz28JNvvfRCLKcMPXrnxRrl3XWbFHHeEzNbFwfeXW7169f4qOso9yBW49NIPyaQpvYcsXnJMhgI4y1sJ7hL0aZgxp8nKSTqsn2XI5AVsFlN/OfuLlfRmEbWXrU2U4gVdWE4trVtTzVJUfTx/iVv66vy77nueHJDNgmtpAWLglJfvzKOOPMjvnDj9PSngS0RZutzqWVg3uedyZ7vFcYNNg0p/Vkhfmasowcqz/EClwWUBmBoqWUSLPAyP8XRYS7GC+rCBVFepjZSd/sMvxeWlEHaQXd9fS0FWN0D3A0y7ECWi9qzARl3T7Tv/8M09J9yXFMOOkpmHZbDYulwWzN+3GYM8jCwL1bptkSxckgb4WAsbRsuECdmYgX1pdxd5+UcjXCiwPxQY0tQkp7/uDXtVtFtOmaGfNqyZdOknq6Z14fMyTVZSB1U9Rpx331s477o3mHU4dVB1CycAynPIC5u83q3PezK9ONNxyndwtbDvWxp7sRL2eLfQetuIt83zm2WWBdLf8pa37pVekengUuDhRx5Lwz7ys+aec+f3IvseNt9SeFr383SWwtPZMwGuejkJNEvA6WmJq4ZOP4bvcIpPOfZ8WXvzNngej3PfX1M2CWqbLry/90vBeR1748fkp71RLfKkX1XDtSsfC2S/ueYNkhs5961eXSx5Aw+dD0eYLDOPHSfyzMp9K7ab3FhpePj5ByNcKNDXCrzxjW+UO37KhKPeO+5Ln/yU527UeI6xFePbOlMXocdjldFJwnpfMwnK0tnLkxn8lMZ3ubF/0K1oZdnLU8tJi/e7pcdeojwe+ddvKKEnzwx143gRexgo5UUPGBOml2fHju06tvQE+eAHL+pRuanQ+HNQKrBDh7m8/PLL5XsfEbyr3cLFvcZ9x7PAvWc/jNr1uWhM6evr6V1gJQvueb9PC7hNMJp+pPnx4h2hT0wq0+9pHz9K/btzCUj1nvf2kr+6LM+fjpWOe5w+dSm4P5ZPLOroPhQW0+61iSMDrcCxs+WozGAqm9fL2l7Oxh/oU/D677r9tmR18v3wQ4G+VOCCC94tY/Xzmnvr0lhTfRFjKWWsaRqrmU2IKsZrKuRpmrxb38eLYgktrJRYK5ksRZyNKzULqb+4feynW0XNd4hML9Y0ccrK8a55iy+68K0+LLgGnl6/t9cndKXzST8OO+Q3fuOzMkxX6QgXCuxJgQULFpTB1KETkOQ+xHlc7luZlqboHQBii/s2waAlLP/1ZyWBaglw0zNTBkyrb3c/1Lwd9H7QxlQPZZXqZj937Ka4Ujye/XCUtALAhg0DMwkqwDS/ShGuLQV0otKGbBhobTWud63pzRd6eldypA4FRCZNnCCXfuwTey2Fd+UDpYwjxU9QpxCaw511lxucppn7epwXoFkkeRnaxr6/JInjpQsc5t329uK0rvwCXouufYNU9nnJW5e9g6f7VrfBL2FvSw6yDqn4o0ePlUOnTdtrnSLjwaPArbfeoWt6btETLiyYBo0Gc36/4TvweZwBH/FuZbU8/kyUOLAspgFsXq6BbSqvlJgwPwqZgMj9X+kKy2qCUj3O8wOQuqXU09MGa4f5Ho/vxzyuUYcJDYSLrvyBUD3q7JkCa9fLRn6Y+tDPw2bJscNE5u3bMNNS3WPkkPG+bhxR22TDuj4puFR+eKFA/ypw2WUfkccff6xX65p6C4FRXJv2pWMx4cngJWXWk2K9Q/aJV3sKqaVT1zrFeTemh+m+pEjS+zF8j6vTzwCzz0vf6rC0vExtrchi2IsW0aUrva/TMWsTEOBAzIvdrEa80IHS5uZNct5553dZVkSGAtUKrF27Vu/XNo0urOvccw6FDnHcX4Td97Ddy0UXP3n5gUV3fkpbrlAPlCya3Oudnbrett67hK2MujTUpngOWmw4jT4ruUsfz2jXH3B6r5OPXg1/Lgrfcvh+akep/bSPeHxzdTr0ZWDeiQGmfg3Crz0F2jfIhmZ9u/mkpHqFyYn6C25ZH/TnNx0hRx9e/IMj7Stk4fyttadBtCgU6KECRxw+Q6666ip5y/nnp2WfepitIhkvNX9pMUYOx36CS32BAbBYUXihdXTqV2j0RcubjCVt+IY34Q4NA5uMS2UcKWkdTgFSA1Hi7Q1oab3zDlAFSotmGcAW+x6yl6iV4S9T7w7lGC93t6wyFn7ChIny4Q9d7NnDDwV2qwAfZcmdWe6BvcbyfeX3NfcZ93F6Lng2dONe9H0LM1veoLRO788y/2kl3L9mNbWvqlEuedOPPy0HZ/e05tf663V1iY5W3dKRdDS1qbWjZFEtQak/F57Mnxn8lCu1k7YApLZpTak9nA8f0RkI5/8aDETdUWcosHsFWp+Vnz+TLabfcLy848Kjdp+nh0ebzn+3vMmBlzwbX5UFq/oAeHtYfyQLBfaHAlMmT5ILP/DBfSoa+ARQUxe4+t6Vj8/mY1CTZUZfgGmMKenVupRAUMO8VMmfZvNr2CHRX9T4WKPsZUzaUjnUrfFFOp+8RPpdN09ndZXanNphYSYd0ubhI4bLmWeeJbfedmd6Ae+TQJH5gFeguXmzPPXUUzJs2PDyuTq4cY872Nl9bJZ5P04cYR9+YmlASINSmJBjOZhqBv5Pz4kBsMOt5UnPIs+U3svpedPnrlXBtChD0+vz5pZSK8Py+o8zfH9eUltL7aQl1F3ZfgPr8sn3cyAspv0seFTXGwXWySOPvyztbz2j1Js/Qua8860y/Tsv7dUi+0XN4+S8C86UCeWIdll33+0ydz9y6dBhOgYhXCjQDwpccMEF8qPr/2OfauJFmDtgtak03owXWIXT7vyODrWYlqKTBVTTuDXJXnhmLQJEraveuvh5WZLeN4omzAvU0lXUVLFjL9PCmpS/WA0G2tPScE1DhsicOacK47w36hdtbrv9Ljn11JNjrGmFmrGTK8AHJZqbN8rw4fk62ta13pDud4M8v8cd+PC5D32fe9l/fLXrp31t6Ir2ApZ6C6zOF+Taz10i1+YN6HXYoLW1wX7k+bOQiuFBqXIcxzmUens9n/tV2fptNyym/Sb1gVUR9/X+XyqqVZbdfLfMs+FvScCG0z4pn3/b3s8+ToVMfY987G35guSr5P5bH5f9yKXy5re+XV/s8TvwwHoKavNs3nT+OfIrl1+5T43jxeTWUZ8Ihb+z9KUoPmfKV6IYg2aWVCZL6daiFh2dnJHCyVqpM/yTlYfZ/lgvzQJrFk77BGqyBimgUk5u3XFrp5Vvlk/L52VY+vx4qlfLoa1btmyWQw+bLp/85CflyCOPTMDL1+oYO3jDDTfKosWv7JNGkfnAVQCgrGdoSpUDMrHom4W/sOxz3/p97JZJniGAzy399BoYpGKhBAn70HXqjzAdrsLzSE8GPySpL20MKajaEpBqC3LrbLLi0i5tmFtcN2/eIi36PPW3CzDtb8UPkPpGjRopH/3kr+7/s1l2vfzjT17L6jlULvq/fyzvmLqXswWbTpPPXvUH8pZx2T866x6V2x7Yv8ti8I9WuFCgPxT45Qsv6vqLC+WoWbMSjO1LnUyo8Bdu8vU+BgRZXsr3U9e+xrEPTNpmwwF4SWJ9Ii69LPWFmYYApBc53fa+Fd3/lE9ZbsXJ/VRneunywneYpQvTuu6BX9q2ffs2OeqomXLBBe/R7thhyVo6bNjQ0rjXehk1apQ8/fQz+vW6lQPy4t2XaxJ5B04Bg00DTsJ+/xqAFl3lXe0De0Cqw2CfgqmONrXPmmrbtF1sAObuNgdRe75I78MH8A2ieRY5z/52YcLpb8UPkPpYB3D27Nn9cDYbZe4PbpWXP3ClzCqxZMORH5Grrhf5zcv+j9y1she/5prmyGX/+DX5gzOKTnxm4z/9vX+Wn/WimL05aV6E4UKB/lDg6qu/m16Ys489To457nh5eO4Dsrm5ea+qTi9fIFEh0BYMt4lM7TqxiWVp6N5v0ONpopO+xEjTwKbHOzqY/MTC+gqROoaUhfb9u991CpL1uig/C4bjzEJldhIL052fdZVUtd5euLxMDQ54AydI0Dz05Bw2fYZC6QUyduzYFE96m4zVkKy+dMFu1y/A/eTG/8/eeQBYUSR9vEiSc845Z5CgIqCYcwDFLIrnqaeeYrhT785TQM+c71QwfeYcUREQFRGUIIhKzjknyeGrX/er92Yfb5fdZcPb3WmY7ZmeTlOve+o/VdXVn7g6Lr7oAilXrmxcK+FlSIGUFGBsEhhrfCRxbeCUc9IYZ6RZXuJIMZfmxnVs1ZLW1lz6P3KXnF67uDN/oTxlmC9+/vjdnjBtsV2fXJ3L3pG/XPo/me16pGBU29wbETX6Nn1f3e3AHwOaFnuAaqA0Bp4B0WnVE6gyy09DiWmWk7TgVGgDO7ufePeUJ+T2F2dKkE0BTv/3xRtyR5866Wq+WPsL5P63X5AhxzeIep+i4N55r8uQYX5qp6uiTGZqoKrEMIQUyG4KbNy0SVavWqUSwmKOqQHMWrVpe8jNMtedJEaZH+cwXqSpXmXopZdOShRI85IYL0Vy5fUeZezcqRcj9UTTKK+HqT9Ti32eSN0uvzJlBaVIY2GmjRs3iZoZwOiLFuXwgNkYP0RBtc+zLF227JBpFFaQ/ynAOCX4se3HKtekxx+kB0NsjHvpZEwOGTuL5df5xgKpBPWmSIsWSGf+uPpow1mauvQDn6NkyZJSNPLxGG0qB05CiWkOEDm/NtGtW1e328wmXVCQvWGLTP3PHfJwx+fltqC0s0JnuXL4d3L5wq/llVETZPywF2VMUIKqEtJ+g06X5s2Ok0uPTQlIXX83fiV3XvSATM1maSltlS6d0og+e+kV1l7QKLBu/Xp54YWXZZxKR9kBqnTpMlK8eAkFaYWlmUpOy5YrJ9+OGe1sLzNLG0DffmVSexUIFom4s0HVB+BD8gkDQ1q6h1gPpKOWZmCQNCSlgEeT/tAf0l1MeuS+S4j745iyW0UcYdoBIIskCglTx06HO4Y+f/4CtTP9QypWrKCO9csqTbz7KiRR9Bl7WSRcFStWlIkTfxLs6dq2aeXAalyz4WUBo0BxXShXrVo1Wa/zqkiRGEzyYNGbZTF2kLxb7Md0YWfqYpJGxqsF246Ue+4DzW5ozAeeSVspQx6dQi4wT/bvR1oaU83rbSmUYgEV8wGzGK99oLyeufLuVM8CXeHK3QNguzmll8wf/yHoP/j4YPNS25yXX8Yo7roZ/gkpkH4KtGzRTHJstfnuqfJs/6tE3owDp9rdIg2OkQEDOf6e/s5v/EEeuGyQvBMEsukvneGc5RQYhCGkQHZRYNSor+WTjz5Qu9ImDlixAh2pKYCQ0KBBQ9l5VA/57usxh9QFGCgBgFpEOd0+5XowtiIwOD0MtAJQAX/k5x4qf5ilZ7heVbl3XwyE4pAfxgkTpk6CgdUoc49wVpgpwSRK2JfCRAGaDRo21Hr2OWmp5TPgUEEBu2fCeAyIcH2th/v0b9KkyQ6cHnlE1xCcOgoX3D8IElqoGczYsWN0ZX4MJjF+CR7EHWhTynxj3DEeLS/g1cYiMWWdH9MoZtUT/jOf9L6V8+e0xYccY96PW1eeuYRE1fXG//HzwddDHVYP0yZ27kvYPPBTyn/k+fK+f7RB+zxHboQYxXOj9bDNPE+BylWqyOqVK3PmOQCn554lc+56TB4c2FkytzZ/r2yc+qLces0DKaWr2fwEXbp0yuYWwuoLKgXmzpsvL7043IFSFvrgGLxYscNSqK5hMu3atVc7ynLy9aivZNshOs4GcAJEkZTuV6mpMTHHmDUNgEqaMWWkrQZODWga8ySPgVDsdXDUT554Zso1dTp2rPdhmuRj1T+gFKkw7n22b9+hoNyD1y1btrh8tAEYLVu2TLRflKU+6mUBF7RZuHChbNiwIXTEX1AnU+C5+WCxMWjJNi4BcYA3FvVhJrJ3b+RjS8ekgVMbX4wxDgKxcxulH0/BsN9JK2MfS1YH7fuPNgAxkksAL0BVwWakTl8PgBOAGblyYDRyoUnB56BfPp8HpL6f/nn8c5md6T7nRcPXmLN/Q2Cas/TOd62dcOLJ8vuMGTn4XEtlzOC+0v2T8+TWG6+Ry49NoKJPpTd7VeX/0jMKat+enq2uoeKbv+qa66R8KDGNJ0t4fYgUWL5ihTzzzLMyYfw4qVGrdkR9j6S0uB4xYOqAn3Iy1O51dFFQ3/MvkJ9+nHDI8xaGBuB0Ek6NCUhJYYK2AMoBQgWqqPQBf1zDdB3D1ZiAWQDXgFNjoBa7DJE/nqEqA1Xmj70rbfNMgFLAOCrXjRs3OLDANcAVIEAeQAb5UM9WqlTR0Yd+oKpkJT/9on+0u3XrVnnzrXeld++eUqN6tWAXwvMCRAG/85OXkAYfm3FI8CATzxAA2Jgpio1dYhvrnFPOYh29KXZtoi6ArgeXHjBaPTqMXT3c24eWQXeP0uriJKZ6j00qtAZ3jz/u/MD+k05fvISUtmg7FjNvmDPMh3q6m1xuhBCY5gbV81Gb9evXz5Wn2T3tbRl6hR41+sjVA9VZfsXOcu65HeOkqDtk4Zh3ZfT8DTLnk+flneAuUjnUawBC377nRF4sOdRo2EyBoMDYsd/JN1+PlvrqFgmvD7hDKlq0mJNMetCFTaUHe8QEGBJS1aN79lZmtE9m/fbbIdPKGDUVwdBgqEhMDaQSI10tpAwPELpH7yNpNZAKO+bcGDf12Gp9zkl3NnnEkQPmaf5RWYWPT1Xa5eDZeTYvWTJn/YWc/1LaQXKL5BTgAUMmn9VrdeAPctKkKXLaqSfRhTAUQAocddQRans8wX3gKNw7gAKMMcaNj73a28Ye45PDzQWNbf5ZmnPnFKjRwKHCXU0FxKodt340WX6flQ86D4jdfNGxGwv0Aw0CZUn1/cU0Jj5wn37rXxd7KSkfcR6cWt/x1erzxdeQ/dchMM1+GufrFrp375q7z7dytDw7eLTrw9BBuduVRK1XrV5d6tatk+hWmBZS4JAo8P3330u9Bg1VfV3SLXSKV98byDKmaI0ZM+3V+1j5Q6WDSxcvtltZElM/0kwOACYSTqShBpbpF+mAVNYdcm59DXYgnilyjeTT6gcE71CXTy6odAeg6tuAoZd2dTqbVQdSPWjFuT5AmbJITr1vU4CpBxnQCskqeVaqidK473+QVq1aSCVdIBWGgkWBKpUrR0Bp4ucGyLFYqHBhVPp8XuFGKvYxCMAjGDh1F5FrBwotAUmo5vXg1KvrGYc6bN1YD85fzv29iJ1qijoUHCsQ9XPJg1YkrMEQnFNgUwPVHpx6kwPmGH0nDtpiB+vJ7vMQmGY3hfNx/TuVGTz99H/z8RMe+qN1P7KHsMIzDCEFsooCv8z4Te699x7HtCpXruLU0ix0QhII0wJUAdAIMKlggDHBjDhgPIzPbR3+kBEffxTMlmXnMNxdetAPA6OmsieNfnpGmrKfdMCYaLDP1OfsVzUup66wevc5Xr749GPXX8Am9u4w1QoKJE3KimSUOqy+5cuXyzaVspKvatUqutCpZLQP0A6S7dix00mWZ8+eo474f5YTTzxemjVtkmV0CStKfgqULl1KTj31NPnwww90biV+h/tFQn5lPmDTpPSMaeYXwY19nZc2/rhmBb2HjuTwwBSTAD9vyevHf1Caz5zlPvW4OROUmDK+9b4OaTd+ua9nVJ4g+Japx6SkHmR7Ka/taoXWoHq1KgnKZ39SCEyzn8b5soUhQ/8jI5QhrNSXfBhSp0CvXr1SvxneCSmQQQqM/2Gi/OWaPzvH+eXVDRJqeZgm4AtQZRIVquXcMyjfiGdEMVDKanbulyxZKoO9yHh22nZS1EhRA6lIORMFVJ0WvDQpdk06C53uGXKfU7Xfqr5I339bd9zQ4MCp+nFFvQ/wpF0WqMSq8wCVfNyH2VeoUD66Cr9oUetPISc5hT6Y43z77Ti3OCq0OXVkLhB/mD+VK1eKfuQlemjGlUkbWdRUqJB3IcW4oTzjj8B1yo9FFvHFwn4di34++jTsSL2LKGKvnje1PGPWzW2V1sbq8OBWF/BrMKlpYmBKeR+o20tNSTNJKf3AzRrPjp/f3AghMM0NqufhNpcuWy633/43mTDuuzz8FDnT9ZI6qbt06ZwzjYWt5HsKsNXofUOHSGtdXY/6vkSJkgqaWIHv3ULB+AyMWmxEiQelMCGOnTt1b21lirXr1nVZly1ZYkWyNQZscmQ01KpTRx59/AnBVZ35Bv7XP+9SN0+b5Se1B9yofiepF9/KMFvAMJJVLxny0mKYMc+8bt06lwfpaXVd5MTOT4B7AkCCA7U+eQGnH374sbRp09rN6VALktFfLm/mP7xzR3nvvfflj1S8WDCvvAo+NpZt7hkY5ZpggJD0fSoxNXhoEtM9ezwALVIEt1AeyAJKUafv348JC+p9f4+6CikwjQXMChTcRlT5pNOOj5G+ulON/YnvN333c8KV1foApW5bX9WGtlGfvrkVQmCaW5TPY+2uXrNW1YeDs03ll8fIka7uXvOXG6SaqgrDEFLgUCmApHTggMulQ6fODpDhPB+wVLz4YSqJie1oRDvGGK1NmA+MJ8aE/Gr23bt3uW05ufetOuYn0M5dd94hi+bPt+JJEbdo3VrOPqevnH9eX7dwKdipMmVKy//++7Tb8/7cc86V3375xd1mG1bANypJA6ZmSwrdoAcO1E2tj70g4BQpUVAli3SVwAKzOXPmyvz5C+SSiy+IMn53M/yTryjA2Fi4aIlMmDBRatWqJb///pt+tBRL+IyMG6SUlOEAEIIJDZDa+AkWLowqPwIWAaYAQgOm1EFZ7nvVvZfCcu0lqdSv2hBtN1qFnu3Tsb43AoINlNIm59RpwfoJuLVznsEkpmzVy2r8cropRW4F9fMa6HFu9SJsN6kpsGjxErn77rt155gxSd3PZOpc81atdB/uD+UwlWaFIaTAoVJg8JD7Zfr0n1XtXNEBJ6SkQWmpgVGLrT1e7zAgO2CSqLaRBGJHuWbNKiddHDnySysia9etlyeffFo+++Qj2aBSxdwO1914k9x80w3p6sY3334vV1x6cYq8APhqNWpIlapV1QQAtX1pt+gJcO+2XFQpKaCzui5UZAtXFkVBN/yhQqdduzytcJ9DOkAXn6dnnXV6OL9TUDr/XEye8rNMnjzFuRdjro0cOdKNAwBhooAvU+4h6UTC6W2+D4tqMxiDzE0k8hwAzuC5aTt8HuzDC+l93Jl592ukU7d9MPlzu/bg0wPimPrewKnF9Jv3AIFx7N8NvB8wI4gBU9yltW3bRlq1bO7y5safEJjmBtXzUJvDdZvDoffcnYd6nPtdrairOV98+RW3vWHu9ybsQV6mAAsMn3tuuDLGL6RGjZrOHtTsSWF2MDcDoxbb83rG40EpUlEAKQsbUN8jFdm8aZM0