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</div><h2>SL Paper 1</h2><div class="question">
<p>A wind turbine has a power output <em>p </em>when the wind speed is <em>v</em>. The efficiency of the wind turbine does not change. What is the wind speed at which the power output is \(\frac{p}{2}\)?</p>
<p>A. \(\frac{v}{4}\)</p>
<p>B. \(\frac{v}{{\sqrt 8 }}\)</p>
<p>C. \(\frac{v}{2}\)</p>
<p>D. \(\frac{v}{{\sqrt[3]{2}}}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is equivalent to<span class="Apple-converted-space"> \(\frac{{{\text{specific energy of a fuel}}}}{{{\text{energy density of a fuel}}}}\)?</span></p>
<p>A.<span class="Apple-converted-space"> </span>density of the fuel</p>
<p>B.<span class="Apple-converted-space"> \(\frac{1}{{{\text{density of the fuel}}}}\)</span></p>
<p>C.<span class="Apple-converted-space"> \(\frac{{{\text{energy stored in the fuel}}}}{{{\text{density of the fuel}}}}\)</span></p>
<p>D.<span class="Apple-converted-space"> \(\frac{{{\text{density of the fuel}}}}{{{\text{energy stored in the fuel}}}}\)</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">Which of the following correctly shows the energy change in a photovoltaic cell and in a solar heating panel?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_08.38.51.png" alt="M10/4/PHYSI/SPM/ENG/TZ1/28"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Some teachers argued correctly that a photovoltaic cell was a type of solar panel. In the context of this question, though, it is clear that a solar <em>heating </em>panel is meant. The response options allowed only A to be correct.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The rate of global warming might be reduced by</p>
<p class="p1">A. replacing the use of coal and oil with natural gas.</p>
<p class="p1">B. a reduction in the Earth’s albedo.</p>
<p class="p1">C. a reduction in carbon fixation.</p>
<p class="p1">D. an increase in deforestation.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Three of the four responses were incorrect and only one option was possible. Any confusion between carbon capture and carbon fixation was not relevant here as it was clear that the option referring to carbon fixation was not correct.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The energy source that currently provides the greatest proportion of the world’s total energy demand is</p>
<p class="p1">A. coal.</p>
<p class="p1">B. oil.</p>
<p class="p1">C. natural gas.</p>
<p class="p1">D. uranium.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Three gases in the atmosphere are</p>
<p> I. carbon dioxide (CO<sub>2</sub>)</p>
<p> II. dinitrogen monoxide (N<sub>2</sub>O)</p>
<p> III. oxygen (O<sub>2</sub>).</p>
<p>Which of these are considered to be greenhouse gases?</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">It is suggested that the solar power incident at a point on the Earth’s surface depends on</p>
<p class="p1">I. daily variations in the Sun’s power output</p>
<p class="p1">II. the location of the point</p>
<p class="p1">III. the cloud cover at the point.</p>
<p class="p1">Which suggestion(s) is/are correct?</p>
<p class="p1">A. III only</p>
<p class="p1">B. I and II only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">The first option concerning the daily output of the Sun’s power caused some confusion. The question does not ask about whether such variations occur (they do!) but rather whether they would lead to a change in power incident upon the Earth. Clearly they would, leading to D as the correct response.</p>
</div>
<br><hr><br><div class="question">
<p>A black body has kelvin temperature <em>T</em> and surface area <em>A</em>. The total power radiated by the body is <em>P</em>. What is the new power radiated when <em>T</em> is doubled and <em>A</em> is halved?</p>
<p>A. 4<em>P</em><br>B. 8<em>P</em><br>C. 16<em>P</em><br>D. 32<em>P</em></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div class="page" title="Page 13">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';"> </span></p>
</div>
</div>
</div>
</div>
<br><hr><br><div class="question">
<p>In a wind generator, the kinetic energy of the wind cannot be completely converted into mechanical kinetic energy. This is because</p>
<p>A. momentum is not conserved in the collisions between air molecules and the blades.</p>
<p>B. the density of the air depends on the temperature of the air.</p>
<p>C. the air molecules cannot be brought completely to rest in collisions with the blades.</p>
<p>D. the wind speed does not remain constant.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>In the production of electric power, an advantage of using photovoltaic cells rather than fossil fuels is that the photovoltaic cells</p>
<p>A. can be effective in any location.<br>B. can be used continuously.<br>C. have low initial set-up costs.<br>D. are more environmentally friendly when in use.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The energy density of a substance can be calculated by multiplying its specific energy with which quantity?</p>
<p>A. mass</p>
<p>B. volume</p>
<p>C. \(\frac{{{\text{mass}}}}{{{\text{volume}}}}\)</p>
<p>D. \(\frac{{{\text{volume}}}}{{{\text{mass}}}}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A uranium nuclear fission reactor that attempts to operate without a moderator would</p>
<p>A. suffer core meltdown.<br>B. not require uranium enrichment.<br>C. produce too much energy.<br>D. produce very little energy.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div class="page" title="Page 13">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';"> </span></p>
</div>
</div>
</div>
</div>
<br><hr><br><div class="question">
<p>In the production of energy from nuclear fission, fuel enrichment means increasing, in the fuel rods, the amount of</p>
<p>A. uranium-238.</p>
<p>B. plutonium-239.</p>
<p>C. uranium-235.</p>
<p>D. uranium-235 and plutonium-239.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The diagram shows a simple climate model for the Earth.</p>
<p><img src="images/Schermafbeelding_2018-08-10_om_17.12.57.png" alt="M18/4/PHYSI/SPM/ENG/TZ1/30"></p>
<p>What does this model predict for the average albedo of the Earth?</p>
<p>A. 0.30</p>
<p>B. 0.51</p>
<p>C. 0.70</p>
<p>D. 0.81</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the purpose of the moderator in a nuclear power station?</p>
<p>A. To absorb fast moving neutrons</p>
<p>B. To slow down fast moving neutrons</p>
<p>C. To initiate a chain reaction</p>
<p>D. To transfer the heat generated to a heat exchanger</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p style="text-align: left;">B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A natural gas power station has an output of 600 MW and an efficiency of 50%. The mass of natural gas that is burned per second is 20kg. What is the energy density of natural gas?</p>
<p>A. 15 MJkg<sup>–1</sup><br>B. 30 MJkg<sup>–1</sup><br>C. 40 MJkg<sup>–1</sup><br>D. 60 MJkg<sup>–1</sup></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div class="page" title="Page 13">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 12">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">Non-renewable fuels have been produced in the past and so can be produced again, so C represents </span><span style="font-size: 10.000000pt; font-family: 'Arial';">a common misconception. The key to understanding what is meant by ‘non</span><span style="font-size: 10.000000pt; font-family: 'Arial';">-</span><span style="font-size: 10.000000pt; font-family: 'Arial';">renewable’ is </span><span style="font-size: 10.000000pt; font-family: 'Arial';">consideration of the time scale of production and consumption. </span></p>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
<br><hr><br><div class="question">
<p>The average surface temperature of Mars is approximately 200 K and the average surface temperature of Earth is approximately 300 K. Mars has a radius half that of Earth. Assume that both Mars and Earth act as black bodies.</p>
<p>What is \(\frac{{{\text{power radiated by Mars}}}}{{{\text{power radiated by Earth}}}}\)?</p>
<p>A. 20<br>B. 5<br>C. 0.2<br>D. 0.05</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the phenomenon that best explains why greenhouse gases absorb infrared radiation?</p>
<p>A. Resonance<br>B. Interference<br>C. Refraction<br>D. Diffraction</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Three energy sources for power stations are</p>
<p> I. fossil fuel</p>
<p> II. pumped water storage</p>
<p> III. nuclear fuel.</p>
<p>Which energy sources are primary sources?</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III<span class="Apple-converted-space"> </span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which of the following best defines non-renewable fuels?</p>
<p>A. They produce a lot of degraded energy in comparison with renewable fuels.<br>B. They have very high energy density but produce greenhouse gases.<br>C. They cannot be produced again.<br>D. Their rate of consumption is much greater than the rate at which they are being produced.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div class="page" title="Page 13">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';"> </span></p>
</div>
</div>
</div>
</div>
<br><hr><br><div class="question">
<p>In nuclear power production, what is one advantage of a nuclear fusion reactor over a nuclear fission reactor?</p>
<p>A. The operating temperature of the fusion reactor is lower.</p>
<p>B. The nuclear reactants are more easily confined within the core of the fusion reactor.</p>
<p>C. The disposal of the nuclear waste products from the fusion reactor is more straightforward.</p>
<p>D. The nuclear fusion reaction is more easily sustained for long periods of time.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Methane and carbon dioxide are both greenhouse gases that are believed to cause global warming. The reason for this is that these gases</p>
<p>A. absorb incoming radiation from the Sun.</p>
<p>B. transmit the incoming radiation from the Sun and radiation from the Earth.</p>
<p>C. reflect incoming radiation from the Sun.</p>
<p>D. transmit incoming radiation from the Sun and absorb outgoing radiation from the Earth.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p style="text-align: left;">D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">The average surface temperature of Mars is about 200 K. The average surface temperature of Earth is about 300 K. Both can be regarded as black bodies.</p>
<p class="p1">What is the ratio \(\frac{{{\text{energy radiated per second per unit area on Mars}}}}{{{\text{energy radiated per second per unit area on Earth}}}}\)?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>0.7</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>0.4</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>0.3</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>0.2</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">Venus and Earth may be regarded as behaving as black bodies. The mean temperature at the surface of Venus is about 600 K and at the surface of Earth is about 300 K. Which of the following is the best estimate for the ratio \(\frac{{{\text{power radiated per unit area on Earth}}}}{{{\text{power radiated per unit area on Venus}}}}\)?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\(\frac{1}{2}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\(\frac{1}{4}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\(\frac{1}{8}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\(\frac{1}{16}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">One <strong>disadvantage </strong>of using photovoltaic cells to power a domestic water heater is that</p>
<p class="p1">A. solar energy is a renewable source of energy.</p>
<p class="p1">B. the power radiated by the Sun varies significantly depending on the weather.</p>
<p class="p1">C. a large area of photovoltaic cells would be needed.</p>
<p class="p1">D. photovoltaic cells contain CFCs, which contribute to the greenhouse effect.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">To heat the amount of water used in a typical household, a large area of photovoltaic cells would be required and this is a disadvantage. Some candidates were distracted by the inclusion of the variation of weather conditions for one of the options, however candidates should have realized that the power radiated by the Sun is unaffected by the weather conditions on Earth.</p>
</div>
<br><hr><br><div class="question">
<p>Mars and Earth act as black bodies. The \(\frac{{{\text{power radiated by Mars}}}}{{{\text{power radiated by the Earth}}}} = p\) and \(\frac{{{\text{absolute mean temperature of the surface of Mars}}}}{{{\text{absolute mean temperature of the surface of the Earth}}}} = t\).</p>
<p>What is the value of \(\frac{{{\text{radius of Mars}}}}{{{\text{radius of the Earth}}}}\)?</p>
<p>A. \(\frac{p}{{{t^4}}}\)</p>
<p>B. \(\frac{{\sqrt p }}{{{t^2}}}\)</p>
<p>C. \(\frac{{{t^4}}}{p}\)</p>
<p>D. \(\frac{{{t^2}}}{{\sqrt p }}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The three statements give possible reasons why an average value should be used for the solar constant.</p>
<p style="padding-left: 90px;">I. The Sun’s output varies during its 11 year cycle.<br>II. The Earth is in elliptical orbit around the Sun.<br>III. The plane of the Earth’s spin on its axis is tilted to the plane of its orbit about the Sun.</p>
<p>Which are the correct reasons for using an average value for the solar constant?</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">In a nuclear power station, uranium is used as the energy source and plutonium-239 is produced. Which of the following is true?</p>
<p class="p1">A. Plutonium-239 is produced by nuclear fusion.</p>
<p class="p1">B. A moderator is used to absorb plutonium-239.</p>
<p class="p1">C. Control rods are used to slow down plutonium-239.</p>
<p class="p1">D. Plutonium-239 can be used as a fuel in another type of nuclear reactor.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">In a nuclear power station, a moderator is required to</p>
<p class="p1">A. control the rate of fission.</p>
<p class="p1">B. reduce heat losses to the surroundings.</p>
<p class="p1">C. reduce the energy of high energy neutrons.</p>
<p class="p1">D. increase the energy of low energy neutrons.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">Which of the following correctly describes both the role of the moderator and of the control rods in a nuclear reactor?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_08.37.14.png" alt="M10/4/PHYSI/SPM/ENG/TZ1/27"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Only in certain reactors does the moderator also have the role of cooling the reactor down. The best answer is therefore A.</p>
</div>
<br><hr><br><div class="question">
<p>Which of the following geographical features has the lowest albedo?</p>
<p>A. Polar ice cap<br>B. Desert<br>C. Ocean<br>D. White cliffs</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
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<p>World energy resources include coal, nuclear fuel and geothermal energy. Which of the following lists these resources in order of energy use in the world?</p>
<div class="page" title="Page 14">
<div class="layoutArea">
<div class="column">
<ol style="list-style-type: upper-alpha;">
<li>
<p>nuclear, geothermal, coal</p>
</li>
<li>
<p>nuclear, coal, geothermal</p>
</li>
<li>
<p>coal, geothermal, nuclear</p>
</li>
<li>
<p>coal, nuclear, geothermal</p>
</li>
</ol>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<div class="page" title="Page 2">
<div class="layoutArea">
<div class="column">D</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<div class="page" title="Page 1">
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<p> </p>
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</div>
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</div>
</div>
<br><hr><br><div class="question">
<p>The design of a nuclear power station includes an electrical generator. The function of the generator is to convert</p>
<p>A. nuclear energy to kinetic energy.<br>B. kinetic energy to thermal energy.<br>C. thermal energy to electrical energy.<br>D. kinetic energy to electrical energy.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">Which of the following is likely to increase greenhouse gas concentrations in the atmosphere?</p>
<p class="p1">A. Using natural gas instead of coal to generate electrical energy</p>
<p class="p1">B. Incineration of waste to generate electrical energy</p>
<p class="p1">C. Increased use of wind turbines to generate electrical energy</p>
<p class="p1">D. Carbon dioxide capture and storage at the power station</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p class="p1">The diagram shows the variation with wavelength of the power per unit wavelength \(I\) radiated from an area of \({\text{1 }}{{\text{m}}^{\text{2}}}\)of two different bodies.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-08_om_18.25.57.png" alt="N10/4/PHYSI/SPM/ENG/TZ0/28_1"></p>
<p class="p1">Which of the following is a correct comparison of the temperature and of the emissivity of the two bodies?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_18.27.01.png" alt="N10/4/PHYSI/SPM/ENG/TZ0/28_2"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many candidates thought that the peaks of the curves being at the same intensity meant that the temperatures were the same (response B). It would appear that the family of curves representing bodies of different emissivities (but the same temperature) had not been widely taught.</p>
</div>
<br><hr><br><div class="question">
<p>A black body emits radiation with its greatest intensity at a wavelength of I<sub>max</sub>. The surface temperature of the black body doubles without any other change occurring. What is the wavelength at which the greatest intensity of radiation is emitted?</p>
<p>A. I<sub>max</sub></p>
