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</div><h2>HL Paper 1</h2><div class="question">
<p class="p1">The diagram shows the pressure \(p\) and volume \(V\) relationship for one cycle of operation of an engine.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-08_om_06.16.40.png" alt="M10/4/PHYSI/HPM/ENG/TZ1/14_1"></p>
<p class="p1">Which of the labelled parts of the cycle identify isobaric changes and adiabatic changes of state?</p>
<p class="p1" style="text-align: left;"><img src="images/Schermafbeelding_2016-11-08_om_06.17.31.png" alt="M10/4/PHYSI/HPM/ENG/TZ1/14_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 class="p1">The graph below represents the variation with time of the displacement of an oscillating particle.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-07_om_16.56.17.png" alt="M09/4/PHYSI/HPM/ENG/TZ1/15"></p>
<p class="p1">The motion of the object is</p>
<p class="p1">A. over damped.</p>
<p class="p1">B. critically damped.</p>
<p class="p1">C. lightly damped.</p>
<p class="p1">D. not damped.</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 graph shows the variation of pressure <em>P</em> with volume <em>V</em> for a gas undergoing an adiabatic expansion.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Which of the following areas correctly identifies the work done by the gas?</p>
<p>A. X<br>B. X+Z<br>C. X−Z<br>D. Z</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>The work done on a gas is the total area under a P-V graph. Many candidates incorrectly opted for response A.</p>
</div>
<br><hr><br><div class="question">
<p>Microwave ovens cause the water molecules in food to resonate. Water molecules have a natural frequency of vibration <em>f</em>. In order to heat the food most effectively, the frequency of the microwaves should have a value</p>
<p>A. less than <em>f</em>. <br>B. equal to <em>f</em>. <br>C. greater than <em>f</em>. <br>D. as large as possible.</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 can be deduced from the second law of thermodynamics?</p>
<p>A. Thermal energy cannot spontaneously transfer from a low temperature region to a high temperature region.<br>B. Thermal energy cannot spontaneously transfer from a high temperature region to a low temperature region.<br>C. The entropy of an isolated system always decreases with time.<br>D. The entropy of an isolated system is the measure of the internal energy of the system.</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>Which of the following is equivalent to the principle of energy conservation?</p>
<p>A. Newton’s first law<br>B. The first law of thermodynamics<br>C. Newton’s second law<br>D. The second law of thermodynamics</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>An ideal gas undergoes the thermodynamic changes represented in the<em> P</em> –<em>V</em> diagram below (P→Q→R→P)
.</p>
<p style="text-align: center;"><img 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" alt></p>
<p style="text-align: left;">Which of the following is the net work done by the gas in a cycle?</p>
<p style="text-align: left;">A. 4.5 × 10<sup>5</sup> J<br>B. 3.0 × 10<sup>5</sup> J<br>C. 1.0 × 10<sup>5</sup> J<br>D. Zero</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>Two oscillators X and Y are undergoing forced oscillations each at a frequency close to the natural frequency of each oscillator. The graph shows the variation of amplitude with forcing frequency for each oscillator.</p>
<p><img 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" alt></p>
<p>Which of the following correctly identifies the system that has the greater amount of damping and the<br>greater natural frequency of oscillation?</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">
<p>This question elicited a number of comments on the G2s and the statistics showed that the topic had been sufficiently understood by only the better candidates. These two systems were clearly not identical – otherwise they would have had the same y-intercept. Y had a blunter peak which was visibly to the right of X’s peak, making D the best answer.</p>
</div>
<br><hr><br><div class="question">
<p>A fixed mass of gas is compressed in a very short period of time. Which of the following describes this process?</p>
<p>A. Adiabatic <br>B. Isobaric<br>C. Isochoric (isovolumetric)<br>D. Isothermal</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 entropy of a system is a measure of the system’s</p>
<p>A. total energy only.<br>B. degree of disorder and total energy.<br>C. degree of disorder only.<br>D. degree of disorder and average kinetic energy.</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">A system consists of a refrigerator with its door open operating in a thermally insulated room. What are the change in the entropy of the system and the change in temperature of the room?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-29_om_09.38.26.png" alt="N15/4/PHYSI/HPM/ENG/TZ0/10"></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 fridge is switched on and is within a closed system. This means that, as the fridge is consuming energy, the room will rise in temperature.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">An ideal gas expands isothermally from a state X to a new state of volume \(V\). The work done by the gas is \(W\). Which of the following is correct for an adiabatic expansion of the gas from state X to a new state of volume \(V\)?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_14.13.37.png" alt="N10/4/PHYSI/HPM/ENG/TZ0/10"></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 correctly describes the entropy changes of the water molecules and the universe when a sample of water freezes?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-07_om_16.54.47.png" alt="M09/4/PHYSI/HPM/ENG/TZ1/12"></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 pressure–volume (<em>P</em>–<em>V</em>) graph shows an adiabatic compression of a fixed mass of an ideal gas.<br><img 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" alt><br>Which of the following correctly describes what happens to the temperature and the internal energy of the gas during the compression?</p>
<p><img 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" alt></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<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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<div class="column">The diagram shows the pressure volume relationship for a fixed mass of an ideal gas that undergoes a cycle XYZ.</div>
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" alt></div>
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<div class="column">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">In which part(s) of the cycle is external work done <strong>on</strong> the gas?</div>
<div class="column"> </div>
<div class="column">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<ol style="list-style-type: upper-alpha;">
<li>
<p>Y→Z only</p>
</li>
<li>
<p>Y→Z and Z→X only</p>
</li>
<li>
<p>X→Y and Z→X only</p>
</li>
<li>
<p>X→Y only</p>
</li>
</ol>
</div>
</div>
</div>
</div>
<div class="column"> </div>
</div>
</div>
</div>
</div>
</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<br><hr><br><div class="question">
<p>Water in a container freezes. Which of the following correctly describes the change in entropy of the water and its surroundings?</p>
<p><img 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" alt></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>An isolated system consists of a block of ice floating in a glass of water. The ice melts completely at constant temperature. Which of the following identifies the change in internal energy of the system and the change in entropy of the system?</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">
<p>There were a number of comments on this question from the teachers. In this situation the slight change in volume of the water/ice can be taken as negligible and it must be assumed that the water is not at 0<sup>o</sup>C, otherwise no melting would occur. The statistics showed that the better candidates understood this, choosing A as the best response.</p>
</div>
<br><hr><br><div class="question">
<p>An ideal gas expands adiabatically. What energy change is <strong>true</strong> for the gas?</p>
<p>A. It gains thermal energy from the surroundings<br>B. It loses thermal energy to the surroundings<br>C. Its internal energy increases<br>D. Its internal energy decreases</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 9">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">There were two aspect to this </span><span style="font-size: 10.000000pt; font-family: 'Arial';">– </span><span style="font-size: 10.000000pt; font-family: 'Arial';">adiabatic means no thermal energy transfer (ruling out A and B); expansion means work done on the surroundings and loss of internal energy to do the work. D is the only response matching this. </span></p>
</div>
</div>
</div>
</div>
<br><hr><br><div class="question">
<p>An ideal gas undergoes adiabatic expansion from state X to a new state of volume <em>V</em>. During this process the work done by the gas is <em>W</em>. What is the change in internal energy and the work done in an <strong>isothermal</strong> expansion of this gas from X to <em>V</em>?</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>The entropy of a system</p>
<p>A. will decrease if the system’s temperature is increased.</p>
<p>B. is related to the degree of disorder in the system.</p>
<p>C. must always increase.</p>
<p>D. is always conserved.</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">A positive amount of thermal energy \(Q\) is transferred to an ideal gas from its surroundings. The internal energy of the gas increases and the gas does a positive amount of work \(W\) on its surroundings. The change of state of the gas is</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>isochoric (isovolumetic).</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>isobaric.</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>isothermal.</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>adiabatic.</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 the <em>P</em>–<em>V</em> diagram below, which line could represent an adiabatic change for an ideal gas?</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>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
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<p>A block of ice at 0°C is placed on a surface and allowed to melt completely to give water at 0°C. During this process the entropy of the</p>
<p>A. molecules in the block has decreased.</p>
<p>B. surroundings has increased.</p>
<p>C. universe has increased.</p>
<p>D. universe has decreased.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>C</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
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<p class="p1">The graph below shows the variation of the pressure \(p\) with volume \(V\) of an ideal gas during one cycle of an engine.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-08_om_09.41.05.png" alt="N09/4/PHYSI/HPM/ENG/TZ0/13_1"></p>
<p class="p1">Which of the following correctly names the thermodynamic process associated with the parts \({\text{Y}} \to {\text{Z}}\) and \({\text{Z}} \to {\text{X}}\) of the cycle?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-08_om_09.41.57.png" alt="N09/4/PHYSI/HPM/ENG/TZ0/13_2"></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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<p>Which of the following statements is consistent with the second law of thermodynamics?</p>
<p>A. Thermal energy can ow by itself from a cold to a hot body. <br>B. A heat engine can be 100 % ef cient. <br>C. In natural processes, total entropy tends to increase. <br>D. The entropy in every closed system is constant.</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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<p>Which process will increase the entropy of the local surroundings?</p>
<p>A. The melting of a block of ice</p>
<p>B. Evaporation of water vapour</p>
<p>C. The isothermal expansion of a gas</p>
<p>D. The adiabatic expansion of a gas</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">
<p>There is evidence of much guessing in this question and it elicited a few adverse comments from the teachers. But both A and B are logically equivalent so must be wrong. As an adiabatic expansion involves no thermal exchange with the surroundings, this will not affect the entropy of the local surroundings. Hence C must be correct by elimination.</p>
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<div class="column">During an adiabatic expansion, a gas does 50J of work against the surroundings. It is then cooled at constant volume by removing 20J of energy from the gas. The magnitude of the total change in internal energy of the gas is
<p> </p>
<p>A. 70 J.<br>B. 50 J.<br>C. 30 J.<br>D. 20 J.</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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<h2 style="margin-top: 1em">Examiners report</h2>
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<p><em>The following statement refers to question 11 and question 12.</em></p>
<p>A gas is contained in a thermally insulated cylinder by a freely moving piston. The volume of the gas is increased reversibly by moving the piston.</p>
<p>Which term identifies the change of state of the gas?</p>
<p>A. Isobaric<br>B. Isochoric<br>C. Isothermal<br>D. Adiabatic</p>
<p> </p>
<p style="text-align: center;"> </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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<p class="p1">The graph shows how the volume of a system varies with pressure during a cycle ABCA.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-29_om_09.05.18.png" alt="N15/4/PHYSI/HPM/ENG/TZ0/09"></p>
<p class="p1">What is the work done in joules during the change AB?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\(15 \times {10^5}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\(9.0 \times {10^5}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\(4.5 \times {10^5}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>0</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p class="p1">A</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
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<p>The diagram shows a <em>P–V</em> cycle for a particular gas.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>In which of the following changes is <strong>no</strong> work being done?</p>
<p>A. 1 → 2<br>B. 1 → 2 → 3<br>C. 1 → 2 → 3 → 4<br>D. 2 → 3</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 graph shows the variation of pressure <em>P</em> with volume <em>V</em> of an ideal gas during a thermodynamic cycle.</p>
<p><img 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" alt></p>
<p>During which stages is work done on the gas and work done by the gas?</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>Which of the following gives the conditions for maximum amplitude in forced, but damped, oscillations?</p>
<p><img 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UOty5IoJPKwXSUG3ZF/Dycjy7r04yf6CX9qluPHWfMf7ypTp+T47moVebYQ0L5yhopzPjwnwWuLAnd1SPIkGPPImstW/hhNX7vBt6wo8vTrtTuyLMuehI/wVy+Bc9O6fBmM7e0rMeiWirvaxP4Fk542d7WjTJ2aY7ur9WP41rYs24tWO/xOh5yb4pwftDXCXR2cn5H3ahvZWj+Gb217Gq2omcrTh6ljw129FM5R6/JVNLVfVt8LStvUOndVbC9Tp+fI7oqPKgQt7ifnqDgHJ1/9Pv+zo6r98/fo3/JP/Qjdi/N1V+r9dkYW+84WskUa9QsSOSBzllrHBl+oli+KNHRN3dWWMtUDjuqu8lX0buy+cSzLskaT8Huf7dVZKs6ByRb+5XUnVTvP4uvLais6Y3elvd/O2FK2iCC+IJEDMmepdXBXLxL62OCuhL8y+9rPaDoNfyThZGRZljUOkh7bq7NUnIPyFPuXHVXtbOE7an7q+bor/f129/NbyRa6sZfOWWodquWLBO5K/SuTL+VJcOlFK74ibr0OkucdfqwbzlJxDsdqGUw6SmvIvgXuSPdTZ+quau+3uxLAXQ2Ks9Q6VMsXCdyV+lcG33mKfY/aqVXk2ZZl2eNg2dvZq74qzjqNPwce2zDheEGUyNVQ3qqaJQ++a1uW5byP0jX7Shrf/8o2z9uOF0RJZY9BniVR+SuV77DuX8IN0/KvG65vUDyxGMuZa1d+idspwV3laRz69JvONNzqdopCON/B8eNMvpo3i9PGWlrZG7xO49Cn8Rl7s0X1j7MkCjyH3430BGvu9//8f275L6Yl0habqzDdlNcv96Kvkodr17YsazyNSIp5aygKY9miX6ty4cebg1RC9q079iyssTf7I1lGgTfx46woNml41RIYsVryC5bxr5wcsX01kJ7myPXDmN4gqZwCZUnEYpv0IkfHOqXWiQd5qE+EsE7jG/Id2/XDON0k4awtbjXuaispWGXJF98dWZbtTB/o4zert9t9c9uA5Gk8I7WOVLlVcnPb0FbzNL4P7wJvbLlhWjk5RRUoGqV52eyssRd8jlV9bitGni5mJNT0sS1vZjxNd5VE92HgOZUmULqr/wo9ndiyOPUytWPkj85uDc3gb1aRd8mXAp9i/9Kyep3bflLFqYPMGI3c669pXpQTSEIH8yx0LRcfbr/c/J5u0sW1a/OZwuxb4DrsCut08dG1LenQkWKdRu+dUlDIPy3Lfhs+CvW7Ltum8fqb1uJpoL1R3dzVG/9mFtzF6VooqlivWm9HPN/B+RCG1/6nOF2T5CfNjctIe4M/3H25vqbdcLbwHbuSX0g203GTQf9ZzUHU3i/dbCt/ykrI3ZUU3/d3X8J5mqWLj65NRjJmT3bvuav2p9xeCfnnI9f/kmR5UeSsq5NNCd3XXSktUxjJXeXZcuZeuNekQ8lJkSzLuY6zfPtqQKww759YMEsHuUrCqWNZlvXKi35qgqYfUZyAk2ld/hhNx6X1p/+snOWxfgzf2jxW9Km1u1Kdu2qt/+KAwflwd38zf9yQE0ZIHgsZWNqsClXHmUKpjGr4TgHJv4eTV9zt0QNQGtoqzRO3LMuy3nwIrv9JB5/ZMvTUaPOwjL1wmRVFUagjNKNi5I/hxOZ/QiPA/l+Ks85djd5M3l8/JFkhtFNDmdot8p2wW0Nr/Zv1YzidChLD+iSN7vSEkylOPTRoUr4a2ZVa6Z5Z3VXNK2kS/kKozqzbpn1MwVyLWOl1a3Bad2V0/fri6Wl2V7b8c+RDsV6Z3Q5r1eTQpqZvaqB3ZLuzZTnKZFMUyqSF6EOU79Ter34sTqVTmLsqzY3auMxCcZiVwT0rIfEulYer3bCtLa0msPljOKmctEedmfAr5tUgW/jOhVQ8+rfilDwxeeoOnuckuOqP9J1M61QNUetzvgzGI7l+PsX+1U7uaispUI8NIv5bXnIh6zCVjt+ohu8YkDwJxnJ7N9hdxJpDxdBrRoBkLFFZVtIMMNqK8ZwEr6tjm8pOHbqEpXVXFe2igyXZCOoa/s6R74TjuKt8GVy+k0SWHc3Q24Ov+ueumnpi+UM6Cld7xzwJxsqwT+mxnmL/UtYLUo/b3ZXZ9WuL13zjZnlXxG6KH5rdDq2QlcLrvqlBf0dUKMpHQ0RK6muV79Ter7m7ogHXxNcsFIdxV/tVQup7lBlNjSIbuqvnJHhdV8jyc9NqQP6wUjwy6JdnKx/Dia0ou6qHJ+VkWpct/Mq5aLQyCfWZfCIHMN9xZXAfKShqBEfzoZkM7hiQTexfVIeUz80rgzXdRFHWfz5ip+1Otk1FwQ+X4v11WzFIYCuDGXFlsCbFqi7vijZ8scVpGv7uke+EY7irfBW9u6ymWDFH2dfc9hfirrbonuW1DxWth1in8W9sAb7VXRlev654LTdu5q6a/VD97WjGta1Xaymh7tGUSBlFB3VXZkckNITiIO5qr0pYaxA14mvmrsTzuzXwAJpVA3I1o8lXdfpKq4enxOqD1uVpfP+JrfxW5q7IEYmuH7akQIq0ZbVvKwWFseDsILM6agLCUxG2iUedu2JXYzW5fmDG9qJVvllbDB4EbcoUKdQ27opWAzF6asM/UOSPxm4NrflvqO2toae57b1QHBk6DpbGXnSyWh5D1HVspDqa2Vma0ms73q/3cbIwmrsyvP4p3FXr7XTnrljau+MF9/GPxeHnrlrcVXsojuquTCoJk3LVmO7srsgftp8CY1YNyNXMlraVBf2fkXfVqyHlabWObR4Ye8Hn+MfX6txVdatHTYa1Qq272lEKivJFI1IWFOn1xUmabWRWR1tA5HRbxwvuW01WrbuqCEiDJWXrpbwkbcWQktJItOVibuWuNGqvNvx9I39sDu+u2EEMKsx19fLgqx66K56jZ7sfFyTfNgk9x1ZWlJs7tvZcN5Z8zfdJGa4MGl6/a3dldDvduCuWtcq36hxjZbDBXZmFogN31VxJ6juDPd1Vux/axl2Z6jgROnbL0v6eXnA6rWNp5t4NNUzqyiChstPWngTLlowSbbXcQwro3y+uXXFfURJOnerg1lRmdRgGpLLzsZLxqQmGmbuqTlDVf9OwGJX9j3I647Hc1bklczf8zVPs/09Nuj4/+KqP4eiluyqKYrUM3k39fzisOvt3c2UDc8uijD7XLf8rmj8WBU91VFe4TVcGW67fsbsyvJ0u3BVZJJImazt1V6ah6GJlsLGS1L8kbt+VQb3U5Mnv8x1WBvXz7vlq/nkud07C9FW/8tkJJ9I6listjq7r3BVB9FhtY3JNtdxLCvhffAu8dz6zFLbr31XPxDGUQc3/bRkQ0dw0LwG1rQyyX2TrfZphg25PlWExRI8lXHmXlcHmvKudI98Rh3ZXzQO1Hue299JdrZbB/1y1v0GItiU1qqzxyHtri6Io8iy+C5PngldvqRVtldXecv2G4jXfzm7uyvR2OnBXugmPI7orZQBqHIpDuqvdKmGtyu/srnhOhuYchKd49pnFxLAasHl3zWkdP+fhH9WKTZOFL/3F117lsxNOpHUkqnJ/rMlq/3N2I3XYNEGizoFVrqQeFGIqBTojnn0LJl7D+Sy0hEYyqGIUkE18eyPvpaAZzDX5neSPaHNQTv9aRVNb/EU2bKjs1VW/2VaMLJ6FUr9Pm4A6AWzkrnTeri6rfYfId8Rh3dVT7LuNAzWehtaL4yhEeuiu8iQYG83zsc3wantjhwPJh9St0/hmOr1/FNeqNOc+6NxVpQs3uH5T8fTU9NOaPMdCfXG66e0wMdbprPG5mtrtnNWiiI5Bm2BUc7+agLMDe2QxUjIk5M9bQ7HdA6qbZ9qrEvLvVA/j0ewZ1IWLHRSkHMBjWZZ8gmuexrP3Uz5iMa4G4tXKg0bzNJ794mtaKJ2WsB3HwUiSojMT9PnKewZHFQv7I3QvWhd51VawnxQUtLcySbYzkkEVo4BsYn9UaRRp6LYMVpkWaU6OGMkf1p3u9jPyXokpKG3FyGL/77pj/IT+S3v4gt5dkc2eleVgncLsGPmOOKC7ImvSlZNjqt8pM+Ok05BZ/mDLcvIR6Z+74gupGmz3+oEdR8vOqNQvn5f/K/290JZoe6YPLk8XM/8Xj7+bJfv3ffSfvJDTOfPH+c2cngXedv3m4unvnIxInOs4y/P095voR14epCl1wEKfx4TA6HaMr6aFrjjIYSzbOR85sF3NpFbnaTy7/uC9YdZktbyf/yXOz0v3yy/Icj7yNL4JZnf+Gx5k0m1wY6EaccMnq72d2nvnuavSeHHfSlh+x3a8kKpklkR0l5ckvmy3Bz3jMU8XN8GNEBjeXXEzKv9s+cS3qgbaqwmHelfvWV3a6AvWiVYGWZYP6TXXafzJ/+Cx57vKlg/RX8/sRAZuiOkZs8oRYhXYcbLibk2j+l8+VsWvNGzP4mfesnszqOG7BYQehcDPHyepYC1XZu7qb854wnoKepqoOq/BOmXeI9OfkMxNWzGI9SktDjlutLWtlbJpu754mqiaaVcjUztFviN2a2jK30hvo7D0a9jiGbIc6kPhrnTwU2u12G/Dx3U18JZu8qDspSzdHhyWLG/x7bb8UGNW46WvVZWl4fpGxdPAjr2mBVDfwXIVps/ie1GEWtd6O1tdrYpyRxdu+EOt23Tag52PzDcq8+Pa5RhW7pcHtvrnRRq61sj1P4XhPMlyXXwrWagtT1Z/O3r0b8KpvDCAsnUlLIpy85RF9hyFUZLph7bqfW3S8MqyXf8uDKW0GPkVH9JGpx2qgZTVq0vBke5mFU1t7OCR4MfZs+fGTyfnw8XNn7Ob5UZ4f1H7SQRqK6DVbwcpqOyP+XqtvgSMUZ1nNajhOwRkE9/eJKu2t8RUI8IWyu+S8oUHI9e/rXlFjPy+NV12b1sxsngWJhvhjTTSY9O2tc02v94oU7tEvgt2a2j9MyJ7czrFaWC1nP1zptksQ14S8reTn+cBwHHZ4iWvfaN3x1xxeql1vST7NvNvdQN+8rqYllSw01G/ZxB0CNwVpX+Ks34M/6dBnTfxP6/grsB583LdVf49vGpPiD4J/dO6XpJ/DyeT+oXdLPbfwV2BBuCuKH1TnPwxnNgNnUq+mt/e91K7ATgYL9Zd1R/7d3r6pnW9ZP0YvrWbtrf8nM++nDxvuga4q14Ad0XpmeKQhMfaXM4y9xmAM4YmtL0wd5WnX6/dN33bFs3pmdb1k5+R96o+OXqdzsOov4PbuhMZQKfAXVF6pzg0o3nk+p+kVwrkaXxfSd0F4CzhLydVz+PpHeVOQ5Lz27R1+sT0Tuv6CMuIt13/7jcxSzpP4/vwviY9vB/UbOwFHQN3Reml4ohvHuX7KX7ryYYIAI4JPXSqZp9R7+D7y7Z8+/AJ6KXW9RLpzcpMgNtf83dCNsqmV8xgnQy4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6KAsUBAAwBaB0AHQB3RYHiAACGALQOgA6Au6JAcQAAQwBaB0AHwF1RoDgAgCEArQOgA+CuKFAcAMAQgNYB0AFwVxQoDgBgCEDrAOgAuCsKFAcAMASgdQB0ANwVBYoDABgC0DoAOgDuigLFAQAMAWgdAB0Ad0WB4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALiroigKCwAAAADgoGztRo5hcU7LDlEAAIAXB7QOgA7YraGdYeOE4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxQEADAFoHQAdAHdFgeIAAIYAtA6ADoC7okBxAABDAFoHQAfAXVGgOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6KAsUBAAwBaB0AHQB3RYHiAACGALQOgA6Au6JAcQAAQ/taiCUAACAASURBVABaB0AHwF1RoDgAgCEArQOgA+CuKFAcAMAQgNYB0AFwVxQoDgBgCEDrAOgAuCsKFGcbVkl0H975ru34cXbqwrx0dgtmniVR4I0ty7Is2/GCKFkdsYzgjDhDrcuSKAzvfNe+8OPNqQsDtOTfw8nIsi79+Il+wp+a1Sp9eZbMw/CT745e0BM+lLv6EboXVgO269/d97kDOEPFORbPSfCaPVe4qz3ZLZjrNHo/dmfLLC/ydHHt2pZl2W/Dx/VxCwvOgnPTunwZjG3ahl5Q3zs0Ku5qE/ulZWiRvjwJxtbLe8IHnbvKH6MpCcLrIHkuP07j+8BzyCB7+pDmuxX1uJyb4hybVeTZcFcHYstg5o/hxH7lRT/5v6PpGO4KGHKOWpevoqn9svpeUNomE+n7GXmvXtYTPvDKIPOjV2FaiUCeLWdkiO34ix52yOeoOMeEPmlDQ5Cvfp//2es2cdISbhdMMt0FXwt25Cy1jrahF9T3gqIo0tA1dVdZ7Dsv6wl35q4K7j0texqtejd/dZaKc0S2MgTZwr+87nWbOG0Jt3NXZBUe7grsyFlqHdzVi2QL6YO7anJXmzS86m2yzlkqzhHZolU8xf5lv9vEqUu4lbvazooBUOUstQ7u6kUCd6X+Vd1/NLornsArZWX1hLNUnCNi2ipWy2DS73yIHpQQ7gp0yFlqHdzViwTuSv2ruv9oclfZwndsy7LsSfjYu4XB3irOOo0/s433luV4QZSo1TBP4/s736X7Zsbe7I9kGQXexI8zYcpQ2nAh7dhww1S8XJZEdBdC/Y+atIrsW+COrArSb62S6Nbn33G84D5u3/Qg777O0zikt2473k2cVjK7xZMLrOrhBfoS3v7vFhETz1NYZckX3x1JuzcOFcxKAUocP87kmKySB7KNcDyNyqYmbC6xLGvsBVGSKbHO0/j+E3situPdxMm3KPAuSRBokkRDXJSGn6fx/a+eY2uCv/WjJNEO2NUs2/VDWl+kSl4tiVDsFyTNx8M6pdZJT7CmHq7T+IZ8hzziTRLO2nrfGnfV2PxpeRrbb3MFln7K+JvbBiRP4xlpuSPXD+N0ldzcNtTjPI3vw7vAG1tumErXH3uzhU5g8yyZlx2INfaCz5rW11aMPF3MSKjpY1vezHgu6yqJ7sPAcyoqV0rff4Wejly/UoB6d7Vj5I/Obg1tW3cldKLO+0gjmqfnpIpTx2oZTC7cj4t0XRRFnn69Ji1f2hawThcfXXvk+l+SLC+KnAmEJfXWdDdspWo+xf6lZUmOJ08fpo7NHxP9pzWahN+lVmk+5iB9m9omyE43ZxqSlpAlD6R5N9cQaff1+/DLv3yqF/ReZO++TqP3TqmV5J/K4QXaEhpFjDZ4Eu0Pd/c388cNeUzjIMmPEEztl0V/c/H+7ks4T7N08dG17XGwzIuC7im5cK9JqPghDs51LOg4qWC2e/1QeSJSENaP4Vtlqi/P4mtHbfjZt8B13OuvNPiLj65tlVuyt3uU5GqvuOtiweQOMs+SkHbJXlQV103sX0hec8icTOvopnL2INge80qbfQzf2lwEaF1tbxo6d9Xa/FvaLx192azhVAdjQqmaq/o+Acm/h5NX3O3RXqBhlCAOgd58CK7/yQR2GXpqtHlYxl64zIqiKPRjs9Zi5I/hxOZ/QiPA/l+Ks85djd5M3l8/JFlR1B8xU+Oudot8JxzJXdVAqmwv6Z+7Iioj93+P4USqOmQnZnUbpm6bq7ZqshF/6a7oJ8LX1O+Qj/d0V6QHrawR13SrCvTH7UmwFLpRKitiB68mgJNPLtzwR1sJDSNWVnqlUz9CMOu/zEohnNTAyB/DiS3LDfWOQs0hPYdc37gBEoOgnyRQg0/kWB4JUGcm/Irxo3yK/Uu5eEyyS1WhJk+tP3kSXKqWa6icTOvUhqapNstgPJKaZ/EU+1c7uSuz5l/bfkkqCx+iFEXBDk+pdPxmVX23gORJMK4OWlq34DCdqYxU6fKROLojTUa+Rz5YEm6zrRjPSfBalrU8i68vxaehPXeGBr+iWtqOQCfIO0e+E47krjQrg9Tt2q7/oFnbOjm9c1f5MhgrJw9XejvaRyp5bJp6bOgVSLuSJlfoMz2ou6I2sXLNsuQaiyCFgdjHSnRokZQuWZJCEoeDuiv6UNRQHCGY9V