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<h2>HL Paper 3</h2><div class="specification">
<p><span style="background-color: #ffffff;">Nanotechnology has allowed the manipulation of materials on the atomic level.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Describe the structure and bonding of a carbon nanotube.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Structure:</span></p>
<p><span style="background-color: #ffffff;">Bonding:</span></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><span style="background-color: #ffffff;">Suggest <strong>one</strong> application for carbon nanotubes.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Structure</em>:<br>giant covalent/network covalent <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Bonding</em>:<br>each carbon covalently bonded to 3 other carbons<br><em><strong>OR</strong></em><br>each bond has order of 1.5 <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “cylindrical/tube shaped”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “has delocalized electrons” <strong>OR</strong> “has sp2 hybridization”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>3D electrodes <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">catalysts <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">biosensors <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">molecular stents <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">body armour <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">synthetic muscles <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">micro transistors/circuitry/capacitors/electrodes <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">reinforcing phase in a matrix/composite material «such as concrete» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">micro antenna <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">stealth technology <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">water/air filtration <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">solar cells <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">tennis racquets <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">microelectronic circuits <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Do <strong>not</strong> accept just general answers such as “medicine” or “defence”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Describing the structure and bonding of a carbon nanotube was generally answered satisfactorily, although some candidates simply said the bonding was covalent with no further detail.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were some vague responses for applications of carbon nanotubes when specific details were needed to score the mark in (b).</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Technetium-99m, a widely used radionuclide, has a half-life of 6.0 hours and undergoes gamma decay to technetium-99.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Most of the nuclear waste generated in a hospital is low-level waste (LLW).</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the percentage of technetium-99m remaining after 24.0 hours.</span></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><span style="background-color: #ffffff;">Technetium-99 decays further, emitting beta radiation. Formulate the equation for the decay of technetium-99.</span></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><span style="background-color: #ffffff;">Outline what is meant by low-level waste.</span></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><span style="background-color: #ffffff;">Outline the disposal of LLW.</span></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><span style="background-color: #ffffff;">Magnetic resonance imaging (MRI) is an application of NMR technology using radiowaves.</span></p>
<p><span style="background-color: #ffffff;">Suggest why MRI is much less dangerous than imaging techniques such as X-rays and radiotracers. Use section 3 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em><strong>Alternative 1</strong></em><br>half-lives = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{24}}{{6.0}}">
<mfrac>
<mrow>
<mn>24</mn>
</mrow>
<mrow>
<mn>6.0</mn>
</mrow>
</mfrac>
</math></span> =» 4.0 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«N(t) (%) = 100(0.5)<sup>4</sup> =» 6.3 «%» <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “6.25 «%»”.</span></em></p>
<p><span style="background-color: #ffffff;"><br><em><strong>Alternative 2</strong></em><br><em>λ =</em>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\ln 2}}{{{t_{\frac{1}{2}}}}} = \frac{{\ln 2}}{{6.0}}">
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mrow>
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mrow>
<mn>6.0</mn>
</mrow>
</mfrac>
</math></span>» 0.116 hour<sup>–1</sup> <strong><em>OR</em></strong> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{N_t}}}{{{N_0}}}">
<mfrac>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mi>t</mi>
</msub>
</mrow>
</mrow>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mn>0</mn>
</msub>
</mrow>
</mrow>
</mfrac>
</math></span>=e<sup>–0.116 × 24</sup> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">6.3 «%» <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><sup>99</sup>Tc → <sup>99</sup>Ru + β<sup>–</sup></span></p>
<p><span style="background-color: #ffffff;"><br>Ru <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">mass number of Ru <em><strong>AND</strong> </em>beta product <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “e/e<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">–</span>/<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{0}{{ - 1}}">
<mfrac>
<mn>0</mn>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</mfrac>
</math></span> e<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">”</span> for “<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">β</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">–</sup>”.</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">small/low amounts of radiation <em><strong>AND</strong> </em>for a short time <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “weakly ionizing radiation” instead of “small amounts of radiation”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “short half-lives” instead of “for a short time”.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">stored in shielded containers until radiation level drops «to a safe level» <strong>[✔]</strong></span></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">lower frequency/longer wavelength/lower energy<br><em><strong>OR</strong></em><br>does not use ionizing radiation/radionuclides <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Do <strong>not</strong> accept “does not cause cancer”.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly determined the % of technetium-99m remaining after 24.0 hours. Some candidates did not read the question properly and forgot to convert to a percentage.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A common incorrect answer was to give Tc as a product or to give an incorrect symbol for beta radiation. Most candidates scored a mark for the correct mass number of the product and beta radiation.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Low level nuclear waste was poorly outlined with many superficial responses. Many candidates only gave half the required answer.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Outlining the disposal of LLW was also challenging with many candidates saying that it should be put in a container without saying the container should be shielded.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Suggesting why MRI is less dangerous than using X-rays and radiotracers was mostly answered well, but some candidates were confused and linked longer wavelengths with higher energy.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">The discovery of penicillins contributed to the development of antibiotics.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain how the beta-lactam ring is responsible for the antibiotic properties of penicillin. Refer to section 37 of the data booklet.</span></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><span style="background-color: #ffffff;">Outline the impact of antibiotic waste on the environment.</span></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><span style="background-color: #ffffff;">Suggest a concern about the disposal of solvents from drug manufacturing.</span></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><span style="background-color: #ffffff;">Discuss <strong>two</strong> difficulties, apart from socio-economic factors, associated with finding a cure for AIDS.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">ring is «sterically» strained<br><em><strong>OR</strong></em><br>angles of 90° instead of 109.5/109/120° angles<br><em><strong>OR</strong></em><br>angles smaller than 109.5/109/120°/tetrahedral/trigonal planar/triangular planar angle ✔</span></p>
<p><span style="background-color: #ffffff;">ring breaks up/opens/reacts «easily»<br><em><strong>OR</strong></em><br>amido/amide group «in ring» is «highly» reactive ✔</span></p>
<p><span style="background-color: #ffffff;">«irreversibly» binds/bonds to enzyme/transpeptidase<br><em><strong>OR</strong></em><br>inhibits enzyme/transpeptidase «in bacteria» that produces cell walls<br><em><strong>OR</strong></em><br>prevents cross-linking of «bacterial» cell walls ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept arguments using correct descriptions of hybridization for M1.<br>Do <strong>not</strong> accept "breaks/binds to cell walls" – a reference to the enzyme is needed for alternatives 1 and 2 for M3. <br>Do <strong>not</strong> accept "cell membrane" for "cell wall".</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«leads to bacterial» resistance «to antibiotics»<br><em><strong>OR</strong></em><br>destroys useful/beneficial bacteria<br><em><strong>OR</strong></em><br>useful/beneficial/less harmful bacteria replaced with «more» harmful bacteria ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept “affects/disturbs micro-ecosystems”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>«most are» toxic «to living organisms»<br><em><strong>OR</strong></em><br>incomplete combustion/incineration can produce toxic products/dioxins/phosgene<br><em><strong>OR</strong></em><br>carcinogenic/can cause cancer ✔<br><em>NOTE: Do <strong>not</strong> accept “harmful to the environment”.</em><br></span></p>
<p><span style="background-color: #ffffff;">accumulate in groundwater<br><em><strong>OR</strong></em><br>have limited biodegradability ✔<br><em>NOTE: Do <strong>not</strong> accept just “pollutes water”.</em><br></span></p>
<p><span style="background-color: #ffffff;">cost of disposal ✔<br><em>NOTE: Do <strong>not</strong> accept “hazard of disposal”.</em><br></span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept “ozone depletion” only if there is some reference to chlorinated solvents.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br></span></p>
<p><span style="background-color: #ffffff;">HIV difficult to detect/remains dormant ✔<br></span></p>
<p><span style="background-color: #ffffff;">HIV mutates rapidly/quickly ✔<br></span></p>
<p><span style="background-color: #ffffff;">HIV replicates rapidly/quickly ✔<br></span></p>
<p><span style="background-color: #ffffff;">HIV destroys «T-»helper cells/white blood cells/lymphocytes<br><em><strong>OR</strong></em><br>HIV attacks immune system ✔<br></span></p>
<p><span style="background-color: #ffffff;">HIV has several «significantly different» strains/subtypes ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept “virus” for “HIV”.<br>Do <strong>not</strong> accept “AIDS mutates” without mention of the HIV/virus.<br>Penalize the use of “AIDS” for “HIV” once only.<br>Accept “HIV metabolism linked to that of host cell” <strong>OR</strong> “drugs harm host cell as well as HIV”.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Proteins have structural or enzyme functions.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Oil spills are a major environmental problem.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Some proteins form an α-helix. State the name of another secondary protein structure.</span></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><span style="background-color: #ffffff;">Compare and contrast the bonding responsible for the two secondary structures.</span></p>
<p><span style="background-color: #ffffff;">One similarity:</span></p>
<p><span style="background-color: #ffffff;">One difference:</span></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><span style="background-color: #ffffff;">Explain why an increase in temperature reduces the rate of an enzyme-catalyzed reaction.</span></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><span style="background-color: #ffffff;">State and explain how a competitive inhibitor affects the maximum rate, V<sub>max</sub>, of an enzyme-catalyzed reaction.</span></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><span style="background-color: #ffffff;">Suggest <strong>two</strong> reasons why oil decomposes faster at the surface of the ocean than at greater depth.</span></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><span style="background-color: #ffffff;">Oil spills can be treated with an enzyme mixture to speed up decomposition.</span></p>
<p><span style="background-color: #ffffff;">Outline <strong>one</strong> factor to be considered when assessing the greenness of an enzyme mixture.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>β/<span style="background-color: #ffffff;">beta pleated/sheet <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>One similarity:</em><br>hydrogen bonding<br><em><strong>OR</strong></em><br>attractions between C=O and N–H «on main chain» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>One difference:</em><br>α-helix has hydrogen bonds between amino acid residues that are closer than β-pleated sheet<br><em><strong>OR</strong></em><br>H-bonds in α-helix parallel to helix axis <em><strong>AND</strong> </em>perpendicular to sheet in β-pleated sheet<br><em><strong>OR</strong></em><br>α-helix has one strand <em><strong>AND</strong> β</em>-pleated sheet has two «or more» strands<br><em><strong>OR</strong></em><br>α-helix is more elastic «since H-bonds can be broken easily» <em><strong>AND</strong> </em>β-pleated sheet is less elastic «since H-bonds are difficult to break» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept a diagram which shows </span><span style="background-color: #ffffff;">hydrogen bonding between O of C=O </span><span style="background-color: #ffffff;">and H of NH groups for M1.<br></span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “between carbonyl/amido/amide/carboxamide” but not “between amino/amine” for M1.</span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">enzyme denatured/ loss of 3-D structure/conformational change<br><em><strong>OR</strong></em><br>«interactions responsible for» for tertiary/quaternary structures altered <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">shape of active site changes<br><em><strong>OR</strong></em><br>fewer substrate molecules fit into active sites <strong>[✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">V<sub>max</sub> unchanged <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">at high substrate concentration substrate outcompetes inhibitor/need a higher<br>substrate concentration to reach V<sub>max</sub> <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept suitable labelled diagram.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br>surface water is warmer «so faster reaction rate»/more light/energy from the sun <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">more oxygen «for aerobic bacteria/oxidation of oil» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">greater surface area <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>non-hazardous/toxic to the environment/living organisms <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">energy requirements «during production» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">quantity/type of waste produced «during production»<br><em><strong>OR</strong></em><br>atom economy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">safety of process <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “use of solvents/toxic materials «during production»”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “more steps involved”.</span></em></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered with many scoring the mark although there were quite a few incorrect responses that answered “beta-helix” rather than “beta-pleated sheet”.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Almost all the candidate’s stated hydrogen bonding as the similarity between the 2 types of secondary structures but lost marks on the difference between them.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered where most candidates received one mark for identifying that the enzyme will denature with an increase in temperature. However, many candidates did not continue with the explanation that the shape of the active site changes.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates stated correctly that Vmax remains unchanged but only some mentioned that a higher substrate concentration was required to reach Vmax for the second mark.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates received two marks for this part while some candidates only suggested one reason or repeated the same reason (for example - heat and energy from the sun) even though the question clearly asked for two reasons.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The candidates struggled with this part and gave journalistic or vague answers that cannot be awarded marks. Atom economy was mentioned correctly by a few candidates.</p>
