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</div><h2>SL Paper 2</h2><div class="specification">
<p>In a pumped storage hydroelectric system, water is stored in a dam of depth 34 m.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-12_om_13.07.03.png" alt="M18/4/PHYSI/SP2/ENG/TZ2/05"></p>
<p>The water leaving the upper lake descends a vertical distance of 110 m and turns the turbine of a generator before exiting into the lower lake.</p>
</div>
<div class="specification">
<p>Water flows out of the upper lake at a rate of 1.2 × 10<sup>5</sup> m<sup>3</sup> per minute. The density of water is 1.0 × 10<sup>3</sup> kg m<sup>–3</sup>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the specific energy of water in this storage system, giving an appropriate unit for your answer.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Show that the average rate at which the gravitational potential energy of the water decreases is 2.5 GW.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The storage system produces 1.8 GW of electrical power. Determine the overall efficiency of the storage system.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>After the upper lake is emptied it must be refilled with water from the lower lake and this requires energy. Suggest how the operators of this storage system can still make a profit.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Average height = 127 <strong>«</strong>m<strong>»</strong></p>
<p>Specific energy «= \(\frac{{mg\bar h}}{m} = g\bar h\) = 9.81 × 127» = 1.2 × 10<sup>3</sup> J kg<sup>–1</sup></p>
<p> </p>
<p><em>Unit is essential</em></p>
<p><em>Allow </em><em>g = 10 gives 1.3 × 10<sup>3</sup> J kg<sup>–1</sup></em></p>
<p><em>Allow ECF from 110 m</em></p>
<p><em> (1.1 × 10<sup>3</sup> J kg<sup>–1</sup>) or 144 m</em></p>
<p><em> (1.4 × 10<sup>3</sup> J kg<sup>–1</sup>)</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mass per second leaving dam is \(\frac{{1.2 \times {{10}^5}}}{{60}}\) × 10<sup>3</sup> = <strong>«</strong>2.0 × 10<sup>6</sup> kg s<sup>–1</sup><strong>»</strong></p>
<p>rate of decrease of GPE is = 2.0 × 10<sup>6</sup> × 9.81 × 127</p>
<p>= 2.49 × 10<sup>9</sup> <strong>«</strong><em>W</em><strong>»</strong> /2.49 <strong>«</strong><em>GW</em><strong>»</strong></p>
<p> </p>
<p><em>Do not award ECF for the use of 110 m or 144 m</em></p>
<p><em>Allow 2.4 GW if rounded value used from (a)(i) or 2.6 GW if </em><em>g = 10 is used</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>efficiency is <strong>«</strong><span class="Apple-converted-space">\(\frac{{1.8}}{{2.5}}\) =</span><strong>»</strong> 0.72 / 72%</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water is pumped back up at times when the demand for/price of electricity is low</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about the oscillation of a mass. <strong>Part 2 </strong>is about nuclear fission.</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 1 </strong>Oscillation of a mass</p>
<p class="p1">A mass of 0.80 kg rests on a frictionless surface and is connected to two identical springs both of which are fixed at their other ends. A force of 0.030 N is required to extend or compress each spring by 1.0 mm. When the mass is at rest in the centre of the arrangement, the springs are not extended.</p>
</div>
<div class="specification">
<p class="p1">The mass is displaced to the right by 60 mm and released.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_08.55.14.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/05_Part1.a"></p>
</div>
<div class="specification">
<p class="p1">The motion of an ion in a crystal lattice can be modelled using the mass–spring arrangement. The inter-atomic forces may be modelled as forces due to springs as in the arrangement shown.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_09.00.34.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/05_Part1.b"></p>
<p class="p1">The frequency of vibration of a particular ion is \(7 \times {10^{12}}{\text{ Hz}}\) and the mass of the ion is \(5 \times {10^{ - 26}}{\text{ kg}}\). The amplitude of vibration of the ion is \(1 \times {10^{ - 11}}{\text{ m}}\).</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 2</strong> Nuclear fission</p>
</div>
<div class="specification">
<p class="p1">A reaction that takes place in the core of a particular nuclear reactor is as shown.</p>
<p class="p1">\[_{\;92}^{235}{\text{U}} + _0^1{\text{n}} \to _{\;56}^{144}{\text{Ba}} + _{36}^{89}{\text{Kr}} + 3_0^1{\text{n}}\]</p>
<p class="p1">In the nuclear reactor, \(9.5 \times {10^{19}}\) fissions take place every second. Each fission gives rise to 200 MeV of energy that is available for conversion to electrical energy. The overall efficiency of the nuclear power station is 32%.</p>
</div>
<div class="specification">
<p class="p1">In addition to the U-235, the nuclear reactor contains a moderator and control rods. Explain the function of the</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the acceleration of the mass at the moment of release.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline why the mass subsequently performs simple harmonic motion (SHM).</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the period of oscillation of the mass.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Estimate the maximum kinetic energy of the ion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">On the axes, draw a graph to show the variation with time of the kinetic energy of mass and the elastic potential energy stored in the springs. You should add appropriate values to the axes, showing the variation over one period.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_13.12.52.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/05.b.ii"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the wavelength of an infrared wave with a frequency equal to that of the model in (b).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the mass of U-235 that undergoes fission in the reactor every day.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the power output of the nuclear power station.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">moderator.</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">control rods.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">force of 1.8 N for each spring so total force is 3.6 N;</p>
<p class="p1">acceleration \( = \frac{{3.6}}{{0.8}} = 4.5{\text{ m}}{{\text{s}}^{ - 2}}\); <em>(allow ECF from first marking point)</em></p>
<p class="p1">to left/towards equilibrium position / negative sign seen in answer;</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">force/acceleration is in opposite direction to displacement/towards equilibrium position;</p>
<p class="p1">and is proportional to displacement;</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\omega = \left( {\sqrt {\left( {\frac{a}{x}} \right)} = } \right){\text{ }}\sqrt {\frac{{4.5}}{{60 \times {{10}^{ - 3}}}}} {\text{ }}( = 8.66{\text{ rad}}\,{{\text{s}}^{ - 1}})\);</p>
<p>\(T = 0.73{\text{ s}}\);</p>
<p><em>Watch out for ECF from (a)(i) eg award </em><strong><em>[2] </em></strong><em>for </em>\(T = 1.0{\text{ }}s\) <em>for </em>\(a = 2.25{\text{ m}}\,{{\text{s}}^{ - 2}}\)<em>.</em></p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\(\omega = 2\pi \times 7 \times {10^{12}}( = 4.4 \times {10^{13}}Hz)\);</p>
<p class="p1">\(5 \times {10^{ - 21}}{\text{ J}}\);</p>
<p class="p1"><em>Allow answers in the range of 4.8 to </em>\(4.9 \times {10^{ - 21}}{\text{ J}}\) <em>if 2 sig figs or more are used.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-09-02_om_13.16.40.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/05.b.ii/M"></p>
<p class="p1">KE and PE curves labelled – very roughly \({\cos ^2}\) and \({\sin ^2}\) shapes; } <span class="s2"><em>(allow reversal of curve labels)</em></span></p>
<p class="p1">KE and PE curves in anti-phase and of equal amplitude;</p>
<p class="p1">at least one period shown;</p>
<p class="p1">either \({E_{\max }}\) marked correctly on energy axis, or \(T\) marked correctly on time axis;</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\(7.0 \times {10^{12}}{\text{ Hz}}\) is equivalent to wavelength of \(4.3 \times {10^{ - 5}}{\text{ m}}\);</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">number of fissions in one day \( = 9.5 \times {10^{19}} \times 24 \times 3600{\text{ }}( = 8.2 \times {10^{24}})\);</p>
<p class="p1">mass of uranium atom \( = 235 \times 1.661 \times {10^{ - 27}}{\text{ }}( = 3.9 \times {10^{ - 25}}{\text{ kg)}}\);</p>
<p class="p1">mass of uranium in one day \(( = 8.2 \times {10^{24}} \times 3.9 \times {10^{ - 25}}) = 3.2{\text{ kg}}\);</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">energy per fission \( = 200 \times {10^6} \times 1.6 \times {10^{ - 19}}{\text{ }}( = 3.2 \times {10^{ - 11}}{\text{ J)}}\);</p>
<p class="p1">power output \( = (9.5 \times {10^{19}} \times 3.2 \times {10^{ - 11}} \times 0.32 = ){\text{ }}9.7 \times {10^8}{\text{ W}}\);</p>
<p class="p1"><em>Award </em><strong><em>[1] </em></strong><em>for an answer of </em>\(6.1 \times {10^{27}}{\text{ eV}}{{\text{s}}^{ - 1}}\)<em>.</em></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">neutrons have to be slowed down (before next fission);</p>
<p class="p1">because the probability of fission is (much) greater (with neutrons of thermal energy);</p>
<p class="p1">neutrons collide with/transfer energy to atoms/molecules (of the moderator);</p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">have high neutron capture cross-section/good at absorbing neutrons;</p>
<p class="p1">(remove neutrons from the reaction) thus controlling the rate of nuclear reaction;</p>
<div class="question_part_label">e.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">This is a slightly different situation. Most candidates at SL did not use F and m to find acceleration. Very few added the force due to each spring and ECF was frequently applied.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Care was needed in showing the constant and equal amplitudes. Many poor answers were seen.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Mostly good answers although it was rare to find a candidate who stated that the probability of further fusion is increased with thermal neutrons.</p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Too many answers lacked precision referring only to the use of control rods in avoiding an explosion or meltdown.</p>
<div class="question_part_label">e.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about energy resources. <strong>Part 2 </strong>is about thermal physics.</p>
<p class="p1"><strong>Part 1 </strong>Energy resources</p>
<p class="p1">Electricity can be generated using nuclear fission, by burning fossil fuels or using pump storage hydroelectric schemes.</p>
</div>
<div class="specification">
<p class="p1">In a nuclear reactor, outline the purpose of the</p>
</div>
<div class="specification">
<p class="p1">Fission of one uranium-235 nucleus releases 203 MeV.</p>
</div>
<div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about energy resources. <strong>Part 2 </strong>is about thermal physics.</p>
<p class="p1"><strong>Part 2 </strong>Thermal physics</p>
</div>
<div class="specification">
<p class="p1">A mass of 0.22 kg of lead spheres is placed in a well-insulated tube. The tube is turned upside down several times so that the spheres fall through an average height of 0.45 m each time the tube is turned. The temperature of the spheres is found to increase by 8 °C.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-30_om_17.06.57.png" alt="N15/4/PHYSI/SP2/ENG/TZ0/05.f"></p>
<p class="p1"> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline which of the three generation methods above is renewable.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">heat exchanger.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">moderator.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the maximum amount of energy, in joule, released by 1.0 g of uranium-235 as a result of fission.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the main principles of the operation of a pump storage hydroelectric scheme.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A hydroelectric scheme has an efficiency of 92%. Water stored in the dam falls through an average height of 57 m. Determine the rate of flow of water, in \({\text{kg}}\,{{\text{s}}^{ - 1}}\), required to generate an electrical output power of 4.5 MW.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Distinguish between specific heat capacity and specific latent heat.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss the changes to the energy of the lead spheres.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The specific heat capacity of lead is \(1.3 \times {10^2}{\text{ J}}\,{\text{k}}{{\text{g}}^{ - 1}}{{\text{K}}^{ - 1}}\)<span class="s1">. Deduce the number of times that the tube is turned upside down.</span></p>
<div class="marks">[4]</div>
<div class="question_part_label">f.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">pump storage;</p>
<p class="p1">renewable as can be replaced in short time scale / storage water can be pumped back up to fall again / source will not run out; } <span class="s1"><em>(do not accept “because water is used”)</em></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(allows coolant to) transfer thermal/heat (energy) from the reactor/(nuclear) reaction to the water/steam;</p>
<p class="p1"><em>Must see reference to transfer – “cooling reactor/heating up water” is not enough.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">reduces speed/kinetic energy of neutrons; <em>(do not allow “particles”) </em></p>
<p class="p1">improves likelihood of fission occurring/U-235 capturing neutrons;</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(203 MeV is equivalent to) \(3.25 \times {10^{ - 11}}\) (J);</p>
<p class="p1">\(6.02 \times {10^{23}}\) nuclei have a mass of 235 (g) / evaluates number of nuclei;</p>
<p class="p1">(\(2.56 \times {10^{21}}\) nuclei produce) \(8.32 \times {10^{10}}\) (J) / multiplies two previous answers;</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for bald correct answer.</em></p>
<p class="p1"><em>Award </em><strong><em>[1] </em></strong><em>for correct conversion from eV to J even if rest is incorrect.</em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">water flows between water masses/reservoirs at different levels;</p>
<p class="p1">flow of water drives turbine/generator to produce electricity;</p>
<p class="p1">at off peak times the electricity produced is used to raise water from lower to higher reservoir;</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">use of \(\frac{{mgh}}{t}\);</p>
<p class="p1">\(\frac{m}{t} = \frac{{4.5 \times {{10}^6}}}{{0.92 \times 9.81 \times 57}}\); <em>(t is usually ignored, assume 1 s if not seen)</em></p>
<p class="p1">\(8.7 \times {10^3}{\text{ (kg}}\,{{\text{s}}^{ - 1}}{\text{)}}\);</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for a bald correct answer.</em></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">specific heat capacity is/refers to energy required to change the temperature (without changing state);</p>
<p class="p1">specific latent heat is energy required to change the state/phase without changing the temperature;</p>
<p class="p1"><em>If definitions are given they must include salient points given above.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">gravitational potential energy \( \to \) kinetic energy;</p>
<p class="p1">kinetic energy \( \to \) internal energy/thermal energy/heat energy;</p>
<p class="p1"><em>Do not allow heat.</em></p>
<p class="p1"><em>Two separate energy changes must be explicit.</em></p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">use of \(mc\Delta T\);</p>
<p class="p1">use of \(n \times mg\Delta h\);</p>
<p class="p1">equating \((c\Delta T = ng\Delta h)\);</p>
<p class="p1">236 <strong><em>or </em></strong>240;</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">use of \(\Delta U = mc\Delta T\);</p>
<p class="p1">\((0.22 \times 1.3 \times {10^2} \times 8 = ){\text{ }}229{\text{ (J)}}\);</p>
<p class="p1">\(n \times mg\Delta h = 229{\text{ (J)}}\);</p>
<p class="p1">\(n = \frac{{229}}{{0.22 \times 9.81 \times 0.45}} = 236\) <strong><em>or </em></strong>240; } <em>(allow if answer is rounded up to give complete number of inversions)</em></p>
<p class="p1"><em>Award </em><strong><em>[4] </em></strong><em>for a bald correct answer.</em></p>
<div class="question_part_label">f.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The essential difference between specific heat capacity and specific latent heat is that the former refers to a change of temperature without changing state; whereas the latter refers to a change of state without changing temperature. Most candidates just wrote definitions which they had learnt by rote – and omitted the constant temperature for a substance changing state.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">This is a question specifically about energy changes so candidates are expected to use accurate language and spell out the changes one by one. Common mistakes were omitting the “gravitational” in gravitational potential energy; referring to “heat” rather than thermal energy; and saying that gravitational potential energy changed to thermal and kinetic energy as if it were a single process.</p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">This was generally well done. There were four marks and the question asks the candidates to “deduce” so it is essential that the argument is transparent. The examiner cannot be expected to search through a mass of numbers in order to carry forward an error.</p>
<div class="question_part_label">f.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about energy resources. <strong>Part 2 </strong>is about electric fields.</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 1</strong> Energy resources</p>
</div>
<div class="specification">
<p class="p1">A photovoltaic panel is made up of a collection (array) of photovoltaic cells. The panel has a total area of \({\text{1.3 }}{{\text{m}}^{\text{2}}}\) and is mounted on the roof of a house. The maximum intensity of solar radiation at the location of the panel is \({\text{750 W}}\,{{\text{m}}^{ - 2}}\). The panel produces a power output of 210 W when the solar radiation is at its maximum intensity.</p>
</div>
<div class="specification">
<p class="p1">The owner of the house chooses between photovoltaic panels and solar heating panels to provide 4.2 kW of power to heat water. The solar heating panels have an efficiency of 70%. The maximum intensity of solar radiation at the location remains at \({\text{750 W}}\,{{\text{m}}^{ - 2}}\).</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 2</strong> Electric fields</p>
<p class="p1">An isolated metal sphere is placed in a vacuum. The sphere has a negative charge of magnitude 12 nC.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_10.12.42.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/06_Part2"></p>
</div>
<div class="specification">
<p class="p1">Outside the sphere, the electric field strength is equivalent to that of a point negative charge of magnitude 12 nC placed at the centre of the sphere. The radius \(r\)<em> </em>of the sphere is 25 mm.</p>
</div>
<div class="specification">
<p class="p1">An electron is initially at rest on the surface of the sphere.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The Sun is a renewable energy source whereas a fossil fuel is a non-renewable energy source. Outline the difference between renewable and non-renewable energy sources.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">With reference to the energy transformations and the operation of the devices, distinguish between a photovoltaic cell and a solar heating panel.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the efficiency of the photovoltaic panel.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>two </strong>reasons why the intensity of solar radiation at the location of the panel is not constant.</p>
<p class="p1"> </p>
<p class="p1">1.</p>
<p class="p1"> </p>
<p class="p1">2.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the minimum area of solar heating panel required to provide this power.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Comment on whether it is better to use a solar heating panel rather than an array of photovoltaic panels for the house. Do not consider the installation cost of the panels in your answer.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Using the diagram, draw the electric field pattern due to the charged sphere.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Show that the magnitude of the electric field strength at the surface of the sphere is about \(2 \times {10^5}{\text{ N}}\,{{\text{C}}^{ - 1}}\).</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">On the axes, draw a graph to show the variation of the electric field strength \(E\) with distance \(d\) from the centre of the sphere.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_14.39.55.png" alt="N14/4/PHYSI/SP2/ENG/TZ0/06.g.ii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">g.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the initial acceleration of the electron.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss the subsequent motion of the electron.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>renewable sources</em>:</p>
<p class="p1">rate of use/depletion of energy source;</p>
<p class="p1">is less than rate of production/regeneration of source;</p>
<p class="p1"><em>Accept equivalent statement for non-renewable sources.</em></p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">mention of rate of production / usage;</p>
<p class="p1">comparison of sources in terms of being used up/depleted/lasting a long time <em>etc</em>;</p>
<p class="p1"><em>Award </em><strong><em>[1] </em></strong><em>if answer makes clear the difference but does not address the rate of </em><em>production.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">solar heating panel converts solar/radiation/photon/light energy into thermal/heat energy <span style="text-decoration: underline;">and</span> photovoltaic cell converts solar/radiation/photon/light energy into electrical energy; } <em>(both needed)</em></p>
<p class="p1">in solar heating hot liquid is stored/circulated <span style="text-decoration: underline;">and</span> photovoltaic cell generates emf/pd; } <em>(both needed)</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(power available at roof) \( = 1.3 \times 750{\text{ }}( = 975{\text{ W}})\);</p>
<p class="p1">efficiency \( = \left( {\frac{{210}}{{975}} = } \right){\text{ }}0.22\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)22%;</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">depends on time of day;</p>
<p class="p1">depends of time of year;</p>
<p class="p1">depends on weather (<em>eg </em>cloud cover) at location;</p>
<p class="p1">power output of Sun varies;</p>
<p class="p1">Earth-Sun distance varies;</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">area of panel \( = \frac{{4200}}{{0.7 \times 750}}\);</p>
<p class="p1">\({\text{8 }}{{\text{m}}^{\text{2}}}\);</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">calculates area of photovoltaic panels needed as about \({\text{26 }}{{\text{m}}^{\text{2}}}\) / makes a quantitative comparison;</p>
<p class="p1">solar heating takes up less area/more efficient/faster;</p>
<p class="p1">further energy conversion needed, from electrical to thermal, with photovoltaic panels, involving further losses / <em>OWTTE</em>;</p>
<p class="p1"><em>Allow ECF from (d)(i) with appropriate reverse argument.</em></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">radial field with arrows <span style="text-decoration: underline;">and</span> direction correct towards the sphere; <em>(both needed)</em></p>
<p class="p1">no field inside sphere;</p>
<p class="p1"><em>At least four lines of force to be shown on diagram.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">use of \(E = \frac{{kQ}}{{{r^2}}}\);</p>
<p class="p1">\(1.73 \times {10^5}{\text{ N}}\,{{\text{C}}^{ - 1}}\); <em>(must see answer to 2</em><span class="s1">+ </span><em>significant figures)</em></p>
<div class="question_part_label">g.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><span style="text-decoration: underline;">line drawn</span> showing zero field strength inside sphere;</p>
<p class="p1">decreasing in inverse square-like way from a value of \(2 \times {10^5}{\text{ N}}\,{{\text{C}}^{ - 1}}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)\(1.7 \times {10^5}{\text{ N}}\,{{\text{C}}^{ - 1}}\) at the surface, \(d = 25{\text{ mm}}\);</p>
<div class="question_part_label">g.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">force \( = 1.7 \times {10^5} \times 1.6 \times {10^{ - 19}}\); <em>(allow use of </em>\(2 \times {10^5}{\text{ N}}{{\text{C}}^{ - 1}}\)<em>)</em></p>
<p class="p1">acceleration \( = \left( {\frac{{2.7 \times {{10}^{ - 14}}}}{{9.1 \times {{10}^{ - 31}}}} = } \right){\text{ }}3.0 \times {10^{16}}{\text{ m}}\,{{\text{s}}^{ - 2}}\);</p>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><span style="text-decoration: underline;">radially</span> away from sphere / away from <span style="text-decoration: underline;">centre</span> of sphere;</p>
<p class="p1">velocity increasing but at a decreasing rate / accelerating with decreasing acceleration;</p>
<p class="p1">because (electric) field (strength) is decreasing;</p>
<div class="question_part_label">h.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">It was disappointing to see some candidates sketching very imprecise lines. Most fields were radial, but often with incorrect direction.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Another “show that” question which often elicited a jumble of numbers. Line of reasoning needs to be clear. Although there were many arithmetic/POT mistakes the field strength was often given correctly.</p>
<div class="question_part_label">g.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">It was extremely rare to find a zero line for the field inside of the sphere. The inverse square drop-off was often very approximate and did not always start from the surface of the sphere. The line should not touch the \(x\)-axis, but often did.</p>
<div class="question_part_label">g.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">This was done correctly by a minority of candidates with many arithmetic and POT errors.</p>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Some candidates clearly do not fully understand the difference between velocity and acceleration. It was rare to find that direction of motion was given with precision. Some candidates said that the electron would stop as the field strength approached zero.</p>
<div class="question_part_label">h.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about a nuclear reactor. <strong>Part 2</strong> is about simple harmonic<br>oscillations.</p>
<p><strong>Part 1</strong> Nuclear reactor</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The reactor produces 24 MW of power. The efficiency of the reactor is 32 %. In the fission of one uranium-235 nucleus 3.2×10<sup>−11</sup>J of energy is released.</p>
<p>Determine the mass of uranium-235 that undergoes fission in one year in this reactor.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain what would happen if the moderator of this reactor were to be removed.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>During its normal operation, the following set of reactions takes place in the reactor.</p>
<p>\({}_0^1{\rm{n}} + {}_{92}^{238}{\rm{U}} \to {}_{92}^{239}{\rm{U}}\) (I)</p>
<p>\({}_{92}^{239}{\rm{U}} \to {}_{93}^{239}{\rm{Np}} + {}_{ - 1}^0e + \bar v\) (II)</p>
<p style="text-align: left;">\({}_{93}^{239}{\rm{Np}} \to {}_{94}^{239}{\rm{Pu}} + {}_{ - 1}^0e + \bar v\) (III)</p>
<p style="text-align: left;">(i) State the name of the process represented by reaction (II).</p>
<p style="text-align: left;">(ii) Comment on the international implications of the product of these reactions.</p>
<p style="text-align: left;"> </p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>power produced \(\left( {\frac{{24}}{{0.32}}} \right)\)=75MW;<br>energy produced in a year (75×10<sup>6</sup>×365×24×60×60=)2.37×10<sup>15</sup>J;<br>number of reactions required in one year \(\left( {\frac{{2.37 \times {{10}^{15}}}}{{3.2 \times {{10}^{ - 11}}}}} \right) = 7.39 \times {10^{25}}\);<br>mass used (7.39×10<sup>25</sup>×235×1.66×10<sup>−27</sup>)≈29kg;</p>
<p><em><strong>or</strong></em></p>
<p>mass used \(\left( {\frac{{7.39 \times {{10}^{25}}}}{{6.02 \times {{10}^{23}}}} \times 235 \times {{10}^{ - 3}}} \right) = 29{\rm{kg}}\);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>the neutrons would not be slowed down;<br>therefore they would not be/have less chance of being captured/induce fission;<br>so (much) less/no power would be produced;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) beta decay;</p>
<p>(ii) the reactions end up producing plutonium (from uranium 238);<br>(this isotope of) plutonium may be used to manufacture nuclear weapons / can be used as fuel in other reactors / plutonium is extremely toxic;</p>
<p><em><strong>or</strong></em></p>
<p>the products of the reactions are radioactive for long periods of time / <em>OWTTE</em>;<br>therefore posing storage/safety problems;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Melting of the Pobeda ice island</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The Pobeda ice island forms regularly when icebergs run aground near the Antarctic ice shelf. The “island”, which consists of a slab of pure ice, breaks apart and melts over a period of decades. The following data are available.</p>
<p style="padding-left: 30px;">Typical dimensions of surface of island = 70 km × 35 km<br>Typical height of island = 240 m<br>Average temperature of the island = –35°C<br>Density of sea ice = 920 kg m<sup>–3</sup><br>Specific latent heat of fusion of ice = 3.3×10<sup>5</sup>J kg<sup>–1</sup><br>Specific heat capacity of ice = 2.1×10\(^3\)J kg<sup>–1</sup>K<sup>–1</sup></p>
<p>(i) Distinguish, with reference to molecular motion and energy, between solid ice and liquid water.</p>
<p>(ii) Show that the energy required to melt the island to form water at 0°C is about 2×10<sup>20</sup>J. Assume that the top and bottom surfaces of the island are flat and that it has vertical sides.</p>
<p>(iii) The Sun supplies thermal energy at an average rate of 450 W m<sup>–2</sup> to the surface of the island. The albedo of melting ice is 0.80. Determine an estimate of the time taken to melt the island assuming that the melted water is removed immediately and that no heat is lost to the surroundings.</p>
<div class="marks">[8]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest the likely effect on the average albedo of the region in which the island was floating as a result of the melting of the Pobeda ice island.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) in water, molecules are able to move relative to other molecules, less movement possible in ice / in water, vibration and translation of molecules possible, in ice only vibration;<br>in liquid there is sufficient energy/vibration (from latent heat) to break and re-form inter-molecular bonds;</p>
<p>(ii) mass of ice=70000×35000×240×920(=5.4×10<sup>14</sup>kg);<br>energy to raise ice temperature to 0°C=5.4×10<sup>14</sup>×2.1×10<sup>3</sup>×35(= 3.98×10<sup>19</sup>J);<br>energy to melt ice=5.4×10<sup>14</sup>×3.3×10<sup>5</sup>(=1.8×10<sup>20</sup>J);<br>total= 2.2×10<sup>20</sup>J</p>
<p>(iii) energy incident=450×70000×35000(=1.1×10<sup>12</sup>Js<sup>–1</sup>m<sup>−2</sup>);<br>energy available for melting=1.1×10<sup>12</sup>×0.2(=2.2×10<sup>11</sup>J);<br>time \( = \left( {\frac{{2.2 \times {{10}^{20}}}}{{2.2 \times {{10}^{11}}}} = } \right)9.9 \times {10^8}{\rm{s}}\) <em><strong>or</strong></em> 32 years;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>average albedo of ocean much smaller than (snow and) ice;<br>so average albedo (of Earth) is reduced;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The Sun has a radius of 7.0×10<sup>8</sup>m and is a distance 1.5×10<sup>11</sup> m from Earth. The surface temperature of the Sun is 5800 K.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Show that the intensity of the solar radiation incident on the upper atmosphere of the Earth is approximately 1400Wm<sup>−2</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The albedo of the atmosphere is 0.30. Deduce that the average intensity over the entire surface of the Earth is 245Wm<sup>−2</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the average surface temperature of the Earth.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(I = \frac{{\sigma A{T^4}}}{{4\pi {d^2}}}\)</p>
<p>\( = \frac{{5.67 \times {{10}^{ - 8}} \times {{\left( {7.0 \times {{10}^8}} \right)}^2} \times {{5800}^4}}}{{{{\left( {1.5 \times {{10}^{11}}} \right)}^2}}}\)</p>
<p><em><strong>OR </strong></em>\( \frac{{5.67 \times {{10}^{ - 8}} \times 4\pi \times {{\left( {7.0 \times {{10}^8}} \right)}^2} \times {{5800}^4}}}{{4\pi \times {{\left( {1.5 \times {{10}^{11}}} \right)}^2}}}\)</p>
<p><em>I</em>=1397 Wm<sup>−2</sup></p>
<p><em>In this question we must see 4SF to award MP3.</em><br><em>Allow candidate to add radius of Sun to Earth–Sun distance. Yields 1386 Wm<sup>–2.</sup></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«transmitted intensity =» 0.70 × 1400 «= 980Wm<sup>–2</sup>» <br>\(\frac{{\pi {R^2}}}{{4\pi {R^2}}} \times 980{\rm{W}}{{\rm{m}}^{ - 2}}\)</p>
<p>245Wm<sup>–2</sup></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 12">
<div class="section">
<div class="layoutArea">
<div class="column">
<p>5.67 × 10<sup>–8</sup> × <em>T</em><sup>4</sup> = 245</p>
</div>
</div>
<div class="layoutArea">
<div class="column">
<p><em>T</em> = 256K</p>
</div>
</div>
</div>
</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Two renewable energy sources are solar and wind.</p>
</div>
<div class="specification">
<p>An alternative generation method is the use of wind turbines.</p>
<p>The following data are available:</p>
<p style="padding-left: 120px;">Length of turbine blade = 17 m<br>Density of air = 1.3 kg m<sup>–3</sup><br>Average wind speed = 7.5 m s<sup>–1</sup></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the difference between photovoltaic cells and solar heating panels.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A solar farm is made up of photovoltaic cells of area 25 000 m<sup>2</sup>. The average solar intensity falling on the farm is 240 W m<sup>–2</sup> and the average power output of the farm is 1.6 MW. Calculate the efficiency of the photovoltaic cells.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the minimum number of turbines needed to generate the same power as the solar farm.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain <strong>two</strong> reasons why the number of turbines required is likely to be greater than your answer to (c)(i).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>solar heating panel converts solar/radiation/photon/light energy into thermal <strong>energy</strong> <em><strong>AND</strong></em> photovoltaic cell converts solar/radiation/photon/light energy into electrical <strong>energy</strong></p>
<p> </p>
<p><em>Accept internal energy of water.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>power received = 240 × 25000 = «6.0 MW»</p>
<p>efficiency «\( = \frac{{1.6}}{{6.0}}\) = 0.27 / 27%</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>area = \(\pi \) × 17<sup>2</sup> «= 908m<sup>2</sup>»</p>
<p>power = \(\frac{1}{2} \times 908 \times 1.3 \times {7.5^3}\) «= 0.249 MW»</p>
<p>number of turbines «\( = \frac{{1.6}}{{0.249}} = 6.4\)» = 7</p>
<p> </p>
<p><em>Only allow integer value for MP3. </em></p>
<p><em>Award <strong>[2 max]</strong> for <strong>25 turbines</strong> (ECF from incorrect power) </em></p>
<p><em>Award <strong>[2 max]</strong> for <strong>26 turbines</strong> (ECF from incorrect radius</em>)</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«efficiency is less than 100% as»</p>
<p>not all KE of air can be converted to KE of blades</p>
<p><em><strong>OR</strong></em></p>
<p>air needs to retain KE to escape</p>
<p>thermal energy is lost due to friction in turbine/dynamo/generator</p>
<p> </p>
<p><em>Allow velocity of air after turbine is not zero.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about the production of energy in nuclear fission. <strong>Part 2 </strong>is about collisions.</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 1 </strong>Production of energy in nuclear fission</p>
</div>
<div class="specification">
<p class="p1">A possible fission reaction is</p>
<p class="p1">\[_{\;92}^{235}U + _0^1n \to _{36}^{92}Kr + _{\;56}^{141}Ba + x_0^1n.\]</p>
</div>
<div class="specification">
<p class="p1"><strong>Part 2 </strong>Collisions</p>
</div>
<div class="specification">
<p class="p1">In an experiment, an air-rifle pellet is fired into a block of modelling clay that rests on a table.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-09_om_18.13.15.png" alt="N10/4/PHYSI/SP2/ENG/TZ0/B3.Part2.b"></p>
<p class="p1">The air-rifle pellet remains inside the clay block after the impact.</p>
<p class="p1">As a result of the collision, the clay block slides along the table in a straight line and comes to rest. Further data relating to the experiment are given below.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{Mass of air - rifle pellet}}}&{ = 2.0{\text{ g}}} \\ {{\text{Mass of clay block}}}&{ = 56{\text{ g}}} \\ {{\text{Velocity of impact of air - rifle pellet}}}&{ = 140{\text{ m}}\,{{\text{s}}^{ - 1}}} \\ {{\text{Stopping distance of clay block}}}&{ = 2.8{\text{ m}}} \end{array}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) State the value of \(x\).</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Show that the energy released when one uranium nucleus undergoes fission in the reaction in (a) is about \(2.8 \times {10^{ - 11}}{\text{ J}}\).</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{Mass of neutron}}}&{ = 1.00867{\text{ u}}} \\ {{\text{Mass of U - 235 nucleus}}}&{ = 234.99333{\text{ u}}} \\ {{\text{Mass of Kr - 92 nucleus}}}&{ = 91.90645{\text{ u}}} \\ {{\text{Mass of Ba - 141 nucleus}}}&{ = 140.88354{\text{ u}}} \end{array}\]</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>State how the energy of the neutrons produced in the reaction in (a) is likely to compare with the energy of the neutron that initiated the reaction.</p>
<div class="marks">[6]</div>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the role of the moderator.</p>
<div class="marks">[2]</div>
<div class="question_part_label">Part1.b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A nuclear power plant that uses U-235 as fuel has a useful power output of 16 MW and an efficiency of 40%. Assuming that each fission of U-235 gives rise to \(2.8 \times {10^{ - 11}}{\text{ J}}\) of energy, determine the mass of U-235 fuel used per day.</p>
<div class="marks">[4]</div>
<div class="question_part_label">Part1.c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the principle of conservation of momentum.</p>
<div class="marks">[2]</div>
<div class="question_part_label">Part2.a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Show that the initial speed of the clay block after the air-rifle pellet strikes it is \(4.8{\text{ m}}\,{{\text{s}}^{ - 1}}\).</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Calculate the average frictional force that the surface of the table exerts on the clay block whilst the clay block is moving.</p>
<div class="marks">[6]</div>
<div class="question_part_label">Part2.b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss the energy transformations that occur in the clay block and the air-rifle pellet from the moment the air-rifle pellet strikes the block until the clay block comes to rest.</p>
<div class="marks">[3]</div>
<div class="question_part_label">Part2.c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The clay block is dropped from rest from the edge of the table and falls vertically to the ground. The table is 0.85 m above the ground. Calculate the speed with which the clay block strikes the ground.</p>
<div class="marks">[2]</div>
<div class="question_part_label">Part2.d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>3;</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>\(\Delta m = 234.99333 - 91.90645 - 140.88354 - [2 \times 1.00867]\);</p>
<p class="p1">\( = 0.186{\text{ (u)}}\);</p>
<p class="p1">\({\text{energy released}} = 0.186 \times 931 = 173{\text{ }}({\text{MeV)}}\);</p>
<p class="p1">\(173 \times {10^6} \times 1.6 \times {10^{ - 19}}\);</p>
<p class="p1">\(( = 2.768) \approx 2.8 \times {10^{ - 11}}{\text{ (J)}}\)</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">\(\Delta m = 234.99333 - 91.90645 - 140.88354 - [2 \times 1.00867]\);</p>
<p class="p1">\( = 0.186{\text{ (u)}}\);</p>
<p class="p1">\({\text{mass converted}} = 0.186 \times 1.66 \times {10^{ - 27}}{\text{ }}( = 3.09 \times {10^{ - 28}})\);</p>
<p class="p1">(use of \(E = m{c^2}\)) \({\text{energy}} = 3.09 \times {10^{ - 28}} \times 9 \times {10^{ - 16}}\);</p>
<p class="p1">\(( = 2.77) \approx 2.8 \times {10^{ - 11}}{\text{ (J)}}\)</p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>if mass difference is incorrect.</em></p>
<p class="p1"><em>If candidate carries forward an incorrect value from (a)(i) [2 is common], treat this as ecf in (a)(ii).</em></p>
<p class="p1"><em>Award </em><strong><em>[3 max] </em></strong><em>if the candidate uses a value for x inconsistent with (a)(i).</em></p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>greater/higher energy;</p>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">reduces neutron speed to (thermal) lower speeds;</p>
<p class="p1">so that chance of initiating fission is higher;</p>
<p class="p1"><em>Accept “fast neutrons cannot cause fission” for 2nd marking point.</em></p>
<div class="question_part_label">Part1.b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">40% efficient so 40 (MW) required;</p>
<p class="p1">\(\frac{{40 \times {{10}^6}}}{{2.8 \times {{10}^{ - 11}}}} = 1.43 \times {10^{18}}\) per second;</p>
<p class="p1">number of fissions per day \( = 1.23 \times {10^{23}}\);</p>
<p class="p1">\(\left( { = \frac{{1.23 \times {{10}^{23}} \times 235}}{{6 \times {{10}^{23}}}}} \right) = {\text{48 g per day}}\);</p>
<div class="question_part_label">Part1.c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">the total momentum of a system is constant;</p>
<p class="p1">provided external force does not act;</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">the momentum of an isolated/closed system;</p>
<p class="p1">is constant;</p>
<p class="p1"><em>Award </em><strong><em>[1] </em></strong><em>for momentum before collision equals collision afterwards.</em></p>
<div class="question_part_label">Part2.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>initial momentum \( = 2.0 \times {10^{ - 3}} \times 140\);</p>
<p class="p1">final speed \(\frac{{2.0 \times {{10}^{ - 3}} \times 140}}{{5.6 \times {{10}^{ - 2}} + 2.0 \times {{10}^{ - 3}}}}\);</p>
<p class="p1">\( = 4.8{\text{ m}}\,{{\text{s}}^{ - 1}}\)</p>
<p class="p1"><em>Watch for incorrect mass values in equation.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>initial kinetic energy of pellet \( + \) clay block \( = \frac{1}{2}m{v^2}\);</p>
<p class="p1">\(0.5 \times 0.058 \times {4.8^2}{\text{ (}} = 0.67{\text{ J)}}\);</p>
<p class="p1">\({\text{force}} = \frac{{{\text{work done}}}}{{{\text{distance travelled}}}}\);</p>
<p class="p1">\( = 0.24{\text{ N}}\);</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">use of appropriate kinematic equation with consistent sign usage <em>e.g. </em>\(a = \frac{{{u^2} - {v^2}}}{{2s}}\);</p>
<p class="p1">\(a = \frac{{{{4.8}^2}}}{{2 \times 2.8}}\);</p>
<p class="p1">\(F = \frac{{0.058 \times {{4.8}^2}}}{{2 \times 2.8}}\);</p>
<p class="p1">\( = 0.24{\text{ N}}\);</p>
<div class="question_part_label">Part2.b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><span style="text-decoration: underline;">kinetic</span> energy of pellet is transferred to <span style="text-decoration: underline;">kinetic</span> energy of clay block;</p>
<p class="p1">and internal energy of pellet and clay block;</p>
<p class="p1">clay block loses kinetic energy as thermal energy/heat;</p>
<div class="question_part_label">Part2.c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\(v = \sqrt {2gs} \);</p>