/Wx6QoqPBVP2dJkPRzIkkVkS20Z8wYuqs8CcZ1hRQ+N3yUeRKMleKR6StloD9SRq7PSXDVXKMGxcm0Llv4leeltlnySWVUuePKoFnzr22/Oium+9Cwqu8WkE3sX1TXK56bVwZrR3G81fMBCW0van9NGz53nG3FIIGtDOHElcEa4aqTPtoRiF2bRpB3j3wndOeuivK2lZWRHtA3dyWeTqvBDdOGDlVTZY29glgGMZ3rkO6KNnLd9Ha1VRtfU+uuRNZp/Bu7m4O6K7MjEg4TzIYv167ACgtwGq7CdFPfwWiCYOauxDPoVYT4Gz1KcrUWz03uVjN9tYq8y/7OmndPL7ROyvCrzF2R1Lsyq86Etqz2+uZf23617kr1Z8ZVvZmagPCOYJt41Ao7vRo7FKl+SMZOZ618s7YYPAjalClSqG3cFa0GYvRULTpQ5I/Gbg1tR3dVLhz2b4mwF4ojQMYKylyCCGsAqjfa112t0zj03RFJM/+xOPjcVcPuD7bcU2P46q9Z765osrTteL/ex8ni4HNXLe7qoMFs+HKduyLfb25xdKSoNtud3RX5Q4PdwUaPklzNxF1xXeY/na+id5dN7WhwnFbr2N6FsRd8jn98VdosP3eaUJNhrVDrrlqbf237pWtM8uQoqV3iJI1xVa+hLSBsUzPBaOtP/bBZbqcNllTpytuKISWlkWjLxdzKXWmsrapF+0b+2HTrrsrXEdZ94WT00l01T+HUN6F93BVLtOS7S46wMtgwQdUynVZ/Tb27Ynnl3ow29SOsDDa4q4MHs+HLze6q+QhfTZ4TYU93ZeCHtnBXzYMNDh11sNr1M/Kuequ/J+F0WsfSzPmG0LoRUWWnbSUtT4e2Who1/6b2SzKsRyxpepWEU6e6QLaN9a9iGJDKzkfLJu8YrQ+GmbuqTlDVf9OwGJX9jyM3+FYG6ljuarfIdwHcFaVv7qoyhSvznER/pA2v1trdXZF0QqkbO4K7Upb/i8p/tfWjhu6KZnGqi/fduKsjBLPhyy0rg3oNypPf5+mm/kWH+64M6ocH+V/R/LGp2PqVwZoZuNUf4Vy+NWH6CvnsKifSOpYrLT7E5tV80WO1LXdoqqVh82+ee86+Bd47n1kK2/XvqieqGFd15f+2DIhobpoVsm1lkP0iW+/TTP9UvrlNMUSPJVx5l5XB5ryrnSPfEd26KyriWBk0gFYv3Xuvs3gWJnlD29jZXdE/lC54lKx2WnJ13yyZ1mqb7DVzV/QDqbIdz10p9uUYwWz4MrkLjR1n1kRz1MVTPPuc5GVlU7RyZ3fFH7F6DkKexXchj4nRo2QDCU3KZr6af55Xb5km6Tv+PEY+u8KJtE43AanJav9zdiPvXaAbpVsG5Gq1NG3+de23KIrsWzDxWl+OblrVlaubBGQT395IV2B74ppm95lMKbuiVtFU2rzCe5nqy3+r32wrBuuTyguQfHkh1Nu4K523q8tq3yHyHdGhu2KHeSCr3QxWfeXj0fJ0MZv+Qhs8O5OpugVdMxVB25tk8/kTqZ4MKRqCmuwuJmbtmYP6Xr/m8IVV5CkHTKjoq5nyQlCdvBL3pnNX1RKaRawhFMcIZlGzsbl5uy7tn+SzTPM0nr2f0pbIKlv1jBnde+k14WInCemOWJMPSFyn8c10es8fuuGjlK5Wnoi4TuObqT/XjFzJvIX9N8d518O3mp6WHrkrNeFvE/ujSiX8EboXrW+nVSuSafOvbX3PSfDa6K24ZlVdwSggm9gfVUQyDV3DpBHNyREj+UPN4QtFUdBAySenNBYji/2/y906KYPgWbWHL+jdFdnsWVkO1qXk7hj5jjiouyr9Ez+ajLCWjmEV12ILHiDl827pn7sS4ykieVN2pqLteCGtW1kS0b0xUpWlXSw7GS9PFzfBzZ3/hl2WNHKWEUUW1PM0nl1/8N6w9cfV8n7+V16UbdLk5H0xDzR/nN/M6fdpFqQtnA9JTrNsTikoyiM9pVAIZpSbMypVtGrl6WLm/+K57IzQ7N/30X/y+hKaRYwbC1XvjhDMMrdUntQsq4p2BbAspIicrsuuwM93FQ4BVs6YGVk8GSVP45tgJsSlXHeglbPyq6KOGz/KuqvVnj1rtsQ8SE6kdTzLh/Sa6zT+5H/wmFKtsuVD9NczO5GBDwPoacltA3JdRTJq/u3tVwc/vZndW3tV3zEg9CgEPsAmqWAtV2bu6m/OeMIPByaniarLBUxSeHYa/QnJ3LQVg1if0uJQMS8VpkbluD3iRzXpfr0oyne9VKK6U+Q7YreGpv4NT6iqx/GC8F5zRD3cVRPiu2J0GzHKLSf0C2GUZPoBQXmYNdtWu0nDK8t2/bsw5FMa7EhfvreWnzDOBEU8eJfQPGnPf7cqSfIbDLQ5DQp82ynHDVO1+rEDwZRb5uc1i+eu1ZWwNWJqKOQR8EGDqd46vdNn9T/Ui8gvu9DuPBJqkuV4QThPslXN+cjV+yrS0LVGrv8pDOfSIy69vlXd/7Xdo2RX44k4tuvfzTUv8+GsIs/u736iE2KdTOtIVrjQnvjp5PwNAZs/ZzfLjfDWpvaTCPQVqTBo/i3tl70eQ4/yLoH6qr5HQDbx7U2yantLTDUiLIHhLilf3TFy/duaV8TI71vTtay2YmTxLEw2gp5Lj61Z5Ux+vfKEKzK7Q+S7YLeG1k8jshenU5wjsFUeDwC1vLw3p5bgmKsazkrrjkr2bebf6qbSyetierc3i2G28xocGbgrylkpDtwVOAwv112tH0Pvqn/5nX3grLTueOTfw8mkfu4zi/13cFegAbgrylkpDtwVOAwv1l3ly+AS+ex6zkrrjsX6MXyrvIlM5Od89uXkedM1wF31ArgrylkpjrrlCoBdoFlQL8xd5eniejJu23k6WM5K647Fz8h7VZ8cvU7nYdSDvOka6k5kAJ0Cd0U5I8XRb7kCYFuEoxxO/8L5Fsq92SQ1tnXn6XA5I607Hiwj3nb9u9/ELOk8je+127P6Q/lSGvUgKNAdcFeUc1EcdfNmb1MvQZ9hw9+6fTp9g760ZOu3/w6Qc9G64yO9WZltaGt/zd8JUZstZrBOBtwVBYoDABgC0DoAOgDuigLFAQAMAWgdAB0Ad0WB4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxQEADAFoHQAdAHdFgeIAAIYAtA6ADoC7okBxAABDAFoHQAfAXVGgOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3FVRFIUFAAAAAHBQtnYjx7A4p2WHKAAAwIsDWgdAB+zW0M6wcUJxAABDAFoHQAfAXVGgOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6KAsUBAAwBaB0AHQB3RYHiAACGALQOgA6Au6JAcQAAQwBaB0AHwF1RoDgAgCEArQOgA+CuKFAcAMAQgNYB0AFwVxQoDgBgCEDrAOgAuCsKFAcAMASgdQB0ANwVBYoDABgC0DoAOgDuigLFAQAMAWgdAB0Ad0WB4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxek1WRKF4Z3v2tZVmG5OXZpzYpVE9+Gd79qOH2fGf5VnSRR4Y8uyLMt2vCBKVkcsIzgo0LrjoG1KeZbMw/CT744u/BjKJbB+DN/alu34CxYsHkCrPVa8R+hxWI/mrvI0vr9j+mtZlmU5XhDeR8mqyL+H7z4l+Q6/e0SgOP0lXwZjm1UjuKsD8pwEr3n7NHZX6zR6P3Znyywv8nRx7dqWZdlvw8f1cQsLDgS07gjom1KeBLwL7LENOAkVd5XFvmMZxkrsEXoc1mO4q3W6+OjalmW7/t08yaiNytP4/s537Z5GBIrTczaxfwF3dQxWkWdv4a7yx3Biv/Kin/zf0XQMd/WCgNYdC31T+hl5r3rZ6fUPZpsMYpWvoqnhV0/Fwd3VahlMbMuyydBWIU8fpo7JxF/XQHEM+Pl79O+Ontsqjv6UO/s0dM/WXeWr3+d/nuq2qG81dFdkjL7VMiLoF9C6Y6FvSnRWpn+dXg/5EboXhrGiwe5xWA/rrshcX/MyQZ7F107/+kgoTht5Fl9fdlSTn2L/qtp/n7G7yhb+5fXJNGI7d0XkD+7qBQOtOxZwV/uyRayG5a7yx3BiW5Zlj4NlY1bVz8jz+tZHQnFayBa+000GIfHfSv99tu7qKfYvT6kRW7mr7awY6CPQumMBd7UvcFd6d8XT+tr7vzwJZz1TZyhOE9m3wB11UpPzbDlztWlA5+mu6Eo63BXoDGjdsYC72he4K627YlnH1jjo235AE/qpOHka3wce20ox9oIoqWSzSRtTV8kD2cE1nkaP+VYXKb9gWY4XRAmTB253RC7c8Af743Uafy43h0p/W8i7lFdZ8sV3R5ZlO9OHVFNJmNWQYHZKcFd5God0g4TteGH1dopVEgWew69UueXKHul1Goe+O6LfnC10BatcXNh3LRTFcrxZXPlr8eQCq3p4AfOsEu7t/4ZXZaCZdPDmZVmW5YapaXibQyFeusUwSQUoIX/V/pTbK2FRFMU6jX/jW18sx5vFy2UUeHTZlOZkCL9byFuNxGrJL1hfOeVN3XKluolTNbdBCqbt+iF/3LRyWrqSCMXuR09gnVLrDCpksU7jG/IdEuSNwWg8Txcz8qDp3yxvZiyVsXKeiyh3vM2KDdl2/Yek+ntNIsk4gLsyiE+exjNSkpHrh3G6Sm5umy6dp/F9GAaeY12F6Vo+S0Vbz/MsmZfN0Bp7wWfN19qK0fREqAj/6lXXQ8pYrQXFkNoao95dNXdJ3bFbQ9P8Dd96anvRSzz65qSKo4XaGtv9uEjXGpdz4cfPQo938f7uSzhPs3Tx0bX54myeLWfuhXu9oApC988713G5l/Nh6tiW8z5K1+U/rdEk/C7U5k0aXulq8moZTC5oCYs8/XpNulXNJlvnw939zfxxQ77TZMFrMntoB/bGv7sJbhZpznarVaoc/ZD5S/6dSUj8prRH+sPdl+trKq/ZwtfceAVp3/WHMLz2P8Xk6cTXjlXJOFyn0XunNBnkn0pWIrmvSmTz7+FEnSx8iv1Ly+Luqi28baFgz3bPuavWp9xeCQv+edmx8aGCFAWWfiCXlj67irtqrJzSpu734Zd/+dRY0yBXo5R9C9xXvDdizUQYxmTLkPYl02hVqUFZ7I9rRhQn4GRaZ1Qh14/hW5vJEastLZUzfwwnNn8WdNM6rTXSeS6TIHoI70mDZ2M5++3dYj4L7mhDTkLPsS3r0o+fyusbieTe7sokPvn3cPKK1yVaq5suLY5J3vjBP/1wSdtXONXIEZWpsce/phuxtxaj6YnIQzWtu7LfvP1w/SXJ8vIIAiXaNe6quUvqlIO5Kx6vfgzPtqZ37oqKwusgeeYfkT2oFd1nkRc2yfM/eAwntiQTrNvmtU21TfQTYYJE+7WC6aDUR7LOT/hRVj5j293sruTbIR+K/ZlqVjRLiqwNSztbtTeug97RyA2+CUUkxVYnLcQbUb9T4670iqwrYUN4jUJxoJXB+mIYVMKCdXXy17iXFW9BXwA1sEaVk17MngRLodSaKD3F/qVsB5mnFMcJxOSpe3ryZXD5TrFcJ+NkWmdSIfNlMB7JLlm3x0XiOQley822ugWHjankCsYev9z1qk3PUCT3dlcG8cmTYFxpvyZ7Yuh1ZIekGUiQUWIlc1ozdGwrRvsTqTmogimzJCPasavWXZl1SV0Bd0XpnbvSdoS6D6lwaOL+nASvlc8rPRapuNKwgD7KVneVL4OxkueuHlhCPzHP1Gl2V3JA6AEzwofZwndsyYDS+xH/kAahUnjdjevQ3xHRBbGDf4r9S1kR1O/s7a4awmsUigO5q9pimFRCpoDVGU3dkTaG7sqscurbjhKlPAnGymYdMoGhmXdRBsp5Elz2aUb/ZFpnUiHJJ5UOsmVlkDSWioMX16HqsjZ1ox1NKzMUyb3dlUF8NrF/Ua1gzy0rg7W3z00nG8PTYY+a20qdEDc9bcUweCL6sNTFihRAaoMad2XYJXUF3BXlZbgrbe+o754rU+IqmvRw6cTXNnclLrFpKP982z3827grbUCk+/nEcqrE7+gXOk3dlb6EOudUImYUHdRdGYa3NhSHymqvKYZRJdSb3UIroGbuyrRyaoNfrVSkeJq5YQ2a6aufkXclzECfHqsPWldXIXmF0eba6OHr9SQBSHcY0F7uSim4XiQPmtVeE58yA8c8PEX9liAabVq36wfqbJzDVgnaimHwRLZzV+yCQsBVcTDukjpit4am+xs6i3CCezgIvVAcETqMkAZMtPZUElbq3BWpfUabDFhmt+MF9/GPhdHcFRm+tJ2+UZzEXbEU1bEXfI5/fFW+06G7okWxHe/X+zhZHHzuqi28baE4srsyqoRkYKoxpju7K9PKaeSuyLMwc1e0GxB+ehV5l/3a6HNarWurkJUE05qU6grSBhHS1uQu/wDuqlUkD+Ou2uIjb/1xvKB6qzpqN1xLEWjYhae8KqOtGK1PZDt3pXkoammNu6SOOJy7Ynm4uqTOF0Dv3BXPyLNZOjBNm1XWj5vdVevjYKmUfLuc4cogvXz7kkfH7orlkvPtMJrvdOSuWDIs30t4hJXBpvCahKITd9VSCbWdnPBrO7org8q5hbsyVm0yzqS3nK+id5e9kXvC6bTOrEIWyga9SmKcnspuOzktck93ZSSS+7srw/hUdiLXvhmlxMhdVSeo2q7QWozGJ3Isd9WjfXWHc1f82ZgM8rL/ex/9gOK0kWfLG2/6C6ugI9e/Lffzc1pWBvWPI09+n6cbltioW882XBnUd5zPSfTHKVYGWf6jOFlyKndFN7KJ+xK6dFeGoehmZbC5Eta+iG3flcHWyrnFymDNDNzqj3BeuTVh+qpn+eyEE2mdcYXkiB7L9KAfsUcXmt5e7spQJPd0V9vGRzQ3bda/ZWWQBqqahiV+kfyX5im0FqPmieyyMtiSd2XcJXXEAd2VMH1VWbqq8vTn/e+P/RKcHrqrPFvOJldhe6DUfXMU1ivw7c0lT/Hsc5LzGio1p62y2vWHV2XxLOTNkEiY4cJKsZ+70k0znMhd0atJenQ8d6WG1zAUh3VXajEMKmG9fdnZXZlWTiN3xceN6mkd+Wr+ea5IOU3Sd64X8a+9ymcnnEjrzCrk5s/Zjbx7gO75ajhGWJKbouA9kVAf9nFXpiK5p7syis8mvr2RrA97+1yzatHbV5otmWfl7Y63mur5BaQJlGVrK4bBE9nKXWl20NdmtRt0SR1xUHdVlKut7JQmldUyvJ23rqN3Tu/cVb4MxrbJJKeyIi5cgwqTfKJansaz91PST2iEg/UlOncll4e1KPmQzDxdzKa/lFm9rBHUpHur6PtpNq7S7hmsnC0pK5S6r5Bvp9fdY/sMvv6Oqu8f1bkrXYKR3hzrAs7Ov9G5DTW8hqHY8gFVA95+kfZKWH6nYl90ewZ11YOdPyR+0ahy6tuO2hXxcaN03uw6jW+m/lzXQslsx4XjXBoPKrqjR+5KrZCb2B9VjrT4EboXjYvLWez/XXc+X1lJamZltO5KSaA2Fcm6VqBVmx3js4n9UeUktjR0W5fDaJWutC/SRsQP9WcfUOESJk3aitH+RGoOX9C6K7pnU15Y1DZesy6pKw7trgrhVL1qQuIqiW6v/aDqulj6diV2HdM7d8V3CaiIRwnzHlc/OcROsKxcoGwYbKstWTLP03h2/cF7w3qq1fJ+/hc5L05IqM/T32/Iwm756yJicy0LYLwcTieBHX+RFet0HkaP6/IgTfniZVuigy2eOkASNdZp/Mn/4LFX66yy5UP01zNbs5NFpOxBm09GYQIkHzwmeAimQfQJ0oqdp4uZ/4vHXyiU/fs++k9e8PHWpR8/Ffnj/GZOTz0lF2RZd3m6uAlu7vw3/BmOg2XeFF6zUNTcTg08lbUyOmx+yq2VUPwOP8ZQODBaPdKmHL+t0/gumN34by7Yhfn28tbKaVipikIwcBKaCTn2/dqVlNNjnWhl0KhC0hMZuBEnh0k2n/FLuuTyWHOSsSpUMP6gxWcq1HwhYah80GWyl6FI1jQlrdrsGh96FAK3DvQM3uYrc3f1yhlflaf1hlNHM03F2rhwiv3i2rXl1Le2YrQ+kbqw8NY3cn3xNFHVHmgbr0mr747dGlrr3+RZMg+Fs/TJroFQeyA93JUefkatltEk/J7zYzBK1Bks+bUGms0d3A3T3bP8JGJWvwn8bN/KayJWSXTLdg5X9oaIp3gTzCZIWJFs9/ohWRXqbbphKp1BTK5N+mBWTr5bmB957F4/JCvlYhdu+EN5k0ndBJZ6R1dh+pwK764hUfbjrCjPfeZF4ce1izHkX6sEXP3zTRpeWbbr34VhlGTt4W0JRc3t6CfuNHWNhsnkKbdVwqIo92RZlmWNvSCM+MNSjmOu3lfxI3QvbNe/C+/lxMT6yrldpSIPX0gDsl3/bq57mQ/nZ+T9rT/bl0Ssk2lda4WkK4ObtregyGTxLEw2aXz/q9xeiqLQPegLP94oD9py/PhJacjs+beLpL4p6dVmj/hs4tubZCW86aXhyAMBvjCaIBwU7gAAE1VJREFU/PtBeN/Pnf4VMfKbZHRVva0YjU9E80wqm4HEt2bpso31jVcIY22X1CnWcdzVy2O3QByTPFve+jOd48ySB9+1X+bJFwCY07BFvPf07pgrTv+0DhyZ2j2D4IjAXVH6pjj5YzhpOCZnE/tXcFfgzHm57ip/DK9MtqScgr5pHTg6cFenAO6K0i/Fyb+Hk1FTn7L6Ors/wUIyAF3yYt3VcxJc9TCfndAvrQMdAHd1CuCuKP1SnFXk2fVZxkLuMwDni/Euzn6xThcf3XHzqTSnpF9aBzqg7kQGcEzgrig9Uxya3mi7/p2UkrdO49/CsDmdFoCzwHQXZx/ge51IKq3J2eIno2daB45N3VZfcFzgrig9VBzpdaF098SnU21/AKBTlF2c/X6BKd/ha7aH66T0UOvAsVDbEWawugLuigLFAQAMAWgdAB0Ad0WB4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxQEADAFoHQAdAHdFgeIAAIYAtA6ADoC7okBxAABDAFoHQAfAXVGgOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6qKIrCAgAAAAA4KFu7kWNYnNOyQxQAAODFAa0DoAN2a2hn2DihOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6KAsUBAAwBaB0AHQB3RYHiAACGALQOgA6Au6JAcQAAQwBaB0AHwF1RoDgAgCEArQOgA+CuKFAcAMAQgNYB0AFwVxQoDgBgCEDrAOgAuCsKFAcAMASgdQB0ANwVBYoDABgC0DoAOgDuigLFAQAMAWgdAB0Ad0WB4gAAhgC0DoAOgLuiQHEAAEMAWgdAB8BdUaA4AIAhAK0DoAPgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxdmGVRLdh3e+azt+nJ26MC+d3YKZZ0kUeGPLsizLdrwgSlZHLCM4I6B1R6CmFWdJFIZ3vmtf+PHmdKXrHevH8K1t2Y6/YMHiAbTaQ/VConood/UjdC+sBmzXvwvD+zjN9y/zUYDiGPOcBK/Zc4W72pPdgrlOo/djd7bM8iJPF9eubVmW/TZ8XB+3sOAsgNYdmppWnC+DsU0/7rcP6JyKu8pi3+FmoSVULyeqB527yh+jKRlMj71wWXYUeRrff/LdEf2v2aKHHguKsx2ryLPhrg7ElsHMH8OJ/cqLfvJ/R9Mx3BUwBFp3FPStOF9FU7v3PqAXMNtkEKqXEdUDrwxuYv/CsizrKkzVm14tg4lNFjKmD30zWFCc7aBP2tAQ5Kvf53/2uBmcuITbBZMMlOFrwY5A645CTSumH/fbB/QDugJmEqoXEdUu3VUhGKzRJPzeK38FxdmOrQxBtvAvr/vcDE5cwu3cFdEguCuwI9C6owB3tS90fRDuSk+buyqK/Hs4GVn9SxOB4mzHFobgKfYv+90MTl3CrdzVdlYMgCrQuqMAd7UvcFdFsZe74iumlj0Olv2ZvoLibIdpH89mK/vbDHpQQrgr0CHQuqMAd7UvcFdFsZ+74tl/luWG6Q4/fhz6qjjrNP7MNt5bluMFUaJ2qnka39/5Lt1IMfZmfyTLKPAmfpwVxSYNr9TtGOxJ6R5ElkSBV27h0P6oSR+ffQvoVgYB6bdWSXTr8+84XmCyq1TejpuncUhv3Xa8mzitTIiKJxdY1cML9CW8/d8tIibuxF5lyRffHUmZhYcKZqUAJY4fZ3JMVskD2UY4nkaPPJx5Gt+XJRl7QZRkSqylDSi2493Eybco8C5JENLQbYmL0vDzNL7/1XNsTfC3fpQk2gG7mmW7fkjri1TJqyURit1vNe4I62Ra19gYKes0viGPmDzfTRLOWgcSeRrPSN0euX4Yp6vk5pY9ad5CL9zwh1yF+BardRqHrNqPXP+L0jSkiqdvPgdwVwa/sm188jS+D8PAc6yrMF3Lx7hom1ieJfOyM7HGXvBZ87WmgJP/X8zID9FSLm9mPK81z5J5GP7qOZUTFUp3tRbESmjmJlE16jG7YbeGtp+74jsq+yR1p1OcBlbLYHLhflyk66Io8vTrNem5yzNCiqJYp4uPrs0VIWcdvNzO2YKsHPKn2L+0LMnx5OnD1LEt531Ef/Rh6tiaPDnzGRTSt6nPmux0c6YhkdcseSBNmv20Hmk77vvwy798qo/0XuxJWBqKYp1G753S65B/KqvS2hIaRUzcSOx8uLu/mT9uyGMaB0l+hGBqvyz6m4v3d1/CeZqli4+uzaeH82w5cy/caxIqfoiDcx0L2k0qmO1eP1SeiBQEspW6Epc8i68dteFn3wLXca+/0uAvPrq2ZVmXfvy0/aMkV3vFuwQWTO4g8ywJaa/jRdWzvzaxfyF5zSFzIq0zaYzrx/CtzRWAVtS2dpF/Dyev+HiG6iStn+JZCRdu8CUKf4vTNW0RtmVZo8nd1z9mwQ3pv7Nl6I2rGkv3wrP6w7bGV+vnnu7K6Fe2jY94UtIbP/inT/fyr5JwqlFC+lD4ln/9OK0x4ORWwonN/4Q2fO1wTOuu7DdvP1yT7oyLRlUza6Jq0mN2xyncVfnIm7/WKf1zV6Qhyf3fYzgR+yeqEdXakyfBuOKu9JOubMRfuiv6ifA19Tvk4z3dFelBXwfJs/KhIlsK9MftSbAUulE6RSFWKjUBnHxCRrHNJTSMWFnplU79CMGs/zIrhXBSAyN/DCc2rzPkI+IdhZpDpvHk+qbdI63XNTX4RILlkQB1ZsKvGD/Kp9i/lIvHrO04SOhn1OSp9SdPgkvVcg2VE2mdQWPMl8F4JLXN4in2r5rbRZ4E46qtlzep0Gpc0UlWf+Q6r6neqj5o6ufe7srkV3aKD7tOZXShii1pPpWMHTZwEnxYW8Cfk+C1LHF5Fl9fSgH4GXmvat2V1FQ1BSj0UTXpMTsF7orSO3eVL4OxchRtpbejfWTFo2hPXjH0CqQqSwMF+kwP6q5opVeXhmnJNRZBCgOxj5Xo0CIpXbLULEkcDuqu6ENRQ3GEYNZ/WR+ToqBiV/2cjenp5/RwPyUVUiOChu4qT4JxXSGFzw0fZZ4EY6V4ZPpK8lK0RVTE9DkJrppr1KA4kdYZNEby3CsdZNvK4Cb2L6rO6VleqNKNqeqGOqqnyRZ+pZpppGZvd2XyKzvFR+8Fy8bIug/adtROmYoANz1tASePtTKcE1cGixp1rcu7IgWQmr8mqiY9Zrecwl1hZdAAVvVrcMO0oUPVtHNjryCWQUznOqS7ol277vlXW7LxNWskr2Sdxr+xuzmouzI7IuEwwWz4cu0KrLAAp+EqTDf1BlETBDN3Ja7IqAjxN3qU5GotnpvcrWb6ahV5l3x+C/RB62oaI6+r2lybGrhU1v/Rfu5K+jExMfGg7srkV3aKT+0d0avRZlU/PGMb0exptMqL9oDztk9SsrRpHlu5K3ZB4UmpUTXpMTtmt4Z2mKz2lh60W3qgOBJkfNC4rZJVerXe7OuuWI6n4wX38Y/FweeuGvaGsOn65sawlbuiydK24/16HyeLg89dtbirgwaz4ct17op8f9xoL2iTVJvtzu6K/KEyq6pi9CjJ1UzcFe8z+E/nq+jdZZ+2J5+cU2pdS2Pk6VCEmpTqKvwYRcuytJtjDuCu2JaLsRd8jn98PfzcldGv7BSfWr8ohaWhnEq33hZwabcQedYVE7aVu9I8KbW0Bj1m13TvrviJDP06ULSX7qrZgNbPPO3jrlhyJX9h0RFWBhsmqFqm0+qvqXdXLK/cm9HmfYSVwQZ3dfBgNny52V2xcaeeWv3d010Z+KEt3JWhdFKFYbXrZ+RdtZu8IXEqrTNqjIWyzbaSk1dzbXk3omWTt3BS9nRXLB+fb7I7xsqg4a/sEB8jd1WdoGq7QnPAC2X/48gNvqlJb4d2V+cwZbPPaaJsbrOSP3tq+uau6DynvlN8TqI/0oZ3Le3urkiqo26F+wgrg7oJFfJfbf2oobvKFr5jyzMoXbqrIwSz4cstK4N6o5Mnv8/TTf2LDvddGdSLXf5XNH9sKrZ+ZbBmBm71RziXb02YvkI+u8pptM6wMZbfFzxE88xridjli+1uH3fFsqrFMhzeXRn/Csc8Pi0rg/SJVNOwxC+S/9L8Sl3AOaLHUh/9ViuDLXlXBj1m13TsrviM4mly+Bvom7sq97mo72TM4lmY5A3tYWd3Rf9QuuBRstppydVqQKa12laUzNwV/UASheO5K8W+HCOYDV8md6ERF2ZNNEddPMWzz0leVjZFH3d2V/wRq+cg5Fl8F/KYGD3KhgnvfDX/PK/eMk3Sd/x5jHx2hZNonVFj3Pw5u5E3LtA9X02pJpv49kaSC7Y1tWxl+7gr3bzp4d2V2a/sFB92R4pikDEVfyL6nZUFa31l2doCzvqn8gIkX16M/zbuqrrWL8RGyWpv7jE7pkt3Vb5kUJ4k7AW9c1e8yspn7uXpYjb9he67YWcyVbega6YiqJRIcwnsSBXlKBKxHtdkd7HarR93iuh7/ZrDF1aRpxwwoaKvZoqI6ASduDedu6qW0CxiDaE4RjAL7cOtjwktdUizJMSz9fI0nr2fUrPCKlv1/BvdxmlNuNjZRboj1uRDEddpfDOd3vOHbvgopauxZVZ6NX+umZoiMyX23xznXdOS6CDpjbtSGuMm9keVGvgjdC+a17U3sT+qyEgaumLL1Q8e9O6KjQoa3ZU2T7GmFZvtozf7lZ3iw1pTZWRCmrz4of7sA/qY5FNUGgOexf7f5d8ioRbHn9rDF7Tuiu68rngGXVQNesxuOai74n1PeRwZ+VzYAVEuuovQuChrt93RP3clxlNEaiTsTEXb8ULagWVJRHfjSB0w7WJteqRkni5ugps7/w27LGnYLCOKPIg8jWfXH7w3bP1xtbyf/5UXZTs0OJuKSdulHz8V+eP8Zk6/TzMfbeF8SHKaZWsdYEd6SqEQmhY3Z1SeaMvM08XM/8Vz2Rmh2b/vo//k9SU0ixg3Fuoq2BGCWQ5R5CFaWVW0K4BlIUXkswzYFfj5rsJJ+vLRocTojOgxoXka3wQzIS68B2WVs/KronYbP8q6q9WePWu2xDxITqN1Jo2RnjjAxwD0qOTmDF16QADvUMkZm2U1K9uXlI5CVyrlvKWyHfHunCckka+t0/iT/8FjArvKlg/RX8/1rVhbw1XMfmWn+DB39coZX/kPiXCaqDqOZfLCu2kaTCm1qy3gxCSVYyoq7GJYyuArZ8mS4PviaaLqdExNVA16zC7ZraGpfyOeCavDdv27MKw9kx7uqg7xXTHazReV94f8GkZJpp+jLg+zZltpN2l4VX009LRii++n5SeMsxovHlBOaB6W8d9VXjEhvSbFsl3/rvWtBWzMUuKGqVr92IFgyi3zE6JdJjQNJWyNmBoKeeR60GCqt07v9Fn9D/Ui8gsutC8dEmqS5XhBOE+ylX6uXrmvIg1da+T6n8JwLj3i0utb1S1O2z1KdjWea2K7/t1c8zIfzirybINNi8PDOo3WGTTGzZ+zm+Wm7S0oFTbx7U2yEt5/Ih4EoLYvx4+flPcmWRd+vBFf9CTVPXayOS8PP0idvtigphXra3gdrb+yY3zKtc7k3/ztC/ViK79JRtfKGgNe0HW4jaDtcimVqEiaKb+wa+T6t9V3JbVEtb3H7AzrsCuDL5fdAtFTtsrjAaCWLd6r2jtwzFUNZ6V1oJXmE7zA0YC7opyV4sBdgcPwct3V+jH0rvp05kt/OCutA63AXZ0IuCvKWSkO3BU4DC/WXeXL4BL57HrOSutAK3BXJwLuinJWilO3BReA7aBZUC/MXeXp4noybtt5OljOSutAK+gOTgTcFeWMFEe/5QqAbRGOcujX2b8ayiMbSB7tyfbH9J8z0jrQSs0uY3B84K4o56I46uZNTAiDHdgo+6rMjuM6FWRbuOk2qkFzLloH2lB3QWIGq0PgrihQHADAEIDWAdABcFcUKA4AYAhA6wDoALgrChQHADAEoHUAdADcFQWKAwAYAtA6ADoA7ooCxQEADAFoHQAdAHdFgeIAAIYAtA6ADoC7okBxAABDAFoHQAfAXVGgOACAIQCtA6AD4K4oUBwAwBCA1gHQAXBXFCgOAGAIQOsA6AC4KwoUBwAwBKB1AHQA3BUFigMAGALQOgA6AO6KAsUBAAwBaB0AHQB3RYHiAACGALQOgA6Au6JAcQAAQwBaB0AHwF1RoDgAgCEArQOgA+CuiqIoLAAAAACAg7K1GzmGxQEAAAAAGCxwVwAAAAAAhwTuCgAAAADgkMBdAQAAAAAcErgrAAAAAIBDAncFAAAAAHBI4K4AAAAAAA4J3BUAAAAAwCGBuwIAAAAAOCRwVwAAAAAAhwTuCgAAAADgkMBdAQAAAAAcErgrAAAAAIBDAncFAAAAAHBI4K4AAAAAAA4J3BUAAAAAwCGBuwIAAAAAOCT/P2iC2BHcdqh5AAAAAElFTkSuQmCC" 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><em>The following statement refers to question 11 and question 12.</em></p>
<p>A gas is contained in a thermally insulated cylinder by a freely moving piston. The volume of the gas is increased reversibly by moving the piston.</p>
<p>Which of the following gives the correct entropy change of the gas and the surroundings?</p>
<p><img 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l8J2P+/vl1eLgSEgBAQAkJACAgBISAEhIAQEAJCQAgIASEgBISARkAUdSIIQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJC4DQgIIq606AQJAlCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkJAFHUiA0JACAgBISAEhIAQEAJCQAgIASEgBISAEBACQuA0ICCKutOgECQJQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJCQBR1IgNCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkLgNCAgirrToBAkCUJACAgBISAEhIAQEAJCQAgIASEgBISAEBACQkAUdSIDQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJC4DQgIIq606AQJAlCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkJAFHUiA0JACAgBISAEhIAQEAJCQAgIASEgBISAEBACQuA0ICCKutOgECQJQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJCQBR1IgNCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkLgNCAgirrToBAkCUJACAgBISAEhIAQEAJCQAgIASEgBISAEBACQkAUdSIDQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJC4DQgIIq606AQJAlCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkJAFHUiA0JACAgBISAEhIAQEAJCQAgIASEgBISAEBACQuA0ICCKutOgECQJQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJCQBR1IgNCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkLgNCAgirrToBAkCUJACAgBISAEhIAQEAJCQAgIASEgBISAEBACQsBREJy5BBobG8/cxEvKhYAQEAJCQAgIASEgBISAEBACQkAICAEhcBYTsLOzO+7ciaLuuJGdPg9kZ2ejvLz89EmQpEQICAEhIASEgBCwIuDs7Iza2lrI4poVFvkgBISAEBACQkAICIGznoCXlxf8/f3h5OR0XHm148BRzLKOC9npE3j6tGlYu3YtHBwc8E+0tKdPTiQlQkAICAEhIATOPgJ1dXWIjYmBWlirobJO+uqzr4wlR0JACAgBISAEhIAQsCWg1GxqoXbMmDGYevvtaNu2LeztW+95TizqbImeQZ+VZrZ3nz4YNGjQcWtoz6BsSlKFgBAQAkJACJyRBHJycrBnzx6MGzAAQcHB2sLaGZkRSbQQEAJCQAgIASEgBIRAqwmoxdptW7dq1nTHo6AzvUAUdSYSZ+DfrKwslBQX48Ybb4Snp+cZmANJshAQAkJACAiBs5fA8mXLsHDBAkyZMgXDhg2D2gYrlxAQAkJACAgBISAEhMDZTaC8rExT1OXl5aG+vv64M9t627vjjloeEAJCQAgIASEgBISAEBACQkAICAEhIASEgBAQAkKgtQREUddaUhJOCAgBISAEhIAQEAJCQAgIASEgBISAEBACQkAInEQCoqg7iXAlaiEgBISAEBACQkAICAEhIASEgBAQAkJACAgBIdBaAqKoay0pCScEhIAQEAJCQAgIASEgBISAEBACQkAICAEhIAROIgFR1J1EuBK1EBACQkAICAEhIASEgBAQAkJACAgBISAEhIAQaC0BUdS1lpSEEwJCQAgIASEgBISAEBACQkAICAEhIASEgBAQAieRgCjqTiJciVoICAEhIASEgBAQAkJACAgBISAEhIAQEAJCQAi0loAo6lpLSsIJASEgBISAEBACQkAICAEhIASEgBAQAkJACAiBk0hAFHUnEa5ELQSEgBAQAkJACAgBISAEhIAQEAJCQAgIASEgBFpLQBR1rSUl4YSAEBACQkAICAEhIASEgBAQAkJACAgBISAEhMBJJCCKupMIV6IWAkJACAgBISAEhIAQEAJCQAgIASEgBISAEBACrSUgirrWkpJwQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAJC4CQSEEXdSYQrUQsBISAEhIAQEAJCQAgIASEgBISAEBACQkAICIHWEnBsbUAJJwROGIFGxmR3wmKTiISAEBACBgKNjdD+U22M8bKzU42NHbQ/pi/lrxAQAkJACAgBIXBqCEjffGo4y1v+xwlwBNygRsHq4rjXnv/+x4mc6dkXRd2ZXoJnWPrrqspQXl3PSfOJaToaG+3h7uUBJzZGcgkBjUBjHcrLKlCvU9aYyHCsCGd3D7g6OUjnZYJyVvxtRH1tFcqKS1FUXMw2phaNLGwHBwc4OHvA188PPj7ucLY/QUbkjfWoKCtHXUsy5maUMWmWzgrp+l/KRH11Ocqr6k/YYlpjox3cPNhHO9pLm/u/JEgt5ZVtZ2V5BWo5mbS9VP/s5ObO/tkRMqSzpXOmflZ9czXKS0tRrPrmqhrUs+wNfbMbvH384OvjAWfHEzQm0+SrEnUNDUZlhYWbJl+ulC9nkS8LFbk7HQk01tegsrJGk2Pb9Ck5dnBxhZuzExysGsoGVJYWIi+/AOUVNbBz8kRAcBB8vdzgaBXONkb5fDoTEEXd6Vw6Z2HaChLWY8nGdNSy465ha2Nr/WLI8tGsX/iEbnxXV+eLMVOuQltvF5ygKXgrqXPwQU2QvYNMPloJ7NQFq8/DugWLkFLKASHfai0vQI+LJ+DcuAC4OIgW5dQVykl8U2MDKopzkbp/C/5guf/4018ooCK2prQElfUcrAd2wZXXTcL1141Fn8gAOB9XuRvrORV8VmsLlLH1vyzGwWJOCNge2cpYt1FX4bwOwXB1FBk7iSUvUZ8EAkXJ27B8UzJKyytRy7qlprt6+Ta88mh9NEPwAVM3XV/vjfOvGYeOob5wPqXVoYW6exKYSZTHQaChAJuXLkFCTgnHgHYUFZOkgGMqoOOwcTi3Sxt4OZ/aEd1x5ECCtpoAFQcl+UhL3IEVixbjp5+WI6umDjWV5aisrUODX3uMvnICJk28DAPiwuDhdDxlbqrfqi3SNSyUr23L/sT+zEJUNyNfHYZcgnO6RsPH5Xje1eoMS0AhcEIINBanYfWfG3DoSAnqlajq+tSGBjsE9xyMIb07ItSLc1+j+NdX5GLNTx/g1Q/mY19qHhq8u+GGO+7FrdcMQWywBxz09eSEpFIiORUERFF3KijLO8wEfAP8UVmwDtv+XI3duYeRnl+GhiYrq84ICAmEi5PRZJfjuIb6WtTU1KC8qISdL6cO5rFdV3S7chxidI2V+WUn8aauPB/7U0rRtmMU3MQ66ySS/gdRcyU1Z9dv+GFNAhIyizn4b7CKZGqnkegX6y+KOisqZ+6HqqIM/PHJc3jqwz+RX1JFk8mOmHz7WOR/+wlWZBWiIm8vfnr7MaxKARY+fw1iA91bbdlTV1GAxNRSRLaNgIerk+U5JWPxS/Djyr3Yn1GEOhsZm9J2MPq2CxJF3ZkrVv+zKff280VNSRa2L1mJ3ZlpOJRfgto66zaUlQx+Qf5c0acVjJokaH10nbYAV1FchipqXBrMnXQHhJ57HtqFnFpFXV1lEQ4eKkFYVBi83J0tdfd/tmRPk4yz7czbuwI/L92C+PQi1NSq5TTLNTGwG3q0DxdFnQXJGXtXXZyNVd++iWff/wUp2SU0l2yLq24ejbqVv2JVUhoKCxOx5ONnsTG1Fh/PugH92/m3esG9rrIYKWnFCIoIgbenq+U5zifyDqzCr4vXY2daEaqpGNRf1/h0QLf2kaKo00OR+9OOQF1dOQ5uXoffN27HwawclFVUc9HMckVf8SjCwyIQ4ulM63fVCTcgY913+OTLhdh/iEo61f8W78YXL3yG9jHhCBrdHd6mObUlGrk7AwjIksIZUEhnUxKdI/ri9odn4X2ueM179Cr4uzU3gG6PO194A3PnvY/33uO/ue/itZdm44G7p2BUlw6IDPKhua9JdN3heKpXCRqqcODX1zDhyqexPae82S2WZ1OZnXF5cQ7HDa8uwMfP3gB/b9cmyade1do6qkkI+eKMIVBbhpUfzsRTHyw1KOmYcNeu4zFt0lSM6e8DNxdLTgoWr0ZaSQWsh+2W35vcsZ4nLnkHN054GutTC2hdpAvhHIaJL3yPD5+9GSH+HrofDLfcuSWKgSZU5IszgYBTaHdMuvsRvLP4N8x7ejIV217NyHIMJj/8DOao/tnYR7/+8rOYce9UXNK7G1fv/bStbIb8ctuN3Sm2PG+oRvKy93HbpFlYuTcL1foZzplQCGdzGp1CcOWTn2LeC9PRLsKvSU65A9KidGnyq3xxxhCoq8CGb17D8+8tNCjpmHCXDpfghglTcfl5YfDVdZtFKzYgLaeAi/CtzB3rd+rKT3HXlKexZOshVOnrt1MwLnv4fbz7wt3oHBPYJELuwJfxXxMq8sXpRsA5uCfufHUe5n/3Ji7r3wWedOOisxuFmtmwqdRd1UjcuQOFublWVsrAEZRWV6CmOV9Auqfl9vQlIBZ1p2/ZnOUpc0DPSy9H52fmY315tc3k2R2devRC7zAvDvAtGIbxdvLtd2Drz+/i4Ze+QkJaLn1dWH4/JXe05ivNXIXXZ/9EP2idUMF9b60dW5yS9MlLzARCo9rSD4qT+bPcnH0EKg8txazvNiOf25xNV+cBbeHsRiMfZx8OyB35T1lsuMI/JJJWGvxsCnjUvw0oy1qHd178CQX5kahkPdcMf20eDomMgaMTVzTlEgJnHQF7dLlwNLq8sRBp2cWgraruckdc527o3TMabqY1M+Ovk265Hbv/+AyzXvsc2/ZlwMagRRfHybptQHnOBrz/2gJkZ9KCn4OEUz1MOFk5O5viDQ6PgjP9LMl1dhKoyuA4ecF6HMwpM2cwrlcUPHyc6JqCyn+Ozezs1LKZC3yDIuDj5sqteeagR7lh/T6yGZ++zXYpxUWz3m1OBxEY3gbOrhwIyCUEzmACrsERiPD2hAe1cqXWxsc2ubKHh6cnnOm3TqtXxompnZMLHKnkM22PtXlIPp4BBGyGWGdAiiWJZw8BB1cEctrcbN/cpEHiYJtbJgB39L1sBt6fNRltaC3V7LMnjVAjqooz8MNz92NNeSlq+R5aEp/iNJy0zJ11Eddpg0BRo551BavL0KGN61FbVan7BqiqqqYC3wn9r7sFHbt1R7u2bdEubhQeeO1GdAr2xrFXp1Q9P4wFrz6KVfm5moJCLRg019bUi4xZsZcPZxkBexf40xqu2TrTRPtFZbbWR7uh+6jpeP3xW9C1jV8rJ98nilsjqrltd9GcmfgrKx3ljFZN/puruyfqjRLPPyOg+mdZ5vxn7M6Epw7v2IbK4iKrpFZX0zl+vVqkvxad+www9M3tRmD6rEno2yGUG+qPdbF+l+ZgyXvPY0VqIriZtsX6Xc8FOpGvY/GU3097Ao7+aB/pCj/PY1mCuqDr8IvQsUd3+HjSHx0V4S7uvgjpNQBRbYLhzkGs9IOnfWk3m8Bmx1/NhpQvhcD/I4H6ynwkZ9ghuq0/ncHbo92oGzG5y5d4ZeO/a3pMjoytnNE2l0/u968uycVfn8zCy3/w5FqjAc+JUAOpNBzz/SpNDNfIbb7/LsfNZk7z+deqNDT3+Kn+TnHQ3kkWJwKGFt+/iMucHtWRnogEGYEa4/1HcZrSdILkpdX15J/Kgkrvcae1kSdclfMoemuNwb5dB1BUPRKdB12F7xdcSYueOjg48XSsVpWNqud5WPPFC3htSR4KrXWA/zR3RkfA/1zGTgl/lbvjLoPmkLAsTau5rWKui4PPabX7hKRDF6/cnnQCDVUFOJTZgFBuZ3RzcUT00PG4rvt8ZGT/2/Vggzwdux1s5AEy+fj721fx5u+HkVN6ArOsBPpYsvyP2rDWpbHVY4TWRXeSQ5nq/z9v76wTqOL7N3GZ0nOC+2ctka2VTescGR7ls+rmRLR1Sva0qE7g+ENLpPqfipv8zZ9bc8PFLp7s21BnveKetO8g8soq0KXPJfjg89H0fVkHO0dHzZXNseNX9bsAG+e/hbd+TQbdz52gS5Xhv5Cvk8he6/dPhHycIFLNRtOatrHZB41fHsfzmowfLa7T5jclU/+ivbFiYg8XHnzi2ApFm3eni3HPXa4IDvwFa3fkwL9zf0y86Wqc0yUSrq0zV7Uh+C/ywfyrluPftG+Gce+/qJs2uTlTP4qi7kwtuf+xdBdsfh+XT/fGr2umIsZfWdIFYPiEc/DWrsOGxkDHw7Cqr/tCf0vfdvZ8oqG+DtWVVajmQEF10g7OrnCnQyt11HWTAQO3u1YWH8HaL57GfXNXoLRS2dIZLvWuev4zmRXbM36lOFAdSnOXnTo9Uv3AhrihrgYVlTw1Up0e6+wODzq8bk6Z0Mj311ZXoaqSlkL2HNTYqfjtuW3EBS6amXMzaVZ5bHJIhyVFWjp5jH1NFRlU12rb+uwcHOHCrQIuPHmryaSIaThKdIaIaXlh4tBSGZjzb0lKq+5Ug614qRXZGg7+tIkLPTQ4urpwUugM++bKrcWYWQIsoAYef15NppoMkKcTZcDNlWVgykSLz6vOiyeO1fKAk9oaOlA3pMcgR85wZZqc1GnAzUzsWuKivUovm6pceCqaIU7mkbLpaJKdltKl0sQ81fBI92rFiOEUb0dHJ8qKM83fm/MT1XInaMhjtWahpg5LsOTP1Zi/lhLS+u+VbNdRtiuVFRy3qVrJNpVrdi2Uq1bHuGJeVsnJgK1g8rPirLFm/p2dj71Or6VYq+e5WP/tC3ho7lLkFls2+6k6rsVpzJqqP0e/eJqhqoM8BKeaZVmjTrjTZMxFk49m2xmbCE86f01eKMNkX61kmO83ywuZOdKZT5O2kN80FWtjfairRS0P/FH1QTkyNssL2yknFVfTB805NslBRVWNVp52bOecVPtGhY99fTXKqhrh7uGq1QHzQ3JzWhEo2vkVptxfjxc+pFP4LoFsnf0waFx/eG/dq8mWPrFHbQcpJ6oJbuCBFIa6Y+ifHJzYPqt2sLl2jHW3igr2jfNfw6Pv/ob0XGVLZ7jUu9SBQiZ1vtYHqfpsCmDzV8mpQVZVn1OLSvbR6jANeyc3uLurdti6VmiyW8N2kuMJLgmw/1A1X/Unqn+m/Dbbbqs2qqVRgmmCp/p9xqv6Z4ZV/bPaKurCAzzsbetSq/pnxdWQ9pb42ylfgtbZs6HT/EfVVmkHfjG96nAIVf/5NjiyDruy73Forsyaj4rfqrbTcIBYNdumGvazDfzOUfXPrYrL1B6pw01Ue8S2l/y09ohuClzYxzvREZ6JhW0yWmKjhdNkg8MHymYN+61qlTYKkpJNV8qm1u/bRqj/bG5z2U9rfQJ/pHw4UVml+im1Ra0p/+baXD7HuOrUmIj9i5JPlT979pmu3ELqdAK2upnlmmVQ18ixHeVaeQ90YjrVuLN5uWayCKSRfXM5Ld1Vv2l1qXIgO/W9qmMqrlZdqn5TCb914dt4au7PSMpUtnSGS5WX9s8ot62VYZO8amVIdo7cIqjGbs22L6aXmf6a2VeTvRr/Gdm7kr0mW6aA/+Av81qr2hPWe+0gNGXRrJgr2W/gnKGmURvPqfeoLB9tvqGESZPzo7QPlvbOmFbFs4VkW8Ia2kZD/ayH2l7paqxXdv/2eZt3a3JYyzEKxwa1PO3