<p>B. \(\frac{{{\text{I}}{{\text{}}_{{\text{max}}}}}}{{\text{2}}}\)</p>
<p>C. \(\frac{{{\text{I}}{{\text{}}_{{\text{max}}}}}}{{\text{4}}}\)</p>
<p>D. \(\frac{{{\text{I}}{{\text{}}_{{\text{max}}}}}}{{\text{16}}}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>In a nuclear power station, in order to increase the chances of a chain reaction</p>
<p>A. kinetic energy is removed from the neutrons.</p>
<p>B. kinetic energy is given to the neutrons.</p>
<p>C. some neutrons are absorbed.</p>
<p>D. extra neutrons are added.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The use of which energy source enhances the greenhouse effect the most?</p>
<p>A. Wood<br>B. Coal<br>C. Wind<br>D. Tidal</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Teachers wished to debate the answer to this question, but the candidates had no problem with it. In paper 1 candidates are required to give the best answer, which here is clearly B.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Greenhouse gases</p>
<p class="p1">A. reflect infrared radiation but absorb ultraviolet radiation.</p>
<p class="p1">B. reflect ultraviolet radiation but absorb infrared radiation.</p>
<p class="p1">C. transmit infrared radiation but absorb ultraviolet radiation.</p>
<p class="p1">D. transmit ultraviolet radiation but absorb infrared radiation.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Greenhouse gases allow ultraviolet to pass through them (i.e. they transmit ultraviolet light) but absorb infrared radiation.</p>
</div>
<br><hr><br><div class="question">
<p>Which of the following alternatives would be the most likely to increase the enhanced greenhouse effect?</p>
<p>A. Replacement of oil and coal fired power stations with natural gas fired power stations<br>B. Forests being cut down without being replanted<br>C. Greater use of combined heating and power systems<br>D. Use of motor vehicles powered by a combination of electricity and oil products</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Surface X has a temperature <em>T</em><sub>X</sub> and emissivity <em>ε</em><sub>x</sub>. Surface Y has a temperature <em>T</em><sub>Y</sub> and emissivity <em>ε</em><sub>y</sub>. The two surfaces emit radiation at the same rate.</p>
<p>What is the ratio \(\frac{{{T_{\rm{X}}}}}{{{T_{\rm{Y}}}}}\)?</p>
<p>A. \({\left( {\frac{{{\varepsilon _{\rm{y}}}}}{{{\varepsilon _{\rm{x}}}}}} \right)^{\frac{1}{4}}}\)</p>
<p>B. \({\left( {\frac{{{\varepsilon _{\rm{x}}}}}{{{\varepsilon _{\rm{y}}}}}} \right)^{\frac{1}{4}}}\)</p>
<p>C. \({\left( {\frac{{{\varepsilon _{\rm{y}}}}}{{{\varepsilon _{\rm{x}}}}}} \right)^4}\)</p>
<p>D. \({\left( {\frac{{{\varepsilon _{\rm{x}}}}}{{{\varepsilon _{\rm{y}}}}}} \right)^4}\)</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<div class="column">A</div>
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<br><hr><br><div class="question">
<p>Gases in the Earth’s atmosphere believed to be responsible for the greenhouse effect include</p>
<p>A. sulfur dioxide, nitrous oxide, water.<br>B. methane, carbon monoxide, ozone.<br>C. carbon dioxide, sulfur trioxide, carbon monoxide.<br>D. water, methane, nitrous oxide.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div data-canvas-width="694.1737373513404">
<div data-canvas-width="694.3557484378152">Most candidates chose the correct response, B. Many teachers commented that various sources support response D as correct. Both B and D were therefore accepted as correct.</div>
</div>
</div>
<br><hr><br><div class="question">
<p>Which energy resource is renewable?</p>
<p>A. Natural gas<br>B. Uranium<br>C. Biogas<br>D. Coal</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The property of the molecules of greenhouse gases which leads to their ability to absorb infrared radiation is their</p>
<p>A. resonant frequency.<br>B. speed of rotation.<br>C. total electric charge.<br>D. diameter.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div data-canvas-width="694.1737373513404">
<div data-canvas-width="694.3557484378152"> </div>
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</div>
<br><hr><br><div class="question">
<p>For a black-body at absolute temperature <em>T</em> the power emitted per unit area is <em>P</em>. What is the power emitted per unit area when the temperature is decreased to \(\frac{1}{2}\)<em>T</em>?</p>
<p>A. \(\frac{P}{{32}}\)</p>
<p>B. \(\frac{P}{{16}}\)</p>
<p>C. \(\frac{P}{{8}}\)</p>
<p>D. \(\frac{P}{{4}}\)</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A student states that the following factors may lead to global warming</p>
<p style="padding-left: 30px;">I. decreased albedo of the Earth’s surface<br>II. increase in volcanic activity<br>III. deforestation.</p>
<p>Which of the above statements are correct?</p>
<p>A. I and II only<br>B. II and III only<br>C. I and III only<br>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The surface temperature of a black-body emitter is doubled. By what factor does the power emitted by the body increase?</p>
<p>A. 32<br>B. 16<br>C. 4<br>D. 2</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>The greenhouse effect can be explained by the fact that the infrared radiation emitted by the surface of Earth</p>
<p>A. is absorbed by the atmosphere and then re-radiated in all directions.</p>
<p>B. raises the temperature of the upper atmosphere.</p>
<p>C. is trapped by the upper atmosphere.</p>
<p>D. is absorbed by the atmosphere and then all of it is re-radiated back to the surface of Earth.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The original source of the electrical power produced by a wind generator is</p>
<p>A. the Sun’s radiated energy.</p>
<p>B. the gravitational energy of the Sun and the Moon.</p>
<p>C. nuclear energy stored within atoms in the Earth’s atmosphere.</p>
<p>D. the Earth’s internal energy.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<p>What is the correct order of energy transformations in a coal power station?</p>
<p>A. thermal → chemical → kinetic → electrical</p>
<p>B. chemical → thermal → kinetic → electrical</p>
<p>C. chemical → kinetic → thermal → electrical</p>
<p>D. kinetic → chemical → electrical → thermal</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<div class="column">Which of the following processes leads to the production of a nucleus of plutonium-239 from a nucleus of uranium-238?</div>
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<p> </p>
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<ol style="list-style-type: upper-alpha;">
<li>
<p>Neutron capture by uranium nucleus</p>
</li>
<li>
<p>Radioactive decay of uranium nucleus</p>
</li>
<li>
<p>Electron capture by uranium nucleus</p>
</li>
<li>
<p>Nuclear ssion of uranium nucleus</p>
</li>
</ol>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<div class="page" title="Page 2">
<div class="layoutArea">
<div class="column">A</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div class="page" title="Page 1">
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<p> The favourite response was the correct one, A. Many teachers, however, pointed out that both A and B could be construed as correct depending upon ones understanding of ‘leads to’ in the stem. Both responses were therefore accepted as correct.</p>
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<p>Large areas of rainforests are cut down and burned every year. The result of these actions is</p>
<ol style="list-style-type: upper-alpha;">
<li>
<p>reduced albedo.</p>
</li>
<li>
<p>reduced carbon fixation.</p>
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<li>
<p>increased evaporation rate.</p>
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<p>increased mass of atmospheric methane.</p>
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<p> </p>
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<p>In a nuclear fission reaction neutrons are passed through a moderator. The reason for this is to reduce the</p>
<p>A. number of the neutrons.<br>B. kinetic energy of the neutrons.<br>C. the number of collisions between neutrons.<br>D. potential energy of the neutrons.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>B</p>
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<div class="question">
[N/A]
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<p>A spherical black body has absolute temperature <em>T</em><sub>1</sub>. The surroundings are kept at a lower absolute temperature <em>T</em><sub>2</sub>. What is the net power per unit area lost by the body?</p>
<p>A. \(\sigma {T_1}^4\)<br>B. \(\sigma {T_2}^4\)<br>C. \(\sigma \left( {{T_1}^4 - {T_2}^4} \right)\)<br>D. \(\sigma \left( {{T_1}^4 + {T_2}^4} \right)\)</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>C</p>
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[N/A]
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<p>A room is at a constant temperature of 300 K. A hotplate in the room is at a temperature of 400 K and loses energy by radiation at a rate of <em>P</em>. What is the rate of loss of energy from the hotplate when its temperature is 500 K?</p>
<p>A. \(\frac{{{4^4}}}{{{5^4}}}\)<em>P</em></p>
<p>B. \(\frac{{{5^4} + {3^4}}}{{{4^4} + {3^4}}}\)<em>P</em></p>
<p>C. \(\frac{{{5^4}}}{{{4^4}}}\)<em>P</em></p>
<p>D. \(\frac{{{5^4} - {3^4}}}{{{4^4} - {3^4}}}\)<em>P</em></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>D</p>
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[N/A]
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<p class="p1">The diagram shows an energy balance climate model for a planet.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-08_om_18.29.06.png" alt="N10/4/PHYSI/SPM/ENG/TZ0/30"></p>
<p class="p1">The intensities of the reflected and radiated radiation are given in terms of the incident intensity \(I\). Which of the following is the albedo of this planet?</p>
<p class="p1">A. 0.15</p>
<p class="p1">B. 0.25</p>
<p class="p1">C. 0.40</p>
<p class="p1">D. 0.60</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
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[N/A]
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<p class="p1">Which of the following is a renewable and non-renewable energy source?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_11.54.18.png" alt="N09/4/PHYSI/SPM/ENG/TZ0/26"></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>B</p>
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[N/A]
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<p>In which of the following places will the albedo be greatest?</p>
<p>A. A forest<br>B. A grassland<br>C. An ocean<br>D. A polar ice cap</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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[N/A]
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<p class="p1">Which of the following is most likely to reduce the enhanced greenhouse effect?</p>
<p class="p1">A. Replace the use of gas powered stations with oil powered stations</p>
<p class="p1">B. Replace coal-fired power stations with nuclear power stations</p>
<p class="p1">C. Increase the use of all non-renewable energy sources</p>
<p class="p1">D. Decrease the efficiency of power production</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
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[N/A]
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<p class="p1">The albedo for the oceans is lower than that for glaciers. This is because, compared to ice, sea water</p>
<p class="p1">A. has a greater density.</p>
<p class="p1">B. has a greater specific heat capacity.</p>
<p class="p1">C. has a greater coefficient of volume expansion.</p>
<p class="p1">D. absorbs a greater amount of radiative power.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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[N/A]
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<p>Which type of power-production system is most suitable for responding to a sudden high increase in demand for electrical power?</p>
<p>A. A wind generator</p>
<p>B. A tidal water storage hydroelectric scheme</p>
<p>C. An ocean-wave energy converter</p>
<p>D. A pump storage hydroelectric scheme</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
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<p>A solar panel has surface area 0.40m<sup>2</sup> and efficiency 50%. The average intensity of radiation reaching the surface of the panel is 0.25kWm<sup>–2</sup>. What is the average power output from an array of 10 of these solar panels?</p>
<p>A. 0.5 W</p>
<p>B. 5 W</p>
<p>C. 50 W</p>
<p>D. 500 W</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p class="p1">Which of the following energy sources results from the solar energy incident on Earth?</p>
<p class="p1">A. Nuclear fission</p>
<p class="p1">B. Wind energy</p>
<p class="p1">C. Nuclear fusion</p>
<p class="p1">D. Geothermal energy</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>A wind turbine produces a power <em>P</em> when the wind speed is <em>v</em>. Assuming that the efficiency of the turbine is constant, the best estimate for the power produced when the wind speed becomes 2<em>v</em> is</p>
<p>A. 2<em>P</em>.<br>B. 4<em>P</em>.<br>C. 6<em>P</em>.<br>D. 8<em>P</em>.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>Which of the following is the primary function of the moderator in a nuclear power station?</p>
<p>A. To control the rate of fission reactions<br>B. To absorb neutrons<br>C. To prevent the power station from becoming unsafe<br>D. To slow down neutrons</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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<div class="question">
<div data-canvas-width="694.1737373513404">
<div data-canvas-width="694.3557484378152"> Many candidates clearly did not understand the role of the moderator in a nuclear power station.</div>
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<br><hr><br><div class="question">
<p>Wind of speed <em>v</em> is incident normally on a wind turbine of radius <em>r</em>. The maximum theoretical power output of the turbine is <em>P</em>. For wind of speed 2<em>v</em> incident normally on a similar turbine of radius \(\frac{1}{2}\)<em>r</em>, the maximum theoretical power will be</p>
<p>A. \(\frac{1}{2}\)<em>P</em>.<br>B. <em>P</em>.<br>C. 2<em>P</em>.<br>D. 4<em>P</em>.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>A black body has absolute temperature <em>T</em> and surface area <em>A</em>. The intensity of the radiation emitted by the body is <em>I</em>. Another black body of surface area 2<em>A</em> has absolute temperature 2<em>T</em>. What is the intensity of radiation emitted by this second black body?</p>
<p>A. 4<em>I</em></p>
<p>B. 8<em>I</em></p>
<p>C. 16<em>I</em></p>
<p>D. 32<em>I</em></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>The main role of a moderator in a nuclear fission reactor is to</p>
<p>A. slow down neutrons.</p>
<p>B. absorb neutrons.</p>
<p>C. reflect neutrons back to the reactor.</p>
<p>D. accelerate neutrons.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<br><hr><br><div class="question">
<p>Which of the energy sources are classified as renewable and non-renewable?</p>
<p><img 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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Planet X and planet Y both emit radiation as black bodies. Planet X has a surface temperature that is less than the surface temperature of planet Y.</p>
<p>What is the graph of the variation of intensity <em>I</em> with wavelength <em>λ</em> for the radiation emitted by planet Y? The graph for planet X is shown dotted.</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Increasing the temperature of a black-body will have the following effect on its emission spectrum.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A black body of surface 1.0m<sup>2</sup> emits electromagnetic radiation of peak wavelength 2.90×10<sup>–6</sup>m. Which of the following statements about the body are correct?</p>
<p style="padding-left: 30px;">I. The temperature of the body is 1000 K.<br>II. The energy radiated by the body in one second is 5.7×10<sup>4 </sup>J.<br>III. The body is a perfect absorber of electromagnetic radiation.</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The following are energy sources.</p>
<p style="padding-left: 60px;">I. a battery of rechargeable electric cells<br>II. crude oil<br>III. a pumped storage hydroelectric system</p>
<p>Which of these are secondary energy sources?</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which of the following is <strong>not </strong>a primary energy source? </p>
<p>A. Wind turbine </p>
<p>B. Jet Engine </p>
<p>C. Coal-fired power station </p>
<p>D. Nuclear power station</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The blades of a certain wind turbine X have radius <em>r</em>. The maximum theoretical available wind power for a given wind speed is <em>P</em>. Another similar turbine Y has blades of radius 2<em>r</em>. What is the best estimate for the maximum theoretical available wind power from turbine Y?</p>
<p>A. 8<em>P</em></p>
<p>B. 4<em>P</em></p>
<p>C. \(\frac{P}{4}\)</p>
<p>D. \(\frac{P}{8}\)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<div data-canvas-width="694.1737373513404">
<div data-canvas-width="694.3557484378152"> </div>
</div>
</div>
<br><hr><br><div class="question">
<p>Which of the following correctly describes the energy transformation within photovoltaic cells and within solar heating panels?</p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What are the principal energy changes in a photovoltaic cell and in a solar heating panel? </p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Two pulses are travelling towards each other.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p style="text-align: left;">What is a possible pulse shape when the pulses overlap?</p>
<p style="text-align: left;"><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p style="text-align: left;">The Sankey diagram represents the energy flow for a coal-fired power station.</p>