<p class="p1">\( = 4.1{\text{ m}}\,{{\text{s}}^{ - 1}}\);</p>
<p class="p1"><em>Allow g </em>\( = \)<em> 10 m</em>\(\,\)<em>s<sup>–2</sup> answer 4.1 m</em>\(\,\)<em>s<sup>–2</sup></em></p>
<p class="p1"><em>Award </em><strong><em>[2] </em></strong><em>for bald correct answer.</em></p>
<div class="question_part_label">Part2.d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) A common incorrect answer was 2.</p>
<p class="p2">(ii) Candidates were often able to carry this calculation through to a correct conclusion. It was a “show that” and a high level of explanation was required by examiners and was – in many cases – demonstrated.</p>
<p class="p2">(iii) Reponses here were mostly correct. However, the answer “It has a higher energy” was common. Candidates need to be reminded of the imprecision of such a statement. Is “It” the initiating neutron or the emitted neutron?</p>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Weaker candidates could not distinguish between the role of the moderator and that of the control rods.</p>
<div class="question_part_label">Part1.b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many good calculations were seen but weaker candidates usually arrived at recognition that the required power from the reactor is 40 MW and could go no further.</p>
<div class="question_part_label">Part1.c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">When the question is “State the principle of conservation of momentum.” an answer of “momentum is conserved” will attract no marks. The examiner needs to know what “conserved” means. Many omitted the statement that external forces do not act (or similar)</p>
<div class="question_part_label">Part2.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) Careful examination of solutions showed that about one-third of candidate forgot to add the mass of the pellet to the final total mass of the block.</p>
<p class="p2">(ii) This two-stage calculation attracted the same error as part (i) and many power of ten errors through a failure to note the units of mass in the question.</p>
<div class="question_part_label">Part2.b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Descriptions of the energy transformations were incomplete and poorly described. There was a general failure to recognise that the pellet transfers its kinetic energy into a number of distinct forms. Candidates are too quick to ascribe energy loss to “friction” without indicating the seat of this energy loss.</p>
<div class="question_part_label">Part2.c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most candidates were able to complete this calculation or to get close to it. Some forgot to evaluate the square root having arrived at the speed squared.</p>
<div class="question_part_label">Part2.d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is about the use of energy resources.</p>
</div>
<div class="specification">
<p class="p1">Electrical energy is obtained from tidal energy at La Rance in France.</p>
<p class="p1">Water flows into a river basin from the sea for six hours and then flows from the basin back to the sea for another six hours. The water flows through turbines and generates energy during both flows.</p>
<p class="p1">The following data are available.</p>
<p class="p1"><span class="Apple-converted-space"> </span>Area of river basin <span class="Apple-converted-space"> </span>\( = 22{\text{ k}}{{\text{m}}^{\text{2}}}\)</p>
<p class="p1"><span class="Apple-converted-space"> </span>Change in water level of basin over six hours <span class="Apple-converted-space"> </span>\( = 6.0{\text{ m}}\)</p>
<p class="p1"><span class="Apple-converted-space"> </span>Density of water <span class="Apple-converted-space"> </span>\( = 1000{\text{ kg}}\,{{\text{m}}^{ - 3}}\)</p>
</div>
<div class="specification">
<p class="p1">Nuclear reactors are used to generate energy. In a particular nuclear reactor, neutrons collide elastically with carbon-12 nuclei \(\left( {_{\;{\text{6}}}^{{\text{12}}}{\text{C}}} \right)\) that act as the moderator of the reactor. A neutron with an initial speed of \(9.8 \times {10^6}{\text{ m}}\,{{\text{s}}^{ - 1}}\) collides head-on with a stationary carbon-12 nucleus. Immediately after the collision the carbon-12 nucleus has a speed of \(1.5 \times {10^6}{\text{ m}}\,{{\text{s}}^{ - 1}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the difference between renewable and non-renewable energy sources.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i)<span class="Apple-converted-space"> </span>The basin empties over a six hour period. Show that about \(6000{\text{ }}{{\text{m}}^3}\) of water flows through the turbines every second.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Show that the average power that the water can supply over the six hour period is about 0.2 GW.</p>
<p class="p2">(iii) <span class="Apple-converted-space"> </span>La Rance tidal power station has an energy output of \(5.4 \times {10^8}{\text{ kW}}\,{\text{h}}\) per year. Calculate the overall efficiency of the power station. Assume that the water can supply 0.2 GW at all times.</p>
<p class="p2">Energy resources such as La Rance tidal power station could replace the use of</p>
<p class="p2">fossil fuels. This may result in an increase in the average albedo of Earth.</p>
<p class="p2">(iv) <span class="Apple-converted-space"> </span>State <strong>two </strong>reasons why the albedo of Earth must be given as an average value.</p>
<div class="marks">[10]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>State the principle of conservation of momentum.</p>
<p class="p2">(ii) <span class="Apple-converted-space"> </span>Show that the speed of the neutron immediately after the collision is about \(8.0 \times {10^6}{\text{ m}}\,{{\text{s}}^{ - 1}}\).</p>
<p class="p2">(iii) <span class="Apple-converted-space"> </span>Show that the fractional change in energy of the neutron as a result of the collision</p>
<p class="p2">is about 0.3.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>Estimate the minimum number of collisions required for the neutron to reduce its initial energy by a factor of \({10^6}\).</p>
<p class="p1">(v) <span class="Apple-converted-space"> </span>Outline why the reduction in energy is necessary for this type of reactor to function.</p>
<div class="marks">[10]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">only non-renewable is depleted/cannot re-generate whereas renewable can / consumption rate of non-renewables is greater than formation rate and consumption rate of renewables is less than formation rate;</p>
<p class="p1"><em>Do not allow “cannot be used again”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>volume released = \((22 \times {10^6} \times 6 = ){\text{ }}1.32 \times {10^8}{\text{ (}}{{\text{m}}^3}{\text{)}}\);</p>
<p class="p1">volume per second \(\frac{{1.32 \times {{10}^8}}}{{6 \times 3600}}{\text{ }}( = 6111{\text{ }}{{\text{m}}^3})\);</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>use of average depth for calculation (3 m);</p>
<p class="p1">gpe lost \(6100 \times 1000 \times 9.81 \times 3\);</p>
<p class="p1">0.18 (GW);</p>
<p class="p2"><span class="s1"><em>Accept </em></span><em>g = 10 m</em>\(\,\)<em>s<sup>–2</sup>.</em></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>if 6 m is used and an “average” is used at end of solution without mention of average depth.</em></p>
<p class="p1"><span class="s2">(iii) <span class="Apple-converted-space"> </span></span>converts/states output with units; } <em>(allow values quoted from question without unit)</em></p>
<p class="p1">converts/states input with units; } <em>(allow values quoted from question without unit)</em></p>
<p class="p1">calculates efficiency from \(\frac{{{\text{output}}}}{{{\text{input}}}}\) as 0.31;</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for bald correct answer.</em></p>
<p class="p1"><em>eg</em>:</p>
<p class="p1">power output \(\frac{{5.4 \times {{10}^8}}}{{365 \times 24 \times 3600}}{\text{ }}\left( { = 17{\text{ kW}}\,{\text{h}}\,{{\text{s}}^{ - 1}}} \right)\);</p>
<p class="p1">\( = 17 \times 3600000 = 6.16 \times {10^7}{\text{ (W)}}\);</p>
<p class="p1">efficiency = \(\left( {\frac{{6.16 \times {{10}^7}}}{{2.0 \times {{10}^8}}} = } \right){\text{ }}31\% \)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)0.31;</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">0.2 GW is \(1.752 \times {10^9}{\text{ (kW}}\,{\text{h}}\,{\text{yea}}{{\text{r}}^{ - 1}}{\text{)}}\);</p>
<p class="p1">\(\frac{{5.4 \times {{10}^8}}}{{1.752 \times {{10}^9}}}\);</p>
<p class="p2">efficiency \( = 0.31\);</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>cloud cover / weather conditions;</p>
<p class="p1">latitude;</p>
<p class="p1">time of year / season;</p>
<p class="p1">nature/colour of surface;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><span class="s1">(i) <span class="Apple-converted-space"> </span></span>(total) momentum unchanged before and after collision / momentum of a system is constant; } <em>(allow symbols if explained)</em></p>
<p class="p1">no external forces / isolated system / closed system;</p>
<p class="p1"><em>Do not accept “conserved”.</em></p>
<p class="p1"><span class="s1">(ii) <span class="Apple-converted-space"> </span></span>final momentum of neutron \( = {\text{neutron mass}} \times 9.8 \times {10^6} - 1{\text{u}} \times 12 \times 1.5 \times {10^6}\); } <em>(allow any appropriate and consistent mass unit)</em></p>
<p class="p1">final speed of neutron \( = 8.0\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)\(8.2 \times {10^6}{\text{ (m}}\,{{\text{s}}^{ - 1}}{\text{)}}\);</p>
<p class="p1">\(\left( { \approx {\text{8.0}} \times {\text{1}}{{\text{0}}^6}{\text{ (m}}\,{{\text{s}}^{ - 1}}{\text{)}}} \right)\)</p>
<p class="p1"><em>Allow use of 1 u for both masses giving an answer of 8.2 </em>\( \times \)<em> 10<sup>6</sup> (m</em>\(\,\)<em>s</em><span class="s2"><em><sup>–1</sup>).</em></span></p>
<p class="p1"><span class="s1">(iii) <span class="Apple-converted-space"> </span></span>initial energy of neutron \( = 8.04 \times {10^{ - 14}}{\text{ (J)}}\) <span style="text-decoration: underline;">and</span> final energy of neutron \( = 5.36 \times {10^{ - 14}}{\text{ (J)}}\); } <em>(both needed)</em></p>
<p class="p1">fractional change in energy \( = \left( {\frac{{(8.04 - 5.36)}}{{8.04}} = } \right){\text{ }}0.33\);</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">fractional change \( = \left( {\frac{{\frac{1}{2}mv_{\text{i}}^2 - \frac{1}{2}mu_{\text{f}}^2}}{{\frac{1}{2}mv_{\text{i}}^2}}} \right)\); }<em>(allow any algebra that shows a subtraction of initial term from final term divided by initial value)</em></p>
<p class="p1">\(\left( { = \frac{{{{(9.8 \times {{10}^6})}^2} - {{(8.0 \times {{10}^6})}^2}}}{{{{(9.8 \times {{10}^6})}^2}}}} \right)\)<em> (allow omission of 10<sup>6</sup>)</em></p>
<p class="p1">\( = 0.33\); <em>(allow 0.30 if 8.2 used)</em></p>
<p class="p1"><em>Do not allow ECF if there is no subtraction of energies in first marking point.</em></p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>\({(0.33)^n} = {10^{ - 6}}\);</p>
<p class="p1">\(n = 13\); <em>(allow n = 12 if 0.3 is used)</em></p>
<p class="p1">(v) <span class="Apple-converted-space"> </span>neutrons produced in fission have large energies;</p>
<p class="p1">greatest probability of (further) fission/absorption (when incident neutrons have thermal energy or low energy);</p>
<p class="p1"><em>Do not accept “reaction” for “fission reaction”.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates continue to give weak responses to questions in which they are asked to compare renewable and non-renewable resources. Although the “it cannot be used again” answer has largely disappeared, many candidates still fail to appreciate that the issue is about the rate at which the resource can be replaced.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>This was often well done, although occasional recourse was made to inappropriate physics (see bii). Candidates should note that in questions where the final answer is quoted (typically “Show that …..” questions) candidates are strongly advised to quote answers to one more significant figure than in the question.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>The rare candidate who understood the physics here was able to give a clear account of the solution. Many failed to spot the factor of a half in the water level change and introduced a factor of two later and arbitrarily. Others completely misunderstood the (simple) nature of the problem and used a random equation from the data booklet (usually \(1/3\rho A{v^3}\)). This of course gained no marks. A simple initial diagram would have helped many to avoid errors.</p>
<p class="p1">(iii)<span class="Apple-converted-space"> </span>As in question 1 there were far too many candidates who clearly do not understand and have not practised the problem of converting between energy units. Effective use of units would have made this an easy calculation. Explanations were few and candidates were clearly struggling with this aspect of energy.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>Many candidates were able to give one coherent reason but two distinct answers were rare.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) As is often the case with this question, candidates state that “momentum is conserved” and fail to explain what this means. There was much confusion with energy conservation rules.</p>
<p class="p1">(ii) Calculations of the final speed of the neutron were confused with little or no explanation of the equations. It was often not clear what mass values (if any) were being used in the solution.</p>
<p class="p1">(iii) There were few clear solutions to this problem. Some candidates did not appreciate the meaning of fractional energy change and others were still travelling along the momentum route from an earlier part, scoring few, if any, marks.</p>
<p class="p1">(iv) Candidates had evidently not considered the mechanical issues of moderation in their learning. There was little recognition that the change in fractional energy is 0.33\(n\) where \(n\) is the number of collisions. The most frequent answer was that the change is 0.33\(n\).</p>
<p class="p1">(v) There was more clarity about the reasons for moderation but even so, answers were poorly expressed. Only a minority recognised that the probability of absorption is greatest at low neutron incident energy.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about solar power and climate models. <strong>Part 2</strong> is about gravitational fields and electric fields.</p>
<p><strong>Part 1</strong> Solar power and climate models</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish, in terms of the energy changes involved, between a solar heating panel and a photovoltaic cell.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an appropriate domestic use for a</p>
<p>(i) solar heating panel.</p>
<p>(ii) photovoltaic cell.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The radiant power of the Sun is 3.90 ×10<sup>26</sup>W. The average radius of the Earth’s orbit about the Sun is 1.50 ×10<sup>11 </sup>m. The albedo of the atmosphere is 0.300 and it may be assumed that no energy is absorbed by the atmosphere.</p>
<p>Show that the intensity incident on a solar heating panel at the Earth’s surface when the Sun is directly overhead is 966 Wm<sup>–2</sup>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Show, using your answer to (c), that the average intensity incident on the Earth’s surface is 242 Wm<sup>–2</sup>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Assuming that the Earth’s surface behaves as a black-body and that no energy is absorbed by the atmosphere, use your answer to (d) to show that the average temperature of the Earth’s surface is predicted to be 256 K.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<p>a solar heating panel converts the (radiation) energy of the Sun into thermal/heat energy;<br><em>(allow “solar energy” but do not allow “heat”)</em><br>a photovoltaic cell converts the (radiation) energy of the Sun into electrical energy;</p>
</div>
</div>
</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<p>(i) water heater / any specific use such as swimming pool/bath; <br>(ii) powering TV/radio/lighting/any low energy electrical appliance;</p>
</div>
</div>
</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<p>surface area of sphere at 1.5×10<sup>11</sup>m from Sun =4π×1.50<sup>2</sup>×10<sup>22</sup>;</p>
<p>power per m<sup>2</sup>=\(\frac{{3.90 \times {{10}^{26}}}}{{4 \times 3.14 \times {{1.50}^2} \times {{10}^{22}}}} = 1.38 \times {10^3}\);<br><em>(presence of the substitution allows inference of first marking point)</em></p>
<p>power per m<sup>2</sup> at surface = 0.7×1.38×10<sup>3</sup>Wm<sup>-2</sup>;<br>(=966Wm<sup>-2</sup>)</p>
</div>
</div>
</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<p>Earth appears, to the Sun, like a disc of radius <em>R</em>; <em>(must be explicit)</em><br>intensity=power incident per unit area;<em> (must be explicit in words or equation)</em></p>
<p>(power incident per unit area)=\(\frac{{966\pi {R^2}}}{{4\pi {R^2}}}\);</p>
<p>(=242Wm<sup>-2</sup>)</p>
</div>
</div>
</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<p>(power absorbed) 242 = (power emitted) <em>σT</em><sup>4</sup> ;</p>
<p>\(T = {\left[ {\frac{{242}}{{5.67 \times {{10}^{ - 8}}}}} \right]^{\frac{1}{4}}}\) <em><strong>or</strong></em> 255.5;</p>
<p>(=256K)</p>
</div>
</div>
</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 1">
<div class="layoutArea">
<div class="column">
<p>In an easy opener, candidates were asked for the energy changes in solar heating panels and photovoltaic cells. Sometimes the word “energy” did not appear in the answer. It is important for candidates to give a clear statement of the initial and the final energy forms expressed in scientific language.</p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 1">
<div class="layoutArea">
<div class="column">
<p>(i) and (ii) There was a wide variety of correct responses here. However some are clearly confused about the uses of solar heating panels and photovoltaics.</p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 1">
<div class="layoutArea">
<div class="column">
<p>This was done well with many correctly showing the intensity arriving from the Sun and incorporating the effect of albedo appropriately.</p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 1">
<div class="layoutArea">
<div class="column">
<p>This was not so impressive (as (c)) with many inclusions of the factor of 4 with no explanation of its origin. This was not acceptable.</p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 6">
<div class="layoutArea">
<div class="column">
<div class="page" title="Page 1">
<div class="layoutArea">
<div class="column">
<p>This was straightforward but a clear manipulation of Stefan‟s Law was required, ideally with a calculation with significant figures quoted to better than the quoted answer. Many failed in this respect by giving an initial substitution and nothing else. Examiners needed to see correct handling of the fourth root to award full credit.</p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, with reference to energy changes, the operation of a pumped storage hydroelectric system.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The hydroelectric system has four 250 MW generators. The specific energy available from the water is 2.7 kJ kg<sup>–1</sup>. Determine the maximum time for which the hydroelectric system can maintain full output when a mass of 1.5 x 10<sup>10</sup> kg of water passes through the turbines.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Not all the stored energy can be retrieved because of energy losses in the system. Explain <strong>one</strong> such loss.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>At the location of the hydroelectric system, an average intensity of 180 W m<sup>–2</sup> arrives at the Earth’s surface from the Sun. Solar photovoltaic (PV) cells convert this solar energy with an efficiency of 22 %. The solar cells are to be arranged in a square array. Determine the length of one side of the array that would be required to replace the<br>hydroelectric system.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>PE of water is converted to KE of moving water/turbine to electrical energy «in generator/turbine/dynamo»</p>
<p>idea of pumped storage, <em>ie:</em> pump water back during night/when energy cheap to buy/when energy not in demand/when there is a surplus of energy</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>total energy = «2.7 x 10<sup>3</sup> x 1.5 x 10<sup>10</sup> =» 4.05 x 10<sup>13</sup> «J»</p>
<p>time = «\(\frac{{4.0 \times {{10}^{13}}}}{{4 \times 2.5 \times {{10}^8}}}\)» 11.1h <em><strong>or</strong> </em>4.0 x 10<sup>4</sup> s</p>
<p> </p>
<p><em>For MP2 the unit <strong>must</strong> be present.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>friction/resistive losses in walls of pipe/air resistance/turbulence/turbine and generator bearings</p>
<p>thermal energy losses, in electrical resistance of components</p>
<p>water requires kinetic energy to leave system so not all can be transferred</p>
<p> </p>
<p><em>Must see “seat of friction” to award the mark.</em><br><em>Do not allow “friction” bald.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>area required \( = \frac{{1 \times {{10}^9}}}{{0.22 \times 180}}\) «= 2.5 x 10<sup>7</sup> m<sup>2</sup>»</p>
<p>length of one side \( = \sqrt {area} = 5.0\) k«m»</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about a tidal power station.</p>
<p>A tidal power station is built for a coastal town. Sea water is stored in a tidal basin behind a dam at high tide and released in a controlled manner between high tides, so that it passes through turbines to generate electricity.</p>
<p>The following data are available.</p>
<p style="padding-left: 30px;">Difference between high and low tide water level = 1.8m<br>Density of sea water = 1.1×10<sup>3</sup>kgm<sup>–3</sup><br>Surface area of basin = 1.4×10<sup>5</sup>m<sup>2</sup><br>Overall efficiency of power station = 24%</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Show that the mass of sea water released between successive high and low tides is about 2.8×10<sup>8</sup> kg.</p>
<p>(ii) Calculate the electrical energy produced between successive high and low tides.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Identify <strong>one</strong> mechanism through which energy is transferred to the surroundings during the electricity generation process.</p>
<p>(ii) State why the energy transferred to the surroundings is said to be degraded.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(i) </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">m = ρΔV = ρAΔh</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">;<br>=1.1</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">3 </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">1.4</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">5 </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">1.8;<br>(</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">≈ </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">2.8</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">8 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">kg) </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(ii) difference in height of centre of mass of water=\(\frac{{1.8}}{2}\)=0.9(m)<br>\(\Delta {E_P}\left( { = mg\Delta h = 2.8 \times {{10}^8} \times 9.8 \times 0.9} \right) = 2.5 \times {10^{\rm{9}}}\left( {\rm{J}} \right)\)<br>electrical energy </span><span style="font-size: 15.000000pt; font-family: 'SymbolMT'; vertical-align: -2.000000pt;">(</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">0.24</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">2.5</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">9</span><span style="font-size: 15.000000pt; font-family: 'SymbolMT'; vertical-align: -2.000000pt;">)</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">5.9</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">8 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(J)</span><span style="font-size: 14.000000pt; font-family: 'SymbolMT'; vertical-align: -1.000000pt;">(</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">590MJ</span><span style="font-size: 14.000000pt; font-family: 'SymbolMT'; vertical-align: -1.000000pt;">)</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">;<br></span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Allow ECF for </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold; font-style: italic;">[2 max] </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">if candidate omits factor of 2 in first marking points. Accept g</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">10ms</span><span style="font-size: 8.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic; vertical-align: 6.000000pt;">–2 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">giving an answer of 6.0×10</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic; vertical-align: 6.000000pt;">8 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">(J). </span></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(i) friction/turbulence of flowing water / friction in turbine/generator / resistive heating in wires;<br></span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Do not allow bald statement of “heating”. </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(ii) it can no longer be used to do work / not available in useful form;<br></span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Do not accept “it is more spread out” or similar. </span></p>
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<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">ai) Many candidates provided a simple calculation with no explanation to show why the values were multiplied together. This did not provide sufficient evidence to show how the data provided lead to the given value. </span></p>
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">aii) Few candidates realized that the energy produced by a water storage is dependent on half the height between the upper and lower water levels. </span></p>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';"> </span></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">bi) Many candidates provided a general response suc</span><span style="font-size: 10.000000pt; font-family: 'Arial';">h as “friction” without identifying the mechanism </span><span style="font-size: 10.000000pt; font-family: 'Arial';">that caused the frictional losses. </span></p>
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">bii) Few candidates could adequately explain the concept of degraded energy. </span></p>
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<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Wind power and the greenhouse effect</p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A coal-fired power station has a power output of 4.0GW. It has been suggested that a wind farm could replace this power station. Using the data below, determine the area that the wind farm would occupy in order to meet the same power output as the coal-fired<br>power station.</p>
<p style="text-align: center;">Radius of wind turbine blades = 42 m<br>Area required by each turbine = 5.0×10<sup>4 </sup>m<sup>2<br></sup>Efficiency of a turbine = 30%<br>Average annual wind speed = 12 m s<sup>–1<br></sup>Average annual density of air = 1.2 kg m<sup>–3</sup></p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Wind power does not involve the production of greenhouse gases. Outline why the surface temperature of the Earth is higher than would be expected without the greenhouse effect.</p>
<p> </p>
<p> </p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The average solar intensity incident at the surface of the Earth is 238 W m<sup>–2</sup>.</p>
<p>(i) Assuming that the emissivity of the surface of the Earth is 1.0, estimate the average surface temperature if there were no greenhouse effect.</p>
<p>(ii) The enhanced greenhouse effect suggests that in several decades the predicted temperature of the atmosphere will be 250 K. The emissivity of the atmosphere is 0.78. Show that this atmospheric temperature increase will lead to a predicted average Earth surface temperature of 292 K.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>power output of a turbine=0.3×½<em>ρAv</em><sup>3</sup>=0.3×0.5×1.2×3.14×[42]<sup>2</sup>×[12]<sup>3</sup>(=1723kW);<br>number of turbines needed \( = \frac{{4 \times {{10}^9}}}{{1.723 \times {{10}^6}}}\left( { = 2322} \right)\);<br>area needed = 2322×5.0×10<sup>4</sup>;<br>=1.2×10<sup>8</sup>(m<sup>2</sup>);<br><em>Award <strong>[4]</strong> for a bald correct answer.<br>Note: Answers sometimes start with calculating power input from wind which is 5743 kW and incorporate 0.3 at a later stage.</em></p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p><em>look for these main points:<br></em>the surface of Earth re-radiates the Sun’s radiation;<br>greenhouse gases (in atmosphere) readily absorb infrared;<br>mention of resonance;<br>the absorbed radiation is re-emitted (by atmosphere) in all directions;<br>(some of) which reaches the Earth and further heats the surface;<br><em>Award <strong>[1 max]</strong> for responses along the lines that greenhouse gases trap infrared radiation. </em></p>
<div class="question_part_label">b.</div>
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<p>(i) total absorbed radiation= total emitted radiation =238(Wm <sup>-2</sup>);<br>temperature of Earth=\({\left[ {\frac{{238}}{{5.67 \times {{10}^{ - 8}}}}} \right]^{\frac{1}{4}}}\)=255(K);<br><em>Award<strong> [2]</strong> for a bald correct answer.</em></p>
<p>(ii) total absorbed radiation at surface=238+[(<em>εδT</em><sup>4</sup>)0.78×5.67×10<sup>-8</sup>×250<sup>4</sup>];<br>=410.8(Wm<sup>-2</sup>);<br>temperature of surface=\({\left[ {\frac{{410.8}}{{5.67 \times {{10}^{ - 8}}}}} \right]^{\frac{1}{4}}}\)=291.7(K);<br>≈292K</p>
<p> </p>
<p> </p>
<p> </p>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was another calculation in which candidates are becoming well versed. There are a number of steps and many were able to negotiate them with ease. Failures included omitting the efficiency or getting it the wrong way up in the equation. Although full marks were given for the correct answer candidates would be well advised in such questions, to fully explain each step in their argument so that part-credit can be obtained. A jumble of arithmetic with the wrong answer will score zero.</p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p>A sizeable majority talked about the infrared radiation being trapped in the atmosphere. This did not attract full credit as it fails to grasp the nettle of the interaction between the earth’s surface and the atmosphere. A generous number of points were available on the scheme but most gained two out of three marks. This question was poorly answered by Spanish-speaking candidates.</p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p>(i) temperature of surface</p>
<p>(ii)This was another “show that” question. Candidates need to display reasoning - more able candidates could satisfy examiners on this point.</p>
<div class="question_part_label">c.</div>
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<br><hr><br><div class="specification">
<p class="p1">This question is in <strong>two </strong>parts. <strong>Part 1 </strong>is about a lightning discharge. <strong>Part 2 </strong>is about fuel for heating.</p>
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<div class="specification">
<p class="p1"><strong>Part 1 </strong>Lightning discharge</p>
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<div class="specification">
<p class="p1">The magnitude of the electric field strength \(E\) between two infinite charged parallel plates is given by the expression</p>
<p class="p1">\[E = \frac{\sigma }{{{\varepsilon _0}}}\]</p>
<p class="p1">where \(\sigma \) is the charge per unit area on one of the plates.</p>
<p class="p1">A thundercloud carries a charge of magnitude 35 C spread over its base. The area of the base is \(1.2 \times {10^7}{\text{ }}{{\text{m}}^{\text{2}}}\).</p>
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<div class="specification">
<p class="p1"><strong>Part 2 </strong>Fuel for heating</p>
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<div class="specification">
<p class="p1">A room heater burns liquid fuel and the following data are available.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{Density of liquid fuel}}}&{ = 8.0 \times {{10}^2}{\text{ kg}}\,{{\text{m}}^{ - 3}}} \\ {{\text{Energy produced by 1 }}{{\text{m}}^{\text{3}}}{\text{ of liquid fuel}}}&{ = 2.7 \times {{10}^{10}}{\text{ J}}} \\ {{\text{Rate at which fuel is consumed}}}&{ = 0.13{\text{ g}}\,{{\text{s}}^{ - 1}}} \\ {{\text{Latent heat of vaporization of the fuel}}}&{ = 290{\text{ kJ}}\,{\text{k}}{{\text{g}}^{ - 1}}} \end{array}\]</p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define <em>electric field strength</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A thundercloud can be modelled as a negatively charged plate that is parallel to the ground.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-10_om_07.24.35.png" alt="N10/4/PHYSI/SP2/ENG/TZ0/B2.Part1.b"></p>
<p class="p1">The magnitude of the charge on the plate increases due to processes in the atmosphere. Eventually a current discharges from the thundercloud to the ground.</p>
<p class="p1">On the diagram, draw the electric field pattern between the thundercloud base and the ground.</p>
<div class="marks">[3]</div>
<div class="question_part_label">Part1.b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Determine the magnitude of the electric field between the base of the thundercloud and the ground.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>State <strong>two </strong>assumptions made in (c)(i).</p>
<p class="p1">1.</p>
<p class="p1">2.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>When the thundercloud discharges, the average discharge current is 1.8 kA. Estimate the discharge time.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>The potential difference between the thundercloud and the ground before discharge is \(2.5 \times {10^8}{\text{ V}}\). Determine the energy released in the discharge.</p>
<div class="marks">[12]</div>
<div class="question_part_label">Part1.c.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the <em>energy density </em>of a fuel.</p>
<div class="marks">[1]</div>
<div class="question_part_label">Part2.a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Use the data to calculate the power output of the room heater, ignoring the power required to convert the liquid fuel into a gas.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Show why, in your calculation in (b)(i), the power required to convert the liquid fuel into a gas at its boiling point can be ignored.</p>
<div class="marks">[5]</div>
<div class="question_part_label">Part2.b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State, in terms of molecular structure and their motion, <strong>two </strong>differences between a liquid and a gas.</p>
<p class="p1">1.</p>
<p class="p1">2.</p>
<div class="marks">[2]</div>
<div class="question_part_label">Part2.c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">force acting per unit charge;</p>
<p class="p1">on positive test / point charge;</p>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><img src="images/Schermafbeelding_2016-11-10_om_07.26.41.png" alt="N10/4/PHYSI/SP2/ENG/TZ0/B2.Part1.b/M"></p>
<p class="p1">lines connecting plate and ground equally spaced in the central region of thundercloud <span style="text-decoration: underline;">and</span> touching both plates; <em>(judge by eye)</em></p>
<p class="p1">edge effects shown; <em>(accept either edge effect A or B shown on diagram)</em></p>
<p class="p1">field direction correct;</p>
<div class="question_part_label">Part1.b.</div>
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<div class="question" style="padding-left: 20px;">
<p>(i) \(\sigma = \left( {\frac{{35}}{{1.2 \times {{10}^7}}} = } \right){\text{ }}2.917 \times {10^{ - 6}}{\text{ (C}}\,{{\text{m}}^{ - 2}})\);</p>
<p>\(E = \frac{{2.917 \times {{10}^{ - 6}}}}{{8.85 \times {{10}^{ - 12}}}}\);</p>
<p>\( = 3.3 \times {10^5}{\text{ N}}\,{{\text{C}}^{ - 1}}\) <strong><em>or</em></strong> \({\text{V}}\,{{\text{m}}^{ - 1}}\);</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for bald correct answer.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>edge of thundercloud parallel to ground;</p>
<p class="p1">thundercloud and ground effectively of infinite length;</p>
<p class="p1">permittivity of air same as vacuum;</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>\(t = \frac{Q}{I}\);</p>
<p class="p1">\(t = \frac{{35}}{{1800}}\);</p>
<p class="p1">\( = 20{\text{ m}}\,{\text{s}}\);</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>use of energy \( = {\text{p.d.}} \times {\text{charge}}\);</p>
<p class="p1">\({\text{average p.d.}} = 1.25 \times {10^8}{\text{ (V)}}\);</p>
<p class="p1">\({\text{energy released}} = 1.25 \times {10^8} \times 35\);</p>
<p class="p1">\( = 4.4 \times {10^9}{\text{ J}}\);</p>
<p class="p1"><em>Award </em><strong><em>[3 max] </em></strong><em>for 8.8 GJ if average p.d. point omitted.</em></p>
<p class="p1"><em>Accept solution which uses average current </em>\(\left( {from \frac{{charge}}{{time}}} \right)\)<em>.</em></p>
<p class="p1"><em>Allow ecf from (c)(ii).</em></p>
<div class="question_part_label">Part1.c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">energy (released) per unit mass;</p>
<p class="p1"><em>Accept per unit volume or per kg or per m</em><sup><span class="s1"><em>3</em></span></sup>.</p>
<p class="p1"><em>Do not accept per unit density.</em></p>
<div class="question_part_label">Part2.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>volume of fuel used per second \( = \frac{{{\text{rate}}}}{{{\text{density}}}}{\text{ }}\left( { = {\text{1.63}} \times {\text{1}}{{\text{0}}^{ - 7}}{\text{ (}}{{\text{m}}^{\text{3}}})} \right)\);</p>
<p class="p1">\({\text{energy}} = 2.7 \times {10^{10}} \times 1.63 \times {10^{ - 7}}\);</p>
<p class="p1">\( = (4.3875 = ){\text{ }}4.4{\text{ kW}}\);</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for bald correct answer.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>power required \( = (2.9 \times {10^5} \times 0.13 \times {10^{ - 3}} = ){\text{ }}38{\text{ W}}\);</p>
<p class="p1">small fraction/less than 1% of overall power output / <em>OWTTE</em>;</p>
<div class="question_part_label">Part2.b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">sensible comment comparing molecular structure;</p>
<p class="p1"><em>e.g. liquid molecular structure (more) ordered than that of a gas.</em></p>
<p class="p1"><em>in gas molecules far apart/about 10 molecular spacings apart / in liquid molecules </em><em>close/touching.</em></p>
<p class="p1">sensible comment comparing motion of molecules;</p>
<p class="p1"><em>e.g. in liquid: molecules interchange places with neighbouring molecules / no long</em><br><em>distance motion.</em><br><em>in gases: no long-range order / long distance motion.</em></p>
<div class="question_part_label">Part2.c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many omitted the reference to a test charge that is positive.</p>
<div class="question_part_label">Part1.a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Common errors were to draw the field lines in the wrong direction, to omit edge effects, and to fail to draw field lines that touch the plates.</p>
<div class="question_part_label">Part1.b.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">(i) This part was well done.</p>
<p class="p1">(ii) Most candidates could only identify one assumption made in the calculation.</p>
<p class="p1">(iii) The estimation of discharge time was well done.</p>
<p class="p1">(iv) There was a general failure to recognise that the average pd during the discharge is half the maximum (starting) value and this lost a mark.</p>
<div class="question_part_label">Part1.c.</div>
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<p class="p1">A handful of candidates defined energy density as energy converted per unit density, but most gave energy released per unit mass with a minority quoting energy released per unit volume.</p>
<div class="question_part_label">Part2.a.</div>
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<p class="p1">(i) Again, this was done well by the majority with the usual smattering of significant figure penalties and mistakes in handling powers of ten.</p>
<p class="p1">(ii) Arguments were weak and poorly supported by calculation.</p>
<div class="question_part_label">Part2.b.</div>
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<p class="p1">Candidates found great difficulty in stating the differences between liquids and gases. They often focused on either molecular structure or motion, but not both as required in the question.</p>
<div class="question_part_label">Part2.c.</div>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">This question is in </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold;">two </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">parts. </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold;">Part 1 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">is about power production and global warming. </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold;">Part 2 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">is about electric charge. </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold;">Part 1 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">Power production and global warming </span></p>
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<div class="column">A nuclear power station uses uranium-235 (U-235) as fuel. Outline the</div>
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<p>(ii) role of the heat exchanger of the reactor and the turbine in the generation of electrical energy.</p>
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<div class="marks">[7]</div>
<div class="question_part_label">b.</div>
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<div class="column">The Drax power station produces an enormous amount of carbon dioxide, a gas classified as a greenhouse gas. Outline, with reference to the vibrational behaviour of molecules of carbon dioxide, what is meant by a greenhouse gas.</div>
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<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
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<p>(i) U-235 fissions / neutrons are produced;</p>
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<p> nuclei/neutrons have high energy/are fast moving;<br> nuclei transfer (kinetic) energy to (reactor) core / neutrons transfer (kinetic) energy to moderator;<br> names energy of moving nuclei/neutrons as <span style="text-decoration: underline;">kinetic</span>;<br> core/moderator energy transferred to coolant/named coolant/surroundings;<strong><em><br></em></strong></p>
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<p>(ii) heat exchanger allows transfer of (thermal) energy between reactor and coolant; coolant transfers (thermal) energy to steam/other </p>
<p> named fluid;<br> steam/fluid allows turbine to drive generator/dynamo;<strong><em><br></em></strong></p>
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<div class="question_part_label">b.</div>
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<div class="column">frequency of vibration is close to that of the frequency of infrared radiation; (atmospheric) carbon dioxide absorbs the infrared radiated by the surface of Earth; the part of the radiation that is re-radiated back to Earth will cause the temperature of the surface to rise / re-radiated at a different frequency / <em>OWTTE</em>;<br><br></div>
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<div class="question_part_label">e.</div>
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<div class="column">(i) Outlines of the processes and energy changes in a nuclear power station were very poor. Examiners had to give the benefit of the doubt on many occasions. Some candidates thought that the U-235 is burnt (in the same way as a fossil fuel) to convert the energy for the process. Only rarely were there an attempt to describe the processes consistently and many answers focussed only on the operation of the turbines.