UMPRS5UWLMXJpqW050Vxa2y6osquuMbbZRplS7UJL7Y0pu40N9dr4qYbPaoeT2TsY53iGEC33Fup3S38S0eN8PKj+mSKmlGjlZvz8j/NhHMcdNR9a+1aHOo4D1SEu9fysZNDR2L6pdq5p+2bq74wJpKzWsbyrqowcKP8ObLddeZibQwP7Y8q/ajec/ocOcRRFnVmY5eb0JVCP1B2bUR9wAQfBllTG9r0Qse2+Y8do+Q50AJ+SmGpWVOh+0W6DY9rBs6EMGYcOYi8dbyZnF6Ky2gEBMV3Rt39PdIwKhaeLzmlnQx1K8tOx/OPZeOTDFVQMWJR03GSH1KQEhJR7Ghof5yC0bxuAyvQkZFWoRsr27UBYbAf4ujmgujgPhxLisXXzLqQXV8Avpi9GXjhYO5FSr6xrqKlA/pHDSNy3G9u370EZHTH7OVNpBy/Edu6I9rHRCA0OhDeVfPoGtLYsD2kZefTf0UyX6xqM2HA3lGSlYu+ePdiXcBjF9Lbt7h+MLt17oEuHGAQHeMPZrIygX76cFBwuqGo2T4Zc2iEwuh2CPHhUeKPiQge/StGkR0BFTHRcO3i02k+Y4eGG2koU0UFqZloqDhzcj/TsMlRwkOzk4I2Izl3Qo3MHREQE08eJYqB/YfP3ahpQzUFfVkYidu+JxyGeDFrd4IKwdp3Rp2cPtI2kmbg6zbCZxxup3KwqLUZ+Xj5yuLUqNSMNWYfpBFkp1hqdENCmLTp164i4qEgE+Xtp1p/maCibqTzprIqDeysuxgBB0W3h1ViOw2nJ2LtrJ5IzC5hPewREd0bvfpTN6DB4U3HRXEfXSGVGSUEuMtJTsH/XPiRlF6CREztHJ3cER7RBXNu2CAmgz0e94ouDPifvMAT7ujdRTjbWV5H5Edalvdi9+wCyKaP1jY7wZv56du+Gju0iEeDp1uQ5c15bcdNQW4GCI5lI2h+vyXaJQwBlm4oteCC6YwemOQZhmmwbFOjmKBtrUJCaigLKdn5lOQeVNjSLc5F0MAko9ENkuyh4s4PXNRvmaKxuWM9LCzLw139fxJMf/oE8dXqs+apCenIiElFoaH+cAtEuNhCu6lSSFi4lO2r1PzkziTK2hzKWz7rogtDYjvTr1QPt2M546NsZm3hUeRbnWfhnFfPQmgZHeEXEGvlHIdDrn/NvpEK3tDAX6ZSXhF37KS952iKAI5URQfTto7YLh1JerCaeRnkJoryYlBVafSgrRoGqD9kZSE031IcqKjdUffCPiEGnrqwP0VFam2IVnzHPKi3FuRk4sGs7tuw6iBIO8Jzc/NGmfUd06RQDz9x4/LnHCWOvHIIwHtxxzLK0YSkfTwWBBqTv2Ylqjw4cVHNiYHxlVI8haNs+0+pQF9ARfHoKt6VSAWBTc7WnAiKj4W1Xg+zDKdi3axcOHs5lv2sHv8gO6NWnJzrFhlu39aruFmZizVevYdaHv+FwvkVJp/rojNSDSPSoYn/G6J38ERsdiLrcNGSXUsHRTPcYHNkW/p4uqC0rQHrSPmzfsgup+cWse90x9Pzz0D6cB2UYrRNU31SYm4WDB/Zgx449KGz0gY8zJ1x2boiMa4+4dmzDQoLoOJ/+t3SdU11FITKYrwrKehMGLoGIDHVHVf5h7N+r+ucMFJTXwsU3EB27dEXXjqybQb5wMU7U1Wl/5XnpyGS+W3YYbse6GI0gb9Zd1CA9NQPlVCxav9sRETFkz7QeTx1rqKviGCkPmemHkHgwAWlZRTyhsIoKDw+ExnVEty4dufUqlAxs2vEWxFLJTm15EQ6lJiOebWdKJjnVOiE4uj169uiB9uwHPVWbbhIyXTyqPaouL2F7VKC1R2nsnzMP56OivBI1jQ7wCYsmQ7ZHMVEICfTRMTRGQtnMIJuyJmwMv/tHRMHHoRZHMlOxb/cuJGUcYV7t4BPBtFE2O/N0cF9tLKZLlPFWtXNlRfk4nME2N/4AEg8fYUkoxZc7AkLDDW2ulibdAgknpk6eQQj09eQ411Iqhv6eY8ik/YiP30+ZpyuWBgd4hkahW7du6BTHsvZx19rvpik59jfamCsvGwcT9mLnjnj2tZ7078qFQMp1eLt2HOfGIjw0iFvseFCMviAaa1HMPiCfyobc0lIq+GwqGMddKSzXALtKtIluY6gXzZSjVQob61BWmI2/v38Lz3zwC8fsFiUdOFrITEvh+NgOHFaj0ckPUZFB8HRr2TexSb7SOJ6M3xuPlIxclNc6IjgyDj24bbB9TAS8+Lw+W/r0mNincSwaz3LMUKdiczuvZ2gkunYl+/bRCPbx+GfsWd6l+WxPON7fuiuR45AK2Lv4cN7QDh07tYVf+SFs3F+LvkP6cwwRSNc7dSjMOsyDtFj3bVCzsUNwmwj4ebuhhnFmM52VTU7vBvzDOJbzUWNVRYa+eXMycIQnd1c2M4EJCGdY+kur54m72SkHsHPbbhzMzodzUBwGDT5PO7yjge/KPcrz/ny+QT2fmoCdW9m+Wz1vPfbW2pYCjoMS9mHXzj04UuUED1dlauGC4KgYxMW1RZvwEMoR5VAtBpoKinJYlJVJfmXNcHFEELn4sy3UuBSQSzMdgX9oGwT4ch6kuHDsk52RheIyjjeV8snm8mX99eHBZYXZ6TjAOUViWhZKyhvgERyDrhzvdYmLQoCXWmg0p1AXQyPdt5Qjj9xTkxKx70Aa010JRw8/xHbsiO6dY9hPqMUPpY5r/qqvLKDlej7KK5qZWzj7IyI8ED4eXPhW+TjMfHAnSrP5CAmDj6sd85GBhD276QfemI+gaHTt1QOdmQ817mwuH41clC7nmDfrcBqS9rJ9S89GOeVNzUH8g0IRExuD8GDDSfHmuSrl3dHDH/4+PnBVHbSS/4IcpOxX8p9AOSyHnbM3Qjk36tipHfyrMrB1fzW6DeqDjrEhrGPN8Wye0Zn8rV7FcSbnQ9J+FhNorC/Epr8TUed+vtVxYM5tx+KHH0bBWQ2CTfW1KhnP3vcf7DioTOx5nLVNyzbtjc/Rq2ApZrz+I8rKbQaqQRfi+bnP4OqBbbif3zAoquYk8YsX7sGcn5NRXm1txg/sxsybrrSQ73QPVv14C7bMvg/vbEni4L5pY/jYjxtwfXt7Wuc9hwff/R2lFRYn+L8//D0+nToIfm6GallXVYyk7X/hvecexi87S9nh0F8QB/0ezg0ozsxBiVrJazsE99x5G64aOQDRgV7myUDO5s9w9zM/IjExQ3OmbYWh61TM+09b/PTI81hdxHjZ/Ov7nsHXP4r/TJ+A/tFBxs67CqvemIZZ8/cju9JgeWPJtLrzREhEAG56/WvcOigG7nXJeGHGg4g/ROVeXgkVDFxdd/RGSFhHvPHDpzgn0l/z7WcdR/OfGmrKkLZzFT559SV8vSEFVYwnLNAD1fnZ3JbIlXKVsaDBuP/JOzFx1ECEsDNsti/URV99JAVrv/kMT7wzH4WlFVZ5R+xleO2Nx3BpnwizDJgf5SC+MCsJq3/9Dh8yr/vrneDtywGOfb2mVCmjfJg4nj/5Mfxn2rXoHRkAJ1OCqlPw8sP3Y9O+/RzE0nLIFNj4gltf/hB9ytbgyTk/ooAdlFWZBY7A03OexoTzYjlgtgzY1aMN1WU4fGArfvr0dcz7ZYdm8WlHRUd4sC+clVKaSiK16hsQEwtftaLFZ9QKG8pSEDPpI7x62zAEqiPejVc948tO2ITP5zyLz5Ynotzeh3F5AZWFyOGEoK4+ADc+NRu3XjECMUEWmTM935q/dVUlSGa5fvDCY/h5OydSdZTt4EAqyRupQD6CEmVtEHMu7ph+C6654FzEhtC3nIlj3WG8f/1EfM5BRJmN7GrvTv0Wd1/7HW97Ye6fH+OiTqHgzoGjXtX5e/HtqzPw5k/7UFSuHFzrr714/o6Jli86TMdvX92NbuE+lu9s7pSM/f3dd5g9bz6OFJaa5UILFjMWL77yKK4YEA1PWq/aXvWU+ZyEzfjirefw2bIElNp5UWHpDbvKIiN/f0x6fCZuvXIkufhYuNhG1MJnVacyE7Zh4X/nYN7CrcxvDexc/ahQUPJSgUwq7ZRVTEB0DHy4aq1SqMlLeSqir52Ll24biVA1KuWgryj7INb+/gM+fuNr7KFu04MDfheHBk7cqVypMtZPPj904oO4a/r16BcTxN/1ea5DUcomntB8Lz5ZnYmSak5aKbcuDlwgyS1AOSfAkZkpyKoZhOjzeiLQzwMupra+hfzJ16eeQGN9EXZsPYgKh2iro+icoi7Aex8NhSMXUczFXn0Ib816DKu3bOf2VC7+2HTSk2a+gYH2e/HKvB+QnlNkXXcChuDhF5/EpBGd2U8aFlNqCg7gxzmPYc78HRzY6xfSFIcDeP2Bm/G6CUncFPzwyVQcmfc05q3YhP25ZZxkW89w76Iy4KYB4dizcA6eeHchrfMse2h7Tp+Hd+64CG0DXGkJXIrU+LX49NWZWLAhA8U1zvALYhvG8xHKcvIoyzWojxqAKbfchOtGD0GcpuAzyH7ujh/wxMvfYPOOFLrRsJlcdZiI52/vhk3vzMXy1MNs4zhB0/UV/S+/E9OnTcLgzm3goS0W1GDDR4/iuS//RmIh+xVTXs1/3REYGoDrZr+LW0f2RqBdGuY+OxPrtu+kgqdEs1C3c/REYHAcZn/4Fi7oGQd3fRU1x9P0pqGWC0t71uPrd97AVyup0GngwlAAJ/JciCyqoCWWSox/f9x2/1RMvnQoovw9zWOUprEZvqnJS8Omn/7Cmx/NRwr7Ll3WgchRePKZhzBhaEf4udoslLA9Kma7u/6Pn/DpW99gZ2E1XNkeuTo2cvKXT+Uby8PYqZ571V1keCPO6RAON50CDDXpmPf8k1j+92bKpmG3gz6d1z76Es51S8GcD35AMhWAVmnzPxf3P/M4bryoOwLdrQ8taqgpR/bBnfj1q7l4f8F6ZNOngp0r/UdR4epKZXL2ES7k0ILKr00kfGmVpXKmtbkV6Whz2XN4+rZL0S7EXUtKPePKTd6O7997FZ/+vgO5te6MxxsONSXIKyillZ8Pxt8zA7ddOwYd2xhcxejzcKx7Jddpe9fj8zdmY/66ZBRWOcM3MABeVJCUc8G0mJZN9ZF9ceNNN2HiJUPRgWM/FxPD+mx8dc9d+IgL0Dx70pqPenHGIsy8/VfedMGzX72F8UM6w8umGG3TV1OQhF/mzcSc7zZSKWYZLxvCJeLdJ6bhXdNDsZPw2bx7MLx7uOmbJn9ruCC3ZeFGzP30BySkqxMydUHajMQjM2dg4oguCDCOw3W/QmOfshPzPyD737Yhp8oNwUE+cKorRS7rUnWtN6646wHcNnEcOikuzfTv+vis7+tRcng3vp/zJD7+bScyisk9gPJBBWl5QSHKA7j4W5SLkopOePjDcLoYCICPYz4Wvfkivvh9OQ4W8WRPq7Y0Bo/Pex0TRvfCgR/fwDvf/oFNKTRMoNJHf41/ci7umTAasX5q7FyLzf99C+/9/Ae2cgHbNuwNz76HWy/qh6yVn/E03+8Rn5KrWauq+DpPfBrP3TkOpd/OwYeL/sTWzKbPT3pmHm4d3R/ZK/9rfP6I1fPP3nkV5x2+WhuhWGcc2Ixv576IH/6KZ310gJe/P5WwDqgqKEAJd8PU8oTyqyZej+svHYFu0SFwMxsBFODXt1/G57/+gaRmuDzyziu47pK+SFzwFt795ndsJJcKm/ndFY+/jXtZh9pyB5d9bRa+evcl/LLkLxzmeK7aRuE57o5HMDSsAt98vQA7afigWUKaIPv0wa0PzcDNlw1ElMbY9IPhb01ZIeLXL8Kbr36E9XtSUEmLRJoi0xLZgX1MDQaNHY+osnSU2bxTH0vBniWY8+43WLZuH4q5KMGzzyxX9DWY8/JdGHtuW7jWZeHruS/j599WNJuPMdMewvCIanz7zQLsOJDRJB9THnwAt1wxiPlws5pnNXLBKvfQXvz548f4cP5fOEiL10Yn9ilBfjwEow65XMitYHl5UxHoywMvlBpdtW+NFVkIv+A/uP/Wa9En1gcVmXvw09yn8dGiLUgtcISPvy8X+exQXkj59w1HYGkh5+3tcO/bTyI8Kgh+NifhWjJ9dt05zOJ1dmXpfyc3P//8s7Yt48rx41u/vet0wlN/BL+9z86SK+vWg8sIjJ96BaK8nbUVgIKEpXj1rT+RGchB7/h+XLkwDYLUaqRa+dLN3JyCcBEHxb4lO/H33pwmg/AtSxdg8ZpkeLMDdHegdRQ7LXObVpGM5fscMO6SAQj04LvJKmnBo3j7j3yt49AUe1a9On0BcGUmKMAPfr6+8IseguvG9EXviy9CB5dcrN2cyJVg606x78WjUb70VTw0708rJZ0qlkyPXhzkddWsplBbil2rvsC102ZjWyqtaZhI39ChePDlF3DfTaPgsmULduUVobaAK2x/LEB8QyTO7R4Hb06IFA6PiN4YcU4c0letRQpXZ0wDVK34c7di8eLlyHP3RzBXRT2dOBBgI2rKWtrutfghwQUXDemOIM467O24MtcuDqUbt2FPPt9pNRhQMV6Al758E+MHxMBDrWrRauHCcZegf2QVlq+J1zrAgJ434DVOjs7jRN2suNISc5T/0aorbeMC3HLr41h+IIvvdUXohXfgrZf/g7Z567ElpchgQVCRhvW//wiHrhehV2wQB+aGWUZt/m58+v0qrnhXW71k25+/4Le1ifDw9WF6uQKvZMAkBEUH8EeSEy4Z0YfKK1oHmkWLVoUZf2PO3Tfjte/WIb2qAXFjbsIjM+7H5CuGwCV7D5LSaZlnBJ26cw02FQdhJI9V9+EKuyailM0LaDXpX7kXG/ZmcVBnLfXb/lyE31Ynwl2li8oOw9ZXY9IrUrByvz0uGtUPwXplJJWHhzf8gFtueQSLNiejSuvMyYmd3wfvvYDbLumADZx0HCmkX0V2doUc4BTwXwXTWd/oCg/6tBjbP1qz7tLeVFeB5I3zcf8tj+HXnYdpBabiuhsfvDMTY9o3YtOmvSiiwmjHqsVIcYxGv25K5tQpU1aIj/qhsbYM8Wu+xg13PYMNiYWaVYtPyHm497lncd+U0XCnNWH8EbIsSMPmZb9gd10o+neN46qp0Wq0JhuLlm1CiTKH5yCggiby5vLT3kzFVmQoAvzDcdFVoxFNKyyzIr+FlKX8+jTmLsnUJpaqLlhvS3OllVkYggL9DfU86lxcfXFP+DM9dQV78PmPq7lCae3Mbsfyxfh9bQJcvbzgScV6lbKcMctYApYddMSFw3ohhKvdFhlj4sg/ZeNPePC2x6nATOMKuDNCR9yFuW/NxLhO9ti2ZS8Kywuxc/XvSLGPRJ+u7TULjlbzp7xkMv5pUx/DT+sTuJKs2ieW8Yg78e47z2PapV2wbdM2bfW9vLDIIi8c+dU3ulBeRuOS/jG0OHBA6eENmPvAVLz69UqklNUh9qJJmPHg/bhp/DB45CcgOT3fvIJ/aPff2EQLx6F9O9MSk64LjPJSV5mMt2+/HZ/+fZiWdIBPyCV4+LlHccv4gXCkZUtu2gEcZv9Q1+iHCzlojqPCVh3gcyZdKcnJWLZsGS644ALExMRwq84xZqanU+bq8/DXV79gD/sa6ylyKC6eOBbtw6go5ip4UcpKzHt/KRIdO+HqSwcgnFaXhmJSWxa5/ZMFbi42pwAMO38QQupSsG0/rZeo0NVfu1YtxZJV++Do7qn1TaodNHc5lWlYl9CIIUN6IYIKIVWvU5e8hA+WJNPqgGsJlBVrxZ8LAsJC2UfTWtePfXTkIFzOiebAiy9ER59KbNtJO1meOm+qmiodPYYPR92mz/Hc+78ijYo8/ZXj3gWXD++GUPcG7Fs/H7fd9xz+2sW2nNXIO2gApj81Cw9MvRT+SQewN4uWYAXp2L5yMXZV+NLyuz0CtfpuB4/QbjhvQAcU0uF+Cts67uaxXOy3lv+5Ahlwgz/7Z29nOypxqBwxQsjcvxk/H2hEv95d0UZjQEvu6BhU0bJqv3qnjeIRGIzH5ryI6y/oAX9Xjp0c/TDkgpEYFGePzVv30RqnCn6dr8SsV5/CqF6xTReoLCmzvlNtyfYluO/eWfh5UwLKap0RNGQynp19D3ojAfHJOSilpT4qM7FtxSLURvZHN1pkmHYs1Bbux/e/rNEWH/QRx6/5E0tW74Wdixu8OEnTtoiaGs+Sg1id3IhBA7ojUi1MmoWqkad0b8FHj9+FVz9bigNU0kWOuBr33H8/brlmJPzKDiEljdZvRrOj9L2bsCXPHf17dEYIZdXcBtNx+5AhAxFul65NVEtooaK/4tcuw5KVe3hQKdPGcrFKW2U61ic2YOA5PRDFhRVz2mgBnr1tMR74z5P4ZvlOlGjyTougwVPw8uvP4z/XkFZ8PA7TCr6sqBhFxj66nG1zHdtc97gRuLB/e1rkcHpbX4m07Yvx1H9m4rs1nJTX0DrovJvxyiszcU1fbxzYvR85tNrbs4GKm1p/dOVuA4PM6XNxlPu6chzYtBB3zHgeS7fQ+p9V0yuwH2579Ak8MP0KBKcdxIHDOSijskv1QTtLPdGlY5yRIQujJhfL1mzFEY5tXDiu1LZvmiuveq8HgsNC2JdGYPjYEbRODTBYuh4lSWnL36RCcj8KKmgfy63VVkoQWlb5h4TQJ5epfvfHuAt7s23wQH1RAn78dQ0yqezXX3vXrcDS1fGod3Sl8tFYhqY0lnARN6Uefft2Q0ywj6UMVQRkn77jdzxNef+WMlBUrdhPxgsvPYXrBvghcQ93HhTkYe+mFUiq9uUBVtxhoixYzcKlT0XT+/rqw/jqycfw0eLtyChtgGfAUNz2wH24/YaRVFDQaj0lAZlltHRr8MK5F49Al3ZhVDJ7okPvzvCpSUZCymGOzXTzGYRi+LhRrHNtENN9APtOLlvsT+ZYUBkQWN7fZdjFGMRxnJ82jnNEmz790D7EDgkMm1NUZhW200D2y0l/4J1PfsKe1DyrcVKea3ucP6g3hjBtnUPsm32+I593Omh63qLkU6kxPN8NbUNZd7j75OC23zDjyZewcM0B1hlap/n3xPX3PIQH7rwasXRFlJyeieKCw9izfhl2FTgghrsAwriLRVntw84d7XtxMaeW1qvkUsgdTpYsh2DYGHJpH0ku/REXyrQeIJeCMqt5Uueho8mlg4GLoy/6D+iDaPcC7OduofwS6z4jYfNaLFu5k2XjyPGePWWUO6pMkKuzsC2lhgebdUK7NpR3c8PABRjWt+2L5uHpVz7CBir4NEUrLZGDOgzAsKG9uBsE2LthA7YmZLNsqfi2FBsCOw/BiEHd0cafLhlCOmJAv65wSkvGwYxstsW6eWdQV1w8agA68GAnR1qc9lP58Cjk7iRa7pVa5n0q6sQt67R8VCgLUa5u2+Zje0o1OnTthDj9AgDbt9z4FZj9+LP4ZOE65NBlDDdnI6DvNXjs2dl44MahKDycyt0WNC5h+1ZsbN/KuDBBO3G4Rp2DwX26IMyzkAc1zsKHCzbgUEk93P3Ow01334vpN49CaFUZCpMPUP5LydgTAy4cjm4duVCl5ps6JqfrrXIJs2TJEm7fdUW/fv3gT4WzthDTygQbZrStDCzBhMCpIaCUFFUoL+H2kH3r8MaDj2MPTY7ZT7Zs+6tLmFtALK664Ur6IqHVh81lZ+eN8JhL8firb+KJSSPgb1b6GQPGv481qRw4GxUuba94A1/M/wVf0qLMWy2VW13d8ei8L7FgwUIsWLgQv867AWFebHi82EFOuRl93WkibA5vuFv31cu4Z+4a2LtxAq/3I8KJjJu21VQ1O/Uo3DMfk+99E0U0fTdczriOjdjVw3qiXYdzcO8HjyAq1NM8wNz8wcOY++sOFHFkpRpzB26niOh8IW6b0B3uHJzbXm5+YZgw403M/+0XfDB7CidcXua4tLBr5+CD33Zx9dQwifJtey4e+fgpbumk76FmBh6hIXQgzvQbGk0HuHkGoBcnPLH0qePgGYiHnrsD57YPOw5T5UZUZP3NFbrnkFxYYlDkep2DFx69Ef079sSEqZPps8rDKlvz3lmCTColrdVfVkG0D3bKQilqHB59/nU8ceuFCFCKNH2wLfPwV2IOB6m6brG2CN8/ex++2UEll4bED5eMuRrDBvRC9z4j8cSbs9HXn5NWXTwp82fjjwPZVHZZ4nENiMGV113BY9QNq+O64Gy4Del65MXX8MTkCxHs7mKdrr0fY12K2s5sia8mfwdevfc1HOTWLHPX7D4QLz52LS2+/BDcaQxemjKUg3zrutD18qm4/4H7MWV4rDZxMqSDk53UP/DYPS9jW16xdqqxI5m/9Nh16BYVgb7jp2Ny92B40amtula+OwPfbUnhoOBYxA2xG/7fgKJ9C3DbjDnI4TsMlzOunvU4rhnJAWLHc3D33IfQNspyWuTWT57Ee1xhy+P2Ly3nbu3w+Aef4KffFuHtuy5okje4XohXPvoWP/86F0PbBoLzqWNe0WNewEff/Iyv5tytbRG2fqAL7n/9E8z/yVjP35+CtkHc7m4dyOqTKsvQyDF4cParePy20QjlBN0q/LYPsJIDs3IrduR/aBmeuO8VbM4pMPIfhOceuRY9Y9qg7xVTcUNPbk0waqpWvfcIvt+URAVX6/nXFOzCmw++gQPcJmGWF7d+mP3QBPRi3Q7uOBrP3TQMob5uVvnpfOkU3Et5uWV4O247pKKprggLXn4YX2/m1ghNg+OLUaOvxPCBfVgfRuARThwHUslgsdMEDi18Ecv2cmW41iS/jchay3I6VETrYMPrzr/7OowY3A+9Bl2Kp3/4BI9d3xdtPA1WfUrsrBhapVA+nFoC3N7JLY/lpUW0ztyI9556Blu4pYYeCWhpeeyUuPpFYezVY+HHFfMmlx0ttNuMxr2zXsITt4xBlK/NducDX2JjMi3NjHIfddFMzP18Ib5++z5EceJvfXXCXc/Pw/esuwvZRy/6YCpPoqWVCrcTnnPttegfGEh1mOlSClQ7bF4wD49wIa2wzgletCg1u6JgH+1qp6z4GlGUuBj3PvEWkqn8MVzOuOzhB2i9cg46dRqI21+/j3/DOEk3/Lrz6xfw4cK1OFxsmODZO1E53n4obriyN5WIlhQYI6MlWDAuvWM2vuTY4qOX7kSfOC5w6SZ42PwJvv5tIzKLDLsCfKL64q43HkLPnjHW4bQI7RBEqx93KkwN9ccertxW1e3cwWjHLUcu3Ho07eGbMKJPO7gfZTu/KW2GvzzIJ2cL3nr0Vew6eFhrq+DRB4/cdT2G9+2PK2+4DgG0/tdfX3y2Com0sjG3O/of9fcs/+DwUbj7sRfwxPRLEW3b1u76An9zYl1UpYuprhiLuZjxNS3A8jWvBT44f+Q4Llb2R48+w3H/c49jSNtoXVkD6b/NwQpuryqqthZYF79IXHzFGFoY2soSE6nSFnEh7nqCaaOVW1sqC60mUYnfYvPBQ5orEVOWarmY8/7Md7AzKcPASf3g2gsP30Un753CERI3Eo9POl9TUJieUX87XDQRd9x7P24b1RVBXmpkwQXV9NV46fE3sIo7JVQ2HTz64tG7r8E5Xdui95gbcV1furhwM6Ro/efP4fs1tDKt0HFSEbd4cadGEnebzHob+5IOG0M5Ycx9d2PC2KF0QzAAt754D7r1iOJiq+Hn3d+/ik9+WsndI8Zxl2s07n7pDXy/eBHmzrgCbUN4VKX+chmKx1/5BAt+fR/j+lLeWrFm0Wbkw3iNiqGvOd7o1DZUHxvv2+O2p+bgG1P9/uhO9ItT/jGPctlRERI2Enc+/ByeuOMKbfHHqgzjv8GG/YmUIz03jkcz1uKVp97EX/sPQU1FHDx6Y8YdV2MwF8h7XTwJ1/WLQ5jRFHXjly9i/l/rkUlFiElfc5QU8adG5G79jYvE3MJOpZTqIftffwlGjhqMvgNH44F5bzGto9A1zENTbKqmwFSX3bntdNQV4xAR3UbzMdvce5y4KN9n9OUYGBkNX/M4vbmQ3DCrwo69DAOio3RhDW3j7j+/wez3FiElvw5uXCh1ZJtoSIcdLd0NPqpNzw/kNnrLuwzPxy9Tz//K52ubf17Fxu3SZSl/YfZL87CZrjAMilknXDB1CiZcPhI9uw3EpKemo8+gjobtkszGvl/ewxc//omEbO740IDbwz2wHS68fBwiYyPp186qhM0Zd3L3Q+9Rl2FgVIwureafrW6cfcJw/sWjuGU7gvEZcm0OQMVgAA0pptw7k23W1egeyXGnPkzKIsRz8SaPin+LPLC+JSzD218vxS6O602Lw57RI/HwTB5a+PKb+HLei5g0ahDnKMove8uXPS3w/NkHjKO1WywtEq3Sp+wUjOMrFYMz3d2cP3oUIlU+WH5Wl8pHyBDcdM9TlLdr0JNWa1b5SF3MfHBHEHedmPJRV5KEb16nonHLfm2RSBvduXTG1JsuxwWs4+HtzsNdV41A73ZBVnPH2CHjcPOd92Dq2P50+eSKgp1/YlliimYEoeLue80ojKTFbt+Bo3DPHM7V7hmLnhG0xmNRKvlvvkStcnPWfPhfyutZU2hnf0aKsG3lX1j03zdx62W34PPtZdqK9fHkW9/F6p/zDb0G8356BlcOH4Kr7r3DRplmCHmEvthMjaazpy+3W/khgiukVo2fMdLgkEDuvw/iQJj+Ojw4ENa1e2r4bfnox09cwV62mSsFnXHr/ffiGq6wh/v5wNPDnVsogzlB7QJfDqZRk4dvXn4NlVROWq4u6Neejb9x5O8cxU6hhzNXvy0hvnrsfWzPKrEye3b3C2im8/bC0Omv4b6rz0GYtz96XnofZk3oScsoXWSMduHb39Bs3GDNp97iED4Sz086F/7uynBZf/2GpfHcYqtfxeHPBft24iCdcXtf/BhGtvWj9ZP+mWPc15dj6bwXsLaMW3OMQV0vGoNuwW5aQ+1Onwkexm2c5pjozyeLyhydHsv8k/7GJ/QqvP3tbFw1ehiums5JELev2uaovFRZQGldjvZobfYmvLexmhYCppjy8PqjnyIhj6tw6iv3ILShAsOowzIFonk5HYzbJEj1mZaYzUFpTTQeb333NK7matFV/5mGft7cVmv5WbvL45aZenN8tOr4+b9YWV6qDdpNQV3PG4k4rrKZLI9iBvbjdiwbpV9jGw5irsMYmsO70cReu2oLseCdZxFfRCs3Y2RRYy5HN241Nii7/HHuJT04ybOk6qv/ruZ2s8pm82NKj/5vI2X7h9fn0KeUfpW7E/qwE3c1jv6d2wzGjT3caFlqefK7mR9j66EC49YOZ5rEcwWdsuvrxUm8fkCkHuFKWzBN7v39aH3VwgDNErPhztnTBwGs5+Gs58qZtO2lJm3+waZ63rL/GtNzPiGX440vZuHacSNw1e3T0JcWvLZbNitohaZ2OZgvKoN/nvs84gvzzPwjL74M3bi92LB11x/ncFuVGy0qTdc3X67hKj5XyE1fHPVvAw4s+gKrqFwxqf9VcNdzzkccLRBMO6qj+vehxZyNYrExAiPHXosxg+PoI8YRddm0XtlMH4NmQ8J8vDPzc1oRFRrGhO6BCGfjZJJBU7Iyi2gdZ7b4qcae1Ut5OqBla+HCL3/E6t0HuQLOAa1dEMbNeBlXdOlA5XDzdcYUr/w91QRKsHv9Wvz25bu4+7rp+HBlOhUex5cG1W422w4Gc2v4J0/h+ssuxPjpt2IQ652tKiufq/a1xnbQycObdZ1bt7n9T+/Hy5Qaf1rCBjCOQPbRvtzir19oUvFaartSGjpg59od9AsVhYnTpuPavj0Qy7rrxUUhL59ADB7YCUEuFVg09z3kZ2abXsG/7dGDPnNU3VCXU/ggXNvdC0G6hC986Sv6l8q08v3k5s0FCfoStb48MfCGmdy+fwHaMd3dRt2OhycMQgS3TemvpZ/9jL3culdjhOgQMhgPXTW4mUWEFVhF65hC9o36qyhpL1IqyuE6/E4M6RRN33qW0Yo+XLP33CK/6vN3sCqLFpHGAC7DRmhbLZXyxTUggi46aI2vfzjhAI5wPHGsdQXvoIvx7HtP4sZrRmP8rbdiQHgo3G2SVqkmiuZ+kPPQIzvw+ZZSZJmbkgIqOL/F9oM5Bj50BRHGcYuhHbUkKpuKU9ttbOrXlmRTpe0Zpm0yLbXH3z4F54Ug8B4AAEAASURBVDBt1suFHPcwTnW4g+FqQNKf87GGfgxNy1Lqe5d+5yE2VC1uGkK1of8nH/b3VrwawzBk1HiMHUrLIOWagsrIJZ/NwbaMVHN/HzGCyps2dIeiPeiLvud3hQ/bctO18MeNPIm5FcpRPtBYW4DFH36EnEPppsf5Nw7do+kb1zg2dArrj6u6+4L6IvO16I3vsD4+TbPSV37RvHxpee7Df16e2uEY5oDqhoo2tQ07gH2zs9nHolWIJh+c3L3g78u+mfXbuRlFslL2W+r3sf0gegdehFlvP4GbJl6C8VNuoZKGljlN5IsHXujkC3Ul+OOLt7GNFoWmLi98+IXoGhXCBXeVZF/0HtaFW9/pIsR4/b5oK5JoddZ0B4ophP5vLZK2rqELlWzzuHPFr39ixaZ4ZHF8VceDeYZPeRhXDhqEUO6a0U0stEjcOH5RJ9sf61ItiJWMHeUBFVbLmhZG5csZ+7bsY/8dgEtvuAnXnzcQneiuxIdjMC+Wd/8+7WnJSD/Ixjitn1cKW/X8fj7vj0sn8fnBg9DZ5vk2fN6BbhSWffUV0hMStIMyDNHFoGNEOGXKsDvFKbgnxnYNRIyP5QC7Pz/4Ges2J9HK1GJV6HocXCx5NWagmT8ttQte/sPx4AsP49YbL2ObNRmD49o2UfwV0hWT2sFlvuoKsPzrH5B24CDHgab2whkXUKnVR7k1oDbKPawP7r5vCoZQCexmHB+bn2/mxo4KO/sm/UnTgCoVpjfqf/XyH8ZFjYcxdfLlGH8L89GhXZN8FFnlowGH1izBugxaJFLBaurPnbv3RWSbMI7bDMYbYV06wY9W7Uqxa7mC0X/wGIwZ3gthAU5I2fk3inIyWeaGWFYt+QvL1+/iYlQFx8O+GDLpPlw5ZCja0NepnZ3pTZbYzua71tbZs5mB5O20I5BOC7YX8Mr732IfzWN1Tdu/Tum1L9+MLlzB1han6Tjdw02diGMdbXLyEeMqjuV73YKE5Ut11+rE5TIwm0ZnX0x+6VXcPulmPPPzp3iaWyknjBunbXF9/JqeHOhzS9m+3/H+jmqj5Zbxda7dueXRWkHADYc2/fUyfLeafoJsfC0YY7D8cb0Yd47vQ18Ppi7VgSuCl3IbgM3kPHchNibQX5VuwNL76snoGkRHuTbMPvx0Ka0FdNZsNIfet3IjfSy44K6rB2nbPy0JOPZdbc4mfPkrLY4qLd1J3yia+hu3jTmEdcDIQG9+ZkfAAlT/3HyjEUBFp63exvZt1zx3o7YyqSnV3ALRPVydumYdan/KEe30StO3tXT+7cTy02fbLn+ftkKm8DQ6haJLVweeRGR6wvA3IYlbdukfrjXX1c/egG60ktTSxW0Z7tyW0UQ21cDPHF8lTdU3aScD6uPvwqPYPZkhU1rdQ+mQ1sHZSum39fPFOFhYYaXUrUxdjrdXV9KK0hLbkMEdtNOWlNJS/bOzU8MvU8xA/srfuS2uOYe9ljj0d2UH/sTHOyuMVljGX1xpMcBtxnr9mMJoeYsK9xf95dB6jH4Jj3mpkbRFbI4ZXB+gxZJSPxzH2ODKWdejexR916hMUMa6hjvQj4/+TdyGQv8uauuU6ao8tAJzV5drW3xM3w0+rz1PmnTW2Gv87dXKqoVMPrcJ7s2lMrtV+a1E0rYtPOnYNNUwvKUTB4VePFHOFKt7aAd0daJlsCkR/Lv9qyVIyqPDciODGm5/duLAzPSMCmpXkKD5BVV6uEYeetOpsyNlRxcJbxOTs7XTwAzf0idPsTotUhdm/w94cNrT+HbZNh5eU446p1hMnjEe7dr7cQCqCye3/88EsvDTR3Pw2twvsa2g2LyYciISdemjXMnnYS2aYpuWZ26u6sRJ65gPHcrXTivXf6sXI/33re+j8/kY66OzD65+bCamTZmGWV+/h6cfmo5Jl1+Ka297Ag9fNwje+Rvw5c4iHNFXI5dOdJVA5/26dDbtn9di0UZaVdA/6VEvl+GYPKY/QrnYYrjs0eX8CzVlhS56aoSWYjuttEp1lj/daOXdjYch2S6Kff0DrdmUEt3UhtHZeuL6baigX/7JY/sigpZh+rp81PTxx7rcHfjpz0PILbQo/7pHhNAtiaEdcQiOxeAgKmuoWDH1z64+bbj1lqdiHuNFY1nfe3cKAYudGj9/dAqjA3nL2pCWtKQ0+jyiywPTVUt/vk48dMCKT2ESCso4yVNtoyMP+urgDK6JWl3Jqbl0H3OM8tA9MebBK9C7A9Om8sA+2rUZ2UzLKOAJwKa08XCzXdtRwYMV9Fd7+sZTB4yY0usW3BadXdytlH67f1zBAyfou85YZlUZ6/DpOjqN12n8BvSnQoBbd039s72dmsRaGsrC9SuxXx3G0WLlsKSqPHktvtmZj0z9+rBLBx6swkUcS5SaIsa6CNfj98376HevFZp6FaRVfZUlXaa7FrOg4jPJtSnwUf6Ovu8y9O1G34SafPmhQ6gzdxVYP6DcNpTr/EdXHf4bn6/Lx6FCS7h+/WLoCsPDzN6O7PVqsCJuI0zgNsRSKm2PnTyeklvGU3xNYqNek7wUrzz2PD79cTWSWHer7MNx6ZQx6NkvkqedmiTHkB7F5tjvMIT9Z/9XC6ssPPodGz39P5h6+1144uM5mP3UPbh5/BW4dgq3pE4ciU7h3Lba7ABcCa3h+Yum8flpfP6jN/H0zHutn4/wRnX6ZizclY0UNTYwZcqZB2lQ6eaqWwlXts3WFLZixc54pOVV8DnDgyefi4Hm8KkXYUAfugRRiilHumTh4reth4usrGKUUcml6qq6qjJ3YnESD8rgNmdzPqkY7xLFAxu459W0NdIzbhDGdA1DjJc6wdfwvpP1/2G3jsLAfvSDzY7MlA/q060uLR/KXYSWDx4MtT8eZfkFFEBTYQExscEI5GE22jybT7vQv2Kcmzd81VzNGNuBJetxIJFzPA4YWdKa/NdS/s2xcD7y1kxaon+7AglsByvtwnDJDRfTkjKGJyBbl7xVAs/CDzZTh7Mwh5KlM5BAB9w843YEF+7ClwuXIT0xDSU80t1cgf9Fjqy2jziHYUA3eyzl7hX6czZfhVwRtTSc5q9PyI1rj5swvn+kwXrIKRqjb38Io61ibsDeZT9TwaXTlqjfO6vTXjlhMYe1hwu31rI15zcWMouXbsNTV3SnbwODo21zcP1N50j4sSOxxEU/JJFdqMxxRA7D6Yet63Zk4Qb6MHOj9Zp2BfTGbWNDsPPjYlq96EZc677gVr6rEE1n727sTOvLE7Do++10mDwe53akXwZdB6tPSvP3jUhdvYh+PtRKouVq3ymYPhaMvYZDFCbccxm2vv078tT2H6a993XnI5pO7m36FUsExjslAxYFmBetJe3NW5RMgYtoHqIdLW78wj28FwZy9byEfiyKtY7FEX60pvSkFYI6vbSIfmHyyMNWbip48pNphcgUd0t/raxBnJVfNgcsOaz8slieUOkyWXuqby0lbwljVYDqa24/dtN1kIaQR7g9x2i+rvWcjUjZsAx1lXpbKz7qzBPXSorRqMqPcbhFxcJe00aa5HMLfWJwmyYt4mwHj7oUGW9pAfjXr6ihFYfV1TFYOwnZIo/2cFYWXTayvXT5Djx2RS/6j1RT4NP7ciIvSxopY0GUMSWYunammHtGLav2lPmNy1HDU2z1l4uTgb9dpYG/a5sY+oBUs1ZTOW2lU3NaGnYM4+DQQlAfh/6+WXlRadL/4OxCeTGshFqepbzQz54m30yKe1gP9KffvlxOIIqoOG5grfPliV5ebHe0+lDC+lBOqwRdE6HiqmR9sMgvt+C5cUCqaWF0AfNX4blp8dhzH1eorxiJjr0vwx23RqCdcphugWpJmtz9PxCIxYRpNyPWPh0L6e80cW8y2xPK8wlIiaO+fXYKRq9OTlicAPCgOvOl1R2z1sn89Qm5cel0Df0wUkFBC3mAvrQm3cV/pqgbsO2Xpags1s3Y1U+0dlen6lnk0w7OVEoZtlxZZHvF6t3IvXwgIn1tLJxN0WtxRTAu9mM6WffkwlRn+kUjBrMFmwq6Ze8RTBxWi0C1HV1dfl1x3agI+kSiT7Y8Xe+5+Uf6RR1HJR4tg1lH6+mPd9ki+lSqG8GtgpEcLxy77TC8QP2/EekblyGJDEy9gPo2lifeu5qs7e0jMG7KxdhGf59Jmew/qGXvdpk6UOPYPiZV+VtS48nTpx3p74wv0PWDJWw768xWa1wLCemK3jyt+hD94uWrdortkQ8tKb21bfo8NZ6nEeaV0SeSpShUkqmks7Gc0r5t+X/K2tq8XYw+Z3t2dMbieNBHqeUZ27Tpm1ZzKNXm6tPCNteVba712CUPpfRtpLWhDmS+bS2qbOTOmf1DBf02FdUZ+gen0Ag4cMEVMFms7+KJ40dQWU2r5KPuM23Awb+X89CCPHMStZt2AfCmFZNl+Ma+mfHba6tqlgysWrcX2ZfTmpNb2CxlZx3V6fLJkf2NSQmifOaFBDhwCyVTpxPmEirTLfLViIztf6OCYzz95eJUz/6sBEUNzDHHKs4h4Tw0R2mCTW3DXh6Gk8nF5u7wp6ZTG87oI7C6V1zJTtPu6FrRoi14/6n7kZh0O6ZcNxa944bh+kkB8I1jf2+0VrKK5iR/cGl3MYb360kfpCqt7hh4xRT+a/1Lmzx/+c0YeLn+ec5/tq5FsbKs0il+OLGAp49ByW9oFk28rKVt/eYEZFxaxIV4WuZZVyb9S074vZIpc7vgGIBO7Vx5qizo3oWtpbEBKCur4eK/qc40IPtAPMp5WrZVPp1pZUtLZGvLM871OLZztBpTnvAsaBEqf4pmZSD9dXZqSz+pPDMtm3YmpnyUsh2t0VsG8kmVRat2zrZ9c3Ti4hGVl1bJ5mFhdHFlWGTm1mnlJkkrNF2/Vbwdnz77EJIPTsHNEy9Dvw7n4pqJlIWYSG2eaRXdWfxBFHVnceGeuVkLwKBRozCIWwFvuHECXr76Nnywj34hVJusG7z+s/yZGkr1tAOtjP51hMeVjF4j+iOQq87W3Ys+igoebZ2EerPVlPE3tXpv1RK6o8MAOnZdStVajW4EuzcBuVTAhDG4daOoe0eTuPgb0+TUzEiigKe21pnNslUczhhw7T0I/uERFFcU68aaufjq+zUY1zWUnbgLDq/9EX9Q+3nOf0Yjir79WkyLLlmW22ocjN/D1UWdVoM/ph8uMlo6Guh1HvcIvh44EVm5FXQdE4hYOjhtbtuiJV7TnV4GTN8d469XZ8x4/kF4zHwXG3gwA6dGmPDIXYjlhpYDG1fj168/xn//Vh3PMeI56s+6ARqJNbUqs32Y3pIsI2jbHy2fabKkj1n7gQeEaL6XzOJfhzyu+Fk7agbW/vQ1HLf7a9ZMSkFUfuAvbVXQMtAFj2BXiprWXJVI3ncQtXqtuHpMyaNVBG5o368/nJakq5mUJeJ9icil9UMMvzn9Oy6rDFny0OJdHfKzyV83+VRB1y38Fo67uGVADdLIvyJhFUp4cEVT/laNQwtvobzoZ/+mUNqjuudZ3/VKai2YSV5Mz3h2xD1P3we3p+dinTr4AwEYf/8daO9Mqz1aef727af4YjUdIOuaJtOjlr9u6DH0XPj8QafG5er8Xv2Vj4X0ubX674l48p4pGHnpRfCjZaF5EKkPKvf/DwT80Gfo+biweyRunHQ13rv9fszlNpX8lju240ijvu6odlCv9D6OaP5h0C48XTjUmwfQNPt8FQ4l8PRxKqCsrmbasLa9+sD1t0RqGGm2Zrr4bD5Pm1fdhI2RmClEM+0hf6KmSvXP5ubaGLqIC0fKKlfVHcNvTuhNf5LhC+nrJz/dYkGHAvoF24DRvXkoT6QPcjb/jr9KitBl8nA6U/fV+hpLAo51V4NDBw6gqsK0WGAIn5lDy16OPeBpaJ3jLrgD7/W6jP0zT73m1tPIcH8qRFrTcqvyt24NjpUieMRh2qN3weWFeVh1KIfLGP4Yd8dt6Opnh9RtPDxg/hf4cnkK/bUdM6ZjBNCnja4ujimbxjbXtuBss6faXObZ+mvDISyGBNFv8ZES9p26SSx/2LzkZ7ilbKX/Qb6AC2iVyRuQk1ts1T9UcJHb7Ni+xdzx4K6DqVQ86fpbFVYpr6wGD66I7d4T7t7UThaZlIEMk5SKAmrSaxu5YGebVxXPaXXpy7A1CSN7Wq3XKtnWXVuWLoJ72k5aexrZp2xEFg+u0PfNldSyHpu9itQFHfr2RjBP8U3MzeaCmF4SirDi85ewbUc87rz9Fm6FPocuc1p/SIUuyf/6No6HQUUE8XT4ZuYKrYk8rk+nYzzPw9FS0uj7tNxagaWaWys5dEGbTl15Cuxm2B3hHMjEKyUdxUU8lZWfT+1yrkqcqcyoVOMMz3ap05pPNdL27eBp1DpNngpAX9A+PBCDdhRN2nrr50/WJ33fqxYO7LR/LVdpQ/vW2HIAQ0K5+0KNKU2EDF8qV1FKaa4+uSCud08EL9kMxxweqqHbxcVlEKz65g3s2L0XU2+dgsvP748IHhBnZXRjiPCs/X9res2zNvOSsdOVALfk0axLa3t9u+CuuTOw+KoZSLbZRmVOPRURan7raGujaw5w+twEK8fYx5htKgVNqy7rVs/wSG6S2dFnc3PyFuN19EEU93Noz+ji3bNtH0pqh3MablFpuscOwy3dgvBMfilKzStEtNT/YT423nYRxnCfyvIfF3Dy3gZjh3WgD7TjbWbqUJDDE6FszHEKjpTqLJAMOfEKjoJXcIu5OqE/hPcag2d/Hk3ZrONBJ/nISt6Fz2bej89XJsPFn36UuOqtDJ9srepOaCKsIuMJXdEBHJ9n09rAMoqp4mDb4FDXELi+OA+Zqo6Yn6VlnB9PJKP1g0VGapC55yDzZq1pTFrPVfYDyoTd0hMHhbVBkDkunnbI5WjLr7ofmrn9V7Kdd1CzilBiwcXks+wif1ol1dEqSX8d3PgXyhM5KNfxDwiJYH20XN5uyjqnNSXgyCPtWZOdlQLUIg3VFfSjqBPa+pI8ZNnIi6tvWwSxXuu5h3W/CDPnX4B6VR9osZKVshvfPP8kPl+RAHtv5Y+Edi1MltWYy5Js7S5m2LU4t+1G+tnbx0MmLGkyBSvY+DXum7gfj7wzG9fSP9+ZYE1pSvvZ/Zcyw7Zf66O9O2Dy83dj2a2PY7Oq4M3VTWMf7WB0VXA6swnkSY3ayYEtJPLYCygtPKi+LqCirlT516OirnlNYPMPO9Iql64qlNEsd0qZr4R4bu9ke88zIs2KRVeebHtd1wikpGQiU7fnMW3xYmyeOAoxPNFx3e+/caHNGzec05H+xFoaWJlfY3NTj6K8/CYLaUV5VNTY+Kn14Ome9O1/Sq6QLjzE5othmME0lJcWIic1Hj+//h98/udu1Lr68nTieq39slkLOclpc0RoBBWUrpSaEkvfWl2pfNcatkSqlruB7WcO9z3q1b+udOUR6GHwyav2OWQnpKLaRpGWum0dKlM9KUuWSufhF4pYP0u2fN3VqbbH7h/UKO3YoSzqCMsbeFd4CAU8yEtZxyglw9l11SAn8RCquI1afx3asR5L03Yzvxb2br4hiPW1hPL3ZL08xnjfFDqi38UY0HkL9qcWIYflrLWtph/5t2jXYh6ulozsx2dg8jVDER2glHW6AKfg1s/TjWsGxzuetyTMz8vtmMp6JT7/OFvFGTyAjz7NaW1tXC+wvPw0u1P2FcoeQzfdMmxnsgzlT7MUN5ccBwTR16YH947b5XL8ZsxMDReylIseU94ayouRV1tt9u+oYnLx4jjW04suDgytTljvCyn/m7EnkWNJ1jXdkFR7cXE8t4Lfm4qcB++ndR0P3wn2oPy3psVqLt1n1nf/vMadWfmU1J7BBNzbj8IdfWbjSc4vzTVfl5+K7Hjsz6cfqM5h9AP1j5t4XYwn77ZDu8BWWn0dKw08GVdtU7TtzflYa4ysmsTu4ItYbgN2pM7HauskjwRvytwXo3k647xtb6CMK/qmxpjru/j2jz3o51aBrzbVwGnwTegTzpWPf1AkzTVMRXkFVCioXqzV6p4m2fx3XzSitoIOq1PisYiOtN/+P/bOAsCq4vvj3+3uXjZY2KW7BRXBxkSxu7t+YDeKouLfTkRAFARsFAFBEATpjmWX7e7ueP/v3Ldv99XCgoAPOFcf++LeuTOfmTtz5syZc75bj0pG6AoI74RH3piK+jkP472VBab+1/7dDQ9xtTOGXPs/RC97ASXxmZrgry7Yu2YN0u49HYHalpUm5OxciyRupdarQajScfHFmfdcgi7cpmzM2Ym7Nszl+S6XPYsZE8/WtksZVbRJvpzdPY/yc6faNgVV85Ga0wjVtk/WoZkuMy0KF0Or0c8nqgjArKm2B82Uvxv5d+ghc2YkrYfRefnLKNid2urrcN/atYzadwZC6azeya4JubvWI6m2uqUbUO3FB2fceRG60o+VcXtRGWqorkRu6h4s/uYTfPjdWpQwQIZ/WDgeeHUy8MPz+GhFBhgQsP3Dsxeeev0BpD75PrZuS0Q1FcVGeoiW67Zi6oOvwvvbaZhwWmd4dKis7d9Sfjn6BNxizsQtAwKRuoudvZWJRk3BfiQWeqJLlzD6Rv2v+u+OlbsLt1m5tgSFsHZFO4+h2an6PqzNSbjh55Y+7HA7MXtvRHajn8t9TMcQvUElqRyYWTww3jjrtvGYvSUFeQym0FYdO7Bo9U4MYyTOH7ZUorbfdejXOfiIJrSm/YC+bOUlJWbWffrvj9+/7I/oOiA/fR+WfjsdH9MvXw79pvmHhOLu556F26r38MWSeGQZ8zvmmXNC/8vuQteV+Ugr3dfqnzNx40Yk545BV0ZlcLFvRt6+zUiuLGvZfck+19kbw288D90YPdJgoUaXeHQTYJrh6PMewjv/u5TKUA4e7TRMZ1f6mDO4DDG9/Ag+NaO+lsHWzBZRVUIn9dhshX3UOfdh2mPj0TOUfuosZBU9WidXd02x1SF9gntX3P7YrUjn2Lts5RaUUVlnuci1DzOmvAdPBqG7+dLBCOHimbnMdgSV2uFLIrh13Uu75+F2YPpbRIT5/Kvr2zLazEVNuqcx33lE6VAtDh5Z7tpSPx7vDApJk7yafDgeufi393BC97OvQbe/M7CXAfcqqpXvOiB1x04kZ+Zwqza3ztN0vChpF1JK8lHREnDCzskL/cePRs/unRj5uWWZ2T0GNz10MzLqqvHbsg0oqai20v7346tpH8DT1xu3TqBlaUtwkX9bClu/3qzbt/XsSv5OTQLu6D+2L5yqrUxWm2vx53vX45bJv6CAzl/bkVVsBludtspwqFx2pLeuxv6NG7gVwtQCB87KoXVLx3c4pSbHMirlzOUNR1rZNTM75jkOGHQRLg5RUctM87r2h4WYM3sBMqodcN0Vw+HHCFWmZ3QsU8rlivmRsnkrMhh21VJ4MT/z2HyuryzG1iVf4ZarbsfUOatRQYfRfqH98OQHC3D9mcMQyG09VrJ9bDLTkqpz5HmYNpETrrgIRgBuMbZPmYeFS9bTN00B8jO34dvPvqOFAbcHU6Jz8gxAxKi7MfG6QYyAaDphNq9jdQv7Jl5DDZKXlze8va2/DsdXyiFN5LVy1SBhyyZuNTFyGqO+d6Z1gVq9Pt6QtTwd+38YqsPiJoq/86H4U3FleaVFUtoXzhHn4PXHrsWgHlGMmtzixzJ1AX5Ytg4pWflsL9ux8IvvUF5SobUXR09/RJx2Jx69bggdHJtu1muoLMH25XNx1/V3YcrMFdz6VAdf+or639tf44axZyCElpaHFjB08Iq9BNPfeRkThvVDJx9ltWetNOsx7atVyCyqtuiLrJdUvj2+BNzQc1QvuOs4o23TDOmzoKvDuhkP4f7J85CYV2mpVzq+GT3k3eo5RpuPg20XqV7SWvtsO0P/rhbJO7bSCsdMK8RnWbln6EgKJik216G8jpNTM6WcA7U4OisPmV/fsTi3Uxh8zRYuN/3+G+bOno/EojpccsEghAd4Hn5emDFL21e6pti5Gxkl3CJobSAxKcyx+dBQVYpdKxfgwVvvw+TPFiOHwWh8g3rggSlf4JZx5zJa4H/jP80p7Ew8e/81OL1/V3g5MyCYKn7GL1i8YjX2p+UiP2sXfv7qR+TnFOn7XA9GOB16I+67eiQijcMGW8Fmp8Znx0OMzzTdtNqlmqXXsWpjcIxd2xmExGg7t0pHa9cdu4/ZbU+Ij9bkFgN7T1oFtScbuXUguFkbAB08okYzQMPTuP38M9GVz6YKnmCpiNuB2b+swu5kWrW231G1JXsU36loxqbbcg8v8Xpuw+7I9Ydui2rr6C5UcHHAxMcbgw8pP2cdae+Hl/Njd7ZJWe0YPJGLpapaTb4/drf/1yk7BQ/F/bdchfNP60P3JOSvBrfcFVi16k/sSsxAbtY+LFn4K9IY+EgVytHNByEDrsDNV4xGr2hGK26tLB3cI0/Hc089gbsuGotujKDsyshDlu1/N775fRW2JzLg33Fu//8a1hEmYGWIP8KU5DIhcAwJdBp8Frr4eFuY8NcVMTrookZ0HdEH3kaRLo9hVo5x0uzJlGdby97JYn5gTVhGHKPFmUWH7VCGa3OxeXczt66Ynh3erzO5mgae0M5gMIcrHzoTvl5mTrGTf8LHX/yBeidOFAaEsihH0sU4MBqvIZiAUX5SvsGv2zPpB85stmI4hUs5x2xwa6zGtp/fxV3PvoeE0pbJJiP43jVtGi4b3IkCFWenx+zmhgJa/xt3wSP49M3HcW5nb21rlFLIfU8rpZfffAsv3HkjZmyvhJ1HAMIiO2PQFRMx6/270COwbauUPlX61CBz83a3d+kfOFBcYeTryDQPdfRTVMetRlYMO01P1D4xSqhq260Ds5VTWr5Sc30LnF25guztcmQWo+3fykZ+UfxVYAXTKfy+P+i0nX4i25v81h8Wf31RY899AB9OfRwXxvlzu7aqcjv8+OZjmPzGG3jh7lswfXMJmt3ZXiKiMejyx/DFu3ejbygFKmNSjTXY/tuHuP+5d7GLPuo03QyjZd465XWMHxHDICvqGbWoQeMUtPeN1UVIzS6FY6fTMOWrT/DsncPRmxE/rVmAFC9eQ0WA8oNkkYx8YQMEQvuOQExgEJzpWNu4iuqLGSF0WRUCenKbpdd/oyw5enhYMhXZwOw5tZa+Gp+NOWjnxNAPjy+3Kh7usFhXgJ3xDYxEaXqnEEZs9nV3sVSIM5jDuNtGIYxO1U16lPSl+GrOUlq5DsIZfaN5rTXbONN7WH6yZ0Ry1qMWBMbo14yfsHzHAfqbtCqZEMYxHJ+barB72XQ89tK72EjllybGOPnguudewJWje4G+73lY1IZR5o/t25jRt+PNV57A+H7hmgWj6nMXf/Q8prw+BS/cfwc+XZOGamd/bpONwoCL78MH0+7DiK7BRnsHqNwlc33gnba8Jq5ejQRGda1tZ8JaT8v0OhVc45BF5zKRatdG2zjb7mL6zurYHN0XQX7eh9+uTZO20U8cm+no3s6MzYE1axmVNw817cBVlocdY68vdhMjqWfll6LZvw8enTYVLz52AUYw2qe7ci1i8hBzG+zqrcjMZMRi3vuQVWtE9XDONbrsOL7Vt0Nz1tYyYLUdduqBgABuNVfmnYd5HF82qk0xSrBZm0JqOooLK1BrxRrh+Obv8OBFDpuA556dhBtGdUcQgxWprfZ/ffMu3nr9Zbzw8L34aPFW5DV7IZBuc/qceyumvHI/zh/chdZ0bQNhEyN3Z9PHYyPdXT3w2qt4cdKlOL0v+0tl7GFWnWVrdyBT+SJtcR9weLk98c5uo3Ti5V1yfAoR8Op1M3769QZEMKqn4ZnVNVRi/fxZ2E7Lm56RHQ0kYArt33Z+bdfTGs0k6ILpfTr+yQs9hw6Ck7nTZStPqrKHMrAwpO9DM3wXFdXK8IW1v1bSsq5pseN2YkaoNUR8NUsr7pzrMDSQUdws0rPDgBsvQiz9UZhM7s2ub/8jrTOGD4MTA1yYH9NnLUIGBzJzZ/e65nqU0TFraVV9B4RS81QP/bk+Zw1efOsHlJQZ7eOLuR7n0BeQGwHoaNLdcIyiEB4ydyy7W1h/nH8+o3UyRFNYFBVyQ4Ygayf9ndSGoteA83H9Xc/gw9k/4ttXb0IPf/qcs0jUDX2GDmWAWG1G0/Zr4S/45a/9KGGUjLa2rv9ZCZYbli3FlpQiOn9tR3nalhLfeaE7HSa7KAHF+LBoP/rNzeZt2DvUnZGjzNq2eaaM0z0m74/Wc26eOTf0Zp25KGWp8VH4K7er7UMRI4aZF7Wppgwbly/D5uQCuijsCP+WhFV7Ce2Lc85zhWeAD0KVAnfIYOTu3Y746kB073curr3jKbw/63t8O+VW9Ak2V+pyd3zuWkx590dGNTMKdxh9Ncb0joInnRRpzwNny4dS4Ob8/T5ufHw6dmYwUIxLBC6ZOA+fvP40hvaLo7LP3EK1iFEQOzLpNAYo748XAc+4CZj5zY3o19W3tX/RcYFj6y/zsaWkCNHhvoxodySKoaNVAvXsHt7E1vLOnogd0A9unh6mP1npw1RJzfswr2D6aDqUBay9etLNnnb1IJl9pTLQPZYTGSrqzO+jfos5nVHyOoXCUzNxUN8YDjv0uoIWC7SIN2yrNPzSsb+udPw9CO5enhanz1u4HPvTCywsHXTNDbR+KUZppak/TIsEjvCLhryNePujn5DGCOStR+RlOL13V1p5OLaMz4fuj1qv7egbK3Vi9VL2ua7BPTH6bE+6BvBCcAQVcoMGoSRlP+LLvNC551hcfcskvD19AeZNvRfDo/3phsA4JVd07z8AHrRqNzmKl+OPdTuRXcztqGZ5aaotx7a/VmJTAiOPmkVpNElD++CBLn37Mn2zOlV5MMkHLWIsv4InLf9c2e+bnGqWH8t7Hu1vWp7vw73vIc93RVy//vDyYfhL46NkBZYzgE5mkXX2u9euwab4NO5Uoex0yHsABdvmYuLLn2DF9gzUOgRx+zoVHa9NxvlnDGYbZqRdE7ildDPLKKLmlW6cP1UbxtdQRFBr3B3Ji0kyx/WDO6J79ISXn6+2gNh6a61PbP2kvVEyrHm36xngCjelKOJvxkU3vbKFi+EEAxfTk47xJxdE9ewNn4AA03Iy6E8Nx8xG40rSNXF3CS0ZqZnsQDOyzPfBYVieb/ZNh+6pa4BzQFeMON2f8w9PBHaKRJ/+/VFbkI2EIkcEdxmFy699GK9/wKA+bz+G8xmESm15NT6KdizA01M+wuKNyai2D8QZN76BN157DRePGQ5/T+Un2/jsMnKiH7zDEHuNrz7R3v+XUtOJxkrye5QJsP8xcYdmnLylOM3Qzi3aBWXq3FhXiYKdi/DWB6tRTQ/+wfSdcKggDcbpa+91jaijjxfjPtHiHMMX7fRW6muVn7qKPKRkO6JLrD+czbabGJLo6N8eYycg5KPV9FFBf02G+9rRZxRXWdRHQ3+l+ijDzyptOztvXHMjAz8wOqLhHPW9xWFXhopalbaOnZ/+zJqMeGxsYthto5PtHH0xun8nWreYD4ctJ3n2xy1X9MKaj0vo0NrIFI8hxq8Y15sD5pF3L5HDxiLIa5m2na6Vgbrt2vcxa+kwPHjJMEb+0Qc5aG6oQXH2Diz8dD4cz7sfN5zelZG4LFVRRkUzesvtRDTRMeaoftQ+G32ZsnklcuspkBldifoSFBaVoMyFaVQlICGjUXMSbnyKlhYbunIcrTlSN/+xvc+8Ru38PHTb1KEiazM+fPRefL25EE3D7sVnbz2EYVGM5EfJTq06dnScDhs4nJYHS5BPl6/G5fz2nS8xvFcozhsQTX8TeuVJIycBiX99icde/hZnTvpIU5R3xD9kt9GXI/STv1BQVtu2hdmuRhM423BT4DbjYmfnhQnXnIlgb1patv7GfqDJEHWm9ct/96YtEybpKLff6r+6CvoayrZHVIyKYNjRNkZBSz0e7aRtuFHYgGHwI/8cxiw0Lv+C92dhKP1vXsgVSB8GZlHlV/wPrJ6JiZO/xYiH30GPiEAq1Nt5Tg030P6yvWRvxSeTHsBX63NQP/hOzJj6MEZ1ZZCJw2gvadtWI5f+oFT7aj3qS1FUzOfBxx7NVUlIzKwD9WoWh87wPHBBobKEkW73fIMlO2gxHTYIAXSYH336tZgdE4nJDzyP77cmalGFtUScg7X2ZzphsUhevjiKBLj+gHq2W8uma9lnqp7GYGSlxsSm+ioU7v0DH0//C/kFjJMd4g3Hw/WVpfrBOt7L+IFor3yWmdTOVF+r/NRXFiA9xw7hkX60UuHYZLVc7SXe9n3syHEID1qFNG7jbd2Kas8AEVyo0/prrYNins3yY2fniUsuH4kILm4d9Em1q6BipV6LFmnYFlSbnYTt9TUm7unAAFDDe4XDm+O91cOjFyaM64M1SemoKDBaYKLl6wVjaHnCyJFHeoQPGIlg/9+RlKOiwhulsnkmFi7tjxCf8xDL+laR+Zoba1Gas4d+Xb9H7YAJuPKsfggyc7tglILZW46tXAAzZ2l2ErfdrqMD8lK9JZ3hx4YyFLM/Ki3l4kdNKg5k1IBBw00P7mk07o/MLTdMTzb7xLZZz7Z56PVZHSpzd2Hm8//DrJWJqOhzA96Z/AjO68tFPvLp6Bgd0nsg/L1+oxKcixpGWVk0YwEG9ojG+DP7sP/k1lq2v8a6CqT8Mw/PTZ2LLlc/jaiIEHgdIspDl+HnoVPoSvbbtOA21CnbtfIL3Nau1bNkdHP11s4D4y4ZgWhGD24bEfn8U55UCzZH72gb+Y3T1J5vPsz1lUXIzNVxLuALDwbK6tjB9kWYFmUyuzi45wD4+/xKJWWJybbv32Z+hwHdO8OHrnkCafmjZ1+J1PXz8cq0+Qg4935MCg6BD+vFeu7bblRdzp0L8d9izY4e6NONAUEo34YPHIe33gjDxy++gW+Wb0Ce8gGmLnEKoIzrokWC1lJQzgstGq8D+xA+f7xALWSXpyfRD2I5+xDTClR9oy0dUYNGIyJiFXYkFdFnbUtLt6sjd8udGyajkJ07xp43BF2jgjTZt5WLBXkHrc9q5ZKh51JhzuFIsbBfaOCgyV2+Bz1CuvVmH8xgcHbKj6jhZimIT0pFYclABIQw8jgbTU1pKhL2l6O0zLQf1LJrnmdrd3Ri2gcdcKxdxO+U8QHLcWgFoQ7V9EG78K0X8OVvm5AbeRGeeeFhXMlART5q0ZZlUG3/kO2/ohIN+7/DPzti0L9XBLe+uiOUi8ZTpoSg85Rp+Or3v5HNhR6NlBMDWDjTp/KRlKud4try16dIMW25Ck7dvDUUZSGRnYFlf0bBjo5UGzXBV3VO+lcze4z62koU56Zjy5/f4uEbX8Au5XAScYijUGgQajWihn7PDK9Jv9aUj/27eH+zyaQSvEzOYxp2OjVBNu9qapFXVEp/TgVYN/cZXHPTfGSX6wdSHYVLJRpbZEN9YfGlaSado07HpLHc0mK8QrlnM/ZT2Nb7pGDnWVPCiTL/tqSltlL4hU7A+IHchnmo3mvPz/jpz+3ILdEzbq6vxp7Vf5lFnLSDb687cVqUHyOKmZfbkF8HDJxwG0IZKtt48uw18C6MpENul3avM1zf/l+32DG4b2Qnq8Ll3GcfwzvzFmHbviSkpCZh5/qleO22O/Dhb2vQSOWJYqEd5pVouJ1xcZpLkZHNNmDWCA1cDZd4+ARZbDtByly8/db7mDnzS7z+0E34OrGQptiGK/R/a6uKkMHgE0roqDdIv+3ky+Rrts2EPWrAN01PKVdNzmsowcIpD2He1kJuCQa6dI2Fvz0V0Aw0UlVVhZrKKk50a1DFv1XVnKgwqmij8pNokoj+Hl5xZ+CKTsq5uNmwULgEj/1vGhat2UGLhRxkZyRj8x+z8TAtoXShl+H2c7rDmwqWjhzOESPxyJhIBNLKobUa9m1BQn5lS0h21bYZ9ayGys0WGV/Vp2/I5bh0YDQ8TCYbDHxA4bOR0fLMj9a0zX84xGc7nZpqmF9di/ziMlpsFmDDgsm4+fa5OJBbpSnTFEbrjzMngIZ76cqQlcu6NOtnmtjIjKvBM46rjpxQeZtHry5chscffxs//7UVKRl6/luWz8GjT05HQ+BFuPWcnvD16Bh/NJZym+v/MG9TDq3T2F66dEWAA5UhVLpZby8UkK20F3evQCplzO6ZtgDvv/MBZszg8/DorZizJwvlZmWurSpGJoNP7EwqRC23TDto0aTt8Bn9PK7fn6FZfigmbp1GYtLTVyE42GBBYgf3Pj259dn1JN36bGgstvW3sSQXyVSGG0ej1OewjlFDq7kwoe9LTMfoKpTkZ2L7mh/x9D2TsS41h9d3RkyQr6kyufUBMSuz8fdNhUjmls9aIz2TOlvrB9ueMC0B9exaG6MLqQwu5bO76YepuOOuOdidSuWwuoL/KLHfqirBOA9a6m3/OIUPxT2jOyPS22jyvX8HknLVKr+6kGlyG08B+zBDl68m0T5B4zCuf6xm4dWWmpV3CUuxZNVmpOVTYcIFHrUQtX/DOjO/YEwv7joMiYmg5al5f2VI0x59xl2FTuzTjbt0z97XY2iXSPpLa+86w/Xt/3XtPBI3c4t7ON1smB8/vzUZ786cj392xSM5JQm7N67A/z30EN5b8DvKOIm1N2x3apexad+Zk8fxzNo4aHRjN68ApmuWl4yfMf2jDzB9+gy8OekuBtdIQJHZUFFHOSo7bR92MehGZW1bZ8We2XrHbvw122ZKQgPYdZoc+rZp9FVjGRZ/+Dzm/Z2IQi6+RUXHIIimjI1GfW4tG3g1x+sqyr01dJKvIiaqdIwPjy7DMC4qAsFcrDE5iv/CZG75nb/kHySlZyE7MwXbV87H089PR5HDSFw3pj/CfM2s2E0S0H9wChuM28/owiBTRgu9ibuQnFPCxRJ9XvTtmgu6hodGtevA83F+v25mytcm5GczSi0DI5gcKhmzcpn8fpAP1p/vOhSVUonB3RRbFv0f7rtvJjbt44KlSqe9+xg3e105cvPYv5h1cJoSx+h6j5jBuCAqCiHm7EtWcxvfe5j32zocMLBfNR/Pvjgd6TV9cfkZAxBNhYOxfNxeEe21sdAeC79Zgj83x6OESjnVBlxDBuD2+y9Htx6dWp8d19guCKQ1vBKHVHEcGDDEw9HZaKu0uksmEpPSkJ1biLy07Zj15rt0bxNvsfuhvpayVkv9tuaNAFScGvMdmFr1tZ50kDdsH9au1x4rfVNq92LH4H64bmQsegYbjfW0PE3nVt9yNjzFpJmK6CJq3Zl1/aHaof9ZtOjvhU7c526YAxi4GEmbPD8TB5LTkZWj5/IVZfhNO/axTRsatT5JxcVil0x7AIydGDaXUOavRUW5qXxn3qbco/rgjKhoRvPWK3hbSoJff16D9XQhUEKZvaI0H6vmzcYvCfHI4VhgjK6ekVGr2UYaWgw41PVKMW4h27NfqVMLP8YXm6RkuLP+kWk9jeXIZDnKLRSEpuVCYyVWfjUN3y7fjPSyJoSGRyCEVt7NdWrOUYlqlqOtf6tu69+U/Nt2a+oSlU9jB/y4kJaq6/fQhYLKsw4uwX1x092XoU/fKM3YQV3i2iUGgUqe4BzT+HE2Su6kemvW459UZZPC2CABHbViSgHX1FCL9B2btJD0pt2jyvQuzP5mKTpdexqCPdX+dD6KnBDUVDPiZtpOLJ37MeavSadvrJYrnYMo/HJLnPbEKmu7GpTlF1ndilpSVIaqukZu+dChisJ7CjsCQ19vwFVakMstGtXwdGWUw5YR1tk/glERXVBSTisS1eNqxy58/O4XyIkrwKezt2AwlTX+XDlTK8jlyXuwoZEWVoZEW/4W0wdFRXUtnfpzNcAgsJqdA7jjvP9NxsIdT2HN3hQK/2q9ZSN+XbEV/XyHIMDDHrlr5mHGVgp3lC31iowIPPj2bYjjKnnbqqZFwvp9CxQwpz/5MPtXOnA/swccS3Zi2rvLUVmll1ZUeo7eIbjrmcsRTgsmM7WNSaLOkSPwwJnBeOb7cpQxAiqn2LiUoeOD29mOY3LxQT944ZJJT2HO/hexbW+apixoO70AC1+fyFcQO+tilBRz8HYLwOgH3sB1A2lSzT0jjYwcVFZQbLUNVJWTG9sAmwzbQBZ9bFEBbNYIymiyXcI24MOVWWUVUFdaomaHbVloebd5yTxsWQr4hYTTXx8nFFR+trUPRmCdPRW3fVUJpzOexQ8fXYMwTzstXzorWxVLi8pRxcmCOyuwpoSTACqm26YO+huWFeRp+fLz0OerIXcdPt3I9tYiaO79aiqmURAZTdNyBztljeCIkDBPTpzLYe/qxmhJvgjyD0ZQcBCCg/zJSik2WwrjEIarXroZv098jxOXAq40G5U35Rc8dfMv6DV4FHyqtmJbci2cfTrhmZeupdNjr4O3ORNqbjj7oecxfOez+HM7raWovdJhC35ftRUDglypiHFA/toFmLmlQoueq9qiT3An3Dv1FgputMjR0uIzTuVcQ00x9u3Mo1WDWeXVF6Ocq9N1jITn4qS3MDDJwkE+OPtRyGD006w8tqHW8u/FjE9morB7BebM34Aet16EIF9nKAV3OSMRN5treZl+dTmFKLYxL/pKqSnJxm412TTLZnlhjiaMBTFIg2pjsA/DhOdvxJLH38OOBDrKNW4jqb/i2dt+Rc9Bp8G3Zge2J9XAySccT73AiFtBXKQ4SJmMf2rI/QfTN1ajuEXxse+baXgH2bSc7czVSX17CQ71RBn94tlxxdLT1w9BAUEICmKbYXtRlqqqvdSVl3LB1axAvNG2PxYywATgGxwGDw8P1DQoZU5bO4qf+zbunlcN55GPY97718OvcxwcaBmA+Ll4ZqoTXnr4JoxkJDBPpybk5dF6gX2fmorY0R/k2ZcM1CwqD9YfGZdV3h8ZAV0zbRfY9ho5jmXt2cYFIW7FsUgqHt/9uBxRrjp0CeLKvxonOa7X1lQgL30v/vz+CyxYuZ8Lbi1XOgfQqsSxxSUPn19aJ6tnp4ljpPlRxkAmVZyE+dN6t6aMPgwpM5jNo1FeVKCNxZ389eOo6sKc/cIRzPHvAJ+5+taJJ6PEzZiN4nUN+OHnjYie8BRCuE3PjttmytLisUUtYphloJRtv5zO4HxUYCaa8bf2j63nueHMuyZhxK6XUcytb+V1yi3Adiz/ewsGRfogOsAZhRt/xJzNRVTW6cdn76Aw3PbS9eiv/C+qzLZ3qAeZE6R5rz2HpqrHcfX5g+FVnYiPPvmDCoWWbebMkKNnIK5/+ELEdfIzi8RsmrBT+GDcOqoTUlKykFGmWLvi3ItHIIpWfR3tM0xTNHzywLn3PIgfEsuR/89uLgYpBoajGL99/DJf/vDzr0BlBWU+WtmPuPUlXD2CViRu9qz/GlQUMYq7+eoFk6ip1I/PTS5UFpTlYl9evbYIZUhd/S0vymf9c3GHfbwTtZD15WXQWemHd676Bbv+ApVJIXBjdGxnygX1hhUgppP43Ud4+Ps6uAx7AJ9PuxkDu/rREpST7EL63TR32MvztbbJoGX6vBUjjeOQWcgjVFBppOWN7UzlralgM77eQv9jLdWX+P3H+Ah5GDOkmyarNDTZU47xRFUpF3+obFR9bqB/IMdofZ/rSd9xmhhqH4yLH7saK4pzULwtrU3+VUAylmPqQ8vxfV/Kh00HsDeFPNxD8PCb49nmQswUOOoCa4crRt36CE7bzTrlolAZtaPNul1Y9c8WDOkShNggFxRtWYS5m/KRw4dGjc3egaG4+dlrMKhbWMs26paxubYUiXvzuEBoJgHTyrGygj64amkBTqWXYUeHtdyYf+fkE0o/ePoI83WtdZiIb7/+GuXb7LDk980IvuAhhHdigBStfXH8YBRx86OWVjnV3FHSyL6rrjwP8fl1oGcJk6OiWN++6hoZMZd1aEf2Fz40AX8WZqJwc4op+8wVeOvRFfixzyAE6lKwL4UWj66Un1+6BIPpQ1K56+jI4RMeCWcP+pTcsRjvfURLpIabcf6Q7pxT2KGA84Zapa3mQ6YiAo8Y01tzJeDUYsLsFNgFoyjT7SLTdPadelG1lIGhvkB15mY0Ja7G5gT6P6OM7sXMqDZr6FP37MxEFv3ERnN+40J5UMcttVVZydhVVc6NmKbKlMqSSspW9EtMi1hX5RPcSl/WrF2f1O71ZTSuqKOCv73r6QQUQ66+E6P28ZmhFVU+5fBm3T78s2ULhvUmowgvlO9eiu82ZCC1VOWP7dA/CBMevRzDuetD+T0zZMspIAYjQ4Kxk1xSuXCi51KG72fMQE3WFuiS1mLT/lRyaYIX2SouqimovmzvLsWlBDGKC52KNjfU8dkusQzgx3MrOC+s4PypkfJrIy17M+vrLMaVyjLOVdhn1Tb4wl3tTLELxgU3j8N6Gp7krYun7K8sUJkYZb0FC7zRVDIM9slrMPe31UjMrmDe1Y9tR9qKlVjRLxqe3mehVzgjlTPnhZzz1NSaNeacfUjLyEBhZWe4cKHTjgtvqhyN5qsfTLqSdVtRRStaH5aDwXmsl4NWypSvDeVoLt6Fn7YXIKFQKVGZ/aXf4Eta/aaO6gt/zp9U/+ZH69B6znsbuZjm7utDS0IlU6o5SAC83Fw0ucA7rBNcGLTObt8yfPIZR6emW3DR8J4I5HxXtX9VLkVARYwdemYvdKa7K7Vr6FQ4HF7icSoU9GQs488//4waOou94sor4ezczvYHGyt4dT4toOITsG/rMnz0xKdIYufWzN5eDfrGr+xtKzB/zm9YtfJ3qHL+9PUcvP/ZdHz/yx/YqVbEqRNqPb/XtXj4hmHw53YWO10VEtYuxydvvo5dWSq8s2m6uxLK6QOhNzo5ZuKnT97Ggm2pmiVPa1rMR+meA7ALC0Z0lxhuBeSqOfsCe89O6NW0BVsOsJMyUmiVpmzDtv1FCAi6AW+/dgWjFjpxS+5KfPnx29i4v1CzCjJOe9e2QgSEUZlGi5QQpQRTiVs57D0jMXZkJPZt2ksfF1Q6UCmZsGYdirlNszh9Gz596TOkUqDVuXhTEROOu9/4EreeEav5SzNOrnDnEixcvR+1Bk1UAH+1C0B4oD02L/keX82ejTkLlyJdCWVaHThpQm2fG17Bc+MHwOeQ21ddEBrWjF8WbUQpBQR4jcYTz1yPLtq2VOOcHP57B58uOKe/L1e7ElBdVq63uNLyaKhTrs5UO8GXwmLYJU/g/YfPYyAN+uvRVSPxnz/x+VtTsT1dBUIwnK//uyO9ChExPRDhlI1fPv8U321J1JShxvVUum8X7IJDEdWlixa51p1KuOUUXouLy/WDfQsrT19/BIeG4O5X38UNPRhwYm8qyikQELK+fbrYwztsOF5+52H0i6CwsEHl6w3mS20ZMs3X7gMV6BTXExHOOfh1+rtYuCUJ1ax303wlM18BzFcMldPOqM/eiFnfMwJtS5ukiggHdqzHij+W4Y9lf2DF8qX45adFWMbPS3//DYt+/B7z536FlXvL4RsWi6gwrsoqQbSlejzC+6GXexp2HShAGQdtTbAxYl6Yk4HMMhf4ceJ5/XMf4+YzutOi4/CmfPYeERg9Ior55ES+olyzrDqwbj2KqdgqztiBLxilL4kBLJpd6MsnNAy3v/opbhvTq826khGKE3Zsw/rl8/B/v2xFaXWDCSO7sl0ocwzg9jY3KlAZMMEQ3bQDTdDeIxw9mndiV3Khtu1ayUaKfxkXCHbsL+Cq7ZWY8tIEKifskLJhFaa//Qa2pVB4M6vLndxmFRYdx7rMw+9fTsfCjfs4GWg0yWdZ/G7YBQazLbKNKYfwrASPMPL3SMeepHxudeAWZH0GWq8rzM1EZokLoxmG4tpnPsDNZ/aGN32ydPSoy+Gk8YfVFBgNJko1SNq1EX+at5dlqr0sbmkvc/Dn7hJ4h3RBZBhXMWmx6+bRiFV/b0dBAZ1ft+bREZ4+6nnT+mzGAABAAElEQVQIxe3cqnNT32bsphBcysmaEqa1dkwTAK/QoXj2zQcxuAsna7XJ+Prnv1FHi+WmtK34df5GFFHILT7wFz56ax6SqTRx9PRD6LC78crD46gEofVuRwtrI+elJCdj+fLlOOecc9C5c2ctKp2NZM1qNmoK0rA3gWP0tpWY8dIX2JNdhAajPsDQH+Xt+Rs/fbuYfczvWLSIY/Q33+BjjtHzf/wdWxPpN5FjleFcu7hLcNs1oxDpzzFPV4Pkzavx5TtvY1NiHhXYpv1gfEolgqL47LgVYfmcj7HgH46BXMBoTYt5KU9Ig87Ph89ODPwZzVPTc7uHoVvzXsSn5qOAKxeqXapryjP2YNf+PPrfugQvPnMVt+l7oyR+HeZ+8QH+3pHG7ZCmfWz8nhK2YyrPfQMY6Vgp6yxbnL17OEYOjULm/hRa9JRofVjyxk2cDNXSDcNezH5rJvZlc/x3pr8ePg83PvsOIzmqRTZTq6/ifavwy5rdKK5smTb7sUoc/bhY4EAr998xdw7H5wWLkVjKcUyrA0d4c5LTY8KTmHjFKEQo6xGrtWj40pkKHx1WrtzOKKiMQOs5Avc+fA36dlZbrgznHNlfB68onNHHH/sPcKJLpataWGh9zrW81lIhw+fdNxih5z+IKQ9cgh6h3PbL+k/d+jdmvfc2NsRn0yrGtP73ZtfAP5x9jXsx/pw7GwvpOLyYsoVJ/R/YB52PLzpxfA7goqeHZxPWbtiFHEZO1RbKWlh5eHOhgePzTU/SEnqoO1KSua2MbaM1nxy7PEMG0oXAvRhJf7Mu9szbtrWY/f7/Yf2+LNQy/LzxfRNSK+Ef0RWRnqW0dPmMedtJyx7T8af8QDqavb0Qzrap8taYvxMLF61GToEhUirvsW8rVq34g2P0Mm2MXvTzIixduhTLlizGrz/9gAXzvsby7blw8YtGZHgA3NhvqupyD+mJ7p4FSE7PQyGj2raVVZ/P4vwcZJWwTP4hGP/YVNx83jAzS7eD17U9n6ERg6OQR4ujguJirV2nbN7K56kKRTnxmPvObFqkMliHatchobjuyTdx+7jTEGKwrGyuQ8q+3diwYiE+WrQeGcX6aPOtDCviUcGtsi60APMN4hZ0pYQ8eJZaf7Wn4rGrLoFWgznILaUbEgonKt2KzHjsSciBi8f5eGrS1RjQ1R2Z2//BnA/exT+7+Xyb1WE825dvKC1iPcqwZv4cLFizDYW0TGrNo0ozKQHNnp6sQ7Yv+lpWC/buwT3QzYsLBxm5ZMO5hbLA0tqZnn1JQS6yihlohe398kem4MYLT+d8gEFXOvicOdZmcjF+PfJK69BE1qt+3oTMwjKUZGzAnE8XYGdiNnQ0Hgjsfx0evesyDIo13uLpyT6jnH1fGjLYztQio1aeujwk7tnBLYOUQ7sGwoWK5UquGGrLIy15L01mMCcvL3SJi2SwHxeUcU7z89efYSWtmpT7nVZZlucnJ5bBgW3R1Y9KeG/Wo5KtTMrXjJLkrbz+c/y5frfV6x0pE+uvd7dyvb667d2CMah/JMpzyDq/kAt+DUjbsUvb2VCcewDffTIXW+NTUevoCn8q4a946AXcMf4cRHHeYcKbbS3ErwLx6anIyC/TFg31XPJxYM9OZFXawYtyiAsXp6qUBZ26vTEXRvTtHBdBH2n2yN67CQs+/RCraZlbQZ9xxlxSMqvhERiJTt412LxoDr5btRFZlN80xVJLepWp2WjiPD0kOhqBKqAQBy23kO6I9WlATlYWsujvV0XVVfnLT9qNv+j/edWOdNiF0mqau2QaaWmr1jztaDnp7u4BL+86pMVvxsZSb3QNdETB3mX48POfGA2Vz2erTKbaZikK6uzg6h6KiBB31s92LPzsY5YjXoskblIOzpndWY4I71ps+fVrfLdyI+V9s3KkZXNcYzk668uhK4nH4mVrkJxRqJcFqQLOStqFv1euaO3fflv0K5YsWcL+7Xf89tOPWPjtN1hGX3SNbmHoFB4IL86zneqzsWTlBmQVccEiPwF//7oRqbklKMncgm+/WIgte9PJzxNB/a7Cg3dcgeHdQ7TAVfoWY9v/NtCiUZXflT7Ah9AXtb+/v1bPHc21KOo6SsoGzzsRFXX5G7/E41Nm4M+1nExTe+7LBqsarfWXMmFW4Nk7sWPw8/Ozft7Ac3DN2T24lYODRnMhvn3kZfxV4QxPDiYW6doVYltBIOKa12Hm4gR2Xt6W5/jbIW3nBrjSCX8/+r7TW9XZI3zwuXSsbo+9qYVwc/eEL62T/HiPUeP/h6m0ZuseoBRvNVjy3BP44UA93CkkWtzftRR7N63DNud+uLDfwbepuvh1wcWXjIQHB/Cc0kYGmGhCeuJObNqyE6W0dlGOSAMHj8er0/4PV1K4suYjzEJRp3YiDL0f01+8HA0HMlBHiyNXdvqeHp7w5kpuQFAP3DTxFbx025lUUBlt7TlI+3elNVn1wh/pMLwCnlc9jv9d0EvzTXCQSzr8kxJMLxvbh5P4eBTTOsxZWYVx1dGTgoUv2QcGDcadz0zG1LvGItSjZcsG28DCiVOwqoTCFRVpFnXQVIAdBf6IaV6POUt3w9GVDp4t2qAr0ndvhmvfs9G3E1fA/GJxZk9fpMdnUIHkDh+y8vfvhguuvw/PvToZ5/XjlpEeveBYsI2rzc7w8PJl+yDPgZdhytsvYEw3CgMoxsLHp2BlEe0OreXLvhg7C1W+GMl46X4KRNbyZY+MPZvg0mcs+jBfrnbF+OnHZSgsrdaEgo6CLc3YhWXfp6Ln+aOodPJstRxVzixCe4/FsK7+yEnOQZOTM9u6O62jPFkmL66Msc11uxATX5mKW8ZSSaf2XhzB4eIXgwsp4Hs3KKG7gb6rmpFJ4WQz23YxrQq82LaDyO7FqdNohdGVK5BG4nxdGt6eNBk/rdsHFz6HlnXnj5K0vVj7Zzr6njsK4T7mjmgPlmE7hA4Yi96hzkik4OHMujY85yMueQCvvnkn2wP7BF0RfnhqKlbSGtPFWl2yDe4q9ENU0ybMX76Lk293K/l0ReberXDuNZp16c/nV3V2vH+vMeQfgFwl2Dk6WeF/Ph6bPBW3nk2ny4dUpJuW1V5XjF9+WY48TtqVLNfRozRzD/74MRXdxp6GLpxsu/lyBb+HH3IOZKHR0UXrO/z943Du1Xfj6ckvY9zg7uhKp9DOxbuRy0mCm2fL8zDgYrz0xvM4l9Hs3FjeuuJ4LFuXgEHnXYQB3txSZVeOpPht2LCVQiSFcG+2g4Hn3Y3XX7gJvalU1hB1NNM2ct6Jpqgr2jEfk6d9gd9WbEahkwu8LPpG4z6VAYOUlkz1PhxLfDgmWnse/fuNxuW0AgnWFlKK8MuLb2NFRjXdrBmn1fLeoQz7in0Q3rgNP67kliTaClim6YDs/dvgGHcaetEnkRsXG9SzE9LvTFoXuDOScBHsnVxbn91h4+7Bi6/fReWwWoWvxV/TXsMP2/JodWQlv26VOLBzI7Y2x+D0XtFUopsq1wzNytknCueeR0fX7LfzqTiwd2xGduo+bN26E4U6e3iQW+CAi/AUn9XrR/eGrxX3ABaKOqU/73cL3nxyAnwZfEFFdVR9nOp/vaiYCgzshgn3Po3n7zpfU1qbzJENGTP768qJbO2S5diZnQ8ncrh33GBOKK0HoDC79JAf3QLj6Oy+D1wL01FCax0H9pcqr2p89mG/GBjYHzc88gym3DuOFlmeeqUM+6BfX3kXy5Np5e1tpf51Jdhf6IWQhp0MpLMDNU3OVurfDbmUhey7DEXPqFAuoMRgRLcAFKXncppIZaY2PnfFmPG34wnaIlx6Wl/EdesOl/JE5Jc303KppT/qR+XOK8/goiGMVK00l7z3b6++h+VJpbCzljfHcuwv5gJSwy78unoPdzRYy5sjcg/sgH3MEPSMDqNVdRmWLlmFzBxaXx9Gn1uevR+rFqUgYuhAxEYFtLgSsUNQt1EYHBtKv39UhrOduXm40SebfnzWZKLYsbjv6cm4g/Uc5HX4C/jOPlwkPocKPudyFFCuAC2t89L3a+2awx3cVbvudwEmvvAabjybvtuMIwfXZ2H6q9OwYNkmjl3Wnlt/VOQkYcPqFHRmuaJC/Q5DYcyy9x6JXhHetHgvgc7eufX5HnzebXj21btxWs8QWvaVYMkbH+IPLpTrrNUhypBY5IHA+j1YwsWminpHq+0rj7ti7KIGoHvncM4t9P1LEPubQXHhLIOKtEtFiwX7Mbj7yZdw58XDKHfwGevIA9rylNWXpWLt5v2IHDgCg9Rivn0ZUlP2YMv2fSjgooc75z+9R1+Hpyfdwn4pQhs/jR9Qz4ie6EoFf35BCeqaqTBUcj3nWP4BdMx/5f14+dmJGMTxtZzKNyeTuUkzclPyEN6nL6IjfbFz5if4ac1+VDh4Ut4zez7da5GZQOOEmiD0ieuMUE0RaVzIemycoa7n+N3u9duxjUGresfFIMzi+rYSOXmFY9SZqq+qYxA3Kka5C6og6wC2b9+JHFqfuXCsCaAcfN8TL+EWypJhtBYzUdK1JOUZ0YNcaEBBK1m1KNDGJQCnj78XLz83CUMc9BZxjl7GczbFJZfyWB90jnDF+k+/xDIV6MPdx5KLczWt+9zgXZeA1Rv2oIBrIkr+Nx23nLkQHY+mkFjExURpRhBKKRfQZQD6RvvQ37XyyddMy19uY6aC0MeH84dB4/Dk05NwUQgVtupZdOd3Mb1w2hnnYfyV1+DG227DzSy7Z8ZizJz3G63a6jSLXNP7+sO+Mh974nWI7RGElJ++526WdNS4WStHDdLKuJOi7gD+3rgb+bQCtloOKsebglU5OD66VOPv1euQRBcXxrsn2mrS+rvK/GT8s+wAvGO6IY79mVNNBtZv3c/5x2AMjvDhOF2OdLol2Lp9r+YKx021/9MnYNLE27gDJAruRgYG1u9gO9/+W0WdHfczH8bQYTsFl5wAt/MhLeaq19dcyfbk6o8cx4kAt7yV0tpIrVo4s+P0Vv62jMeqY5CNirwU7E9IRkmjPcVQrq5wi2lYTFd0i+SqgpUVf0MW9s15BFe98gu32BkM3flLj4lY9919iGIQq+zkA/TRxgGs2ZETshDE9KClVsvqrSGNtr+mvgnUIKM/6rH6tTtw/5fb8dCsX+m7JspCiGhL40jfNaEwg6upKdkU3MnARVlLRSCmMyf8anvSkSZ7uNc11dCCgis+dlQmcTLiQusi83ur7VpVHHDtHZSShyt81qSHw71vu+eXYtHzN+D5eTtR0OIgr61eLC8y7+5HTaIVzN2nI9Cqc+965GekIT07l1vRuP2ak/bQTtGIoR81tZJ6tI7KfDrLTUihtSh9rWht2xWh0V0RFxVCn1ZH7z6HnV9unymrqKLvEvWc+8KLE/ZjWpUWGaxHQWY60rNyUNnCPyQ8CjGRof+CC/0lTb4VL3y9hQo0te2Y6o3W59giAxb+Tk57dBY+uOcsCtgtE8BmBnKhANnEXklNzq1FtKzllg8VddCOz4OPUppqih39vZorM7ErtQGxsRHwoGVgWQF9LOXk05lyJexcqazpTMsHbtOzZtVkmVvb/GYFremefPJJvD51KkaPHn3CWL/bJs0O5op+3cq5xUpFo3bkhEQ9uyY+bDuYTEdPqyzMwIHEZBRRWcWNnfzPFcGRndmHcXxqCcBjLa0D33NS/9q3SGRQhtaj6z346csHMLirJ/JTkzk+cwLXoBadaOXfLZrBorhVyHzQabnYuH9ve64bsOHDiZj4+Rpc+sp03Hn+IO4+MFr4aL3xv3lDSxoGvEhKzaRrEfbjaiExKBzR0VRy0Gqqnez+mxtav5bW1iVlVdoWKzXZdTN27dByRV1FCa2KaKFpz4k1LSYdNSWv9eSOzrflWPH2Q3h55l9ILm7ZvnUYfe6Qu9/HtPsvQhwjBpseDbRyy+T4kI0KWi0309ImiNY3nSPDNEu1o8G8qigTSWzXyt+ivl27ICiiMxWHdG1wPOvVtOAMX8rtyRybVbRzRzdvPt/Ox/T5Nr89M6Cxz+DYXM59s23sQ8neyMef5YXtfqOrzmNAsmoEhYXQjYoLgwgUcCzMpRVZOXQOHuxPohAZ7HfIyNn13M6blELL0dIare8L69wFYQHeLYredm9v0z9Ul+QgJSmZiiO1rbOJ/1FBHhqJrlSienPrZEfaen15PvsnFaiBC0SULcI6U1FI2cLlIPOn4wmlubqIFr8ptEKtRDOV0H4BYYiJCqf7HRdU0co9t6KJSrgABPh62Zg8VIm1X7yIN79YhO2Z+gBLbWOPJUHjMUr92vfa5/HSA9diSGgDUrKq4Mct3P4+bprbi5ycHOTTJVATZcfgTpGIDOUOmYOMp5Z3s41vqior8eijj1L+9cE9996Lrl27cl7Y8THY0TaKIbkQAicQAfqu8Q088ohpR1JSr5AYDOHraB1qcybY+XWK68dXx1JtqCqj36girko109dBIP0LcNskO5ummgNYtGA77NyuoH8pRo88JmYvDgiMpL8Cvv7Tw8ENAbScPNjh5sOtKgc74Sj+1sTV4EHXPYDgRU+guLqEdUBLQy93Ruo12pJARVMT/Yk1cdtDdQUdnlNpYljZr1Fbzw0fLPLlTOEwTntZ/HQUv/AM7oxBfNnc4exGq9XjVZPWSs+JV0Ss9rL265F811zvgAFX3YPQX5+i75cCrb34sL0o3zStc0ej9lLDrcnV3LJraCI13CKkM3xQGeBk15/bGQ92uNJqyrWdE+w9I9C/T9uPPkGRnOBHtn0h74TAkRBwohLmEO3ySJJt7xpPbhcawNfROtT4rLPngkWXXnx1LNWG6nIU5iulHq3vuV08KJB+i/hc62pT8cciZZl2NoZyG5fXUVfSqfzRD1F4HIbw9Z8eZOZHH6MHO1xoNUOvCsftUH1u70tuRqfFB5BenMrti9y9wD5XRQ1vndCyT1XB0hrps7GGkTlr6PPP4NqzVvkco8xleTjRjQq31/J1rA6PgAj048vmDlrLetE/5XGsRjMER5+9Hbf2du/edhsPv1D6nOar7asOvXOmf+me/UM6dO6JcpK7Xxh6D+HrX2TY2TsYPfsF/4sUju2l9u4B6NqHLyu38QyORqyNZl3X6MCdFuMRuXw/9mXtoItBPpde3BZNhZpy7aTJlap/Y6AL1b/Vav0bg9q1dGl1tI5soi9iO7cgWj23FdKDC1Ox6mWFx6n2lSjqTrUal/IKgSMhoKvDjt+m4+XnP8NOWip0v/ABvDGVftcCPZC7YTGW0ZfayIkXIMqL/oKOJH255ggINNO58w945J7XuVWIfhs9gjBozNW4lqbw3Wg6rrcgUb4tGrjqy2AfdIS8ccl8LFnN6He0KNBMqe06vqpzBBmUS2yKQDMKt/2MifdPxR7ly8kjEANHT8DV40ahB7e8OGpmOmwvdMBdToffqr1sZnCIJX/Fo5B+mPReWaS92FSVSmaEgCKgq8e+P+fijZc/wT9ZBYgecwtefJmBAboEo2Tbn1jFyHt97jwLsfQx6STEjiOBZhTvWoLn//cGNiZmosHdH31GXoarxp2J3jHczkqLfCgLTC6GVFZWoLQoC9v+/AlL/6K/PeVnUctpR+yFjmOR5FZCQAgIAY1AM0r3/4Vpz7+NlZv2odrJG3FDzsNlF45lgJlQeGruHmgkQB+DVYw+W1aUg51rf8fylVuQVljJXWkqEdW/SR+n4WznH1HUtQNGvhYCJy2BI9i/p6vahfemzMIuKumUI9o9v3+EP2+6FrGDPfH7N3Ogc+6Jq8/qQbN/6VKOX7upxuqZ72MfreQ058DD72NAk5sQS+WpdXWKDldccw50I67ED5m5qLFTjsnp16O9fVTHryByp+NCoAZ/f/UR9pYUaZHNMIS+3169mf746ODd6v317cVu9DX4LikDVWwvXtJerJKSL4XAERGwNj+x/jAeNHlddTxmvP8NNlJJp5xcJKycjVVXXIqeDBq18oeF3HoejotH9UIA/TjJcTwJ1GLDwhnYzS2qWnTYATfhuRfuwMjYwHYXNMdfdS5cL78DczfvRqnqcxkwxFFT6B3PfMu9hIAQEAKHIkADjsUMdJK8H+UMrqLreRkemHQPLqbP9PaiHV965bkIuHcSZi1hgB2ajnvQX6rTYQakO1SuTrbfZVZ9stWolEcItBDQ0dS4rlEFGdCWLdq42NFpO02Rla+A1q0Xbb9afVeTm4J4RkbSoiK1nJGbnY34irV4f20zetx5LwaFeh6GY2Crt5EvD4sA689eOSxWsz3WcW4qErPyEOhKB9au9NlC3xvaL6zn5qYGunWpQUlWCiO5Ua3Ha3yD++CasXEMjy42FoeF/YQ9WUe/GPSfo1lR0lYjPw0H2F7CPaiwdaXfK9Ve2GBUv6C1l7oalKr2Qgs79YNPcC9MGNMNPgzaIocQEAL/joB+fGZk5xa7qdbU7DjOcuzWfPlofXvrL+2+qSugj7yGOqhYFIajII8+r9ZsxOdrKxB88T0YEkP/WWLubsBznP629LmaPyL2uQWZ9MOUi+70N+dL31qOyr9uS5+ro3xVzzG6LCeV0eyp1uMP3oHdcSkjqwdTWSeHEBACQsC2CKg5iPJB2uKruySXPlXpV47B6EK4vd9JBXxgP6bGMtW/NdTXojyPi770L8n4tgz4GINzh/dANOeOx9aXt21RO9zciKLucInJ+ULgBCDQWF+F8uIcbFzzj7aVzUQht/cfbE8aDz/7EPpK8dT82CiFzsEO98Cu6E4HnwV08t6olHw8ee4bT+OP4gwg6Bw8cPlQmjmLwudgDI/+b17off5IROxhxKpUbmXcNwf3TCrA4zdfhuG9O8PfS0UhtkNTUz2qSwqRGr8F89/6HBvpeNo7LBI3vjQVY7g1yuUILDiOflkkxWNPwBM9zx2JyF3lKE0uQGP8XDz0RAEevekyjOrbBQEUrJSwpLWX0kKkxW/Fgv/7AhtKauFJx83XPz8FZ8ep4C3HPqdyByFwMhNoaqhGOSc1W9dv0CYtJuNz4hbsSUxDjD8dpnur8Vn5+jk4DVf/KPrz8UACJ0Y1dP6jxuefPpmK1RUFsPcZgUfHDUeo//H1q3vwHJ8qv3ogbvRQRG/LRu6+XNQf+AHPvFiE1Osuw5iB3RDEOnOkEq+5mf5jS4uQnrgdP34wC+sY4MslpBOunvgszu8fy8ixh2gApwpOKacQEAI2RMAdnYcNQMzGeCRVpqMqbRnefqsMWUmX4oIRvREeoAJf0E+qrgm15SXITN6NxTPmYvX+DOj8gnHJ3Q9j3KhBCGIgMenh2q9WUdS1z0Z+EQInLIGS/X9jxqfvY+EWwJHhxBng1ehIwOTJ05B63giMuexKDIpiVMVDzQR8++C+a4cgb95WZNO3gFLW2deXwrFTBG599XEMjWSHLD2tEePj87bH+BfwulMMXv7kRxQUlaGuYDNmvLEen9M5a6MyRedKlr29I7fOOMHZxQUudOwf2X04Hnz8YVw8hNF5ZUvN8akoG7lL90ufwatO0XiF7SUnvxh1xdswZ9omzLTWXpzZXjx8ENH1XNz72IO4dHhneMgWBRupScnGiUygNHkT5n35Mb5dw4jrjhyfTQboVLz//ofIHnsazr3sckZ/DYH7oQZX7x64iYtlmbRUSMgs06Ld2jVUwDk4GFc/+SBG9QoXBft/1GBiz38UzzlG4M3PvkdSRi7qyvbi+w93YL7qcxkkQj9GO+jHaPa5apwOGXQhbr3/XlxxRg9a3sk07T+qOrmtEBAChyAQfcYteNQxCI4zvsO2famorU3B8lnT8PsX9E3X1KT1b3b2DnBwdGTEe33/5tN3DK686TZcfd4ghPm4albFh7jNKf2zjACndPVL4U9WAjVFuWiIOAs33eqkWVWZl7Ouvh5lZbVwc6HZstp7ccjDGaMe/BgfD1yKxcs2IZ8BCpx9uuDcK6/AUJo5O4mfs0MSPDYneGHgxffjp/NuQnZaChL2JyM9JwsFeSUorqpmpCUdXN18EBQWjc7du6BHbCyiQv245UbM6I5Nfdh6qp7of+E9+O7sG5CTnoqEhCSkZ2Uhn0q7EraXJirgXV19EBgWhc7d2F7iYhEd5i/txdarVfJ3QhGoLS5AffBQjL92BMdOy764ns63y2qbuHWIE5xDLaJpJXfCkFumYFrvv7Bs2T/IKK+Go1cURl98CYb3DIe7s+U9TihgJ3RmPdD77Fsw+8wJyMtMQyLH6LSsTPa5RShWPn+5oObCMLSBtFqOZp/bXetzA7VI3Cd0sSXzQkAInAIE3BF32gS8N2QcCumLM+lAMlLSM5CXV4gS9m/1jPTq5OwB/+AIRHaN0fq3mIhguLmqLbNydISAKOo6QknOEQInGIGos27B82cd7Uw7I27UJXiELzlsjICzF8Lj+mkvG8uZZMcWCTh7Iiy2j/ayxexJnoTAyUygEyc2/zvtaJfQCTFDzsE9fMlhgwScPBAS00t7nW6D2ZMsCQEhIASOmICTOwKjummv4UeciFxojYAss1mjIt8JASEgBISAEBACQkAICAEhIASEgBAQAkJACAiB40xAFHXHGbjcTggIASEgBISAEBACQkAICAEhIASEgBAQAkJACFgjIIo6a1TkOyEgBISAEBACQkAICAEhIASEgBAQAkJACAgBIXCcCYii7jgDl9sJASEgBISAEBACQkAICAEhIASEgBAQAkJACAgBawREUWeNygn0Xccidp5ABZKsCgEhIASEgBA4iQho4zQjMOv4kkMICAEhIASEgBAQAkLg5Cfwb6U+ifp6ArcRJ0dHODg4oKqyEjqGeJdDCAgBISAEhIAQsB0CdXV1cHJyQn1DgzZW1/OzHEJACAgBISAEhIAQEAInN4Hq6mqoxVqlrzmSQxR1R0LNRq7x9fNDBZV0vyxapE0EbCRbkg0hIASEgBAQAkKABLIyMxEREYHt27YhNzf3iIU1gSkEhIAQEAJCQAgIASFw4hBo4CJtY2MjvL29j0j+E0XdiVPXFjktKS7GNgr/SUlJmrbW4gT5QggIASEgBISAEPjPCNTX1yMkNBS//vqrbH39z2pBbiwEhIAQEAJCQAgIgeNLQLk8KSsrgx+Nq5qamg775qKoO2xktnOBh6cnhg0bhkmTJsHNzc12MiY5EQJCQAgIASEgBLB9+3bMmjULjz32GPr27SvW79ImhIAQEAJCQAgIASFwChCoqanB9OnTNYs6e/vDDw0hiroTuJEoDa16xXTpAk8q7eQQAkJACAgBISAEbIdAWlqatuXVz98fXWNj4ezsbDuZk5wIASEgBISAEBACQkAIHBMCKo6AUtZVVFSg+QjiCRy+au+YFEMSFQJCQAgIASEgBISAEBACQkAICAEhIASEgBAQAqc2AVHUndr1L6UXAkJACAgBISAEhIAQEAJCQAgIASEgBISAELARAqKos5GKkGwIASEgBISAEBACQkAICAEhIASEgBAQAkJACJzaBERRd2rXv5ReCAgBISAEhIAQEAJCQAgIASEgBISAEBACQsBGCIiizkYqQrIhBISAEBACQkAICAEhIASEgBAQAkJACAgBIXBqExBF3ald/1J6ISAEhIAQEAJCQAgIASEgBISAEBACQkAICAEbISCKOhupCMmGEBACQkAICAEhIASEgBAQAkJACAgBISAEhMCpTUAUdad2/UvphYAQEAJCQAgIASEgBISAEBACQkAICAEhIARshIAo6mykIiQbQkAICAEhIASEgBAQAkJACAgBISAEhIAQEAKnNgFR1J3a9S+lFwJCQAgIASEgBISAEBACQkAICAEhIASEgBCwEQKiqLORipBsCAEhIASEgBAQAkJACAgBISAEhIAQEAJCQAic2gREUXdq17+UXggIASEgBISAEBACQkAICAEhIASEgBAQAkLARgiIos5GKkKyIQSEgBAQAkJACAgBISAEhIAQEAJCQAgIASFwahMQRd2pXf9SeiEgBISAEBACQkAICAEhIASEgBAQAkJACAgBGyEgijobqQjJhhAQAkJACAgBISAEhIAQEAJCQAgIASEgBITAqU1AFHWndv1L6YWAEBACQkAICAEhIASEgBAQAkJACAgBISAEbISAKOpspCIkG0JACAgBISAEhIAQEAJCQAgIASEgBISAEBACpzYBUdSd2vUvpRcCQkAICAEhIASEgBAQAkJACAgBISAEhIAQsBECoqizkYqQbAgBISAEhIAQEAJCQAgIASEgBISAEBACQkAInNoERFF3ate/lF4ICAEhIASEgBAQAkJACAgBISAEhIAQEAJCwEYIiKLORipCsiEEhIAQEAJCQAgIASEgBISAEBACQkAICAEhcGoTEEXdqV3/UnohIASEgBAQAkJACAgBISAEhIAQEAJCQAgIARshIIo6G6kIyYYQEAJCQAgIASEgBISAEBACQkAICAEhIASEwKlNQBR1p3b9S+mFgBAQAkJACAgBISAEhIAQEAJCQAgIASEgBGyEgCjqbKQiJBtCQAgIASEgBISAEBACQkAICAEhIASEgBAQAqc2AVHUndr1L6UXAjZLQKfTgf/LIQSEgBAQAkJACAiBk4uAyDgnV31KaYSAEBACR5mA41FO7+glpwYw2MHO7uglKSkJASFg6wSUck6HxrpaVFVVo8HOBf6+nnCwl47A1mtO8icEhIAQEAJCQAgcnIBO14ym+jpNxqmHE3y8PeDs6HDwi+RXISAEhIAQOOUI2KiirgmlmakotA9ETLg3HERbd8o1TCnwqUdA19yI2qpKlBYXID1hG1au3IAc99Pw9CMXI8TLlWp7OYSAEBACQkAICAEhcOIRUDJOXU0VyooLkZm0C2tWb0Q6euHu2y9Ctwg/yBanE69OJcdCQAgIgWNJwCYVdc11OZh+9/n4yP0RrJ51DyK9nGWSfixbgaQtBP5jArr6cqSlJGH3+lVYOP0TrE6tRH0zM9U9EPff24RgL0gf8B/XkdxeCAgBISAEhIAQOHwCuoZKZGWkYu/GNfhp9hf4c28OKhqYTpdbcMmEsxHLt6KoO3yucoUQEAJC4GQmYIOKOh3Kdi7G9IRGNNTMwIoD1+LG/oFwkq1vJ3M7lLKd4gTqc/7C/Q+/i9LSEhRk16BBKem0wwlqQ4hY07XgkD9CQAgIASEgBITACUWgIX8jXnjhA+xLTEdJfiGqlJJOOxwp49iLjGPAIX+FgBAQAkKglYDtLeA0VeKPWbPR2KBGsXzMXPgPquqbWjMsb4SAEDj5CDj698eUtz7F3JlvYnSYN5xEM3fyVbKUSAgIASEgBITAKUjA0bcHJj7zFr7+8m1c0jsaHrY3+zoFa0WKLASEgBCwbQI2N1TUZa3FzKU5aGjUh3tMmvUttpfUokmiP9p2S5LcCYF/QcDBKwoD+8Whc6/TcX5/Z7g6/YvE5FIhIASEgBAQAkJACNgIAXuPcPTuFYuuvU/DmH7e8POwkYxJNoSAEBACQsBmCdiWok5Xjy3z5yKR1nStO9+wCvOXJqKuse0bm6UpGRMCQuBfEmgEA6LJIQSEgBAQAkJACAiBk4wAdwgxsj3E+OAkq1cpjhAQAkLg6BOwKUVdU+U+zPt8La3pmmEc6PWXGQuRVlVvpLw7+iAkRSEgBGyBgI7PvjMzIntfbaE2JA9CQAgIASEgBITA0SKgNHTcMmBnU9Ovo1U4SUcICAEhIASOIgEbCibRhPQV87GksREuAeHwRRlyiqrQrFaekmZh0Y770PX0CDg7yAT+KNa/JCUE/jMCOprONfN5V7vc1VNtZ+8ARwdPdBnaHY6rc4H6Vm/L7eeR/YOOr6amRvYV+tP06dA5s7G2v90U9Nc3NzW1Xq9WCRwcHLTr2+1teM/m5mY08aaOjo7qEuaDnxubtIVyewdH2DMAjsX17eTXwcEe9ofKr3Yt79HU3LYYz2vsmVflivrQl5N3azl5nT3vqYL0qHxzkd/BUZW5PVDkxLKac+5QvttLUr4XAkJACAgBIXCSEtBkHA6uSk5Qh5JNHBzcEdUvFm5/7AEqqjpQ8paxt5kyinE6HL/trMkYVlLU54PjP2UI7eBA78C8HPT6FhlH3VMvG9jpZRwlf/A3Te5QebC437/Ir0HGoWxlyKoSSjRZhYrN9uUTfSZMy2km43CnhpJX2pcL/0W+LRjIF0JACAiBo0PAZhR1zXU5+O6zBWho0GHcEx/iDvsFuPHZhSiva9RKOnfun7htyPUI9HCyMjAcHRiSihAQAseBACWw+ppyFBbkIy8nD+UM8aqEPRd3PwSHhcHOyYPC1KFXm3XNjaguL2E6hSgoKkIN01GCqKuHHwKDghEU5A9POrtrTwGmhLq6ynIUFxcgv7AYtfVKAUah1NkdPgFBCAoMgI+7CwXaNlFUUwo21KKqohz5uTkoKndAr4E94OnQgOKcbKTnFKKuyR6ewRHoHBUCT2cKwy1IDfktYn7zzfMbyPwGt5/f5qY6VJSVoKioACXFVYyKq3Kqz6uXrz/8/fzg5+PBhQxr3HRorK1CYX4ucguKUEtOOntneHp5wdfXB84NBUjP9UDv/pFwd7EcEqzlW3FQ9aVxPki+j0NrklsIASEgBISAELAdAhwfG2orUczxWsk4pXVcdKSOzNnVG4GhoWiyc9GUdofKsBp7ayrLUMxxu6CIkWLruSDJsd/ZzQf+gUEIDg6Al5upjGKSppJxqitR2iLjVHM+pWQkeyc3ePsFajKOr6crF0jb5AZNxmmsQ3VlBQrzclFUpkNMj67wZ/SLUsoQGdkFqK7XwT0gDFGRofBxc6aMpb9ra34LmV++qrjY2tH8NjfVU64qpYxTSBmnQnN3pNSK9k6u8PTxa5FxPOHi1CZTtZWVMk5dNUoK8ynjFKK6luW0d4KHhyd8KOO4NJciJ98ZMXGd4OPt2iqTGa7X55uyYCFlSSv5DgoKgLeZLGi4Vv4KASEgBI4lActZ2bG8W7tp61C2ezGmJ9C6xqMHxo/phwFOtejxxk/YXKi3lClYNA9/PXoZLu/uC8e2MaXdFOUHISAEbJCArglVxTnYuupnfPjue9iY6wBfb3c4UEgrLipFp7Ouw/C67ahRgu1BjuaGauSn7cfK72bjky//QImTWtmtQ2l5tWZxFtj7Qtz30J24aGRfhPt7mCjbVLK6plqU5KZi45KfMXPWDOwtcYEzBcDaqiKUV3HluvMo3HvP7bj2nNPQOdQHTvY61FVVoIQKtsyUPfhr2SJ8Pn85Kqtj8eXfM9CneBveeeIp/JhYiloVpDpwLN6ZPQ2X9guBK62AmxuZ39T9WPX9V1p+ix2VtV0981ul5Tegl8rvHbhoVD90MstvU00ZUhO3YcnC2fjw27+gc/GicO6EhupSFJfVoMm/Fy694ipcd/PlGBYdyPuZdpANlcXYsW4RPnn9TWwocICruxvsybucwn+PM89FYNlqrEq8DT8vfwg9I7xpndd2qHwXkPOq7+cw38tQxLKY5vsC3PsA8316f0QEWHJuS0neCQEhIASEgBA4yQlQxqkuLcDudb9j+scfYfWBCi5qcRENjSgrKUPgkHEY4phABVjNQUE0N9agKDMJaxd9i+kzf0dGTR21Vo0or+RCXUMT/OJG4+a7bsPlY4chJsQbTmbjvo6Le2UFmdj252J8PWcmtmbWwc7BiYukpaiorkdj+GBcf9PNuHHcaHSPpNzA3bj11VVU6hUhOz0ea/9cgpkLlyGnIBhT5/8fzvQpwpzJL2P+pmQUK/HM/zQ893+v4rrR3eHrYk8Zh/nNSsK6RfO1/KZX17bmt5H59Y0djZuY3/FnD0XnEC4QGuW3ubYCGSm7seLnefjs2z+o2HSAl4crmmrLNZmu3rsrzr7wclx303iM+n/27gMwimoLA/Cf3ntPKIHQISAdQWkCooLSFEEBQZoNBUVExYZdQAQpgiCCgjSlSQ0ISEdAOqRXEtL7pu68M7vZzQKhmBcE9Z/31myyO7NnvoTZu+fee26D6nCWDlDTrTg/C+f/2I7vvvwSe8Kz1V5fWColyE3PQGCLdvDVnsPR8J6YsehldGkTANMPvmrc6QmR2L9pJb79brOUWdLHnVPm7FqnI55+9hn07dZWnCVufgA1ped9ClDgNgtYvCfbbX6Nmx++NBcbZ0zE9tMZcOn/Ht7t1QC2LtJTE7Ma287mQL+OxGVkOHXAI/dWh43JBf7mB//3PmP9+vXQaDTo178/rK3Vul7cKHA3C2iRlxqOX6aPx8SZa5FQ7Ar/zoMx6bXReLR9XWTFxCP62O/4IzoDRYZlnj3vxfAnWsPd3rq8F1SSR3Ent+DdJ1/AshPxsPG+D0+PGoTO9/hLb2i6NJJzkHU5FHs2rUKCZW00bxIEZ2mFGqdNSJLu8sUDmDPhGXy28jBybX3w8FOv4NmBD6KGfSwS4tOQkxiDoyEbcCTdA22b15fe5EIc27QCX3/wOr5YsAp7j12UmbnqaN+6aNnMFssnvI/t8ZnQKGVdy/lRyK/VBd2bBMDevBDxf27Fe4NfwrJjMbD26oCnRg1G5+YBSE0rj3fvr6twyaIW7mks8UoiTh9vMeJ2fYcBY6Zgy4FzsHX3w+Nj38ArY59EU+8SRMdeQublOGmk7sbaKDv0aN8U3o42xh5uaDU4tXYann1zDqKLXNBjyHhMeHkUet/XHA4xsTh57hhORBegqEF7PNO/NTwcpKff8CckzvEnt+H9p17C90ejYe3ZAYNHDkKXFgHS652BvDLnvZtXI8GiJppJ3GrvutHZcBx+pcB/WCAqMhIhISHo1q0bAgMDddPq/8McPHUK/IsFtMjPiMG2Be/g7S+X4WyaJTzb9cUL40bh8QeaokRGe8UcP4DjEUnIlRH8us2tBQb0boMaXo7lnWSSPEo8txvTx07EtztPodi5Bfo9/QS63RukG+mWm56F7ORIHNqxDtEFbmjQoA48nKQDzvDmLUm6tKhj+O7dl/D5ku24VOqMzn1HYfigR9HAMwMpScnITIzDyb1bcSTRCg0a1oOfm4JzuzdgwadvY9qcpdh+8Iwk9CRphUA0aeiM7dNn4deTUcjQyhRYNXBNPDQBrdC+cS142JQg6fweTH/udXwb8ieKnJqj71MD0b19HRkRmIOc9GyJNwKHQiRejSvq168LT2dDvCW4dGA1xkx4Dyu2HIZi545eQ17ES88NQ7vaNriclIRUiTXsz/3YEK7FPU0boaanE4xVkLQFuLh1Aca/Owt/JCro0G80xo17Dv0faAsPGZ134ewJnIjMQm6NFuj/WDsEejtd4azGPeOFSVi47QQKne5Bn8FP6OPOy0V2hhp3JA7vXI8ojQvqSdxe0rFsdNb9AvkfClCAAtcXKC4qwtatW2Fra4tWrVrB3d1dPicZLtbX38/4iAxzvuNbQewWpWdQLaVa9cbKkpPJSrEUdFC3rDOLlVZBgUqAn5/ir7uNUQ4n5ymldzziuyOA4c88ozz26KNKTk7O3REQo6DADQSKcuKVZeO7KvUDA5SAoGBl5MxtSlpeYfke+ZHKnEe6KvWqBZT9e5d/952/UMJScqU8mmErlevCWqVvkwZKjcDGyuAPVysxOQXGa0Jh8hHlrZ73KUEmx3h33XEls6Ck7AClSnb4NmVU00ZKoJ+/0qTlSGXjmcuKrCpd9ni+svHtTkqj2uUxvLz8iJKZG6nM699HeWvyBGVA++ZKoO741crilOO0aKP0ub+D0rZZI6VWtWpKzdoNlLHfHlLS84qU7LM/K/2bNlRqSryDpq5SorM1JvEeVd5++H6ljkm87/zyh5JRFq+28KLydstmSh3d9a+W8t6Gk0qW8VwU5dSqSUqbhrWN18ipW88r2YXlV0htyj7l8RbBSg2/asqk5ceUzHyDg3q6mcq26c8orevVVAK6fqacT8o2xqXIveyzvyiP39NIqVlT4v7gJyUqK9/4eGHyUeWdXp2UutXLnd5ee0RJ05gev4yUXyjwHxYI2bFDadmihbJ9+3alsNDkevcfNuGpU+DfKFCcl6T8MnWgvCfXUPxrN1IGf7BcCb+cU95+KYhTlo14QmkZKI8bPtd0eFvZczZJKX/n1Co5oVuVMV3bKUE1Gyp9Jy1Q/ryUYXy8KO2kMm3oY0pwzerGY4z/9lclNquw7HVk/+jflTe636fUlzZOo2aDle93XVCyjO0CjbJrxpPKfU0M7Rc/5dnZG5To1Ejlx+efVaaMf0EZ9EAHpX5N9XH15q+7NWzaQul1XwelQ/NgpY68ds1a9ZSh0zYqESn5Sk7YNuW5bu0l3gZK34nzlePxpvGeUqYP66M0DSyP95UFm5SYsni1RVHKjEd7KE11HoHKhEXblPisIuOfx8XNnysP39tYqVbmNXHpTiUhx0Qr/Q/lpUc6K0ES6/Ozf1Vi0k2vsdnK3kWvKT1a1FOq3TdZ2XnqktFRSp8ouWHbled7dNDF3ee1ecqx+HSluOyVi9JOKV8O76c0M/ldvTx/vRKdWVD++zRGyTsUoAAFKhbIlRzNyGefVV6dMEEJDQ1VSkvLP6NVvMeVPzWd5WRM3v2td5QiHPt5OcJKiuHYaAy61XU1TlNzbtwTT/u4wsqYedyA1QdiUaRWn+dGAQr8cwTk3/mFX77EZ79GIadQgVuP8Xh7eEe4yUg542ZXCyPnTUI17yunXxoflztKUQZWffUBzuZkwanVWLz/3EOo5iCjuKTuilzaYOXZCq9+Pgo+bo7GkWELv96AmCyZEmvY/7NJ2Cv13ops3fHSzLfQtb6XySI1dmjV6SHY2tnpR4bJtefPyEwUKQEYu+YXfPjxdHz53kCZrmsnR3OTmwWsXX0w9rOl+DFkG2a/8wI6BzdCmx7DMKxHIziYZ2P1rKk4m50Jx5aj8d7Yh1BdRryVx9sSEz4dBV93J2O83369CdEZ+njzpVd8q1ovRl4JaIyW9fx0NVp038p/grv3RUOZViOzVsq2sl76su+yYs4gqkSmuUis1f2lF9rYDa0+QUbYPTcJD1R3h62NfGvSwaM6r579Ic5kZkjco/Du2EdQw0lquxidW+KVT0bBz8PZuNviuRJ3eq7Ouezl+YUCFKAABSjw7xdQihGxfRFmbziN+MxiuN43AuOGPIha3uVtEdhUw8APX5QRbNUh1S8q3JTiTGz+bqZMVZXR98GD8OqIx9BYym+Yl733WroFY+Sbw1A3yM84Mmzl0p04F5uqW5hLt/83H2NnTARybFww5J2X8HC7ujJd1PBxzxZN2nTR1ajTjeqQNs752Gxpl3lj8Jxv8cGMrzHj/SGoVcND4nORmxWsnTzw9OQvsWjLVimhMRGPtGmBNl0GYvCDLeDjWIgtS2bhWFwUrJo8iVdG9EGwv2m8TfDs5GGoV8ffGO+qZTtxNiYFUpIcBXGnsVutWazTqIsmtarBWWqRG7Z6HXqgsYcP1BaXftPXEjZ8l5MQKqMKc6GBM/xktJyNTMMt35xw/+Cx6NawFlxtBdzEXCnOwpbvJe6YSFg11sfd1F8+fxqdm2DEG0NRv56/tPL02+off8OZ6GRd3OWvwXsUoAAFbp+A6RXt9r3KDY5cmnseK77eLzUX7PH4iw/By1pWUDQ+3w+PvfUYnEwKnC9fshmX84v1Q6+Nz+MdClDgbhYoyT2LBdO3SrFgmUph6YqXhnaFtxTnLf+3ro/eunobPFXLHg6mRURMTiwvdAvmHtTItBHgocfbwEoKCKdL3bg04y0dpT510VhqsRhTgGf3IyqjQKbQK8g8uxFzDuYjR/a3bTUaXRp5w/aqFrN7/XtQzd8Xri6uUojYE/ZSrNl0mLJXjdqyCpoaoNq0tEDLIR/iyXa1YG/tgNb9nsfizduwat4baFfdCUXhW3XxZkt5mZ4D2sC6qOJ4G5nGe26fJOo0uin/6us6yc1CbmZ2kpCTaf9yV7epiUnF2gnu0vw1XMg1UiBPfmzckiOjUFKsFpRJxbYtexCekCKLSZg8x64BnhjgA7cSue6qmcyyLS90G+YfykeWxP3ggNay4EQFcXsHoZGlNdQcn247d0CXYJS1KrhRgAIUoAAF/jMCpfmhWLFgBxLjM6RZ4Iyh/e5DkK+r8b3ZAGHl1wyP1XKDj83VrR/9M/Kj9mLp4XQk5ACdHm4GFxtptxjbN2pbJx3FbjVQV+qwORoOGnYM8SkZ0EjJkJywXfj+UKpufxtJ9LUPrg03O0MLQb+Da+0GCKheDe6y0IKLq4csuiDTUE3mc7r7VZeFL9TUWLrcFDTu+xr6d2ouZTUcEfzgEMxctQ6rFn2AB5v4wyx2L5YdTkW8lIbr9FAzuNmigniro45pvOHHkJCcoa/nKw0aB7lZqm0ceU1LdfV5w3mpbRxZXMxFVqg1pO4KCmXRMGnLGba0uHiprafW+8vA73sO4nxEAvLKFs3QPcc2CI884o9qavkU/dqEuh9ron/HDxJ3nMTdsWewGJldE3eRazWJ26HcOfy4Lm6NSVvJEAe/UoACFLgdAtf5OHw7XqqiY5YidvdKbC0tgaVbXzzRvpqMppO3BZNPmjU79UdHtxXYmFSs6y3CYamdcHEwnmnpIwXejZfzig7On1GAAneFgBbxu9diryTVJO8D+D2J++t4wOaqBJk+VCfUblkNln8mAyUmrSrdg1pEHNouq3updVOAFd8uhHLIQxaBKKuZovupNOck+X+gsAhaKytd4660NBKXM2XRBW0xDv+8QlZB049Pa9UmWGqryKqwuv3K/2NdvRtmvleCTYcvIt/aFw/1bwFXqRln2ErMTBe6CMKwPq3haDoy0PBEaBF5eIfEqy8a/dOib6Ec8ZQRcRXEW1BoEm8UkjJlRJ00Ru1rtMMTQfXwi2MqNI27I9DdVlKDWllRTl15VhaTiDuHZEnEGXJjpy5cQmHX+lJMWZ+mdJXGuIWV/jJ/bOk7eFGKXE8Z+RiCAwPg4eooIwkt0KDnS2idVij1EwwNZIn7yA55Db3TysWLoBz1kmLTV8ctBaelhk3pNc7SiOa12fhXwDsUoAAFKPBvFtAi8dBWHMhMRZZ6mt690Tqohoziurp1oT7oiOqS4LLbd1aGk+nbMupP9ZsWcSf2QpOtJsiAjStXQpGOO3d7C5PBCfJ+nh+J35Kk001qU1vJ56XS0jikZOfIbKNinNu2QRaKuqzbP7iZ1J5zcjSOCNP9UP5j5Xcfprxaiu2HTiNV6yoJtvtQy6t8zFqp9Nqpq8rrt5ro170l/LycDLubfNUi9s/focnSx7tp1SooFw7Ao4J4dyWaxhuPlJxs3cquzv73oFdQQ+TnWyC9bmfU8nOHjblW2k2FyJMVbzMSLsjgjHyZFaDfLkReRk6etCSd9W0yZz9fWNlJdlC2M7/MxCSxGz/icbRvVAtebs66GQi17x+KVpIYdHExtOPE+c99Eneabr9f16yGcvEQPB2udo7Cb5cuQ2N0jkdqtj5urmqoo+N/KECB2yxwRxN12qJErFmyCsWyhHfDoW1gm5GIhFzDIOOyMzd3Q4dOHti8Jlc+t6tvHMlYtvJ3DAjuKz03dzT82/yr4eEp8G8RyMfh9ZtQqClrlHraw9pcXaW1os0CvrVrwdzypDxoaJoZnpePi6dPy+hbNVFmDe/sc4iM8YWlJJuu3MzQpl0H5OXl6ZL+qSk+8HWUFUnNCnE5PkUatfru0GbBfrqVXq/cV/3OArXaP4KX5HbzzV43Is8wyu3K50u8ZyReKSSqizfnPKKuE2/rthKvrLimdlKkyiprftJzba4e1DZQptyuxbD8QljaWqNUk4eUuAjEhJ6UxTJW44eQY0iX0XeGJrUsJHvF5lEjGL6uDkhJk+unJP6iNszGiA0r0HPoSDzZvysaBVaDZ7WemPOW6e9Dg9AzZ1AsyU593BcQHZ2p6+m+4uDyTas27cvjTvUWZ/lQUDHG1bvyewpQgAIUoMC/QKAAJ0N2IltGsFxu0wAAQABJREFUvuk2GVZmpVuJvqJTM4dXDRmxpksuXZ2oK0DkxQuyYESe7GgFj9wIXIrLQ3oFi8U1atoataXTUm3PZKR7wt/FUwYvFCE1KQ1FhfrOxAb1vOHoaJxbYBKMOaq36IJn5XbzzVY6VS2u0/dWgKhQ6dDMzdXHmxeBxLh8ZFQUb3Ark3g9JF4pOaJ26FlXw+C5C9FPOivVmQqlRQWSnItGXMQZ7N+2Dj9tP4S4pCxjZyTUUzP0TMpdV7/68PVwlRgTJfGnIH7nUry6cyM69h2MgU/0RPP6gfCWBcfeH2dpcg7iHHpBEoGGuCORFKdBZlkHp6lJgyYtUUuShnpnidu1LG7TJ/E+BShAgdskcAczXQqyzm3Gwj9LZKSc1Ej4bjzG7ZIVguQD/BWbgz0iziVCazLUOGL5Chwb9yC6VHcuX/nnip34DQUocNcIyKpcWQVqDbmyiGSAmZpzV7+tMFmnNsQMz73qJGQh0rLHAvD6ol/Qp6FMXb3qknHVLuXfahOQfEmmTZRdS2T5iPLHbtM9NV79ywTgtQVr0a+xL2Tg2l/czKVOZylSYi7i5JHfsHLeHBxNtYK9kzOad2iI4ztPIyO/qEIyC/978daTrfHO0n0Ijc+SxqZa3yUVW5d+qrt1HjoRI554BM3q1ZSVbctXi5VF54xxT5i/Gv2DZQTAX477L54mn04BClCAAhT4pwloC6XGm1ZGwZcFLvk39f51Wxg3auPIvoruOL4Y/clCPNU5GK6GgWA3c9FeRtrlEknU6Z+ojoq7bgw3O9YtPl5ijNcHIz9agKe7yvTXW43X+Boy9VWq26ZfisWZ4/vwy6IF2B+dB3N7Z9QNriWdneG4nJpTYf1bC5/meP6xtshKT8Mf4ako0pX2yMDeX+bobu1ktduhg/qjTZM6smKrTK0tG+0vC+NC0bUFfTBi6nwM6dYc7n85buMJ8A4FKECB2yJwqx9xq/7FS3OxY9n3Uj+pBO4BNdGqtZqkUz8cygdJ05v0eNRu2RI1/aTWg3GkxiH8uOkCNCWGd8WqD49HpAAFqkhAk4Q/zpRKA6rsePLvvMIE3S28XHk7Kgqhsekyyvbm1wDjVHpNCqJSSlFSlqg7fkZ6YKVRd7PNuP/NnljB42q8+nONQlic1JYxtuQreLLhR1ckEBUU5qTixG8/4dXeA/D8hJk4me+OHsMmY8HqrVg0awZ6uLmV14kzHMP41Rr3PjcTn0wcimYNa8PTWabOSkPV4L976RcY2ms45v58AEk5Mv22rFVvGne4GvctOJdl9oyvzDsUoAAFKECBf71AYQpOXSySKZllZ/p/fLJSR0/o35/jEHUpFflSb+2mm6HNUJiO+LRiqUOr3+NsaApy1IK+N9mqpo0Tj+hLKcgv+AvxlsVVlJuOcwc24J2nh+K5Fz7G3gQztO3/ImYu3YDF0jHZT2ZZOF/3HKzQ/KkpmPL6GNzXsiG8XaSWr2X5DIFDvyzE80+MxPQlWxCZIotdlbVxyp3jEZMozpq/Hvd1Q+IDFKAABapI4I6NqCu8tA/frU+UUcyueHX+z3jqHh9jT0dF5xYf8il6jZmHVI1+IYntC1YjZlAwGrpJEdSKduDPKECBu0NAWp1XLDZqKQ0is8r18+p7mvWnFScjbQs6BsHRuJpZRadbgqzL6VID010WqHCCrxRV1sUiLx9xLkyKDreVkWRWxsTVNUco1eBSbCbcArxhZ22o4XbNs67zA6npppWTLztVXbyd6uriNSTKrt2xBJnJEq+LxCuL6JRqMrFv5VSMn7YJaTnm8KveCx8ueBNdGnvBRj0RGUlnfIFrDyYPyQhCxQat+k3Cyvsew4ZF07Fk+xkkXEpAZl6prg4eEIVv3ngZdh4/YEy3xnCW1SGucD6fhILO9WRRHynGXNFr6H6mj9uiLG6WqLsuFB+gAAUoQIF/k4C8MaoDzo3vj5bSAVjJNo6uvVDWZkgMT5YSHjJa3tF0kb2r4Uplym0GzOydYG/pAE8bWYle/VAkfZgx4VHIys2Xu/bX/5wkowGTEzJh7+EGBztrk+mhV79Oxd/rcoSGeCNSZDppIRSnm8WbKfE66hbqQmEW/tg0C29+uVo6Mwvh5d8Vr38+Eb3vqwMn9UQKZHEO0wbJ1WFIAFrFGk26j8WClt2xY8U8LP31MMKi45EpScpiXWYuHis+fwe2snjG8/07wl8tt2fSNkuMSEau1L1TnG8cd05aJlAW9xVt2qtj4vcUoAAFqkjgDuW4inBy7XKESeFTx0ZjZOlsD90ojxudU7WOfdHTQ60zVfas5B+x/g9J9Bm6R260Mx+jAAXunIClHXxlfqrx325iDC5JA+qv/9OVy5U0yAzN4c3TV+PspUwUG4aBVXCGpZp4LJryPnZJz3KhpQ8aNpbVw8qG5aVu/RUnErJQdINACi7vx8v9puBIXKZ+MZsKXuP6P5KLlUm8W75cg9MJGTeNd/GUD7AzNBmFMkc3bu8CTPxyC9KyC2Dt0hWfLX0XXZt465N06gvfZDqqUpCK8LBU3Uqvdt4NMHDyQqxavhAvP9ECdau563qe9fGnYuaXm5GQoTbqJW5tufPWmRK3rGR3M+cl736InReTUHgDz+tb8REKUIACFKDAP1DAwhbeUtPC2GeYLGU2svNRdIO2ScVnqXbuqe+9+o9muxdtxokLCbKa6/VnDpQWJGLV9C+x9Y8wZCvuCKpvLau46o+esWc3TkcmIvcGS7EXpvyB90d/jJA/oqC5/stUHK6uraA2qPTx7lm8Bccl3vwbjMBX410940tsORqK7KISJB75CVPnbJAkXSasnO/FpBlv4LFO0jFowFQPbfjcV0EUiowijIlKQW5+MWw8gtD7xWlY8v0iTB7RGU2DPGFrbRiPkoHvFu/E+ahUqX4szkp53Hu/24rj5+JvEncS1syciS2HLyCr6C9DVRA5f0QBClDg5gL6q+vNn1elzyjNO49lX++XovD2ePzFh+AlF9IbXIf1r21dH4OebQs7q/JPpnN+DEG6DFcu68y5JkZ1OLfhds2D/AEFKPD3CFj7Ibi5rE5WliBDyjqs2x+J3MLrTDs1vRhc0UizQa1mTWBpPNA6fLtmj0z1kOkMFTSIldICRISswLL9h5AtK76qjUlLJ+lKNdbBPIof1+2XFVY10iN79VVEVlIryMSu7+cj3NwTTrJwzV8fJWaDwGaNYWltOPH1WLx2N+LU6RfXiTcy5CeJ9yCyS6UXXcnBwRWrUCCLYqhb0ICHEeyrLsSh+7bsP9epQaNe++QZ+VHr8dTAWTiTkG1MjDr5NcGzU9fim48noGkdf1mMo+yA584iIadIEpL6uK2MBaFl+snPuxGbIjVirhf3zlUS9wFklUjcpr8/01B5nwIUoAAFKPBvE7DyQr3GdnBwLHvzS9+BHUfO43JWxbVjr/jAc8X7uQ2qN6wPO0f7MqEdWLV1Fy5ImY+KymYoUmgtdv9GrPp9DxJlMSqYSRvHwRFmsviDfjuF9Tv2I0JGzKmLSV25SRunMBsH1/6A87lmsLZX67dd+Yybf2eDarp4yzKDCMHqrZIMi027brxx+zdhtcR7KS9X2ih5OLFxEzKT9KvU1ujZGU1qe0EWXzXZZMScfHd19GqpDfVnmvgQvPLcXOz+Mx5FZU9y8K6HgRMXYfYnU9CxRd3yZF14GJLSc6UTVOJuUA92Toa4d2LtthCci7lB3Ack7r17kKDGzTaOye+HdylAgdsp8Jcvy/9/MCWI3PYTtpSWwML9UQzsUF0+KN7aVa9xv2dQ30GGZhuC2L4MOyOyKngDkou6VDhNuxSDiIgIhMdeRm6Rutw4NwpQ4O8XkEZRvfomCTZg9eK1OBMvhX+v6ilWlGIUFRlXjJBVT/X/avU1VCxQs3VruNnIogdlJ7Fr9jh8tWYXIi6lQyO1XLTSGFVkJFqhJhuJF/dg1ls/QGv5iCS43GBlYY82vfvAzd7e2E7eP+8DLJOVUy9Jsk5NQukS+7K/JjsNZ/cuxeQfT8Pj4ftQQ4oQX9F2NCJKAWk1xAovLhJvy1ayOrWtMd7fvn4Fs9aEIDwhTVd75sp492LWFInXQuL1c4e1WQ6SLsrxy0rMmOVK7RnpqdbnFNVYS5GflYg0rZy3MR61p1iLvPRkZEoPs9bCURrvP2N/9OWranpaoE7X4Zj/7lOo4eag9zDLkxEA6mITFqhxVdy754zHrNU7EFZB3EkX92L2Oz+gxKynOHuUj/YzxsQ7FKAABShAgX+rgA18awXBRtoWhm2z1JA9FhqHfHVxA8MP5auilMggBbVzsKyj0lrey83lGbo3dnMENG0KD2dZKK9sn4Pfv4+5K9bhVJR8jpHic7p2irRRigpykRxxCIs+WY6MzNZo4FsNDtb2aNb1Qfh4ehn3P/bj11ixeQ8ikrN1yTNDG6cgNxOhh9fgo5+OoqRlMwRKG8mmwo9iahvH9AxMTkZaNv5NguHh4iKLQei3Q8umYt7yX3AyUuKVUkXXxPvZCqSlt0RDv+pwtMpHSqQsfqE2+WQzkzZLsYz+M+QU1TaOJicZGSWFMgrOsKlBKsjPTEVWnqx6ay7tObPtOB4fhcwr6syZo+a9A/DZpCFoXsvgkY9iOaZWqSDuHz6SuH/GnxFJ18YdeRjffb4CqWnNxblG+Wg/Q0j8SgEKUOA2CRg+796mw191WLnYF2ZexOJpq2QVnxIEj+6D2g4yUuWqp13vW0uv5hh4j7184DY8IwILFv2KFBkFcvWIGE38QXz60iA80KUTOj89GevPplSY0DMciV8pQIHbJWCBloNHobosCKMuZKDbzi7B1Nk/43RUktSJk8acJO6LC/OQmvAntkkPcEFBWXYqMxmpmdmyolc6cqRIsde9j+LxGr6wN4wCk4OtnvocJn64ECEHTyE0LEqmep7F/q3LMX7AOPyaqaD7671Ry0WfaAto3wsPVfMy2T8V88a/gHmSPDsbFqOr3RYZfhohy6dh8LhZyNQ6YPijzeBkZxgVJ01ESS5K07oMK1OuP/rGaNkPrvji3V6N10/q45Vf5dZ89AJe/0iN9+QV8U54fBw2pWvxwMRHJF57WMh0Ghd/c5iXtYDP/bQKe8/FIC0vH/k5mUiMOo8NM1/Hsax0lGnJFNd8pKbEYtOMKVhxPA55ZVNeVq/9DfHSUL96RJxv8w4ItrGFOtnG2iUIXvZWuinK3vf2xoCa/nA09swDaz9+Ca9/uAA7DhjiPof921ZgwsBXsCm1GF1flbgl6We8PF8hwW8oQAEKUIAC/0YBczR59EnUql0N1pZlbZywtfh64SocPBODbI0kmqSNUyIZqfSks/ht9wFkZOToIWSxqIzMLPk+AzmaIrg2fwC9g2rBW2rUGrYtX7+Dtz6YhY27juLCxUhp45zHwZDVeGv4RKyWsh4tRndDg5oeuvdxn5Zd8ECtGnCXmrr6LR0/fjgFc75fh2PnIhGfkICoyLPYs3YOxrw2E6HJRXi8exP4eRpGl0nlC7WNY2jiIAfpUneuqMT4A0NYuq8eLR5AL1285W2krXPfk3i/wvpdR3C+LN5DO9fg7RGvY9WFJDTXxespswNs4ORjAUupi6tu4Zs24/dj55GYlYs8aeNcjg3DtgVTcUi+5uqfIguAySCM1HiELJyGn34/jeR8fcJz87ZDCI1OvmbhK8/GLdHYWervyf7WzjXg6aCfleDRvCt61QmCj0153NvmvY+31bh3msa9Fu88+zpWSk3kZiMfQANJ+qntJW4UoAAF/g6B8neC2/pqinwIL5QPl+k4uHQGViao06uAei42yM7TSM1VG1jLxbL8o+zVwSjyBlckPUil8G5YD2b7DuvXPpenRayZjCVSz2BYp8bwcLIzHid863dYfyJe3hzlhSK24YuVj6N3ox6wMnnzu/pV+D0FKHB7BCy878eHQ1phwpxdiEyV+nTSZXp29VSMuBSJNyVh38DXAfkpoVj55XvYdCoT0hGr36KWY9EyfzQsyZGpn6PxYBM/DPp4JLaNn4XT4Yny71s/luyPDbOg3gBPuUnxYbXSmpktfJo/i5EPNYSjTF3VbdZ1MXxyf+x/ewnORcuqsbr9U7Hk3bFY4tkYrYKscfrPsyiUJWrN7Nxxz+iP0LOhD2yl8V1aIsnEIg0Sw+JQalwtNgp7Dp/B/TUc4SfJQGsrmcZ/Ra+0H5786FlsmzALJ0MvmcQ7W+KdLSFdHe9oibexJAbVeB3hX88NlqeSITvK9/sxadKHSH2+L3xyQrFu1hKESw+6uZk6LVdG1cml7tzOxfg4LAmnwoAJj8G4QE/U2qmYW8cDYx7rhBrSc24nicPS4jzEH96DwwUFKDKzQ7vhDyLQ1b6sZ9wPA6eOwLZX9XEX614fOLbxa93t6ri97xmFZyVuZ/u/6S1F98vkfyhAAQpQgAJ3XsDCozVefbwtMi9fwvHoXF397LDNX+OVy3F4aXg/aVt4oSQzChsXfoH1B6OlbE9ZzHEbsHqVD0IdrRH04OPo2kLqrL02GL9lpSHjj3Bpi+jL+5wO+R6vyQ1wl5ua5JM2irRxPBsNxuAeLeHnZqs/oFUgBjz3KA6nX8a+k/FlK9unY+1Xk7F2WT0EBzrIIhNSHy4nH2a2rmg4aDK6t2gAd6kjrFXbOJIIS45KQJGmQH88xOHIybPoHFwDdr7OsJEEoPkVjRxv9JowGLtlhFv60TBjvGd2LsXrcgPc5Kam2QzxDtLF6++uj9c70A22sqCXfqnaY/j882nISOmDelbJCFm0AmdkMY2CQhtYmRdKnVxJ5h1YjZmXvkNcfDEGNe5jHMEfv/VrLKnhCusne6NBDemMlZJKWhm5mHjiEI5mSRJUrO7p3wl1qnuWjRz0xiPjn8SezBSkHQ4tj3vXMrwuN33catmRIp2zR8MnMah7K1TzKHOWR7hRgAIUuN0CFu/JdrtfRCol4cLvu7Fh6XS8veg36ZlRP0Sb4czO8zBztZY3hmJ4+PvCVkbJXPEZ1xCYNgfnjhyTHqQ1mDX7VySrH5Jlf/UY6u3ollVItpDeGa0dfOQCbSOjdtJO/4qVeyPl862ie45FYGcMebCRrIp0ndcwvNY/6Ov69euh0WjQr39/WBvrSf2DToCh/ocEZMXSlp3gkXEAFxM0MmVBX7tFE3ca29etxvIflmP1L3uRYuYOZ2uZ0imj59T+WzvpCc2MC0dkgjc6SZIpyNMeTv7N0K5aiRRZjkVehjSI1a5f4/VAEv+y2pqVvRv8Arrgs/kT0dxfpmWYXFicA9ugmUuyJLOSkJmVr5u6qruWaFKQmJAko/u0cHH3hd9DL2Hea70Q4Gwr1yUtUi+exB+HQzDnrfkIkx7f0rLXDP/9JLRuLjC3cIa/t7OM+L2yy8HetynaSrx/XpQRbuk5143XV4133mtoHuBaFq8VfKvZ4reD55Ai56k7zcxoHNixRerfXESxuwdGvv8B2miP42R0jiziIAyZicjIc0L352dgrKzgapNzHt+v+V0KLRfi/P5t2B9VADtJAiqFmQj7YzOmvzEfsUVW8PLrhDcnD0FdH0fjoh9q3O2qleKkxJ0rvf/Xc/b174xP5r6GltVlcQoT5//QHzdPlQLXFYiKjERISAi6deuGwMBAGSlrGOly3V34AAUo8I8TMIN3k7bwLDyPmIR0WaVdSk/Im3ZB4kXs3bIOP/24HKvW7kKsxlZWdDfTJYbUzjVbR1fkXI5HVLwzmne5Fw1rusPFpxFaBFggMiZBRo/Jgllqh6KxjVMgd7WwtHOFj297vPnpOHQMrg47w2wFcXOs1gyN3PMQFZOIFKnJphtJr+5fkI7kpCQpL1IMJ1dP+HYZgY/H9UfT6m4yUEKLdBmlf+LILiz6+Fv8GZUoHXj6z1gxRy+gUGoDm9u4wMdDn6wzfau382qAFtWsEBUr8aZIOSKJV6kgXm813o/HoVMzSfrp4rWUtoctjp6OQFxShi5Os5x4HN8bgh0HzyDL1gEDX30NHd0vIyI2BdmF8nlOpsJm51qj3eApGPVwB3hpY7D2131ITM5CxPHfcSAsHYqlxCqdu9GndmHe1IU4m5gHV3ntF18chJb1fI11fu08G6B5NUtEx0ncsn/FcbtAjfuNj8ahS/OaVzj/4/5EGTAFKPC3CxTLQLOtW7fCVsogtWrVCu7u7nINN72C3jgkM6lXoH4evs1bIub2HIa1MvxbP0j56pcLwhdr56Kl9FSYvNeUP0lzES/2fQlnZf8bB9sbizaPk+m01tJDMh+DXl+KzJxCwMoafd5bgond68qw9Cs/RJe/yD/v3ojhw5EuUwJ/+PFHODpKLSpuFLjrBTQ4vnER3v36F6RmqA0jfaFgK/k3am3dHq/NfBl1Ymfj5S/3I6/EAvf0GILBjz+EtvUDrkmAZYXtwZzXPseOy6myqpkk9uTioDYOraxt4H/vUEyR2iTB3jJC7DrXw4Q/fsZ7732D86kZul5ndX8zS0sZlWuD3qPfxegB98PNzrqs80CDTa8/jfnH5LXKi6Vcqe05GIsWDEEtDxnlduUjuu+ywvdi3sTPsT0xBTlq3Rp5wfJ4h+Dt14egqY/DNfHGHvgB4z9eisTUbF0tOnMLS1gF98X7rz6D9rXdEbPlC7w2ezNSsgtlmqwV+r70GUb3bqWbrpsv02+eevVbpGdKz7DUtSmWHvMSGR2n1saTzKJYWaF+jxF4deyTaFjBa6uBZ4X/jvmvS9yXpIF8ddztnsZbE4egmZ/jNXFXQMAfUeA/J7BTknSTJk3CJ59+ik6dOrFT7T/3F8AT/m8JFODszpX4dP5qXX3sEhmYoI77t5T3Zmvrlhj1znNoXrIeH8/dgei0EjTq2A9PDOiF+4JrSQKvfBqmapYTfQTfvz8Tv16IRJqMrFMTf2qbwVLaS74t+uGVV4bh3jpekMFwFW6XT2/D9M8X4ki4dGrKSqVqm8NMOgqspI3TbdDLePbJnqju4VjWXinArk8nYMFvZ5FkGEx39VHdeuPTT4eidQPvCktc5MQcxbIPZmLTuQikXhNvX7z88jC0r+t9TbyXjq/HezOW4GxEom5mgJm0TSwb9MD4559Bj2bVkbLvW7w/92dcjM+S+C3x4LBJGDXgARlFaAdN9FaMf28RzklNPDOpz1siAz/UGQC6ckjq4hpiVfv+x/H8qKfQWhaqsKmgn0SN+4epX2Hj2fBr4vZp3gfjxg3DffVlZsV1nK9m4vcUoAAFDAJ5ublyrX4FLlLLc8zYsQgKCpI1DW/9YvI3JeoM4f69X1MiT+JcRAZs/euiVUP/8vpYf28Yt+3VmKi7bbQ88G0WKNWkITIsDInpBdDKdFFP35qoHegPO2lEFiSfx/GLObL6WTAC3KW23A2vZ0W4HBUuPaKp0Ki9zpKk86tRD0H+MmX0xjvqz7A0B7GRUYi5pO/NtZWRdLXr1IGnTOGssNPg/3aReKMjEC29w4Z4fSXeOjeLtyALcYlpkG4H2MloQV9PFxmZUw6TlRyLjHwzOHn7S3JRnZpSFmhRDi5nm8PTzR6lmnQkpSQhWXqO86QWjoWdGwJqBaK6p7Nxiuz1T08fd4zEnV/m7FujrjjLKDqTOK6/Px+hwH9TgIm6/+bvnWf93xbQyqj1mMgIXJJV3ovlQ5m7dzXUrBkAJxtrFKWF40xYBtzkvb+6jzOsb7igXjFS46MRE6MuiicdkpJ48gqojaAASdAZ69DdwFqbh0uxMYiJl/aDdLTZuHiiZu0geMsCWbdn3EJZvOoifrLAlyHe2hKv3Y3iLcxB4mVZZEvaFza2MorNU6axlhckR06azBaQBbXs3H3g5mBTHruU8EiVmcDOTjLzoTgHyWobJyUTOXmFMLN2gl/Nmqju7Qobk3q7FWupcccgNjYJOca4a0EfN0t6VGzGn1KAAjcTYKLuZkL/4seZqPsX/3J5ahSgAAUo8I8XYKLuH/8r5AlQgAIUoAAFKECBvyzw/ybqyodk/OWX5g4UoAAFKEABClCAAhSgAAUoQAEKUIACFKBAVQkwUVdVkjwOBShAAQpQgAIUoAAFKEABClCAAhSgAAX+DwEm6v4PPO5KAQpQgAIUoAAFKEABClCAAhSgAAUoQIGqEmCirqokeRwKUIACFKAABShAAQpQgAIUoAAFKEABCvwfAkzU/R943JUCFKAABShAAQpQgAIUoAAFKEABClCAAlUlwERdVUnyOBSgAAUoQAEKUIACFKAABShAAQpQgAIUEAFFUSrlwERdpdi4EwUoQAEKUIACFKAABShAAQpQgAIUoAAFqlaAibqq9eTRKEABClCAAhSgAAUoQAEKUIACFKAABShQKQEm6irFxp0oQAEKUIACFKAABShAAQpQgAIUoAAFKFC1AkzUVa0nj0YBClCAAhSgAAUoQAEKUIACFKAABShAgUoJMFFXKTbuRAEKUIACFKAABShAAQpQgAIUoAAFKECBqhVgoq5qPXk0ClCAAhSgAAUoQAEKUIACFKAABShAAQpUSoCJukqxcScKUIACFKAABShAAQpQgAIUoAAFKEABClStABN1VevJo1GAAhSgAAUoQAEKUIACFKAABShAAQpQoFICTNRVio07UYACFKAABShAAQpQgAIUoAAFKEABClCgagWYqKtaTx6NAhSgAAUoQAEKUIACFKAABShAAQpQgAKVEmCirlJs3IkCFKAABShAAQpQgAIUoAAFKEABClCAAlUrwERd1XryaBSgAAUoQAEKUIACFKAABShAAQpQgAIUqJQAE3WVYuNOFKAABShAAQpQgAIUoAAFKEABClCAAhSoWgEm6qrWk0ejAAUoQAEKUIACFKAABShAAQpQgAIUoEClBJioqxQbd6IABShAAQpQgAIUoAAFKEABClCAAhSgQNUKMFFXtZ48GgUoQAEKUIACFKAABShAAQpQgAIUoAAFKiXARF2l2LgTBShAAQpQgAIUoAAFKEABClCAAhSgAAWqVoCJuqr15NEoQAEKUIACFKAABShAAQpQgAIUoAAFKFApActK7cWd7hoBMzMzXSyKotw1MTEQClCAAhSgAAX0Arr3aXmPVt+n+V7NvwoKUIACFKAABSjw7xf4f7MzTNT9g/9GLC0tYWFhgaysLBQXF/+Dz4ShU4ACFKAABf59Avn5+bC2toamoED3Xm1lZfXvO0meEQUoQAEKUIACFKDAFQJqG1DtrFVzNpXZKrdXZV6J+1S5gKeXF3JycrDku+90CbsqfwEekAIUoAAFKECBSgukp6cjMDAQB/bvx9kzZ3QNtkofjDtSgAIUoAAFKEABCvwjBEpLS1EgHbWubm6VytUwUfeP+DVXHOTlpCScOHECsbGxMDdnucGKlfhTClCAAhSgwJ0RUHtTPT09ER0drUvSGcpV3Jlo+KoUoAAFKEABClCAAn+HgFarRWpqKjzc3aEm7f7qxkTdXxW7i55vJdNpmjVtiplffQUHB4e7KDKGQgEKUIACFKDAPhlJ9+mnn2Ly5Mlo166dbhosVShAAQpQgAIUoAAF/t0CeXl5+OCDD2BjZ1epE2WirlJsd8dORYWFKCwqgpOzMxwdHe+OoBgFBShAAQpQgAI6ARvpUMuXhpqNrS2cXVyYqOPfBQUoQAEKUIACFPgPCKhrCZSUlKBY8jWV2ThfsjJq3IcCFKAABShAAQpQgAIUoAAFKEABClCAAlUswERdFYPycBSgAAUoQAEKUIACFKAABShAAQpQgAIUqIwAE3WVUeM+FKAABShAAQpQgAIUoAAFKEABClCAAhSoYgEm6qoYlIejAAUoQAEKUIACFKAABShAAQpQgAIUoEBlBJioq4wa96EABShAAQpQgAIUoAAFKEABClCAAhSgQBULMFFXxaA8HAUoQAEKUIACFKAABShAAQpQgAIUoAAFKiPARF1l1LgPBShAAQpQgAIUoAAFKEABClCAAhSgAAWqWICJuioG5eEoQAEKUIACFKAABShAAQpQgAIUoAAFKFAZASbqKqPGfShAAQpQgAIUoAAFKEABClCAAhSgAAUoUMUCTNRVMSgPRwEKUIACFKAABShAAQpQgAIUoAAFKECByggwUVcZNe5DAQpQgAIUoAAFKEABClCAAhSgAAUoQIEqFmCiropBeTgKUIACFKAABShAAQpQgAIUoAAFKEABClRGgIm6yqhxHwpQgAIUoAAFKEABClCAAhSgAAUoQAEKVLEAE3VVDMrDUYACFKAABShAAQpQgAIUoAAFKEABClCgMgJM1FVGjftQgAIUoAAFKEABClCAAhSgAAUoQAEKUKCKBZioq2JQHo4CFKAABShAAQpQgAIUoAAFKEABClCAApURYKKuMmrchwIUoAAFKEABClCAAhSgAAUoQAEKUIACVSzARF0Vg/JwFKAABShAAQpQgAIUoAAFKEABClCAAhSojAATdZVR4z4UoAAFKEABClCAAhSgAAUoQAEKUIACFKhiASbqqhiUh6MABShAAQpQgAIUoAAFKEABClCAAhSgQGUEmKirjBr3oQAFKEABClCAAhSgAAUoQAEKUIACFKBAFQswUVfFoDwcBShAAQpQgAIUoAAFKEABClCAAhSgAAUqI8BEXWXUuA8FKEABClCAAhSgAAUoQAEKUIACFKAABapYgIm6Kgbl4ShAAQpQgAIUoAAFKEABClCAAhSgAAUoUBkBJuoqo8Z9KEABClCAAhSgAAUoQAEKUIACFKAABShQxQJM1FUxKA9HAQpQgAIUoAAFKEABClCAAhSgAAUoQIHKCFhWZifuQwEKUIACtyagaEtRVFiAohIz2NnbwdLC7NZ25LMoQAEKUIACFPiXCSgoLSlGYWERShUL2NnZSLuA4yb+Zb9kng4FKECB/1vgb0vUKaXqm1IJlFv6jCpPkv+bm5nBzNwC5vIGZqHelxs3ClCAAne9gKJviBfk5yEtJRbHf9uKPaGOGPn6MDTwdJTr2V1/BgyQAhSgAAUoQIGqElC0KC4qhCYvC5ciTmPPb/sRpa2PEUN7oo6/G5iqqypoHocCFKDAv0Pgb0vUaZLP4pctp6FFCUrkQ6xytZ8uN2f49GoJK0cb2FvZwdndDd6+fnB3cYWzoz0cHGx1Sburd+f3FKAABe4OgVLkpKUgKvQYtq74EYt+PYDcgiIJrQG6j3ocdT2YqLs7fk+MggIUoAAFKPA3CJQWIj0lHucO78XqhXOx/XQCsovldWsPxYOPdkZtfxmc8DeEwZegAAUoQIF/jsDflqhLPXcMoZERCNu2DafSk5GpKS1P1lnYwMnJHtaWFjKQTh05p0Bbqk4X0yA3vxCKJPaAuhjw0iiMGNQT9QLcYWtlrg6640YBClDg7hIojMVXTzyDDanpyMnPQr6MJNZvDrBUm+K8cN1dvy9GQwEKUIACFLiNAkWX9uLFV6bjzMVY5GXnwNgsgBVk3hCbBbfRnoemAAUo8E8V+Ns6cGo88Cze//BjLD+6C9OGNYK1JNqMm/8DeG/Od1i9YQO279iFkG1bsObHeXhjTD/4+3rB0UZN34VhzezX8XD757HqQBTyi7XG3XmHAhSgwF0jYBOAQV9Mw7J1a/H+063gbPe39YfcNQQMhAIUoAAFKEABvYCFW0O88f5XWLN8Fno3DoQDO+z4p0EBClCAAjcRMMmW3eSZVfawCzo/PgiWliYfXn1bo3u75qgfGAgfHw94+gagXrOOeOa1adgXshqvP1wNbnZqsk7d9uHNQQOw5kwKirTXTKCtsih5IApQgAKVE7BGUMvWqF+7Hh7u2xt2DvaVOwz3ogAFKEABClDgHy9g4VgNTZvUR72mHdGjuQvcHf/xp8QToAAFKECB2yxwBxJ1gNbSCtamJ5ZXBLVUQ0VpN2u3unh2zia80sEXtsYK7Jfx5se/4HKBLE5hehzepwAFKHAXCZjZ2cpUV3ad30W/EoZCAQpQgAIUuEMCUgpDV87nDr08X5YCFKAABf4xAnckUWdfvQk6mJlLvaZb3bww7JNPUNPGprzY6v6NuJhRDA6qu1VDPo8CFKAABShAAQpQgAIUuDMCWiglFpKsYwfenfHnq1KAAhT45wjceq7sDp+TpUc11JWRKWHGOE7gZEwWOvrZcRVYownvUODuF1C0Wl2C3dzCtICyLCAjWXfdwjGSxDeXf+u3PhDNsK+6ToPcFwJzOYaZuWG6fFWaqAvdSENb/Z8M5zUzN8RaiUa3HEArFro1sM2knPQtnrOiiJ/aQyH7qyOK/0oMVW5fFku5x62fxxW/Fd3fhP7vQv25mXklj3PFQfkNBShAAQpQ4E4J6N/jtWpjQW0vqG0bc0fUaFEHdr+dB3Lzbi0w9X1Wfb/X3QzHkTbOLTc7rmq36OJQ21g3PoCxvaC2pXTPVVAq7R/duajtN7XNUtEZ/B/xXtO+ucVY9WGYnKdEpmsH6mLUQg3bXNprNzxl8dVK7JV3rgiDP6MABShQeYF/TKIOcvE0rJ2oP10LWMiHVVkglhsFKHDXC0gDr6QYhZp8ZKUlIV1jj1pBAbCTRWVKijTIy81EakoWNMUlMLdxgrenB1xcHGEl090rbAjqzleuCYWFyM/LQ3Z2JrIKtLBUiiAz6eHu7gU3Vyc4ONjBUhqZ//+mRXFBAfLyspAqq7kWFKkJNmn42djDzc0dLk6OsLORNV1v2ArUtW91/ykpzkdOVhbS0tOhkWOZWzvC29tTd87W14lX0ZagQJOHnOx0ZKTnoVhNbKoxWNvD2c0VLg4OcLCzgcU1+5fZF2j09vm2CKwdAHtrS5QW5SM3V84pJRMFYm8mcXh5lcVxE/tijazKnZOBtIws2Vdt3Eos9o5wc3aFs6ODeFjpEqdGe7XBffWvQq7rRfI3kSO/v5TUVFkkSFYDl+PYOLjB011c5W/A1sryxo1r4wvwDgUoQAEKUODOC5QWlbUXki4js6BY/75m7wpPeX+1kPdZc4tb+Pilvj/K+3ZedhZS0lKRV6ifRWRjJzXu5P3RVdo4tvI+fv12hyJtpAJpI2Xr2hr5Ui5I7eMzt7aFi6sbXJydYS/v01e2GdRkXIm8bgGy01ORnq1FQGAAnOwskJ+dgaTLadJmUWDv4Q0fTzdpR1iUt9HUeAslXmnb/NV4FW0pCgvykCttgYyMXFkVV9oC8mtUY3WUNoWLtCkc7G1heUUHb/nvWVtSiLwcaUempUN3nuZWcHR0gpOTA6y02bicag7/at5wdLii8JL+AIa4xTlV2iG5Zc7WJs52N3Quj4P3KEABClSlwC28U1Tly13vWFd/erv6eVpoEsJwQS6mxrVeLWqiXoC82V3zye/qffk9BShw5wQUSXBppKGYi8To0whZuxyzV+5ErqYOFv2+Au09zXFx7xrMnDYDByJzUFSqjzSo8xi8894LuD/IAzbG2pQmZ6EtRm5mMk79vgXLv12KkItJMpNEknqSzMrTFMiIM088OvoljBjWG40CPK9sTJoc5pbuymvlZSXj2JY1+OabuTiWqEgjWxKMhbnIL5QEVe3OeGXcWAzq2gL+bg43uCaZoUSuYYW5GTi/exk+mTwHJzJydPU51TiCeozGu2+8gPvqel5zzlpJqCXHncGvK77F9KUhKIIVbCSBpf48N78IWs8m6P/k03hmWC808XWFPtlXbp8UfQY7f1mhs8/Oq4Vvdv6Ajv7WCP19Lb6a/iX2h2ehsMy+dqdRePvdF9CprpdJXVATKZ39JRxY9yPmTvseoaUWsLK1goBIwjQXRTXvx3OjhqFP+7pw0iXr5KGSEti4+8HX2db4oUApLUJ2SjT2rFqMmfM24JKuYV6MfE2hbsSgV3AvjHv1eTzStj68ZL/rfxgxiY13KUABClCAAndMQJJVeTkIPbwZc2bOwK7zaYCljXQiapGfnw+/9n3RzvIC0rM0N4xQKZU2TlocDqz/AV/P/wXhWXnQmpVCU1CoG9Xm3qAbRr0wBn07N9O1O65MtsmhpS2Un5OK079txOKF83EgIhulsIDaSVhQWILSam0xfNRIDH2oPWr5uOg6RUuK1I7PXCTHnsfeHRsx/4dfkZDsgU9XzUJ3nxwsffst/HA4HGnSGQr3+/H+rKl44v66cLaSuQxl8R7c8CPmSLyhkmzTmpvEW/8BjNTFew8C3B2M7QAVQSnWIPXSRYT8vAxfLd2ClBxpL0hiTCmRZKe0B0pd6qHnY09g2DOPoWVtXzhI+8t0UzscI0+GYOFnn2L7WVlo0Nwa5ook/nLzUb9dJ/hrT+Pw+e6YtvgVdGkbcEXZJV3c6XE4uGE55krcF9Nzroq7K0Y8Pwb9ujTXxV01Hb+m0fM+BShAgesL3B2JOsnTlahdJxVsai9LQd4lrJg2HQlFRboeFvVpjnUHINjH7toRGhUcgz+iAAXukICSg5O/rsDiebOxIzQD+cZ/6N4ozIzFum/ewCfrIqUBaSmrozqiRKaCqNM6I3Z/g2Fv2GPn/LGo5+V01b/zUuRdOoZpz4zEDxfTYe7kjnv7DUe7BrXgmH0OC1ZsQkJ8MjYueAcbFuzCtJ+m4pE2gXCyNen5vVUOSUplxR/DnPGjsOSPHFg6uaDnsHHo1tgZZ3bOxuqQKCRH7sbMl3dj1+BPMWdSfwR6SrKuwr4HSxTmJ2L7jA/x7sqTKFbMYSe9vaV5+fpz3r4AQ7NcEDJvJOr7mJ5zKS4fWo5eL0xDUlo27F080G/0G+jToSYiJeE3d8VuxCWfwdrZk7D2Qga2fz4CDb2lEwM5OL15JRbP/xrbL0hvvKl9VhzWL30Hn/0chkKtJWzFvlgatepU3Mg9CzHiDTtsm/scGvm5XHUuYh9/BJ+Ofh4rpUEMRw8MnTQdQx9phsLI3/De5Bk4GPE75k3eg3lGY3XaDFBv7CIsf7mrJOukR1uSdOlhu/Du4IkIySqCtVMbPD26EzxKwvDTLzuREJeE1NObMOWZTTg8YQ6mPPsQAlxtObLOaMo7FKAABShwdwkokhxKws4F72Lqkl24lGcJl5b98PzgB1ALCVi1cAWOHFyH1TJ63TjooKITkKRXZtQ+fDF2CjZGJsv7bHP0G94JAbaXsHHzbwgPj0PmhRB89lIIjo36CJPH9Ec9P+fy92pJ0uUknsb3703Aol2R0Ng4o1Pf59G9ZTXEHfkev+w4jej4w/huymEcPDoRn0wcgha1bHFh/2b8MHcWNh+LRrrMUNB/LKuHzPAzmPHuQmy9EIF0w2e19N+x6cApdGxSDc4eVsiM3o/pz0mbK1w6TSXevsM7oppdEjZt2YXwMIn34k58Pm4njo2cKvE+jvr+hnhLkXpiA4ZLO+LExXhpE7mi55CX0feBYKT/uQGLf9qO8zGh2PrdVGwNTcH3H4xB5wY+sDS0sZRixPy2GC9+8C3CUwrRoc9YPNH7PngUJmHX3G/x65/7cEo6M0sbyMhBR5n6auotzlnRBzD9hXewPjRR4r4HfZ7phOr2Sfh1y28IC4uVuKUN+fIuHB/xPt4Y+wQaBLhIuSXTg/A+BShAgdsnYPGebLfv8Nc5csllbJq7EuGGN6uA9hjxSCNYmatTtEpl9EUxitWenfxcZKVGYe1HL+PDDRflMXWqlwUcXT0wee5naF/d+T9dn279+vXQyPSzfv37w9q6guHc1+HnjynwtwloU/DT+I+QFtwSZkky5TVfRkvpXjwav+5cgQPnimFf816MGDUaT/ZsgvMXwpCVnaebJoL4Q3Bu3Qcta3rA2qRlVJwXiTmDn8aSC2kotnXFxPk/461nHkX7lsFo1rYLnuxWF+F7DyNaRquVKtHYvuYYfNt31DUMTY9zcwMFBQkHMenR0Vh1QRKCzh3xyfKleL7f/WjUqDHue3ggfBM2YN9Fmfop8/Ivnw6BpkF33FvHB7aW+h7f4rQzWLJ6j5SiKZSXi8eWwzuw+1gybBs+iNFjRqBf53oIDY0oP+eEA/Du0AdNa5Sfs1ISjZlPvIajl9Nl9J01hny5CpOl4V+nZiCaduiNVi7R2Hk4DHlqEJH74NiuL1rUcIeNWRpWTfwEKQ2awjw5WaYby0hDXSM7Blt2/YT9ZwthU70dho8chScfaipxhCNTeu11dQITDsOpZW80D/SCjbFFrObXYjFvyDNYeiYZeaV2GPbFCrzS/174yBQcD1kk6OH23ti664BMl9GUNfKt4eqhnxpct/UjeKhlDZlqY46C6J0Y8+RE7EotQJOnpmDRwtfxaJe2aNOhOwb3borLew4hXJKSxTIPNvTgZlje0x3NAr2Nrjf/3fEZFLg7BKIiIxESEoJu3bohMDAQFhZSSJ4bBSjwrxMoLcrCzlnj8cH3uxGbY4m2T0/BN++ORY9WjVGnQQs81r8LbE78ibPxScjTvxkDbi0woHcb1PBSO9fUTZJ98b/j9dFTsCE0CbX7jsfsuZMx6JGOaNu+K554pAXyT55G2KVUFMgxIo/vklH9rdC4Tg04yTRU3f6XT+DTEROwZF8oCuzbYtKsuXj5mV5oEdwE93bvi+o5RyQploBMjYLUiweQF9AczYPssO+Lubjs6AtFZkFk5ORKeQ01I5WAfTt3IEJKdPi6OMNS2jYlpTL83sIGtds+jG4tguCQfhiTn5uCdecTEdjnZXw1R+Lt1UkX7+MPt4Dm9FmEJqTo4o06/hu0tVuicVBNONtYyKi5eHz30lTsPhWGfJkp0PftrzFp5ADcU7c2GrfpgZZeGTh+MgzJWQVA3B9waHw/goPUcy0bVZd1SjoIv8Lhc3HoMX4W3nlhENo0qInqtRug48BeCLJKwJnzkng0b4y+j7RFoNoJqjKrzgn78aYkF9edS0DgY+Mwc86b0v4oj7vg7FmESaevRpyjTuxGaWBzNKoTCBeJmxsFKECBWxEolkFmW7duhY0siNqqdWtd2YKb1Qc1PW7Zlc70R3fg/p8/Y8bMOVi05HusWL4aa9f8hO++mYEpLzyLNu0fwjurTqOoRAsPCc3euS7e+GYjnmruI4k9dmvcgd8WX5ICty5gUQ0Ttu/EvBlzMf+dAXB1sjXu61Dojv6vzsbO9d9iwqiB6D3wJWz67m1psDobez1DDsVKPRST6pTaIhxb/BGWRGVLosga9z43GwPb1Ia91LozbPaBXfHlgsmoYexhPoUpby5AaLKauDM86+ZflZJsrPlkHHZlpqNQasq8PHcqHmzkazIt1R5tuvSCja298WDHZNRgkdRZu95mn1KCpyZ+hZAfPse4p/uh71PjsWXJFASZjFzbuDdapn+Wn7Mm8jA2qvVXdAcNRtuGATLttbyh2Kzn42hk52gynaOsr94iAC9v3oZ5M+dh3ruPw93FzhiWfZE7+r4yEzvWfYvXxgzCowNfxIbFb6O2r4vRftcRsZfaOuWbgrgd32JZTDZy1FO0egwPtw2Eg4xUNGx29R7Cm7284W5v+H00x6c/bcHBI0exeHwXeDpZS8M8B2u/nIJTGWmwbjoGH497DLVd7Y0rett4t8MbM8bC17v872D+rF8RlZ4rIy+5UYACFKAABe42gVLE7lyAab/8idj0ItjfOxKvjngIQb5OxvdU2NbA0C/Go07jmtcdlaWU5GLzws9xLC4SZg2ewuSx/dE0wE2GKOg3a8/mePH9Z1Gnrp/xPXPZdztxNiZVV0ZD3X/L3HexPToM2Vb2eGbqq3i0QwO4GBJbsEPTdl3h7O5pBDwTnYXsQh8M/24Fpn2zGPM+GS4dgerjrnKzgqWdE556ew5++n0vFn0xEQ80qY8m7fvjqYdawse5FFsXTcMfMRFAg0GYNEaSbNXcje0RNd7n3xuBevX8jfH+sGQnzsSk6OItjDuFHflS004XTX00kySci0kduYYdH0YTTx+Ut7LUkX7lDbncxFBEF+RCI7HWlA5Oe3spw2HcnNF52Et4oF4QXOzk86KhWSKPKyV5Evd0/CFOSv0nJTE6AM2rm8Z9D55751nUbxBg3G3597/hTFSysVyJ8WV4hwIUoMBtErg7pr5aJCBk/QrslhV5dKM55GS1MuW1pFgKIchULDN4y2U5GWkWCvq+9ja61XWWFXykcLz0TDNVd5v+MnhYClSxgK+MQjO3UhtRam0Wawz/4ke81KMJHHW9wPoXc6rfCcOq2WBaqiyIJlkZdcED08kKJSmHMH3REWSrK0ZYyGiwPs3heEXDTH8cu3qPYFL3GXhtZbau1xgRS7D80EDU7tXklntDcy9sxpe/a6QBK03Vds+jW7CMlJNaLKabe/1geHi4IVeKK6ujfc0t5ZKqzvOscLPGMx8txbhezaR2m6HZDdjV644XWsh02NRMZMprOajnbHIIdeU1Nb2p1mhTrKx1i2OYvoRi6wIvuXaqR1TTakXFEkt5O1YXiW/DRrCUfSF91qr9sE++x7iH7tH1aOueIP9xqtcRQ6rbYVpyBrIlT2ivW8TBJBCpjHdy/3Yp+KweQ7bGPnDW/X703+r/a42WvYbCZs3nQF6m/Ogw/oxLl3p3kuAse5omfBtm7c+TAtvAkOGd4SJk+bm5pgeBZc1gNLeywSX5qTwNOLMP0ekj0VBq6VxVnuaK/fgNBShAAQpQ4O8W0BaE48evtyIxNl3erO0wfGBH1PF1NybYDPFYBdyD/jVcEHXBDJcKr3qjlicVxEgy7GA64rOB/gPvha+UfCi46v3RPKA+giV5dlGeL08DLh5FXEoGCkoleSclKL49kIY4ecDyniG4r2kduBk7ztQnS/pNRpt5eHnBMVFKjUgLy0Jtl5k0KtwDasLaVu3Yi5GbJer3eQMDu0hSzskZPr1GYqHcDJsmYjMWH0xDbBbQb0I7qZdXQbz+ktiTeC/ITvI0Xbzx0s7QlPjDUj7rqW0DC3l9raW6sIVpi08SarK4mJu5pbRapEkhtyJ1ZpUJW3JkNAqlfAiQjr17jqBLk1pwqeUFK8uyz4d2ddH7ES+phSvfq7X1yraC2L1YcjAVMRJQ31ckbg+7a53966KJvTPOyz5qawahfyBeFtPILwnQtVvKDsUvFKAABW6bwN2RqPN/Al8tGIoa8oZko6beSguQcTkefx49iLU/rENsrqxYJBdTD+ngWfvu01gzpxs+/upN9GtXr3z4820j4oEpQIGqECg1U0eJGVpY7dA+uOYVI8P0r2EDV18zWaxBvpNEXVauRupXGvZREL57HS7KtAzdeDPfhvBzkoadaS7JGKg1OgweAedNnyJLk6N71eWLdmFU5zqSJJMacsbnXe9OMQ6uWSY15fQJpFbtguFpIwWKr3q6Tc2HMP/DEvy8/xzyrf3x6KBW0ig27dE13aEt7m1eU1ZpK0/SmT56vfsONduhv28AVinW0DR9ADXc7eSc/8feeYBHUXVh+EvvvVMSeu+CgAUEOxYUFEFR+LGAhaI0QUHsKChFsaKggIgISpEmIL1KLxJKAqT3vj27/5lt2YQECIYo+M3zLLs7M/fec98NM2fOPUXSBOj15iqwRanxyJZiDVY/Ohw4lght14ZSOrUkHF5hb7JzEjlalCeHhb05Mk8A5xVpZEHExl6RTpJT54iSbHNrU0uHjoetE3D1lKu4g9Jfel4mnN2zTgqMWIx98776GsU7Q4WJGCHtJ7rDqeg4/iiQyrYijELLaIxFSk4RDIo8jlZMext+IAESIAESIIF/goC4EuxZi615mRaDTtjD6CihnYFeZTUGRTZfxLSWive7jgOSU630ZkLigc3QSGV3ZVuyYCGMR7aYPdRt93fFw81JdRprkyR81n5/jJPQUCkIJc4Nf63+Bfnpqeb2rdo2RlSAj927zbxT/nGv2QXvjtVj5baDyDAG4/aeXVA/3MFnTYpWmETHsGwxeKzHjagZ4W9r7vAu8h7cCnWeFMyQbekPi1B8bDtCxTB4obwpKLTLK7l9pbqrViKl/CXstkeNOshOVyO78a0SCREkUQvWSvWS2keVfg5ZUrnW5tt//FQq8gtl+c7P1zymX5TkqxOdQyX45dEAAEAASURBVNkO/fQBRgi7V4c8jpsa1xLPPC8pkuGMht0GomVqNnz9bI+8JiRJ7jqV/F7K9suPi2A8vgOhPmXlPoN1CckoKCW3cBa5ZcXU3Jb/kAAJkMDVJGC7al3NMS7dd2QU2oprcohXyQNuTL3GaNP5dgwcNgbH13yNp8d/hoS0XIvHXdp6jO+7HqpFOzHopmiHULRLD8UzSIAE/g0EVJLnpESVq0iiM3tikaPtbg6ZdDapcWDzH9CL0mbeIoLgJUqY3f5UphP/Rreiq/d0LHYqgEbROZOSkCNhqcqol1axNEiXPDJKzkxla9uihti9yjOwuaB+l4cwWl6X3mTO5jybFz/ToNNbc8lZz/Oqj+Gr1+BZlUaqq4pvnUEn1eBSkXhyv1RJ+wFfr9yFXHtOOGnjsGpc/kgq6BX2CpOK4MmhuL0nka29HRGyfGLjVep0uVzbbHaO4xTrlDx3Ff22Khw/dAg6rfKA4gr/5F04hEizd7RjH8rnZi3aokilFBcxIiMjQu4Pvhd4J5Rtw+8kQAIkQAIkUL0E1FIVfo1UMbcYfhDqJXmjxcO+XCFcEBYjzy1eisdaWUOdGqf+OoYiswedK/zS9uOvo0mie5Qsutm6jKnfDBG1ZDFN8sVlZ4WJkUnCNp11yEqRqqcaixLQrHG42LNsvuy2lsq7C6Il/9sL8rr05iW5YWUupW7+tlZqnD4h8hYUyA5F3gOIPZqMs+XJW68ZImtqRe8zmOUN8Q6xpC9yj8bAufPxmFR3dZF2TnJcnZOOlDNHsHnlT5izfKs8++WXLOQpFjsH9SK4RiMEKbnznFPNC3nn5XnxhTVL0P2xgXiq/wNo3aAWgmp0x5QxjrqicLbLLXnP0w4i9lhKuXJH122KCEVuWQzNzgoVziJ3hQuRNi58JwESIIGqIfDvMNSJP7Ny7S3/udEdze55Eb8GOeH+p6eZvSpsDjbvDPsK3TdPREP/kgfJqsHCXkiABP4VBESXVUIdzTpicTpidxWLoc4qmRJB66CwXSCveyRuaOWC5bK4bNZbM8TwVCBGsAg5s1yl06EHUyHSk2RV12qJclZy4F2qjUPzv/Px8LbjyH2pK0KlOmqJou8iRR2kjmtWAo7s3IB506Zia7JRFFtPNOlQF8e2n0KBWl+izP4dAWxtFfal5uwmhSF8JBm+slOu1kf3Iz6rCA2lwqyHgxbv6uYjHnU2yb3g7yXXZwfF1qA405l/t2hMmL8YD7eIEoOrbVC+kwAJkAAJkMA1RMCkg0pSTtjXHkU3sa2FlTsL2wNPOQcN0tbitV4Dw2fORr+uLRB4uU9qJkkRlGaA5C43b86K15fDvbec4f72LrO85vt5DQyd/hWe6NYKgSU+F5fZvwvcRdai3BT8tW8LFn32CTbGSrEwFy80aBEJleQpzs5WwnQv3FwiO2B4z3ZSeDAdhySO1aB4u0kY7MZFH5tfN/d5Ec8OeAw3NJLcdxLtoITYKpsEblk518TQaV/iie6tEVRpuc1d8R8SIAESuGoEbE9TV22Aquo4ouMLmPlkO/PKjr3PtDnYfDqnTHiW/Sg/kAAJXOsElKQkNu1MV4hksdLbvbg8xFhUypB06ckqNqbLaqJKx6l0yZNpHWzf4WRodfaRKx5IWW34u5uy0F5GSL2E757csQTDuvfAgCFvY1uGG7r2H4e5v23Hwq8/R49gqfL6d8ct215hX2o+SjjxMwgLC7Curm/BD6v3mauxGa2rJ0aDBke37IROQlaUSfgG9cXNDaRaq0NuvxJdOE4qqmWbCwWVHZrfSYAESIAESOCaIKBJx4G/tJI71yptmft3Zeag2OQszc8jTiq7qpRq7pe7qbNwNkMvBbgsDY6cSENBoW1l83I7qdx5yv3cJm+8ePOZq89XrgsYpBhE/L5VeL13HwwY+BpWxRaiTc+X8Oni9Vg4dw76NpBiEBX26Yb2A9/Bm68+i/bN68Df210Wd0t+gO0/zcLA+/pj6rz1SMhR26MVHDnHp0gV+8pwrlAWHiABEiCBqiVwzRjqlGk3vfMWSdZe2vWiQC6uNg+7qkXD3kiABP5VBCRPiBJRYV8gTspCod5ot+NdUlYXUc2kcSnbU0WNxCssQvKm2TzKTp+Mh1or15qKzlf2S0XaHCkIoeQvueh5F+tDOaZ4nDl0oISS7lsyCX2ffwMbslTwDLkbH8z7HTPGD0D7aF+4FStauUMDpY+rtPk164PXH4tBTIglFGbLx+Pxw4Z9SMqUqnF5OYjfuwwTP9uArHwj/IJCMPLzgWgq1VsdHQIcr9cppzMuwwBqlBw4+ZJ/529yvUpM2C0JkAAJkMB/m0CphylZRFScykvMRZVg43ArTz+XLXloL+Upb4SmoFCiBiRPrasXQiXkVlQX83YuPhEFReqLawcmPfKz86G5lH5TwRTM93OrzIq86srIK+2MejWOrJ6BwS9PwJKTyVLp4la8Ov1nzHxrKLo1DZdqr+J+WGEqDRFKBDAZPdH2vhGYP28O3h0iVWLrRcJP8Z6z/yjn8d1bY/D9mr1IV1kMn6aSpL1IPyeFLVS6i3MSTdPMWTiVSt1bARfuJgESIIGqIGC/jFVFZ5Xtw+F+dFlN3aRq0BXe+i6rf55EAiTwLybgUQM3tXaVAhRWGTNW43BqoeRbuzyZXWvfgFoSTup6OdqzhM02b+UKc5Fa6T5jxUocljwp+otoaPqsPRh890jsPJsjBTAuT6ZLn2VCyrav8OIHK5CZp4ardzdMX/w+7m4tmeNsVsTSaxeX7vJvneGObsN/wvj7oxAknn/uXkX45tWBGDrhPXzw5lD0Hvw2zumcEBzWBa9/vgz9O9eHj4M3nXL9NurFbGdVkld8sAQnUnKhd7TelZHPqEvBnNffxJpjyVIlrsrAlhmFX0mABEiABEjgCgi4uouBzNluIENaKrKkEJYUg6/kZr0/Gi1KyvrPfsPhkynQXkTvMOrT8dOHU7BydyzyTKFo2NQdPpY6C8jesBFHz6ah8CL3TUPOIbz25ASs2nUaqsvUpUomZZHXZvTa8IXoZCeSobmEvIunTMXKXSeQJ1EK6X8uxGvTRQ8QY5mrVydMmPUGHrm9iVSUtz6eKm8X0dlM+gKkp+WZF1K9Qhui16jP8NPiBXhtQCc0qulnrv5qkTcbX361Dn/FZUhUhizY6l3EwGfpeOOXq3HoknJn4OePPsaKnZKaRGcL8yghwU8kQAIkcDUI/DOGOlkdqfxlzoiinExZ8XBs6WnOa3DhRVwp3y2vq0GMfZIACfxDBNzgIznSnOxhDRn4Y1ccVLLCWe4m1xmDaMq260Dz+9siwssx71u5raw7JfGwhxRusLvv7cL8FX8iI19brgevUa/C9u9nItYQBB9P1woSL19svAqOmQqwbf5880quckb9fj3RuoYPbDqspZVthhX0caW7y1WOZVU5NwlJKQY4ewbizn7PYegzA9HQ24DM4lDc/dhgvDtrHtbv/gZPdKkLbyW3X6nNA3VaN4Wb3dq6BN8s34mUbJWsUpczD6Meidt+xpwt4qWnU8JpuZEACZAACZDAv4iAWwSaNPcSA5n1ppm1Cuv3xYq+YI1BvZiope6z7qjVrCE8fW0VWFfjx3VbcSY5v/wUP0YDUvb8hh82r0NCgRRcEH3FrLc42+67B/Drhj04l1qA4nLur0ZJMPfn0rk4lmOEmxS3qHwhU0XeBvDy87HOcA0Wrd+C00l5FcqbuncVFoq85wvy5GmuCH/++gtyUyxVaqMfuAOtGobB19EFXzS4cjQDO1H1udV4bsAn2LQvyW4Y9Y1ogicnSKGtqW+gY4s6Yqyz8jh5EsnZ4n1oFLmbNHSQey1+ErlPJV5c7h83r8U5qVbr+BRqF4QfSIAESOAqELBdza9C1xV3acpOQ5KjIa3Ujaq8dkZoi87jx2lfyIO3koXVsnn6PYiuDULk5uLQgTzYFeRkIT09HelZedAUX+wSb+uJ7yRAAlebgJPd6FWJkUpdobzRrf8zCPb3tdvm1y1YhbOieJX339yoTcXRw1J8QtGV3f3wUPcW8Pa0ueNdSgZvdOr5EPx9vO1jbZ4uYZ5bjyJDcr7YjEomqUiqUxfi7O75eHnuYfj3uAUx/p4VVCeV65TDpapCCRzPMeYi6ZhicLSc7S42yVJJqsUYqdPkIqfs4odcX3WFeZKEudhsWLwi9o5yWIUt1qXhxwlPYNrmVDR5YgreHj0UL44Zjw8/+ghfTJ+GyeNfwsO3tUGoGOLKaS69uCCm7Q3wk+q1tuPrPx6CGUs3IyGjADpxjzQvspiNrGrkJu7GJ2PmSDjN3WgZFSYLM7ZWFdLjARIgARIgARKoRgLuCDdXcpXFPeu2bOE6HIpLkWeQsmYdpfK8EmZp3e8pzyh2PccFNVu0QoC/v33X1q/H4dNFKxGbnAONUrVeeXZS7o96DfKT9+Obt+YhPeUGNI2sDV93H7S9/S6EhoXZ2++ZMxU//r4DCdlqu/FMaa/XFCHxwC+YtGAPVG1bo05UEDzKvb2KpOUY+SzTFHmbt0SgX4m822a/hlmLVuBEkoTt6pUwUQd5U0Tet+chNbktmkREw9etEGmnDPJ8Z+nNTfQbo3j12YcTOXXafOQV680FB21slXedqkAWaaU4mIvoaE6rcCD1LPI0jqxdUPfWxzFjwgC0rRdu5VEgERjSxuSCGs2lSEeA5Nu1drr9m9cx68fl+EuRWwkjLiX3Acx5dz5SElqjSWQM/DxsrRwl4mcSIAESqHoC/8jVplA8Mk6V3KYAb6PcQOQCa786WyZqvhnpNCjITsLa6WMwfY8Wtnzuzl7+eOjNp9HY381+oVVaaZL34L3BPdGxfTu06zUKvx3PMJfsrnp07JEESKBSBCQksmRpVJS/C//Lm7srdRmwFlawmdv9m9+PAU1kxdXmqXVmDmb/uv9CTzfJF5eyayVWadVQww0Bd4zDvdLOsxKGnlq3PIi7woLhZV8IyMD0wU/ji1+34pwkec7JyZaQizhs+2kKej7zITJVTnj64XaSG0US6Vk3J5vg5u+uqMD3z3Lps53rJYqtTWGWqmcBUU6Sm9PS4ZHvFmGnKP8FUsZWp1EhN+M8Vk8bhj15maL6WzZRQ5FfkIE1H43H3L3nzHn8UIq95HpT2FvPL3mz/Cb278oDhE0O686MHd/j0y0FohDLIXUS4hLO4XxCCpKS0pCWJosj6ZnIyMhEVla28MkVOYrMDxeOv2nErT3RKyIcviUJZPDjG89gxJtfYfOB00iWhNTpyeewf/NiDLt/MJakFaLLmAdQP9inVK47u5z8QAIkQAIkQAL/GAEXtH7oCdSIqVXiOBC7ENO/+hn7JHRVqVpqFIWnWFbcCnNFZ9i8AzmSF868iSdcYVERigrlXinnhXS4Cw/Uqo0wh3zcyz8ajdFvzMTaHceRmCT32ZTzOLRtGcY+PhQLjieg9fN3oUlMKBTNI7LDHehWswaCbF5kUgF1zmuj8On8lfjrXKpUT81GRtpZ7F7+GZ4a+gGOSaXUPne3RI0wa7ys9GFSQlftCkIBciXvnL681VA5N1TkvS86GuEO8q74eCxGT5yJ1duPI8EsbwIOb1+GVx8fhvlHz6P1kLvQtG6YVIv3hF+4MyRy2LzFLv0Nu47GIVMtz3oaNfKzkrDp64nYeT4WhZZTRIcyCq8sbPrqA8zbdAhp1njdFWv/RFxipt0YaT0dEa1vRtuAECiJk1y9aiHY2wuK+hja4U7cVzsGEQ5yr5z+KsZMnIFV2485yL0c4/sPx7zDZ9Fi8J1oJka/Ki/cZROW7yRAAiRQhkApB+Myx6r4q9yk5EKvJA49H3tabgQOKx+5CTh9NhHOIf5wd5OwMbP5UFZSVHk4f3w35k8dj1+PacXgpkSiOcHDJwAN+ryDcb2aWkJfHSQ9ufJL/Lz3vOWmcuo3vLvwEdz1xh2yAlKtiZwcJOJHEvivE5D/++LWdv7IIXm3ecTmIjGrEOpafnBxc4GLGG2MspSql6XV7FwHg5EUKChSaaAP8JDwBbk2IBQDPpiAxU9NwIkzyWYD/7L3Xkbdml/jqW7NEezjDpOsmBYl7cbU4d8iP0cllUc74MPRDyDC36us3eniP4xHYzz3+sPYMu57CT2RMA1z3pUMfDn2KXwZ1godG3rg4L5D0Gp1cHL3ReOnP8R9zSLgJcZAY7GsfIt3b64YrYz2FfVdki8mA51qBsBfrkeu1jkbZM45Mme7HpyfA5UkgDZIEjhXVx+E1/WF6xG5KCoXQGzGsGGT8PrIx1Aj/y8s+uArHBGrnr5YQnWdxAAnyvWRtV/hHXk42HOoCMPvHCE8tEg4cli88mymvDwkKey1QaIgl7A3aFXIyRM5bJdmCfEoEjn0BlFszeyBnMREGA0Wc+OW2ZOwZXZZhGEIC3dFQEAEwmVVv2ajpuja4z7c3KohQv08JCRYsfzVxBOTB2LV8E9xIj7dskgje/f88rH5BYTJt2x5ydK6kzsCGv0Pg+9riQCfy/WGlKbcSIAESIAESKCaCLiEdcSrj7TFuLRkHEksMt9HTyz7CM+nnsfIIX3RSUI6DdlnsOTTt7F4axzEwc2ynf8ZixZH4qSvM6K790K3tvXx0Lh++D0/E9mHzsn915I47uDqr/CCvIBgeSlmK+V+7ga/+o/hybvbo2aI1ZvPvR76DX0AOyVyaffxVKlcr9zQs7HwgxFSIb4J2tT3RfxJyQ+XJ324e6N+n9dxd/umCPF0lueyYnlOE71FqqDqRa+xbOex99gp3N6mLnzCvOEmRb1KB0dE4KEx/bAhVxboDsbb5T209mu8JK8L5e2D/iJvLbO8JoTU9hUx5PlMq8xzD956+31kZfRBM7c0rJo1F3uz8qEyuEphCIOZaezWRfgocTbOnBYD4+v3iDyW1cTzKz7CnDrB8H78ftSPCpQcvsp89Mg6vhd7CnKRJ6yaP3IbGkTLgq25SQR6jumLDXkZyNwf5yD3bAxdqyg2ZTjXexRP3N0BtUKV1WNuJEACJFA9BFwmyVYdQxWrM3D61Dkc3fQdHh8711zpTzG6mV/ZR7F03hx8/dVSrP99AzZvWofVP3+PiW9PxcJlv+NUjiRp9fSGt2RI9fXzw/0jZ2HWsDsR5O56wYN3xqEVWLRFbhbmm5M8MNe4CU/1aA4fWTUp4xxSHdO+qmMsW7ZMQsLU6NW7t1TDLPHiuaqDsnMSqBQBE7QFKTixdzVmjP0KJ/IlF5n5/30O/jiuRb0aEsYqFbsC/VyQHH8CO5fPxbviIVcgeefM14acg8iUIhIhPj4ICrUoX66BDdDzpihs2HFIDFqSe6W4CDt/+xGpTiHwdtXgpKw0v/7CJGyXlVYvCW0Y9fk36NmyRqW86WxT9K/XGW38E7H3eJJ4h2nEEGZdZlZJ+H5CsnmV3Ms3AIF3DJdV616oHaAYA03IOX8SRw9uwLShH+OvbJHReq3bfboIUeG+YrDyRrDMOeXsCexY/h3eW7YP+WrbnA+Z5xzm7YmA0AjUreuB1VuOiAFTZRk/5wy2rl6BVVsOIsfTC8++8z46m/bj8LlC8TiWa6p4LKdkOKPrCzMx+OZQpB5dj5njvsJfORIibJYjF5tOaBAT5WdmH2CWIxY7V3yH93/dhzxZPTezzxU53G3sg4SfM4pzT2LVpv3ILlBCd6zXb+vcLMxU8psUyqp9KhIS4nD84G6sWjwfZ9zrSq6Y+hLyagmJ9Ylqi841Ndh9JA6F+fJQY+Nq7kQpeyvRQBLGExh0M6Z8Mw431gmRVfDr7Qpunib/uc4JxMfFYf369bjjjjtQp04dWZTgouF1/pNzev9JAs7ivdUZoYUHcPpcFrKLLGGq6qTj2LDsJ3z37RzM/3E1TmQa5Rog626y8KaY0Nw8vJEuus+xWKlc2v0WNJN7XVBUS7SvCRw/dVa800V/EMcGu4ObxAhIgKjcH71lQawDJnw0Et3b1nHw/Ad8a7dFi6BcWcxMREZOkXWRUZqpMyXsNBk6SSHk6eOHgFufxpRRfdA2OlgWQU3IS4rHsf2b8dXEz7HvjOR8s97b43cdg97LW3LnBSM00EcKepW+hnmFNzfLe8Isr5JPrzx5JTpA5H19qiJvXXiZDWxuCK/hju37TyIxTXK/KYuheefx58Y1WPXHXqTIImSfUWPRLSQd8QkZohfK2l1+GjIyi3FDv0l4/sEuiDKdw8+/bUNKeh5O7tmILbFSlMLbB57OWiQe3YCZr83CQalG6yljDx/+JG5sGmXP8esV3gw31HRC7OlzyMwUuSXU4ELOXvAPaI/xH76CO2+oB29bEa//5N84J00CJFBZAnpxklizZg08PDzQvkMHBAcHm5+xLrcfJ3nwLLkuXW6rKzjvzNKxePKDDeLabVkduuwuIiLQsFYjtG3THm1bt0brNs0Q4SsPexU8s2Vsn4GeI+Ygv1BWg1xc8dC7izDhvsbwsLuBX/bI//oTB/3vf2Y39vkLFsDXt8Rt/V8vOAX8DxHQYcN79+Pt5RmQOgzlb/Vfwvy3amH4MFlJlbyS5W+tMePX6egUHQhbEVFtxlHMfn8YFmyRvsUoZ8mjImGispLqIv/32/YYjJee74824rX3d//7J+5ahDHjPhElO1cWfhXPNZN4/opXnJSFfeilyRj6eDcJqXC3LgaosPTFhzFzbzrybQ6EZSdV/0V892YkRr/8EdIzcssetX6vjylLvsCtdUORvPVbDH7jG6SIMqlsTuJ27NL6UXz42hB0kTydccvexksfr5QQYA2c5Cng0ZEzMax3O+yd8QjeWZ4qoSvWLsu+1X8BcydFY+yoDyR0NafsUev3lvj452m4qV4I3CWkeOvEWzB0UTq0nv6W66qi3MpdRGGieErbbiiKV6FBUheolTwycuzNpVvxeHtRdB3Cj3NO/oGZQ9/G6uR0FFi5yuTk0u2KqM7/w1sTnhZFWiq3VXC9r0Bg7iaBfw2BDWKkGzt2LN6fPBldu3blotq/5pehICRwNQiocXjNPEyauRCnE8RjXFzllXuiYqB3cWmPl94bgQ7Fv+DNT1bjdKoWzbv1wRP9euG2NvXhWyaHbl7cDsx+dTKWnRAPPMWwp9xo5eHHxcUNETf0wZixz6BL4wgxSpU/j9QDK/HOW7Ow+3SCVHS16C1OZr3FFXc9OQYvDHgAMaF+1vRBaqybNASfrDuMpIr0hZDemDnjWXRqHlFuGoq8uJ34ZvwHWHb8NLJKyeuKcEXeMc+a5fUqbedD4t7FGPvebBw9nWxmpeg3zk164NVXnsN9bWOQvmkWxk9fjL8Sc826T49n38CL/e5GzWBvqONWYsi4z8zVcUUBMUczFIvBz/JoK/2Ik0a9Lv3w8kuDxKsxHJ5lxlbI5cfvMsv9q3gOXiB3u0cxavQzuE0MfGXlLp8695IACZBACYGiwkKMGDEC/pJ7dMjzz6N+/fry/FjBRbukmf1TtRnq7CNWw4e0U/tw9JSsoNRqgk4taonL9PX5lEdDXTX8MXGIfz2BnKRYHI+VRMIGJwlu8IB/SChqN2iASH8l1LIKxS/Ox9nTZ3A2McccTuIZGoUGjRohXEIyq3ScikRW5+B8UibUoqh7ewejRnigKOwlF/scSaYskb7wi6iFEG8JE67KuSsymQwoPLMNk/oMwzp1C0xc8C7uahgMjboIaskno9VqJF2BHgZ5mNBrCpCadBZH92zC8t93Iyk9F49MWYoJD92AIK+yGRd0SI07hbiz6VBLmI9RVp1qxDRBo1riRfd3LawVseR+EqgmAjTUVRNoDkMC/yICRk0O4k+Lp1i6eLqLcSwkvDbq16stXuXu0GacxOHYbATXaSye7YFwv6iXlh7p5+NwNl5y00qkgdHdAxG166Nh7XB4SVTRJTdjIRLj48UjLdMcyeQRFIa6DRohUrz/r87tVY8MkTc+PlXklUW6y5VXk4fk1CwUioHPwysQkWESQeEwv7zMROQU6OEVEoVgX09znjnz3PWFyJD1XX9JbeKsz0dqegpSU7NRUKSVCrh+qFG3LmIigyUioBwLXSl4itzC6aySA1iRWwqE1Gpg5uztcRmcS/XFLyRAAiRgIfB3DXXX5dUnouENiGjIPxESIIH/AoGgmo1xs7yu+ubijzqN28rrqo9U/gBeQYhuEFT+MdkbFFkHFR+tsNllH9BlH8bkviOwLDUPA756FXc1j5Fce87w9wuooI8ueKD3U3j89qnoPfJrnEuRvHsGm7+dYxN3RNZrbn457uVnEiABEiABErgWCTh7BqF+i46oX47wXmGN0FFJxXpZm4SHRjc2vy7r9LInOfuiVv2W8ip74Gp9d0OYyKu8KrV5BqBGnYp0CUgakFryKqdHN1+E2fa7B6F2XeVVznmX3KXI3cj8uuSpPIEESIAEqolAiTtGNQ3IYUiABEiABK4xAiYN/vhsApblZUGFJripmSRkdr+0y55SPCgvI01yz7jhxpZR8GRRn2vsh6e4JEACJEACJEACJEACJEAC1U2AhrrqJs7xSIAESOBaI6A+g2XLk6UKrJJj9Ai27DmJ1Ix8yTmql8TRtnwwlkmZzHli9FAX5SF+3xKMmbIKGvTEbY0jJVSHt5xr7aenvCRAAiRAAiRAAiRAAiRAAtVL4LoMfa1ehByNBEiABK5zAk4u8JCM1c5KFR/JQff1K/2w666BeKrPfWjXuDaCfCXfjVIJTo4ZDCrkpMVh27IFmDZ/C4pd3fHK5wPRIsq/3ATU1zk5To8ESIAESIAESIAESIAESIAEKkWAhrpK4eLJJEACJPAfJOAVjd6PtMD++RokpuRBK9Vdj6ybi9HyUraw8PoIrBEAZykqEXfmNPQGAzy9fOHjcyPGffIWenWOgTdLt5pZ8R8SIAESIAESIAESIAESIAESuBgBGuouRofHSIAESIAEhIA3bhn+LeZ0XolZ4z7G1nSpziZhr4pBrliMdvl5ieaXi4srPL19EeDuhm6Pj8KLz/RCvWBvXLSoHfmSAAmQAAmQAAmQAAmQAAmQAAnYCdBQZ0fBDyRAAiRAAhUTcEG9G3viow33Ii3uOPbv249DR+ORnleIYslLp2wB4bXRovXN6HRTG9QM8qKBrmKYPEICJEACJEACJEACJEACJEAC5RKgoa5cLNxJAiRAAiRQPgF3RNRrg3uV16Pln8G9JEACJEACJEACJEACJEACJEACV0aAJfiujBtbkQAJkAAJkAAJkAAJkAAJkAAJkAAJkAAJkECVEqChrkpxsjMSIAESIAESIAESIAESIAESIAESIAESIAESuDICNNRdGTe2IgESIAESIAESIAESIAESIAESIAESIAESIIEqJUBDXZXiZGckQAIkQAIkQAIkQAIkQAIkQAIkQAIkQAIkcGUEaKi7Mm5sRQIkQAIkQAIkQAIkQAIkQAIkQAIkQAIkQAJVSoCGuirFyc5IgARIgARIgARIgARIgARIgARIgARIgARI4MoI0FB3ZdzYigRIgARIgARIgARIgARIgARIgARIgARIgASqlAANdVWKk52RAAmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQwJURoKHuyrixFQmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQAAlUKQEa6qoUJzsjARIgARIgARIgARIgARIgARIgARIgARIggSsjQEPdlXFjKxIgARIgARIgARIgARIgARIgARIgARIgARKoUgI01FUpTnZGAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRAAldGgIa6K+PGViRAAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRQpQRoqKtSnOyMBEiABEiABEiABEiABEiABEiABEiABEiABK6MAA11V8aNrUiABEiABEiABEiABEiABEiABEiABEiABEigSgnQUFelONkZCZAACZAACZAACZAACZAACZAACZAACZAACVwZARrqrowbW5EACZAACZAACZAACZAACZAACZAACZAACZBAlRKgoa5KcVZ/Z05OTtU/KEckARIgARIgARK4LALm+7TJBJO8uJEACZAACZAACZAACVz/BP6u1ud6/SO6fmfo7OwM5QGgsLCQDwDX78/MmZEACZAACVyjBLQaDVxdXaGRd+VerdPprtGZUGwSIAESIAESIAESIIHLJVBktdEoNpsr2WiouxJq/5I2kVFRUKlU+Pijj3ClfwD/kqlQDBIgARIgARK47ggUiJLWoGFDrFu3Dtu2bTMvrl13k+SESIAESIAESIAESIAEShEwGo1Qq9VoKHqgsmhb2a3yLSo7As+/agQy0tJw5PBhnDt3jsr/VaPMjkmABEiABEjgyghotVqEhYUhPi7O7PnOdBVXxpGtSIAESIAESIAESOBaIqCkPMnLy4PiXGUwGCotOg11lUb272mglx+8foMGmL9gAXx9ff89glESEiABEiABEiABbFi/HmPHjsX7kyeja9eucHd3JxUSIAESIAESIAESIIHrnIAS+jpixAjISu0VzfTKAmavaCg2IgESIAESIAESIAESIAESIAESIAESIAESIAESqIgADXUVkeF+EiABEiABEiABEiABEiABEiABEiABEiABEqhGAjTUVSNsDkUCJEACJEACJEACJEACJEACJEACJEACJEACFRGgoa4iMtxPAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRAAtVIgIa6aoTNoUiABEiABEiABEiABEiABEiABEiABEiABEigIgI01FVEhvtJgARIgARIgARIgARIgARIgARIgARIgARIoBoJ0FBXjbA5FAmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQAAlURICGuorIcD8JkAAJkAAJkAAJkAAJkAAJkAAJkAAJkAAJVCMBGuqqETaHIgESIAESIAESIAESIAESIAESIAESIAESIIGKCNBQVxEZ7icBEiABEiABEiABEiABEiABEiABEiABEiCBaiRAQ101wuZQJEACJEACJEACJEACJEACJEACJEACJEACJFARARrqKiLD/SRAAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRQjQRoqKtG2ByKBEiABEiABEiABEiABEiABEiABEiABEiABCoiQENdRWS4nwRIgARIgARIgARIgARIgARIgARIgARIgASqkQANddUIm0ORAAmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQQEUEaKiriAz3kwAJkAAJkAAJkAAJkAAJkAAJkAAJkAAJkEA1EqChrhphcygSIAESIAESIAESIAESIAESIAESIAESIAESqIgADXUVkeF+EiABEiABEiABEiABEiABEiABEiABEiABEqhGAjTUVSNsDkUCJEACJEACJEACJEACJEACJEACJEACJEACFRGgoa4iMtxPAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRAAtVIgIa6aoTNoUiABEiABEiABEiABEiABEiABEiABEiABEigIgI01FVEhvtJgARIgARIgARIgARIgARIgARIgARIgARIoBoJ0FBXjbA5FAmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQAAlURICGuorIcD8JkAAJkAAJkAAJkAAJkAAJkAAJkAAJkAAJVCMBGuqqETaHIgESIAESIAESIAESIAESIAESIAESIAESIIGKCNBQVxEZ7icBEiABEiABEiABEiABEiABEiABEiABEiCBaiRAQ101wuZQJEACJEACJEACJEACJEACJEACJEACJEACJFARAdeKDvyT+00mE5SXbXNycoLyKrsZjUY4O9PWWJYLv5PAtU3AhGK9HhqtFka4wtvHEy7l/P+/tudI6UmABEiABEiABEjg2iZgMhZDp9NCpzfBw8sLbq7OuPCJ7dqeI6UnARIggX+CwL/GUGeUC71BLvRajQZarR46eUg3KERcXeHu5gFPDw94KC93VzjLQ7vJoEJaSi6Ca0TBw4W3hH/ij4djkkBVEjCZjNBrNVAV5SIpdj9+/307krxuxOgX7kWYrycVv6qEzb5IgARIgARIgARI4IoIyIKqQQ+tSo2crEQc3rYRW46b8OCgR9GugTyX8bHsiqiyEQmQAAk4EvjnDXVGAzSqIuRkJGD/zq3Y/Mfv2LR2L9LgIjY6F/Gkk4f3gBjcdksXdL/9DnTu0Bw1Ar2hPz4PXR+bj6+3r8UtEd7iceM4LX4mARK4pggUq5GZch5HdmzEgk+n4Y/4QmiLZQaN/fDMoLsQ6gsa6q6pH5TCkgAJkAAJkAAJXH8EilGUnY3zZw5h/dKfMHf5ZqTmFMg066PxXd3Rop7iQHH9zZozIgESIIHqJvCPGuqMehVyEmPx24IvMOnr1dAaiiXMzR/eQaFo1rgdWteNFkNdLo5s2IrDfyzBzpVzoNK2wrNjeiDjtyniedcZziZa6Kr7j4bjkUBVE9CeX4c+Az5AdnYOCnJV0BltI7iLyZ5GOhsNvpMACZAACZAACZDAP0ZAl4y5Q1/GosMnkKkpRKFabxXFC65O4mDxjwnGgUmABEjg+iLwjxnqFCPdyU3fY9DgyTiv0cHk4o3gUD/0Hf4Bnuh5M2KCfcRIZ4NtQHr8n1j82WR8u+YEvv7wPWsOuxNIztHCFOHFJ3kbKr6TwDVIwDWkFT6c8S1CXM/izYGvYEtqLnQlaSqvwRlRZBIgARIgARIgARK4zgi4R+KBcRNxh4cb/lr+MaZ+vxHxGerrbJKcDgmQAAn88wT+mUoMRi1ObZqFBwa/j3OKkQ4eCGoyEPPW7ca4/92FOiGORjoFkivC63bCi1N+xeIvRqNWRIC1uEQaEnMLYXQoPPHPI6UEJEAClSXg4l8XHdo2Qb2W3XB/O8lJ6VbZHng+CZAACZAACZAACZDA1SXghugWrdC4YVPc2eNuBIeFXt3h2DsJkAAJ/EcJ/AOGOiNUJ1di0JDPoNZY3KV9Au/FnB9Go1W4uxSKuPgvUe/mp7H0k2cR4e9mdq+m083FefEoCVxbBPTiLXttSUxpSYAESIAESIAESOC/RsDZ0wNOLv/Ao+R/DTTnSwIk8J8kUO1XV4PmPD57ZQySpKqr+XnczRdPfzoKrYMvbaSz/UI1bn4O47sEwd3VSfJXMWOpjQvfSeDaJ2CUis4Skc/ck9f+T8kZkAAJkAAJkAAJkAAJkAAJkAAJVJpANRvqihH703R8cVwPvTVZvHebYXiyc224Vapsqw/uHfEqAtzdsedQMoqNdMGp9C/PBiTwjxMwwWgsht5ggEFeyv9jk8kfDTo3hqtHJdJnGo0wFlv6KOmnMpMTOYqLUWzto1j6M12GW59RzisulnPtQ5nku/QjRXEuGo7/N+Q1mZQxlTFszC5PVouIDvMUuY1m3nLE3Ke9eod9Nhd8+BtyX9AXd5AACZAACZDAdUjAZNMNSpQDmaWi71jv34reUOrYpSHY9A3z/V90APv9+9JNK3mGg56g6GVmWSsprG1EmaRNt7L0Yztw8fcL9JxKyFDl7B3mYNEvK6NzOcxT6Uf0XbueWYk5OfTCjyRAAv8xApV4Gq4CMoZEzH97BfQ6g7UzN/Qbcj9C3V0rXSXIu+mdGBQ8Gb8WFF38obgKxGYXJEACVUvAoFOjsCAXmSlpyNUXw0n0QE+fYISHh8LdS8lBeRlrCGJg0qqLUJiXh/TMTKilH0WdVPoJCQlCQIAfPF2lAlmF4fRG6DUaFBXlITMzGxopNau0d/bwRlBQMAL8fOElBkPnUh2IMc6gh1ba5WemI6vQGXUbR8PLxYii3Cwkp2ZDW+wEv/AoRIYEwMPVueTaZpM3Pw8ZGZlQlZXXX+R1K19ek9EAjcy1ID8bOdlFstAhRk1FVndv+AcFIsDHBz5eHnCpIHeAUa+RtjnIUOYpqyQmZ3f4+fvD39cbroYcJKW7oV6DSHi4l+OhLHLrzGOL3MJZpbNw9vAJQmiwcArwFbnlGl4h56r922FvJEACJEACJPDvIqAs1BnkXqlGfk4asovcUCO6Bvy83GHUq6EqFD0jKw8qycvt5O4jOkoIAuXe6aHc8yuciPSp00JVVIR80RvyNAY4G3VyDwf8AoIRHBgAX1+ptCqhpxX3UWHnZQ6YYNBqZKx8ZGVni5wGebZSdAxPBASKPiX6grcUj6hIx7B1puglylas06BQZM7Kkb60Bji5WeYcFOgr0VDlz9kkhiytRnS6/Fzk5BRCK4ueFj3HE77+ouf4ip7j7VnOfK3sNcI+O13YuyKqdhT8vT0s7JU5ZeaiSGEvcgSHBCMo0O8S7K36YaEii/xuMgczD08fYRFg0Q8lmXJpTdUJzmV1MNGf9FpF3xUZsrKkQq4OxWK0c/f0N+uZQUF+omdKP1SgLH84/JcESKAUgWo11BX+tQE/y4XYZqaDS3Pc0iLikhf+UhLbvwSj9yfjEa6rCfdKeePZO+AHEiCBaicgxjVRWI9tWYqpH3yInYkGeHp4iPJpQFGhCjF3DsTN2kNiNLNfJcqV0FSsQ356PP74cTamfb4CaaL4mEx6US615pXmsFYP4uVRL6DHjY0Q4if9l1WCjHoU5aVj3+rF+OKLz7A/VRRSUXYN2kJRyMSQVe82jBg2BP26t0ONIB9RviALDKLEFhQg9ewRrP/tF3wybxUKiurh2+3fob36OD4aNgI/xeZAXSwih92FWfOn4N5mYfAQ25dZ3oyz2LRI5P1sBVJlZb2svCNGPS/yNkZoGXmNOhXSE47it4Wz8dH366GDmyiYrlD2F6p0MIa2QO++/TFwwP1oERkI9zKKYrGmELF/rsTMN97CZuHt7OYOJ5m/Or8Ibe64D2G5G7Hh+AD8unEYmtbyL6V42uTevOgbM+cUWckvJXfLBzBs5PO4v6PI7e95Iedyfz3uJAESIAESIIHrgYDNwFWItIQT2LJyMT7/cR1SsiIw+cfP0aN1FBL3/IYvPpmBjYeTUKizzDm64+N4ZdyLuKdtDPzcSpt7zGcoOlF+Jv7avQGL587H2kPxUBlMcDYVS35vDQzFgbij7yAMHNQL7RrUhJ/Z2HOFPGUsVUEmjvyxEnO+/gI7zuRBL2mFivUqaMRAVVyrI/737DN46t6bUFeK+bldJCedYoTSyeLnmd1LMf2tWdh6Jhm2erDRt/TFyJEv4e62deDnXnrOJjFmZibHYv3SeZjx/WpkFBhk4dBVUqHIYqpai+KARrinZx8MGNgTN9SLhI9ZBmGv6GViyEwX9ltX/owvFq1FYkYY3pn3CR5oH43kP1fhq09mYv3BBBTY2N/4GEaMfQn33lAX/mXkKGGfin1rl2L2tLk4kKWCkyyEOomRtECcQ3RR7dCvf3/06dYS4X6eYiR1MkeFuAeEIzzQx/5MaioWPTMnCXtEz/zyyyU4npoDnZMsuoqeahCPuqAGXdD/uWfwyO0dEBPud1GuV/jLshkJkMA1TqAaDXUmnPhjLYziSm3fanRCgxAXebiz76nUhxodH8VjlWrBk0mABP45AiZoChKxcuoITJj/J9TOPgi8qT/GDuiKkLwT+Hr6dzi6fi6+V0ICLiakGOmyT67Ha4+NwsYiI7z8OuKpQV0QpI3FD0vWIzkpHZmHl2P8U8uxa/SXmPj0XYj0FyXL1qcYqfIS92HWiGcwd18hXP0CcO+AYbi9uT+ObpiJxevPIj1uE6YP34SNj0/GrLG9USe0GId/X4I5M6dh3V9ZKBKF2bKFI+v4brwxbiLWZeVCY9udsQ4/bhmEW+sFwsPThOxTGzCh72hsKNDDU5H3f10RpIvFwqUbkJyYZpb3NZF396gvMOHpuxEVYJO3GGm7fsD9L05FalY+vANC0Ou5V/HQzTGI2zQPny3chIT0o1jyyVgsOZGDdR8OQtNw35JrqiiWp1ZNwxMTvkeBwQO3PzEafe+9AR5Zcfjtw5lYvW0N9qj1MLZxh4u7nZBlagrnUxsxsd9orM/Xidw34smBXRGsP4Uff9mApIRUZB5ZgQkDV2DPK59hwjP3oEaAKK1lurFh5zsJkAAJkAAJXFcETEX4649lmPflLKw+eB45ykKfeYLNoC1Iw9pP3sIni/cho8gJbh6+cC1Wi5GmGOd3/4ARkzwxb+qL6NI0CpJy22ETY1z6EXz1ysuYu+MkVB6BuOHu3ujcqhmCNPFY9OsaxJ46jw0/TsX6H7di3IzX0OfeVgj1ufxc3/bBxEhXkHoE3096BbM3xkHt7o+uDz+PO2+ojYS93+OXdYdxNnE35kzYjZ17R+P90U+iXd0QuJb74OYqHoUZ2Dx7Jj5esAWphUa4+flAr1IMizLnbT9ieIEfvp8yBF2bO865GJkHl+N/Yz7CgdhE0ekCcc+Tw/Hw7S2RLfu/FcPnX+dOYs2ct7HmZAa+e2swbmsSAVcUIXbTCjP7VQfOIltjY98YuoIM/P7ZFMxatFvksLI3Cnvx0ju/ZxFeecsTQR++hO4tapZhb4Q69SA+HzMG87adQJF7IHo9PxEDe3eFe+afmP7uJ1i3bx9+eG+PvOwURe9xQt1+74te2QutavlCXPmQf343PnnlHfxyJB467xa4u19f1AnMwfoNm3Hir7PIO70Fn4zZgkP9x2HU4L5oVSe0kmmgSsbnJxIggeuTgMsk2apnakVYN/MNbDqruP1aRnRr+RBe7NUaPhd1/a4e6a7FUZYtWwa1uNn36t0b7pKvjxsJ/JsJFGuzseKtAZiw8BDyjd647fmP8cObA9GxSQPUb9YBffp1h27NHziULau5NoNXaGf8r08HBHuLF5h5cmLsi/8dgx4Zhc15BrR+chLmzh6N+7rciBtvvhNPPNAKSRt24HROARRbWuyOlXBr1wNtohXPNqUHaZ+0E2MeeE6837Lh7N8V7y+ch+d73YpmzcTDt0dfRCYtx7bYPEjkB9KOrIe6yZ3oXLcYy0ZORmHTNjBlSMirKJ5GkxImGo/fV6xCooSgxkgYi7JLr4TyunqicZdHcE+bGnBK2ohnHx2FTTl6tOr/BubMHoP7u1rkfVzkTdm4U+TNd5D3XrSJCRV5nWU1+SymPToSf6Znywq3O56c9hPGPX47GsTUQaubH0D7gLPYsPuUhHSIsHHb4NvpYbSLDrbOVWabswdDn/0ApzMK0fudRXjrmXvRNKYmajdohtsHPIRaqsPYcywZRd434qneHRDiazMQCqez6/HcY6PxR5YGLftPlJX2sXjgto5mzo/f3wqpm3bhVLYitwknd/4G1zZ3oXVMuIQbl14p/zf/TVI2ErjaBOLj4rB+/XrccccdqFOnDlxcygkvv9pCsH8SIIGrQ8CUjd/emYnzQVGQPBrIFY8r5Z4IJGLTjqXYejgHCG+Hx/oPFP2kA1JTEpEhIbBKjjmkHoBv01vRskF0KQ8zgzoB84YPxTdbTyDH1R/PvfslXn/+KXTv1Aatb+yCXrc3QfaRY4hLyYLWmIBtaw7Au2ErNK4bAe/yvPMqnLkJ2rQDmDxoJL7behIarxsxZuZnGDHwAbRr2QKd73wYtQv2iPEsCblqEzJjd6CoZlu0bVQHAZ4WPw9D7kn8vHIrktPzZJRUbD4oC5x7E2CsfTMeHzgQj93dGmkpScgQvc4857T9CGl9C1rUj4av1ZvNJGmR5gx7G5sOnYJKIgYefv1TjH3mEbRpWA/Nb7wLN4TlYL8cS8/TAAl/wqe5MJP2fm55WPX+pzjnFwao1MgT9noz+yRs3vkLthzKgim0LR4V9v0fvBHpqcnCPteS1zztEHyb3IQWDWLgr4Q9WLdiXTIWjHwFczYfRbrOE71enYERT96PBpFBCK7RBN071sD+g4eQIN5xyk8IkddfCQ2WVCv12nTHHe0bSVSEG7TJu/HWy29hyYE4RN3zHCZPG4enet2Om27uht6yWGo6cxpnEtJk0bcY5w5vg6FmMzRuUBeBXm5c7LT9GHwngeuAgF6nw5o1a+Ah0WPtO8jzrKQMUgz7l7tV6xOVWxmp2nZsAj9RWi9f3DId8CsJkMA1QqAYp5dPwZu/nka+phg+t4/E2891Q4isANs3r/p4ac7riAiTHHX2naU/mAz5WDx1PI5KfjuPVs/jw+EPIlpCD2wXMo+Iznh9xhCEBfna+5g1bQXO56mglEswt39vKP7Ik1xy7r4Y/vnbuLtphN2wBXjjxm73ixect33gfSclXMEYjRFrfsfH0z/Hl5MfR1CAcjxYXi5w9Q7AkI8X4dfd2/DFpOfRsW40WtzWH4PubQEfVzV+/ug1HMnLgXurwZg8rCdi/L1KyTt+usgb4meX97PpK3A2VwUlglYdtxsrDFpZN1a2lujYtKY5r4r5q/zT+p5H0cxLVultO8yztH9BwfmjOGPQiZEvGA3qB8OtlBIfhPuGvY7bIsWw5yltHKCbDAVYMm0CjkjePUXu90XuOgGOcnfCuGmDERnmb2/2+YyVOCv58xS5uZEACZAACZDAdU/AORKDvvsRn37+Lb544wnUqxVkn7KXLhA9nn4bv/70DSa+/D883Pd5/PDZa+jQtBZsGXu2H0pCjmKAsm2SwuPIT59iwdFzSNO7oW3/SXik6w3iLVdyl/eqeRMmfDgSbVrWltRBSsMTmDb1O+wRg5rObDyydXbxd5OhEKs/m4R1Z08iz80bA94eiQdvbiqF+mwalRdadeoO/+BQe0dHz+YhXyVJ8irYvLINeGjQ61g2dxpee64fevd7EYs+ex03tYi2z3njHjFW5tgCYgFtwmGsV0kOXHOfjdFajHABDrph0y490CJUjJD2MRXPOZmocwQGfjMfn3wxR3SvJ9EwJsR+hpc+APcMfANLhf2kVwYJ+yGYP+s1dGoeY5djpxQjzHZkL32mbF+ExScTkaKEybrdgdvaNJVw1hI91bNOV7xwdzTqhdqMe80wesYCbN61F/MnPIJGUT6iZxZho4Te7j19HIZ6D2PooEdwY71we1oSt+CWGDR2AFq0qmPOt6cIvfjHLTh4KhUaSYvCjQRIgARsBGxXY9t3vpMACZBAlRMoVh3Hl++ulCTBopC6eGOEhKNG+Ci5PUpv7jGdMCDaU/KPlN5v+6Y+tQbTtqlRoAUefaYb/JyKJUlzIQodXq51WqOd5GGzq1ZHtiBelEKD6D+FJ34zt8+X9m7tXsSdLcUDzK20FMGNW5qLUfj4eMPbxw/OrqIgO6x+hEY3hIuyz6xWOqHVkx/iyZvrw0cMf537voJFW3dg1Xdv4pYYfxji1mL6dlnplfEeGdQN/lJ0olx5XT0c5N0qBi+LvEoFM8WGpuTYcxKvWSXcxEEUmDwDECYJ9Gy4dOKKaF5QtgJLOXEKBr2iVGdg7ertSM7IFQ628BDZ7d0c/R6V1WCN3AocLGzq02sxY5sKufJz9R50GwJcTBfKHdMKbd084GEdC0e3idwqe0Vv226+kwAJkAAJkMD1TiCsQSO4e/tYp+mGR15VjFU9xagjeW6te33qdkTv6EBEWBUUb9ElHAs0GLIPYvbCPeKxVSg3/hZ45M52iJT2ZTfPut0wpFstxARa7/7nl2DFnuNIkTQVl7up4jbhmx2ZSBBnONfm/XFLqwYSvWCT1NJLYL0mCAkLg68UrFL0IRc3cblwVEJKDeaGXiM/wsj/PYy6ISVz9qx7C55qG4LafpaTvSTHruOclWqoih7houg50r+L6DSOWpnJww9Bzq52HUkn4RKOeo7Sa2j9hnAXGS2beOWNmorxQ3qhQZikArHu9anTAb1ighFlZa8U7ypd/EGPE/u3oiA309KiYagU6xC9y9re1neL7r0REF7TuvcQ/kpJhWQ1scgvezXnt2L+rlSczjah24PtUVvSkehURZKHuURXdY6ojyayyBsoMzXP9fQhpKRlSJExswmy1Ij8QgIk8N8lUPr689/lwJmTAAlcNQKySrl1KTZI5SuxVwGRT+G2RhLaWTopi3V0f9S/sRZcj8naqsrBcmQ+akL8rjXm5MHK17mff4ni7eIlJv2ULCJLiGya+NB2AABAAElEQVTRMWxScqKIt66iwhqNJ5CcoxIDlQ47F8+DVsJTlK19p5YI9ZCcLuZvJf94xNyLL94xYOn241C518CD/dojyLvEH7jY2XE1uQGe7dMJfj52c1VJRyJV/K61MGhU5n3fffEVineEwF0MgxfIWyTylZG3WOIqfMRw2TuyFhaLoU3d6nZEB3uJMigVzsT4plSBLUqNR7bk/bStwR44lght14aQLMzmMQOia1qNisBuCbkdlJOO9154BC1qiQJqrZ7W/L7haJWuFbdsm3Jswtnd6+xyf//lbBTvDBFPvrJyH8cfSqiJXe5YJOeKR525NJqjmu2AhB9JgARIgARI4DokYHQ2wKSUsDdvbXFD4/rwd/AMs+x3h3+YM1yVW7QoRPmiq+glL69lM+H8rnU4mSv3e2VHWD2Ei/e+Q2Sm9TzlzQ03PNgHYWvOygJZolkHWP7TTjzWpS1qBUiRPoczy/9owP7VvyAvPdV8uGXbxpIb19E739LKvWYXvDtWj5XbDiLDGIzbe3ZB/fAS37bSfbdBu2YNpCKq1RJW+mCF37wlnPbeGnWRlaZGduNbER0VJHMWPcegh1bS+6jSzyFLK5ysPRwXz7P8QllF9JNccNbNKEUalNQmlq21hOfWR6Ck8ii9SbX7MCVfnewV9oUqLfQSelqyGaDOM4p+Zd2jET3GeKEu4yr6lZNSYazczYSkQ9tQlC1cxZq4cslSGE/vR6SfFMawny/hrSophnb6LHJl8VVZajUazyFTIkXUkjrFJD94hbZQex/8QAIk8F8gUK2GupKLlAWtXio7Ovh2/Bd4c44k8B8kUITti38xK1zmyUf4wKPMimkJFBdENawvxqUjsstRgVLOKMKxQwel+qqyYuyKgKQdOGCKkpxPFypMLVu1Q5GsYBrFeywjPRIhnrK666RFmhRuMEpSY2Vr27KGGM3KU2ddUL/LQxgtr0tvPvASQ2H5SlURjjvKm7wTBxFZbo6qFmXl9fI2e9FBwoFHSG6D50SZd/MU3zoJYy3MSkXiyf1SHe0HfL1yF3Lz1SUKYJnF9LDoFqKseiItq8CcTyVuyVT0XfIdHnjmJQzodxca1wqHf50HMedt66quecIqHD98EDqdYlZ1hb9VblcxyJXdmrds68A5AiEShntBhd2yjfidBEiABEiABK5rAkrRCHnCKfvgU2bO56Waa0a+LNTBD64mDY7t3ikeXbmWs0IDxePf7YLFRFsXvnU7oLN/IE45JUKctySpbhrypKKoYme68G5ta2V71yIrNR06rUVpaNYovIIFRxdES564F+R16U2Zs1IZ/uJnGvTy7GdJ8GY50TMaA+fMw2NS3dVFIgecisVgJouKKWeOYPPKnzBn+VYkpOWX6DnKBG22zXKH0qD4ctgftrEPsHvNKZqQ3TTnKsZCGbXsdIp1KpljWf3UJogap08cQ35unpzjAt/Mozh9LB1Jiv5WZous3RDBkTpzxdjcnBBJBRMm4bGyYGoXoEwDfiUBEvjPEahGQ514Y5gLHli8SxTSB7YdQe6IzvB2Z566/9xfHif83yFg0qHIMSRTLgFKoQdF+SlXH1H0xrKakZWWpP6wHovBpEVL0bOJFIm40E5nPbvMmykF6UmyWmrVr1yUfG3lClCm3d/4apC5WpTWGExc+DMeahYBz8uV1z6ui3gfOqMgKwFHdm7AvGlTsTXZKAqtJ5p0qItj20+hQCq3lofMpdateKNPa4z/fhfOpiuGS+WsDKyY/Yb5deczEzCk/4NoFh0BPw9Xu4JoltusCEdj4oLFeKhFFLwqLbd9AvxAAiRAAiRAAiRQloDYb5S1RrMqYsxC3AEdVPnWk8Rp7KIGKbcwtGgqXmLHgOwCOTc7HnmK0U/RcS5lqZNqtVlpxWKos4zlIjqGU7mVXC3Hq/Lf2H2nkKF439eSUFp7xy5wFxmKclPw174tktfuE2yMzRKPfS80aBEJlTh2ZEsO3Iva5+x9XeYHR/bmJkphCG/xdlSkEognjyMxLRcqQxT8HSJAXCSfn5OTTXJP+Hp6lKqCaxB3SIsdLxLPSqGRJ++9EeFefM69zF+Fp5EACTgQqMZHLx+0uLlTaW+SgweRJtUKy3vAdJCRH0mABK5lAqpk7DwkCqEtnEA00iu1j5UEoJ5BbEKOhC1UQm1TpeF0erGEmVhg/nk4WbzGrF8uxvdvXKAUeS1zPYOTCVK5tTLyWmXSq/NxcscSDOveAwOGvI1tGW7o2n8c5v62HQu//hw9pIJQ2QCPkum449YRX2DKmMfRsE4U/LxcS3m8/T77bfS+7TF8vnKfVLLV2a/FJXLHWeTWV4JzyeD8RAIkQAIkQAIkUBEBJcbVdnvVq5AuFh67Y7yHKB/OlVNAbEUqKhrOvl+dhXMZOqitgx2JTZdwUqvVzn7SVfqgKCxlnj4NmkLE71uF13v3wYCBr2FVbCHa9HwJny5ej4Vz56Bvg/oIqGpxFPalVEA3tJNw4lp1JP2K2Q63B8s370F8Sr4lpYecbizW4uSefSjMtng9egfch/Z1pVqrt81wpwQl26aXhHPi5VioLKRW7mes6pmyPxIggWuUQJlL5dWdRY2WbeDtXHIxA37D7jN59gtg5Uc3QKvRWUtkV741W5AACVQPgVIXGg+jrEZemdbiqOyknMqA7pKGLynekJcPrRiaTG6+ksBZsoFYrYSnT8aLknqJhQLJa5eTmQutjFN5icWL2FRikkw5LfLarIQVYneQV84p1hVh35I30ff5N7AhSwXPkLvxwbzfMWP8ALSP9oVb8UXcD5UxBJjR6IVOfSdh5c/f4bUnbkWdmpKfzlOSKNtFi8PMYc9h4a44FOosTwwm24ODdJFyJlP4ldJmlZ7LbEbJ7WLlXOYIv5IACZAACZAACVyCgDwfuUkuWHvoo+LNJc4Ml7r72nt1kTxoTqW0LfuhCz6IV1ioeI65W/WAc/EJKCh0SKNxQQPZIRVp87PzodFeQm8qr63jvjKegka9GkfWzMDglydgyclkIPBWvDr9Z8x8ayi6NQ2Xaq+yyuuolDj2VcWffRvch6EPN0HLWm7iJQfs/XYqFv32B06nZCM/LwfnD67FlNnrcDqpCD4BwXjunT64sXnNUoulip5q0xczE3KliIRWvtv2lCewERopNKFwdYwILu9M7iMBEvhvEbjMK3rVQIno2BuPBsrDpf0BEVi0aDsKNEoWgMpuJmhzjkjp7U1Iv9TDdmW75vkkQAJVR0Ay90aKNmgzkCEpEenqK1FInGHUSbS+1fi17L2fcDI93xxGW5GwRl0yvnl1ItbGpkHrEolmrUQxtbrlZSxfgUOS90R/Ec1In7UHg+8eiZ1ncy46TvnjO5nltRnrlr//M06kKvJWfLVT5P123BtYeyIVGsmxkrLtK7wweQUy89Rw9e6G6Yvfx92tIyTRsvUi6rjuUY4QJl0eUmQ1WPHk845sjiffWoBVv3yP4b0ao1aor7m6mqVZBiZ/sALJElpiEh9Ao97NbmRcMflnxKbmQX9RuVMw57VJWHM8BRolrpkbCZAACZAACZDA5RNwD5diDB6Qmg6WLWszTqRkyALa5d1TXSNboEagH2Qd7tKbhM02aOoBH+tY2Rs24ujZVBRe5P5tyDmE156cgFW7Tl9Y6+vSI1Zwhgnpfy7E69OX4sS5HLh6dcKEWW/gkdubwF8WVs2b8ubw3FhBR1W02w2dBn6KUb3boE6QeMd5qvHz1FF4edwEvPPmK3jixUn4MylXCoJ0wrB3v8egezsjzMGbThHUqBc91VqEYsvcDTh0NEHSv1S82Gs0ZGLFp7OwfIsU7FDR+66Kfkh2QwLXBYFqNdQBNfHEpJ5y8ZWKN1Z8p354B78cSYe2+PJuRDbq+qIcLP2gD96dOh8pRWXzMymluy++fmHrh+8kQAJXmYBUTm3V1k1Wiq3jZCzGst1nUXQ5YaelrlAeqNu2meQPsaXWXIwvf9mNtFy1rEKWc/0w6pGw5Sd8s2UjcvXKiqasVHt6iR5lu/rswvzlfyIzX46V21yF7d/PRKwhCD6eSshoZTmJvG2aws1mGcTP+HrZLqTmXETerYvxrcibrSSOMRVg2/z55pVWZeT6/XqidQ0fSTbsKEc5gjscVp2W/HL3zcDRJAndsO73q9kaL0xdi7lTRqJRdJgY66wTO3oECYU6Mch5oE7rJlIZzfaDLcHsZTuRml2x3InbbHLLinylOTkIzI8kQAIkQAIk8J8k4ArvIG+42ItcZWHXQansnqe4oJWziZeZwSH/b8PuzRAlC3A2DamcFg67RB+SPLewVy89iGUb9+CsLCYWl6MQGSXx2p9L5+JYjhFuXl5mbzOHzq78o+TK+/PXX5CTnGLuI/qBO9CqYRh8S02iOp/njNDmpyIlVQOjiz9uffBxDHlmENpEeCO/OACde/THxI+/waotc/B8r3YI8S4lqMzBHbWaNhBvO39RNRVlaAN+3bwZx89Jvr3yIkBMBqTv/x2Lt6xFXG626Gmi01GHuvK/J7YkgeuMQKlHvuqYW737huB/ESHwsD8sp2HimFk4lJEP3UU8W0pkM0GnysW2b17DG8s90G/qW2ge4FmS7kAezgtyspCeno70rDzxSrn4g2xJv/xEAiRwdQh4Ikryi7i4lig0C776Vbzh8mC44P98sRjdHPKkiF1NUVos/4tdENOuPXzdPex6zLopT2PGsm1IyiqUMFil2phipDdKZVg1chN2YfqobyXc9D60jAqGu4sPOj/YE37ekgjYOtHN08djwdZjyCzS2o19JqkUq1MX4uzu+Xh57mH497gFMf6eDkmPHSlJaKkiXLmXGamW1u4G+HqUyPv71Gcx49etSJQqrOXJO0Pk1eruRasaIRKSkoekY1L8wppDxt0gobASkmofSuap0+QiR94dIlXlBLlGFuZJ8mXhIeG+cPoRuxIzy3i6uaDxXYMx9+0nUDPIx8pDQleVEF+pVKbI7efhaef0+0eDRe7NSMgsLbdB4Zy4GzNHz4FGczdaRIUKZxtdR078TAIkQAIkQALXMwGHiqGXO81St0tJU9GzL6JqSDV76/6tyzZJnlhxZrhAVxKnLV0GYv+SSvCFMpibD+68qTHC5H5+eZsX2t5xF8LCwuzPT3vmfIRF63bgvCzKFVvHM+tTmiIkHvgFkxbsgapta9SJCpJnuApGqWi/4+mO55jykXZK0hgphcJkcxM9xyirinZboaLnaPORV6w3V7O1nGX5V6cqgEqrF8Oisv6qdOrYseOZFXwup4lRn4mV04Zjxm9HEHLPWIwbNQojxryKdz+cgs+nT8OUCS+j3z0dUdNfDKrlduuCGs1bICg4SH5Dizy75r2Lr35cisNn083yKgvLCleDXoOC1MOYP2UhEs40QoPQGPjLonAlZ1GuFNxJAiRwfRCodkMdXGpj6NKpaFkj1H4Rw6k56DX6axw4ly7VC3XmG4T9Im3jLDuMBi0KpSLQ+q9fxjOfbkadfpMx7LZapR4MNcl78N7gnujYvh3a9RqF345nlGMMsHXKdxIggatPwAUdnxyCsFD/Eq+0w19i4sxlOCV5P5T8Z4rSUixebwU5J7H+961i9LEa6yQnSL5KDbWSv0POi+j6MB4JD5FclyWqzILxAzD8rW+w7WAcklMzkZ58Dvv/+Akv9ngWv2Zp0H38Q6gXYFGqat3aE3eFBUnlVVv7DEwfPAif/7oN51L+z955gEdRbmH4S+/ZdEILJfQqTYoKgigKCgqK5aIUBcQCWBBQEUQRsQEiiAiCggKiCIiACEiTKr0HSEJ639TdZLO7uWe2JJuQhIAYA3zzuG6ZmX/O/w6ZOXNqCtTqNCQlhmP3jx+j33MfIUVjh2cfaSvGPeciTMUU5gxpwlB2Gm9wV5G3WiA8Cr3WwA9vD8XYdxdh15GLiJNjmuTd/iNe6jMCv6Ro0X1CP9SXzmMO0u1MVd0O9hb75olvV2JveLyUCtCJgU6D9OQobJw5GgcyUgqLT+eLyS4zKxmbPn0TSw5eKqw598Pq3UgUY2bJyMOaHXuig6u7qb6Ko3sdBIh3WOlAF3zXwxggcnvayL180rMi99fYaZI72SL3Krz84Eislo6yXcf3RaifRwW9+UU4+YkESIAESIAEbngC+VKXttBrpjjxSo8EK/Z84ypWJpsnMc+GPfBo0xAES5dQ0xL1E1Zu2IOIROmSarujBCUkHd2KrZmpSJO7rtcdo9C9ZUP4XUVb+eD29+DuWjXhpxRjMy1pWPz2OMxd9ivOXEqQLqtpSE6MxP518/DMyzNw6lIGBvZqiRqB1txcy26F3kNHKe0hDCw/274Vc2hKM4kCa5MMe1d4BdlLpoR563Orf8O+k+FI0eaJnqNFZmostn/9DvZGnYNij1QW0biQnZOK7QtmYOn2Y0jMkZp5wr7owOK8LIt94fmRgSSg0Ja9Mnba4TVYsiMW0RnyJTcR0aJPXoqOQ2xsIhITJQAkKQXJySlITU0TfTFd9C3RTaX8kq1uFdD+XvSqG4oaTpKJoQwqy+9fTsVbU2Zi7Z9HERGVgKT4GJzctwGTh72GJQfOIvTprmjauIbottY9zPvx/yRAArc2gaIQl0rk4FijB77/YRruG/QOEuXilytX8IKtn6H/1l8xYuqrUpugA4J9POAi4d/28kBtlDCS/DwNEiIPYfnnL2H5fmlHfscbWDSul0TXFJ9C2Pqv8NPBKOnsKLeK879h2vJHcd/knhIdUrrvoxKnzUORwC1LwCH4bnw0qDVeni/Rb2oxJ8mf5/Hv38KTMRcxdfRjaF7dE5rE01g6fTxWH06HlLAzLxcXY+HSWmiuT0Wtfs+hlxTtfeaTZ/HbS3NwITql0Ou7/6ePoLyAQHmlyUtcsnbOUDV+DqMebG7qdmoa0KUxRk7qj10Tv8PFuAxptKColMn46o2n8VVgK3Rs6IKjh44hL08nu3ui8bMfoU+zanBzVK5DBhjEq5sWkwiDRO+Zl4vYdfgC7q6rQqCXC5wUK1expSYGzRiK30Z/gTBxRFi91Pt//hjK63J5n8XzD7awyOuBoHpSR+64jGlKmdiB0aOn4O3XHkeNzDNYOWMBTohSnG+wF2+yEgkHnPh9Ad4Pi8eBYzkYc98rhWmt4cvfxLxGAXjp4TsR7Cd1QkXOAulelnR0N/bocpErrNoM64164o03X1GlTIHIvWHMHJyNSBa5zdrtgdWfQnldLvdQjOzTEip3a7psMQj8QgIkQAIkQAI3KYEC0Ql0iDt7WiLDLKFhkEgxdRZyJPjATem2Ls8ypigqnTjZMgzQW3WcrExocjTisNTDVVqN2tv5YsAbo7EhbhqSDpxGvjgot8z7ACHBKgzteydq+UqagUEPTcIRLJi0FNHnE+Hh3QoTR/ZB0xD/QsNQhUA718eTLz2EvamJSJf6snolZF/0p+UzXpGO8k1wW6gnIsLOIiNDTGTO7ggd+DZ6tW8KfzEGFkjYm6IPZaakSWSYNHswLUdxPjYW6ux6cPNwEmdj0ZwzZM4yRfMiEf/aHK0pq8BFHJL+tT3hotR5y1P0qgOY+t50pCYPRDOnRGyYuwQHU4WRXnEiSmMNEfHcrpX4NGYhLl4Qw+FbvaQxrrA/d0bKhGRZDyAlUbKQLZ3s3cX5WIx9pq0cMm62LXs7pMcnID/XnGp88MfPobyKL37w83eBr08AAgKCUKNBI9xx7324s11zVFf0J5MTuBp6i167XZ2AxH3nCptvnNy2FK/LS7plyEtpOaukSzjCs24/PNqzI+pV8yhyZssaLiRAAiTgMEWW/wKDs38jPN3nNmT8/heixRFilO6KBmMaDv25Hku/WYB956MRfiEc504dwZ+/r8dX743FzO/+wPkUD7Qe9D6+mz4QNaWGkjUuxjqH5GO/YuXOCHl4VW448nBdowue6d0cHnIDLLmtdZ8b9X3t2rXQarXoP2AAnJ1tIn5u1AlR7puYgD1q3t4DvglbcCJai2zpZKYYljSXjuC3H7/H4kWL8f2PfyBS4woXR6kRYiq8ayeFfD1EATuK42G+uLt/dzQM8oB3zXboUlOLPcfCocnUFPcyQ2NiaO/sAV/fO/HZkrfQrpYPxM5WuHjX74zbvKJx4FScdDnLFTkUY50smkTEiufUKEYpN08VfHqOkQYJ/VFb5SbXjgKoo8Jw/OBWzH51Ns6KEmiQtAYl3SLsz8Owk+gzV1cVgsQIZlbUzEMq//eo0VbkzcXe4+HIuYK8ny5+U7q5+lka7jiheogTNuw4ITVqNGY51WIY3Pir1Ec5CrXU2xv+/nR0LjiM45ck9dcg8qTHIj7ZHt1emIMx97eCW85ZfPvTDlFY83Byx3psD8+HytcTzsYcRBz+DR+M/RzhOQZ4qrpg8uRhaBLsVZhy41G9DTrXzMO+E9INNrOEN9+Gs4/vHdIF7U3cXte/WKOgIgL8RAK3LoGI8HBs2bIFPXv2RN26deXhlU7DW/dfA2d+8xGQUhM5Sbh4bCsWSGT/ochE6Ey6QSb2XtAiQIw3zvZu8PJwREpcOA5uXI7P1uxFtNSqVfQHO3G6pTn4wNtDBb8AFVwl+MDRuw7u7VATx0+dl8itVDGI5eDwtnWI1ijNsAy4dGgzZoz7AL9HJcNOpcKIaTPwWNdW8HUp6Si8Mm3P2m3QwjcdZy/GIFmdY3Feyn7aFCTExUGny4erhxdUdz2Lj18fiDain4iZDhmxETh7fAfmv/kFDp6PsczZDscuaeHl5SaBFu5QmeYcgYOblmPmGiWlVmOZ81mZswoqNw/4BAQgpI479h4JQ0xCuvn4GVH4e9smbPjzIOLFGTnw9fHo7p+EiOhkZEmyhV1mIpJTDGj35GQ8e09T6KL+wtfvfYO/L8Yjz8J+/0UtfCWTwlUMgZ5iBEyNj8Dfm1Zg5i97cCm1SA611KHzcreylyZamRHYsfcIYpOVDAQ5lmk8s65npikZHlIaRa1Okig7YXDib2xesxJn8lRo3qQRArykZIjom24BjdGmphMiIqMlCk8p82LbTMLc9tZeGq15+7TF61NGo1cXpXnGzfeceuV/gdyCBG5uAvk6HTZt2gQXKYPUvkMH+Pn5ma4rFZ21nTykWp5SK7rL9d4uB6f/+h0rvpqBDSdz5aYgHhOJXJGCVrAzyucCe1Fs5cYlhrbG9w7DqGcH4q5GQYWRIiWlSf5rNvqNXYxMKYqujPHwtJWY1KexPPxf/Q2s5NhV7fuwoUNNoenLvv8enp4lQtGrmrCUhwRMBDQ4+PM8jJu5Cmnp2aYIM+UCZP4bvwNvLRiPJpdmYtTHO5Apukyb3s9hyFMPokvT2nCWa4Dtoj63FTNHvYtNyWnIEcO86VJmJ9cLqYVXo8uzmDb5WdwWLB5OGyOd7f4x+1bgjQlf4Gxqujhyzfvb2zvAUbpePPzSh3j5qe7wk5RX8+4arH7xEcw+KOn5Vuex7WDK58AhWPn9cwgNFK9oyXXyXX1uG2a9OBWbElOQfZm8w/D+O8+hTfXL5Y3cuQgjJ3+D+JRM06h2khrh0PoxfPTW8+jawB/ha9/DS5+tR7IAsxMjwGOvfY7RAzpJVJ4Tcs6uQP8X5yI5LVv4SHqxXFuVKMJCVrJ9o/tH4u2xg6W+3OXHVg6oPvcnZr88FRuV7nMl5K7eeSjek5TYtjW9aKQznR3+jwSKE9gqRrrx48dj+ocfolu3bnSqFcfDbyRwgxPIx555z2LGKmnGlF7GVOo8jc/GNcXCuQtw+kxkGRs1waT576NXh1BJfzRvoksLw4ov3sLSTeeQkK48DynakpTDkIh4xeDf7O6nMHzEEHRuHGSK+i9j4Ar9nHB0PaZNnWsKktBY7vN2Jn3IEfc9/QZeGPwQ6gR4WXQbLTZPeR5zNh9HrBIYVtoSMggfj2uEb+d/g5OnIkvbQn4LwYS5M9C7YxOkH16F8R8sxMkLcaYMVkXPsW/SGxNeHYE+beogaftcvDlrFc7EpENZ13v4ZLz4ZA9ErXoFH688gkh1WYf4Hz56rTmWLlyIE+J0LH1pjDe/mIoHOjWCh1TCOzhrIMZ/exix+V5wM2VtmTMWFL3J+lLGUbIs9FKyJVepkyeGuDHzVkgX2DsRYGMwzbz0N5ZN/RS/HD6NBFM9PZP1z6TzBrTqi9GvDEfP1iHwcipDUS1dYP5KAiRwgxDIkdJNY8eOhbe3N54fNQqhoaES5VvaU2LpE6oChroiwTSZyYiOuISY2Dg4VG8I95QLSNB5oVrtGqhfvx4CJJRa8VRcaUk8fwgnz6fBtVYTdGpRq0yj3pXGqerraair6meI8pVFwCDe2vNnzyJeasjppY5HUPV6aFC/FtzFGKdNOIm/z2QhpEVr1PZ3u8Lfrw7xF8MQLkV6c0W5NEoDhBp1m6BxLT84XpaGWoo0hkxEnr+IyFi1Ke3DNaA6GjRqhCC51pgyGErZ5Z/9ZJY3QtJgtZLOapa3MRrVkmi08uTVqhEVmwKtXADd3f1QI8hHFL2iC706IRJqCSb0qlbL1IWsUHZdlij4dgj094BBk4a4xDgkJKqRo8mHvbsPQqTJR51A1WVRgJfPUYeEcDNns9wuJs5XlPvygfgLCdxSBGiou6VONydLAtedQEaCZBedD0ea1igNDJzh6eOPWqH1ECzRek6FN/vrcFhjNmIiI6SGWoo0tTLAxTcQ9SS1M1iyCiol1iE3Q+oMpyJbdCMXNx8EB/rAxWQoM88tIyUGavGUuvlXh5+nq8z9OszZdogCA3LEsDbr+QlYE+GD4bMm4ZE7QmEnpZc0Ui8vLy8XeZLKrJfSSnrpfpEUH4Uzh3djw9a9uCjRfveNE2PioPtR11eK8BVb8pESI7XuIuOQodRhd3JGYA3ReUOC4enKciHFUPELCdxkBP6poa54gbf/GI67dyAat1ZeVkGaWj9c1Xu1hu1QreFV7cKNSYAEKpGAg1sAmrS5E01KOaZ7cAt0DS5lRak/OaN6aAt5lbryyj9K2kPdJm3kdeVNr88W1yivm68Y1XzLFME3uC5KXevsheAg824OXv6oq7walDlMOSucEVy/hbzK2YSrSIAESIAESIAErisBldx4b6+Mm6+9J2rVbymv6yp+xQeT8iE1pN5vWYsqoBZUAWWt/ee/52ecwfyX38KPUqak1wdfo8+dLaX2sGJIK1um3g8/hSfuW4gRb8+TdNlcaE119krK4oSAWg1Mr5Jr+J0ESIAEyiNwvf0R5R2L60iABEiABEiABEiABEiABEiABEigahAokHq8y2ZiXdQFpKA+2oYGw0dq7F1pMepzkZ0qDbd09mjduBpU0lSMCwmQAAlcLwI01F0vkhyHBEiABEiABEiABEiABEiABEjgxiGQG4U/tsQgKVnpxHoOB46fw6U4taS8Ko0OLTWQLbNR6v0apeNtriYTUcc34r05v0pzkM7o3KC+1DUuXkv5xgFASUmABKoigSu7C6qi1JSJBEiABEiABEiABEiABEiABEiABP4JATsH6cooTTqUmn/ScGvltDE4umMAnhjYD51bhiJAJd17LfXyDHot0pMv4cDvP2Hesq1I0Row/P2B6NSyJlwrUEf9n4jJfUmABG4tAjTU3Vrnm7MlARIgARIgARIgARIgARIgARJQCLhWR68HmuNgQhxORailOZke53b/jHflpSx+/iHwq+EPB4MO0dJwQ6PVwsXVXZp7tcHoaRPw5P2tpJEXo+lMsPg/EiCB60aAhrrrhpIDkQAJkAAJkAAJkAAJkAAJkAAJ3DgE3NB+yAx83rYXFr/3Of44F4E0XT7y9XoYJcIuJzsROWGJsLd3gKN0bfX390DnfsMx8rkn0aK2P5xZSOrGOdWUlARuIAI01N1AJ4uikgAJkAAJkAAJkAAJkAAJkAAJXE8CDghpdS8mr7obL0adx/Ejh3H0xEXEpWYg32gwHcjLvzqatuiIjp3bISTIC84OzHW9nmeAY5EACRQnQENdcR78RgIkQAIkQAIkQAIkQAIkQAIkcMsRcEJASDP0UF79brnJc8IkQAJViACDdavQyaAoJEACJEACJEACJEACJEACJEACJEACJEACty4BGupu3XPPmZMACZAACZAACZAACZAACZAACZAACZAACVQhAjTUVaGTQVFIgARIgARIgARIgARIgARIgARIgARIgARuXQI01N26554zJwESIAESIAESIAESIAESIAESIAESIAESqEIEaKirQieDopAACZAACZAACZAACZAACZAACZAACZAACdy6BGiou3XPPWdOAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRQhQjQUFeFTgZFIQESIAESIAESIAESIAESIAESIAESIAESuHUJ0FB36557zpwESIAESIAESIAESIAESIAESIAESIAESKAKEaChrgqdDIpCAiRAAiRAAiRAAiRAAiRAAiRAAiRAAiRw6xKgoe7WPfecOQmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQQBUiQENdFToZFIUESIAESIAESIAESIAESIAESIAESIAESODWJUBD3a177jlzEiABEiABEiABEiABEiABEiABEiABEiCBKkSAhroqdDIoCgmQAAmQAAmQAAmQAAmQAAmQAAmQAAmQwK1LgIa6W/fcc+YkQAIkQAIkQAIkQAIkQAIkQAIkQAIkQAJViAANdVXoZFAUEiABEiABEiABEiABEiABEiABEiABEiCBW5cADXW37rnnzEmABEiABEiABEiABEiABEiABEiABEiABKoQARrqqtDJoCgkQAIkQAIkQAIkQAIkQAIkQAIkQAIkQAK3LgEa6m7dc8+ZkwAJkAAJkAAJ/MsE7OzsgIIC+a/gXz4ShycBEiABEiABEiABEqgKBP6p1udYFSZBGa6NgIO9PZQHgMzMTBgMhmsbhHuRAAmQAAmQAAn8KwQ0Gg0cHR2h0WpN92pnZ+d/5TgclARIgARIgARIgARIoOoQyMnJMTlp7cVmcy2LnXh4/6mx71qOy32uA4E333wTZ8+cgbe3t8lgdx2G5BAkQAIkQAIkQALXiYBOp4OioClONQcHh+s0KochARIgARIgARIgARKoygQUM5sSUNW+Qwc88cQTqFu3rkknrKjMjKirKKkquJ1WPPVpaWmmB4BrtdRWwWlRJBIgARIgARK4KQgoEXUuLi4wGo2myDpTGuxNMTNOggRIgARIgARIgARIoCwCiqEuTa2GYrO5ltg4GurKInsD/J6RkQEfHx98+9138PT0vAEkpogkQAIkQAIkcOsQ2LplC8aPH4/pH36Ibt26gamvt86550xJgARIgARIgARuXQI52dkYO3YsFKet4rC92uXaEmav9ijcngRIgARIgARIgARIgARIgARIgARIgARIgARIoFwCNNSVi4crSYAESIAESIAESIAESIAESIAESIAESIAESKByCNBQVzmceRQSIAESIAESIAESIAESIAESIAESIAESIAESKJcADXXl4uFKEiABEiABEiABEiABEiABEiABEiABEiABEqgcAjTUVQ5nHoUESIAESIAESIAESIAESIAESIAESIAESIAEyiVAQ125eLiSBEiABEiABEiABEiABEiABEiABEiABEiABCqHAA11lcOZRyEBEiABEiABEiABEiABEiABEiABEiABEiCBcgnQUFcuHq4kARIgARIgARIgARIgARIgARIgARIgARIggcohQENd5XDmUUiABEiABEiABEiABEiABEiABEiABEiABEigXAI01JWLhytJgARIgARIgARIgARIgARIgARIgARIgARIoHII0FBXOZx5FBIgARIgARIgARIgARIgARIgARIgARIgARIolwANdeXi4UoSIAESIAESIAESIAESIAESIAESIAESIAESqBwCNNRVDmcehQRIgARIgARIgARIgARIgARIgARIgARIgATKJUBDXbl4uJIESIAESIAESIAESIAESIAESIAESIAESIAEKocADXWVw5lHIQESIAESIAESIAESIAESIAESIAESIAESIIFyCdBQVy4eriQBEiABEiABEiABEiABEiABEiABEiABEiCByiFAQ13lcOZRSIAESIAESIAESIAESIAESIAESIAESIAESKBcAjTUlYuHK0mABEiABEiABEiABEiABEiABEiABEiABEigcgjQUFc5nHkUEiABEiABEiABEiABEiABEiABEiABEiABEiiXAA115eLhShIgARIgARIgARIgARIgARIgARIgARIgARKoHAI01FUOZx6FBEiABEiABEiABEiABEiABEiABEiABEiABMolQENduXi4kgRIgARIgARIgARIgARIgARIgARIgARIgAQqhwANdZXDmUchARIgARIgARIgARIgARIgARIgARIgARIggXIJ0FBXLh6uJAESIAESIAESIAESIAESIAESIAESIAESIIHKIUBDXeVw5lFIgARIgARIgARIgARIgARIgARIgARIgARIoFwCNNSVi4crSYAESIAESIAESIAESIAESIAESIAESIAESKByCNBQVzmceRQSIAESIAESIAESIAESIAESIAESIAESIAESKJeAY7lruZIESIAESOAfESgwGqDLy4VObwc3dzc4Otj9o/G4MwmQAAmQAAmQAAn81wRM+o0uD7r8Ari4ucHJ0R7UcP7rs8LjkwAJ3CwEKs1QZ9DlIk9fALuKXsFlQ3vlZS8XfXsH02c7ezveAG6Wf3mcBwnczAQKCmDQ5yNXk4PU5Cgc/nMTdoR54rk3BqNJgCdoq7uZTz7nRgIkQAIkQAI3KwGzfpOn0UCdGovju7dh5+kC9B32GNo2qA6Xij7n3ax4OC8SIAESuE4EKs1Ql3zyT2w6kiwPqAbo5SG2oIwJmA15dnDydIe7uzf8ff3g6+sDlUoFT3flN1c4OznBQYx2XEiABEig6hEwICs1GRFhh7Bp+fdY9NseZOfqRMwmuHf4Y2joT0Nd1TtnlIgESIAESIAESKB8AgbkpKUh6uIxbPl5JZb8uhMJ6izZJRSN7+uBFvXFUOdQ/ghcSwIkQAIkUDEClWaoc/N1QcKlMBzfuBEn0lOhztHZGOsc4GIxwDkqUXNirSsoMMKQr4MmRwuDxbDXpuej6PtQP9zZqRVCgvzg4exQ8Qi9ivHgViRAAiTwzwjkRWH2wCFYl5KGLE0GNHl6y3gecISUBaWP4Z/x5d4kQAIkQAIkQAKVT0AXhyUvv4KVx88iJTcb