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</div><h2>HL Paper 3</h2><div class="specification">
<p class="p1">Infrared (IR) spectroscopy is widely used as a technique in analytical chemistry.</p>
</div>
<div class="specification">
<p class="p1">The IR spectrum, mass spectrum and \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of an unknown compound, <strong>Y</strong>, of molecular formula \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{4}}}{{\text{O}}_{\text{2}}}\) are as follows.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-26_om_10.37.56.png" alt="N10/4/CHEMI/HP3/ENG/TZ0/A2.c"></p>
</div>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Identify the bonds responsible for the peaks <strong>A</strong>, <strong>B </strong>and <strong>C </strong>in the IR spectrum of <strong>Y</strong>.</p>
<p class="p1"><strong>A</strong>:</p>
<p class="p1"><strong>B</strong>:</p>
<p class="p1"><strong>C</strong>:</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>In the mass spectrum of <strong>Y</strong>, deduce which ions the <em>m/z </em>values at 31 and 29 correspond to.</p>
<p class="p1"><em>m/z </em>= 31:</p>
<p class="p1"><em>m/z </em>= 29:</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>Identify the peaks at 3.76 and 8.07 ppm in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum.</p>
<p class="p1">3.76 ppm:</p>
<p class="p1">8.07 ppm:</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>State what information can be obtained from the integration trace about the hydrogen atoms responsible for the peak at 3.76 ppm in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum.</p>
<p class="p1">(v) <span class="Apple-converted-space"> </span>Deduce the structure of <strong>Y</strong>.</p>
<p class="p1">(vi) <span class="Apple-converted-space"> </span>Explain why tetramethylsilane (TMS) is suitable as a reference standard.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Another structural isomer of \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Br}}\) is 2-bromo-2-methylpropane. Deduce the number of peaks and the splitting pattern in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of this isomer.</p>
<p class="p1">Number of peaks:</p>
<p class="p1">Splitting pattern:</p>
</div>
<br><hr><br><div class="specification">
<p>The mass spectrum of an unknown acidic compound, <strong>X</strong>, with empirical formula \({\text{C}}{{\text{H}}_{\text{2}}}{\text{O}}\), is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_13.36.34.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/02.a"></p>
</div>
<div class="specification">
<p class="p1">The low-resolution \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>shows four peaks. A simplified representation is shown alongside a table with relative peak areas.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_14.41.01.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/02.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the relative molecular mass, to the nearest integer, of the compound from the mass spectrum and deduce the formula of the molecular ion.</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">Deduce the formula of the fragment responsible for the peak at 45.</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">Deduce the formula of the fragment responsible for the peak at 29.</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">Identify the group responsible for the peak at <strong>D</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest a possible structure for <strong>X</strong>.</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">Peak <strong>B </strong>shows the following splitting pattern in the high-resolution spectrum.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_14.48.50.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/02.c"></p>
<p class="p1">Explain the splitting pattern, indicating the hydrogen responsible for peak <strong>B</strong>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Compound <strong>X</strong> has the molecular formula \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{3}}}\) and is found in human perspiration.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Its infrared (IR) spectrum is represented below.</p>
<p><img src="images/Schermafbeelding_2016-08-15_om_12.10.47.png" alt="M14/4/CHEMI/HP3/ENG/TZ2/03.a"></p>
<p>Deduce the bonds responsible for the absorptions labelled I and II.</p>
<p> </p>
<p><strong>I</strong>:</p>
<p> </p>
<p>II:</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum recorded showed four peaks with the following chemical shift values (in ppm):</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-15_om_12.53.52.png" alt="M14/4/CHEMI/HP3/ENG/TZ2/03.b"></p>
<p>The integration trace for A:B:C:D was found to be 1:1:1:3.</p>
<p>Deduce what information can be obtained about the hydrogen atoms responsible for peak D at 1.2 ppm from the integration trace in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X</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>Deduce the fragments in the mass spectrum which correspond to the following \(m{\text{/}}z\) values.</p>
<p> </p>
<p>\(m{\text{/}}z = 45\):</p>
<p> </p>
<p>\(m{\text{/}}z = 17\):</p>
<p> </p>
<p>\(m{\text{/}}z = 15\):</p>
<p> </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>Deduce the structural formula of <strong>X</strong>.</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><strong>Y </strong>is an isomer of <strong>X</strong>, which contains the same functional groups. Deduce the structural formula of <strong>Y</strong>.</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>(i) Like <strong>X</strong>, 3-methylbutanoic acid is also a source of body odour. Deduce the \(m{\text{/}}z\) value for the molecular ion peak on the mass spectrum of this compound.</p>
<p> </p>
<p> </p>
<p>(ii) Ethyl propanoate (ethyl propionate) is an isomer of 3-methylbutanoic acid. Its \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum consists of four peaks.</p>
<p>Deduce the ratios of the areas under each peak in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of ethyl propanoate. For each peak, deduce the range of chemical shift values (in ppm), using Table 18 of the Data Booklet, and predict the splitting pattern.</p>
<p><img src="images/Schermafbeelding_2016-08-15_om_13.25.29.png" alt="M14/4/CHEMI/HP3/ENG/TZ2/03.f"></p>
<div class="marks">[4]</div>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p>The mass spectrum and infrared (IR) spectrum of a compound are shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_11.39.58.png" alt="N14/4/CHEMI/SP3/ENG/TZ0/01"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State the information about this particular compound that can be derived from the mass spectrum and outline how it is found.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(ii) Suggest how the fragment with <em>m</em>/<em>z </em>= 43 is formed from the original molecule.</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>(i) Use the IR spectrum in the region 1600 – 1800 \({\text{c}}{{\text{m}}^{ - 1}}\) to deduce <strong>one</strong> functional group that is present in the compound and one group that is absent.</p>
<p> </p>
<p>Present:</p>
<p> </p>
<p> </p>
<p>Absent:</p>
<p> </p>
<p> </p>
<p>(ii) The molecular formula of the compound is \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\). Explain, with reference to another region of the IR spectrum, why the compound could <strong>not </strong>be propanoic acid, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{COOH}}\).</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) Deduce the structures of two possible isomers of propanoic acid consistent with the IR spectrum.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>\(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectroscopy is often very useful in distinguishing between closely related compounds such as the ones shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-22_om_09.07.19.png" alt="N14/4/CHEMI/HP3/ENG/TZ0/X01.c_01"></p>
<p>Deduce the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra you would expect for each compound and complete the table below. (The answers for propanoic acid are given as a guide.)</p>
<p><em>Note that some of the boxes may be blank.</em></p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-22_om_09.08.38.png" alt="N14/4/CHEMI/HP3/ENG/TZ0/01.c_02"></p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Typical proton chemical shift values are given in Table 18 of the Data Booklet. The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>contains three peaks. Details of two of these are shown in the table below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-03_om_15.12.50.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/A2.c"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce a possible structure for <strong>X </strong>that is consistent with the mass, IR and \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra.</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">Complete the table above by suggesting the chemical shift of the third peak, and state its relative peak area and splitting pattern.</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 class="p1">Explain the splitting pattern of the peak at chemical shift <strong>4.1 </strong>ppm.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The structure of an unknown compound <strong>A </strong>with empirical formula \({\text{C}}{{\text{H}}_{\text{2}}}\) can be determined using information from a variety of analytical techniques.</p>