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<p>(ii) Equally, the heat exchanger and the turbine roles were poorly described and often simply repeated material from (b)(i).</p>
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<div class="question_part_label">b.</div>
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<div class="column">As in part (d) it was rare to find a well-expressed solution and in the case of incorrect evaluations, examiners found it difficult to understand what the candidate was attempting to do.</div>
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<div class="question_part_label">e.</div>
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<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about Newton’s laws and momentum. <strong>Part 2</strong> is about the greenhouse effect.</p>
<p><strong>Part 1</strong> Newton’s laws and momentum</p>
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<p><strong>Part 2</strong> The greenhouse effect</p>
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<p>State the condition for the momentum of a system to be conserved.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
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<p>A person standing on a frozen pond throws a ball. Air resistance and friction can be considered to be negligible.</p>
<p>(i) Outline how Newton’s third law and the conservation of momentum apply as the ball is thrown.</p>
<p>(ii) Explain, with reference to Newton’s second law, why the horizontal momentum of the ball remains constant whilst the ball is in flight.</p>
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<p>The maximum useful power output of a locomotive engine is 0.75 M W. The maximum speed of the locomotive as it travels along a straight horizontal track is 44 m s<sup>–1</sup>. Calculate the frictional force acting on the locomotive at this speed.</p>
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<div class="question_part_label">c.</div>
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<p>The locomotive engine in (c) gives a truck X a sharp push such that X moves along a horizontal track and collides with a stationary truck Y. As a result of the collision the two trucks stick together and move off with speed <em>v</em>. The following data are available.</p>
<p style="padding-left: 30px;">Mass of truck X=3.7×10<sup>3 </sup>kg<br>Mass of truck Y=6.3×10<sup>3 </sup>kg<br>Speed of X just before collision=4.0 m s<sup>–1</sup></p>
<p>(i) Calculate <em>v</em>.</p>
<p>(ii) Determine the kinetic energy lost as a result of the collision.</p>
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<div class="question_part_label">d.</div>
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<p>The trucks X and Y come to rest after travelling a distance of 40 m along the horizontal track. Determine the average frictional force acting on X and Y.</p>
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<div class="question_part_label">e.</div>
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<p>Nuclear fuels, unlike fossil fuels, produce no greenhouse gases.</p>
<p>(i) Identify <strong>two</strong> greenhouse gases.</p>
<p>(ii) Discuss, with reference to the mechanism of infrared absorption, why the temperature of the Earth’s surface would be lower if there were no greenhouse gases present in the atmosphere.</p>
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<div class="question_part_label">f.</div>
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<p>Outline how an increase in the amount of greenhouse gases in the atmosphere of Earth could lead to an increase in the rate at which glaciers melt and thereby a reduction of the albedo of the Earth’s surface.</p>
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<div class="question_part_label">g.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>the net (external) force acting on the system is zero / no force acting on system / system is isolated;</p>
<div class="question_part_label">a.</div>
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<p>(i) no external force/system is isolated so change in momentum is zero; { <em>(do not accept momentum is conserved/constant)</em><br>force on ball must be equal and opposite to force on the person;<br>so ball and person/Earth/pond move in opposite directions;</p>
<p>(ii) Newton’s second law states that the rate of change of momentum is equal/proportional/directly proportional to the force acting;<br>the horizontal force acting on the ball is zero therefore the momentum must be constant/the rate of change of momentum is zero;</p>
<p><strong><em>or</em></strong></p>
<p>Newton’s second law can be expressed as the force acting is equal to the product of mass and acceleration;<br>the horizontal force acting on the ball is zero therefore the acceleration is zero so velocity is constant (and therefore momentum is constant);</p>
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<p>\(F = \frac{P}{v}\) <em><strong>or</strong></em> \(\frac{{0.75 \times {{10}^6}}}{{44}}\);<br>17kN;</p>
<div class="question_part_label">c.</div>
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<p>(i) 3.7×4.0=10×<em>v</em>;<br><em>v</em>=1.5ms<sup>−1</sup>;</p>
<p>(ii) KE lost\( = \frac{1}{2}\left[ {3.7 \times {{10}^3} \times {{4.0}^2}} \right] - \frac{1}{2}\left[ {10 \times {{10}^3} \times {{1.5}^2}} \right]\);<br>=18kJ;</p>
<div class="question_part_label">d.</div>
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<p>initial KE\( = \left( {\frac{1}{2}\left[ {10 \times {{10}^3} \times {{1.5}^2}} \right] = } \right)11250{\rm{J}}\);<br>friction\( = \frac{{11250}}{{40}}\);<br>=280 N;</p>
<p><em><strong>or</strong></em></p>
<p>use of kinematic equation to give <em>a</em>=0.274ms<sup>–1</sup>;<br>use of <em>F</em>(=<em>ma</em>)=10×10<sup>3</sup><em>a</em>;<br>270/280 N;</p>
<div class="question_part_label">e.</div>
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<p>(i) methane/CH<sub>4</sub>, water vapour/H<sub>2</sub>O, carbon dioxide/CO<sub>2</sub>, nitrous oxide/N<sub>2</sub>O;<br><em>Award <strong>[1]</strong> for any two of the above.</em></p>
<p>(ii) <em>mechanism:</em><br>mention of resonance;<br>natural frequency of (resonating) greenhouse gas molecules is same as that of infrared radiation from Earth;</p>
<p><em><strong>or</strong></em></p>
<p>mention of energy level differences;<br>differences between energy levels of greenhouse gas molecules matches energy of infrared radiation from Earth;</p>
<p><em>explanation:</em><br>less infrared trapped if absorption is reduced;<br>so more infrared is transmitted through atmosphere;</p>
<p><em><strong>or</strong></em></p>
<p>more infrared is trapped if absorption is increased;<br>so more infrared is re-radiated back to Earth;<br><em>Allow only one variant for each alternative.</em></p>
<div class="question_part_label">f.</div>
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<p>more greenhouse gas therefore more infrared radiated back to Earth;<br>leading to an increase in temperature of glaciers/surface;<br>less glacier area so less reflection from glacier surface / <em>OWTTE</em>;<br>albedo defined as \(\frac{{{\rm{amount of radiation reflected}}}}{{{\rm{amount of radiation absorbed}}}}\) therefore albedo reduced;</p>
<div class="question_part_label">g.</div>
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[N/A]
<div class="question_part_label">a.</div>
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[N/A]
<div class="question_part_label">b.</div>
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[N/A]
<div class="question_part_label">c.</div>
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[N/A]
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[N/A]
<div class="question_part_label">e.</div>
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[N/A]
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[N/A]
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<p>This question is about nuclear power production.</p>
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<p>State <strong>two</strong> advantages of power production using fossil fuels compared to using nuclear fuels.</p>
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<p>no radioactive waste;<br>no radiation risks to users;<br>lower expense of decommissioning / easier to decommission / easier to install / lower set-up cost;<br>transportation and storage less hazardous/safer;<br>simpler technology;<br>cannot be used for military purposes;<br>fossil fuels can be extracted/found more easily;<br>no chance of catastrophic accident/meltdown/Chernobyl;</p>
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[N/A]
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<p>A satellite powered by solar cells directed towards the Sun is in a polar orbit about the Earth.</p>
<p style="text-align: center;"><img 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"></p>
<p>The satellite is orbiting the Earth at a distance of 6600 km from the centre of the Earth.</p>
</div>
<div class="specification">
<p>The satellite carries an experiment that measures the peak wavelength emitted by different objects. The Sun emits radiation that has a peak wavelength <em>λ</em><sub>S</sub> of 509 nm. The peak wavelength <em>λ</em><sub>E</sub> of the radiation emitted by the Earth is 10.1 μm.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the orbital period for the satellite.</p>
<p style="text-align: center;">Mass of Earth = 6.0 x 10<sup>24</sup> kg</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the mean temperature of the Earth.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest how the difference between <em>λ</em><sub>S</sub> and <em>λ</em><sub>E</sub> helps to account for the greenhouse effect.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Not all scientists agree that global warming is caused by the activities of man.</p>
<p>Outline how scientists try to ensure agreement on a scientific issue.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(\frac{{m{v^2}}}{r} = G\frac{{Mm}}{{{r^2}}}\)</p>
<p>leading to <em>T</em><sup>2</sup> = \(\frac{{4{\pi ^2}{r^3}}}{{GM}}\)</p>
<p><em>T</em> = 5320 «s»</p>
<p><em><strong>Alternative 2</strong></em></p>
<p>«\(v = \sqrt {\frac{{G{M_E}}}{r}} \)» = \(\sqrt {\frac{{6.67 \times {{10}^{ - 11}} \times 6.0 \times {{10}^{24}}}}{{6600 \times {{10}^3}}}} \) <em><strong>or </strong></em>7800 «ms<sup>–1</sup>»</p>
<p>distance = 2\(\pi \)<em>r</em> = 2\(\pi \) x 6600 x 10<sup>3</sup> «m» or 4.15 x 10<sup>7</sup> «m»</p>
<p>«<em>T</em> = \(\frac{d}{v} = \frac{{4.15 \times {{10}^7}}}{{7800}}\)» = 5300 «s»</p>
<p><em>Accept use of ω instead of v</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>T</em> = «\(\frac{{2.90 \times {{10}^{ - 3}}}}{{{\lambda _{{\text{max}}}}}} = \)» \(\frac{{2.90 \times {{10}^{ - 3}}}}{{10.1 \times {{10}^{ - 6}}}}\)</p>
<p>= 287 «K» <em><strong>or</strong> </em>14 «°C»</p>
<p><em>Award <strong>[0]</strong> for any use of wavelength from Sun </em></p>
<p><em>Do not accept 287 °C</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>wavelength of radiation from the Sun is shorter than that emitted from Earth «and is not absorbed by the atmosphere»</p>
<p>infrared radiation emitted from Earth is absorbed by greenhouse gases in the atmosphere</p>
<p>this radiation is re-emitted in all directions «including back to Earth»</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>peer review</p>
<p>international collaboration</p>
<p>full details of experiments published so that experiments can repeated</p>
<p><em><strong>[Max 1 Mark]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The following data are available for a natural gas power station that has a high efficiency.</p>
<table style="width: 522px; margin-left: 60px;">
<tbody style="padding-left: 60px;">
<tr style="padding-left: 60px;">
<td style="width: 391px; padding-left: 60px;">Rate of consumption of natural gas</td>
<td style="width: 155px;">= 14.6 kg s<sup>–1</sup></td>
</tr>
<tr style="padding-left: 60px;">
<td style="width: 391px; padding-left: 60px;">Specific energy of natural gas</td>
<td style="width: 155px;">= 55.5 MJ kg<sup>–1</sup></td>
</tr>
<tr style="padding-left: 60px;">
<td style="width: 391px; padding-left: 60px;">Efficiency of electrical power generation</td>
<td style="width: 155px;">= 59.0 %</td>
</tr>
<tr style="padding-left: 60px;">
<td style="width: 391px; padding-left: 60px;">Mass of CO<sub>2</sub> generated per kg of natural gas</td>
<td style="width: 155px;">= 2.75 kg</td>
</tr>
<tr style="padding-left: 60px;">
<td style="width: 391px; padding-left: 60px;">One year</td>
<td style="width: 155px;">= 3.16 × 10<sup>7</sup> s </td>
</tr>
</tbody>
</table>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate, with a suitable unit, the electrical power output of the power station.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the mass of CO<sub>2</sub> generated in a year assuming the power station operates continuously.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, using your answer to (b), why countries are being asked to decrease their dependence on fossil fuels.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe, in terms of energy transfers, how thermal energy of the burning gas becomes electrical energy.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
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<div class="section">
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<p><span style="font-size: 11.000000pt; font-family: 'Arial'; font-weight: bold;">«</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">55.5 </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">× </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">14.6 </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">× </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">0.59</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-weight: bold;">» </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">4.78 × 10</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 4.000000pt;">8 </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">W </span></p>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">A unit is required for this mark. Allow use of J s<sup>–</sup></span><span style="font-size: 7.000000pt; font-family: 'Arial'; font-style: italic; vertical-align: 5.000000pt;">1</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">. </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">No sf penalty. </span></p>
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<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«14.6 × 2.75 × 3.16 × 10<sup>7</sup> =» 1.27 × 10<sup>9</sup> «kg»</p>
<p><em>If no unit assume kg</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub> linked to greenhouse gas OR greenhouse effect</p>
<p>leading to «enhanced» global warming<br><em><strong>OR<br></strong></em>climate change<br><em><strong>OR<br></strong></em>other reasonable climatic effect</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Internal energy of steam/particles OR KE of steam/particles</p>
<p>«transfers to» KE of turbine</p>
<p>«transfers to» KE of generator <em><strong>or</strong></em> dynamo «producing electrical energy»</p>
<p><em>Do not award mark for first and last energies as they are given in the question. <br></em></p>
<p><em>Do not allow “gas” for “steam”</em></p>
<p><em>Do not accept reference to moving OR turning generator</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
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<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Energy balance of the Earth</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The intensity of the Sun’s radiation at the position of the Earth is approximately 1400 W m<sup>−2</sup>.</p>
<p>Suggest why the average power received per unit area of the Earth is 350 W m<sup>−2</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The diagram shows a simplified model of the energy balance of the Earth’s surface. The diagram shows radiation entering or leaving the Earth’s surface only.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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" alt></p>
<p style="text-align: left;">The average equilibrium temperature of the Earth’s surface is <em>T</em><sub>E</sub> and that of the atmosphere is <em>T</em><sub>A</sub> = 242K.</p>
<p style="text-align: left;">(i) Using the data from the diagram, state the emissivity of the atmosphere.</p>
<p style="text-align: left;">(ii) Show that the intensity of the radiation radiated by the atmosphere towards the Earth’s surface is 136Wm<sup>−2</sup>.</p>
<p style="text-align: left;">(iii) By reference to the energy balance of the Earth’s surface, calculate <em>T</em><sub>E</sub>.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Outline a mechanism by which part of the radiation radiated by the Earth’s surface is absorbed by greenhouse gases in the atmosphere.</p>
<p>(ii) Suggest why the incoming solar radiation is not affected by the mechanism you outlined in (c)(i).</p>
<p>(iii) Carbon dioxide (CO<sub>2</sub>) is a greenhouse gas. State <strong>one</strong> source and<strong> one</strong> sink (object that removes CO<sub>2</sub>) of this gas.</p>
<div class="marks">[7]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>the solar radiation is captured by a disc of area π<em>R</em><sup>2</sup> where <em>R</em> is the radius of the Earth;<br>but is distributed (when averaged) over the entire Earth’s surface which has an area four times as large;<br><em>Award<strong> [1]</strong> for reference to absorption/reflection.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) 0.700;</p>
<p>(ii) <em>I</em>(= <em>eσT<sub>a</sub></em><sup>4</sup>)=0.70×5.67×10<sup>−8</sup>×242<sup>4</sup>;<br>=136Wm<sup>−2</sup></p>