<p style="text-align: center;"><img 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" alt></p>
<p>What is the overall efficiency of the power station? </p>
<p>A. 0.3 </p>
<p>B. 0.4 </p>
<p>C. 0.6 </p>
<p>D. 0.7</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The Earth rotates about an axis XY, as shown below.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAsIAAAIsCAYAAAD4XM8rAAAKqGlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUFEkax6u7JwfSwEhmiEOQnEFyHILkaGKYIQxhGAYGFTOyqOAaUBEBRdBVEAVXJYgJEcW0CAYw7yCLiHouBkyocw0cw+3du7t3//fq1a+/rv7q6+qq9/4NAOUqWyDIgOUAyOTnCsP9PBmxcfEMvBggAA+IgAQgNidH4BEaGgRQzfR/1cd+AE32d0wnc/37/f8qeW5SDgcAKBTlRG4OJxPlU2g7zhEIcwFAuGhcd2muYJI3oqwoRAtEuWqSU6b5+CQnTnPX1JjIcC+U7wNAoLDZwhQAyH+gcUYeJwXNQ8GgbMHn8vgo26Dsykllo/NQ0HtgbmZm1iTvR9kw8Z/ypPwlZ6I0J5udIuXpd5kSwZuXI8hgL/8/l+N/KzNDNDOHDtooqUL/8Mn50DWrS88KlDI/cX7IDPO40zVNcqrIP2qGOTle8TPMZXsHzrAoPcpjhtnC2Wd5uazIGRZmhUvz8zPmB0nzJ7GknJTjEzHDyTxf1gznp0bGzHAeL3r+DOekRwTOjvGSxoWicGnNyUJf6Ttm5szWxmHPzpWbGuk/W0OstB5ukrePNM6Pko4X5HpKcwoyQmfrz/CTxnPyIqTP5qIbbIbT2AGhs3lCpesDeCAYsAEnN2nZ5L4CXlmC5UJeSmouwwM9JUkMFp9jNpdhZWFpB8DkmZv+pO/pU2cJol+fja1vBsDlvEQiOTMbC9wGwEkmAKTe2RhzOwCyagBcreGIhHnTscmtDrDoOZYFikAFaAJdYAhMgRWwA87AHfiAABACIkEcWAw4IBVkAiFYClaCdaAIlIBtYBeoANXgAKgDx8AJ0ArOgovgCrgBesE98AiIwTB4BcbARzABQRAeokI0SAXSgvQhE8gKcoBcIR8oCAqH4qAEKAXiQyJoJbQeKoFKoQqoBqqHfoVOQxeha1Af9AAahEahd9BXGIEpsCKsARvA5rAD7AEHwpHwIjgFzobz4UJ4C1wO18JH4Rb4InwDvgeL4VfwOAIQMkJHtBFTxAHxQkKQeCQZESKrkWKkDKlFGpF2pBu5g4iR18gXDA5DwzAwphhnjD8mCsPBZGNWYzZjKjB1mBZMF+YOZhAzhvmBpWLVsSZYJywLG4tNwS7FFmHLsIewzdjL2HvYYexHHA5HxzFx9jh/XBwuDbcCtxm3F9eE68D14YZw43g8XgVvgnfBh+DZ+Fx8EX4P/ij+Av42fhj/mUAmaBGsCL6EeAKfUEAoIxwhnCfcJowQJohyRH2iEzGEyCUuJ24lHiS2E28Rh4kTJHkSk+RCiiSlkdaRykmNpMukx6T3ZDJZh+xIDiPzyGvJ5eTj5KvkQfIXigLFmOJFWUgRUbZQDlM6KA8o76lUqgHVnRpPzaVuodZTL1GfUj/L0GTMZFgyXJk1MpUyLTK3Zd7IEmX1ZT1kF8vmy5bJnpS9JftajihnIOclx5ZbLVcpd1puQG5cniZvKR8inym/Wf6I/DX5Fwp4BQMFHwWuQqHCAYVLCkM0hKZL86JxaOtpB2mXacOKOEWmIksxTbFE8Zhij+KYkoKSjVK00jKlSqVzSmI6Qjegs+gZ9K30E/R++tc5GnM85iTN2TSncc7tOZ+U1ZTdlZOUi5WblO8pf1VhqPiopKtsV2lVeaKKUTVWDVNdqrpP9bLqazVFNWc1jlqx2gm1h+qwurF6uPoK9QPqN9XHNTQ1/DQEGns0Lmm81qRrumumae7UPK85qkXTctXiae3UuqD1kqHE8GBkMMoZXYwxbXVtf22Rdo12j/aEDlMnSqdAp0nniS5J10E3WXenbqfumJ6WXrDeSr0GvYf6RH0H/VT93frd+p8MmAYxBhsMWg1eMJWZLGY+s4H52JBq6GaYbVhreNcIZ+RglG6016jXGDa2NU41rjS+ZQKb2JnwTPaa9M3FznWcy59bO3fAlGLqYZpn2mA6aEY3CzIrMGs1e2OuZx5vvt282/yHha1FhsVBi0eWCpYBlgWW7ZbvrIytOFaVVnetqda+1mus26zf2pjYJNnss7lvS7MNtt1g22n73c7eTmjXaDdqr2efYF9lP+Cg6BDqsNnhqiPW0dNxjeNZxy9Odk65Tiec/nQ2dU53PuL8Yh5zXtK8g/OGXHRc2C41LmJXhmuC635XsZu2G9ut1u2Zu6471/2Q+4iHkUeax1GPN54WnkLPZs9PXk5eq7w6vBFvP+9i7x4fBZ8onwqfp746vim+Db5jfrZ+K/w6/LH+gf7b/QdYGiwOq541FmAfsCqgK5ASGBFYEfgsyDhIGNQeDAcHBO8Ifjxffz5/fmsICGGF7Ah5EsoMzQ49E4YLCw2rDHsebhm+Mrw7ghaxJOJIxMdIz8itkY+iDKNEUZ3RstELo+ujP8V4x5TGiGPNY1fF3ohTjePFtcXj46PjD8WPL/BZsGvB8ELbhUUL+xcxFy1bdG2x6uKMxeeWyC5hLzmZgE2ISTiS8I0dwq5ljyeyEqsSxzhenN2cV1x37k7uaJJLUmnSSLJLcmnyixSXlB0po6luqWWpr3levAre2zT/tOq0T+kh6YfTJRkxGU2ZhMyEzNN8BX46vytLM2tZVp/ARFAkEGc7Ze/KHhMGCg/lQDmLctpyFVFzc1NkKPpJNJjnmleZ93lp9NKTy+SX8ZfdXG68fNPykXzf/F9WYFZwVnSu1F65buXgKo9VNauh1YmrO9forilcM7zWb23dOtK69HW/FVgUlBZ8WB+zvr1Qo3Bt4dBPfj81FMkUCYsGNjhvqN6I2cjb2LPJetOeTT+KucXXSyxKykq+beZsvv6z5c/lP0u2JG/p2Wq3dd823Db+tv7tbtvrSuVL80uHdgTvaNnJ2Fm888OuJbuuldmUVe8m7RbtFpcHlbft0duzbc+3itSKe5WelU1V6lWbqj7t5e69vc99X2O1RnVJ9df9vP33a/xqWmoNassO4A7kHXh+MPpg9y8Ov9QfUj1Ucuj7Yf5hcV14XVe9fX39EfUjWxvgBlHD6NGFR3uPeR9razRtrGmiN5UcB8dFx1/+mvBr/4nAE50nHU42ntI/VdVMay5ugVqWt4y1praK2+La+k4HnO5sd25vPmN25vBZ7bOV55TObT1POl94XnIh/8J4h6Dj9cWUi0OdSzofXYq9dLcrrKvncuDlq1d8r1zq9ui+cNXl6tlrTtdOX3e43nrD7kbLTdubzb/Z/tbcY9fTcsv+VluvY29737y+87fdbl+8433nyl3W3Rv35t/r64/qvz+wcEB8n3v/xYOMB28f5j2ceLT2MfZx8RO5J2VP1Z/W/m70e5PYTnxu0Hvw5rOIZ4+GOEOv/sj549tw4XPq87IRrZH6F1Yvzo76jva+XPBy+JXg1cTror/J/63qjeGbU3+6/3lzLHZs+K3wreTd5vcq7w9/sPnQOR46/vRj5seJT8WfVT7XfXH40v015uvIxNJv+G/l342+t/8I/PFYkimRCNhC9pQVQNAGJycD8O4wANQ4AGi9qH+QmfbEU4KmffwUgf/E0755SqhzaUS7SSvk1QHAcbQZuAMgg15PWqJIdwBbW0vbP5STbG01nYuCOkvsZ4nkvQYA+HYAvgslkom9Esn3g2ixDwDoyJ724pPCoX8ojXhXjveCvnbzteBf9HcIWQN53PJn6wAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAxppVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6dGlmZj0iaHR0cDovL25zLmFkb2JlLmNvbS90aWZmLzEuMC8iCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPHRpZmY6T3JpZW50YXRpb24+MTwvdGlmZjpPcmllbnRhdGlvbj4KICAgICAgICAgPHRpZmY6WVJlc29sdXRpb24+MTQ0PC90aWZmOllSZXNvbHV0aW9uPgogICAgICAgICA8dGlmZjpSZXNvbHV0aW9uVW5pdD4yPC90aWZmOlJlc29sdXRpb25Vbml0PgogICAgICAgICA8dGlmZjpDb21wcmVzc2lvbj4xPC90aWZmOkNvbXByZXNzaW9uPgogICAgICAgICA8dGlmZjpQaG90b21ldHJpY0ludGVycHJldGF0aW9uPjI8L3RpZmY6UGhvdG9tZXRyaWNJbnRlcnByZXRhdGlvbj4KICAgICAgICAgPHRpZmY6WFJlc29sdXRpb24+MTQ0PC90aWZmOlhSZXNvbHV0aW9uPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+NzA2PC9leGlmOlBpeGVsWERpbWVuc2lvbj4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjU1NjwvZXhpZjpQaXhlbFlEaW1lbnNpb24+CiAgICAgIDwvcmRmOkRlc2NyaXB0aW9uPgogICA8L3JkZjpSREY+CjwveDp4bXBtZXRhPgo7wPn1AABAAElEQVR4AezdCZgU1bn4/9cQ7mNuZtj853eHRZFlAFGJA2IgBpBBbgyb7IsmoAIiF0kCyK5RogwIouYiARwEISqIbIoQIzIEiEKiMF4UZBvAyDL3l79sw018/oTrv9+aqbanZ+uluvtU1beeB2emu+rUOZ9Tzrx96tR7rvo6sAkbAggggAACCCCAAAI+E/iWz9pLcxFAAAEEEEAAAQQQsAQIhLkQEEAAAQQQQAABBHwpQCDsy26n0QgggAACCCCAAAIEwlwDCCCAAAIIIIAAAr4UIBD2ZbfTaAQQQAABBBBAAAECYa4BBBBAAAEEEEAAAV8KEAj7sttpNAIIIIAAAggggACBMNcAAggggAACCCCAgC8FCIR92e00GgEEEEAAAQQQQIBAmGsAAQQQQAABBBBAwJcCBMK+7HYajQACCCCAAAIIIEAgzDWAAAIIIIAAAggg4EsBAmFfdjuNRgABBBBAAAEEECAQ5hpAAAEEEEAAAQQQ8KUAgbAvu51GI4AAAggggAACCBAIcw0ggAACCCCAAAII+FKAQNiX3U6jEUAAAQQQQAABBAiEuQYQQAABBBBAAAEEfClAIOzLbqfRCCCAAAIIIIAAAgTCXAMIIIAAAggggAACvhQgEPZlt9NoBBBAAAEE3CBwRc7nTZPbr28kTax/raR/7kG5EkXVrxTkSv/M2I+P4lTs6kIBAmEXdhpVRgABBBBAwB8C1aRW9jh5amDDkuYWSf6cGbKs4KvImn/loCybOF/yL+vu1SVj4DxZMrKFVIvsaPbygQCBsA86mSYigAACCCDgXoHvSedp02VARvXiJlzeLc9M/J0UVDks/KXseWaaPLO3qPi4jP7y1LRsqeVeCGqeAAEC4QSgUiQCCCCAAAIIOChQK1um5PSXjJIiL++dL5OXVjZFQqdUzJOfL8wXazBYGsqAnHHSuRZjwQ72iieKIhD2RDfSCAQQQAABBLwsEOUUifN5MnvaGim0SNLl5tGzZEr297wMRNtiFCAQjhGOwxBAAAEEEEAgmQJlp0jMuvfXsu182ByJKwWybtKv5Y3C4rHg6q3HyrxH2jMlIpld5aJzEQi7qLOoKgIIIIAAAr4WCJsiIYVr5NGcPDkfRPlKCpY+KtPePVn8SvV28sjcn0kTZkQEhfimtACBcGkPfkIAAQQQQAABYwXCp0hclsLVM2V23t8CNQ7MC96zQCbM2V0yL7iBdJ39lNzf5GpjW0PFUi9w1deBLfXVoAYIIIAAAggggECEAud3yZyho2TxPjsjxBBZsrKT/GHI2JIpEZoqbYFsmtOVKRERkvp1NwJhv/Y87UYAAQQQQMDFArpQxqC7ckpyBF8tGRlXS2FhySSJjEBg/M6TZIlwcf8mq+pMjUiWNOdBAAEEEEAAAccEqjX5mTw9qV1gmQzdvvomCCZVmmPGfiiIQNgPvUwbEUAAAQQQ8JzA1dLkgcflkdbpIS1Ll6zpi2QmqdJCTPi2MgEC4cp0eA8BBBBAAAEEXCRQJJ/+fqecCMuo5qIGUNUkCxAIJxmc0yGAAAIIIICAEwJ/k21TH5JZ9hLKJUVWveqcE+emDK8IEAh7pSdpBwIIIIAAAr4R0CWUn5NHV39e0uJa1sNyxT8USf6cGbKs4CvfaNDQ2AUIhGO340gEEEAAAQQQSIHAleNrZUpwCWVNlTZH3np1vGQVPzkncnm3PDPxd1LAFIkU9I67Tkkg7K7+orYIIIAAAgj4W+DKQVk24SnZUrKEsmT0l6emZcs1pbJIBGLhvfNl8tKDgWU22BCoWIBAuGIb3kEAAQQQQAABowR0CeUZ8ow9L7h6loxaMKEkX3Agi8TI/5SFAxuW1JgpEkZ1naGVIRA2tGOoFgIIIIAAAgiECoQvoRxIlTYpRya0uSZkp+9J52nTZUBGyRwJpkiE2PBteQIEwuWp8BoCCCCAAAIImCVwPk9mj1ksn1wurlb11mPl6QdaSLXwWtbKlik5/SWj5HWdIjHhmV1SsuZc+N787HMBAmGfXwA0HwEEEEAAAfMFAqnScmbKG/a84Ort5JG5P5MmZaJgbUk1qZU9Tp4KmSLxycKpMjvvb+Y3kxomXYBAOOnknBABBBBAAAEEIhcIzAvO/bmMDqZKaygDFv+njGhydSVFhE2RkM/ljWnPybbzPDpXCZov3yIQ9mW302gEEEAAAQTcIXCl4Hcyec5uKZ4RoanSpsuUSJZQDpsiIYVr5NGcPKZIuKPbk1ZLAuGkUXMiBBBAAAEEEIhK4PwumTduvuSXzAu2U6XViqiQ8CkSl6Vw9UymSERk55+dCIT909e0FAEEEEAAARcJ6LzgqbJ4X1FxnQPzgqe++quSVGmRNoMpEpFK+XW/q74ObH5tPO1GAAEEEEAAAQQQ8K8AI8L+7XtajgACCCCAAAII+FqAQNjX3U/jEUAAAQQQQAAB/woQCPu372k5AggggAACCCDgawECYV93P41HAAEEEEAAAQT8K0Ag7N++p+UIIIAAAggggICvBQiEfd39NB4BBBBAAAEEEPCvAIGwf/ueliOAAAIIIIAAAr4WIBD2dffTeAQQQAABBBBAwL8CBML+7XtajgACCCCAAAII+FqAQNjX3U/jEUAAAQQQQAAB/woQCPu372k5AggggAACnhC4dOmS6D82BKIVIBCOVoz9EUAAAQQQQMAogSNHjsj3b7pZ8vPzjaoXlTFfgEDY/D6ihggggAACCCBQicCZ02esd9PT0ivZi7cQKCtAIFzWhFcQQAABBBBAwEUCp0+fsmrbNLOpi2pNVU0QIBA2oReoAwIIIIAAAgjELPDZgQPSuEnjmI/nQP8KEAj7t+9pOQIIIIAAAp4QuHDhojRseL0n2kIjkitAIJxcb86GAAIIIIAAAg4LbMvLk5Y33uhwqRTnBwECYT/0Mm1EAAEEEEDAowJ22rQaNXhQzqNdnNBmfTuhpVM4AggggAACCCBQIqBBq6Y6C90044P9sFvo621uvTX0R+v7rKysMq/Z5ZW3f5mdeQGBMAEC4TAQfkQAAQQQQACB2AWOHjkqZ86ckUOHDoo+xKbzdz/+OF/OnT0Xe6HlHNk5O9t69Z///Kf1NX/PXutrZmampKWllXMELyFQVuCqrwNb2Zd5BQEEEEAAAQQQqFxAR3jz9+bLhx9+KAf27xedqxu61a5TW265JUuuvfZaqd+gvvVW8+YtJC39m0BVc/+Gpz0rb+T4UtElK7jWQi5eLLLOp9+Hn1NfCz1vixtukGbNmwkBssqwhQsQCIeL8DMCCCCAAAIIVChQWFgo2/+4Xba8+26pILR1m9ZyU2B1NzvwLG8aQ4WFxvHGhHHjZN++fTLnmWesUvZ89JGcOnlKvvjii1L10zc1xVqrVq3khpYtRadSJKuOcTSPQxMsQCCcYGCKRwABBBBAwO0COkK7Y/sOWbb0JdlbMgVBg8qfdOsubdu2lazWWSmbjjDigeEW75JA3crbNHA/cvhIcKrG9u3bS03T0AC+/Q9vT3k7yqs7ryVegEA48cacAQEEEEAAAVcKaBC5eOEi2bjxLSt4tIPfXr16lZnOkKoGNrm+kYwZO1bGTxgfcRXs4FindOz64P1gcK8F2IFx5+zOjBhHLOreHQmE3dt31BwBBBBAAIGECOgI8IuLX5QF8+db5ffu01t69+krHTp2SMj5Yi1U6/n9wHSMqdOnyYiRI2MtRrQce65zaGCsc407deokXe7sKt26d4u5fA40V4BA2Ny+oWYIIIAAAggkXUCzPox+aJQcKzgWCH57y8TJkyUjIyPp9YjkhPn5+dI/EKCvWb/O0dFbeyrIh3/5S3A0fP6CBQTDkXSKy/YhEHZZh1FdBBBAAAEEEiWgAeAdHTta0yDcEPht3rRZxo4ZI3/YsiWhUzU04ObBukRddaktlzzCqfXn7AgggAACCBgjMG/uM1YQ/PKKFcZNg6gISacvhKdfq2jfWF8nCI5VzvzjGBE2v4+oIQIIIIAAAgkXsOfbDh02TB6f8UTCz8cJEDBB4FsmVII6IIAAAggggEBqBeylinv1vju1FeHsCCRRgEA4idicCgEEEEAAAdMFdAU3NgT8IkAg7Jeepp0IIIAAAghUIqDzYHW+7fKXX65kL95CwFsCBMLe6k9agwACCCCAQMwCD40ebS1LvCQ3N+YyOBABNwnwsJybeou6IoAAAgggkGABXbJ4W15e1Ku1JbhaFI9AQgQYEU4IK4UigAACCCDgToHn//M31kIauqqcBsW6HDEbAl4VYETYqz1LuxBAAAEEEIhDQKdHzJqZY80bfu7537gmr3AcTeZQHwoQCPuw02kyAggggAACkQiELrfcOTtbnsqZaexyy5G0h30QCBcgEA4X4WcEEEAAAQQQCAroQhurVq60Rof1xanTp8ngIUMkLS0tuA/fIOBWAQJht/Yc9UYAAQQQQCCJAjpX+NFp060H6TTNmmaYGDFyZBJrwKkQcF6AQNh5U0pEAAEEEEDAswL5+fky6ZFH5FjBMWncpLEMGjzY+BFiDeIzMjI82yc0LHYBAuHY7TgSAQQQQAAB3wps3rRZnnt2nhUQ6wjxPff+NPDvHuMCTg3c+/fpK63btJb7A1kwunXv5ts+o+FlBQiEy5rwCgIIIIAAAghEKKCB5oL5L1hTJvQQfaiub79+RgWcmgFj0cKFcu7sOWsUe9z4CUbVL0JqdkuAAIFwAlApEgEEEEAAAb8J6PSD1159LfDvFSvg1FHinj17SXaXLsakXgsdxdZpHQTEfrtKy7aXQLisCa8ggAACCCCAQBwCO3fslA3r1wX+bbBKsYPitrfdJh07dUx5xonwgNgN85zj6A4OrUSAQLgSHN5CAAEEEEAAgdgFNPXaju07ZOt7W2T79u3WSLGWpvN12//wdmnbtq1ktc5KWWAcGhDbmTBIDRd7f7vxSAJhN/YadUYAAQQQQMCFAjqfeFveNtn1wfuyd8/eYAs0ML7ppptFR4ybNWsmTTObBt9Lxjc6gr385ZdLpYYjIE6GfOrPQSCc+j6gBggggAACCPhOQEeL8/fmy6FDB2X3rt3Bh+1sCA2Or7vuOrmhZUtp3ryF1K1bN+EBcuiDfyZnwrCN+Bq/AIFw/IaUgEBQQH+JvrJihfx06FDJysoKvs43CCCAAAJVC+iSzocPH5aDBw/Kgf375eOP84PTKeyjNUC95ZYsqVmzhhUk6+ttbr3Vejs9Ld2RYDk0INaChw4bJqNGP2Rcajir0fwnLgEC4bj4OBiB0gL6y3Pk8OHWL25NITRm7MMExKWJ+AkBBBCISkBHjo8cOSJnTp+R06dPyWcHDsiFCxfl889PWDmMKytMM0M0bHh9mV1Cg+jwN+3y9fULFy6IZsM4feqUtdvLgYGODh07hB/Czy4WIBB2cedRdTMF9Jf2qpUrgzkrCYjN7CdqhQAC3hCwA2VtjR0s2y0LDWrt1/TrhQvnS81RDn0vNHjWQFiD8KKLF+W6htdJ7pKXHBlxDj0f36dWgEA4tf6c3cMCBMQe7lyahgACnhYInRpBNglPd7UQCHu7f2mdAQIExAZ0AlVAAAHPCGiQmqhnMAiAPXOZRNwQAuGIqdgRgfgECIjj8+NoBBBAQH+Pfj+QZm3q9GkyYuRIx0D0Ib3Zs2aRPs0xUfcURCDsnr6iph4RICD2SEfSDAQQSLqAjtj279NXnHpoTR+EW7xwkaxYvtxqy5ixY+XBUQ+mbIGPpINyQvk2BgggkFyBtLQ0ayRDk7XbD9XpL3YeqktuP3A2BBBwn4A+DKdbWnpaXJUPD4BJjxYXp6sPZkTY1d1H5b0gwAixF3qRNiCAQDIEluTmyqyZOVJw4nhMpyMAjonN0wclZUR4xAPDy6wY42lVGodAHALb8vKs/1/e372L5O1xOHIoAgh4T0DToWkWh2i38AGH3n16y8TJk/kdGy2kB/dPSiDct18/ade+nQf5aBICzgicOnlK/vSnPwWSwxfId77zHRkwcCC/oJ2hpRQEEPCQgC6koavKRbvd0bEjCx1Fi+aT/ZMSCHfr3s0nnDQTgegEwlP16JPQOndY5xGzIYAAAgiUFtAll3v27FX6xQh+mjhpsjRr3ixhadciqAK7GCqQlEDY0LZTLQRSJkAAnDJ6TowAAi4WOHf2nNRvUD/qFgwaPCjqYzjAHwIEwv7oZ1ppiAABsCEdQTUQQMB1Avr7U7fmzVu4ru5U2FwBAmFz+4aaeUiAANhDnUlTEEAgJQKXii5Z5403dVpKKs9JjRUgEDa2a6iYFwQIgL3Qi7QBAQRMEDh06KBVjUQtr2xCG6lD8gUIhJNvzhl9IEAA7INOpokIIJBUAc2uE0vqtKRWkpO5ToBA2HVdRoVNFtBk7Y9Omx5cr54sECb3FnVDAAE3CXzxxRcxpU5zUxupa/IFCISTb84ZPSywd89e0fQ+BMAe7mSahgACKRGINXVaSirLSV0jQCDsmq6iom4Q0JzZ5M12Q09RRwQQcJtArKnT3NZO6ptcgW8l93ScDQEEEEAAAQQQiE6A1GnRebF35AKMCEduxZ4IIIAAAg4KXDm+TVa8d1j+tvsVWbz1ZKmSq7caKON6tpDv3dpL+mZdU+o9fvCfAKnT/NfnyWrxVV8HtmSdjPMggAACCCCgAfCyhc/LM6v3yeUqOapLRpfhMuHhEQTEVVp5d4clubkya2aOFJw47t1G0rKUCDA1IiXsnBQBBBDwo8BXcmLLDOn37w/IrIiCYDW6LIVbF8nEPr1lZO4eOe9HNtospE7jIkiUAFMjEiVLuQgggAACIQKBIHjtRLl3wttSGHxVR3vvl/tvbyd3Duss11ez3/hS8te+JX/58wZ5Lhgwn5S8mffLfWcXy8uT20ste1e++kKA1Gm+6OaUNJKpESlh56QIIICAvwSuFOTKoLtyJN+eC5HRVaYunCUjKp3/e0XO578hsx/PkTf2FZWANZCu816WBf2aSDBu9helEa21H16LpjJ169aVjIyMaA4J7ntr69bSs2cveXzGE8HX+AYBJwQYEXZCkTIQQAABBCoWuHJQlk2cHxIE95C5K+dK30ZXV3yM9U41qZU1WGavaCh1ho6SxVYwfFK2zH1JdnR5UjrXIhSuAjCit48eOSpFl4rkzOkzcvr0KeuY3bt2B4/V/L2auiwRW+fs7GCxLW+8UWrUSJf09BrSrHkz63V7OWVSpwWZ+MZhAUaEHQalOAQQQACBUIHAqG7eY9L9gZUlUyIayoClgVHe7O+F7lTl96VHlKtLg9ErJW9yG0aFq5Qr3kGD3TNnzsihQwet+bY61aCyALdxk8bSsOH11sHXXnut1G9Qv9SZmjdvIWnpaaVeq+qHw4cOS1HRxeBuFy8WyYH9+4M/b8vLC35f3jftf9he7ujcWerVqy9169WVzMxMSUuLrg7llctr/hYgEPZ3/9N6BBBAIMECp2Xd8O4ycWvxY27Vu8yT91/qK9EnRPu75D/dR/ovPFxc3wYPyZrtkyWLQeFS/Xfp0iU5cuSI7PnoI/nswAH561//KrriZehWu05ta6liO8C1A8v0tHRpmtk0dNeUfK9L1WvQrinTNHD/9JNPZeNbb0m9+vXk9KnTpepkB+zt2rcTDc51+oUJbShVSX4wWoBA2OjuoXIIIICAywW+XCcj202QPGtucEZgNPj3gdHg2B51u5L/tGT3WSTFGYebyaj162VS1r+6HCi+6utcXR1p/cufd8u+ffvkWMGxYIF2wKtBoh3s2lMNgju54Jvw1Gmho9vlBfuh7dbgOKt1FiPHLujnVFWROcKpkue8CCCAgA8Ervz1iBy2H5CrfrPc9v30mFtdrdWd0r3BS7L4pBb4V/ngo0BInFU8lzTmQl12oAa+Otqrc3hDpxJo8NepUycZNHiwtLn1Vk9NGwhPnaYjvvqvQ8cOpXrP/lBw8LPP5NNPP7HyDts7tG7TWm666WZpe9ttot/H+tCeXR5fvSNAIOydvqQlCCCAgGECgfnBxwrkv+1a/VsTaRTPA27VAre9m39X5KROs/gqMAXgVCDLcDOpbpfvwa86+rlnzx7Z8u67pQJfDeaGDhvmi8Au0tRpOtodOuIdOk1EPzisWL7c+qeXifq1/+Ht0rZt2zIBtQcvI5pUiQCBcCU4vIUAAgggEI/A/0rR2fPfrB5Xp47UjmtO779K7WuqyjQRT33NOHbnjp2St3Wr/OlPO4NTHXQurAa+2V26+O5Wvz7Up6nTot30QTo7OB4xcqR1uD2i/od33pEF8+cHi+wdWLDlth+0k053dGK0OKjij28IhP3Rz7QSAQQQQMBQAR253LF9h2x9b4tsWL8hWEsNzkaMfND3wZmTqdNCA2N1z9+bb33o2LjxraC9jhb3HzDQ9+7BC9Hj3xAIe7yDaR4CCCCAgHkC5QW/Os/Xr6O+FfWQjuDqpg+9Ob3piLHOM9Z/ulCHTkN5K5Cd4vebN8m0KVOs0xEUO61uXnkEwub1CTVCAAEEPCLwLUmvU8uaw2s9L3f2rJy7IiFLKUfbzL/LuS+/Kjmouvw/19SQb0VbRIr3t6c96HxV3UKD3/CHv1JcVSNOrynUdIs2Z3EsldcH8MZPGG/9s+dmL8l9sVRQfP8Dw6Vjp45koYgF2NBjCIQN7RiqhQACCLhfILAyXOMm8m+ypTjl2X8XyPHzVyTrmhgnCl85I0cP/U8Jy3elWdO6rlhQQ/Pivvbqa9ZIo53ezB75Jfit/CrXPMK6hT4EV/kRzrxrZ6YYNHhQqZHisWPGWCeg/5xxNqEU8gib0AvUAQEEEPCqQKk8wrUke94mye1XL6bWui2P8OZNm2Xd2rXBbA+6nHDffv0YUYyi9+2H2+yH3aI4NCG7an3e2vBmMPuEPsSoKesGDxnCKHFCxBNfKIFw4o05AwIIIOBjgShXlrtSJOf/51+lVo3wUWN3rCyno79vb9woixYuFH3IS6c+3HPvTwP/7iEbgYf+L7DneC9b+lJw5T4dJe7V++6kj157iDUlTSEQTgk7J0UAAQT8IhDIJZz3mHR/YKUUWk1uGFhd7o3A6nLfKxfAHvX971YD5ZFfPiT3Zzeypj9cKciVQXflSL412Ti+keVyTxznizqn9NVXXgmOFNqjv926d4uzZA43XSC87/UBO51LTN+b3nPF9SMQdkc/UUsEEEDAvQJXDsqSQDqqWXuLituQ0UPmrpwrfRuF5wQOG/UNPGaX0WWivPDoDbLlF/8hi/cVH1+99TTZ9MZIaRI+aJwCIb1VvmD+C8HpDzoqeO9Pf2qtfJaC6nDKFAroKPGqlSvl9VWrrPzPOm1C099179GdaRMp7JeqTk0gXJUQ7yOAAAIIxC1QekQ3UFxGV5m6cJaMyLqmdNlXjsu25avktReXSV6hvTZzyC7V28nUd5bJiCbhQXTIPlV8a8/zfG/LFjl9+nRw7/T0dOlyZxfp3advlauN6fzf556dZwU8Ov3hodGjpUfPnkx/CGr6+5vyrg/mEZt5TRAIm9kv1AoBBBDwmED4FAltno743i/3395O7hzWOSSt2peSv3aJ/HbuS6WD4epZMmpVrkxqExY8Ryil83enTJosO3fsqPKIm26+WeY9+2yZkd3QAIcHpapk9P0OoXcM7A9MBMRmXRYEwmb1B7VBAAEEPCwQCIb3PC/3DX5BPilnsDeShldvNUSenDFBBoSPJFdxsM7j7N+3rxQVlUzPqGL/q666Sr7++muZv2CBNdczPAAeN34Cc0CrMOTtbwQIiL+xMO07AmHTeoT6IIAAAl4XOJ8vb+Q8IY+t3iexxcPpcvPAafL4tAGSVavqicIaBPfr00d0DmcsW7369eT0qdOiI8AEwLEIcowtQEBsS5jzlUDYnL6gJggggIC/BAIB8bo3/iJHd78ii7eeLN326q1kwIQe0vRfmlrTJq7962b51S+myKqSB+asnSOcL3x3z16y/9NPrRHe0ieJ7CcdHf7VE08Elj8eGtkB7IVAFQLhAfGvn3yKOwxVmCXqbQLhRMlSLgIIIICAwwJfyYm838mi5+fLG/u+koyBC2TTnK5Sq5Kz6JQGezWwSnar8q2p06cFMgCMrHI/dkAgGgFdcvvXM54IZpmY88wz5CGOBtCBfQmEHUCkCAQQQACB5ApcOb5L3pcs6VgmBVvpeuho8KeffFL6xRh+SktLk//6NP5yYjg1h/hAQD+w/eqxR61FWDQH9VM5M8lAkqR+JxBOEjSnQQABBBBIroDOCf7+TTc7dtI169cxWueYJgWFC9h5iGfNzLHe0rsQZJgIV3L+5285XyQlIoAAAgggkHqBI0eOOFqJw4cOO1oehSEQKqB3HXT6zfu7d4mOCmtA3OfuuwPp/naG7sb3DgsQCDsMSnEIIIAAAt4UKCq66M2G0SqjBDIyMmTJ0pfk5RUrrHrdN3SojAgs2ax5sNmcFyAQdt6UEhFAAAEEEEAAgbgEOnTsIOvffFN0isS2vDzp0a1bYPnm1+Mqk4PLChAIlzXhFQQQQAABBMoI1KtXv8xrvIBAIgXs6RJ/CCwH3qhRI5k2ZYo1Oqy5sdmcESAQdsaRUhBAAAEEDBPIyspytEbNmjVztDwKQyBSgaaZTeWNtWuDo8M/7tqV0eFI8arYj0C4CiDeRgABBBBwr0CLG1o4UvnrGl4nGoywIZBKAX2YTkeHW7dpHRwdZu5wfD1CIByfH0cjgAACCBgooLeOB/TrJwc/O+hI7SZOmuxIORSCQLwC4aPDOndY8xCzxSZAIBybG0chgAACCBgqoA8UDR40UI4fPy45s2fL4HuGxFXTDh07svxtXIIcnAgBe3RY5w7r6okTxo0TzUXMFp0AC2pE58XeCCCAAAKGCmgQ8Phjj8mG9RusW8ezZj9tTWfQ14f+9GfyXx9/HHXNa9SoITs/eF/0oSU2BEwU0Ov7xcUvyoL586Vxk8aycNFipvFE0VGMCEeBxa4IIIAAAmYK6FQIXXxAg+AxY8daDxbZc3o1iF3xyu9ER3aj2W66+Wb5/bt/IAiOBo19ky6g1/f4CeOtvMPnzp0THqSLrgsYEY7Oi70RQAABBAwT0PmRemu4dp3a8tzzvwkEvB0qrKFOm5g1c6YUFRVVuI8GFmN/8XNrla8Kd+INBAwU0Afn9P+FvXv2ytBhw2TCxEf4IFdFPxEIVwHE2wgggAACZgroLeF5c5+RFcuXW1Mh5i9YILoqVySbLlv74YcfyoH9++XChQvy3e9+V1p9//vSokUL6dipI8FDJIjsY6zAjMefCP5/YU8RMrayKa4YgXCKO4DTI4AAAghEL6BB8P2BES9GvqK34wh/COidkl899qjV2KrulPhDpPxWMke4fBdeRQABBBAwVEDnA98RmO+rQbBmhXh8xhOM4BraV9FWS/tWRzPJjRutXNn9u3XvJqteXy21a9eW+4YOZQGOskTWKwTCFcDwMgIIIICAeQI6yqUPA+m2Zv06GTR4kHmVpEYxCxRdKrJu6Z85cybmMjjwGwF9YHT9m28GF+DQDxlspQUIhEt78BMCCCCAgKECS3JzrQeBdFWttzdvFqeXUDa02b6q1p6PPrLam5mZ6at2J7Kx+vCnLs+sD8/pfHpdaEanFrEVCxAIcyUg4KCAjlbd2rq16B9sftE4CEtRvhfQkaxZM3Okc3a2LAv8MY/0oTjfw7kM4OLF4mweGryxOSugU4h0KpFOKdL59ToNhU2EQJirAAEHBXSk6pZbsqw/2DqHkYDYQVyK8qWAfqDUESwdydIRrSVLX2I+sIevBM3ioR922BIjoFOJNLuKrrqoqy8SDBMIJ+ZKo1TfCugolf6h1rmLBMS+vQxouEMCoZkh7IfiHCqaYgwV+PzzE1KzZg1Da+eNatkP0WlrNBjWO5l+3hgR9nPv0/aECejcRQLihPFSsA8EdKRKV4rT27g6gsVDcT7o9EATjxUckxtatvRHY1PYSn2Izs4ooQtw+DkYJhBO4YXIqb0vQEDs/T6mhc4LaBCsI1W6XOzLK1aIjmCxeV/Avk1fr1597zfWgBaGZpTwczBMIGzAxUgVvC9AQOz9PqaFzgjYQbCWpiNWlS2X7MwZKcUUAU2dplvdenVNqZLn66EPJerDp/p8iwbD+lyL3zYCYb/1OO1NqQABcUr5ObnhAuFBsI5YsflHgNRpqenr0GBYM7P4LdcwgXBqrjvO6nMBAmKfXwA0v4wAQXAZEt+9QOq01HW5HQzbuYb9FAxf9XVgSzS9TsI+ffpUok9D+Qi4VuDUyVPypz/9KfCgSIF85zvfkQEDB1rLxrq2QVQcgSgECIKjwPLwriMeGG61Th80ZkudgAbBdrpCzT3s9e3byWjgusCKJtvy8pJxKs6BgOsF/vGPf1i/hEaNfohFA1zfmzSgKgGC4KqE/PO+pk5r1aqVfxpsaEvt4FeDYd3snw2tbtzVSkogzKe7uPuJAjwsUFhYKIsXLrKCX22mJpMfM/ZhgmAP9zlNKxYgCOZKCBXQ1GmDBg8OfYnvUyRgB78aDKfXqCHjJ4xPUU0Sf9qkBMKJbwZnQMB9AhUFwDp/mA0BrwsQBHu9h6Nrn14PupE6LTq3RO6twfAXX3whC+bPlxYtWng2jSGBcCKvIspGoBwBAuByUHjJVwIEwb7q7ogaS+q0iJiSvtPz//kbuT+wtLmmVhNZ4MlgmEA46ZcVJ/SrAAGwX3uedocK6LLJox8aZb2keYJJkRaq49/vSZ1mZt/b2SS8HAwTCJt57VErDwkQAHuoM2lKXAIaBOsfVJ0LqivGEQTHxempg0mdZm53hgfDzZpt8dT/u0lJn2Zu91IzBBInQACcOFtKdqfAgH79ZO+evTJ/gTdvsbqzV8yoNanTzOiHymqhf9N6dCte7txLd3NYUKOyXuc9BGIQ0F8Wmofx9nbtrUwQmgVizfp1otlTeBAuBlAO8YSA/j+hQXDO7NmenGfoiU5KYSM0dVrNmjVSWANOXZVARkaGtey57jd40EDROzxe2AiEvdCLtMEYgZ07dhIAG9MbVMQUgSW5ucEE/YMGDzKlWtTDIAGdLnNDy5YG1YiqlCeg05mee/43cu7sOWuakxeCYQLh8nqa1xCIUSAtPU169+nNCHCMfhzmPQFdWXTWzBwrP7adm9R7raRF8QiQOi0eveQf26FjB2t6k97hefyxx5JfAYfPyMNyDoNSnL8FdOoD0x/8fQ3Q+m8ENMDRtEut27QWTcPEhkB5AqROK0/F7Ne6de8mBw+OtXIM129wrasX3CAQNvtao3YIIICAKwX0lqnOI6xdp7Y1eqRPnrMhUJ4AqdPKUzH/NV1t7tRJ9y+4wdQI8681aogAAgi4TkDTpOk8wtyXXmK5cNf1XnIrTOq05Ho7ebYZTz5p3fH51WOPij3Fxcnyk1EWgXAylDkHAggg4COB0AwRTBXyUcfH2NQD+/dbc8hjPJzDUiigd3pmzX7aqoEulOPGh+cIhFN4AXFqBBBAwGsC+nDciuXLZWhgRJgMEV7r3cS0h9RpiXFNVql2JgnN/PHLn/8iWad17DwEwo5RUhACCCDgbwG9Naq3SPXhuAkTH/E3Bq2PWIDUaRFTGbujZpKYOn2abMvLE02X6KaNQNhNvUVdEUAAAUMF9Jao3hrVTW+V8nCcoR1lWLXseaX16tU3rGZUJ1qBESNHWlNcNF1ifn5+tIenbH8C4ZTRc2IEEEDAOwKaT1RH9jTZvt4qZUMgEgFSp0Wi5J59NE2iZooZOXy4a+YLEwi75/qipggggICRAjoveMP6DTJm7FjRW6RsCEQqQOq0SKXcsZ/eCdJMMZoxxi3zhQmE3XFtUUsEEEDASIHQecEPjnrQyDpSKXMFSJ1mbt/EWjPNFGPPF3591euxFpO04wiEk0bNiRBAAAHvCUydMtlqFPOCvde3yWgRqdOSoZz8c+h8YX1odtqUKcbnF77q68CWfCLOiAACCCDgdgF9OlwfjMmZPZtUaW7vTOqPgMMChYWF0qNbN2nUqJG8sXatw6U7Vxwjws5ZUhICCCDgGwF9KlyD4M7Z2QTBvul1GopA5AIZGRkycdJk2btnrzw779nID0zynowIJxmc0yGAAAJuF9BUaX3uvlvOnTsnb2/ezBLKbu9Q6o9AAgUmjBtnPUy7Zv06MXGlSUaEE9j5FI0AAgh4UeDFxS8GU6XpqA8bAgggUJHAjCeftFKqTXrkESNTqhEIV9RzvI4AAgggUEZAp0QsmD9fevfpTaq0Mjq8gAAC4QKaUk3zi2uecf0QbdrG1AjTeoT6IIAAAgYLDOjXT44fP86UCIP7iKohYKLAiAeGW0sw/2HLFqMW3WFE2MSrhTohgAACBgpolgh98EUfgGFKhIEdRJUQMFjgqZyZ1hQJO+WiKVUlEDalJ6gHAgggYLCApkIiS4TBHUTVEDBcIDSLhEkLbTA1wvALh+ohgAACJgiYelvTBBvqgAACkQuYNr2KEeHI+449EUAAAV8K7Nyx05rbp8umNs1s6ksDGo0AAs4I6CqU586ek7lPP+1MgXGWQiAcJyCHI4AAAl4W0JzBv57xhDRu0lgGDxni5abSNgQQSIKAfpgeM3aslVtYs9CkeiMQTnUPcH4EEEDAYIFVK1daaY9+9fgTommQ2BBAAIF4BR4c9aD14FzOU0/FW1TcxxMIx01IAQgggIA3BfQBuUULF1rLKHfo2MGbjaRVCCCQdAH9UG0vv5zqB+d4WC7p3c8JEUAAAXcIzAiMAq9YvlxMy/vpDj1qiQACVQl07dLFWqr9jzt2pOyOEyPCVfUS7yOAAAI+FNC5exoEDx02jAfkfNj/NBmBZAjMeeYZ68E5nYKVqo1AOFXynBcBBBAwWGDB/BesOXyjRj9kcC2pGgIIuFkgKyvLmnqlOcp1KlYqNgLhVKhzTgQQQMBgAR0N3paXJw+NHs0Kcgb3E1VDwAsCU6ZOtZqxeOGilDSHQDgl7JwUAQQQMFdAn+SuXac26dLM7SJqhoBnBDSdmk7B0qlYqRgVJhD2zKVEQxBAAIH4BTZv2ix79+y1RoNJlxa/JyUggEDVAvYUrFSMCpM1our+YQ8EEEDANwL6FLdu6998M2VPcfsGm4YigEBQwM5S8/7uXUmdksWIcLAL+AYBBBDwt4COBh8rOCbjxk8gCPb3pUDrEUi6QKpGhRkRTnpXc0IEEEDATAF7NHjL1q1mVpBaIYCApwVSMSrMiLCnLykahwACCEQmEDoaHNkR7IUAAgg4K5CKUWECYWf7kNIQQAABVwosW/qSlSmiY6eOrqw/lUYAAfcLZGRkJD2DBIGw+68bWoAAAgjEJaB5g8kUERchByOAgEMCyR4VJhB2qOMoBgEEEHCrgL2K3OAhQ9zaBOrtEoHXV70uTa5vlJJ8sS4h8n01kz0qTCDs+0sOAAQQ8LPA0SNHrVXk7rn3p2SK8POFkKS2FxVdtM6kwQ4bAhUJ9Op9t/XW2xs3VrSLY68TCDtGSUEIIICA+wRefeUVq9L33HuP+ypPjV0nsHvXbmndprXr6k2FkyuQlZUlnbOzZdHChXLp0qWEnpxAOKG8FI4AAgiYK6B/YHRZU13elBE6c/vJSzW7cOG81KxZy0tNoi0JEujbr5+cO3tOdmzfkaAzFBdLIJxQXgpHAAEEzBVYtXKlVTn7NqS5NaVmXhHQhzLbtW/nlebQjgQKdOveTRo3aSzPPTsvgWcRIRBOKC+FI4AAAuYKvL5qlXWbWm9DsiGQaIHCwkLrFOnpNRJ9Ksr3iMCIkQ9aq11qZptEbQTCiZKlXAQQQMBggZ07dlp/YO5/YLjBtaRqXhI4c+aM1ZxmzZt5qVm0JYEC3Xt0t0p/a8ObCTsLgXDCaCkYAQQQMFdgw/p1LKBhbvd4smaHDx222lW3bl1Pto9GOS+QlpYWXGAjUQ/NEQg732+UiAACCBgtoLeoN6zfIKRMM7qbPFc5Uqd5rkuT0iD7GYZNb29KyPkIhBPCSqEIIICAuQJ2bs5evXqZW0lq5jkBUqd5rkuT0iB9hkEfmluS+2JCzkcgnBBWCvWrgK6adGvr1oH/YXMTnvvQr8a0O34B+yG5pplN4y+MEhCIUIDUaRFCsVsZAfuhOV0AyOmNQNhpUcrztUCnOzrJLbdkyayZOXJHx44ExL6+GsxsvD59fazgmPCQnJn94+VakTrNy72b2Lbp31bd7AWAnDwbgbCTmpTlewFdlGDJ0pdkTeBBJAJi318ORgLYT1937NTRyPpRKW8KkDrNm/2arFbp39befXrLxo1vOX5KAmHHSSkQARGd00RAzJVgooD+IdE/KPo0NhsCyRIgdVqypL17ni53drVWmtPUj05uBMJOalIWAmECBMRhIPyYUoHNmzZbf0h69+mb0npwcv8JkDrNf33udIt1pbnadWoHMt6sc7RoAmFHOSkMgfIFCIjLd+HV5ApsfW+L9YekQ8cOyT0xZ/O9AKnTfH8JOALQs2cvK/WjkzmFCYQd6RoKQSAyAQLiyJzYy3kB/cOhuYP1DwkbAskWIHVassW9eb7sLl2shu3YvsOxBhIIO0ZJQQhELkBAHLkVezojYP/hsP+QOFMqpSAQmQCp0yJzYq/KBfRulk6P0LtbTm1XfR3YnCqsonKenfesHNi/v6K3eR0B3wtcuHBBThw/LmfPnpVvV/+29OjRU+Y996zvXQBwTmDG409YT1x/tHevc4VSEgIRCjS5vpFMnT5NRowcGeER7IZA+QL6u2zF8uVScOJ4+TtE+SojwlGCsTsCiRCoWbOmtGjRQtJr1JB/Xv5n4Bb2erHTDSXifJTpPwHNFsG0CP/1uwkttn+XpafXMKE61MHlAvZdLaeyR3w7GR7jJ4xPxmk4BwKuFNA/EosXLrI+4WoDOmdny5ixD4vmTWRDwAkB/YNx7uw5aXvbbU4URxkIRCVA6rSouNi5CoGs1lnWHnlbt4oTD/4mJRCuok28jYAvBSoKgHX+MBsCTgp8+OGHVnEsouGkKmVFKkDqtEil2C8SAc2Bbi+u8fiMJyI5pNJ9CIQr5eFNBJwXIAB23pQSKxf4/eZN1p0GFtGo3Il3EyNA6rTEuPq51Nt+0M7KgnP0yFFpmtk0LgoC4bj4OBiByAUIgCO3Yk/nBPS6O1ZwLPCQ0oPOFUpJCEQhQOq0KLDYNSKBTnd0svb74x+3EQhHJMZOCKRQgAA4hficWrb/cbul0KZNGzQQSIkAqdNSwu7pk+ozNI2bNJY/vPNO3JlIGBH29KVC41IpQACcSn3ObQv85c+7rT8Y8d4+tMvjKwLRCuzds9dKnRbtceyPQGUCP+nWXRbMny+6WFA8074IhCtT5j0EYhAgAI4BjUMSJqCryQ0dNixh5VMwApUJ6O9D3UidVpkS78Ui0LZtW+uw/L35cWWPIBCORZ9jEKhAQNNU3Td0qPWunQaNLBAVYPFywgXy8/Otc5A2LeHUnKACAVKnVQDDy3EL2GnUNCtOPGnUCITj7goKQOAbgbT0NGv0rVfvu4UA+BsXvkuNwJ6PPrJO3LpN69RUgLP6XsBOnZaelu57CwCcFdDpEPq7bdcH74vEsV4FgbCz/UJpPhfQ4JcA2OcXgUHN16f19YESFmcxqFN8VhU7dRpz1H3W8Ulq7o/vuktmzcyJa54wSywnqbM4DQIIIJBsgW15efKjH3VI9mk5HwJBAfvDWPAFvkHAQYHmzVtYpek84Vg3AuFY5TgOAQQQMFhAE83rxvxggzvJB1XT1GkNG17vg5bSxFQI2POEDx06GPPpCYRjpuNABBBAwFyBPXv2WJVr1qyZuZWkZp4X0FvXffv183w7aWBqBOx5wnrnIdaNOcKxynEcAgggYLDAwc8+k9p1ase96pLBTaRqLhAYMXKkC2pJFd0scNNNN8uK5ctjbgIjwjHTcSACCCBgrsCnn34it9ySZW4FqRkCCCDggIA9/cueDhZtkQTC0YqxPwIIIOACAV3Nq137di6oKVVEAAEEYhewp38dPnw4pkIIhGNi4yAEEEDAXAF7IQ37iWpza0rNEEAAgfgE7NR8Bw/G9sAcgXB8/hyNAAIIGCdgL2KQ2SzTuLpRIQQQQMBpAV3J9cD+/TEVSyAcExsHIYAAAuYK2A/KsZCGuX1EzRBAwDmBa6+9VjRveiwbgXAsahyDAAIIGCzwxRdf8KCcwf1D1RBAwFmBFjfcYBVYWFgYdcEEwlGTcQACCCBgtoCOjLS88UazK0ntEEAAAYcEmjUvzpd+5syZqEskEI6ajAMQQAABcwXsEZH69eubW0lqhgACCDgokJlZ/DzEno8+irpUAuGoyTgAAQQQMFfAHhGxR0jMrSk1QwABBJwR0BXmdAGhUydPRV0ggXDUZByAAAIImCtgj4jYIyTm1pSaIYAAAs4J6AJC+nxEtBuBcLRi7I8AAggYLHDxYpFVOx0hYUMAAQT8IhBr5ggCYb9cIbQTAQR8IaC5NDWnJhsCCCDgJ4H6DWJ7LoJA2E9XCW1FAAHPC3z++QnPt5EGIoAAAuEC9kqa9sqa4e9X9DOBcEUyvI4AAgi4UOBYwTFp176dC2tOlRFAAIHYBdLSY5sORiAcuzlHIoAAAkYJ2KnTjKoUlUEAAQSSIGA/IGw/MBzpKQmEI5ViPwQQQMBwATt1WptbbzW8plQPAQQQcFYg1geEv+1sNSgNAQQQ8I/A5bzJcssDq+WrKJpcvdVAGdfzZml2Z3/p3OjqKI5kVwQQSKnA8Vzp3TlHPomrEhkyYOnvZXZ2rbhKSd7Bh2VJr7tl1j79LWd+3Rs3aSy7d+2WESNHRkzEiHDEVOyIAAIIxC9wed9qmTPzMRnR+TbpPW2znLgSf5l2CfYtQfsWof06XxFAAIGKBb6U/NXTpHffXDlR8U6ueKdhw+ujrieBcNRkHIAAAgg4IVAkn7z2S7l36hY570RxIWXEeoswpAi+RQABPwic3yVzenWW/pNWyif/9EaDo82cw9QIb/Q7rUAAgVQLtJomW98aKddXWo/AyMvaJfLbuS9JXuHlwJ6XpXD1M/LikNtlUta/VnpkJG/GsrxoJOWyDwIIhAlE9P972DEm/njuU/lgX/EiPCZWL9o6acacbXl5UR3GiHBUXOyMAAIIxCNwjWT1myyLVj4lXTOqlxR0WJa+8I58GU+xJcfq8qIspuEAJEUggIBvBAiEfdPVNBQBBEwRqNaon8yceIfYofDl9/8s+3SAmA0BBBBAIG6BS5cuRVwGgXDEVOyIAAIIOCVQTa5p3VZa2MV9dVwKThIJ2xx8RQABBGIRsFNHHjlyJOLDCYQjpmJHBBBAwEwBXUhDlxXVuXF16tQRFtYws5/8UCu9Dpfk5vqhqQlqoz5HsEyWPD1Cbr++kTQp9a+V9J40X5Ys3VZJthlNd3ZD8XG9NAvEFTmfv0qm9GoVLKtFr8ny20l3S3MtOzQd3L4c6WKfzzq2oiZqmRtkcaCMFvb+ga9a7uK1+Y4//FtRLZx6nYflnJKkHAQQQCAKgSvnz8q5KPYP31Vv/a1auVJ+t3yFnDx5Mvj22jVrRP81aNBAfjZsqAweMkTIIhHk4ZsEC7yyYoXs27cvqjyuCa6SS4rX4HKpTBw9t+RB2vKqHcg0s/pZK4/xrBd7yNyVc6VvFbnIrxQslREDcyQ/5IbT5X3vyu7vZYoGgNEniggE6rmT5OGZW6QwrIpWasgJq+W55Q/Lqyt+KW1qVQvbw8wfGRE2s1+oFQIIeFrg77Lv3TwJhq8N2kib6+wZw1U3fOeOnfKj9j+UWTNzSgXBoUdqcKzv636bN20OfYvvEUiYwIULFyWWXK4Jq5BLCrYD1uJsMhFUuvBtmfiz30h+ZXnIr7wvs4fNLRUEWyVXbyvdfnxtBCcJ3+V/ZP/zo2RIOUFw6J6X970g9z6wVAoqq1voAQn4/lIRc4QTwEqRCCCAgDMCVwpelZlLDpcUVl0a9LxTWkU4eKJB7X1Dh0pRUWQpj3S/sWPGcLvama6jlCoEdHpOyxtvrGIv3i4tcFrezPltMGDV1ScnzVsne04Enh0I+Xd421J5dHSXwPpuJdvJPNmy7+/2T2W/7t8ueYFnD6q3uk8Wb/uspKzPZOvq8XLXwHmyX8veNk1uto/UlHD2+cpNBVkkB/YVBJI+psvNA6fJkmCZR2XP+lkyoFW6XZJc3hu4M1VZ3YJ7OvuNvZjQoUMHIy6YqRERU7EjAgggEI+A3vrcKGv+vEvenrdaPrFvVVZvIz/rf6NEEgfrSLAGtbFsOjpcr1596da9WyyHcwwCVQrYT+rXqPFNQFTlQW7dwZpPmxNl7StYovjL3fL7HSXL6mQMkYUrnpTO5UwrqNaos9w/+Sa5/ssBMmL154Fz/185cixwXGU5yKt3lZxlj8qd19i/Ya6W67OCj+lGWX/dvYF0nfeyLOjXJOR3VjWplTVYZq+4RuSuMfKGlSM9grrFcPaqDollGhiBcFWqvI8AAghEIhDTH8bAH5XZT8n9Ta6u8gwaZMQaBNuFT508WVq3aS0ZGcExJfstviIQt4D9pL795H7cBfqlgGv6Su6RvhG2tpY0yvw/gX01EP5K/na28ikAV/cZIj2DQXCEp6hkt+pdxsnMUkFwyM61bpdBfRrJGwv1btf/yOGjZwKP6tULCZhD9jXoW+YIG9QZVAUBBHwkUL2VDM5dETayUnH79cG4SKdDVFSKBtOLFy6q6G1eRyAugTOnz1jHp6f5YEQ4LqloD/5KTuS9Yk1vWjypv9w188MIC6glP/xB82C+8ggPqmS3WtKhWzsJjPtWsFWX2nVqlrx3Wf7fLy/K/1awp0kvMyJsUm9QFwQQ8LhAA8ke/VP5wfeayZ3DOsv19t3KCFq9fNnLEexV9S7r1q6Vx2c8UfWO7IFAlAKnT5+yjmia2TTKI124e6KWWD6fL+ve+EjOXjlaegpVTERXyzW141+6/ZtTO13eNyWn8jsC4VTqc24EEPCOQKL+MAaEjh45KqdPn3bESkeFNddrVlaWI+VRCAK2wGcHDkjjJo3tH/kalYCmJZtablqyqIph56gFCISjJuMABBBAILkCRZciyxARaa0OHzpMIBwpFvtFLEDqtIipwnb8UvY8PVLuXZgfyMhQ3lZyJ6nOt6Rak07SseBR+feIp0eUVx6vhQoQCIdq8D0CCCBgoIAGrk5uRUUXnSyOshCwBDR12pixY9GIUuBK/hIZHwyCNTXZSOnxgx9J/35ZUqtMWZflREGZF3khDgEC4TjwOBQBBBBIhkC9evWScRrOgUDMAr5KnRazUnkHhi6uU10yAvl9X57TtZwA2D72spw7e8H+ga8OCJA1wgFEikAAAQQSKZCWnuZo8aS3cpSTwgICpE6L9TL4/+R8ILtC8XaNdLirbSVBcGCv8+/L6+uPx3oyjitHgEC4HBReQgABBEwS0Afbvvvd7zpWJXv1JccKpCDfC5A6zYlL4H/kaEFhIPduBdv5XTJn6ISSBSsq2IeXoxYgEI6ajAMQQACB5Av0698/7pNeddVV0r1HD4ll9aW4T04BnhbwVeo0R3syXVr94OaSXL9Fkj9zpDz0zBY5ERoNa0q1RZOld9t7ZPG+0AdnvwqMxJ+q4AG7GCr5WZ68V/BVDAe6+xDmCLu7/6g9Agj4RGDU6IdkxfLlcbX266+/lvuHPxBXGRyMQHkCvkudFtNKkiVypVItVpNrugyQ3hl/LBnpPSl5LzwY+FeectnXrnx5TnRiRcWLXJQ9ptQrNa6R71UPvKLpKi7vllldbpBZukOpOuoL3t0YEfZu39IyBBDwkIAuizx1+rS4WqRP9JM/OC5CDq5AgNRpFcBE8nKtbJmyYJTcrAFppVvgYbouP5clS8fLzSX7XT50RP4aOnpc6fHlvHlNB7mnT8Oybxw+KsfLz+VWdl+Xv0Ig7PIOpPpmCehCBUtyc6WwsNCsilEbTwiMGDlSBt8zJKa26JSItlnc5wAAOIlJREFU8RPGx3QsByFQlYCmTmt5441V7cb75QpUk1ptJsiGD9fJ3OkPSnZGWESc0UVGTX9SlmzbJ++/NE46d+oqPVqXLGN9Mk+27Pt7uaVG9uL3pPOsZbJk+sDSgfiVc3LuYjwRdmRnN2GvqwK3yr42oSLUAQEvCOzcsVPuGzrUasrQYcNEb2frSB4bAk4KPDvvWVkwf77onN9IfoXrtciyyk72AGWFCmjqtO/fdLN1x0I/rLEhkCoBHYzq36evzF+wQLp17xZRNRgRjoiJnRCITKBDxw7y/u5dooGHzue8vV17mfH4E4wQR8bHXhEK6MjumvXr5EcdOlR6RPvbf2jtRxBcKRNvxilA6rQ4ATnccYG69epGXCYPy0VMxY4IRCagI8AaeOho8OKFi6yAWINiRogj82OvyAR0ru/LK5ZbH7L27tkr+tT+rJk50jk7W/r26yet27TmbkRklOwVpwCp0+IE5PCUCjAinFJ+Tu5lATsgZoTYy72c+rbpdaa3APWWtAa/uunPTMlJfd/4pQakTvNLT3uznQTC3uxXWmWQAAGxQZ3h8arUrFnL4y2keSYKaOq02nVqm1g16uQzgcOHDlstrls38qkRBMI+u0hobuoECIhTZ8+ZEUAgcQKaOu2WW7ISdwJKRiBCgaKi4uWqo7kjRiAcIS67IeCUAAGxU5KUEy5Qs2YN+fjj/PCX+RmBhApo6rRrr702oeegcAQSJUAgnChZykWgCgEC4iqAeDtqgRtatpRzZ89FfRwHIBCrgKZO061+g/qxFsFxCDgmEMs0naRkjRjxwHDRT4xsCCBQtYBmmNB/+pBdNLd3qi6ZPRBAAAFnBezUac2bt3C2YEpDIAaBWKbpJCUQ1lQ+7dq3i6FJHIKAPwSKLl6UDz7YJXv37LEafFe3nxAE+6PrHW2lHYxoUnmWUnaUlsIqELBTp6Wlp1WwBy8jkDyBCxfOS7QPDSclEI50dY/kUXEmBMwQ0KWY7VzDWiNyDZvRL26tBcGIW3vOvfW2U6fxwcu9feilmmtO9TFjx0bVpKQEwlHViJ0R8IEAAbAPOjkFTUxPS7fOqimECExS0AE+PGUsczJ9yESTkyhQo0bx78FIT0kgHKkU+yHggAABsAOIFFGhQNPMptZ7dgqhCnfkDQQcEohlTqZDp6YYBEoJ6JQw3ewpYqXerOQHAuFKcHgLAacECICdkqScqgR0YQMdpWNDIBkC+iC8TuliQ8AUgWiniBEIm9Jz1MOTAgTAnuxWoxulCxvoKB0bAskSIHVasqQ5T2UCez76yHo7MzOzst3KvEcgXIaEFxCIX4AAOH5DSohNQBc22LjxrdgO5igEohT4r08/ETuXcJSHsjsCjgpcvFhklZeWFl0GEwJhR7uBwvwuoH8Q5s19xsoDrBZkgfD7FZH89uvoHItqJN/dr2fUoCPawMOvVrQ7sQIH9u+X1m1aR30SAuGoyTgAgYoFNr29yQqCCYArNuKdxArYD4qQSzixzpSOAAJmCXz++Qlp1apV1JUiEI6ajAMQqFhg0OBBov/YEEiVQN26da1T60IHpFBLVS9wXgQQSLbAsYJjgb+/g6M+7beiPoIDEEAAAQSMFbBTqNkLHRhbUSqGAAIIOCQQa+o0PT2BsEOdQDEIIICAKQI6T273rt2mVId6IIAAAgkVsJf6tu+IRXMyAuFotNgXAQQQcIHAddddJzpfjg0BBBDwg8DBgwetZtp3xKJpM4FwNFrsiwACCLhA4IaWLUXny5HWygWdRRURQCBugVgzRuiJCYTj5qcABBBAwCyBNrfealXoyJEjZlWM2iCAAAIJEPj443y56aabYyqZQDgmNg5CAAEEzBWw58nZKy2ZW1NqhgACCMQnoAtYae70FjfcEFNBBMIxsXEQAgggYK5ARkaGNG7SWD47cMDcSlIzBBBAwAGBI4eL73w1a94sptIIhGNi4yAEEEDAbAFNLL9v3z6zK0ntEEAAgTgFPvzwQ6uEWPOmEwjH2QEcjgACCJgoYD8wp7cN2RBAAAGvCsTzoJyaEAh79cqgXQgg4GuB4ANzJbcNfY1B4xFAwLMC2/LypP0Pb4+5fQTCMdNxIAIIIGCugH2b0L5taG5NqRkCCCAQm4C9olyLFi1iKyBwFIFwzHQciAACCJgtoCvM7frgfbMrSe0QQACBGAXszDj6uy7WjUA4VjmOQwABBAwX0NuFe/fsZWENw/uJ6iGAQGwCmhlHM+RoppxYNwLhWOU4DgEEEDBcoG3btlYN8/fmG15TqocAAghEL7Bh/Qb50Y86RH9gyBEEwiEYfIsAAgh4SSCrdZbVHOYJe6lXaQsCCKiAPT+47W23xQVCIBwXHwcjgAAC5gqkpaUJ84TN7R9qhgACsQs4MT9Yz04gHHsfcCQCCCBgvMCP77rLmidMPmHju4oKIoBAFAJ/eOeduOcH6+kIhKNAZ1cEEEDAbQJ33NHZqrI+NMeGAAIIeEHg0qVL1gf8n3TrHndzCITjJqQABBBAwFyBpplNpXad2rL1vS3mVpKaIYAAAlEI7Ni+w9rbfiA4ikPL7EogXIaEFxBAAAFvCfTs2Uu2b9/urUbRGgQQ8K3Ah3/5i9X2Dh3jyxihhRAI+/YyouEIIOAXAX2q+tzZc7Jzx06/NJl2IoCAhwU2bnxLevfp7UgLCYQdYaQQBBBAwFyBjp06WpUjjZq5feSWmo14YLhMGDfOLdWlnh4U0LRp+sG+y51dHWkdgbAjjBSCAAIImCugadR09OT3mzeZW0lq5gqBjz/Olxo1arqirlTSmwLb8rZZDbM/4MfbSgLheAU5HgEEEHCBwG0/aCfHCo7J0SNHXVBbqmiqgI7E1W9Q39TqUS8fCOgHes2Prh/wndgIhJ1QpAwEEEDAcIFOd3SyavjWW28ZXlOqZ6qAvZJX8+YtTK0i9fK4gH6Q1w/0/QcMdKylBMKOUVIQAgggYK5ARkaGNYrC9Ahz+8j0ml0qumRVMS3dmZE409tL/cwTsD/I2x/snaghgbATipSBAAIIuEBAR1GYHuGCjjK0iocOHbRqlpWVZWgNqZbXBexpEfrB3qmNQNgpScpBAAEEDBfo3qN4FaZXX3nF8JpSPRMFTp08ZS3OYmLdqJP3BXRqjn6Qvz+QucTJjUDYSU3KQgABBAwWsLNHaA5ONgSiFfjiiy/kllsYDY7Wjf2dEXhrw5tWQU5li7BrRSBsS/AVAQQQ8IGA5t5kcQ0fdHQCmqip06699toElEyRCFQucOnSJbEX0XAqW4R9RgJhW4KvCCCAgA8EunXvZt3e3rB+nQ9aSxOdFCB1mpOalBWNwI7tO6wP8L379I3msIj2JRCOiImdEEAAAe8I9OzZSzas3yCFhYXeaRQtSagAqdMSykvhVQisW7vW+gDfoWOHKvaM/m0C4ejNOAIBBBBwtcC9P/2pVf/tf9zu6nZQ+eQJkDotedacqbSAfmDflpcn99xb/Hur9Lvx/0QgHL8hJSCAAAKuEmia2dTKKbwk90VX1ZvKpk6A1Gmps/f7mV979TWL4J5770kIBYFwQlgpFAEEEDBbQFMQaSqinTt2ml1RameEAKnTjOgGX1bitVdfkc7Z2eJk7uBQSALhUA2+RwABBHwioCmIatepHZgrzENzPunyuJpJ6rS4+Dg4RoHNmzZbD8n17dcvxhKqPoxAuGoj9kAAAQQ8J6ApiHhoznPdmrAGaeq0mjVrJKx8CkagPAH7ITnNdpOojUA4UbKUiwACCBguMGr0Q1YN7Tl4hleX6qVQQFOn3dCyZQprwKn9JqCZSvQhuYdGj05o0wmEE8pL4QgggIC5AjrnTufe6Rw8TVjPhkB5AnbqtHr16pf3Nq8hkBABeyW5Hj17JqR8u1ACYVuCrwgggIAPBYbdd581B2/T25t82HqaHImAnTqtbr26kezOPgjELaAp01YsXy5Dhw1L2ENydiUJhG0JviKAAAI+FNAE9Y2bNBZSqfmw8yNssp06LTMzM8Ij2A2B+ATs6Vp2zvP4Sqv8aALhyn14FwEEEPC8wLjxE6xUavqENhsC4QKaOk03fcCSDYFEC+g0LTtlmuY8T/RGIJxoYcpHAAEEDBfQJ7J1VPi5Z+cZXlOqlwoBTZ2mc8nZEEiGwKqVK63pWmPGPpyM0wmBcFKYOQkCCCBgtsCIkQ+ywIbZXZSy2pE6LWX0vjuxjgYvWrjQ+uCVlZWVlPYTCCeFmZMggAACZgt079HdWmBj+csvm11Rapd0AVKnJZ3ctydM9miwQhMI+/Zyo+GJENA5lgMCK+Aw1zIRupSZSAGd/6n5OjVvp50uK5Hno2x3CNjXAqnT3NFfbq5lKkaD1YtA2M1XDXU3TqBZs2Zy/vx5GTtmjHTt0oWA2LgeokKVCQweMsQaFV4w/4XKduM9HwmQOs1HnZ3ipqZiNFibTCCc4o7n9N4S0Cdct2zdKvMXLLAaRkDsrf71emtCR4W5q+H13o6sfaROi8yJveITSNVosNaaQDi+vuNoBMoV0KfwCYjLpeFFwwXsUWEySBjeUUmqHqnTkgTt89OkajRY2QmEfX7x0fzEChAQJ9aX0p0X0FHhXz/5FHmFnad1ZYmkTnNlt7mq0qkcDVYoAmFXXS5U1q0CBMRu7Tl/1js0r7D+kWLzrwCp0/zb98lq+by5zyQ1b3B4uwiEw0X4GYEEChAQJxCXoh0VsFeb01uWbP4VIHWaf/s+GS0vLCyUFcuXS+8+vSVZeYPD20UgHC7CzwgkQYCAOAnInCIuAb1GdTUxTW7PqHBclK49mNRpru0611T80WnTrbpOnDw5ZXW+6uvAluizHz1yVIouFSX6NJSPgGsFPnj/A1n12mty+vRpqVevnowe8x9yz733urY9VNwbAhoI9e/TV4YOGyaPz3jCG42iFREL6GidBipTpk4VzYjDhoCTAvbvlzFjx8r4CeOdLDqqspISCI94YLiVpD2qmrEzAj4XeH/3LsnIyPC5As1PtcCMx5+wbl3+YcsWgqFUdwbnR8BDAppr/9y5c/LHHTtEH9JN1ZaUQJgR4VR1L+d1g8A//vEP2fKHd2X9unVSVFRkjQg/MnmS3H333W6oPnX0uICOCvbo1k1uuSVLlix9yeOtpXkIIJAMgddXvS7Tpkyxcu7rNKxUbkkJhFPZQM6NgKkCOu9SH0TSOZj6QErjJo1FH1BK9S8FU72oV+oEluTmyqyZOUb80UqdAmdGAAEnBPRv3x0dO0qjRo3kjbVrnSgyrjIIhOPi42AEohcgAI7ejCNSL2DKbczUS1ADBBCIR2DCuHGyYf0GWbN+XcoyRYTWn6wRoRp8j0ACBTQA1pE1/SSso2u1a9e2Rth0BTpGgRMIT9GOCMx5pjjXp+b8ZEMAAQRiEdAH5DQI1gfkUpUuLbzejAiHi/AzAg4LMALsMCjFpUzAtJGclEFwYgQQiFpA/xb2CTz7YsIDcqGVJxAO1eB7BBwUIAB2EJOijBDQa1rvaOjdjPVvvpnSJ72NAKESCCAQscCz856VBfPny8srVkiHjh0iPi7ROzI1ItHClO87AQ0WmALhu273RYM1xdGvn3xKjhUcsx709EWjaSQCCMQtoNnDNAjWRXpMCoK1YYwIx929FIDANwI6/2nk8OFkgfiGhO88KGDnhie3sAc7lyYhkACBAf36yfHjx+XtzZuNy4/PiHACOpwi/StwqeiSlW91/oIFwkNw/r0OvN7yp3JmSu06tWXqlMksv+z1zqZ9CMQpoHdI9+7ZKxMnTTYuCNamMSIcZwdzOAIIIOBHgc2bNsvYMWOsp79TuTyqH+1pMwJuEbCXUdYpEaYuyEMg7JariXoigAAChgmQRcKwDqE6CBgkYGqWiHAipkaEi/AzAggggEBEAjOefNKaIjHpkUeYIhGRGDsh4B8BzTmuD9Y+9/xvjM4wQyDsn2uSliKAAAKOCmgWCf0jp3/sHn/sMUfLpjAEEHCvwM4dO2XF8uUydNgw47JEhKsSCIeL8DMCCCCAQMQCmgpJV4nS1aJeX/V6xMexIwIIeFOgsLBQxv3yF9K4SWOZMPER4xvJHGHju4gKIoAAAuYL2OmRVr2+WppmNjW/wtQQAQQSIqC/CzRLhFvSKzIinJDLgEIRQAABfwnMmv201WBSqvmr32ktAqECunqcBsE5s2e75gMxgXBoD/I9AggggEBMAjoKrKvO6R9B5gvHRMhBCLhaQOcF6+pxvfv0lkGDB7mmLdWeCGyuqS0VRQABBBAwViCzWaZcufK/8rvlKwKJ8+vKTTfdZGxdqRgCCDgnoEsojxwxXOrVqyeLXnxR/uVf/sW5whNcEnOEEwxM8QgggIDfBOw5gmvWr5OsrCy/NZ/2IuArAc0XfH8gO4QuoezGZwQIhH11udJYBBBAIPEC+ofxjo4drRO9vXmzkcuqJl6BMyDgDwF7YZ35CxZIt+7dXNdo5gi7rsuoMAIIIGC2gOYX1pGhc2fPWcswa2DMhgAC3hNYkptrpU7UFIpuDIK1RwiEvXdd0iIEEEAg5QL68JyOEOnDc7rCFBsCCHhLYPOmzTJrZo50zs6W8RPGu7ZxPCzn2q6j4ggggIDZAvrw3Plz560VpvQhuvY/bG92hakdAghEJKAPx435j9HSsmXLwMNxi131cFx4AxkRDhfhZwQQQAABxwQen/GElU5J0yrpCBKb2QJ6q1tXBmNDoCIBDYIHDxpova35w3UqlJs3AmE39x51RwABBFwgMOPJJ6V1m9bWfOH8/HwX1Ni/VdRb3W9v3OhfAFpeqYDO99dFc3T+vxszRJTXOALh8lR4DQEEEEDAMQEdMVq2fLnUrlNbRg4fLjqixGaegN0v9erVN69y1CjlAnaaNJ33r/P/vbKUOoFwyi8tKoAAAgh4X8DOJKEt1duqdtDl/Za7p4VFl4qsytatV9c9laamSRPQh17tINitGSLKwyIQLk+F1xBAAAEEHBfQESS9naqb3l4lrZrjxHEVuOejj6zjMzMz4yqHg70nMOPxJ6yHXocGFs7wUhCsPUUg7L3rlRYhgAACxgpoMPzrJ5+yRpZ0NSqCYXO66uLF4hFhtz/8ZI6oN2oSGgTrw69e2wiEvdajtAcBBBAwXEBHlOwcwwTD5nTWgf37rZyw5tSImqRawOtBsPoSCKf6KuP8CCCAgA8FCIbN6/TPPz8hNWvWMK9i1CglAprucEXgIVddMMOLI8E2KoGwLcFXBBBAAIGkChAMJ5W7ypMdKzgmNwQWSGBDQIPgsWPGWGkPn//P33gahEDY091L4xBAAAGzBQiGzegfO4sHqdPM6I9U1iI0CNa0h16fM04gnMqrjXMjgAACCFhPoTNnOLUXAqnTUutvytn9FgSrO4GwKVcf9UAAAQR8LMDIcGo7306dVrcuOYRT2xOpO7s+GGdPh/DDSLAtTSBsS/AVAQQQQCClAgTDqeO3U6dlZGSkrhKcOWUCdnYIfTDOT0GwghMIp+yy48QIIIAAAuEC4cFwYWFh+C78nAABTZ3Wuk3rBJRMkaYL2EGwLpaxZOlLnp8THN4fBMLhIvyMAAIIIJBSgdBguEe3bizHnITeKE6dVisJZ+IUpgjoYjYTxo0Lrhjn5RRplZkTCFemw3sIIIAAAikR0GD4D1u2WOcePGggwXCCe0FTp7Vr3y7BZ6F4UwQ0CNbFbDas3yA6EuzXIFj7g0DYlKuSeiCAAAIIlBLQ5ZhXvb7aeu3HXbuKPtHO5ryAnTotPZ3FNJzXNa9E7W8Ngvfu2Wut8OjnIFh7h0DYvGuUGiGAAAIIlAhoMPz25s3W/FV9on1Jbi42DgvYqdOaNW/mcMkUZ5qABsF6h+X48eNWEKx3Xvy+EQj7/Qqg/QgggIDhAprJQJ9k1yfaZ83MEX24h805AVKnOWdpckl6R0XvrOimd1oIgot7i0C42IH/IoAAAggYLKCrW+kT7TqfcUUgKB7Qr5/oPEe2+AVInRa/oeklPDvv2WCOYL3Donda2IoFCIS5EhBAAAEEXCOg8xlzZs+25jfe0bEjD9E50HOkTnMA0dAi7MwQC+bPl959elt3VsgVXbqzCIRLe/ATAggggIDhAoMGD5I169dZteQhuvg7i9Rp8RuaWIL9UJxmhhgzdqzMe+453+UIjqRfCIQjUWIfBBBAAAGjBLKysqx5jroIhD5Ex7zh2LuH1Gmx25l6pM4HDn0obvyE8aZWNeX1IhBOeRdQAQQQQACBWAR0nqM+RBc6b5iV6KKTJHVadF5u2NueD9yoUSMeiougwwiEI0BiFwQQQAABMwX0IbrQecO6Et3OHTvNrKyBtSJ1moGdEmOV9EOgPkQaOh+Yh+KqxiQQrtqIPRBAAAEEDBfQecO6El3t2rXlvqFDRUfFyCpRdaeROq1qIzfsoR/+9EOgLpKhD5MyHzjyXiMQjtyKPRFAAAEEDBbQ0a/1b75pPR2vo2K6epZ969/gaqe0aqROSyl/3CfXD3s6P14//OmHQP0wqB8K2SIXIBCO3Io9EUAAAQQMF9CpEjoaNn/BAmv1LM0qwWp0FXcaqdMqtjH9nfz8fOlz991WXm2dJ68fApkKEX2vEQhHb8YRCCCAAAKGC+iqWbpwgL0a3YgHhgsP0pXttAsXzkvNmrXKvsErxgroKLBO/enfp6+cO3dOXl6xwponrx8C2aIXIBCO3owjEEAAAQRcIKALB+hqdFOnT5NteXnWHMrXV73ugponr4o6p7Rd+3bJOyFnikvAHgW2H4j7444d0qFjh7jK9PvBBMJ+vwJoPwIIIOBxgREjR1pzJzWd1LQpU0RHh5k7LMER8vT0Gh6/AtzfvPBRYB6Ic65PCYSds6QkBCwB/sByISBgnoDOnXxj7drg6DBzh0XOnDljdVSz5s3M6zBqFBQobxSYB+KCPHF/QyAcNyEFIPCNgD6Uo39gdcRJf3mxIYCAWQI6Ovz+7l3BucNdu3Tx7f+rhw8dtjqnbt26ZnUStbEEdE77hHHjSs0FJi2a8xfHVV8HNueLpUQE/Cmgt6/mzX3GeopXBfRBnTFjHxZdDpYNAQTMEtBlaH/12KNy7uw5K+XaxMmTRecV+2XTQEtHhfn9ZF6P66DKooULrWtzzNix8uCoB4WH4RLTTwTCiXGlVJ8L6B+YxQsXERD7/Dqg+eYL6IfXFxe/aK3GVbtObXlo9GgZPGQIQYf5XefJGuqdxEmPPCLHCo5ZAylTpk4lJVqCe5pAOMHAFO9vAQJif/c/rXePgM7tnz1rlpVdonGTxjJu/ATRFGxsCCRDQP9WPDptunX96QeyXz/5FNdfMuAD5yAQThI0p/G3AAGxv/uf1rtHQKdLPPfsvOCIHFOb3NN3bqxp+N8GTfXHHYnk9iSBcHK9OZvPBcJ/6TGH2OcXBM