</div>
<div class="specification">
<p class="p1">The infrared (IR) spectrum of <strong>A </strong>is shown below.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-07_om_15.52.12.png" alt="M15/4/CHEMI/HP3/ENG/TZ1/02.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The mass spectrum of <strong>A </strong>is shown below.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-07_om_15.45.46.png" alt="M15/4/CHEMI/HP3/ENG/TZ1/02.a.i"></p>
<p class="p1">Deduce the formula of the molecular ion from the mass spectrum.</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">Explain the presence of a doublet in the high-resolution proton nuclear magnetic resonance (<span class="s1">1</span>H NMR) spectrum of <strong>A</strong>.</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">One isomer of <strong>A </strong>has only one signal in its \(^{\text{1}}{\text{H}}\) NMR spectrum. Deduce the structural formula of this isomer.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iv.</div>
</div>
<br><hr><br><div class="specification">
<p>Biological pigments include a variety of chemical structures with diverse functions.</p>
<p>The graph shows the conversion of hemoglobin to oxyhemoglobin.</p>
<p style="text-align: center;">Hb(aq) + 4O<sub>2</sub>(g) \( \rightleftharpoons \) Hb(O<sub>2</sub>)<sub>4</sub>(aq)</p>
<p>The partial pressure of oxygen gas, p(O<sub>2</sub>) is proportional to its concentration.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_11.43.40.png" alt="M17/4/CHEMI/HP3/ENG/TZ1/16"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the shape of the curve at low oxygen partial pressure up to about 5 kPa.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a graph on the axes above to show the effect of decreasing pH on the binding of oxygen to hemoglobin (the Bohr Effect).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the effect of decreasing pH on the oxygen saturation of hemoglobin.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Aspirin is one of the most widely used drugs in the world.</p>
</div>
<div class="specification">
<p>Aspirin was synthesized from 2.65 g of salicylic acid (2-hydroxybenzoic acid) (<em>M</em><sub>r</sub> = 138.13) and 2.51 g of ethanoic anhydride (<em>M</em><sub>r</sub> = 102.10).</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> absorbances, other than the absorbances due to the ring structure and C–H bonds, that would be present in the infrared (IR) spectrum of aspirin.</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>State <strong>two</strong> techniques, other than IR spectroscopy, which could be used to confirm the identity of aspirin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The molecule of an unknown straight-chain compound consists of 4 carbon, 8 hydrogen, and 1 oxygen atoms. The <span class="s1">1</span>H NMR spectrum of the compound is given below (the numbers next to integration traces correspond to areas under each peak).</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-22_om_14.39.30.png" alt="N12/4/CHEMI/HP3/ENG/TZ0/A3"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the number of hydrogen atoms for peaks with chemical shifts of 2.15 and 2.4–2.5 ppm. An example for the peak at 1.0–1.1 ppm is given.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-22_om_14.47.00.png" alt="N12/4/CHEMI/HP3/ENG/TZ0/A3.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Analyse the splitting pattern of each peak and determine the relative positions of hydrogen atoms in the molecule. One example is given.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-22_om_14.53.01.png" alt="N12/4/CHEMI/HP3/ENG/TZ0/A3.b"></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">Using the information from (a) and (b), deduce the structural formula of the organic compound.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The structures of morphine, diamorphine and codeine are given in section 37 of the data booklet.</p>
</div>
<div class="specification">
<p>Methadone is used to treat heroin addiction. <sup>1</sup>H NMR spectroscopy can be used to study its structure.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict the number of different hydrogen environments in the molecule ignoring the benzene rings.</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>Predict the chemical shift and the splitting pattern seen for the hydrogens on the carbon atom circled in the diagram. Use section 27 of the data booklet.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Ibuprofen and paracetamol are mild analgesics. One of the IR spectra below belongs to ibuprofen and the other to paracetamol. The structures of both compounds are given in section 37 of the data booklet.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Both spectra show a peak at wavenumber 1700 cm<sup>–1</sup>. Identify the bond responsible for this peak.</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>Deduce which spectrum belongs to paracetamol, giving two reasons for your choice. Use section 26 of the data booklet.</p>
<p><img 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r3jqnRNu/felUUbHkmz+Ug2LHrXqUV9R4AAAQIECBAgQGCGAtMegs5wve/c4o3h7N/9+dz+1K9kw6bVuaTV4cgP8qWb+rLkntuyZXlXxpruvCwbvrw7657YkS8NHEvSyMj+R3P/kauzfuOHJg7OO7p+Lzes+2AGnj6UoUbSGDqUpwfelys/fEk6x7o8L12rPpvvTRys/0v2f/3LefoPPpcdW644sZ6Oriz/0y9k761Hs217XwZPBpYsza133JI1i+aPramj6wP5yPILJrZ1ZsSOdHb9x/Ftn7nCTwkQIECAAAECBAicLYG5HSCGP5/V75536lSi1mlH87pzzfNL8sCBp/K1Ne9NRysYHPhu9gx35/KLf/VEeDip2dmdxUuGsufJH2YkHZm/akeGhu7J8qPfT19fX/r6/ir13j/K4o3fOrlEOrovy1UrfpDbH/pO9vd/Z9JpSeMlIz/Mk3uGsuSK35wIISfu6cxFi9+XnHZa1cRqx795MzVTl3GbAAECBAgQIECAwOwJzO0Acdq7ML2aI/tuy4pcnXWrfj8f+sD4Kw0Tlgdz3+oLp4SN92fjU8MTFRk9lPr63875i6/Ll//un5N05IKe+3LgoWtPHfh3Ls/Wbw9k7+/+a/bdfWNWL353arVT10k0jr6U5yet8tTKx78bfjEvHX39DT/2AwIECBAgQIAAAQJzQWBuB4jThFvvvvRn2bvvN7Lnho35zMOHpnwOxLV56Mi/T3q711Nv/Tp076rMb12c/Mhd2fj0ldn3k5fyvXs/lTVr1mTNqoV59cg/nraldC7KqjWfyr3fG0rz+FAO7LsqR29fnRV3D2R0wcW5vOv08tNudV2Sixecd9qP3CBAgAABAgQIECAwVwTaKEC0yM/Lwmtuy97buvONjZ/Jg2MXLHdk/rKPZF3Xj/LcoX86/XMhRvdn18pL0lM/nEZG85NWUFjywVzWNekAv/FveeXYz6bfnx1dWbrmhqxftzTDz7+Uo52/lZ513XnhuX/I8MS1Dq3FT67/5IXd06/SPQQIECBAgAABAgTOVYE2CxCts44WZtX2u7Nzxd9n29av52DrbVrnfzh/8sCVeeKmO7N7//CJEDF6OH1335Ft2ZwdaxelI+/Jsp6r0/XUX+bhgZdP1IxdkH1nbqofmth/jcF6elqnLPUdHn+Fo/WWrd/Pk/szftH2e7L8kzfnqic+m+27nxsPESM5XO/N9fctyM4da7Ko/dQnfHxDgAABAgQIECDQ3gLteSjbuSyf3rUtKwZ2ZuuOZzLcOC8L1+zIwN4rc7R3aea1LrY+/9o8duGmHPjm5iwde6vXjsxfcXO+/fDl+dvVF52ouegz+f6vrc+j+27NybOSOhZdn4cPbMqFj12b88c+K2Jezl/xWC68+au555rWRdsd6bx0Xb4ysDtXHr0r3fNqqdUuzR8fuSJ7j3wzW5deMAsT5XMgZgHZJggQIECAAAECRQrUms1ms1arjV0bUKSApgkQIECAAAECBAgQmFZgalZoz1cgpm3fHQQIECBAgAABAgQIzERAgJiJnmUJECBAgAABAgQIFCYgQBS2w7VLgAABAgQIECBAYCYCAsRM9CxLgAABAgQIECBAoDABAaKwHa5dAgQIECBAgAABAjMRECBmomdZAgQIECBAgAABAoUJCBCF7XDtEiBAgAABAgQIEJiJgAAxEz3LEiBAgAABAgQIEChMQIAobIdrlwABAgQIECBAgMBMBASImehZlgABAgQIECBAgEBhAgJEYTtcuwQIECBAgAABAgRmIiBAzETPsgQIECBAgAABAgQKExAgCtvh2iVAgAABAgQIECAwEwEBYiZ6liVAgAABAgQIECBQmIAAUdgO1y4BAgQIECBAgACBmQgIEDPRsywBAgQIECBAgACBwgQEiMJ2uHYJECBAgAABAgQIzERAgJiJnmUJECBAgAABAgQIFCYgQBS2w7VLgAABAgQIECBAYCYCAsRM9CxLgAABAgQIECBAoDABAaKwHa5dAgQIECBAgAABAjMRECBmomdZAgQIECBAgAABAoUJCBCF7XDtEiBAgAABAgQIEJiJgAAxEz3LEiBAgAABAgQIEChMQIAobIdrlwABAgQIECBAgMBMBASImehZlgABAgQIECBAgEBhAgJEYTtcuwQIECBAgAABAgRmIiBAzETPsgQIECBAgAABAgQKExAgCtvh2iVAgAABAgQIECAwE4G2CBCNwXp6arV09/ZnZDqNxuHUe7pT696e/pHGNFWvZbC+NrXasvT2H5umJmn37YVVErPQ+gVo91nXX2snn4vPjWZv7B+gc3LfeG703Dh+eGQ+T/yavm3HoOOuc+RLrdlsNmu1WprN5hx5yB4mAQIECBAgQIAAAQKzJTA1K7TFKxCzhWc7BAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShcQIEqfAP0TIECAAAECBAgQqCAgQFTAUkqAAAECBAgQIECgdAEBovQJ0D8BAgQIECBAgACBCgICRAUspQQIECBAgAABAgRKFxAgSp8A/RMgQIAAAQIECBCoICBAVMBSSoAAAQIECBAgQKB0AQGi9AnQPwECBAgQIECAAIEKAgJEBSylBAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShcQIEqfAP0TIECAAAECBAgQqCAgQFTAUkqAAAECBAgQIECgdAEBovQJ0D8BAgQIECBAgACBCgICRAUspQQIECBAgAABAgRKFxAgSp8A/RMgQIAAAQIECBCoICBAVMBSSoAAAQIECBAgQKB0AQGi9AnQPwECBAgQIECAAIEKAgJEBSylBAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShdoiwDRGKynp1ZLd29/Rqbbo43Dqfd0p9a9Pf0jjWmqXstgfW1qtWXp7T82TU3S7tsLqyRmofUL0O6zrr/WTj4XnxvN3tg/QOfkvvHc6Llx/PDIfJ74NX3bjkHHXefIl1qz2WzWarU0m8058pA9TAIECBAgQIAAAQIEZktgalZoi1cgZgvPdggQIECAAAECBAiULiBAlD4B+idAgAABAgQIECBQQUCAqICllAABAgQIECBAgEDpAgJE6ROgfwIECBAgQIAAAQIVBASIClhKCRAgQIAAAQIECJQuIECUPgH6J0CAAAECBAgQIFBBQICogKWUAAECBAgQIECAQOkCAkTpE6B/AgQIECBAgAABAhUEBIgKWEoJECBAgAABAgQIlC4gQJQ+AfonQIAAAQIECBAgUEFAgKiApZQAAQIECBAgQIBA6QICROkToH8CBAgQIECAAAECFQQEiApYSgkQIECAAAECBAiULiBAlD4B+idAgAABAgQIECBQQUCAqICllAABAgQIECBAgEDpAgJE6ROgfwIECBAgQIAAAQIVBASIClhKCRAgQIAAAQIECJQuIECUPgH6J0CAAAECBAgQIFBBQICogKWUAAECBAgQIECAQOkCAkTpE6B/AgQIECBAgAABAhUEBIgKWEoJECBAgAABAgQIlC4gQJQ+AfonQIAAAQIECBAgUEFAgKiApZQAAQIECBAgQIBA6QICROkToH8CBAgQIECAAAECFQQEiApYSgkQIECAAAECBAiULiBAlD4B+idAgAABAgQIECBQQUCAqICllAABAgQIECBAgEDpAgJE6ROgfwIECBAgQIAAAQIVBASIClhKCRAgQIAAAQIECJQuIECUPgH6J0CAAAECBAgQIFBBQICogKWUAAECBAgQIECAQOkCAkTpE6B/AgQIECBAgAABAhUEBIgKWEoJECBAgAABAgQIlC4gQJQ+AfonQIAAAQIECBAgUEFAgKiApZQAAQIECBAgQIBA6QICROkToH8CBAgQIECAAAECFQQEiApYSgkQIECAAAECBAiULiBAlD4B+idAgAABAgQIECBQQUCAqICllAABAgQIECBAgEDpAgJE6ROgfwIECBAgQIAAAQIVBASIClhKCRAgQIAAAQIECJQuIECUPgH6J0CAAAECBAgQIFBBQICogKWUAAECBAgQIECAQOkCAkTpE6B/AgQIECBAgAABAhUEBIgKWEoJECBAgAABAgQIlC4gQJQ+AfonQIAAAQIECBAgUEFAgKiApZQAAQIECBAgQIBA6QICROkToH8CBAgQIECAAAECFQQEiApYSgkQIECAAAECBAiULjBHA8Sx9PcuS61WO/Pf7vXZ9fRgRtty7zYyOtifem/Pqd7but+