bdZcOnXqJGecfooVi8bkmf7LrzJs2DCZO2e2rF29+pAd80crT+MEENm1+5Fy443Xu61Eq1apnEbuA29N0cVKd/z97zJn5szoTWiFh4xKuliMLVuhIZJRgKnZ6HINMK2h7WNfRwCcQjdiAKlJlQCpMPkzzzxdMtq/aKfCk6SiAL/nlKnTZMmSpe63rlSpko6Nom6sABxff/0N9/sn6jTgLwgcAbMcgEs+IOPBKHOV+0GA6uvw3is8ELVzD3YN9BooBbzauQefAFWOlD0kjXeBBU49MOXd4E0RWHjFOCemr4neB1Y+J+IQmOYElfNgG6NGfy3/feZp+Xny5DzY+9zt8g033yI33nBd7nYibD3PU2C97kA04PIrHJCsU7eek/ShgkbSZ4zNwKjF9tBBUArDRW0P0wFQbd++TdasXiV169WX++8fmm6vEStXrpLPvxgpX6l0FXvOzNiIWv/i445duqj08TC55NLL5OSTjo+/nanrofc9IMOfjXkNwek/UtNq1Ws4UFpKt50sXbqMAofDohJUwEJl/bBEelqtWlUHHJCaxqSnu5wUFYBK4F7Hjh2kU8f2mepjWCh5KDDxx0kya9ZsqaiLCr0LtuLRecYY+fXX32Ts2K/dh0yiXntwiLo9JjVF4gm4BZzanLWPSWIDpyYxJeYgcJ868WeKpNTyUL8HpSZF9ddBUGp9cRXpn0TAFBMCPlT9+wFQutuZtbRr11Y6tG9rRXMlDm1Mc4Xsyd3oE08+I48//GBydzKJe7dJJVFhCClwqBR4UufhPvWvWVNt3ACjMDGkezA4Y1KeGXlJSbA9mI0dXlqqbptUJb1z5y5dKLRFFuvWm4OHDEk3KKXuGjWqK1C+xB1z5s6TGTN+lXfefltWr1opC+bNCzZ/0PN6DRtKzZq1pHGTJtKvX19pp6rDrA6DBv1VZs+eJd997U2QWAiFaQIMf+9ev6ExdESV6enoV1GzJSk0RtpVVYFsyZIlIozdLzzx0iZvt0td3303zoGZhg3qZ/UjhPXlAAVWrV4j06ZNl9UaszOYuV4Lgka60aRJY1XvT9KPlO0OKKbWNaSQbB2KaTLSSSSYAEsDmpRjfFkw0Mh8JXDNfT5+iP21V7378ernO+n4KbV3gElPfb1xYtOANSrt0K+gCh9QysG7oX59vxDS15M7f0Ngmjt0T7pWUVN9+tkXOvEmy+cRv4BJ1/BrjT4AAEAASURBVMk80qGPP3zfqQPPPfcsqazqoDCEFMgIBTbqh80HH3wsU6dMlipVqjhQiqQ0yChhWDGGFGNytOMZj7cthblxwHQApUhLKTv4vvulYcMGmjtzoaky6SaNG8kR3bvJ6jVrdHHIrAxV1KxZU6mpQBfJVPny5TJUNr2ZWTl/5513yltNmsqrL73gaIDEeJ062YceBNxWQR+jJYujCCyKMnpjf4rEDCAAwLCFVFYHEtb33/9QTjvtFGmuzxWGvEOB6b/MkJkzZ7vfH/MNv3ual2QakGS+APrYLaxbt+7CxhaovZFaBgPjw4LHmH6lPsDUHNUzzggAzPhAOwTuUZcdzGcPSP1iJRur9g6wciZJtTaIg33y57wXzL7Ur8JHaspYZhFg+/btcnXRk9EkVOUbJQpwvEsH5SWXXCqTJkwowFQ4tEdHTYhEJhhwF/XJiBESSlKCVAnP06IA/gOP7d1bKqukrmat2m4FvreBBJh6m1KYFEzHGFOwvuDqe0CY2Y3BdDZuWC/Lli6R59RmtKABqJdfeU3uUbdSwYAbqeo1a7qFT/hFLVWKbUpR6+OKq4SeF1dJaEV3IEkDmMDAkZih2uec1dTvv/++jP/2G1f1bXfcJVf/6cpgM+F5ElKABb1jx37rTDpYyObV7bGPP+aWP5BIxvwBMz4WLlwk7777roLFg8v1mKfU7T9yiFn4FPOiAfjlYE7Tnl1TztJsrtu8JyZY/zx5veSUNAJlYgEgGlv4FP/hyjsDLR+gtIduw5oMwT9FMvQk7EOuUGCdSgbee+/DEJQeAvUrq1QL27X4gJNv9tsOQ0iB9FJgzdp1TnJRsSILL8w/KUwy5qPUmI7FVrdJR4iN+bDaFvDEsXLlCjnq6F5O0mllCkrctWsXaduhY4rHZTvTbeqf0q+8994KPJj3UmYkqfiv5ACMQlMPLIpE4y1btspPP4yP1vvyi8NlwcLF0evwJDkpsHTpMvdhwYI3A4Me6MXsNj2284DPnoKPEcw7ypYtFwf+LEfK2M9FzD6Yh371O2nBg3EVf3Cf/Jbu6/ESU9LsmnpNAoq038912okd3Ofa+1u1fvj71GUalVq1aqbsfC5eFblbQy62HzadSxRgIcPzw16U66+9VkZ+8Xku9SLvN4sqsE69em51czHdFhLfibwELIz/fpzs3L1XXW+0dGoiSw/jkALxFJgw8Sd57LHHpLquvi+t6mPU3EjvAKgcJlkBkJrUxOoIMjBjNNiUoroHWJH/5kGD5PLLLnaSFitXUGJWzvfvf74UL1lGxkc2B2GeIknmA9JAPkycRSGmpoWumDkBXslPPlsYQ/qTjz+qkugNUTL+oa52PvnkEylc9DBp2KiBlFTJaxiSgwIIYWbOnCXfj5/gPjRY3MauZ2YmQ8wc8wDVfwiaBJInYCz4MYC9dQ2ZO3dOdEyk9YSASAJAl1OuEx02h60dynBOXtoNxpbX0uzaA9WU4JOyHCx+9LG3JwVkM4axqT766B7SpnVLmkyKEALTpPgZcrYTOMu/6aab5YN33nZfSznbev5qjRcDNmsVdCVnY7Vl4xWEWx0LTP4fJ/wgTVu00t1qcs8vnPUnjJOTAtOm/6Iujv7mACSqRe9Av7izbQRUGsNMBEoZg3bAoEx9j59SANWK5cvk4osvlWOP6ZWcD5+DverQoZ3MmbdQ5s2Z7Vplf/FdSiM8DBRTO1LMBgEjqG/9YhK/+ASwD40BriyGYhvTd999T37SuR0fkMSOU9X+rj37pVfPo+Nvh9e5QAFA2fgfJsi8eQucCzJ2DcOelA8+7If9/IqBUT8GYupwP78AiR4sYne8bdt2dS21RMumx1e1V6d7KWyMANRrH0WcW/Dt+WvmNCGYZucWk8fODcQaWCUmzWLGsn288mEGDU48oY+jg7Wf23EITHP7F8jh9rFhGzDgCpny04853HL+bo4tEKtUrSa169TVF9Yfzkdk8ImnT58mp59xptoMlgomh+chBWSmuqi5/NJL3fipqIvlkOLALM1fKcCUAwYWzzAhnzEgmA8HwBRAumPHdlm8aKG0a99Rrr3mTyGllQLQ79RTT5bNW7fLz7q4zIK3F1VNh4ID7MWNztDcDtT85AOIPPvsszJKNU1oTAAEiQL116nXULUlLRLdDtNyiAJIBd997wMnHUcN7+2HvT0poIy5xe/NhwgmMwYUrXvML68G9yYyXDMO8HO6Tjej2Lp1i5ZJ2yqSIcI4idXNmPHAl9Xx8WPIQGZ8TJ8szfcrZrZDur0LgrG9F0gLglLeEfTnz3++ymkB7HmTIQ4XPyXDr5ADfRj51Wh5+aWXZIYCpK3qEiKnAi/5dh07qiPqs9XecpJ8qivW82sormq7uvXrS/0GDWXpksWyaMECQXpioYSqZs+74CK55pqrw61KjSgFOIaRjPxqjLzwwjCVWhzmFmIASmGcSHCCTBMGAgMNBmM+1GMMhxgH+khC+Fg65dTTFIidFHqHCBIucv7jT5PloYcelMkTJ0bv8kFQRRc68ZHJgigka/igLFWqpB6lHZ1/+nGCzPrtN8fUmfPQf6eCn0SB+12POFL69u0np5x8ggNAifKFaVlPgcVLlqqEdL4Dj/yu/rdM6dTeAKkBSwOO/Kb+MBtOQF3MLhNgyrXCRPn667GqDl+v5zEJa2pPA/j1uzn5lfr4KDX7cfpiH6HBc5v7vq9+IRbnpHPYOW1a/zmn/xabxNTAKeY9pF188UXStEkjly+Z/oQS02T6NbKpL8tXrJAHH3xIJqi9I1/9ORmO6tlLnXjfJz2PPkoaNGgoM9RJ8SpdhJEfA6vy16ufxHLq/qZJ02buhbNm1aroowIapk2dolKUBroCMncdGEc7FZ7kGgXmKtP805VX6G5Eld2OQybJCe4UczBJqTFQA6YwTFT469evVUlpB7n+L9dIKf0gCsOBFKhdu5a079BBRo0aJdiGEmDWvCMBDHwcFFFfptDYmP+PE39IsaMUdEetiykATD8+8E5YvHCBjPzyCzn+xBN14UyV+CzhdRZTgN9rga6c//bbcc6GErOL2NxKtPLeS0lTgjoPSOmaX1TkpY2MD3OvxDhBGsvCuHX63jdwm9bjgBUVS2rgjweOXNFnxo/NZ2JLtzSuLQ8xfSEQcwTvcW7vBIt5N3Dw0cp47tq1q3TrerirI9n+hBLTZPtFsqg/TJbZc+bKokVL3ORBLTjs+Wflt19+yaIWUq8GN0nn9DtfOnfuLMf16e2+VIO5MT4HrP42fXowOd+cI+lq2KSJ1KvfwH1J/zJ1aooPAr7eLxlwpXMsnoxfq/nmh0jiB2FXpwceeFjmz5+r7ogqOWkpKmLGRryk1EARj2NMCsZjzImVuLt2+YUMLHjarAvwTjjhROnX92xXbxKTISm6tkNVmkOH/kdee/nFaH/Q9PDBUFWlp+wQhc3v1Ek/pbolK5JRgA1gJbUdsZq2aCF/vWmQs+cLgqBoo+HJIVNg3vwF8ttvM1W9vlWw1cYeGN7HHHIfGgG1PUAy+Dv4ueXBoV/p7sGpATtiLyndEwGkflHcWl1jwFzkt1+6dImTiB7sQWjXbJg5B6z6GAmq7xcbPJg0lQ9U0u1D1eeNeQzgmmCxvScspu8eSG+X7t2PkHPOPiOa92B9zY37ocQ0N6iezW0yScZ8/a0sW7bcqaDKli3rnFg3btxURul2gtkdzj2vvwy+925p0bxZQoPqenXrqAF6BRn33bdusmR3f3K6fujPgiheBCyI4q2zVp2QW+DrdurkSbJIVU0nn3KyFI1T0Vq+MM6/FHj0sSdl8qQfFfhUV2lOySgghXlyGHOyOEgJYzbE2JMiwfG7Ou1w6vtWrVrLDddf6wBusFx4npgC0LtlyxZOm4OfVwKLoswGj/ukb9RV3akFJKMsnsL9UGpq/fX6TuD926NXb7eLVmp1hemZowA7OI0ezZahxdT+s6LOK794kN8v+LHn51RiUOq9MvABGFPdA0Z5Z/M+Z5MKDqSOgN+Nai6D1PTCC/tLp04dVUr7nZu76XkC5q+2BHvQgDN8YrMTRQLqzQngJ9ih+nvBNP9xSj0+z4Gr8YNAepXu0FZdt+MdMOBS946htWQNITBN1l8mk/1CSvrVqDFuElWoUCHC9Lyrmdq1a8qOXXtk5m+/ZrL2tIuVUQB84aWXyz3//mfaGfUuDr5POe00Gae7aLBNYH4Mm9VpcQm1GWzWvIVu9bbZuZIKPicqvsJFi+sXbNdgcniejynAZhY33HizfDt2jNRv2NAtdEKiw4E0BCYalIrARIMBBgQj4jCmw4pjHL5v2rhBCmn+u+66Q0orQApD+imAOr5v33PdYqWvVO1OsBX7gBBMdA4W9uhvSxk0RoCYRAGA8/mIz+Q4lWgDnsKQNRRYqkKY0aO/dpshlCmDXbBfaZ8SlHp7zPiPPT+fvHTUAJ5JSfm9TFKKiQwglIOtO1eoiRzh4osvlAb160l5ldA2UUHE+PHfu/T0qvZ1KkeBJe0DVOmTn+selJLHp3lTAt9Pr8Knj3b4D1Uv2eVjlXG4e/cuBdF/yMCBqqXre44cpsA92UMITJP9F0pn/1BhTJ48VeYoMGW3EqSkfDGabzYcQyPm76A2Vb/PnCmrIpMqndUfNFsntVf5j9qxXtD/vIPmtQwVdOeV004/XQ4rUVp+V7CM25ZkCjjOf/KZ/0qDRk2cy6fM9A3JKV/rSE4Bp2bLZnVNwjtC4aLuaxu7tjDkbwr8+54hMnvWTOf7lp2GgtJSACmHMc4gKDVGlZJx2ur7nQ6UblRgescddyblYoa88quygr5CparyzddjXJehd0beSwAEAup/AA2/W3ygvrfeeEP2FSoihx/eKd0Stvh6wmuR+QsWyqjRX8ss9WzBinsWqfGRFwSmzCNbcR8/p8zpvKnubYGTAVM++gB4fPjxgQIgZZckAN8JJxwv/c/v61yH2W+Bv9wjjjxStZUrFLgu1w9NFix6NbvlSS0OquH9PPeO+Tn3/YxJUT0Qxe2TB87eRZy3IUXSj1SXPrMQsly58nLLoJucMCj4/Kn1IxnSQxvTZPgVDrEPX+vWaqjtAaOsPASMGpMDkHoXGLFVgD/+OEnu/dc/DrFVXxzn8k8+/bS0a9vmkOpjB5XHHn9SXhr23CHVkxWFeaZTTjtD/qRbC1ZUqTPhP2oP+NwzT2W6+g5qb1u/QSOZO2e22vlOP4BhtWzTRl5//XV9iZTNdBthweSlAHaMt956u8yZPcu5FMNm0S/I8L4U+XiBacCcLA4+DYwIkOMZplffm0so3ELBQIcPfz5PSEOCz5Ws52+8+Y7c9bfbMt093EjxPmZnKSTbqYWbb/ubXHft1andDtNToQBz4YcJP6pHixd044QLnKqbRYOH6SYnSEk5/DzyfM9An1XnP/SYU7EFRQZG3ceI2mybRsJvQbvd2W6v0sWsbLBwxYDL0jTHoK7JU36WL774Un2dLnZAOb0A1foYH/MMSFPNpRXn9J/A83jwiqTVbxzRunUblZIOkEoqqMprIZSY5rVfLNBfVArvf/Cx29kFn2p+p5j4r0VWHGLm6I2qGci1atXSCfN5CldGgWrTfVpeQdv/vfZalvjpA0zjjPqYPsfJhk0qWdQXek66tbKHvvLqa+Tpp5+U3r17pti15fDOneSHiT/KyuXLLWuGYr6yK+nXdL169eUP9XOKK59gwCn/th27XLvB9PA8f1BgwBUD5ZdpP6v0vbFKdfzHI5IdAGlQfZ8IlHqJiVffG/P0vkp3uHkyd/Zs+btKSlEnhiFrKNC2TesUav2M1gpQwNaUHbx2p6LWp87JqjFZsmyl9NR3X2hrnj4qr1y1Wm688SZ59MEHnJ/ert26O54GcLP5xDwyKenBQGlMDY4K3Duf9/akXnWPpJT393q1Me7evZuC0kudJ4a0ekv7ddTrQ+9ePeWw4iWdRBeNmddcZl4zBv+290FMkuptTQGkgGkkpNdcc40uPD4mhTQ3rf4m271QYppsv0g6+rNTX3RrdU/tsSopxTYKp+1B1QXqAw9E+cLyUpjg5ASoMhkvv+SSAwBSOpqX2nXrymNPPOEWN2Hsnx0Bm5jZc+bIDz9MlNGjRsq0Kdmz53w9tfNr0bKV3HDDDWoCUUFqVK+W6uNAs+tvuEm+/OyTVPOkdYPfqGmLllJXwenPUyYdAHLxm/iKAv1DlT6n1YfwXs5T4J13P5CXXhzufGOWLu23GgWMIt3Bf6lnojFpqfXQS3VslbB3/wLD9Acuodbr/C4kt912azhmjGhZHCOV++ddd8r8uXMzVTO/D/MawMDWp6mFGioseOmV/wvNMFIjkKbzUcZcGq7eZRbMmxfNWb1mTblegSoL2JgzKVe7K7OLBD+fvJTU5pZ96AHyOMe7Bb8VQh8kpWglVqvQoLJ6aDjxxOMz/fEHuN2udX777fcybtw4Px50u2CAtA+xflp/045jduY8S5kyZXVb0aOFbVa7qguoEvrRm5dDCEzz2K/HdqIjRnzhVPVV1AYyuPLQ1Pd+YsZAafARGcSI/FErjB49Rp567JHg7YOe9zz2WHn00UcE+9CcDPh85Lkn/DBeJv04UVgFm5mAmp7dmdiFqVOnDs7uJiP1AJgvu+wy+Xny5IwUS5G3bYeO0rRZM1XrzpYZKkXjNwmGV15/Q446snswKTzPoxT4/IuR8vhjj0qt2nWc6t6r73Ggjz2pXy0MeOEAoAYDzNKkIzBLDhilZ5g73ArwJ594LFgkPM8GCvAb9Ot33iHNedxJ8fumBU55L7z77ttOgp4Nj5Gnqxz3/Q/yz3/cJYvmz0/4HAD7Bx56WM0nykSFMcGMHojG22iafaaPvZQUu0zsM7e7Ffeo7k866USVfB4drO6QzwHB34+fKN98840KmdaqmcAmVydaFN4FiQLp2IwCnmvWrKUr7KvLOeecpUKmfVKzRnUFp6UTFcuTaSEwTfCzMYjXrd/gmIeyjGgOJByoy3Mr4Cj/a3UDhR2iN/AO2tR4n2eMaVPbB/vpASkAyBtUc71en/GO2291ro2CeROdd+7WTYYMGZoUX/RLli5T/6AbXP+fe/bZRN1NkcZK5euvv94ZxjOZq+tX5aGEiT9OkgvP65fpKmBSXdSXXFXdXQbJafDrn0pDBpVp0iZVwWefGy7Pql1y63btnb0hEnNsS3mPYCcWr8IPdp75iYQeUERswHS7SlmQvsye+bs89MijSesgO/gs+eF8wsSf5KLz07+wM9Ezs/MbIbgbXHy+bkceJf/733+zzdb8t99nOskg7Y4ZM1Z+nDghvgvSUM1Nzj8/9n5r3ryZFNexm1uBLXtvu/U2+VV3LUwr3PK3O6R3715uvlg+z/dM6+CFMgA5gCHzyktJd2m810lJmVt8/OEwH3DaRm3/zz3nTKsuW+J1qvnYpOZrhE8/HeHMcxI1xDvguOP6uE0aMBPITSySqH9ZmVaggSkLEnaqC4i1OgiRNuKYmhgBFjYlxjiQQCJhROxuXyV8vaDGLqkgg5WAlMuugE3N/PkL3AInJKTYqJkqMNZHb1NDP+mbfXUxMQlISTm31YdMTq7Hjv1G3n3rjVTBKWqo4086xTmD79qlc3Y9YqbrXbkytrNSWpXU0C/KrAqMmy+/HKWSsEdS/YI/WFsVVTXUSJ3wYw/ENrHBHaIoe7ZuUNCvX98QeByMkEl6/6OPP5Pnnv2vcx1UuXIV967wc9bblSI9453BPOXc5iuPY1JSGKc/Yg702ZebndM6de4iN92k5ieRxXlJSoZ80y1sDz9Tjc20adPktVdeypTGht8YcMrvm5qvUwh2rLqSOuOMM+T0007JNP2w0WdBKZqmJUuWymzVzhB+GD/OAS/OV69cmSpIxsTJwuFdurpNIBo3bqySuhrSokXzHNtS+c233pX/U3rP/PXgLg7b6E5nNw+6xQE35g3BFgR53ucBKfQH5JnqPmhPCt9H6FFXzdV69DhS6tSpnaNqcQDqXuez1Kgfi+HdFXRXQd4j+T0UOGDKAJ07b4EDenwRwRwAmLjqMcNpfnhjGDANzziQRB6obmMCIKFECoLvwIo49s1C+45Ro8fKGnXOzrZq2KOxSIh+0ifUgUhegjY1wQHLs9qE9OfeVxsT0g6e9bfffpcHhg52eYPlmzRvLv++517p3q1LMDk8j1BgytRp0u/ssw6JHkjT8HO6QHcAwo6W3ykYnnlumNspJpgWnicvBWB6L738qrzy0gvSUBk5ElIkG8QsfEB9z5wzMEocDLxPbN4yR42Bepu3bQpKV8pDDz+kmovGwWLheQ5S4LnnX5D/DLk30y2iMUF6zuLO+PkerPSf9wyWyy69KJh00HP8WL/22hvq7mq0LFm06KD5M5uh6xFHOnMowDPq86wOL7z4irynZg3pAaTBtplzQ+67X+dcCUdbBDCmJWQu+Q89gCm22mr3qxiAAykpantcLZ5yykmZtiUN9iU8zzwFCsSqfF7wa3Sx0Jw58wS1wPLlK3SA7nE2XwxgXhIwCwCfZx7en6C3A+M8uJ2ZvwbQclCO+7xgcJ7NbhBIYfdo/UWVCWXWN+WChYudX1JUCrgdATz7/tHHYq7t1ECpvexYpcc5zJIj6KONCcqX4h9/bHN2qmvXr5MVy5a5kYQkr+/5Fzj1N6tTM/sMmR+WeaMkhuZ11QXUevUfabTLaM/xa8pvyw5AhXUc4fc0GJarL7zGTZpJLZVUhCH5KYBfxYd0tXCVKlWdNNy7sPFSUv+uSOmnNCgpZa6mnK8GTNnf+g9Zo4sw+p13fpbbuyU/VZOrh7VVirZDQc2s3393QCejvcM+nt+dnaLcb67v5kRhmtqf165TX5o1a5LodjQN6ehXo76WkSNHyTNPPyVjvhqZqUWt0QrTccJOWFMmT5Jf1TRg1qw56mlkm1s4Ci89lACvfvmV1+Spxx+VZUuWZLiqjSrtrF23vjRUiS88zvieCWL8qntstb0dKbRDQoqdZ4MGDeRUBaV19fcNQ+5SIN9LTBGNj/j8S/dFVF4X7DBxkG7CJIxRWGxgEwkk50GpBi+S+IOfLhFj4WXjgd9u10b9+nXT7V9wmYJmbH/oJzuD0A/ODYxyTZupSUmZiF5tn1IlyMS0r0Xvaoat1WwhhV/h+98nH5cTTz1N/vWvfx6yHWbuDuucb/3qP18ro9QFV2ZDrTp1pH3HTur+ZFFCW6pLBlwpd//rrsxWH5bLAQpgn3aFuoVCIoY/YRY6FS1aLMX8tXeKvUvoVjwgZZ4yX/lwxEcp83TtmtUyWG28W7ZolgNPEjaRHgqwBebdd/9bRo74LD3ZE+bBVIpxk9Zizl7qQm/okMEH+M3EO8s333wnQ+69R5YuXpyw/pxMZOe/W9XO8+KL+meq2Ycefkw++/RjWbxgQabKWyHcGA578UW9LOSkoQZQAaPMKfgfAhnovkyFMQDS44/v49w7WR1hnLsUSKlHyt2+ZHnrSDCn/jzdGTXDKAyA+sVBHuDFACgg0wPNoIslYyDxMQwm0WH10RZqd1QG7BaR3rBAJS4wItxAUZf12doyUMqkiw8wONQWLnI3Y9JSACtqDaSotlsEqg0mKgfqjMO7d5eLLrooBKXxhE3Hdc+evdKRK/Us+DFF2l5bASq7xsQH7ICRoocheSnwyaefq236xsCc9VoVP2djdqT2Lgk+iZ+7PsUYqQFU3iENGzUJQWmQYElwziLK3r2POaSe8O5FY8KYSC18M3qUvKrq+fjwqY63p558MilAKX3DNOHV/3tZ0mv3H3yeWbPnyKsvv3jIoNT1Q9+jAHZ4J/PKeJ/NJ1T40J33LUKfXrrinsVEYUgeCuRLiSmrtn/55Vdnm8mEZ+Kzih2giPob6aOp6WPADympt/1CdW1q8qCEI3juQGwEHMa/VIzJ7IsgRCYCUtqyCjYT7eyzdt16mT79F7cyj7Ll9Cua/Ewa2jRbUg+cD/RLShlb3GSLmrwKw9uSkoYEBgaHKsN8tGHozeTEBg4Hz53VfVIYMkcBfoMvR46Wt99+U74ZPTpTlbDHdhu1OcUp9y8/Tz1Ard+qbVu5RXcP6tXzqEzVHxbKHgqw0vmxxx6XpbrDC26h/PumhHvn+PmLSY9pOmIAld4wbjzj9GY3zFEkO0h1kOis0A0dqO/Bhx4MmWf2/HyHVCu/32jVcD2sv89sVe1nJjh+pDwJqSmAKbXQ/+JL5fq/XCtjvv5GF19+IePGfp1a1lxNR2PAu+qyywboAq6TU+0LtPviy69kom5c8oHak2b1hiq4NjxfTdKYXwhhmE8cqO8R/nTp0kW36G6b464PUyVIeCNKgXwHTJm0U6f+7BziMuENkGLrZSAUO1I7N8ZBbCAQiSng1EtOJcpUvKQDWWVEra9lfJr/2g0CVCYdgUmxH2mlHoBD2qiuTtwP074hpZw3f6FMmjRZHeNqmoJRFjiZqYFJXwGkAOVg/dRNGxyuDXfupaK04ydjbJETLzwAqX0psqAKGvz1xr/ka7cT0Cmnw82DbpOP3nsn082yurSx2vkuUJ99AFQbS1bhKeqD9dFHHnK/n6WFce5QAI8ZAy6/3NkI864pWdI+gmPvG3u3EAeDzV0kOTFpjp+nANSlS5dInz7HuzkaLBeeJx8FkPiddvLJsk9/y8wGAB08K6sBWmb7kxXl2Ir5mmuvc7sQxdd3qO/J+PoSXV946WXStm07x2vRXM7Xd2rjxo1VM9g/BKSJCJYkaSnflEnSqcx0AyCG5ALJI7ZdBuo8U/Ar171dZkxlYqDSx77V4DkpQTBoUlKXphc+bzAmvx0+3TEjTSysB33aoQujNmzw21FOmz5Dfv55mlvcZGDZS0djZgK+vpRSFqOPB6be7ZM/9zs6QQt/eFs1Ly316gu+FPlqXKmre4888sgQlBoxszDu3bv3IdW2etVKZ3ZRU51GY7cVHz7/5GNdxDcnPjm8zgUKvPHGW076wkeePzC/8fbpzP3gOyK+e8xRP29jH5ekGUjl4/X88/rGFwuvk5ACeEnof9HFUlk3PclsQKpXFGGK8q/8EtiI5NVXXxXsYS0w5sezo9/ILywp22KAKPMJ2uIOEgHQ0Uf3CEFptlE8ayrOFxLTzZu3yIcffSIr1AG9rWBHegGjILbFQ1wjCTUmYoucvArfu4KKnXswC2MxBgO4NFAaTdOFUi4tjd+DiYgPMiYINp6o1tlSdP78BZFFEgeu2vUSW+pOCUqNkWFLSp3GyKjbM7QYGN21i71+dzopKeoLVvgzQdu2bePsaiqpa4wwZA8Fvhs3Xt5551357KMPMtWA+Tllq7nff53hfA4GK2qsO0fddPMgOenE4w86/oLlwvOsoQDmN3feeZfMnjVT7T8bu3kcc+fmvXzwIWrA1H2gRpq2OWxzlzlpBw708VNao2Ztue66a6VVy+ZZ0+GwlhyhAFqwewffJ2+99n+Zbg9gynjBET9jJT8EFnCdf35/JzR6/fXXDmmhaEbowfzroXbA7VULFZqrZYRyuZs3zwNTJu5rr78lC3QlX6VKlRwQ9dv+AUxZ0e53R4JJoCZhwgNMkVCaHamXrno3UNwPHgxsQCKhsIJE5TTR+3qaAhQYE4r/SWFABAOnqPb3KJCcp/5U6b9X4eMCChBK+x6Q0o/4QF2x+jzIRSLqgam3pYm3JUWFj+oeaWm7du2kX9+z46sNr7OBAjji73tuX/l9xoxM1c4HVfcePdwY/llds6zV3zAYGM8fffZZhrdVDdYRnmeOAm+8+Y689OJwtSmtrVoHvwLffwDzbjlM5/LBQSnzmLmLeQ1zk3m7XneBYd4PHTokdFuTuZ8m10uxxuGMU0+VzWrDn9kAOGUMbVOBQn4KrJjftNFrDHPquTp17SqDBw8O35M5RfAsaOdA5JMFleZUFbzUn3zqv/KrSpRYxW6SUGMKChsjEgsPNunXgeAxpcTT7hNbfncS+QPT8HlioDRYRms74J+VMQltYX3hFNWjVq0aDiADMOg7QBlw6gFzyp8GAGug1J+nXF3vJS6ewQFEUdezsGmjvgSWqD84drL45z/uDEFp8MfM5nM2WmAnkswGAMvvuuMJztnZwrScujsLBn7zRx99LJgUnucABbAnfO3VVxwotS1GAaXMYTQu9v7hvRD/cWnzmNhrOLADx8xGd6FTcEod7BgV+lLMgR8ym5rgt/v088+lpW5nmdnAzlCMkfyk1ocWOQ1KLx/4J3nn7bdCUJrZgZhL5fK0xJTdIRYsmK+g1DugZ3U5IC+mvvfSCwOsSFBhGp6BxEAgaR4QppSWBgGlg5sBaapJSw2U8vuRx8URUOsu9A8vGIIuVXLg0jMllXyq1BTbG2xOAa0xIO3rcWW0LCvukbZSjnPv9slW2nvG5oGpX3EPKAWcIn0BzJ577jnSpHEjB4KpMww5S4GJP06S6675s2xQU4rMhCpVq0rzVq3d2J7w/bjoNoJsG9hXty5FU4AfviqVK2Wm+rBMOilgH8Jvv/m6NG7aLOJAn/cNm3Sg8fCg1IBpIlAKGGVOGigFjKK+/+OPrTJvzhz559336EKR3unsUZgtmSmAB5QXXnzZ7aqXzP3Mj33r2/9CfScel3DRVX583vz2THkWmM749Xfdeu11Z1OK6h5QygHoNJtSQKpJIz04jQFTmAZg1NuU+nOTWMZW5UfU9iY9dWVMRReTvjpwCizVfBzxIQpMAZb6j2Cqd8DpFpVsYgsaLOtBKHnNlhR3MuJUfzHVPbs3eWlL0JYUKSmG3kcddZScfNLxrr3wT+5S4KtRY+TPA6/MdCeK6Lg+8uiezkZruq7Ur1S5sgy4YqD7AOGjBOn4WWedEboUyjSFD17wiSefkY8/fF93lqmXwoE+bugMlPJesSNYI2DUf5B6G3Dmv/eUsV1/uy1OMv4n3aRhwOWXBIuF5/mAAghQhvz7X/ngSfLGI1x3401y80035I3Ohr1MSIE8CUynqDuoYcNecCvscJwPEAWU+p1WkJJ6H6CAUWxJufZS0Zi0lHtgyEMFpjChoKTUwKXFUD0FMI2AU9JgVkhCsS3buHGTk4Ra/qCU1CQsMDO/pRruoFTaqv4OkYxy4AoDcMJzdurUUZroKtHQaXDCMZ9riT9NmqJ+Tt+RD955KzomMtIZ/Jy2Vhvh3r2Ple7du8lq3XnGpOIGejp37uQcsTMOwpA1FGDePfDgIzLuu2+keo2a+p7x7xq/wJJ3im0R7M18eCcEA+VtvptNKTG7OvERWUVXcl977bXStEmjYLHwPB9RYM7c+fLggw/KaPU/GoaspwCbkpyj2qMzzzxDOnVsn/UNhDXmKAWK5mhrWdTY2LHfRndGggmY6gwwaAeqcb+IKCbBDILF+K6kde/AvDFpqd2zdoP1AHyRcgbTXH5NQ3JKepEihRRkFnXAeuvWPxwDi4FSD1xhYhwA1Bhj262MzW8pCiDF/ROSlz/96Spp0TzcttB+l2SKuxzeyb0058+bI7hRyWjYriYa9erVl9NOOyX6EYYqmN+fscT4GDv2GzdGOrRvm9Hqw/ypUOD3mbNlzKiRUqtOXZ2n+CnF1zA2pWhgvPrefaDqbxAPSvlNAKX24WBz2UtLd8iSRQvlxhtvDEFpKrTPL8l8dNzz77vdzmCTJkzIL4+VNM9x3Q1/lYsu7K8a1DJJ06ewI5mnQMpP+8zXk2MlYRKLFy+K2okaQzDwR8wBIMxIgHGkFkz9bnUH8yEttXRiAlHkNMW5v3dgfp4BiS92ajAypKjESEe97ejuCCDd7RZI+MVN290OFkhKl+iOM6y2v/3220JQ6n6B5P3DR9SgW27NVAdZAHWs7mayaNFit7itmm6JWLMmC+iKOeBD3bhLGzfue924YUGm2ggLHUiBp556SqpVrxGdo4BRNC4GSuPnv9VgoJQYQLp3r//A5GOCxU5rdBva2/9+hxzeuaMVCeN8TIEaNarrlp3/J207hL93Vv3M7Tt1khEjR8qfrx4YgtKsImoS1JOngCm7rAwf/oIDbjBhA6XQ0ZiD0RRgGI810wKfvpyXbDh5ZqAw4DM+0HYxVeF5qQl2ZTFQGp/XqooBVwdnXZ/Ja+nldStS6vEqe+/b0NuQ7nY7V/hFEn84tT3bia5atUqW65aFF1zQX90SnRXucR9P+CS9PvKIbvLhp58JOzylJyCdO+6kk+WoHkc7ULpw4SL9GFnqbBRr164pDRrUd9vYMo4ATBXUJQtaheXq1zcMmafALzN+k/PU9+LaNavdRgfeDZ3fapT3T/AdFP/+AYzaYfOZucxHJfN4pf425/e/QG3AT8h8B8OSeY4CmJY9+NBDUq1GjTzX92TrcL8LLnK0bN6sabJ1LezPIVIgTwHT//u/15wqBEYNU4AZABCDADW99IBpZCQY4wE4FlWJCbuyHLiS/0BpaFptOHiqz6D/3TOQF7dXOGlG1Ye0dOdO7/pp2zYWSfyhz7/J+SRduHChs00bMvjf0k4d5ochb1GgbZtW8pE638f5c1oB26nTzjpHJaO13AcJY4MxADBdvHiJs0uuW7eONGzYwElLqYv5wBx5770P5dvvvicpDBmkwPfjJ8jF+sHHvK9cpaqTlrL6PrZDW8wtVPz7hw/gIChFWmpzGbvSJarxOUzNAU4+OQSlGfxZ8kV21PpffzNWTjz19HzxPDn9EEf27CWjxo6V++8bLI0bNczp5sP2coACeQaYLli4WGbO/N25gjKQSEywOEgvpJSR2y7ZpJZBqSlp/tqvfCcj1wccWIRqOgwIUOqc8yMxUemUHfgmdYfmSdQfq9t1Rv/E53HX2mEWVHB46Yr3bYiUhZ2bsCXEUf6GDRukZcuWcuUVl1l1YZxHKXDLLWn7OW3RurVTAfP7exWw91ULOF2xYqVbAMW4rF69mvrFrenGDqQgrbz6PWWLXrbqDUP6KbBLPwgfffQRaa17bOOKDpCPuURQfQ99CcTBucx7AlBKjKQUH6XeLtzvwLZm9Spp0bKVvPzSi+G2iOn/SfJdTnwcP/P0E8IK8jCknwLHnnCiPPTQg9JQtURhyL8UyDOLn375ZUZUdZaIGQR/IpgCwXx/Ekf4SBR0yp6f5OmLhsgYt4Vvaxkw7D9yXv2UTCZYJ+cAXWsbB/mycLice9z94vb1KdFX/jdlqPQs6tAujbvi1pdgXaRZOkzNMzbfZ9qoVKmirrbe4FbtsvLepGSs4K1du7acffaZUk+lZGHI+xRo3aqFPPLEU/LWm2/IxPEx6SZjooL6J8VcBL+07GBmqmOAD+OQ8bB8+QoHmiqrD9MqVSo7VTHb3QJkyY/N6bRpvzj3RvXr1c37BMvmJ2C3rvvue0BwcF6hQkUF+khJWehkwDRmQmTvAusSczoISr1NqXcLhQYE5+KNmzST66+/zi1es3JhXHAp0KpVq4L78Bl48uZKpz7HnSDnnBOarGWAbHk2a54Bpj/88INjELEtO720NJ7yBvhisc/BtR2OsccX1Gt/Pz4GMKrJABJSPQCOgIZ9Wl8RjWO98GYFRQrTjuJSvcfWo9TpmVWsH9a05nT3ucZEYN8+6ivkmFa5cmVl6VJvR4iUtKo6Wb/44gudo3wrH8Z5nwKAmzPPONUd1153vXz52afuoZDOFdYxtGHDejdGcBWlI9OdI4WzsWz2iyyCq6M7zuAmrEKF8rJQNQwAVyR95Pn440914VRvad2qpas//HMgBdauW69aiCsdbWuo6USpUqUd/VJKTL0brtRAKXPdJKVoPXAFx4fFwgXzpXmLVjJkyD3ODOjA1sOUgkiB999/ryA+doaeGVvSW265OdxAJENUy9uZ8wQw5cWOOkz5dKrBGLVl4Do+xKelzGEg0QPRYFkHF9NqPJLZSz+5UFdQQFbEtMqoTCIa7BKgND74fB4YlylT2qluUd8DLnARFEpJ4ymWv657qu2UAVPGO6p7zDgAN0V3F3NzgHRAEbEdjBG8OvzxxzZdBFXW2Snj35dNFhjzjKtSCmxXrlwdAtM0hszPP0+X1atWul2d3IeBfixCaztsflocrMreLcQcfnc2v20wvyGhX7++ISgNEi08d2smco0MNfrI1QO7S9VGx8mlxzaQlJ6P98rGqZ/Ie5OXyJxPnpd3pm3JlW6yu93FF18UgtJcoX7uNZongOnIr8a4CYw6rbBKJAnGANKKTa3m8yC9xI2UL496P0VwDMXXy71ChVhVC1PyuYLMyElcI9LTWB0KRR0T84xJdy7Q8nqufkpp051H2rY++H75/JFb0erK6Qp99reHQfbu1cMBi+jN8CRfUuD888516vhHH3lYZv76q2xVKSjSN3YHK6MqeWKuUS/7MRWTyANiWWADWMUUpFGjBvpBU1TWqRQQ4MqK8hW6EnzS5KnSpnXLUJUcGEHr1Wb7o48+lc8+/Vhatm7jaIMTfXOgb26h4gGqVeF+o4h2BPrzOwBGWejECnwkr6+9/ppUVtOMMIQUMAq8/8HHMn3KFLvMobiY1OhzpQz6y0A5p2PlNNosIhU6niVX4tlq4PUyZNFYeW34czLsq4WyVRdg+sV8O2WvjvesDvDao3r1lhPUnpStlqtVrZLVTYT1JTkFkh6YblB15Pjx450a3WgZBHEG7uxeSjAK6IN5GyhFgOnduAAcY4F8gFKfr1AhDxaJmSQecDq5qbuGQRUBhCaQorr8mu7Bp/oi3eP3xqZdgutvRCXr8/heBJ+DOugPallsB5GGhSH/U4Df/bg+x7jV97f89Ub3wDjVX6WAEptRABAHK/X9JgwemDJ2AESMMRgGC6HqqFq/adMmUrHiOlmwYKFT6zNusdWeMmWqnKcguIIujiroYYG63up37rlSs1Yt56u0dOky7mMQUIoK3811/QhNC5RCf2jPb4MtKQeAdO3aNbJczXFeeuWVEJQW9IEW9/zfjRsv/7rrDjdW4m5l32WxdtJvyN3yt/M6SoUMtlKkfm+59J6ecs7FI+SxB1+Tn1b7D6/Nughzi2pmeE9lVeAj/OWXXsiq6sJ68iAFkn5V/gz1Jbhp00YHCIP0NVBngM6YA3lS3guWip27crFLSqW4Su3CgCrxwYKTyirTAmQSfJuxduLriL+P3Skr8MNQsCjQSu1AMd+w4CRwKqXY4dyI+dXdpsY3sEpMGtLRzZu3OLtGfOyyEwoHwIpAvYCopUuXW/UFOp6k28QSyutCJ7QTuIDzR8wdnc1Ti41g9rFJ7A//EWq/zUr1MXzscceHLm2MYGEcpYCbo/qxmWOhWEe5+s0X5P5MgNJYHwtLmWanyV2P3iV9W1Z0moBy+nGL2VAYQgpkJQWSWmLKC/633353DBd1mgUH4CJSitTOYRRgx337iqgkg3NW3O/Vo4hjIioMTQFF9+ve8+RjoRPBmJAxHBVEOeZOe9yz+y5z4A/3CR4wsNtLRGKq0lgC9QWD738k3RBsJANtsIBip0pgcC8ShoJBARxGj/3uO3nn3fdl+HP/i0ok2CmI8VS23A6n1mcsmeQU6Z4fc3sjdql+g4ZKqj7GAT/3ly1b7uxWWak/adJk5w+1TetW6laqXMEgbNxTvvHmO7oTz8vStn17Vd+XjOzsVNwBVEAqB3PQpKXB4v694CXW0B0pKe8rVPhbt27WD4DD5JHHHhe2oQ1DSIEgBRgjTz7xWDApe88dKH1ebut8oOp+78Kv5ZVRE2T8sBdlzEplchaQrg46XZo3S2B/Wqa1XPKP62XHP56TT+aukL1xPM2qyGyMCdODDz0qN/31ejcHM1tPWC7vUiCpJaa86KdMmexs6oIk9gzZq9sNmNp9A4YG+Lx6nrwGDGPlrAwQNYYJY/c9o0caAor1gJN6zdYvVt6fWdv0j8nqmZevjxxcW/D98+1aueA9zmGK0IDFX2EoWBRg+8Lr/3KNHHv8idEHR2K6USXouB3astVLRWFy2Jeaj1MAEudr165Vm9JVzu8tm0GwdSlmIQTGFaALH6fffjcuxbiMNpbPT5apm63XX3/VuYQqWbK0sycFTJoDfXPNBa04giE2d81Xqf8AZZEaG2IsXrhQzjrrrBCUBokWnkcpwLbaC+fNi15n70lZ6Xj7UBkUD0o3TpbhVx4tzXpfIYMHP5cSlNKh3dPlnfuHyJArj5Xjr/yPjJy5KWU3S3eUK285XRqJmhDph1lWBubXJ7r5CDs9hqFgUiCpgSl7xXtJqQeF/ET7VLLJwDVw6kCgTgwAHEDSron9eQwg+gVI2IL5tFitijtdfi81NcmTr8Pb9QE08SmK9BJfhzD/Hbv2BKSuCjI1zx61Kd2tfdmjIlYcde/R/bH3Omms9dsWQvEs/jlox7XvbFwNwPreoc6PZ4wFc6gWzKe++1//kOtvGhTdwnCbqv/Wqfuw1Wp3un7dWsHGa6uCVNuAgZgD91FL1b5xzpx5snDRYmej3bBhA6lfv55TvSEFZIEdi6NGfD5S828tMAT+YcKP8o9//FOfv7yq8Cu4xU7eXym7ufkdnbxrOC8ttfnHeyf4jsHEwn8IsAHGVmdGwQLNwUPvC7caLTCjKeMPOnXqz84WPOMlM16iWKcb5D8DWgRW3Otq+8kPy9ld+srQ0UsPWmEJXd9QZNEoefqOf8vTE5dLTLSiGsRa3eUc3VUZ86GsDsuWLJG33343q6sN68sjFEhqYApD3bVrp5IyJrFQ3hAFpgY+gxKM9J47KWiKH8lLLy3Jg1gPHGFGBnwBy1wDPgG4KcAtgFnBJV+QAFQHODXN9ykqdHVNkBbtP8CUB9MQH8MosUcKQ8GkAO6f/nrjX+TmW26LEgBABPBEegpTYAMGJHX+8B9NfDjZxgzsEIXTfRb01NJFPkhPUe0DuIhXrlwp474f78ZjtJF8evKzbjZw5x1/V/ptdm61oElx3R4U21tvY+oXOvH4gHcDpVz7eRx7J9gHLOY2ANS1+sHQo0cP6d6tC9nDEFIgIQXWrVuXMD3rE+vLWX85UxoH/EDtnfeiDOz/lEwPaO3TahdgyuLffXvmyZiHH5c3UkhOK0nPG6+QXoWyfmU+fWKnxzAUTAokNTBFhY2ENBg8oPPSxyCIMxBocZCJmB2eV+vDYPx3X0pQ6SWVtOdBKwzIg0rqNCbEbi67lRF5cBoEppE8EcCKlJTydlh/fP99Xtf/CJjVltxjBvO5+5pKW2Eo2BTo1/dsueiyAVEisDMRtlibNm6QPyISUyfFD6j2vcuiHbqL2HrnKordxCpUKCeYCbBhA6CLMYbXh8WLl8i7733oPsCijeSzk1mz58jll1zsJaXlkZSWVDAaA6RB9b0tFguSwOamfx94t1AmMV2nK/A3rF8n3bt3CxYJz0MKHECBSZN+PCAtWxLqnCzn96oaq3rvTHnp1idkajpBqb0fELQ4jd7uufLJk5/I70GxaeXucnLPjK7xj3UprbNJEyfIkqXL0soS3sunFIitKErCBwxKK4LdQ1IZA4osaPIqN6SanBuQpAzXSC+RunJepAgAsKjsRW1OBhd+l1f/0k9etctMxSpFVVCwvTCg2YNJA5YuIa5OuwcgJX+Q6XEOoDWTg7ii4WUBpcAdf79N6tWrJ++8/abMnTUr6ueU8VKmbGxBFDtDMQc4kK4SL13KOU75d6sLqYrSsCELooo5W9StW/9w0kM+BD/5dIT07NkjS9wbrVNAPH/+QmdasGbNWrcwyM9Bv+Kdc6RHzNuaNWu6+Wk/Lc9EP0uXLqXPXFfKq9kBm05kNoz7/gd5/PHHpHXbdlK6TBkHSs0llPePnNKRPn2zYLQkNs0JgBQ/pXwMYE5x5lnn6O5dpxXYhWRGqzA+OAX4oMz+UEzqnH6ctAtKS6d/JK9MSX/bzEHGNqEyfrtVcrp70Wfy7Gd95LHTa0Yeobr0OqWLFBv9laQT70bKHTzClp75FoaCR4GkBqap/RxeAupV5TALJhCHMRBAK9IPS7dY4Z+mxUBgDJim1lJG0vfJrh3q5Lyo78vBSmquaBbrn38GK899O6JZw5MCTAGc5A+88nJp3LiR7thypXNujf9AVPqMfbbNLRpxM4XEz6R+zAUOFkQBxvhQq1WrplPpo75e5Exmdjm1/oYNG2XMmG/k7LNOz9SKWGywF6pvUKS1I0Z84SS1ALgyCgZZXBSUSlq/AIGblAHS3yAgNBtOzA8qqC0ogJn7dWrXytAogDYvvfSS03RUrFgpYlPq1ffWH2vbaBZswOYn9fBugVn6hU471T/sBmnbtr1cesmFwSLheUiBhBTYtEl9fqrpTfaHynJEl8YB29JtMn3kGDm4VWnKniEt3abmQrw3kJru2LFeRn86Qdadfrb4Nf5FpHLvk+ToYl/JmKxGptoV6BWGgkeBPApMvTQRJgHTMCBqjANmQxpMjBhm4+95HQTCkMIBYJglP/t+XSSlDGuvW6x08BoByBaCjA8wSl/94UEq52EIKWAUOKZ3T/nzddfL048/6pJshyjGfTEFmowXxn7hwv7jjPFvAIzdnwBWJUoUdyp9gCmMEldSjEMYECDxx58my5FHpF8tPXfefPnww49VArrWLbrCPAD/hhbTB9oitoM++n56iyK7JiZg/0odtrDrpZdecX1sqNsU9up1tFRSierBpKgA5Zt08djC+fOkfsNGTlJq9qTWJ2hD4DoYgvOScy8t9Sp8JKVrVq+SIvpM11zzp2Cx8DykQKoUmDDxJ1k0f36q97PuRl1p2iioYVgqU8YvzlT1aAeQXvIB7DQwqz6Xb9adIedUjohjK9SXptWLyZilWY9McWvXoX3bTPU7LJR3KZAngalnXB7AwSy4BoDGg9EgKDWwx0+FT1MU+TFs2FzOf/hOOb12ccecjIkbAyWGV8LobZU8dRRZ8Y5cd8n/ZLb7/bU/rg8xFaAxWIvJBoOzYOfEqO4NlNo1feYZAkWsaBgXcArccP21bsHNsP8948YUklMW3xBgHja2GD/xgTnDOMa8he1LUZUTTN0OmPztN7/woFvXwx2odRni/mACMPKr0TJ27FhdTLRJQW0JBZPFpVq16m4eBRcTxc8p5gSHn1t+zgTP7X6wSUAzYY0+5xtvvOX6hbq/R48j3W5XqPuDc428gwcPlZUrlku9Bg0jfkrNJVQxB3xpkxDfnp+DMW0MzBm6Iv3lfIOaKfQ57gQZOHCAFFcAHYaQAumhAHMiR0KJhtKodmyTDtm9TObM2pHppnFVFw17F8ncxboouXIpn1SkrLqiU5CaDcA0x+gVfbjwJBkokEOzJGsf1S8oArSxMt5LYRjABkSJYYQwGwN3nvHQDy9R2psC7SlIjYBAK2Ox9ZxrtRxVho/EB6aqQHJvENx6oLx3r2eyZPdlYrHVRWzAgdh3xZc3AO0XYSE55X4oMQ3SLjzXUazj/W+33+LGEeCUADhdp+p6gJMOPgf6GE8ExqKNR+bHcvXjqakOaKEqNzdSqPVRwwNOf/31N5k7d57bvjS4wcNGlag++OAjqqZHyrpP85bS3aXKa58wGcAxvY9pLx6QGvgMxtY/S7PrYJ9JCwZAKs+GNPXjjz91fW7evLmc1+8clw0p8C23/k0WL1ogNWrWiqjvSziJMO1AP2vP4mD91G3gFEAKmMfrAbSh7rIKgq+79upgkfA8pEDyUmDzBll34DdqJvu7WdZv0HeMRICpVJNGzXUB1LSVmawvLBZSICUF8iQwNYYBgzUQSgyDgaFwHs+QPaNBxe8lrCpjDUhMlSiKM61eGCL5rT691EAaoBSwGGH68eCWBVX7PQDglt12IDYl3aP3aNiDUy819f33gNSfe3OFuOLhZUgBRwFcSU2e/JNM/eknd42fU8YNwCulWj8mnbSxvWrVKjdXkHLWqlXDlQF4sUKfUKpUKQfExo37QY7r09ulfTbiS3VM/5qC351udXuJEqW0HCvbvR0rQBRwaqDUgCnXBgBJIxjwtHSuCVwT7H7w3OYKaTY/6SfH0qVLZdjwl9zK+H+PN7aGAABAAElEQVT+4y7187pOGjVp4kA29OCw/hAH+0R9FqCPvQt4lwBKAaf4MQYIz509Sx59/AnLHsYhBdJNgZIlS6Q77yFlbN5UGgYEprJlvazNek37IXUxPYXtnZCevGGe/EOBpAamMBIAYaLAivVChcwWM7YQygAqMQEmY4fdc9d6z4CjA4fOvRMMNSadhDnBwEzNDj8FnHr+qfni/Jh6Sa7fspS2Y5PqwGegboIxWi79oi6TnHpASl/tWVyB8E9IgQAFkGzec889zhn167q9JnbOuJJiNS02mswTxrA/vJSQMQeo42BBFPam+PIsqwuUqlWrpmDU7xzFuEMyuVz3fP/8i69kg9qYffnlF067gHN66vdgz2xYvQ9Qxj3tUT/nwSM+Lf7a8gbT7XG5Z/PG0shHIJ2+bt68WUaPHqPnJaR2nbouNpdQ7OqUqF9WF3Uw3ywGkEIDQClAfPPmTW5nqBvVZrVTJ/UsHoaQAhmkwHvvvZ/BEpnMrh9lG5QFNvDfgJmsJPeLzZ7tDeVyvydhD3KSAkkNTNu2ae0WP3hgdiC4cz5FlWkQvP1nSkbo0ws75mIMjzRfX0qJqQevHszCmDhgesQeIFMSsEk60lOVADm7UJ8eA7cxlamBag9kLZ+PtdpICDLDGCiljzBGJFj169e1zGEcUuAACrRq2ULu/tddznn+f4bc68bsFgVojKGy5dQXsEryOY8BLm+DyjVjbOFCLxHEt2ltXa3ftGljB8BQ9wPkZsz4Rd5683VV15eTkqVKqmuqslHpowemXn1vc9CD4BgwNZBJOvPQruPPbY5ynyMYuEeIj3kGC9RPf5jLR/fs5ebO6tWrXV1FiqC+9z5Lg+1aWeIgKAWMmgofu1I2NMAzwFNPPh4sEp6HFMgQBaZNnZyh/JnOvHa9bETGYsC0dmNprsLa6Zk3Mw10pZwuPAzaVW+TDeuypOJAG/501arQPOAAohSAhKQGpgBPGKcxo+Dv4RkSABF1fmGXL8j4YDIwY2Nw1JGyHpWMRCv0dpxeMgo4ZTbHJKf0IVgP6noHTpUpBuvYh39VBa1+YUmMicI7U7Ydk5TSBbMj9RJX+u0P2uWAoYYhpMDBKHCG+tFctGiRvPfWGw5UYXPKPGAVehFduAdoAzzyEUXMmOQ+Y3v16jVurCEFrVatqnMnxW5R48Z9p3aaC53avpjeQ03PPKOMn2/2Mehtr0nnsPlm58QES08UW17uWV53EvljdQTTLC9pvBOsXs5R71epUkW9DGyM9tvyW2zlyM9h7w0/97z6ni1fedYBAwYEmw7PQwpkmALtO3aWBfPmZbhchgvs3SAbNisvs5XzhRVMVlE+khULlIrVlyb1/EJE16+9K9Sv8h8Z7mJ6CsRvsJOeMmGevE+BlGKJJHsemGSPHker5COwIjDQR89IYszEJBwG6OwaZkOaSSGJnfP6aF1ah1tItceBRA92PbC1claWujzz8nagKYCpu+ftXn1+vzUpfiO5xsG5HZZmffXXHoj6vEhskJju9ItZon0NT0IKJKZAjerVZMjgf8vnX30lFSpVckCL1bSrdctRXBuxkhyQxTam7O2OQ30W8mA3iYsoJKRz585zqnt2iXr80Ydl7pw5zv9ocfWh6gBuRCrppaNmImBg1MdBgGlAkZh0O+za7hvYDZblKbnmXvC+1ZEoJh8A3I6yKt2tVKmyKx9sK0hBm9PEtvoed1Dbtm3XA5vd/TJ82HPSOVTfB8kWnmeCAqeddmomSmWiyO5f5MdpAWf6RVrK8ac3zERFBxYp1vMk6WWAl9sbF8mcVdljwNqp0+EHdiBMyfcUSGpgCuMpX768A5Gp/RJ+9TrAD1AZA6CAOw4Dfh5M+jRjRDFQqVJLJ6XEVpU8gE7OAb0x4Gt1WHniaEDiEinry3spLHajHPTFzol9Hb5+u/blfF7u03cYbJUq3pVxtK3wJKRAGhRo2KC+3Hr736M5AFv4INyskkNsTwGjmIiwytwfOzXe6dLYvhRQ+vTTT0sFnNHrYg18dRowJAbgoRqPgcvgeUqbUjrBPCaQ34KBRIuD9y1favdIjwellmZluM85/fXgtFJEYpzylefnpZ/j9hFKjE0ptFmxfJl06dLVuh3GIQUOiQLwk5wJ6+SHn+bpEl8LpaTdCcdKHbvMdFxBjj6le8S5PpXslXVjv5DvsgeXuo05Mt3VsGCepUDKt3QSPgY71OBkG/VjomDgEVAXBKN2Hh8D+EijXKxGPXdAFjDowaniTM3jwaQBRivryyu4jFXg+ge49YAzBnANpKbspwHfWD4PhH3fPJje66Q35cqVDf0kJvrhw7Q0KXDCCX3kqmuuc26NyMiCKMDp1i2bU4BTAKoHqR6cYkv5wQcfymq17XKLhVTlb2DUgz0An39tYLIC1jQQSDuAQQsGFoPpdt9i7iUqz33Lkyi2+xZbHRaTzjkHgYVR7D5FOpoWAnM1Xn2PlgVACnhfrV4LunTtLuecc6bLH/4JKXCoFLCxd6j1HLz8bln6ySiZHkOmUqTjJXJjn0Pc177GyXJhn+qB5lfJNyN+yvLtSAMNhKcFkAJJbWPK79GpY3tp0qSpzJo1Uxlk4u6aJBJAx8Q3pmTnXFuIvhgKBRc/qcREgSlMifv797NjDgwTGzzs8WBguKKyhU/eLq/wnpR2qs7BfoRZ054xcGvbYt8Hzxxph2vALrGBUr/l4Q5p2LBtlEFb+TAOKXAwCrArEn5Or7v2z3LGGWfI4gULhAVRjK9yqoVgQRTALDbmGff7Zdx33zppIb5J2UKULU4BprEDsAfow84U6SlANQYumWt20Eebe5YWjLlvoNfSrYwBymB5SyNPomB5qZPA8/CMpHMOOMUcAdMFgKfdhwbMP6SkpHO9XneweviRh6Vpk8aJmgrTQgpkigIIGkqoJ40UDuszVVM6Ci19U5758BJ5/txakcy15Mx//F1G/nqXfLUyEyLOYh3l6qcHyTEV/Pxyla6bIJ9/uzEdnclcFt5XYSh4FEh6iSk/SceOHRwTOdjP46WVJrX0sTEfi2N5ghLTmPSEfJaX2CS1lLN7FpMWC76cvwdT5KBMfDnKkNfyeOZJPdY3yiC5LVWqtNrHVYo1EZ6FFMggBcqWLSOHd+kWLeVU9gq+dqnqfreq+Pfs8c7jGZNsJ7pxw3oHFj349OpwA3wKM7WemCSTSmP3PDi1hkgP3rP0jMRW3uKMlCWv9cFi0gC3AFTSmKt+Xvt3BeCUA3DaqHHTEJRCsDBkKQWaN2sq1WvWzNI6U69so3z32giZF5SaNjhPnn5zsBxfI4MLaou1k/7PPCKDOgfNyrbJ1GHPyphMYNzU+5zyDp4wwlDwKJBYBJlkdGjXro188UUl57IlUddQl4uwch5Jpwd+5MM+04KBSZNM7i+kNqngThcUKDr7UC+1hFkhdfEO9Vl84Rm0SUw9o1PJkbYbrULP8CG5RxkegTzxMX2wYP3xjNEzSOr3EtM9jjm2atVCgjvuWNkwDimQEQr865936baj9WT4c/9zUlPsTBl3SAZxAbVLHcfPnTNbXb6sk/IqacULBHalhZ2k1I99AF0M4CExDQLP4LnvmY1/rqycpVl8MAmolQ3GnBOsDn+V+l/asLlGLp6bRZXldOemjbr/NzTwC5688/yNGzeog/4j5fLLL0m90vBOSIFMUqB8+XJu/GWyeIaL7Z7yhNz+Yg95a2CLqOeoIgpO//dFYxk+6K8ydPTSg9ZZrP0Fcu/dg6RfxyAoVevSea/LkGHZ62e0c+eOB+1fmCH/UaCQvrRjaCmJn+/5YS/K1KlTU+0hjNLvOINUpEh0BTFMCPUdIDW4qphrU0+SDqODiVl68Jp0f8CAjUGb+tKrNo1RJootzTpvYNQYJoAUQE06wHTXrt1uxfTxxx8rFcMvRiNbGB8iBW4edJt89N47rhZAZ3kdW6j1sT/FtRTbbJZWO8wSugKf3aAOU8kiOzqZ/0+bH1zbnGC+WLrNGbsXvObc1PbcJ1g+uyZPosPyukL6hzzxgTpsPgXvBV9v9lFq8w/p8ZIlS6ILwNgp6vgTTpQrr7gsWEV4HlIgSylwfv8LZNKECVlaZ5qVoYJ/83m5LYW005fYu/BreWXUBBmv/HVMUL2vEtJ+g06X5s2Ok0uPbRAFtdF2Nn4lfzvpOnknWCZ6M+tOvhg1KtRcZB0580xNMZFikne5Xbu28v3345x6O1FXgddeWootKPaiXGMT6kElzMyYV3z5+HtWDvUmJi5eeurtSosUCfpKhEmiqofReqYKQLaQiIFyzxio9dkzSt9/705ql1tJHIJSo2QYZwUFbr75rzJ29FeySSWF2EMjOfXq/D26Ar+il5JGP8L8vGFcW4gfz3YdH1t+YrsXTLNz7qV2P5gePLeyxAZoLS1YH3OKQJqBU/KTTgxI5aO1evXqMlu3GMUl3V59b4Sg1KgZxtlFgcMP75qzwHT3VHm2/1UiCcBpkQbHyICBHDEvHgd97o0/yAOXDcp2UNq5WzepW/fQ/Qgc9HnCDElHgTxhYwrVOnXsoNsAdnbSjURUhPmg0kfiCNPxkke/0hjJCOo681Fo6jtL55rD1Oh27kEi93a5+z5f0Bep9ztq5WwnKitv6cE4eM/OaYe+YNvGCulNmzZLy5bNEz1mmBZSINMUqFO7lnw7bpxcc/2Nrg5MT/5Qn6bYXCL5BKg5rYMCt0IcikkBcR7wEdt56l0IgsPUcyW+Q9n4EF+f5YkHpfHluG95rA5iSyfmGif8zZu3EBZ73XXXXfHVhNchBbKcArmybgBweu5ZctWwyZL5pUp7ZePUYXLVSZfJs0EfqVlOIV9h//4XhqZs2UTbZK82zwBTXNeccspJEfuctK0Pgqpx2z0KcAhgjT9IN4BoeZCqBPOZM3yrK3jPn6OG93VTlvY5AMoHHrE+eMmuB7f0ARU+ABUJbe1atpIy2YdQ2L+8RIEyZUrLVQOvkHYdO7luA0idiUtEJW/gzcBc4meLSToTYMloEeowaWU0MY0Ty0s5C4nODVRaH1OLqSNY3q5JM4DKOYC8adNmDqRau2EcUiC7KNBMF0DlTlgqYwb3le5n3i7DxywM+Dg9eG9Q+Q+/7RzpfvaQlCr/gxfNVI7adetK166hc/1MES8fFMozqnxo3aRxI12UcLm8/PLLCUlvjI2be/d6lfv+/X7JoN0ztTwMGVBp1zAq0gCWpHEY8+KcQFxI3Uz5GKZnZgJ7HQOMMUhyx5g3V9Y+5gGo8D2Aja0GNnBM+nHHHaNgIU/9NDxiGPIIBab+PM35KcXOlB2dnAP9iATRLWoKjF0DcQGsmO6nZMwzh9IK5KGNRMHS4+NEeROlWTnuWTsWc4+D/jGfAafff/+D1K1T29nYJqovTAspkBUU6HJ4J2nSvLlu4zkrK6rLcB27p70tQ6/Qo0YfuXqgOsuv2FnOPbejpFz/vkMWjnlXRs/fIHM+eV7eyQEJqT0I87L/hRcLGp4wFEwK5Dn0w7aAH374kdtC8WA/GUzIA1SAY2GnqjfGRFkDnEwE0oOBawOmds59y0sMXgVIck7w+Tn315bubuof6rEDaSlNUt6ktpga1KtXV2rlmDsR61kYFyQKPPXUk7Jy+fKI6j7yEaaDmfHLmLVxa6p7aBNMT4tWNr6tDq4TnadVR/CezcFgWkbPre/MtWAgnfotbNANCH6fOVs6dmhnSWEcUiDLKYDpzBlnni2PPHB/ltedoQpXjpZnB492RYYOylDJbM3Mx/LJJ5+YrW2ElSc3BWJv5eTuZ7R3SDWPOOIIBZzpd7wL8DPwF4xNJU8a58F8ie4h1Qzms3KkwfRi97BXjdmm+jZjPiN9O35nJ+rkQIWP4++mTZtEnzU8CSmQ1RR49bU35edJkxxYRFLqbUljYNTaMzBp14cSA04tGHDlOvhRZ+DRgCLXzHUOPiA5DKSSZvms3vTG9lyJYkwaJkyY6Gy901tfmC+kQEYpwNi7+KILpHmrVhktWiDyV6la1WkuCsTDhg+ZkAJ5DpjyFL17HS0VdR/vjIBT8vojBkBtQZTFAEQ7t4VRgE0Dj8EYcEneYJq/Di6O8m35PN4NlNVrMYudtqmrnnXqqqZlyxbSoH69hD9UmBhS4FApsGr1Gnnw/qFR7QAMsohKDAF5DqjpdTxgC7YZDzC5F8Cc0XqDZew8CEgtjbaCdVo6IBSQaKCU/pGGGyv2vWdr0VKlSrpr8qQ32LORn/PgtbXBx+GIz0c60JzeesN8IQUySgH8mQ697/7ImomMls7f+c88+1w39/P3U4ZPlxYF0v9WT6uWHL7Htm733zdYBg+5X5arSjI9gcVIgElTn8MQYUZIbUzaCfOD0QFGLeY8KK0xKQ9MjXRi6iEEGR3ndk0ZgjFna89LTvfIVl0Zfd55faVhg/ouX/gnpEB2UGDEiC9k65YtrmokpW5cM4b13MZqau0yfzRrJCAB9eYqJNi4DtZBml0HzwtXbipdm1WSopUaS4dGFSTFl/H+TbL41yWyZdc6mTd/vexVH6qYE7DBBdujFi+O1wA2vsD8pZjGfDT6xYt8/DGf0gr0g0C/rE+c23uAuKRuFzlLbf9WrOyqCxBzaoeetHod3suvFOjQvq2069QpZ11H5QFinn76qXmgl2EXs5MCeRKYGkG6desqb775pkpOSjpGY+mpxTBXdohSXqTgMyVjNXBJWZgfAaYFE+TgfvCwe8bYiDkscG6MkDTOqYeYIyhpZds1Fl2EIaRAdlJg4sSYU+/48RrfbvzYtft+XDM3SPFALz6vXVssUkyqNO8qRx7RUZpUTOOVU6i81GtT3jXVuuNWWfH7rzJz6VbZpx+LgFKkqMxBAGiRIrpzm87nokX3uI9I7qF9YF7F2rVepy+2+Qs4nTt3fghM00e2MNchUKBduw4hMA3Qr8+JJ0kooAkQpICepsElkp8iHdW36fz5C2TKlMkOFLLj08ECzAyACEDFIT9lDHCSjqSUmIN0YhgdTMvy2bnFpBO4toNrY5DEHFav2aKiNixdurT06XOMa5cyYQgpkB0UmPHr7zLpx4kZqtrGLGPago1prnVIR+dGMN3yujwl68nRZ54k3WuXCiYf/LxQGanZqqtUqb1U5sxdKTsKo9pnf28ktzEPGnv2MH+9Dar11ySnwT4lOg8+l3WIj1LeAQsWLJAeR3WPfqTa/TAOKZCVFDj66B7y8gvD3HbWWVlvXqyrWo0acuWVV4a8MC/+eFnc5zyzJWlaz71u/XoZNuxFWbhwgQLDFMrBVIvFb2EKuIT/muoQ5mSg1ak89b4BUwOivkxiVT4Nw/hgiByAUgCpHVtUpdq1axc5+6wzUu1jeCOkQFZQYMuWrXLqKafIMt1+0wILn7DVZAVsCZUQIiUkrbi6TUJtXlQlkLgsM9AHKAQQMuY5Z2wzL/zc4FwXUmmazRF3XrapnHzhadK+EoAy82H/jrWydOkG2V0E9b2Z3hB7VT623UhL+dDbvn1HdI7Z3LPYesA1wealxVY3wBa77w4d2svxxx1rxcI4pEC2UOD6G/4qIz7+KFvqzkuVDnvpZTmmd8+81OWwr9lEgTwtMTWaVK5USS68sL/ce+9gTcI+9OCM0NT6MN79+1lVb75I2a4QFT42qHuijBmGawDVGDBx8KA/XBOM+XEOw+MahsexdesWadCgYQhKIU4Ysp0CfIQFQSkNFo6M0/jGg+M2eA/tgg5jBzwZz4DUYF7Obey7cqWbyEkXJAKl22T5jJmyfMMymf7LctkZmVeo4otXbSxtG9SUGk0aSNXiMSltoRKVpVaNvbJ0zXYppABY8bObU/SDNgGmBPAm18xTwsEkpy5T5A/lgv2njlWrVstOrRuwHoaQAtlFgccfe0QQVHz39ZjsaiLp6z3z3L4hKE36XynnOpgvgCnkwhkvaoBp06bLjBm/KFPae1AqAj4Bpc6puEpa4dU40Cd4oOrBKEwKplVUF2OYFJVrk5gGGRrnQYZtUhhipDq00a1bdzlcnSyHIaRATlAANX5qgbG6X8emjVl3TVrgCJYF/KFOJyaPB4d83AXLlJU2J50gHSoHPxD3yfZlk2XEZz/Ksp0edLoPPa2NOePmzaYlMuOXZTJ3zhyp266LtG9UUa1TCQo2y1SWyn+skDXbY+Y37Kq2f//OSD8AxqJztKgDpMH+uCoS/CGPheA5adSzRCXMixcvkaZNGlu2MA4pkOUUgI9cddVVsnD+PFmyaFGW158XKuzatVte6GbYxxyiQL4BpjC2brqFGcf34yfI0089JeXKl3dAMi1awpCUL2tICWQBq4Q9e2Lqyd27vT0qbXEfkOqZqsvq/hivg2F7KRP175XNmzdLR90G8vLLLg53lomRKzzLAQqMHp1YEhMEY+48MngVYjqwR9dIt8NrEWLXB5SPPEvhhkfKcc3KBJ5st6yfPkLeGrVQbUVj7qko78Cppvl55Oda0aI6Xxb9Kr8X7yhta5eOrP8vKqUrlpFNOzbLHi3H/EIiimmMzTXqoo9mLhPogDtN1N9gGpn83EZrwgdrYRk5clQITOMJGV5nOQWOOrK7DPzTn+Vfd/49y+tO5grZce2vt9wm/c/vm8zdDPuWwxRIn0FmDnfqUJtj55YrB14lrVq1dlUBENMKMCc7yMc5DI4Dyau5pPF+Ss13qfdj6u3bdqo0lGOHO7BP2759m9qpbXcqGuo85ZT/b+9N4CyrynvtVVU9z/NI0wOTNg0CSiMoMsrU4AQIiIgak3idNWbQaKIx5ib55bs3NzHGEDVxQlFRBIXIJE6gooDM89QjDd30PNTU3/us97y1d52u6qrurjqnqvu/+rfP2nvN579X9X7Ou4a9JL3udUsEpYghV1MFnnji8Z3qa7c+jitbSx3wvP/bH0Hu/3ZV+tsgT1zzN+Xn5OMcv719Qnr5iQvTaAtxZ5bSpbena29+Mm2u/J15PT70Dwjiwi+mzOxIW1c8m1ZvK/52G4aNSWNtVB1oZB/g7dubbRjfX3oRf7MFqFa+X3zPiu9tstZW2sI152U/X9gHoMsQ6wtr1kaQfCnQbwqccspJ6WW2fdT+4vibf8MFb06Xm7FGTgqUFdhnLKblLzVq1Kh02qkn5YNNxb/61a+nRx99JG83w7DgrlxXDynCeLWpDfCb7/mL4X+/9gcdD2Z/WDc38+Dcnt7whjems848Pa++31W9ipMC/aEA/f+uO3+zU9HeXwMyrX+b9REQqw4nY4RxDlQCjzh4jmseMM52BpHjDk4vnV2ak9n+fLr7lnvSc63MS/U9SPFxRTkOtZRDXBxDmprTmtUb0+QDx6f8H5VVQj38CORvi62h/EUVvocpFtSwolI+bcPR/nDl79JVWDkt7aOOtba4csrkSZFcvhToFwXYN/d737s6/cu/fj79y//5p079tl8qrHOhl1x2efrM3/x1nVuh6geiAvukxbQs9PRpU9MFF5yfZs8+wB5oW+2P3a075TS7cx4PNreo+qIphuo5fM4b8NpqIDrGVvUenc547WmC0t0RWGn7VIE77vh1Xq1eXajDpAFhhj2zXhqEhSWznDb6e4QF43UOD/BrTGNfelg6oPS/Svvy+9Pdz7Xk7GXoI6BcH3G0icN/9PGDz/b7Xb/aXqLxTHrkwYfSI489k1ZvKYbvfcjeV+dTVhyUHXWFH2FxHT7hu3IMNa5a9dyukihOCvSpAizkZTHgvu5m2PZQclKgKwX2SYtp9RedP+/A9PGP/3neNHvlylW29YztjWgLLBh637BhfV7owIOqt1tNUX4xf9S3gRo/fkKaNm2aAfDsNM/e4HTM0S+z1ybu5t6N1Q3XtRTYSwXWrVvX5R6J9HfAboj5AB2WRiyE7ay+t/A2O29oi7mfblklfVOTv3SCtPwN7NgB0PK3gyV1dDpw7tTS25ya0/KHn0zrrfxcdsWnHP9789EGLKQ8iPG9XH8BBZA63Nq3ZrXHN1q+GMLHp81MpYnhfM7LFlPqiAMZOQ8X5wHHka4Mt6SlDbRXTgrUSgGs85/6279Ln/rExzt2nKhV3bWoZ+r06em97/+gzSu9sBbVqY5BqMB+Aabcl2H24Fto1hwO3LNLl6UXXngh/eAH16Unnng879k4fPiIHMcHD8jOw/7+AI8EPMgA2+nTZ+T3d59xxmvToYcenCbaW5zkpMBAUIC50c8917W1j7mlOHxgLJ8Dbl3CXAF0lqACewF6cY0/Pk2fOjyX5R/r0rPPbOgoG8jj7yZ8gI9zVsBHmMNmS/77o/3+d8jfI0DckOd7+1xvn1sa878pK6A0oDO+U/k6wsp+bmDlozotwcwVl5MCtVTgojefn3eFuPJrX0nr7cflvuTOOfd16bK3XrIvfSV9lz5WYL8B02rdDpxzQOJ42ZFHpCefetoeam3p2muv63hIY1XFmooVh4fepEmTU3noYeLEiel023x76pQpafz4cdXF61oK1F2BNWvWpCs+/7lu21G2DmIlbc9WUACzksVOPI0P84c1MyyktjzI4llZ75C6o2lSmjLR54/mEtrWpefX8IpQt4yWGwIAUnYAJbBJ+fy9Aansk8oIBrCJI33k4W+VcA7mgFJGHJEu/Oo647oTjFcCyYMLn3Pa8vjjLB47k0s5KVAzBT76Jx9K8+fPT3/2kQ/VrM7+ruilixalD33w/f1djcof5Arst2Aa940HYexT+NKX/EkE53l522y4kAcTD98xo0dpRX2HOjoZDAowb5Q5kkBftQO+8pA9UGeA124jCm0VUGxstCF7G8ZvMzBssv6f09ocahx/DwAjYIfPED6WzOzs76SzC2uqhwKP/L15Xs/DOe3zOtpze+OcOdvM3faXYFCW77dKeIBp+GUwpTbKqHaExRFxkS7C45p2RRgWXTkpUA8Fzn/T69PEiRPSL37xy/SD71+d1tlCvMHoXvnqE22txwXp3CXn5NHJwfgd1ObaKaD/cbvRmnfYc8hJgcGqQAyDd9d+Fj4BYAGkvJI0w1hs/WQg2GjxpOn8pifyMbwOvBUvlPC8nWvz7ah8NRRQG+BHKq7DAZjhHH59T9MIy+20RYVlxw/GAFL8AEnSkL4nV24L55GnXA7n5Xb2VKbipUBfK3CqbSPFsXXr1vTtK7/e18XXpLyPfOQj6eXHHFWTulTJ4FegtH528H8ZfQMpIAUKBVasWNEJBIsYP8Niiov5pnk434DOYdKtjsAaR8BaXOd8GeYKSyZpOrtiaDzyR5q4jvK4Bi6Zt+1bQDVnnz2BN2/e7CMYtk0UC52YV4qPpTXANMrBL0Nq1FP2o+3hR97u0jAlYpW9nlROCtRTgQ9/+INp+syZ9WzCbtd94SWXpv+5+WZB6W4rt39nkMV0/77/+vb7sAJf+cpX8xzM7r5ihsEYxjcoxMIaw/t5ON/mebabVbMpQyNWU2CV1fhYF2No34f1eXNaU6MBpL0yNI2p/N5tGJFGDre0m/wNT57PITfXZRDJ0H6E006sk8ApYcwfjTDSMaQOdOICPoFK0nL05KrTRL4AU/KXy+McRzu6mg6RI/UhBWqkwLSpU9Ktt/3E9uR+3OZpfiA98+STNap596uZMWtW+vgn/iotOUdzs3dfPeWQxVR9QArsowoMGdLzXogxjM9QerY+BujFcL5dB7gxdF4GN8PUDKjOhGbxbDHL4gsOk1nSxvG2ONCnBwRIBhyGXy6vqKc9W0sBVNpFOH4AIuGAYix8KpcRsNmVX77NURft4hwXPufV7SNMTgrUW4ERw4enI484PF133bXptDPPqndzdqp/mu1N+p3vf99eC/5LQelO6iigtwoITHurlNJJgX1QgdguKobxyz7AmeMri44cAB1UkcLhrhjKT2mDDXlvKak0Kk2dNroD+Dx/sQCp+roMk8QBjRk+xx2Yjj7m0DS1yfctJczr3tlaShkRF351uYSXw+K7lPN2ju+dRbb0xXUqBfpVAdY/XPEf/55u+slP0ulnnd2vdfW28Jcfd1z68n9/xfbw1lzS3mqmdF0roKH8rnVRqBQY9AoAVz25DGMVqyFWSYbMGw38GGpvtcVGQ+xfBrzKEHp7u6/Ep1zSutXUV+g3Nm61rZVWpNbjJvorRNPwNGfhwWns7b9OGy2/py+skZQRbcSPxVrUx7nHDUvTFx6bXr7ItmQ7+gTLsSE9cO3V6afLi2F+ygkXC6fiGj9ANMIot1xvXIcf6YvrnnWMsuVLgVoqsGD+vPSxj/1FOvHE16R77rkn/e63v0lLn366o3/3d1vmLliQTnjViWnOnDlpyZKz0wGzZ/V3lSp/P1BAYLof3GR9xf1Tgen2hhVALSCsOxVagUaDUtK22TzOPM+0Aqm2Bb5BooVbHA6fFfrAWwGBpMGSau+Wtz0/l7YfnuZXxmIa57wsLZ7xu3TzKh+Spwygs8jr80oJKwMpbSZNGjUvHXHQGLK527IsPbp0a2or7Y0aQBtJeutTB3Xi4jygFD+OmIbQ23KVTgrUUoF5cw9MHG+99OJc7dJly9MNN/w4Xf+jH6b77rm7z5ty0KGHpilTpqY/+ehHtaipz9VVgSjQYP8hyxygviAF9kEFXrQ3xpyw+LheLdxhv9NhNn9tqPkjR45MQ2xf0+F2zYIj5qoOGTokWzyHNJlvYcBpE+dmNQUg2WuUsMbGKWnxuz6QLsXCWXHtz/00ff5zt6Tn8r6npHEwxQ+o9DI8nGyexqylr74wXXrctMprTtvTlvt/mL5069LkOFlsOZUh1vJV+5UmZI//6uK/u7If4dVQCpBiRWZngPe8591p7oFzysXpXAoMeAVWrXou/erXd6annnoqXf/Da20UpC29sHp12mI7XfTkxo4blyZOnmwvkJmQXnvGmXmP4SVLzkoz7Adv/N32VIbipcCeKCCL6Z6opjxSYBAowJZKvXUsgoqhfHwePB0WQ1uB32TWUFbot9uG+g0VK2NDg6+QjyF9Nr5vaFiT7vrxnem0haelGWE1nX5Cuuh1y9IXf/Bo2pItqw6elI8LmIxrr7spTXvFknRBB5RawvYX0n2/X55aq/LlQiofAZyUGefl+DiPuKizOzglfNq0aYLSEE7+oFJgxozp6Q2vPze3+cMf8jcubdiwMT39zDM9fo9pU6fa2w6n95hOCaRAXysgMO1rRVWeFBhACgCcvXF5+B7wNEspi4uwlAKoAB5Hm1lEcQzlNwKpdu7zTX04nDQAZYbTpXekmx44Nl12RFhNh6apx16SPjj1zvTDH96c7lvN4iWH0wDEXLh9UE57+6h00MnnpdcdPyeNjAircesTd6e7nmvOdZMOR37Ow4/k1deRNuKrgZT0cRAXR1hNI598KTDYFRg3bqyt7F802L+G2r8PKyAw3Ydvrr7a/q0AW8ssPv6EdMfPf9ajEEAZIBrW0vAbDfoycMa+pWbxBNbAVOCN+acBmX7NHqPPpzuv+lE6asFF6YjRsfFHo00XPS69+X3HpFMf/G16cPWKdP9PH0irDVADahunLUwnLpyX5h2zKM0ZGfm86e1r70s/uunhtMkqK0MpsVwHnHrq4jPSEsJ3DBcQGmH4AaPlOML4vnJSQApIASlQGwUEprXRWbVIgZorMH78uHTaaaf3CkxpHEDG/qDAXCOr8ytzQQP8WGrf2NaQeDGo2RchwpyWxfmAbKy6t4i0Y92v0pf/bUx633uXpIM64JRahqYpC49Pr1mY0mtOPp+Ant3Wp9Ot19yWntjkrySN9nQHnRQYcQGeUUlchw94Vp8HjAaoH3TQQZFdvhSQAlJACvSzAp3NEv1cmYqXAlKgtgrsibUPUOMIaItrC7QwA9JKfOyBGmDXkQ5stTSty25Jn//81en3q5v3+Eu3r3kwXXflNenOUhnV9UW9EU5l5bDyeVdxXYXFd+cNV2PHjiWJnBSQAlJACtRAAVlMayCyqpAC9VLghBNemcYYWG3auLFXTYitolptnmlYHcnIeYBf+TwKxWoaABjp8ZuX/jJ96e+fSceec1Y689RFaVpvfwq3r0kP3/GL9LOfPdQx3F9df7Qv/GhL9XWER36u4zwAlOs4xwfomWu7ffv2NGpUMdM1ypIvBaSAFJAC/aOAwLR/dFWpUmBAKLDwpS/J2z71FkwBNI48jxQ4s2/BkD5D+w15cVObXTPD1LZ2MoCLVfqk2WFviLKgDLFxzfTMprQs3Xndl9Nd109Mh510fDp07Mg07YjFadHU6lembkrP/O736ZlNq9ODP38wrba9Sqshk+toI+fV8YhOfE8uyqj2gdLysWnTpjTX9oiUkwJSQApIgdooIDCtjc6qRQrUTYFJU6akNS+80Ov6sRQCfC12DKvAKJbU1goINjW1dcBfnodqcazW37Gj0VbzsxiqmLdp2Q1yeUsUi6XWpUd++j