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about nuclear reactions.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Fission of a nucleus can be initiated by bombarding it with a neutron.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the other product of the fission reaction of plutonium-239.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span class="mjpage mjpage__block"><math xmlns="http://www.w3.org/1998/Math/MathML" display="block" alttext="{}_{94}^{239}{\text{Pu + }}{}_0^1{\text{n}} \to {}_{54}^{134}{\text{Xe + }}.................{\text{ + 3}}_0^1{\text{n}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>94</mn>
</mrow>
<mrow>
<mn>239</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Pu + </mtext>
</mrow>
<msubsup>
<mrow>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mrow>
<mtext>n</mtext>
</mrow>
<mo stretchy="false">→</mo>
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>54</mn>
</mrow>
<mrow>
<mn>134</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Xe + </mtext>
</mrow>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<mo>.</mo>
<msubsup>
<mrow>
<mtext> + 3</mtext>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mrow>
<mtext>n</mtext>
</mrow>
</math></span></span></span></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><span style="background-color: #ffffff;">Outline the concept of critical mass with respect to fission reactions.</span></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><span style="background-color: #ffffff;">Outline <strong>one</strong> advantage of allowing all countries access to the technology to generate electricity by nuclear fission.</span></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><span style="background-color: #ffffff;">State <strong>one</strong> advantage of using fusion reactions rather than fission to generate electrical power.</span></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><span style="background-color: #ffffff;">Outline how the energy of a fission reaction can be calculated.</span></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><span style="background-color: #ffffff;">Calculate the half-life of an isotope whose mass falls from 5.0 × 10<sup>−5</sup> g to 4.0 × 10<sup>−5</sup> g in 31.4 s, using section 1 of the data booklet.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{40}^{103}{\text{Zr}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>40</mn>
</mrow>
<mrow>
<mn>103</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Zr</mtext>
</mrow>
</math></span> <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">minimum mass to «self-»sustain chain reaction<br><em><strong>OR</strong></em><br>if mass of fissile material is too small, too many neutrons produced pass out of the nuclear fuel<br><em><strong>OR</strong></em><br>at least one neutron produced causes further reaction <strong>[✔]</strong></span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>reduction in emission of greenhouse gases «from burning fossil fuels» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">economic independence/self-sufficiency «from crude oil/producing states» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span><span style="background-color: #ffffff;"><br></span></p>
<p><span style="background-color: #ffffff;">uranium is more abundant on Earth «in terms of total energy that can be produced from this fuel» than fossil fuels <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept specific greenhouse gases (such as carbon dioxide/CO2) but <strong>not</strong> pollutants or other general statements.</span></em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>fuel is inexpensive/readily available <strong>[✔]</strong><br>no/less radioactive waste is formed <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>lower risk of accidents/large-scale disasters <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>impossible/harder to use for making materials for nuclear weapons <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>larger amounts of energy released per unit mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>does not require a critical mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>can be used continuously <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “higher specific energy for fusion”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “no/less waste produced for fusion”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept specific example for a disaster.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass difference between reactants and products <em><strong>AND</strong> E = mc<sup>2</sup></em> <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«N = N<sub>0</sub>e<sup><em>–<span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">λ</span>t</em></sup>»</span></p>
<p><span style="background-color: #ffffff;"><span style="font-size: 14px;"><em><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">λ</span></em></span>«= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{ - \ln \left( {\frac{N}{{{N_0}}}} \right)}}{t} = \frac{{ - \ln \left( {\frac{{4.0 \times {{10}^{ - 5}}}}{{5.0 \times {{10}^{ - 5}}}}} \right)}}{{31.4{\text{ s}}}}">
<mfrac>
<mrow>
<mo>−</mo>
<mi>ln</mi>
<mo></mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mi>N</mi>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mn>0</mn>
</msub>
</mrow>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</mrow>
<mi>t</mi>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mo>−</mo>
<mi>ln</mi>
<mo></mo>
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mn>4.0</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>5.0</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</mrow>
<mrow>
<mn>31.4</mn>
<mrow>
<mtext> s</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> »</span></p>
<p><span style="background-color: #ffffff;">= 7.106 × 10<sup>–3</sup> s<sup>–1</sup> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{t_{\frac{1}{2}}} = \frac{{\ln 2}}{\lambda }">
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mi>λ</mi>
</mfrac>
</math></span> =» 98/97.5 «s» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This part was well answered.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was also fairly well answered although some candidates missed the concept of minimum mass to sustain a chain reaction.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part saw some reasonable answers, but some other candidates wrote very vague or general answers.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a well-answered question with most candidates referring to fusion having less or no radioactive waste.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most of the candidates were able to state correctly the mass difference between reactants and products and <em>E</em> <em>= mc</em><sup>2</sup>.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates were able to calculate the half-life of an isotope correctly.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Consider the following data for butane and pentane at STP.</span></p>
<p><span style="background-color: #ffffff;"><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" width="534" height="113"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Discuss the data.</span></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><span style="background-color: #ffffff;">Outline what is meant by the degradation of energy.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«similar specific energy and» pentane has «much» larger energy density ✔</span></p>
<p><span style="background-color: #ffffff;"><em>Any two for <strong>[2 max]</strong>:</em> <br>similar number of bonds/«C and H» atoms in 1 kg «leading to similar specific energy» <br><em><strong>OR<br></strong></em> only one carbon difference in structure «leading to similar specific energy» ✔<br><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">NOTE: </span><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Accept “both are alkanes” for M2.</span><br></span></p>
<p><span style="background-color: #ffffff;">pentane is a liquid <em><strong>AND</strong> </em>butane is a gas «at STP» ✔<br><em>NOTE: Accept “pentane would be easier to transport”.</em><br></span></p>
<p><span style="background-color: #ffffff;">1 m<sup>3</sup> of pentane contains greater amount/mass than 1 m<sup>3</sup> of butane ✔<br><em>NOTE: Accept “same volume” for “1 m<sup>3</sup>” and “more moles” for “greater amount” for M4.</em><br></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">energy converted to heat<br><em><strong>OR</strong></em><br>energy converted to less useful/dispersed forms<br><em><strong>OR</strong></em><br>energy converted to forms that have lower potential to do work<br><em><strong>OR</strong></em><br>heat transferred to the surroundings ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Reference to energy conversion/transfer required. Do <strong>not</strong> accept reference to loss of energy.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">New genetically modified organisms (GMO), especially plants, are continually being developed in research laboratories.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline what is meant by genetically modified organisms.</span></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><span style="background-color: #ffffff;">Outline <strong>one</strong> benefit of the use of these products.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">organism whose genetic material/DNA has been altered by genetic engineering techniques «involving transferring DNA between species» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “any living organism that possesses a novel combination of genetic material obtained through the use of modern biotechnology”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>increased resistance to pests/micro-organisms <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increased shelf-life of food <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increased nutritional value <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">greater crop yield <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">greater tolerance of crops to adverse climatic/soil/growing condition <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates had difficulty outline the meaning of genetically modified organisms with many simply repeating the question by stating modified DNA without including technology or engineering techniques.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Outlining one benefit of using GMOs was well answered.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>DNA, deoxyribonucleic acid, is made up of nucleotides.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">List <strong>two</strong> components of nucleotides.</span></span></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><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Explain how the double-helical structure of DNA is stabilized once formed.</span></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two correct for<strong> [1]</strong>:</em><br>pentose «sugar»<br><em><strong>OR</strong></em><br>deoxyribose ✔</span></p>
<p><span style="background-color: #ffffff;">phosphate/phosphato «group»/residue of phosphoric acid ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept “−OPO<sub>3</sub><sup>2−</sup>/−OPO<sub>3</sub>H<sup>−</sup>/−OPO<sub>3</sub>H<sub>2</sub>” but <strong>not</strong> “PO<sub>4</sub><sup>3−</sup>”.</span></em></p>
<p><span style="background-color: #ffffff;">«organic» nitrogenous base<br><em><strong>OR</strong></em><br>nucleobase<br><em><strong>OR</strong></em><br>nucleic base<br><em><strong>OR</strong></em><br>purine<br><em><strong>OR</strong></em><br>pyrimidine ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept the four bases together: “adenine/A, guanine/G, cytosine/C, thymine/T”.<br>Accept names or formulas.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br>H-bonding between bases in each pair ✔<br>hydrophobic interactions/π-stacking between bases ✔<br>polar/charged/hydrophilic groups in sugar-phosphate backbone interactions with aqueous solution/water<br><em><strong>OR</strong></em><br>H-bonding <em><strong>AND</strong> </em>ion-dipole interactions between phosphato «groups» andwater/histones ✔</span></p>
<p><em><span style="background-color: #ffffff;">Accept "phosphate groups are hydrophilic and form H-bonds with water".<br>Accept “H-bonding with histones”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is an energy source composed mainly of methane.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is burned to produce steam which turns turbines in an electricity generating power plant.</span></p>
<p><span style="background-color: #ffffff;">The efficiency of several sources for power plants is given below.</span></p>
<p><img style="margin-right: auto; margin-left: auto; display: block;" src="data:image/png;base64,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" width="363" height="240"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the specific energy of methane, in MJ kg<sup>−1</sup>, using sections 1, 6 and 13 of the data booklet.</span></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><span style="background-color: #ffffff;">Calculate the maximum electric energy output, in MJ, which can be obtained from burning 1.00 kg of methane by using your answer from (a).</span></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><span style="background-color: #ffffff;">Hydroelectric power plants produced 16% of the world’s energy in 2015, down from 21% in 1971.</span></p>
<p><span style="background-color: #ffffff;">Suggest why hydroelectric power production has a higher efficiency than the other sources given in (b) and why its relative use has decreased despite the high efficiency.</span></p>
<p><span style="background-color: #ffffff;">Reason for higher efficiency:</span></p>
<p><span style="background-color: #ffffff;">Reason for decreased use:</span></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><span style="background-color: #ffffff;">Methane can also be obtained by fractional distillation of crude oil.</span></p>