<p>(iii) <em>σT</em><sub>e</sub> <sup>4</sup>=136+245Wm<sup>−2</sup>;<br>hence \({T_e}\left( { = \sqrt[4]{{\frac{{381}}{{5.67 \times {{10}^{ - 8}}}}}}} \right) = 286{\rm{K}}\);<br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) the Earth radiates radiation in the infrared region of the spectrum; the greenhouse gases have energy level differences (in their molecular energy levels) corresponding to infrared energies;<br>and so the infrared photons are absorbed;<br><em><strong>or</strong></em><br>the Earth radiates photons of infrared frequency;<br>the greenhouse gas molecules oscillate/vibrate with frequencies in the infrared region;<br>and so because of resonance the photons are absorbed;</p>
<p>(ii) most incoming radiation consists of photons in the visible/ultraviolet region /photons of much shorter wavelength than those radiated by the Earth / photons of different wavelength of that radiated by Earth;<br>and so these cannot be absorbed;</p>
<p>(iii)<em> Source:</em> emissions from volcanoes/<span style="text-decoration: underline;">burning</span> of fossil fuels in power plants/cars/breathing;<br><em>Sink:</em> oceans / rivers / lakes / seas / trees;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A nuclide of deuterium \(\left( {{}_{\rm{1}}^2{\rm{H}}} \right)\) and a nuclide of tritium \(\left( {{}_{\rm{1}}^3{\rm{H}}} \right)\) undergo nuclear fusion.</p>
<p>(i) Each fusion reaction releases 2.8×10<sup>–12</sup>J of energy. Calculate the rate, in kg s<sup>–1</sup>, at which tritium must be fused to produce a power output of 250 MW.</p>
<p>(ii) State <strong>two</strong> problems associated with sustaining this fusion reaction in order to produce energy on a commercial scale.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Tritium is a radioactive nuclide with a half-life of 4500 days. It decays to an isotope of helium.</p>
<p>Determine the time at which 12.5% of the tritium remains undecayed.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) number of fusions required per second \( = \frac{{2.5 \times {{10}^8}}}{{2.8 \times {{10}^{ - 12}}}}\left( { = 8.93 \times {{10}^{19}}} \right)\);<br>1 tritium nucleus has mass of 3 amu=3.0×1.67×10<sup>-27</sup>(kg)(=5.0×10<sup>-27</sup>);<br>total tritium mass required = 4/4.4/4.5/4.48×10<sup>-7</sup>(kgs<sup>-1</sup>);<br><em>Award <strong>[3]</strong> for a bald correct answer.</em></p>
<p>(ii) <em>Award any two appropriate problems e.g.</em>:<br>difficulty in maintaining high temperature for long periods;<br>difficulty in maintaining high density of plasma for long periods;<br>difficulty in enclosing plasma for long periods;<br>difficulty in controlled removal of heat from plasma;<br>difficulty in maintaining magnetic fields;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>one-eight remains / 87.5 decayed;<br>3 half lives;<br>13500 (days);</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The radioactive nuclide beryllium-10 (Be-10) undergoes beta minus (<em>β–</em>) decay to form a stable boron (B) nuclide.</p>
</div>
<div class="specification">
<p>The initial number of nuclei in a pure sample of beryllium-10 is N<sub>0</sub>. The graph shows how the number of remaining <strong>beryllium </strong>nuclei in the sample varies with time.</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>An ice sample is moved to a laboratory for analysis. The temperature of the sample is –20 °C.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the missing information for this decay.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>On the graph, sketch how the number of <strong>boron </strong>nuclei in the sample varies with time.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>After 4.3 × 10<sup>6</sup> years,</p>
<p>\[\frac{{{\text{number of produced boron nuclei}}}}{{{\text{number of remaining beryllium nuclei}}}} = 7.\]</p>
<p>Show that the half-life of beryllium-10 is 1.4 × 10<sup>6</sup> years.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Beryllium-10 is used to investigate ice samples from Antarctica. A sample of ice initially contains 7.6 × 10<sup>11</sup> atoms of beryllium-10. State the number of remaining beryllium-10 nuclei in the sample after 2.8 × 10<sup>6</sup> years.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what is meant by thermal radiation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss how the frequency of the radiation emitted by a black body can be used to estimate the temperature of the body.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the peak wavelength in the intensity of the radiation emitted by the ice sample.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Derive the units of intensity in terms of fundamental SI units.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iv.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(_{{\mkern 1mu} {\mkern 1mu} 4}^{10}{\text{Be}} \to _{{\mkern 1mu} {\mkern 1mu} 5}^{10}{\text{B}} + \beta + {\overline {\text{V}} _{\text{e}}}\)</p>
<p>conservation of mass number <strong><em>AND </em></strong>charge \(_{\,\,5}^{10}{\text{B}}\), \(_{{\mkern 1mu} {\mkern 1mu} 4}^{10}{\text{Be}}\)</p>
<p> </p>
<p><em>Correct identification of both missing values required for </em><strong><em>[1]</em></strong><em>.</em></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>correct shape <em>ie </em>increasing from 0 to about 0.80 N<sub>0</sub></p>
<p>crosses given line at 0.50 N<sub>0</sub></p>
<p><img src="images/Schermafbeelding_2018-08-10_om_19.42.49.png" alt="M18/4/PHYSI/SP2/ENG/TZ1/06.b.i/M"></p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong><em>ALTERNATIVE 1</em></strong></p>
<p>fraction of Be = \(\frac{1}{8}\), 12.5%, or 0.125</p>
<p>therefore 3 half lives have elapsed</p>
<p>\({t_{\frac{1}{2}}} = \frac{{4.3 \times {{10}^6}}}{3} = 1.43 \times {10^6}\) <strong>«</strong>≈ 1.4 × 10<sup>6</sup><strong>»</strong> <strong>«</strong>y<strong>»</strong></p>
<p> </p>
<p><strong><em>ALTERNATIVE 2</em></strong></p>
<p>fraction of Be = \(\frac{1}{8}\), 12.5%, or 0.125</p>
<p>\(\frac{1}{8} = {{\text{e}}^{ - \lambda }}(4.3 \times {10^6})\) leading to <em>λ</em> = 4.836 × 10<sup>–7</sup> <strong>«</strong>y<strong>»</strong><sup>–1</sup></p>
<p>\(\frac{{\ln 2}}{\lambda }\) = 1.43 × 10<sup>6</sup> <strong>«</strong>y<strong>»</strong></p>
<p> </p>
<p> </p>
<p><em>Must see at least one extra sig fig in final answer.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1.9 × 10<sup>11</sup></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>emission of (infrared) electromagnetic/infrared energy/waves/radiation.</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>the (peak) wavelength of emitted em waves depends on temperature of emitter/reference to Wein’s Law</p>
<p>so frequency/color depends on temperature</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\lambda = \frac{{2.90 \times {{10}^{ - 3}}}}{{253}}\)</p>
<p>= 1.1 × 10<sup>–5</sup> <strong>«</strong>m<strong>»</strong></p>
<p> </p>
<p><em>Allow ECF from MP1 (incorrect temperature).</em></p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>correct units for Intensity (allow <em>W, Nms<sup>–</sup></em><sup><em>1 </em></sup><em>OR Js<sup>–</sup></em><sup><em>1 </em></sup><em>in numerator)</em></p>
<p>rearrangement into proper SI units = kgs<sup>–3</sup></p>
<p> </p>
<p><em>Allow ECF for MP2 if final answer is in fundamental units.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.iv.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iv.</div>
</div>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold;">Part 2 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">Electric charge<br> </span></p>
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<p>Two plastic rods each have a positive charge +<em>q</em> situated at one end. The rods are arranged as shown.</p>
<p><img src="data:image/png;base64,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" 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<p>Assume that the charge at the end of each rod behaves as a point charge. Draw, in the shaded area on the diagram, the electric field pattern due to the two charges.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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513jO/EpSM4aJNdu3Y1oXYczy7W2rRpk/Tt29eAT9bO5rVr18qSJUvk2muvlZ49e4r6eYIk3Jx7Cj7N4XuqVc855xy5++67hVyZdevWOXMEhxGFU5jIELk+aSNtgNdnn30mnTp1ytzv8s0338izzz4r48aNE/xW+Jj0Kg4HFHyKI4tYlOCHmTJlirz66qvG/HKhkTQiYODAgbJnz57UphcAhrnFf1lrPeRGATjwqWPHjpmv14h/+llLDij4tORJae6Qq4L5NXfu3Myzn3HW7tq1yzi50wAdUTPMn6y1EJzaixcvlmnTpkm3bt3U3Crgt1rBp4BCsSWpQ4cOctddd8nChQtl8+bNmZpfaD44nfH7pLm2bdsmvXr1ytTZjHOZrOzx48fLsGHDMjfv0vDjdH5Wwafk0r/wwgtl9OjRMmfOHDlw4IATh3AQS/r37y+ffPJJavDxMpuz1HzIgzp06JBMnjxZ8I9lbd4F8UvvRXNAwSeaR4Ufccstt8inn34qq1atyqxQkx8xGkXaWizMLvKVsvL54MwmmZCwOhnhGt0q7tdXwae4srGmrHPnznLjjTeaH11WuT9oD0S8SNhLE/EiQ5t5siqrwMmMT2nUqFG5JTFaC0oHnsIBBZ9T2FHeN5deeqlx4tJ+I6vSC7KSMb3QfpJcABfZxVmVNmzdutWkH0ydOtWUb6i5lURK+T2j4JMfrzNdCTOG0ov333/fAEQWmc8kBlKXRZlFkojX3r17pUuXLgZ8XAMD+6VifcyYMTJgwAATBcyU4Tp5ag4o+KRmYXEmwNTA5CDEjJaRBCAa7YYfNbk+STUf+vfg78nC2UytG6kAkyZNUidzIyEW6DMFnwIJIy0pOFfRfhYsWJCJ9uOZXUkLTAGfLHJ88EG9+OKLJrpFGF+dzGm/Sfk8r+CTD59zW4VkQMLiixYtMomHLrUfkvVoq0ozriQXka7u3bs7j3RRYkKPI4puNZM5iWSa84yCT3P4numqt99+uwEf161CcRQTpUoaboceilRdOpzx9aD1XHbZZcakc+1LylRQp/nkCj4V/AIMGjTItKz46KOPnGs/OIzpgxzX7wNI0AD/7LPPdpr0R4U84fuLLrpIyPhW8CnPF1rBpzyyikXpbbfdJrQN5Yfp0vSi7zKJfHHBxwMeNCeXAPHyyy/LxIkTjTnnct5YzNbBiTig4JOIbcV/iKp3kvnoZ+PyeBocuh74xAE1omSYXBTCurqoNcOJTXmJ+npccTW/eRR88uN1risR8bn11lvl3doRNS5rvuhAmKSZPMmJmGwuw+x0KMTcInyvEa5cv15OFlPwccLGYk6CRoCvBb9I2mp0b4fUS1FHFtfsQvPxEgy9udK8EnXj0EF6Mp977rlOTbk0dOmz9hxQ8LHnVelGomVMnz7dnHbh6sRRQuVoUnHD7V6ky5XZhT+LjGvyhlzNWToBl5xgBZ+SCzCKfA4bxC9CaUOaglBvHSJK1I6hUcW5MLu8MHtaxzBa3Ntvvy3Us+HXSjtfnH3oWHccUPBxx8tCzoRJQg9jwu4uSi74oZOng+YTx+FMEiBtOVxoKatXrzYV65R7UNOmVzk5oOBTTrnFoprTTjnBwdVJpwAazdnjaFJE3Fz18KFvNVoPBw/qVV4OKPiUV3bWlFOThXlCq9WkdVn+xSiziOP3wTmNxuPCPMJ8w39Ee1Tac7iY0783/Ts/Dij45Mfrpq3ED5Szvjjp1IXjmahVnBovtCQym10kGH7wwQdC61ho0PB6075SThZW8HHCxuJPQtElWgMJgnHMpaCd4TgGUGz9PmRZYyKl7V6IBkWUCx+WhteDJFOuewo+5ZJXYmrJAEZjoM8z0ao4zuL6RTnwD7PLFsRcOZs5DgdnNyUeLotT6/en7/PhgIJPPnwuxCo4njlmB60lzYUWg/lmm+tDISqaSlrNh/A6dVz4r/QqPwcUfMovQ+sd0OsHwCDnxxY4giZH84kT7cI/RH5QmjA7han07eHYY9eV8UF71HvZc0DBJ3seF2YFfvy0Gf34449TtdpA8wEMbM0utKS0mg8FskTZcDSn1aAKI5DTnBAFn9PsC3DFFVfIsmXLUple+I/iZDnjH0ob7cLkmjBhgklUPM1EVtntKvhUVrTBG6PFKqF3cmWSml7UjBF5snVao/lgdiUNjaNlccwyRzaryRUs1zLeVfApo9RS0AwAoEEQ9eJHbQsgQUvyrM3z/jyfoHmi7uHrweTicMSkABa1hn6ePwcUfPLnedNXxPRavny5AZ+kxMQBAUDuzDPPTAwcc+fONc3hqQ3TqzocUPCpjiytd4LpRa0V+Te2TuP6yT3Tq/5+0Huq0JPWdWEaovkQqdNyiiDulveegk95ZZeYcqJehKyp9UraYhVNhmdtwMvGNAvbDEcg4+AmvK9RrjAulfO+gk855Zaa6ilTpphOgEn9PmghaDRx+/rEJZxq/JEjRxqHddxndXyxOaDgU2z5ZEYdms/OnTsTO52JOqH5pNFqbDYH+AwfPlyPxbFhVsnGKPiUTGCuyMV5S7Jgkn7M0IAPxybcjlmGczpJ6wuiZDRAo0G81nK5knxx5lHwKY4scqeESvf169fLoUOHYmswgA9mV5Tmg8M4aVkFtHFahjqac/9q5LKggk8ubC7mIuT7EEkCfOJeAArAEuXz8RqJJdF+aP3qmVxx6dPxxeeAgk/xZZQZhfRApsdPEs3Hto8z2lHSKBW9mslqVs0ns69AUydW8Gkq+5u7OD9qNBiS+Ih6xbk4hwt/EdpPI9PLyyeKGle/NmkA27dvN+0zkppt9XPq+2JxQMGnWPLInRocwo8//rgsXbrUur8zfaApTqXYE4dwo4uD/fDd7Nq1y7qWjELUJ554wuQh2eQRNVpfPysuBxR8iiubzClDY6HF6cqVK+Wxxx4zIIGPJuqilSnJf4TBCdej1QRdzDVr1izTP+j55583fZ8baUnMgQn4zDPPyF/+8hfT8hUgivIrBa2t94rPAQWf4ssoMwrp50zFOT9uzj1/5JFHDKiEgQmEoPX8+c9/NkBCk7CXXnpJ6FQYBCpoUziNAZTZs2fLxo0bGx6zzLpoPL/73e9M1T1aj4u2r5kxUCdOxQEFn1TsK/fDnGaB5kMODk3hcT7jx2lk6vDMokWLDIjw3HPPPWdApR6w0HqefPJJo70Q6QKo/vjHP5r1goAKTuIfAqDIQSKUDyhyRhfP6lU9DrSp3pZ0R7YcoDj0gQceMCdCjB49Wqh2HzRoUMO8HDSfG2+80ZhqRLwuuOACAxT1gEKUi7luvvlm4x8aM2ZM5HE3gNRDDz1k+jQ/9dRTwjPUkAFEelWPA61qX5oT1duW7siGA/hT+GE//fTTRtvgbC+0jkbZyGQdAyz4ZXh22rRpptcOxZ/+59CEGEtUDDPq4Ycfll69epmePFGhd9q8olH95Cc/MWF2GsZrxMtGouUao5pPueTllFrvFAhO/1y8eLHx50T1zPE+J0zP35hr9cADkYAFleiYUoAUjcAY6weosM1s2bLFZDZTP8YcNs+EzaX3i8sB9fkUVza5UUavHKJWaDS2F/4YL2u5ETgAQoyNo2ADPmhJgFajuW1p1XHF5ICCTzHlkitVtCjFqVvvNG5EhFc20WgMnwE+ceblGZILe/bsKfik9KouBxR8qitb653xI8cPgzPZVkMBUACWKM0EpzTRM1vth/XxRWHSRfmGrDeoAwvJAQWfQoolf6I87ccmyRDqPM0H06vRBfhgztmCGkfyEOFS4GnE1Wp81vibU4096i4sOICPhaRDW/DBkQyw2Go+FiSYIRzpg5PZZm7bOXVcMTmg4FNMueROlR98bLQUTDQbgEAzsjW52DSheaJizK1XtTmg4FNt+VrvDgcvp1nYOofRfAi3R5ld1gR8P5Asa0/zifusji8XBxR8yiWvzKjt3r27KX2wNbvwzeCodg0++/fvN5nQqvlkJurCTKzgUxhRNJcQTB0KRBvVdfkpBHzIw7EBH8bYmHLMT23ZueeeaxVJ89Ojf5ePAwo+5ZNZJhTzg6c3jy34oCHZaieAFONtAIh8I8wuwvh6VZsDCj7Vlq/17vyZyDYgwRgiXVHRLgigTAJNCcdz1EWLD3xJGmqP4lT5P1fwKb8Mne0AILEFnjiLolXRptVGq/KSF+PMr2PLyQEFn3LKLROqSe6zcTgzJk7dFdnKNBSz0Xwy2ZhOWkgOKPgUUizNIapDhw7GPIrSUGiVAVDZOJvZid+f1EizQuvB3LIx5ZrDIV3VJQcUfFxys+RzeUcgR2koRMUAFFu/DK078PlE5RCRuEj4XsGn5F8kS/IVfCwZdToMw9FLHZYN+KAl2UakOJYZR3KURoVp5uUOKQBV/xun4FN9GVvvkNC5TUiccHgczYdGYjbgA/BBg605Z70xHVhIDij4FFIszSEKJ3KUaQRlNJ2PAz7k7QA+UXMDfDZtOprDHV3VNQcUfFxztMTzYepgcjVyCrM9NB9MKVug6NKli+nREwU+mGW2plyJ2aykf88BBR/9KpzkAOAD8ESBDyUQcZq6E2onzycK2PhcfT0nxVH5PxR8Ki9i9xuk+t3TfGxmR5sBWPiv0aXA04g71ftMwad6Mk28I8wemzwbQu1Eu2xD7RBEGD+qTSuO5qiIWOLN6YOF44CCT+FE0jyC+OEDAI00ELQXzzfTaFz9LvD7AFqN/D5oSMwdZfbVz63vy8kBBZ9yyi0Tqgl1RzmR8d2gxcQNh9MvCHOtUSifMDvgpOCTiXgLN6mCT+FE0jyCvAzjRsBCp0F6/8SNSnGssgc+YTsk1B+n2XzYPHq/HBxQ8CmHnHKhkgzjqJoteixjQtn28vEI7927t2kUhuYTdrE2AIhpp9pPGJeqc1/BpzqyTL0TmokBAI18Obt27TJns1MGEecCfDgdA80m7GLtRmZZ2HN6v5wcUPApp9wyoZriz6im8P7TRBuBVD2BPXr0ONkjOkyrYT4+C/u8fk59X24OKPiUW35OqfeiXY0mRfPBeRxX88FJjTnVyOxqtK5+Vj0OKPhUT6aJduQlAKJ9hGk0gBOmWceOHWNHuyAKR3WU0xnNKyofKNEG9aHCcUDBp3AiaQ5BOJvRTsKAB6ooKKWsAmdzo3FhOxg0aJA5FLBRRIv5AbhG+UBh8+v9cnFAwadc8sqMWoCFGqxGIfRNmzYJjmNC4kmuoUOHys6dO4UDB8MuLxkRLUuvanNAwafa8rXeHZEoWl80KpnYsGGD9O/fPxX44LDGrAq7unXrZjKhNeoVxqHq3FfwqY4sU+3ESx5slL+zbt06Az5R4fgwQkg0pB1HI5+OPxM6bB69Xw0OKPhUQ46pdxEFPphB+/btM07jRgDViBAiZFTD43QO8+lwZjwmoEbFGnGyGp8p+FRDjql3QQidaFSYM5kePviEiEYlcTZ7BF544YXimV5B+Ty9evVS8PGYVfFXBZ+KC9h2e3v37jWZy2FazerVq2XAgAEGfGznDBo3atQo2bhxoznNIuhzz+GsBaZB3KnWPQWfaskz0W7QQKhWp0dPWFHpihUrZPjw4ZHlF1EEoPns2LEjNOLlgV+jMoyoNfTzcnBAwacccsqUSvrskOMT1kgMcCLS1a9fPwM+aYghosZ14MCBUL8PpRg4ptXvk4bTxX9Wwaf4MsqcQq9ey9M66hfcv3+/0YhwFjcKxdc/F/Qef9GwYcNk69atRvsJ8vtg3lE93ygqFjS33isXBxR8yiWvTKglebBv376h+TuYXCQIEmJ3cU2aNEnWrl0b6vcZPHiw7N69u2E+kAs6dI7mckDBp7n8L8TqnklF5nJQJGvhwoUycuRI4xMK+jzuJpgLzYcq+iDNB6Br5BeKu56OLyYHFHyKKZdcqfLMrqBKdfwu27ZtM/6epGUV9ZvB74OPibyhIL8OuT7kAjWqAaufU9+XjwMKPuWTmVOKv/nmGwMA5PAE+XMAHnw9FHyGRcKSEDRhwgRZv359oPYDCHIiKo5wrfFKwt1yPKPgUw45ZUYl4NKoWPTDDz+Uiy++2LTRcEnEpZdeKitXrjQV7EHz+k2vINMs6Bm9Vy4OKPiUS17OqcWZPGTIkEBnMj1+li5dKiQGRrXbiEsYBar4fMJKLQC8zZs3hzql466n44vHAQWf4skkV4o+/vhjE8kKKpsg4oTWQaV5o1YbSQgmrE/CIdnO9BKq1274DKc0n+lVTQ4o+FRTrla7oq8OOTxUkgfl+MybN09Gjx5tarqsJow56Oqrr5aPPvpI8DvVX5RZoHmRjKh+n3ruVOO9gk815JhoF2gWAE+QSYUmQogd8An6PNGCdQ/h18GpTBV7PcDg3OZzInFBmlHdVPq2hBxQ8Cmh0FyRvGjRopP5O/Vz0nGQUDdh7yCtqH58kvckLWJehUW9vGRE6s70qh4HFHyqJ1PrHWHy8OMP8ve8//77Mm7cOBPydpFYGEbUtGnTjFP766+/bjHkoosuapiM2OIBvVEqDij4lEpc7ojF14M5E+TvIfEPrWjMmDEmxJ4l+FDnRdSLZmb1DcbIL+KkDD4LSkZ0xw2dqRkcUPBpBtcLsOayZctMiwz8OfUX5RYk+mFyuY5y1a+FSXfJJZcIIX8cz/VRr4kTJ8qaNWtMy4/6z+rn0vfl4oCCT7nk5YzaDz74IFSzeeONN2Ty5MmZm1zeZoh6EfInslUPMCQjAj5BETHveX0tJwcUfMopt1RU41/BlKF1RX29FgBA7o2XWJhqIcuH+/TpY4pWt2zZ0qLJGJ9hjnG6Rr1ZZjm9DisoBxR8CiqYLMlavny5AR7qp+r9OYTXBw4caBILXdZyNdoP61x33XUyf/58ARj92g/1Zji+aePKYYL+zxrNqZ8VnwMKPsWXkXMK3377beNnwZnrBx9ybebMmSOYOhSa+j9zTkTdhBSaoo3RqL5ew7nqqqsEwFTTq45pJX+r4FNyAcYln1oqmsXTsKu+ORhNxYgqYY4FtdeIu1ac8YAdCY04wsnr8Ws40MNFuYdGvQwrKvE/BZ9KiNF+E5g2hLdpkVGv2bz88stG66HfTl4ml59yTC80HNIA/OCD6YU2hlM6KCLmn0P/Lg8HFHzKI6vUlFIr9e677wqZw/VmFVoF7TXI7QkKv6de3GICGtR37tzZRLfquxxieuH3obG8H5gsptUhBeWAgk9BBZMFWYALTdn5kdeXTLz66qsGeDg5ohlaD/tl3VtvvVXmzp1rolt+kOGoZbS1oIhYFrzSObPngIJP9jwuzAqzZ882Wg+Zw36Ti5MiaOxFbk+9RpQ38V6IHxPL304DemfMmGGKXYPygfKmU9dLzwEFn/Q8LMUMhLD5QWNWcTigH3zw9fCjJ6cmqJVqnhsko/q2224zYXd6PGMqetf48eONRhRUiuGN0dfycEDBpzyySkUp+TuAC2aVH2Boq0EG8RVXXNF0rcfbIF0MyUGi8NWf20NqAODphd39Zpn3rL6WhwMKPuWRVWJKCU9TMjFlypRTSibI63n22WeFHJsiaD3eBtF+7rzzTlmwYIHs2rXrlF4/RMSoAyMi5teKvGf1tTwcUPApj6wSU4pmg5lFbo+/nALNAtPm8ssvL4zW422SdADofe+9906p+QIkaeu6bt26wJMvvOf1tfgcUPApvoxSUYhp8tJLLxmzyu9oxgf04osvyjXXXGOq15sV4QrbHPTcfvvtpp8PQEOUjgsQvemmm4RTNTTsHsa9ctxX8CmHnBJTiU+Hokz8KP78nddee804nnHi0kysiBctPa6++mp58803TdmFZ2bRZAy/Fa0/6EOtVzk5oOBTTrlZU412Q1Jh165dT0a4aFu6ePFiuf7664VG7f7Il/XEOQ0EfCgDIffHy27GJzRz5kxzjx7Q6njOSRiOl1HwcczQIk1HH2aS8nAoe+F1zC2czDTp4ryurJuFpeUH2tpdd91l0gTwXdFXmos9kQdE+w/PJEu7lj6fLwcUfPLld66rvfLKK4JZRXYwPhQ0BO7xeuWVVxbOyRzGHE6xoLaLinuKYjG/AKXp06cLTdHU9xPGuWLfV/AptnwSU0eIGk2BrGWvdQbRLcLUmCxEjIpsbtVvnBA7+3jrrbfMcTsAKFE6r/kZ2o+aX/VcK/b7Nq7Io0cMvgRaMZTpS+1q/0WZh5yeH/zgByaSRUJer169jHMWjQH/Dz9Ywtj1tV1FoT+MDjQdcn8ee+wx09wezQ0wQvvhpI2+ffuaV/ZftMhd2J6qeJ+CYL53NIDzTP2wfToDH5LYiJqQh6FX8zjw/PPPm8bwhKd/8YtfmB8ovhH8PGg7JBrypSjjxfnuN9xwg7z++uvm1A2iXmRmv/POO7Jq1SoDrpdddpnQEkT/AWyOhDdv3myawfEPXNT3zBn4oPbee++9BvX86fvNYcHpuyoa6KxZs4xDFq2HHyG1W5wK+uCDD5b+hwm47Nixw2RsAzJU6BO1wx/E9+7uu+8WQEq1n+b8BlBC6J5gYwKrz6c5MspsVf4RoDcPP1L+5SEZDz/PLbfcIr179y79jxKAoe0GZhjOc0AVvxalIoTi649dzozROnFqDij4pGZhsSagEBPTBK0H04sEPRpxcTJp3q1Rs+IMvp577rnHOJvRePDz0G6DfKCW/+IeN2ZAy/tZUafz2nJAwceWU00Yt2/ZAtnx1bdy5D+6SkRSQe0WWg+9mvH/ADq8r+/XHDlRwQcArpRfALC0hqUOjETKFib/kU/kpd8vkX2fHpRjtQiZXsXhgIJPcWTRgpJ9K74Hnxg/GrQCGrD/9a9/NS1JCVE3u0FYi405ukEPIjQewIe0Avw8LXw9Rz6Tt55dIfs+PyTHFXsccd7NNM4czm7I0Vn8HDij5t9o/f0/D/xuWvk+PHZwnyydu0g2HTgi3Xt2ke/+1l7GThlT05KOm8gWzliactETucqRH6J3+HpINuTYnRY+nzPaSPuebWqpBafy7x+sPCzbli+Upes/lfadu0n7Wpi4+5hJMqxPZzmrjf677Pu6ZfKngk8mbE046fGvZcOqLXLwyDE5Xvvur9+yVQ6dt0xO7Oss7VodlePtusqFw/tJu2+2ymNPPCnftO4pPS44W9559E+y4MQk+V8XDa/5Qb42PpA77rjDNA5roQkkJK2oj7E/tB+ABw2IM7+OfLVbNuz4TL47JnLi4EeybvfqWpvYvnLwQBc5/t1R6Tr4Qunb5YQs/7cn5P/t/k4G1Uy4Nqt/L2++f0hu//VgGdCzs5xZ+2X4wb6o+y8zXQrvhZLed/JpLYy8uXZ+1pbtm2RjrSJ9Ry1subX2nvyJTdv3yd8PfiJzHv1nmbXiGxl+1Y1y353TpW3tVIfjXbpJx/ZtpV2b/wg3F71uyxXrSZgk3E6XRrS8Q1/ulS3btsimTTXebdwu+w/sk607t8smeLhhk3zy5UHZ9MFj8s+Pz5NWvSfKbffcJeM77ZeN354jnc85S9q2bqXA40o4DeZRzacBc3L/6IxzZEjt4LxetX+dW9XMhHZrP5JDY8fI6B7nSzvsr7bnyJEtb8hjT62W6b95RK4Z1U9aH1gg645+J1dfPly6dGwvbWqmGqc8tHC85r6ZfBfE0Y5TnX2369RbRo/rJkePnJA2xzrIiNlny+gx42VQ7/Ok3YkzpP2Zn8v/fvxpOTDpv8r/uHGC9DrnsMzfcEy6T7xc+nY9V9q3zpf203U1BZ9CSb69XNBvwEmKvu3fR74cOEgG9OoiZ9f+NRY5KgtfmiVrOo6W/zayt3Ro97X8+/99ShYcGyb3DO8hZ7VrY0wukgp//OMfF75dxsmNOvhjyZIlpuiUsPuZ5w+UgZ2/V+r/fli6tt8h/Xr3kyGDu0qbM1rJt5uel7dXdpR7/+cY6dmpg+x687fy3DvrZex/Hyzdzj1LzlC9x4FEoqdQsyuaR00bcYwQ+ylh9qOyd91GOXpWRznj6N9k5Qv/Iv/6xEvSduS1MqR7p5p2JCaxkAZiJODRPuN0yG8hiZLDELlaaHw1JrY6cdyw0Qt2Hfxstxw7eracd7bI/o1z5F9/9wf5YF8vGTusj5xztjp7DCNz+J+CTw5MTrpE94snS7/zO0jbmh/jH9cZ0nPIOGnz1VJ5/Hf/Jh8s3SBtDx+RK6aNlO7n1EyO2r/Y+HnIZsZHRM0TYfcqX/QrQtMbNGiQSaxs4edq212uu2eiXNC1g5zxPR/P6txTerX+SmY/9ag