23ImaIkCAAAECBAjMWYE5GiDGvbtuyzOvHk+z2Zz099UceWBhHr/6E9nS9+M05uyuOfMDb7z8aLas2JJnF9yZoeOtvn+WoUeX54X17dnvmRX8lAABAgQIECBA4J0SmNsB4oxq87NozS2549ZfSv2rz+TFtkoQr+XFJ/8i9Xw86zd+KF1je++8dC3fmP9+z/tTv+mrGRhpq4bPuIf9kAABAgQIECBA4J0TaMMAMQnzhRfzk9GTB9SvZ/jgnvSu7B4/9acnvfX+DE7cf2K5xvDB9O1an+6J06Om1p3hFKKVvan3Tz5lampNd1b21tM/ODL+4BoZ6d+e7trafK1/IH8+cTrSkqzf9eQbHtOpjt6VRRseSXNoR1bNP8OuG34xLx19PclrGayvTa22NvXB104t7jsCBAgQIECAAAECMxQ4w1HoDNd4LizeOJaXnh9KllySizpbLb6el/tuydKPfzcL7j2Y461Tnn76hSx+dktWbHk0L5/MGKP7c/91m/LYvBtzcOz0oGaOD23NvD03ZtODB05cUzF6IA9uujXPLv5Cfjp26tTPMnTHL2fP6tvzyNjBeiOjh/dk8+TTjI4fzL0Lns31i6/LroOvTBL6Vm68+6mcv/FbY6dgHR+6Pwsf33xqW5Mq39S3V380H77kXUnGg0bzkWxY1LrtDwECBAgQIECAAIG3R6D9AkRjOPt3fz63P/Ur2bBpdS5pdTjyg3zppr4suee2bFnelbGmOy/Lhi/vzronduRLA8eSNDKy/9Hcf+TqSacHJR1dv5cb1n0wA08fylAjaQwdytMD78uVH74knWP74Lx0rfpsvjdxsP4v2f/1L+fpP/hcdmy54sRpRh1dWf6nX8jeW49m2/a+DJ4MLFmaW++4JWsWzR9bU0fXB/KR5RdMbOvN7uLGy3+Te2//0al+3+yC6ggQIECAAAECBAhUFJjbAWL481n97nmn3o2oddrRvO5c8/ySPHDgqXxtzXvT0QoGB76bPcPdufziXz0RHk4idXZn8ZKh7HnyhxlJR+av2pGhoXuy/Oj309fXl76+v0q994+yeOO3Ti6Rju7LctWKH+T2h76T/f3fmXRa0njJyA/z5J6hLLniN8evUTi5aGcuWvy+5LTTqk7ed/Lrm6k5WTv+dfRQHt6+I/94w/2555pWv/4QIECAAAECBAgQOHsCc/t487R3YXo1R/bdlhW5OutW/X4+9IHxVxom7A7mvtUXTgkb78/Gp4YnKjJ6KPX1v53zF1+XL//dPyfpyAU99+XAQ9eeOvDvXJ6t3x7I3t/91+y7+8asXvzu1GqnrpNoHH0pz09a5amVj383cZ3CG+6p/oPW4938X3N7bs7/2r56SmCpvjpLECBAgAABAgQIEPhFAnM7QJzWXevdl/4se/f9RvbcsDGfefjQlM+BuDYPHfn3SW/3euqtX4fuXZX5rQuPH7krG5++Mvt+8lK+d++nsmbNmqxZtTCvHvnH07aUzkVZteZTufd7Q2keH8qBfVfl6O2rs+LugYwuuDiXd51eftqtrkty8YLzTvvRWzszmzIAAAmeSURBVLnRGH4uXxwLD1vT/5V1uXTsWo+3sibLECBAgAABAgQIEHjzAm0UIFpNn5eF19yWvbd15xsbP5MHxy5Y7sj8ZR/Juq4f5blD/3T650KM7s+ulZekp344jYzmJ62gsOSDuaxr0gF+49/yyrGfTS/a0ZWla27I+nVLM/z8Szna+VvpWdedF577hwxPXOvQWvzk+k9e2D39Kn/+Pa9nuP9zWd19bf56wecyIDz8fC73EiBAgAABAgQIvK0CbRYgWmcdLcyq7Xdn54q/z7atX8/B1tu0zv9w/uSBK/PETXdm9/7hEyFi9HD67r4j27I5O9YuSkfek2U9V6frqb/MwwMvn6gZuyD7ztxUPzSB3hisp6d1ylLf4fFXOFpv2fr9PLk/4xcxvyfLP3lzrnris9m++7nxEDGSw/XeXH/fguzcsSaL3rJ6I6MHv5LrVv9Zjmx4IHs/vyaLvPIwsW98Q4AAAQIECBAgcPYF3vKh7Nl/aDPYQueyfHrXtqwY2JmtO57JcOO8LFyzIwN7r8zR3qWZ17rY+vxr89iFm3Lgm5uzdOwgvCPzV9ycbz98ef529UUnai76TL7/a+vz6L5bc/KspI5F1+fhA5ty4WPX5vyxz4qYl/NXPJYLb/7q+EXMHem8dF2+MrA7Vx69K93zaqnVLs0fH7kie498M1uXXvDWG2sM5pHtOzOQZLj+iVw0tu7W+k/+XZbe/tY7SvkciLeObEkCBAgQIECAAIGfJ1BrNpvN1gFos9n8eXXuI0CAAAECBAgQIECgQIGpWaE9X4EocMdqmQABAgQIECBAgMBsCAgQs6FsGwQIECBAgAABAgTaRECAaJMdqQ0CBAgQIECAAAECsyEgQMyGsm0QIECAAAECBAgQaBMBAaJNdqQ2CBAgQIAAAQIECMyGgAAxG8q2QYAAAQIECBAgQKBNBASINtmR2iBAgAABAgQIECAwGwICxGwo2wYBAgQIECBAgACBNhEQINpkR2qDAAECBAgQIECAwGwICBCzoWwbBAgQIECAAAECBNpEQIBokx2pDQIECBAgQIAAAQKzISBAzIaybRAgQIAAAQIECBBoEwEBok12pDYIECBAgAABAgQIzIaAADEbyrZBgAABAgQIECBAoE0EBIg22ZHaIECAAAECBAgQIDAbAgLEbCjbBgECBAgQIECAAIE2ERAg2mRHaoMAAQIECBAgQIDAbAgIELOhbBsECBAgQIAAAQIE2kRAgGiTHakNAgQIECBAgAABArMhIEDMhrJtECBAgAABAgQIEGgTAQGiTXakNggQIECAAAECBAjMhoAAMRvKtkGAAAECBAgQIECgTQQEiDbZkdogQIAAAQIECBAgMBsCAsRsKNsGAQIECBAgQIAAgTYRECDaZEdqgwABAgQIECBAgMBsCAgQs6FsGwQIECBAgAABAgTaRECAaJMdqQ0CBAgQIECAAAECsyEgQMyGsm0QIECAAAECBAgQaBMBAaJNdqQ2CBAgQIAAAQIECMyGQFsEiMZgPT21Wrp7+zMynVrjcOo93al1b0//SGOaqtcyWF+bWm1ZevuPTVOTtPv2wiqJWWj9ArT7rOuvtZPPxedGszf2D9A5uW88N3puHD88Mp8nfk3ftmPQcdc58qXWbDabtVotzWZzjjxkD5MAAQIECBAgQIAAgdkSmJoV2uIViNnCsx0CBAgQIECAAAECpQsIEKVPgP4JECBAgAABAgQIVBAQICpgKSVAgAABAgQIECBQuoAAUfoE6J8AAQIECBAgQIBABQEBogKWUgIECBAgQIAAAQKlCwgQpU+A/gkQIECAAAECBAhUEBAgKmApJUCAAAECBAgQIFC6gABR+gTonwABAgQIECBAgEAFAQGiApZSAgQIECBAgAABAqULCBClT4D+CRAgQIAAAQIECFQQECAqYCklQIAAAQIECBAgULqAAFH6BOifAAECBAgQIECAQAUBAaICllICBAgQIECAAAECpQsIEKVPgP4JECBAgAABAgQIVBAQICpgKSVAgAABAgQIECBQuoAAUfoE6J8AAQIECBAgQIBABQEBogKWUgIECBAgQIAAAQKlCwgQpU+A/gkQIECAAAECBAhUEBAgKmApJUCAAAECBAgQIFC6gABR+gTonwABAgQIECBAgEAFAQGiApZSAgQIECBAgAABAqULCBClT4D+CRAgQIAAAQIECFQQECAqYCklQIAAAQIECBAgULqAAFH6BOifAAECBAgQIECAQAUBAaICllICBAgQIECAAAECpQsIEKVPgP4JECBAgAABAgQIVBAQICpgKSVAgAABAgQIECBQuoAAUfoE6J8AAQIECBAgQIBABQEBogKWUgIECBAgQIAAAQKlC7RFgGgM1tNTq6W7tz8j0+3RxuHUe7pT696e/pHGNFWvZbC+NrXasvT2H5umJmn37YVVErPQ+gVo91nXX2snn4vPjWZv7B+gc3LfeG703Dh+eGQ+T/yavm3HoOOuc+RLrdlsNmu1WprN5hx5yB4mAQIECBAgQIAAAQKzJTA1K7TFKxCzhWc7BAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShcQIEqfAP0TIECAAAECBAgQqCAgQFTAUkqAAAECBAgQIECgdAEBovQJ0D8BAgQIECBAgACBCgICRAUspQQIECBAgAABAgRKFxAgSp8A/RMgQIAAAQIECBCoICBAVMBSSoAAAQIECBAgQKB0AQGi9AnQPwECBAgQIECAAIEKAgJEBSylBAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShcQIEqfAP0TIECAAAECBAgQqCAgQFTAUkqAAAECBAgQIECgdAEBovQJ0D8BAgQIECBAgACBCgICRAUspQQIECBAgAABAgRKFxAgSp8A/RMgQIAAAQIECBCoICBAVMBSSoAAAQIECBAgQKB0AQGi9AnQPwECBAgQIECAAIEKAgJEBSylBAgQIECAAAECBEoXECBKnwD9EyBAgAABAgQIEKggIEBUwFJKgAABAgQIECBAoHQBAaL0CdA/AQIECBAgQIAAgQoCAkQFLKUECBAgQIAAAQIEShcQIEqfAP0TIECAAAECBAgQqCBQS9KsUK+UAAECBAgQIECAAIECBZrNE7Hh/wPa6iPrDbQ6wQAAAABJRU5ErkJggg=="></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>Describe how mild analgesics function.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>In recent years several antiviral medications have been produced. One of these medications is oseltamivir (Tamiflu).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the functional group circled in the structure of oseltamivir.</p>
<p><img 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1jn/c23CAsCCCCAAAIIIIAAAggggAACWRb4VJavx+UQQAABBBBAAAEEEEAAAQQQ8AsQkFIREEAAAQQQQAABBBBAAAEEciJAQJoTdi6KAAIIIIAAAggggAACCCBAQEodQAABBBBAAAEEEEAAAQQQyIkAAWlO2LkoAggggAACCCCAAAIIIIAAASl1AAEEEEAAAQQQQAABBBBAICcCBKQ5YeeiCCCAAAIIIIAAAggggAACBKTUAQQQQAABBBBAAAEEEEAAgZwIEJDmhJ2LIoAAAggggAACCCCAAAIIEJBSBxBAAAEEEEAAAQQQQAABBHIiQECaE3YuigACCCCAAAIIIIAAAgggQEBKHUAAAQQQQAABBBBAAAEEEMiJAAFpTti5KAIIIIAAAggggAACCCCAAAEpdQABBBBAAAEEEEAAAQQQQCAnAgSkOWHnoggggAACCCCAAAIIIIAAAgSk1AEEEEAAAQQQQAABBBBAAIGcCBCQ5oSdiyKAAAIIIIAAAggggAACCBCQUgcQQAABBBBAAAEEEEAAAQRyIkBAmhN2LooAAggggAACCCCAAAIIIEBASh1AAAEEEEAAAQQQQAABBBDIiQABaU7YuSgCCCCAAAIIIIAAAggggAABKXUAAQQQQAABBBBAAAEEEEAgJwIEpDlh56IIIIAAAggggAACCCCAAAIEpNQBBBBAAAEEEEAAAQQQQACBnAgQkOaEnYsigAACCCCAAAIIIIAAAggQkFIHEEAAAQQQQAABBBBAAAEEciJAQJoTdi6KAAIIIIAAAggggAACCCBAQEodQAABBBBAAAEEEEAAAQQQyIkAAWlO2LkoAggggAACCCCAAAIIIIAAASl1AAEEEEAAAQQQQAABBBBAICcCBKQ5YeeiCCCAAAIIIIAAAggggAACBKTUAQQQQAABBBBAAAEEEEAAgZwIEJDmhJ2LIoAAAggggAACCCCAAAIIEJBSBxBAAAEEEEAAAQQQQAABBHIiQECaE3YuigACCCCAAAIIIIAAAgggQEBKHUAAAQQQQAABBBBAAAEEEMiJwPk5uSoXRQABBBBAAAEEXCHQIS17npYj7x+XZ+sa5c0uc6bypXDMHXLHiEuk+NqJMqqol/lL1hFAAAEEfALn/c23IIEAAggggAACCCCQiIAvEG2sk1VLd4UEodHOocHpLFmzbBaBaTQitiOAgCcFCEg9WexkGgEEEEAAAQSSFehu2y/Lv79Idh/7MPFT5A+VKT++X1aXF0le4kdzBAIIIOA6AQJS1xUpGUIAAQQQQACBTAl0tzVK9dRlcqDd1DfXF2ROmjtOvvXtm+SWkv7nLt3dJs07fyWvv/xzqT94+tx2GSDldQ/L1gnFBKUmFVYRQMCbAgSk3ix3co0AAggggAACiQp0viIbps2Q+kDLaB+54rZauf/eChlo2dzZLZ0tO2T+rI3SFAhkL5VJOx6X2tEXJpoK9kcAAQRcJUBA6qriJDMIIIAAAgggkBmBj6Vl/XiZuO3tntMn3soZ1rpaOFUanr9XRhVYRrOZyQ5nRQABBGwiwGtfbFIQJAMBBBBAAAEEbCzQ8bz8uMEIRn0TFE1eLrUJdrnNK5osWx+dLyX5Pflsf0JW1r8h3TbONklDAAEEMi1AQJppYc6PAAIIIIAAAg4X8LWONtRLkzFsNH+kzF04WgqSyFVe8TipHn9pz5FdcvqZX8sxItIkJDkEAQTcIkBA6paSJB8IIIAAAgggkCGB03Lk5T8Ezp1fdoNc0z/ZbrYXStnUG33TGvUsp5vkwLGPjU/8RAABBDwnQEDquSInwwgggAACCCCQkEDHv8lrb33Sc0iBlFaMENNcugmdSnfOG3qtjB1g9Nv9g/zmd+YZeBM+HQcggAACjhYgIHV08ZF4BBBAAAEEEMi4wF865H2ju658UQZflkxnXVMq8y6WQV/5XM+GT+TEiT9J4PSm3VhFAAEEvCBAQOqFUiaPCCCAAAIIIJC0QFfbSTkROPrz0q/AaN0MbExw5bPSt3+vwDGfHD8pfwp8YgUBBBDwlgABqbfKm9wigAACCCCAAAIIIIAAArYRICC1TVGQEAQQQAABBBBAAAEEEEDAWwIEpN4qb3KLAAIIIIAAAgkKfKpvP/lCgsdY7/6xnOkwJkkS6TVkkHzZ+gC+RQABBFwrQEDq2qIlYwgggAACCCCQDoG8vx8slweGjZ6Q146+n9ppu/8sJ3//155z5MsX+l8g3JClRsrRCCDgXAF+/zm37Eg5AggggAACCGRDoP8IubHMmFm3Uw7vf1U6Urhu97Ffy3OnjXl1i2TsdV+VZN9qmkIyOBQBBBCwhQABqS2KgUQggAACCCCAgH0FLpJrKq4Uo5G069Dz8lJHd5LJfV8O7fqlBN48Wjhcriz6dJLn4jAEEEDA+QIEpM4vQ3KAAAIIIIAAAhkVyJP+I2+Q0kBE+qLUrW+SziSu2d26T7bufbfnyHwZMH6ClBXQPpoEJYcggIBLBAhIXVKQZAMBBBBAAAEEMijQv0IWLRjR00raJe2Nc6Vy+3FJpJ20u61Rqm/fKC1Gb93CibJyxjforpvBYuPUCCBgfwECUvuXESlEAAEEEEAAgZwL9JLi6Stk3rA+PSn5UFrWTpYJS/bLqZhRabd0tmyXmVOXyYF2Ixq9VCbVzJFRtI7mvGRJAAII5FbgvL/5ltwmgasjgAACCCCAAALOEPC3cgYFlr50F46RGXeOlCuvnSijinqdy0h3mzTv/JW8/vLPpf5gYNSo7/sBUl73sGydUEzr6Dkt1hBAwKMCBKQeLXiyjQACCCCAAAJJCnS+IhumzZD6Yx8mfoL8oTLlx/fL6vIigtHE9TgCAQRcKEBA6sJCJUsIIIAAAgggkGmBDmlprJNVS3fJm0YvXMtL5vsaUmfJmmWzgltRLY/hSwQQQMD9AgSk7i9jcogAAggggAACGRPwBaZ7npYj7x+XZ+saQ4JTDULvkDtGXCLFod15M5YeTowAAgg4S4CA1FnlRWoRQAABBBBAAAEEEEAAAdcIMMuua4qSjCCAAAIIIIAAAggggAACzhIgIHVWeZFaBBBAAAEEEEAAAQQQQMA1AgSkrilKMoIAAggggAACCCCAAAIIOEuAgNRZ5UVqEUAAAQQQQAABBBBAAAHXCBCQuqYoyQgCCCCAAAIIIIAAAggg4CwBAlJnlRepRQABBBBAAAEEEEAAAQRcI3C+a3JCRhBAAAEEEEAAgSwJFA8sCrtS66m2sG3GhtD9rfY1juEnAggg4AUBWki9UMrkEQEEEEAAAQQQQAABBBCwoQABqQ0LhSQhgAACCCCAAAIIIIAAAl4QICD1QimTRwQQQAABBBBAAAEEEEDAhgIEpDYsFJKEAAIIIIAAAggggAACCHhBgIDUC6VMHhFAAAEEEEAAAQQQQAABGwoQkNqwUEgSAggggAACCCCAAAIIIOAFAQJSL5QyeUQAAQQQQAABBBBAAAEEbChAQGrDQiFJCCCAAAIIIIAAAggggIAXBAhIvVDK5BEBBBBAAAEEEEAAAQQQsKEAAakNC4UkIYAAAggggAACCCCAAAJeECAg9UIpk0cEEEAAAQQQQAABBBBAwIYCBKQ2LBSShAACCCCAAAIIIIAAAgh4QYCA1AulTB4RQAABBBBAAAEEEEAAARsKEJDasFBIEgIIIIAAAggggAACCCDgBQECUi+UMnlEAAEEEEAAAQQQQAABBGwoQEBqw0IhSQgggAACCCCAAAIIIICAFwQISL1QyuQRAQQQQAABBBBAAAEEELChAAGpDQuFJCGAAAIIIIAAAggggAACXhAgIPVCKZNHBBBAAAEEEEAAAQQQQMCGAgSkNiwUkoQAAggggAACCCCAAAIIeEGAgNQLpUweEUAAAQQQQAABBBBAAAEbChCQ2rBQSBICCCCAAAIIIIAAAggg4AUBAlIvlDJ5RAABBBBAAAEEEEAAAQRsKEBAasNCIUkIIIAAAggggAACCCCAgBcECEi9UMrkEQEEEEAAAQQQQAABBBCwoQABqQ0LhSQhgAACCCCAAAIIIIAAAl4QICD1QimTRwQQQAABBBBAAAEEEEDAhgIEpDYsFJKEAAIIIIAAAggggAACCHhBgIDUC6VMHhFAAAEEEEAAAQQQQAABGwoQkNqwUEgSAggggAACCCCAAAIIIOAFAQJSL5QyeUQAAQQQQAABBBBAAAEEbChAQGrDQiFJCCCAAAIIIIAAAggggIAXBAhIvVDK5BEBBBBAAAEEEEAAAQQQsKEAAakNC4UkIYAAAggggAACCCCAAAJeECAg9UIpk0cEEEAAAQQQQAABBBBAwIYCBKQ2LBSShAACCCCAAAIIIIAAAgh4QYCA1AulTB4RQAABBBBAAAEEEEAAARsKEJDasFBIEgIIIIAAAggggAACCCDgBQECUi+UMnlEAAEEEEAAAQQQQAABBGwoQEBqw0IhSQgggAACCCCAAAIIIICAFwQISL1QyuQRAQQQQAABBBBAAAEEELChAAGpDQuFJCGAAAIIIIAAAggggAACXhAgIPVCKZNHBBBAAAEEEEAAAQQQQMCGAgSkNiwUkoQAAggggAACCCCAAAIIeEGAgNQLpUweEUAAAQQQQAABBBBAAAEbChCQ2rBQSBICCCCAAAIIIIAAAggg4AUBAlIvlDJ5RAABBBBAAAEEEEAAAQRsKEBAasNCIUkIIIAAAggggAACCCCAgBcECEi9UMrkEQEEEEAAAQQQQAABBBCwoQABqQ0LhSQhgAACCCCAAAIIIIAAAl4QICD1QimTRwQQQAABBBBAAAEEEEDAhgIEpDYsFJKEAAIIIIAAAggggAACCHhBgIDUC6VMHhFAAAEEEEAAAQQQQAABGwoQkNqwUEgSAggggAACCCCAAAIIIOAFAQJSL5QyeUQAAQQQQAABBBBAAAEEbChAQGrDQiFJCCCAAAIIIIAAAggggIAXBAhIvVDK5BEBBBBAAAEEEEAAAQQQsKEAAakNC4UkIYAAAggggAACCCCAAAJeECAg9UIpk0cEEEAAAQQQQAABBBBAwIYCBKQ2LBSShAACCCCAAAIIIIAAAgh4QYCA1AulTB4RQAABBBBAAAEEEEAAARsKEJDasFBIEgIIIIAAAggggAACCCDgBQECUi+UMnlEAAEEEEAAAQQQQAABBGwoQEBqw0IhSQgggAACCCCAAAIIIICAFwQISL1QyuQxNwJt22XcwCIp9v+bLA1tXQmmo1OaF1zVc3yRfG1BsyR6BssLBqWvSIbcsl1auy2PCPmyS05tn5y59IVcjY8IIIAAAggggAAC7hMgIHVfmZIjBJIS6Dq6RRbuOC4JxaRJXYmDEEAAAQQQQAABBBA4K0BASk1AAIEegQ+lZcMq+WnrJ4gggAACCCCAAAIIIJAVAQLSrDBzEQQcItD1qmya/7MEu+46JG8kEwEEEEAAAQQQQMB2AgSktisSEoRAbgXouptbf66OAAIIIIAAAgh4SYCA1EulTV4RiCbQ6x9k0rhLe76l6240JrYjgAACCCCAAAIIpFeAgDS9npwNAYcKfEmuX7pUJhXmn00/XXcdWo4kGwEEEEAAAQQQcJYAAamzyovUIpA5gYLRsqhmohT2XIGuu5mj5swIIIAAAggggAACZwUISKkJCCDQI5AnBaPnyJrJdN2lSjhH4L333nNOYkmppwRaW1s9lV8y6xwB6qZzysorKSUg9UpJk08E4hK4UEYtoetuXFTslFOBw4cOS/mYMXJ9ebk0bN+e07RwcQTMAi0tLf66OWHceH/d/Oijj8xfs45AzgTa29ulcvqdMvOuGbJqxUrRzywI2EHgfDskgjQg4H6B12XdqMtlnRMy2tN19/D0XaJ/qs523S2Vx6qGSJ4T0k8aXS1w8sRJqV23TpqbmgL5XLe2Rh7bvVuW+26wSstKA9tZQSDbAnqzH6luzrlnbraTwvUQCAjoQ5GH6h+SrVu2+LddVlwsj+zcKc8887TMnDVLpkydKr179w7szwoC2RaghTTb4lwPAdsL0HXX9kXkwQTqDZU+0dcWUfMNv0HxTus78r1p0/xP/3nqb6jwM9sC0erm7OrqbCeF6yHgF3hs92MysqwsEIyaWc58cEb0gd74m2+W/c/tN3/FOgJZFSAgzSo3F0PAKQJ03XVKSXkhncYNlT7RD10u+PwFQZs0ILh6xFVyX919QlfJIBo+ZFnggguC62aWL8/lPC6gXccnTZggSxYtEg08zUufPn3MH0Uf6OlDE23h114oLAhkW4CANNviXM+jAlfK4ua3pfVUWwL/WqRhsjHnrRVbt3S27JP6BTfLkIFFUmz8G1EpG7bvk5bObquDo38XNuvuo7L9pfej7883CKRZwBiLF+mGatTo0fLyq6/I4Zdflmnf/W7YlbVrmrYKaDDLgkC6BbRuRlu0br5w4IAc/s3LUj17drTdGPscVYYvUhHQHiJz58yRieNvkaNHjgad6rLiy2TL1q3y5L69/p99+/UN+l4f6GkvFO2NwgO9IBo+ZFiAgDTDwJwegYwKdLfJr5fcIiPGz5ENjceky3yx9oNSv9b3R+mGH8iTbZ+Yv4lzPbTr7rvy+JLN0pxsgBvnVdkNAWPiDb2h0if35kVvqB5+5BFp2PETKSws9I97WrFqpT8A0EDAvGirgAazOvmRVQBhPoZ1BKwEzDf7kfbTm32tm4MGD/LXzXvm3uN/cBJaN/VY7SqpdVMn6GJBIFUBDSB1gjftIbJv776g02nguXjpEtn71FNSMbbC/53+fPHQoYgPTbQ3ij7QY8K4IEY+ZFCAgDSDuJwagcwKfCKtO5bI3b/QQLSPXDF5nTzxxsmeFtjfyRMbpsoV+b4UtD8r86euTjKQDOm62/6ELKtpks7MZoyze1RAb6i0q63eUIWOxTNuqA4cPBhx4iINADQQ0GBVg1bzokGtBrfaasD4UrMM6/EKxHOz/z//7c3Azb75vPrgROvmE3ufjFg3jbHPdJU0q7GeiICO/9QAUh9yhC7ag+TZ/fulsqoqbOIincgo2kMTY3wpD01CRfmcCQEC0kyock4EsiHQsV9qN7zqD0ZLljbKng1TpKTAmAe3v5RMrpE9zy+REn9Q+kv5xcEk39dYUCpVdw4XPY1vzl1pb1wrtU103c1GEXvpGsYNlTELpDnvekOlT/L1hirWorPsatCqrQGh3dG01UCDXX3qT3e0WJJ8bwho3dRJXyLd7I8bPy7qzb5xvPGzpKTEXzdramvD6iZdJQ0lfiYiYIwT1fGfoeNEtVVeH4JoDxJ9KGK1GA9Noj3Q46GJlR7fpUOAgDQdipwDgRwIdP3P1+Q32kc3f4TcdsvgiK9kySseK7eVFfh26pTfvPb74C69cae5lxRPXyHzhhmTINB1N246dowpEO8NVaKvJNDgVYPYSONLNbDQ1gRmlYxZPJ7eQeumTvKiN/uhXceHDR/mv9mv27w55s1+KOKtU26NWjeNrpKMfQ5V47NZQHt66DjPSONE9UGc0XVcH4Ikslg90DMemjBhXCKi7BuvAAFpvFLsh4DNBD5VdIPM87UCLV48VYYFWkZDE/lZ6du/l39jd8cZ+Uvo1/F+zhsid2ycfba1VY/p6bobPG9fvCdjPwR8VSiOiTe0m2OiN1RmWw1itXVAWwlCx/Bpa4IGGjoLJeNLzWqsa+u5cbMfqeu43uw/vmdPWuqmTn4UqW4y9pl6GEnA6Dr+nYoK/3tEQ/fRniH6IM4YJxr6fbyfrR7oMWFcvIrsl4gAAWkiWuyLgI0E8opGyR2+VqDK6aNkoNFTNzR93a3y+m86fFvz5aLLLxVtK012ySv+J1m/YISp6+69suqZPyZ7Oo7zqID5hiqeiTfSwaRBrQa3GkiEji/VWSi1lUEDEMaXpkPb2efQ7tzaeh7pFUPputk3C8Uz9llbaambZjVvrpu7jod2z9Wu4zrreKRxoslqxXqgx0OTZGU5LpIAAWkkFbYh4AoB3+tgXtojT53Wfr1FMva6r0bs1ht/VkO77rbLm8fa4z+8Z0+dUZIxfAmzueKAWDdU0SbeSFfmtdVAZ5mMNL5UAxBtdaBupkvbWefR30s6eYt25w692dcWzHTf7IfqxOoqybt1Q8W88zlTXcfjFbR6oGdMGMdDk3g12S+aAAFpNBm2I+Bwge7WHVI5Y5doyJg/bKJMGPrZ1HMU2nU3iTOu9nWhZAxfEnAOPiTXN1RmOn3qr60IGvxqq4J50UBE66ZOYMP4UrOMe9d1Zlu9mdZJW0LHiWprunb31tb1WJPCpEvIqJuRxj7TVTJdys44T6yu4zo5VqpdxxORMD/QCz1Ou7YzYVyoCp8TESAgTUSLfRFwiEB3W6NU375RWrRxtPA7UlP3T1IcrVtvgnkK7rqb2ME6UYdx08cYvsTsnLh3rBuqdIzFS9ZFAwydkEYDDp2gxrxoHdXxpRqo8CoOs4x71rVu6uQs15eXR3zFkN7s62zNqYxhTlZL66bV2GftKsnY52R1nXGcVdfx6tmz/eNEdXKsbC/GAz3tMRD6QE/TwsPmbJeIe65HQOqesiQnCPgEfN10W7bLzKnL5EC7Lxr1zcC7+NGNckvR2YmN0kMU2nU3sbOGvoqDMXyJ+Tll73huqFKdeCMdFhpwaCuDBsehddOYVVLHl2oAw+IOAX0wpuNErV4xlIub/VBdc1fJ0Lpp/N7k3bqhas7+HE/XcX1vqAaGuVzMD/RCx+XzsDmXJePcaxOQOrfsSDkCIQKfyKkDa+R7vvePNmkw6msZ3firn0plcTqD0Z5LJtl1N9brDhjDF1KkDvzolBuqUFoNjnV2Sh1fGroYr+LQIJvFuQLadVzHiWoLY6RxojrjrbZM5vpmP1TYqm7ybt1QLWd+tlvX8XgV9aGJ9iSI9G5dHprEq8h+KnDe33wLFAgg4HSBDmnZvljuXnvAP2bUH4zuSnfLaHqN9OZw65YHwrrL6VX0ietyX6uUTvTB4gwBvaGqXbcuanlu2LQpJ90fk9HTGU2XLVnqirwkk3+3HROrPJ30u0bzsnH9egmdoVrLTFtRV9+7JuVXfrit/O2cH+15UbdxU8RZnbU85y9YKHZorY/HUPPyUP1DEXseaF5mzpolU6ZOtd0Dn3jyxj6ZFyAgzbwxV0AgwwIdcmR9ldy+rUV87aKSP/RuefSRH8jwqO8mzXByEjy9Th6z+b66wNhS8+E6u+WixYtFX43AYk+BWDchTrqhChXWhyYL5s2LWjfX1KzN2mQ3oWnjc2wBrZu7d+3yj2sL3du4QdZJhJy4aN2sWbNGtBUqdNEx0UuWLXPMA6DQ9Hvls3Yd37hhfVhrveZfJ7WaO3+eI4O3WA8n59wzl4cmXqnkCeSTgDQBLHZFwH4C5mA0XwqvWyOPbpsc/b2k9suAP0XGjeOD27a57o+zTcnTkiy33lCF4ljlUycYuWvGXY68cQzNp5s+64Ou5T9cFvX3yYxZM13xMMGqbmpQ45Z8uqluxnrQ5ZaHsDp8Q2fVNyYyNJehPmyunn03D03MKB5fJyD1eAUg+04W+ERat98hY9e+6msZdW4wai4B7Y5Wv+1BV3RfMufLbeteuaEyl5ubW4LN+XT6ulXLoVtvgmPVTbpK2qNWu6nreCKiOvaeh82JiHlzXwJSb5Y7uXaBQHfrdrn1hhrfq13cEYyai8TqplLHlzppPKI5X05f9+oNlbncrAzoKmmWyu66lovXx1Za1U39vUlXyezWSeNq8TwwcGrXcSOPsX5q3bR62KwPTdxuEMvI698TkHq9BpB/hwp8LC3rx8vEbW/Hn/6hS+Tg01UyMP4jcr6nVbc7be1gDF92isjoUq3vmAtdjLF4Xpuswqo7mr6fb/7Cha7oEhpa3nb7bNTNaC0wOmsydfNcqbm1lfhcDu21Rpfq4PKI9bDZSROMBeeMT6kKEJCmKsjxCORE4G1puOlmWXfsk/iv7sCAVDNn3HBGCob0ey/ecGq+s7VYPRRgjJqIVXc06mZma6nVhGg8FLCum06eNCeztSo9Z7cKvHgoIGL1d0V93DKONj21yRtnISD1RjmTSwQcL0CXvOwWITdU8XvrQxOrVzfwKo74LePZ02oWT7pNBwvGqpt0lQz2SvWT1d8puk0H68Z62MxDk2Avt38iIHV7CZM/BFwmYBUocTOaemHHGutDcBXd2CpQolUkulu838QKrpz8iqF4DZLdz6pu8t7nZFXPHWcVXHl1WMM5Hes1/ZsT7b3Pasf/19Z+bvmWgNQtJUk+EPCYAGNz0lvgxg0VY/FSd7XqSko35+R8rbpG8+qd+E2t6iZdJeN3NO9p1f2UruNmKet1fdgc7b3PTGZobeeGbwlI3VCK5AEBjwpoEPVQ/UOydcuWMAGeSoeRRN1gdZPKDVVUNssvrAJ8o24yq6Qlof9Lq8mjNIBiYrPYhqF7WNVN3ZeukqFikT/TWyeyS6pbrR428/98qrr2PZ6A1L5lQ8oQQCBOAasuP3RHi44Yqxsfr9eJbhfvN1ZdoKmb0RX5fzq6Tbq+saqbdJWMrhzLjWEN0e3i/UYfmkQbl6/noFdEvJLO2Y+A1DllRUoRQCCGgFWXH7qjncOz+mPPjeg5p3SuWbWmUDfPSWvdjNXrgZblc17pWLOqm3SVPCccq2WZWbXPWaVrzeqhqf6tIvhPl3Tuz0NAmvsyIAUIIJBmAasuP17vjsZYvDRXtgRPZzXezOt1k/9vE6xMad7dqm56vauk1bAGr9ukuRpGPJ2VP5MZRiRz3EYCUscVGQlGAIF4BGK1AnrtdQeMxYun1mRnH6OlJdK7db3YQk3PhuzUu3iuYlU39XivdZXUurl1ywPS3NQUxkfrcRhJRjcYdTPaxHvMd5BR/oyfnIA048RcAAEEcilg1eXHCzcUjMXLZe2zvraWzcb162Xf3n1hO3qlblrlf849c6VibEWYDRsyL2D1e8MLD01iPdDkVSSZr4PRrmD1e1OPoet0NDl7bycgtXf5kDoEEEiTgNdaCPWGirF4aao8GT6N1Rg+N3YHNFo6orUQa++FKVOnSu/evTMsz+ljCVi1Xru1qyTDGmLVCnt8b/V7Ux/o8UDLHuUUbyoISOOVYj8EEHCFgBduNhiL58yqalVubukqaTVOkS539q23VnXTLeUW66HlosWLZdDgQfYtJI+mzOp3ij7Qq559t5SUlHhUxznZJiB1TlmRUgQQSJNArO5YTp25z+qJMX+Y01R5MnyaWC3bTq6b0cbiubWlLcNVJeunt6qbmhindpWMNaxj+YqVUlpWmnVvLhi/QKy6qRPGzZg1UwoLC+M/KXtmVYCANKvcXAwBBOwkoAGcG26SrcbU0HXJTjUu/rRYjeFzUgCn+ajf9qA8snNnWOZ5bUMYiSM2WAVwTirTWA8mvTbxnSMqX4xEWv3e1LpJmcYAzOHXBKQ5xOfSCCBgDwGrKeXt3B1Nb6h279oljMWzRz3KRCqsxvA5oW5GmxHTqa1pmShjp57Tqour3R+aWHVB9vrrl5xaH83ptqqb+pCWVm+zlj3WCUjtUQ6kAgEEcixgBHeRbqCNJ6t2mmjFatyMnQOVHBezYy9vNfbZbsGd1c2gGydpcmylSlPCreqm3bpKWj3g0brJONE0VQqbnMaqblLeNimknmQQkNqrPEgNAgjkWMCqi6Edur+6pZtxjovZkZe36mJoh7pp1ZVT07dh0yYmF3FkzYudaKvfm3Z4oGfVldMO/+/EFmaPZAWsfm/qOWkRT1Y2vccRkKbXk7PlRKBDWvY8LUfePy7P1jXKm13mRORL4Zg75I4Rl0jxtRNlVFEv85esIxBVQAO/mjVr5OiRo2H75OLJaqwbPqdOdhOGy4aYAlaBn9bNbM8qaXXDp8EI72yMWaSu2SHWA7PH9+yJI6/p/Zuu/79cX14edl07BMphiWJDxgSs6mZiv6es6mcfuWJylXxn8CUyfNL/kJKCvNj5adsu40bVyJv+Pa+Uxc2PSmVRfuzjAnt0SvOCG6Wysd2/pdfkHfLGhlGSyBkCp8rhCgFpDvG5dKoCvl8KjXWyaumukCA02nk1OJ0la5bNIjCNRsT2MAGrrrHZeLJq1ZVYE+uW14GEwbMhpoBV19hs1E1NoFWXuGylISYUO2RdINK4fO1aXllVZZGWzP1Nr5x+pzQ3NQWurXWTWVcDHJ5aiVQ3FSBm/exuk+YdD8qPNoQ2fETjGyCj714uS+eUy0CruJSA1A9IQBqtHrHd1gLdbftl+fcXye5jHyaezvyhMuXH98vq8iKx+h2R+Ik5wq0CRlBoNXmQ9Y1WcjJWAYe2hK2pWcs09snRuuYoo25ajX3ORN3U1oYF8+bJO63vhFnmogdBWCLYkHMBo27q701tgXrx0CHp3bt3xHRl+m+60Upq98mWIuKwMe0C5rqpJ9du23ufeioj9TN/6PfkgR8tlGuj9dAjIPWXLwFp2qs5J8y0QHdbo1RPXSYH2k19c31B5qS54+Rb375Jbinpfy4J+kRr56/k9Zd/LvUHT5/bLgOkvO5h2TqhmKDUpMKqtYB2m924fr3s27svbMd0jpGz6pKZzuuEZYINjhWw6tKtdSZds0rGGouXrus4tiBIeJiA1pkTb5+I+i7PbP1N19+rgwYPCksfG7wrYPxNHzf+lsTqZ+EYmXHnSLkydCiY/57zWXlh33Z53NxgUjhVGp6/V0ZF6sJLQOqvgASk3v3/0Jk573xFNkybIfWB/9F9/fVvq5X7762w7hIh3dLZskPmz9ooTYFA9lKZtONxqR19oTMtSHXOBGKNL0225VKf2tZt3BT1nY2MxctZkTvmwlbjpFJpudS6+VD9Q7739m4JszDG4mWiJTbsYmxwlwB/091Vnm7LTecBWXRDtTweuG/0dcNder9srBouBZZ57ZAj66vk9m0tcrbpxDdkbPJWeW5DefhxBKR+yU9ZevIlArYS+Fha6leaglFt5dwre2piBaOaiTwpKKmSB3etkfJCY6j3u/L4ks3S3Nltq1ySGPsLlJSUiE7OUVNb6++KZk6xjlO6esRVcl/dfaI38fEuOhZvZFlZxGBUxztpd7dbp9wa7+nYz6MCWjcbdvxEtmzd6u+GZmbQuqmTuyRaN/WdjVo3IwWjWjef3b8/xthAcypYR8AQ4G+6IcFPOwpo/dwUFIxqz7oHYwajmpf+MnxhvWybfGlPxrqkvXGTPNTysR0zaos0EZDaohhIRFwCHc/Ljxve7tlVnzYtl9oEu9zmFU2WrY/OlxIjJm1/QlbWv+FrP2VBIHEBDRA1UNSJhUIXvXnXm3idQMFq0Rat8jFjRMdZnfngTNCu2qL1woEDsmLVyqhjW4IO4AMCPQIVYyv8Y6J0oo7QxaibGmhaLVo3J02YIEsWLYpYN5/Y+6S/bhYWFlqdhu8QiCzA3/TILmy1h0DK9fNCGbVkqUwKNIK0yXO/eov7zSilS0AaBYbNdhPwPalqqJcmY9ho/kiZu3B0eNeHOJKdVzxOqsefe2p1+plfyzEi0jjk2CWSgE7Scc/ce+TlV18RDSDNiwaYs6ur/Tf1enNvXnTsis78ONE3diV0Yhgd8/fwI4/4W7oY82RWYz0RAa2b2o1W6+a48eOCDtW6qYGmPgyJVDfnzpnjr5uhrz3S7rna+qqtsNoay4JAcgL8TU/OjaOyI9AtHS8+L4cD95zD5Y4ZpYnfcxaUysyaWmlofktaT70tLy0czrwlUQqQgDQKDJvtJnBajrz8h0Ci8stukGv6JztH7oVSNvVG37RGPcvpJjlwjG4UBgc/kxPQViK9SddWIw0ozYve1GvgqTf5ra2t/i6T2q3X/BoC3V9v9rVFS2f7Ky0rNZ+CdQSSFtC6Wbd5s79u6iyj5kUfhmjd1IcjWje167