/pUfYzvf5aB15LEICZy8p1AMO+P2rEReMByTKMVl9TRneOdoWrBlKuiQfI47y1tSUNtV0KdlVmlCdfCkgBKSAF+kYBgWnf6KhSpMCAVeDMs85Jjz388G61j424sZA221A2c0lxQys+YBiw1mAm1fYmj99RgcKmJuCxAMSGBiyYbokFXhsbiy2eCGexFGU6ZGJxxfqK7+cBp+HTFs678imj2lWHcR1hAdH4Aab4LS3NaaNNf+BVj9pYv1pRXUsBKSAF+k8BgWn/aauSpcCAUGDevHm73Y68sAlTpzlW27NCHRgESNsAUNvntK3NN+JvsE332yrbSWEe9XSdh/VjEZZzIyCKVRQLpUMm5QKEO+fF+toZUGkT6TiqXQBnxMV1pItrfI4AUs5pYxlOeTvOq151fGSVLwWkgBSQAjVQQGBaA5FVhRSopwInn3xiOmbx4nTXb37T62YAanlI34A0HMP54ZoMInmNqS1vMpgb4pBnltMhlg+S9O2msF4Cf8WrR7GWUjb7n1ZbTx1KPRwrK9ft7Q6gsLBzaGEpDfgMn7bFefiEUV+1TxhzYokKOAVMHU7b0maD0hNfc5K9g3xuzqsPKSAFpIAUqI0CxXhbbepTLVJACtRYgYkTJpjl78Q9qhWAi/08AThgFZ9V+xwBcmwj1dZqYGeW0wx6Fesj4b4oyuedEufXYa3E52BuJxbUzvM8AyAdGr2MCCNPrsvKDN/jomwPJyzii/YSV1hJizQOp4h12mmn2BxT/Xbfo46jTFJACkiBPVRAYLqHwimbFBhMClxwwZsqFs7db3Ve+ASImvW0zY7t27ZlIOUa4HNorJxbWKsN8XPkracyoDp4OhQGRBbD5p1BlXCHwwBaYJV6HFy9Hgdet4ZGXMQzxaD6CIh1AA0g9Xq8/Zz7m6/4XkwtmDVz5u6LpRxSQApIASmwVwrIHLBX8imzFBgcChwwe1Y6743np6uv+uZuNxiYyxDKuLc5hsnb7ZxwDh/S9zmjO3b4fykshCKOoX38WCwVebj2cLeo+mIpfif7/NMdO1otnuuYd+pD/F6/D/OXh/Y9vOt5p8RFvUwtsOZUQNcBFaAlnu+IRbi5eXt65StPsI31x5BVTgpIASkgBWqogMC0hmKrKilQTwXOOOOMPQJT2gy4YS2NdzixjVJsHxXzOZtsQVS42HCf60azdrKAaseOprxtlMOhw2WkZ+5pOOafsl0UllLgk/J32J6mQCpA62HFYE/UTxvDRVhc40e8W2IdiKnDLa1Yft1i+vzq1enkk19TzqpzKSAFpIAUqJECxZOkRhWqGikgBeqjwAnHL04zZs1Kq1as2OMGMDzP0HlzcyBqUVSbhYf11LAvNRmINjTY3NGAzgyYZkU1gCU84DF8wBHwbGtj0ZMvkAJQCfctp6gr4NMtqZGXofrRo8d0WGaxfG6zKQdNTQXA+vA/+X3OKRwLjPJ9OLCYrl/3Yjr0sJekBfPnF19MZ1JACkgBKVAzBRrsP/34n75mlaoiKSAF6qPAz37+y/TOt13WYT3ck1YAg6y6x2o6fPjwDJrDR4zIUIjVNDalx0ra1DQkwyHp8zUb52erZ0O+xjrKMD5lEh+gyTnD+jhP4+m4jjSEDxs2PI0ZMyZNnDjRXh06KrcBuAU0WVm/bNnSDKjk47+6+N/O57ECpMVcV14/unHDhvTP/++f0/x5c8kiJwWkgBSQAjVWQGBaY8FVnRSotwLf/NZ30qc/+Zd5PuWetgU4xPI51LaMAkQ5H1LxgdMhgCi+HYBokwHpkCFNvo2UgWgGTwDX4vwoADUglbYRh3MYLeaQjhs3NltIR44cmeunvGhH5AFE169fnx577DErh+kAncEUeI2FW622o8C2bVvTFVf8R2IXAzkpIAWkgBSojwLFOFd96letUkAK1FiBSy6+MC084oi9qhXIY+ibLaMYNvdFQ83Zz3NRbag/bylVScOQeUuLp2dLqVi1H3AIGHIeFkzKLq/i59znhrYZ1PLq0yE5PfVWp6VtOGAWa+rUqVPz1IMon1eNUl5uv9XT3Gztt/bOm7dAULpXvUKZpYAUkAJ7r4DmmO69hipBCgw6BU497bXp93fdtVftBgABw3ABhFyH1TKf52F53iAFMPJfjq24Z7gda6mtiG80CyrpyY/PfNIY4o8wyuEcuGTe6fbtPscVSymQCYTie36fFkAe4gFT5puuWfMCQZVyAGFrvwFps71+9MU1a9Jlb7s8x+tDCkgBKSAF6qeAwLR+2qtmKVA3BdauXdsndQOLrQaEOM4zPAKIFWB0kLShe7NwMtQOPGLtBC6BSYb328wHKAFUwjJcZkD1eKyozEPdsH5dLn/CxEkZOKkryqH+gFLK6CjHzpl7umDBgrRp00Y7NmW4pR1YdlsMSpc+80y67O3vTGedeTrFyEkBKSAFpEAdFRCY1lF8VS0F6qHAvffdn2768Q25agAOwNsblzfgtwICTCmrfA4wxjVzT3GsyseaSThD8zsYxq/AaKPtX9porzEtt2379m3puVWr0nib/4n1k9X/WFVbWnx+K3UwNE+ZwDB5cYTjgOHp02ektWseyHUynaDFhvDXG+xe/s53pbdf/tacNyfWhxSQAlJACtRNAYFp3aRXxVKg9gr80//3z+nf//X/ZXDDgokD6ADEvXF5GymskABmxWIKFHIOJFIXVtM2O7CwNlkc16QBJmOBVABl3ubJ8jW126IpW9n/1BNPpE22Yt4trkNzebQZi2nAJ3k5Dz8AlWuOWWyVZXD79FNP5HRrbfj+nHNfl977nj/em6+uvFJACkgBKdCHCmjxUx+KqaKkwEBWYNnyFenKr30lNxEQxGWIq1gxc8BefmD5DOsoPtALIGZgxTcozRZWwu2cNISRDysmaT3MfDuP61hIxf6pDL8ztzUPx1ve8CMtPgeOssLxXWfMmGFQOywvhlrz/PPp1a9+dUTLlwJSQApIgQGggCymA+AmqAlSoL8VuP2OX6d//Id/sHma6/P8TyyWzAPFwjjEgA1LJrAHLO6NCxg1Iu2oB3AEUBlOz1tIUa8d1IclFUhmiD/ak2HZwrIV1d7MtMX2I920cWOGzHU2N5ZyhgwZmsHVLa5Ati+cKltM43tQXhyzZ8/OFtqf/+y2dNXVV6eXHbl3uxNEHfKlgBSQAlKgbxQQmPaNjipFCgxYBX50/Y/TB97z7ty+PHxuoAYEMoSOw+cYaYuE2GCeRUF748JKSTntQCGQaT5WT/Y6ba3URzhhAaS0IYOygWeGU7vOvqUbZhv5b7e5pZQNnLKxf7ut6Of7sIk/4TGsHxAa7YgyInzmzJnpAx/8sKB0b26y8koBKSAF+kkBgWk/CatipcBAUeC2227LTcmAVrIelttHHC6vnN9LMC2Xm+GQYXWDSwbXy9DbyDC+1UuaHQah4bCuAqsZNiuwGu0jDfG8pQmopTx/rehQG74vpgLkMim3dEQZhMlJASkgBaTAwFRAYDow74taJQX2WoFVq55Lf/2pT6eb/+eGbHnM2zSVQC+GvTOwVsBwhL1JiXRbt27tBJF705gMh5UpAkwUaDCgzMP0BqthuQ1raYRjCaVdhOOzUf42axOO8li4VJ4eQFjsfVoGUM7jmrx8Z45nn3023XLrT9OJJ56QhlUWgREvJwWkgBSQAvVVQIuf6qu/apcC/aIAoPbvX7hit6A0GsJw++jRo+Oyz33axlxW5pjmwxY0MUzPwqZms4Rmn/O80Kkl+wDr8BEjOtqCpZRV+ptt/unWrVuyBTXKA1hZ/BSLovCps+zYburee+9NK1asLAfrXApIASkgBeqsgMC0zjdA1UuB/lDgqm9fnb7+31/ORWOVxIX1sCtLaU5Q+iDPmLFj8xzOUnCfnwagBozyJiYAE0DlHCspB2HMgS1bPwlbv25dhlrAluH9WLEPnHIElAasBqBSzlj7fo8++liffycVKAWkgBSQAnuugIby91w75ZQCA1KB719zXfrMp/4qQxyA2ciQeCwoMstjB6BWgLW7L8EwOkPorIoHAvvb5fmiVgkQiYWUdrJ7AOdmNs3XWE1jSJ/2sFhrfcW6O9SsoMyRZcU+bcfFFIE8jYFyzMVwPnFPP/1MWrpseZpzwOwcpw8pIAWkgBSorwIC0/rqr9qlQJ8pANC97/0fTDfdcP1OUBowFhbH8LurPPYQJR7ga7eh8Bm2mn350qXdZemzcKyaO0pzUqNgIJt2lR0wy3xTvg8r9R1MWanvc1MDTMmTQZcyKN+OuP7BD65Lb7vs0jRu3Nhy0TqXAlJACkiBOiigofw6iK4qpUB/KPDl//pqhlLKxsrYlaWUuGw9rVgPue7KxQb1HfM0DQD/9M8/lt79vg90lbwmYbEhf3VlWFAZ0t+yZUu2pjItAEhnWB8/vkPMOw0wpRzAFZj9yle/nrZbPjkpIAWkgBSorwJNnzJX3yaodikgBfZWga9+7cr095/9jG86b7AVr/zEKsiBxRQHlPbkwloKyHFMmDgxfeNbV6UTX31CetUJx6c3X3RxmnnAgTYM/lTesL+n8moRz3xUvhv7nbJ4y7+vf2/gExdaVPsR39LSmg48cE4tmqs6pIAUkAJSoBsFGsx60Hm5ajcJFSwFpMDAVOCaH/wwfeqTf5nnWwJnYSntgNEKmPUGSsMqiaWRfUKZW/plsyae9JpX7fTlWRH/xJNPpX/918+lW2/88U7xtQ5gq6tZ9maniZMnp/HjJ6QRNh915MhRaZQtmmIVPpZRhvsBUa7xQ6No69svf2ucypcCUkAKSIE6KCAwrYPoqlIK9JUCV37z2+mTH/vzXFxAaV7wZBZSLINhDewNlGIpZdgbKykWyAWHHJI+87efTS8/5qgem7vqudVpnQ2nX3XVd9JtP7klLX366Z22aOqxkB4STJ0+Pa/MP+FVJ6Y3vvEN6YDZs9LH//IT6ae33NyRc/yECWmmwemEiZMykLLtFXAKkHIEoAKpHIBpwCkQPtmg9txzz9beph2K6kQKSAEpUFsFBKa11Vu1SYE+U+D6G25MH3zfezqG78NSGkCKjwO88sr2XdTMIiIcYIql9OhXHJuuvPLru8ix66hnly5Ljz32RPrSF/8ztdkbmX77q1/tOkMXsVhAX3b0MRky3/3uP0pHHrFop1Q//8Xt6e1vvbQjHCifZgA7fcaMNGr0mLwl1KhRozOUjrTyymAaVlNW7OMYPNpm207NmTMnnXXm6flFAx0F60QKSAEpIAVqooDAtCYyqxIp0LcK3Pnbu9LFF5zv80cZkmYeqfkdFlI7xwGnhO/KxfA9YMYQPouJvvP9a9IxR79sV9l2K+6++x808GtPv7V233zTjd3mnTlrdrr88styPPuMzp83t9u0EfHXn/pMx56thI0dNy7NmDUr78M6btx4g9NxGUgBUw5AtAyo5SF9NMDye/FFF6aZM2dEFfKlgBSQAlKgRgr0vBKiRg1RNVJACvROAYbNv/SlL+XEsfo+hu9jWJrI3kApw/fAGJbS7BuY/uVffzq97MidrZO9a13XqY5YtDBHHHzQgnTO2Wd2nchChw0flibZYqvdcZdcclFas+aFdMN11+ZsrM5nf1OAc/jwEXZsNy1SBlKG73EBo/hlyzJxAPG99z0gMEUMOSkgBaRAjRWQxbTGgqs6KbCnCgCON918a7rmmmvSHb/4eX4dJ6vvgVLgigPQwvVm+D5W3weUbjWgYzuoP/3oh/e0iXXLt2nTZrO0Xp7u+d3vchsA0AmTJtmQ/sy8qwCWUob0YyFUzDfFcsoR2gWkArcLFy5MJ5/06rp9J1UsBaSAFNgfFdA+pvvjXdd3HrQK/OIXv/QFOxUA5YsElHaylhqw9uRY5ATscjCvFPea15zYU7YBGT9mzOi08PAjOtrGlAReU9ra2tKxl2m7zXWNLbCqfTKiQzgAf9WqVZ3CIk6+FJACUkAK9J8CPT+9+q9ulSwFpEAvFcCq+Y0rr8rzH0fboh5cfs1mxVqaLaTMJzUg7WkFfl59b+AGiFEukHbp5e9I1994Yzpu8St62aKBl+zCC89Ps23hEo7vxnD+mhdeSJs2bkybN21KW23u7LZtW9P27dvsDae++X7eFsu0CB3QAodFlbmmX/nqN9L69RtymD6kgBSQAlKg/xXQUH7/a6wapMBeKbD2xRfTv/zLv6W1a9fkOZMA6f3335uefOwxB9HdGL7vaqETc0rf+Y637VUbB0rm3/7u7rwoLKyfDOlPt1epjp8w0Y4JeSHUcJvHGvubEg+EoinnMec0hvQB1vnz56fTTzt5oHxFtUMKSAEpsE8rIIvpPn179eX2BQVuueW2tHz5MoOnoXnY3uyBGaaAp/LwfW++awAblkH27aSMxYuP7U3WQZHm0EMOTguPOLKjrXlIf/t2s5Buz9MV2tqwjvobrcI6iiZxAKJhRcUnDUP6vBVKTgpIASkgBfpfAVlM+19j1SAF9kgB3t3+ta9dme6+++68zVEepm9i4/zGPCT9s9t+kjfCj2H8Xe1VGgudALAMXwalf/i/3pve/OYL0pwDZu9R+wZqpp/c9rP0h+94e8f8UBaH5Y33bQspLKcsgPJjdH47FOcTbSeAuXPnpmnTptpbo8b5PN7KPN21a1/MFtWXHHZI5YfBQP3mapcUkAJSYPArIDAd/PdQ32AfVeD711yXbrI9P1lNDnxWH6tXP5d+9ctf9DinFHnYQB8oxQLIAajdfsft+6hyKb3+9W9M9//+no7vxzD9zAMOSFOmTs16jhkzNsMpb4Y6+uij04IF822Yf0zHNlIM7TOs39jYYHr54rAJE+01pzbsLycFpIAUkAL9p4CG8vtPW5UsBfZIgTVr16ZP/tWnDUpvynMhq4GUQoHMWbYZ/eE2bJ2h02CzOxfzSmNYm7cpXfFF3we1uzyDPfy73/1O+oM//l953ijfhWkLL6xenTasX28LoTbadXOaMmVKOu64xekAsxizYn/rVlbxt1ZW8fswPlBqsx3yllzr1q3P1ubBro3aLwWkgBQYyAoITAfy3VHb9ksF7r33flvotDYPM7vVzq2lvi0U20P5FlFYPg8+5NBsBeRVmgzXVzvCwlIKnLFq/bN/93dp0eEvrU66T10PHTokffxjf5bmLljQ8b3QiJX6rM5n8dNRRx1l4Dosv4a0tbXNpziYD4z64dpRAD8OmAKx3earykkBKSAFpED/KSAw7T9tVbIU2G0Fli1fka699tq8uGlnKDUiTWykzzxTzh1QTzzplHTaGWdmAC3DKZZS4BWgwp87b1667rrr0vx5B+a8+8PH2eec2/E10WO9bQHFFlJTbUif7aDYNoqFTbF9FIujsJ66Zq6bGafzkD7TAXjrFpvvy0kBKSAFpED/KKBXkvaPripVCuy2ArzVCSjFipf3KDUrXXnlvVtM/Q1PAaZRybRp09NZS85Lzz23Kr1o1tbnVq1MWzZvzrAKUL3iuFemP/3TjyY2ot+f3GWXvSU9/fRT6brvfy9/bQB04aIj8vzSTba3KZZQfgCw04FPmfA5pYXusRq/ydI1wwK3YwAAO1FJREFU5nxrX1yXh/Y133R/6kn6rlJACtRKAYFprZRWPVJgFwpgibvhhhvs9ZjDK4BUQKkbRx1IgadwZTjFIsp+nPPmzbd9NxfkPU+fevLJNMSGtBcsODh94i8/lsaNGxtZ9xt/sr2W9L3vfW/6+U9vS+sM2KdOm5Ym2MKvzQbt6MXBVlIscvK9TIdkizQWU7TOgNpgQ/qVc9IY7SdegSow3W+6kb6oFJACNVSgeMrVsFJVJQWkQKHAgw89kj772b+z4eP2DENY8DIQVWDIh+8dTItcnc+YR4pj8Q5zSVl1/rKjjk6H2BxUVp3vj1AaCh1y8IJ0yaWX5cuDTA/0wVrqb4LaZnNMt9vcUYb0W/Kwvi+AKk2D2OE7GVAAPxJ4s1ae01vRPOqRLwWkgBSQAnuvgCyme6+hSpACe6zAXXf/Pn3hC1/IQ8QMuXdY6SpQCqCWDyriuuwCSvF3GETBS1hQN9hCn0MOOSS98Q3nlZPvl+cf/ZMPpUcffSS/mhT9tm7dkuF02LBh2WqKKFhDs0XUzvlxwNA9Lutvc3vbLB9hXJPumWeXpgPnHJDvWU6oDykgBaSAFNhrBWQx3WsJVYAU2HMFbrnl1sRemv5Wp/JepQCpQ1HAKrV0B6XEAaM4ABWL3sUXX5Te995359X9OWI//3j3u9+dnn9+tanQkC3LgDuWUxYzhfW0ubklr7x362lLZesos5iapugL9HNfAFN+SDz19DNZ7/1cWn19KSAFpECfKSAw7TMpVZAU6L0CDBf/2+f/wxbmPJ0hJyx02ToH+Zgrr7736+4tpQ6lvs0RWxode+yx6fhXLs7l6MMVONy2yDrvdW/I1lLgFHjHcgqUsigK3fKrSyvTIcp7msYqfbdKO5xibeUgv5wUkAJSQAr0jQIayu8bHVWKFOi1As+tfj5997vfSw899GAeRg4AxXfrKEUFnHaG0aikPHwfllLmqLJx/MEHH5xOOeWkSCq/osBwg8gLLzw/bdy4MS1d+my2Pm/evMX2NN2SdccCCmhyH4YObckWUX4o8KMh5v8CqDEHmDjybN6yNU/FkNBSQApIASmw9wrolaR7r6FKkAK9VgCI/PTffNbgaEMGnMZGXnvZeQV+Aardw6lb7nx4ma2OGGLG6veOd7w9vfQlh/a6Pftrwj/9s7+wIfyteRieqRTjx49PEydOzCv2R44cmV9POmrUqDwNAlgdMWKEQegQA1ebB2zgygIo5ptyH1ps+H/EyBFp/LhxGXb3V031vaWAFJACfaGAhvL7QkWVIQV6qcDd99ybXrAN3h0+HUjJ6kP4+SyXxHV3rmwtJQ1QCvBOs62QBKXdqdY5fN68+aZZG+rZPFJW47fkTfUZvscqioUUn2sWlJHWdeZHQHHk+2T3av36DZ0r0JUUkAJSQArskQIayt8j2ZRpMCqw3SyKAMQLL6zJi17Wrn0xQwd7h2INY4iWRS34WDFjBbZbNcN6CUz6twdUgJThw4el0WZdG2rWNHysa2X32ONP2Mr7K3Jayh47dmwG0bCUOpQ25DojXzWYlmEUSPJXZrbZwqkx6c1vviAdesjBkVV+LxR4/evPSytXrsyvfmVuKcP77GmKQ3v6QdwDzukD3LvsrK80VBaa0UeIx61+/oU0fdrUfK4PKSAFpIAU2DMFBKZ7pptyDTIFsCjebVszrbb5nazCHmfDroCIw6gDKaA4ZIgDiIMIAwq+RRBxuIDIOMcHGjfa6m6sbsw5nDJlchpn8EnZK1euSv/1X1/JcVFfNZCWyyyXyzmuM5T6ynDC2CR+yZIlglKXabc+D5g9Ky1atCj91Dbex