8+/YC2X30sBwfO1MG1aKGZ9bMW4/bVeZbEfamZlcRpBBCwwW1sO+pVzsZefvP5D8ffVe+ONRBRo7rJa/+dZtcOaqvdPg+PEMRKUV99GumdzMhdzoZFrVV6qn7i/eOCBcFsziap06dKpheLS7A59bup9zu2O9S+enPHpAVn34t/S6cIIc/+ItcOn20XHD+2dL6JNCf8oi+yYADCj4ZMDXLKc8ZcKn8/L+Mqzmf28q2534uuwZPkRG9u5m8FP7FBnzI+r366qtPlh8ARCNHjixdG41GfKSMhAxuIl30J+IUDuq8CLVHXmf1lpsf/pnMONpWjn/+vjy4vY9M/08DpVNH2sFEPq0DHHHAqdl1OvgXHPE91TStjx2QVe89L//n6TfliwPfycFDtRyg731DRH1eeOEF092Pkykor8AsobmY14A91eIFeJhEQnxaNMa/+eabTasQ2mzQz9n6qkXFvty2RB79lydl8b7P5cvPvpDvjhw9LXxk1jzKeKAzzYcvNidJ0mO3hdMv402cbtOfOPypLJk3T/a0Hi0Tu3wn61cuk/bfdJb2bVoZHw8NnehaSKMtKsAff/xxA0D3339/JTKeqdSnfw+1XbTUoIkdmg9aH0dCowFFJVe2anVMdq1ZJEs3H5SLxvSQL7eul2WL20mnDm1P+oZOt++Vi/3Cf9tGdc7Ah6NZ6KXrHVDnYiM6RxgHTkj77iNk+nXDaj+ymp3w7R7ZtG6vGYwc0Hjo7je6ljNEhz8qwB999FHjgKbinfqvsl6bagmXVLLTRGzEiBEGZOhfRPEszuY9e/YYc9Nmf8ePnS1XXn3t90Nby54aAO1Vu8uGdaFjOMpowIABpxxOGTbYGfhwkBuV1Gp6hbE6n/u0SQVwli5darQAKr05/4pyi2eeecZ0mqTFpf/k0nwoS78KqQP4eYhs0cOHnj7Lli0ztV2cZjF27FiT55R+JZ0hKQc4FYWOmTbFzM7AhxYH/KdXMThAv+Mnn3zSaD9EutCCyP/BN0J0qGzd/jDrid7h77n22mvNmfOe74fiUk7oQKOrchFtMb5Z7qhw6nB2R5bOlJYDRLf41wcbHF8IP0pMLkovaDDGqQ9l0lLxYa2u1bDRIqR79+7G3MLvQx4TvZyjmpWn5ac+754DCj7ueVqIGfF/YGq99957xgGL5kDtE/4fEhDJCi7LUcP79+83fanx65DDREdGtB40IcxM/2mshWC+EmHFAQUfKzaVcxDNtvCLoDF4QMPpIuTFoP3gnC16+B36cCjTl4hkSe9EBM5pR3tTraec302oVvApr+wiKfdKLah78ptZRIo4o537Ra//wmwEaEgb8DdGI8+HU0xV64n8GhR2gIJPYUXjhjAOcMNE4QfsnWkOKGF+rV271uTIeOefu1nR3Sx0KOSgQ8wtwrfQzbV9+3bhHHrVetzxuhkzKfg0g+s5rol/BDOLvB+/lkM4Hg1o9uzZhT3rHM2MhNVLLrnklEgWJiPpAp7jOUd26lIOOaDg45CZRZ2KnBgygCmx8Nc+EbLGF0SuDBGxIl2ffPKJcZZDo9+0ooRi5cqVBnxsckmKtCel5VQOKPicyo9KviP/BWftokWLhIJML8TOfcoviIhRIV4k5zM+HZIJhw4desp5Y/NqZSWUVJDX45lhlRTaabApBZ/TQMhskSbraAzUPXngw30yg4kgUZdHTVgRLo5DJocHs/Dcc889mThIl0J6FAGk5CtpQmERpJWcBgWf5Lwr1ZOUWJDZTBGm38RCeyAb2jt6pgjaD6F1MrLRcPzazcaNGw3gkJ1dxvKQUn1hciBWwScHJhdlCervqAgniuTXfijQpOcPmlGztR+iWBSP4qeqL5d44403jPMZWvUqPwcUfMovQ+sdEJom4rV3795THM9ElMiGJiKGWdZM7ee1114T0gPQ1PytWchTApRInNRSCmuRF3qggk+hxeOWOEwVfDxEt6iJqtd++Jx8IC8b2u3q0bMBfGRjQ2O91kNtF2YYyZFRvXqiV9IRReCAgk8RpJAjDdOmTTPOZTQg/4VvhXwgfD/+fCD/mKz/njt3rqm2R+vx+3pY96233jKg5HdAZ02Pzp8tBxR8suVv4WYnuRBzhpyf+sxmNA4awlHz5c8HymMTRLIw+8hmrgcY0gDI7yHLmeJYvarBAQWfasjReheYLFdeeaXRfupNL4pQySamEZk/H8h68hQDaXpP+00KX8nK9l/kJw0fPlzD636mVOBvBZ8KCDHuFtAuyKMh6lV/kVFMMSeaht8nVD/O9XsiWeTvBEWyiNAReteMZtdcb+58Cj7N5X9TVic7GO0C86re9KIbJQBATk1ejmfa79JlkZM20L78yYP08sEHFaQRNYV5uqgzDij4OGNleSbix007CrQf8nr8Gg6fof0sWLCgRT5QVjtcuHChKaUIimQR5Ro8eHCL6FdWtOi8+XFAwSc/XhdqJUwvwtpBxynjeEYrQuvIOucH4KO2jDXrHc0wbP78+cKJHGpyFerr44QYBR8nbCzfJL179zZlFkS36Pfjv8ixwcGLEzjrjGeibgAgJRP1jmbWBgSJ0Gk5hV9C1fhbwacacoy9C/JoKKugn3OQb4fOgZx9Xl+KEXuhiAdwJqPZBBWKbtmyxfTsQevRxMIIRpbwYwWfEgrNFcle1Kve78P8ABNaEaZXvWbkan1MOvw9lFPUZzSzBp/hhPb6NrtaV+cpBgcUfIohh6ZQwQ+blqT+KnePEEwgNBLP9PI7pb0xaV9pnQEAhfXmodB1yJAhLSJgadfV54vBAQWfYsihKVRg6gAyhLqDMpqnTp1qTC8SDrO4GjmTMffQyIiA1ZdaZEGLzpk/BxR88ud5oVak0p1q8SC/D2dkUU0OOLk2vdCkyFxGuwqqUscXRW4Pp636834KxTwlJhUHFHxSsa/8D+Nv4YeO6VVvWqEVAUBhTuk0u6enNAmONDijrKL+IsuaNqokHepVTQ4o+FRTrta7IqS+bdu2k8fq1D9IK1NarLqu9aJ+DKd2kNYDDWvWrDHgo5pPvUSq817BpzqyTLQTDuLD5AqKeDEhzbt2797dov9PosV8D5FBHdYYDBPvs88+M/6eIK3IN43+WWIOKPiUWHguSMefQsIhP3baWtRfhMCp9SLZL+jz+vE27wE6jsbBpxPUIoOmYmhEfKb+HhuOlnOMgk855eaUavw6hNzRgOr9Piw0ceJEc7ppmHYUlxiSB/H1BOX2MBcOcApcg4Ap7lo6vrgcUPAprmxyo4yzsYKai3kE0OOHUy8AHxfX4sWLT1awB82Hg1tLKoI4U617Cj7Vkmei3dAhEL+Od5Z7/SSYR2Q7uyq1IHkQwKtvn+GtiwMcU5B6LjW7PK5U71XBp3oyjb0jzjyneVhYLo/XYZDweBhA2S5K1Iz+PByBHJY8iH+Jz+sLTW3X0HHl4ICCTznklCmVgAD/kesT1kKDfCBKLYLygeIQR9Mwz58TpNUAgJh3YVpRnLV0bLE5oOBTbPnkRh0OYEyroDILiPAnI6YhCpOL5mDk7wRdaEU4omlyHwROQc/ovXJyQMGnnHJzTjUO3rBwO4t5n5OVHBQRsyWIBmYe+ASBCyYX9Vya32PL0fKOU/Apr+ycUk5luQc+QeCC85e+OkHNx2wJwaTjtFR8TGH+HPxK+HsUfGy5Wt5xCj7llZ1TygEfkvsaJRISoaINRlARqg0xNsmDJB+Sda3gY8PRco9R8Cm3/JxR361bt4Y+HxaiFoswOBGvIO0oihgvebBRS1QOCAR8wiJhUWvo5+XhgIJPeWSVKaWAT1hfH29hNJ+dO3cm1nw4jicqeRDtiD5DgE+QT8ijRV/LzwEFn/LL0MkOiDA1CrWzCCFywCEsIhZFCGUVgE+jmi3m5xQL1XyiuFn+zxV8yi9DJzvgx45DGHMqzKTCSYwvhtMmwvKBGhFDJAsNq5E/BwAEnLRhfCNOVuMzBZ9qyNHJLvjBhwGPtwCOacyzRo5pb6z/lfGE6aP68wBqCjx+zlX3bwWf6so29s7QOMIq273J+vXrJ14Xwiig8p7hFXOK1hw2yYPq6/Fzrrp/K/hUV7axd0YPHcCnkUkF+BAOrz/jPWoxHNXk9zSKdDGn+nqiOFmdzxV8qiPL1DuhnooweiPwwenMWV5xzS4bfw9r41fC7FLtJ7U4Cz+Bgk/hRZQfgfzw0T6iwMfLhI5DGZnNUWUTFJSqszkOV8s9VsGn3PJzSj0//KgEQnJwaIsR1n4jjCCSBz3wCdNqCOHb+ITC1tD75eKAgk+55JUptV64vdEi3phGIfmg54mQURsGuIRdgA/zh4FT2HN6v5wcUPApp9wyodoLtUdFsWw0pHoCaVZmAz6NwKl+Tn1fbg4o+JRbfk6p54ePvycKfKi9ou+ObaYz8zFvFLAwDq1HNR+nYi3sZAo+hRVN/oRFgY5HEVnKjdqueuO8V/xIhNijkgc90LGlw5tfX8vJAQWfcsotE6o97cQDgbBFcBxzhjvhdhugwN9DDhGaT6O5Aae4juwwGvV+8Tmg4FN8GeVGIWaUTY4Nzb4AH1ugILu5U6dOkQmEgJPtnLkxRRfKjAMKPpmxtnwTo8lQ9NlIO2FXlElwjI6tzwcTjUr1KJ8PeUbQ0CjPqHxcVYrDOKDgE8aZ0/A+vhkb8EGLAXxstRTMLlp2RJVO4BeyNeVOQ/FUbssKPpUTafIN2WYYAz5Eu2zBB83HO5GiEXX+8g4bX1KjufSz4nNAwaf4MsqNQlvwwYSK09MHoIrK8WGTXnmHAk9uIm/qQgo+TWV/sRanbMImJI6GQtMvW80HE80m2uX5mhR8ivW9yIoaBZ+sOFvCeQGTKL8M28JxHMcpjOYD+ETl+TC3B0D8rVe1OaDgU235Wu8ObYMfvvef9YMWA9Go6GAYFe1iKjSvqIZmFkvqkBJwQMGnBELKg0Svl46t5oEWg/ZjYyLhS7Ix59hn3DB+HrzRNbLhgIJPNnwt3aw0CLNxCnsbQ5Ox1VC8anXv2UavlG7EqRtrNJd+VmwOKPgUWz65UQf4xDmszx8Wd0kk2dMcyQxg2WhVLtfWufLlgIJPvvwu7GpxjymmrUZU18Mkm+3Ro0ei0zGSrKXPNJcDCj7N5X9hVgd80Dpsol0QnaSnj81mkx7NYzO3jikWBxR8iiWPplHjNXgn0c/G6YwD2UbzwXwiymUzJ5unQX2SHtFNY5wunJgDCj6JWVetB3fv3h15mqh/x4CPjV/Gtl7Mmxvti3IMm7m9Z/S1nBxQ8Cmn3JxSjWOXFhmUTdgkArI45pkNQJC46Gk+NtoPY/kPrUqvanNAwafa8rXaHUmARK9sevl4E3rtL6IiUoCIrSnnzY3fhx5ACkAeR6r5quBTTbnG2tWOHTuEKBMgYXuhnXABPo0ACM3HVpvy1h40aJDgg8JkazS3N15fy8kBBZ9yys0p1Zs2bZI+ffrEAh8Axdbsglgbk8vb1MCBA2XXrl0GfLx7+lo9DrSp3pZ0R7YcQONBw5g/f75wBjvnqXNR4hCmrWzfvt08wyuNx/ATjR071jirPW2IOWgK9vHHHwsnlRK9Wrp0qXlu9OjRps6LMfUXmg6HC6LtrF27VhYuXCg9e/aUUaNGhT5TP4e+Lw8HWtUEfaI85CqlLjnw+9//Xn7729+apD60jd69e8vPf/5zufzyy00eT9Baf/jDH+Sf/umfjIMagAJkmGfGjBnGb+Q9Q4nEXXfdJRs3bjS9fwCqESNGCM8PGDAgUBPCz/PII48Y4FmxYoWpHYMunuE1DBC9NfW1XBxQs6tc8nJK7YQJE0w9F7151qxZI9u2bTOJhgBF2DVz5kwZOnSoAR0ail188cUSpM2gEd10001GO0Kj4br//vvNkclhc6NxQcvy5cuNwxkAmzx5sqExjtkWNr/eLxYHFHyKJY9cqRk5cqQxsTCXAJTf/OY3MmzYsIatL0gCvOKKKwwgUFz60EMPGcAKAocHHnhAhg8fbgBoyJAhMnXqVNNONWgsG4eOX//61wa0KHIli/qqq65S8Mn1W5HfYgo++fG6cCuRKIi2QX9lQARNiHtR14MPPmh8MQDRpZdeahqFBT1DhTomHFrQD3/4QxNRCwMe73nG/vKXvzR+JKJv/fv3t6LJe15fy8MBBZ/yyCoTSvmxX3bZZXLrrbcakIgCB4gAdACF66+/PvKZO+64w/iS0JYAOZv5Bw8eLGhN+KBsa80yYY5OmikHFHwyZW+xJ6cZGIl8v/rVr4TEPhtg8HaExjN+/HjjZG70HNrPRRddZLSjRuO8eb3X++67z5iCxEM0JuJxpVqvCj7Vkmes3dA3B+cyR+H4w+Q2k/AcJloUoDAuSZSKZ4iKEarXTGcbiZRvjIJP+WTmjOJVq1YZBzOO3bgXCYaNomLefJhNXrvVuBrMuHHjZMOGDUIb1rjPeuvra3E5oOBTXNlkTtmSJUtM7g1RqygNpp4YwucAS5RWg9MYzSUJeJC8SPY14KNX9Tig4FM9mVrtiJorsoipowJ84l4ACppPFGgxhrWSgE/fvn1New3yfeIc1RN3Lzq+ORxQ8GkO35u+KmUM+GzOO++8SO0liFiSAXk+SvPh2STAw3P4oYh8UQZCs3q9qsUBBZ9qydN6N4sWLRKSDJNoPSwCGCR1JlsTWRtIVG316tVC24+kIBZnPR2bHwcUfPLjdaFWomiTsgjb3Jt64tF8kviK6ueJeu/5fRR8ojhVvs8VfMons9QUc3Y6DeNpo2ETsQpaEPDBmWxjdjEmqdZCGgAgp32dg6RQ7nsKPuWWXyLqqRjH0cz56VEO47AFCLXb5gbRJTFNuJwSDWhW7SdMGuW8r+BTTrmlovr999832clpwCcOAZh2aEpEvZJc+H2IzBH1SqpBJVlXn8mWAwo+2fK3cLOjgWzevFmoMk/qbCbsjSmF1mSjOVGhngZ8CLmjaXGqKq96VYMDCj7VkKP1LlauXGl8PRSU2gBH0MQAiU1phfesH3ySai5TpkxR08tjaEVeFXwqIkjbbcyZM0cmTZqUqkcOx+xgstlWnNO2A5MpqdnF3qiKpxyEM72SApgtj3RcPhxQ8MmHz4VYBQCgXIEGX0lNLjYC+ODHsXU4k8iIszgN+GB6cRGlo3WrXuXngIJP+WVovYPFixebQlLAIKnJxWJoH8xhCz4uNB/WnT59ulCPpo5nuFH+S8Gn/DK02gFO4rfeess0DkuaWOgtRKN3fEa24NO5c2fTRD6ts5iQ+7p160zDe6318qRR3lcFn/LKLhblmCuABvk9SVpo+BejDxAAZuvzAXzQltKYXazfpUsX0751y5YtWuvlF0hJ/1bwKang4pI9e/ZsmThxonE0x322fjwg5jUgszHfGIvPB80nrbOY1q0LFixQx3O9UEr4XsGnhEKLSzKhcX6wl1xySeJaLv+alDpgdtmWZhAZ45idtJoPNNBgjIp8OhymNeP8e9K/8+eAgk/+PM99RUoTMFno02xrKjUi8osvvjAOZ9u50I7S1Hf5aQHwOE6HE1DV8eznTPn+VvApn8xiUYy28eqrr5ozs9IkFvoXxYSiXsvG5PKew0dEdrULRzFRL5Il0YBczOfRqK/5ckDBJ19+577a7t27zY+Uo4rT5PZ4hGPqoPF45RXe/ajXHj16mCiVC1Ope/fu5lgd7e8cxfVif67gU2z5pKZu1qxZQmkCuTYuLi/SBfjEuTD5cFSTIJjW6cy6t9xyi8yfP9/M6WK+OHvRsW44EO8b5GZNnSUnDuCbwd9DOYWrCnZC9l27drV2NntbRfPxwMe7l+Z11KhRxuFM2N07Cz7NfPps/hxQ8Mmf57mtSHh9zJgxwsF9cTWVMCL37NmTCHw45dQl+OBv4pTVDz/80Jhzqv2ESay49xV8iiubVJTRrfC9994zJhdV5XGcw40WxodE0qBtmN2bq2fPnqYbocsDAOnzgyZGg3mt9/I4XZ5XBZ/yyCoWpeT18IN3fd45+TXMSwvVOICGqYa/yEWioccIaCDpcN68eZp06DGlRK8KPiUSli2phLQJr1977bUmHycOSEStgeZDzlBczYf+P5hGLqJdfhqnTZsmW7dulZ07dzqf27+O/u2eAwo+7nna9BlJwCOsTh0X2oGrC/DAnIvTTsO/tqvqdv+c0HLllVfK3LlzVfvxM6YEfyv4lEBIcUikjOGFF16QG264wdRfudR6SC4E1JLO2a9fP9m3b585PjnOnqLGsteNGzfK9u3bVfuJYlaBPlfwKZAwXJBCzx6q1mkY5lLrgTYv0pV0Xj/4uIxO0Vto6tSpQmN80gtczu1CJjpHMAcUfIL5Usq71Dq9+OKLMnPmTJNUmFRDCdv8tm3bjAM7Kfj079/fFIS6jHh5tLJnfD80x9fIl8eVYr8q+BRbPrGoI7ROGDwLrQdCCGmTM5QUfGiFSj1WFkmB+H4AoHfffVdrvmJ9a5o3WMGnebx3ujI/aiJcN998cyZaD8TiUyFZEPBJolUBXITbKXbNwjQi8oXZtWbNGm025vTblc1kCj7Z8DXXWQlfY26RzTxgwAAnbTOCNkCODwASN8zuzUXbVZ6lv1AW4IOv65577jHJlaQEuOgf5NGur+45oODjnqe5z8iJFB999JFpsJ62OXwY8fhRADnyddKUapD0yOF/WfllqGOj3QeOd9ICsgC5MB7p/XgcUPCJx6/CjSb8/ac//clk+pJ5nAYYGm0Os448HdsGYmFzeU5n/D5ZAAPm4IMPPigLFy40xwRlBXJh+9P79hxQ8LHnVeFG8uMlvEz06LLLLjOV61kRSSQJhzGaT5pr4MCBgkmUhdPZows6OWTw7bffVuezx5QCvir4FFAotiTxI3755ZfljjvuMFGuJE5g27UIYXs1XbbPBI0j6xrfURbhdv969PvB+Yw5SrmJXsXjgIJP8WRiRRE/KMytyZMny9ChQ1ObQ1GL+jWfNCBHtMzz+WRhdnn7wPn8ox/9yDifNffH40qxXhV8iiUPK2r40VLJTcYxxaOuejM3WpzCTRqCJc3x8eYm2sV/lIFkCT6sR8Oxiy++WM0vj/kFe1XwKZhAbMgh05j6rfvuu8+EvtNoIjbrHT582AAF/h4Xa1FmwfE7Wfp9vH3de++9pp6M6FcegOetq6/RHFDwieZRoUZQQvHMM88IjbTIZE6acxNnU660Hm9NzEQSFrOKeHnr8Eoh7EMPPWQc82vXrs0sxO9fU/+244CCjx2fCjGKsDHnrfMvOOaWyw6FjTa4fv16QVtJG+ny1gB8ADQ0qjwuQJom+nPmzDHravJhHlyPXkPBJ5pHhRmxatUqAz6YW3QGdGEC2WyOdhUe+LhYk4hX1uH2+n3ddtttxnQkNYESj6z9TfXr6/uWHFDwacmTQt7Bufz000+bI2MGDx6ceXTLzwQyqPv06eNM8yFZEZPL8yX518rqb5IjH374YcH0wv+j4fesOG0/r4KPPa+aNhI/D2F1zBVC64SR87ow9ShToGwjbXazn2Zyhgi5Z53v41+TujS0RpIPKT7Nc20/Hfr3Pzig4FOCbwKlAhw7g+mQVe1WGBtI1KMkIm2IvX7+0aNH55LvU7/u+PHjzTlm77zzjppf9czJ+b2CT84MT7Icms9Pf/pT4ZhgFz6XODRQiT5jxgznoEcBKKCGNpX3nu68807TGiSrOrg4/D2dx7aqOd5OnM4M0L0rB5QDzeGAaj7N4buuqhw47Tmg4HPafwWUAcqB5nCgsOBz/Njx5nDEctUTx4/VOuUdl+bbrCdMx77j31vPJ44no8mK37U9H4/a8InjLcYkpclSFM0bVuP58UiGBJCX9LmAqcp86/8DP8d6EqHUwIkAAAAASUVORK5CYII=" 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<p>at least four field lines (minimum two per rod) to show overall shape of pattern;<br> direction of lines all away from poles;</p>
<p><em>Ignore all working outside region.</em><br> <em>Any field lines crossing loses first mark even if accidental.</em></p>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about the greenhouse effect. <strong>Part 2</strong> is about an electric motor.</p>
<p><strong>Part 1</strong> Greenhouse effect</p>
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<p>Describe what is meant by the greenhouse effect in the Earth’s atmosphere.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
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<p>The graph shows the variation with frequency of the percentage transmittance of electromagnetic waves through water vapour in the atmosphere.</p>
<p><img 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" alt></p>
<p>(i) Show that the reduction in percentage transmittance labelled X occurs at a wavelength equal to approximately 5 μm.</p>
<p>(ii) Suggest, with reference to resonance, the possible reasons for the sharp reduction in percentage transmittance at a wavelength of 5 μm.</p>
<p>(iii) Explain how the reduction in percentage transmittance, labelled X on the graph opposite, accounts for the greenhouse effect.</p>
<p>(iv) Outline how an increase in the concentration of greenhouse gases in the atmosphere may lead to global warming.</p>
<div class="marks">[9]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>effect caused by gas such as H<sub>2</sub>O/NH<sub>3</sub>/CH<sub>4</sub>/CO<sub>2</sub>/greenhouse gas in the atmosphere;<br>gas absorbs outgoing (long wave) radiation from Earth;<br>gas re-radiates some of the energy back to Earth;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) \(\frac{{3.0 \times {{10}^8}}}{{6.5 \times {{10}^{13}}}} = 4.6\left( {\mu m} \right)\);<br>≈5(μm)</p>
<p>(ii) water vapour molecules have a natural frequency of oscillation;<br>if this frequency of oscillation is \(6.5 \times {10^{13}}\) / reference to frequency at X;<br>due to resonance this radiation is readily absorbed by the molecules / the radiation matches the natural frequency of oscillation;</p>
<p><em><strong>or</strong></em></p>
<p>X is a natural frequency (of oscillation) of water molecule;<br>so resonance effects mean that molecules are excited at this frequency;<br>and energy is removed/less energy transmitted from electromagnetic waves at this (particular) frequency;</p>
<p>(iii) energy gained by absorption needs to be re-emitted (as molecules de-excite);<br>in other directions / some returns to Earth;</p>
<p>(iv) more greenhouse gases means that there is more absorption of outgoing radiation;<br>therefore more energy returns to Earth;<br>leading to a further/greater increase in the temperature of the surface (of Earth);</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is in two parts.<strong> Part 1</strong> is about renewable energy. <strong>Part 2</strong> is about nuclear energy and radioactivity.</p>
<p><strong>Part 1</strong> Renewable energy</p>
<p>A small coastal community decides to use a wind farm consisting of five identical wind turbines to generate part of its energy. At the proposed site, the average wind speed is 8.5ms<sup>–1</sup> and the density of air is 1.3kgm<sup>–3</sup>. The maximum power required from the wind farm is 0.75 MW. Each turbine has an efficiency of 30%.</p>
</div>
<div class="specification">
<p><strong>Part 2</strong> Nuclear energy and radioactivity</p>
<p>The graph shows the variation of binding energy per nucleon with nucleon number. The position for uranium-235 (U-235) is shown.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Determine the diameter that will be required for the turbine blades to achieve the maximum power of 0.75 MW.</p>
<p>(ii) State <strong>one</strong> reason why, in practice, a diameter larger than your answer to (a)(i) is required.</p>
<p>(iii) Outline why the individual turbines should not be placed close to each other.</p>
<p>(iv) Some members of the community propose that the wind farm should be located at sea rather than on land. Evaluate this proposal.</p>
<div class="marks">[8]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Currently, a nearby coal-fired power station generates energy for the community. Less coal will be burnt at the power station if the wind farm is constructed.</p>
<p>(i) The energy density of coal is 35 MJ kg<sup>–1</sup>. Estimate the minimum mass of coal that can be saved every hour when the wind farm is producing its full output.</p>
<p>(ii) One advantage of the reduction in coal consumption is that less carbon dioxide will be released into the atmosphere. State <strong>one</strong> other advantage and <strong>one</strong> disadvantage of constructing the wind farm.</p>
<p>(iii) Suggest the likely effect on the Earth’s temperature of a reduction in the concentration of atmospheric greenhouse gases.</p>
<div class="marks">[7]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what is meant by the binding energy of a nucleus.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) On the axes, sketch a graph showing the variation of nucleon number with the binding energy per nucleon.</p>
<p>(ii) Explain, with reference to your graph, why energy is released during fission of U-235.</p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>U-235 \(\left( {{}_{92}^{235}{\rm{U}}} \right)\) can undergo alpha decay to form an isotope of thorium (Th).</p>
<p>(i) State the nuclear equation for this decay.</p>
<p>(ii) Define the term <em>radioactive half-life</em>.</p>
<p>(iii) A sample of rock contains a mass of 5.6 mg of U-235 at the present day. The half-life of U-235 is 7.0\( \times \)10<sup>8</sup> years. Calculate the initial mass of the U-235 if the rock sample was formed 2.1\( \times \)10<sup>9</sup> years ago.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) total wind power required \( = \frac{{750000}}{{0.3}}\);</p>
<p>maximum wind power required per turbine, \(P = \frac{{750000}}{{5 \times 0.3}}\left( { = 500{\rm{kW}}} \right)\);</p>
<p>\(d = {\left( {\frac{{8P}}{{\rho \pi {v^3}}} = } \right)^{\frac{1}{2}}}40({\rm{m}})\)</p>
<p><em>Award<strong> [1 max]</strong> for an answer of 48.9 (m) as it indicates 5 and 0.3 ignored.</em><br><em>Award<strong> [2 max]</strong> for 22 (m) as it indicates 0.3 ignored.</em><br><em>Award<strong> [2 max]</strong> for 89 (m) as it indicates 5 ignored.</em></p>
<p>(ii) not all kinetic energy can be extracted from wind / losses in cables to community / turbine rotation may be cut off/“feathered” at high or low wind speeds;<em><br>Do not allow “wind speed varies” as question gives the average speed.</em></p>
<p>(iii) less kinetic energy available / wind speed less for turbines behind; turbulence/wake effect; <em>(do not allow “turbines stacked too close”)</em></p>
<p>(iv) <em>implications:</em> average wind speeds are greater / more space available;<br><em>limitations:</em> installation/maintenance cost / difficulty of access / wave damage;<em><br>Must see one each for <strong>[2]</strong>.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) mass of coal per second (=0.0214 kg);<br>77.1 (kg);<br><em><strong>or</strong></em><br>energy saved per hour=0.75×3600 (=2700MJh<sup>-1</sup>) ;</p>
<p>mass of coal saved \( = \left( {\frac{{2700}}{{35}} = } \right)77.1({\rm{kg}})\);</p>
<p><em>Award <strong>[2]</strong> for a bald correct answer.</em></p>
<p>(ii) <em>advantage:</em><br>energy is free (apart from maintenance and start-up costs) / energy is renewable / sufficient for small community with predominance of wind / supplies energy to remote community / independent of national grid / any other reasonable advantage;<br><em>Answer must focus on wind farm not coal disadvantages.</em></p>
<p><em>disadvantage:</em><br>wind energy is variable/unpredictable / noise pollution / killing birds/bats / large open areas required / visual pollution / ecological issues / need to provide new infrastructure;</p>