2dp8iwxS1sNOnskqXyIekQRIgARuWgKVZqhT1euBCVN7AFMnYutHQzF87h7k5RvNYJ3r4YHBfXFXs5aoVTsQKndn6DMTcObvfVixbA0iMjOgztLgyJafTC+gIV6d/RGGPNAGfh7ONNbdtP88OTESuAEJuNTEkx9/gsd8VTj23QS8u+xvpGusxrobcD4UmQRIgARIgARIgAScg/HQxHfQ08UJZ9Z9ik+++xMRyVpyIQESIAES+BcI/AddXz1wZ98+cHS0sRG2/h/efX0MnhjQC3fe3hYtW7RAmy498dTot7Fuz2Ys+eAF1K4eCNfCGnXn8dmYRzDhu51Iy8m3icz7FwhxSBIgARK4KgLOCG3XAY3rN0LvRx6Cm4f7Ve3NjUmABEiABEiABEig6hFwQkiLVmjcsCnu7X0//AIDqp6IlIgESIAEbhIC/4GhDtDbuUHi4IoQShpsrnwrtW6dox/a9X8FO9Z9hUdrV4eXTW26De8/g882nUG2zhKZVzQiP5EACZDAf07Azs1VUl1trnX/uUQUgARIgARIgARIgAT+GQF7VxfYOfwnj5H/THDuTQIkQAI3CIH/5ArrUacx7pCHV5uYumKfS2PnXKMjZuxYjsG1qsHZ5sF3yeiJ2BSWAWsWbWn78jcSIAESIAESIAESIAESIAESIAESIAESIAESqOoE/hND3TVDcW6I13+cjkBfN5t4vCMYO2st0qSgaakRedd8MO5IAiTwbxAoMEqjGIOxxN9rAYym3w0wGKUr9FX9MVv3NcJokK7S8jIqY/wbwsuoyjEMBj30er3IKvO4OmGLpJL9rGNdzZxNjXYUGeT4VyvDdWcvTX+sczDLcrXnzoJDOBotTP/ROEV0+YkESIAESIAEKpVA4T22mAJi1VEU3UHRGa5OJLNupOhNyv4W/eYqx6jYEYt0EtN92CTrNR7IVr+5ijlfpt9chQzXnb3NHK5W1yrGWxnHaKM3XsWcio3DLyRAArccAdugthti8o4h9+CTJxph2NfHobWG0W1YjL/e6I++DZ2k69ANMQ0KSQK3GIECMSzlI0+rQUZqghjW3VEvtCbcnOyh12mRk52OlOQM+ZvWw97FC0EB/lCpPOHkIF2gyyRlhD4vTzpD5yAzMx0ZuUY4FuggmfTw8wuEr48XPDykE5lNunyZQ11xhRH5ubnIyclAinRzzZV0e0V9tXdxh6+vH1RennBzkZ6uNtG+pQ1pUnnlf/p8DbIyMpCalgatjGXv7ImgoADTnJ3LkLfAqEeuNgdZmWlQp+VIFLHZGGnv7A5vXx+oPDzg4eYCh8v2t7DP1ZrZa1xRt35NuDs7wqDTIDtb5pScjlxhbydyBErNGYW98xXY52u1yM5SI1WdIfuaHz7s3T3h6+0Db08P4eEk585GybezFz4lqIihTyf/JrLk/CWnpECTbzA9xLh4+CLAT7iKHK5OjsweLoGNX0mABEiABKoKAbnHiqNJJ/fETHWi1M52Qo2QGvByc4YxXwuNco9NlQ7wuTq5x3rA398fPnJvc3Eqr0uqjKmz6jcZot+IbmSUMkHSZNVL5Qc/HxU8PUW/kdTTkrfVq6dSILpUruhSmSadRCPHEvVC9BJXqHx8ofL2hrvczy/XLYofyXq3N+hykS1NAFPVaaau93ZO5jn7+ohe4Vj6nAvEkJWXmyP7pUOtzkaeXnQBGV6RwVN0CpXoFB7urqXM18Je9JvMtCRh74jqUibJ293FzF6ZU0o6chT2Ioefv59JNyyfvUXfE71ULfqNJs/Cw9VDWKjM+p6rE4pHutjBvqSCI/pNfp6iJ4kMqanSIVcHgxjtnF29TXqjr6+XSU+6kt5YnDK/kQAJ3EoEbjhDHSRJttPgUVB9Pwa5GbmWx8DzWLMzDPfXawtHefDnQgIkUFUIFIiBSxTVnGzER57Alp9/wJyVW0VhaYBFu5ajS4A9zu38CbM++Qx7wrOgM5jlDr17JN6Z8iLuCvWHixiMLluM+chOT8LxXRvxw8LvsOVcAgrESGYnxqwcba54LwPQd8TLGDb4ITSrGSBGqdKVw8vGLe0HOVZORhIObfwJX301D4fiC2AvyrE+L1sUODFQ1b8bY0c/jyd7tEUNX4/LlbXCMe2gF8UtL1uNM9uXYvrEuTiizoLo3aYl9L4RmDzhRdzZMOCyORvFoJYUfRK/LV+IT7/bAh2cRMl3hPJ7tkYHY0ALDHhiEIYMfhAtgn1gNvYVsU+IPImtvyw3sc/MqYevti5D1xrOCNv1M2Z/OhN/XchAnoV9/W7D8fbkF9GtoTTwKZN9HPas+R7zPvkWYQYHOInSKkDEYJoNXZ27MGr4YDzcpSG8TMY6WSXRfy5+1RHs7Vqo7BcYdMhMjsSOH7/BrC/XIc6kmOdDo80zRUQGtnwQo197AX06Nkag7EdltvAfEj+QAAmQAAn85wSsBq5sJEafxc71q/Dlis2IT62GD1d8id6tqyPmwHrMn/M5th2PlXraZoFDOj6FVye+iPvb1IFXac8sih6TmYIz+7di1ZJl+P1YBDR60TsKDNCKw1Bv8EHPJ4ZhyLD+aNugpuk+W9JGVGE0cixNVgpO/Lkei7+ejz0XpZQQHGAQZ2KuGKgMtTpi6PDn8MwDXVCvmkqcp2U/YylGKJ04My/uX41ZU+di18U4WPvBhtz5BF577SX0alMXXs7FxygQY2ZK3DlsWb0Us7/biOQs0RfEkVigF+eo6AMGVSPc328gBg/ph3b1g+FhkkHYi0FQcdQmCftd63/C/JW/IyY5EO8vnYOH2ocg7u8NWCDstxyNRpaV/e2PY+z4l/BAu3rwLiGHiZmJfQIObfoZC2d9iyOpGtiJA9ROjKRZWTnQVW+LJwcNwsDuLRHk5SpGUtHrRL9xVgUhyMfD5OBUxikwiN6ojsWBjaswf/7POJOohs5OnK25eXL+jPBt0BWDRjyHR+/pgDpBXuVyrfC55IYkQAI3HYEb0FAHONe+Cy81ccDUg4C1j8TW9XuR8VQridAp1qbipjthnBAJ3FAECrJw7Lfl+ObLOfgjTG1SNs3yByEvPQprvpqA6WvCYRADvJuHJ/TZOSYjzcXtX2HwBHdsnf88GgV6lYjEMiAn7hA+GfIclp1Lg72XHzr3H4pOTerBM/M0Fixfj9iYJPy64B2sW7ANn6x4D31uF+XQ9RqMdWKky4g5hLmvDMeSv7Pg6KXC/YNHo2dzb5zcOgertkQgKXw7Zo3Zjm1PfYi54wegboAY60qxLSpOhjxNPDZ/9j4mrzyG/AJ7uHl5wJCjMc958wI8k6HCli+fQ+NqtnM2IHHfD3jwxU+QkJoJd5U/+o+YgIfvqINwMfjNW74d0Ukn8fOc8fj5rBqbPxqGpkGe4u3NwokNK/HN/C+w+WwKckTRL2SfEY21372DGavPI8/oCFdhn5+tyGFE+I6vMWyCG36fNwrNqqtKzEXYxxzAhyNewMpTyYCnP54Z/yme6dMaeeF/YsrEz7D34i58OXEHviz8hyqqrPBo9Pwi/DCmhxjrnCGhAkg7vw2TnxqHLRk6OHvdLkprN/jrz2PFL1sRG52AlBPrMWnIeux/dS4mPfsAavqIUlwq18ID8QMJkAAJkAAJVA6Bghyc+XMtln41FxuPRkGtOO5MR26GvKxE/D5nKuasOoTkHDs4uXjC0aA1leaI2v8Dxk5xxdJPXkTXptVLZAKJMS7pBBa8+gqW7AmDxsUH7XoNQOdWzeCXG4EVazbh3PkobF3xCbas2IWJs9/CwAdaIcDDucS9ugIIxCiVlXAC3015FQu3hUPr7I1uj4zCve1qI/rgd/hl83FExuzH4kn7sffgOEwf9zTa1vMvI0vBUSIKk7Fj4ef47PudSMg2wkn0m3yNYlg0IGr3CozJ8sJ3Hz+Pbs1t52xAypF1GCp6xJFzMaIT+eD+p8fgkXtaIu3oOnwjhs8zl8KwafF7Uo88Gd9OHYm7m1QTbSoH57b/amK/4Ugk0iSjwsy+MXRZyfhj3seYu3K/yGFhbxT24gyMOrASr051he9HL6FHi5ol2BuhTTiKL994A0t3n0WOsw/6j3oHQwZ0g3PK35g1bQ42HzqEHz44IK8ivnaimNR7cjrmju2PVrU8Rb/JR2bUfsx59X38ciICOvcW6PXkE6jro8aWrTtw9kwkMi7sxJw3duLYoIl4feQTaFU3wJRBUjQqP5EACZAA4DBFlkoHoU/E+nkrcUFSrUz9WgPvwsin2sOz3DBwWykNOPX7ImyPyJUwYsvvwXdg+GMdxDt1DQ/jtkPfQJ/Xrl0LrYTa9x8wAM7O8vDLhQSqGgFjMla8Mg2pLdvBLkFSXjUSLWWSMRK/bV2OPafz4V6nM4YNH4En7m+BM2fPIyMzx1zDJWYfvDs8jHZ1/Au9lMqu+TnhmPvUICw5m4p8Vx+Mm78abw3piy7tWqJ1x+54omdDXNi5H5ESrWYoiMTmnw4huEtXNK7hXWycK6MqQG7sXozvOwI/nhWDoHdXTP/hO7zQ/y40a9Ycd/Z+HMGx67D7nKR+6oHEE1ugbXIvOjeoBldHs8c4P/UklqzageycPDlcDDbu/wPbDyXBtWkvjBg5DP3vboSwsItFc47dg6A7HkarkKI5F+gjMWvg6ziYmCaebmc8PfNHTHzqHjSoUxet7ngI7VWR2Lr/vKR2iBDhu+HZ6RG0DfGDi10qfhw3HclNWsE+SVJClEhD0/XyEjZuW4G/TuXBpXYnDH1uOJ4QRT8s7ALSMxT2slHsfni1ewht6gbCxaaegEEXhS+fHoLvTiYhx+CGwR8vx9gBnVFN0oz9a7dA7y5B2LRtD9IytRal2Rk+kmqipAY37NBHvNghkkJjj9zIrRj5xDhsS8lFi/9NwqKv30Df7h1x+x334qmHWiFxxz5cEKNkvsgStncDHG+7F63rBhVyvfK54xYkUDUIRISHY8uWLejZsyfq1q0LBweHqiEYpSABEvhnBArS8Nv7nyPKtzqkLgbSJeJKr9w/5V6/fc9q7DquBoLa4vFBQ/C/hzogIT4GyZICq9TQRcIReDa9Cy0bhBSLMNNro7F0zMuScXAWakdvjJj2Fd4e9Qx6dLoNrW/viv73NEHaiVMIj08VJ1s0dm86AveGrdC4XjW4lxadV+YMC5CXeAQfDnsN3+4KQ67b7Xjj83kYO+QhtG3ZAp3vfQS1sw6I8SwW6doCpJzbg5yabdCmUV2oXM0xHvr0MPy0fhfikjLkKAnYcVQclgejYax9B54aMgSP92qNxPhYJKdZ5px4GP6t70SL0BB4WqLZCvQxWPzye9h+/Dw0kinwyNtfYPxzj+K2hvXR/Pb70C5QjcPHziNJMqgQ/Tc8mgsz2d/LKQMbpn+BS16BkDB8ZAh7RV8Q5QU79v6CncdSURDQBo8J+0F9b0dSQpywTzfVQEbiMXg26YIWDerA26XoemzQxeH7117F4h0nkaRzRf8JszH26QfRINgXfjWaoEfHGjh89BiiE9QWXcoJ3kpqsMoL9W/rgZ7tGyHAywl5sX9h6qvv4ecj4ah+/wh8OHMinul/D7rc0R0DHmiHgosXcDE6UZynBlw6vhv6ms3QuEE9+LhJuRA6I8v8F8sVJHAjEsjX6bBp0ya4uLigfYcOUprJT/7OK/6HXjz++IYh4IHWndpL+lnRBRYx6cgSq51ymeZCAiRQRQg41MKrm7fiy8/mYf47j8JHUgWsi0eeHwa8Ngdb1y7Eq8Mfx0OPv4z1i99GSKB3Yc2VLfuipIabGKCsi6QfHPpmGpZEZIqhyBmdR83B47fXL6agutftgZkLJiKkurfFw3wck95cgLAkxXBnHejK7wX6TPw0fTS2pachT2q3jZn3Hno1C7ZJS3XH7d0fhIure+FghyRqUCd11spa3JP1+N+42diy7COMHtQfj/zvFWxcMgmhNpFrv+6MFL2zaM7a8P34VdJKc0yDtkTHpjVNtW2sx2h9/2No5ibeeusPFlMoHGpizIbf8eWsL/Hl5Mfgp3Ir3MJd54dHxs7CH2sWijf3SfR9/CWs++Zt1A9WFbLfdkDYKwVxCpcCRP+xEEsvZcq1Vn506ofeHevCQyIVrYtbowfw5oNB8HO33lraSArQRuw9cBDfvNJdlFhnSWfJws8zJ+G4OhXOrUbig9H9UN/HvbDei0tQJ0z47HkEBxX9O5j/+W+ISMuWyEsuJEACJEACJFAFCNgHY9i3K/DFl99g/uT/oX4t30Kh3HQ+6P3se1izahHeeWUoHnliFH6Y9xY6NK0Fa0WJv47FQq0YoKxLQT5O/PgFvj95CYn5TmgzaAoe7dZOouWK7u5uNbtg0kev4baWtaWMhLLjWcyUEhQHxKCmuyr9Jhsb503B5sgwZDi5Y/B7r6HvHU2hKkwHdUOrTj3g7RdglQ4nIzOQqbHVCQpXmT64penx8LC3sXbJTLw14kkMePJFrJz3Nrq0CCmc87YDYqxUWxNigbzo4/hDkwGJz5elMVqLEU4l0YHWpWnX3mgRIEZI6w+i35ie9OyrYciiZZgzfzHmT3kaDcWha13c8iXzYchkrP5xEaa8OkzYP49lc99Cp+Z1CuXYeywOabbsZdT4v1ZiVVgM4pU0WaeeuPu2ppLOWiSLa91ueKFXCOoHWHWeZhg3+3vs2HcQyyY9ikbVPUS/ycHv33yK/edOQl//Ebw87FHcXj/IUo5EOKwZegAALMdJREFUhvVriWHjB6NFq7qmenuKzKtW7MTR8wnIlYwGLiRAAiRgS8D6NGX72w3x2V5uLCh8pJSPiUeRkCMX8Ku4Ud0QE6WQJHCTEAiWKDR7J6llZlqcMfTj7zHpmbvhr3gRLb96Ne6GwbVcpAaJ+Qel4YFtqWR98j58uugAMpWOEQ5tMfThNvB0t45pGUTe3Br1wfh7A+Dtahn54hL8sC9SasRU3NSTfXYDZu6SAsUSDOfU9gX0bCmRck5WSc3H8mvcUgpD+0rTCne4e0i6qqMo1GV6SpwxZNp3eP3JuxEgRaatI7k1uhcvtnWTeinmMT2UOVtXyk9KJzPFvKnUaLOTyFmlOYbtIQpcVQi0t5eqMuZFly9qbInrYHDTZlK/06pwOmPw9G8lrfQeBIlCbD2UV6OueLq2G7wszwTupiYO1rXK2Doc+2uzFHzWmA/UvJrIrJwf28UZ7R58Bi6e3pYf9+NotBg6Jc3XKp/2wu/4/C+JPpDnk/5D74ZKjqfJzpamFkUvxzot0cbJBS7WoU/uRmSaRhpoWH/gOwmQAAmQAAlUDQKBDRrB2d3DIowTHp2gGKvECeUvpTAsv3rU64gBIT6oZrkVu4u+YNugQZ92FAuXH5CIrWy54bfAo/e2RbCU0ii5uNbrjue710IdH8tdNepn/HrgNOIzLYXYSu5QyndN+HYs2pOCaAmGc2w+CHe2amDjYDPv4FO/CfwDA+EpjaoU/cZB0d9slY9i4zqh/2uf4rWhj6CezZxd692JZ9r4o7aXeWM30Sts56x0Q1Xu8w6KfiPjO4guY6t1FEhzMV97R8klMC86KeFRUr8JCG0IZ5HRvEhU3uuf4M3n+6NBoFICxLx41O2A/nX8UN0ykKtkXxVv/pCPs4d3ISs9xbyD1Oj19BR9y7K/+c0JLXoMgCqopuXXYzgTn4AssV2a5Jdfc6N2YfHeFJxPA7r3bY/aUoZEp8mRhmlF+o19tVA0cVfBR2ZqmuuFY4hPTJZmWgw2KYabX0iABEpcg24gIEqHJXmELZLY2deUolXmPaRoS34iARL4DwgYpJBu0d9sJ3RpWadYZJhZJBf4BEv3LEX/FJtaRrbUFSnUygpwYfsanJPmFKZ4s+CmqC5pBlbvdPEpOeOOp4bBe/2HyNBmma4UPyzahuF3N5DCy0WKc/F9bL/lY+9PS6WmnCjMsrTv1BIBLlIDxnYT+exS5wHMf1+P1X+dhsa5Bvo+2R6+pRgOzbt1RGcpHu0qjS2uZvGo0wkDgmvixwJnaFvdgxA/N5mzdDrLzzd1gc1JiECaFDO22rCOnIpBXreGIpxVtRWUwr6gUPsVOVqUJoeZvSlQWQBn5EhpAXOurEVcKTqtFkXSauvUyoA2l2DrnBxdpfBymRfiAkQe2CwNRszGvqULvoZhb4Awse0PK8bDnNP4U0llEWEUWkbjOcSrJa3I1IqucCLWQ/KdBEiABEiABP4zAkZ75R5rvSG2QbvGofC2iQwzC+YM70B7OCq3ZnEAZkr9tnxpLGBeChC1bzPC0pPNDRgC6yNI5S4R/JbVxd6c0K7vQARuihQHVozp3r/ux714vGsb1FJVK3SKFdul2Bc9Dm/8BRlJCaZfW7ZpjOrShba4UUrqgdfsimnj87F+91EkG/1wT7+uCA0qim0rNiRuQ9tmDaTMRZHeUXx96d/cJZ22d426SEvSIq3xXZIJIc9yDqLf6PORJ6V9NEmXkCodacUWZlpOS+RZZrZ4+aSchnUxFtMtb5P03FD4eBa6+SybOcMrUKlXJ1+FfbaUYcmX1NOiRQ9thlEpL2de5BAwXq5rOIpeZSfGxNKXAsQe2w2txdi3/ufVMF44jGDxflr/ZYjbF3aaCPx5IRLp4nRVXJhG4yWkZKVDq3S9lxNepvpU+kH5KwmQwE1MoOR1+QaZar50WDonXhXrDU7EbtMWdTyKe2JukMlQTBK4BQloTJ2vrjTxiwfOSYHmHqaUSfsCLY7s+FPa3SsalCzVfOEmuR+Xq1Lm1d6N7kI391lYZZeFXEVLipU0E1GElKtGWWqWeU/l/7lIikkQZdGsyLVpUUPsXqVpzA4I7fowxsnryovMWfEGX2FDvS7fUv/EsqFbKMZs3IThotQ7uUpsnV6H7NQExIQdli5pP+Dr9fuQXlgTTva5olNdItOUhwNFkLLgyarwg2FIy7sH1cTfbeVVbHNxrtuquRZppU+EUufO5tpsXWF61+D0sWPQ5YmmLI8F3nH7cAzBkgJyOdtmLdogRzzRSoOL5ORqEnnpWYEHkGIH4xcSIAESIAESqGQCStOIK2f4REk31+RM0QvgBceCXJzav1ciutLNsgb4SAS/U+G9t+QEPOt1QGdvH5y3i0Gaci9PTESGdBRV7EyX301L7p2H1IQkuQ+blYVmjYLg5VHSsKXs44AQqRP3gryuvChzFkPTFRQcvVKb3NYB6BqCIdLZ9nHp7uogGQN2EoShVSch/uIJ7Fj/Ixav24XoxMwivUmZYFnqhUlILQwVYX/cyl5VaKBU4tsKdRx5OpbZFB3XAsCg08gcS9N8lA20uHD2FLKzsuSzAzxTTuLCqSTEKnpbiSW4dkP4BetMHWPT1f7w9wiU9FjRZwsFKLEDv5IACdySBG5QQ50GcWcTJCWs6I7gotQ44hXulvxHzEnfxASkrJpSh8WkuxiScG6fQQx1lvkqZU7KU9icg9GulQPWidM4V9FHk8XwJDkKxmry+UrKUEE2kmLFq2vRx+yVIs1X2sci1j99O777NNJf6oYAyYW1GsgUpc9FGlRkpUbjxN6tWDrzE+yKM4pi64omHerh1F/nkaXNv0yp/EeyKOyLzdlJGkN4SDF85Ue59p48jIjUHDSU1A4Xm1xdRycPUTatkktKr5sY+myuzXolmM503kIwadkqPNKiuhhc/5Gk3JkESIAESIAEbiwCYr8p1G+MqQg/ooMm0zIFU0RXOdNxCkSLphIldgqi18h2aRHSlEpxgMrnK91PpVttaqJBDHXm8R1Et7CzuYeXc9R/vOrcofNITs+BoZak0haO5gBnkSEnPR5nDu2UunZzsO2cNAtzcEODFsHQSJ3itDRx2hVufx0+2LI3Dac0hnCXaEdFKoEYdgoxienQ6KvD26ahloOUXbKzs0ruCk/JIFDKkVgXveilZjteMIZLo5GnH7gdQaLgFG1h3ZLvJEACJHBlAtanqStvWYW2MGRH4tgRCVG2cWr06NQKKonK4MWwCp0oikIC/5SA0kHBqp3pshEn7trCP3sXMRZd5R+8YmOq0C6aJJxPMpiVXhHh0PE45FWkvl2R7+DaZ670fCghZL6k74bt+Rmje/TG4Offw+5kJ3QbNBFLfvsLy7/+Er2li1Bp/vBrF0L2VNgXm4+STvwcAgNVYnhTRt6JHzYeMnVjM1rc6EZ9Lk7u3AudpKwok/D0fQJ3NJBurTa1/YoqCobjfEwadHrrCVbG5EICJEACJEACtwABW2djvgZJYuEpDIhX9Bv7YjfgKwIp7lgrZ3NtKi4l66RRl3mbE+eSJJ3U6gEtZ7/rsUpRVEo8eepzsxFxaAPeHjAQg4e8hQ3nsnFbv5fwxaotWL5kMZ5oEArV9Ti27RgK+0JlUlnhhLaSTlyrbi2J8Fe+H8C6HQcQEZ9ZWALEaMhD2IFDyE4zRz26q/qgfT3p1upuNdwpo1jVt1hckijHbMWBenWnUTk4FxIgARIwEShxubwRqBgQtWGldEHUm+tUKSK7eKNXd+mgIx4ZLiRAAjcpATHES2ZEUWpAbCqypbtAhc08DhJALJFdFdKZJCqsmtRNsyq+F8IioM2TGjTloZWOtOqUdOSJ4anc7cobQ1mnRJzZDKCkkh76eQqeGDUZW1M1cPXvhRlL/8DsNwejfYgnnAyKtm2zgzLGv7R4NRuItx+vgzr+UohZjHU7P3sTP2w9hNgU6QaXoUbEwbV4Z95WpGYa4eXrj9e+HIKm0r3VNnTbVmmNv5BcAQOoUWrHZCJPznXlzPJfgsdhSYAESIAESKA0AlKY10kcWoXB50o0V66+uC2ptP2sv4l+U1AYyW79sYx3iQoLkMgxUXFMy6WIaGRJPeBy76/SkTYzLRO5V9KDyjhk4c8lIgWN+Vqc2DgbI1+ZhJ/D4gCfuzBh1k/4fOrL6N40SLq9Sq5rmaU0Cke9Lh88G/TBy480QctaThIlBxz85hOs/O1PXIhPM+k3UUd/x8cLN+NCbA48VH4Y8f5A3N68ZjEnqa1+kxKdLk0k8oRreWSNyJVGEwpXmySx6zIfDkICJHDjE/hPLVvlXbrKQpuvCcOSz1ciX+o4WRev+yaia4iq8KHa+jvfSYAEbiICLjXQpbWjNKCwzCl5I45LdzQpO1ehxbF2O9SSdFKbLIay95O02eatHEVxNm+S/Ot6HJc6KfnlaFL5qQcwstdr2BuplgYYZQ99dWsKEL97AV6c8StSMrRwdO+OWaumo1drqRxntSIWOXOvbuhr2toZ3cf8iDcfrA5fifxzdsvBoglD8PKkDzDj3ZcxYOR7uKSzg19gV7z95VoM6hwKD5toOsXXbMwXs52ls8WvM37G2fh05NtqtyXkMurisfjtd7HpVBy01w9siaPwKwmQAAmQAAn8RwScg6QZgwukp4N5Sd0h98Zk6VRfMWXCMbgFavh4wbUi+oCkzTZo6gIPy7HStm7DycgEZJdzf9Wrj+Gtpydhw74L0FRQ57oyyQIk/b0cb80SPeCSGo5unTBp7mQ8ek8T6ShveTxV3kpkGFx53GvdwgmdhnyB1wfchrq+Eh3nqsVPn7yOVyZOwvvvvor/vTgFf8emS0OQThg97TsMe6AzAm2i6Qr1G0sTip1LtuLYyWjklONkNOpT8OsXc7FupzTs0DD67lrPHPcjgZuVwH9jqJOH3QpHwdiQV8Kj9337OZbF5MuDnXmFk4cv3n3pIfg7Sycdm23NH8WPIQ+AFbvNXbYzfyABEqhSBJzgITXSimqpJOPPfeHQiCey1EW8sHpRcq1//80fbINqbrZ130rdy/Kj1GxxkSImhe7tfVj2699S+Fm8o9YBbXY3StrKX999jnN6X3i4OlpSQ202uNaPBVnYvWwZcrPM3WdDn+yH1jU8pOiw7YClCGS7+lo/X35BlZHE+5sei9h4PexdfXDvkyPw8nND0NBdjxRDAHo9PhLT5i7Flv2L8L+u9eCu1PYrtrigbuum0nnNam39GYvW7UV8mka8yaXMw5iPmN0/YfFOidLTKbkqXEiABEiABEjgZiPgCHdfdzg4WS1tqdh3VDq6Z1iaZ5WcrqLfyIOQ9bbZsEczVA+4vHNryd3M3yVyT+rborB76VGs3XYAkQmS5mkd0GZHoxRe+3v1EpxSG+Hk5maKNrNZfe0fpVbe32t+QXp8gmmMkId6olXDQHjahuBfIR7t2g9e2p5G5GUmID5BOt47eOOuvk/h+eeG4bZq7sg0qNC59yC889kibNi5GKP6t4W/ezFBZUBn1GraAG7eVmvrVqzZsQNnoqTeXmklPgr0SDr8B1bt/B3h6WkSPSk6UKl6V2my8jcSIIFbgUDJq0ylzLlALkixcqTCx7IrXZjkhpQnFVZPrJuJoR9tkMLw5gdzJ3cfdHhpHvo2lq49JZ8H5QEvKyNDipCK68fRFSofb/E0XelAlTJ9HoQEbkkCdoVGr6uYfrG/a3d0H/Qc/DZOR2Zulun6sfn7DYh8sDlUbj6XRdQa8xJw8rg0n1AyQ5298HCPFnB3tRqIriSDOzr1exje2xYgM0+6mMrmO2ZJmmfTRRh8d0sEeIrBT0mjlY6k+XkaxBz6Aa8sOQ7vPk+hjrerTZFk2+PI9acilyDbbYzpiD2lGBzN4zjLpa9Yw1a5Nupy06GW92LOD1G2ddkZ0Dt7wk0U/2tibyuHZRoGXSJWTPofZu5IQKvhX+O9F3og0MvlsvHLPp4D6rRpBy/Xv5CcpTNx3fLZ8whQLcTofneiuq8HnEwXc6lFKF1DshMOYc4bi6HV9kLL6tIVrULhkLbM+ZkESIAESIAE/m0CNh1DK3qoYvdYN9E5nkD1zZcQrY4Rgxmwa+12hPVqh9r+IcUaNinDG3XJOHdGOsArPjwp1XFvl8YIlPtnxRY3tOl5HwK3XEB0RqJJdziw+FOsDA3Gs/26IUTC5R2ktoXSvV2fp0X8ibWY8v0BaNqMQN3qvnApJrfNEcv63WaTYjpQQSYSz+shKpZpcRL9xiiPbIqt0KQuKvpNXiYyDBKcYTuGfNZpsqB3cIWLEqRh2rgiB7cZRNm8xC7G/BSsnzkGs387geCHP8DEFx9BkxpeV6Xf1GjeAj7eW+EQl2VKW963dBoWiOVxlDhZm9X2h6uzoxxW9BtR6rQpp7Hs4+WIvtgIAwPqwFucvCVEshGYH0mABG5FAsUegysLQLY6AudtHyzdpTGEPPAWuoYsghjlN708BKuTLmL1rLEYOOEbqROlXK7t4Obli45DPsLCUXfAzdSlp7j0uXEH8MHIfujYvi3a9n8dv51Ohr6ctLXie/MbCZDAdScgKZEmy4xpYImqvfxP3rym0IIvXy2NFaw/eTd/EIObiMfVGql1cTEWrjl8eaSb1IuL37ceG0TJ1Ep5X1XPiXhA9nO9CkNPrTv74r5AP7gVdvRKxqyRz2L+ml24FJcCtToNSYnh2P3jx+j33EdI0djh2UfawstdCulZFjur4KbvjkV1Na0bWN5NTmzrtm7iJbdqa9L1TFXdDvYWl8qJb1dib3g8sqSNrS5Xg/TkKGycORoHMlIKi1BLX1tkZiVj06dvYsnBS6Y6fijGXmq9KexLyKD8opyTwsVVtrDKYfkxec93+GJnFhQnv502FuHRlxAVHY/Y2EQkJiYhKSkFyckpSE1NEz7pIkcOciU32dZJX+2ufuhfLQieSrs7y7Ji8nMY++4C7DhyAXGS7pMUdwmHd6zC6AdH4ufEbHR94yGE+nkUq3Vn3ZfvJEACJEACJPCfEshXHHdWCeReKje9y++xJR5zlHts0W0Qng174NGmIQi2tkGP+gkrN+xBRKJ0SbW9iUogQtLRrdiamYo0uSt63TEK3Vs2hJ+rzWBWUcp4D25/D+6uVRN+hVEOaVJiYhzmLvsVZy4lSJfVNCQnRmL/unl45uUZOHUpAwN7tUSNQGu0mAysTLBwkqLfiOJS+NXmuKZHL+sKaSZRYG2SYe8KryB76bRq3vjc6t+w72Q4UrR5ot9okZkai+1fv4O9UedgzimA6FBGZOekYvuCGVi6/RgSc6R2sLAvOnA57AvPjxxPAgpt2SsSpB1egyU7YsV4KV9yExEtesil6Lhy9BupLSeBI7bZAAHt70WfkDqoKQ5S69nY9OW7eGvKTKz98ygiohKQFB+Dk/s2YPKw17DkwFmEPt0VTRvXgHthhKMiDRcSIAESkFizSoMgT4DKjcYoURIx5y6YIlEKj50ejQuR8bCXtDZn8TbYKw9wRj202am4cGArPh/3EQ7k5sEoXhMnVw94errj4XFf4s0nO8Ld3J6ncCjrh7D1X+Gng1FSv0ruDud/w7Tlj+K+yT3h5WINK7duyXcSIIF/l4D87UtYW9SJY/Ju9YumIyY1G9paXqZUDwf5mzeKKzVfXKtp6TYGI2lQkKPJRb7KRSKt5NqAAAyeMQmrnpmEsxfjTAb+tR+8gno1v8Yz3ZvDz8MZBeJ9zYndj0/GfINMtUY6j3bAR+MeQjVvt5J2p/Kn7dIYI95+BDsnfoeLcRkin6JpJuOr8c/gq8BW6NjQBUcPHUNenk7SSDzR+NmP0KdZNbiJMdAoLamNokyni9HKqITAmZZ9UgcmGZ1qquAt1yFHy5z1Mme1zFm5VJmWTDU0OVroxavt6OiBoHqSznJCromm1IkdGD16Ct5+7XHUyDyDlTMW4IQox/kGSdW1EwOcjHHi9wV4PyweB47lYMy9Y4VHHqJPHJeoPEtYHjIQq7DP8xUF2QFW9ianSIbIYRU3Uwohixz5ejcLe0AdEyOXZnNE886FU7BzoUXmwrdABAY5QqWqhqDAQNRs1BTdevfBHa0aIkAi75QoRKAm/vfhEGwY8wXORiSZnTTy64FfPjO9gED5liYvca3bOUPVaChG9mkJlUdFoyFlVy4kQAIkQAIk8K8TMEdHxZ09LZFhltAwSKSYOgs50lbVzU30Fmt0mk6caxnSTd58CwWyMuVer5FGSXpxIioNmnwx4I3R2BA3DUkHTiNfnFxb5n2AkGAVhva9E7WUwrAGPTQJR7Bg0lJEn0+Eh3crTBzZB01D/AsNQxWasnN9PCllg/amJiL9dLx0uFdu/GlYPuMV6STfBLeFeiIi7CwyMsRE5uyO0IFvo1f7pvAXY2CB6GoG0bMyxSGnL9TpjuJ8bCzU2fXgJvdqB8lgMkXkyZwzZM4yRfMikf5a0St0eoPU2XWDf21PGV6ey/KUwncHMPW96UhNHohmTonYMHcJDqYKI72jRPhJYw0R8dyulfg0ZiEuXhDD4Vu9pDGuDnHnzkhDhizLAbKQmJ6FbI0O7pKaWox9pq0cMm62LXs7Uwpufq451fjgytlQXsUXP/j5u8DXJwABAUGo0aAR7rj3PtzZrrkpG8DR5NSthr7jnsBfkumQvD+ssPnGyW1L8bq8pFuGvJQyHoo+5gjPuv3waM+OqFfN4/qVTJGRuZAACdwcBBymyFIZU8lJipBOOfE4te17jBm/GGolfVUe2pSQZbu0k1i99Bt8vWA1tu7bih07d+KnFYsw7YPZWPPHXqQ4OcPN0xNeXt5o/eDz+HDmTAzq2gDOikGvjCX52K9YuTNCHmCVm488ONfogmd6N4eH3AxLBImUMULV/3nt2rWSEqZF/wEDxMBZFMVT9SWnhLcOgQLkZcXj7MGNmD1+Ac5mSi0y09+9Gn+ezkP9Gp6wM7rCx8sBcRFnsXfdEkyTCLksqTtnujaojyJFmkj4e3jAN8BHFDvxvvo0QL8u1bF1zzFRciW9wJCDvb+tQIKdvxjucxG2ey3efmEK/pKKx24qFV7/chH6taxxVdF01vPjXb8zbvOOwcHTsRIdliuKp8WapklErHhalahfN08VfHqOweK3+qO2SjEGFkAdFYaT4vGe+fJnOJMmMlqudfsv5KB6kKcoZO7wkznHR57FnnXf4oO1h5Cptc75mGnOge6Ssh9QDfXquWDjzhNiwNSYj6++iF0bf5U6KUehdnXD8Peno3PBYRy/lA2dQa6nUkMuPtke3V74HCPvCEDCyS34fOICnFFnW+RIx/azuahTXVI6hL3KJMc57P31W0xfcwgZ2nwz+3SRw9nK3lf42cOQHoYN2w8jzZS2arl+W+ZmZqaRc5It3vgEREeH4/TR/diwahkuOtdDxxahkvJqriXqUb0NOtfMxf4T4cjOLBEtYGp7K85uZw/4+N6BjxdNxO11/eFUGNloPTt8J4GqTyAiPBxbtmxBz549UbduXXmApbOw6p81SkgCFSEgJSZyknDx2FYsmLoIhyITJXhduS9mYu8FLQIkFdXF3g1eHo5IiQvHwY3L8dmavZLaqjXfY8XZlubgA28PFfwCVKa0SEfvOri3Q00cP3VeItNTTfrN4W3rEK2RLq1OBlw6tBkzxn2A36OSYSf6zYhpM/BY11bwdSn7eaismXjWboMWvuni9IxBsjrH4oyUrbUpSIiLg06a9rl6eEF117P4+PWBaBPiJ8bAAmTERuDs8R2Y/+YXOHg+xjJnOxy7pJXnNDdp+OUujjVlzhE4uGk5Zq7ZgyipQ2vS6TLPypxVUq5E7u8BAQip4449h8MQI11uTc7QjCj8vW0TNvx5EPHihBz4+nh0909CRHSy6IXyNJeZiOQUA9o9ORnP3tMUuqi/8PV73+Dvi/HIs7Dff1ELX5W7lDtyg6cYAVPjI/D3phWY+cseXEotkkMtdei83K3snVCQGYEde48gNjnb1IHVJK9pTOtTo2RoaLMlWyBJouyEwYm/sXnNSpzJU6F5k0bijHSVOUoiSFAztKnphIjIaMkykBIkoida/bASqieAjbB3coG3T1u8PmU0enVRmmfcPM+mZf174+8kcCsSyJcgiU2bNsHFxQXtO3SAn5+f6VpYURZ28uBZdP2o6F7XsN3F1ePx9IytEiaseE0qtlQLboSaDeuieePmaNWuPVo1b2CqDaVcCK+0JP81G/3GLkZmtngtpG35w9NWYlKfxnApDPO+0ghVf/2woUNN4enLvv9eogxtwtGrvuiU8JYhoMPWDx7Ee+uSpdZbGZMOfQnLptbCmNHiSU1Vcg5KW1pj9ppZ6BTiA2sT0bzkk1g4fTS+3ylji1HOnH4gaaJizHOQv/k2vUfipVGDcJtE7f3TP/uYfSvxxsQ5OJuSLo5fJXKtQDy1EhUnbWEffulDvPxUd/hJyqv50qTBaqlt8vnBJGRaAwhLTin0RXz7bjDGvfIpkpLTS661fA/Fxz/Px131AhC36xuMnLwI8SmZpnV2kiLh0PoxfPTW8+jawB/ha9/DS5+tlxTgXNiJIeCx1z7H6AFtcXD2o3h/XQLSy+rDEPoClkwJwfjXZ0jqqroMOVris59mokt9fzhLSvGud+7EyyuTkOfqbb6eSr6PchdRmCg1+6w3FCWqUK/LNZUrUM7Nu6t34an29cWYWnQBV4f9ic9ffg8b45KQZeEq3ULkku2I6p2HYuqkZ9GuplfhOS9DQP5MAlWWwFYx0o0fPx7TP/wQ3bp1o1Otyp4pCkYCV0sgH3vmPYsZq04guqzbeJ1n8Nm4Jlg4dwFOn4ks4wBNMGn+++jVIVTSH82b6NLCsOKLt7B00zkkpEs0mXKTFQ3DrN84oNndT2H4iCHo3DjIFMVfxsAV+jnh6HpMmzoX+85HS0dXs35jZ9JvHHHf02/ghcEPoU6AlyViT4vNU57HnM3HEVuWXhEyCB+Pa4Rv53+Dk6ciy5AhBBPmzkDvjk2QfngVxn+wECcvxJn0B0W/sW/SGxNeHYE+beogaftcvDlrFc7EpIt6YI/ewyfjxSd7IGrVK/h45RFElqW6hPwPH73WHEsXLsQJcQqWvjTGm19MxQOdGsFDKuEdnDUQ4789jLh86aArGV6KUa1Qv1F0HNN5kF8V/UYyxHKlHJNSumnMvBXSBfZOBNgYTDMv/S267adYfeg0EsXoaTqH8gCr6KcBrfpi9CvD0bN1CLysSm3pAvJXEiCBG5hAjhQSHTt2LLy9vfH8qFEIDQ2V58eKO1YqzVD3XzBOPH8IJ8+nwbVWE3RqUctUHPW/kOPfOiYNdf8WWY57IxFQx57D6XORyNBLajzES+kfgNoNGiDYW0m1vI4zMWQi8sJFRMaoTWkirgHV0aBRIwRJmsd1PU5ZImvViIpNgVYUPXd3P9QIkgYaNlHF6oRISKYvvKrVMnUju+4ySYey7Iu7MWXgaGzWtsA730/DfQ39kKvNgVbqyeTl5UqB53ypU1OAfGn2kRAbiZMHtmPdH/sRm5SORz9ejUkPt4OvpAIVX3RICD+P8MgkaCUdxihepxp1mqBRLYmi+6cW1uIH4jcSqHQCNNRVOnIekARuGgIZCeE4dz4caVqjNKlyhqePP2qF1kOw0njpet7kjdmIiYyQGmopyJOAChffQNST1M5gyRKolNtwbgbiElKRLSU+XKQ5WHCgZFCYDGXmU5mREgN1Vj7c/KvDz9NV5n6dT3GBATliWJv1/ASsifDB8Nnv/L+9e4ux6ioDAPwzA+PMAJ0OQ7kzHQcIWqAXamgHDKkaodgYtNiGi6k8tPGh0ZpqSRtjjNYajZcmbUQjxvqAD176QDU1WokJbWKDKRZQG2oBOxLuFA4ZmGFuuA6F2AtzplzmZHP2t8Pmctacs9b6fpLZ8++9/hWfnt8aw1Kd9JNnr29OpaXMvalGSbFcycF97fHKlhfi2Y1/jZ3pab9FD6Vk4mdvj5bGVITvbUdPHN6Tat39Z29ardAdfWmF2DWT3h/TmyfEqPe8udnbPtA/CBC4ggQuNVH3zp+YrqCpDz7U8TNujvEzBv86X0GAwJUr0Dh5ZixI55AfaZlEy8yb0jnkPZ2/g7rGaJ7eeP629GrjhJYYuHXAt73nhu43tsV3ln8pNuwvxOd++nAsmpV2KUt3j68a3TDAZyyMTy67J1Z+7Pux7Mvr4vV9qe5e77nn7d76lpqY0DrrzPnWV/2dAAECBAjkWaBhQmvMS+eQH1WjYkrrnHQOeU/n76C2ISa1DHQtEakMyJR0nv+tl+PVnsIr8ZMvfDV+vW1XLP72urhjwey0o32xLu7AY/rEp1bG8kU/S7WM16blssXVA+dbMTYixk5Jq8HS6SBAgMCFClzuexIX2r+vJ0CAAIGsC5zuir+s/VpsKBxJFeQ+EPOvSzvo1gz+uGJ/T2cUDh1ItWdGxLw5E6PWZj5Zj7TxESBAgACB/AicPhUvrn88nml/LQ5Ha8ydNiGuTjX2Bjv6e7ui48ih6Ouuihtmjk/1ft/5NN1gn6CdAAECpQUk6kr7aCVAgACBzp2x4Zm9aRfY4h3j7bFp86ux/9DxVHO0WJ/l/3VbilDFnd76045wnScKsfulp2PN955N5ZOXxm0zJ0RdjW85/jMRIECAAAECGRHoao/n/rwn1Qsu7sS6IzZv2xHte4+mJa9pqWqx7u7ZunTF0Z67vuk6eTzat/0hHn3yd2lzkLZom96a6hTbKCgjETUMAhUjMPgtg4qZqokQIECAwEUJDKuO99WmAs/FnXzSReu6B1fEi4tWxz133xFzZ06NxlGpjs2IdJGa2np7T8bRA7vihQ2/jMfXb4q+4TXx4I9Xx+yJV4VvOBel700ECBAgQIDAUAgUr29SGY/qYs2/dOPxV489EC9vWhbL71oabXOmxdiGkWkToDevXvp6O+PYoddj8x9/G2vXb4zDnX1x37fujlvnTI7awRcZDMXofSYBAhUs4OemCg6uqREgQOCyCNQ1x7LPzI4t67tiz75CnEp3mbf/6RfxUDqLxzXjpsXVkxqiKhVd3rXztejp7Y3aulExcuS8eOTJb8adbddGvZ3Nzlj5jQABAgQIEMiIQO3EWLxkVvxt/9745+6j0dXXGzuefzq+kc7iMaapOcZMaorqvu74b9pw42RnZ7pxWZ829bopvvjYw7Hi9uvTBl6epstINA2DQEUJSNRVVDhNhgABAkMhUB8ffuDn8VTb7+NHj/wwnj+YdmdLy16LCbni0pDjhT1nzurq4VFbPyoaakbER1Z+Je6/985oHVMf1e40D0VQfCYBAgQIECBwSQJ18aHV340n5i6Opx59Ip7bsTveOHt905+esDvRcSBOvHogqqqq08qBmmhqGhltS++Lz9+7ImZPbQoVPS4J35sJECghIFFXAkcTAQIECJwTqI7WeUvjBxuXxIFd/4otL22Jrf/YHQcLHdGX6tIVj4ZxU2P2DQvi1vk3xuTGOgm6c3T+JECAAAECBDIqUB3N1388vv6b2+L+9n/Htr9viZe374y9RwrR0//mbq6jmybGB2ffEre03RzN40ZHjTuQGY2lYRGoHAGJusqJpZkQIECgDAI1Mb71xlhSPO8qQ3e6IECAAAECBAgMucCIGNt8XXy0eC4d8s50QIAAgZICtuAryaORAAECBAgQIECAAAECBAgQIECAQHkEJOrK46wXAgQIECBAgAABAgQIECBAgAABAiUFJOpK8mgkQIAAAQIECBAgQIAAAQIECBAgUB4BibryOOuFAAECBAgQIECAAAECBAgQIECAQEkBibqSPBoJECBAgAABAgQIECBAgAABAgQIlEdAoq48znohQIAAAQIECBAgQIAAAQIECBAgUFJAoq4kj0YCBAgQIECAAAECBAgQIECAAAEC5RGQqCuPs14IECBAgAABAgQIECBAgAABAgQIlBSQqCvJo5EAAQIECBAgQIAAAQIECBAgQIBAeQQk6srjrBcCBAgQIECAAAECBAgQIECAAAECJQUk6kryaCRAgAABAgQIECBAgAABAgQIECBQHgGJuvI464UAAQIECBAgQIAAAQIECBAgQIBASQGJupI8GgkQIECAAAECBAgQIECAAAECBAiUR0CirjzOeiFAgAABAgQIECBAgAABAgQIECBQUkCiriSPRgIECBAgQIAAAQIECBAgQIAAAQLlEZCoK4+zXggQIECAAAECBAgQIECAAAECBAiUFJCoK8mjkQABAgQIECBAgAABAgQIECBAgEB5BCTqyuOsFwIECBAgQCCHAsOGDYs4fTr9Op3D2ZsyAQIECBAgQCB/Apd61Tc8f2SVM+OqdPFfvPA/evRodHd3V87EzIQAAQIECFSAQEdHR1RXV0fHiRNnvlfX1NRUwKxMgQABAgQIECBAoJTAyXTt19fXF1VVF/ds3LCU6LnUZF+p8WkbQoE1a9bEtq1bz/wQMITd+GgCBAgQIEDgIgSKF2hNTU1RKBQ8UXcRft5CgAABAgQIELhSBXp6emLhwoWxatWquLal5YKSdp6ou1KjnsY9Y8aM6D51Kvr7+6/gWRg6AQIECBCoXIGxY8fGsWPHore3t3InaWYECBAgQIAAAQLvEmhJCbq6+vo4UwrlXa0Dv+CJuoFttBAgQIAAAQIECBAgQIAAAQIECBAom8DFLZgt2/B0RIAAAQIECBAgQIAAAQIECBAgQCAfAhJ1+YizWRIgQIAAAQIECBAgQIAAAQIECGRcQKIu4wEyPAIECBAgQIAAAQIECBAgQIAAgXwISNTlI85mSYAAAQIECBAgQIAAAQIECBAgkHEBibqMB8jwCBAgQIAAAQIECBAgQIAAAQIE8iEgUZePOJslAQIECBAgQIAAAQIECBAgQIBAxgUk6jIeIMMjQIAAAQIECBAgQIAAAQIECBDIh4BEXT7ibJYECBAgQIAAAQIECBAgQIAAAQIZF5Coy3iADI8AAQIECBAgQIAAAQIECBAgQCAfAhJ1+YizWRIgQIAAAQIECBAgQIAAAQIECGRcQKIu4wEyPAIECBAgQIAAAQIECBAgQIAAgXwISNTlI85mSYAAAQIECBAgQIAAAQIECBAgkHEBibqMB8jwCBAgQIAAAQIECBAgQIAAAQIE8iEgUZePOJslAQIECBAgQIAAAQIECBAgQIBAxgUk6jIeIMMjQIAAAQIECBAgQIAAAQIECBDIh4BEXT7ibJYECBAgQIAAAQIECBAgQIAAAQIZF5Coy3iADI8AAQIECBAgQIAAAQIECBAgQCAfAhJ1+YizWRIgQIAAAQIECBAgQIAAAQIECGRcQKIu4wEyPAIECBAgQIAAAQIECBAgQIAAgXwI/A919QNVx+WfTwAAAABJRU5ErkJggg==" alt></p>
<p> </p>
<p> </p>
<p style="text-align: center;"> </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">There were many comments on this question from the teachers, ranging from it being unfair to it being impossible. The physics of the situation is clear, though. The process is adiabatic, as there is no thermal energy transfer involved. It is also reversible. Hence there is no change of entropy either in the gas or the surroundings (Entropy change = ΔQ/T). Alternatively it can be argued that the total entropy cannot decrease, hence, by elimination, D must be the best answer. This question is covered by the syllabus item 10.3.3 and was deemed fair.</div>
</div>
</div>
<br><hr><br><div class="question">
<p>A piece of ice melts at constant temperature. Which of the following gives the correct change in the entropy of the water molecules and that of the surroundings?</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">
<div class="page" title="Page 8">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">A large number of candidates opted for C. This stems from the misconception that the entropy of the surroundings must always increase, but there are situations where there may be a decrease in the entropy of the surroundings. </span></p>
</div>
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</div>
</div>
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