03ViB0jqb+f8otamO7ypUV0yk5q1auDM4D1pXhRo1+yFdz1E3pOAJhU3qCevhKgIDYV91NY10qYAcrs2bmWC0gWHFpRxpUbfuash+EYzAk9Z1DIJz6PqAGPhYgIPZx59N01wiE/39KQOyarjOmogTAxnRFmYokJRDWOVenT58qc3JeQACBYoGiixflgw92yd49e6wXWrdpE0j+vwYeBBAwSKC8gLhX77tJP2ZQH5lWFQJg03qkbH2SEgjr4gK6zjsbAghEJvCd73xH3tuWx3yxyLjYC4GkCoQHxNzeTiq/K05mXyMbN75l5QLmGjG325ISCJvbfGqGQOoFNG/kgvkvBNPmkMc09X1CDRCIRECDnbc3bgw+8ETatUjUvL2P/j5/a8ObwRzyvfv0lp8OHcpdA4O7nUDY4M6hat4WIAD2dv/SOv8I6O3vTW9vkiW5L1pp1+yFOXr07MldHZ9cBjoFdNnSlwLT2/ZaLWYeuXs6nkDYPX1FTT0iQADskY6kGQiUI6AB0bq1a4PTAXVEsHefvtKhY4dy9uYlNwvoHYHXXn0t8O8Va/qD3hEYNHgweYBd1qkEwi7rMKrrXgECYPf2HTVHIFoBXanu1VdeEXuOqAZJP+nWXe659x5GiaPFNGh/Hf3fsX1HqdFfnf877L77+LBjUD9FUxUC4Wi02BeBGAQIgGNA4xAEPCJQXuDUuk1ruT/wEHnHTh0lLS3NIy31djN27tgpeVu38sHGg91MIOzBTqVJZggQAJvRD9QCAVME7Fvpv9+8yZpLrPXSqRNd7uxKUGxKJ4XUI3xUX9/Sub/ZXbow+hvi5PZvCYTd3oPU3zgBAmDjuoQKIWCcQPgIo1aQoDj13US/pL4Pkl0DAuFki3M+TwvogzJjx4wR+6nxwUOGcOvT0z1O4xCIX6C84EunT/QfMFDaBBbXaZrZNP6TUEK5AvbUla3vbZHt27dbD73pjnwoKZfLky8SCHuyW2lUqgT01uf2P26X7j26EwCnqhM4LwIuFtA7Stvytkno9Al90O5HP+ogbW+7jSkUDvStbbzrg/eD6c508KJTp05MU3HA121FEAi7rceoLwIIIICALwTsD9Z/+fNu2bB+Q7DNOlrc/oe3S4sWLUS/z8jICL7HN2UFNPDd89FHsnvX7mBaO93Lduyc3ZkFL8qy+eYVAmHfdDUNRQABBBBws0BFAZ2OGLdq1Upu+0E7ada8ma+DOn3A7fDhw3Lw4EEJHfHVfmdk3c1Xf+LqTiCcOFtKRgABBBBAIGECdmD82YEDpea36gl1tPO6666TG1q2lDa33ip169b11Mixzu09cuSIHD50WE6dOiUH9u8vNdqrBprft+WNN0rbtm0lq3UW09UUha2MAIFwGRJeQAABBBBAwH0COpXiyOEjcujQQWsawMcf5wcf/rJbo8FhzZo1rAC5Xr36UrdeXWODZDvYvVR0yWrTqZOn5IsvvpCK2qVBb/369XnA0O5svkYkQCAcERM7IYAAAggg4D4BO5gMHTn9/PMTwTzGoS3SB8ZuuSXLeunaa6+V+g3qW9/bAXPovpmZmVGPsOq0haJLRcFi7ADXfkHn8OpWVf3sujVv3kIym2V6aqTbtuBr8gQIhJNnzZkQQAABBBAwRsAOTDVILiq6KPaIq1ZwW15e0uup0zlq1qwVHLHWCui0Dt2ysooDdOsH/oOAgwIEwg5iUhQCCCCAAAJeE7AD5tB2aRaGaLfyRpYJcKNVZH+nBQiEnRalPAQQQAABBAwU0DnEP7v3XvnV40+wRLCB/UOVUiPwrdSclrMigAACCCCAQDIFzpw5Y80NTktPS+ZpORcCRgsQCBvdPVQOAQQQQAABZwR0LrBumkqNDQEEigUIhLkSEEAAAQQQ8IGAPhCnGyvR+aCzaWLEAgTCEVOxIwIIIIAAAu4V0PRkuroaGwIIfCNAIPyNBd8hgAACCCDgWYELF85Lw4bXe7Z9NAyBWAQIhGNR4xgEEEAAAQRcJrB3z15ryWGXVZvqIpBQAQLhhPJSOAIIIIAAAqkX0NRputWokZ76ylADBAwSIBA2qDOoCgIIIIAAAokQ0NRputkrtSXiHJSJgBsFCITd2GvUGQEEEEAAgSgE7NRp6WmMCEfBxq4+ECAQ9kEn00QEEEAAAX8L2KnTmmY29TcErUcgTMBHgfBhWdLrBmlyfaPAv4Gy5PjlMAp+jE/gspzIHVjie4P0zi1O3F5c5nnZNql9yXvtZUre+fhOFffRptUn7gZRAAIIIFCpAKnTKuXhTR8L+CgQ9nEv+7LpX0r+6mnSu2+unPBl+2k0Aggg8I0AqdO+seA7BEIFCIRDNfjeGwLnd8mcXp2l/6SV8sk/vdEkWoEAAgjEI0DqtHj0ONbLAt/2cuNomykCtaTznF1SMCdJ9Tn3qXywr6iSkyW5PpXUhLcQQACBRAuQOi3RwpTvZgFGhN3ce9QdAQQQQACBKgRInVYFEG/7WoBA2NfdT+MRQAABBLwuQOo0r/cw7YtHgEA4Hj2ORQABBBBAwHABUqcZ3kFUL6UCSQqEv5ITea/IkqdHyO1W+jJNYab/msntw2fJkqXb5MSVyByuHN8my3Jnych2zUrKKC6rRa/Jsjh3g+Sfj7CgSk8XyDiwdlk59dVztZLek+ZXUueQNG29NGPBFTmfv0qm9GoVrK/WdUne8cA7kW6xlhlPO8LrVtyHiyfdLS2CfagWubLt+FfhO4f9HE26stjrfDlvstyodeucI5/YNdiXI13s+lr9oW9EXp/4rreQfgum7NP25cqc4R2C14P+v2Bdv2vzAzVjQwABBJwVIHWas56U5i2BxD8sd36PLJnwS5m19WQ5cpelcOuLgfcC/2ZlyahVuTKpzTXl7Bd46cpxee+xX8rDr+2T8jIAX963WuYE/smcZTL4t8/Lr7s2kmrll1TJqxq0LpWJo+dKXmF5Z9FDi+ST1c9agdasF3vI3JVzpW+jqyss80rBUhkxMEfyQ4q7vO9d+fO5X8iICo+q/I2qy3S4HRX2oVrkyIj1vw/03W9lYOXVruJdh+tcxdmqfDsR15uVzeJhWVzOg3zW9TthtTy3/GF5dcUvpU2t6K/eKtvEDggg4EsBUqf5sttpdIQCCR4R/ptsy5lQQRAcVsPL+bJ48MOypKCc0cUrBbJu9FAZVUEQXKqky/tk1ci7ZVDuwShGXItLsAPMioPgUmcSKXxbJv7sN5Jf0dDulfdl9rC5pYJgq4TqbeUnd/xbWGER/hhBmY6248pBWfLA/ZX3odV3/yGLDv49wkaU3c3ROpctPrpXEnK9HZFlo0eVGwSHVu7yvhfk3glvypehL/I9AgggEIcAqdPiwONQzwskNBC+EhhdfWL158WI1VvJgOlLZWvBcSk4Yf/7SNbMe0iyM6oX73N5j/xuzf6wAPYrKVj6qEx795sR5eqtBsrUpXly2C6nIE+W/OrBb8oJjNrmz3xIpuf9LYoOPC1v5vw2GLTqOSbNWyd77HOUfD28bak8OrqLZNgln8yTLfsqCAD3b5e8k5eleqv7ZPG2z0ra/ZlsXT1esq+JccSvyjKdbIfaz5Bn9tqpyNLl5oHTZEmwLUdlz/p5MqpLA5FAMPzG2v22SpRfnalz9eynZb/207ZpcrNdg1bTZKvdh2+NlOvt1yv8mqjr7bwUFuqHvAaSPXqerPn46DfXw9Kfh1y7Acqti+Wl/AquqQrrzRsIIIBAWYFLly5ZL9aokV72TV5BAAFJYCB8Wb74aI8Uh6/VpcGIX8nMkZ3l+lLx3zWS1W+yLHp1omRZsfBlObnxPdkXOsL65WaZPWd3yXSI6pLx70/LO+uflhHZIVMfqjWSzg9Mldx3lsuoVvb/7J/Lhhc2SEFoWZV1+Je75fc7SmZoZgyRhStyZFS/LKkVdky1Rp3l/smz5KmBDUve+b9y5FglMzurd5WcZY/KncHpE1fL9VktypQbdprKf6ysTCfbcX6n5L60p8Q+XbKmr5a1c0ZK52BbqkmtrL4y6aV1siToUXnVy33XyTqXe4IoXkzk9VY9MP1n7QbJndxXsoJTHwLXQ/Y4yd00W7JLPg+KVHFNRdEcdkUAAX8LHDlyxAJoc+ut/oag9QhUIJDAQLj0Gf9ZUCBfVBCUVmsyUtYcKRkl/tNkyQoGy1fkyz++Izvt+bUZ/eWpOf3CgumQ89RqLxOeG1sSVAdG1vaukbUVjdaGHGZ9e01fybXrsDtHOgcDlfAd9eda0ijz/5S88ZX87WzxJ+7y9ry6zxDpGevob3kFBl6rtEwH23F573uysWSudPXWY+XpB1pUMO/6e9J52nQZYI/sV1DvCl92sM4VniOiNxJ5vQU+xPUZLQ9WNAf+mnbyk472x67Kr6mImsJOCCCAQEDgzOkzlkN6mj1IBAsCCIQKfDv0B2e/ry7X3tomcCP4w8CocOChuHcnS5fb35VRw38gdao1lTuHhY8Ol3f2Itn350+Co8EN+vSTjpUGqCLVmnSXezoGpjhs1VHakpG1rH8tr/AoX9OsCWvkvYJ/yJUjb8tzq/dFcHwt+eEPmktwoC+CI6reJd4yI23H3+XTDz+W4hnbtf7/9u4/tqryjuP4B7smRAELFdMprJQWRZ2NgASMY2oRQ8QoKHQb/ppIUYMsQfkN29TRlp9hmT+QUcqmcYstP8SBmxpa4+ZkotZghozSVB1gowMKoiFr7thz2nvbw21Pe2/Pubf33Ps+ScPpuc95nu/zes4fX54+9zkad/ck5bb+B6WDKDOu14+m5Khy/cEOPnR7KdKY3bYTy+ftAl055qpO/hIwUCPHDpN273XbCe5HAAEEWgWOHj3SfJ43LK/1GicIINAmEMNE2CSl+Xfo3pEvqTS0xrRhtzYU725uvfQp80/WeJMYX6+8a2/XnSM62i3iS9UdCC07yNR1o3MdZiTbOiTZE4pvdPDQF2bN8SUR3Gero7FG2yrf1/HAIe1cW6GPQzPStiKRnfZWZn8vknB7a1HU6aofjao/+GWw4Ys1bGhottIei/38fH1/9DXqbRLhDr7uaC/Y+bmrmDuvuutPY/m8RWLYdYSUQAABBKIR+GT/fg3NHRrNLZRFIKUEYpoIK224ZpZv0PH7HL4t35oYP6X5VlI8f7ZmdbAut2VEBisv54IoB6dJ/zl2Sv8zd3U2mdlWqdnjdeNiPVr8phraLvrwzIt+nNbxr0Ip7YUakNH1vPZ5/QfoIqN1uFtiXsTcrYYdbvL6eYvM0CEYLiOAAALdEjh58pSys4d0615uQiAVBGKbCFuCZt3uglffU6FZVvD6XyqblxR0OMFqJcWPv60d/3hWu1ZN6ORPyLEalmP6YGWR7l5fE1yKEd6O9W3/ezRmwHlm+cUN+mHdMt1SnIh/xu65fqRlDFB/wxZ9ItxzMYePMr8jgAACySRQXVWl2XPmJFOX6AsCngrEPhFuDtf6Zvw9esj6WRVa73lCh/60UZXnvFzArCWuKNaKiddoRcHAsI7+W4fqv5FyuvoTfZNOHD8ZvDddF2X2i2hrjEBNmR5rTYKtbcKKdNuYH2hqhzPUTfq0Liy8BPnVu3700YCB1otCrFnhkzreaP33pfNZ4ab6Q6rthoN3MXejccdbYvu8OTbLBwgggIBHAmyd5hEk1SS1QJwSYbthS1I8s8BcK5qjFebVATVby/Tc6k3Bt7kd1bt7P1fAJMJpuli5w03iu89aqHDMXK8z10d1sczBvrb1Al2W990uyluxfat9b1S1bvWWVbhWv+t0VtqebFv3J8rhZT/MzhiXmZ0xIv7SYZOOmD2iQ4spIhfxMubIW+24ZLyet45b5yoCCCDgpQBbp3mpSV3JKhDD7dMOquz2K5Q7JEe5w2Zp2zGHvdPUspfwcyVT1PKi4rZ1vVJf5Y+5OjgPafYY3r5Vbzc61dMyRIG6XfpDaD9gk0h3/SUv677/qtGsJW45MjVu4ujOl2Y0vqOXt9cHyyfSP17243zl31Jgdv2wjkZVrXvR+Q16VpHAPlX8/iPrLMrDy5ijbLpd8Xg9b+0a5gICCCDguQBbp3lOSoVJKBDDRHiQRl3/vRaypre0dmWVSaecjjP6vM7MAjd/bF/OkKbMGydqXOgv8g1btGzBVn3qlAs3vqu1c59uezvcyKm6Kz/aXRu+0aG6hrC329niNm2suu9xVQb317V9kmCn7vuRln+zJg0K4h9+SU+ueddhDM0a3zXFKjdv0XN3uI/ZXfs98by5i5i7EUAAAScBtk5zkuE6Am0CMUyEzYzi1Kmtb4xrqJitSQ+WanNV/TlJZqC+WptXPqr7ikNvj8vRpFuuaFvOkHmrFi0Y2zorbO1HPHHKQpXZ6wnUq7q8VEUT79eG1jXH2Zr86OTO975tdbDPBFqvZy7Sw2vePDfhtrb1en6hJo+ebmvDquCMamuPOHzBrrWBOJ143I+0azTrqanB10l/rY/X32/GcKW21RwL9iegxpptWvXgZBW2rq+Otqsexxze/CdVZu/nKBZsxOV5Cw+S3xFAAIHYCEyeMjk2FVMrAkkiENM1wmm5d2rxzD8Hd2IwX4Tb/Vstt34c8cyX1B55QrPOeQFGb+XOWK6SvT/V/DcON9/ZtK9CpTPMT6f1lGpRuy/cOd1gZgLHT9PkrLeCM72HVfXMLPPjVP7c64FjJ2QtrOhoJ+RzS8b6N6/7YV6hbF7/u7zw75pZ8ZkJ3hrD5zXf+mnXlWzdUThYr1f8Lcp1wl7HbALrl6mB1kS2NUHdtEel469oeVbyl2j3q0UaYi47H/F43pxb5xMEEEDAK4GZRUVeVUU9CCStQAxnhC2zTI2at1bPTM/vYr8Bq6xJgqev0K/nXdd+fW5aru5c/4I2RFJPer5+vHGHti7soB6rGacjo0CLnn1IV4eWYTiVMz3JGv8zlZU/pquDZZr+VavPnZZrONYTow8874d5fXLp5i7sB2nC2k0qmXhJ9zrldcyZ4zR9Snb7WA4eUn0kqzfi8by1j44rCCCAAAIIIBBngRgnwqY3aTm6uWSb9mxfp8WLCtsnmtaLNJb+SmXV7+mVkls1xOnNF8317NA/q8u1bOksFWTZM1YrOZ2lxb8o1+4DO1Q8IadtaUXEoGb2c9TjemXvNq1uV7+ppDXOfXpn01zddMME3Tayb0vth6v05r5vI24ptgVj0A/7GD4yPrhUwuqF5f6wVm9/Rc/fFclb/5x67nXMLcl72dKw5y1wQidORfg/lpg/b04WXEcAAQQQQACBeAn0OmuOeDVGOwgggAACCCCAAAIIJIpA7GeEE6WnxIEAAggggAACCCCAgE2ARNiGwSkCCCCAAAIIIIBA6giQCKfOWNNTBBBAAAEEEEAAAZsAibANg1MEEEAAAQQQQACB1BEgEU6dsaanCCCAAAIIIIAAAjYBEmEbBqcIIIAAAggggAACqSNAIpw6Y01PEUAAAQQQQAABBGwCJMI2DE4RQAABBBDwu0BNTY1e2/Wa37tB/AjERYBEOC7MNIIAAggggEB8BD54/33NmT07Po3RCgI+FyAR9vkAEj4CCCCAAAJ2gU/279fQ3KH2S5wjgICDAImwAwyXEUAAAQQQ8KPAyZOnlJ09xI+hEzMCcRcgEY47OQ0igAACCCAQO4HqqipdedVVsWuAmhFIIgES4SQaTLqCAAIIIJDaAqdPn24G6Nevb2pD0HsEIhQgEY4QimIIIIAAAggkukBtbW1ziKOuvTbRQyU+BBJCgEQ4IYaBIBBAAAEEEHAv8MXRL5or6duHGWH3mtSQCgIkwqkwyvQRAQQQQCAlBI4ePdLcz7xheSnRXzqJgFsBEmG3gtyPAAIIIIBAggiwdVqCDARh+EaARNg3Q0WgCCCAAAIIdC7A1mmd+/ApAuECJMLhIvyOAAIIIICATwWsrdMGDx7s0+gJG4H4C5AIx9+cFhFAAAEEEPBcILR12qWDLvW8bipEIFkFSISTdWTpFwIIIIBASgmEtk67/PLhKdVvOouAGwESYTd63IsAAggggECCCIS2TuvTt0+CREQYCCS+AIlw4o8RESKAAAIIINClQGjrtBEjRnRZlgIIINAiQCLMk4AAAggggEASCFhbp/Uf0D8JekIXEIifwHfi1xQtIYAAAggggECsBMbfPEHWDwcCCEQu0OusOSIvTkkEEEAAAQQQQAABBJJDgKURyTGO9AIBBBBAAAEEEEAgSgES4SjBKI4AAggggAACCCCQHAIkwskxjvQCAQQQQAABBBBAIEoBEuEowSiOAAIIIIAAAgggkBwCJMLJMY70AgEEEEAAAQQQQCBKARLhKMEojgACCCCAAAIIIJAcAiTCyTGO9AIBBBBAAAEEEEAgSgES4SjBKI4AAggggAACCCCQHAIkwskxjvQCAQQQQCApBL5S9YIblTskJ/hzoxZVfdWNnp1R3cafaHionrFLVN0Y6EY93IJAcguQCCf3+NI7BBBAAAFfCQzUTUuWalpWejDqz1S5ZF3USWyg7kUtXLVHTc21ZGtayVzdlJHmKwmCRSAeAiTC8VCmDQQQQAABBCIVyCjQopKpygqVb9ipZytrFfF8buCANs9/WjXNWXC6sgqXalHBwFBt/IsAAjYBEmEbBqcIIIAAAgj0vECaMgrmanlhdjCUr1Wz6kltrjsTQWhmSUT5k1rz4dctZbOmavmSAmVEcCdFEEhFARLhVBx1+owAAgggkOACYUskmvZozfwXVdfVtHDjX7Vx0wcsiUjw0SW8xBEgEU6csSASBBBAAAEE2gTClkg0ffi0FpYf6GSJhPmiXUmxKhusNREsiWiD5AwBZwESYWcbPkEAAQQQQKAHBaJZIhFQY9U6Lav4rDne9JHz9ULpBJZE9ODo0bQ/BEiE/TFORIkAAgggkJICHSyRKHlNx8ItGqu0YskWNVjX08dq3up7lcsmEeFK/I5AOwES4XYkXEAAAQQQQCCBBMKXSOz+jVafs7ewfUlEX41Y8Es9kNs7gTpAKAgkrgCJcOKODZEhgAACCCBgBMKXSNj3Fg5fEjFHK2cMN3dwIIBAJAIkwpEoUQYBBBBAAIEeFQhbItGwRU9s+EiBQK22PLOTJRE9OjY07meBXmfN4ecOEDsCCCCAAAKpIWDN/v5ck2b8MZj45mvK7dLOrfvMdmlmScTSCr1cxGxwajwL9NIrARJhrySpBwEEEEAAgVgLmLfGlU0rVGnohRnB9tJHLtGuyiK+IBdrf+pPOgGWRiTdkNIhBBBAAIGkFUgbrgdWz9GIdFsP2SXChsEpAtEJkAhH50VpBBBAAAEEelQgLfduLZ15WTCGdA2aOY9dInp0RGjczwIkwn4ePWJHAAEEEEhBgXT1H3BhsN9p5rwvu0Sk4FNAl70RIBH2xpFaEEAAAQQQQAABBHwmQCLsswEjXAQQQAABBBBAAAFvBEiEvXGkFgQQQAABBBBAAAGfCZAI+2zACBcBBBBAAAEEEEDAGwESYW8cqQUBBBBAAAEEEEDAZwIkwj4bMMJFAAEEEEAAAQQQ8EaARNgbR2pBAAEEEEAAAQQQ8JkAibDPBoxwEUAAAQQQQAABBLwRIBH2xpFaEEAAAQQQQAABBHwm0OusOXwWM+EigAACCCCAAAIIIOBagBlh14RUgAACCCCAAAIIIOBHARJhP44aMSOAAAIIIIAAAgi4FiARdk1IBQgggAACCCCAAAJ+FCAR9uOoETMCCCCAAAIIIICAawESYdeEVIAAAggggAACCCDgRwESYT+OGjEjgAACCCCAAAIIuBYgEXZNSAUIIIAAAggggAACfhQgEfbjqBEzAggggAACCCCAgGsBEmHXhFSAAAIIIIAAAggg4EcBEmE/jhoxI4AAAggggAACCLgWIBF2TUgFCCCAAAIIIIAAAn4UIBH246gRMwIIIIAAAggggIBrARJh14RUgAACCCCAAAIIIOBHARJhP44aMSOAAAIIIIAAAgi4FiARdk1IBQgggAACCCCAAAJ+FPg/EI+tnirK3wUAAAAASUVORK5CYII=" alt></p>
<p>P and Q are positions on the Earth’s surface that receive solar radiation from the Sun. Why is the intensity of the solar radiation incident at P significantly greater than the intensity at Q?</p>
<p>A. The same amount of solar power is spread over a larger surface area at P.</p>
<p>B. The path length through the Earth’s atmosphere of the solar radiation is shorter for P.</p>
<p>C. The distance travelled by the solar radiation to reach the top of the Earth’s atmosphere is shorter for P.</p>
<p>D. The periodic variations in the solar power radiated from the Sun’s surface have more effect at P.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The graph shows the spectrum of a black-body.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Which graph shows the spectrum of a body of emissivity 0.5 at the same temperature as the black-body? (The original graph is shown dotted.)</p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the main role of the control rods and the main role of the moderator in a thermal fission reactor?</p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The average intensity of the solar radiation incident on a planet is 200 W m<sup>–2</sup>. The albedo of the planet is 0.6. The average temperature of the planet is constant.</p>
<p>Which of the following is a correct statement about the intensity of radiation reflected and radiated by the planet?</p>
<p><img 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vONv5mHeCCAAAIIIIAAAggggAACCCCAAAIINCvwd81uwQYIIIAAAggggAACCCCAAAIIIIAAAh4BAilUBAQQQAABBBBAAAEEEEAAAQQQQCBMAQIpYUKxGQIIIIAAAggggAACCCCAAAIIIEAghTqAAAIIIIAAAggggAACCCCAAAIIhClAICVMKDZDAAEEEEAAAQQQQAABBBBAAAEECKRQBxBAAAEEEEAAAQQQQAABBBBAAIEwBQikhAnFZggggAACCCCAAAIIIIAAAggggACBFOoAAggggAACCCCAAAIIIIAAAgggEKYAgZQwodgMAQQQQAABBBBAAAEEEEAAAQQQIJBCHUAAAQQQQAABBBBAAAEEEEAAAQTCFCCQEiYUmyGAAAIIIIAAAggggAACCCCAAAIEUqgDCCCAAAIIIIAAAggggAACCCCAQJgCBFLChGIzBBBAAAEEEEAAAQQQQAABBBBAgEAKdQABBBBAAAEEEEAAAQQQQAABBBAIU4BASphQbIYAAggggAACCCCAAAIIIIAAAgh8E4LYBbK6Z8Z+EI6AAAIIIIAAAggggAACCCCAAAKtKlB1tDri833jb+YR8V7sECRgBVOiKYCgA7ECAQQQQAABBBJGgPY9YYqChCCAAAIIIBBXgVjaeG7tiWtRcDAEEEAAAQQQQAABBBBAAAEEEEhlAQIpqVy65A0BBBBAAAEEEEAAAQQQQAABBOIqQCAlrpwcDAEEEEAAAQQQQAABBBBAAAEEUlmAQEoqly55QwABBBBAAAEEEEAAAQQQQACBuAoQSIkrJwdDAAEEEEAAAQQQQAABBBBAAIFUFiCQksqlS94QQAABBBBAAAEEEEAAAQQQQCCuAgRS4srJwRBAAAEEEEAAAQQQQAABBBBAIJUFCKSkcumSNwQQQAABBBBAAAEEEEAAAQQQiKsAgZS4cnIwBBBAAAEEEEAAAQQQQAABBBBIZQECKalcuuQNAQQQQAABBBBAAAEEEEAAAQTiKkAgJa6cHAwBBBBAAAEEEEAAAQQQQAABBFJZgEBKKpcueUMAAQQQQAABBBBAAAEEEEAAgbgKEEiJKycHQwABBBBAAAEEEEAAAQQQQACBVBYgkJLKpUveEEAAAQQQQAABBBBAAAEEEEAgrgIEUuLKycEQQAABBBBAAAEEEEAAAQQQQCCVBQikpHLpkjcEEEAAAQQQQAABBBBAAAEEEIirAIGUuHJyMAQQQAABBBBAAAEEEEAAAQQQSGUBAimpXLrkDQEEEEAAAQQQQAABBBBAAAEE4ipAICWunBwMAQQQQAABBBBAAAEEEEAAAQRSWYBASiqXLnlDAAEEEEAAAQQQQAABBBBAAIG4ChBIiSsnB0MAAQQQQAABBBBAAAEEEEAAgVQWIJCSyqVL3hBAAAEEEEAAAQQQQAABBBBAIK4CBFLiysnBEEAAAQQQQAABBBBAAAEEEEAglQUIpKRy6ZI3BBBAAAEEEEAAAQQQQAABBBCIqwCBlLhycjAEEEAAAQQQQAABBBBAAAEEEEhlAQIpqVy65A0BBBBAAAEEEEAAAQQQQAABBOIqQCAlrpwcDAEEEEAAAQQQQAABBBBAAAEEUlmAQEoqly55QwABBBBAAAEEEEAAAQQQQACBuAp8M65H42AJLVBXWqi+eSU6HXYq+2tu2XrlZ6aHvQcbNidQo4riuZqxYKeO6yxdMGWxHvvlVeqe1tx+vB8kUFuhLRt3aPvqtSo9Xhf0duOKrpqwZrsW52Y0rmKpUaC6WKMHL9T7jWscS5HbNfU502HiGh0oGqz28ImCg6MasdgqAk3VOfcE0Ma7u8SyljY+Fr2w9o2qzWqn5RKVVehSaOozhva9wa09OYSuKe3nHXqktJ+yVnruEn1wtFpVVaVaMSU7xJeZbsqdv0nl1nZHSwiixLV+1Ku2dJk3iGId+JTef+FO3fBwuerjep5UP5h1QXSTLu07VrMWrFSpLtfcre+Z+mrV2T9q1cTzUx0gvvnLLNC2ox9q97Jr1DUOR/Z8zlTt0tJh3eJwtOQ9BA7JW3bJmnLa+LYuOdr4VimBiNusdlwuEVs1XYK0aw0+ODRdT9rTuwRS2lNp23lNy9QVD9yp0R3sFY7nbtfo1rx+avXf7mt3as60tTrqSErqLX6t2qojpieK81GnY+/s1385V7kttwsft4wHrqtR+ZICXevp0WO9l6HcWfcrP6dz4IbJ97pNy7iDuo/+qUZ1i1NfkbQs/WTyj+X2EZN8BRNDinEIxmvTeh6cnJRck4htvAWd8mVPG996f0+RtFkxlEu8MtSmdT8SqzAyTLvWgISDf2Vp0zrun5TWfEUgpTW1k+FcnTqpY6vfZnJCZQsXaOOJ/0sGoRjS+HfKyOoR8Kt/urpdeqH+qcmjthefJhE8b9ZXrNLPl1fIdyNPen+NuPycxh1r3tYLWz9qfJ00SwlQxmlnqVOnVv/jT5oSIqHxEEiAeh6PbCTzMdqkjbfA2kPZ08a36p9G2G1WtOUSr9wkQN0P2ypeeeY47UsgAep4G4ETSGkjeE5rC1hdLh/VPSXJ+OXXzkO4z2nKyJ2pp+YP9QZTrDFSHtNzd/dT6K+v7cmnOcdP9NJTG3TMuVlaR3U826GX8c+6+IKznFskwTJlnASFRBJjFqCex0yYtAdoL2VPG5+YVTSacolXTtpL3Y+XF8dJPoH2XccZbDb5amxKpbi+erPmzNsUcLtLSmUxIDOdlVOwUu8UBKwO8bL9+YSAsFbX/7eO/MeXTWxg3krrqqwe35L2n2p6uwR6lzJOoMIgKS0mQD1vMdqEP3D7Knva+MSskJGVS7zy0L7qfrzUOE4yCbT3Ok6PlGSqrSmW1vrqEt127T3a2eSMKymW6Qiyg08A1tdf6ORnvpt6At5MzpeUcXKWG6mOTIB6HplXKm1N2YcuTWxC26TCO5RvKpQieWhKgDouEUhpqobwXosJ8MfXNC0+Lj7Hjuhg+HN3uxwgsVZRxolVHqSmZQSo5y3jmgxHpexDlxI2oW1S4R3KNxVKkTw0JUAdb9Dh1p6magnveQUOadXIUVpU6fIttsNErXp/iQZ/WaEtG3do++q1KvX0MElX1yHTNHNGvsb6zahyWkd3LtGdt/5K7wd2LqhcqCHdFzaqZ8/T7pcL1L1xjWepvrpM60rWa9Xy3d5bgqxz3aj8qZN1fW5mwHgj8Uy7f0KC02Gmjr7lLt06/SfK3H+fxu4YqjeKBjdMM11drNGDF+p9/0N4XvnPOR+Jz82a23ubFpX4zwPkf4r+mlu23juNda3KZo9Qvt/2HXTB/Je0raCX/25Br9z29W5k1wEz4Ytlsnb5Y3q4pNIMCGtNpf2YlhYEzwIVbNdEGdaVac4FedroUv102kzR3bMkKLWRrogoPS4H9+z/xg69tKzEUa/NGDgTC3TNxf9P48flOGbCiqSMg/8GYkurmTp68xbtfH2dVuz2jjbTdYimz7pNN40zt0S1ysPkv7REJeuL/dNw01RNvGGwujuGvDHTfLjU2cBExqeO15UWqm9eidyqmedvdF6Gti28X7/w1G1vGnx2zvINTF+kr60yelnlJw7qVb/6JKVnT9Rdo4fryiAn6xwt91ln5yCyuhdbPbfPyXNrCMS77sRe9uHXtXinvdE7OA208ZZJOG28FO3nWKN/w1KMbVbY115u543mczi2uh9c55q4NgpMssec9j2IxaygfW9+Zsvw615sddytfJJ5HT1Skrn0Wi3tvZT/coV2L7smYMYZKwFfqerNBzS6/1jNWrDSG0Sx1tfp+O5nNWviDK2qsr+a1Ktm8+0aXuASRLF2afZhGtTimzRocJ4eWv4fumDZLh06ekTlm6ery96VeihvlMYt+b356uV8xCvtzmOagEFVsSYNc6ajWlUHntAIva4ZfXupX96L+tS5S2aBth39o1ZNPN+5NmA5Up9OumLRC1oxJbshWBNwtPQL5+nNKhNoyLSntM3Q4KLf61DZEg3tatalZ2ty8eva3GwQxTqwte9vVb7mWpc6YL1vfbA+oHHGZJHvi+YxlS6Yp5UVX1kbeB9RlGH6YC0+aHzL5ukC+zD2sxXEOWzeO2r/qzDGXe13w3iOIj1+R3Xsv/h36rrYqpMf6s35A0yZnNL7JY9o0cxJuvqmEh2tt3aMtIydJ3OcK+z679i/tlyrpo3W+JkLPQGM9OwZKjlwRFXvzFf/6jWaNe8VHfGk0bFPvBfrj2jnvEkanndfYxDFOsfx3VrxYJ6Gj3lAu6rtzwvrDVPvWqmOp+cu0QdVu7R0WDfrxP6P+j+pOO8GzfHVbe/bVrpnjtWAkctUXhsrXsPf0OieP9L4pe/oi143a7Onbr+nTd4BqusqS1Tk6mSlp2U+6xpyGmndi6Wee215akWBeNadWMs+0roWz7Q3ktPGN1o0LIXbxsf6OeY4bzzarLCuvRzn9F7LRPc5HEvdj7TeO9NsluNhFXDIiF/SvjdBFuvfRct8zjUkOJK6F0sdb4Inid8ikJLEhde6STfz0F+YrS6BJz39qhbduV8/eKbU8wUyKNhSt08PL3zdxMmtR5o6j1upg9aXXrcvxVYPFN8XYrONX28UM7XW7HEav2CnpxdK+pC7tGBcljmiGY293/W6Y4wVoDBfXJdPV37xQfN11fmIR9odx6s/qLWznlSF1aOmw481aaSVDvPIyNHYwqe03jXgZG3QRf9v+MXqYC26PqLwScvUFQuXa+GQjOAjduysDL9f9xs2Scvsqx99p4O65d+rB4cG9uAJPkzjGmM9cKgGBmXg//T5e8u1YGsfPXbwHS31S8tfdPg/7dBWLGXYmIr4LcWanhqVLynQtZ46aX41mnivFnvqZAdljZ2ggXb8ygoqvnmPbni43NTLKMrYk+EY02rq7Kq8G7XI7oVivnTnPXCL+lkVxNShwXffqyn/94o2fuAMYsRP2j7S6c1LteDTy7W87ENP8MsX1PNuUFf5K82442n/oERr1vG07rrsyj5BgcnTmx/Rsk8GaO7W90y6TfB26zzlWsFIX7qf0tS8Nary/+Cx3w7j2VxkbZ6lqQV2kPk7yrnwvIbPFZlBEvOma1Q35/mM08znXc4X5886T8qjqXvR1vMwqNikhQTiVXdiKfto6prFEa+0e2lp4wPqWLhtfLw+x8zp49pmNXftZWc31vRHW/ejrfeN9ZX23S7DJp5p311wIq170dZxl1OnyCoCKSlSkG2XjW4auvgR7xdyczEzcmzQF+26vTv0Vk3U3zBM1qwI6Hzd4psiOUMDrxpgvl7Yj07KvriX98vPKVUUPaC1vl4w9jZuz9Glvb7yJT1vzwpz+nf6zctVjsCNMRh3rx5qsueJW1piWXeuRs27VTmN37M8B6vbu1Fb3Rxq/qQ/HBqgO/L7er+oxXJus+/pLZo166+69cmJ5raMwLR8Rz2/ZwV5WqoMo017rOmxpntbptuXV5gwifX4lv754h803r6Tcb56nuMskDp9VvOFvo4qubGntWbbI3rYrrNWGrrlamj2mY7UdNHgwtuV60yy4914LaZfOEvrVt6lwZkN0bi0zHFavHC8Xy+nusrntGjjYcfflHX2wHrVkKL41/E0nd2xY/DfRboJoqx/Qvme2xRNQDEnT4tnXe4XcKnbv17Fb52Ijqr+A5U8+kbj7GXHN+mehaWNvevSzlKnTv5R0br9O1X2ceD9kaFOH91nXeL93YbKH+tbTiDauhNpimL9nHM7X3Rpp40PsAyrjTf7xO1zzNSFtmiz4pb+AL8mX8Za79vIyiVPtO8uKNaqFq9X0X3O0b6HKK8IVxNIiRCMzQMEnD0yAt7yvayr1ckvovsK6TlG/QGtfnSP9wurtaanLr7Q2TfGfLH5XpbOsU9YV67nN30Q8EXMftPxHGXav/78pD7zHeaYds4co3GzN6jC17W/iwZNn6p/acURiNKyRus2T68cX8LM3VXlWrvi7cYvY563TKO7Z5eqbjS/cHf2/2Lm2DPCxXR1+8kVyvYeLi1rrObm55gvmWaMkFvu10055gt7S5VhhCn1bR5reuoPa9NTrzZ+8Q2sk2l9ddOTs3y9FtKzf6rHb7nE74u3Ly3NLcSc1sC/H3NX1/d76rzA4u/8Q13cJ6i7UXOpi+j9tB49As7r1svJBEOfe0mVAbHXtqzj6YMmaEyW08b8KnP5cEevI4vhI21b/7a3911ELC4bm15Mv9uv6gAD/w3/P52sDTOQEuVnXcL93foD8Ko1BKKtO5GmLdbPObfzRZl22vhAzDDa+MBdPK+j/BwLqgtt1WZFmX5XixArg/Ia4fVt0P5tZWU6t9K+hyjkwNVxrldRfs7RvgeWS3SvCaRE58ZerShQX7lLrx1zfGFIz1Cns/2rblpGJ3X0palOx97Zr//yvW7pBWssjLkaP3y6Himt9gRw0rIK9MJC70CzLX16z/Ebgjf+vVLMh/XWjSr16w30qd564/80ZfwPgn91jzqdnXVJf+/tTZ5jdFa/wi3mFq5KbSu8xNNLI9HKMNb0+P1i6epm9VooUPG+Q55bWA6+fJ+u8PbCcN28iZWxplUf79fvnH8/5lxpnTvq7CbO2apvpf+jevRyBinM2Y+Vqzyot0Xb1XFXr6BeRyZ2GW3vO0/g7UFNyD6rgb7rUM19Ml85drCr9iMd+UtgVMVMB/75X1u0qGKuey2aOg6eSgKJXddo45tr4z11MV6fY23VZsUr/RH8YcZc79vKKtw80r6bCy7rhzXa93CrTLJt5/9tNNlST3rbgUCd/uu9cnnnF2nIb1pHdTzb/oYRguDQEVU7Yi8htopqdfqFV+gnjvERfAcxA08+nXelBk0rdvRO8b3b4gtpWVdryqCAsVLq9ujxVQd8vXPqK57XU/XDA35djzVp/6QemU3N+JJoZRhrelz2j5Uw5P4u54qo/pseSPvf1cGQx0+EN76jrN4B9daEQY9UfxmUuLar40FJMRdHwbfbqM4EPD7+X5eNm1tlBd4ma/HLlQ0DJ+9b6bmNyDNDxpJ8Xdr3Jm30zIbW3HHi+X6sdS+eaeFYqS2QWHWNNj6wtjXXxtvbx+NzrC3brHik37YI5znWet+WVuHkz9qG9t1cLNC+h1tdknA7AilJWGjJl2T3L0Xh5eNLVR8O6FvimfI2U1ndHf8Cpxau/1yffxH4C254Z/TfyiXtGbmaEzCuQ+M+phfI7oWmd8qd2uI3+0jjFi23ZMaRmDHZTDrsfJjeOVs3a6/ntqOvVPnmYV00daBjfBnntlEuu/QQ8j9SW5ehf2qkWNPjsr8iuM0iMDlNvnY5V0T1/2udOlnruC2uyZMlwZttVMddZf5BnboE9KRRnHqJ1FZo4+xR+oE1Q9nWv9ONW1/Q3OzAc7kmKoaVgZ91sda9GJLCrkkmEFh3Ik1+W9Y1l7TTxvsXYLNtvP/mvldRfY4lUJsVVfp9uQ9jIdZ6n0BWYeS2+U1o35s3inaLwM+5WOtetOlIvf1acRSH1MMjR20l0F9zy9Y7pvVt7XSY6HLuvVpffIbuvNWeZSMgDcdf1axrz1LHHb/UYLepcwI2j9fLtJzrdMeQDZq1254pxxz5+Ha9sHuGBl++T89s76lb73aOLxOHM4fTQyLoNG1dhoEJijU93tmJrPFgWvwRSVpjGJuoxfMR3QnapI67JvVMdewc7+CGmYawZJkemP+i3rd61HW9RktfXKqxmR9rlWsaWntlJHWvtdPG+VJLoC3rGm28X12KuI1P9M8xv9y5vGjL9EdS72nfXQovTqto3+MEmfKHoUdKyhdxsmfw75XROXA0h5b69T8SKzM7z9D7tPnNpzXZHtcgcHcz88b9Kxpvqwl8u2Ven6PcqSP8ZkGRGW629NHntGu3GWR2ROOgsC1zfrejJloZxpoet/2/1KEj/+27hcpNIbp1budKhPofXW7C3iv9Al30L97xQoJ2SpQ6/pU+rwmcLvpsder490EpDmtFbblWTRut8bO9QRTPTEFWECXewZqwUmM2aqd1L1wetoujQCLWNdr4qAo44T7HIsxFq6Y/Eet9hF7RbE77bkYEtmYCpH2Ppvok2j4EUhKtREhPgMAZOq/H+QGznVTrtTc/bIEvrQGnDuNlWuZVWvBymTbNHxoQvLB2rtOnhz4KmDUnjIPGtIn5Je2y63XjhQFfQo+t1PT5/6cZ8ZryOKI0JloZxpoet/3NLVSv7AqaaSYiJteN3c4VSf1P1z/9qF/A7V5mxuqDR/Rn1/O1xcq/qOqgoweVlYRzspQZsidXotTx/9HJEwGBlPTz1eO8M6JAPKGyhTO1aLc9GlS6uo7J03i/mYKiOGxMu8Ra92I6OTu3K4HErWu08ZFUxHh8jrVlmxWP9EfiFWu9b0urcPNJ+y61dr0Kp2xirXvhnKN9bEMgpX2UcxLn0m2aUee4Hy5Zqz+otb/4tariMUSKy+HrSh/QlOKDjkBOZ+UUrNTesiUa6jYIrcsxWnRVWk+NmTogIPhkAuCDhuuyuE15HEkOEq0MY02P2/7G49gGPbPtk0hgwtjW7VyR1f+083qqV3rAqT58V/v9ZnMKeL81X9af0smTzj/WDOXedV3jjDVuaUmEOh6U7uj/xuor1uj+ko8cOf2W/vniH3hmvHKsbOXF2OteKyeY0yWtQGLVNdr46CpSvD7H2qrNilf6w9eLvd63lVXYeQxqJ2nfJdr3sOtPEmxIICUJCqndJNE3085pVRUv0lp72p3OAzVlzPn+DOa2mXtmb9ZR5/cvzxZm3zXFOjL4SmU1M7GP/wEjefWV/m31Ou8Aro37pWVO1NPLpzl+/T9LPxzwz/H7MhTKpzEJ3iXTOI+errxuzm/PvZQ3Y3h8B5m1zxvOwL6JVoaxpqfzVZozOzBYZW6hWrrIfZDh2t+r6KYnVRFUX21E77NbGcec1uG6Nb+X/4nq3tX2PZ861tWrtvRXWlsZ0MPCsUU8FutrPjfDsQY8zNS+hz91TLHVbbJuHX1uwEaBL1u5jgee3nodmG6dr9FRDeRs7P+zSs7SMH2GdOLk//jOWl/1lnZ82LJl4zuZcyHWuuc8lnPZrZ4732c5dQVClX1L1bWoJGnj/djCaePNT0tx+xzr3BZtVhzT74fneOFW92Ot921i5ciTY5H23YHhW2yFeuU7V4QLsdY9t9O51XG37VJoHYGUFCrMuGTl5El93tyXPeeJwmpgnTt4l8+7UD/2+6Jv1td/rKqPT6u+6nnN3/ltDTrPDgR00eB58zXBr7eHmR3nzXs09aZHVWbPjlNfrbKHZ2nxyfGalRvGgKrRpt3KwvEXdcv1j6ncMxuON0/mKe2HF+kSe0gDM1DkbRN6monPmn64Nj4R+bgc38xbP+2uyxt7pXTL1dDsOAyE+sXnCurIUFerk180N+hZC5WhS9aDV51WzedfBayONT0dlJV3n+4OvIXKM8jwDD1SWu3tsXRaR0sfVcE1j0rTp/j3sgi7jGNN65nKmX53wN+PM+hj0rjzIf303kp18fsbs8hq9PaGN10ClgGcYb6s+4/D+tjv88VM37hnh9624yjWfcPP3eHvFOrYLVXHXc53eu8WvWJ/znjeD0i3WZd+4VQVXBbG547L8YNXndb7q59sCMqZmSNeeusMXfTjwCmi3ep18JE8a6L+rIu17pmzh13PQ6Sd1fEVaK023kp1RGUfh7oWKBV1vTcHoo1v1AyrjW/cvHEp2s+x1mmzXK+9GhNvlqJNv9k17Lofa71vHSs/lhAvaN9DwAStjqFeBR3LrIj6cy7Guhd2HXdLdOqsI5CSOmUZfk5MwGHXfY9pm9sPnMde1TNryl3G9TBftvZXmjv9Ah51H+rNPUe9XxpN5LVyvw76fVGytv9SB9/90P+YaT/QxLuu9B9XpG6fFg3po15TKzVxyXX+PUoyhmrBiw8F3DpjTTX8hPIH92mYCjlrlB6vn6KlhZcE9AKJc9q9BHWVT2ni8Okq2lzhzVuNyh95ssE1PUfTn57pP2NPfZVe2fA70zT7P+o+KNNbfl/SzPuR+vgf0jqAOg+ZoNGeL8ZnKeeGUcpuLqITdIzAFcZxT5n+3f7S63v7gNYu2tr8l+2YytDYlmzXQd85vQun/6A33nbUytp39cbemoCtvtS/v/Hb4PTFlB5zirTeyl+zVnOH+E84bSqlns7LVS/P9Nx9NGTeh7r4yeWa3a+zf7oiKeNY0+q2vxX08fztmDT+4s+65sn5uuY7gZXEClgWakjWJZpTGjCOiX9uQr9Kz9bk4u16c9k16npstWbcVKwKTwDSfF6YW1rmLN3TMD1z16GaW/KU8sMeF6Ql6rh7Njpc+kP9tfhBX4Csvnqz5tvpNrukZ8/Q+jV5/p9Z1qFC/M37B2ac+XCc31M+Q1Ww8Wvl5k3VTTe4DCI983JdOs32tPZtgc86t7pjSiy8z16TpEjquSP7LMYgkAhtvJX8SMs+6rrWAvXeJJ823q6D4bTx8fwcM+d1qwvRtlkhPof9r73inP5I6r5bXiP5jHXbP1oru8jDfaZ9D7qmbzfteyR1PNz6lITbfeNv5pGE6U64JGeZL01VR6sTLl3OBNWVFqpvXknQH71zG/9lexq2aq0aOUqLmuj232His9rac7VGLHjX/xDOV9nztPvlAnX3rTMXP6XP69nHntTGylNm7Vm6YOLPdMct12lwqJkqrF4nz72qN7YVe/exDmbtN13XXztZY3MCvqzqUNzTXlc6T1fuGKwtRReqevPL+uMftunRksqGL4Pmxp7cWwo0ZeJE/zxUF2v04IV635f34IUOE9foQNHgxl4k1peiSH38DvuVKpaM0fhV52vpvuUaG9P4KLUqmz1C+SXH/c7g/6KrJqzZrsW5gb+c+2+lSMswTLt3h+9Q/6bqd4eJWvX+Eg22OzrZyYo0PfZ+vmczVeLmLdr5+jqtcA4WOuRG3XjpAF1xw2B1D4xP+PaNsIxjTavp3bBlwwatW1bSML2u39+cmWLX+jv/sJcmzLxGPTxp/qY6/Wiky9+VLwMhF6zPm/6PnamHHy/UFZ6/Zytw8op+8+Jax9+LGVTVcrpquMaPywkIgIY8tOONeNbxhsO6fU42/G1m60+bN+g3z63wffakZ0/UXTdM1iSXtLsdx5Fwz6Lzb76+eqcef+hBPe2pQ26fIwFTcpoL2Amz79TNeXb9iv9nnV96Y6p7EdZzvxO3/YtkaN8tpXDqnL9mS7fx1tmiKPuI6lr86z1tvH8taXzVfBsf++dY49k8S7G2WWFeP9jXXvFNf4R1P6J6H+BkvYzVyuWQoVbRvjf/fap9tO8R1vFQFaqN18fSxhNIiVPhxVIIcUoCh0EgSKC+wgyA+1RPbVw9tmXGRwk6IysQaF2BeNdxty+jzgui1s0dZ0sEAdr3RCgF0uAmEO/PP7dzsA6BthKId/2mfW+rkkzs88bSxnNrT2KXLalDIAaBT/TSU9uVddUAgigxKLJrIgtQxxO5dEgbAgi0pACffy2py7HbWoD63dYlwPmbFyCQ0rwRWyCQnAI1+7S9akQYM6AkZ/ZINQKijlMJEECgvQrw+ddeS7595Jv63T7KOclzSSAlyQuQ5Ld3AWvciWIVDOhlBtwdqIJie6Bga1aRXaoacUUcBplt78bkv20FqONt68/ZEUCg7QT4/Gs7e87c8gLU75Y35gwtKUAgpSV1OTYCLS1Qf0Arf7ZUpcetqXSOqdQMIlphLZr1qx/9WMOH9Wl2+uWWTiLHRyAmAep4THzsjAACSSzA518SFx5Jb1aA+t0sERsktsA3Ezt5pA4BBJoU+PoLnfzMMR/x6WpVHTuus0sW6Lnv52lvzplN7s6bCCS8QKvW8Xp98fnn3uncE16GBCKAQKoLtOrnX6pjkr+EE2jV+k37nnDlnwIJokdKChQiWWjHAuk/1JUjz3cAvKtFgy/RxFVn6K55VzHIrEOGxSQVaM06XntAW1//0DuVeaPX6b1b9Er16cYVLCGAAAKtIdCan3+tkR/OgYBToDXrN+27U57lOAkQSIkTJIdBoG0EumjworVaNWOIunoSkK6uQ27XqjfXKj+rQ9skibMiEFeB1qnj1rSIP+g7Xot2HwtO/fFXNWtwHzMO0UStqnb0AAvekjUIIIBAHAVa5/MvjgnmUAhEINA69Zv2PYIiYdOIBL7xN/OIaA82dhWIZQ5q1wOyEgEEEEAAAQTaXID2vc2LgAQggAACCCDQIgKxtPH0SGmRIuGgCCCAAAIIIIAAAggggAACCCCQigIEUlKxVMkTAggggAACCCCAAAIIIIAAAgi0iACBlBZh5aAIIIAAAggggAACCCCAAAIIIJCKAgRSUrFUyRMCCCCAAAIIIIAAAggggAACCLSIAIGUFmHloAgggAACCCCAAAIIIIAAAgggkIoCBFJSsVTJEwIIIIAAAggggAACCCCAAAIItIgAgZQWYeWgCCCAAAIIIIAAAggggAACCCCQigIEUlKxVMkTAggggAACCCCAAAIIIIAAAgi0iACBlBZh5aAIIIAAAggggAACCCCAAAIIIJCKAgRSUrFUyRMCCCCAAAIIIIAAAggggAACCLSIAIGUFmHloAgggAACCCCAAAIIIIAAAgggkIoCBFJSsVTJEwIIIIAAAggggAACCCCAAAIItIgAgZQWYeWgCCCAAAIIIIAAAggggAACCCCQigIEUlKxVMkTAggggAACCCCAAAIIIIAAAgi0iACBlBZh5aAIIIAAAggggAACCCCAAAIIIJCKAgRSUrFUyRMCCCCAAAIIIIAAAggggAACCLSIAIGUFmHloAgggAACCCCAAAIIIIAAAgggkIoCBFJSsVTJEwIIIIAAAggggAACCCCAAAIItIgAgZQWYeWgCCCAAAIIIIAAAggggAACCCCQigIEUlKxVMkTAggggAACCCCAAAIIIIAAAgi0iMA3/mYeLXLkdnTQrO6Z7Si3ZBUBBBBAAAEEEEAAAQQQQACB1BCoOlodcUYIpERM5r6DFUyJpgDcj8ZaBBBAAAEEEEgEAdr3RCgF0oAAAggggED8BWJp47m1J/7lwRERQAABBBBAAAEEEEAAAQQQQCBFBQikpGjBki0EEEAAAQQQQAABBBBAAAEEEIi/AIGU+JtyRAQQQAABBBBAAAEEEEAAAQQQSFEBAikpWrBkCwEEEEAAAQQQQAABBBBAAAEE4i9AICX+phwRAQQQQAABBBBAAAEEEEAAAQRSVIBASooWLNlCAAEEEEAAAQQQQAABBBBAAIH4CxBIib8pR0QAAQQQQAABBBBAAAEEEEAAgRQVIJCSogVLthBAAAEEEEAAAQQQQAABBBBAIP4CBFLib8oREUAAAQQQQAABBBBAAAEEEEAgRQUIpKRowZItBBBAAAEEEEAAAQQQQAABBBCIvwCBlPibckQEEEAAAQQQQAABBBBAAAEEEEhRgRYKpHyiLdNy1HvaFtWkKBzZQgABBBBAAAEEEEAAAQQQQACB9ifQIoGU+qrX9MLeWtXt3aG3aurbnyo5RgABBBBAAAEEEEAAAQQQQACBlBRogUDKV6rctEkVdcarbo8eX3VAhFJSsu6QKQQQQAABBBBAAAEEEEAAAQTanUD8Aym17+g3W6u9kHU69souVRJJaXcViwwjgAACCCCAAAIIIIAAAgggkIoCcQ6k1Ktm90ZtO251R/E+jm3QM9s+sV/xjAACCCCAAAIIIIAAAggggAACCCStQHwDKfUHtPrRParr+gNd0DXdi1Krt1/fx6CzSVtFSDgCCCCAAAIIIIAAAggggAACCNgCcQ2k1Ffu0mvHOihn2gP6xZhM+xyq271Cqyu+8r1mAQEEEEAAAQQQQAABBBBAAAEEEEhGgTgGUj7RS09t0LH0AZoytq/65U9Xrt0pRdV67c0PGXQ2GWsIaUYAAQQQQAABBBBAAAEEEEAAAZ9A3AIpDVMef6luJoAyqnOa1HmARgzK8J7IDDq7dbP21jLqrE+eBQQQQAABBBBAAAEEEEAAAQQQSDqBOAVSvFMeq5+uG/8DmTCKeZyrUTMmq5tNcny7Xtj9qf2KZwQQQAABBBBAAAEEEEAAAQQQQCDpBOITSKnZoWdWVavrmDyNz+rgQ0jLvkJXd7Pv7zGDzq5/TVV0SvH5sIAAAggggAACCCCAAAIIIIAAAsklEIdAipnyeM8OvV2XqVHXXir7Zh4PQ1pfTbvrctmhlLr9m7S5kkFnk6uKkFoEEEDAFqhXbcUGzRmZrazumeZftkbPLlZZ9Wl7A54RQAABBBBIAAHaqwQoBJKAQEoLxB5I8U55rCHTNS3nzACsNHUeMkGjfVMhM+hsABAvEUAAgSQRMBelpb/Q1WPmamPlKW+aT+n9koXKv3aWthBMSZJyJJkIIIBAqgvQXqV6CZM/BBJBIMZAivmgemuzXjp2rkZPHajObjnKuFSTfFMhm0FnV63QSzXc3+NGxToEEEAgYQXqD2vTs9UaWLRF5UerVXX0iMq3zlOuFSg//oYeL/mAmdkStvBIGAIIINCOBGiv2lFhk1UE2k4gxkDKpypdv13Hu43QpMu6hMjFmcoeP145vvt73tX2PQw6GwKL1QgggEBCCtRX7lb1pGVaPDHHewtnmjJyCvTs8mlmUHETJH9llyqJkSdk2ZEoBBBAoD0J0F61p9Imrwi0ncA3Yzl1w5THtVLds2aQ2WfDPFStSh99XhWjC5XTML1PmPuxGQIIIIBAWwmk5dymBTnBZ087r6d6mUD5p9/vqfP4TA8GYg0CCCCAQKsK0F61KjcnQ6DdCsQQSLGnPB6qpeXLNbZzU1fQZkDazbfo0pk7ze+W5nGsVDsrf6acoDFV2m05kHEEEEAgKQXqPz6sQ3Xnh769MylzRaIRQAABBFJNgPYq1UqU/CDQtgLRB1K8Ux53y1+oUU0GUawMmkFnR09X3qN7tOKYFUo5pDVP7dC01WPdx1VpWxPOjgACTQnUVmjLxt/qj68U65Xej+tA0WDfzFxN7eZ5r75aZc+9qje2FTsGLD1LF0ws0Kjh1+j63EzzaRHu47SOlpaoZH2xVuw+5tkpPXui7rphsiaNs28/afpYdaWF6ptXotBzznTVhDXbtTg3Q81va86VPU+7Xy5Q94DTNrlviH0CDpGgL00ZvHdAn104VQUhb+9M0KSTLAQQQKBJAWvWl1e06c1XtXb5bh33bdtNubdcrxHDxmpsjuvogL4tGxdorxot2mqJ9qqt5DkvAqkqEOUYKadVtWWjZ8rjq4f1Ce+LT1ofDf1Jps+xbu8OvcWgsz4PFhBIaAErALLmyYZpb/uO1awFjzgCIeGlvL76dc0fM0r5Dwbua8388ogeyrtSg24q0dFwxtkw6dk1b5KG5xXrcJ97tbvKGvz0Q+342ZnaPmeSrp5WrIra5g+UnrtEHxx9T5uKrtUF9jhOnux009Blu3To6O89QRRrlWfbqlKtmjFEXf2ynK6uw5Y0pMEliOLb1xqcdfOMxvN0Haq5W99TVYh9/E6RqC9q31bxc9/UXUuvU1b4EbBEzQ3pQgABBLwCNSpfMkEDxszW2kM9NdP6rPYMsl2tQ2X3qs+hdZo1ZrBGL/m9zA3uTT9or5r2aa13aa9aS5rzINBuBKILpNR/oM3Plct9yuNQdmcqJ3+6cu0vK3X79MKWw8zyEIqL9QgkjMBXqnj0Cb3x1w7qcdWIxkBAJOmr3an5196pDb5pc912rtPxN+/R1FuaCabUV2mL+TVw+gvV6n1LkZbePVTdPV/iO6j70EItm91PNbsX6tq8NapqPpZiEtJZORPv0X35vRoT1eHHmjQyKzhInJapwXcv0kMTz2/c1uw/cPIwbxocq4MWzeCs/abpjjEmDJM+QHPXP6H8sH/NDDpYHFaYcl1ypbK6Z4bxL0cFmz8JOOcJlS1cJ5nAWH5Wh4D3eIkAAggkq4D5sbB4hqYu/5M6D3tI61cW+vU8Scscqp+vLNbcC6X3l09XfvHB0NeytFdxqgS0V3GC5DAIIBBHgSgCKWa8k20rtKapKY9DJbDzAI0YlOF995QqVq/T3jB+NQ51ONYjgEBrCJgg6N2PavHNBcq/+SE9Nrt/hCc1F0ArHtZG0y+665CbdM+aUtPTw+pBYv4d2KKltzh7eFjBlEVasC3wS7t9SnOBu+YezXvT3MrT9RrdMf0i7wwy9vsdlJV3t/K6patu/5MqXNPEBa69i+c5YHax0yZtntsQ/TbyvuiiwYW3NwaFze+RB6v+4rZh8DpzUf3u72qUPmiCxrR58MGUa+Ebvl9Z7V9b3Z8rVDzuXEd+rF9r79Omi+/XgtxQM7Y5NmcRAQQQSBaBmte1uGifGdMvU6NuucY9SJ7WWzfMGKEOMteyRY/oJdce1rRX8Sty2qv4WXIkBBCIl0DkgZTaUi1dukd1HS7WlQMjvYDuogsH9GxM+/FNumdhqXu3yNrfq2hktueX0t4jl6mcgEujG0sItJlAuv4xK9NcPEbw8Iyn9N+64Jbn9NrqubrROQ5KRo7GFq7Qa85bXswnQulzr+mo2yl8F7jp6jZmnAZluNxP4ruN0LrAfUBrq0KPgOI8RVrW1ZriC/Qe1h/2n3C+7b/sFxQ+rYP7/qQa/y1cX9VX7tJrx76lgVcNSOLxocx95puLVNzpdj0xzqXXjmvOWYkAAggkg4D5sXDPDnPruklrh77q/8MzQyY6PbOHPFe0de/rj/92Kng72qtgk1ZfQ3vV6uScEIF2JBBBIMUaKKtYc66faX5ZNi3M6e16fP6GsMYhsD3rq3eq+JWD9kvzbH59Lpmpn84OPE6djm58VCu8twHUVa7SLzdWOfZjEQEEkkWg7t/+oHcH3a/VhZcE9B6xc2Dd8nKbuSVnQOOgtYeOqNozxZe9jfVserasWqFSz/pvqVeP7wbfeuPZ3PQuGZarbtZyXbme3/RB6G7Xnu3t/87RZVf196ahVm+/vq+J4Mi5GjVjcsM5rNOENeaTmenszVIdS++vEZefY580yZ6ti9L7tODIaC0u6O3wN+t3LlNRyJ5ESZZNkosAAu1U4GudOlnbMMNkkz0Tm+OhvWpOqOXfp71qeWPOgED7FggzkHJIq0bmaEjeQscAk9YAkXM1vm8PZY0sdv/12Gdr7d9HvQbf5jJGQuNxfjC7rKHxMl9luk+4S9OzzzJHMAM5Dvm57puQ5TsaCwggkCwCX+lP757SlBnDm+mBYW7JGTtBA+0xlNyyV/+hdr5S7X3nO+r5Pfs2weCN087rqV6eY9Xp2Cu7VBnWWClmdrHLh/vS0FxwJC37Cl1tbiHyPOr26PFVB5oO2HjTnz5ouC5rdqaz4Dy1/RrronSWps4sUenyKernN7ZKHw259T/UY2CyBojaXpcUIIBAogkc0PMllSE/1+uqj+iwleT0C3TRv1jXq44H7ZUDoy0Waa/aQp1zItDeBMIMpPRS/ssfhr6XvtlZJ5rZ3ztewgfOaVQzLtHslyvNOQ/pndUFynHrwt/eSov8IpB0AtZ9zc9odk7o7tG+LJ3dUb74wrc7KSPg06nhthhvN5X089XjvDN8uwYtZJyvnud4gxzHSrWz8qugTVxXOG/ZaS44kvZd9fj+t7yHaT5g05D+TOU1G1RyTVkbrzTd3TffruEzX3VMAeqfpOQNEPnng1cIINCeBdL1Tz/q5+1taD7XVy3QsnK3GzdP6Lc7/qDT1o99YyYo19d4NdjRXrVlHaK9akt9zo1AexII+KrSnrJOXhFAIKEEvvhcDeP1mfFPfnKFsv2GP6lX7X9W6VM7wWkd1fFsvw3sdxqe085Sp072+x/rd++ZwWnDepyj3KkjvNMbNxMcqdmn7XsdE182GbDx3tbTLVdDs8MIKnnSan5RK/21Vswepd69C1Vm3+pkTUVdXKjRPe3Zdgaq4OGdAdNGG6+KbQ372j1HBuTrkdLqkL+uNs1jeuuMW6mD9iDBLs8HV49tptdR02fgXQQQQCARBNJyrtMdQ7w9HusqtGJynubvdH52Wr0dHtQ9JR8pPXu6npiXG3DbKu0V7VUi1GTSgAACLS1AIKWlhTk+AgiEJVD/8WEd8gQLMnX1sD6O8Tes3f9XHx/5yHvrn3nZq4cym7oNyO+M9fr85KkwAwhmvJbLxmmUfctOyOCId0BCdVHXLnZCqvXamx+6n8fTzftjlwCRX0IbXtRWaEvxIhUMyDa3U/5CRaZreWMMpUQ3X3ql8heU6H17pY6p9KmbNHxCsXe6Z2tGnQkaMOYuv311fLeezhulSU1N1emSHFYhgAAC7UvgXI1dVqQJXe1bNyu1oeB63VxcboZCN0GS8qd155w3pCHz9OK6O9UvqMc07ZVVX+qraa/a198NuUWg/QkQSGl/ZU6OEUhAAW+PDZOy9CHTNS3oVqC/qrbmiyjTXafPzL5fh7u3b9Yfa4dQwZFP9dbr70qDbtejN/XzDlAbqgeLufB+a7NeOnaeS4AoMFG1Kls4S+v2VerfrUG9HQ/rovT2hw7oRwvf8E4f/Z42zR/q7T1jBrzd/4wWb6tQ2exJuv3QQC0v896OWVWqFVOyvWlsaqpOx8lYRAABBNqzQMZQLXjxIQ21gylWwHrBjfrptH/V1ZP3qveC35hZ6ELddk57RXvVnv94yDsC7UeAQEr7KWtyikDiCtS+o99sNQPJpg/Q3fOuauNbRByz/pi+IK6D1Xpu65GZxjhXFzkHyXXtwfKpStdv1/GwbuvJ0OCiXdq2+kXt3Xqzb1Yga5a0p371D5q1cqHyfdNHd1ZOwf2aaXdBt6aNnnm7fnPxCu1dfZcGZ3onqU7L1BW/vFd5di+bUFN1Jm7tIGUIIIBAqwukZU7U0y8+psmeiQ+s05vJEXab2dz6XKgr+vcJuJ2n1ZPnPSHtVVvJc14EEECAQAp1AAEE2ljgtKo2rtG24x2UM/s+3ZjlDQC0Yar8ZuQJCo7Yt/V4pzF2DlBrerC89OI7JqTheHiCLl+Gd1uPY7e0jE7qaL/uMEJ3PHCVutvDvtjr5ZyyWeow8UE9OS4r4LYos3Falvr/uLN3r1odrPqL7wgsIIAAAgi4C6RlXqzxPxng6/lnbVVX+StNHzYpYNwU9/1bYy3tVWsocw4EEEAgWIBASrAJaxBAoBUF6queV2FRuToPu0cP5/UODgK0Ylp8p2ry9h77th57GmNnMKNOx7duVGnDqLnmcHbQpZ+uG/+DyPJ2dmf5hl/xJSxwIU1nd+zoO+7pg0f058BNeI0AAgggELlAfZW23DRa41efoZll7/jdSmmiKZ5xU27bXOU+LlbkZ4t+D9qr6O3YEwEEEIhBgEBKDHjsigACMQrUH9TaWU/qT33MzAdF41x6XNjH/3tldD7bfhHhc7q+bfaN7MMuoLv01s3aW1vfcF7fbT0DvLcgmRltLh+ugfaYs3Xvavsee34hO+gyQWMi7WnjnA46whyzOQIIIIBADAK1v1fRmDGaVdZNc9cv1djMc82tlMv12tZ5ynWMm7Jz5k8VHEyhvYpBnl0RQACBpBGI7LtF0mSLhCKAQOILmNllHp6nhz+5TAsfv81l5gNnDs7QeT3O9w6Y6lwfYrn+lE6e9AY+9C0zyc93fb02QuwRtDote5Suu/CshvXHt+uF3VZwxO5h4r2tx97L7/aeWr39urmP3novKOhi78AzAggggEBCCpgA/6q86VpRqYDbTc2sbjkFejZgENqdc+7R2qrTjqzQXjkwWEQAAQRSVoBASsoWLRlDIJEFTuvo5vt1+6ozdLfn177mxkUxF7DfyzIjgngfh46o2n9SG/udhuevv9DJz+wNvqOe38vwfz+cV2k9NWbqAG/wxg6O2D1M7Nt67AM5b+8x99Dv3aG3aupUs2eH3lZA0MXehWcEEEAAgQQTMMHybY/o4f2nPIOfTxnbMygI3zAIrWNGn7pyPb/pA8ctPrRXCVaoJAcBBBBoEQECKS3CykERQCC0gJkOuPRBTZ3zZ43a8JTyw7zlxW9AvdPVqjpmB0pcznTsiA7aPxCGNVuOyzHM5bPzlh1PcOTQb7V9rzVbj31bj72f2XbIBI22u3xbt/fs3qOt6/eZKZIDgy72PjwjgAACCCSWQEOw3NO6nJOlzIygEb49yfUEU9bPUo7nls7g2d1orxKrVEkNAggg0BICBFJaQpVjIoBACAETRCl/TD+99aAJohRrdj97JpkQmztX+w2od1h/2H/C+a7fcl31ER32rEmPeLYcvwM5b9mp26e1d68M3cMk41JNGpPp3d30YHnkXhXvT3MJuvidgRcIIIAAAgkj8D86ecIbhe9kZk5zj6N4UpuWdbWmDPL2dvzspGq/dmSC9sqBwSICCCCQmgIEUlKzXMkVAgko4A2iTN6mrguWamaTQRQzJXLxTbp58yeOfJgBYMeP9/4C+KUOHflvR1dqx2b6Sn9694A8l8LpUcyW4zyU3/TCp/TvlVVN9DBxDlBrbu85flyfdR2hKUN8NyT5HZkXCCCAAAKJJvAP6tTFe6vpyZP63B5qyzWZXXThgJ6ed9IvvVjZ9oDjnjW0V65krEQAAQRSSIBASgoVJllBIHEFHEGUxb/S0+Oygu4796W9tkJblszQ9UXSsMv9gxBpWddpyWxr3BLTldo5k45vZ7NQ/6F2vlJtFs4KGCjQuVG4y/6390gZTfYw8evObVLZbcw4DQrRNTzcFLAdAggggEBrCTjGuzpWqp2VXzVx4hPav8/q++jeLtBeNUHHWwgggEAKCBBISYFCJAsItJ5Avb74/PMQPUFCpcIOojyl9+uOaefMK9Sre6ayQv3rO1azlu9WjevYIh2UlXef7rZm0zn+qp7eeDggLaYny5qHtcaMn5J+4c+0JK936IBNqOQGrnfe3pPezMCxft25M3X1sD7Rn985zkvIMWGiK4/PT54KcAvMNK8RQACB9ihgguejC7VwWDeT+UNac99ylde6dUux2rUXtW5vrWlrbtWc0ee6YNFe+aPQXvl78AoBBJJdgEBKspcg6UegNQVqD2jr6x+a/iANj9N7X9RzFZ6JfkOkwpqd505dPc4KooTYxHW1+y98nk3Teit/zQpNz5Yqigo1v6RCtdYb9dUqe9j0ZFlQbgZ+nacX1+Qpq4n7211P67ryHOVOHaGu5r101+COcyfH7T1RD3Jrjmfysqv4VR30HfqgXi15ryGfvnVmofaPWv3cPl956MNXVbyzOiBIYl3wr9bjW49797R68/xKL1V7xwFwHo9lBBBAoL0LpGVp7PJfaakJptRVPqWp18/TqlLH56rV1hTP008nr9CJQc20NbRXjbWJ9qrRgiUEEEgJgW/8zTxSIidtnAnr1/Wqo9btBDwQSD2ButJC9c0raRh3xDV7HXTB/Je0raCX/7vVxRo9eKHe91/b/KtuN2vTW4XKaTIQUqOKzav0zNLVKj1uRWnS1XXIjcqfOlnX52ZG3xPELXX15Sq67BYdvmubise5/fLo2Mmz7b/qtZ/8WqWF/SJMR52OFk/VkAXvOg7oXLSdpVUjR2lRZahgSH/NLVuv/G6/1ZwL8rQx1GbZ87T75QJ1d56CZQQQ8BOgfffjaEcvzA8BpZu06909Wmt6SdqhaKmbcm/5V/24/7AI2hraK9qrdvSnQ1YRSCKBWNp4AilxKuhYCiFOSeAwCCCAAAIIIBBnAdr3OINyOAQQQAABBBJEIJY2nlt7EqQQSQYCCCCAAAIIIIAAAggggAACCCS+AIGUxC8jUogAAggggAACCCCAAAIIIIAAAgkiQCAlQQqCZNDzomMAAEAASURBVCCAAAIIIIAAAggggAACCCCAQOILEEhJ/DIihQgggAACCCCAAAIIIIAAAgggkCACBFISpCBIBgIIIIAAAggggAACCCCAAAIIJL4AgZTELyNSiAACCCCAAAIIIIAAAggggAACCSJAICVBCoJkIIAAAggggAACCCCAAAIIIIBA4gsQSEn8MiKFCCCAAAIIIIAAAggggAACCCCQIAIEUhKkIEgGAggggAACCCCAAAIIIIAAAggkvgCBlMQvI1KIAAIIIIAAAggggAACCCCAAAIJIkAgJUEKgmQggAACCCCAAAIIIIAAAggggEDiCxBISfwyIoUIIIAAAggggAACCCCAAAIIIJAgAgRSEqQgSAYCCCCAAAIIIIAAAggggAACCCS+AIGUxC8jUogAAggggAACCCCAAAIIIIAAAgkiQCAlQQqCZCCAAAIIIIAAAggggAACCCCAQOILEEhJ/DIihQgggAACCCCAAAIIIIAAAgggkCACBFISpCBIBgIIIIAAAggggAACCCCAAAIIJL4AgZTELyNSiAACCCCAAAIIIIAAAggggAACCSJAICVBCoJkIIAAAggggAACCCCAAAIIIIBA4gsQSEn8MiKFCCCAAAIIIIAAAggggAACCCCQIAIEUhKkIEgGAggggAACCCCAAAIIIIAAAggkvgCBlMQvI1KIAAIIIIAAAggggAACCCCAAAIJIkAgJUEKgmQggAACCCCAAAIIIIAAAggggEDiCxBISfwyIoUIIIAAAggggAACCCCAAAIIIJAgAgRSEqQgSAYCCCCAAAIIIIAAAggggAACCCS+AIGUxC8jUogAAggggAACCCCAAAIIIIAAAgkiQCAlQQqCZCCAAAIIIIAAAggggAACCCCAQOILEEhJ/DIihQgggAACCCCAAAIIIIAAAgggkCAC3/ibeSRIWpI2GVndM5M27SQcAQQQQAABBBBAAAEEEEAAgfYqUHW0OuKsE0iJmMx9ByuYEk0BuB+NtQgggAACCCCQCAK074lQCqQBAQQQQACB+AvE0sZza0/8y4MjIoAAAggggAACCCCAAAIIIIBAigoQSEnRgiVbCCCAAAIIIIAAAggggAACCCAQfwECKfE35YgIIIAAAggggAACCCCAAAIIIJCiAgRSUrRgyRYCCCCAAAIIIIAAAggggAACCMRfgEBK/E05IgIIIIAAAggggAACCCCAAAIIpKgAgZQULViyhQACCCCAAAIIIIAAAggggAAC8RcgkBJ/U46IAAIIIIAAAggggAACCCCAAAIpKkAgJUULlmwhgAACCCCAAAIIIIAAAggggED8BQikxN+UIyKAAAIIIIAAAggggAACCCCAQIoKEEhJ0YIlWwgggAACCCCAAAIIIIAAAgggEH8BAinxN+WICCCAAAIIIIAAAggggAACCCCQogLfDC9fdTpaPFVDFrwb3uaOrdKzJ+qun/RWlx+N1Niczo53WEQAAQQQQAABBBBAAAEEEEAAAQSSSyDMHinp6l5Qoqqj1ao6sEWLJ2Yr3ZfPdHUdtkS7q8x71vv2P7Pd0vk/12htV9GCBzVrzI/Ue+Q8bayo8e3JAgIIIIAAAggggAACCCCAAAIIIJBMAmEGUhxZysjRhMIbNNAXSUlTl/591T3NsY21aLYbW/AzLX65TCW35HgCL3WVL2rOmHGaU3oiYGNeIoAAAggggAACCCCAAAIIIIAAAokvEHkgxcrT2R3VOTBwEjKvndWvcIWWTzzfu8VH2jh9vrbU1IfcgzcQQAABBBBAAAEEEEAAAQQQQACBRBSILpAScU66aHDh7cq1e7HU7dHjqw6IUErEkOyAAAIIIIAAAggggAACCCCAAAJtKNBKgRSTw4zz1fMcXyRFnx76SLVtmHFOjQACCCCAAAIIIIAAAggggAACCEQq0HqBlLSz1KlT4/1AdSdqdCrS1LI9AggggAACCCCAAAIIIIAAAggg0IYCrRdIqfuzjhw67ctqepfOOsv3igUEEEAAAQQQQAABBBBAAAEEEEAg8QVaKZBSr5qXX9Q2XxwlQwOvGqDOie9DChFAAAEEEEAAAQQQQAABBBBAAAGfQKsEUuqrN2v+0j2q85w2XV2HzdX80ef6EsECAggggAACCCCAAAIIIIAAAgggkAwC32zJRNZXl2ndGzv00rISve+JopggypBZeqponLo3DpfSkkng2AgggAACCCCAAAIIIIAAAggggEDcBOIQSDmt9xdcqawFzaUpQ7nLXlPxOHqiNCfF+wgggAACCCCAAAIIIIAAAgggkJgCcbi1p4MumP+Gqo5Wu/w7ovKtj2ru/JuU2/VLlc68VFkD8vVIabXqE9ODVCGAAAIIhBSoV23FBs0Zma2s7pnmX7ZGzy5WWbVvAKyQe/IGAggggAACCCDQZgK1Fdo4e5R6e65fMtV7ZKFW8Z20zYojFU4ch0BKUwxpysgZrfyCuXr2xYc0tGu6dHy3ns4bpXFLfq/apnblPQQQQACBBBIwQZTSX+jqMXO1sdKevP6U3i9ZqPxrZ2kLwZQEKiuSggACCCCAAAI+gdqdmjN8kuaUVHrH7JTqKku0KO963ba5ih/4fVAsRCLQwoGUxqSkZY7UrGn9ZEIp5mEuvpfP1eLSE40bsIQAAgggkLgC9Ye16dlqDSzaonJPD0Srx+E809vQCpC/ocdLPuBCJHFLj5QhgAACCCDQTgVOq2rjb3Rk0IPadOBIwx0UBzZp7pBuxuOYdj66SZXcKtFO60Zs2W61QIrUQd1/1Ffn+NL7kbatf1s1vtcsIIAAAggkqkB95W5VT1qmxRNzlOFJpNXjsEDPLp+mbub3nWOv7OJCJFELj3QhgAACCCDQXgXqP9BL1ddoRdFk5WR4ZzvJ6Kf8lY9pejfzY9CxUu2s/Kq96pDvGARaMZAipf3wIl3SoTG1de/8QZUNcyI3rmQJAQQQQCDhBNJybtMCl8HC087rqV7mOiT9+z11HrOxJVy5kSAEEEAAAQTatUBaP/184Wh1DkRI+656fP9b5gLmfPU474zAd3mNQLMCrRpICUpN/ef