3oNnNIvuGfcJw76AtDJfeW8rc1htb3dhvCtP7EHAvcyNuenDBZCMRVATgpIASkgBfZMAYHpnummXINAAYZhH33s8bRixaq0Zs2aDB3MG5w8eVIGDqADEOHAYhrzPbGCBZgGNHYFk0gQVjXOgRkA+EV7ZeXGjZvSvffen2688ccZXgJKSV8NuXFNGWUXQEoY5XLNASgdeOCB6dWvPiG97Mgjyll0vhsKsEDs4YcfTsuXL8s/KNavX5eH770/DM2ad+4HjdlSHX2iyaYBtLWxrRcvRPAtpF5YY2+XmjpFb4XajfugpFJACkiBsgKaY1pWQ+f7jALbzHr1u7vuSbfc8pO0atWqvGgFKGUhSwBp+N1BqVvD/F3qcY4fMOvWVR/y9yFdAHdoHqpntfett95idQ21sGEZRgNKgZiAmzKURlj1TQggxcdhkfuDd14uKK0WajevGXY/++yz8qIxsjKntPOeps15+yh+CBRzT5l/6gfTKbLl1Hwc/WKIHdo+KsuhDykgBaTAHikgi+keyaZMA1kB5pJ+85vfzsOzkydPzjAKHAKSDLu6FSzmkWLt8m2afE5pzC2NrZv8zUsAZIAjZeAsJod1aGHECeQ+8cRT6etf/0auK6DU643FTp6P8rpzAaFYSnFcc75ly+b0pje9aad5rN2Vo/BdK3Dc4leYpm9P3/jGN6yfDDdrdHOGU37EAJr8kBk+fES2UgOo3LP4YcL9aKc/2b3ZsYN7alZT+2GyYcPGvEK//KNj161QrBSQAlJACoQCAtNQQv6gVwBL1S9+eUd65JFHM7gxjzT2psRvamLonsMXrAAYbgEtIDTgFJD0lfMxjzDAtASkRiIBHwGt99//ULryym/kfS2xyBIfMBxpyj6ic112AaX4cQBBzCl96Utfmo59xTHl5DrfSwVe/aoT0l133W0/KJ6wkhpM5025/3Bf6Dfed3y+KVVFn4n72NjA6n4spn6vh1kehvSn2ZC+nBSQAlJACuyeAhrK3z29lHoAK3DND36YHnjgwQwVvu/k0NJc0mLIHSAFKhwaAU4HigDVsG4WvsfDj4arqQHraWVIPyAFa+y4cWNt+D5eMcpCGfJxeH0dIEP+CoyG35Wsbi11OOUtRW9966Xp3X/8Li2u6UqsvQjDyn3mmWfYEH2rlcL2Ua22e8P6vHMDPwbQnmP7dob2mzusp1hQ87A+llMb3mdoHzfUrKwshFq16rl8rQ8pIAWkgBTovQIC095rpZQDWIEb/uem9Oyzz1beO18sagrYBBIzVnYCUh9+dWAMWCQMC6b7HucWTQvJcQXQcl2xoBl8/ud/ftm2H/JFVp0XzXi6cllI6fVw5i6so/gBpcAOkLN48WJZSkOofvAX2etK586dlwGUe4/mm2ynBazwDqXbO4A05puGn4f0816nvmMCfYLFbq0Gq8x1lpMCUkAKSIHeKyAw7b1WSjkAFWD1+3evvibdc8892ZIIiMaipgBIH5YHIB0s+RoBiTFcn1k0h0dc5y9rOT3AEhZ5PS1g8s1vfTu/YpQ5pV4m6dxi6mVX4DYq6lx8HrKPIAdUNnhvz4tvDjnkEL1iNMTpR/+SSy5O8+cvyJZTNtXftm1rx2IoQJWj2d7yhNUUKG1t9UVQ7huUYjm1A0ffox9u2rS5073tx+araCkgBaTAPqGA5pjuE7dx//0SX/3aN/Lm6AzdY6WK+YCAAXP+fN6fzyX1MD93uHSAKECzs9W0CHcANdLMwBF5I37p0mU2R/F3eW9ULKUOwAWUurXW6+JOka8rV1hM3fLGUPG73vUH6bBDD+kqucL6WIH58w5Mn/zEx9LHPv7JPJQPcG7YsD4vgOIHDwfg6f2K/U79ntKvcNzXIZU+Qh8ATIFZrK4sppKTAlJACkiBnhWQxbRnjZRiACoAxP3Xf3/N9qBcnmG0bCUFEIAFt1j623rCislXCaAMYLSQLmEx0nX19YkLB4wCxF5fZ0tp1BHwEnnCL2C0vNDJh+9POeUUQWkIVUP/+OOPr8w3TQaWzXnRGcP5WEr9wGpatpy2GrAyx7SwmjIFAzilX6y0uabaQqqGN1BVSQEpMKgVEJgO6tu3/zaePUrvu+++bIkKSygWrQJKO6+Yr1YKIOzKOYx2FeNhXcWPHj3K2jE6J3A4BYq53Hn4vgy05TY4oGIp9cU37FV69FFHeqX6rKkC7HrA/rMshuJ+sEqf/U05fL7pNhvGdziNIf2Yb9rGcL7NLfX7CZw25sV469attzmqLK6SkwJSQApIgV0poKH8XamjuAGpwLLlK9JVV12Vh87ZZzKG76uhFDgsH3wZB8vCQhqGz66As9OXt4SRN8LjeortlTrWXkHKYhm31FKPTwsgTbjyeYThZ0ubzWmElVnlPXHixPTnf/Ynub5yOp3XRoGZM2ekP/qjd6Uvfem/DCbdSspboehnAGfMY/Zzn7LBud/7St+y+2gbSGWraV4IZdMy1tlK/6n2utpwQO669RvSo48+lqcLYPWnDD/c8k6foWzAd+7cObaB/xDra2PUN0JE+VJACuxzCghM97lbum9/IaxW3/veNflBDSAEDMQDnW/fHQDuShke/rvMZ/GWoMsiyHfKKSfbVlE/yXMKY/i+nLhcNnXh8P1wKGU+4ogRw9OSJefsui3lgnXeLwrwqtezzjor/ehHP8r3KOaK0ucATQ7uMzAZG++3tHh/zP3S+kS7HTHneOiwoflVtevWrcvTA8gDmIallSkC/CihPPoKZeDTr3Gcs/0U/YX5qqTDqj7S+gvzq0kvJwWkgBTYFxQQmO4Ld3E/+Q7N9jC/wrZkevjhh9KkSZPzwzhDQJ5PWlg0/YEORHZ+sHclU5k3OQ9o7Cot5eLCb6rsT0rYsce+PFtwv/Wtq3aChEhPunL5naF0W5o3b34655yz09wDDyCpXJ0VOOfsM9LTTz+d7r//vgyQL774YmXxk88p5v55/3MoLBbbubW80WBx27btaY1ttv/kk09lgB0zZoxZXofkqQL4WGEBTOajUhYvgKCbAb2UR9+JAzk4p15AlrJfyHuvpmxxnTF9mhZZ1bnPqHopIAX2XgHNMd17DVVCjRR48cV16d57f58f5uWHdViV+qoZAGpPDih1Ky3wa7BgcwvnzJmd21bOSzu7cg6lheUUy9rxxx9nwNKUoaOrPAqrvQKHHnpoBkp+5GDdDMsm53GwtVTeaN+292KLL+7tEINM+sQTTzyZoTRW5se0E/pMWPndpz9x+BC+7yYBmFYgt2OI38PIQ19hKgtAC6SyyAorrJwUkAJSYDArIIvpYL57+1nbb731tjxsyTAmD+MynHYHgMzf5CEOLOACCP06CNSH1Bsa8HOq7EeeRuCgYpUFGIbawpiwZuVCK+Vi+XrLWy5O1133o8SQLe0MF2WV6+cc0AFWLrrowjRr1qwMFiyUmTFjRGSVX0cFTjzxhLRs2bJ0xx235z63ceNGu1/e/3zrKPbNbcpA6tbTBrOQrknPP/9Cvpcx5M68Ye4z16SPPoxfBlTiol8THuf4XOOq+zr9aPhw78MrVq7K9YwaNTJNnDChI08dJVTVUkAKSIHdUkAW092SS4nrpQDWqQceeKDyQPd5ePGAjod3uW0VDu0Iqr4mIiCxI1E3J/bIzzFYs1h84mABnBpUGCDHQTsWzJ+fzjtvSZ6DSPnVrqjTQYJXXs63PAsWzM8WNkBli+17CfTI1V+B4WaRvPiiC7JlEqsp1tHNm7fk7Z+wgjL3lC2l6J+cP/vs0vTII49mKPVh+hE5bxlKHWAZqncLaVhH/ceOw6j/8IqFUJE29uW1YX+D1DiwztInAWYsqPSxtWvXpbU2wsD0FzkpIAWkwGBSQGA6mO7WftzWBx58yKxQq81aVFiRdiWHQ+HOYEieamAsYLH7EoFOt2z5xuk+FOuA0GhxQAKW1XYDl0MOPij94bvemeecMsRbri/qYp9Lhl1f9apXpbdc8maznDpAUA9Qun7Dhu4bo5iaKsDiolNPPdWsomz31GD3yjfNB0y5hwAp+5g++eRTGUxJD4gCiWEZdfj0eaT0o7hm+J4+XQzth2UUP/qcx1vXsNotLCz4Vk625NP38jQAA9QKpI4cOcJeDrAhPfPMs4LTmvYWVSYFpMDeKlCMNe5tScovBfpJgdU2LPrtb383g2F+OPNhDojDBezFOWDnYcTFQZiBo8WRr4gn3OYDWjrigAb3CXOwNRTIIEE+DvaqBA7cwlXVhvbG/I70SZMnpXf9wTvSQw8/kreRetDAGutorOBm2P+YY45Oi499RX6fenwXvgMws3Llc3khCxY7uforcMopJ9krZx+2OaOPmzV8hL0Zal22kmLZBExXrlyZFzGNHz8+W8tjGzO3lGIZ9RX87nMdB7Ba/NgiHvyMMK7p5gBpTCeJfljuM6EQfbbRDvowP5boqytteH/06NFp/Lhx2aoaaeVLASkgBQaiAgLTgXhX1KZOCixbttxWRz+VJkyYmMPjwRzgSKCDZmcLaYRFuuy33pW+8LZ/SD9tJtfCdPkX/ja9aU5AqEMmMVaie/YZAJDhAKh96kvpgjP/Md1PihFvTl+87x/SKUMddg1vM+TCtCPManWUbZI/zKxnCxe+JA+vrre9LIGXcePGpsmTJqbtNsc0XP5eVi8+1rJmGyIWmIY69fUn2D1705vekK644os2jL/FoJSN9zfnOc/0K7ZwYgspQLU8h9Qt/Fg0/SiG6P0eg5wBow6h/uPH+0AJSq1PFGHeT+kjOzvvh6TdAdTmH1sN2XraYn1txozpHf1557wKkQJSQArUXwEN5df/HqgFPShw8823ZItPAGZ+6EJ+5gjDOhQu0jAXEOfXPp+T84j39FwXaRheL6cpp6VOjlxXwaxeTOWT+ACQPAzLkKuFYVHDWsW72Hmb09wD5yRAJ6C0ox5LiyMPVlPAR27gKPCSww61PWaXdPQ3hu+5TwzdA6Wcc7g11IfffTje+w7fpHKLOcv32eGSc7/v3Pvi8O/ONQkKcE127n3Fyyzn8XMsrhzRHvbHZb7pylWrvFB9SgEpIAUGqAIC0wF6Y9QsV2DVc6tt3t4z2RIVmgTIhV8OJwx4BDgBB649rIDQTlyZ40lfQKnn9bCAguxbRfiNTQUURN3h5/iKdQye4PWUbCEUB6+lbLN2MRc1HPVRv31EUK5no71JSm5gKXDaqSfZtmAH5vmj06ZN77CUAoBYQ4sfJvwo8R8m5T4BkAKV3p8CKL1fEefhcZ1DuOgEpeU01edcRxv83H/ksFAP6zv972mbd7rNfizJSQEpIAUGogIC04F4V9SmDgXYu5QtenjI4wIaI4FDp72fPMNoGS4LEMUS6nmB1gL+ymHOhJ7fasnpw0JFpWGVJWwIcwJziu4/aFd+b3pVuwDSgOCov7qUgA1We/OmK7mBpcBrXnNiGjNmbLaUxgInt0wWw/WFpdThNPoS97b6qP52cf8Jj3PPU31tEGp/F3kxFMBbOY/r8l67TC9oMngGTgHopUuXZYt8uS9Wt0PXUkAKSIF6KKA5pvVQXXX2WgHeI85CoWoXD9SugdQBkziAINJ2DO93KqxIawOkFsM7z4uwAIIMxBWo7JS9iwvqxUKKtZR8uX4rN9oRWbjG4cf3iOui3s4gnTPoo24KrLW3P9100015aknZSkqDCvgEIP2HFFbzznDpP2kIx/l9DlgtrnNc5edP5M8ZKh85XxfxhNOfOvJY94m/AeY/t9vfA0P8/E1t3LipYySC6QhyUkAKSIGBoIAspgPhLqgN3SqAxZAHa7iAuzLIxXn4kQYQ7XxUW0zLsBjnhfWVrZ5aWx0uKZsD4GxusbBoUMWPOknTyvC9Ddf78L0P20c8yeMcLu2w4NoF/2KeaxS/YcPGOJVfZwVY3X7FFV/K9wiroy9kcqiMPup+wGeFPvug3R2gaWV1dU5YhIdPtTncADbi83QDLKs2nYA5zux4wSEnBaSAFBgoCshiOlDuhNrRpQJPPvmkhZcf8G5dDFAMH4jkoYvPQ5hwtoECDgsLqFlDM/4VVQUkRrqU2FeymP9JytZWhklj1b3BZLPBZkcRAbTuM3zfaotMAMyW1pYMoZHU64oroLQY1ieu7Ljme2ChmzlzRjlK53VQgPvwqU//TRo7dlzeVYFtoAJOM+xlS6TPMQ0IDD+glWbbLbXDf2iVFzDt6itRjufd2a+Oi3II79SnKpZTrKZDhw3t+MHVKU1kli8FpIAUqKMCAtM6iq+qe1ageo6lw1xh1eTByhGASolxDaTiiHPw9D1KCwS0vJ3gkIc5sAjY+pC+521LLfagbwp4JE8uOZee2uytP+1mgSKa82wpZYGTpQsXWQMEoo1k4jz/s/z+PSphFh4QE+XIr48Cv/rVnRlEmVMKiAZ0Bhj21CpPT9/0/tn5x1ZPuYv4qM9soB2BEUZAhWFzPYTTtyK+fM53yFNNimI6ytOJFJACUqCeCghM66m+6u5RgWqrEsAI+AUwAp8Oc259DBjFSpWBzx7MEU++6ufwDstftrIyz7ShASgFZlnhTA4e8C0d9e5obi2BqUHrtu2pGVus1UUdrfaGIPyony9ZhgLOc1gFXMtQ6nEBpma/3cUOALkQffS7Arzh6eabb8oLnspgGpZSwC/gj8aUz6Nx3hfiyn3/8dM5bKerStkAJ+XyStxy+YR35Qinm5XT2gB+atvhP9aIZzFU9MWuylCYFJACUqAeCghM66G66txLBQrY9Ae+XwOYLEgBRAkvgBN4rVhLDTodC70JDoWev4BZwBdALXx/axRzTg1dDY6LMqjH3pNu++RTJ7ARIJzJoPRNqyEgSgEgos1ehrefrOvXb0gvrFmbptibpOTqo8C1112fXz06fvxw+6Hiq+wBvvKxq5ZxT8uAaD2lIzlx0S/oB3HeOX0BpSxc2pWL/OU05bByueXzGJngRQFyUkAKSIF6KiAwraf6qnuXCuQ9P83yWO0C/ABPzgNA45r0nAMRnrYCpfbkbzNwLJxBQSk/4ViS2tuxlAKHWErDwuRD9VZy58VPNvTfau+53065JciIOgI+47rsAyI4wIGjDKcR1mwLVHg3u1x9FFizdm369a9/1bFRPTBXBrretKoMhn7ufakcvqtysNpjKWXLJ15L2slV+k5vy2IKQFd98sV163OxAtNO6upCCkiBOiggMK2D6Kqydwrcd/8DadWqlbZfZOftogADNs/nCBgNQG01kyYLUxxIbeg+p8XySVoey77K3lvwaLrqo5enq3rXnG5S2Sr9bdtS87DCghYJuwOYgIiyz9A/ljSHU8Da2xxpokz5tVXg5z+/Pe8lC7DFtBLuKz96unPcs/IR6eJeRhzhfp7PuMrXXIVjugBQOnQox9AOKC7Kyrm8HPuRVfy4iRJ29mk/+fGjj7bYgj05KSAFpMBAUKD7/10HQuvUhv1agbFj2cS8M5SGIDxYy/M4iwd1Z+tj+UFtWeyBHCX0lQ8MFCBS1BeQWcTRxup2dhUGajik9Ed7++p77x/lrLJXePKK0d66uL+kj/Pwy2FeXvedsZwn4JE8AZPFlAIL459Bpn10xHv5xWe5vKKcIp5+y/Hc6ueLQJ1JASkgBeqggMC0DqKryt4pcMjBC9LkyZN3SuzWRJ9DioU0DqynnGP94SHLOWHFYWmxRO5U4t4EAJvlOnzv06LOznGdw323AIcC0jkcxBQGT2sLrbrnl71puPL2oAD7ez744IPZUsruCH4YAJoL0MPn/uGXj+ofFpGG8PbmO9O/nr8knXf22emcMz6SvrusuVPeKJthe6y0Aabtlbq4bnzmS+n8gw5Ohx18SHrJER9PP7MtzfKbnszCCrSGdbe6rdbKjrqIq/Bsx9ZXL9q2WPzdyEkBKSAF6qWAhvLrpbzq7aUCXVOZD+XbKuPKPFMe/Jwz9FkO4yHONQ9rhvKZI1qUeHA6/3//RTp75lCL54HuQ7TxeslYaBJxgEkGhRXfSx9+1xfT45Vv4AueigUuDhIBMJ4IAMCVIZOtqTwMuAEYHEx9yyr/PmPGjElTpuwM5zmjPvpVgV/+8va0ffu2PIReXVHAYzk8wNShlP7A/S5AkD4afarIV/TG6jLpR96XPDX5G61/l8OiHIdRK4tFfmZuwOLADyb6VW9clEn/3Lp1m+3XOqY32ZRGCkgBKdDnCghM+1xSFdiXCpRBrlwu4QCnH635YR1QykMWqw/XPMzjIJzdn8qP6h15ripb8JCOx7kDIXXFw5ow30aKhVAGBp0e9lZaZe9T2gSM4AIyijI8IsJJQ7tw5AsoJQzLKW+c4rsxr5D3m8vVVoFt27enZ555NlcacFeGTCL8Xvk9Ksf5/fRe5j8yfCsx8hDHR/YJMBd5/Tx/5r5X9B1P02Q/rujTOzvrW/RtOjd91fpxaxWURr/buS4vLeoaPnxYfqmDwHRnlRUiBaRAbRQQmNZGZ9WyhwpMmzYtrV27xnJXiK9SDg9YAI6tmlpbeVjbUKY9tGPuHX7AqVtLY3W9Dbt2tMUslZa/vd3/DIBT3haFiwd5R1LLhcUUK1QjYNERQRnWDmNaHu5xeDRt9pQBrIQXUFK2pmE1dQsXQBrQE8Dg5emzVgo8/viT6fe/v9veKT+6VKXfy4C76CPcK/oYrviBgXWdHx5NuS9FHtJaSKn/WJ7KHGUAmD7oUwa8P1EmfQBLKWDaXX/wfudp2zOU+vQC8ue6O9XoYRGHH45yttliPjkpIAWkQL0U8P9N61W76pUCPSgAmO7Kla2L1XNK4xqfAyjgKKDSjEsV62RAoYMFkOhzVPEdFD3MyyiDhc919XRu7fQ01MUOAABCYbUlLsIoNyyjRR2eh2vmynZtIduVIorrCwW++92rbXumoR1FOVj6ZUBmte/31uGUOO8H/PhwEIx+Ufww6VyepXIINQAlTX6jWAVaM5xW4LejUV2c8PfAG53KVt723Ae9PbQrXLn9Drb+44++t269bx8VaeVLASkgBWqlgCymtVJa9eyRAgCl2YG6zOsPVrcMxUMfnwcrFiygjvycF+GdoTL2MSUNFi72MGUeKpauPCxaqtnTeFlFsJVndfqG/AEhxe+98iKUIo+VnKcDkN7zFGDslmDazfd4yWGHlrPpvEYKjBgxolNN/mPC4Y4I7hv3pwx3xXlOkeHSw+ijxXB+QKNXALUSX8Ar/T2DaMXMnsvIfYw5ql0N5Ud7rO9nq3vlb8LKzS0pwWhcR32UvbPzhVQ7hytECkgBKdD/ChRP0P6vSzVIgd1W4MgjF9k+kpu7zRfD+QzpY2EE6OLgGngI38PLi58MNCyeNBEXgEh5XrbHFWksPENlpUn2YHe4jR0AwsLqVtKyRdTLcCupg7Knpe5yXdEWAIVN1eVqq8Azzy5Njz76yE6LnrhngBz3kXMc1/Gjp3yeLZc5vfcDYJR0cZRxEDak30Uf8L5ndVhE7gu5b7faixaarS+75b+zIt6PW+nLuf+bXwFU6qNdcXg7/Lo6jjT0OX5MLVu+onMVupICUkAK1EgBWUxrJLSq2TMFRo8enXg/uSGAHV1bTnnY8gAnHosSD1h8AAKH9Yl4/DasUzmUD3+gOxT4puOENTXtsIczQIhFjAe1n5M/P7ytvqIMpgMYCNjDnHg/vALOd26zQwEp4IACGAqgdTDl++ywOY5d7+NKfrn+USAgsnzvIgyYw3HfOKeP0dewpse9dB8gjLCcoyOPvRW3k/PV86y2Jw8vj/ByKRPX0uL9PkCyrd023bch+6IYh+U2m1uafwgZlOJoh/vZyx9RRo6rxHuaKM19/ibkpIAUkAL1UEBgWg/VVWevFThowfw0a9bstHLlCgOAnbtrNQRgHSXModAfznGe/QYsUUX1LH5i8RTPaOJ37BiSzxkxBRJ8wRMw6ftY5vo6QYFDRFdgCthE3VFjBoJ8QZnePsIABoAU0OHAOjZr1ozIJr+GCmCxrHZuSa/ca7s/3K844v5x37jfACXWT37Y+DVpvcTcHwz6ii5o/YAfOvaDyaeRsJDK+41b+oFV0rSnocN8zmujld3WbPvbdjTSwNQsqS2NBqbWdiC62uUyKMc7nZdZLoHwkqOM7dYHtSNESRSdSgEpUBMFNJRfE5lVyd4o8LrXnZc2b+5+OD8AobXVh+7D4hiQF8DHgx6LUvEI9gd+pCvgMAARWCggJIZYHTriG4XV1aHF6yJfYVGL9pV92lFuV7SNMM43bdpk+5dOiUrk11CB++57YCdLdYBd+R52dU46wmPBW3Fd/AjJbFj+PjmPQ6PPZfW09CH6HMP3DNM3b29OzdY3mltsSL+1bDG1/sYPLA7rV9QffTp8b5P39/xd7K8gt8P+GNz3+kmH27p1q/0YXFVupc6lgBSQAjVRYGcTVE2qVSVSoPcKHHbowekge8vNqlUru7SauoWIByqb6fOmJIbiG+yB7r+7woqF3wBodlQNRDggkiemAdijOj+s/RoramTg3HIbMHQE2RlD+a0GCrn8bHX12Gwdi6xVPgDQAQtWgc9JdKgARIDTkSM7L8CpKkKX/aQA83rpD3YrOxx9gL6CRT3uXfj8mIih/AiLPunXWNuxnrKvbi6o1H8AQ7eKUn5DA+X7MDpWe/bP7bDgDjVrvkFpI9uWdbLaG7Ru255aMKhWOivt785F7y2nieSEcU7fpf/LSQEpIAVqrYDAtNaKq77dVoB5puecc3b6yle+0m1ef7DyUA3Y9GH4yNABiQYIxSPb0hpUtNucvYgvHtYBuKzu53nvsAuA8FrTTmXYdXtTMWwfZUXd4RMe5Xs7ARIHkwBTIAdr1Zw5B6Tx48ZFVvl1VoD7xT0CEtn3FuAs7iF9zq2UZUDlfns64oA9ANXvefF1Hkpfe++F6WtFwO6f5WkA/KjpOSv9DUfb4/Brzxz9kTg5KSAFpEA9FBCY1kN11bnbChy3+BXp9tvvSI899liXeXmQAg74Pi+UuaZYuTysI5OBQfH8tjw2/N/c3JBXYAMVHOQBVlkEFXARC1ywfDW2lR/alGFDqJV5gdRD/bty/tB3mHHL2g4frqUcaw/xrzxusSxWuxKxxnHxY4OhcYbLhw4tQJQfE8RH3yFNpLfgfM6PG7eI2o8Tiy/3oL3/KtaXgOZKt4u6uyrX+56DKf08XBFO3+8MrZFGvhSQAlKgFgoITGuhsuroEwVmzJiRt/HpDvx4uPKsBR7ZhxQQaGvzIUmHTXvoDpmbTn3Ph9JrjRSGDBli8OdWzHhIx0Od6zJsMDWgzYAUQG2fenr6iyvOtHgbaDWQtcd8hmDq9/zFA7+rL046byu+g0C0D+hhJf5QG7aVG6gK+I+KuI9+L/0HUDmM1tutzvc67jd75TJDoK/B1OvtrFf0ZeLCxXl1ev+B5D/k6IseX+SL/PKlgBSQAv2tgJ5+/a2wyu8zBU4+6cT0y1/+wixWzOnrfv4bz2GgtKUFqxaQWFiAeOBi0QJKeQBn0DS/fE484fEQ55wwIJS6ufY5g0AvYOrWMr5oAatc7ewos4AAt75RN+WyEp9h/KOPftnOGRVSMwXoG3Hvo1LvN6zWH1LpA75ynz7hP07sp1DuFz6lI6CQ/PQJ99m2jBLKwHdYuvj/fCKdO2tYLocy+BFE//bV+f4aUq/H+1kue9l30vvf/h/Jxw+wmLJlWa6lU31es8Mx5wWj+t9EEe8/puiLHPT36KeRRr4UkAJSoBYKCExrobLq6BMFZs6ckd72trelz33uc2nMmLFdlhlAwQMYIGhvj61/nA546A4dOjSDRzyEw+fh71ZUrK3+gCaMc3yAAHDgmnPKb2vz+al+XUAJcdWONpGXNjro+GInIAAo3bBhQ16Jf/BBC6qz6rqGCixadHj61re+lUaPHtOpVu6fD9sDoUPy/WerMfoGzn8wFSBJWPSLHTu8H9K/WukDRGZnfcGu6Rfh2JrMHT+++EHkncn7j1vlG7nocPzYoS95OurEhR/Jir+N+KEWMd4vuYq+WW5PkUpnUkAKSIH+V0Bg2v8aq4Y+VGD+/HkZShkC725IP6rjIcvDGd+BECh0a1AAQ/jxIA7LKNeRFxiNh3qkI86hlWkDhSUryqMNcR55yg/98hA+dQbULFq0MJovv04KcD+4d905LIncU/y4p6SNfsZ5uf9EGsLivBNWVvon+ajX03gZ9LHIQz9rsN35YVLCyq6rsHI855EnyqcPhuM74/BpJ7tCALtyUkAKSIFaKyAwrbXiqm+vFJg6ZXL6+//92fQP//hP6cUX11pZ3QMEFfEQBvrsLJ8DE01NbqHCesWDOKygQADnhIXllDCu8YEG4vHjOs6pi/Pw49yvgYwCYmhTAAA+7cNietppp6RDDj4ol6GP+inA/QHOqh3hOICNexb3nr4QcRFGugjjnH4Trsne0FQpyoKsX1gfwPKOI0+UFz5lkp7utWOH97/O20VZGV1YTHOBnf4+ij5InE9z8VRxTj+NPul/Nx6vTykgBaRArRQQmNZKadXTZwqMGzc2nX76aenKK6+0YXleV9qz48HbaG/GaW+PYVKHAIAhACJAgGsO4IR4wuMIcCAuICQghus4qlsUZUa55OHBH1A6YcIEQWm1aHW6Hj58WBo1apTVDoh2/cPHLd7+Ayf6Aj5Qx0F/wUWfIqyjb5ilsmzvtN5m/Y28AKxPHSFtOMqIOhjaz+VYAUUZ1letf7NlGa6cN8oI3/sfOenfpRIq1tOA7hEjRqS5B86JbPKlgBSQAjVTQGBaM6lVUV8qcMIJr0zLli1Pd9xxuxVbPMS7q4MHMhvXY3lqbGytLH4Ki2lhFQ1LaQApD3nO4zoANcNBJY46A0QinDDqDJ/zOAJetm+3TdFtyPSggw5Kp55yUk6rj/orMGvmzHTYYS9JDz74QJc/fNyqyA8Tfljwo4X9Splz2vmHCX0pHP0nXJ4PGhcAov1AabOVSwzTA4y+3ZlbTqO/he9dyiz2eVFfFOI/oqwYy+thtKXsoi8SRhlcl4fq6ZM4f7mDv+ABOJWTAlJACtRageJ/zlrXrPqkwF4owDu8L3vrJfbaxJXpqaeezA/znorjYexv0XEgBWgdFn2+IA9/v/YHfQEDDpU87CMMn+uwZAUIEB4uyuKac9Lih6WU16zOnj07veH150YW+QNEgRNOOD7df/993bYGqGMrMqzwPgzvllIAtGwxjT4SBeX+AxhGQLZcYi3FOu/9iS7klv1iTirJ6Tve73z+aUcZ9C02/q/0Peoscyn5wvm59+eYXkJcDOXTN/kbYYGgnBSQAlKgHgoITOuhuursMwUuueSi9Dd/85n8wGaldE/Ohy+Zc0paHsK+5VNjo7/ZCXjkwNpVhs8A0AwWFSiNeEAgzqk/IBUIiCPKBVp4+HONf+YZp5NFboApMGnSxHx/hg/vumGwHvc2hr5JFZbw6A+ERX8hLeGk2cEcUyKzsz6S+xxD9AQwtYRpJ/Qd5jz7MD4xlBXlWHTJ0RiHVQLLUFpKZHn9Kvpk+ITSLhz9srm5JR111EvztT6kgBSQArVWoOcnea1bpPqkwG4oMOeA2env//7v7HWlX08PPfRgl0Ov1cUFnLKQxLfiATAcHNifNAAjoKJ6GD8gtAwgAaP4cR4PfnzKDBjdunWLQU9buvTSt6QZM6ZXN0/XA0CB+fPmpsWLj0u///099iNlZ+uh31t+xLiVkx8Z5XsffYCvwnl5KL+xao4pbx9rbfUFToz40yeBUodTINW3KIv+SHnVi594+1hb7nshXud+GDZa4DT6Jf0xHFNKcPiA8YgR3RB5ZJAvBaSAFOgnBQSm/SSsiq2dApMnTUof+fAH0o033ZIXRI0aNbrHyn0YE+sVYAGUMmfQIYKhTEAjgDT8AAOuAzzKwNFVpUAAABBQunHjxnTmmWekM157WlfJFTZAFMBifvbZZ6b77ru32xYx/E0/oL/EanmgkjD6SjjfeskhMEOlgV+BhGYZtXLob2HRhBe9XzFdBIspfRFrqUMlZbDYqWIAtWoYyjdLfKX/Eo8Lnz6ICyCNPhnXxFE/jh9QLCicMH58vtaHFJACUqDWCghMa6246us3BYC9559/Id10042VVdX+gO6uQn9A8wBnFTWLU3zOKQ96LJrAAGAAJHAAG4SVN9WPIVDqqAYBYJQ6wgK7bt06GyI9SlDa3Q0ZYOFYTWfPPiDPY+6uad6HAD+fc+qLoXy6BnHRJ8hP/+G6eiiffuJzPH04PfLAk/xgIh+w6nuYehkNBqaFczBtr0BxEd75zNtazFv1kQNPE/1427bt9p1nds6oKykgBaRADRUQmNZQbFXV/wpc+paL0rHHvjxdddV30tKlz3Y5DFtuBQ9rAABYKDuMTrFqGWgFSPGxiOEDD+WDcnBln4c919u3b8uLSf7oj/4wLVz4knI1Oh/ACnB/jz/+ldaXrup2iohb27GKc+99OJyvxH2vXkBEGBA6xGCz0l1ImRcuYbAknoN68ZuaYt6zn3t/837W2GZpO7TzbaqwmOJIV+0oD+cjBZzzg8khlXDmleLWr19vP56OzOf6kAJSQArUQ4EG+w+r+P+tHi1QnVKgHxTgnfM33/KTdPXVV6fhtoKlNwujaEZAQXWTHAoYYh2SIdXjfeEUf0EAR/Gw96F7wHTTpk1pyZJz07lLzrY3VvU8xaC6Xl3XV4ENGzamj338EwaK3N+dgY/WBQjGjxaAdJjtGsF0AM7xObC6l/04D2s8llHCcGGlp2yP54eQb03lfdGvYdC4zhnzh/9o4rT47z3AlL7pYMqoQMRv27Y159yyZWs6/02vtzmm2ioqC6IPKSAFaq6AwLTmkqvCWiqwfMXK9NWvfj098sjDaeTIkfnhvrf1O4Awh9ABIB7uWFgdUtsSD/r58w9Kl19+mTYq31vB65z/29/5Xrr55psMGndeBEXTAkw5d8t6Y7awApkAKnAaUEpYAGiAaYQRTrqAUT9nCoBPIyGevhf9ruiHtKGY00o7wmhaNjsA1/RVwNR3E2CUwIF106bNZEuHHHJwesXLj87n+pACUkAK1EMBgWk9VFedNVUAOL3nnnvTE088kR5//PG0efOmDAs86HnI76kLIAkwbWlpTmPHjkvz5s3Lx5FHLkrz5h64p8Ur3wBR4LnVz6d/tFfgYoXflXPLJVDY0AGjLCQCTqvBNK4DWh063WJK/jKkRpz7DqYRRnu8Xn4k+Xm5jfTNgFM/9/msWPh9wVVhSSXfhRe8sZxd51JACkiBmiugOaY1l1wV1lqB2bNmJg4cD+Onnn4m/fjHN+UV18CGW1J97mhv24b1iTl627ZtS9OmTTcgHZtOOukkm5O4OA0zC5ncvqPA9GlT0wknnJBuvPHHBpjd/5dZQCCwx7ZL+P7DBxD1eN8kP87znFOzohLPwXVAZ5wHqEY4AEq5Ee5A6hbTgFRS4CjD2xGWUp9mQjh/C/i4OXMOyL4+pIAUkAL1VqD7/2Xr3TLVLwX6QQGGTQ85+KAOGGWl/LJlS/PQ+/DhvZtXx8PfFzQNy6+uPPLII80/JB180IIMC/3QbBVZZwWmTp2S9/hkON9Bb9cN8q2kgEwHQfoMc46BS1ysguc8wjgvO8IjD/kDIh0+SckCJl8sVSl2p/4XAOy+zy+lHA7KjjIPP1wb6pe117kUkAL1U0BD+fXTXjUPEAWYX8cipYcfedRa5BauXTWN+XnMxRs/blwaN27srpIqbh9RALD7zne/n37yk1sr8NdzP+Gr80OI4XogM4btwzqKTzw+8dXXhHEAosThx3WcUwfnZT9fVD4CTAFQzgNIgdItW7bYavzmnPLDH3p/OZvOpYAUkAJ1U0AW07pJr4oHigKslufQW5gGyh0ZeO0A/t584ZsyBN5yy80GiOx727PjRwyvvY0N+AMUyzkJAzjxcUAjIBrASt3E4ROGIz2QGVCaAysfERdh5A0wpWyG8Dk2b96crcCRTr4UkAJSYCAoIDAdCHdBbZACUmBQKMDioLVr16bf/vZOs4AO67HNrIAHAuP1ou3tQzJ4luETqykwCXR6Wj/nGvCMuGowJbwrR7qAXOKB0rCUUj6WUqy3r3/9eTb3elZXRShMCkgBKVA3BTSUXzfpVbEUkAKDVYGvff2beQup0aPH9PorDBlS3vapOA/LKIDKUYZR4DOOCMevPq9uRFhJy1DKOVNWxtkUlA+8/z253Op8upYCUkAK1FsBWUzrfQdUvxSQAoNOgdfa628ffPCBtGbNmm73N63+UoAh+43i44wv7bxIhRU1oNPjfcET4BpD+eEDq2EVjTz4uIDS8CmXIyB1/vz5gtKslD6kgBQYiArIYjoQ74raJAWkwIBXgGHxG2+6Nd1ww/V5EdGutpKKL+OWTt+azDfLB1B9gROwiVWVa2A0LKlhMcUvQ2iAaIRRBzAawAqMct7S0mLD95vNUjo+XXDB+bYrxYJojnwpIAWkwIBTQBbTAXdL1CApIAUGgwIMu59z9hnZEnn11d+x13gCjl3P+4zv41ZMALLVDk/f0OCWUt8bl4VPbBPlK/YdZB1UA1DLQEq5cR1Aiu/1+JZQDN9jLb3ggjcJSuNGyJcCUmDAKiCL6YC9NWqYFJACg0WB39z5u3TllVea5bSl100GQAMqi0wxfzSsqm5F9deSEtfZalrkK6ylMWSPxZT9dufNm5/ebq/GHT9+XDm5zqWAFJACA1IBgemAvC1qlBSQAoNNgRUrV6b/+3//JW3cuMHmcPZuOym+485w6t8ccLXYbEF1MHXLqceSDxgtgBSLK7sAsEUVgDx8+LD0ylceb1bdM/N2aJFPvhSQAlJgICsgMB3Id0dtkwJSYNApwEb8zDuNVfbA5d44wJX5pvjMSw2QjSF74BQY5RorKa/ZPfnkU9LFF11g0wt69zazvWmf8koBKSAF+lIBgWlfqqmypIAUkAKmwNPPPJuuv/5/0j333N0BlX0DqMUc1jKYYi3dtm1bmj37gPSOd1yeFsyfp/sgBaSAFBiUCghMB+VtU6OlgBQYDAosX7Ey/epXv0mPPPJIWr58eZ7zyeb2bvXcc0sqIAqYsuJ+1KhR6fDDF6XFi1+RFi06PA2z8uWkgBSQAoNVAYHpYL1zarcUkAKDSoH16zekJ5962iypN9g81I1pxYrleaid1fa47ualBoSShsVMLS2tab7tRTpr1ux0+umnpjkHzNaQPeLISQEpsE8oIDDdJ26jvoQUkAKDSYFNmzanlaueSz/96c/S888/n5v+2GOP5m2dyt8Dq+i0adPSpEmTc/C55y4xCB2e5s2da68V1W5/Za10LgWkwL6hgMB037iP+hZSQAoMQgUA1OaW5tzyBx54yBYvlV4FlUN3pOnTp9sxNV9NmjhxEH5LNVkKSAEp0HsFBKa910oppYAUkAJSQApIASkgBfpRgWKJZz9WoqKlgBSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UUBgWhOZVYkUkAJSQApIASkgBaRATwoITHtSSPFSQApIASkgBaSAFJACNVFAYFoTmVWJFJACUkAKSAEpIAWkQE8KCEx7UkjxUkAKSAEpIAWkgBSQAjVRQGBaE5lViRSQAlJACkgBKSAFpEBPCghMe1JI8VJACkgBKSAFpIAUkAI1UeD/B2I9gRgFw+QsAAAAAElFTkSuQmCC" alt></p>
<p>(i) State the name, applying IUPAC rules, of compound <strong>Z</strong> and the class of compounds to which it belongs.</p>
<p>Name:</p>
<p>Class:</p>
<p>(ii) Deduce the number of signals you would expect to find in the <sup>1</sup>H NMR spectrum of compound <strong>Z</strong>, giving your reasons.</p>
<p>The mass spectrum and infrared (IR) spectrum of compound <strong>Z</strong> are shown below:</p>
<p>Mass spectrum</p>
<p><img 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" alt></p>
<p>IR spectrum</p>
<p><img 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" alt></p>
<p>(iii) Identify the species causing the large peak at <em>m/z</em>=31 in the mass spectrum.</p>
<p>(iv) Identify the bond that produces the peak labelled <strong>Q</strong> on the IR spectrum, using section 26 of the data booklet.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Phenylamine can act as a weak base. Calculate the pH of a 0.0100 mol dm<sup>−3</sup> solution of phenylamine at 298K using section 21 of the data booklet.</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br>