<p><span style="background-color: #ffffff;"><img 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ERERF529uxZrFm9Rv97HxlHj6mye+69Fw0bNUTt2rUxbPhwVUbkKxj+iYiIiDywLiEB82JjVeiXwD8kMhIhd4egevXqxieIfA/DPxEREZEbpLV/SnQ0Nm1MVKF/zNgxuDc01JhL5NsY/omIiIhclJmZiccHDFCt/VOnx6D3I4+gUqVKxlwi38fwT0REROQC6+C/YtV7bO2nMonj/BMRERE5IaP5zJg+3aXg//vvv2Pfvn34eN06o4TId7Dln4iIiMiJV195BYsXLsKcebF4qFcvo7Swc+fOYc3q1Xj15ZlGCdG1w6E+iYiIiDyQnp6Org+Eo//AAZgWE2OUFiat/OPHRqnXXbp1xcO9e6NevXoICAhArVq1VDmRL2D4JyIiInIgevJkvL/yPSR/a7E5jOfiN95Qrf2tWt+DqXrlICgoyJhD5HvY55+IiIjIDmn1l+D/zL8mOgz+0tr/dlwcgz/5PIZ/IiIiIjs+S/pMTXv27Kmm1uSmXjP4z5o9G5UrVzbmEPkudvshIiIisqNzx44IDLwN772/yigp8Fi//sjKOoUP165FjRo1jFIi38aWfyIiIiIbZFx/GdqzR88eRkkBafX/evduDImMZPCnMoXhn4iIiMiGjIwMNb2zWTM1tbZr50417dqtm5oSlRUM/0REREQ2/PLzz2oqw3UW9cW2L9ToPmz1p7KG4Z+IiIjIgQAbN/JKl5+GjRoZ74jKDt7wS0RERGRDo/oN1NTWk1IdzSPyZWz5JyIiIiLyEwz/RERERER+guGfiIiIiMhPMPwTEREREfkJhn8iIiIiIj/B8E9ERERE5CcY/omIiIiI/ATDPxERERGRn2D4JyIiIiLyEwz/RERERER+guGfiIiIiMhPMPwTEREREfmJCprOeE1ERERWMjMzkZOTg64PhBsl5MsSt2xG7dq1UblyZaOkZBrVb6Cmh48eUVNrjuYR+TKGfyIiIkNqaiq+278fO3fuxKaNiUYplTV169dD127d0O6++9CyZUuPKwMM/1QeMfwTEZHf27VrF+bHxiJ5z9fqff0GDRDatg1atWqFh3r1UmXk+z5etw6H0tJw7OhRfPrJRqMUeHriRPTp2wc1atQwSlzD8E/lEcM/ERH5rfT0dDwfHa1CvwT+f0QOQceOHVGzVi3jE1RWnTt3Dod++AHz583H17t3q7LZsXPRKyJCvXYFwz+VRwz/RETkl9YlJGBC1Dj1es68WIR36YJKlSqp91S+7Nu3Dy/P+LeqBHTp1hWzZs92qSsQwz+VRxzth4iI/M4bi95Qwf/B7t3w5Y7tqmsPg3/51bx5c7wd9w6e+ddEdS9H965d1c3cRP6I4Z+IiPyKBP9ZM2eq4C8twOzi4x+kcjds+HCsWPUeMo4ew+MDBuDSpUvGXCL/wfBPRER+IykpqVDwd9TaL11F5AZSKjveW7kSu3ftUv397bk3NDS/AvD0hAlGKZH/YJ9/IiLyC9LNo0Pbdrjn3ntVFxBbwf/333/H5k2bMD92Ho4eYV/usky6+PTp2xfVq1c3SgqTisLzk6PxUsw0DBg40CgtjH3+qTxi+CciIr8QPXky3l/5Hj5N2oJGjRoZpQVO6pWDpyc8rW4KbdX6HvTo2RP3tG6NoKAg4xPk66SCl5GRgU82bFDXWsjN3PaGax09apQaEvSLHdtRy0b3L4Z/Ko/Y7YeIiMo9GdJTwqC0BtsL/k8MfFwFfxkOctXq1ao1mMG/bJEAHxoaipjp09XTfqUSN35sFBa/8YbxicKixuWN9iS/AhD5C4Z/IiIq95bFxampdAMpygz+uVquCozujANPvksqbm/r112G9nz15Zk279+QimD/gQOweOEinD171iglKt8Y/omIqFyTUCet/sNGjbTZ/3vGjBmqf//cefPY0l/OyFj+cmO3VADkF4DDhw8bcwr8vU8fNU3cWPBEYKLyjOGfiIjKNYvFoqb3tWunptZkZBjp8y03fbZo0cIopfJEKgCTJk9Wr81fgKzJMwDk6c47d+40SojKN4Z/IiIq1741wn/Lu+5SU2srVqxQ096PPKKmVD7JvQBPT5yIVStWqm5eRckvA/LwL477T/6A4Z+IiMo1y969anjPokN7yljw0uovoVBah6l8C20TqqbffPONmlpr0rixmp44cUJNicozhn8iIirXkvd8jYaNGhrvChw/flxNGwUVH/2Hyh+zW1dycrKaWpNuP+L06dNqSlSeMfwTEVG5Ny0mxnhVQPp6i3r16qkp+Qfp+lOU+V14vP9jakpUnjH8ExGRX+v6QLjxioio/GP4JyIiIiLyEwz/RERERER+guGfiIiIiMhPMPwTEREREfkJhn8iIiIiIj/B8E9ERERE5CcY/omIiIiI/ATDPxEREZVrZ8+eRXp6uvHOMfksUXlWQdMZr4mIiMqdRvUb4PDRI8a7wmSesDefyo7MzExkZGTgl59/RnJysip7f+V7amrN2XfBFlvL8LtDZVUFhn8iIirPGP7LJ2mht1gs+Fb/S9y4ERlHjxlzCnTp1hXVq1fHjTfeiMaNG2NC1Din34VhI0fgwoULOHfuHCpUqIBPP9nI8E/lSgWGfyIiKs8Y/suXXbt24ZMNGwq16tetXw9du3VTAf+Opk1x0003oUaNGsZcz0kFQCoPtpjfnX4DHkP3Hj0QGhqq3hP5OoZ/IiIq1xj+y4ekpCTMiInJb+GXVv2He/dGcHAwatWqpcqupn379uHlGf/G17t3q/etWt+DMVFRrASQz2P4JyKico3hv2yT7j1ToqOxaWOiev/0xIno+VDPaxL4bZF7DdZ/vB6zZs5U76VSMk2vpHjjlwei0sDwT0RE5RrDf9klwfrxAQNUa790rxk/YYLPhmqppMyZPVt1R5JuSMtXrvSZCgqRNQ71SURERD5pxvTpKvhLa3+M/tqXW9Nl32QfZV9lnxctXGjMIfItDP9ERETkc6TVX7r6SIv/8BHDjVLfJ/sq+yy/AMgxEPkahn8iIiLyWbbG6vd1ZXGfyX8w/BMREZHPKQ/95dnnn3wRwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPxEBU1nvCYiIip3GtVvgMNHjxjvCpN5wt58f3X27FkcOnQIqSmpOHHiOM6dO4dNGxONuVdfWbs+/F6RL2P4JyKico3h33W7du3CJxs24P2V7xkleR7s3g2vL1hgvCNn+L0iX8bwT0RE5RrDv3Pp6el4PjoayXu+Vu+HjRqJ+9q1Q5O//hXVq1dXZeQ6fq/Il7HPPxERkR9buWIFuj4QroL/1OkxSP7WgmeeeQb3hoYy+BOVQwz/REREfujSpUsYNXIkXoieorr1SOh/bMAABn6ico7hn4iIyM9I8H96wgR1E+8z/5qo+vMz9BP5B4Z/IiIiPzM9JiY/+A8bPtwote3333/H4cOHjXdEVNbxhl8iIirXeMNvYesSEjAhapzT4L971y6sWLECn36y0Si5dsra9eENv+TL2PJPRETkJzIzM1Xwv+feezFo8GCjtDBp5X+sX38M7P+YCv7DRo7A7Ni5xlwiKuvY8k9EROUaW/4LRE+erMbw/zRpCxo1amSUFpDWfgn9devXw9ioKIR36YLKlSsbc6++snp92PJPvowt/0RERH5AWv0l+PcfOMBh8G/V+h4sX7kSvSIirmnwJ6LSwfBPRETkB9Z/vF5NbXX3OalXDMwW/7fj4lCrVi1jDhGVNwz/REREfmDN6vdVX39brf6LFi1S08VLlrC1n6icY/gnIiIq56TLT8bRY+jRs4dRUkBu8F21YiWenjgRQUFBRikRlVcM/0REROVcRkaGmt5+++1qau2zpCQ17flQTzUlovKN4Z+IiKic++Xnn9X05r/8RU2tfbHtC3WTL/v5E/kHhn8iIiI/Yau//9e7d6OhjXIiKp8Y/omIiMo5ebCXIzIEKBH5B4Z/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0RERORzLl26ZLwqu8rDMVD5w/BPREREPufEiRPGq7KrPBwDlT8M/0RERORzateujbr166nXmZmZaloWmPsq+y7HQORrGP6JiIjI51SuXBnT//1v9frxAQOQlJSkXvsy2ccObdup17LvcgxEvobhn4iIiHxSaGgolq96DxlHj2F45FBET56M9PR0Y67vkH2SfZN9FLLPsu9Evojhn4iIiHyWhOgvdmxHvwGP4f2V76HrA+Ho37evamU/e/as8amrT7Yt+yD7Ivsk+yb7KPvK4E++rIKmM14TERGVO43qN8Dho0eMd4XJPGFvfnnh6DjL0jmQFvaE+HgsXrjIKAG6dOuKNm3a4M5mzVCnTh3UqFHDmONdEvaPHz+O7/bvx86dO7FpY6IxBxg2cgQiHn4YQUFBRgmR72L4JyKico3hv/yEf5MEcYvFgm1bt6oW96KkBb527Tq47bZA/LlKFdSrl3fjsLAX0K27Ex07dgy/ZWfj1KksnDhx3O42OnbqhJCQkFKrcBCVBoZ/IiIq1xj+y1/4tyZj6cuQmt8fOIDk5GT8ePgwkvd8bcwtztl3wZZWre9ByN13o3HjxrijaVM1ig9v5qWyqgLDPxERlWcM/+U7/NsjQ27m5OTkt+JPiBqnyh19F2bHzlWvzV8LAgICUKtWLVVGVF5UYPgnIiJfYt394vTp0/jl55+Nd8jvhmHt3Llzhfpf2+Is/NsjLb4NGzUy3hVo1aqV8SqPtAabfLFV2B/Df1HOjlPml/dzQCQqMPwTEdHVULQlNlv/O3jwoJq3c8cONZyjp6T/tT3SX9tZ+Le3fEn3S25GrV69Om688UbVZUSYFYWrWUlg+Gf4JzJVYPgnIiJvMPtem631aWlpuHDhgksB2rqF3bxRUxS9WdMXumGYx2mSCs3RIwWhUfqdC1d+kRBmBcH8NUEqBzfddJNXbyJl+Gf4JzJVYPgnIiJ3SdccacH/OStLtd47CvhmsLc1+oq/DI0oo9OcOXOmUEXBrCTYGknGJBWD+vXr599o6mmlgOGf4Z/IVIHhn4iI7LEeSUVa8i1799ocSaVu/Xpo07YtgoODUUUP9xJUebOk62z9anL06FGbvxyY51p+KajfoIFLY9sz/DP8E5kY/omIKJ+0UB86dAipKanYv3+fzfAp/eMl5N8aGKha8DnsYemSeyWkUiC/GNgbylIqBF27dcv/haDoLyoM/wz/RCaGfyIiP2Yd9r/YtrVYqDSD/u0NG6Ju3bpsyfcRRX+RSdy4sVi3K7l28uvA3/S/Dm3bqTKGf4Z/IoZ/IiI/I/31v96zBzt37izUsm/dncRW6zH5NmcVOcHwz/BPxPBPROQHUlNTsWvnLqxZ/X6hFmKzdZhhv/yRyoDclH3u7Dls3fo5du3YiSR9WhTDfx6Gf/IXDP9EROWUtPB/lvRZocAvrft9+vZDi5Yt0LJlS/bVp/xQvP/g9+X6+8DwT5SH4Z+IqByRvuA7duzAW0uW5Hf7MAN/aJtQtGjRQpURmcxQLJ6eOBH3h91fLn8FYvgnysPwT0RUDsiIMOs/Xo9ZM2caJcCwkSMQ3qULAz85JN2D5IbhDevX51cY5dkMY6KiEBoaqt6XBwz/RHkY/omIyjDp2rMsLi7/QVES2vr1769CP7v0kLvk3pAP1qwpl98nhn+iPAz/RERlUNHQL0+CHfj44+WqpZauHfk1YM3qNfm/JEnXsUnR0QgLC1PvyyKGf6I8DP9ERGWI9OlfFrcsP5RJ6I8aN44j9VCpKFoJkF8CpsbElMnvG8M/UR6GfyKiMkK6ZIwbO1aN3FMe+2ST75JKwFtLl2LxwkXqvdxPMvqpp8pUVyCGf6I8DP9ERD6uaGv/SzHT0PuRR9inn646qYC+PGOGujFYKqCz5swpM099ZvgnylPRmBIRkQ+S4P/0hAkq+EvYStyyGQMGDmTwp2tCRo56Oy5ODQkqFYAObdth165dxly6+s7DMvcRveLSDbGWbKOsuNwsCzbERaO7XsGRSo78NY+ci/j1FmTlGh/yltwsWNavxbLoXvnbUn9do7Es4UukZ3t7g4bsdGxLeBtTuja12m4vTInbCEvWZeNDNqj9LbLcHUMRu/bT0lnOI5eRZfkU64pcw7zjS8C29IvG51zDln8iIh8lXS1GjRihQpY8iXdydDRDP/kMCf2P939MvV6+6j2f74ImYUmUn5b/yziZMBEPRiUgB8EYvXYNokKqGPMK5J5MwOiwcdicYxQUERA2DR/EPoYmVWy3B2vZh/Dp0qWIW7sRKWiOXr2fwNDIcARV+ZPxCZMeUJPfxvODZuJzO9tSAsIwdtk0jGoV6LUW6NyszzD1yTFYcdDehptjYNwiPN+xZuFt5mZg3ai+mJCYZRQUEfAgpsTPxKAmVY0Cg6fLmbSLSE9chiVxH2LdXqBl70cxeOggPNi4KioYHzHlZu3CgujxmJdkZ1tKIDqPn4Opo0MR6MpJlfBPRES+JScnRxs5YoTWsF59bdHCRUYpkW9JS0vTOnXooL6nO3fuNEp9k+yj/NnjaJ4v+iMzXhsRnHdMDet11ebu/dWYY+WPY1rC8HvVZ5oNma99lnbBmHFBS0uarw1Vy9+rjYg/pv1hzCkk97i2cUy41iN6tbb3p0zt5E9fax9EP6y1HrZG++lyrvEh8V/t1NYYrZvalzu0bpPf0tbvPWW1Tn3+3nht7pC8fWlYr7e+v+eMeSVU6BjnaAlW2/3j1Nfa8skP5W0zOEpLyPyvMUf8V8uMj9KaqXmR2tykNC3vDP6h/Zq2OX9fmw2P1zILnRxPlzNd1k5+8qzWutvz2gff/KidPPmjtnfN81qPv43VPvgpx/hMnj9OJWkvPHhH3v4/OFmL+3ivdspqnX+c2qslzInM2xc573O+NvbFMYZ/IiIfNHnSJPUffAZ/8nVSAZDvqlQCTpw4YZT6HhWg9D97HM3zOVaBN+/Pdvj/I+0dLULmBz+vbb1QNIlahdiH3tHSbARVtXzwJG3zmStGiV4fOLNZezZ4gBaXdsko0T+XXxF5SHtha6btioT4I1Pb+rwRxh+cr+391e4nXeb4GHV//KDFPSQB+g4t4p0fCvYtv7y9Fr31P0ZhgYJjKnysHi9nUst31p7dnKXlV59ys7TNz3Qusn/mNdZD/fNJhUJ/YdYVL9cqVezzT0TkY6Q7hYzfL8N4Dh8x3Cgl8k0y7OcbS5eoUagWLVxolFLpuYyTH8/FlMSLaDL2ZUwJq26UF3UFvxywYL/+KqB3J4RULRr5rkfNzr3QK0B/mX4EmTb64muXfsPZP1VGQKWCZStUCkCVP/0Pl6+YvcZP48uFc7E5J0Dfn2g8XbRrjbWKNdFxwjj0l20e/BDx35zNK/fY7/hxR5KDY9RVrIc2D9+lv8jB/u0H8UteKfDLQexIzdEX7Ij7Q2oYhQUq1myHPr3r6q+O43Cm1f0Uni5n0v6L385URJWA6wu6+FS4HgFVrsOl//2BvLOai4tfvqVf4ywgeDimPdPJQXee6xHYcRieGSjbtODttSlwdgeA3VUREdG1MT82Vk0nTZ6spkS+Th7+JfelSKVVHkBHpSf35EbETEpAjoTCoaGoZpQX9ztOHjmsT6vj3r81gs3e51Ub4W9t9MpDzjZ8ZikexP8U1AZ9G2zCkrhdOPV7LrTfM7En7i18cEc3dGxUSX0mN30D5q3I0MPwo3hmyN0oftdBEVXbYNSKRZj92lyMan+zUeipSggavELdq7EvpqPtY8R1uKFa8ZB+5eQRPSrr2tyFv9qqNOhn9q9/a6FPM7Au6bv8QO3pcvn+VB/t+t+MD95cjT2ncqBpOTi1ZzWWvF8T/TvUh7qTIjcd8XM/1KsrddF/Yn+E2Lkfo8DNaD96LmJjFyFudBs756EAwz8RkQ+RoRTlBl8ZTaWsDKFIJAYNHqymCfHxakqlIDsZ84dMxuacEIye/riTUHgexw/ITaKBuKOuvSpCNdRpGqhPf8XP53/PK7JWuSX+sWAqWqW+gI5/bYigv4bjuYNtsWRePwT9n7Rb5yI78wh+lM8GNUAtpyFVXI/AkAfRq2eIazenlth5/PBNqj4NQLN2wbhFlV3B6Ywj+hz9DDStq0dnW67DzXUbqMpVTtZ5PYgLT5ezVhXNh7yM+a324bl2TfXT1hQdJ/6Atu/MwIDG8pOILvsUDqfLknXQqJbT6pRSMTAEPSIeREjg9UaJfQz/REQ+5OiRvNFGQtvw4V1Utkj3HzUc7caNRgl513lYlryM1w9WRXjsXIwJsd/mr+T+hvP/+a/xxplzsBz5RY+2RVVApTqdMGpxIvZ+sxs7Uvbis9eGoHXg/zPmX8bPR39UAbdax+Zo4IOpMvfkdqxZm6G/ugsRbesZwfcKfj3vRpejvUdwUp0cT5crolI9dBy9AJtTv8H2Pd8idWsshra+Ta825Mn9+Si+k5Na/W40a5D3C4s3MfwTEfmQCVHj1FTGUycqa+RXK+n7L8PUkjflItuyHFPmWRDQdSKiH6rrPMDp4f9cRvF2Z89chyo334pbq1UqMhSlHobPybUOQJ3qf/a9UJmbgfXTZhr3I4zFI0FmkDb3212eLmdLBVxX5SYE3loNlYqM75n76zkclxd1q+OGUjipDP9EREREvix7L5ZOfgOHAiIwbUo31PS59JaD4+d+06soPiT3JLa99JQaiz8g7DnMGerC/Qi+JuMcfi2Fk8rwT0RERF5Vo0bxGyzJU1bdfWaMQ8+azvt0KxX/jOp1jT7kpeY63FC9pNc6G5a53ayeWuvq3xisy7LVp0angv8IRC7bBwRHYn5MnyIPMfN0v71xvM5VvKE66hivSwPDPxEREZFPuoysbQvc6+5j0sN/tb+YffOdqY6QBrfk9zl33fW4tX5DSBXj/LZ9OOJqK3X2T7CkOxuQ0kNFgv/Sd55Bx2I3wdoeAciuuxugpjo5ni7nnoq31sedclLP7cX+IzZuxLbpItItP+lVKecY/omIiIh80i/Ys+IjHNJf5SSOQ/vbi7Z+34cJSef0uQfxeu9m+vsQ/DPhhFqyYCSfLHyfIePT2GKOCHSD6s/vvoqoGtLJeFZAKr7PupxX7FAuLn6zDIMfaIFGd82F5UoVhIzbqIbrdO9vPnoFWifrXGSnb0HsPx9RwT8gbBo++eA5G8FfFIzIc/5ABk7nFRZRMLJPQGA1VcHxfDk3Vb0T96tnBfyIPQd+ca071UUL3h14P1rW74ZYi+MqAMM/ERERUblTCTUbNNKn57D7m8O2H/x05Rcc2SuVB9eHlCzGDKo5m/Hm6lTnLc/5Y9gHoNnYbmjpQct4cZeRlfwmxvf6J15PuogmA+fio9jHinT1Key6mg0QIi92fosfLtqK1+ZzEgLQsNFt+fcLeLqce2ogJKyjvoYsbF68Dik2HsBW2O9IX7sUq+T+7hZ90L2l460y/BMRERH5pNrotdRio9Xb/PsKs9UTfoMxeu1+/b0Fb0bUzlsU1+GWpiFopr/KWbsVlmJBNRcXt6/D25L9W4ShTUNPh5S8Ge1HjkN4QA4OzYvBrG0nHbRUX8Shd2MxWz0hNxyDwxt4IYhK16hXMeTvM/F5TiA6j1+Kt6ZGIMjZMwduCUbbFgH6ybH9gDNc/AbxSw7qL6yHCNV5upxbKqJq+yGY1jUQOPgGpry6FVl2T2ousg99iFdf2aG/DkT4k53R0MlGS37OiYiIiMjnVGzYGYMlQOa8izHjF+Dz/H72F5H+2QI8PfJd5LgYGB2pWLMbomdEIAD7sGLwA+gZ/TY2WLKsKgF6QLckIDayC7q/+Km+zeYYuPAZ129edkCeeDx15FIc0rfeZOx8zBkT6trDwyo2wANPhutLZWDVyOcQ+1m68auF0X1o/HOqJT2g66N4wLpi5Oly7qpYFz2nTMyrVC2LRLvu0Vi23lKoEpCbZcG6ucPQpssUveKjH/+gGDzvwn0hFTSd8ZqIiK4x6ccrpFWPqKzx5e+vs32T+WXv390JrIt8CBOSAjF67RpEhRTt7iHPB1iAvr3nqPsGbAnoOhefLojwwvCheoUiYTaiot61uy0lIAxjl03DqFaBXmiBPg/L3CHoM89ivHei+hisSR6HELOrUXYyYv8+GK8ftPM8hIAIzE6aiV5FKymeLuc2qVB8jJljJmOVvW0p8ovHHEwd7VrFp+TnnYiIiIh8UEVUCXkK63d/hNgXB6CJUaoED8CU1z7CZq8Ef1EVQREv4ZPvNmNp7MsYHSY3G1uR7cUuQ+LXi/GUV4K/Lvdn7N/2g/HGA1VaIeqTz7DmtSnoH2x9a25z9H9xAdZ8bifAe7qc2/TrFxSBaYm7kBg3H6+ODUPhG4hle3OxdMsmvOnqLx46tvwTEfkQtvxTWcaWfyLfx5Z/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wSf8EhH5ED7hl8qya/H9TU9Px/cHDiAtLQ0XLlxQZe+vfE9NbXH0hF+i8sTed53hn4jIh5Q0PEkQysnJwdEjBcv/uUoV1KtXDzfddBNq1KhhlHpfamqq2m5ycjJ+PHwYyXu+Nubk6TfgMdx44424KyQEwcHBqFWrljHH/2RmZqrrJKHV2h1Nm6ppUFCQmpYG2fbBgwfxrcWiwnLRoNyq9T1o2KiRukZ3NmuGFi1aGHOcu1rh/+zZs1izeo3+9z4yjh4zSh1zZ59YEaDygOGfiKgMcDc8SQiy6CEufu1abNqYaJTaJ8GuQ8dOuD/sfq8ETHshrG79emjTtq3xDjh37lyx/ZN9GRMVhdDQUKOkfNu1axe2f/UVEjdudCmwSmWpe48eaNmyJSpXrmyUek62v2L58mLXoUu3rqhevbrxDti5Y0exa9mnbz/9r4/TymNph/9Lly5hWdwyzJo5U72/59570aNnD9zTujVq166NSpUqqXIiso/hn4jIh7ganoqGICEhrk2bNqhSpUp+C7I4ffo0fvn5Z9Uibx3sJFwOGjzY40pAUlISZsTEqPWZATG0TSgaN25sN6xKq3NGRgY+2bAhv8VZ9nvS5Mnl9pcACd3zY2PzfwmRc9W1Wzd1nuo3aICAgABVbv5ic+pUFr7YtrXQ58fqlaReERHqvbvknM+YPj0/9Mt179ipk8NfX+T7Jd1odu3cVahiNzt2rsP9KM3wL78sjRs7Vu1L/4ED1He3UaNGxlwicpmEfyIi8g0N69VXf46cOHFC69Shg/pcvz59tC1btmhnzpwx5jqXkpKiTZ40KX9bCfHxxhzXLVq4SC0r+yHL68HVmOM62edXZs7MX48cV3ki58Q8PvmTc+bOMcr5WbF8ef61HjlihNvn2fq7Itfck3Ms25RrbK5HjsMe81i9Tc6DrPf+jp00vRJglBKRJxj+iYh8iLPwZB3mJBB5ErpNUgkw1+VOBWDnzp1qGVnWG4Hden0lOR5fY1awJLSX5DxZV5LcqQDI58zrKxXEkpJjkO07Wp/Mkz9vMiuao0aO1M6ePWuUEpGnGP6JiHyIs/BkBkoJzN5gXZlw9dcD+bVBPm8GWmf7bEvRZaTyIe+lQlMemBUaT1rr7TFDsKvnSAJ60c/Le/lzh/Uy8h2R74v82eLJ+h0xj0GC/6VLl4xS+zK9UBklKu/Y55+IyIc46jMtfbc7tG2n+mzHTJ+uyjzpY110GemT/nj/x/BSzDQMGDhQldlj7sPTEydi+Ijhqswb+yB9zJsF36H6/y9YuFCVWXNlG57sR2nRw6rqY/+1ZW/+TbIlPU9yjrp37aref75tm5o6Ej15srqvYv/B7/PvwSjpPoiVK1bghegpSNyyudj9It68BjJyVdcHwtVNvW/HvWP3Zt7Dhw/js6QkfLB6TaFRroj8nb1/h3zIFxFRGSHDMwoZAcabzNF2zPU7IiFSbvqU0YK8Sda7fNV7CA8PN0rKNgn+UpHx5tCqco7kpmq54VWCsTPyPZFrZe/ma0/JyDqyXhk6tjQ9Hx2tprNmz7IZ/H///Xe8+uqreDDsAbz68kw0Cf6rqsDKvhGRfRXY8k9E5DvcbTn1RktuSV2NfXDl894+Lm+7GufJmdLeB2/tr4wkNTxyKObMi8VDvXoZpQVOZmbiiYGPq5Z++SVsxMiRfv3cCCJ3sOWfiIiIfMpbS5aoYVDDu3QxSgpYB3/5tUi6wDH4E7mO4Z+IiIh8hoznL884GBM1tlh3H+nqM2PGjPzg7y8PiCPyJoZ/IiIi8hnyYDFxX/v2ampt86ZN+PSTjapfP4M/kWcY/omIiMhnyBOFZYSf6tWrGyV5pNV/fuw8tGp9j8dPOyYihn8iIiLyEWfPnlWjGXXo2MEoKZDy7bequ8+QoUONEiLyBMM/ERER+YQzZ86o6W233aam1uReABEcHKymROQZhn8iIiLyCTk5OWoqI/0UdeLECTXlyD5EJVOB4/wTEfkOc5x0d3kybntpcHU/SuM4S/O4vMkXrpUn18neMrb20Z1jtPbBmjVY+9FarFr9vlFSWP++/ezOIyLXsOWfiIiIfML111+P5D17jHfF1bjJe09MJvJXFdjyT0TkO8xWVE9bTssrV84Lz13p6d+3L266+Wa8vmCBUZLn8OHDeDDsATX0pozAU9Jr8MaiNzBr5kwkf2spNtqPrFue5isP9SIiz7Hln4iIiBxq2KiRGl+/qEZ6udi8ebOaltQX27aq/v62hvkUN954o5oSkecY/omIiMghc4Sdk5mZampt2KiR2LQxEenp6UaJZ2R5ebLv3/v2MUoKpKWlqWnjxo3VlIg8x/BPREREDt3ZrJmaHjz4g5pae/jhh9V0WVycmnoqdu5cNe3Tt6+aWvtu/341/VurVmpKRJ5j+CciIiKHpMW9bv16eGvpUqOkgHT9kdb/91e+Z5S4T/r6y68HU6fHFOvyIzas36Ce7MthPolKjuGfiIiIHKpcuTL69O2Hr3fvVjf5FvXUU0/hwe7djHfuMW/yleV7P/KIUVpg965darv9+vc3SoioJBj+iYiIyKk+Rl98W917KlWqhEmTJuGee+9V71995RWcPXtWvbZH5kdPnpwf/GfNnq3WU9T8efPV9L727dWUiEqG4Z+IiIicqlGjBp6eOBGrVqzEZ0mfGaUFataqhbfj3kH/gQOweOEi3BNyt6oE7Nq1S93Me+DAATVNSkpS5TJfugpJlyF7wf/jdetUq78MJSrbJ6KS4zj/REQ+hGPV28Zx/n3DpUuX0L1rV1SsUBHvrliuAr8t0jVIfiGQioKpVevWhR7gJZWEQYMH5w8XWpT5DAHp6/+2vi7pekREJcfwT0TkQxhgbWP49x3Set/1gXA1Hv8Haz+yeYOu6dy5czj0ww+4NzRUvZeWfFlObiC21dJvkiFFnxj4OHK1XCxfuZI3+hJ5EcM/EZEPKUmAlT7UZ86cwenTp/HLzz+rsj9XqYJ69eohICCgTAeo8hb+zTHxvz9wQE2FhGK5TrVr1/b5Vm7pyvN4/8dUH/9Zs2fZ/QXAE2bwP3rkCJaveg+hRsWBiLyD4Z+IyIe4G2BTU1Oxa+cu9WRUeUCSM8NGjkC7++5Dy5YtvRowpTuIPIhJAltycrIq27ljBzKOHlPdNuQJsfJ0VmnxvaNpUwQFBanPuKqsh3+pmFksFsSvXauGtHSmS7euaNOmDTp26uT1SlumHq6/0a+RXK8LFy7gx8OH1XdHhvJs07at+ow81Ov2hg0dfk/MCoBUWubMi0Xz5s2NOZ6TewmGRUaq1wz+RKWD4Z+IyIe4GmAl9L88Y0Z+4DeDW6tWrfJb+4X5K8CpU1mFKgjy+bFRUegVEaHee0pasBPi49UNnkWZod+sBFgztx/epYtLlZCyGv6lUrQsbpka0cZkBvsq+nUyW/uF/AqQnZ2NgwcPFhozv9+AxzBi5MgSVQJkPzZv2oT3V60qVkk0vzvSRcdWxUQqjBEPP2yzwibfw3Fjx6rr66wPvyPW9wjI/rCrD1HpYfgnIvIhrgRYc1x0IcHw7336oEWLFuq9M9Lqu23rVvWwJglsEkSnxcS4PZKKhMnXX3stP/RL0O/Rsyfuad3abrcVaf0+dOgQUlNS8/dfgt6k6GiEhYWp9/aUxfAvFaNhQ4fm//oxRH8dEhLi0rmW85uSkoL5sbH5Yd3TlnAZXWeGfo3NCpj560/dunVtBmzZ9okTJ/D1nj3YsH59/vbluzZZv1ZFr61cV/k+md8FqQR0794dLe+6y2G/fvN+gBUrVuDTTzaqMhlNaNDgQV79VYqICmP4JyLyIc4CrBn8JUxO1QOdu91nTNaBTdblzmgqsuyoESNUKJRl/zVpksuVD5PZEj1PD7cSSiX0DR8x3JhbXFkL/1LJ6tC2nXotw1S6+guHLdbh3d0KgHVF0dP9kErM83rol+vtqFXevBHYmtwT0LBRQ1XBFK+++iouqq5GP6ohPE1y/Xs+1JOt/URXAcM/EZEPcRRgzXDlblh3xAyHzsK3tVEjR6ruId5opZWQ/PT48SpYvrF0id1fAMpa+O/ft686Jm/1WzcrExK+P0lMdOmcS6VheORQr3WjMb8r8mvRgoULjdLCzGsg1/JbiwWWvXvzfzmwHupTvsMhd99dKvefEJFjDP9ERD7EUYCVByNJS33ils35Lf6eBN6iy5hBdf/B752GMPMmT+k68syzz6qyku6DBNvHBwxQ7+0FW1e24cl+2ONsXY7mSz/4R3pFFKpQebJvRZdZl5CACVHjHFaSrHXu2FFNzeDvjX0wv4P2KjWebIOIri4+4ZeIqIxI3LhRtZh62tXHHumrL6SftzPbv/pKTYcYI7J4gwRTWZ90a3FlH3ydjHgkQtt4d6Sa+9q3V1NpUXdGfiWS8ynn1Ztdaczr/smGDWpKRGUPwz8RURnx+bZtWLV6tfHOewYMHKhaal2pVEg3Dek77u4Nws7IkJay3vJARlCS8+nufRDOyDmX9Zq/uDhy0003qfMpN2B7k+yDrLd7jx5GCRGVNQz/RETkMunqUdLhQW2R1mlZr7d/1fBXEtJL63zKer1xHwMRXRsM/0REREREfoLhn4iIfJ50d3F2E6krnyEi8ncM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREROQnKmg64zUREV1jjeo3MF65x9VRbjxdvyvcGWmnNPfDm+wdU2lfJ1Fa5+hq7IM72yCiq4st/0REREREfqICW/6JiHyH2dLKltNry9l14HWyjeeFyPex5Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP8HwT0RERETkJxj+iYiIiIj8BMM/EREREZGfYPgnIiIiIvITDP9ERERERH6C4Z+IiIiIyE/wCb9ERD6kpE9IvXTpEk6cOGG8KxAQEIBatWoZ70pHZmYmDh48iJ+zstTUllatWqF+gwZo3LgxKleubJT6nqvxhN/09HTjVWFBQUHGq9Ih35G0tDQcPXIEycnJRmlhtWvXQaOgRggODnbre8Mn/BL5PoZ/IiIf4m54kiCXkpKC7V99hcSNG5Fx9Jgxx7Z+Ax5Dx06dEBISgho1ahilnpPt79ixA28tWYLkPV8bpa4ZNnIEIh5+uNTDridKI/xL5Wjb1q3YuXMnNm1MNEpta9X6HnTo2AmhbULRokULo7RkpLKREB+PxQsXGSWukX3p178/wrt0cVphY/gn8n0M/0REPsTV8CShe/OmTZgXG5sf+OvWr4c2bduq1vWiVEvv0aOFQufTEyeiT98+HlcCUlNT8fKMGfmhX8L8XXqlol69ejYDvfmrxNd79mDD+vX5y0mFZPyECV6pjHiLN8O/hO5lcXF4f+V7RgnQpVtXNGvWHLfdFmiU5MnOzla/mlh/VsL3mKgohIaGGiXukfP++muv5Yd+WV+Pnj1xZ7NmqFOnjs3zLvt87NgxfGux5C8n36+58+Y5rIww/BP5PoZ/IiIf4kp4khbkGdOnqyAvgaxP337o+VBPl7pnnD17FhY90Jkt9bL89H//2+1guWvXLjze/zH12tNKhATM2Llz849j+cqVpd41yVXeCv8rV6zAC9FT1Gup5HTv0QMtW7Z0qcuTVK6kgmeGb6lcjX7qKbe6S8l35enx49W19rQSId+ZNavXYNbMmer9SzHTMGDgQPW6KIZ/ojJAwj8REfmGhvXqqz97zpw5o3Xq0EF95pWZM9V7T23ZsiV/ezt37jRKnUtJSVHLyH6kpaUZpZ5btHCRWl+/Pn20nJwco/TaMs+LPc7mC/O45DzJOfPUiRMntJEjRqh1ydQd5nKyLyUl+2F+9+wdj8yTPyLyXRzth4ioDJkze7bq5iOt7c88+2yJusqEhYXhix3bVav75OeeUy28rpCuPmLxkiWqe4+09potvq6yXmb4iOHqeKR1Wlq6ywNptZeWcmlt/yQxsUT99uXXkFn6dZeuQvIrybqEBGOOY0lJSerz8ouBnGNRkmsl+yG/zgjzO0BEZQ/DPxFRGSFdOKQvuHQf8UaYExLoJkVHqwqF3DDsjOyDhHQJlN68UXfQ4EFqam/0GVeO05XPXC1mJWZqTEx+Nx1P9s9cRtYhFQCpqMl9Hq6Qm4vFkMhINfUG+b6YFTV7oxURkW9j+CciKiMyMjLUVPqNe1Pbtm3V1N7wnNYkhM6OnatG