6/Av6UgW5sAIBBBBIEoH6jw/rUN35Gj11YPBFSpLkgWQigAAC/gI1qtj8dMPA2iOLddT/zXb+6rSOlq5T0bSBysKmndeFJM9+/X/ryH+cVtcxE5TbmV+Ckrw02yT5cZj+OIJ0f/G5apxxk7SO6ng2FTcCQTZFoO0FzKjnWzb+Vn98pViv9H5cB4oGe8c+CiNp9dUqe+5VvbGt2DFg6Vm6YGKBRg2/RtfnZir8TwTrYq5EJeuLtWL3Mc/J07Mn6q4bJmvSOPv2k6bTVFdaqL55JQo950xXTVizXYtzM9T8tuZc2fO0++UCdQ84bZP7htgn4BAJ+tKUwXsH9NmFU1VwWZcETSPJQgABBMITqK8u07qS9Vq1fLeO27tk2wvt/Nlq+zds0LplJXrf7k3e7mysmete0aY3X9VaZx0xN7jm3nK9Rgwbq7E5Qf0eXCoO1y8uKK2+qv7ofv3xs766cfpA7y3LrZ4ETpjkAq3aI6Xhl0tbLF1dR16hnIbRZ+2VPCOAQCIKWAGQNU82/DrXd6xmLXjEEQgJL8H11a9r/phRyn8wcF9r5pdH9FDelRp0U4mOOoOtoQ5t0rNr3iQNzyvW4T73aneVNf36h9rxszO1fc4kXT2tWBW1zR8oPXeJPjj6njYVXasL/D6Lumnosl06dPT3niCKlQzPtlWlWjVjiLr6pct8lg1b0pAGlyCKb9+jZnDWzTMaz9N1qOZufU9VIfbxO0Wivqh9W8XPfVN3Lb1OWeFHwBI1N6QLAQTatcAneumhZfpdzf+1awX3zNeqbOEsrTvcnseRqFH5kgkaMGa21h7qqZlW++0ZeL1ah8ruVZ9D6zRrzGCNbm5WUq5f3KtYq689ob0rXpJm3qcbsxzjTrR6OjhhMgu0XiCl/qDW/nK9GRvZ+0jvRwTQtuAZgYQW+EoVjz6hN/7aQT2uGtEYCIgkzWbaufnX3qkNvmlz3Xau0/E379HUW5oJptRXaYv55Wf6C9XqfUuRlt49VN09X+LNgNZDC7Vsdj/V7F6oa/PWqKr5WIpJSGflTLxH9+X3akxUhx9r0sis4N4xaZkafPciPTTx/MZtzf4DJw/zpsGxOmjRDM7ab5ruGGPCMOkDNHf9E8oP65eroAPFaYUp1yVXKqt7Zhj/clSw+ZOA854wF9brJBMYy+ciJMCGlwggkHwC52rs6ldVXLRaLy8bGn5Py+TLaBQpztDgol3atuwxrV7cHm3MrC/FMzR1+Z/UedhDWr+y0K/nSVrmUP18ZbHmXigzK+l05RcfdJ/FjuuXKOqe+y71FUt0WVjXL5nqPW1LwOQmpmdR6RN6XHdoVUHv4Gs991OyFoEggegCKYG36AQdNmCF54OjQIv2n/K+YX7tXfyQewSw9vcqGpntubDvPXKZysP4VTngbLxEAIG4CpypnLsf1eKbC5R/80N6bHb/CI9uvrCveFgbTT/prkNu0j1rSk1PD6sHifl3YIuW3uLs4WEFUxZpwbbAL+32Kc3FzJp7NO9NE5Lteo3umH5RQHfMDsrKu1t5ZhT2uv1PqnBNiIsZ+3C+5zOVPX58Yw+50yZtx+y+y76NvAtdNLjwduX6erDU6mDVXwI3cn9tPgvf/V2N0gdN0Jg2Dz6Yci18w/eLmv3LmvtzhYr9Bpq1fpm7T5suvl8Lcrmlx72wWYsAAskpkKazO3Zsx1+uPtGWJRtCjAuTps4X9lfv5CzY6FNd87oWF+0z89NlatQt17j/cJLWWzfMGGHmKD2liqJH9JLfWAbWqbl+ib4AgvdMyynUW/a1ZDPPB1ePdYzhZoIo5U9o1qYL9NiioQHXkMHnYQ0CTQlEHkgx90huXPKc3vZ9x6jXiX2btba0Ojj6at1PWbxIBZeO0Czri4/16DpEt61Zp6fHufzaaz6ijm58VCu8v1rXVa7SLzdWNezH/wggkAAC6frHrExzoRDBo2aHnln137rgluf02uq5utE5DkpGjsYWrtBrzlteVKvS515zv4jzXcykq9uYcRpkT2PnTE5aHw39SaZZY13MPKC1VaFHQPHbLetqTRnUMLGvdFh/2H/C+bb/cucBGuHb9rQO7vtTwK8d/pvbr+ord+m1Y9/SwKsGOBp1+91keTb3dm8uUnGn2/WE6+d4suSDdCKAAAII+AtYv9Q/pWXv2D98+r/bPl/Vq2bPjobvPR36qv8PzwzJkJ7ZQz2td+ve1x//LcCQ65eQbq35Rn31Zs1fkaE5T050D4i1ZmI4V9ILhBlIMQGO4okN3b/N+AhzSipNyMN+mF+Qd6804xvkqldgFyvPWAorVapBmj5/nuYu26Lyfav0c+cXKfswnud0dZ9wl6Znn2VemXEHhvxc903I8tuCFwggkFwCdf/2B7076H6tLrwkROTfuuXlNnNLzoDGrtSHjqi68UPGm2HTs2XVCpV61n9LvXp8N8QvhqZ3ybBcM/SbedSV6/lNHwQHeV0Jz9FlV/X3pqFWb7++r4ngyLkaNWNywzms0+zdobeCfn0KPMlXqnyzVMfS+2vE5ecEvpkkr60gyn1acGS0Fvt1hzXrdy5TUcieREmSPZKJAAIItGeB2j9q5WOvNg60254tfHn/WqdO1jZ872myt6pvB5cFrl9cUFp9VX11iW5/6M/KK7reb1w3awy/e5e83sQ1X6snlRMmicA3w0unCXAUlKiqILytY9oq4xLNfrlSs2M6CDsjgEBiCHylP717SlNmDG+mB4a5JWfsBA00XWcbAiUuqa//UDtfqfa+8R31/J7deyR427TzeqqXufXmWF2djr2yS5V391NOs4Ohmi7Llw/XwPSdnjQ0BEdGaWyIKfHSsq/Q1d1Wa4V1C1DdHj2+6oBGFfYLEdwxafSmP33QdF0W4pjBOUmkNVYQZZamzrQuskvUb3lA2tKHaum+ZA0QBeSFlwgggEB7E7Buw589u6FXeLubjSfcwj6g582PyTeGaOvrqo+Y/qzmkX6BLvoX60dh74PrF1uizZ6tIMpt196jncfrtKPvEwHpyFDusteauU4N2IWXCBiBMHukYIUAAghEI2CNw/GMZueE7grrO+rZHeWLL3y7kzICPp0abovxdlNJP189zjvDt2vQQsb56nmOdxCTY6XaWRnmTAPOW3a8wZGQ49WmfVc9vv8t76m9AZuQG5s4iue2nkzlNRtUCspNAqwwXZs3367hniCKe3LSBw1P0gCRe35YiwACCLQXgYZZ9cY03obfXjIeVj7T9U8/6uftgWra+lULtKy8xmXPE/rtjj+YkVBMj/oxE5Tru6Cx23+uX1zQWmdVzRbdPKzQE0RxPWFS9xR2zRErW0kg4KtKK52V0yCAAAKBAr5BrM34Jz+5Qtl+PUjMfdv/WaVP7X3SOqrj2X4b2O80PKedpU6d7Pc/1u/e880X5r9d0KtzlDt1hHd642aCIzX7tH1vbeMRmgzYeG/r6ZarodlhBJU8RzU9QEp/rRWzR6l370KVea/BZE1FXVyo0T3t2XYGquDhnQHTRhuvim0N+9q3XA7I1yNuY1k15qCJJdNbZ9xKHWxiQDf/wdyaOBRvIYAAAikl4Pistj9vzXPvkYVasaYs4LM5IOPWWIJL8nWpvV/PUZrz7K9VVn1a9RWP6ubiQwE7eF9Gu1/Q0WpUUXyTBg2+zX9WvcqFGmKnqXsfjQ6VDsfx6qvLtNaZl7DaHHe7rO6mXVtSrC0VbgEL+6TWvutUNG2gskYW+8ZViy4d9jHdn9NyrtMdQ7y9YOsqtGJynubvdI4NadKy+UHdU/KR0rOn64l5uY5bmbl+advrF1Omnceq+LB3kgO365jDK0P2PnavEaxFoEGAQAo1AQEEEkKg/uPDOuQJFmTq6mF9Am6R+V99fOSjxrGZevVQprfDSfOJr9fnJ0+FOU6KGa/lsnEaZWb98TxCBke8g8+pi7p2sRNSrdfe/ND9PJ5uvR+7BIhcUm8P0j0gW0PyfqEix5hUVtfUmy+9UvkLSvS+HVgxk8qXPnWThk8o9k73bM2oM0EDxtzlt68ZzEpP543SpFDTMrokhVUIIIAAAk0I1JZr1bThmrr+z+py7ZqGYHNVqVbNGKLOlSUqejBPw8c8oF0mMBL48HyeD5+iZYcu1lMHjjTMoHZ4jSZ1+bNeuDZbvcasdB2rJNr9As/f8LqzcgpW6h3ry2XZPF1gb5Q9T7t9Xzg/1LaCXvY7Ls8miLDzAY0blqeHlu9uTLOnzblR80tDDNxu3Up001DTzj2odTXX6EWPwRGVb52n3K6fqnT5Qs0yg8rPCdzfaiOftX5M6GP2vU8rdts/lDSVjut12+Yq9/bZJUfBq8zU2MuKNKGrt72vq9SGgutNoKvcDI9vAiXlT+vOOW9IQ+bpxXV3qp/fQPhcv1ieXL8E1yrWJL8AgZTkL0NygEAKCHh7bJicpA+ZrmlBtwL9VbU1X0SZzzp9Zvb9Oty9fbP+WDuECo58qrdef1cadLsevamfd4DaUD1YzEXWW5v10rHzXAJEgYmqVdnCWVq3r1L/bu7jdT6si5DbHzqgHy18wzt99HvaNH+ot/eMGaZl/zNavK1CZbMn6fZDA7W87MOGC3NzUb9iSrY3jaGmZXSeiWUEEEAAgWYFan+voutv1MOfT9W6lYUam9O5YZe0TA2+28xGt+Zaz+dzXeWvNOOOp1Ve67j3s/6g1s58SDu/+VM9tbJAOb4v3iawMa5Qz66fpRw7Ru9MSLT7OY8R1+XTqt48V3du6KDrS95zaXM+0sZ716jCkfWG059Q2dxpDbcSpV+umUV5XgPzY0ZOgZ5dPs17K03g/t428t2PdcKvibTSMUs3PPm/mmqn4+h7Krklx9v2HdPORzepMigdEWBkDNWCFx/SUDuYYv2IseBG/XTav+rqyXvVe8FvzMyEzrK0j831C9cvdl3gOdUECKSkWomSHwSSUaD2Hf1mqxlINn2A7p53VRsP+OWY9cf0gfEMVht48eW5rUdmGuNcXWQNkmtf8Lr2YDG/rK3fruNh3daTocFFu7Rt9Yvau/Vm36xAOr1dT/3qHzRr5ULl+2Y9s35JvF8z7e7G1rTRM2/Xby5eob2r79LgTO8k1eai/opf3qs8u5eN27SMyVhnSDMCCCDQZgJmFpYV95uBWb+rvF9M9ZsBpCFJ/r0b6yp/rWd3+25OlT5+W6/uD5ge15GXtKypmp/v0gsk2v0cx47rYmWxHi8fqscCAkl+bc6xcpV/7Bf1kGre1gtbP2pIyjlZyvQFkhpWpf3wIl3ibcLkt7/dRv5aLy8b6g2SmH2sdByZopdeXqgJdkDLXEn0u3t+Y9vn2j5HppGWOVFPv/iYJntmF7X2PaX3d5sZ/vpcqCv693HczhPZceO3Ndcv8bPkSAg0L0AgpXkjtkAAgRYVOK2qjWu07XgH5cy+Tzdm2VdPLXrSJg/eMCOPNzoSdPFl39bjncbYOUCt6cHy0ovvmJCG4+EJunwZ3m09jt3SMjqpo/26wwjd8cBV6m4P+2Kvl3PKZqnDxAf15LisgNuizMZpWer/Y++vpSZ1B6v+4jsCCwgggAACEQrU7NAzq8z4JU0FyP3G6qrV26+bL9yBpzn2qlZsc7vlxPpCfLmvx2Hgbop2v6ADxbgi+2d6bKFL2+TX5vyXjlR/GdmJ/u5sdfq2/QuF265m3K4L+6u3/ZaVjsJLggMZfun4Qic//6u9R9TPaZkXa/xPBviVjdXraPqwSQHjpkR9iph25PolJj52RiAiAQIpEXGxMQIIxFugvup5FRaVq/Owe/RwXu/gIEC8TxjO8Zq8vce+rceepcYZzKjT8a0bVVpjd2Gxgy79dN34H0SWt7M7yzf8Ssg0p+nsjh19xz198Ij+HHJb3kAAAQQQiF3A+7ludbI49qzGZ9kDfwc+X6lFlY1jo9T9x2F9bDcNvs93c8vJzDEaN3uDKpy3/phDp+XcpWcDxyaJdr/YMx3fI3QeqCljzjfHPEs5N4wKGFzeyrxzwPh4nToOPyJ4xnUZrfGrz9DMsnf8bq+Vd9yU2MZiiUNeuX6JAyKHQCA8AQIp4TmxFQIItISAdb/3rCf1pz5mlPuicS49LuyT/r0yOp9tv4jwOV3fNvtG9mEX0D1262bttS9yfbf1DPDegmR+Gbt8eOPtPXXvavseuwu3HXSZoDGR9rRxTgcdYY7ZHAEEEECgpQQcg4f6DcraxKwg1sCtvy1Ujt2r0BdIsNJobg8pmavxfS83M9Ws88zYEzLl0e4X8oBt9UYXcxvrHjOmSqU2FTh+QLFmpVvzpOaMHO8XhGqrVPqd1xoTZ4yZIrqsm+auX6qxmeea22uX6zXP4Lh27xkrMPbTgIFtuX7xc+QFAikkENl3ixTKOFlBAIG2FjCzyzw8Tw9/cpkWPn5bwCj3gWk7Q+f1OL/xfujAtwNf15/SyZP2T3/fUq8e3/X12gjcNNTrtOxRuu7CsxrePr5dL3jub7d7mHhv67F39ru9x9GFOyjoYu/AMwIIIIBAcgo4Bg89dETVAcN/hJcnE0hYtNYzu09X3w5m8NLl9yl/8EUaPbs4REAl2v18J0nABTMge8U2rZg9Sr2zrtcLJzroogdWaG5229/m68MyP/qsyptuxsRRwC3I3sFxAwah3TnnHq2tsnsjcf3ic2QBgRQTIJCSYgVKdhBIDgEzTeHm+3X7qjN0t+eXneYumMzFyveyzIgg3kdzF69fm3uhP7Ovbr+jnt/LsPcM/zmtp8ZMHeAN3tjBEbuHiX1bj3045+09ZgadvTv0Vk2davbs0NsKCLrYu/CMAAIIIJDcAqdNT5NjdlsTYVY8s/us0t6yNZo70Z5ZzTqG1UPFDCweasyNaPeLMHktv7kVQNmiommXq9/Etaruead2VL2t4sKCxhmQWj4RYZzB/ICy7RE9bA0ObAbEnzK2Z9APMw2D0Dpm9Kkr1/ObPvBOt8z1SxjIbIJAUgoQSEnKYiPRCCSzgLl4Kn1QU+f8WaM2PKX8MG958RtArbmL12NHdND+MaipwQCbZPS/ZccTHDn0W23fa83WY9/WYx/AbDtkgkbb0yJat/fs3qOt6/eZKZIDgy72PjwjgAACCCS3wEHt2OU2WGxgrj7RliUbdDRwtXmdljlY+UUv6YPAgIo15sat8xw9G/x3jnY//6O01Svrx5Q7dfWYmVrxQV8tffM3WlwwuInbe9sqndZ5G35A8YTLXGYYslPmCab4pq32n/GP6xdbiWcEUkuAQEpqlSe5QSDBBUwQpfwx/fTWgyaIUqzZ/eyZZMJItt8Aaof1h/0nQu5UV31Ehz3vpkc8W47fQZ237NTt09q7V4buYZJxqSaNyfTubnqwPHKvivenuQRd/M7ACwQQQACBpBI4S9kXX+DtrXhKFauf1kvVduQ+REbMbZ5vVv29GVo19KMhMLJF+5xjbvj1bHDfN9r93I/WGmu9P6bMfFXHrcFmp92mUZnN9UptjXSFOsf/6OQJb/l2MrPp2ePc/P/t3Q18VNW97/9v/zk58tLqP0qp1MNV0gDF25JLpCpHLyhBKGiVZ0SoVEIiUB8pkECw2lpBiOAjiiEQBEvR8KwoKJAo1haLIZygRw6QJnrRxmIglVNv2jTmrj2ZPdkzmUlmQpjsJJ95vXjNnj17rb32e4Wsnd9eD0EOj0m4SRMHenvAfnFSlV97D+L+JYgWuxBo+wIEUtp+HXIFCLQRAW8QZcJWdV3wmGY1GkQxSyLn3Knpmz5zXJuZAHbsWCV55nT7m44c+7O326zjEM/mV/pg/0F5bntim7Fajl92ziE7p/WfxSWN9DBxTlBrhveUl+uLrsM1cbBvQJJfznxAAAEEEGiLAv69FVW+XZn3LdbukMGUEypYvEY1P3L0ZCxdremLC4O0Yd45Nxw9G76o+FL23+NqbjpXMZvg084CE0SxXuepR0LXBkNlXFVcfVMXdfEGek6e1Cl7+rWgheyiK/r39HwTe+3VSrTnoBX3L0G52IlAGxcgkNLGK5DiI9A2BBxBlEUv6NkxCaFvnCqLTBfouzU5Sxp6vX8QIibhdi1Ot+YtMd1mnSvpOBFqPtKuV0vNHvOkK/0hTQlz6JAzi/rtgBtmxTXaw8Sv+64pZbdRYzQwrpHHV/UnYgsBBBBAoK0I+K2eYwLnxS9ompnTZO7zWx3LGJt2zzOJaqpm7P1+QFD9nyoP1YYZg5juV+iqi62/wgNXnWtuujBgfUsrm2ObmocsjOzqD6lSxamv6j/6bVXoD/sbDo2qKT2o9//SaMTCL5ez+8HxQOV4vnYVh7oWqxQndGCf1R+24b0C9y9nt5bIHYHWECCQ0hrqnBOBNitQoy9PnQryFK2xC7KDKMt0qNpaGvAG9eoer4RQ//qO1pzle1QRdG6RTkpIeUizrdV0zFPAZzccDSiL6cmSu0S5ZvK/2Cvu0eIUx7KKjRWxse+cw3tim5g41q/7brxuGnp56IBRY+e0vnPO8xJyTpjm1cepk6cD3JoqDN8jgAACHUUgnN+rZvWczPkaZ8+LZdGYOU02LJppljHu4W3feqjfqJnKyvurRi6cqUGBQfXyjXogfZPKgsULKj/W0c/NrBzBelU2N11T1XfBhepsx/2r3tMb71jDZ632e6nG3rlZFcHShxVwqdKJk//tSO1cDtg8FFn5sB7cVVrXJnkepKQq+b7X9XdfCu9QXvPdhiWbdcjrVVNpeofYx4RVDvvgSN/NA5WRGVo4tJtJeES5Dy1XYWWwSrOs1mvt3kpz//EzzR15ScCJuH/xBwnn/5l/CuvnkfuXQBM+t6YAgZTW1OfcCLQ1gcqD2vL6R6Y/SN2rau96rSkKentlH1E3odwYK4gSycU2fJrjSx3TW6m52ZqWKBVlZWh+XpEqrS9rSlWwxPRkWVBoJn7N1PrcFCXYN4W+xM3ZuFjJk4arq0kaGzS448zTMbyn2ZPcmvzMtezO2a7DvqwPa3ve+3XX6dtnNir/qFVr9vnqQx9tV459Q+o7zrq5W6WnttR1pDZ3+6Y3zwtNj+n3pWcDAQQQ6EACgb9Xi9dq0aaGvSYUN0QL1j+pCYkmsB/y1U1Dlq7SguQuQY6oVvmbGRo2KkMr872BBHNUTekuPZ7+hPKVqAnPLQzSq7K56YIUwbkr9gf60S2Xefd8rA0pV5mAkAkG3VWmifNulGdGs5oSbX50rQ7Z6ap+r5dfaWhTU/qmXt5r3xtU6fCrrzqCD+cqadrs+iCUNaluWnLdA5a+P9Xav47Wmi0LdfP3z/OepVL5s65VwrDl+uvg69THatdNObYt367jZ1QOO3EY7zEJGr38BT1mginVxcs0aXKmX5157j9yMnXHhGydGNjI/Qf3L/XYgf/PuH+pt2GrzQh8o9a82kxpXVxQ6+l6SZk1nIAXAu1PoDo/Q31T8urmHQl6eZ3UZ/42bU3r5f9taY5GDlpYf9Pl/23oT92ma+PbGUpqNBBSoaJNK/XcY6uUX25FaWLVdfAUpU6aoMnJ8c3vCRKsVDWFyrpuho7O3KqcMYFPmQISeI79iV67+TfKz+gXYTmqVZYzSYMX7A/I1P5oO0srbxmhR4u9E+DZX/ver9S8gnVK7fY7ze2Tog2hDkvM1J5X0tTdl44NBBAIFKB9DxRpr58rVZA+XKl5dtA58Dq9v1fjfRNfeA+w2qLN2vX6WmXvsf+076bkGWmaOH68BgWbSNWa6yQvUc/Ovkh717yp/e/+Jry0zU0XeCmhPlsPJJ5YoAeW7fFMBNtn/D26b8bt5hpimmibumpc7g4tGlAUdptjBYyeeuRhPes1i00cr9n3T9cUT/vt7Ml6vvqMz9RDmeOUFPd1E+U4222fWW0of6N2739Lq03P2fqfFKu+f6Jrrhwa5v0H9y/cv4T6T8j+aAucSRtPIKWFautMKqGFikA2CCCAAAIIINDCArTvLQxKdggggAACCLhE4EzaeIb2uKQSKQYCCCCAAAIIIIAAAggggAACCLhfgECK++uIEiKAAAIIIIAAAggggAACCCCAgEsECKS4pCIoBgIIIIAAAggggAACCCCAAAIIuF+AQIr764gSIoAAAggggAACCCCAAAIIIICASwQIpLikIigGAggggAACCCCAAAIIIIAAAgi4X4BAivvriBIigAACCCCAAAIIIIAAAggggIBLBAikuKQiKAYCCCCAAAIIIIAAAggggAACCLhfgECK++uIEiKAAAIIIIAAAggggAACCCCAgEsECKS4pCIoBgIIIIAAAggggAACCCCAAAIIuF+AQIr764gSIoAAAggggAACCCCAAAIIIICASwQIpLikIigGAggggAACCCCAAAIIIIAAAgi4X4BAivvriBIigAACCCCAAAIIIIAAAggggIBLBAikuKQiKAYCCCCAAAIIIIAAAggggAACCLhfgECK++uIEiKAAAIIIIAAAggggAACCCCAgEsECKS4pCIoBgIIIIAAAggggAACCCCAAAIIuF+AQIr764gSIoAAAggggAACCCCAAAIIIICASwQIpLikIigGAggggAACCCCAAAIIIIAAAgi4X4BAivvriBIigAACCCCAAAIIIIAAAggggIBLBAikuKQiKAYCCCCAAAIIIIAAAggggAACCLhfgECK++uIEiKAAAIIIIAAAggggAACCCCAgEsECKS4pCIoBgIIIIAAAggggAACCCCAAAIIuF+AQIr764gSIoAAAggggAACCCCAAAIIIICASwQIpLikIigGAggggAACCCCAAAIIIIAAAgi4X4BAivvriBIigAACCCCAAAIIIIAAAggggIBLBAikuKQiKAYCCCCAAAIIIIAAAggggAACCLhfgECK++uIEiKAAAIIIIAAAggggAACCCCAgEsECKS4pCIoBgIIIIAAAggggAACCCCAAAIIuF+AQIr764gSIoAAAggggAACCCCAAAIIIICASwS+UWteLilLmy1GQvf4Nlt2Co4AAggggAACCCCAAAIIIIBARxUoKSuN+NIJpERMFjyBFUxpTgUEz429CCCAAAIIIOAGAdp3N9QCZUAAAQQQQKDlBc6kjWdoT8vXBzkigAACCCCAAAIIIIAAAggggEA7FSCQ0k4rlstCAAEEEEAAAQQQQAABBBBAAIGWFyCQ0vKm5IgAAggggAACCCCAAAIIIIAAAu1UgEBKO61YLgsBBBBAAAEEEEAAAQQQQAABBFpegEBKy5uSIwIIIIAAAggggAACCCCAAAIItFMBAinttGK5LAQQQAABBBBAAAEEEEAAAQQQaHkBAiktb0qOCCCAAAIIIIAAAggggAACCCDQTgUIpLTTiuWyEEAAAQQQQAABBBBAAAEEEECg5QUIpLS8KTkigAACCCCAAAIIIIAAAggggEA7FSCQ0k4rlstCAAEEEEAAAQQQQAABBBBAAIGWFyCQ0vKm5IgAAggggAACCCCAAAIIIIAAAu1U4F9a7LpqSlWwZrdKTryn1cv3qNwv4/PVZ3yaftzzm7roh7dodFKcKvN/odE7h+iNrEGK9TuWDwgggAACCCCAAAIIIIAAAggggIA7Bc48kGIFUJ5YoAeWWcGTbkqeMVmztiw2wZLO9VdcWaTNG3Zqx6pnlL/gYc3xftNp/JD6Y9hCAAEEEEAAAQQQQAABBBBAAAEEXC5wBkN7alRZlKO0a3+kVBNEqUi8Q9kFu5STkeYfRLEA4pI0Om2ect59Q9kTE309UKoOH9OnLgeieAgggAACCCCAAAIIIIAAAggggIAt0MxAigmiFD6pO8YvVH55tWKvyNRrWx7SDfGd7HyDv8fE64aFK7V8/GXBv2cvAggggAACCCCAAAIIIIAAAggg4GKBZgVSakpylTphmQ5VmyuL7a/Zj92uhJhwr7KLBj26VNO6mZlRTp7UqZpw03EcAggggAACCCCAAAIIIIAAAggg0LoCkQdSag5r9ZxnVGQFUcwgnW6pszUloYmeKIHXGNNXdz48Vl2/OKnKrwO/5DMCCCCAAAIIIIAAAggggAACCCDgToEIAyk1qtj6uJYcOF13NbHX677Uvgq7M4rPIEZx143RiG6Rp/RlwQYCCCCAAAIIIIAAAggggAACCCAQZYHIAik1R7Vl3T55OqNYBb04QfFxzQyGxFyuIUNqVHLcl1uUL53TIYAAAggggAACCCCAAAIIIIAAApEJRLT8cU3xNr1o90Yx5+l0zVX6QTPjKNK5SspYrKTIysvRCCCAAAIIIIAAAggggAACCCCAQKsJRNAjxazU86cSfe4raif17PlvvqWMfbvZQAABBBBAAAEEEEAAAQQQQAABBNqpQASBlNMqfu9Q/bAexal3wrfbKQuXhQACCCCAAAIIIIAAAggggAACCDQUiCCQ0jAxexBAAAEEEEAAAQQQQAABBBBAAIGOJEAgpSPVNteKAAIdV6CySBvSR6h393glmH+9b8nQyvxS1XRcEa4cAQQQQACBJgQqVJSXqZE969rOhJ4jNDenQGU0nk248TUC7V/gDAIpVao49VX7F+IKEUAAgbYuULlLc4fdqrl5xb7hmdXFeXo0ZbLu2lRCMKWt1y/lRwABBBA4CwInVJA+RmPT1+uQvchodbE2LJimSTPyCKacBXGyRKAtCUQQSPlXxXW+wHFtVTpx8r8dn9lEAAEEEHCfQJVKNrysYwMf1saDx1RSVqqSgxs1b3A3U9Tj2vXERhXzZM191UaJEEAAAQRaVaCmZKuyj12jRVver2s7y97XxvlD1NU8kih/c5Xyinmg3KoVxMkRaGWBCAIp5+jSHpc5Vump0uF9H6iilS+A0yOAAAIINCJQ86G2lf5Y2VkTlBTnXa8+rp9SVzypad1iTSwlX7u4GWwEkK8QQAABBDqewFcq3vKFxuf8WuOSOnsvv7OS0p7Ushm9zOdSvfbmR/To7Hg/GFwxAj6BCAIpMep8/TANMPfd9qt67069XcGjTNuDdwQQQMB1AjH99POFI2XfBvrKF/Md9fjeeVLsZepx6Tm+3WwggAACCCCAwLlKmj1Pozt7H0D4QOwHy+epV4/vKPBb32FsIIBAuxeIIJBiLDoP0MRRl9WjVO/Xjrc+r/8c4VZN6WY9mFNENDdCNw5HAAEEzlig5s869l9V6jpqnJIb3Ciece5kgAACCCCAQDsU+Ls+OfaxqrsO18TBF7fD6+OSEEAgXIF/CffAuuO6aOC0SUraslBFnkmXKpX/2DIVDP61BtldxsPNsOawVj/6oQZljSCaG64ZxyHQagI1qix6VRvf3K7Vy/eo3FeObkqeMVnDh47WaF/XV9+XITaqVJafp7x1Ocrec9xzTGzieM386QTdOiZJcSFSOXdX52eob0qeqpw7/ba7alzuDi1KjlPTx5qEiZna80qauvvlocbThkgTkIVrP9aUHdAfv+irKdMGhGXu2guhYAgggMDZFjCrnm3e8Dv98dUcvdr7KR3MGuQY6t7EyWtKVbBmu97YmqMNxae9B5+vPuPTNGLYjzU5OT6C++Azaz+bbg9pO5uoTanmExW+96WSpk7WwEj/9mkycw5AAIG2JBBZjxRzZTEJt2txev/6BqR8vWZMflKFlREM8akp0eYZv9KxCdMjD8C0JV3KikC7EKhQ4eJx6j8qXauP9NQs36RrpTpS8KAuP7JWc0YN0sjFf1BlU9drbih3Z96qYSk5Onr5g9pTYiY+LftIO+85Vzvm3qqbpuaoKIzfJbHJi/WhNelb1m3q4xhuKHXTkKW7daTsD54gilUcz7El+Vp592AzQZzzFauuQxfXlSFIEMWXtuyYCjfdXX+erkM0zzIIkcZ5Bvdun9De7G3SrIc0JaGTe4tJyRBAAIHWErACILnPaO4tiUroO1pzFjzuCISEV6ia0tc1f9QIpT4cmPa0DuU9rkdSfqSBd4a5+ksLtJ+0neHVW+ijzEOlt9fqRaVocUrvCAJgoXPkGwQQaLsCEQdSpE5KSHlEC4daKz7UvaqLl2nS5F9oQ1EYU89WFmrlnT/T2oR7NTe5i50F7wgg4EoBs+JLzt2atPwDdR76iNatyPDreRITP0Q/X5GjeVdIh5ZPU2rO4dBD9TwB1Mma9ttS9Z6RpcdmD1F3z+DiTuo+JENL0/upYs9C3ZaSq5Kw4rJm0rfxD+ihVGvSN++r0zW69ZaEhjc3MfEaNPtRPTLeMTTRzBoyYMJQbxnsDIK9xyiu31TdN8qEYWL7a966p5Uadu+bYPmd+b6aosW6rnu8EsL413vq5oBJwc2NYP7Tekr3aWUaN4JnXhvkgAAC7U/gKxU98bTe+Ecn9bhxeH0gPZILNcvOz7/tfr3k64USLLG1+ssDTS+l26LtZ8dtO1VTqKz/3SustjOh553aHDgPZGW+Fj0Zo1/mpiiByVGC/UCzD4GOJVDb3Nc//1S7a94ttd+7rHvtd33/+tSOmPN0bc6q/NrSfzoz/mftqQNbanMWTa295jJzzKLf155yfu3cPvX72sU39/Hk+b2bl9S+f8ovI+eRrtq2DHgh0O4EvthUm9rD+j8+tHbxgb+FvLx/7Emv/Z/W74EeabWbvgj2f/b/1h5bMaHW8/vi6nm1+cH+X//z/drF1/Y05+pTO2bFR7XBcglWgH8eW1E7xlNGq5zjanP+9I9gh9Xt812PdWzv2hEr/iv0sc5vvGX7Xsqm2i+c+9vctvld/P7jtakzXg74Hd3mLoQCIxA1Adr3qFG79ET/qC1dMc60GVa70b32f87Jr22klfFew99qDywaao7vWXtNysLa3D1/qm/TTh2o3eS5H67Lry7fvrWpGz8Ncf1np/2k7QzBHWq39fdJSnrtpj/931BHsB8BBNqgwJm08c3okeINNJknvDcsfFk7c+9Vcle7b31dV8VHH07R4ATn09Ie6jdqph5deULX52zTpox/DzEmv1plG55Qtjd6X128Ur/eUNKxIltcLQKuEahRxVs79Y41H1KnvrryB+eGLFlsfA/1tL6tPqQ//oc9BtxxeMXrWpS1T9VmUGC3UWOCjyuOuVxDbo43iU6rKOtXWl0SegYUR85muOFNmjjQnlnlqN47cML5tf925/4a7js2/CXca4p367Xj52nAjf0brn7jfwZXf6op3aT52XGa+8z4MHriuPpSKBwCCCAQJYFY/Zu5p41oEGTFTj238s/qM2ONXls1T1Oc86DEJWl0RrZecw4ZNQNj89e8prJgV3SW2k/azmDYIfZZPYIy83RR5q80Oj6in4QQGbIbAQTag0DzAymeqzdd8pNnKmdfsfbk/lrz5t/pCKrYPNaEWj/XvAdztefwNi0Y0tikWrHqPm6mpiWebxKb+QsG/1wPjUuwM+IdAQSiKvC1Tp+sNMEP86oyc5kc92w1owSmi/TKbOV7kje2XOC5ShyabGY5Ma/qQr248cPQw4T8SnGxrrvxSu+8TZV65/V9AUNZnAdfohF3T6g7h3WasJZw/0rFb+breOyVGn59252hv6Y0T/c+8qlSsib7dUm2xvA/uPj1RsycfmwjgAACCDQlUP0f72n/wF9qVcgHh9aQ0bvMkFbHnINHjqm0QTN7NttP2s6m6tHzvRVEuWepjk19QKnOOcWsOWt+sVTbAof/hJUpByGAQHsQOMNAik1gBVR+otS0eSaocsRMHmlNIGn/K9bWrHuUmjIovCegcf+u9FeKTfojendVmpKYEdtG5h2BVhQ4qBfzikMGNqpLj+moVbrYPrrqf1mBUMer5iPterXUu+Pb6vldu/eI4xjvZsylPdXL08GtWsdf3a3isOZKiVHn64dpgLdjXFPBkZjEG3RTN/vgt/TUyoMhr8tTLG/5YwcO03VtdJlgK4hy120PaOeepzW+bw+/8eG9Bs3Xn3v0bdM9bRr+JLEHAQQQaC2Br/TB/tOaePewJn6vmjkHR4/ztV1BS3tW20/azqDmzp2euWnu0JzXdyh7zA/92s6EhGTd/Vm8/ncbvS9wXibbCCDQPIEWCqQ07+SkQgABNwvE6n/8sJ+394YJbKxcoKWFwSaUPqHf7XzPLEVsepGNGqfkgJuKumEx3sdssZepx6XnhL7ouMvU82JvkON4vnYVfxX6WOc3ziE71U0ER2K+ox7fO8+buumATV3545XS5E2xs0Au2q7YrOlDM7SrvMGjzrpCtvGeNi6SpigIIICAEThXSRnPKT0p9HBYH9MFF8rXZH7rIsUF3JWf9faTttNXFQ03PtPmO8dqzpvHG37l2RPX5of7hrgwdiOAQJgCAb+yw0zFYQgg0CEEYpJu132DvT1IqouUPSFF83eVOnpwVKls08N6IO9jxSZO09OZyQHzH5kVYv5Uos9trZgLdeEFjUx1H3O+LrrI/v4T/f79UDcwdob2+8VKnjTcu7xxE8GRin3asdexUHOjARvvsJ5uyRqSGMZNsac4xiT/N8pOH6HevTNUYMcvrKU0czI0sqc9f9QApS3ZpTK/XjfGq2hrXVp7RZ7+qXo832luX3OY751HK+eo3UMwyPvRFRrtu5MPM08OQwABBBA4c4EvT6luZIiZP+zmG5RoN3+enKPRfrqp7bQu2k3t5yUavarI0cM+sP0sUs6YS878Z4AcEECgzQoQSGmzVUfBEYiGgLmRWJqlcfaE0tXFeiltsqbnFJqp8cxNXuGzun/uG9LgTK1fe7/6NRiK93d9cuzjunlWrOL26qF4b4eTpktfo1MnTzuCNo2lMOPNrxujEfaQnZDBEe8Euuqirl3sgpTqtTc/Cn4eT7fqT4Lc4AYpS2WRNuc8qrT+iRqc8gtlmaFQ9TGUPE2/9kdKXZCnQ/ZOHVf+sjs1bFyOd7nnChUuHqf+ZmJuZ1qV79GzKSN0a2NLSwcpDrsQQAABBNwtUPPJUR3xtAnxumno5fKLoyga7acL2k6rimg/3f2DSukQQCCoAIGUoCzsRAABn0DcEC1Y/4iG2MEUKwCwYIrumPoT3TRhr3oveNmsShBqPqN/qLLiS19WkW1U6wuT9utwE/lW/bEShAqOfK63X98vDbxXT9zZzztBbageLCZQ9PYmbTt+aZAb3MBCVapg4RytNRNv/2fAEJq6SV4P6ocL39ARz9xR72vj/CHe3jNmwtsDz2nR1iIVpN+qe48M0PKCj+qegJXkK3tioreM1kpGjzOpXSA7nxFAAIE2K+Dt8WjKHzt4mqY2GAoUpfazVdtOq/JoP9vsjzAFR6CDCxBI6eA/AFw+AuEIxMSP17Prn9QEz4paVgqz1PkeszrO5VfohisvDxjOE06OZ+MYx6o/pi9I0MlqPcN6ZMY1J+sq5yR/QXuwfK78dTtUHtawnjgNytqtravWa++W6b5VgVS1Q8te+KbmrFioVN/yl52VlPZLzbKHTFnLXs66Vy9fna29q2ZqkL20orXE/K8fVIrdyybU0tJng5I8EUAAAQTOrkDlu3p5i5mIPba/Zmfe2MTEtGezKK3ZdlrXRft5NmuXvBFA4OwJEEg5e7bkjEC7EoiJv1pjb+7v60lhXVx18QuaNvTWgHlTWu+y/VbkaRAcsYf1eJcxdk6yZ3qwbFv/rglpOF6eoMvfwhvW40gWE3eRLrQ/dxqu+351Y5AVy5zLTkqdxj+sZ8YkBHTrNpnEJOjKazp7c6vU4ZK/2DnzjgACCCDQZgWqVLIhV1vLOykp/SFNcS6r2wrX5Ia207ps2s9WqHxOiQACzRYgkNJsOhIi0IEErCUA7xypsavO0ayCd/2GpphoimfelLs2lQSfZySaTI12UbaH9djLGDuDGdUq37JB+XWz/pkS20GXfrp97PcbBjgau6YLOss3/UrI42J0wYUX+vKtOnxMn4Y8li8QQAABBNqTQE3Ji8rIKlTnoQ9oSUpvX1vQatfohrbTunjaz1b7EeDECCAQuQCBlMjNSIFAxxKo/IOyRo3SnIJumrfuMY2Ov8QMTVmu17ZkKtkxb8quWXeoYTDlXxXX+YJmesXqWyZtZL+kAroob9mkvZXeZXF8w3r6e7tQx6jz9cM0wJ5ztnq/drxlry9kB13GaVSkTwqdy1k288pJhgACCCDQTgVqDmv1nGf0weVmpbusMUF6LNrXHc320wVtp3XZtJ925fOOAAJtQCCyv1HawAVRRAQQaEEBc8O3MmWasosV0P3YzPSflKbnAyah3TX3Aa0uqXIU4Bxd2uMy74Spjt2hNmtO6+RJez3g88wiP9+J+EldTOII3X7F+XVnKN+h3+6xgiN2DxPvsB77/H7Deyr1zutm3hfruwZBFzsB7wgggAACCDRXwKzOtiRTSz67TgufuivISnfOfKPbftJ2Ou3ZRgABBJoWIJDStBFHINBBBUzwYevjWnLgtGcyvImjezYIatRNQutY0ae6UC9u/NAxxMcEXL6boIttwSPHVOpb/tfe6Xj/+kud/MI+4Nvq+d04x5dhbsb01KhJ/b3BGzs4YvcwsYf12Hk5h/eYOV/27tTbFdWqeGun3lFA0MVOwjsCCCCAAAIRC1SpbNMvde/KczTb07uzUxM5RLn9pO1soj74GgEEEPAXIJDi78EnBBDwCdQFHzxhjYsTFB8X4/vGueEJpqyboyTPEJmGq+X4TWJXVaqS43agxJmLd/v4MR22O7SEtVpOkDxMuMc5ZMcTHDnyO+3Ya63WYw/rsdOZYweP00h7iJI1vGfPW9qybp9ZIjkw6GKn4R0BBBBAAIFIBGpUmf+wJs39VCNeWqbUMIeMRrf9pO2MpEY5FgEEECCQws8AAgiEEPhvnTzhjWpcZFaiCR5H8aSNSbhJEwd6e498cVKVXzuy9JvE7qjeO3DC8aX/ZnXpMR317IqNeLUcv5ycQ3aq92n17BWhe5jEXatbR8V7k5seLI8/qJwDMUGCLn5n4AMCCCCAAAJhCJggSuGTuuNnh03xxyxZAAAsu0lEQVQQJUfp/eyV2MJIGu32k7YzjErhEAQQQKBOgEAKPwkIIBBC4Ju6qIu36/HJkzplT10S9OguuqJ/T883sdderUR7AlfPHjOJ3dix3h4rf9ORY392DP1xZvaVPth/UJ7QTWwzVstxZmUGE11345Xe4T2n9Z/FJY30MHFOsmeG95SX64uuwzVxsG9Akl/OfEAAAQQQQCA8AW8QZcJWdV3wmGY1GkQxSyLn3Knpmz5zZB3t9pO204HPJgIIINCoAIGURnn4EoGOLOC4oTqer13FXzWCcUIH9ll9SeKC9uSISbhdi9OteUvM0B/nSjrOHGs+0q5XS82e8wMmtnUeFO62fxflUOWyc/PrPm1K2W3UGA0MMZTJTsM7AggggAACoQUcQZRFL+jZMQkN5hnzpa0s0ubFd2tyljT0ev8gfnTbT9pOX52wgQACCDQhQCClCSC+RqDjCpgbqpEZWji0myE4otyHlqvQXkrYD8W6WVyvtXsrFXvFzzR35CV+39Z96KSElIc021pNp3y7nt1wNKBXinkSl7tEuWb+lNgr7tHilN6hbziD5B50l7OLcmwTE8f6dZ+O101DL2/++Z3zvIScE6ZGX546FWAQ9CocO2t06uTpCNM4krOJAAIIINAMgeb9vvYM55mwTIeqj2vXrBvUq3u8EkL96ztac5bvUUXQubmi3H62Vttp1QztZzN+PkmCAAKtJUAgpbXkOS8CbUEgJkGjl7+gx0wwpbp4mSZNztTK/NL6P+ZrSlWQk6k7JmTrxMBMrc9NUUKouVRieis1N1vTEqWirAzNzytSpWVg5bHEPIlbUGgmfm0ij4jMLlbypOHqatLEBr05dWbmGN7T7Elu665ld852HfZlfVjb896vu07fPrNR+UetWrPP9M/xvj7arpxdDlfPbitAtUpPbSn3HmT15nlB20q989bYaXlHAAEEEDh7ApUHteX1j3y/r6v2rteaoopGzmetznO/bhpjBVEaOazBV8F7dHoOi2r72Qptp3WR5l6A9rPBDwU7EEDAxQLfqDUvF5evzRTNespQUmYNS+CFQHsUMDeG+Ru1e/9bWm2emtl/2kvdlDzjJ7rmyqGanBwfZi+OChVtWqnnHlul/HLrLjNWXQdPUeqkCRHkEaZxTaGyrpuhozO3KmdMsJ4yjnw8x/5Er938G+Vn9AvzWuz01SrLmaTBC/bbOwLeO6nP/G3amiatvGWEHi0OFQy5UvMK1im12+80t0+KNoQ6LDFTe15JU/eAs/ARAQRaXoD2veVN20KO1fkZ6puSVzdvV9AC27/Xe/l/W5qjkYMW6pD/3qY/dZuujW9nKCnUwwhPDlFqP6PWdloXRfvZ9A8HRyCAwNkSOJM2nkBKC9XKmVRCCxWBbBBAAAEEEECghQVo31sYlOwQQAABBBBwicCZtPEM7XFJJVIMBBBAAAEEEEAAAQQQQAABBBBwvwCBFPfXESVEAAEEEEAAAQQQQAABBBBAAAGXCBBIcUlFUAwEEEAAAQQQQAABBBBAAAEEEHC/AIEU99cRJUQAAQQQQAABBBBAAAEEEEAAAZcIEEhxSUVQDAQQQAABBBBAAAEEEEAAAQQQcL8AgRT31xElRAABBBBAAAEEEEAAAQQQQAABlwgQSHFJRVAMBBBAAAEEEEAAAQQQQAABBBBwvwCBFPfXESVEAAEEEEAAAQQQQAABBBBAAAGXCBBIcUlFUAwEEEAAAQQQQAABBBBAAAEEEHC/AIEU99cRJUQAAQQQQAABBBBAAAEEEEAAAZcIEEhxSUVQDAQQQAABBBBAAAEEEEAAAQQQcL8AgRT31xElRAABBBBAAAEEEEAAAQQQQAABlwgQSHFJRVAMBBBAAAEEEEAAAQQQQAABBBBwvwCBFPfXESVEAAEEEEAAAQQQQAABBBBAAAGXCBBIcUlFUAwEEEAAAQQQQAABBBBAAAEEEHC/AIEU99cRJUQAAQQQQAABBBBAAAEEEEAAAZcIEEhxSUVQDAQQQAABBBBAAAEEEEAAAQQQcL8AgRT31xElRAABBBBAAAEEEEAAAQQQQAABlwgQSHFJRVAMBBBAAAEEEEAAAQQQQAABBBBwvwCBFPfXESVEAAEEEEAAAQQQQAABBBBAAAGXCBBIcUlFUAwEEEAAAQQQQAABBBBAAAEEEHC/AIEU99cRJUQAAQQQQAABBBBAAAEEEEAAAZcIEEhxSUVQDAQQQAABBBBAAAEEEEAAAQQQcL8AgRT31xElRAABBBBAAAEEEEAAAQQQQAABlwgQSHFJRVAMBBBAAAEEEEAAAQQQQAABBBBwvwCBFPfXESVEAAEEEEAAAQQQQAABBBBAAAGXCBBIcUlFUAwEEEAAAQQQQAABBBBAAAEEEHC/AIEU99cRJUQAAQQQQAABBBBAAAEEEEAAAZcIfKPWvFxSljZbjITu8W227BQcAQQQQAABBBBAAAEEEEAAgY4qUFJWGvGlE0iJmCx4AiuY0pwKCJ4bexFAAAEEEEDADQK0726oBcqAAAIIIIBAywucSRvP0J6Wrw9yRAABBBBAAAEEEEAAAQQQQACBdipAIKWdViyXhQACCCCAAAIIIIAAAggggAACLS9AIKXlTckRAQQQQAABBBBAAAEEEEAAAQTaqQCBlHZasVwWAggggAACCCCAAAIIIIAAAgi0vACBlJY3JUcEEEAAAQQQQAABBBBAAAEEEGinAgRS2mnFclkIIIAAAggggAACCCCAAAIIINDyAgRSWt6UHBFAAAEEEEAAAQQQQAABBBBAoJ0KEEhppxXLZSGAAAIIIIAAAggggAACCCCAQMsLEEhpeVNyRAABBBBAAAEEEEAAAQQQQACBdipAIKWdViyXhQACCCCAAAIIIIAAAggggAACLS9AIKXlTckRAQQQQAABBBBAAAEEEEAAAQTaqcC/hHtd1fkZ6puSp6pwE3iPi00cr5k391CMuqjfuJuVFBcTYQ4cjgACCCCAAAIIIIAAAggggAACCLhD4Bu15hVRUWpKtfsX9+vu3xar2pPwfPUZn6YRw36sycnxJmBiv6pUlr9Ru/e/pdXL96jcsztWXQdP1ay7UzU6qbN9YLt4T+ger5Ky0nZxLVwEAggggAACCNQJ0L7zk4AAAggggED7FDiTNj7yoT0x8bph1k81INbGPE+9h92uKX5BFOu7Tuqe/BOlZqzUuwc3a9H4RMWa0Ev5nuc1Z9RIpeUUqtLOgncEEEAAAQQQQAABBBBAAAEEEECgDQhEHkixLuqCC9W5vutJ05cZl6RxWblaNyPJBFOs13HlL5iiOxb/gWBK03ocgQACCCCAAAIIIIAAAggggAACLhFoXiClWYXvrH4ZOY5gymkdWp6uuZtKVNOs/EiEAAIIIIAAAggggAACCCCAAAIIRFcgioEU68JMMGX2fKV0s8cFHdeux1ZpbyWhlOhWO2dDAAEEEEAAAQQQQAABBBBAAIHmCEQ5kGKKGNNXU2de7x3iYz6Xb9Qvsw/SK6U5tUcaBBBAAAEEEEAAAQQQQAABBBCIqkD0AylmXZ/O1w9zTFZbreOv7lYxnVKiWvGcDAEEEEAAAQQQQAABBBBAAAEEIhdohUCKKWTn/ho+MK6+tMfztav4q/rPbCGAAAIIIIAAAggggAACCCCAAAIuFGidQIriFN/r2w6Ov+jon1gM2QHCJgIIIIAAAggggAACCCCAAAIIuFCglQIpsbrwov/fwfE3HTn2Z+ZJcYiwiQACCCCAAAIIIIAAAggggAAC7hNotUDKvyXEq5PPo1pfVHypr32f2UAAAQQQaFGByiJtSB+h3t3jlWD+9b4lQyvzSwlgtygymSGAAAIIIIBAuxbgfqpdV28kF9dKgZRIisixCCCAAAJnJFC5S3OH3aq5ecWq9mZUXZynR1Mm665NJQRTzgiXxAgggAACCCDQIQS4n+oQ1RzuRbZSIKVan5aUqspXyk7q2fPf6pdE9u1nAwEEEEDgzASqVLLhZR0b+LA2HjymkrJSlRzcqHmDu5lsj2vXExtZNe3MgEmNAAIIIIAAAu1egPupdl/FEV5gqwVSTp38q6OondTlom86PrOJAAIIINAiAjUfalvpj5WdNUFJcTF1Wcb1U+qKJzWtW6yJpbBqWos4kwkCCCCAAAIItF8B7qfab90288r+pZnpzjBZpUqP/MWRR09dfUUXx2c2EUAAAQRaRCCmn36+sF/DrGK+ox7fO0/6/DL1uPScht+zBwEEEEAAAQQQQKBOgPspfhICBFqnR0rFPu3Y61juuFs/9bvUPBnlhQACCCAQHYGaP+vYf1Wp66hxSu7s7akSnTNzFgQQQMDlAhUq2vSs5t6SqIRbclTm8tJGt3hVKstfq6ypA7CJLjxnc6sA91NurZmzXq5W6JFSo4q3duode8ZDxSl55u1K4j7+rFc2J0Cg+QI1qix6VRvf3K7Vy/eo3JdRNyXPmKzhQ0drdFJn397GN6ybsDzlrctR9p7jnkNjE8dr5k8n6NYxSeY3QtOv6vwM9U3Jc8yzFJimq8bl7tCi5Dg1faxJm5ipPa+kqXtANo2mDZEmIAvXfqwpO6A/ftFXU6YNCMvctRdCwRBAAIEWEqgpLdDavHVa6WznElso87aejVmpZPNLL2nt0jwdsu/hO7KN5bHhd/rjqzl6tfdTOpg1KLy5HmtKVbBmu97YmqMNxae9PxXnq8/4NI0Y9mNNTo5X+H8ScT/lhv9W3E+5oRZapwzR75FSma/HHnvLt3KEuk3Qz0Ze0jpXz1kRQCAMgQoVLh6n/qPStfpIT83a8n7dhKVm0tIjBQ/q8iNrNWfUII1c/Ac5+pkFz9fcQOzOvFXDUnJ09PIHtcdMOl1S9pF23nOudsy9VTdNzVFRZU3wtI69scmL9WHZ+9qYdZv6+HVm66YhS3frSNkfPEEUK4nn2JJ8rbx7sLo68jDfqOvQxXVlCBJE8aUtO6bCTXfXn6frEM2zDEKk8TuFaz+c0N7sbdKshzQloX4hetcWl4IhgAACZ13gM217ZKl+X/HPs36mtneCShUsnKO1R79qe0VvyRJbQZDcZ+p6KvUdrTkLHncEQ5o+UU3p65o/aoRSHw5Md1qH8h7XIyk/0sA781TW9G2QxP1U0+BROYL7qagwu/QkUQ6knDC/iBdoQ7k3lB3bX/PW3EdvFJf+cFAsBGT6fJTk3K1Jyz9Q56GPaN2KDL+eJzHxQ/TzFTmad4V0aPk0peYcDr2Ubk2JNpveK9N+W6reM7L02Owh6u557NJJ3YdkaGl6P1XsWajbUnJVEs5NhDorafwDeii1V31FdbpGt96S0PBpTky8Bs1+VI+Mv6z+WJN+wISh3jI4djfYjFFcv6m6b5QJw1i/s9Y9rdSwe980yKxFdtQULdZ13eOVEMa/3lM3q8LvrKZ3Uf7Tekr3aWVa74ZWfsfyAQEEEOgoApdo9KrtyslapVeWDgmvd0FHoTH9Fgdl7dbWpU9q1aKOavOVip54Wm/8o5N63Di8/uFKuD8DZtnc+bfdr5d8vVCCJaxW+ZsPaNKMJoIp3E8Fw2vWPu6nmsVGIq9AFAMp1lPtaZqR97H31ObJ8aJHeBrKjyICbhaoeF2LsvaZHmTxGjHjx8GDDjG99dO7h6uTTqso63FtqwgWBTEBmdwHlPmmGcrT9ce6b9pVAcNJOikhZbZSzCoy1QeeUUZuIwEZP69zlTh2rJLsXilVpofLcbvPsd+B5kMXDcq4V8n2sab/zOES56TXgcc7Ppublv2/r1DswHEa5YIeHDFJGXrbWsY4jH+HV402ISP7ZYIohU9rzsY+evLRIQF1YB/DOwIIINCRBWJ0wYUXduAg82favPilEPPCxKjzFVeqd4f88ThXSbOf0KLpaUqd/oieTL8yAgUThMleYh4km1ugwXfqgdx803PW24Yf3KzHZjh7zFrBlEe1YOtnIfLnfioETLN2cz/VLDYSeQWaF0j58pSC/q0UitWMI9yQnmKeahfVDenxdI3fqufHBHlybOdR+QdlWZN8mSeuvW9ZqsIwuvvbSXlHAIGWEHDMZ9Spr678wbkhM42N76Ge1rfVh/TH/7DH/DoO9wVkYtVt1BgNtJfhdRyimMs15OZ4s8cKyPxKq0uqnN+G3I5JuEkTB9ozqxzVewdOhDxWnftruO/YKh3e90FAb43gSWuKd+u14+dpwI39HUGJ4Me6eW9N6SbNz47T3GfGBw+KubnwlA0BBBBA4CwLWD0Wl2npu0Ha8bN85raVfaz+LSHePEAK81WxU8+t/LP6zFij11bN0xTnPChxSRqdka3XnEOIzYOe/DWvBQ9mcT8VJvrZPYz7qbPr21ZyjzyQYo3JW7rGMVns33R454tanV8a0KXfmgDpN1q5OFXXmnGEc/OKTRDFmphyqTbuXN5E1/hqlW14Qtne7m/VxSv16w0lbcWUciLQTgS+1umTlXXBz0Z7ejR1ueZJzMps5Xs6ipynXj2+E+JJn+ldMjTZ/JYwr+pCvbjxw4DfKaHOc7Guu/FKbzfsSr3z+r5GgiOXaMTdE+rOYZ1m70693WRU+CsVv5mv47FXavj1F4cqhOv315Tm6d5HPlVK1mQlOGays8ZsP7j49UbMXH9pFBABBBBAoCUEKv+oFU9ud0wo3xKZkkf1f7yn/QN/qVUZ/x6iJ6g1hPguM8S5f/2QsiPHVNqggy33U274aeJ+yg214I4yhB1IsVav+L41Hj8h2cxxYAVF7Jc9QVKyevmN179cg1N+oSXvdtbk+Zmat3SzCsveUU7GaCUFexptZ+d5j1X3cTM1LfF888lMCDn453poXILfEXxAAIFoChzUiyYYGmzQjlWK6tJjOmptxPbRVf/L+n/reNV8pF2vlnp3fFs9v2v3HnEc492MubSnenmG3lTr+Ku7VRzqhH5JTVfj64dpgHfITlPBkZjEG3STGULkeVW/padWHgx5XZ5jvOWPHThM17XRZYKtRv+u2x7Qzj1Pa3zfHn5zq/QaNF9/7tG3Tfe08ftx4AMCCCCAQOQC1rwb6em+h5iRZ0CK4AJf6YP9pzXx7mFNtLNmiPPocb57maB5cT8VlCWaO7mfiqa2+88V9vLHdatkLI7eFcX9u9JfKVZ69M7ImRBAwE8gVv/jh/1M7439Om5Cp8dXLtDSG3KU3q9+xo26w0/odzvfM9PSmqDnqHFKDgg21A2L8YZeYy9Tj0vP8TuL34e4y9Tz4ljlW/OcHM/XruJ7lJQUekiRL613yE7+HrNukDc4MiKjX/CeLzHfUY/vnWfyt9YY8gZsZvcLOel1XfnjlfJMUzdBvtK4a6Nis6YPzfD2CApStDbe0ybIFbELAQQQQCACAU/PxPvmNjERagQZcqhDwMytkvGckhx7Qm5ecKE8t1DWLdO3LlJcwONu7qdCykXnC+6nouPchs4S8F+0DZWcoiKAwFkXiEm6XfcN9vYgqS5S9oQUzd/lHMZnhvBtelgPmEmkYxOn6enM5IBuq2a89Z9K9Lld0pgLdeEFjnEl9n77PeZ8XXSR/f0n+v37ZnLasF4XK3nScO/yxk30ZqnYpx17rSCK9+UJ2IRa0tE7rKdbsoYkhhHQ8WRZN6wxO32EevfOUIE3hmQtVViQk6GRPe3VdgYobcmugGUOjVfRVnnS2j38+qfq8QZDJ+3Ch/HeebRyjjYyMe3RFRodEPwKI1cOQQABBBDwCDh+59u/t81771sylJ1bEPA7PoDMzCG42RoCb6frOUJzn/+NCkqrVFP0hKbnHAlI4P3Y3HQNcqtQUc6dGjjoLv8gSvFCDbbL1P1yjQxVDkd+NaUFWu28lrDaruB2Cd1N+7g4R5uL/Necc5zObFpp1ypr6gAl3JLjm0+keeXwz7nVPvnmoDTzyd18gxLt2yFPgbif4n6q1X4yOXEIAQIpIWDYjQACloBZDnJplsZ1tYfCFOultMnm5q7QTIVmGvXCZ3X/3DekwZlav/Z+9WswbO/v+uTYx/VDAXv1ULw3q6Z9a3Tq5OnGh934MjHji68boxH2kJ2QwRHvBLpmBZ+uXeyClOq1Nz8Kfh5PN9pPgtzQ+E5cv2Hd2OY8qrT+iZ5hjVmeeaHqvra6gk6/9kdKXZCnQ3ZgxfTzyV92p4aNy/Eu92ytbDZO/UfNlDOtyvfo2ZQRurWxpaXrS8EWAggggEC0BCoLtXLqME1a96m63Jarw9ZKLCX5Wnn3YHUuzlPWwykaNupX2m0CI4EvT7swbKKWHrlayw4eq1uF7Wiubu3yqX57W6J6jVoRdK6S5qYLPH/d585KSluhd61yF2Sqj31QYqb22KvKlH2krWm97G+CvJuAxq5faczQFD2yfE99mT1t1xTNzw8xAbw1lOjOIaa9fFhrK36s9R6DYyrckqnkrp8rf/lCzTGT088NTG+1tc9bDyWsKQQeUvYe+4FLY+WYrLs2lQRv54NcUWvtqvnkqI547hHiddPQywN61XI/ZdUL91Ot9dPJeYMJEEgJpsI+BBCoF4gbogXrH9EQO5hiBQAWTNEdU3+imybsVe8FL5tZ6NNCzH30D1VWfFmfV0Rb1frCpP063DS+VX+sBKGCI5/r7df3SwPv1RN39vNO6haqB4sJFL29SduOXxrkhiawUJUqWDhHa/cV6z/LfZESz0FWo3/vIwf1w4VveJc7fF8b5w/x9p4xg4sOPKdFW4tUkH6r7j0yQMsLPqq7oTY349kTE71lbGxp6cCy8BkBBBBA4KwLWKtLTp6iJacmae2KDI1O8g57jYnXoNlmFZbc2zy/56uLX9Dd9z3rv/pkzWGtnvWIdv3LHVq2wtl+msDGmAw9v26OkuxYv/NCmpvOmUeLblepdNM83f9SJ03Oez9I2/WxNjyYq6IG852dUMG8qZrzpgmCxF6vWVkp3nsI81AkKU3PL5/qnRQ+ML23rd3/iU74NbVWOebop8/8XZPscpS9r7wZSd429Lh2PbExzHnXWhQogsy8PWBNitjB0zS1wbBm7qe4n4rgx4lDoyJAICUqzJwEgbYtEBM/Xs+uf1ITPBNAW9diJpneY1bHufwK3XDl5QHDeVrrWh2r/thznwTevHmG9cgsY5ysq5yTugXtwWKeiK3bofKwhvXEaVDWbm1dtV57t0z3rQqkqh1a9sI3NWfFQqX6lju0ngD+UrPsIVPWMoez7tXLV2dr76qZGhTvXVDR3Izf8OsHlWL3sgm1tHRrcXNeBBBAoMMKmNVTsn9pJmb9jlJ+MclvJbQ6Ev9ektXFv9Hze3yDXKVP3tH2A6GXGI5JmKT5qUF6gTQ33dmqp+IcPVU4RE8GBJL82q7jhSr8xC/qIVW8o99u+biuVBcnKD6gN2vMD67Sv9trC/ult9va3+iVpUO8QRKTjVWOYxO17ZWFGmcHtMzUrv1mz69vQ4O282cLphn5Vr6rl7eYiflj+2t25o1NTEzbjPwjSsL9VERcHNxhBQikdNiq58IRiEwgJv5qjb25v68nhZXaetI2beitAfOmRJZvSx7ttyJPg5sme1iPdxlj7wS1decv1bb175qQhuPlCbr8LbxhPY5kMXEX6UL7c6fhuu9XN6q73zhn60vnks1Sp/EP65kxCQHdeM1hMQm68hp7ct9KHS75i50z7wgggAACrSVQsVPPrTTzlzQWaPeb86tS77xuHj4Elvf4dmVvDTbkxPpD9nq/9tYvaXPT+WXSAh8S79GTC4O0cX5t1//RsdK/RXay/+8CXfStYF1y7GzMan1XXKne9kerHMGWFvYrx5c6eeofdgqXvVepZEOutpZ3UlL6Q5qSYEeRWq+Y3E+1nj1nbjsCBFLaTl1RUgRaT8Azlnmkxq46R7MK3vUbmmKiKZ55U1wx/rjR4T32sB57GWNnMKNa5Vs2KL/C7sJiB1366fax328Y4GisJi7oLN/0KyGPi9EFF17oy7fq8DF9GvJYvkAAAQQQcI+At32wOlkcf15jE+wJxAPff6RHi+vnRqn+r6P6xG5ifO2EGXIya5TGpL+kokr7y7orjUmaqecD5yZpbjr34NWVpPMATRx1mdk+X0k/HREwqarZ7ReEaqnCu/dhRE3Ji8rIKlTnoQ9oSUpv371BS115s/LhfqpZbCTqWAIEUjpWfXO1CEQuYI0DHzVKcwq6ad66xzQ6/hIzNGW5XvNMCGc/MbJuBu8IMpnbvyqu8wWRn9OTIlbfMmkj+yUV0B11yybttW9OfcN6+nu7zJonWtcP0wD7Eqr3a8dbdtdrO+gyTqMifTJkL1/YzKsmGQIIIICAmwUck376TcrayOpo1sStv8tQkt070RdIsK7TDJXNm6exfa83K9Ws9azYE/Lqm5suZIat9UUXMxz2LTOnSrE2pjkCB9bqdrnPaO4tY/2CUK1Vyqic15r3Zs4z+uBys/Jh1pggPVjtUnA/ZUvwjoBbBCL7G8UtpaYcCCAQHQHTwK9MmWbGgSugu6l3QriASWh3zX1Aq0vqn8BJ5+jSHpfVj2NuqtQ1p3XypP1U7jz16vGdiJ/MxCSO0O1XnF93pvId+q1nXLrdw8Q7rMcuh9/wHkfX6wZBFzsB7wgggAACHVvAMennkWMqDZj+IzwbE0h4dLVndZ+uvgRmIvflDyl10FUamZ4TIqDS3HS+k7hww0zsXrRV2ekj1Dthsn57opOu+lW25iW2/vCWs49lVutbkqkln12nhU/dFWTlQ2cJuJ9yarCNgBsECKS4oRYoAwKuFDDBh62Pa4k1IZ6Z/Gzi6J4Nghp1k9A6VvSpLtSLGz90LDFoAi7fTTAzgnhfTd10fm3GMH9h35V+Wz2/G2enDP89pqdGTervDd7YwRG7h4k9rMfOzjm8x8z5snen3q6oVsVbO/WOAoIudhLeEUAAAQQQsASqTE+T43abFSGJZ3WfldpbkKt54+0V2qw8rB4qZoLyUPOPNTddhMU7+4dbAZTNypp6vfqNX63SnvdrZ8k7yslIq18B6ewXohXPYJZr3vRL3bvyHM329PZtKnDE/VQrVhanRiCoAIGUoCzsRAABqS744LlFDDKrvi3kCab4lmpsuJSw34RlTd10Hj+mw3aHlsYm8bNPHvTdf8iOJzhy5Hfasddarcce1mMnNMcOHqeR9tLO1vCePW9py7p9ZonkwKCLnYZ3BBBAAAEELIHD2rk72GSxgTqfafPil1QWuNt8jokfpNSsbfowMKBizT/2s8yAXp71GTQ3XX0OrbllBRHu102jZin7w7567M2XtShtUCPDWlqzrGfj3CaIlP+wJs39VCNeWqbUMIcQcz91NuqCPBFovgCBlObbkRKBdi7w3zp5whvVuMisRGOP7Q5y1TEJN2niQG/vkS9OqvJrx0F+E5Yd1XsHTji+9N+sLj2mo55dsRGvluOXk3PITvU+rZ69InQPk7hrdeuoeG9y04Pl8QeVcyAmSNDF7wx8QAABBBDokALnK/HqPt5ej6dVtOpZbSu1nwCEADHDRd8s+VcztWroV11gZLP2Oecfa9DLs2H65qZrmFO09niDCLO2q9yabHbqXRoR31RvjGiVLRrnMddf+KTu+NlhE0TJUXo/e2W+MM7N/VQYSByCQPQECKREz5ozIdDGBL6pi7p4b25OntQpe+qSoFfRRVf07+n5Jvbaq5VoT+Dq2WMmgB07VkmefX/TkWN/dgz9cWb2lT7Yf1Ce29HYZqyW48zKb3nh0/rP4pJGepg4J6g1w3vKy/VF1+GaONg3IMkvZz4ggAACCHRkAf9ejyrfrsz7Fmt3yGDKCRUsXqOaHzl6RJau1vTFhUHaQu/8Y45enl9UfCnfs4nmpnNVdZng084CE0SxXuepR0LXBsOGXVXcFi2MN4gyYau6LnhMsxoNopglkXPu1PRNnzlKwP2UA4NNBFpdgEBKq1cBBUDArQKO+UOO52tX8VeNFPSEDuyz+pLEBe3JEZNwuxanW/OWmKE/zpV0nDnWfKRdr5aaPeYJVfpDmhJmV1dnFvXbATe6IcplH+/XXdaUstuoMRoY10gXHDsh7wgggAACHU/Ab/UcE4AvfkHTzJwmc5/f6ljG2PzR7JlENVUz9n4/IDj/T5WHaguNZkz3K3TVxdbTh8DV65qbLowq8i2tbI5taj6zMLKrP6RKFadC3T9U6A/7Gw6Nqik9qPf/0ujTm/rs28yWI4iy6AU9OyYhdACpssgMBbtbk7Okodf7P9ThfqrNVDgF7QACBFI6QCVziQg0T8AEI0ZmaOHQbib5EeU+tFyF9lLCfhlaNwfrtXZvpWKv+JnmjrzE79u6D52UkPKQZlur6Zind89uOBrwJM48ecldolwzaV/sFfdocYpjOcQguYW1yzm8J7aJiWP9usvG66ahl4e+wWnq5M55XkLOCVOjL0+dCjBoKuManTp5OsI0TeXJ9wgggAAC/gLh/H42q+dkztc4e34tKwMzp8mGRTPNMsY9lNA93vzroX6jZior768auXCmBgUG58s36oH0TSoLFi+o/FhHPzczlAXrndncdP4X2fDTBReqs/38oOo9vfGONQzXat+Xauydm1XRMEWYAZcqnTj5347UzmV8zcOVlQ/rwV2ldW2bJ4CQquT7XtfffSm8Q4LNdxuWbNYhr1dNpekpax/TooEfO9PG3sP5GXGmt4Moy3So+rh2zbpBvTw/I9bPSZB/fUdrzvI9qgg6Vxv3U05Z62eU+yl/ET5FT4BASvSsORMCbU8gJkGjl7+gx0wwpbp4mSZNztTKfO8Nj3U1NaUqyMnUHROydWJgptbnpijBvhELvNqY3krNzda0RKkoK0Pz84pUaeexxDx5WVBoJn5tIo/APBv9fLGSJw1XV3NMbNCbEWdix/CeZk9ya/IzHrtztpvpB+3XYW3Pe7/uOu1d1nvlH7VqzT7TP8f7+mi7cuwbSXuf5wZ2lZ7aUtcB2tylm948LzQ9Ft+Xng0EEEAAgYgFAn8/F6/Vok0Ne00obogWrH9SExIbm/mkm4YsXaUFyV2CFKNa5W9maNioDL92taZ0lx5Pf0L5StSE5xYG6Z3Z3HRBiuDcFfsD/eiWy7x7PtaGlKvqgkF3lWnivBvlmcmjpkSbH12rQ3a6qt/r5Vca2tSUvqmX99qhlyodfvVVx4OYc5U0bXZ9EMqaVDctuS6w0PenWvvX0VqzZaFu/v553rNUKn/WtUoYtlx/HXyd+lj3GKYc25Zv1/EzKoeduBnvlQe15fWPfG141d71WlNkX29gft6JdcdYQZTA7xr7HLyHrycF91P1cIH/X7mfqrdh66wLfKPWvM76WTrACayIckmZNSyBFwLtUcDcCORv1O79b2m1eUpi/2kvdVPyjJ/omiuHanJyfJi9OCpUtGmlnntslfLLrbuKWHUdPEWpkyZEkEeYxjWFyrpuho7O3KqcMcF6yjjy8Rz7E71282+Un9EvzGux01erLGeSBi/Yb+8IeO+kPvO3aWuatPKWEXq0ONTEhFdqXsE6pXb7neb2SdGGUIclZmrPK2nqHnAWPiKAQMsL0L63vKk7c6xUQfpwpebVt3D+5fT+fo73mwTMHGK1aZu16/W1yt5j/2lvtY1pmjh+vAYFm0jVmuskL1HPzr5Ie9e8qf3v/ia8tM1N538hoT9ZD0eeWKAHllnt/PnqM/4e3TfjdnMNMU20cV01LneHFg0oCrvtsgJGTz3ysJ71msUmjtfs+6driudewtmDwypHph7KHKekuK+bKMfZbUOr8zPUNyWvbi63oIp2W9+r/tvSHI0ctLA++FT/TeNb3aZr49sZSgr1cMqTmvsp7qca/zHi26YFzqSNJ5DStG9YR5xJJYR1Ag5CAAEEEEAAgagL0L5HnZwTIoAAAgggEBWBM2njGdoTlSriJAgggAACCCCAAAIIIIAAAggg0B4ECKS0h1rkGhBAAAEEEEAAAQQQQAABBBBAICoCBFKiwsxJEEAAAQQQQAABBBBAAAEEEECgPQgQSGkPtcg1IIAAAggggAACCCCAAAIIIIBAVAQIpESFmZMggAACCCCAAAIIIIAAAggggEB7ECCQ0h5qkWtAAAEEEEAAAQQQQAABBBBAAIGoCBBIiQozJ0EAAQQQQAABBBBAAAEEEEAAgfYgQCClPdQi14AAAggggAACCCCAAAIIIIAAAlERIJASFWZOggACCCCAAAIIIIAAAggggAAC7UGAQEp7qEWuAQEEEEAAAQQQQAABBBBAAAEEoiJAICUqzJwEAQQQQAABBBBAAAEEEEAAAQTagwCBlPZQi1wDAggggAACCCCAAAIIIIAAAghERYBASlSYOQkCCCCAAAIIIIAAAggggAACCLQHAQIp7aEWuQYEEEAAAQQQQAABBBBAAAEEEIiKAIGUqDBzEgQQQAABBBBAAAEEEEAAAQQQaA8CBFLaQy1yDQgggAACCCCAAAIIIIAAAgggEBUBAilRYeYkCCCAAAIIIIAAAggggAACCCDQHgQIpLSHWuQaEEAAAQQQQAABBBBAAAEEEEAgKgIEUqLCzEkQQAABBBBAAAEEEEAAAQQQQKA9CBBIaQ+1yDUggAACCCCAAAIIIIAAAggggEBUBAikRIWZkyCAAAIIIIAAAggggAACCCCAQHsQIJDSHmqRa0AAAQQQQAABBBBAAAEEEEAAgagIEEiJCjMnQQABBBBAAAEEEEAAAQQQQACB9iBAIKU91CLXgAACCCCAAAIIIIAAAggggAACUREgkBIVZk6CAAIIIIAAAggggAACCCCAAALtQYBASnuoRa4BAQQQQAABBBBAAAEEEEAAAQSiIkAgJSrMnAQBBBBAAAEEEEAAAQQQQAABBNqDAIGU9lCLXAMCCCCAAAIIIIAAAggggAACCERF4Bu15hWVM7XjkyR0j2/HV8elIYAAAggggAACCCCAAAIIINA+BUrKSiO+MAIpEZORAAEEEEAAAQQQQAABBBBAAAEEOqoAQ3s6as1z3QgggAACCCCAAAIIIIAAAgggELEAgZSIyUiAAAIIIIAAAggggAACCCCAAAIdVYBASketea4bAQQQQAABBBBAAAEEEEAAAQQiFiCQEjEZCRBAAAEEEEAAAQQQQAABBBBAoKMKEEjpqDXPdSOAAAIIIIAAAggggAACCCCAQMQCBFIiJiMBAggggAACCCCAAAIIIIAAAgh0VAECKR215rluBBBAAAEEEEAAAQQQQAABBBCIWIBASsRkJEAAAQQQQAABBBBAAAEEEEAAgY4qQCClo9Y8140AAggggAACCCCAAAIIIIAAAhELEEiJmIwECCCAAAIIIIAAAggggAACCCDQUQUIpHTUmue6EUAAAQQQQAABBBBAAAEEEEAgYoH/B7N6qRaI9pCqAAAAAElFTkSuQmCC" alt></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">The stem clearly states that the average temperature of the planet is constant, so neither B nor D can be correct. A correct understanding of albedo leads to A. The statistics would suggest that many candidates had not read the stem carefully. </span></p>
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<br><hr><br><div class="question">
<p>An electric motor is used to lift a heavy load. The Sankey diagram shows the energy transformations involved in the process.</p>
<p><img 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" alt></p>
<p>What is the efficiency of the motor?</p>
<p>A. 33%</p>
<p>B. 50%</p>
<p>C. 67%</p>
<p>D. 75%</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
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<p>The Sankey diagram of a fossil-fuelled power station is shown below.</p>
<p><img src="data:image/png;base64,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" alt></p>
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<p>Which of the following best identifies the thermal energy removed by water and the useful electrical energy output of the station?</p>
<p><img 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" alt></p>
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<p> </p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p>Sankey diagrams are quantitative and candidates should understand that the greatest proportion of the output from a fossil-fuelled power station is in the form of thermal energy.</p>
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<br><hr><br><div class="question">
<p>The graph shows the emission spectrum for a black body at absolute temperature <em>T</em><sub>1</sub>.</p>
<p><img 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" alt></p>
<p>Which graph shows the emission spectrum for the same black body at an absolute temperature <em>T</em><sub>2</sub> where <em>T</em><sub>2</sub> > <em>T</em><sub>1</sub>? The original graph is shown as a dotted line.</p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br>