jWzUgTd2nd1B4B2vrKgkBqAvxNT82PozMr8J68tP/1nvGfIvllk2R8cTLvse8lA0ffwqsG4ygsAtI4kNjFBgId/yavvfVJT0IKpLRihK+HfvJL3tBrZewAo9/uH+Q3vzPPwJv8eTkSAW01OnDwYMTxpXqTP/OuGTHH4kV7NQK6CKQiYIx91hZOffhhXvThiNbNSK820tZVbWXV1lbqplmN9aQF+JueNB0HZkGg6/fy25c7ey7US4aM+HpK95xZSLHjL3G+43NABrwh8JcOed/oOiFflMGXWc9vFhMl72IZ9JXPiZzWXzifyIkTf/I9CbtcjBA15vHsgEAMAR1fOvY7Y8Nmzf2v//qvoCN5L14QBx+yIKAtnGXXlIXNmkvdzAI+lzgrwN90aoKdBU6flONGG4ivo+6Q4i9mKbWvy7pRl8u6LF3NTpehhdROpUFaogp0tZ2UE4FvPy/9ClINHT8rffuf637xyfGT8qfA+VlBID0C2pqkExLpxEQ6vvRLX/6ynP7jH/0/L7jgAv9YPJ2tl7F46fHmLPELaN00j32+6KKL/HXzosKLROumziBN3Yzfkz0TE+BvemJe7J1LgQukX9+/y2UCPHFtAlJPFDOZRACBXAroxEQ6vvTf/3T2sYf+rJ59N2PxclkoXNsvYIx9fu+99/yf32t/z183ecUQFQQBBBBQgXQ0giAZS4Auu7GE+B4BBBBAAAEEEEAAAQQ8KPBHOdn2V5GiFIeKxSV3pSxuflQqixLpBdgpzQtulMrG9riuYNedaCG1a8mQriCBT/XtJ18I2pLqh4/lTEdggID0GjJIvpzqKTkeAQQQQAABBGIK8Dc9JhE75FLggv5yYSIxYS7TGve1u6WzZZ/UL7hZhgwskmL/v8vl6jvXyU+b2nL+flQC0rgLkh1zKZD394Pl8sAvhxPy2tH3U0tO95/l5O99T7z8S758of8Fwv8MqZFyNAIIIIAAAvEI8Dc9HiX2yZlAwaUy+CLjprNDXnm9NfmArfOYNLd05CwrZy/cIUfWT5IR4+fIhsZjgdfZiG+t/eBDsmb69VJ2V6Oc6s5dMrkHz509V05EoP8IubHM6C7RKYf3vyqp/O/dfezX8txpY9reIhl73Vd5WXEi5cG+CCCAAAIIJCvA3/Rk5TguGwLGmxj81+qS995+V/SdDIkv3dJx8AGZNf6bvhZJX2tkToI+X8toU53887YWX/jZR664bascbG2T1lO+f61N0nD3GCnUwPRXa2TejuPJB96J4wQdQUAaxMEH+wpcJNdUXBl4LUvXoeflpY5kH+W8L4d2/VICbx4tHC5XFn3avlknZQgggECCAme7YxndsooSPJrdEci0AH/TMy3M+VMRCK2fj8ve1nPDvOI/83vy0v7Xe1oku6Sj+3zpkxf/0WnZs/sNeWj5E9Luu4MunFwnD9dUyEAjDXlFMmrev8gDsy73XepDadn5lBxL9tY6xcQSkKYIyOHZEsiT/iNvkFKjB0XXi1K3vimpJ1bdrftk6953exKeLwPGT5CyAuP/zmzlh+sggAACCCDgVQH+pnu15J2Rb1/9HDNJxhX23HR2HZGf1h9O+J6zu+Vn8qODRttqgZRWjJD+2Qb4w1H5jb9HYJHcPPVq31tVQ5fPytev/Ib4X4T4vz+Qzv8b+n12PhOQZseZq6RDoH+FLFowoqeV1Ne9oHGuVG5PrHtBd1ujVN++UVqM3rqFE2XljG/QXTcd5cM5EEAAAQQQiFeAv+nxSrFfLgQKSqXqzuGme87VsmhPAmNJO1+RuhWPmnrj3Si3jbko+zkpqpJ92j331AuyoOSzEa7/vvzr86+Jv/33C/2kIEeRYY4uG8GDTQjEFOglxdNXyLxhfXr29HUvWDtZJizZH8dAbJ1dbLvMnLpMDrQb0eilMqlmjoyidTSmPDsggAACCCCQXgH+pqfXk7OlVyC0fp6WA3O/JzO3H4nZUtrdtl+WTpsh9cc+7EmSHe83jVl3K2VWo/Ya9KVx9XQpyVGHQQLS9NZezpZpgbwhckfdMik3ulH4+ry/+YtqGXN1pWzY/nNpbgvp49/dJs076mXDnSNl+PgaaQoEowOkvO4nsnb0hZlOMedHAAEEEEAAgUgC/E2PpMI2uwho/dw4W0qM4WK+9s6mtRNlxE0LpX77PmnpNA+4PBvgNayvlLJR1bI7EIzq2M2lssg295v63tKrfJMsDfLdF5+ddVeGTpXavXukNodpPN8uZU46EIhXIK9osjz4/CWywfz0qf2g1K/Vfz+MfZr8oTLlx/fL6vIiuurG1mIPBBBAAAEEMibA3/SM0XLiNAjkFU+XhkaR+bM2Bho1uo41ygbfP1k7J8YVdFbbWrn/3vIIYzdjHJqxr/9DWo8b41rPXqTr2C754YpPS98fLZRri/yjSTN29WgnpoU0mgzb7S1QcJUseLpZntgwVa4IPLmKlWTfU6ox/ywNv3pM1hKMxsLiewQQQAABBLIjwN/07DhzlSQE8qSgpEq2P/+Y1E4eGnjbQ8wTFY6R6h1PyR7zrLYxD8rGDpdL5dNvnX3ty6nfBe6ju449LDOmrpbmoFbfbKTn7DVoIc2eNVdKu0B/KZlcI/smz5WWPU/LkfePy7N1jfKmMUTUfz0NQu+QO0ZcIsXXTpRROXryk/asc0IEEEAAAQRcJcDfdFcVp9syU1AikzY8JZOWtMiTj/9O3j/xrGxuPNbzShcjswNk9Kx/lG8P+pZMnFBio1ZRI32hP/X/uXvl4eL+8r0pD8ib7U/IynrfmycWDs96D8Lz/uZbQpPHZwQQQACB9AvouyGNZfHSJVJZVWV85CcCaRUw1zU9sb4E3Wox70/dtJLiOwQQQMBtAv8uT945VubrK2qGLpGDT1fJwCxnkS67WQbncggggAACCCCAAAIIIICAPQQulGEjBp9NytsnpS2op2F2UkhAmh1nroIAAggggAACCCCAAAIIZFmgQ1qajlm8rqZLznzwf7KcpuDLEZAGe/AJAQQQQAABBBBAAAEEEHC4QLd07LlLhgz8pkyc8YA0dZhfU2POWqe0vf0f/g35V39bhsY9Waj5HKmtE5Cm5sfRCCCAAAIIIIAAAggggIDNBPKk/8gbpFQDzK4XpW59U4RW0k/k1J51UqfjR33TMJVWjJD+OcgFAWkO0LkkAggggAACCCCAAAIIIJBRgf4VsmjBCN/rarqkvXG1zF//pLQYr3bpbpPmTXfL7XOflXbfHoXXLZal476U0eREOzmvfYkmw3bbC5hnhdTEWs0iGbpvrP1tn3kSiAACCCCAAAIIIICApUAvKZ5eIw+0/UDu/sUxado21/8v+BB9ReJ8eWDDBBmYF/xNtj7RQpotaa6DAAIIIIAAAggggAACCGRTIK9Irq15TJ7fsUpmjBlgurIGonfJsh0vyKGfVElJQY6iUV+KaCE1FQurCCCAAAIIIIAAAggggIC7BHrJwNHTZIH+s2HGaCG1YaGQJAQQQAABBBBAAAEEEEDACwIEpF4oZfKIAAIIIIAAAggggAACCNhQgIDUhoVCkhBAAAEEEEAAAQQQQAABLwgQkHqhlMkjAggggAACCCCAAAIIIGBDAQJSGxYKSUIAAQQQQAABBBBAAAEEvCBAQOqFUiaPCCCAAAIIIIAAAggggIANBQhIbVgoJAkBBBBAAAEEEEAAAQQQ8IIAAakXSpk8IoAAAggggAACCCCAAAI2FCAgtWGhkCQEEEAAAQQQQAABBBBAwAsCBKReKGXyiAACCCCAAAIIIIAAAgjYUICA1IaFQpIQQAABBBBAAAEEEEAAAS8IEJB6oZTJIwIIIIAAAggggAACCCBgQwECUhsWCklCAAEEEEAAAQQQQAABBLwgQEDqhVImjwgggAACCCCAAAIIIICADQUISG1YKCQJAQQQQAABBBBAAAEEEPCCAAGpF0qZPCKAAAIIIIAAAggggAACNhQgILVhoZAkBBBAAAEEEEAAAQQQQMALAgSkXihl8ogAAggggAACCCCAAAII2FCAgNSGhUKSEEAAAQQQQAABBBBAAAEvCBCQeqGUySMCCCCAAAIIIIAAAgggYEMBAlIbFgpJQgABBBBAAAEEEEAAAQS8IEBA6oVSJo8IIIAAAggggAACCCCAgA0FCEhtWCgkCQEEEEAAAQQQQAABBBDwggABqRdKmTwigAACCCCAAAIIIIAAAjYUICC1YaGQJAQQQAABBBBAAAEEEEDACwIEpF4oZfKIAAIIIIAAAggggAACCNhQgIDUhoVCkhBAAAEEEEAAAQQQQAABLwgQkHqhlMkjAggggAACCCCAAAIIIGBDAQJSGxYKSUIAAQQQQAABBBBAAAEEvCBAQOqFUiaPCCCAAAIIIIAAAggggIANBQhIbVgoJAkBBBBAAAEEEEAAAQQQ8IIAAakXSpk8IoAAAggggAACCCCAAAI2FCAgtWGhkCQEEEAAAQQQQAABBBBAwAsCBKReKGXyiAACCCCAAAIIIIAAAgjYUICA1IaFQpIQQAABBBBAAAEEEEAAAS8IEJB6oZTJIwIIIIAAAggggAACCCBgQwECUhsWCklCAAEEEEAAAQQQQAABBLwgQEDqhVImjwgggAACCCCAAAIIIICADQUISG1YKCQJAQQQQAABBBBAAAEEEPCCAAGpF0qZPCKAAAIIIIAAAggggAACNhQgILVhoZAkBBBAAAEEEEAAAQQQQMALAgSkXihl8ogAAggggAACCCCAAAII2FCAgNSGhUKSEEAAAQQQQAABBBBAAAEvCBCQeqGUySMCCCCAAAIIIIAAAgggYEMBAlIbFgpJQgABBBBAAAEEEEAAAQS8IEBA6oVSJo8IIIAAAggggAACCCCAgA0FCEhtWCgkCQEEEEAAAQQQQAABBBDwggABqRdKmTwigAACCCCAAAIIIIAAAjYUICC1YaGQJAQQQAABBBBAAAEEEEDACwIEpF4oZfKIAAIIIIAAAggggAACCNhQgIDUhoVCkhBAAAEEEEAAAQQQQAABLwgQkHqhlMkjAggggAACCCCAAAIIIGBDAQJSGxYKSUIAAQQQQAABBBBAAAEEvCBAQOqFUiaPCCCAAAIIIIAAAggggIANBQhIbVgoJAkBBBBAAAEEEEAAAQQQ8IIAAakXSpk8IoAAAggggAACCCCAAAI2FCAgtWGhkCQEEEAAAQQQQAABBBBAwAsCBKReKGXyiAACCCCAAAIIIIAAAgjYUICA1IaFQpIQQAABBBBAAAEEEEAAAS8IEJB6oZTJIwIIIIAAAggggAACCCBgQwECUhsWCklCAAEEEEAAAQQQQAABBLwgQEDqhVImjwgggAACCCCAAAIIIICADQUISG1YKCQJAQQQQAABBBBAAAEEEPCCAAGpF0qZPCKAAAIIIIAAAggggAACNhQgILVhoZAkBBBAAAEEEEAAAQQQQMALAgSkXihl8ogAAggggAACCCCAAAII2FCAgNSGhUKSEEAAAQQQQAABBBBAAAEvCJzvhUySRwQQQAABBLwk0HqqzUvZJa8IIIAAAg4WoIXUwYVH0hFAAAEEEEAAAQQQQAABJwsQkDq59Eg7AggggAACCCCAAAIIIOBgAQJSBxceSUcAAQQQQAABBBBAAAEEnCxAQOrk0iPtEQU++ugjeWzXbtGfLAgggAACCCCAAAIIIGBfAQJS+5YNKUtC4LHdj8nIsjJpaGjw/9TPLAjYQaClpUU+97nPBZLS1naKhyYBDVZyKRBaN3OZFq6NAAIIIOA9AQJS75W5a3M8acIEWbJokZz54Iw/j/pTP5ePGePaPJMx+wu0t7dL5fQ7ZeL4W+Svf/2rfHnAAH+id//iFzL+5ptl/3P77Z8JUuhKAa2bc+fMCdTNfv36BT00cWWmyRQCCCCAgO0ECEhtVyQkKFmBo0eORjz0ndZ3Im5nIwKZFNAu4/fV3SdXj7hKmpuaApf69Kc/HVjXujm7utofsJ48cTKwnRUEMimgdbNh+3Z/3dy3d1/gUh988IHk/12+9O7dJ7CNFQQQQAABBDItQECaaWHOnxEBq/Ghffv1lbJrrhH9yYJALgSMruNbt2wJu3ykuqkB6/Xl5bJqxUq68YaJsSGdAtoir8Ma1q2tCTvttO9+V146fFimTJ0S9h0bEEAAAQQQyJTAeX/zLZk6OedFIBMCekO1+b46idTyqTdUM2bNlMLCQv+Nfd3GTfLIzp0Rk7Fl61apGFsR8Ts2IpCMgI7FWzBvXsS6OW78OJm/cGGgbj5U/5BEClj1QcrMWbOksqoqmSRwDAIRBbRubt3yQFBrvbHjqNGjZdHixTJo8CBjEz8RQAABBBDImgABadaouVCqArFuqKpn3y0lJSVhl7E6btjwYbJk2bKIx4WdiA0IRBHQsXjLliyNeLN/WfFlsmHTpoh1TLvp1q5bF/W45b4W09Ky0ihXZTMCsQW0btZvezDigzmtm3PumcuDudiM7IEAAgggkEEBAtIM4nLq9AhY3VBpa9Lqe9fEdUNl1bJqbr1KT6o5ixcEtOv47l27InZ/1Lo5f8FCuXXKrTEpDh86LKtXrYzYsqqtV2tq1vpbVmOeiB0Q6BEw6uaD27YFJnozcIxW+ClTp/rGi/Y2NvMTAQQQQACBnAgQkOaEnYvGK6ATb0S6odLjFy9d4hvrlNgNldVNWrLnjDcv7OcuAX3AsfyHy8Ju9jWX1bNny10z7kr4Zt+qvid7Tnepk5t4BKwevpmHNcRzLvZBAAEEEEAg0wIEpJkW5vxJCVi1GKWjNdOq1ZVubEkVmWcO0i7gNWvWSKRZndMxFk8fmkQb+5xIq6tnCoSMBgSsuoAzPCHAxAoCCCCAgM0ECEhtViBeT062b6isxpdqcBFtXKrXy8mL+deHGBvXrxfzazIMB32Ike7xnlZ1k+DCkOenCsR6iBHvsAY0EUAAAQQQyIUAAWku1LlmmECsG6p4x+KFnTjODVbdL+niFieiS3czunlHek2GMRYvkzPiWnW/TEdvAZcWm2eyZdXNO5lhDZ6BI6MIIIAAArYRICC1TVF4NyH6zsaNG9andSxeMpq5DjySSTPHZFbALg8qjLqZzvHUmZXj7JkWyPSwhkynn/MjgAACCCBgCBCQGhL8zLqAdkmM9s7GXM4smu2umVmH54IxBay6y+ayK7fV2GdtraVrZsyidfwOWgeSecWQ4zNOBhBAAAEEXCtAQOraorVvxpxyQ6VBSSYnr7FvCXk3ZVYBn50mu4pVNxn77L46rK3kD9U/JFu3bAnLHJNdhZGwAQEEEEDAQQIEpA4qLKcn1eh2GG0sXqbHiSbrF6vb5tz58xJ+vUeyaeG4zAgYddNpXWJj1c0Zs2by/tLMVJmsntUuwxqymmkuhgACCCDgGQECUs8UdW4zGuvG2e5BnRGwRAumZ86aJZmc2Ca3pefuq2vd3HxfnbzT+k5YRp0waRB1M6zYXLPBrsMaXANMRhBAAAEEbCFAQGqLYnBvImJ1LVy0eLEMGjzIMQDapdPq1R8bNm2SkpISx+THywnVurl1ywPS3NQUxuDE16rEqpvpfi1NGBob0iZAWaaNkhMhgAACCDhAgIDUAYXkxCS6/YaKlgsn1sqzadYWxbqNm+SRnTvDMuGGsXix6qbTHgKFFZKLN9Da7eLCJWsIIIAAAlEFCEij0vBFMgLGDVWksXjZeGdjMmlO5RjGdqWil/1jrd7ZWD17ttw14y7XjAe2qpv6bl27d5PPfu3I7RWdPqwht3pcHQEEEEDAyQIEpE4uPZul3Wosnt4Au3WCFQ3Cmf3SZpUxJDlW72zM5SuGQpKZ9o/UzbSTpv2EsYY1MGNy2sk5IQIIIICAzQQISG1WIE5MjtVYDhgJWQAAQABJREFUvFy+szHbltpNOdr7AZ04JjHbfpm43skTJ6V23bqI40T1NS5eGVdpVTfVgbHPmah91ueMNaxhzj1zpWJshfVJ+BYBBBBAAAEXCBCQuqAQc5UFbX2JNhbPTu9szLaP1Rg+J8zamm2vTFzPqm66set4vIZebSmO1ycb+2nd3L1rl1gNa5gydapruo5nw5RrIIAAAgg4W4CA1Nnll7PUW43FW7x0iXBDJWI1hg+jzFVdq7rJ2Mmz7lZG1M3M1U2rYQ08rMqcO2dGAAEEELC3AAGpvcvHdqmzamHhhiq8uGK11K2+dw3d8sLZktpi1TLtpa7j8eJRN+OVSn0/q2ENdOdP3ZczIIAAAgg4W4CA1Nnll7XUW41B44YqdjFYjWXEL7af1R5WddPLXcetzMzfUTfNGuldJ+hPrydnQwABBBBwpwABqTvLNW250hsqqxlkaeFLjNqqhdnNMxEnphTf3lZ1U89A19P4HI29rOomvR8Mpfh/0i06fiv2RAABBBDwtgABqbfL3zL3jIG05Enpy2g3q8aEO4zBtea1qpsET9Z2Vt9qkM+EO1ZCsb+zCuzd/Iqh2DLsgQACCCCAQGQBAtLILp7eGmss3pqatVJYWOhpo3Rk3qo7H11NIwtb1U26Pkc2S2ardoOu3/agPLJzZ9jh1M0wEv8Gq67PasardSK7sRUBBBBAAAECUupAQCDWe/G4oQpQpXXF6kZWW1QWLV4sgwYPSus1nXYyq3Gi2qpM1/HMlKjVZDzUzbPmVl3HtW7OX7BQbp1ya2YKiLMigAACCCDgAgECUhcUYqpZMLrprVtbE3YqbqjCSDK2weqVEF59XYlV3dSCqJ49W+6acRfvbMxYrTx7Yq2by3+4TM58cCbsSl6tmwph1XXcyy5hlYQNCCCAAAIIWAgQkFrgeOErqxtNbvazXwOMAOzBbdvCbv6N8aWVVVXZT1gOrmhVNxmLl/0CMepmtAdXM2fNEq/UTauu47QcZ79uckUEEEAAAWcLEJA6u/ySTr3eUNWsWSNHjxwNOwc3VGEkWd8Qawzf8hUrpbSsNOvpysYFreomY/GyUQLW14jVtd/NddOq67jWTTfn3bpW8C0CCCCAAALJCxCQJm/nyCO9HOg4scCsxvBt2bpVKsZWODFbUdOsraKzq6vDvvda63AYgA03WD04cFsLtrYOW73+ykutwzasiiQJAQQQQMDhAgSkDi/AeJNvdLejK2i8YvbaTwO1zffVyTut7/gTpgHai4cOuW7spNbT8TffHMinZpaxePaqi6GpsRpH6YZu/1Zdx7Vuzpg1k1nHQysFnxFAAAEEEEhAgIA0ASyn7mr1Xjxu9p1TqsZDBR3DV1Nb69qZO41WUrqOO6tuWrUgOnGm2VgtwNWz75aSkhLnFBIpRQABBBBAwKYCBKQ2LZh0JIvXiaRD0X7n0G7Xbn8PrAalbuuObL+alP4UWY2xdMp7YjUPG9evl31794UB8Q7WMBI2IIAAAgggkLIAAWnKhPY7gbak1W3cxEvt7Vc0pAgBTwho6+KCefOCul4bGR83fpzMX7jQdg9VzD0QjLSafy5eukSmTJ3qum7y5jyyjgACCCCAQC4ECEhzoZ7BazZs3y5W40S5ocogPqdGAIEgAavxpXYK8ELHaJszYdcA2pxG1hFAAAEEEHCyAAGpk0vPlHarFgkm3jBBsYoAAlkVsOqxoZNzrb53Tc66Z+vvza1bHpDmpqYwE6d0MQ5LOBsQQAABBBBwmIDzA9K27TJuVI286Ye/UhY3PyqVRfkJFEOnNC+4USob2/3H9Jq8Q97YMEoSOUMCFzPt2iEte56WI+8fl2frGuXNLtNX0keumFwl3xl8iQyf9D+kpCDP/GXE9W8OGyZnPjgT9B03VEEc7v4Q9P+BSP6wJfLc41VSHLvq9Lh0yantt8uYta/7P0f9/yDoOk76/83dxe+E3MUa057NSYKsXn+V6yDZCWVJGhFAAAEEEEinwKfSeTLOFYdAd5s0b18o4wZ/UybOXS3rakODUT3Hh/Jm432ybu0cmfiNkVK16YCc6rY+t7YyGIveUOk7Kh/fs4dZIA0Uj/3sOrpFFu44LjGqjcdUyG4uBQYNHiQNO34iDz/yiOjkQOZFWygnjr9FVq1YKRosZnLRYQ3fqaiIOMZeX1Ojr1NiQq1MlgDnRgABBBBAIFiAgDTYI6Ofutv2y9LxN0vl2khBaLRLn5amB+6SG8avkl+3fRJtJ/8NlLaI6rgsbqiiMnnoiw+lZcMq+Wlr9DrjIQyyaiOB0rJSOXDwoP93lT48My+P7NzpDxY1aEz3oq+/Kh8zxvegryasN4m+YujlV1+Re+bew6RF6YbnfAgggAACCMQQICCNAZSur7vbGqV66g9k97EPz52ycIzMWHqvNDS/Ja2n2s79a22ShuX3yKShfQL7dh17WGZMXS3NndHbvLRFtLKqihuqgJrHV7pelU3zfyat0auMx4HIfi4F9HfVs/v3i45xNy869ECDRg0eNYhMddGuwpXT75TvTZsWNuuvttQ+sfdJf8ut21+llKojxyOAAAIIIJApAQLSTMmaz9t5QJZOXSYH2o2BogNk9NIn5MirDbKg6h9lVFEv894ieUUyavpsqX26WRpnlZwbz9r+hCyraZLO4L35hEBUAbruRqXhCxsIaBC4YtVKf1CorZTm5Z3Wd/xBpAaTGlQmuuhkStoF+Pry8rBJi7RlVnuTaEttSUlJoqdmfwQQQAABBBBIowABaRoxI5/qY2mp3ySPm4LR8rqH5cGq4VIQ+QDT1v4yfGG9bJt8ac+2Lmlv3CQPtXxs2odVBEIEev2DTBpn1Bm67obo8NGGAhoU6vhSHfseaXypBpUaXGqQGc+iXX5HlpVFHCeqLbI6rEFbaFkQQAABBBBAIPcCBKSZLoOO5+XHDW/3XCVfCicvl9oJxRL35KdyoYxaslQmFRrz/rbJc796i8lqMl1ujj7/l+T6paY6Q9ddR5emlxKvkwntfeopf+tlaL51fKkGmfpu02iLvsbFapzoCwcO+Ftke/fuHe0UbEcAAQQQQACBLAsQkGYUvFs6XnxeDhs9dfOHyx0zSuNoGQ1JVEGpzKyp7Rlr+ra8tHB4AgFtyLn46A2BgtGyqGaiFPbklq673ih2N+RSg0VtvdRJhsaNHxeUJR1fumTRIn/QqcGnsejMvNq1V2fq1a6+5kVbXHVmX22B1Zl+WRBAAAEEEEDAXgIEpBktj/fkpf2vSyAeLZsk44tDxovGdf1eMnD0LeFjTeM6lp28KZAnBaPnyJpAd2+67nqzHjg31zq+tG7zZv/4Up1B3Lxo0KnBpwahtetq5eoRV0UdJ6otrjqzLwsCCCCAAAII2FOAgDST5dL1e/nty8YURL1kyIivS/9MXo9zIxAkENLdm667QTp8cIaAji/VGcR1fGnoa2L0/aXb6+vDMqLjRHUGX2YdD6NhAwIIIIAAArYTON92KUopQa/LulGXy7qUzpHGg0+flOOB10AWyJDiL6bx5JwKgTgEerruHp6+S9p9u5/tulsqj1UNSUO3b5v9/xYHB7s4V0DHl5ZdUya7d+3yvxbGyMlnPvMZ+c///E//R52pt3r23cyca+DwEwEEEEAAAQcI0EKatUK6QPr1/busXY0LIXBWgK671AT3CJjHl5b5JjjSRYPRfv36+VtQdZwor3FxT3mTEwQQQAABbwgQkGatnD8v/QqMmXKzdlEuhIBPgK67VAN3Cej40qtL/yGQqQ8++EC0BZUFAQQQQAABBJwn4LIuu1fK4uZHpbIokcCvU5oX3CiVjdqh0Wrpls6WZ+SxXT+VzY3HeiYq8r3GZcwdUnn7FJk2uihGF8g/ysm2v4oUxX77qFUq+A6BpATCuu4+KttfGie1oy9M6nRnD8rk/28pJItDEUAAAQQQQAABBBwjQAtpXEXVIUfWT5IR4+fIhkAwqgd2SfvBh2TN9Oul7K5GOdUdcrIL+suFicTGIYfzEYH0CYR23X1XHl+yWZo7Qytt+q7ImRBAAAEEEEAAAQQQiCVAQBpLSHwto0118s/bWnzhZx+54ratcrC1TVpP+f61NknD3WN873r0Baa/WiPzdhz37W1aCi6VwRcZEWmHvPJ6a/D3pl1jrnYek+aWjpi7sQMC0QVCuu62PyHLaprEmAc6+nF8gwACCCCAAAIIIIBAZgQISGO5dr8hDy1/wjdDqa977uQ6ebimQgbm9RyUVySj5v2LPDDrct8G33sedz4lx8wRad7FMugrn+vZuUvee/vdJG/+u6Xj4AMya/w3pXjg5XJ1pNbYWPngewRUoKBUqu4c7qvNuvgepDSuldqm9/2f+A8CCCCAAAIIIIAAAtkWICCNJf6Ho/Kb012+vYrk5qlXS/gI0M/K16/8hvTS8/zvD6Tz/5pPeJFcU3Flz82/7/b/0OOytzXwHhjzjjHW35OX9r/uCx906ZKO7vOljxEUxziSrxEIFuglxdNXyLxhfXo203U32IdPCCCAAAIIIIAAAtkUICCNpV1UJfu0e+6pF2RByWcj7P2+/Ovzr4k/zPxCPykIEs2T/mMmybjCnm67XUfkp/WHE24l7W75mfzooNGxskBKK0ZI/wgpYRMCcQnkDZE7Ns6WEqM3eU/X3TNxHcxOCCCAAAIIIIAAAgikTyAofErfab1wJp11d5/UL6iUWY3v+jJ8qUxaPV1KQlsuw7pIrpZFexIYS9r5itSteFROG6SFN8ptYy4yPvETgaQE8or/SdYvGGHqunuvrHrmj0mdi4MQQAABBBBAAAEEEEhWgIA0YTl9TcxVvrGcg2R4z6y7MnSq1O7dE+UVGqFdJE/Lgbnfk5nbj8RsKe1u2y9Lp82Q+mMf9qTSF/TWzJFRBaFRb8KZ4ADPC4TWy3Z581isVx95Hg0ABBBAAAEEEEAAgTQLEJAmDPof0nrc6D579uCuY7vkhysekF+3RRkfGtpF0tfe2bR2ooy4aaHUb98nLUGv3jjb8tqwvlLKRlXL7kAwqpMqLZVFKb03MuHMcoCbBcLqpZszS94QQAABBBBAAAEE7Chwvh0TZe80XS6VT78llf5EdkhLY52sWrrL17r0sMyY+v9Jw/P3RmzBzCueLg2NIvNnbZSm9p7piY41ygbfP1k7J0aW9XUztXL/veURJlWKcShfI2AhcLbrbpOMXftqz6RZFjvzFQIIIIAAAggggAACaRaghTQl0P5SMvleeXj33XKFThDjmxxmZf0bUd41micFJVWy/fnHpHby0MDMuzEvXzhGqnc8JXvMr5uJeRA7IBCvQGjX3XiPYz8EEEAAAQQQQAABBFIXICBN2dAXaA6fKtPK9IUwXXL65aNiOTVMQYlM2vCUHH/jSdm4dIksiBicDpDRsxbJ4ron5cirDXLP6CJh1GjKBcUJognQdTeaDNsRQAABBBBAAAEEMixw3t98S4av4YHTd8mp7bfLmLWvi/SaLA1vrpdRxis1PJB7sogAAghkW6Bh+3ZZt7YmcNlW3+u5WBBAAAEEEEDAeQK0kMZVZr6xok3HLGbF7ZIzH/yfuM7ETggggAACCCCAAAIIIIAAAmcFCEgta0K3dOy5S4YM/KZMnPGANHV0R9m7U9re/g//d/lXf1uG0joaxYnNCCCAAAIIIIAAAggggMA5AQLScxYR1vKk/8gbpFQDzK4XpW59U4RW0k/k1J51UndQXwVTIKUVI6R/hDOxCQEEEEAAAQQQQAABBBBAIFiAgDTYI/xT/wpZtGCEb1bcLmlvXC3z1z957r2h3W3SvOluuX3us9Lu26PwusWydNyXws/BFgQQQAABBBBAAAEEEEAAgTAB3kMaRhK6QV+LUSMPtP1A7v7FMWnaNtf/L3gvXzA6Zr48sGGCDGQ63GAaPiGAAAIIIIAAAggggAACUQRoIY0CE7Q5r0iurXlMnt+xSmaMGWD6SgPRu2TZjhfk0E+qpKSAaNSEwyoCCCCAAAIIIIAAAgggYClAC6klj/nLXjJw9DRZoP/Mm1lHAAEEEEAAAQQQQAABBBBISoAW0qTYOAgBBBBAAAEEEEAAAQQQQCBVAQLSVAU5HgEEEEAAAQQQQAABBBBAICkBAtKk2DgIAQQQQAABBBBAAAEEEEAgVQEC0lQFOR4BBBBAAAEEEEAAAQQQQCApAQLSpNg4CAEEEEAAAQQQQAABBBBAIFUBAtJUBTkeAQQQQAABBBBAAAEEEEAgKQEC0qTYOAgBBBBAAAEEEEAAAQQQQCBVAQLSVAU5HgEEEEAAAQQQQAABBBBAICkBAtKk2DgIAQQQQAABBBBAAAEEEEAgVQEC0lQFOR4BBBBAAAEEEEAAAQQQQCApAQLSpNg4CAEEEEAAAQQQQAABBBBAIFUBAtJUBTkeAQQQQAABBBBAAAEEEEAgKQEC0qTYOAgBBBBAAAEEEEAAAQQQQCBVAQLSVAU5HgEEEEAAAQQQQAABBBBAICkBAtKk2DgIAQQQQAABBBBAAAEEEEAgVQEC0lQFOR4BBBBAAAEEEEAAAQQQQCApgfOTOoqDEEAAAQQQyJHAfXX3yS/37w+6euX0O/2f/9vXviYXXNBHhn/zm1JSUhK0Dx8QQAABBBBAwH4C5/3Nt9gvWaQIAQQQQMALAh999JG0HG2R119/Xf7f//W//Flu2PETy6xr8Nnc1GS5z5atW6VibIXlPnyJAAIIIIAAArkXoIU092VAChBAAAFPCbS0tPgCymZ55Tcvy9EjR4Py3rdf36DPyX64+EsXWx6qgfDuXbtk5MhRMmjwIMt9+RIBBBBAAAEEMidAQJo5W86MAAIIIGASaG9vl+9UVMiZD86Ytgav6ne6X2FhYfAXpk/l110n7777rrzT2hrYOmr0aN+2U75t7/i3XXyxdUB66KVDsm5tjf/fZcWXyY0VY+W222+zvG7gYqwggAACCCCAQNoECEjTRsmJEEAAAQSsBDTI7Nu3b9SAVAPDoUOHWp3C/92tU26VDz/8iz+YNHaO1c3X2M/4+fpvf2us+oPYrVu2iP4bNnyY3OHrEkx33wAPKwgggAACCGRUgIA0o7ycHAEEEEDALKAtkRr46aIB6D/8Q6lc+a1v+QNBq1ZR8znSsf6v/3o44mm0C7H+W/7DvrL5/h9JaVlpxP3YiAACCCCAAALpESAgTY8jZ0EAAQQ8L6DjMnv37m3pcNNNN/m/15+5HLt54OBB0bGsT+97Sp555umwVlvtOty7j3VeLDPKlwgggAACCCAQlwDvIY2LiZ0QQAABBKIJaCCqr2L571+/wh/kRdtPt2sQes/ce3IajBrp09fCrFi1Un539Kg8/MgjMm78OOMr0TGpvDYmwMEKAggggAACGRMgIM0YLSdGAAEE3C/w2O7HZGRZWaAb7tYtDzgy09o1t27zZnn51VekevZs37+7HZkPEo0AAggggIDTBOiy67QSI70IIICADQROnjgptevWhb0PVN8Pql1hndq6qONYtQWXBQEEEEAAAQSyI0ALaXacuQoCCCDgGgFtFb2+vDwsGNV3iC5eukQGDx7smrxGy8jhQ4flm8OGif5kQQABBBBAAIHkBQhIk7fjSAQQQMBzApW+V6IsWbQoLN/TvvtdefHQIamsqoo5sVHYwQ7boGNm5/zg+/6JkL43bZp//KzDskByEUAAAQQQsI0AAaltioKEIIAAAvYXKL/uuqBE6qtbntj7pH9yoFgz7AYd6OAPdRs3Bc3Kq6+xmTRhgrS3tzs4VyQdAQQQQACB3AgQkObGnasigAACjhS4dcqt/hloNfE6+c/ep55y7HjRZAtg7vx5AQPjHPru0u9UVIiOrWVBAAEEEEAAgfgFCEjjt2JPBBBAAAGfwP3/8iP/a1J08h+vtIqaC17z3LDjJ1JTW2ve7G811bG1+5/bH7SdDwgggAACCCAQXYCANLoN3yCAAAIIRBDQgExfk+L1RVuLXzhwQHQyJ/Myu7qallIzCOsIIIAAAghYCBCQWuDwFQIIIIAAAlYCgwYP8k/mNGz4sMBuOsGTbmdBAAEEEEAAgdgCBKSxjdgDAQQQ8IyAziCrr3VhiV9AW4x/unOnjBs/TjQYXbFqZfwHsycCCCCAAAIeFzjf4/kn+wgggAACJoEf/PP3/e8XPf7WWwRWJpdYqxqU1m3eHGs3vkcAAQQQQACBEAFaSENA+IgAAgh4VWDVipX+YFTz/4ivxe++uvu8SkG+EUAAAQQQQCBLAgSkWYLmMggggICdBTT41CDUvAwZMsT8kXUEEEAAAQQQQCDtAgSkaSflhAgggICzBPQ1JVu3bAlK9JatW6VibEXQNj4ggAACCCCAAALpFiAgTbco50MAAQQcJHDyxEnR15SYl+rZswlGzSBpWm/Yvl3Kx4wRnTiKBQEEEEAAAQTOChCQUhMQQAABjwpoYDRr5oyg3OsssffMvSdoGx9SE1DnuXPmyLq1NfJO6zuy4oc/TO2EHI0AAggggICLBAhIXVSYZAUBBBBIRKDlaIs/QDKO0Xdpzp0/z/jIzzQJaED60ksvBc62b+8+Xq0T0GAFAQQQQMDrAgSkXq8B5B8BBDwrUFpWKi8cOCCXFV8mffv1FR03qq8vYUmvQGFhoWy+/0dBJ12yaJFod2kWBBBAAAEEvC5AQOr1GkD+EUDA0wKDBg+SvU89JbsfaxQNnFgyI6DBv47NNS+LFy00f2QdAQQQQAABTwoQkHqy2Mk0AgggcE5AW0U1MGXJrMBdM+4S7RZtLEePHBWd6IgFAQQQQAABLwsQkHq59Mk7AggggEDWBDTwX1e7Puh6D27bJu3t7UHb+IAAAggggICXBAhIvVTa5BUBBBBAIKcC2hJt7rp75oMzcuLtEzlNExdHAAEEEEAglwIEpLnU59oIIIAAAp4T0K67OpHUuPHj5OVXXxEdX8qCAAIIIICAVwXO92rGyTcCCCDgJQF99YguzKKb+1LXMtCJpCiL3JcFKUAAAQQQyL0ALaS5LwNSgAACCGRcYPeuXTKyrMw/iY4RnGb8olwgqgDBaFQavkAAAQQQ8JgAAanHCpzsIoCA9wQ0ANXJc3S84rq1NTL+5pu9h0COEUAAAQQQQMCWAgSktiwWEoUAAgikT0BbRzUYNZZbp0wxVvmJAAIIIIAAAgjkVICANKf8XBwBBBDIvIC2jhpL3359ZcrUqcZHfiKAAAIIIIAAAjkVICDNKT8XRwABBDIrsP+5/UGto7fd/o9MppNZcs6OAAIIIIAAAgkIMMtuAljsigACCDhN4Mk9e4KSfNvttwV95oN9BHSs73PPPudP0K1TbrVPwkgJAggggAACGRQgIM0gLqdGAAEEcinQ3t4uzU1NgSToey8LCwsDn1mxj8B9dffJ1i1b/AnSd5QSkNqnbEgJAggggEBmBeiym1lfzo4AAgjkTODZZ54JuvaYa8uDPvPBPgIf/uUvgcS80/qOnDxxMvCZFQQQQAABBNwskLfSt7g5g+QNAQQQ8KrAeZ/6lPTq1Uv+8Mc/yGc+8xnZWLfJNRSat+JBxVJaVur/N2z4cEfnbcCAAfLzn/0skIfPFxTIVf/PVYHPrCCAAAIIIOBWgfP+5lvcmjnyhQACCCBwVkBb3AYNHgSHjQXKx4wRbR3VRbvtHjh40MapJWkIIIAAAgikR4Auu+lx5CwIIICArQUIRm1dPP7E3VgxNpBIuu0GKFhBAAEEEHC5AAGpywuY7CGAAAIIOEPgyiuvDErokSNHgj7zAQEEEEAAATcKEJC6sVTJEwIIIICA4wR0PKx5+e1rr5o/so4AAggggIArBQhIXVmsZAoBBBBAwIkCo0aPDiT7pZdeCqyzggACCCCAgFsFeA+pW0uWfCGAAAIIOE7glgkT5JJLLpEhX/2qDHf4zMGOwyfBCCCAAAI5EWCW3Zywc1EEEEAAgcQEOqRlz9Ny5P3j8mxdo7zZZT46XwrH3CF3jLhEiq+dKKOKepm/ZB0BBBBAAAEEbCxAQGrjwiFpCCCAQDICLS0t0qd3H5e85sUXiDbWyaqlu0KC0GgyGpzOkjXLZhGYRiNiOwIIIIAAAjYSICC1UWGQFAQQQCAdAsUDiwKnWbx0iVRWVQU+O2mlu22/LP/+Itl97MPEk50/VKb8+H5ZXV4keYkfzREIIIAAAgggkCUBxpBmCZrLIIAAAtkQOHniZDYuk/FrdLc1SvXUZXKg3dQ31xdkTpo7Tr717ZvklpL+59LQ3SbNO38lr7/8c6k/ePrs9q5jsrtqmnTUPSxbJxQTlJ7TYg0BBBBAAAFbCdBCaqviIDEIIIBAagLaXXfi+FsCJ3li75NSUlIS+OyIlc5XZMO0GVIfaBntI1fcViv331shAy2bO7uls2WHzJ+1UZoCgeylMmnH41I7+kJHZJ1EIoAAAggg4DUBXvvitRInvwgg4GqBt3//tsPz97G01K80BaMDpLxur+ypiRWMarbzpKCkSh7ctUbKC/N7HN6Vx5dslubOboe7kHwEEEAAAQTcKUBA6s5yJVcIIOBRgQ8//EtQzh3XOtrxvPy4wQiqfRMUTV4utQl2uc0rmixbH50vJUZM2v6ErKx/QwhJg6oGHxBAAAEEELCFAAGpLYqBRCCAAAIIiPhaRxvqpckYNpo/UuYuHC0FSdDkFY+T6vGX9hzZJaef+bUcc0hE+tFHH4l2vTb+6WcWBBBAAAEE3CpAQOrWkiVfCCDgSYE/nf6Tg/N9Wo68/IdA+vPLbpBr+lsOGg3sG75yoZRNvVEGGF+cbpIDxz42Ptn654kTJ/zjgHUssP5rOdpi6/SSOAQQQAABBFIRICBNRY9jEXC5gLbM3Fd3n8z5/g+EVhpnFPYf//jHQEKHDR8WWHfESse/yWtvfdKT1AIprRghprl0E85C3tBrZewAo9/uH+Q3v+uZgTfhM2X3AH2HrHn5/e+Pmz+yjgACCCCAgKsEeO2Lq4qTzCCQPoHHdj8mGzeslzMfnPGf9PDhQzJz1izHvtMyfTL2PtN/+9rXAgk0rwc22nnlLx3yvtFdV74ogy9LprOuKYN5F8ugr3xO5HSnb+MncuLEn6RLLhcjRDXtaavVQYMH2So9JAYBBBBAAIFMChCQZlKXcyPgQAEdt1azZo0cPXI0KPUamK5bWyOP7d4ty1eslNKy0qDv+WAPgZtuuklGjR7lT0xoS5s9Uhg9FV1tJ+VE4OvPS7+CVEPHz0rf/r0CZ/zk+En5k4ySgYEtrCCAAAIIIIBArgUISHNdAlwfAZsItLe3y8b162Xf3n2WKXqn9R353rRpvqBntCxavFhozbHkyvqXtevWSXNTk/+6WkYNO36S9TRwQQQQQAABBBBAIF4BxpDGK8V+CLhUQMeGNmzfLlePuCosGO3br68sXrpEVqxaJbpuXjToub683D/GlPGlZhnWEUhNgP+fUvPjaAQQQAABZwkQkDqrvEgtAmkV2P/cfhlZVubviht64mnf/a48u3+/f8zotO9OkxcPHZLq2bNDd5OtW7b4z6FjTlnsJfDGG86anfVTffvJF9JK+LGc6TAmSRLpNWSQfDmt58/MyXSWXfPSp88F5o+sI4AAAggg4CoBAlJXFSeZQSA+AR0nWjn9TpldXR2YtMg4UmdmfWLvk75W0ZVSWFhobJbevXvLPXPvkRcOHPB31w184VvR8aVLFi2S8jFj/O9ONH/HenYFzBMZGRNSZTcFyV8t7+8Hy+WBYaMn5LWj7yd/Mj2y+89y8vd/7TlHvnyh/wXixD96l3/l8tQcOBoBBBBAAAEbCzjxb7ONOUkaAvYW0HGiq3wTEum7DY1xhkaKtUvulq1b5fE9e6SkpMTYHPZTx4zquMSHH3lELiu+LOh7HV+q59ZgV6/Fkn2BCy4IfmVI9lOQwhX7j5Aby4yZdTvl8P5XpSOF03Uf+7U8d7qr5wxFMva6r0qybzVNIRkJH3rxxRf7eyPoGGD957TJqRLOMAcggAACCHhagIDU08VP5r0koONEv1NRIY/s3BmWbR0nql1yK8ZWhH0XbYPOsnvg4EH/GNNI40t1TKpek/Fw0QSzs91ZDwYukmsqrgy8lqXr0PPyUkd3klDvy6Fdv5TTxtGFw+XKok8bn2z9U3smaG8EffCj/5g4zNbFReIQQAABBFIUICBNEZDDEbC7wOFDh/1dafWVLaFdOMeNHycvv/qKf5yodslNZqmsqvIHszrmNHTRa+oYVR2rypIdga98ZUjQhf785z8Hfbb3hzzpP/IGKTW67Xa9KHXrm0TfIpro0t26T7bufbfnsHwZMH6ClBU4oX000ZyyPwIIIIAAAs4WICB1dvmRegSiCpw8cdLfdVZf0aJdac2LdrXVcaJ1mzcHjRM175PIugazOuY02vhSHas6acIExpcmgprkvr37BD9Y+PO/2y8g1bqpD0oiLv0rZNGCET2tpF3S3jhXKrcfl0TaSbvbGqX69o3SYvTWLZwoK2d8wxHddSOasBEBBBBAAAEXC5z3N9/i4vyRNQQ8J6BdZOs2borYNVe71s5fsFBunXJrRl20RXTzfXVhgbBeVFtSZ8yamZZAOKOZcOjJtfz///buPrrq6s73+KdN6WWqOKnUMXOLS1Ieyh/VaYhYHBdIiLQ11gEqBKIuVEiALGRansmDPJOEkIgdoCEkF8VeC4RHEblUSlJhOnrHQixMb6mC0RHbOA6aW6rXrkxm7tkHzuHkPOWccE7y2+e8f2vFnPP77d/+7f3aP9fim/30w7//gW655RZ9dcBXNWZMlmOGfJqyba3d6l6Z2fCa3nnfhbO85B1nVT85V+WnLl051U+3PVShp1fnaGDYTs4OtTVv06LC9Wps9USjt2rytt2qGHuTN3s+IIAAAggggIBzBAhIndMWlASBaxYwW6+sr1wXMDTXZGy2bJk5a6Z7tdxrflAEGZjgY+eOHdpSUxNQHhMYzy4s1NS8vB4rTwRFJkkcBYK9m+aPE6ZnPdjh7uXMK9VRb2DpSpWWrVkzxmjEvZOUld736m0dLWra/rJe/+X/VO0x76xR1/UBGlf9rDY/OIje0atafEIAAQQQQMBRAgSkjmoOCoNA9wTMNi6LFy4M2iNpVulcWlTUa71kZlGd2potQXtszdDhefMXRLWYUveEuKu3BMK9m6b9zcJYIY+2V1U5bZZqT3t6SkOmDLzQ53ZN/fHTWjUunWA0UIczCCCAAAIIOEaAgNQxTUFBEIhewAR7pcUlAVu4mJzMP/aXubZ4MavhOuEwgUnZmjU6dfJUQHF6O2gOKBAnrlnAvJvr163Tgf0HAvKKbuj4RTU3VGtlyQ6d8YzCDcjR90QfV0dqodaUFnbuRfVNwmcEEEAAAQQQcIwAAaljmoKCIBC5gP9cPN87PcNhzeq3TjzM/NJlT5YGDOM1ZTVDOBcsWsgwXic2XIRl8gzVNissBzu638auwHTvQZ388KwOVTf4BacmCH1cj4+8RYP8h/MGK4SDz5k/3Jh9R9nqxcGNRNEQQAABBGIqQEAaU04yQyD+Al0FdDYsGBQuaHF6QB3/Frb3CeHeTXrBI2tXsxq1GUVg/j946OFH3PuRRnYnqRBAAAEEELBTgIDUznaj1Eko0NWQ1zlzn1BGRoZVMuGGdTptyLFVsD1c2HDvJu0YeWOY/x/uHnmX94Zwiz55E/EBAQQQQAABywUISC1vQIqf+AJdBW2JsCiQCWjCLcq0pmxt8O1BEr/5HV1D826GWrCKnu7om870MJs9ez3Hs88955g54J4y8RsBBBBAAIFYCxCQxlqU/BCIkYBnWGuwbVPMI4pKihNu25RgW4N4OHt62xrPc23/fe6tczp48KCGDRsWs9WMu3o3Tc+eDUPHnda2C+bN67QI1K//5QzzqZ3WSJQHAQQQQCDmAgSkMSclQwSuXcD0lGx4qjroNi4TJk7QoiVLErbH0AQ7W2u3avPGjQGQptdt0eIlmjJ1SsA1TgQKjMvO9r5DwzOHa/fevYGJojxz4vgJrXLtHfr2+bcD7jTzRG0cOh5QkV44Yd77v/nGbd4nm//Pqzds8H7nAwIIIIAAAokq8PlErRj1QsBGATN0NX/6DPewPf9/8JuAYs/+fe5/pKalpdlYvYjKfP3117sXcvnla6/KBDi+x8cffazipUtlAi1jxRFe4Pbbb/cmMAvlmCG23T1MT6t5Nx+bNi0gGDXzRDdu3qz6bf/DunnM3fWI9X3HXzneKcvse8d1+s4XBBBAAAEEElWAHtJEbVnqZZWA6R2pXl+l57ZvDyh3svcKhptfmui9xQEvQ5Qn/OckmmHe0W4H1NW7ObuwMOGGjkfJHJPkntV1PZkxXNcjwW8EEEAAgUQXICBN9Bamfo4XqK+rU6h5osybvNp84ZwScT7t1Zpf26c7hg/37vlqejKPHjsWcYbhzPljQMSMXSb0X12X4bpdkpEAAQQQQCCBBFJWuI4Eqg9VQcAaATMXL3/6dL34wkF99v8+61RuM1T1+R0/1bhvj9MXv/jFTteS9cvwzEzXvowP69NPPtWvf/3rTgz/eOKEdu3cqQEDbtGQoUM6XUv2L3/4/R+8Xh9//LGGDBnapZHplZ72yCNB300zdHzjjzfr0cceY8GdGL1cZpj6lKlT9Rd/8SWdO/eWfjhvvm699dYY5U42CCCAAAIIOFuAHlJntw+lS0ABMxevorxcTY2NAbUzPViVVVXMwwuQ6XwinCEL63S28u99Mz5mrmeww6QtLS4J+m6aoeOrVq+J2Uq9wZ7POQQQQAABBBBIPgEC0uRrc2rcSwJdrR5r5uJFO7+vl6rimMeGW/GVrUeuNpNZjMj3DyBmcayMjAxvgnDvpknEkGgvFR8QQAABBBBAIMYCBKQxBiU7BIIJhNtf0wROCxYtZPhjMLgIzplgaueOHUHn4ZpePRbdkXtF4kkTv+/W9O+FNwsfLXuy1DvP1Jfc9KauKVubsFsM+daVzwgggAACCCDQOwIEpL3jzlOTRCDcCrHmH/tLi4o0eMjgJNGIbzXNcNPami1BVyo2Qdiy5Ss0avSo+BbCwbmvdNV/xJ13eofcmnezbM0ame1g/A//oNX/Ot8RQAABBBBAAIFYCRCQxkqSfBDwETDB0fp163Rg/wGfs5c/mn/sz5u/wBsYBCTgxDUJmEBr88ZNnYaoejLkjwBy70Ua6t1M9i2GPO8JvxFAAAEEEECg5wQISHvOmiclgYBn+Gj52rKA2jJ8NIAkrifCDUVNxmHS4d5N0xBsMRTX15HMEUAAAQQQQCCEAAFpCBhOIxCtQLgAiD0bo9WMTfpwQZjnDwTJsJCUeTc3PFWtt8+/HQBLr3EASdxPeHrxmZ8bd2oegAACCCBggQABqQWNRBGdLRBuLp7Zs7G4tLTTiqbOrk1ilq6rIdSJutWOJ/DxXWHX08LMq/VI9PzvcdnZ3j8OmBWMk+GPIj2vzBMRQAABBGwRICC1paUop+MEwi2iY3rf2LPRcU3mXm021EI+ibSirOkZrl5fFXSBp2TqGXbeGyjV19XJd0i/ee9C7QvrxPJTJgQQQAABBGItQEAaa1HyS3gBzzDQLTU1QbfKYM9G578C4YZX2z6X0gQ8od7NYHNnzfu8tXarZs6aydZDcX51TY+1Z/sdz6N+dvQoK217MPiNAAIIIJCUAgSkSdnsVLq7Al3NxWNOWHdle/4+TyC2eePGgIebXsRFi5doytQpAdeceuLE8RNatXKFdyiobzlDzRM999Y5Fc6e5b7HzHOu3rDB9zY+x1DAvG8Tx4/v1D4M140hMFkhgAACCFgrQEBqbdNR8J4UMP9wrygvD7qVCHs29mRLxP5ZZuh1aXFJ0La1YQ5wV+9muC2G7hg+vFMvf1lFhVVBeOzfhvjlmD99Rqd3zLxbu/fujd8DyRkBBBBAAAFLBAhILWkoitk7AqZXI9xcPNt60XpH0Y6nmuGUixcu7NSD5Sm5E1dJ7qqHd3Zhoabm5YUdhmt6VR+bNs1TTffvPfv3sQhXJ5Fr/+I/b9T0wB86fFhpaWnXnjk5IIAAAgggYLnA5y0vP8VHIG4C5h+RY0aPDrowjJmL94vjx+lNipt+z2eckZGho8eOyfQSmoDB9ziw/4DuHnmXe0EaEwj29rFr5y73uxlsuLF5N02wY1Zuvf7668MWddToUe79R30TFcyYIdPryhE7gT/+8VKnzDY8/SOC0U4ifEEAAQQQSGYBekiTufWpe1AB33l1/glCzcXzT8d3uwXC9YybIdrhhsHGs+bhenGvZXjx5Acf1KmTp7xFNwG5+YNLVwGt9wY+dClg5p/PnTPH/QeA+Qvmd5meBAgggAACCCSLAAFpsrR0JPVsqdOErDKdcacdoaKm55Wf3ieSO6+kaVPT4vuU39Dq/t43d5veqMxSNDlE8TC/pBfVvPegTn54VoeqG3Sm3fdyP92WW6DvDblFmZMfUEZqiu/FgM/BVsJkz8YApqQ4EW5+pvnjxJy5T/TI8NZw+6ia4PFatxgyAbj/gjsmwH1m+3aC0hi+6eZ9GjxkcAxzJCsEEEAAAQTsF2DIrv1tmNw16GhRU90STRhyhyYtWKXyCv9g1PBc0pmGp1x7/83TpG+OUUHVUb3TEZrNDN00W3+Yw/xj36yEuf+FF2SGN3Ikl4AJHswekc8+95zMHyV8j6bGRvcWHiuXr5AJGONxmEDRDB03w4XNsGH/w7ybpicz5/4c/0tRfTc9oTVbagOGKkeVCYm7FCAY7ZKIBAgggAACSShAQJqEjZ4oVe5oOaySieOVvzZYEBqqlhfUuGmmvjtxpX7e8lmoRO49GU1QGulcvJAZcSEhBMwfI8z8UhMA+s8vfc7Vi/i9nBx34BjLypohnmYOc/nasoBszSJLv3zt1YjmiQbcHOKECZZ27mpw18/MQzUrwDJkNwQWpxFAAAEEEEAgZgIM2Y0ZZQJkZNGQ3Y6WBs3JK9XRVp+xuWnZmjVjjEbcO0lZ6X2vNojpRd1+SD87UKfdp30WF0nLU/2R1crqYgjv1Yz4hIDcvaG1NVuCLnYVi6HdZsh42Zo1neZ0etxN/pVVVXEdJmx6e1n91SPObwQQQAABBBCItwA9pPEWJv/YC7QdVUmnYHSAxpbs0cnX6rW44JHOwah5ekq6sqbPVcXBJjUUZlyd09q6R6VljWqLfQnJMYEFTLC2fOUKme1RzDxS3+Pt82+7t1Exe05Gu1KtCQTN8N9JE78fEIyaXlmz+q/ppTVDyuN5EIx2T9f0aJvFoZywCnP3asBdCCCAAAII9I4AAWnvuPPUbgt8qubaKu329owO0LjqZ7WlIFOpXebZX5lLalWTe+uVlO1qbajS1uZPu7yTBAj4C5jA0Mwv3bh5c9D5pd8ZN84dYHYVoHjmiZphv2b4r/9hho6zxZC/irO+P1X9lHsFXbNS8eOu4c4cCCCAAAIIIBC5AAFp5FakdILAxSP6cf2bV0rSR2m5y1Tx4CCFXzfXt+A3Kau4RJPTPGv/tuill3+rMGsc+d7MZwQCBMyCQmbRq1DzS808ULNvaLDjxPET7tVtzTzRjz/6uFMS0/tq5omaLUKcNpczVH06VSAJvpg/JpjecN/9YE1Qahai4kAAAQQQQACByAQISCNzIpUjBDp08RdHdMIzbbRPph6fNSqCnlG/wqeO0uyyCtU3/Vbn33lTryzJjCKg9cuLrwi4BEzAmF9Q4F4Eyyw45HuYQLN46VKNy86WmR9qDjOc1wQyj02bJjPM1/cw80TNcGDT++rE4bOmN9DUxwxPjXZYsm89bf9s2tL8scGstux7mAWhpubl+Z7iMwIIIIAAAgiEESAgDYPDJacJfKBXDr8ubzw6erImDvJZvCji4vbVwLHfD5xrGvH9JEQguIAJIKs3bHAHlGYfT9/DBJ5mfuhj0x6VGc7rH8h4thjqiXmivuWK5rOZJ+npDTQ9gVOn5Ibs/Y0mX5vSml5RE5SbtvTv1Ta95GZ+sdN6tG3ypawIIIAAAsknQECafG1ub43bf6d//qVnCaK+GjbyG+pvb20oeQILmPmlZtsUM7/Uf5uY999/P6DmplfNzBM1vaw2HZ7e3+4s4mRTPX3LevyV496g3HPetLHZq9a29vOUn98IIIAAAgj0psAXevPhPNvJAq+rPGuoyp1UxAvndNa7dWiqhg36KyeVjrIgECBg5peOvme0du7Y4d1P9M9//rOuu+46ffLJJ+5VepcWFcnsAWrDYeozdOhRFc6e1WmosentNT9mAaaZs2YmdA+hMdi3d6y3h9vM9V1TttaRw6tteKcoIwIIIIAAAvSQ8g5YKnCDbvzyFy0tO8VOJgHP/FKzQJE53r9wwR2MFsyc6Z4naksw6mkzU16ziJMJPv0PM5zX9CAm+mECUDPX12zF49S5voneBtQPAQQQQCBxBAhIE6ctk6wmf6kbUz0r5SZZ1amulQL+CxR95aavWFkPU2gTZJvVf83iS75zZU2QZnoQE/0wbWnm+k6ZOiXRq0r9EEAAAQQQiLsAQ3bjTmzrA0aoqOl55adHE/S1qWnxfcpvaI2g0hfVvHendm2v1e7Tl66kH6CxhQV6KDc3ggWH3tO5lk+k9K53H42gMCRBAIFuCHjmypptYNZXrtO8+Qu6kYtzbjEr5x488IK+OuCrzAd1TrNQEgQQQACBBBcgIE3wBnZk9dpeVeW0War1BqKeUl5QY81y10+dxlU/q83++4ve0F83mfjYs8yu5zZ+I4BArwqYnsL7v3d/l3NHzQq1Lx16KaK0PVWh1tZWHXrxRddqwTu982LNIkVm6xZWy+2pVuA5CCCAAALJLMCQ3WRu/V6p+4dqKiu6HIz2uV1T6xr15jstrv1AW/Rm01bNyR7gKtUFHV1aqmfOe1cwulzS1Fs15GZPj+1Fvfr6eXV0tw5tp9XUfLG7d3MfAgj4CUQSvJn5pWYP07/5xm3ufVhNz2pv7GVqnllfV+feS/XukXe5F5zy3Q/WrB6cDHNh/ZqQrwgggAACCPSKAD2kvcKevA/taN6mFQ3vugBu1eTaeq0de5MXIyV9nOZvvVH/cU+eai+c1E/2/EaPL8lUiidFyl9r8Nevc8WrZuuXdn3w5rtqU2Y3tn7p0MVjm1S44Kgrlz5K+/YaPV+Tq4HeB3keyG8EEIilwD7XVjiew7Myr/lueiTvuece3fmtkT3Se1pRXu5dJddTHt/fZl5sv379fE/xGQEEEEAAAQTiJEBAGidYsg0m0K73fnXS1f/pOgbcpyn3XA1GvalTBmnE3/ZXrWse6r9f/KP+03Xhapx4s+7JGaE+x0wg6QpJj+/W/vM5yh/U13t7ZB8+0CuHX78y8rddFzu+oH5XHxJZFqRCAIGoBMxwXROEBjtMj+SB/QfcP0O/PlRmbmqowwyx/cMf/hBw+U+X/qTf/e6s+/z3Hngg7DYsI+8aGVAWExQ/8MDf6eFHHrFmG54ABE4ggAACCCBgoQABqYWNZm+R+2hgQYPOF4SpQdvr+tlxM5S2j77S/wZ1HlOeov7ZkzUh7Rfa3eoKSdtP6pnaE5pUOU7RLG3U0fwT/eiY6WU1R6pG5YzsRi/r5bv5LwIIRCZghvT++l/OuIfCHvv5UXfwGezOcMGoSW/me5avLQt2q/dc5h13hA1Ix4zJcufhCULHZmdr1OhR3vv5gAACCCCAAAI9J0BA2nPWPCmsgM+quybYTMvTilnf9OkdvXJz6igVzMjUgbWvuXo429XasEpLv/W1wAWQQj3LtaBS9fLnL/fSmjRp9+mh7JtDpeY8AgjEUMAEpWZbGPNTvWGDzKq2TY1N+j+/+Y27x9J3C5lQj33/wvuhLnnPm97ScIfZS9VsWdNV8BsuD64hgAACCCCAQGwECEhj40gu3RVob9LS26Zrt3f9on66Lbdcy4snKyM12Djavho0fbkW/q9clZ8y28W4FkBa8Jhmf/S01hdkhu0p7Wg5rGU/WKqd3tV9XfNYy+YpK+hzulsh7kMAgUgFTEDoGxRGssDRe++912X2ZuhuVz2evs/tMkMSIIAAAggggEDcBAhI40ZLxhEJXDins95g1NxxSWcayrTyCzfo6dU5wRcaShmmx9fP1ZHvlqnZvQWMa7uYtZM08sVczXvgLt05+QGfYLZDbc0vas/Lh/RMzTFd3SHVtZhRbomW+iyqFFF5SYQAAnETMD2XXR1Li4o0Z+4TQZP1u74f8z+DynASAQQQQAAB5woQkDq3bZKjZOkFOvDOlUmlbc3aXbZCTzac1pmf/lAP/0cfvRRifmjKoOmqb5AWFa5Xoxni6zraTzeo0vWjtfO6sHP1wj5U4Qp4o5t72kWmXEYAgR4QiCRo7YFi8AgEEEAAAQQQiJFA5zVjYpQp2SDQLYHUDE2u3KbnCzNcSxqZ+aFV2tr8aYisUpSaUaC6I7tUkXu7K32ER1q25mx7QXvLQvS+RpgNyRBAAAEEEEAAAQQQQODaBeghvXZDcoipQH9l5j+iUfXNamz/V/3Try5IGUNDP8EdxL6gycXN2rf7V/rwrUPa4Ophvdxn6rltgMYWPqJvDb5Tkx7MCDvP1HMHvxFAAAEEEEAAAQQQQCD+Ap/7L9cR/8fwBASiEXhT9X83XuWnP1Pf3G16ozIr8h7QaB5DWgR6WGDQwHTvE4tKipVfEG4PJG9SPiCAAAIIIIAAAgkrwJDdhG1aB1es7bSams1eoyGOjkv66KOOEBc5jQACCCCAAAIIIIAAAokiQECaKC1pRT1+r30zMjTom+NVuOkVhQxJ297VWx+YQbep+ttvfZ3eUSvalkIigAACCCCAAAIIIBC9AAFp9Gbc0W2Bm3VPzgh3gNl+7B+0vvHDwJw6zmtf0QbX/FHXpT4jdN+YmwPTcAYBBBBAAAEEEEAAAQQSQoCANCGa0ZZKpKj/hPlaOLyfq8DvandxkSr3NqvtSvE7Wo7qqZmPadHLroWMNEDjKpZofP8UWypHORFAAAEEEEAAAQQQQCBKAVbZjRKM5NcokDJMj1dXqOUHS7Xz9DHVLjA//nm6VsUteVoVDw4S4ai/Dd8RQAABBBBAAAEEEEgcAXpIE6ctralJSnqO1u5/QfXLZmpsmu8OomZ7lpWqbzqquoJMtmexpkUpKAIIIIAAAggggAAC3ROgh7R7btx1rQIp6cqaXuT+udasuB8BBBBAAAEEEEAAAQTsFKCH1M52o9QIIIAAAggggAACCCCAgPUCBKTWNyEVQAABBBBAAAEEEEAAAQTsFCAgtbPdKDUCCCCAAAIIIIAAAgggYL0AAan1TUgFEEAAAQQQQAABBBBAAAE7BQhI7Ww3So0AAggggAACCCCAAAIIWC9AQGp9E1IBBBBAAAEEEEAAAQQQQMBOAQJSO9uNUiOAAAIIIIAAAggggAAC1gsQkFrfhFQAAQQQQAABBBBAAAEEELBTgIDUznaj1AgggAACCCCAAAIIIICA9QIEpNY3IRVAAAEEEEAAAQQQQAABBOwUICC1s90oNQIIIIAAAggggAACCCBgvQABqfVNSAUQQAABBBBAAAEEEEAAATsFCEjtbDdKjQACCCCAAAIIIIAAAghYL0BAan0TUgEEEEAAAQQQQAABBBBAwE4BAlI7241SI4AAAggggAACCCCAAALWCxCQWt+EVAABBBBAAAEEEEAAAQQQsFOAgNTOdqPUCCCAAAIIIIAAAggggID1AgSk1jchFUAAAQQQQAABBBBAAAEE7BQgILWz3Sg1AggggAACCCCAAAIIIGC9AAGp9U1IBRBAAAEEEEAAAQQQQAABOwUISO1sN0qNAAIIIIAAAggggAACCFgvQEBqfRNSAQQQQAABBBBAAAEEEEDATgECUjvbjVIjgAACCCCAAAIIIIAAAtYLEJBa34RUAAEEEEAAAQQQQAABBBCwU4CA1M52o9QIIIAAAggggAACCCCAgPUCBKTWNyEVQAABBBBAAAEEEGRLBBUAABZQSURBVEAAAQTsFCAgtbPdKDUCCCCAAAIIIIAAAgggYL0AAan1TUgFEEAAAQQQQAABBBBAAAE7BQhI7Ww3So0AAggggAACCCCAAAIIWC9AQGp9E1IBBBBAAAEEEEAAAQQQQMBOAQJSO9uNUiOAAAIIIIAAAggggAAC1gsQkFrfhFQAAQQQQAABBBBAAAEEELBTgIDUznaj1AgggAACCCCAAAIIIICA9QIEpNY3IRVAAAEEEEAAAQQQQAABBOwUICC1s90oNQIIIIAAAggggAACCCBgvQABqfVNSAUQQAABBBBAAAEEEEAAATsFCEjtbDdKjQACCCCAAAIIIIAAAghYL0BAan0TUgEEEEAAAQQQQAABBBBAwE4BAlI7241SI4AAAggggAACCCCAAALWCxCQWt+EVAABBBBAAAEEEEAAAQQQsFOAgNTOdqPUCCCAAAIIIIAAAggggID1AgSk1jchFUAAAQQQQAABBBBAAAEE7BQgILWz3Sg1AggggAACCCCAAAIIIGC9AAGp9U1IBRBAAAEEEEAAAQQQQAABOwUISO1sN0qNAAIIIIAAAggggAACCFgvQEBqfRNSAQQQQAABBBBAAAEEEEDATgECUjvbjVIjgAACCCCAAAIIIIAAAtYLEJBa34RUAAEEEEAAAQQQQAABBBCwU4CA1M52o9QIIIAAAggggAACCCCAgPUCBKTWNyEVQAABBBBAAAEEEEAAAQTsFCAgtbPdKDUCCCCAAAIIIIAAAgggYL0AAan1TUgFEEAAAQQQQAABBBBAAAE7BQhI7Ww3So0AAggggAACCCCAAAIIWC9AQGp9E1IBBBBAAAEEEEAAAQQQQMBOAQJSO9uNUiOAAAIIIIAAAggggAAC1gsQkFrfhFQAAQQQQAABBBBAAAEEELBTgIDUznaj1AgggAACCCCAAAIIIICA9QIEpNY3IRVAAAEEEEAAAQQQQAABBOwUICC1s90oNQIIIIAAAggggAACCCBgvQABqfVNSAUQQAABBBBAAAEEEEAAATsFCEjtbDdKjQACCCCAAAIIIIAAAghYL0BAan0TUgEEEEAAAQQQQAABBBBAwE4BAlI7241SI4AAAggggAACCCCAAALWCxCQWt+EVAABBBBAAAEEEEAAAQQQsFOAgNTOdqPUCCCAAAIIIIAAAggggID1AgSk1jchFUAAAQQQQAABBBBAAAEE7BQgILWz3Sg1AggggAACCCCAAAIIIGC9AAGp9U1IBRBAAAEEEEAAAQQQQAABOwUISO1sN0qNAAIIIIAAAggggAACCFgvQEBqfRNSAQQQQAABBBBAAAEEEEDATgECUjvbjVIjgAACCCCAAAIIIIAAAtYLEJBa34RUAAEEEEAAAQQQQAABBBCwU4CA1M52o9QIIGCZwJ/+9CfLSkxxEUAAAQQQQACB+AsQkMbfmCcggECSCxx+6bAmjh+v6667TjfeeGOSa1B9BBBAAAEEEEDgqsAXrn7kEwIIIIBALAXOvXVOFeXlamps9Gb7ySefuIPSz3+Ovwd6UfiAAAIIIIAAAkkrQECatE1PxRFAIF4CZnhu9foqPbd9e8Ajvnzjl7Vy9Wrl3J8TcI0TCCCAAAIIIIBAsgkQkCZbi1NfBBCIq0B9XZ221NTo448+DnhOUUmxpubl6frrrw+4xgkEEEAAAQQQQCAZBQhIk7HVqTMCCMRc4MTxE1q1coXePv92QN4TJk7QoiVLlJaWFnCNEwgggAACCCCAQDILEJAmc+tTdwQQuGaB1tZWlRaXdJon6sl0eOZwFZeWKiMjw3OK3wgggAACCCCAAAI+AgSkPhh8RAABBCIVMPNEt9Zu1eaNGwNuMfNEFy1eoilTpwRc4wQCCCCAAAIIIIDAVQEC0qsWfEIAAQQiEti1c5fWV64LOk90zty5mjlrJvNEI5IkEQIIIIAAAggkuwABabK/AdQfAQQiFmhubtbihQuDzhPNGjtWa8rWMk80Yk0SIoAAAggggAACEgEpbwECCCDQhUC4eaJfG/Q1VVZVMU+0C0MuI4AAAggggAACwQQISIOpcA4BBBBwCZh5ojt37FD52rIADzNPdHZhofILCgKucQIBBBBAAAEEEEAgMgEC0sicSIUAAkkmcPilw1r2ZGnQeaLTHn1UCxYtZJ5okr0TVBcBBBBAAAEEYi9AQBp7U3JEAAGLBcw80bI1a3Tq5KmAWph5okuLijR4yOCAa5xAAAEEEEAAAQQQiF6AgDR6M+5AAIEEFDDzRNevW6cD+w8E1M7ME503f4Fy7s8JuMYJBBBAAAEEEEAAge4LEJB23447EUAgAQQ880S31NQEDM/1zBOdmpfH8NwEaGuqgAACCCCAAALOEyAgdV6bUCIEEOghATNPdMNT1UG3cTHzRGcVzmYblx5qCx6DAAIIIIAAAskpQECanO1OrRFIagEzT3Tzxk1qamwMcBieOVzFpaVs4xIgwwkEEEAAAQQQQCD2AgSksTclRwQQcKiAmSdaW7NFz23fHlBCMzx31eo1zBMNkOEEAggggAACCCAQPwEC0vjZkjMCCDhIoL6uTsHmiZoiFpUUi3miDmosioIAAggggAACSSNAQJo0TU1FEUhOgRPHT2jVyhVB54lOmDhBi5YsYZ5ocr4a1BoBBBBAAAEEHCBAQOqARqAICCAQe4Fzb51TRXl50HmiZhuXyqoq5onGnp0cEUAAAQQQQACBqAQISKPiIjECCDhdwGzjUr2+KuQ80UWLl2jK1ClOrwblQwABBBBAAAEEkkKAgDQpmplKIpAcArt27tL6ynUB+4ma2s+ZO1czZ81kP9HkeBWoJQIIIIAAAghYIkBAaklDUUwEEAgtYLZxWbxwYdB5olljx2ppUZEGDxkcOgOuIIAAAggggAACCPSKAAFpr7DzUAQQiIWA2caltLgk5DzRZctXaNToUbF4FHkggAACCCCAAAIIxEGAgDQOqGSJAALxFTDzRLfWbtXmjRsDHmT2E51dWKj8goKAa5xAAAEEEEAAAQQQcJYAAamz2oPSIIBAFwKHXzqsZU+WBp0nOu3RR7Vg0ULmiXZhyGUEEEAAAQQQQMApAgSkTmkJyoEAAmEFzDzRsjVrdOrkqYB0Zp7onLlPsI1LgAwnEEAAAQQQQAABZwsQkDq7fSgdAkkvYOaJrl+3Tgf2HwiwMPuJzpu/QDn35wRc4wQCCCCAAAIIIICA8wUISJ3fRpQQgaQUMPNEd+7YofK1ZQH198wTnZqXx/DcAB1OIIAAAggggAAC9ggQkNrTVpQUgaQRCDdPdMLECVq0ZInS0tKSxoOKIoAAAggggAACiSpAQJqoLUu9ELBQwMwT3bxxU9BtXIZnDldxaSnzRC1sV4qMAAIIIIAAAgiEEiAgDSXDeQQQ6DEBM0+0tmaLntu+PeCZZnjuqtVrmCcaIMMJBBBAAAEEEEDAfgECUvvbkBogYK2AZ57olpqaoNu4zJk7VzNnzWSeqLUtTMERQAABBBBAAIHwAgSk4X24igACcRI4cfyEVq1cobfPvx3wBLONy5qytcwTDZDhBAIIIIAAAgggkFgCBKSJ1Z7UBgHHC5x765wqysuDzhM127hUVlUxT9TxrUgBEUAAAQQQQACB2AgQkMbGkVwQQKALATM8t3p9Vch5oosWL9GUqVO6yIXLCCCAAAIIIIAAAokkQECaSK1JXRBwqEB9XZ1CzROd9uijWrBoIfNEHdp2FAsBBBBAAAEEEIinAAFpPHXJO7kFWuo0IatMZ9wKI1TU9Lzy0/tEYdKmpsX3Kb+h1X1P39xteqMyS9HkEMXDfJJeVPPegzr54Vkdqm7QmXafS+qn23IL9L0htyhz8gPKSE3xvRj087js7JDzRJcWFWnwkMFB7+MkAggggAACCCCAQOILEJAmfhtTQwQiE+hoUdO2LfpRpX8Q6nv7JZ1peOpykL22WmOfWKaSeeM0MExcOmXqVJWvLfNmYuaJLlu+QqNGj/Ke4wMCCCCAAAIIIIBAcgp8PjmrTa0RQMBXoKPlsEomjlf+2nDBqO8d5vMFNW6aqe9OXKmft3zmf9H7Pb+gQMMzh8vsJ1pUUqyjx44RjHp1+IAAAggggAACCCS3AD2kyd3+1B4BdbQ0aE5eqY62+ozNTcvWrBljNOLeScpK73tVyfSibj+knx2o0+7Tl9zn208/q1l5f1b9kdXKCjGEd+Pmze60aWlpV/PiEwIIIIAAAggggEDSC9BDmvSvAABJLdB2VCWdgtEBGluyRydfq9figkc6B6MGKiVdWdPnquJgkxoKM67OZ23do9KyRrWFwDSBKMFoCBxOI4AAAggggAACSSxAQJrEjU/Vk13gUzXXVmm3t2d0gMZVP6stBZlK7ZKmvzKX1Kom99YrKdvV2lClrc2fdnknCRBAAAEEEEAAAQQQ8AgQkHok+I1AsglcPKIf1795pdZ9lJa7TBUPDlKY9Yn8hG5SVnGJJqd51v1t0Usv/1Ydfqn4igACCCCAAAIIIIBAKAHmkIaS4TwCCS3QoYu/OKITnmmjfTL1+KxREfSM+qGkjtLssgp9Jz0ncHivX1K+IoAAAggggAACCCDgL0BA6i/CdwSSQuADvXL4dXnj0dGTNXGQz+JFERv01cCx39fAiNOTEAEEEEAAAQQQQACBqwIM2b1qwScEkkeg/Xf65196liDqq2Ejv6H+yVN7aooAAggggAACCCDgEAF6SB3SEBQj0QVeV3nWUJU7pZoXzumsd+vQVA0b9FdOKRnlQAABBBBAAAEEEEgiAXpIk6ixqSoCwQVu0I1f/mLwS5xFAAEEEEAAAQQQQCCOAgSkccQlawTsEPhL3ZjqWSnXjhJTSgQQQAABBBBAAIHEEGDIbmK0I7VwvMAIFTU9r/z0aAK/NjUtvk/5Da1xrt17OtfyiZTe9e6jcS4I2SOAAAIIIIAAAggkmQA9pEnW4FQ3EQU61NZ8QLWLx2vYwHQNcv8M1d0zyvVMY0vwfUFv6K+boomNE5GNOiGAAAIIIIAAAgj0ugABaa83AQVA4FoELurkuskaOXGeKhtOe7dxketT67GtWjP9Oxo9s0HvdPg9I/VWDbnZE5Fe1Kuvnw8euPrdFvRr22k1NV8MeomTCCCAAAIIIIAAAgiEEyAgDafDNQQcLeDqGW2s1t/XNLvCz3667aHNOna+Reffcf2cb1T9E9lKM4Hpy2u0cNvZzgFnyl9r8Nevu1K7dn3w5rvybAITXZU7dPHYJhVOvMPVM+vqlQ0W/EaXIakRQAABBBBAAAEEkkiAgDSJGpuqJphAxxvaumyPWtVHabnVerYsRwNTrtQxJV1ZC/9BmwqHuk5cUvP2F3S6Uy/pzbonZ4TrzstH+/Hd2n/euw/MlbOR/PpArxx+/UrPbLsudnxB/TxliOR20iCAAAIIIIAAAggktQABaVI3P5W3WuBfT+mfLrS7qpCu8Xl3K3BJoi/pGyO+qb6mkv/+kdr+07e2KeqfPVkT0q6EpO0n9Uztiah7STuaf6IfHfP0raZqVM5I9fd9DJ8RQAABBBBAAAEEEAgjQEAaBodLCDhaIL1AB8zw3Hd+psUZXwpS1A/1j0f+t9z9nl+5Uan+/7enjlLBjMwrvaSuob0Nq7R0bxRzSdteVfXy53XB8+S0+/RQ9s2eb/xGAAEEEEAAAQQQQKBLAf9/onZ5AwkQQMDpAp5Vd/NV2PCuq7C3avKq6coIGErbV4OmL9fC4f2uVOiCji54TLPrTnbZU9rRclgl02ap9vSlK/e6nlE2T1mpAQ9xOhblQwABBBBAAAEEEOhFAfYh7UV8Ho1AbAUC9y3tc3ueKlYu0OSMEANpU4bp8fVzdeS7ZWo2o39d/Z2Naydp5Iu5mvfAXbpz8gPK8AaZJtB9UXtePqRnao655q56DjOHtURLx97kOcFvBBBAAAEEEEAAAQQiEiAgjYiJRAjYIPBvOn/WM5/zcnnbT+/Qk8v/m778oyW6N909mzSgIimDpqu+QVpUuF6Nre6oVO2nG1Tp+tHaeQHpO58wq/tW6OnV44LMYe2ckm8IIIAAAggggAACCPgLMGTXX4TvCFgrMFT5B397eduXd36lPZV5us21ZlH76Wc1K2+Vmto6LbPrU8sUpWYUqO7ILlXk3u5dedcnQfCPadmas+0F7fVd3Td4Ss4igAACCCCAAAIIIBBUgIA0KAsnEbBdoL8yclfr2Z1PuINSte7Rito3Ou9F6l/F1AxNrnxBZ9/Yp/UlxVocNDgdoLGFS1VUvU8nX6vX/LHpYtaoPyTfEUAAAQQQQAABBCIV+Nx/uY5IE5MOAQRsE/i99s24X4vM1iy3F+vYwQINtK0KlBcBBBBAAAEEEEAgYQXoIU3YpqViCBiBmzR85JDLFG+eU8vlKaLQIIAAAggggAACCCDgCAECUkc0A4VAoLsCF9XceDrMNi3t+vij/9vdzLkPAQQQQAABBBBAAIG4ChCQxpWXzBGIl0CHLu6dqWED79CkWZvUeDHUgkVtannz39yF6HP3t3S7a5EjDgQQQAABBBBAAAEEnCJAQOqUlqAcCEQlkKL+Y76rUSbAbP+Fqtc1Bukl/Uzv7C1XtZk/6tqUZVTOSIXYjTSqJ5MYAQQQQAABBBBAAIFYCRCQxkqSfBDoaYH+OVq6eKRrm5Z2tTas0qJ1+9Ts2dqlo0VNVU/o4QWH1OpKkfbtIpVM+O89XUKehwACCCCAAAIIIIBAWAFW2Q3Lw0UEHC7gCjx//uQP9cRPT7vC0mCHKxjNXqRN1dOVkcoGLcGEOIcAAggggAACCCDQewIEpL1nz5MRiJGAa2huY4Manq9T7bELV/I0gejjyn94qqaxV2iMnMkGAQQQQAABBBBAINYCBKSxFiU/BBBAAAEEEEAAAQQQQACBiASYQxoRE4kQQAABBBBAAAEEEEAAAQRiLUBAGmtR8kMAAQQQQAABBBBAAAEEEIhIgIA0IiYSIYAAAggggAACCCCAAAIIxFqAgDTWouSHAAIIIIAAAggggAACCCAQkQABaURMJEIAAQQQQAABBBBAAAEEEIi1AAFprEXJDwEEEEAAAQQQQAABBBBAICIBAtKImEiEAAIIIIAAAggggAACCCAQawEC0liLkh8CCCCAAAIIIIAAAggggEBEAgSkETGRCAEEEEAAAQQQQAABBBBAINYCBKSxFiU/BBBAAAEEEEAAAQQQQACBiAQISCNiIhECCCCAAAIIIIAAAggggECsBQhIYy1KfggggAACCCCAAAIIIIAAAhEJEJBGxEQiBBBAAAEEEEAAAQQQQACBWAsQkMZalPwQQAABBBBAAAEEEEAAAQQiEiAgjYiJRAgggAACCCCAAAIIIIAAArEWICCNtSj5IYAAAggggAACCCCAAAIIRCRAQBoRE4kQQAABBBBAAAEEEEAAAQRiLUBAGmtR8kMAAQQQQAABBBBAAAEEEIhIgIA0IiYSIYAAAggggAACCCCAAAIIxFqAgDTWouSHAAIIIIAAAggggAACCCAQkQABaURMJEIAAQQQQAABBBBAAAEEEIi1AAFprEXJDwEEEEAAAQQQQAABBBBAICIBAtKImEiEAAIIIIAAAggggAACCCAQawEC0liLkh8CCCCAAAIIIIAAAggggEBEAv8fEBRZNmk1qY0AAAAASUVORK5CYII=" alt></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>Predict the number of signals and relative integration you would expect to see in the nuclear magnetic resonance spectroscopy (<sup>1</sup>H NMR) spectrum for the circled portion in the structure.</p>
<p style="text-align: center;"><img 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" alt></p>
<p>Number of signals:</p>
<p>Relative integration:</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>Oseltamivir is a chiral compound.</p>
<p>(i) Identify an apparatus that can be used to distinguish between its enantiomers.</p>
<p>(ii) Explain how the differentiation between the enantiomers is obtained using this apparatus.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br>