6fEmWe8bS5fYvFm5LJJ++tJS780Kkpwjub9DKmpSCXNGvidyrbx9I/X9Yfer9d50001GCRGVJbzhl4jIh5gtw7ZumJRuOWfOnEHt2rULtSYLd26wtLWMtOJ6+iwAb+2DI6583pP9sMfZupzNt3U+Pdm/osvY+g64wxv74Ign6yeiq4st/0REZYS04EpLsiehzxlZryfBn2wrrfNZmt8BIvIPDP9ERERERH6C4Z+IiKgI6bbiqOuKs/lERL6K4Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP8HwT0RERETkJypwnH8iIt9hjpPuLnduPvV0G65wdT9K4zhL87i8yReu1bW8TkR0bbHln4iIiIjIT1Rgyz8Rke8wW1rdbZn1pDW5LLXOurLPvn5c/nCtyuJ3i8jfsOWfiKgMk5DlbtDyZBkqOV4rIvIFDP9ERERERH6C4Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP8HwT0RERETkJxj+iYiIiIj8BMM/EREREZGfYPgnIiIiIvITDP9EROXI2bNnkZ6eXuyPfMulS5dsXicpp/IuF9npX2JdXDS612+gnoqs/rpGY9l6C7JyjY/ZkJtlwYYiyzWPnIv4UlrOI7lZsKxfi2XRvfK3pf7k+BK+RHq2tzdouoj0bXGY0rWpe8eo9vftQss1umMoYtd+CkvWZeNDNni6nEcuI8vyafHvTP1emBKXgG3pF43PuaaCpjNeExHRNSb/QReuPtVVwv5XX36J5ORkvL/yPaPUti7duqJZs+YIbROKFi1aGKXek5mZiYMHD+LnrCw1tXbjjTeicePGqN+gAerUqYMaNWoYc1zjynlx99xdTRLqU1JSsP2rr2DZuxfJe7425hRXt349dO3WDXeFhKBt27aoXLmyMcc75Dtz/PhxHD1yBGlpabhw4YIxJ09wcDBuDQxU01q1ahmlrvHla+Ab9BC37VUMGbwUh4ySYoIjsfSdZ9Ax8HqjIE/uyQSMDhuHzTlGQREBYdPwQexjaFKlcLuup8uZtOxD+HTpUsSt3YgUNEev3k9gaGQ4gqr8yfiEST+25Lfx/KCZ+NzOtpSAMIxdNg2jWgV6rwU69yS2vTQCkcv2GQWF2T3G3AysG9UXExKzjIIiAh7ElPiZGNSkqlFg8HQ5k6ZXVBKXYUnch1i3F2jZ+1EMHjoIDzauigrGR0y5WbuwIHo85iXZ2ZYSiM7j52Dq6FAEunBSGf6JiHyIq+FJgvaihQsLBX4J9/Xr11ch29qpU1k4ceJ4oc+2an0PxkRFITQ01CjxjATJxI0b8ZYeDjKOHjNKnZN9Hfj44y5vv6yGfwn9mzdtwrzY2PzzI+G+jR7qJVxXqVJFlZmkEvfj4cOFKgdPT5yIQYMHlbgSsGvXLqxYvhybNiYaJc7Jvvbp20//6+NShY3h37GCIK6HtbETMbx/N4SokC8tux9iweTpWHUwBwFd5+LTBRGoaQY5q7AZEDYesRMHoXOQBEs9RH62DK8+NUcP3IEIj12N1yPqFoRqT5czaSeQGDUEC6sOwUv/aIfbkIkdb/8bs/7TH6teexQN/s+MqtaVmgA0GTgBI3p3Q7cQM+DL8W3E+wtn4nUVYkMweu1biAqppuaWzO9Ij4tE1xd36BWnAXhx+mg8prZrfU6BJmPjsHpcKxT8i7uMkwkT8WBUAnL0Csno155F5P1B+nz5ZeYzLJ35vNrXYtfC4+VM/8OpjdF4eEElPD11ENrW1P8bvX0ZXnjlAgat+TcebVDw7zw36zNMfXIMVujfCTm2KSN7o0v3kPyAL7/orF+1CFPmJUH/1tg4Rjsk/BMRkW9oWK+++nMkIT4+/3P9+vTRtmzZop05c8aY61hKSor2ysyZ+ctPnjRJy8nJMea6TpbRg2T+ejp16KDWK/uSlpZmfKqA7J+Uy76PHDEifznZf9knZ8zPO+LKZ66mEydOqOOTfZLzs2jhIlXmCvmcnF9ZzlzelfNki5x3cz/kT86/XAcpt/W9kfKdO3eq/TW3L3+yP86+K+ZnyZZLWto7A9T5aTZ5q3bBKLX2R9o7WoQ6hwO0uLRLRqlVefDz2tYLfxilpv9qmfFRWjOZ/9A7WprVbE+XM6nlgydpm89cMUo0LffMZu3Z4CL7lxmvjQiW/X5Ie2FrpmZjVXn+yNS2Pv9Q3vfkwfna3l/tftJ1F7Zq0WrbvbW5e88ZhaY/tF/3zte62ToHf/ygxT10h75cey1663+MwgIFx1T4WD1ezqSW76w9uzlLyzWKtNwsbfMznbWId34oOHd/HNMSht+rr+cOrdvzSdopu6fqv9qprTF5x2jzHBTH8E9E5EOchSczcEsok6DtKQmXZgiXqTsVAPmsuazshwRJdysQEjolXJrHK2HTEfNzjrjymatFzq8ZnKVS5O75Mcly1pU9dysAcl7NZWU/XK0kmmT7sg7zWJx9V8xtkQ1OQqOS/5m7tKHxx43C/2mn4p9S59VepSE/ABcKuJ4uV+BK6uta+zunadt/y4+pmvbbdm3qnX20N783vwf/0bZObq9vRw+pc77WfjVK7coP6w7Og8v+0Ff3vMMKjH4StKHqe/mUlnDqf0ahziy3c+wFx1VkPz1dznQlVVvQNkybuv2sUSDOattfCte6vHlAy6tmWR2XS5Ukc5sOrrUVhn8iIh/iKDxJi6zMkyDmaguyIxLizF8BpFLhKvm1QJbx9FcDa3JMZrB0FGxlvvw54spnrhazciTB3RvMEC/nytVzLufTXMbTXw1M1t8Vue72yHz5I08d1xKG3KWfQ+vw/6u2d07XImVFmctZB05Pl7OSY9EW9GynDVqwQzt56Q8t99IJbfeCJ7VmfeK0tMt5FQLHvy7Y8l/t1N5ELeHjvQ5as73FquW/SOXgf3vnaHdL+ZB47ZRRVpjtypOnyxW4oKW+3k9r9sQibffJ37Tc3N+0k7sXaYOCB2txh37L+4grFcUi/ji1V1sfn6jtPfVfo8S+Yj2RiIjIN+lBUk0XL1mSfyOm9LE2+1m7ylxG+pCPfuop1a9b+uy7QvqNy70D0mc/Zvp0tY6S7ENQUBCWr1ypysaNHaumvsDZMTmaL/djSL/6fgMeQ6+ICFXmbH22WC8j90bMjp2r7hvYsWOHKnPm5Rkz1FTOr9zgXZJ9kOv8zLPPqmOS6y/fAyoFFw/jm53n9Bd3oG3Tm/PKcB7HD0g/+UDcUddeH/lqqNM0UJ/+ip/P/55X5PFyViq3xD8WTEWr1BfQ8a8NEfTXcDx3sC2WzOuHINXfPxfZmUfwo3w2qAFq2blpuLDrERjyIHr1LOi7XipkNJ6EeRg/cA4OyT0GL0QgKH97V3A644h+hvQz0LQuzDNd2HW4uW4D/QwBOVnnkXcPs6fLWauK5kNexvxW+/Bcu6b6aWuKjhN/QNt3ZmBA44C8j2SfwuF0WbIOGtVy2oNfqRgYgh4RDxr3kDjG8E9EVEbIjbVyo64EZm+RUDckMlKFShlq0hkZrUZEjRunpt4gFRm5qdXVffB13yQnq+nf+/RRU2/5W6tWano4/bCaOiLnUW4alvPq7og9jowYOVJNze8BedNlnPx8HdZJ5msRhjYNK+UV5/6G8//5b95rp87BcuQXPaLqPF2ukAqoVKcTRi1OxN5vdmNHyl589toQtA78f8b8y/j56I8q4Fbr2BwNfCFVXrEg9i690np7KPpEzcfuNuPx5pZ3itxcfAW/nj9rvHbB3iM4qU6Op8sVUakeOo5egM2p32D7nm+RujUWQ1vfplcb8uT+fBTfyUmtfjeaNTC+B17E8E9EVEZIi/+sOXOMd94jw0ombtmM2rVrGyX21axZU7X+erMCImT4UVlvTk7xdrKy5r727dX5LDrqUklJiJf19nyop1FiX0BAgDqfLVp6d0hX2QdZr3wPyLtyT25EzKQEPUgXaaXWQ/y5DA/+XXi6nE3XocrNt+LWapWKDEWph+FzEoYDUKf6n30jVJ7OwPfy44khJ2kO/tlrAl5LzkLBcP/mfrvL0+VsqYDrqtyEwFuroVKR8T1zfz2H4/KibnXcUAonleGfiKiMkMDtzVZckwzhKOt2ZSjJAQMHqu4+3ibdUmS9pfH8gavNnfPpLle/A/IZOZ8lHcrVFlmvfA/Ie9SQjkMm5w0B+uJURHplCMyrKQfHz/1mFa6vocAIvHn0iBpu9vDRVCTGPoEmOUmY9/dRmG+RDjtlSMY5/FoKJ5Xhn4iIiOgaKRjLHWgyKAZTn2haeJz2in9G9bpGX3B3eLqcW67DDdXde2BfcdmwzO2Wf3+J639jsC7LVp8aa1URFPEcYl9sq7+24PWXEpCuwrSn++2N43Wu4g3VUcd4XRoY/omIyOflteI5fnCUK58h8iWFg/98vPXC/cVvgtVDfLW/mH3snamOkAa35PUd93Q5t1yPW+s3hFQxzm/bhyOutlJn/wRL+kXjTWmrhIZtw9BMXqYfQWa27KQe4qu5EeLvboCa6uR4upx7Kt5aH3fKST23F/uP2LgR26aLSLf8pFelnGP4JyIiIrqq5Am7r2F450g9+FdF5xfXYPVLNoK/Yo7Ik4XvM+x1WzFH9rlB9cvP4+ly7qiIqiGd0EuCanoqvs+6nFfsUC4ufrMMgx9ogUZ3zYXlShWEjNuYX3l3/W8+egW6lqwr3lANf5EXOedwIScv/Jsj8pw/kIHTMq+YgpF9AgKrqQqO58u5qeqduL93Xf3Fj9hz4BfXulNdtODdgfejZf1uiLU4rgIw/BMRERFdLblZ+Gb+BDwyZA4+z2mO/rFxmDO4SFefQiqhZoNG+vQcdn9zWK822HDlFxzZK3e5Wg8N6elybjKDas5mvLk61XnLc2464ud+iBw9Fjcb2w0tPWgZL/A70uMGqm5AzaO32T5G3ZWTR2CRF9UboM7NeRu8rmYDhMiLnd/ih4u24vXvOHlERtYKQMNGt+VfH0+Xc08NhIR11NeQhc2L1yFF/VrhiH4e1i7FKrm/u0UfdG/peKsM/0RERERXQ+5JbHtpGPrNSUJOQBjGfrAYL0U0cRIQr8MtTUNUt5WctVthKRY4c3Fx+zq8LRneeohQj5dz181oP3IcwgNycGheDGZtO+mgpfoiDr0bi9mpekoNCMfg8AYlDKIFXXpy1q7D1pO2fnk4j31fbNf/NwBNnmiHxmZl45ZgtG0RoC+4DZ9ZbIzgc/EbxC85qL+4CxFt6xXsp6fLuaUiqrYfgmldA4GDb2DKq1uRZfek5iL70Id49RV5/kcgwp/sjIZONsrwT0RERFTqLuPkx69izLJ9+usQjF7xKp5qFehSEKvYsDMGSxDMeRdjxi/A5/n95aX70AI8PfJd5NgIfp4u566KNbshekaEHq/3YcXgB9Az+m1ssFgPrXkZWZYExEZ2QfcXP9W32RwDFz6DnjWdP5DKmYJjTMCU59/GN9Zdj7LT8fncZzB4nkVVNv7Zt0VBRatiAzzwZLi+zxlYNfI5xH6WbvxqoYfp9C2IHf+cakkP6PooHrCuGHm6nLsq1kXPKRPzKlXLItGuezSWrbcUqgTkZlmwbu4wtOkyBZ/n6JWbQTF4/qG6Tr9TFeQxv8ZrIiK6xuTnayF9Wl3h7ueFJ8s44gv74G3O9s/d/feFc3Q19sHb+1yuZCcj9u+D8fpB18berzb2I+weF4K8hmo9WFoWoG9veVqtbQFd5+LTBRGoWSj5ebqcJ/QKRcJsREW9a3dbivzisWwaRrlY8XFJ9gEsi4rEtCS5f8GG4Ccwe/4E9AqqahQYnF2TgAjMTpqJXkUrKZ4u5zapUHyMmWMmY5XD700gOo+fg6mjQ116anIFhn8iIt9hhid3uRvOSoMnodLX2Tum0r5OorTO0dXYB3e24S9y0+PwyAMvYb/x3pnC4T+PtPRu/HQtFr24siBgBw/AlJG90aV7iN3g5+lyHslOx7YkC1I2xOJ16zAu2xsWjjZh7RBUxZsbNORmwfLJRsQvnF0QlPWKxuiYx9E93ME2bS2H5uj/4jA8/GAYQgLtBHhPl/OIXrHa9gW++/ZjvDAvCQXVANnek7i/bWd0LFqxcaACwz8Rke8o7bBVmqHbF4Ktt9k7pqsRikvrHF2NfXBnG0R0dVVg+Cci8h1m2GJ4uracXQdeJ9t4Xoh8Xyn87kJERERERL6I4Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP8HwT0RERETkJxj+iYiIiIj8BMM/EREREZGfYPgnIiIiIvITfMgXEZEP4UOSfAMf8uWZa3Ve0tPTcezYMfyWnY0JUeOMUiL/Zu/fYQWGfyIi3+GN8HTp0iWcOHHCeAfcdNNNqFGjhvGu9Jjb/f7AAZw6laW/Pm7MydOqVSv8uUoVBAcHo1atWkapb7pa4T8zMxM5OTnGOyAoKMh4VbpkuwcPHlRhOTk52SjNU7t2Hdx2WyDqN2iAxo0bo3LlysYc565m+N+1axe2f/UVFi9cZJQQkTWGfyKiMsCT8CRBbtvWrSrMvb/yPaO0uFat70GHjp3QomULtGzZ0q1Q50hqaio2b9rkVgirW78e+vTtp//1uSoVE3eVRvg/e/YsLBYLvtX/EjduRMbRY8acwuTctGnbFh07dUJISIjXzo9sX7a7Yf16JO/52ih1btjIEWh3330IDQ01Suy7GuE/KSkJM2Ji8s/fg927ITw8XFVWAgIC0KhRI1VORLYx/BMR+RB3wpO0fM6PjS0U5Lp064rq1aurVnZTWloaLly4UKhiIAFzbFQUwrt08bgSIJWOGdOnY9PGRPVeKhc9evbEnc2aqRBm3Ypt/iogXTOKht+XYqah9yOPeK0y4g3eDP8SutesXoNZM2caJQUB32xlF9nZ2aoC9+Phw4Wuab8Bj2HQ4MEe/yog537tRx/hhegpRkleoL9Lr1jUq1dP34fahc69XNfTp0/ju/37C1UU5PpO1UO3o/0ozfBv/X2ToD8maizua99efd+JyHUM/0REPsSV8CRhbroewswwL+Gwe48eLrXmS9/or/fswVtLl6rwLSF08ZIlbgdLqXg83v8x9dqTcCrHkJKSgsnPPaf2Qyots2bP9pkKgLfCv7RSD48cql5LeO7Xvz/+plfMnHV7Mn8liF+7Nr9yJZWkAQMHqteukvP89IQJah2eVvjkO7MsLi7/+7Z81Xt2fwUorfAv3zfzuzJ1eoyqLFaqVMmYS0RukfBPRES+oWG9+urPnpycHG3kiBHqMzJNS0sz5rhH1rNi+fL87elB3Jjj3IkTJ/KX27Jli1HqGdmPV2bOzD8eX2Eenz3O5ouE+Hj1mU4dOpToPMm1kXXIuhYtXGSUusb8rkyeNEmd65LYuXNn/n7Y+97JPPnzJtmurPP+jp00vSJilBKRpxj+iYh8iLPwJOFP5rsbAu0xg5WEOlfDoQRJWUaWFc722Zaiy5gVgJJWJrzF2TE5my/hWObLeZXKUklZV/pcPUfmtZXrZXK237ZYLyMVEXndr08f9b4oT9bviHXwz/TCeSQiTWO3HyIiH+Ko24R0Bbkn5G7VfWTV6tWqzJNuFkWXWZeQoIZHfGPpEoSFhakye8x9kK4+MdOnqzJv7IOt9VpzZRue7Ic9ztblbP6rr7yiboBO3LI5vzuUJ/tnvYyt6++IuQ9fW/bm3zRc0n0Q5nq/2LG9WPclT9Zvj/Txf3zAAFSsUBHvrliOmna6Sv3+++9I+fZbfLV9O77da8HXu3cbc4j8m71/h3zIFxFRGXHo0CE1HTI0rw+5t0gfcCEjBjkjfcjNewy8ScLp0xMnGu/KPgnHEtI9vUnXFjlHcqOu3IArFQFnatasqa6Vt0dTkpF/ZL2lTW7ulT7+byx5027w/3jdOvTo2g0D+z+GxQsWonoN3vxL5EwFtvwTEfkORy2nEvjOnDlTaHQWb7TkCrmpU0bo8WT8fW/tgyOufN6T/bDH2bqczbd1Pj3Zv6LL2PoOuMMb++CIJ+u3xbyhXG7ufWzAAKO0gLT2y43Mn36yUVWyxkRFeXX4WqLyjC3/RERlhLTgSktyaQQcWa+vP3irLCmt81ma3wFfIkPYynCeMqpPUdbBX0ZAejsuTo0+xOBP5BqGfyIiIvIZ0uovXZtkHH9bw3mawV+GHJWhTxn6idzD8E9ERFSEdFtx1HXF2Xzy3PavvlJTeYBXUdLH32zxd+WJw0RUHMM/ERER+Qy5WfrB7t2KPblXuvvMj52n+vjb6g5ERK5h+CciIiKfIMN7ijZt2qipNRnO8+iRI2q0K3b1IfIcwz8RERH5hIyMDDW9/fbb1dSajOMvQkJC1JSIPMPwT0RERD7hl59/VtOb//IXNbV27OhR1eXH288tIPI3FTjOPxGR7zDHSXeXOzeferoNV7i6H6VxnKV5XN7kC9fKk+tkbxlb++jOMVpbuWIFXoieYnN52U6PXg8hdt48o4SIPMGWfyIiIvIJVapUMV7Z5mw+ETlXgS3/RES+w2xFdbdl1p2WVk+WudZc2WdfP66yfK1kP+ztg8z7aF0CWrRoUeL9ffWVV9RoP9/9cLDYGP+y7n4DHkPM9OlGCRF5gi3/RERlmIQsd4OWJ8tQyZXla1W3fj2MHjXKeFfgpDE6z3f796tpSVn27sU9995bLPib2wkODlZTIvIcwz8RERE51KZtW/VwraJq1qqlwvpbS5caJZ5LT09XT/bt0bOHUVLg9JkzanprYKCaEpHnGP6JiIjIoVatWqnpvn371NRav/79kHH0GNYlJBglnlkWF6emXbt1U1Nru3buVFO2/BOVHMM/EREROfQ3I/ybIdxaeJcuqvV/XmysUeK+pKQkvL/yPTzzr4nFnuwrPli9Rg3zWatWLaOEiDzF8E9EREQOSeiW8C0h/PfffzdK80j//Kkx01Trvyd27dqF4ZFDVQVi0ODBRmmB3fp8ebJvv/79jRIiKgmGfyIiInJqTFSUCuGbN20ySgo0atQIK1a9Z7wDUlNTjVf2Xbp0SY3r/3j/x1C/QQPMmj2r2I2+Yv68+Wp6X/v2akpEJcPwT0RERE6Fhoaq1v/5sfNw7tw5o7TAvfp8qQBIkH+kVwSiJ09WrfoS8q1lZmaq+wO6d+2qHuj1YPdu+GDtR+rm4aI+S/oMX+/ejZdipvHJvkReUoHj/BMR+Q5fGdfd17hyXnjuSp+MyNP1gXAV2F9fsMAoLUwqBmtWr8arL880SvK0at0ayXv2GO+gKgljosbioV69jJLCZHjPJwY+jlwtF58kJqJy5crGHCIqCYZ/IiIfwgBrG8O/75CuOtJiLzfnDhs+3CgtTioBlr0WWL614JlnnjFKgfdWrsSdzZqhefPmRklxcl/BPwY/qVr9E7dsRlBQkDGHiEqK4Z+IyId4I8BKN4sTJ06o1zfddFO56C5RXsO/tKSbylLAHTVyJDZtTHRaAfCEBP+nJ0xQzxVYvuo91d2IiLyH4Z+IyIe4G2Al6KekpCA1JRX79+9TgcwWeUKrPKipY6dOCAkJKZUKgVnp+P7AAfU+LS0NFy5cUGOzV6lSBX/W/+rVq+dRyC0P4V/6um/buhUHDx5Uw1ra02/AY+qcSet4ixYtjFLvkkrHsWPH8Ft2NrL1P9mnG2+8EY0bN1bz72jaFLVr17bb1UautQR0+b71HzgAk6Ojbd6s667Dhw9j+NB/qhuL31i6BGFhYcYcIvIWhn8iIh/iaoCV8LUsbhnWrH6/0BCLEhyF+VCmU6ey9EB+HDt37Cj2ORlWsaStzbIfO/R1x69da7fiUZRURPr07Yf7w+53eftlOfzLTa/zY2PV02tNcuNsw0aN8itGZgCXrjLW51E+J0Nc9oqIMEo8J4FfbqAt+p1xpEu3rni4d2+01SuORSsC5ndw1syZqv9+zIzp6qZfT0hr/9qPPsLzk6PVe7b4E5Uehn8iIh/iSoCVMDn5uedUgJMgPSQyUrXoO3sA0tmzZ2GxWPDWkiX5QVRGURkwcKB67S55MNOMmJj8IClBMTw8XAXBgICA/C5HZtcWaWk+nH64UPiUSsiIkSOd7ntZDP8Sjqfr58ds5Zdj7d6jB1q2bOn05lUZKnPXzl0qWAupBMyaM8ejh1zJLw6LFi7M3w+z8tUoqJH6JUZIJUy+H2fOnEFOTk7ekJ6bN+dXRGSZSdHRNlvirb8HMlb/mLFj0PKuu1z6JUAqO4kbN+LtpW+pbcp3aNLkyXyYF1EpYvgnIvIhzgKsBH8ZF13Mjp2rnq7qySgoEi5fnjFDVQKenjgRw0e412/7jUVv5AdTWb5P3z5udSWS7X+wZk1+IHXW0lvWwr91t5iSBFoJ5G8tXYrFCxepAL585Uq31mNdUZTKx9/79HGrK5FsX8K53OArZB3SxcfRrwAm6Q5k/rJhPaLPx+vW4dSpU/hi2xfqhl4hlRt5jgBb+4lKH8M/EZEPcRRgJYjdE3K3CoGLlyzxSpcdM6BKRcLVriVm8PdGK620GsvTXYWjUV3KWviXMe6lYuNJxcoWs9InIXnV6tVGqWPmsJyipP3n5bs3RQ/98l0ZNnIEnnn2WWNOYeY1kM9IhcVa0aE+zV8gQtuEltq9DURUHMM/EZEPcRRgzdBtHeQ8CbzWy0ioe7R3b/X+823b1NQRM1BK8J81e7ZqAS7pPrgSbF3Zhif7YY+zdTmaL91sOrRtp87RgoULVZkn+1Z0mVdfeUUFalf7w/fv21f9smN+vqT7YF1ZtFdRK7oNORfSjej06dM4cfy46g4kyssoVERlEZ/wS0RURnyxbatqLfXmCCgSwKT1VbqFmH3zHZEbRkXUuHEedTeyRYKptJBLUHVlH3zdN8nJajrw8cfV1FseGzBATWVkJ2ckdMv5lBZ4b3Wlkest110kxMerqTPyq5BUEmQfpMuRvJY/Bn+ia4fhn4iojJgaE6P6fHub9NeXllwZ2tGZG26oovp92+ue4ynp+iHrlVbisu6+9u3V+ZQbe71JgrSst+dDPY0Sx+R8trvvPuOdd8h1l/XWrFnTKCGisqYCu/0QEfkOd7tmlLQrhzdcjX1w5fPePC5n6yqN/S/Km8cjrsY+eHuficj72PJPREREROQnGP6JiIiIiPwEwz8REfk86UbirCuJK58hIvJ3DP9ERERERH6C4Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP1GB4/wTEfkOc5x0d7l6o6un63eFOzfbluZ+eJO9Yyrt6yRK6xxdjX1wZxtEdHWx5Z+IiIiIyE9UYMs/EZHvMFta2XJ6bTm7DrxOtvG8EPk+tvwTEREREfkJhn8iIiIiIj/B8E9ERERE5CcY/omIiIiI/ATDPxERERGRn2D4JyIiIiLyEwz/RERERER+guGfiIiIiMhPMPwTEREREfkJPuGXiMiHlPUnpGZmZuL06dM4esT2/t/RtClq166NypUrGyW+qbw/4ffSpUs4ceIEvj9wwCgp7JZbb0XdunVRq1Yto8Q1fMIvke+rwPBPROQ7PAlPZ8+ehcViwbf639GjR7FpY6Ixp0Cr1vegYaNGaNWqFf6m/7kb6hyRwL/+4/X4YttWJO/52ih1rEu3rni4d2+0bdvWJysCpRX+U1NT8d3+/Th48CB27tiBjKPHjDkF+g14TK8g1UGLli3QsmVLr50fCfw79G3Gr11r8ztiS9369dCnbz/0fKinS98Zhn8i38fwT0TkQ9wJT+np6UiIj8fihYuMkjwSHosqGjSlMjAmKgqhoaFGifuk0vHW0qWFtj9s5Ag0btxYtfAXJb8I/PTjj9i5c2d++JRwOVbfj14REeq9r/Bm+JfQvXnTJsyLjS12DaRCZu3cuXPFgvnTEyfqAbwPatSoYZS4LykpCTNiYvK3L5WvNm3a4PaGDXHzzTerMmvyi0BaWhoSN27MX0a+V+MnTHC4Hwz/RL6P4Z+IyIe4Ep4kTK796CO8ED1FvZcQOWToUAQHBztsnZWwfujQIWz/6qv8wC4hcNLkyW7/EiCt/Y8PGKCCoVmRcKeVWvZFgqVUHmQdEiwnR0f7zK8A3gr/0tI/buxYdYxmK3pom1BVQXJ0rFKx+3rPnvzzI95YugRhYWHqtavku/L6a6/lX29PKhK7du3CfL3iIr/qyDHMnTcPLVq0MOYWxvBPVAZI+CciIt/QsF599WdPTk6ONnLECPWZfn36aDt37jTmuOfMmTPaKzNnqvV06tBBO3HihDHHOfmsLCPLJsTHG6Wekf0wj2fypElG6bUn+yN/9jibL+TamJ9bsXy5unaekHNsnu9FCxcZpa4xr7GcY3eusS2yH7IuR98X83iJyHdxtB8iojJEWvylW4i02L8dF+dxtx1p+X3m2WdVa7K0LD89frxqJXbFooUL1TKyrHTXkdZes8XXVeYysh+zZs9Wx/P+yvdUK3N5oH4Z6f+Yain/aF0CBgwc6PGvGnKOl69cqdY1a+ZM9WuCK+Rz0uIv51bOsfy6U5JrpfZj1Xvq2st3gIjKJoZ/IqIyQrrKSFcf6WYjYU7CZEnCnJBuJC/FTFNdOuRmUGdkHySkS6B0twuKPXIc02Ji1OtPNmxQ06JcOU5XPnO1yA3QYlJ0dH4XGU/2z1xGgrtUAMTLM2aoqTNyn4GIGjfOa92ppLIpXbTkOyAVHCIqexj+iYjKiOPHj6tpv/79vRbmRNdu3dR029atauqI/Dog4W/g448bJd4hvwDIzcI33nijUVK2rVn9vqqkeauCJKQCIOdIKmpSCXOmZs2a6loFBQUZJd7RvUcPtV4iKpt4wy8RkQ8xW4Zt3TApN4HKKCz3tW+ff8Omo8/bY2uZdQkJamx3T7oReWsfHHHl857shz3O1uVsvq3z6cn+FV3G1nfAHd7YB0c8WT8RXV1s+SciKiOkBVf6XXsS+pyR9ZZk2E8qrLTOZ2l+B4jIPzD8ExERERH5CYZ/IiKiIqTbiqOuK87mExH5KoZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMV+JAvIiLfYT4kyV3ujDzj6TZc4ep+lMZxluZxeZMvXKtreZ2I6Npiyz8RERERkZ+owJZ/IiLfYba0suW0MFfOC8/dtcdrQOT72PJPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/wfBPREREdNXkIjv9S6yLi0b3+g3Ug9HUX9doLFtvQVau8bGicg9hWa+mBZ+39ReZgCzj49ZysyzYUGR7zSPnIt7R9jyVmwXL+rVYFt2r8L7J8SV8ifRsb2/QdBHp2+IwpWvBOXJ+jL8jPW5g4f0s9jcG67KuGJ+3oo7z7ULba3THUMSu/RSWrMvGh7zlMrIsnxb/ztTvhSlxCdiWftH4nGv4hF8iIh8i/0EX7jwhNTMzE98kJyNZ//vx8GEk7/namJOnbv16aNO2LYKDg3Fns2Zo3LgxKleubMz1LtmX06dP4+iRwvv/5ypVUK9ePdSuXdujbbtyXjw5d1fT2bNncejQIaSmpOLEieN4f+V7xpwCXbp1Rf369XFXSAhC9L8aNWoYc7zr0qVL+j6cwLFjx/BbdrZRmqd+gwa4+eabUatWLaPEdb5+Da49PcRtexVDBi/FIaOkmOBILH3nGXQMvN4oMFzchin3PolVOcZ7W8LmYvvSCAQab0XuyQSMDhuHzXaWCwibhg9iH0OTKrbbg7XsQ/h06VLErd2IFDRHr95PYGhkOIKq/Mn4hEk/tuS38fygmfjc0T4GhGHssmkY1SrQey3QuSex7aURiFy2zygozP4xnsa26EcQuSLDeG9LT8zePQe9Aq8z3utyM7BuVF9MSLRV1dIFPIgp8TMxqElVo6AITa+oJC7DkrgPsW4v0LL3oxg8dBAebFwVFYyPmHKzdmFB9HjMS7KzLSUQncfPwdTRoQh04aRWYPgnIvIdroYnCW+bN23C+6tWFQr7ZtC3VrRCIJ/p07ef/tfHK+EyNTUVu3buwprV7yPj6DGj1L5Wre9Bj5490bVbN5e3X5bDf3p6OhLi47F44SKjJI8E/erVqxvv8hStEMhnBj7+OEJDQ40Sz0nlI3HjRuzcuRObNiYapfbJ90SuUXiXLmjRooVR6hjDv2MFQVwPa2MnYnj/bghRIV9adj/EgsnTsepgDgK6zsWnCyJQ0yrIXbHMxb295+O8jYBvl1VIDQgbj9iJg9A5SAKpHj4/W4ZXn5qjB/VAhMeuxusRdYuHce0EEqOGYGHVIXjpH+1wGzKx4+1/Y9Z/+mPVa4+iwf+ZUdW6UhOAJgMnYETvbugWYgZ8Ob6NeH/hTLyuQmwIRq99C1Eh1dTckpHW+0h0fXGHXnEagBenj8ZjarvW5xRoMjYOq8e1QhVjKeWKBbGtHsHr52wEfLsu42TCRDwYlYAcvSIz+rVnEXl/kL5e+UXnMyyd+bw6RlvXMM//cGpjNB5eUAlPTx2EtjWBU9uX4YVXLmDQmn/j0QYFjSO5WZ9h6pNjsEL/TsixTRnZG126h+QHfPlFZ/2qRZgyLwn6t8b2Mdoi4Z+IiHxDw3r11Z8jJ06c0Pr16ZP/2VdmztT0QKedOXPG+IRtaWlp2orly7VOHTrkL6uHUmOu+1JSUgrth6xX9kXWKfNke+af7J+UT540Kf/z8rdo4SKn+y3MzzviymeuppycHHU+zP2Sc7VlyxZ1/RyR+fK5kSNG5C8r503W5wlZTs6zuS5zfXI95LpYXye5blIu+239PZF9l3nOmJ8nWy5pae8MUOen2eSt2gWj1Nofae9oEeocDtDi0i4ZpeJ/2qn4p/TyO7SId37Q/jBKnclfX/Dz2tYLRZf6r5YZH6U1k/kPvaOl2VipWj54krb5zBWjRNNyz2zWng0uvH9/ZMZrI4Jlvx/SXtiaaX///sjUtj7/kDoHDR+cr+391dUjceDCVi1abbu3NnfvOaPQ9If26975Wjd75+BUvDbUwfHb9McPWtxDd+jba69Fb/2PUVig4FwUvYYGtXxn7dnNWVquUaTlZmmbn+lc+Nr+cUxLGH6vvp47tG7PJ2mn7O7ff7VTW2PyjtHmOSiO4Z+IyIc4C08SwMzPSEBzJTjbIgHPDHcSDN0llQhzPyRIuhIMTRJGJXSaFQfZD2eB2NyWI6585mqRYzTDu6vB2RYJ5OZ65Dy5e73lvJrX2ax8uFOJkO1bV2CcfVfMz5ENTkKjkv+Zu7Sh8ceNQvEfbevk9o6XLcasMNivbOQHZ5uVA027kvq61v7Oadr23/Jjqqb9tl2bemcf7c3vze+RuW96SJ3ztfarUWpXflh351js+UNf3fMOKzD5Ab/eU1rCqf8ZhaJgWbvnxxZzfXbOmdNrdSVVW9A2TJu6/axRIM5q218K17q8eUDLq2ZZHZdLlSRzm64dC8M/EZEPcRSeJPiZQU7Cc0lZB0MJha4yg78sK+GwJKQSYq7LUQVAPiN/jrjymavFDMwS3D1tsbdmttzL+lxlfX3lmpVkP+Q6m5U1WZc9Ml/+yFPHtYQhd+nnsEj4z68UFA2wjvyq7Z3Ttfi6CjG3Zyeo5li0BT3baYMW7NBOXvpDy710Qtu94EmtWZ84Le1yXoXA8a8LtvxXO7U3UUv4eK+D1mxvsWr5L1Y5MH+JcXR+ivvf3jna3bK+IfHaKaOsMGeVrgta6uv9tGZPLNJ2n/xNy839TTu5e5E2KHiwFnfot7yPuFJRLOKPU3u19fGJ2t5T/zVK7CvWE4mIiHzTmtVrVJ/6N5Yuye8DLn2szX7WrjKXkRs6l69cqcreWrJETZ2R/usvRE9R/cFl2aCgoBLtQ6+ICCxf9Z46rhnTpxtzrz1nx+RovvStl/79cm/DrNmz1Q3OztZni/Uyw0cMR78Bj6m++rt27VJlzixauDD/+zJg4EA0C77D432Q6/x2XJw6Jrn+8j2gUnDxML7ZeU5/cQfaNr05r0xkn8Lh9BygRUvUubC98Eg6aoQZW6PonMfxA9K/PhB31LXXt74a6jSVuwd+xc/nf88rsla5Jf6xYCpapb6Ajn9tiKC/huO5g22xZF4/BKn+/rnIzjyCH+WzQfp/U+zcNFzY9QgMeRC9ehb0XS8VMhpPwjyMHzgHh+QegxciEFRoe9nIPHxcn+rnuu5ZbCs0kk4o/jn3Axuj6FzB6Ywj+pnVz1zTurC6Qlauw811G+hnFsjJOo/i9z5XRfMhL2N+q314rl1T/bQ1RceJP6DtOzMwoHFA3kfM6406aFTLaQ9+pWJgCHpEPGjcQ+IYwz8RURmxf/8+FbrDwsKMkpKTCsDTEyeqG4JlpB5nPkv6TE2n//vfHo0GY4tUZMxg68o++DqLxaKmY6KivDqq0qDBg9X0px9V1HJIzqPcPCzn1VvfFzmWf02apF6b3wPypss4+fk6rJPM1yIMbRpWyivWXTn8LRKlPHUa+nR5EtNWWI1qk5OE18cPQte//xvbrIeYzP0N5//zX+ONM+dgOfKLHm2LqoBKdTph1OJE7P1mN3ak7MVnrw1B68D/Z8y/jJ+P/qgCbrWOzdHAF1Kl3MR7lx7gbw9Fn6j52N1mPN7c8k7xm4uvZCDlExnlZwem9e6FyBdXWo3AlIXP5z2LyAcex4vbTupVHNMV/Hr+rPHaBXuP4KSNUUJRqR46jl6AzanfYPueb5G6NRZDW9+mVxvy5P58FN/JSa1+N5o1KPgeeAvDPxFRGREeHq5Ct7fdH3Y/ZsfOdSmoyhCVwhujz1jr2KmTmmZkOBpyr2yQIU3lfDZp0sQo8Q5pfZf13t6woVFiX06OJAegVatWauot5qg/5veAvCf35EbETErQg3TRVurfcWTfXtXaLMNkjn5rM1KOHlEjKqm/7zbjzbFhCDi4FJFPLobF/AVAD//nMvK+ByV3HarcfCturVapyFCUehg+J2E4AHWq/9k3QuXpDHwvP54YcpLm4J+9JuC15CyrEK+fniP78IX6nIy89CYSv/ux4JweTUXiW+PROWAfVgx+CvMt6uzrzOP1hgq4rspNCLy1GioVGd8z99dzUP/C6lbHDaVwUhn+iYjKCOki4+3QLSRUyrpdGXYzZvp09X+O3iat07Le0ji+q82d8+kuV78Dsg9yPuXz3ibrle8BeY8a0nHI5LwhQF+cishCrdSVEDR4hTrvh79fgig1rKSVKkF6eJ2CaV0DgYMfIv4bb4VTd+Tg+LnfCoXrayYwAm/KuVJ/eoiPfQJNcpIw7++jrEK8HoCDBiNefWYX3hz3AIIKdVmqiqD7h+HFGRF6tcaCt9emwL3HaHlJxjn8WgonleGfiIiI6BopGMsdaDIoBlOfaOp8nPaiKt6CO1rLL0IZWJf0XV5QrfhnVK9r9CEvNdfhhuolreRmwzK3W8E9DC7/2XnybiF6iI94DrEvyrNPLHj9pQSkuxymr0dg0xaQs5qzdissF2VBbxyvcxVvqI46xuvSwPBPREREdA0UDv7z8dYL93t4E6weSqvlhdL8m0z18F/tL2bffGeqI6TBLfl9zl13PW6t3xBSxTi/bR+OuBqss3+CpdjNtKWlEhq2DUMzeZl+BJnFboy2r+IN1fAXeZFzDhdyjPBvnGeX3N0ANd0/qah4a33cKSf13F7sP2LjRmybLiLd8pNelXKO4Z+IiHxe3k/4jrsbufIZIt8gT9h9DcM7R+rBvyo6v7gGq1/yNPjbY47kk4XvMwq6uxRmjgh0g+rP776KqBrSCb0kqKan4nvrG47tysXFb5Zh8AMt0OiuubBcqYKQcRvz//26/jffxSfy2grxnioYyef8gQyczissomBEoIDAaqpi5Laqd+L+3nX1Fz9iz4FfXOtOddGCdwfej5b1uyHW4rgKwPBPREREdLXkZuGb+RPwyJA5+DynOfrHxmHOYAddfXIPYVmvpmhUvwOmbLMdNwtGoQlAs3bBuEWVVULNBo306Tns/uaw7T7rV37Bkb1y16vrQ0oWYwbVnM14c3Wq85bn3HTEz/0QObKvY7uhpQct4wV+R3rcQNUNqHn0Nrv98q+cPAI1Blf1Bqhzs2zQteVyfz2P/8iLFiG445a8Hb2uZgOEyIud3+IH1RWoqN9x8shhfRqAho1uc78Ll1IDIWEd9TVkYfPidUhx+muFfjxrl2KV/OTTog+6t3S8VYZ/IiIioqsh9yS2vTQM/eYkIScgDGM/WIyXIpo4DogV66HNw3fpL6z68xeVvR+frP5Wf3EXItrWM8LddbilaYjq7lLQZ91aLi5uX4e3JfsXGVrUPTej/chxCA/IwaF5MZhVaGjMoi7i0LuxmJ2qp9SAcAwOb1DCIFrQpSdn7TpsPWnrl4fz2PfFdv1/A9DkiXZorDK89XK2zo04j5QN67FfKikPh6KhuaO3BKNtiwB9wW34zGLj5uqL3yB+yUH9hfW1cFdFVG0/xLiJ+w1MeXUrsuye1FxkH/oQr76yQ38diPAnOxfsqx0lO+dERERE5ILLOPnxqxizTMboD8HoFa/iqVaBLgQxPaiGP6qHaz1vrngOT8/fVSgI5mYlY8XLMXhd7hsYOxaPBBWE+IoNO2OwBMicdzFm/AJ8nt/PXrodLcDTI99FjouB0ZGKNbshWo2MI0NjPoCe0W9jg8V6aM3LyLIkIDayC7q/+Km+zeYYuPAZ9Kzp/IFUzhQcYwKmPP82vrHuepSdjs/nPoPB8yyqsvHPvi3yK1qFz82bhZeTB4Qtn4UpslzwcEx5NKjgOlVsgAeeDNePNQOrRj6H2M/SjV879BCevgWx459TLfABXR/FAx5XqHQV66LnlIl5laplkWjXPRrL1luKXHsL1s0dhjZdpuDzHL1yMygGzz9U1+l3qoI85td4TURE15j8DC2kT6sr3P288GQZR3xhH7zN2f65u/++cI6uxj54e5/LlexkxP59sB7SXRt7v9rYj7B7XIhxE64enpPfxvODZuohTxUUoQe/gdMR+6+HigxZqQdSywL07S1PubUtoOtcfLogAjVLEP7z6BWKhNmIinrX7rYU+cVj2TSMcqni46LsA1gWFYlpSXL/gg3BT2D2/AnoFVTVKMiTm7ULC6LHY56byzm9lgERmJ00E71KXLmRCsXHmDlmMlY5/N4EovP4OZg6OtSl+0YqMPwTEfkOMzy5y91wVho8CZW+zt4xlfZ1EqV1jq7GPrizDX+Rmx6HRx54CfuN984UDv95pKV346drscjqabQBYWPw0sAeeKBjkfH/rdhaDsEDMGVkb3TpHuLdG42z07EtyYKUDbF43TpUy/aGhaNNWLsiFRQvkdb6TzYifuHsgqAsD0WLeRzdwx1s05vLoTn6vzgMDz8YhpDAkv+qUUCvWG37At99+zFemJeUN5qTItt7Eve37YyORSsoDlRg+Cci8h2lHbZKM3T7QrD1NnvHdDVCcWmdo6uxD+5sg4iurgoM/0REvsMMWwxP15az68DrZBvPC5HvK4XfXYiIiIiIyBcx/BMRERER+QmGfyIiIiIiP8HwT0RERETkJxj+iYiIiIj8BMM/EREREZGfYPgnIiIiIvITDP9ERERERH6CD/kiIvIhfEiSb+BDvjxzrc9LZmYmcnJy0PWBcKOEyH/Z+3dYgeGfiMh3lIdQmZ6ergLY0SOFj+GOpk0REBCAWrVqGSW+yx/C/9mzZ3HmzBkcO3YMv2VnG6VA/QYN1HUKCgoySlx3Nc/LpUuXkJKSgtSUVHyxbSuS93xtzCEiwfBPRFQGeBqeUlNTVdhOTk7GuXPnsGljojEHaNX6HjRs1AjBwcG4vWFDNGnSBDVq1DDmlpyEsB07diB+7dpC27Wnbv166NqtG8K7dEGLFi2MUt9SWuFfWqYPHjyIw+mHceLEcezUz1vG0WPGXKDfgMdw4403onHjxvhbq1ZeryjJ92TXzl1Ys/r9Qtu1p0u3rni4d2+EhIS49J25GuFfvm9rP/oIby1dmn8M99x7r/4db4hW+jl7qFcvVUZEtjH8ExH5EHfCk7Tcrlm9xmaQkxBpKhowhcwfNHiwR627JglhmzdtwoSocUZJXlhs06YNqlSpolr6TeYvAWlpaUjcuDF/f6Ri8q9Jk3yuEuDt8L9r1y6sWL68WOXIrJiJopU2IfP79e+vKkqVK1c2St0nof/lGTPyW8fNCphUMm659VbcfPPNqlx8f+AAsrOzsXPnzkL781LMNPR+5BGH+1Ha4T8pKQkzYmLU90cC/5DISITcHYLq1asbnyAiZxj+iYh8iKvhaV1CQn7oliDXp28/hLYJVWHOXjiT7jgS7N5ftSo/BEolYHJ0tNvBUlqwnx4/Xq1Htj82Kgr3tW/v8i8Ksi+fJX2GWTNnqvdPT5yI4SOGq9e+wFvh3/o8CTnfHTt1Ur/C2GvVl0rdoUOHsP2rr7B44SJVJud47rx5HlWS3lj0Rv55lu3/vU8fl9cj+/LVl19iXmysCtxSGZk1Z47dfS+t8C8Vzel66H9/5Xsq9I8ZOwb3hoYac4nILRL+iYjINzSsV1/9ObJo4SL1mU4dOmgJ8fFaTk6OMcd1aWlp2sgRI/LXc+LECWOOc7I9WUaWfWXmTI+2b5L96Nenj1qXHJevkP2RP3uczRcpKSmFztOZM2eMOa6TZVYsX56/vZ07dxpzXGMuK/sh59pTco2tv3f2jsXcT2+SbZvf1TcWLdL0ioAxh4g8wfBPRORDnIUnCfsyX8KQJ2GyKDPQyfpcZS5jhnVn+2yL9TLW4U4Csy9wdkzO5su1MYO/u4HdFgnu5vpcDfHyOfm8VK7MCpqz/bbFehnz+zd50iT1vihP1u+I9XcjaUuSUUpEJcFx/omIygjp+iDdL6QLyLSYGNXFRrpZmF0tXGW9jHS1GTZyhOrbLf3SnZF9kC4k0v3DW910pMtR1Li8LkxyD4EtrhynK5+5WuReDOkm88bSJQg1uqd4sn/mMnJvxuIlS1RZ7Ny5auqMdKsSU/XvSknuF7DWKyJC3dch3W+kS1Bpe3rCBPXdXLHqPdwfdr9RWtzvv/+Offv24eN164wSIrKHff6JiHyIGQ5t9ZmWmzYf6RWhbrwcMHCgKnP0eXuKLiMh7p6Qu1Ul4Jlnn1Vl9khffRlDfXbsXBUEhTf2QfTv2xc///wzPt+2zSgp4Mo2PNkPe5yty9n8zh07qqn1sXiyf0WXGTVypArD+w9+7zTQR0+erEK69fa8sQ/m/SaJWzYXu2Hck/XbY27nmX9NxLDhtiuacpP0mtWr8erLefc0EFEBe/8OKzD8ExH5Dkfhybxh1/rGWm+EOSFBS0Z9MVup3eGtfXDElc97sh/2OFuXs/m2zqcn+1d0GVvfAXd4Yx8c8WT9tpgVUrm59+24d1CpUiVjTgH5ZePf06erUaTMIUnr1atXohGsiPwBu/0QEZUREmqktd2T0OeMrNeT4E+2ldb5LM3vgC+RblNiasw0m8F/8RtvYFhkJHK1XHy0LgELFi5EWFgYgz+RCxj+iYiIyGdIq7/cV9J/4AA0Mp6BYE1a/KWbj7T2f5KY6LMPiiPyVQz/RERERUi3FUddV5zNJ89ZLBY17d69u5paO5mZqVr81fMGZs/22o3MRP6E4Z+IiIh8RvzatWpq6yFeixblPfTMmyMYEfkbhn8iIiLyGTKakXT5KUpG9lm1YqUalYp9+4k8x/BPREREPkFGMxKtWrVSU2tfffmlmoZ36aKmROQZhn8iIiLyCTk5OWp6yy23qKm15ORkNeUNvkQlw/BPREREPkHG7Be2+vsLebo1EZVMBT7ki4jId5gPSXKXOyPPeLoNV7i6H6VxnKV5XN7kC9fKk+tkbxlb++jOMVr74IMPsPajj7Dq/feNkgLTXnoJklief/EFo4SIPMGWfyIiIvIJ1//f/yF59x4cPnzYKCmw7J04XP7fZeMdEXmqAlv+iYh8h9mK6mnLaXnlynnhuSs9/fv2RYUKFfHe+6uMkjwy7n77tu3wUsw0DBg4sMTXIHryZLy/8j2by8u6+w14DDHTpxslROQJtvwTERGRQw0bNcLXu3cb7wrUrFUL9Rs0wIb1640Sz126dEkF/we7dzNKCkglQwQHB6spEXmO4Z+IiIgcMofetNUd5x+RQ5C852vs2rXLKPHM5k2b1HTgwIFqau3gwR/U9PaGDdWUiDzH8E9EREQO/c0I/1/v2aOm1no/8ohq/Z/83HNGifsyMzMxLzYW99x7r82RfizfWtS0ZcuWakpEnmP4JyIiIodq1aqFVq3vwdtL3zJKClSqVAnPTZ6MjKPHjBL3SHefGdOnq+WnxkwzSgvIk30XL1io+vtXrlzZKCUiTzH8ExERkVP9+vdX4/DvttG95/6w+/HMvyYa74CzZ88arxyTFv+nJ0zApo2JWLx0KRo1amTMKbBm9Wo17d6jh5oSUckw/BMREZFT4V26qIdsRU+ajN9//90oLTBs+PD8CsCjvXtjXUKCatW3RSoHK1esQIe27fKDv1QgipJW/1dfnql+dQi18+AvInJPBQ71SUTkOzhcpW0c6tM3JCUlYXjkUAwbNRLPPPOMUVrYvn378PKMf+ePDiTddWSUnuuvvx5nzpzF/v37VOAX0sdfuvrYavEXo0eNwqefbETils0ICgoySomoJBj+iYh8CAOsbQz/vsMci3/Fqvds3pxrku5BX23frvrri1atWyN5zx51c3CXbl1xX7t2Dpdf/MYbqtXffIYAEXkHwz8RkQ9hgLWN4d93SFeefwwerIb3dFYBMEn3nerVq6vuQnKDsDNm8JdKwqzZs3mjL5EXMfwTEfkQTwKs9J8+dOgQfvrxRxw8eFAFLbNbhfSVlgc03XjjjbgrJER1v5CRW0pTenq6mp4+fRq//Pwz7mjaVL2/6aabUKNGDfXaXeUl/Mu5+f7AASQnJ6v3O3fsUKPcSF/6Nm3bqjIZU19axxs3blyqoVe+N2fOnFGvZZ9uufVW3Hzzzeq9sy42cqPu4wMGqH2311/fUwz+RKWL4Z+IyIe4E2DloUqfbNigumAUJf2shRkurUmFQEZukRs4vRGsJAhu27oVO3fuzK90ODJs5Ai0u+8+NWa7q9svy+FfQvaa1Wv0v/dtXgupnFlX2Kw9PXGiCtbe6O8uLfYpKSnY/tVXSNy4sdi+FCXhu02bNujYqZPNCqNcdxmiU/a7/8ABGD9hgmrd95Q8xXfGjBmqjz+DP1HpYfgnIvIhrgRYCZNz9GBkhn4JSuHh4aqF3V5IlKCWkZGhgt/ihYtUmbQ2z503Dy1atFDv3SXrXLRwYaHKhxkYq1Spgj/rf3/5y1/U8JAiLS0Nlr17VXcRIdsfGxXlUiWkrIZ/GfFmQtQ49VqOt0/ffghtE4o6derY/BVEArqcp+/278eG9evzz5X0e5eHaXkShmWd8vRceYiWGfil0hFy993q1wUhvzT85z//wW/Z2cjW/+QXJOvrKpXJESNHFqsEyLpff+21/O/U1Okx6Nqtm1uVAKn4yHCe0tov2MefqHQx/BMR+RBnAda6u4UEskGDB7vdKmy2RM+amRe2lq96z+1hFOVXh8f75/26IEFyjB7iXW3JN38peGvpUnUcsvysOXMcdkcqi+H/jUVvqHPsTiWnKDnP8/XQLpUAT1rDrVvnZT+GREbabckvyvylwNy+eGPpEoSFhanX1lJTU/HyjBn5n5NfAjp27IR6+jZr165dqJ+/hH3pbiRdjTZv3qxa+oWn32cicg/DPxGRD3EUYCWMde/aVQXm2bFz0SsiwpjjGel/PmzoULW+j9YluPwLgBn8JUxOio62GQZdYd1qLOv6cO1au/cElLXwL2PYvxA9RQX2aTExHt/rIKzPkwTkGD3Mu0IqeTLevlxf6Wo1+qmnPPrlQMg1n/zcc06/e+Y1sMUc7aco2beIhx9m6Ce6Shj+iYh8iKMAa3Yhse4W4UngtV5GKgBdHwhXre+rjCepOiKB8p6Qu1VYX75ypVduHjZbyB0FW1eO05NzURqsz9EniYkqcJf0OolRI0eqFnxXx7w3h+SU+waGjxhulHrO+lenry17bVZozH3ef/B71X1JunydOpWFEyeOq3H+L1++jNq16+C22wIddlMjotLDJ/wSEZUR0kVCSN9vb5HwJS2v0l1Dwp0zcqOomP7vf+cHfwl8ZuhzlfUyEkwl+EtQdWUfrgZnx+RovsViUVP5VcTTlnZb/jlsmJp+baP1vCipgMj5lEqdGfydHZMt1svI9ZbrLqTbmCNy3PJLkvxCINuXSt3zL7ygpvJeyhn8ia4Nhn8iojJCbuqV/vneDJRCulxIVw5X1is3ggp37xFwRvqhC7kpuayrV6+eOp8hISFGiXdImJb13t6woVFinzmEp4zq5E3mdZeWfCIqmyqw2w8Rke8wW1ld7R7i7ueFJ8s4cjX2wZXPe/O4nK2rNPa/KG8ej7ga++DtfSYi72PLPxERERGRn2D4JyIiIiLyEwz/RETk86QbibOuJK58hojI3zH8ExERERH5CYZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPxEBY7zT0TkO8xx0t3l6o2unq7fFe7cbFua++FN9o6ptK+TKK1zdDX2wZ1tENHVxZZ/IiIiIiI/UYEt/0REvsNsaS1LLaee7LOvH6ez/eN1sq0snhcif8OWfyIiKhEJeu6GPU+WoZLhdSIiwfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMM/0REREREfoLhn4iIiIjITzD8ExERERH5CYZ/IiIiIiI/UYFP+CUi8h3l4Qmply5dwokTJ4x3hQUFBRmvfJuz61BenmSbmZmJnJwc412B2rVro3LlysY71/EJv0S+j+GfiMiHeBqezp49i0OHDuGnH3/EwYMHjdICtWvXwW23BeKOpk1LJYCnpqZi185d+GLbViTv+doota1Lt65o06YNOnbqhFq1ahmlvqW0wr9UjNLS0nD0yBE1vXDhgjGnQKtWrXDLrbeiSZMmqFGjhlHqHfI9Sdy4ETt37sSmjYlGqW1169dD127d0O6++xAaGmqUOsbwT+T7GP6JiHyIO+FJguSOHTvw1pIlTgO3NQl1ffr20//6lDhc7tq1C/NjY/O3L+tu07atCrBFnTqVhf379xUKnf0GPIZBgwf73C8C3g7/6enpSIiPx+KFi4wS10hFaeDjj7scvu2RFv5FCxfi/ZXvGSV5627WrLmqFBaVnJyMnfp3K+PoMfVeruvYqCj0iohQ7+1h+CfyfQz/REQ+xNXwJC3t48aOzQ9nw0aOwF0hIahXr57NIC3hLyMjA6kpqViz+v385V6KmYbejzzidhcPqXg8PWFCfpB/euJEhLYJRYsWLdR7R2TZlJQUrFi+PH/52bFznQbLq8lb4V9a2ufMnp0fulu1vgc9evbEnc2aoU6dOsUqX2aXqe8PHMDmzZvzz48E9UmTJ3v0S0lSUhKGRw5Vr2X7Y/QQ37JlS5euuXxv1n+8HrNmzlTvZT9m6cdjb1mGf6IyQMI/ERH5hob16qs/RxYtXJT/OXl95swZY47rdu7cqXXq0EGtY+SIEVpOTo4xxzn5rCxjLuvJ9k3W+6FXBozSa888v/Y4my/0EF/oHOsVHmOO69LS0rTJkyblb0/OlzsS4uPVcrIfW7ZsMUrdJ9fY3I9+ffrY/b6Y+0lEvovhn4jIhzgLTxLgZL6EOQmXJSEB7pWZM9X6JNi5yqx8yNQbrEOyhF1fIPsif/Y4my/n1puVGgn95jZdve4S2OXz3viumJxde3Mfich3cahPIqIyQrqEzIiJUf2vl69cqbqASDcLs6uFq8xlpOvGM88+q7pySLcU6b/vjOyDdAGR7iODBg9SZSXZByHHsXjJEvVa+sXb4so2XPnM1bL2o49U1yrpVjVg4EBV5sn+mctIn//lq/K6DknffVesWb1GTaf/+9/53YVKsg9i+Ijh6trLd0C6NBFR2cPwT0RURpw4cUIFyiGRkV4dJSdq3Dg13f7VV2rqiOyDkH7rngwFaY/cpyCVGsvevUZJ2bZh/Xp1PHI/hbdIBcCsqEklzJkTJ46raUlvFi6qX//+anrmzBk1JaKyheGfiKiMOH36tBod557WrY0S75DgLeutWbOmUWKffFZu5jRbs73p823bsGr1auNd2dawUSNVSfNmBUnIyD9yrVxpdY+ZPr1UbryVG7Nlvb42QhMRuYbhn4iojJAWXAl0pRG6ZL2lEej9VWmdT/M74M1ffojIvzD8ExERERH5CYZ/IiKiIqRbi6MuM87mExH5KoZ/IiIiIiI/wfBPREREROQnGP6JiIiIiPwEwz8RERERkZ9g+CciIiIi8hMVNJ3xmoiIrrFG9RsYr9zjzsgznm7DFa7uR2kcZ2kelzf5wrW6lteJiK4ttvwTEREREfmJCmz5JyLyHWZLK1tOC3PlvPDcXXu8BkS+jy3/RERERER+guGfiIiIiMhPMPwTEREREfkJhn8iIiIiIj/B8E9ERERE5CcY/omIiIiI/ATDPxERERGRn2D4JyIiIiLyEwz/RERERFdTdjq2xUWje/0G6sFojeqH4p9zV2ODJQu5xkdsyc2yYEOh5RqgeeRcxK+3IMvBgp4u55HcLFjWr8Wy6F7521J/XaOxLOFLpGd7e4Omi0jfFocpXZu6cIzZsMztVnj/HP3dNReWK8aiJnWcbxfaXqM7hiJ27aewZF02PuQtl5Fl+RTrilzDRvV7YUpcAralXzQ+5xo+4ZeIyIfIf9CFu09ITU9Px/cHDuDUqSycOHHcKM1z4403onHjxqjfoIGaVq5c2ZhTemR/rAUEBKBWrVrGO/e5cl48PXdX09mzZ3Ho0CH88vPPSE5ONkoLBAcH49bAQDUtyflyVWZmJnJycox3eYKCgoxX7isL1+Bay836DFOfHIMVBwuf9zyB6PziUswZ3BRVjBJT7skEjA4bh822FtMFhE3DB7GPoUmVwu26ni5n0rIP4dOlSxG3diNS0By9ej+BoZHhCKryJ+MTJj2gJr+N5wfNxOd2tqUEhGHssmkY1SrQey3QuSex7aURiFy2zygorPgxSvjvgz7zDhrvnag+BmuSxyHkOuN9bgbWjeqLCYlZRkERAQ9iSvxMDGpS1SgoQtMrKonLsCTuQ6zbC7Ts/SgGDx2EBxtXRQXjI6bcrF1YED0e85LsbEvRvzfj52Dq6FAEunJSJfwTEZFvaFivvvpzRVpamrZo4SKtU4cO+cu58jd50iRt586dxlpKTg+Pan2vzJzpdF9GjhihrVi+XEtJSTGWdo25vCOufOZakPOzZcsWrV+fPvn76MqffF7O1ZkzZ4w1lZycd1mnXAdb2zT/5DrK9ZTrKvvvKnN5suOPH7S4h+7Qz9EdWrfJK7W9p/5rlJ/S9r47Weumzl9vbe7ec3nlpj+OaQnD71XnttmQ+dpnaReMGRe0tKT52tBgWe5ebUT8Me0PY47i6XKm3OPaxjHhWo/o1drenzK1kz99rX0Q/bDWetga7afLucaHxH+1U1tjjP2XY3tLW7/3lNU69fl747W5Q/L2xeYxeuySlvbOgLz1PjhZW56/XdnmSi36QeN8z/la+1WVu+aPzHhthDo/Rff1v1pmfJTWTLYXHKnNTUoz1vuH9mva5vxjbDY8Xsu0eVIvayc/eVZr3e157YNvftROnvxR27vmea3H38ZqH/xU+N/aH6eStBfU/ucdW9zHe7VTVuv849ReLWFOZN6+uHGMDP9ERD4k7/8YHYcnCWMSzMzPSlCTSoAEtRMnThifKiDhUSoKRUOfhEtbn3eV7Ids11yfuS9SuZBtJcTH5//J56Tc+rOyfVcrIeYyjrjymatNjs+6QiTnQCoCcj1shWopl/nW11f+5ByWhOxH0cqHfBdkO9bXSa6b7GPRSpxcP1cqIebnyZY/tAtbn88Lag/O1/b+WjQZntP2zumtzl+zyVv1eF7gj7R3tAhZLvh5beuFostZhdGH3tHSrMOhh8uZ1PLBk7TNZ64YJXp94Mxm7dngAVpc2iWjRP9cflB+SHtha6btioT4I1Pb+vxDed8Tm+fAAxe2atE2Q7rQA/ne+XmVEpvnwI5fv9bmqtBtq0JlVuDaa9Fb/2MUFig4F4XPUT61fGft2c1ZWn71KTdL2/xMZy3inR8KtpVfcdND/fNJhUJ/YdYVL9cqVQz/REQ+xFl4krBuhjh3wrM1CZjWQdyTdUgLshkQZSqh0dWKhCxrHW5lX5y1LpufdcSVz1xN1hUjV8OzNTknEsjN8+zKeSpKPm99reW8y/l3ZT1yPeW6Wl9nZ98Vcztky3+0rZPb6+fnjsIhL9//tFPxT+WdwyHx2imj1Lq8aKUgnxmACwVcT5crcCX1da39ndO07b9ZtfL/tl2bemcf7c3vze9QwXG51PKcH9Zth2f3WFWo7FRg9JOgDZX59Z7SEk79zyh0pKASZnOd5vrsVibM82Hn+K6kagvahmlTt581CsRZbftL4VqXNw9oedUsZxXFosxtOrjWVhj+iYh8iPo/HP3PFglsZsu9hEl3g2BREuTM7UmFwFXWy0k49XQ/JAybwVSOy9F6zO054spnrhY5L7IvEphL8uuKkPNkfd1dZf19kamn+yHrMY9H/hxVAMzPkCfM0Fm0cvCrXt5VL79LGxp/3Cgr6riWMOQu/TPWgdPT5azkWLQFPdtpgxbs0E5e+kPLvXRC273gSa1Znzgtzej24/jXBVukO06illCkC0vpsGr5t1c5KMJ+d588/9s7R7tb1leogmbNWaXrgpb6ej+t2ROLtN0nf9Nyc3/TTu5epA0KHqzFHfot7yNOfl2wRboArY9PLOhK5oDX7rUgIqLStXnTJmzamIhhI0dg+Ijh6sbdvBEf8m6ydJW5TGhoKJavek+VLYuLU1Nn5IbVyc89p17Lsr0iIjy+gbhGjRqImT4dT0+cqI7r9ddeM+aUbZcuXcK82FjUrV8Py1euVDfuluQ6yXmaNXs2WrW+B7Nmzix2M7U9y+KWqfMq53fBwoUe30As11euc+KWzeq9XH/5HpD3yGg86+Y+g8HzLEDwcEx5NMjqZtjzOH5AbvYMxB11q+UVFVMNdZoG6tNf8fP53/OKPF7OSuWW+MeCqWiV+gI6/rUhgv4ajucOtsWSef0Q9H9ya2ousjOP4Ef5bFAD1LJz03Bh1yMw5EH06hni2s2pnpLReBLmYfzAOTiEEIx+IQJBTrd3Gl8unKtujg4Y+BT+EVL0vF3B6Ywj+pnVz1zTurg5r7CI63Bz3Qb6mQVyss6j+L3PVdF8yMuY32ofnmvXVD9tTdFx4g9o+84MDGgckPeR7FM4nC5L1kGjWkVv/batYmAIekQ8iJDA640S+xj+iYjKCHN0mNFPPaWm3iAVgH4DHsP7K99zKdAlbtyIjKPHMDt2rlpWlCTYCqnISLBdvHCRz4RKZ8fkaH5KSoo6R2Ojorw2Yo8E8H9NmqRey6hOzsh5lIqCnNdBgwepMmfHZIv1MjIK0BtLl6hjk+8BldwVy1z8TT+/je99BBPmfYd7x76JxA9GIcQ6ROf+hvP/+a/xxplzsBz5RY+oOk+XK6QCKtXphFGLE7H3m93YkbIXn702BK0D/58x/zJ+PvqjCrjVOjZHA19IlVcsiL1L/97eHoo+UfOxu814vLnlHUQVC/LF5aZvwLwVGfqrtpgw6F49phd1Bb+ed+O/UXuP4GTxkwpUqoeOoxdgc+o32L7nW6RujcXQ1rfp1YY8uT8fxXdyUqvfjWYNKuUVehHDPxFRGfJSzDSvD9XZvUcPVQGQFmtnDh7MGxovvEsXNfWWfv37q+nx44WHKS2r5Hz+rVUr4513yDCtst7s7GyjxL4zZ86oqZxXb35f2rZtq6bm94BKoqAVOU8WPp/3TzwS9Sa+sR4nXg/x5zKKtx875elyNl2HKjffilurVSoyFKUehs9JGA5Anep/9o1QeToD358zXutykubgn70m4LVkx89QkF9KUjasx379VcDASDwcZCt0m8frDRVwXZWbEHhrNVQqMr5n7q/noP5LWLc6biiFk8rwT0RURkgXmQEDBxrvvEda8GXdrrRSjxg5UnX/8HYFRCoTst46deoYJWWXO+fTHXLOXf0O1K5dW53P+9q3N0q8Q/ZB1ivfAyqp6xAYMV89E0H9ffcpZg9srofVmej35GJYSu1hWKUhB8fP/eYkXF8lgRF40zynR1ORGPsEmuQkYd7fR2G+paCqVczFFMQvsegv6qJX2J02Wv2vgYxz+LUUTirDPxERuUwCbUkeAmWPhEpZr/Rvp5IrzfMp6/V2xYZ0VZqg19RXMKVFAHDwDUz7MD0vTFf8M6rXNfqCu8PT5dxyHW6oXtLvmJtP283/G4N1Wbb61FiriqCI5xD7ovxiZcHrLyUg3WaYzsVFy1askx9KWjyJJ9rb7s3vneN1ruIN1VGazSAM/0RERES+oGI9tHn4Lv1FDn48fEqPxVL2Z1T7i9nH3pnqCGlwS17fcU+Xc8v1uLV+Q0gV4/y2fTjiait19k+wpF803pS2SmjYNgzN5GX6EWTa/EXlLCxJ2/SzHoBmD4eiod10rIf/am6E/7sboKb7JxUVb62PO+WkntuL/Uds3Iht00WkW37K+844wfBPREQ+z+wa4YgrnyHybQXhsmCkGHNEnix8n2Gv24o5ss8Nql9+Hk+Xc0dFVA3phF4SVNNT8b31vQp25eLiN8sw+IEWaHTXXFiuVEHIuI35/35d/5uPXoGuJeuKN1TDX+RFzjlcyLER/i9+h8/Wyo2+dyGibT0H4bhgJJ/zBzJwOq+wiIJ7OQICq6mKkduq3on7e9fVX/yIPQd+ca071UUL3h14P1rW74ZYi+MqAMM/ERERUWnLPYRlvZqiUf0OmLLNdmwEfsfJI4fVq4KhJCuhZoNG+vQcdn9zGDbby6/8giN75S5X66EhPV3OTWZQzdmMN1enOm95zk1H/NwP81rZx3ZDSw9axgv8jvS4gaobUPPobbaPUXfl5BFIb35Ub4A6NxffYP7oOgENUe9Wx0NlXlezAULkxc5v8cNFW7HcvIYBaNjoNnh2VmsgJKyjvoYsbF68DilO7//Qz8PapVilui31QfeWjrfK8E9ERERU2vK79GRg3ertOGkrz2UfxJebj+kvQjCww+1GN5zrcEvTENVtJWftVliKBc5cXNy+Dm9Lhm8RhjYNzRZ8T5dz181oP3IcwgNycGheDGZtO+mgpfoiDr0bi9mpekoNCMfg8AYlDKIFXXpy1q7D1pO2fnk4j31fbNf/NwBNnmiHxsWy/xX8csCiRvlBm7vw16pO9uiWYLSV+zJytuEzi42Rfy5+g/glMhqWs18RHKmIqu2HYFrXQHX/x5RXtyLL7knNRfahD/HqKzv014EIf7Kzg25LeRj+iYiIiEqdHlTDH9VDsp4bE2fixdd3WQU6PcClb0Fs1Bi8fjAHAV0fR5+WBePSV2zYGYMlCOa8izHjF+Dz/P7yF5H+2QI8PfJd5NgIfp4u566KNbshekaEHq/3YcXgB9Az+m1ssFgPrXkZWZYExEZ2QfcXP9W32RwDFz6DnjWdP5DKmYJjTMCU598uPExqdjo+Nx+eplc2/tm3hY2WeFu/tjhQsQEeeDJcP9YMrBr5HGI/Szd+7TCu4fjnVAt8QNdH8YDHFSpdxbroOWViXqVqWSTadY/GsvWWQpWAvIfDDUObLlPweY5euRkUg+cfqus03FeQx/war4mI6BqTn6+F9Gl1hbufF54s44gv7IO3Ods/d/ffF87R1dgHb+9z+SOttO9h/MMS1oyiQvQAN3A6Yv/1EIIKPS1XX86yAH17y9NqbQvoOhefLohAzULJz9PlPKFXKBJmIyrqXbvbUgLCMHbZNIxqFei9FujsA1gWFYlpSXL/gg3BT2D2/AnoFWRrAM8TWBf5ECYkAZ1jP8abEbWNcgeykxH798GqomZTQARmJ81ErxJXbqRC8TFmjpmMVfa2pQSi8/g5mDo61KWnJldg+Cci8h1meHKXu+GsNHgSKn2dvWMq7eskSuscXY19cGcb/khabDd+uhaLXlyZH5QDwsbgpYE98EDHILv9xG0th+ABmDKyN7p0D7Eb/DxdziPZ6diWZEHKhli8bh3GZXvDwtEmrF2Rio2X5GbB8slGxC+cXRCU9YrG6JjH0T3c0TbN8H8D+sd9hGkdnbb957G1PTRH/xeH4eEHwxASWPJfNQroFattX+C7bz/GC/OSjBvBhWzvSdzftjM62qzY2FaB4Z+IyHeUdtgqzdDtC8HW2+wd09UIxaV1jq7GPrizDSK6uiow/BMR+Q4zbJWl8OTJPvv6cTrbP14n28rieSHyN6XwuwsREfkTCXruhj1PlqGS4XUiIsHwT0RERETkJxj+iYiIiIj8BMM/EREREZGfYPgnIiIiIvITDP9ERERERH6C4Z+IiIiIyE8w/BMRERER+QmGfyIiIiIiP1GBT/glIvId5eUJqZcuXcKJEyeMd0BAQABq1aplvPN9zq5DeXqSbWZmJnJycox3QO3atVG5cmXjnXuu9nmRff8mORnJ+t/OHTuQcfSYMYeI7P07rMDwT0TkOzwNT2bY/v7AAfVewpCpdu06uO22QNRv0AB16tRBjRo1jDneYx3C3l/5nlFaXKvW9yDk7rvR7r770LJlS49DZmkrzfAv5yojIwO//PwzTp3K0q/bcVV+4403onHjxvhzlSqoV68egoKCVLk3yfckJSUF27/6Cpa9e5G852tjTnH9BjyG4OBgdOzUyeWK29UI/3IMO/Sg/9aSJYX2/8Hu3VC9enVMi4kxSojIFoZ/IiIf4m542rVrlwpyixcuMkqckwA+ZOhQtG3btsThOz09Hcvi4goFfll/w0aN0KpVK6ME+SG3aOvs0xMnok/fPqVSISkJb4f/s2fPInHjRmxYv95h4LZWt349/dz0w/1h95e4IiCBeVncMsyaOdMoyVt/G/07YFYOTVKBO3fuHDZtTDRK8q7pvyZNQosWLYwS20o7/KempuLlGTPUOZTK7N/17879YWFopH/fiMg1DP9ERD7E1fAkofv56Oj8ICnhrEfPnri9YUPcfPPNhbpumN065FcB65Z5CX9jo6LQKyJCvXdH0TAprcTde/RwqTVf9mfb1q35QVj2Y/q//43Q0FDjE9eet8K/nKe1H32EF6KnGCXAsJEjcFdIiGrdt+4OJRWEM2fO4PTp00hNScWa1e/nV5Tk/I6fMMGjSpIE5nFjx6p1ybkeEhnpUmu++SvBJxs25H9nZN9HP/WU3WtcWuHf+vsmoX9M1FiEd+mCSpUqGZ8gIpdJ+CciIt/QsF599efIzp078z83edIkLS0tzZjjGj1gagnx8VqnDh3y16FXDoy5rhk5YoRatl+fPm5v35rsh3kscly+wtwne5zNFydOnMg/T3Ku5fjcPc+yjJxjcx2yTndYf1fkXLu7fZNcY/NYZGpvPea2vEm2ZW47evJkTa8kGXOIyBMM/0REPsRZeEpJSVHzJQjK65KQSoAZql6ZOdModc4M7I5CoDsk0JoVEdknXyD7In/2OJtvHVgXLVxU4vNknnM5T66eI/mceV5LUkEzyTFIRVHWt2L5cqO0MJknf95ifR7fWLTIKCWikuBQn0REZYj0dxaLlyxR/a+lm4XZ1cJV5jLShWTW7Nno0q2rumdAuhK5Yl5srOo+IstK94+S7IOQ7ifS7UesWb1GTYtyZRuufOb/t3cmcFFV7R9/4PVvhkui5r4miGS4YJpbZmYaZrmVptIbJeaWippZqamp7/uWKahpmlSYmGmFkAuFmGbuJrlkJKgoCpJpKiKpKfzvc+bemTvDHWZhgBnm9/184N65s93lzLm/85xnKSkSvv9e+Myzm8yo0aOKfJ7YNWt55ErhuvNJZKT8bOFwjAG/nt+nxAwUZR/4GKZNny5czNiNiV1xipt5c+eK8zjlzak0ctQoeas2mRkZtC1xm/wIAGAO+PwDAIAToQgzLZ9pFudBT/YUQbIsKJnCXm8O0/dofa45lNfOnjuHhgUHi22O2Aeme7duVKtWLVq7bp28xYA132HPfpjD0mdZen7I4MEinuFY8m96/3h79s/0PcrnWvMZ06dNE7766tc6Yh/WREcL8R+/NaFAILI9n2+OuNhYmhw2sVDhf/PmTTHQWhyxiM6kFf07AShLmPsdwvIPAAAuAgeCcuAnZ39xJCzg+HMrV64kbzEPBxKz6Avq3Vve4jhWr1lD75aRNI2c7YgHSOYCY+2FszTxteKgaUuMHjNGXCtHw9eeP5fbQnHBwc8s/Nt36EAvhYTIW405evQo9QnqTZMmhNH9Ne8X5/ubuFj5WQCAOTxg+QcAAOfBVsupIyy5RaUk9sGa1zvyuCx9VkkcM+PIY2KKex8ctb/LP1ouMvt8l7hVM40nu/eMDA0V7mdvT59OPXr0kJ8BAFgCln8AAAAAOA1s9WfhPyR4mKbw37d3rxD+HKvydUwMhD8ANgLxDwAAAACngQOVmecHDRJLNRzUGzxkqAg65oBzZysOB4ArAPEPAAAAmMBuK4W5rlh6HtgPF3/jQl4tW7aUtxj46CNdJWuODXF0PAUA7gLEPwAAAACcAk4fytmM2KXHFLb6r41eI7JSmWYZAgBYD8Q/AAAAAJyC8+fPi6Vfs2ZiqWbHjh1i2bFTR7EEANgHxD8AAAAAnILfjh8XywdbtBBLNcnJyWLJxe0AAPYD8Q8AAAAAp0Iry8/e3XtEjQMAQNHwQJ5/AABwHpQ86bZiS/Cpvd9hDdbuR3EcZ3EelyNxhmtlz3Uy9x6tfbTlGNV89dVXFPPNN7T2yy/lLQaGvPAC+Tf3p3dmzZS3AADsAZZ/AAAAAFhkxvTp8pqBb+Pi5DXHcPvWLTq4b78I7jWFt9/+57b8CABgLx6w/AMAgPOgWFHttZyWVaw5Lzh3xQefWy66NWfuXHmLjqNHj9KAZ/vS8siVothWUa/B9GnT6Ms1XxR4/82bN+mh5v40csxomvLGG/JWAIA9wPIPAAAAgELh1Jvsc29KMzkrz4aYGLEsClzZl4X/yLFj5C0GlCxAyvcBAOwH4h8AAAAAhRIQ0JLOpKXRlStX5C06KlSoIMT691viKTU1Vd5qHz/t3CmWj3bpIpZqzp45K5Zc/AsAUDQg/gEAAABQKK1a69JrJh1KEks1/fv3F8tVUVFiaQ9s9V8UEUHtO3SgDh0L5vHfsEE3swDLPwBFB+IfAAAAAIXSunVrsVREuBpOy/nuvLnCZcceuKovBxOnnzlLb779lrzVAM82fLd5i/D3v/fee+WtAAB7gfgHAAAAQKGw6H596lQhwk+ePClvNTBg4EB66une8iPrYYv/65MnC7chHkC0bNlSfsbA+nXrxLJnr15iCQAoGhD/AAAAALDIoMGDxDIiPFws1bDv/wcLFugHAGPHjCk0BoCt/XGxsfTcgAF64T902DD5WQNs9Z//v/eo3SPtUdkXAAfhgVSfAADgPCBdpTZI9ekcrImOppnTZ9CKyEh6oscT8lZjvlizht6ZpqsJwKL9sW6PU506ten27dtUvnx5SklJofgtW4SbDwfwLlwUoWnxZ9gdaG30GorfmkC+vr7yVgBAUYD4BwAAJwICVhuIf+eALfavhITQwf0HaOfuXVS3Xj35GWPYYs/uOl+tWy+yBDHtHnlEet9+sc4zBP37D6DOXTqLWQMtlEEEuxuNGj1K3goAKCoQ/wAA4ERAwGoD8e88ZGRk0GOduwir/efRq80OABS4Wq/yGo4XqF+/vlnBr7Bv714KHjJU1BdgdyIE+gLgOODzDwAAAACrqScJ+dVrvxAW/X8Hv6gZAKxGPTjgzECWhP+3cXEQ/gAUI7D8uxGKVQyAkgaWWOuB9VobWP6dj71799K0t94Svvvst/9s377yM/bBrkILJbHPPv4Q/gAUH7D8AwAAAMBmOnbsSKvXrBFBvZMmhNHQF4YIdx1buXnzprD2Pz9goBD+nM8fwh+A4gOWfzcCVjFQ0qDN2Q7OmTaw/DsvHASc8P33okIvzwJwld4+z/ShhwICREVeLTcftvKf+P13+mnXLlqxdJnYxoOIN99+Gyk9AShmPCD+3QfcGEFJgzZnOzhn2kD8Oz9csKt9YFv5kTHKNeHZgQP79ol1BXbxCX7xRTGTAAAofjwg/t0H3BhBSYM2Zzs4Z9pA/LsGyjX4cfcu+vngQZHT/9q1a8LS/9flv6ipT1PxfP36DahV61bk5+dH1apVE9sAACWDB8S/+4AbIyhp0OZsB+dMG2vOC85d6YNrAIDzg4BfAAAAAAAA3ASIfwAAAAAAANwED7j9uA8lMR3LlR+Tk5Ppj6wssfxyzRfyMwAAW4DbhDFw+3ENcA0AcH48IP7dh+LqlDnDQ/yWLbRp40Y6uP+AvBUAUBQgnoyB+HcNcA0AcH48IP7dB0d3ypzbeVXUKvrgvffkLToaN2lCHTt3In9/fxo6bJi8FQAAQFkH4h8A5wfi341wZKesLuvOcFGXF4a8QA8//DDVrVdPbAMAAOBeQPwD4Pwg4BfYzPKPltOLQ4YK4c9W/hWRkfTFl2vp2b59IfwBAAAAAJwYiH9gEyz8FTefIcHDaFP8FnqixxPiMQAAAAAAcG4g/oHVrImO1gv/KW9OpTlz51KFChXEYwAAAAAA4PxA/AOrOHLkCM2cPkOss/AfOWqUWDfH0aNH6du4OPkRAAAAAABwBhDw60bYG4jFWX2eDgoSPv7s6sMWfy1u3rxJq6Ki6Kt16+lMGoK9ACgKCJgErggCfgFwfmD5BxbhdJ5KcO+kyZPlrcawpb9PUG+a/7/39MK/V+8gsQQAAAAAAM6BByz/7oM9Fhku4NU+sK1YX7goQmT0MWXf3r0UPGSoWG/YuBFNCAujR7t2pWrVqoltwH2BFdB2cM6AK4P2C4DzA8s/KBSu3Muw1V9L+LPFXxH+bOn/OiaG+vbrB+EPQBHguhkAuCItAgLEHxuOAADOCcQ/KJRNGzeK5Suhw8VSDfv4T5oQJtZZ+H+wYAFEPwAO4MC+ffIaAK5FUO/edPzYMfkRAMAZgfgHZsnIyKCD+w+I9W7duomlGg7uZf9+dvXhIOB7771XfgYAUFRSU1PlNQBch2PHjoolDEEAOC8Q/8AsycnJYskuCKaVe9nqz1l9GPbxR0cPgGM5sH+/vAaAa8CuPt9viZcfAQCcFYh/YJaTqSfFsqlPU7FUk5KSos/q07NXL7EEADiGe7286JPISJFmFwBXYb1sEAIAODcQ/8As58+fE8t27dqJpRp1Ok+4+wDgWP7OzRXpdT9cskTeAoBzw4UguQL8Paj6DoDTA/EP7OJESopYNm7cWCwBAI7lhWFDacWyjyguNlbeAoBzwvFhEydMEOu3bt4USwCA8wLxD+wi+9o1sWzWrJlYAgAcCxfU42D6yWETae/evfJWAJwLFv4vDhsmZqpWr/1C3goAcGYg/oFd1K9fXywPHjwolgAAx8JB9KvXrBEDgBeHDKU10dHyMwA4B5yRShH+r0+dSh07dpSfAQA4MxD/wCI5OTnymgEfH1+xPHVSFxQMAHA89erV0w8AZk6fQdOnTUMQMHAKEhMTKejJnkL4L4gIp1GjR8nPAACcHYh/YBYl0FdJ+anG37+5WHIdAOQjB6D44AEAV87m4Pov13xBTwcFwQ0IlBqczpMHoaNCR4hBKbv6cFV3AIDrAPEPzFKzVi2xXBu9RizVcN5/zv/PcLEvAEDxwS5AS5cto9lz5whLK7sBsQBjf2sASgKeceLg8/aBbcUglAejPCsFVx8AXA+If2AWPz8/eY3o6FFd1UY14yeMF0u+EcASCUDxMyw4mOK3JuhnAR7r3IWWf7RcWGMBKC64f+cZJw4+Z2s/u/nwYJRnpQAArgfEPzALWxtZZDDff/+9WKrp0LEjDQkeJtanvfUWrJAAlAC+vr5CeC2PXCmEGOdWZ2ssBgHAkbCln/36hwweLGaalKBedkGDmw8Aro1HvoS8Dso4Po2biOXJM7oCXdbAFh/u+JmDvySRt7e3WFe4efMm9QnqrS/6xRYh3BiAgj1tzt2x5ZyxQEuQBuaLIiKEOGO4PsDzgwZRq1atxGMAbIEHkPFbtogK00qbYtE/aPAgYRCyBH7zADg/HhD/7oO9nTJbfjiwd+TYMTRlyhR5q4HMjAz6z3/+Q99t3iIet3ukPQ0fMYIaNWokUoKiArD7AiFgO/acM2UQ8OXateK3yvDv8IUhQ+jRrl2tEm3AvWFDz+ZNm4Q7mYItol8Bv3kAnB+IfzfC3k5Zbf2P+TaOWrZsKdbV8AwAB/7O/9978hbgKrBrV0BAS2rVuhW1bt3aoYM1CAHbKeo50xJxPBvwdJ8+Dr++wLU5cuQI7d2zl9av+1Jv5VcGjT179bKrreA3D4DzA/HvRhSlU+bMIiwmGjdpQp9HrxbZfrS4cuWKdCNZRz/u+JEO7NsnbwWuhD3WPnNACNiOo84Zu2/8tHOn0WwAM3LMaOry6KMioB8zAu6HluDn2JFBg1+gJ3o8IWJKigJ+8wA4PxD/bkRROmUWEs8NGCBuFpzi89Ooz6hChQrys9rwbICl14DShbM4cbwGV2o2TenKaSUHDBxYJEsxhIDtFMc542D8Hdu306aNG40GAjzr06lTJ2r/yCNFFn3AOeG+OykpiX6R/lYs+0jeqhP8Qb17i4GgI2eE8JsHwPmB+Hcjitops4BQSrlbmgEArgcP1nbv2i0C/ZRZG3YB+GDhQrtT+kEI2E5xnzP+Hf8sDfYSEhLo+y3x8laDGGwTGEj+/v5I4+iisNg/ceIEHTl8hH7csd1osMe/58e6PU4dO3UstoBw/OYBcH4g/t0IR3TKpgOAt6ZNE1PFoGzxbVwcTZoQJj8iUcXTnmI+EAK2U5LnjAOFDx8+rCkUGY4V4Erf/Ftv1qwZ4gWcEK6wfvbsWWHZTzp0yOgalsaADr95AJwfiH83wlGdMg8AXp80SX+TYTcgLvjFef9B2YGzOL0++XX9LIA9AwAIAdspzXOmthofO3bUaGaAYctxYNu2YiDAA4IGDRogbqCE4IHa+fPnhdA/mXpS8/o4w+wNfvMAOD8Q/26EIztlvhGtilolCgwp8CCgzzN96KGAACEKTGsCANeDXYFenzxZn8b1x927bBIUEAK240znTBGcvx0/TikpKQUsywo8Q1C/fgOqU6e2GBR4eXkhhsBOeAB2+fJlIfL/yMqi5ORk2rN7tz44Vw2fdxb5Sp/rDAMx/OYBcH7KpPhXblhaVK9e3W0tVcXRKfOUM6f4VKcVBK4BD9aa+jSlbt0ep8C2gWYHazwAeCXkZTEDwJbfT6Xrba37B4SA7Tj7OVMPCC5cyJLWz5n9/bMlulPnzmJgoBgK7Dkunm28dOmSvpigmpq1alGNGjVcbrChXGcOrGeBz5nSTC35Cq4044LfPADOj4criX/FIsI3HYYzlDCnTp7UtEZZg3JzYtiCUqlSpTJruSrOTpmvDVeF3LNnj9kbGHBu3p03V2T30crQxC5AXTt3EessVoYFB4t1S0AI2I6rnjN1/5yTkyMErVbfbO1xsWFhW+I2o5SUllDSmNoTn1LSKNdZQT1QUmZQeFDjaoHX+M0D4Px4OKv4V3xPT586JW4ilizLPP2phoPUtOCp62vXrsmPLA8cOBVe48aNy0QGjJLslPnGzQQ92VMsgXPCOf3V4opnAz5Y8IFmFid1EPCBpENWWR4hBGynLJ4z7s/bB7YV65aOi638Hy1bpu/zFT92tno/2KKF2KZG8YFXByyzpfzNt98utow2jkC5zvFbE8qUoQm/eQCcHw9nEv8sGA/s318gFzWjnvZUpnkd7cKjCNbCprOVG5GjcyOXBOiUgRbsxpHw/fc0OWyieMwWR3NpXIe+MES4//CgYdToUfJW86DN2U5ZPWfWHBdXJ5721ltiMKpUJbbFiq/MFiguRta209LAna8zAKB08Sht8a+4i5gKfiXFHFt66tevX6oimy1RPPvAqdR4X9VT0DzNzGXQndnCpIBOGRSGOo2ruUJu+yRxFjxEN8t2LPk3i79LtDnbcVdRyMJdmSlcHrmSevToIdbtgT9r5IgRoi3b4qZWkrjrdQYAlD4epSX+WWh8sWaNUcVBttJw8RFnzyfN+25aLZNnJsaHhTm1ryk6ZWAJbtuPyb79HAMwVBoMqOHg34ea+4t1a1J/os3ZjruKwiGDB4v+VGlX9pwH9XvUg1lr3dRsxZp9NPcae47PFSirxwVAWcJTXpYY7GKw/KPlQmCw8GfRzJ09WxF5epYt6M7uSsN+/2xJWrtunfDXZOs/37ReHDKUxo4Zo3cfAsDV4La9ICJcrL8zbbrIQKKGZwJGjh0j1nf99JNYAlBUuM/kPlQYgBxkQOG2PO+//xXrPGMLAABAR4mKf7bEvBISIvwxFdHPApo7e1fynVfDgVpT3nhDWJbYVYkz3fDUdVxsrPwKAFwLdmPj2BYm6VCSWKrxa9ZMLDnnOwCOQMngxjO/joTjshh22wQAAKCjxMS/MgWrWHc4V7gzu8jYCk8pz503j76JixXCiYMn10RHy88C4DrwQHzQ4BfE+o4d28VSjZJxRXF5A6Co9O3XT7iJODp2itsyfy73zQAAAHSUiPhnV5/XJ00Svpds7Wf3Hle19FuCb16r16wRA4CZ02fQkSNH5GcAcB1atdaJsLXRa8TSHDyoBwAAAIDrUCLif/fu3cJKyL7xZcnabw72NV2xcqVY/3jFCrEEwJXgVLrm8PHxkdeIcnNz5TUAAAAAuAIlIv45Mw4zPDRULN0BjgXgAmEcA8AzHwAAAAAAAJQ2JSL+lUJZxZFqzZlh4c+cPn1aLAFwFS5duiSvFeTkyZPyGolCewAAAABwHUos4Jdx1xSYLTRK0gPgzBw5rItVGRJsnOffFHcb0AMAAACuTomK/4jwcLdxgUGqT+Cq8G90/bovxXq3bo+LpRolLSOn6wUAAACAa1Gi4p/dYF6fPLnMDwASExNFqk8AXJGE778XmbmYzl06i6WagwcPiuVjGgMDAAAAADg3HvkS8nqxoZT7VgJgOQ1m+KJFDs/pXNr89ddf9ElkpKhczMeoCChnKXOOsuvAEuyax0XqmIWLIujZvn3FusLNmzfpoeb+Yp3T9lrK3oU2Zztl9Zwpx2UrtpwHe7+jqBS2j5b2qaxeZ/zmAXBeStTyv3TZMpo9d44QxQP79qPp06aViTgAnslgN5/nBgwQwp8HOZzrHwBXgn+LI0eMEOtPPd1bVPo1hWcFGB7cKtVTAQAAAOA6eJSk5V+xBLDIYP9/JRvOC8OG0tN9+ggx4UrFv/g4tiVuow/ee088ZkE0ISxMVKtknM0CAosM0IIHrzHffCOK0jGNmzShz6NXU9169cRjBbb6vxLyMh3Yt09U6eZifZZAm7OdsnrOyuJxWXNM5l6D6wwAKC08SkP8K+zdu5c2b9qkTwXKcCGwLo8+Sn5+fk6ZSYQr9v567Bht2rhRFC5jFNHPllL14MXZOsGS2h9lNufs2bM0KlRnSQbOCf/eeLZKgS3+b7/9dgHhz3wbF0eTJoSJ9QNJh6z6fUII2E5ZPWdl8bisOSZzr8F1BgCUFh6lKf4VMjIyRCEwtaBmOJsIBxX6+PpQo0aNROGskoT3i/Ods9hPTk42GqQwLJxY8JuLXXC2TrC49octx1zFma+h6TkCrgFb+8eHTRDtuUKFCvJWA5nSb6Fr5y5inV33hgUHi3VLQAjYTlk9Z2XxuKw5JnOvwXUGAJQWHs4g/tWw4P754EGRUURLSPKAoKmPD/n7+1OlSpWoZq1aVKNGDfFc/fr1bXIbUscbKOkL+XuvXLmid0lSw778nTp1oocCAqhZs2YWv8vZOkFH7w8HOK9ft17v9gRcBxb7HTt3oir33UePdulCrdu00RT9DLv79AnqTWfS0sTv79OoKKt/ZxACtlNWz1lZPC5rjsnca3CdAQClhYeziX9TWKCz+8gfWVnC+r5n9259Fp3ihIV+48aNhch/sEULmwcWjLN1go7cHw5wXhQRob8WLCafHzyIOkqDowYNGpC3t7fYDlwbFv6cnve7zVuEexsHstfTcAkyB4SA7ZTVc1YWj8uaYzL3GlxnAEBp4eHs4t8citVesdgzSv5xa1FmDxgWr15eXlS9enWHxRo4WyfoiP1hF595c+fqZ2X4vL01bZrIB2/OcgxcE3b1+Xfwi8Liz3wTF2tzel4IAdspq+esLB6XNcdk7jW4zgCA0sLDVcW/K+Bsx13U/WHhz1ZgxSVqyptT6aWQEIj+MgZb+zmlpxLcyxZ/e+tyQAjYTlk9Z2XxuKw5JnOvwXUGAJQWJZrnH7gupsI/eu0XNHLUKAj/MgTHunBGH/bvV4S/UrOirBXkAwAAANwVD1j+iw9nO+6i7M/899/Xp4Rk4d/BQmVXth6fP3+efHx85C3AGeE6FX/8kUV79uwRfv1qFkSEF0hfayuwAtpOWT1nRTkudvNUJ2VQUFw32f2QY41KOj20Ncdk7jW4zgCA0sID4r/4cLbjtnd/EhMT9fn6CxP+irvIl2u/FIWggOvBLj7DQ0MpqHdvhwgpCAHbKavnzNbj4jowu376yagOhSV4pqr/gAHUuXPnIg1arcWaYzL3GlxnAEBp4QHxX3w423Hbsz+czvM56WbKWX1Gjh1DU6ZMkZ8xhi3I/503Tx8cClwDFvudJKHEFlROYeto9x4IAdspq+fM2uNiK/8706fra75wetk+zzxDDzRtKtI6qzOv8Wtzc3NFv5OQkKB3S+R2/bb0GT169BCPiwtrjsnca9z9OgMASg8PiP/iw9mO2579Wf7RcpHHn6fVN8Vv0fTxX7F8Oc3/ny7Xv2I5bv/IIyVelA04HxACtlNWz5k1x8XW/heHDBXrLwwbKhIK2NKPmNYeeX3qVBo1epRYLw6sOSZzr3Hn6wwAKF0Q8AvMwkG+yk2Uq79aEv5c8XhzfLyo/grhDwCwhSNHjgjhzwYETis7d948m/sRdlVjsf/j7l3CBYj7LzZgAAAAMADxD8yye/dusWSrPwd+msKuPorwZwvblDfeKBE/WwBA2WPihAliqWSXYguyYkW2FuU9XIjugwULhMsQDwCUujAK1ny2Na8BAABXBOIfmGXH9u1iyZV7Ta3+HNzLPv4MW/yLc2rdnfj99xN0+fJl+ZGOzMzMAtscwe3bt8UfAKUNW/05rmj23Dk2VZAuDDZEvPn222L9wP79YgkAAADiHxSCUsVXKwiUs/pwkB1P0b82bpy8FRQFFvibt2wRVabVcJBj1KrP6fr16/IWx7BhQxyVL19efgRA6cFBu+zj3+3xx+UtjoH7Lv5cAAAABiD+gSbqaXK/5s3lNQOczpPh4F64+jiG9eu/pvr16suPDLBA97rXi7Zs+U7eUnT2H9BlUgHAGejYsaPw8XeU1V8Nfy7HIQEAANAB8Q80YUucgre3t7ymgyvBKnn8OasPKDosxi9dvkx16tSWtxjDgYwp0oAsLe2MvMV+eIYhISHR7HcBAAAAoOwC8Q80UfL1t+/QQSzVqP3PXSWrjxK8Z/rnDLA7z65duuDqeyrcI5amKEL9u+++F8uikJj4g1ia+y4AAAAAlF1KTPwPGTZMXnMfprw5VYhnzj3tqjT1aSqvgeJi7959lJv7t1iveX9NsTRFEeo8O1AUlx0OKOYZBKZB/YIuRgAAAAAo25SY+F+7Zo1Li2B7OHr0qHCPcWWfeHbxAcUHW/33HzgoP5JE/j2WA3CTDv0ir9nO9u075DUAAAAAuCMl6vbzSWSkvFb24dR1XGrey8vLJcV/zVq1xPK7zVvEUo2X6ngyMjLkNWAPv/xyWF6zHrb+swXfVvg9/F4AgGPgKraWKtla8xoAAChJSkz831OhAq1Y9pFbVFtkQawUrFEHzroSnF5SgXP6q6lbr54o/MUkJyeLJdBx5MhRSkjYalVaTs6xf/Dnn+VHtmGtBZ9rBPD+sPDnfStu+Lj5OwEAAADgnJSY+L8lCUjOCc/VFqdPm0Z//63zcS5rJCYm0mOdu4iCNa5MfZU/eEpKirxmgAt/MZ+sXCmW7gQHPJsrutWqVUtq2LAhRSxaYnEQcPp0mt7X31bYgl+YyObvXbfuK1r75Tpq2zaQqlSprPf1V+OI7EEMfx8f7zcxG4wGjgAAAABwLkrU7efrmBjq1TtIFI96OiiI4mJjy8wggPPijx0zhkaFjhCDnNVrdQWyXBV2VeJrxfx67JhYqhk0eLBYHtx/QFxHd4Lz7m/ctNlsddzmzf3o+ecGCl/+j1dGmg3Q3WdF1VEW+OZcfH799bi8ZoD3aefOn8Tg43zGeQp56d+iaJjWa3lWKmbDBvmRfai/jxk65AUUDgOFopV1S+uvKGh9nvrPFrTe74g/AAAoLUpU/HOu8qXLltGCiHDxeHLYRP0gwBWDgXngsnfvXiH6g57sKXz8uZokD3K4aI2r06lTJ7HctHGTWKrh3P/vzpsr1vk6qouClXUqV65M586dp337zIt3ZQDAln3Oqc8VetWzBbzOn6Hg5VVRLG/dMh5Q3HPPPaLq782bt8TjSpUqiyXDgwv1AISt+Es+XEo/SmLcy+tevfDn16iDihV27d4jiofZCw9KlO97pH076tnzSQh/AAAAwMnxyJeQ14sNxcqhDnpisb9+3Xrp70u9iwxbmvsPGECBgYFioOCMsOBnN5i9e/Ya7TuL/pdCQozy3msdd2li6/7wNWof2FasR6/9gjqYDGg4FuD1yZP1QcE82+Gsgx5zljZ7r82cuf8Ry+GvhFDdunXFuhYskL/6+hv5EUkCuYcklNsLFxlFkFeoUIHulUT4lSt/6Z9Xw99VTRps/XXliiTm76erV/+iu3fviueefaYP+fs3FwMRFuEKwVJ7bNKksVhX78O//vUvMYC4du2qeNxMaq+DBz8v1q2FBxMbNsQZUoY2qC8GGlo422/AFSir58yZjsuafSnu/cV1BgCUFiVq+VfD4n7U6FG0OT6elkeuFMKfLefsNsOCc8jgwSI4mC3rpZlRhsU+Z+7h2QmOVQjwf5AG9u0nYheY2XPn0I+7d4kS8q5S8Mpa+BrxoIZZvGixWKph0Tpn7lx66une4vGLQ4aKc8Tny12Ii9sor2nDMwBsFVfgWYC4bzfSUZUrVdWq3nTrls6ybw4W/kxe3l2qUuU+sc4c/PkQfbH2SyPhzwMCRfgzavcifq96tsBW2A2Jrf1q4c+uPgAAAABwDTxKy/KvBVuak5KSaMf27SIuwBQWovXrNxDVTjnbDKfR5MBUR6TSVNxWzp49SzdycujgwYO0Z/fuAoG7PEhhd5iHAgKoVatW8lZtnM0CYs/+8HlhlyZm4aIIerZvX7GuhmcA5kmDgLXRa+QtRYevdbt27UTKUT8/vyLPBCnHboq914aDaRUBrGWtV8NimwW62s1HgS3xjRs/QOnpZ+iff/7RtMQrswwMuwfVqlWb0tJOyVuMadkygPo++4z8SBeIq/jjM02aNJXaeJo0iMgTj22x/JvOYqhdi8wBK6DtlNVz5kzHZc2+FPf+4joDAEoLD2cS/6aw8Pzt+HHhZnPmzBkxM1AYLMzZF91atAYYajhwt1PnzkKE8mCjWbNmNg00nK0TtHd/1kRH08zpM8T6zt27RKpPLbio2ccrVmjWBigq7R5pTy8MGUI9e/Wya7CnHLsp9l4btfhnEfzqiFARC2AO9vFf9tEK+ZEBdsGpU6eu1NZ1Qb1aLjRq8c+zLQ0aNJIGEmcLpGDl/Rj32lgjv3tO7/mtHLPB761RoyadP58uHjPWin+1m5ICxzTwzEZhQAjYTlk9Z850XNbsS3HvL64zAKC08HBm8a8FuwBxlhIeFDBsoVewJOZNYUHZ1MdHrPv7+0tCrJKwNHOqQkfMKDhbJ2jv/rDr0yshISKzDw+CPo9ebXYAwHBV4BO//14gRsAWVixfLonU87R39x46k2a8vxwwbusgQDl2U+y9NmrxzygBr4XBWXHU7jmMp6enJP7rSe36nLyFaMb0t+U1HWrxz/j6+gmf/YsX/5C36GB3H041qoYDjZUZh5o1a9H169lGGbasEf9awt/aQQOEgO2U1XPmTMdlzb4U9/7iOgMASgsPVxP/roSzHXdR9ocHXS8OGybcoKwZADiSTOm7d+zYQZ9GfqIfCPDA7d25c62Os1CO3RR7r82CheEFcvSHTRhXqPWf3X/YBcfUv79cuXJ0584d+RHRmNEjjVxptMQ/v17t+sMBwWPHjpYf6TB1+eEZhgsXjGsDWBLxWsKfsXSsChACtlNWz5kzHZc1+1Lc+6t8/rHk3xziuuoslNX2C0BZotQCfoFrUU8S+qvXrBGuUCzA/x38onDzKQl4kDFUGnhsit8i4g4YnoXgWAQOCC8NtIpz7d27T17Tht1xqmvELqiFP/Pnn5fkNW1u374lBgzsxqPwwAO6G64aLiKmwO5Fly79KT8ycEv6LHPwTIWW8OdZDmuEPwBqlOQBwBie4QQAgJIE4h9YjekAYMCzfWnG9OnCzackYLHLAcccd6DOMMQxCc4AC+XCKvoypn76Wly8eFFe00YJ1lVn/bl69Zq8ZuCXw4flNV1gMQcUm5JzPUdeM4aDe01dlBQ6duwgrwEA7EUZDKmrqQMAQEkA8Q9sggcAnJ5VuXFxhp92bQJp/vz5tG/vXqvEbVHhmYAPFiygkWPHiMccjFySMwCFCfzCrP8c9Kuk7CyM06oYh8K+q2LFSvIa0clTp4xSePK6OruQufSelzWK6/F+cmExLTggGVZ/YA+cqY0pzdTNzoRiNClLLj92k5dFSRtjaNX0vsJtyPDXkV4NX0dxO1JJ20zh5OSkU2qW/amVHU82nU69SDrzkUxWLL0qzvV4issynoV2PbIpdUcUzQhqoW9DLUPDacPGJMoyOmgmh5LCe+tfZ/GvTTglmZ4e0W4/Nfo+nwdHUETMd5Tk8Ot+m7KSvqO4qOn0tHq/GvelGVGxtCM1W36ddUD8A5vhmxXXNeCiXux7z6xYuoyChwylh5r702tjx4oZgaLwbVwcnTx5Un5UEJ4FmDJlCg0JHiYe8wxASYmKwgR5YdZ/FujWwKJdEeunT58WSy1MXX8yMgz+/GqXH37N33/nyo8KYjpo2Lhps6ZbE9OmdWt5DQDb8PHVJVdITzdkm3JXOOheqQjv3khibdsSevWhjjRo3GSaE23qSppFPyx6kyaH9KROocvpZ6cS0oUhH1f7UbQ50xn2OY9yUrdSRGgvGrTpvLH4LyvkZdKOmS9SUMhsWptsuN/lJi6mKeMGUs9Xo+lEjgOPPC+d4sb2l9rtHKPvk76QPpw0mgZ1n0CrThQiyPOlNrJlCb0x6DHya/oYDZ6yhOJTskkrCDcvay8tCX2MugwYTZNnrSFdbkCFo7R21kQKfbIXvbp4r8YgRxuIf2A3XM137bp1YhAwcowh2JRTffKMgGFkavvfpAlh9FSPJ6nH493FQMDcjMI0aZChuAC9PmmSWBY32dmFu/b8lpwsrxlzJs24ZsT//d//iT8tFPGungXQQu36o9SqYE6kpMhrUh9jIab/rEqMcaVgrXoECvffX0NeA8A2OKMas+snbXcyd+Kw7JLHaaTdl2w6ETWVBg5fSD/kepFf8AxaEJVAh8+kiWBh8fdrAkUuHE/dvVhTvUcvvLyCkhwp4IqLOydp8+t8XPLjUieXUjaF04eJWfLjssZNSv38DQpdJQ0e/YfRrJi9lCLa0AnaFTOPhvh7Se3nvzRp5SHVDFIlCpy4xdDWNP5S9oRTT6ntEQXSa5+8TIHlxBslblPmt+E0I146n149pOeUdnuKDm/9mF7rUVs65d/RgogfKFOzuf5DF+Ln0YtLL1H7qZ/Rjl2f0dT2l2jZsHfomzRjw1te1jZ69+VQWsTXTjq2GUu+oV2SPtDv475vaMGEHuTFA+WFoTR80UGrZskg/kGR4UHAlDfeEFkr4rcmiFScXPm4KCgzChxbwAOBV0JeFll/TGGr9ttv61JjchAwV2Iubiz55O/atVteM8AWdXVqUIZ98OvWrWdkvVf45RedODh5svDZArXLwKlThlkC9ayJperBJ1N1r2V3Hy0//+rV75fXSNrfuvIaALbBLoP8u16x7CNR0NGd2bxJV3vjYbcV/3mUk7SKJs36TpKlLSk4aittnPsK9e3mK0kyFZV8qduAibT8h0gKlgQcJS+nOV+nlk3LNbCf7H30+ft835VE+rzXKTiwtixuy1PtwBdo6rxR5Ce1tBMrN9HP2Va2npyDtHj4NErIrU09JU0zPrCq/IREXhpt/SxB+sSGNGTZfynsCaXdekpN9kka/+5UMWjIjf+atp7SMFzmnaaEFT/TY2FjaGDbB6hOnQco8LkxNP7xY7Tmx3RD+85Lp42zp1N0MpHfS5G0a/NceumZQKqtUu6etQOp78SllBAVqjvGRf+jyKSr8rPmgfgHDoOFKKfe7NuvHw0LDtaPTO354xmFA0mH6PWpU8VnH9i3j7p27iLiCkzhGIApb+petygiwiiPfXFw4ULh1hN2meGAWTVqlxzOvKNw9epVSRQ1KDAAOHX6NKWnn6ObNwsX7uXL36OfPbgkiXcW8PynuO2wa5AlTqedEcvExB/EUoGDhBs1aiw/IqpRSCVfAKxh+IgRYvnTzp1i6Y7wDB3XpGGXHx4QuSV5qfTN7OV0glhYLaF3utUtVIx41n6cXpcF3LH3v6Cd1go44AbkUXbSdorjWZZWz9DTrVUiXSAJ8roNSPzScq/QtVxr2s5VSlr5P/qQ3XlajaSJzzY0bp8Xk2n3Eek5r270RGDBDH6edbvQoAENpbVzdDJDww6ff4tuXJb2y6s8ecibyKM8eVUqR3//c1d2/ZGOa+cnutkF/1E0Z8rjRqLfGGmQ020kTQnm70yiT2MOk6UIAIh/4LRUq1aNRo0eRT/u3qWfCZj+9jTNGYBBgweLJdchUKbUiwtTC75azCvs279fXtNx7pyhiJeXl5hHFOTkXBeFvngAwGJbgV11YjZYN4uh/v7z5zOMYgvu3r0rrxkw3V8OPOTBiulx1apVRwwurl7VWWn5egBQFDp37iyyhU0Om+i21v9VUVFi+VJIiFi6I3mn9lIsiyf/oRTao74VQkQSSq2folcnzaQF/3mC6qnfoASshsZSVs4JitMHDbegp8PVLhDs976TNoSPoJZ6F1PpNdM/pU1JWYXMJujeVzDQUuu9d6TdGU8+PgPpQxHPnUwfDgiQXhtIr8aauFPmpNKOmHB69UHVZwZNp1Wawany54rPSZfeGqsKMh1IEYVZesX5CaBBi3TuqFcXDaTm/D4+X2KLMXlZSRSnPkdm90mGjyPWJOi1sPcZBRjnUlZSLEWEdrT8PrN4UpVus+koGw7jQsi3QGOSrl/mORKqoVUgPVjTskEsL3MHRa5MktYC6bWZ/Qp85p3MNEliS3RqQ82raLXeqtT84VbSMp3iEn8tKMT/1Zi6DKlBX328jvZfyJXu97l0Yf86WvllXRryWGMSSkAaIG8I/1o3uzB1CAVWsvQrqUFdXwuniIiPKOq1TlRF3moOS58GQKnD1rFPpRsmDwDYDej1ya/Lzxjw9vbWW/+jV68Wy+IgM9O4SBZzzz0VCvjus988W+AV1L776iw9LM5v3vxbDABYbKsxFzjMglzNvfcaBhNnzp41ii0w9fdn4a8eZDD8mvj47+RHOry9q0n7WZFu3LihOYAAwB54dvBtORnAwgULxNKdSExM1Fv9rS1QWPa4Sad2J9Ixaa1qz87U0qKokfH0pb7jQ6hvv67kq/Weu8fpyykhNFkVNFzeuwrpesfblLXjvzT4yZdoyqJESVAp5NKJ6DkUNqA/jdIMlrxNmbGTqZP0voKBlob3viYJcqu1qgT7cc96vh+FTlpsHBeQvIbmiOBU88HNd1LX0ht9J6qCTO8l78oFXUftIS8zkd59+UWarD5HYp9epOGztxU4P3mZsTSmfU8KDTMJemWUYxkba8bv/Szt+3As9Rww0TgWQfk+K33XC4Wz8cQuoknBC6Vrpy3kC3KJdi4LpwTpcLyCx9ErancfwR26lJ5GPNyq2qKhJLm1KEc1GjaRhgBSK8m6qmpvClWo5fD/0eJ2R+mtLi3It0kL6jb1d+r82X9oWDP5fp5zgU6m8jsbkE89I2c4s7ALUJ9+T1Fg7fLyFvNA/AOXgEXDBwsXinV2AdqWuE2sq+nYqZNYchaN4nL9MeeDX716wS7g+PHfxJL9/ZUgWnbvMXXFUVx0WGxrzSKYwgMFNfw+Bfb1Vyz4Hh76CUU9PEjSzPcviXwF3scaNXR+/oVlCQLAHnr06EG9egcJEVwSMTrOAmcjGxU6Qsx8TJo8Wd7qjuRQxkmeCW1IQW0aSjLJQWyPpA9/fIgmfCUHe/4aT+8/1UQSORxfsIKGh0RKArAlDZn1GcX/ekp2MT1C8VEzaYh/Nv2wcBK9+62xiM9L/YLGhsVK4k1635z1qkBLVWAnZVHC25/IrkjlqHa/xVI//A295s2f4E+vxRyTXp9EH/eT6zmwL/nL43V+3MEzKXLrEdVnfkYzgluK4OZXZm/REM1XaOfS5bSr01T6ct8J3Xt+eJd6NS1E/NfuRx+fOUbrJ+gC7qtO+IZ+5++L7Ee89waOUOS0BZTZcx6tF58tvebX72iBtD9ioLPqM/pe7b+ed4JWj2afeA7WVr1HvC+BPhZBqNI748Ppo51ahSuP0lfRv1OHCR8brof6+xYtom9S7UwdfieJIto0IZ8HOtKgsMW0r9Mk+lg6t2EFhHxB8lI30aJoToLRmSa/1EHDgn6Hrsuz4VZxKI0ytTKoVmhE3V5bSglHfqZd+3+hI9sjaMQjdfS/h7w/ztCvfPv1bksBTRwzuFMD8Q9cBp4BUGIAPomMFEs1zZo1k9eIUlTZbhyJIujVsECuXLlKAev/wZ9/Fku1vz9b6U0HJnl5Bsv6/ffXlNe00QoOZpRBgzpFp6nV38urovR+yznF1fugDhY+n4FKpMAxzJk7V+/+U1pVuksSdnF6cZguLfG8//7XzV3obtK1LJ7VrEjVqzhS1HhRwBuv09h2crBnpYbkyxZQk/iC2SHdVDMHVci3WwjN/mQe9fSSRPyKODqszyZkmKHwCp5IU15sp/K5lgM7p46kAH5otS/5TUr9epHwJfcKmkcr3w2hbr6KvOTP7EYvvbuEFgTVlkTzalp/WMudRxKlU0PoYWHdld7zwAOF+ILbQjqdazuNPpjYz2A5ruRHfd+cTq9xsDX9RruPG0S83nXL6zma8sYLxtbmSr7UfcLrNLkVv+86/XFVS8RLg4YJi2nhxCcN14O/742JNEQYv42/zyYupdNvqpI6uYkL6dW+k2nJwcLcu5irdHjTRvmah1J/X632KYn/K45yWfSgcpWqU+1aVamCia0u7/oVEs7CDb2pskOurzHF8JEAFB/PPPuMWLL139T3n4WxkvaT3YMcDbvxcFCtOUyt/yzE09LOGPn7s/i/c8fY8q4W2DwroM6uYwq7GGmhjiMwR3UrAnbvu0/qhFQDBPXARD2wAKAosPhdsXKlWOcaHWV5AMCDfa57wvFIbLzg7GjAAorlVvEDN/rT8J8X1KCHGlcvKGqU4EzvQRTaxyRwU8az7sPUq5M3UXI87UxRZjsrkG9ItLBIH53bTdOH2rNyVTLfW2txiX7bxQYkf3plRA+qq70z9EgvzgKVRNE/npakpgleTalRLctuHbbTkPr2eKjgcVaqQ03qGbuaMp6+IbSBrfW/zaZuWn7vnhWp6v0F32egET35mL9xdiemig89zNeiKIjZDnkWgmd3Iv5NfrmJtOj5sbS4sPiI7MO0Qfj6mzkXpUH6FbpuzbjSRkpM/AfJosyd6P/cQGoREFBsLijuCFv/2WLIJCf/LpZq2K2FsZSRxx60rP5qtKz/R48dM/H3r2jRlaZq1aoF/PIVlNSeVaveZzQLoE75qYW1Vv9q1YwHCKb1FbRiHgCwB/Z55xohTFkdALCrz9NBQcIVkYU/JzAACjfocradbh2aaPtG64MzryymQT5agwn+e5QmJ7KpOIt+SzcvDjkYdlNsrHBXEwHAHSaScY40C9y5SGmH+HuUQGCtffGlLmEbxcuvHk+Xhgsm+DahetbGSdiEOd/yqtSgBTsIXaGktIsFByMKotqtfG5EAHAv+Zyaw4ea1HXkzI85qpBvv7coYlZnaT2JPpwdS6maYlqdNehl+ndXczVtylFl7+KfufOs7C1dkeKjxMR//OYtbieCa9asSccl8Qfx71g6deYfsXTruFEwHEgpJHT+vMHa7igsiX/G1Pp/9Ogxvb8/C3AmN7dw8c8+/VWrancuSrAwpwCtW9fgsalO+amFNVZ/fr+l1KB//mnnNCwAGrAVXD0AWBMdLdbLAkeOHBGuPorFH8JfoQY92OVBaXmJfj1zWdsNo1wghf2iWG6VP4PfujbVqGplh0UQyNw2ykbTrMNACgubKNzVCgYAlxD3Vy0WNxB7zp9RZiD2rx8nnxutAOBSpQI17dxD56KVmkYZmoXi/qKkxB2Uy+5j/TtSU7PnWBL/Zu7PmrRtQnXtaJaetRrTQzyhf+UQHUuzdpCcTalJp52vyFfC99/La2UftvhwMZt7vbyQIrEEqVTJuqh4W2GLtzmXH3W2HS3rv4LO5edOgYBbrdez9d8U9utXgn3ZIn/PPfdQlSqGAGFlcGGKtVZ/3i/ePzWmMxCm9QsAKCo8AOB0vjyjN3P6DBo7ZozoP10VNvbwIGZg335C+C+PXAnhb0R5qtPyEV3O/g176VQxuDRo0momxasqo2r/qQJzlUBhfTYauQpxRLjuj6sR7wun7roX20hnmrE1WeP7Tf4KBOU6ESJwWZUZiKvPKucmYhXF//ojLehRRPcdB6J30TIXn5H9K22L4UDfNtSvc6NCxLEhk4/mzIzAkBHIq3ZVEfhsM1UeoidErYBTtP/4RQuxCjLZSfR58BPUunFvikgqfAhQYuL/ngr3uE1wF3f+/5k3T7duwcoLbIfz0pvjRDEF+v7663F5rSD/+pfxz0gr8w9TqVJFys6+Jj8yUK5cQfHPIp/979UoLk1q7rvvPnnNvOuPqdWfBw3mMJ1NMY0x4ExCnL0IAEfC7nyb4+NFCkx2kXmscxfhPlBcs6aKuCoMa15jClv7XwkJEYMYHsxwxXPObgTUcM7+njSIg0GPrKBwkww7jkbvPmHW4msGVaBw91mb6PCZ47SZqxD366f76+ZLXtev0p/yy63CsyJ5N2QpaKb4k8ugClzuMYc2c7ae+Ln0knJuOB2r19909c/Ci1Q6BmlfooLFzEzL6TvMFrfSu395N6EGNQqa4vXZdayIqShXtwkF8sqeX+h3zYJzNykzjSvne1FTnzoF4xqsohoF9ugmfYJpILo5pPMQE0lr+RhaDaKnWxf+rSUm/m/JlUp5arcsp3djixV3/nwDA46HxYBybhs3aSKWarKv6cR1OweXzT/266/yWkFMxTS75phazPkxu+ZoiX/TwYOC2vpvar0vX143YOABhYJ6BkKB4wJMrf6FuQddk89fYZw+7fhgagB48Dp33jxhKVcyAXFf6goGI67aO33aNGHtP7j/gHDz4cGM++byt4CnLw2cyRV7JWETNo5mxp6w4KrAhbYSaUOCoYaJtXg27Uj9eKCR+zXN/+SQ5veIfPWi2FYwrVLSS+bdoCvprKSaUufOTQsKuLxM2hm9QWSGkYaKlJZphWuGZyPq1L+NtJJOa99bS0lagi4vneJGs5tRC+ofdaJYB0b2o2S8kcRtl3YadRduU9bOr2k9B1pbihUoMgaXntyYONqeqWWcukpHf9wl/fciv393oWYFtP8dung8SXctzRbuUlHTnzqLNrWDtiVpZP7J/pk2rOSiapZmEQrDk6p0HU5zgmoTJS+nGfO3F1L4TPp9nJDa9/u7pfXa1PPl7oW4Lemwb5/shH07lU6dO0ruMMsKylQvW6yUzh84HnX1XnVqT4VTch7+ig50/2FXl8Iy3ajFNYt8LZ99JcWnVo59c5Z4HiwoQb3332+cU0It4CtW1Il+9tc3FfZVq+pmC9SDkcKCg2/dukm3bxusNVoDCtPqxQA4EraUfx0TI/pQ7kvZYDRk8GBRIKu4ZgLshS39fC8LerKnvngXW/vZzcdSEL5740mVAl+ihbOekuTYUVob9hR1Cg2nDaaVXUUQaQytmt6fWj8pF7byeoQ6+9uQh0U/0ODc8eNpUngsJekLaOl8+he/856uqFPQc/SkkjNfb6X/hdavilG9hwciO2jVO6MpdJWhoJgR+vdeoZT0v1QCvgL5PjdBlzozeSGFhC2iOFWFYOFDv2gOzYjPknamJ4X05DoFjsAQpHo7JZ0uFnlEoXxeLh1bt5q+UFc55oq/Ue/KdRVKBs+m3SmERXJuLM1451PjAmnS/vwQPoVCFiWJc/rq4FYalnjFUi/dM80W7lLh2YSefLmn1HalQdyYtyhiW6o8qOS2sZUiJr0lLPBG7ckePBvSMzOmUk8vrrMQSl2eLlj9WBd3MZI69ZpBP3DNhZfm0jvPNrTYbkpU/LNvJ3fq3EFyR8kdpqsPAjh/M4t+zuigTPV+ExcLH89iYnFEhFiOHDtGL4wV2B2IU4AyjRrpMgI5gvR09gPUxrQoV+XKum7FNGMPu89cvartrqQMHhRrvhoW7zVr1hIDATXq1J7G64aZAB4IcAwCc//9hu7MUnBwTo7BNvZ//1dwetS0ejEAjobjpLgPPZB0SD8I4AJZ3M8u/2i5EN2lBff5PHvNAxK29PO9jIuWsXGLZy5g7beWKuQXsogSYubREEkM5yYupinjBlKXB1SZb0QQ6WSaI6r21qbuXBDqwFJ6yc+WJIzqgUYW/bBoIg3q4Cd/hx91kX362X3lq/nPGtJvqgcN0dNU72kqDURepjkxNWnCukiaJnLZm2Qu8qxOjQK4z+WZjceomTo9aaW2FBrxFnWX3sbHPHlAR+l53fE26zBQ50Pv9RTN2DCb+tZ1VErP8lRL2m/e09z4idSVz3ForLR39qIexKyhWapj8HmoJ4XO2kb1JkVS5Du65By3L2fr4gKKC0kk950fSTN61BYF0l7QXyvd/rzK59T/37Qgztw5vUrnjvPZ8KbAJjWloY0lylPdHkPpFT7+3ET6cHhPai2+j9vGq7oYEa9+NGdGb+10rjbgWfdZej8uXPxGlKrJ6t+Ivs3w70M655/MfMKqug8lKv4Z7tS5g+SOst0j7fWDAO5IWUS7QqAXW594Knr+++9T+8C2QvQzHOjCU72tWrUSj4FjYcsfiwCmf//+Yqkm6ZDw6BMDMEfegAtz+VEHGPNgpHJl3WCArf/qgcE99/yfJKq5sI0x6gGMp+e/qHHjhkbb+DNMff8Z9WsUyz+jtjaqYw9MA6FNBy1qbt78Wz9wMTcrcUg+1wAUJ+pBwOy5c8S2D957T4ju7t26iYEA98XFPSPABiq+P3EwMvf5PHvNfdHIMaOFpX/psmXI328X5al24FCaE7+X4qMW04JZwySxrUYJsuUA0t30sboglE3wQGMp7dm6iubLlWf1cKDqkm8o4eNg8jP6bB40jKRPYpaKqrsGuErwUlr/w1Ia90hn6iK78cQl/qryN69BXV/7gGbp36d2fZE+1y+YPj6QQJELx4tBgAHlsxfZOMCxBLuQjKaoOarza67yrLVUakfjP1tNEUbXTHe9ImI20PLxT1DXRxV3nO2UpOkb70AqtaCXPt5A65fM0AllBa8e9NpCqf18NZP66guqmaMy1apqpaVeOv6wzdsKfp/+Gr7noMGb1F58pYGE/Bsp0H7F94VT5Nbv6ePxHa0u+OaRb1oGtBjg0QmjFTzFnWrshg0iM44CDwoe6/Y4tWrdivz8/Eo9Ww7fWM6fP0+/HT9OCQkJRv78vK/DR4ygzp07F5jmLey4SwNn2x9b4Bs8T/8zU96cSiNHFZxZeW3sWPpu8xbNtHrKsZti6VywhXvZRyvkR8awQG7c+AF9Bh4W4Q0bNqBTp07T7du6zDlpaTo3JG/vanRFoyogb69Rw+DSwxZ6DuLl4mB37xoKbJni5+er/968vDw6cUI3e8YuO2fPnjHaN84IVK9eXekzz+rz9qv3TYumTQ2fn5qqPXk79Y3XqXz5wjs3V25zpQXOWeGw1X/vnr20ft2XIpuOAvfFgW3bCnfAB1u0EDNiHEhsC2zV59/82bNn6Y+sLEpOThYGKjU8c93t8cc1+3yA9guAK+BR2uJfgQU2+3Pv+ukno4EAw5Zczu3OQZw1a9WSxFINql+/frF0vDzzwHnYWehzoahjx44WCN7lKd5OnTqJG0BhNxdn6wRdsVPmdsEpYtnSxnAF3w8WLDCyfDMnT56kp3o8KdbZEmdq+VeO3RRL5+LIkaP07cZN8iNj2CLPLjkKLNxr1KhO2dnZUju6ILZlZJwn/olxFV91tVyFunXrS4MGg6sOH1eTJo0oJ+eGvj6AKYqYV5OSclI/WDh9+qT0mvv0gwqeTeDfSkZGprRvhtkH3rfc3BvyI2Pq19e9h7lwIVNz1qJnzx70SPv28iNtIARsB+fMeth4xH31wYMHC4h0Ndxn3/z7Jp2RzunMWbOo62OPyc/oCOrVi1JPaGcK4/cGBLSkjp06ioEFBH/hoP0C4Px4OIv4N0Xdqe/ZvdvIwqOGO2YlBSIXeLIlzzt/tkJhNw629PBnPxQQYFPn72ydoKt0yspMy4H9++mTyEj9tTcn/BnF6s/Xit3KTFGO3RRL52L/gQOUkJAoPzKmSZOmRkWxFJHNpKefoxs3cun69Wzxd+OGtshWW9gV/P11k6jKZ5hSr14dSdwbT1+qX8uivlat2mLfqlevJg1QdIOAK1euUlbWH2KdYfeec+e04xl4UKO4G127dpUuXjS8T6FG9eo0evRI+ZE2EAK2g3NmP2y8uXTpEp1JSxPGGy72x7FAagPOd4lbycfHR36kY8b06RQbE0N9+/cXRiZOGMBxQ/Dftx20XwCcHw9nFf+mKNOxPCDggESejmUKE+22oAwi6tdvQHXq1BZpJHmGwdZpYzXmBCewnXfnzaWhw4bJj4zZlriNRoaGinUtqz9j7lpYapMJCVulAYBhkKhgavVnFNHO/PMPu9XoXHcyM89rin8Ozq1XTykoY0D5HB4EnTljLM7ZnadZM2Phwly8+Kf0+9C5FfHMAw8OOIC4SZPG+sEF79NJORuSwrlzBlcgNRwvUK2arj6A4kqkxfBXQqhuXeNZCDUQAraDc1Y8sEGJ48tWREbSEz2ekLfqmD9/Pq1YukzEFqAoY9FA+wXA+fFwFfFvDdy52wIXPyrOjt6c4ATW0b5DB+rzTB8K6t1bs8AVk5mRQV07dxHrHHw35Y03xLop5q6FpTa5bt1XorCVKQ0acGCuYQZIyxVHcd1h6+Pffxe04Kut6wpK3ICCqfVfcS0y5dKly/Tnn7pag3fv3hEZfRo1alAgYFeJR1DgWYmsLJ2Lkhq1+GfOnDmtmabUkusPhIDt4JwVDzwrwKmYtQwJ+/bupeAhQ0UiCgTuFg20XwCcH4+yJP6dDXSC9sPWaC33HjUs/P8d/KKY4udgv0+josy6ZCnXwhRL10bL8s/71aCBcSpRxRXHu+p9dOWqoVAWW+F37vxJ09/f1G2IqSq9n2eeFNTxA4yPT1PN9JumMQINGtQndQGw+6TBybXs60YzBAocI2AaXGwq/i9d+lMzYPmxro9SV+nPHPgN2A7OWfHB55bdBz9culTeooP7m4ea+4t+ZO26dfJWYA9ovwA4P8bOxgA4CZaEPwf4KsKfA8I/WLiwWALx7pPEuCkcTGuKEmvClnYW2go8INAS/nx8psKfUaftZPj9StpNHhhoCX9GXSWYByJq4c9+/+XkvP733Vcw1ZlW2k/TOgDmYmnYrxoAV4FnBzk2iOMA1PDvkWcEOH0npxQGAICyDMQ/cDm+jYsTmX0U4b96zZoixWYUxn0aQt/UlYaFg+JXz3767JZjLj++QsWK2nn2tUS2UjiMY1DMoXy/aTAwD0SqeVelv+UKxbxfymBCQWvQVK6csfhnFyfT9wHganR5VDdLpdQEUTNg4EAR68XFxFyh3gwAANgLxD9wGdgvd+gLQ2jShDDxmIO0i1P4M6Z+/Iza159RW+s5qJaFeH1JhCuCXCsXvtoyr6AeRKipVs27gNXfdHDBj/k1auHP25T4gJu3boklU6GC8Xu1qv1qDQgKKwwGgCvQunVrYTDgLGKm8O/v8+jVYgDw4rBhpVpFGAAAihOIf+C08NT80aNHacXy5dTj8e4iIO/Avn3iOa72yWk/i1P4M1yxl1NaFoZaTP9zR67hKIn4BvXrimXVqsZBvWxB54BcU1i8M/wedtVRYBFfq1ZN+ZEOHjyYDgDUr+Hn1AMQLgSmwMWPCoPPKWcKMqVixYKzEhXutbIaIgBOAA9qJ4SFiX6EZxBNqSu1fR4AeHp4iirCXEGYM80BAEBZwgMBv8WHctzAcbDP7vDQUJuzNJm7Fta0SQ7Y/VH6U2jUqLGReFfn92d8fR6Q1zhN5m3aEPutqFugYC7Fp7pqbxPpM3kgcf58pnhsSn1pYHEj54ZRcLGCMvBQzziknjwtrxlnBmI4DSmnI1V4+OGHhduPaWAwDyBOnTLOfIRsP44H56x4Yde8V0JC6M+Lf9JXMd9oZhJjw8PCBQtobfQa8ZhnGXv27KkvNggAAK6AufsILP/A6eEb7/LIlSIHN6fyLOk83G3atJbXdHC1XjV376qs6ibuMizAWdRbglOFKsKfYeF/b4UKIrWnKfw6fk7LNUdL+FtCnYaU31ezZk1NQaTePwWtmAgAnBn+3bz59tsiZoiLe2nVueD2P2fuXFEQbOTYMaJIGIQ/AKCs4AHLf/EBy7/9cLEuxlEVNoti+WfU+f5NLffq3Pss/jnoVg27DXwW9bn8iLPv3F9gAGOamrNRw/p6Ac+pPnP/1gXsMhzEy1V7hSX+tKH4VmHCn1+nuP5whp6rqhkDdQ7/Zs18qXlzf7GellawAJhpUbCwCeOEa5Q5YMW2HZyzkmFNdDTNnD6j0MrhajjDmGllYAAAcEUg/osRZztudxYVyrGbYu25yMzMpE8+jZIfGRf5YtHQpIku77+W+GfWfrlO+gxdvn5T8a9VtVftOnT9eg5l/XFRfqRz+WHLP5N+LkPMRJj6+JuiHkCkpBjy+psW+WLXBkUEmdYYYDIyzlNurq5aMQ9YQl76t1g3B4Ss7eCclRzs0//Be+9ZPQAAAICyANx+ALCCunXrUjPVLMSffxrEOFvC2Y+4MB5u21ZeM3azYZRUngqmrkP3qoJq+TlF+DP/ksQ+zxgUJvyZu7LVnwW9Ivx5JkB9HF0f7WIkfszl9ldo09rYHQoAV2PU6FH0+tSpIvd/n6DewroPAABlHYh/AKykd++n5DWd4FdnAcnK0oloJduPKb6+PiJlJ2Na9MvUbaaiSRpQLgamCPtq1Y198avXqEZ1atcqVPizyOfZAV4q+8n88UeWfiDAA4xWrVoapf3kz+RYBDWK1d/L617y928u1gFwZXgAwDFFefl5on4IxwFgEAAAKMtA/ANgJSzSH+uqKxLEXL78p8iUw/Bg4OLFP4Xv/NVr2WKbKd27Py6W/FrF/55RV+dlKplU+WUq3HNPAas/w9stwdl9GPb1V8T+tWtXKSfnulhnuj76qIgVMP1udTrRO6qBTZcunW0KKgbAmenRowd9HRNDLwwbKjL88CDgtbFjaVviNgwEAABlDoh/AGygQ4dHjPL+//HHBbp9W5f9h1NjslsNp9FkP31TGjVsSA8+qAumZV97hRs3DG5AbHlnS78pXpIor1OnlvzIenggci37uhD+2dKS4QHLxYt/iHXmgQea0EMPtRDrprMOahR3JT5+uPyAsgbH4cydN08kG1BcgUaGhoqBAMdhmIsbAgAAV8MDAb/Fh3LcP+7eJQonlTbuHEho7sZtz7m4fPkyRa36nHJzdX7+HLBbv34DUnL/165di7y9q4pCXdWkpRrO+/9NzAZp0HCRGjd+QLjW8Pt9fHTrSiYfU3imoDDXHlP49WzxV4S/kt2HByrnz5/TzwDUrVuHBg7ob2TFV9cEOHXqtPQeXSYgzgrEVYY5yLe6hcJnCu7c5uwF58w54DielJQUkRL04MGDYtuXa74QSwAAcAXM3Uc8SkL8KynVVq/9gjp27ChvLdvwjePpoCCx/sOOHWJZ2kD8F8Tec8EDgI2bNtO5c7riWKYDgIrCUl9HBOPef391I3cdHgBs3hIvsv/Uq9dA71tfr15ds+LfFngm4U9J+Ofk5EjfkaVPzckWf56pUIQ/z0I80f3xAu47SmagK1euUlaWboaA4xv+/juHBvTvT02aNBbbrAFC1nZwzoArg/YLgPNTIm4/Qb17i+W0t96ShEWGWC/rfLhkCaWfOStKyYOyB1u+2QL+/HMDRcpLFtRnz54RIpmt7izA09LOSO09k9LTz4t4AMVnnsV2/359qU2bVtLz58R2dslhC/31nBtG8QC2wJ/Dwv2s9H3p6efo9OkzQvjzdnbz4Sq+vJ8s+ocNfYGCnupVQPgzN2/dEgHCivBnFyUW/ny8tgh/AAAAADgfHiVh+WfiYmNFhcSGjRvRipUrHVa8ydlgiz8L/xXLPhKVaTl3tFYl1tIAlv+COOpcXL9+XRLbaXTm7Fm6kHmB7tzNoypVqoiZAJ4V4Ew/9913H9WuXZOq3ldF78KTlZVF332fQF5elUTdAK4R0KB+PZus/yzu//rrCl26LP1duqR38WFL/40bOVSx4r1Uu1Ytql+/PtWpU7vQFJ4cI3D+fIY0kNG5BvGgoZa0L/3799UcKFgCVkDbwTkDrgzaLwDOj0dJiX9GKajCLIgIp569ejmNMHYER44cof/95z90cP8BpxP+DMR/QYrrXLBrDwtxdrvhAOBr2dnEPzVvb2+qJQlxdgVSDwJ+/fU4/XL4CFWufJ8YKDT387U4AFBEPxcA4yWLfrb0e3iQcCPi7/H1aVqgjoA5eJ+5EjDPGLDl/6+/LlHPJ3tQ8+Z+8itsB0LAdnDOgCuD9guA8+NRkuKfYYE8ccIE4RLDswDsFuPqg4DU1FRaFRWlDwabPXcODRg40OmOCeK/ICV9Lk6dPk3nz2eKbEBsha9Xt44+lz6L75MnT9Px35KFcG/UqIHI4a9lcWexn37uPF2TBD+nIH2gaWOqW6cOnTt3jtLOpEsDgavSQOC2CDquVaumGGxULsTiz/tzPiNTCP/s7Gv04IN+1DYw0C5rvxoIAdvBOQOuDNovAM6PR0mLf4ZdY1ZFrdLPAvAgYNDgF6hjp47UqlUrsc3ZYd/upKQk+mTlSmHpZzhH9EshIU7r0gTxX5DSPBe5ubmS0P9duAXVqlmT7ruvsvC3v/LXVTFI4IBddtWpLYl3HiBwGtA/L/1FV65cIQ/p/QEBLYyKcmnBGX9OnjotvqtevfrS99SQBL3hPTx7wMHB585l0B9//EF+zXyodWvH/QYhBGwH5wy4Mmi/ADg/HqUh/hVYQP+0cyctiogQMwGMMhBoJQkQPz8/kXvZWWAL/4H9+2nPnj30/ZZ4eSvRyDGjqV///k4fxwDxXxBnOReHkn6hcuX+T1j/OTOQn5+vEPZcNOzEiVS6JW0XlX49PITotwceABz79Tfy8vKiOrVrijSgnNGH4xX4+3jmwNFACNgOzhlwZdB+AXB+PEpT/Kthd6C9e/bS+nVf6gcCTLtH2lNg27bUrFkzerBFC5FlpSQGBCz02Wf79KlTlJycXCC/M/v09x8wgAIDA51qgFIYEP8FcaZzwQG6FSuaL7Jl6Xlr4fSkGZkXxIxCY2mwXZxACNgOzhlwZdB+AXB+PJxF/Kth4f3b8eOisIq5oiosvjl40t/fX5+9pHGTJsKqaS1nz56lGzm6SqxKEZc9u3cbDT4U+PsCAlqKGYnWrVu7ZIwCxH9BcIMqXiAEbAfnDLgyaL8AOD8ezij+TeHaAOnp6XTxjz+ESGefZ7XbjSPhmYamPj5iUFGrdm1q1KhRmUlLak4AA1DcQAhYD36noCyA3zwAzotLiP/C4FkCBZ4tsIWatWpRjRo1xHpJuROVJhAVoLSAELAe/E5BWQC/eQCcF5cX/wAAAAAAAADr0FUYAgAAAAAAAJR5IP4BAAAAAABwEyD+AQAAAAAAcBMg/gEAAAAAAHATIP4BAAAAAABwEyD+AQAAAAAAcBMg/gEAAAAAAHATIP4BAAAAAABwEyD+AQAAAAAAcBMg/gEAAAAAAHATIP4BAAAAAABwEyD+AQAAAAAAcBMg/gEAAAAAAHATIP4BAAAAAABwE2wW/3lZSbQp9lOaEdSCfBo3kf9a0NPTP6W4HamUI7/OecihpPDe0j4G0qux5+VtTsadJIpow+dxPMVl3ZE38uZwepjPb2gsZcnbygbnKS40UNV+LP0ZnxcAnJey1raz6XTqRcqTHwnM9FcuR046pWbdlh/ocJ0+N49yTp+mLKMLAwAA1mG9+M/Lop8Xj6DWHQZSWNgcWpucKz/B5NKJ6Dk0OaQndQpdTj+bdKgAAABcCUlcpm6liNBeNGjTeWPx7/JkU+q2JfRq+1G0OdMF71U5qfRD+EjqNDCOMiH+AQB2YJ34z8ukHbNH0gsLEyWZ35KGzFpK6/edoJNn0nR/p/fS+ojx1N1LGgYkvkcvvLyCknLQK1lNuUAK+4XP5WLqW7ucvNEd8KfXYo4Z2pHZP3c7L8D1cfW2nUspm8Lpw0QN+7er91d3TtLm1xfSD2r7lUy5wIn0M1+XyH5UW97mbNxJ2URvLOJ7MQAA2IcV4v82ZX47n8avOirdz0Ipct9XNCekNwXWLi8/L+FZmwL7TaTlP0RSsL80AkheTjNWHnJCFyAAAAAAAADcF8viP3sPffR2LOVSIL02byx1U4t+EzxrP06Tpj5HXuwGtHIT/ZwN6z8AAAAAAADOggXxf5NSYyJpbS6RV/A4eiWwqrzdHJ5UpetoiloSThHRo6lrFeXj71BW7HjSBd2mU05qrCpgeCBFJF0l6QX0aqEBcEognZnA3ZxU2hETTq8+yJ/Bf31pRtQOSrXofpRNqTu+oojQjvL7lPduoSR7Yxfysihp4zrrP7OsBNCVCBbagb6tSefTKGhPeR+f478oNXYmPa1cm6AllJRz2/h9fA1j1e1JF9S+KSnLjP8z+0jvpLio6YbPtep9EgXabhNqGRpOG8wG0Ou+a0P4CGppy/cA50bpA7n95ZyguOl9Ddc2/KCqLXCfFUur9M8rf5b6La1205FeDf+KdqRmy6+REPsRQIMWJYuHVxcNpOb8WuX3ZKG/EkkhTNqzT9B0WrUxSSNA1eT3Wqy/O/m7fAbSh1f4cTJ9OCBAeq2hL9EO+DXuc/j44ozOoaXzbnqP4X2L0p1z5Zq3Cacki12/bj+aD1hM0h2T6MpiGuTDn2d6HaS+LOk7K/qHPMreMVN6TQvqH3VC+/xm76AZDwbTqtSb8gY15t5va/9kqW/W3DMAQBGwIP5zKOPkOWnpRU196lAl3cbCYRegZ/pRn8Damh9+J3UtvdF3oipg+F7yrlxBXrePvKxtNOv5fhQ6abHKj/MorZ31Mg0MW0VHLv8jbzOBYxlmvkhBIW+Y+Lbye8fSoO5jaclB28RUXtZeWvJqfxo07k3tz+zwPM3akWnTZwJHcp1S106T2sXndELeQuUrU2UvVWvN+JGW8jUMU7cnXVB72ICxtJgHq0bcpszYydTpyZdo8qw1hs8VKO/rT69JA1/j6y7dJE9E06vte5q0XY6dWUxTQvrR4JnbTASTdGPf8V8aLH3XFCO/X8P3jFq8F1lAXJm7x+nLKSE0OfqovEFqot5VpF5YIi+d4kb3kvqsiTRH9bwOpd+aSnEFAlmz6UTUWNFGjdtNFv2w6A0KffJFB/RLUts8uJxGdR9IYSbtmZLX0JxxA6nL0/NohzmRXGK/O3u5RRn7PhTHN9noHMrnXSvWTfMew/s2WzrnL1PEvj/lbQ5CJOYYSz0HjDbTPzxBz+j7FDbWDaXJrYiObdhLpwqcJEncJ22nuNxfKHb3WY1z+BclJe6QPrkN9evcSL7fF6V/sqJvBgA4hvzCuPt7ftSzD+Y3bRSUH37ourzRHv7Jv7BhnPQ5jcVfwPCP8g9euCVtv5t//dSp/At3pdULG/JHiOfH5cde+Ee8y5hz+bHD20jPt8kfseGcvE3i7tn82FEddJ/91Dv5sSnX5Ceu5ackLs4f4a/7zgLvy7+Sf2jhAPl90/Kjtqfk64/wekr+9s+m5ffm5/zD8mMzeF+tQL0v/qH54YmGz7x74UD+6mnPyvsyQDqfV+RnJP45lB/emrcbH/s/hxbmt+XXD9+Qf0HeVjZQrqU97cpMO9CjamtG5015H5/nDvkjFu3RtTupnZxK+UNqicZt1Pj6Se00ZUP+9Kf4tyA99+xn+SnivTrupnyW30+879n86Z8fkD+X4fcl5IcPV9rEO/nbr6neeP1AfrjymaZtd8M7uvYn7evoDWelT2Kkzzu0WN4ufddn2/NTriufJ71n+2fyPqrfA0qWIrRtfR/IbSU0f/GBC7preP1sforoL//OT/lsmO55qc9afUh+XmDc3wVM2y5tUVC3mwfze0/bYGg313/Pj1X6JaO+7rrUPwaJ7W0XHpJ+HSrM9Fd3Mzbkj1a+f/ji/G369nwr/8KhNYbfz1OL8w/p220p/O70+1/wGmn3ueq+w/TY1L/VB/P7ffa76prcys/YEJYfIJ5T76PJ/vFf64X5h7Ruexro97HAe9TfJ/VxCxMM1/nuhfxDn8v3NG4DCw/I51hpU8Pyo1L+FlsM/Jm/fVpX3f6ZnHvBte3506XrbWhr9vZPlvpmAICjKXxInXeDrqTz2L0aeVd2VFaHzjR5agg9LGIHPKnSAw9Q7SIM7PNO/UBR8VlEXv1owSfTqK9vFfmZKuT7xFhaGD2J/OQtavJSY2nOoiT5fe/QS918DTMblXypW8g7tDKiH3nlJtDH645YEbycR9k7P6EZyr4kLqWwJwyf6Vm7HQW/u4QWBHEOiST6NOYwqSba3RRl2l2ZGi7493B4EjncEarVSJryWke53VWhB3xrmsxSBdJr0fNV109qp77P0hQRzyJxJIl+u6js1U06tTuRjklrXsETacqL7VTtmd/3JI2fOpIC+GHuFbqWq5i8pPby8yb6lGfAtNpuv4k0Z0KgtJ5FCZ/9oLPK5aXSN7OX0wmqTT0jltDskG7kW0n5Muk93UJo9ifzqKeX9J4VcXQY0+WlSFHathcFvPE6jW0nz55Waki+3F/mnaU9G36RNjSkIVPDKNhodpX7uxE05Y3O4lFu1lWV1fUv+jnma2FN9QqaRyvf7WdoN5X8qO+b0+k1TtQg9XVRCWl2Wskv0c5l4ZTAzTkonL77eBx117fn8lQ7cKjcNqWHyV/Thp//0j1lREn87oqI/ySKihirOjb+rY6jKcENpfVcOrYrmS7qnpCuVxpt/SxB2ir/XvX7qNu/sIjFuvPuKPTxefx962j5xCcN15ln5F+U72lshdfH5FUg33hh0MIAAA5SSURBVAGhNMRrNy1Ytc/4npT9K22LIXp+wisUcCSR9pxSu/4oswINqW+Ph6SzwJsc0D9Z7JsBAI7Ayt/VX3TluoMkmFdTalTLfNCwbahuAAP60uN1TT9X6mRb96RBrUw72Dt08XiSeF/VES/S0wXex5Snuh0eow7cUX6+i1IsHn4unfzloPTf3L5IeDakZybpbki5MdspCQHRpYJXQGOqVVjL9+5CXVuaxrd4UpXmbaT2YIp08wyJFmkbj87tprsJmuBZuSrdL68bUKbMzbWXqhQ48RtdOsi4EPLl/b2YTLuPSO/wHkShfRpq/ng96z5MvTp5SwIrnnam8KcD16MGPdS4esHr6+lHL8Udl9rEjzSnWw15o5pyVLlqNXldhRBx6dKKJNQGd6G6ph9cqR2FxfPnHqcNIX7W3hSMuZNOhzcX8h0SnnWfoolicJJOcYm/FjR+lMjvrmhU7dmZWuoFrUJVav5wK3ndQN6pvRTLv1cv6R7UvX7B81opgJ4e3EZ+UHTunPyF4kWHYub7+J727CiazPfD3B20LUkegFVpTf1HBJrckxRx34Cad2lLD3n9Qus3HTMYwfLO0/Z10sDG/znq/7Dc5hzQP1nsmwEADqHwn5lnRfJu6EDLBOPbhOoV6DztRYlJ8KYOD/to3gDIsx4FdGskP1C4SZlpJ8WaPphN66/DRPqBX3Qljc5dsqT+r9K54+zTWci+SHjWaix1pNJK7kE6fNLdxZnlXOg/TwyUJI0jsSJ+pW0TqluEL9VVwY6lOP7jQESlHanJu0xnj12SVgpvL2ruZKZREq/oA/20/h6lyYkczZhFv6Wb+kiDkqMobbsB+dQrtIXK3BaBnaKdxcbQqukDqUvYRvk5A3l/nKFfRVfTih5ubilpg51cSqffRBBtYd9Rnmo1biqs+Lmbf6GTpl1qSfzuioQ3BTapaWV/lEc5GWl0ilc7taHm+uQXaipQk5ZtpaGDI7gjXYI0XSCw2e+T8KxOjQJ44JhO8b+kyzNPVal1n2coQD0gUIwTrXpQp7bt6YkBNYwy+Olm3LMpYHBPai3fz4veP9kQWwgAKBIWxL/SUZylH49mWDkdzJH+R81n2bm/KlV2lPaXRPy1rOvyuovgVYWq3yOvg1LgHqkJVrTQ8G2FRVisPptHM1EFeyJN5r8CgYgyepc6AEypRlXNuVkaZcPxoy4DRuvaWdhkjQBgHXnXrxCbSEofT6n7qyoNARyFHb+7EiOPcq9eETN7hVGubhNi576SowJVqV5RXjfg2bQ7hQTdNszIiNmiSxTQvyM19ZRnNvSDA3nG3asnhfRs4sC+tDj6ZgCAFhZ+Z9UosEc34SN4an+ylRlE/qKfV42joIeaFo+/thEV6L7aleV1e/CigFnfUYqGVc74z4GVLHOz6fItXnFkHAUoPaTBbtIKGj5gopzNw4v8gmfQgohw3V9UAh3eF07ddS82UJRZtVYzKf60VjtV/yXRx/3qy28AZYOrlLRorCobDldbXyC3tcUUufUQ7Yp4RrxSjWdlb2ogr5cukiDOvipJdomG3kU0Atn5u3My9NbyEuMmZV++IS29qIG3Smh71qfHB/ckEq4/d2SXHyWLTzmq2SKQApTZAjn2xKx7K/onAJweC92vJ1UJfJz6sotg/Gpaf9iyG0Fe6iZaFM2+n51pXJ8H7XDZ+IuuasUX5N2gq38K1ayiEtXz4dvaFdr380ntANq8DDq246z8QKEcVfZmP0VpUHPyghXBvNZQlRq04GDeQvZFQj8F79DYB3fkFv159YYkAUy5Q9evagUTFhOqILfuszbR4TPHafPcV6hvv366v26+5HX9KhVI6KefVTPfXvJSo6i/mCrX5dnWi7jUNMpAMK/bYUhS8BTN+P6IJKDiaE7IALmtPUPdfL00277e1ZCO0M+/a/XhNyk1KlhYz336RlGqPU2rRkN60JtXzH0Hc5v+OHNKF+dSVN9ue393JYYimCX2/EK/a8Z3qVx1ikw56RI00bkQmf0+Cb27oWlciXSvf7gPvdJoD21LOqeLX1PdozybdqR+rbzo6o6jdCqVYxlqGAJ9ZdA/AeA6WO5+q3Si0f/hDAFJ9OG0peZzNDM5x2n1eyt0AbhBz9GTTW3I36+/eUgdT4apHM+jnMMJtJ6DiYyoQE0795ADaONoe4Hc1la8L3oJfVogfzTDOaQn6oqUWHVD9CKfNu2k/7wv62jDCQ05l5dOGxfK5+exNtTMYbEP7oQyyDIzcMs5RpvXcUaUEkLvvtOUOnduWtBfNS+TdkZvENec6CSlZSoZM5RZNXNt1xDMTux3K/2WlBsw5X5N8z85pDlozcuMpTHCJcRcYR7gqujdd3wfoU76bDMG8rJ20xql7R9Ko0zFhlLlIXpiAGejSae4dbso07Qv02cR8pLdPHSbbaJcQ2r9tPwd0d/RCQ3xl5f5HYW/v1taq01dHn6gaL7ddv/uSg7D71W6B/1wvqChIucX+nLFNvlB0Snn04aCRIeSQF/EJGv0D9I97dvltEAEIQfSw81M2pAIQK5F8Qe306EdZ8lrwOMUqMQOeDaiTv3bSGO7RIpevZGOtXqZ/t3VOOgc/RMAroMV3TxnCJhIczhFZXIkhXZ4vmA1Q8UPtX0fmsNTsP6htHhmb82MD2ZR3TzWvhdB0fpKgNmUum0pTQpeqOnD6enbhyZwmrXcWJo8/F0b3tePZohUitKgJngKRcSqqk+K41lKs5S0aS93t+KGyAVThuvOU+53NKf/ZIrYZqjQmpd1kKLfGUeTORUoBdIrI7rZdn6AjGqQFR1O81cflK8bx5pspYiw8fShvoBcCaB33/mF1q+KUf0ueH920Kp3RlPoKi1fbNnSJlIsxtKMd1bQD/oqq1Lbjf0vhc3SCSV9+/P0pYEzR5Gf1CpPLBpPk8JjVd+n839e/M57crpFGwffwOnRW1aPbKDP1yjtnuEKslE08+XxFK3Z9qvRwwOeEymPc+Pfo1mLthpisriS8Dtv0Bw5K43Bh1uZHZVaVko6XdR/lzlqUNcxE0Uqz9zEGfR82FJVe+a2+QXNHD5NtE3yH0qhPbSy0diA3b87Cf17r1BK+l/y/aIY8GxCT77cU+qrsighbBzNdFBfpW8Ht9Lp3EXVfVhvqMuiH2aFSv2D6jrzPW31uzQijO9pXuQ3Yig9UcBlR5f2M+izOfReAcu+YjDbTWujf9ceJKJ/AsBlsK7/9WxIfedH0YLgltIDpVKtn26amP8e6Kj3Q/XqMZW+/GwKdRN5/G3BcIPiapCzBnSkZuLzW1HQ8OWUMSKSIif4i1caU4O6vbmMZvTgwYnp+xbSvsdm0vyxWu+rSoEj3tW9LzeRPgwbSF0eMD0enlKOpPf7aactKwCn8py5kCYonzm8J7WWz1GzDoNolgjIa0nBUUtofGAxZd0o86hEM7fFGYPk69aUWj/5Kn2YMZS+iBqrm/4uCdQ3vOhpqt8F78/LNCemJk1YF0nT2CJGN+hytsraVakthS6eR0OkY8lNXEivPtlKfq/UdkWVS+km/dJceudZpf15UqXAl2jhrKd0N/hFE1Xfx8GfOv9nrx5z6Kv5z2JwWcYwGCzU7V5uLyGzKa7eOKntT9W5mty6Stn63Pa6dhMR8W+pnXK7eVXEZIn3PvSUXElY6peWTaFn9IJQlZknfiJ15e8KjZXebR7Pur3pnVVTqbv0JuP2zG1zmq6qu38oRX42kgKLOutZlN+d3uWORflj0v0ikF6NPa97zqGw4WwKLX5Jvm+a9lV7WtPUdwbb3FcZMsbF0uROfNzjKS6Lp3n4+6bSp5N6yP2D6jrzPW0GB0Fzn7KYPpnQTnvmRZkl8upGTwQap43VW/a9nqMJA3w17ononwBwFaz/+XExmLkb6PDWVbRg4XjRwRuQg62iEmhP5Ci5gJetcMcxltZJnz9/AndeMv7DaEZULK2b+Ij5dIiVWtBLH2+g9UtmCCGlg4PhPqNv5g+gRuYCD/h9kd9TfNT79BoLdj2644mI2UDLQ1rYND3tWbsjjRP78j+Tz+T9WUrr931Fs7rVteHEgwJwXvKvYinSqB3qrnf8V2MpsMq/5G0lAbfbkfRJzFKaIQbHCvL1/mEpjXukM3XhKXN2iTDKby69VxJ0cwocCw+ix9N8bvezn1AVL2KqkF/IUtpj+jth+Ley5BtK+DiY/OBSVgapSoETpDZl1M9J6K/7KGrf9XHZ9UKdtpHhYlQzC/av7DM/4X2K3LrapF/imczRFDVnmM4gw6hdiTQpT7XbjaLlP3xDEab3CHkfd22eZodhSIui/O5qUNfXPqBZ+vddoaS0i8WTnMKzLnWbvdrkHsP3l5kUGfcevdy6lrzNBqp0orHROqOBDpVbk2dtenj8UkqI+cjkOiv3tG20sUCfokY6Ny+9TAFaKbll1x8jd6ACoH8CwBXw4DK/8joAAAAASoQ8yt4xm7qEfE65PcJpV2Q/aSgGAADFD4bfAAAAgKPJiqVXhcuLmeBWpUoueVFAF3+qKW8GAIDiBuIfAAAAcDQ1/amziDnYTQveW6kKgOb42ySKWzSHZogEEEo+fQAAKBng9gMAAAA4nDzKSVpKgwdoZ5zTwQkgPqJ3EAcGAChBIP4BAACAYoKt/Fu+i6GPZnG2HQUOTB5J/Z/qQYEOCYAGAADrgfgHAAAAAADATcBMIwAAAAAAAG4CxD8AAAAAAABuAsQ/AAAAAAAAbgLEPwAAAAAAAG4CxD8AAAAAAABuAsQ/AAAAAAAAbgLEPwAAAAAAAG4CxD8AAAAAAABuAsQ/AAAAAAAAbgLEPwAAAAAAAG4CxD8AAAAAAABuAsQ/AAAAAAAAbgLEPwAAAAAAAG4CxD8AAAAAAABuAsQ/AAAAAAAAbgLEPwAAAAAAAG4B0f8DQE9byFzqAhgAAAAASUVORK5CYII=" width="474" height="487"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">[Source: Image used with kind permission of science-resources.co.uk]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Draw a circle on the diagram to show where the methane fraction is withdrawn.</span></span></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><span style="background-color: #ffffff;">List the following products, which are also obtained by fractional distillation, according to decreasing volatility: asphalt, diesel, gasoline, lubricating motor oil.</span></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><span style="background-color: #ffffff;">Explain how methane absorbs infrared (IR) radiation by referring to its molecular geometry and dipole moment.</span></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><span style="background-color: #ffffff;">Compare methane’s atmospheric abundance and greenhouse effect to that of carbon dioxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{891{\text{kJ mo}}{{\text{l}}^{ - 1}}}}{{16.05{\text{g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>891</mn>
<mrow>
<mtext>kJ mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>16.05</mn>
<mrow>
<mtext>g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 55.5 kJ g<sup>–1</sup> =» 55.5 «MJ kg<sup>–1</sup>» ✔</span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«55.5 MJ × 58 % =» 32.2 «MJ» <strong>[✔]</strong></span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Reason for higher efficiency:</em><br>no heat/energy loss in producing steam<br><em><strong>OR</strong></em><br>no need to convert chemical energy of the fuel into heat and then heat into mechanical energy<br><em><strong>OR</strong></em><br>direct conversion of «gravitational» potential energy to mechanical energy <strong>[✔]</strong></span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> <em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “less energy lost as heat” but do <strong>not</strong> accept “no energy lost”.</span></em></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p><span style="background-color: #ffffff;"><em>Reason for decreased use:</em><br>limited supply of available hydroelectric sites<br><em><strong>OR</strong></em><br>rapid growth of electrical supply in countries with little hydroelectric potential<br><em><strong>OR</strong></em><br>not building «new hydroelectric» dams because of environmental concerns <strong>[✔]</strong></span></p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Accept “new/alternative/solar/wind power sources «have taken over some of the demand»”.</span><span style="background-color: #ffffff;"><br></span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “lower output from existing stations due to limited water supplies”.</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="439" height="495"> <strong>[<span style="background-color: #ffffff;">✔]</span></strong></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">gasoline > diesel > lubricating motor oil > asphalt <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept products written in this order whether separated by >, comma, or nothing.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is tetrahedral<br><em><strong>O</strong><strong>R</strong></em><br>methane has zero dipole moment/is non-polar/bond polarities cancel <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em>Any two of</em>:<br>IR absorption can result in increased vibrations/bending/stretching <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">only modes that cause change in dipole absorb IR <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">for methane this is asymmetric bending/stretching <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is less abundant <em><strong>AND</strong> </em>has a greater effect «per mol» <strong>[✔]</strong></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Calculations of specific energy of methane and the maximum electric energy output in parts (a) and (b)(i) were done well.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Calculations of specific energy of methane and the maximum electric energy output in parts (a) and (b)(i) were done well.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Suggesting reasons for hydroelectric power having higher efficiency but lower relative use than other energy sources in was not answered well by most candidates. Often the reasons for higher efficiency were given in vague terms that did not meet the detail required.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Required candidates to circle a fractionating tower to show where the methane fraction could be withdrawn. Despite the expectation that candidates know methane is a gas at room temperature, there were many varied answers to this question.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Required products of fractional distillation of crude oil to be ranked according to decreasing volatility. This should have been able to be worked out from first principles and did not have to be memorized as one G2 respondent suggested.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates scored the first mark for stating that methane is tetrahedral. Further details to explain how methane absorbs IR radiation were generally insufficient. Many candidates referred to “dipole movements” despite dipole moment being in the stem of the question.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly answered comparing methane’s atmospheric abundance and greenhouse effect to that of carbon dioxide.</p>
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Polymers have a wide variety of uses but their disposal can be problematic.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Draw a section of isotactic polychloroethene (polyvinylchloride, PVC) showing all the atoms and all the bonds of four monomer units.</span></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><span style="background-color: #ffffff;">The infrared (IR) spectrum of polyethene is given.</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right:auto;margin-left:auto;display: block;" src="data:image/png;base64,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" width="506" height="411"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Suggest how the IR spectrum of polychloroethene would diff er, using section 26 of the data booklet.</span></span></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><span style="background-color: #ffffff;">Explain how plasticizers affect the properties of plastics.</span></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><span style="background-color: #ffffff;">Suggest why the addition of plasticizers is controversial.</span></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><span style="background-color: #ffffff;">Outline, giving a reason, how addition and condensation polymerization compare with regard to green chemistry.</span></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><span style="background-color: #ffffff;">Draw the full structural formula of the organic functional group formed during the polymerization of the two reactants below.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="602" height="123"></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="477" height="144"></p>
<p><span style="background-color: #ffffff;">correct bonding <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">Cl atoms all on same side and alternate <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Continuation bonds must be shown.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[1 max]</strong> if less than or more than four units shown.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept a stereo formula with all atoms and bonds shown.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«strong additional» absorption at 600–800 «cm<sup>–1</sup>» <strong>[✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br>embedded/fit between chains of polymers <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">prevent chains from forming crystalline regions <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">keep polymer strands/chains/molecules separated/apart <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">increase space/volume between chains <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">weaken intermolecular/dipole-dipole/London/dispersion/instantaneous dipoleinduced dipole/van der Waals/vdW forces «between chains» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">increase flexibility/durability/softness <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">make polymers less brittle <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “lowers density/melting point”.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">leach into foodstuffs/environment<br><em><strong>OR</strong></em><br>«unknown» health/environmental consequences <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “plasticizers cannot be recycled”.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">addition produces only the polymer «<em><strong>AND</strong> </em>more green»<br><em><strong>OR</strong></em><br>addition has no by/side-product/condensation produces by-product/small molecules/HCl/NH<sub>3</sub> «AND less green»<br><em><strong>OR</strong></em><br>addition has high atom economy/condensation has lower atom economy «<em><strong>AND</strong></em> less green»<br><em><strong>OR</strong></em><br>condensation polymers «often» more biodegradable than addition polymers «<em><strong>AND</strong></em> more green» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “if water produced by condensation «<strong>AND</strong> condensation and addition equally green»”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept for addition “all of reactants change into products”.</span></em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"> <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<p> </p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Continuation bonds must be shown.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept condensed formula.</span></em></p>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Few candidates scored at least one mark although most either scored both or none for this polymer structure. Some did not read that only four monomer units are required.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Almost all candidates received the mark for identifying the correct absorption band for polychloroethene.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a well-answered question; with most candidates identifying at least one method plasticizers affect the properties of plastic.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Several candidates wrote vague answers as to why the addition of plasticizers is controversial.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates seemed to have difficulty in comparing addition and condensation polymerisation with regard to green chemistry.</p>
<div class="question_part_label">e.</div>
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<p>Several candidates struggled to draw the full structural formula of the peptide linkage formed during the polymerisation of the two reactants.</p>
<div class="question_part_label">f.</div>
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