<p>(iii) greenhouse gas molecules are excited by/absorbed by/resonate as a result of infrared radiations; { (must refer to infrared<br>not “heat”)<br>this radiation is re-emitted in all directions;<br>less greenhouse gas means less infrared/heat returned to Earth; { (consideration of return direction is essential for mark)<br>temperature falls (to reach new equilibrium);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>energy released when a nucleus forms from constituent nucleons / (minimum) energy needed/work done to break a nucleus up into its constituent nucleons;<br><em>Award<strong> [0]</strong> for energy to assemble nucleus.</em><br><em>Do not allow “particles” or “components” for “nucleons”.</em><br><em>Do not accept “energy that binds nucleons together” OWTTE.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>(</em>i) generally correct shape with maximum shown, trending down to U-235;<br>maximum shown somewhere between 40 and 70; <em><br>Award <strong>[0]</strong> for straight line with positive gradient from origin.<br>Award<strong> [1]</strong> if maximum position correct but graph begins to rise or flatlines beyond or around U-235.</em></p>
<p>(ii) identifies fission as occurring at high nucleon number / at right-hand side of graph;<br>fission means that large nucleus splits into two (or more) smaller nuclei/nuclei to left of fissioning nucleus (on graph);<br>(graph shows that) fission products have higher (average) binding energy per nucleon than U-235;<br>energy released related to difference between initial and final binding energy; <em><br>Award<strong> [2 max]</strong> if no reference to graph.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) \({}_{92}^{235}{\rm{U}} \to {}_{90}^{231}{\rm{Th}} + {}_2^4\alpha \);<em> (allow He for \(\alpha \); treat charge indications as neutral)</em></p>
<p>(ii) time taken for number of unstable nuclei/(radio)activity to halve;<em><br>Accept atom/isotope.<br>Do not accept mass/molecule/amount/substance.</em></p>
<p>(iii) three half-lives identified;<br>45 (mg);<em><br>Award <strong>[2]</strong> for bald correct answer.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about the greenhouse effect.</p>
<p>The following data are available for use in this question:</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the power absorbed by the Earth is</p>
<p>\[\frac{P}{{4\pi {d^2}}} \times \left( {1 - \alpha } \right) \times \pi {r^2}\]</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The equation in (a) leads to the following expression which can be used to predict the Earth’s average surface temperature <em>T</em>.</p>
<p>\[T = \sqrt[4]{{\frac{{\left( {1 - \alpha } \right)P}}{{16\pi \sigma {d^2}}}}}\]</p>
<p>(i) Calculate the predicted temperature of the Earth.</p>
<p>(ii) Explain why the actual average surface temperature of the Earth is in fact higher than the answer to (b)(i).</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>intensity of the Sun’s radiation at the Earth’s orbit =\(\frac{P}{{4\pi {d^2}}}\);<br>fraction absorbed by the Earth =(1-∝);<br>the surface area of the disc (absorbing the radiation) \( = \pi {r^2}\);<br><em>Look for statements that correctly describe each term.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) correct substitution;<br>to get <em>T</em>=250 (K);</p>
<p>(ii) <span style="text-decoration: underline;">greenhouse gases</span> in the atmosphere absorb some of the energy radiated by the Earth;<br>and radiate some of it back to the surface of the Earth;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about alternative energy supplies.</p>
<p>A small island community requires a peak power of 850 kW. Two systems are available for supplying the energy: using wind power or photovoltaic cells.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Outline, with reference to the energy conversions in the machine, the main features of a conventional horizontal-axis wind generator.</p>
<p style="text-align: left;">(ii) The mean wind speed on the island is 8.0 ms<sup>–1</sup>. Show that the maximum power available from a wind generator of blade length 45 m is approximately 2 MW.<br> Density of air = 1.2 kg m<sup>-3</sup></p>
<p style="text-align: left;">(iii) The efficiency of the generator is 24%. Deduce the number of these generators that would be required to provide the islanders with enough power to meet their energy requirements.</p>
<p style="text-align: left;"> </p>
<p style="text-align: left;"> </p>
<p style="text-align: left;"> </p>
<div class="marks">[7]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The graph below shows how the wind speed varies with height above the land and above the sea.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABI0AAAH1CAYAAAB7gQ4/AAAgAElEQVR4AezdDXhU5Z3//89m+dP80sgSBRvSn0hCIFUDSJQCwipiYAWqxLCguIqhgvWpgWCRbgV50t8WqCIoSgULRCoUSgiCoBAQuKhIowEhlMbwJKyQCppsSHOxbnb8X2cyczIzmZlMyMxkHt5cl1fu+zzc9/d+nTn7+51v73Off/juu+++E/8QQAABBBBAAAEEEEAAAQQQQAABBBBwEIhxKFNEAAEEEEAAAQQQQAABBBBAAAEEEEDAKkDSiB8CAggggAACCCCAAAIIIIAAAggggEAjAZJGjUjYgAACCCCAAAIIIIAAAggggAACCCBA0ojfAAIIIIAAAggggAACCCCAAAIIIIBAIwGSRo1I2IAAAggggAACCCCAAAIIIIAAAgggQNKI3wACCCCAAAIIIIAAAggggAACCCCAQCMBkkaNSNiAAAIIIIAAAggggAACCCCAAAIIIEDSiN8AAggggAACCCCAAAIIIIAAAggggEAjAZJGjUjYgAACCCCAAAIIIIAAAggggAACCCBA0ojfAAIIIIAAAggggAACCCCAAAIIIIBAIwGSRo1I2IAAAggggAACCCCAAAIIIIAAAgggQNKI3wACCCCAAAIIIIAAAggggAACCCCAQCMBkkaNSNiAAAIIIIAAAggggAACCCCAAAIIIEDSiN8AAggggAACCCCAAAIIIIAAAggggEAjAZJGjUjYgAACCCCAAAIIIIAAAggggAACCCBA0ojfAAIIIIAAAggggAACCCCAAAIIIIBAIwGSRo1I2IAAAggggAACCCCAAAIIIIAAAgggQNKI3wACCCCAAAIIIIAAAggggAACCCCAQCMBkkaNSNiAAAIIIIAAAggggAACCCCAAAIIIEDSiN8AAggggAACCCCAAAIIIIAAAggggEAjAZJGjUjYgAACCCCAAAIIIIAAAggggAACCCBA0ojfAAIIIIAAAggggAACCLSiQLXKdxdq1fSRSu29UCV1rRiKX7t2GNeEQlX4tW0aQwABBIIj0CY43dALAggggAACCCCAAAIIINAgYKko0daP9ujd6Yu1q9a2PWFQwwFhWrKO6/0CvTHr9yqzjyHTXuAvAgggEF4CzDQKr+tFtAgggAACCCCAAAIIRIDARe197VUdqPrfCBiLwxAsZXr7qWU6bnHYRhEBBBAIYwFmGoXxxSN0BBBAAAEEEEAAAQTCU6CDBr2wQoNkUXXKJQ3MyZd9slF4jscWdUyaHtnwhiSLfpryj5EzrrC+KASPAAItEWCmUUv0OBcBBBBAAAEEEEAAAQRaIBCjdj/qrX4taCE0T41RXLv2ahuawREVAggg4LMASSOfqTgQAQQQQAABBBBAAAEEEPBNoE1SsjJ8O5SjEEAAgZAVIGkUspeGwBBAAAEEEEAAAQQQQAABBBBAAIHWEyBp1Hr29IwAAggggAACCCCAAAIIIIAAAgiErABJo5C9NASGAAIIIIAAAggggAACCCCAAAIItJ4ASaPWs6dnBBBAAAEEEEAAAQQQ8FngW1WUvK9NK6drRJdkpZr/9ddjC/+gLSUV8v6l+/rzNy6cqJ69F6qkztaxpUIlm3+nGcNusrU5UjPeLlaF98bqT7ae+we9MqG/GU/PCQu1qclYfB40ByIQGAHjt1u4UI/daL+XjPtovXaXV0uWMq2auVkVHnu2qKZ8rzYVOJ6frNQbJ+qVgvdVUvGtxzOllt7HXppmV0AESBoFhJVGEUAAAQQQQAABBBBAwG8Clgp9svgpDc1+QjP2/Ugvl57Q8dOn9PnH6zTroWu1a9EvNTn7Pj2+8qhqXDutKddu68NtmgZmP6Gpi4pUazvGUrFTs0bcpTE/n6s1x+xbD2vNjBw9uqi4cVtm28ZDc6FmGOe+fkQdntyoz0+f0vHTn2nD2DZ676H79Phre/SleTwFBEJIoOaoVj12n3K2/B89tqvMei8dP71Hc+74H+3M7a/UlLs198v/9RBwtcpWPqVB8z6VuozV0r8Yv/sy7St4UWOv/0ivTXlCYwY/pVeL3SRxW3Ife4iGzYEXIGkUeGN6QAABBBBAAAEEEEAAgSsW+Fbn3p2nn75cpNq4cVr88oNKi69/jIlJ7KOHns3T2Dij8QrtmvUf2lB+2aGni9r961/onRP2hJB91/+qumy1Hv/Zh0qeVqhD1oRPmfatn6bB1rZqVbZokUtb9nMly7l39ezIPK3R41q3fo4eykhUfUTt1O2un2tp0TS1KShUWcMplBAIEYEqlSx7XnM/GqrFLz+mWxPb2uJqq8SMBzX7rRc11HoPuAu3SiULx2v0vgH6/SuTNNL83dvOXbFYD90QJ9UWadHop7S4pMqhkZbcxw7NUAy6AEmjoJPTIQIIIIAAAggggAACCPgsYDmlHSu2188O+l57tYtzeYRpl667sjvbmjur4186zjXqoEEvbNKbU5/T0k0z1cPeaeUS5S6Unvn9HD0yqJvirdvbKrFPjqY+O8B21EEV/umLxq+8Wc5o89x52l6boadffFgZtgSWvWnjb0zS3coz23HcQxmBVhaoPqSNy0okd/eS19+uRTUlb2vGIumnT/7ETNw6jiYmcYD+7f7etk0lem12ocrtr3m26D527IVysAVc/i9usLunPwQQQAABBBBAAAEEEEDAi4Dl76o84zpTyPH4WLW75vu2DZf0tyrHmUYNx8Vc1V4d7VWXGUv2zVKsknveovbWDbU6cfy8yytqxmyJhZqxrULqdY9G3Fx/ZMP59pJjO/Zt/EUgBARqq/Q343aq3Ke9hx1nAtlji1W37Aka+//Z67a/lnJtmL1UZQkDdXtPT7/7Nrqq/dUNJ35Wor98ZVs8zE/3cUPjlIIlQNIoWNL0gwACCCCAAAIIIIAAAs0XaJOqYZPuVpwSNXjSUHVv0/wmrGd06KwbE2znephl4dpybUWVuf6RdZ/DbIn2g3oq2cvTVMxVCbrOtUHqCLS2QFx7/cD6+lmJXntoqvu1h+I7KfXaf3SK1HJivwo/q5UqF2tMqn3xbNe/3TRw8maH847r1DlbEtdf97FD6xSDI3Cl/yc3ONHRCwIIIIAAAggggAACCES5QDul5byhwzmuDMZXmHZp/54NmrnomOvOgNTNB2clKCP5Wnl7mHKa2RSQaGgUgSsQiE/RrXckao0xW8669lCRlmXmau6TY3WPfY2imDQ9MjvNofE6fXW0REeMLQm5WlecpwxvP36HMxuKoXMfN8REyRcBL7lxX07nGAQQQAABBBBAAAEEEEAgiALWz9z/TjOG9dbQ149JvZ/Q4kk3BCEAhwfnIPRGFwgERCCms+6Z+UL9gtW2DmqLFuuZ7P7qPmy6Vu0ud3kl0zioTpeqvvFvOK12H/t3GNHQGkmjaLjKjBEBBBBAAAEEEEAAgbAXqFb5zlf1WHp/5Wz6u+5cvF+Hl+fpvkHd1S4oY7usc6eOB6UnOkEgkAIxiXdp1vpCvTkpU04fSjv2e83NGarbJizVJxXfOoRQp0uVtqRR5SmdvWhbp8jhCN+LrX0f+x4pR9YLkDTil4AAAggggAACCCCAAAIhLWCp2K9XJ/yLhj36jvTsFn20/Oca3C04qSL3MJUqOfWVWvLo7L5dtiIQJIH4bhqc91t9tGOFZjzU06nT2qJ5emD8Au12ShzZD/lMn/zV3QLa9v2e/4befew5VvY0CJA0arCghAACCCCAAAIIIIAAAqEmUHNUb0+fokVFFYobNk2zxt2k+FaJsY2uSmj4MlTV0TO62Cpx0CkC/hKIUXy3QXrkhY06tONNPZ2Z2NDwseXKfe0jVVu3xCopOdW274w2/WGfzlkaDvVUspTv0JZy20LYIXMfe4qW7Z4ESBp5kmE7Am4FqlW+u1Crpo9Uau+FKvHL/7xkLOL4vjYVGu/m36TULsZXCDL0WOF/uo2gYaNFNeV7tXHhRPW0npOs1Bsn6pXCElX48H/EG9qhhAACCCCAAAIIhKqARdWfrNNLRRXGCrzq9y+3KqnVnmDa6gdduja8zvPRQf212sf/T9eFKl3y8dBQvRLEFSECFZs1a2WZnH+ORvJoiCYv/0DvzTK+VFj/r/a9gzpufd5po2tvylAP+/Zt8/TCu2dc2nD1qdKhbScU/4O2kkLpPnaNk3pTAq32f3KbCoz9CISOgJEo2mxLzvTSsJw8zV192A/hGcmid6yLOA7MfkLP/Gq/rpn4ol5auV2HTpfozaz/66WPapUXztb9Q57Q8q9HaEPpCR0/fUKHNo2RtjylgSNe9DCd1EuT7EIAAQQQQAABBEJOoFbHDxY7f/a+1WKMUbuMOzXSfKL+oxa89ambRYPdBHimkqSRGxY2tYbA/+rcxv064Zw1sgXSTmnj/l1zhznMOLLtienaX1m97D/+Cm2f/HPN2X3OQ+LIopqyLVr+9Y+U0c5IOYTSfdwa5uHdJ0mj8L5+RB9wgTpVFL6q/NP/o5jkTP3UccpmS/quKdOm6aM1MPs5rTmWqrFz12lf6TJNzs7SyEHdmphyXa2yldM0anK+zg57UcvmZKlbvHEr1/8vBLlzpmnoF8s1weN7yC0JnHMRQAABBBBAAIHWEqjUx58ct70u0xCDpeKI/nS00rbhv3Wh6u8eHmQbzrniUrt+GvfsANvptSpb9IJ+4+7B2XJOu99YoV32jv67StW1bp/S7UfwF4HgCXy2We8d8rAuUczVuq57Qn0snRN0lT1jEJOsIeOHmrOQpMNanTNKjy8sVInj2kc15dpdsEhT7tuo7iNvdrNIfQjcx8GTjoie7D+BiBgMg0DA/wJtlJj1nObmZGtk1v16+skxat/CTqwLwE3O0TPGbKW4uzXjg7c19+E+SvTpbrSopmSVpsx6X7UaoGem3N1oinZM0t3KM/4/M8Z7yLO3+vS+cQuHxOkIIIAAAggggMAVC1guVemCx7PjlNq7j/mgWrv63/WLxfvrX8U3PtlduFCP/2yT/jfxWlsLtTpx/Lxq9K0qildr1V6HVYcuntFfzNySj0mcRq+Vxarbv/67Zpj/Q6L9wXmHymvqk0KWimKtfv5ZrWv/Y91uH1dtvibc/7xWLHxCoxu9GmQ/iL8IBEugRK89t8T9mwmWb3T2c+NG6ayxeT9RN/MZpa2S7p2qxY84LppdoV2L8jSmX5ptiY1kpaYP1YQpy/Xl6Cf1wM32Jyc/3sfBIqIfU8D8CZhbKCCAgEeBNknJyvC4t+kdloqdmjN+gnUhR2vCaOM8PZLWjC9/WMq1YfZSlRld9crUbV1j3XQaq64DMq3vHNf69L6xmybYhAACCCCAAAIIBEPAck57V2/UEXtfleu0dPVRh1e+YtTu9kcdXpep0K6XH9TAlGSlptylGZ8ka+rvX9BPM292SCyNV0aXO/T80d4adXsHW8vVKnv/A31s76d2u94pOObQj22H5Zz2bdotcw7GZxv1+70ur+DE36RHXlnukDgyHpwf07D0rtYH5+79crTmmkmaP/YmtbH3Z/sbkzpRr45LEw9hLjBUgy9wbLkmDH7KeT3UmnLtWjRXM7Zdq7GvvKlpg+z3j/0HnKRBM3+rtVMyzfutceBxSntksd6aeZfD/yjur/u4cW9sCbwA//cq8Mb0gEC9QE2xFo/P1epjtZIy9PTq/2hewshYQG7vO3rpM+P8OPW4r7+6eriDY5J76g7rrNIKbV+xy8M7y1wYBBBAAAEEEECgtQRqVLJwuFJTBmjCKse1Iiu0a9ZPdHOX4XqlpKY+uJjOGrkgX29OcnhQveHfNGNlof7wgvGafhu1u3WMnrHN/onLzNVLBRu1NMf4ypqx1ECuUrv00gjrTG37eO392D8+4ikeYybRAHV3jMdowkgcLf9A21bOd/rilNH3AiOuvD625QYSNXjSfC3f8ZmOb3tBj9yT4fAgbY+FvwgEU+AflTTrfX1+cr/WzRuh60+9oaFGEtb4sE76OK3VUC3e8bbmZqW5XzIjJlG35i7R9oI3tMDxnlSc0h6aoVcKdmrzbMeEkW1sLbqPg+lDX64C//Ddd99957qROgIIeBCoKNRj/fLq309PyNW64jxluP5PSG5PrVLJwkc1ZlGJNeGTNmmlw/9nwu0JbjZe1O7pozRh9Zn66aIrN2iua/bfPKs5x5onUUAAAQQQQAABBBBAAAEEEEDAFPAwT8HcTwEBBFosYKxD9LZmWBNGRs7oXzX10VvcZ+699VVdqp0FRsLI+HedUn8Ybyu7+xOrdtd837bjokpPfx24BSHddc82BBBAAAEEEEAAAQQQQACBsBcgaRT2l5ABhLyA4zpExmtlzz6o262fnmxe5HXHD2qb8Waa9d/Van+VtylOsUpKTrUdW6sj+47pK1uNPwgggAACCCCAAAIIIIAAAgj4IkDSyBcljkHgigUc1yEyGumtrAHXX8Hih3W6eOZUw6KMCcm6roO3pJFLwJ+e0rk6l21UEUAAAQQQQAABBBBAAAEEEPAiQNLICw67EGi5wDcqKdotc4KQ8cWzH5zV7sICrZo+suHTlF2S1XPCQm3cXd74Kx7WIOp0qeqbZoTTRh06J8v+kUtVntLZi2SNmgHIoQgggAACCCCAAAIIIIBA1AuQNIr6nwAAARVwWodI0mezNWrKFlW276FRL2zS8dMndGjHCs14qKdqixZrak6W7p9eqPIai0tYdbpU6ZA06pygq7h7XYyoIoAAAggggAACCCCAAAII+FOgGe+3+LNb2kIgOgQsfzutUnOaUaIGz1qul62ff7WPP0bx3QbpkTkpav/1/XpmW4XKVj+nyf94ld6a6eZTlfbTOrYnaWS34C8CCCCAAAIIIIAAAggggEBABEgaBYSVRhGoF7BcqtRZE6OrBgzo6v6raTGddc+MafpgT56219aqbNXrWjvyFk3OMF8wM1vxrWBRbXWVvvXtYOtRd9452O3RZ0+dsm6/LjnZ7X42IoAAAggggAACCCCAAAIIBEbgww93BaZhH1vlBRcfoTgMgeYLuCxeLe9fPItJGqgx2Z1t3ZTodwWHVO2p0wtVuuT6BpvTsRbVVlU2rKUUl6B/iuN2dyKiggACCCCAAAIIIIAAAggg4FWAmUZeediJgB8Fmvzi2dXKyBykuNX51mRP7XsHdXzWIGVY79JYJSWnSjpWH9CZyvqkka95oO+1V7smkkaeMtipXepnGHna70ehFjdlny1FrC2mbNQAto1I/LIhnFyNAYdTvMTql59oo0bCyZXfbKPL57cN/A78RtmooXCyDadYDehwipdYG90aftsQjrZ+G/wVNuTrI+cVNs9pCESzQIzi2icozmeCGMX/MFld3R7v8jU0t8c4bnT52totyUoiRewIRBkBBBBAAAEEEEAAAQQQQKAJAZJGTQCxG4ErF3BJAvnw2fuYq9qro4cO26T21jB7BqrJthy/thanHgNv0LUe2mUzAggggAACCCCAAAIIIIAAAu4ESBq5U2EbAn4SiPlBF6XbEz36RlWX6nxvuXOC8xfS2qXrLnPNo+M6de6yl7aqdPZohW1/b2UNuF7c7F642IUAAggggAACCCCAAAIIINBIgOfIRiRsQMCPAk6JnoMq/NMX8rp+tdl1nHrc119dne5Q25pH1mO+0J7DX3puq/q4Pvmosr61Xpm6rWus2TIFBBBAAAEEEEAAAQQQQAABBHwRcHok9eUEjkEAgeYIdNDtj4xXD+sptTqycb9OeMka1Z07pRLrse5mB8Wo3e0P6plextSlWh3Zd0xfeQjF8rfTKq01diZq6PjBLsknDyexGQEEEEAAAQQQQAABBBBAAAEHAZJGDhgUEQiEQEy3LM2YlFHf9Geb9d6hKg/dVOnwnn2qUpzSJk3SqG5uZgfFdNOomY8rzWih6I/6oNzdK2pVOrRls45Iihs2TdPv7cyraR7E2YwAAggggAACCCCAAAIIIOBZgKSRZxv2IOAngfbKmLRQLw1LlFSi1557WyU1rtONLKopeVszFpUoLvPf9fLEWxTvtvcYxWc8rLnWJNRBrdtyRDVOx1lUU7ZFS5eVSDdM0OKZw5XEXe4kRAUBBBBAAAEEEEAAAQQQQMA3AR4nfXPiKAQkS4U+WfeePrZbVO7Wxi1lLkkb+06XvzGdNXLBSr30UE/p2MvKmbxEu8qr6w+yVKikcJGmPLRUemihNrzyoNLivd2aRhJqidZOuU1nF+VqyuL9qrDmoKpVvnOJptw3Qx/fNk1rV0zVoMS2LoFQRQABBBBAAAEEEEAAAQQQQMA3gTa+HcZRCESxQEWhHuuXp12NCA5rzeS7tWaypIRcrSvOU4a3Oyo+TSNfeFs3Zn6g91a/rMeGvGxrMVGDJ03Wvat3anhGom+vksUk6tbcJdo+sEgfFPxaA1MOW9uKy8zV7Ne36+VB3TzMVGo0CDYggAACCCCAAAIIIIAAAggg4FbA2yOu2xPYiEDUCSRm6c3TWX4adjt1GzRak43/WtxiWyVmDNcjxn8vtLgxGkAAAQQQQAABBBBAAAEEEEDAScDbOzBOB1JBAAEEEEAAAQQQQAABBBBAAAEEEIgeAZJG0XOtGSkCCCCAAAIIIIAAAggggAACCCDgswCvp/lMxYEIIIAAAggggAACCCAQ6gKvvvqajh4t1V133aXMzMxQD5f4EEAAgZAWIGkU0peH4BBAAAEEEEAAAQQQQMBXgcuXL6ugoMB6eFnZ57r22mt9PZXjEEAAAQTcCPB6mhsUNiGAAAIIIIAAAggggED4CRw5csQp6J49ezrVqSCAAAIINE+ApFHzvDgaAQQQQAABBBBAAAEEQlTg448PmJH17ftjJSQkmHUKCCCAAALNFyBp1HwzzkAAAQQQQAABBBBAAIEQE3B8Nc0IbdiwYSEWIeEggAAC4SdA0ij8rhkRI4AAAggggAACCCCAgIvAgQMNs4yMXbya5gJEFYEACmzdulWVlZUB7IGmW0uApFFrydMvAggggAACCCCAAAII+E1g27ZtZlu8mmZSUEAgKAILFvxG+/fvD0pfdBJcAZJGwfWmNwQQQAABBBBAAAEEEPCzgDHD4cCBP5ut8mqaSUEBgYAJuM4s6ty5c8D6ouHWEyBp1Hr29IwAAggggAACCCCAAAJ+EDh8+LBTK7ya5sRBBYGACHz55ZdO7aampjrVqUSGAEmjyLiOjAIBBBBAAAEEEEAAgagV4NW0qL30DLwVBY4dO2b2npbWXbGxsWadQuQIkDSKnGvJSBBAAAEEEEAAAQQQiDoBXk2LukvOgENEoLy83IzkppvSzTKFyBIgaRRZ15PRIIAAAggggAACCCAQVQKui+/yalpUXX4G24oCO3YUmb337NnDLFOILAGSRpF1PRkNAggggAACCCCAAAJRJfDuu++a483OzlZCQoJZp4AAAoEROHnypFPD1113nVOdSuQIkDSKnGvJSBBAAAEEEEAAAQQQiCqB8+fPq6zsc3PM/fr1NcsUEEAgcAJnz551ajwlJcWpTiVyBEgaRc61ZCQIIIAAAggggAACCESVwL59+5zG26MHr8g4gVBBIEAChw8fCVDLNBtqAiSNQu2KEA8CCCCAAAIIIIAAAgj4JLB+/XrzuHHjxvH1JlODAgKBFTh6tDSwHdB6yAiQNAqZS0Eg4SFQrfLdhVo1faRSey9USZ0/ov5W5wrz1LNLcjPbtKimfK82LpxYf65x/o0T9UphiSos/oiLNhBAAAEEEEAAgdAVKC0t1YULF80A+/S51SxTQACBwAkYXyx0fC00cD3RcigIkDQKhatADCEuYCSKNtuSM700LCdPc1cf9lvMlnNb9cKvClXbrBarVV44W/cPeULLvx6hDaUndPz0CR3aNEba8pQGjnhRuyu+bVaLHIwAAggggAACCISTQHHxJ2a4HTt2UHo6n/w2QSggEECBL7/8MoCt03SoCZA0CrUrQjwhJlCnisJXlX/6fxSTnKmfZib6Nz7LGW2eO0/bm5UxqlbZymkaNTlfZ4e9qGVzstQt3riVYxTfbYhy50zT0C+Wa8L4BSSO/Hu1aA0BBBBAAAEEQkTg8uXLys/PN6MZPXq0WaaAAAKBFTh27FhgO6D1kBIgaRRSl4NgQk+gjRKzntPcnGyNzLpfTz85Ru39FqRF1Xvf0oxtFc1o0aKaklWaMut91WqAnplyt5Jc7uKYpLuV9+wA6dhy5c7eqnO8qtYMXw5FAAEEEEAAgXAQOHLEeRHegQMHhkPYxIhARAh8+umnETEOBuGbgMvjpm8ncRQC0SrQJilZGf4afM2n+t28zer60P263dc2LeXaMHupyozje2Xqtq6xbs6MVdcBmTK+HVK7bZ5eePeMyBu5YWITAggggAACCIStwI4dO8zY09K6q1OnTmadAgIIBE7AmOV34MCfA9cBLYecAEmjkLskBBQdAlUqWfZrvabxmvHIj9XGp0EbM5Pe0UufGe+yxanHff3V1cMdHJPcU3ckGI1WaPuKXTpB1sgnYQ5CAAEEEEAAgdAXMBbh3bGjyAx07NixZpkCAggEVuDcuXOB7YDWQ07AwyNnyMVJQAhEkIDxitnbmrFIevrFh5Vxla+34TcqKdptWzC7g9K7XCOPZ7bprJtHdK43+2yF8vc2fFkkgiAZCgIIIIAAAghEocD+/fudRt2zZ0+nOhUEEAicwF//+lezcWMBev5FvoDHZ87IHzojRKCVBGo+1fLnVkiTfqkJGc1YIam6VDsLztiCvk6pP4z3MoBYtbvm+7b9F1V6+mteUfOixS4EEEAAAQQQCB+Bd9991ww2OztbCQnW6dXmNgoIIBA4gUOHDpmN//M/+7zIhnkOhfATIGkUfteMiMNaoOG1tLkTb5G3tI/rMOuOH9Q28ytrV6v9Vd5eaotVUnKqrYlaHdl3TF+5NkgdAQQQQAABBBAIM4HS0lKVlX1uRt2vX1+zTAEBBAIv4PhqaNeuKYHvkB5aXcDbU2erB0cACESWgMNraQUPKyO+OTnbOl08c0pVdiw1b5QAACAASURBVJCEZF3XoRm376endK5OSmzGKfau+IsAAggggAACCISKQHHxJ2Yoxqsxffr0MesUEEAgsAInT5506uBHP/qRU51KZAo056k1MgUYFQLBErjS19Ks8dXpUtU3zYi0jTp0Tpb58lvlKZ29WNeM8zkUAQQQQAABBBAILQHjq035+flmUMOGDTfLFBBAIPACjusZGb2lpDDTKPDqrd8D8w5a/xoQQVQINLyWtq6Zr6XV89TpUqVD0qhzgnxePzsqfBkkAggggAACCES6wIEDB5yGePfd/+JUp4IAAoEVcFzPaMiQzMB2RushI/AP33333XchEw2BIBDqAhWFeqxfnnYZcSbkal1xnjKaTL0ar6Ut0f3ZuzWk4C1Ndl382qc2a1SycIzGLDpWL5S5UPuWZynRi1ddyUL1y15se6XtHr308csa6eX9tDvvHOy2tbOnTlm3X5ec7HY/GxFAAAEEEEAAAQQQQAABBAIj8OGH1qfPwDTuQ6tNPu760AaHIICANwHztbTfNu9rad7abHKfRbXVVfq2yeM4AAEEEEAAAQQQQAABBBBAAAH3AiSN3LuwFQE/CbT0tTQPYVyo0iWLlOhxVTKLaqsqZX5sLS5B/xTn8WBrJ54y2Kld6mcYedrvIcJW2WyfLUWs/ufH1v+mRovh5Bpu8YaTLbEG5v7iNxtZritWrHRaz2jbtq2KjY31aZDcYz4xNfugcHI1BhdO8YZirFu3btWCBb8xfyf2//92KMZqBummEE7x2mN1M4ygbvL+FBnUUOgMgUgTcPha2ovN/Vqaq0WskpJTGzaeqbQmjRo2NFH6Xnu1ayJp1EQL7EYAAQQQQAABBFpFwFgA20gS2f+NGzfO54SR/Rz+IoBAywRYz6hlfuF8NjONwvnqEXtoC1jKtWH2CmmSP15La/gaWpVPo3b52totyUribvdJjoMQQAABBBBAILQEjhw5ogsXLppB3XHH7WaZAgIIBEdgx44is6Obb77ZLFOIfAEeIyP/GjPCVhKoO7RVr35WqarPxujmRT4GUblYY1IX2w6+QU8XrNPkjHhrvU1qbw2Lk9YY75xVntLZi3XK8LiwtePX1uLUY+ANutbHEDgMAQQQQAABBBAIJYENGzaY4aSldecz36YGBQSCI3Dy5Emnjn70ox851alEtgCvp0X29WV0kSTQLl13ZXe2jei4Tp277GV0VTp7tMK2v7eyBlwvbnYvXOxCAAEEEEAAgZAUOH/+vA4c+LMZ29ixY80yBQQQCI7AX//6V6eOUlJSnOpUIluAmUaRfX0ZXSsKtMnI0yen85qOoKJQj/XLk/VDigm5Wlecpwy3d+bVysgcpLjV+arVF9pz+EvlZqS5TwZVH9cnH1XW990rU7d19W2hyKaD5QgEEEAAAQQQQCB4Au+//4FTZ3379nWqU0EAgcALOK5nlJ2dHfgO6SGkBJh8EFKXg2AQ8CYQo3a3P6hnesVJqtWRfcf0lYfDLX87rVLrp9MSNXT8YHXlTvcgxWYEEEAAAQQQCFUBFsAO1StDXNEkYNyHjusZ9ezZI5qGz1gl95MUkEEAgRAViOmmUTMfV5oRXtEf9UG5u1fUqnRoy2YdkRQ3bJqm39uZGz1ELydhIYAAAggggIBngQMHDrAAtmce9iAQFIHjx4879dO9e3enOpXIF2D+QeRfY0YYUQIxis94WHMnZUg6qHVbjqjGaXwW1ZRt0dJlJdINE7R45nAlcZc7CVFBAAEEEEAAgfAQWLNmjRlo374/ZgFsU4MCAsETOHbsmNlZx44d1KlTJ7NOIToEeJyMjuvMKP0hYKnQJ+ve08f2tip3a+OWMpekjX1nIP+2V8akJVo75TadXZSrKYv3q8Ji9Fet8p1LNOW+Gfr4tmlau2KqBiW2DWQgtI0AAggggAACCAREwPhaU1nZ52bbo0aNMssUEEAgeAKffvqp2dk///PtZplC9Ai4XW43eobPSBHwQcBxoWqnww9rzeS7tWayJK8LWDud5J9KTKJuzV2i7QOL9EHBrzUw5bC13bjMXM1+fbteHtRN8f7piVYQQAABBBBAAIGgC7z33lazT2N2Q48erKNiglBAIEgClZWVTl8v7NePheiDRB9S3ZA0CqnLQTAhKZCYpTdPZwUutCtuv60SM4brEeO/FwIXHi0jgAACCCCAAALBFDAeVAsKCswuR48erdhYvgRrglBAIEgCrusZpaamBqlnugklAV5PC6WrQSwIIIAAAggggAACCES5wP79+50EMjMznepUEEAgOAKlpUfNjtLSuishIcGsU4geAZJG0XOtGSkCCCCAAAIIIIAAAiEvsHLlSjPGIUMyeVA1NSggEFyBbdsaXhO96667gts5vYWMAEmjkLkUBIIAAggggAACCCCAQHQLFBcX68KFiybCvffea5YpIIBA8ATOnz/vdC/ecMMNweucnkJKgKRRSF0OgkEAAQQQQAABBBBAIHoFNmzYYA7eeB0mPT3drFNAAIHgCRw8eNCpM+5FJ46oqpA0iqrLzWARQAABBBBAAAEEEAhNgZMnTzp9qWns2LGhGShRIRAFAnv37jVHabwmyr/oFSBpFL3XnpEjgAACCCCAAAIIIBAyAu+917B+SseOHdS3L5/3DpmLQyBRJXD58mWnBO6AAQOiavwM1lmApJGzBzUEEEAAAQQQQAABBBAIskBlZaUKCgrMXocNG67Y2FizTgEBBIIncOTIEafOunfv7lSnEl0CJI2i63ozWgQQQAABBBBAAAEEQk6gqKjIKaasrJFOdSoIIBA8gdLSo2ZnxtpinTp1MusUok+ApFH0XXNGjAACCCCAAAIIIIBAyAgYr8KsX7/ejCc7O1sJCQlmnQICCARXYNu2hldF+/btF9zO6S3kBEgahdwlISAEEEAAAQQQQAABBKJH4MCBA06f9h4xYnj0DJ6RIhBiAufPn3e6H/v0uTXEIiScYAuQNAq2OP0hgAACCCCAAAIIIICAKbBmzRqz3Lfvj5WSkmLWKSCAQHAFDh486NRhenq6U51K9AmQNIq+a86IEUAAAQQQQAABBBAICYHi4mKVlX1uxjJq1CizTAEBBIIvsHfvXrNT41VR/iFA0ojfAAIIIIAAAggggAACCLSKwIYNG8x+jQV3+/TpY9YpIIBAcAWMrxgeOPBns9OePXuYZQrRK0DSKHqvPSNHAAEEEEAAAQQQQKDVBE6ePOn0gHrvvfe2Wix0jAAC0vHjx50Yevbs6VSnEp0CJI2i87ozagQQQAABBBBAAAEEWlVg7dq1Zv8dO3bQ4MGDzToFBBAIvsDHHx8wOzXWF+MrhiZHVBdIGkX15WfwCCCAAAIIIIAAAggEX8B4DWbHjiKz45ycHMXGxpp1CgggEFyBy5cvq6CgwOz0lltuMcsUoluApFF0X39GjwACCCCAAAIIIIBA0AUKCzc59dm/f3+nOhUEEAiugOuraQMHDgxuAPQWsgIkjUL20hAYAggggAACCCCAAAKRJ2DMMsrPzzcHNm7cOF6DMTUoINA6AsXFn5gdG4vSd+rUyaxTiG4BkkbRff0ZPQIIIIAAAggggAACQRVwnWWUlTUyqP3TGQIINBbYtm2rubFv335mmQICJI34DSDQLIFqle8u1KrpI5Xae6FK6ppzssO5XZKVav3vJo2Y/jtt2l2umuY0ZT3Wopryvdq4cKJ62tu7caJeKSxRhaXZjXECAggggAACCCAQcAFj3RTHWUbZ2dnMMgq4Oh0g4F2gtLRUFy5cNA/q0+dWs0wBgTYQIIBAUwJGsmePSg++q5mLilRrPzxhkL3U9N+ao1o1eYLmFlW4HFurstVz9cxqKS5zmn73wk91a2Jbl2PcVatVXviSJk/+o/TQi9pQ+lt1i5dqyndq+bynNPC3P9HyFVM1yKe23LXPNgQQQAABBBBAwP8Cu3btcmp0xIjhTnUqCCAQfIFjx46ZnRpfMkxPTzfrFBBgphG/AQS8CtSpovBV5Z/+H8UkZ+qnmYlej3a703JGm6a6Sxg5H11bNE8PjP+tSmqamiZUrbKV0zRqcr7ODntRy+ZkqVu8cSvHKL7bEOXOmaahXyzXhPELtLviW+dOqCGAAAIIIIAAAq0kYMwyWrlypdn7kCGZSklJMesUEECgdQR27txpdjxsGIlcE4OCVYCkET8EBLwKtFFi1nOam5OtkVn36+knx6i91+Ndd36rc+8u1IxtFYrLzNWCldt16PQpHTf+O7lf617J1eA4h3OOLdWMZZ96eVXNopqSVZoy633VaoCemXK3klzu4piku5X37ADp2HLlzt6qc03loBy6p4gAAggggAACCARKwJhl5PgKzAMPPBCormgXAQR8FDh//rzKyj43j+bVNJOCgk3A5XETFwQQ8CbQJilZGd4OcN1nOaUdK0rUb9YWfbQ8T/cN6qZ4+zExicrIytPSXcv10A32zFGtypZt0SfVHjI9lnJtmL1UZUYbvTJ1W9dYe2sOf2PVdUCmekiq3TZPL7x7Rh5acziHIgIIIIAAAgggEDgBZhkFzpaWEWiJwL59+5xOT01NdapTQYCkEb8BBAIoYDmxX1uS8jRr3E0NySKX/mIS79QvXnxcafbttbu1s+Qbe83hr0XVe9/RS58ZqyrFqcd9/dXVwx0ck9xTdyQYp1Zo+4pdOkHWyMGRIgIIIIAAAggEW4BZRsEWpz8EfBNwfDXNWJg+Ntbd/yjtW1scFZkCHh45I3OwjAqB4ArU6aujlfqJm1fInOOIUfzNQzWml3220SX9reqy8yHW2jcqKdptW4i7g9K7XCOPN3Cbzrp5ROf6Nj5bofy9DV9DcNMwmxBAAAEEEEAAgYAJuM4ySkvrzlpGAdOmYQR8F3B9Na1fv76+n8yRUSPg8ZkzagQYKAIBEzDWQ8rTI918yNbH/FA9Bl1viyRRN3Z2s3JSdal2FpyxHXOdUn9ovujmZgSxanfN923bL6r09Ne8ouZGiU0IIIAAAgggEHgB11lGjz76aOA7pQcEEGhSwPXVtB49jAUu+IeAswBJI2cPagiEgECqkpMaJ5rqjh/UNuPNNOu/q9X+qjb2ipu/sUpKtr+PXKsj+47pKzdHsQkBBBBAAAEEEAi0gOMX04xZRn369Al0l7SPAAI+CPBqmg9IHOL57RZsEEAgmAJVOnu0or7DXhm68VrXhFCdLp45pSp7SAnJuq6D6zH2nW7+fnpK5+rcbGcTAggggAACCCAQQIHi4mKnL6YxyyiA2DSNQDMEeDWtGVhRfug/fPfdd99FuQHDR8B3gYpCPdYvT7uMMxJyta44TxnNyN147Kh6t2b0G681tZ01duUGzR3UweXQyypfOUHDZv2pfrsPfdeVLFS/7MW2RNM9eunjlzUy0XOwd9452KXP+urZU6esheuSk93uZyMCCCCAAAIIIIAAAggggEBgBD780Pr0GZjGfWiV19N8QOIQBAIrYFF1yYfaZLx61mu8xt3umjAyeq/TpUqHL6p1TtBV3L2BvSy0jgACCCCAAAIIIIAAAghEuYDnaQdRDsPwEQiagOU/9eEftqtWGXp6Zpa6+ZIM6tje70kjTxns1C71M4w87Q+akw8d2WdLEasPWM08BNtmgvl4eDi5GkMKp3iJ1ccfYTMPCydXfrPNvLjNONyX34HxxbRx48aZr6YZaxktXbq0Gb3471Bf4vVfby1riVhb5uftbGwbdIxX0x588N/MDfPnz7vitcbCydUYcDjFa4/VvFCtVCBp1ErwdItAvYBF1Xvf0oxt1UqbtFgTMtx8Ne2KqCyqra7St1d0LichgAACCCCAAAItE+CLaS3z42wEAinAV9MCqRt5bfsypyHyRs2IEAgVgZpP9bt5f5SGvahlk/oo3te4LlTpksXbwRbVVlXK/NhaXIL+KY7b3ZsY+xBAAAEEEEDAPwLGLCO+mOYfS1pBIBACfDUtEKqR2yZPkZF7bRlZqAtYzmjT1Fy9pse1csG9SvJ6N8YqKTm1YURnKptIGjUcai19r73akTRyQaGKAAIIIIAAAoEQYJZRIFRpEwH/CJw8eVJlZZ+bjfXr19csU0DAnYDXx1R3J7ANAQT8IVCtsvz/0IzTP9HyFT9TRnxTt2IbdeicLN9fXqvTpSqHhbNvSVYSL6P648LRBgIIIIAAAgh4EXCdZdS374+veK0UL92wCwEErlBgz5695pkdO3bg/jQ1KHgSaOpJ1dN5bEcAgSsW+FYVu1/VlPnSM6/8XIMS2/rUUpvU3hoWZzu08pTOXqzzcp7j19bi1GPgDbrWy9HsQgABBBBAAAEE/CHgOsvoscce80eztIEAAn4S2LZtq9nSsGHDzTIFBDwJkDTyJMN2BAIiYFFN2To9n/efGrNxnh5Ja+d7L+3SdVd2Z9vxx3Xq3GUv51bp7NEK2/7eyhpwvbjZvXCxCwEEEEAAAQRaLOA6y2jIkEylpKS0uF0aQAAB/wiUlpaaXzQ0WuzT51b/NEwrES3Ac2REX14GF1oCRsLoHU25b72SFs7Qw81JGFkHcrUyMgepfrLRF9pz+Et5XAu7+rg++aiyfvi9MnVb19jQoiAaBBBAAAEEEIg4gTVr1jo9kD7wwAMRN0YGhEA4CxQXf2KGb7yalp6ebtYpIOBJgKSRJxm2I+BXAYeE0etv6PlBSd5n/tQU69WFe1XtFEOM2t3+oJ7pZaSNanVk3zF95bS/oWL522mVWj+dlqih4werK3d6Aw4lBBBAAAEEEPC7QGVlpfLz8812mWVkUlBAICQEjJmAjvfo6NGjQyIuggh9AR4lQ/8aEWHYCzQnYfStKkre0YzRv9JXvW9Uo5fXYrpp1MzHlWaYFP1RH5S7e0WtSoe2bNYRSXHDpmn6vZ29J6jC3pcBIIAAAggggEBrCxQWbnIKgVlGThxUEGh1gSNHjKeDhn8DBw5sqFBCwIsA31PygsMuBFouYE8YzdAuY+ZPzgCt9qXRuHFannG1myNjFJ/xsOZO2q0xiw5q3ZYjGpXXR/HmkUZ/W7R0WYl0wwQtnjlcSaSGTR0KCCCAAAIIIOB/gfPnzzvNYBg3bhxrGfmfmRYRaJHAjh07zPPT0rqrU6dOZp0CAt4EeJz0psM+BBwFLBX6ZN17+ti+rXK3Nm4pU4293ujvt6ooflNT7rMljBrt97whLvtOZbTzdHu2V8akJVo75TadXZSrKYv3q8K6uFG1yncusfb38W3TtHbFVJ+/zOY5EvYggAACCCCAAALeBVasWOF0QFbWSKc6FQQQaF0B4/XRHTuKzCDuvfdes0wBgaYEmGnUlBD7Eago1GP98rSrkcRhrZl8t9ZMlpSQq3XFecpwvKMqtur50fPcnNeoIZcNnTUyM73xq2mOR8Uk6tbcJdo+sEgfFPxaA1MOW/fGZeZq9uvb9fKgbg6zjxxPpIwAAggggAACCPhP4OTJk04Po8Yso4SEBP91QEsIINBigcOH658V7A3179/fXuQvAk0KOD7iNnkwByAQlQKJWXrzdFbzh36l5/ncU1slZgzXI8Z/L/h8EgcigAACCCCAAAJ+E1i7dq3ZlvE1JmYZmRwUEAgZgTVr1pixGIvUk9g1OSj4IODp/RcfTuUQBBBAAAEEEEAAAQQQiFaB4uJip1lGOTk5PIxG64+BcYesgLHmWFnZ52Z8Q4YMMcsUEPBFgKSRL0ocgwACCCCAAAIIIIAAAk4Cb731llk3ZhkNHjzYrFNAAIHQEHj//Q+cAunRo4dTnQoCTQmQNGpKiP0IIIAAAggggAACCCDQSMBx9sLUqVMVGxvb6Bg2IIBA6wlcvnxZ27ZtNQMw1hzjPjU5KPgoQNLIRygOQwABBBBAAAEEEEAAgcYCxue7+/Tp03gHWxBAoFUFjhw5ogsXLpox3HHH7WaZAgK+CpA08lWK4xBAAAEEEEAAAQQQQKCRwNNPP91oGxsQQKD1BXbs2GEGYSR3U1JSzDoFBHwVIGnkqxTHIYAAAggggAACCCAQ5QKVlZVOAsaXmNLT0522UUEAgdYXMO7VHTuKzEDuvfdes0wBgeYIkDRqjhbHIoAAAggggAACCCAQxQJvvPGG0+jHjx/vVKeCAAKhIVBU1JAwMiLq379/aARGFGEnQNIo7C4ZASOAAAIIIIAAAgggEHyBkydPOs1cMBbV7dSpU/ADoUcEEGhSYOfOneYx2dnZSkhIMOsUEGiOAEmj5mhxLAIIIIAAAggggAACUSowf/58p5GPHfuAU50KAgiEhkBpaakcv27Yr1/f0AiMKMJSgKRRWF42gkYAAQQQQAABBBBAIHgCe/bscXoINXrm093B86cnBJoj8OGHu83DO3bswNcNTQ0KVyJA0uhK1DgHAQQQQAABBBBAAIEoEbh8+bKWLFkSJaNlmAiEt4CxAHZBQYE5iNGjR5tlCghciQBJoytR4xwEEEAAAQQQQAABBKJEYM2atbpw4WKUjJZhIhDeAvv373caQGZmplOdCgLNFSBp1FwxjkcAAQQQQAABBBBAIEoEzp8/r/z8fHO0Q4bwAGpiUEAgBAXeffddMyrjfmUBbJODwhUKkDS6QjhOQwABBBBAAAEEEEAg0gVWrFjhNMTx48c71akggEDoCBQXFzutPTZkyJDQCY5IwlaApFHYXjoCRwABBBBAAAEEEEAgcALGA+iOHUVmB08++YQ6depk1ikggEBoCezYscMMiAWwTQoKLRQgadRCQE6PNoFqle8u1KrpI5Xae6FK6po7fotqyvdq48KJ6tklWanGfzdO1CuFJaqwtGZbze2b4xFAAAEEEEAgkgWMxa8XLFhgDtF4AL3nnnvMOgUEEAgtAWMBbMckb05OTmgFSDRhK0DSKGwvHYEHT8BIFG22JXp6aVhOnuauPnwF3VervHC27h/yhJZ/PUIbSk/o+OkTOrRpjLTlKQ0c8aJ2V3zrY7v+bMvHLjkMAQQQQAABBKJGYPPmzU6LX0+dOlWxsbFRM34GikC4CRQVNcwKNGLv379/uA2BeENUgKRRiF4YwgoVgTpVFL6q/NP/o5jkTP00M/EKA6tW2cppGjU5X2eHvahlc7LULd64/WIU322IcudM09AvlmvC+AU+JI782dYVDofTEEAAAQQQQCBiBYzFr19//Q1zfMZiun369DHrFBBAILQEjJmB69evN4PKzs5mAWxTg0JLBUgatVSQ8yNcoI0Ss57T3Jxsjcy6X08/OUbtmz1ii2pKVmnKrPdVqwF6ZsrdSnK582KS7lbeswOkY8uVO3urznl8Vc2fbTV7IJyAAAIIIIAAAlEgwOLXUXCRGWJECRw5csRpZuCIEcMjanwMpnUFXB5dWzcYekcg1AXaJCUro7lBWsq1YfZSlRnn9crUbV3dTe2OVdcBmeohqXbbPL3w7hm5zRv5s63mjoPjEUAAAQQQQCDiBfbs2eO0LgqLX0f8JWeAESDw1ltvmaNIS+uulJQUs04BgZYKkDRqqSDnI+BVwKLqve/opc9qJcWpx3391dXDXReT3FN3JBiNVWj7il060Shr5M+2vAbNTgQQQAABBBCIQgHjFZclS5aYI2fxa5OCAgIhK3Dy5EmVlX1uxjd27FizTAEBfwh4eHz1R9O0gQAC0jcqKdotI2UkdVB6l2vk8aZr01k3j+hcj/bZCuXvvegC6M+2XJqmigACCCCAAAJRL7BmzVqnV1yef/55Fr+O+l8FAKEu8N57W80QjURv3759zToFBPwh4PH51R+N0wYCUS9QXaqdBWdsDNcp9YfxXkhi1e6a79v2X1Tp6a+dX1HzZ1teomAXAggggAACCESfgDFbIT8/3xy4sfh1enq6WaeAAAKhJ1BZWamCggIzsGHDhpPoNTUo+EuApJG/JGkHATcCdccPalv9NCNJV6v9VW3cHGXfFKuk5FRbpVZH9h3TV/ZdkvzZlkOzFBFAAAEEEEAAAc2fP99J4YknnnCqU0EAgdATKCoqcgoqK2ukU50KAv4QIGnkD0XaQMCtQJ0unjmlKvu+hGRd18Fb0sh+oO3vp6d0rs6+zZ9t2dvkLwIIIIAAAgggIG3dutVpTZSpU3/B57r5YSAQ4gLGGmTr1683o8zOzua+NTUo+FOApJE/NWkLASeBOl2q+sZpi/dKG3XonKz29oMqT+nsRXvWyJ9t2TvgLwIIIIAAAghEu8D58+e1YMFvTAbjy0vDh/O5bhOEAgIhKnDgwAGnNchGjOC+DdFLFfZhkTQK+0vIAEJXoE6XKh2SRp0TdNUV33H+bCt0xYgMAQQQQAABBIIrsGLFCqcOn332Wac6FQQQCE2BNWvWmIEZyd6UlBSzTgEBfwpc8SOsP4OgLQSiQqBj+xYkjVyE/NmWS9NUEUAAAQQQQCA6BPbs2aMdOxrWRHnyySd48IyOS88ow1yguLjY6ZXSRx99NMxHRPihLNCMBVZCeRjEhkAkCFhUW12lb/0ylOa3deedg7323NR+rycHeSexBg4c28DYhpOrIRBO8RIrv1l+s77/Bl5//Q0Z//n6L5zuL34Hvl7V5h/H76D5Zr6e4avts89O87XJgB3na6wBC6CZDYdbvM0cnl8PZ6aRXzlpDAEvAheqdMniZb8sqq2qlPmxtbgE/VOch1vUn215C4l9CCCAAAIIIIAAAggggAACUSvATKOovfQMPPACsUpKTpV0rL6rM5X1SSMPeaBG8XyvvdqZSSN/ttWoJ+uGDz/c5XZHapdkr/vdntRKG+3/i4GnsbRSWG67DadYjQGEU7zE6vYn55eN2PqFsVEjuDYi8dsGbN1TGq+lzZo129xpfHXp5z9/2qw3VQgnV2Ms4RQvsTb167vy/ZFi++qrr6mgoMAK0bFjB+Xn5ys2NvbKYVp4Zji5GkMNp3jtsbbwErX4dF8fX1vcEQ0gEH0CLl9DaxLA5QtptyQryUzr+rOtJgPhAAQQQAABBBCIUAHjM91LliwxR2c8dE6cOMGsU0AAgdAVqKysNBNGRpTDJbca4QAAIABJREFUhg1v1YRR6EoRmT8FSBr5U5O2EHARaJPaW8PibBsrT+nsxTqXIxyrjl9Ii1OPgTfoWofd/mzLoVmKCCCAAAIIIBBFAsuWLXf6TPfUqVN56Iyi689Qw1ugsHCT0wCyskY61akgEAgBkkaBUKVNBOwC7dJ1V3ZnW+24Tp27bN/j5m+Vzh6tsG3vrawB18vpBvVnW256ZxMCCCCAAAIIRLZAaWmp0yyFIUMy1adPn8geNKNDIEIEjFlGxqto9n/jxo1TQkKCvcpfBAIm4PRMGrBeaBiBqBW4WhmZg1Q/2egL7Tn8pTyuhV19XJ98VFkv1StTt3V1fTfZn21F7QVh4AgggAACCESlgPFa2pw5c8yxG6+lPfHEE2adAgIIhLbA/v37nQK8447bnepUEAiUAEmjQMnSLgJWgRi1u/1BPdPLSBvV6si+Y/rKg4zlb6dVav10WqKGjh+sro3uTn+25SEINiOAAAIIIIBARAq4vpb21FNPMUshIq80g4pEASPpu3LlSnNoxizBlJQUs04BgUAKNHosDWRntI1AVArEdNOomY8rzRh80R/1Qbm7V9SqdGjLZh2RFDdsmqbf29n51TQ7nD/bsrfJXwQQQAABBBCIaIHi4uJGr6XdcccdET1mBodAJAns2rXLaS2yBx54IJKGx1hCXICkUYhfIMKLBIEYxWc8rLmTMiQd1LotR1TjNCyLasq2aOmyEumGCVo8c7iSPN6Z/mzLKQgqCCCAAAIIIBCBAsY6KAsWLDBHxmtpJgUFBMJCgFlGYXGZIjpIj4+mET1qBofAlQhYKvTJuvf0sf3cyt3auKXMJQFk3+n6t70yJi3R2im36eyiXE1ZvF8V1sWNqlW+c4mm3DdDH982TWtXTNWgxLauJ7vU/dmWS9NUEUAAAQQQQCCiBN544w2nGQrG19JYPDeiLjGDiXAB11lGQ4YMifARM7xQE2gTagERDwIhJ1BRqMf65WlXo8AOa83ku7VmsqSEXK0rzlOGtzsqJlG35i7R9oFF+qDg1xqYctjaYlxmrma/vl0vD+qm+EZ9eNjgz7Y8dMFmBBBAAAEEEAhvgT179mjHjiJzENnZ2XwtzdSggEB4CLz77rtmoGlp3bmHTQ0KwRLw9ogbrBjoB4HQFkjM0puns/wUY1slZgzXI8Z/L7S0SX+21dJYOB8BBBBAAAEEQkng/PnzWrJkiRmS8VraxIkTzDoFBBAIfQFjPbKyss/NQB999FGzTAGBYAnwelqwpOkHAQQQQAABBBBAAIEgCSxatMjptbTnn39esbGxQeqdbhBAwB8Cb731ltkMs4xMCgpBFiBpFGRwukMAAQQQQAABBBBAIJACW7du1YEDfza7GDdunNLT0806BQQQCA8BZhmFx3WK9ChJGkX6FWZ8CCCAAAIIIIAAAlEjcPLkSS1Y8BtzvMbshLFj+Ty3CUIBgTAUYJZRGF60CAqZpFEEXUyGggACCCCAAAIIIBC9AsanuefPn+8E8Oyzz/JampMIFQTCT4C1jMLvmkVSxCSNIulqMhYEEEAAAQQQQACBqBVYs2at06K5U6f+QikpKVHrwcARiAQBZhlFwlUM7zGQNArv60f0CCCAAAIIIIAAAgjI+MpSfn6+KdG37481fPhws04BAQTCQ8C4lx3/McvIUYNyawiQNGoNdfpEAAEEEEAAAQQQQMBPApWVlVqwYIHZWseOHTRp0iSzTgEBBMJHgC+mhc+1ipZISRpFy5VmnAgggAACCCCAAAIRKTBv3jxduHDRHNvUqVPVqVMns04BAQTCQ2DPnj1Or5gyyyg8rlukR0nSKNKvMONDAAEEEEAAAQQQiFiB9evX68CBP5vjy87OVp8+fcw6BQQQCA8BYyH7JUuWOAXLvezEQaWVBEgatRI83SKAAAIIIIAAAggg0BKBkydP6vXX3zCbMBbMnThxglmngAAC4SOwa9cupxmD4RM5kUa6AEmjSL/CjA8BBBBAAAEEEEAg4gSMWQm//OUvncY1c+ZMxcbGOm2jggACoS9g3M8rV64M/UCJMCoFSBpF5WVn0AgggAACCCCAAALhLPDyyy87zUqYOvUXrGMUzheU2KNagFlGUX35Q37wJI1C/hIRIAIIIIAAAggggAACDQJbt27Vjh1F5oYhQzI1fPhws04BAQTCR8B1lpFxP/MPgVASIGkUSleDWBBAAAEEEEAAAQQQ8CJgrGO0YMFvzCM6duygKVOmmHUKCCAQXgJr1qx1mjX4wAMPhNcAiDbiBUgaRfwlZoAIIIAAAggggAACkSDgbh2jX//616xjFAkXlzFEpUBlZaXy8/PNsRuzjFJSUsw6BQRCQYCkUShcBWJAAAEEEEAAAQQQQKAJAXfrGPGA2QQauxEIYYHCwk1O0THLyImDSogIeEkafauKkq1aNX2kUnsvVEldK0dcc1SrJvRXapf+emzxflVYAh1PiI3fy3At5St1X5eHtKr8spej2IUAAggggAACCCAQrgLr169nHaNwvXjEjYAbAeNVU8dZRuPGjWOWkRsnNrW+QJtGIdSUa/f2LXpn+mLtqrXtTRjU6LBgb6j7fLteLaqwdrvr5TUaMaaPRiY2Dr/FcYXo+D2P67JO/KlIR3plan5XPrHq2Yk9CCCAAAIIIIBAeAqUlpbq9dffMINnHSOTggICYSuwdu1ap9izskY61akgECoCLjONalSy7Hm9c8KeLQqVMKU23Yfq55mJkhI1eMpY9b02AAkjhe74PV4Jyxf6aONf1OO+/urqcjU9nsOO1hMwkpKFv9OMYTcptUuy7b/+emzhH7Rpd7lqmhWZRTXle7Vx4UT1tLd140S9UlgShJl4zQqUgxFAAAEEEEDgCgWMNU/mzJnjdPaiRYtYx8hJhAoC4SVgJIIdv4D45JNPKCEhIbwGQbRRI+CSZohXRt4avTn1OS3dNFM9Qokh/iY9sny/jp/erzdz+yvRJXL/hBrI8V9W+Tvr/f6an+XEfhWW36GcockKCIl/YGlF36qieKke+/FQ5W75L9364k59fvqUjhv/lebrwYQjejMnS/dPL1R5jS/vXlarvHC27h/yhJZ/PUIbSk/o+OkTOrRpjLTlKQ0c8aJ2V3yLOwIIIIAAAgiEsYCx8PW8efOcvqw0a9ZMderUKYxHRegIIPDaa6+ZCMbMwXvuucesU0Ag1AQ85hliftBF6XGhFm7w4vH7+Ks/Vv6r/+nnAdS/mnYie6TuTGrr57Zpzn8CFtWU/FaPjp6nj2+bq/WvTNLIjMSGJF98Nw3KeV7LXhmqs6vzNGrquzrnNW9UrbKV0zRqcr7ODntRy+ZkqVu8cSvHKL7bEOXOmaahXyzXhPELSBz57yLSEgIIIIAAAkEXMD7FfeDAn81+s7Ozdccdd5h1CgggEH4Ce/bsUVnZ52bgOTk5zBw0NSiEooDHpJHi2uma74ViyEGKya/j/1bndm3SJn+vU219Ne1vGpmZrnZBYqGbKxCwlGvD7KUqU2eNfOhupVkTPK7ttFXSvY/rmV5xqt22UG/sveh6gK1uJKBWacqs91WrAXpmyt1KcrmLY5LuVt6zA6Rjy5U7e2sTCSgP3bAZAQQQQAABBFpVwHiwdFwkt2/fH2vixAmtGhOdI4BAywSM2YNLliwxG0lL667hw4ebdQoIhKKAy+NmKIYY/jFZzm3VC78qlL9Xiqp/Ne023ZVxdfgjRfAI6g5t1aufGVe/l279UXvPI435vtp3NDK1Z7SpqFTV7o40E1BGc5m6ze3i57HqOiDT+npp7bZ5euHdM/I6ccldP2xDAAEEEEAAgVYTML6qNGvWbLN/4/WVSZMmMRvBFKGAQHgKbN682el100cffTQ8B0LUUSVA0ijQl7vmqN5+fp62+ztjJPuraXcqox2XMdCX8crbr9PFM6dUZW3gG1VdqvOpqdqKKjdJRouq976jl6wJqDivi5/HJPfUHda19Cq0fcUunSBr5JM7ByGAAAIIINDaAsbC17/85S+dwnj++edZx8hJhAoC4Sdg3NuOX0EcMiRTffr0Cb+BEHHUCZBtCOAlt1Ts16uTJ2huUYX/e+HVNP+bBqTFGMW1T1D98mAHtW7LEc9fSLP8XVUX/ltSnHoMvEHXNornG5UU7bYlkzoovcs1DesiuR7bprNuHtG5futnK5Tv8XU31xOpI4AAAggggEBrCrgufD116i+Unp7emiHRNwII+EHgjTfecGrlgQcecKpTQSBUBZqfNLJUqKRwoR670fa58GZ94rv+E+GbChzONz4VbrRR8L5KvH7tqVrluwu1avpIpU4oVJNpGOPT5q79dKn/tPmWkoorf13Hp/EbX7aaqXv6PahFjgmjysUak2r/zHqyb+Pw8Mvxz6tpjp9sz9WmCvssGMN6vV6Z0N/2SfibNGL6O42vj2Gx2fHz8YZvYePjPIwhOjbHKP6HyepqHWytyhb9WstL6ucduY7fek2NWURxQ91/Da+6VDsLzthOu06pP4x3bcKhHqt213zfVr+o0tNfX/lv3qFViggggAACCCAQWAHHha+NmQisdxJYb1pHIBgCxiunO3YUmV2NGzdOKSkpZp0CAqEs0KykkaVip2aNuEtjJi/WLvvrVrVFem3yw3p0UbHnGRRWAeOLT09p0LxPpS5jtfQvxufGy7Sv4EWNvf4jvTblCY0Z/JReLXZO6FgqSrTFmvzppWE5eZq7+nATng2fNp+wrEojNn1W/1nzk/u1dkq6Pl70S03O7q/uRrLK8T8fElG+j7+dumXN1nvG59SPb9DT1teEJCXkat1x22fWjX3Ls5TYxGjc727hq2lGQq3QSPb00M1DHtHURUUNr0LVlGnT9Ic1LOdZvWYmvGpVtvo5jRk8TZvO1X/G3bT4+VytOWb/MVRo16I8jRn/W5X49Nl496OLtK0xXQcrZ5j9SpfotYf+XavKXFYsMl5jnPdbHVGihv6/PN3j5mt4dccPapudWler/VVtvFDFKik51ba/Vkf2HdNXXo5mFwIIIIAAAgiEloCx8PWUKVNCKyiiQQCBKxKYP3++eZ6xRllW1kizTgGBUBfwMWn0v6ouW63Hf/ahkqcV6pCR8DASPuunabD1vRtjBsUibSj39HmwKpUsHK/R+wbo906fG2+rxIwHNXvFYj10Q5xUW6RFo5/SYnMmxn9q8/QFOvDF3/Sl+bDsjbTh0+a7lKWX3npOI7vZvisWk6hbcxdo5aQMs4G4YQu196QtieM1gdPS8Ztd+qdQ/bHy55+9wq+m1ahk2fN6p/y8/vaFC+qlUq2aulSnbp2pfVaXEzq0Y6HGGtfG+FdbqBmvf6T/qtipOT/7o9r/7G33xx1bqrl/LGdmi/1qx3TWPTOmaaiNUbXva+6/PKxZu8/VG1nOafeCX2lu0bUa+8pKzc/q7Oa1M8e1kYwEZLKu6+AtaWTv3Pb301M6Z59I5rKLKgIIIIAAAgi0rkBpaalTACx87cRBBYGwFti6davKyj43x5CTk6OEBPusAnMzBQRCVsC3pFHlEuUulJ75/Rw9Mqib6l+KaavEPjmaanza2/rvoAr/9IWbRIGRyHlbMxZJP33yJ24/Nx6TOED/dn9vWzslem12ocqtC/f+X41cvkZz8/6f1qwcZ1sXxnaYuz8OX5aKyx6pOxvN1mivjEd/rrH2HMi2P2rHCU+JLocOWjR+h3b8UrSouuRDbdKgK/xqWrwy8tbozanPaemmmdYvbNWH9ZlWrirRTTPnaXJWhhKtv4wYxXe7V1On/atpX1vwonJeOamf/HaRy3FZmr14qq29Wh3ZuJ/Flx2ud0zSvZq/ca4tyWrsOKzVOaP0+MJ3tOr5JzThzzfrpR1va25Wmu3+cjjZWqzTpapvXDd6qbdRh87JMr/VVnlKZy+SNfICxi4EEEAAAQRaReD8+fOaM2eOU98sfO3EQQWBsBW4fPmyVq5cacafltadV05NDQrhIuBb0ihunBa//KCbhE+sknveYnswrdXZyr83ThrZEzkJA3V7T/MR1sWnja5q7/DZ+M9K9JevHB9wHdeFcTnVoWquCSOp7TXtzESHwyFSu1Tdeps9s/sX/enoRafdbistGb/bBluysX4xZGW3/KtpDV/YMuLppZynx+nWxLYuwcWoXcadGmnOkrlBOZPHuzlOivlBF6Xbjys/pS95Rc3BMkbxaQ/qZafEkfE633Oau/p6vbRiRsOsOIezGop1ulTpkDTqnKCrfLt7G5qghAACCCCAAAIhJWA8UC5atMjpE9wsfB1Sl4hgEGiRwJo1a53u76effrpF7XEyAq0h4Nv7Ld9rr3ZxTT+hVh09o4vKcFqnpyGRYywCvdjHMR7XqXOXpcSGhX5jrmqvjl7PrtNXR0t0xOsxxs72uu6mRKmosskjzQNaMH6zDX8VrIshSyNfT5ftxTt/tey5nbh2uuZ7xutpng+x7nE8rrZS/1Vrkdo1/btpotUI2m1PHElT7pvRsC6YNuuZ8QnS4meaSBw5UHRs7/ek0Z13DnbooHGxqf2Nz2i9LcQaOHtsA2MbTq6GQDjFS6z8ZsPtN7tgwW9k/BcO/8Lp/gq330E42YZTrK39O/j5z3ObdWuHk204xdrav4Nm/QhC4GDfkkZXHKhDIsdYBLo4TxkB7rHpUNvoqgSHWU1NnxBCRzS8mrY4I1zHEEKcrRCKpeKAVixYpi+zf6UZ2tKwsPuxfD0z8pzOrJqrp/okulnTqLnBWlRbXaX6Zcubey7HI4AAAggggAACCCCAAAIIICAFOIXT3HVYWnJJYhTXPsH6SpoxIcbdrKf61h1f87lRA27q0JJOg3yu/dW02cpgBk+Q7VvanUU1Ze9oyn3/oS9HL9ZbM+9SYsz96pc6TaNnvV8/icu6EPxX+nrlG3p+UJL3xNGFKl2yyLb2lLvYLKqtqmyYHBaXoH9qYrbghx/ucteQ9SuDxg5P+92e1Eob7f8LB7H6/wJg639To8Vwcg23eMPJllgDc3+F8m92z549mjVrtjlwY+HrCxfql0zg/w0zWfxW4B7zG6VTQ+HkagQezHhd73HjtdPhw4c7+XmrBDNWb3H4si+cYjXGE07x2mP15ToE8pgAvzvkkKAJ+EK8MWp360/0U/uXvj46qL9WW1fTdvG7rOqv/16/rVembusa67I/hKv2V9Myg/hqWghzhE9o9oTRDO26/nHNnXqnLdnTTmk5i7R95QSlmYM5rNVPLtDmc65zhGKVlJxqHqUzldakUcOGJko+vmLZRCvsRgABBBBAAIEWChhfSnNNGBnrGvEPAQQiQ6CyslJLliwxB2Msfj14sPdlIMyDKSAQggIBTho5jvgzffLXKscN/i/H99KYnw2tXwC79o9a8NanqnHpxXJun9YVnJGUoadnZqlbEAVcQmlmteHVtLt4Na2Zdq18eM2nWj75P7SrtrPGThurjHjHH11bJQ6aqrfWT2v4slptoWbM3apzTjlPl6+hNTkkl1l+tyQrKcDzCpsMiQMQQAABBBCIcgF3X0qbOnWqOnXqFOUyDB+ByBFYvfr35sxBY1TG4texsWE0USFyLgUj8ZOA49Orn5p0bMZxdsQZbfrDPpcHYcdjG8qW8h3aUn65YYPPpbZKypqtDa+MU5pqVbYoV1MW71eF9eHbopryQs189Dltr+2ph1a+qtwMT19z87nDIB5ofzWt5V9NC2LQdCWLqj/Zot8dM16a7KVbf+TuN9dWiX1+qjmvN8w4qt22S8VOXxCU2qT21jD71+manLnnMMtPceox8AZdy9VAAAEEEEAAgVYTMGYfTJo0yelhctasmerTp0+rxUTHCCDgX4GTJ0+qoKDAbHTIkEylp6ebdQoIhKNAgJNGbXTtTRnqYZOp3TZPL7x7Rk4TKBqpVenQthOK/4Hrp98bHehhQzt1y3xQjz10j8Y+P0pa+qAGpiQrtUtX3TzyPV0z8SWt+3i9ZjW1ZoyH1lttM6+mtRp9yzquT/ZZPzyXkKzrOnia7mPMOHpKcydl2LqzfUHQsfN26boru7Pn/Y7Hqkpnj1bYtvRW1oDrva+R5HQuFQQQQAABBBDwp8Dly5c1b948p4TRuHHjdMcdd/izG9pCAIFWFDDu8/nz55sRGGuVPfHEE2adAgL/P3v3Ah1lde///3NSls1JkQOKNsRjJJCYqlw0SlGgEjB4AC9AOFi1yKWC9YIEQgF/aiSAnhJTwaDgBTQY8VLRGIQCchNYVKVoRMDSGASEFqOgyS+k+XP4ZY3/tSeZYSZzyUwyk8zlzVpxnst+9rP3a88kPt/Zl3AVCHLQSIrpfp1G9rZ1j6jQxmkPat624x4CR2bul7Va/v0vmj3Rs6XiIz0zbYEOZ87T/N/+Xi/+7bAOHmn4+dsyTcscqrT45gak2qqZGZrWVvItv+9p/d+KUz5m01FX3nyLPcjqetF5SstIrx9+qa+1fe8/PXyOJFUf1CcfVtZnEW5zd7lWnCMIIIAAAgiEtcDChQu1a9df7XUwvQ8mTpxg32cDAQTCX2Dr1q0qK/vSXpEJEyaoU6dO9n02EAhXgaAHjRSTpCETG+YZsirt1coJo3XvohKVVjhM9ltTrm3FBcoe9a4uHXGlOjRH1HJUa+Zmq+DDjkqKtwWqmpNRkK753ypV13rvZ+X+zgxNc+8SDkc76/IBl9cX1If2jzm3oy6wpk5WUkLjsc8x6nD9nZphDcLWat/OA/rOA4Hl2yPab+3eFK8bJw5W9+B/0j2UhMMIIIAAAghEt0Bh4Qpt2rTZjtC37y+VnZ1t32cDAQTCX8DMV5af/0d7Rczn3J/V0uwXsoFACAp4fpSsrdb3/9tQYh8edq0pG5YBd67nOUq4daYWj+/lcLhCWwum67ZrU63LeSd3TVJyjxs1KXu5/jnmft1+peu8L5ZTVTphy+HTwzpeZ9uxvVpUveMl5ayvkGpLNKOfQ94mf3c/wx7VytIK9701AlX/dhcq6eqGCHPtRr1efMA6Obe1R9R9edrmdoU3W50aXoM1NM2xjvpBVadcUBsVxOwGOp2bW0TUoVh1759R33uodpu2lP7gpXYWVf/9M30sKW5spgbFuxnKFpOi0XPurV9tbfPbet/t3F9V2rN2jfaZfIbN1qO3JjI0zYs6pxBAAAEEEAiWwKpVq1RUVGTP3gxXyc3NZVJcuwgbCESGQOMVEO+5557IqBi1QEDy8CxpqdAnK17TamtPBUkOwQ4nNctx7Vy9TfY10T5/V6/tcDP0LCZB6XNe0JvZGQ1Da5xyadiJU+r4xXppzg0Ny5E7pLEc146V71ofgq1HK7fpvZ2u94np0FkXO1zW5OaB15SbOUpTShrNsxTQ+l+oPjcPbKh3hbbm3qwruybp0msX6Ptf36XrO3iO29WXv2FoWspEjbu+c5NV8j1BtcqK/3S2jfWZ3lr5l4ZJwx1zqVbZymV6uWGkk0y6VzaovKZxjylf0znmHR3bMSmZWpA7VHE6qjfyXtA2xx52jgQ1n+rlvLdVe9kkLZ7Sz0Nvuxi1T7urYe6jz/TW2n2NVgisH+L5/LJSyeQzZ7gSmnqLOZaBbQQQQAABBBAIiMDu3bu1dOlz9rxMwMg8WLKKkp2EDQQiQmD79u1Ow0/vv/8+devWLSLqRiUQMAKNHifrVFEyVcndrtPtCzfLFjOSbMGONN1T8g9JNSpdNFzJ3fpr0it7HSTN0LP+urTrVK2uaNRrJSZe10xdoo3Fzyk/yzF4FKfUsTl6uniL1sxtHDBq6j7D9XRpTcP9zcP0A/rTphc1JSPeoUxNbVZo48MvaYe1x08w6t+wottL2Q1Lqpv6ztHyTa/6OBm3GZr2obqPui5AQ4wa6ti1t27K3eDQxrUqe2WSddLwaxaVqs7Wxu7SrZyuYT26K3lSiSrkJb+GdPX5NdUOkXy+g1In5GmVCRwdWK5Jgx/Q0yWlDgG6apVvW6GcMRP08kUP6s3CmUr3Ou9WR6VlLdGb2f10zGmFwGqVb1mi7FE5+rjfbB/yiWRz6oYAAggggEDbCZiA0axZs50KsGDBAnXp0sXpGDsIIBDeAmZVxCVLltgrkZp6qW655Rb7PhsIRIJAo/Ev7RQ/crEOjlzcZN3Spq/TwelNJmuU4BzFpw3VKPPj07Xt5fd9LN/qbyfu1Fv7H1Ba+0YxMafSWFRTvlOb1r6qOQW7tedgrdLT2gep/h2UcsODevFvDzqVwLedzkp/fJPSfUvsQ6ogtLGP7xkfChfBSUzg6DntGVqqdR9u13sPj9aAabbqmkDiDN0zu0Sz01PU3nbY26stCDtgs94vXqAB3eqDt3EZUzV36UYt9DUfb/fgHAIIIIAAAgj4LVA/t0m+03VPPplHzwMnEXYQiAyB5557zmlVxClTptCbMDKallo4CDQKGjmcCcNNS8UH+uO0P+vyJ55rImBkKhej9inXa1TWz1W9bYoOVp+WfHtcD0MZihwqAjHxabo50/z4FDVtotgmCDtc483P400k5TQCCCCAAAIIBF3ABIyysrKcHiJzc+eoT58+Qb83N0AAgdYVMMPSHCe5z8zMVI8ePVq3ENwNgVYQiJygkXXltEdVfPUftDPNdSJtj5YxP1PHC7oq+SKf+nd4zIYTCCCAAAIIIIAAAtErYIapNA4YjRs3TgMHDoxeFGqOQIQKNB6WZuYsmzx5UoTWlmpFu4C38VthZHNGx99bZF057ZzzO3iZbNu1Spbjn2jrRb/RqJTGy5u7puUIAggggAACCCCAAAKNBU6fPq28vDynHkYmYDRx4oTGSdlHAIEIEGg8LO2xxx5jWFoEtCtVcC8QIUGj77R77XbrpM5Vy5bptbJq97VtdNRSsUXz7vuLBv/O00pVjS5gFwEEEEAAAQQQQAABBwETMMrNzXVaPWnIkAwCRg5GbCIQSQIMS4uk1qQuvghESNDoQvUdO1qppsa1GzT/v67TTY++rNUlO9wsDW8mwN6h1Sse1S2D31bSkzmAHYo4AAAgAElEQVQakXCOL1akQQABBBBAAAEEEEDALuAuYNS37y+VnZ1tT8MGAghEjgDD0iKnLamJ7wIRMqfROYpPn6mXVp2vx8bnaWttrcpWzteMlZ4gzGpVj2j+1v9WmtelzT1dz3EEEEAAAQQQQACBaBdYtmy5Uw8jEzAyvY5iY5n2INrfG9Q/MgUYlhaZ7UqtvAtESNDIVPIcxfe5Vy/+7U6Vb9uuvx3ZpRdzX1OZY/0v+41yftdXl1wxUOkpHRzPsI0AAggggAACCCCAgM8ChYUrVFxcbE+fmnopASO7BhsIRJ4Aw9Iir02pkW8CERQ0slW4g1LSb1GKbtGICaxDblPhFQEEEEAAAQQQQCAwAiZgVFRUZM/MrJw0Z84cehjZRdhAILIEvvnmGy1ZssReKVZLs1OwEQUCETKnURS0FFVEAAEEEEAAAQQQaHMBdwGjgoICdenSpc3LRgEQQCA4AuYzfuLESXvmrJZmp2AjCgQIGkVBI1NFBBBAAAEEEEAAgZYLEDBquSE5IBBuAuvWrXOau2zcuHHq0aNHuFWD8iLQbAGCRs2m40IEEEAAAQQQQACBaBEgYBQtLU09ETgrcOjQIeXn/9F+wMxddscdt9v32UAgGgQIGkVDK1NHBBBAAAEEEEAAgWYL7N6922kOI5ORGZ7CkLRmk3IhAiEvcPr0aT355JNO5Zw1axZzlzmJsBMNAgSNoqGVqSMCCCCAAAIIIIBAswRMwGjWrNlO1z75ZB7DU5xE2EEg8gTeeONNlZV9aa/Y/fffp27dutn32UAgWgQIGkVLS1NPBBBAAAEEEEAAAb8EPAWM+vTp41c+JEYAgfAS2L9/v1Pvwr59f6kxY8aEVyUoLQIBEiBoFCBIskEAAQQQQAABBBCIHAECRpHTltQEAX8EKisrNW/ePPslF1zQWVlZWfZ9NhCINgGCRtHW4tQXAQQQQAABBBBAwKsAASOvPJxEIKIF8vLydOLESXsdH3jgAeYvs2uwEY0CBI2isdWpc4gJnFFF6QatLnlZOcOuUHLXJCV3TdM9Jf9oopwW1ZTv0LuLJquX9ZokJV8+WU+XlKrC0sSlnEYAAQQQQAABtwIEjNyycBCBqBBYtWqVdu36q72umZmZGjhwoH2fDQSiUYCgUTS2OnUOEQETLHpdOcOu0oDM+zTj4Y90/uQn9NSKjdpzpFQvjvxPL+WsVnnJXP16yH1a/v1Nemf/Vzp45CvtWX2btPYBDbjpCW2rOOPlek4hgAACCCCAQGMBAkaNRdhHIHoEDh06pKVLn7NXODX1Uk2ePMm+zwYC0SrQLlorTr0RaFOBmjKtXjBLM1buldRLd8x/VA/8po/ifQrjVqtsxWyNyd0gDVukDfNGKqHhuvYpQzR13r/0ZcZ0TZooLS+cqfT4c9q0qtwcAQQQQACBcBDYvn27cnPnOhXVrJLGpNdOJOwgEJECp0+f1kMPPeRUtzlz5ig2NtbpGDsIRKOAT4+o0QhDnREIloCl4iM9M21CfcAobqhy3n9V8+/yNWBkUU3pK8rO3aBa9deM7KH2gJGtvDEJQzV9Vn/pwHJNnbtOxxmqZqPhFQEEEEAAAbcChYUrCBi5leEgAtEhsHDhQqd5jGbO/D3zGEVH01NLHwQIGvmARBIEAiVgqdiieRMnqWBzhWQCRu/maXxqB9+zt5TrnbnPq8xc0TtD/bq7+/YjVt37Z6inpNr1eXr8vaMibuQ7MSkRQAABBKJLwASMioqKnCpNDyMnDnYQiGiBdevWadOmzfY6DhmSoeHDh9v32UAg2gUIGkX7O4D6t55AzW4tnjhVKw/USkrTlJV/8C9gJIuqd7yupz4318ep56jr1N3DJzgmqZcGdjJVq9DGwq36iqhR67Uzd0IAAQQQCBsBAkZh01QUFIGgCOzfv1/5+X+0533BBZ2VnZ1t32cDAQQkD4+c0CCAQGAFqlS6bIGetQaM4pSa9ZAmpXX08xY/qHTzNpmQkdRZPbqe7/kD3C5RV96UWJ//54Uq2nF22VA/b0pyBBBAAAEEIlKAgFFENiuVQsBngcrKSs2bN88p/YIFC5jHyEmEHQQIGvEeQKAVBMw8RK8qp6C0/l5x/62Zd1+t9v7euXq/thQfbbjqYiVf5C2HWHU4/2cNaU9q/5HvGaLmrzfpEUAAAQQiVqBxwMj0Lnj99deY9DpiW5yKIeAqkJeX5zSPUW7uHHXr1s01IUcQiHIBehpF+RuA6reCgOM8RGZY2aw7dX0H/z96dQc/0/r6bkaSzlPHc70tfhirhKTkhsrVat/OA/quFarKLRBAAAEEEAhlAdsKSY5zGJmAUUFBAZPehnLDUTYEAixgAse7dv3VnmtmZqYGDhxo32cDAQTOCvj/5Hr2WrYQQKBJAcd5iEziqzSy/yWeh5V5zK9OJ48eVpXtfKckXdzZW9DIlrDh9dPDOl7X6Bi7CCCAAAIIRJGACRjl5uY6PSgSMIqiNwBVRaBBYPfu3U6T36emXqrJkyfhgwACHgQIGnmA4TACgRFwnIeoYcWznx/TtpJivfLoCCV3TbL/9Jq0SO9uK1eN2xvX6VTVD27PuD/YTp0Tk2SfNanysI6dJGrk3oqjCCCAAAKRLkDAKNJbmPoh4LtAfn6+PbEJHM+ZM4d5jOwibCDgKkDQyNWEIwgETsBpHiJJn8/V6Oy1quzYU6MfX62DR77Snk2FyhnbS7WbF2vmhJH69aMlKq9pvNxZnU5VOgSNEjvpXD69gWsnckIAAQQQiGiBadOmOfUw6tv3lwxJi+gWp3IIeBY4ceLsAjEzZ85kaKpnKs4gYBXwY3wLYggg4K+A5dsj2m+fhyheg3OXa+GEKxwmwY5R+5R0jZ/XTR2//7VmrK9Q2cpHNO0n5+qlOTco3lNg6IKOBI38bQzSI4AAAghErUBZ2Zf2upuAkRmmFhsbaz/GBgIIRJ/AuHHjmPw++pqdGjdDwNMjaTOy4hIEEGgsYDlVqWP2g93Vv393h4CR/YQUk6hbcmbrxjhzrFZlryzVm3vsMxg5JPR106La6iqd8TU56RBAAAEEEIgwgUOHDrnUiICRCwkHEIgKATPxteM/87tg4sQJjofYRgABDwL/9uOPP/7o4RyHEUCgRQJ1qijJ1oBpaxpyuUVPfbxQI+I9dfA7qW2PjtaklUet6ePGFmrn4+nqYN2rUemi23RbwYH6vHrP0fp3JyjFY9i30b3jxmn5x3OU7mXVtkGDBjeU0/nl2OHD1gMXJyU5n2APAQQQQAABBBBAAAEEEEAgqAIffLA1qPk3lbnHR86mLuQ8Agj4KdDkimfnKS0jXdbORqa/0Z8/00H73NWxSkhKPnvDo5U61Xjao7NnXbd+2lEd4vi4u8JwBAEEEEAAAQQQQAABBBBAwJOApy4PntJzHAEEfBaIUVzHTtYgkH1aI6/Xxqj9RUnqLmmfS7qzq6H5Nmit0WprVycpoYlPu6cItlnhzfzzdN6lqG14wNZbirIGvhGwDbypyTGcXMOtvOFkS1kD9/kyQ1CKiopcMuTvggtJiw6E03vWVDScyktZW/TWdLq4srJSv/vd7+Q48bVJwO8DJ6YW74TTe9ZUNpzKaytrixuphRnQ9aCFgFyOgGeBs0Egaxoflr2PObejLvCQYbvkqzTM1g2pybwcV1uLU88Bl+lCD/lyGAEEEEAAgXAXOH36tDwFjMK9bpQfAQT8FzC/E/Ly8lwCRv7nxBUIIEDQiPcAAkEUiPl5V/WwBXr0g6pO2cebNX3XxE7OK6R16KEbMhMbrjuow8dPe8mjSse+qGg4f5VG9r9EfNi9cHEKAQQQQCBsBczDoVkNzbGH0QUXdNaTT+aFbZ0oOAIItExg2bLl2rXrr/ZMMjMz7dtsIICAfwI8R/rnRWoE/BNwCvR8ppK/fC3fpiKKU89R16m70yfUcc6jr7V97z8951V9UJ98WFlf1t4Z6tedZYX9azhSI4AAAgiEg8A333yjadOmOT0cmoBRQUEBS2mHQwNSRgSCILBq1SoVFxfbczYrpU2ePMm+zwYCCPgn4PRI6t+lpEYAgaYFOuv68RPV05qwVvve/UhfeYka1R0/rFJrWne9g2LU4fo7NaO36bpUq307D+g7DwWwfHtE+60TKcXrxomDGwWfPFzEYQQQQAABBMJIwASMsrKyVFb2pb3UqamXWgNGXbp0sR9jAwEEokdg9+7dWrr0OXuFTRB59uzZio3lC1Q7ChsI+ClA0MhPMJIj4K9ATMpI5WSl1V/2+Rr9eY+nqayrtHf7TlUpTqlZWRqd4uaPW0yKRs+5V6kmt81v6/1yd0PUqrRn7RrrZNpxw2br0VsTGZrmb6ORHgEEEEAgpAXMg+Gdd/7Gab4S05vg6aefFgGjkG46CodA0AT279+vWbNmO+Vveh126tTJ6Rg7CCDgnwBBI/+8SI1AMwQ6Ki1rkZ4aFi+pVM8+8qpKaxp3N7KopvRV5RSUKi7j/2jh5KvV3u2dYtQ+7S7NtwahPtNba/epximdRTVla/X8slLpsklaPGe4EviUOwmxgwACCCAQ3gJm6EnjB8Nx48ZZ5zWiN0F4ty2lR6C5Aqbn4bx585wuN/OaEUR2ImEHgWYJ8DjZLDYuQsBPgZhEjchfoafG9pIOLNSEaUu0tby6PhNLhUpLCpQ99nlp7CK98/SdSm3v7aNpglBL9GZ2Px0rmKrsxR+pwhqDqlb5liXKHpWjj/vN1puFM5Uef46fBSU5AggggAACoSlgWyHNceiJKen999+niRMnMPwkNJuNUiEQdAHzu8EMVT1x4qT9XjNn/p55zewabCDQMoF2LbucqxFAwGeB9qka8firujzjff155ULdM2Rhw6XxGpw1Tbeu3KLhafG+DSWLidc1U5do44DNer94gQZ022vNKy5jquYu3aiF6Skeeir5XFoSIoAAAgggEDICthXSHFdDMoUzPQn69OkTMuWkIAgg0LoCtt8NjgEj0/Nw+PDhrVsQ7oZABAsQNIrgxqVqoSjQQSnpYzTN/LS4eOcoPm24xpufx1ucGRkggAACCCAQkgK2Ca8dHwrN5LYLFixQt27dQrLMFAoBBFpHIDc312n1RDO3mel5yD8EEAicAEGjwFmSEwIIIIAAAggggEAABcyE143nLzIPhWYoCnOVBBCarBAIQ4HCwhUuASMTROIfAggEVoCgUWA9yQ0BBBBAAAEEEEAgAAJmwuvG8xcNGZKh7Oxs5i8KgC9ZIBDOAiZgVFRUZK+C6X1oAkZMhm8nYQOBgAkQNAoYJRkhgAACCCCAAAIItFTAzFGycOFCbdq02SkrM08Jw06cSNhBICoFtm/f7hIwKigoIGAUle8GKt0aAgSNWkOZeyCAAAIIIIAAAgg0KWDmL5o7d67Kyr50SsuE104c7CAQtQJmyGpu7lx7/U0PIxMwYriqnYQNBAIuQNAo4KRkiAACCCCAAAIIIOCvgHkYzM/Pd1o2mwdCfxVJj0DkCrib42zmzJkEjCK3yalZiAgQNAqRhqAYCCCAAAIIIIBAtAq4m7/ITHjNHCXR+o6g3gg4Cxw6dMhlUnx6IDobsYdAsAQIGgVLlnwRQAABBBBAAAEEvAowf5FXHk4igIAkM2z1oYcecrLIzZ2jPn36OB1jBwEEgiNA0Cg4ruSKAAIIIIAAAggg4EXAPAhmZWU5DUczyek94AWNUwhEmYC73xNmUvyBAwdGmQTVRaDtBGLa7tbcGQEEEEAAAQQQQCAaBczqR3fe+RungJGZv+j111+j90A0viGoMwJuBDwFjFhF0Q0WhxAIogA9jYKIS9YIIIAAAggggAACZwXMcLRly5aruLj47EFJQ4ZkKDs7myWznVTYQSB6BQgYRW/bU/PQEyBoFHptQokQQAABBBBAAIGIEzAPgXPnzlVZ2ZdOdbv//vs0ZswYp2PsIIBA9AoQMIretqfmoSlA0Cg024VSIYAAAggggAACESNglsrOz893GY722GOPqUePHhFTTyqCAAItEzC9EU1w+cSJk/aMTE9EhqTZOdhAoNUFCBq1Ojk3RAABBBBAAAEEokPA03C0vn1/qdmzZ6tTp07RAUEtEUCgSQHz+yI3N9epN6L5XWGGrvIPAQTaToCgUdvZc2cEEEAAAQQQQCBiBTwNRzMrH9FrIGKbnYoh0CwBW8Bo166/2q83ASMTRIqNjbUfYwMBBFpfgKBR65tzRwQQQAABBBBAIKIFzOpoublznepoVkdjOJoTCTsIICCJgBFvAwRCW4CgUWi3D6VDAAEEEEAAAQTCRoDhaGHTVBQUgZAQqKysVF5enuhhFBLNQSEQcCtA0MgtCwcRQAABBBBAAAEE/BE4dOiQHnroIacJbM31rI7mjyJpEYgeAXerpDEkLXran5qGjwBBo/BpK0qKAAIIIIAAAgiEpMCqVau0dOlzTmVjOJoTBzsIIOAgQMDIAYNNBEJcgKBRiDcQxUMAAQQQQAABBEJVwDz4FRQUOA0tMWU1S2SbFY+YwDZUW45yIdB2AgSM2s6eOyPQHIGY5lzENQggEEiBMzpeMl29uiYp+apFKq3zNW+Lasp36N1Fk+uvNddfPllPl5SqwuJrHqRDAAEEEECgeQJmsuusrCyXgNHMmb/Xww8/TMCoeaxchUBECxAwiujmpXIRKkDQKEIblmqFj4Dl+Do9/nCJav0qcrXKS+bq10Pu0/Lvb9I7+7/SwSNfac/q26S1D2jATU9oW8UZv3IkMQIIIIAAAr4K/M///I91dbQTJ07aL0lNvVSvv/6ahg8fbj/GBgIIIGATcBcwGjdunHJzcwky25B4RSAEBRieFoKNQpGiSMByVGvm52mjXxGjapWtmK0xuRukYYu0Yd5IJTSEf9unDNHUef/SlxnTNWmitLxwptLjz4kiUKqKAAIIINAaAps2bXa6jZns+pZbbuHBz0mFHQQQsAns3r1b+fn5ThPlm4DRxIkTbEl4RQCBEBWgp1GINgzFigYBi6p3vKSc9RV+VNaimtJXlJ27QbXqrxnZQ+0BI1smMQlDNX1Wf+nAck2du07HGapmo+EVAQQQQKCZAqdPn9YzzzzrcrWZ7PqZZxZrzJgxBIxcdDiAAAJGwASMZs2aTcCItwMCYSpA0ChMG45iR4BAzad6OW+Nuo/9ta73tTqWcr0z93mVmfS9M9Sve6ybK2PVvX+GekqqXZ+nx987KuJGbpg4hAACCCDgk8D+/ftlegQUFxc7pc/MzFRRUZF69OjhdJwdBBBAwCZgCxjZ9s0rPYwcNdhGIPQFCBqFfhtRwogUqFLpsgV6VhOVM/6X8m2cqOmZ9Lqe+tyMZYtTz1HXqbuHT3BMUi8N7GTgKrSxcKu+ImoUke8iKoUAAggEU8DWu+jBB6c69RAw98zNnaMHH5xC76JgNgB5IxDmAqtWrbL2MHKshpkonyFpjiJsIxD6Ah4eOUO/4JQQgfAVMEPMXlVOgTTlibuUdq6vH8MfVLp5W8OE2Z3Vo+v58nhlu0RdeVNiPdHnhSracXai0vB1o+QIIIAAAq0l4Kl3ke3+AwcOtG3yigACCLgIFBau0NKlzzkdf/LJPCbKdxJhB4HwEPD4zBkexaeUCIShQM2nWv5IoZT1kCaldfS9AtX7taX4aEP6i5V8UXsv18aqw/k/azh/UvuPfM8QNS9anEIAAQQQqBfw1LvIzF1kehfxDwEEEPAmYH6HmNUVzdBVx38mYNSnTx/HQ2wjgECYCPg2KiZMKkMxEQh9gbPD0t6afLW8hX0a16Xu4Gdab19l7Tx1PNfbxzdWCUnJkg6YmY20b+cBfTchVfGNM2UfAQQQQACBBgHTu2jevHkuQ9GGDMnQfffdp06drOOe8UIAAQTcCpiAUW5urnbt+qv9vAk4L1iwQN26dbMfYwMBBMJLwNtTZ3jVhNIiEPICDsPSiu9SWnt/OvrV6eTRw6qy1bFTki7u7MfH99PDOl4nxftxie1WvCKAAAIIRLZAZWWlVq58zWWia/Ow98ADD4ihaJHd/tQOgUAIfPPNN5o7d67Kyr60Z2d+hxQUFKhLly72Y2wggED4CfAIGX5tRonDVcA+LO0F/4alWetbp1NVP/hR83bqnJgkM/jNGmiqPKxjJ+uURtTID0OSIoAAApEvsH37di1ZsoTeRZHf1NQQgaAJHDp0SA899JDT75G+fX+p2bNn00MxaOpkjEDrCRA0aj1r7hTVAs0fllbPVqdTlQ5Bo8RO8nn+7Kh2p/IIIIAAAu4ETK+AwsJCbdq02ek0vYucONhBAAEfBO6+e5JTKhMwMsPUYmNjnY6zgwAC4SlA0Cg8241Sh5VAS4aleajoBR0JGnmg4TACCCCAgHeBdevWKT//jy6JMjMzNXbsb+gZ4CLDAQQQ8FVg3LhxuuOO2wkY+QpGOgTCQODffvzxxx/DoJwUEYHwFajZrafH/E6bbnxBf5rex3Xy64oS3XPtdG01New0VW/tnq40l3BujUoX3abbCszE1pIyFmnn8pFeJra2qHrbXA2YUKT6ubNv0VMfL9QIL8PTBg0aXJ83/0UAAQQQQAABBBBAAAEEEAgJgQ8+sD4ptllZXB5N26wk3BiBiBRo6bA0DygnqnTKIsV7nEvbotqqyoaAkaS4TvqPOI+JPdyEwwgggAACCCCAAAIIIIAAAtEsQNAomlufugdZIJDD0mKVkJQsqaGn0dFKa9BIvsaBftpRHZoIGnmKYCd3TbI6HTxyOMheLc/e1lvKU11afofA5RBOZTW1DqfyUtbAvU8b54RtY5HA7AfT1dNE16mpl2rWrFl+L4MdzLIGRtM5l3AqL2V1brtA7mEbGE0zF1pWVpbThNcm55deWu7375LAlMi/XHgf+Ofla+pwcjV1Cqfy2srqa1sEKx1Bo2DJki8ClnK9M7dQymrOammN+Rqthtb4tMt+o9XWrk5SAp92FyUOIIAAApEqYFYzevHFF7Vr11+dqmgmup4wYYKGDx/udJwdBBBAwJvA7t27NWvWbLdJunXr5vY4BxFAIDIEeIyMjHakFiEoULdnnZ75vFJVn9+mKwt8LGDlYt2WvLgh8WWaUvyWpqW1t+63S75Kw+KkN8wkRZWHdexkndI8zlHkuNpanHoOuEwX+lgEkiGAAAIIhK/A6dOn9cYbb6qoqMilEkOGZOi+++5jomsXGQ4ggIA3gVWrVmnp0ueckpjfJ41XX3RKwA4CCESMAEGjiGlKKhLxAh166IbMRL2x8qikgzp8/LQUXx9Qcq17lY59UdFw+CqN7H+JzyPZXPPiCAIIIIBAOAh4G4o2ZcoU9ejRIxyqQRkRQCBEBEwQeuHChS7Bofvvv09jxoxxOR4ixaYYCCAQYAGCRgEGJTsEbALt0qbrkyPTbbueX31aPc1cfp7SMtIVt9KsiPa1tu/9p6ampboPBlUf1CcfVtbfs3eG+nWP9Xx/ziCAAAIIhLWAGYr25JNPqqzsS5d6zJz5ew0ePJjlr11kOIAAAt4EPM1f9OSTeerTp4+3SzmHAAIRJuDrNLoRVm2qg0A4CsSow/V3akbvOEm12rfzgL7zUA3Lt0e03wxjU7xunDhY3fmke5DiMAIIIBC+ApWVlXrmmWd1992TXAJGZuhIcfE71rmLYmP54iB8W5mSI9D6Amb+ojvv/I3ThNdmPrTXX3+NgFHrNwd3RKDNBehp1OZNQAEQ8EMgJkWj59yrtzIXqmzz23q/fKjGpzR+GKjSnrVrtE9S3LDZevTWRPe9kfy4LUkRQAABBEJHwAwZ2bp1q/Lz/+hSKLMqGkPRXFg4gAACPgh4mhOtb99fKjc3lx6LPhiSBIFIFCBoFImtSp0iWCBG7dPu0vysbbqt4DO9tXafRk/vo7MzG1lUU7ZWzy8rlS6bpMVzhiuBXkYR/H6gagggEG0CpgdAfn6+Uw8AY2BbFY2haNH2jqC+CARGwAxHKygocFlx0TZ/UWDuQi4IIBCOAgSNwrHVKHOUC3RUWtYSvfmTHP124VRl/2Sh5k25TvEx1Srf8oryH1yoj/vN1puP/1bXxJ8T5VZUHwEEEIgMAW/zFo0bN04jR45gVbTIaGpqgUCrC7gLRptA9MyZMxmO1uqtwQ0RCD0Bgkah1yaUCIGmBWLidc3UJdo4YLPeL16gAd32Wq+Jy5iquUs3amF6ikPvo6azIwUCCCCAQGgKmG//CwsL3a5SZOYtuv3229WtW7fQLDylQgCBkBYww9HWrFmjpUufcyqnGY6WlZWlLl26OB1nBwEEolOAoFF0tju1DiWB+JF68cjIZpToHMWnDdd48/N4My7nEgQQQACBkBUwk1yXlKxWUVGRSxnNvEV33303PQBcZDiAAAK+CngajmZ6Lt5xx+3MX+QrJOkQiAIBgkZR0MhUEQEEEEAAAQTCQ8DbJNfMWxQebUgpEQh1AXfD0UyZc3PnaODAgaFefMqHAAKtLEDQqJXBuR0CCCCAAAIIIOBOYN26dVqxYoXLJNcmLd/+uxPjGAII+CNggtLLli1XcXGx02Wm9+KcOXMYjuakwg4CCNgECBrZJHhFAAEEEEAAAQTaUCA//48udzfzFt13331Mcu0iwwEEEPBHwNNk+gSk/VEkLQLRKUDQKDrbnVojgAACCCCAQBsLmCEiL730kttSMMm1WxYOIoBAMwRML8bGQWlWR2sGJJcgEKUCBI2itOGpNgIIIIAAAgi0jYAtWFRW9qVLAcwwkSlTpqhHjx4u5ziAAAII+CPgabJrszra7Nmz6cHoDyZpEYhiAYJGUdz4VB0BBBBAAAEEWk/ADA958cUXtWvXX93e9Mkn81gRza0MBxFAwF+B7du3a8mSJS5zpM2c+XsNHz7c3+xIjwACUSxA0CiKG5+qI4AAAggggEDwBUyw6M0339SmTZtdbmaGiJw4cdJ6vE+fPi7nOYAAAgj4I1BZWannnnvO5feN6cU4a9YsdevWzZ/sSIsAAgiIoBFvAgQQQAABBDexqSMAACAASURBVBBAIAgCTQWLJkyYoMGDB2vYML71DwI/WSIQdQKeehcx2XXUvRWoMAIBFSBoFFBOMkMAAQQQQACBaBfwNmeR6VlkCxbFxsZGOxX1RwCBAAh46l1kft889thjzJEWAGOyQCCaBQgaRXPrU3cEEEAAAQQQCJgAwaKAUZIRAgj4KOCpd1FmZqYmT54kgtM+QpIMAQQ8ChA08kjDCQQQQAABBBBAoGkBgkVNG5ECAQQCK0DvosB6khsCCHgWIGjk2YYzCCCAAAIIIICAW4HTp09r69ateu+991RW9qVLGoahuZBwAAEEAiSwbt065ef/0SU3ehe5kHAAAQQCIEDQKACIZIEAAggggAAC0SFgCxatWLHCvuqZY83NCkW33nqrdYJrhoU4yrCNAAItFTCT67/44ovateuvTlkxd5ETBzsIIBBgAYJGAQYlOwQQQAABBBCIPAEzFKSkZLWKiorcVs4Ei+6++2716dPH7XkOIoAAAs0VMMHqNWvWaOnS51yyYGU0FxIOIIBAgAUIGgUYlOwQQAABBBBAIHIEzDf7f/7zOhUXF7utFMEitywcRACBAAmYOdPy8/Ndejaa3z2zZs1St27dAnQnskEAAQTcCxA0cu/CUQQQQAABBBCIYgHzoPbOO++4DAOxkQwZkqHbb7+dBzYbCK8IIBBQgW+++UaFhYXatGmzS74zZ/6eIbAuKhxAAIFgCRA0CpYs+SKAAAIIIIBAWAnY5ivyNLm1qYwZCjJw4PUEi8KqZSksAuEncOedv3EptAlWT5w4UV26dHE5xwEEEEAgWAIEjYIlS74IIIAAAgggEBYC5hv9DRve1/r161yGgJgKmElmhw0brpEjR6hTp05hUScKiQAC4Sdgeji6+2d+B82cOZM509zhcAwBBIIuQNAo6MTcAAGbQLXKt23Vh5sLNX/l3oaDcUodO0P3ZPxKN6SnqL0tqU+vFtWU79Smta9qTsFm1Zpr4jI05X/u0+23pik+xqdMSIQAAghErYB5QNu0aZPb4R8GhZXQovatQcURaFUBT6uimULcf/99uuWWW8RqjK3aJNwMAQQcBAgaOWCwiUDQBGq+0CvTJmn+5opGt6hV2cr5mrHSxHtm6+XHf6tr4s9plMbdbrXKS57StGlvS2Of0Dv7X1BKe6mmfIuW5z2gAS/crOWFM5XuU17u8ucYAgggEJkCZhW0jz76SN6GoJkhIEOGDOFb/ch8C1ArBEJGwPw+WrnyNbcT7TMULWSaiYIgEPUCBI2i/i0AQNAFLEe1eqa7gJHznWs35+n2f/4/vbXqAaW199ZNqFplK2ZrTO4GadgibZg3UgkNydunDNHUef/SlxnTNWmiCBw5E7OHAAJRLGC+yd++fYeKioo8KjBfkUcaTiCAQAAFbPOn5ef/0WOuDz/8sMdznEAAAQRaU4CgUWtqc68oFDij4+8tUs76CsVlTNXcsTdriG0YmqVCpe+9oecfXqyt1rFlkg48r5xl1+pP0/t4GKpmUU3pK8rO3aBa9VdO9lB7wMiGG5MwVNNnva2Nucs1de4V2rDkbFDJloZXBBBAIFoEtm/frjfeeENlZV+6rbJtCNp1113HfEVuhTiIAAKBFDC/k5YsWeJ2/jSzKpq3QFIgy0FeCCCAgK8CBI18lSIdAs0RsBzWpsJSXZu7VgsnXOEcCIqJV9rI6Xr+2l6aN3GqVh4wkaNalS1bq0/uvlrpHdz0NrKU6525z6vMlKV3hvp1j3VTqlh175+hnvqL9q3P0+PvpenZkYlyk5ubazmEAAIIhL+A6VVk+5ebO9e26fTKEDQnDnYQQCDIAmYOtZdeesltADszM1Njx/7GGrgmaBTkhiB7BBDwW4Cgkd9kXICA7wKWrz7S2oTpKhjXKGDkkEVM/CD9/ol7tTtzYX0wqHabtpQ+qPT0zg6pzKZF1Tte11Ofm+BSnHqOuk7dPUSCYpJ6aWAnaV9lhTYWbtVXt05Qioe0jW7CLgIIIBCWAma4x65du7z2KrKtgjZ06H+xZHVYtjKFRiD8BLxNcm2C17fffru6desWfhWjxAggEDUCBI2ipqmpaOsL1Om7Lyp1c/btLkPInMsSo/ZX3qjbej+v+daA0Cl9W3XaOYl17weVbt5Wv0qaOqtH1/M99x5ql6grb0qUVh6VPi9U0Y6bNd8lCOXmFhxCAAEEwkxg//79+uCDbW4nkrVVpW/fX2r06NHq2bMnKxDZUHhFAIGgCphg0Ztvvul2dUYzLPbuu+9msv2gtgCZI4BAoAQIGgVKknwQcBFop/iR0zXe5bibAzEXqWf6JdLnByTF6/LEjq6JqvdrS/HRhuMXK/mi9q5p7Edi1eH8nzXsndT+I9/Los6eg0z269hAAAEEQl/gm2++0c6dO7Vq1Sq384I41uD111+jV5EjCNsIIBBUAW/BItPb8YEHHtDAgQODWgYyRwABBAIpQNAokJrkhUBABJKVlOA6V1Hdwc+03jZhts5Tx3O9fXxjlZCUbGbWts6TtG/nAX03IVXxASkfmSCAAAKtL2CWpt67d6/Wr1+vXbv+6rEAtl5Fs2bNtqbp0qWLx7ScQAABBAIl0FSwaMKECRo8eDC9HQMFTj4IINBqAt6eOlutENwIAQSqdOyLinqG3mm6/MLGH806nTx6WFU2qE5Jurhz4zS2k25ePz2s43VSvB+XuMmFQwgggECrCph5ivbt26ePP97ldfiZ+fZ+zJgxysjIYAW0Vm0hboYAAt6CRUbHrIhGsIj3CQIIhLMAj5Dh3HqUPXIEqg/qkw8rJSXqjuk3u5m0uk6nqn7wo77t1DkxSWaQmzXQVHlYx07WKY2okR+GJEUAgbYSMPMU7d79idavX+d1+JlZcWjQoHT16NGjrYrKfRFAIEoFmgoWjRs3TiNHjiCQHaXvD6qNQCQJEDSKpNakLmEqYFF16QdabYae9Z6ocdc3XjXNVKtOpyodgkaJnXQuq6GFaXtTbAQQcCdgHsC2b9/RZKDIDD8bNmyY+vbtyzAPd5AcQwCBoAoQLAoqL5kjgEAICvzbjz/++GMIlosiIRA9ApajWv3ArzVjfYKmFL+kaWluJsFWjUoX3abbCswcRZIyFmnn8pFe5yiqK12kazMXNwxpu0VPfbxQI7z0NBo0aHD0mFNTBBBAAAEEEEAAAQQQQCAMBD74YGublpKeRm3Kz80RsKh6x0vKWV+t1KzFmuQ2YNQcJYtqq6t0pjmXcg0CCCCAAAIIIIAAAggggAACkgga8TZAoC0Faj7Vy3lvS8Oe0LKsPmrva1lOVOmURYr3OETNotqqStkXW4vrpP+I85jYeldPEezkrknW8wePHPa1dG2WztZbylNd2qxgbm4cTmU1xQ+n8lJWN2+4AB1qrq2vcxSZCa2HDRuuPn2uafE8Rc0ta4Co/MqGsvrF5VdibP3i8jlxOLmaSvlbXrNa40cffaQVK1a4nVfN/K4K1mpo/pbV50YLQsJwKmtz3gdBIPM5y3CyDaeyhuv7wOc3TpASEjQKEizZItCkgBmWNnOqntW9eiv/ViV4jenEKiEpWVLD8LSjldagkbxe41CCn3ZUhyaCRg6p2UQAAQRaJGBWPTt48KBPk1kHMlDUokJzMQIIRL3AN998ow0b3ldRUZFbi2AGi9zekIMIIIBACAgQNAqBRqAI0ShQrbKiPyjnyM1aXvg7pbVvKvrTaDW0JskarbZ2dZIS+LQ3qUYCBBBovoD5Zt4Eij7+eJeKi4u9ZkSgyCsPJxFAoJUFdu/erU2bNmnTps1u75yaeqnuvvtu9enTx+15DiKAAAKRLMBjZCS3LnULUYEzqtj2jLKflGa8+6DS48/xqZztkq/SsDjpDTPmrPKwjp2sU5rHia0dV1uLU88Bl+lCn+5CIgQQQMB3AfOt/GeffaYdO3Zo166/er2QQJFXHk4igEArC9iGoL333nsqK/vS7d2HDMnQrbfe2uLhsm4z5yACCCAQJgIEjcKkoShmpAhYVFP2lh6b/g/d9m6exqd28L1iHXrohsxEvbHyqKSDOnz8tBTvaRakKh37oqIh76s0sv8lPo9k871ApEQAgWgVKCxcoV27Pvb4oGVzMd/O9+17bUDmKLLlySsCCCDQEgEzx9oHH2zz2iNy3LhxGjr0v9SlS5eW3IprEUAAgYgQIGgUEc1IJcJDwASMXlf2qFVKWPqc7vInYGSt4HlKy0hX3Moi1eprbd/7T01NS3UfDKo+qE8+rKxn6Z2hft1jw4OIUiKAQMgJ2HoT7dmzx142T/N9mAR9+/5SV199tQYMGMADl12MDQQQCAWBe++912Ow2wS5Ta+iwYMHKzaW/28KhfaiDAggEBoCBI1Cox0oRcQLOAeMHktPcB/ssTnU7NYzy/4/jZ9+vc72RYpRh+vv1Izeb2v+57Xat/OAvpuQqnjbNQ6vlm+PaL916bR43ThxsLo3NWWSw7VsIoBAdAvY5ibav/8LrV+/zu3KQY2FMjMz1atXT/Xq1UudOnVqfJp9BBBAoE0EbL2KbDd3NwzNDEEbMmQI8xXZkHhFAAEEGgkQNGoEwi4CgRfwJ2B0RhWlb2vJI4XS7DccAkYNpYpJ0eg59+qtzIUq2/y23i8fqvEpjb8Nq9KetWu0T1LcsNl69NZE7wGqwFeYHBFAIIwEbCudHThwQFu2bPH4LbxjlRyHnSUnJ/OtvCMO2wgg0KYCpnfkzp07tWrVKo9BbzPH2pgxY5SRkUGgu01bi5sjgEA4CBA0CodWooxhLGALGOVoq+n5M6G/VvpSm7hxWp52npuUMWqfdpfmZ23TbQWf6a21+zR6eh+dndnI3G+tnl9WKl02SYvnDFcCvYzcOHIIgegVcAwSffrpp01OYG2TMt/G21YWev75522HeUUAAQTaXMD0kNy7d6/Wr1/v9XearVdRz549CXa3eatRAAQQCBcBgkbh0lKUMwwFzqhi98t6bHxefcDIjxrEZQ5SWgdP0Z6OSstaojd/kqPfLpyq7J8s1Lwp1yk+plrlW15R/oML9XG/2Xrz8d/qGh9XZvOjaCRFAIEwE2hukMg2N9Fll11mXznIFjQKMwKKiwACEShgfrft27dPmzZtsge03VXT9Co6ceKk9dTDDz/sLgnHEEAAAQS8CBA08oLDKQRaJFCxTo+NydNWvzNJ1IiMHq5D0xzziYnXNVOXaOOAzXq/eIEGdNtrPRuXMVVzl27UwvQUh95HjheyjQACkS5ghmb84x//kJmTyJcVzmwetiFnPXpcITPkjLmJbDK8IoBAqAjYAkUff7zL6+pnprxmrrVBg9KtQe9BgwaHShUoBwIIIBB2AgSNwq7JKHDYCMSP1ItHRgaxuOcoPm24xpufx4N4G7JGAIGQFTAPUMePH9ff//53mdXNzI/tG/WmCm2+ff/Vr65nAuumoDiPAAJtKuBPoMj0kBw9erQYftamTcbNEUAgwgQIGkVYg1IdBBBAAIHIFTh06JCOHTumQ4cO+9WLyIg49iT6z//8T3Xp0iVyoagZAgiEtYBtjqK//OUvXoeemUqa32133HEHqzeGdYtTeAQQCGUBgkah3DqUDQEEEEAgagUcA0RlZX/3OrmrOyTbnERdu3ZluJk7II4hgEBICdhWPfNlgn4TKLrhhhs0YMAAAuAh1YoUBgEEIlGAoFEktip1QgABBBAIK4H9+/fr6NGj+uqrQ/rii/0+LXvvWEEz1OzKK6+0/vziF79QQkICKwM5ArGNAAIhJ2AbdmbmX1u/fl2TQ2sJFIVcE1IgBBCIEgGCRlHS0FQTAQQQQKBtBcxwC/Nj5h/69tvv9M03x+0FevDBqfZtXzbMstEpKSkyvYgYauaLGGkQQCAUBEwPStOTyJfeRKa8psfksGHDGHoWCo1HGRBAIGoFCBpFbdNTcQQQQACBQAvYJqb+/vvvdeLECWvPoVOnqpuck8NbOWwBogsvvFCXXnopQzG8YXEOAQRCSsAEiWwT9W/atNmnsplVz669ti/Dan3SIhECCCAQfAGCRsE35g4IIIAAAhEkYB6CzD8zIfW//vWvgASGTH6OQ8wuuOACehBF0HuGqiAQDQImaH7w4EHrUFuzkqOvQSLbsLPLLrtMPXr0iAYq6ogAAgiElQBBo7BqLgqLAAIIIBAMAVsPIZN3bW2t9aHHbNuGkVVXV/s9EbW3cpreQ126JKioqMiazMznERsb6+0SziGAAAIhJ7B9+3brao7+TNZvAuS/+tX19CYKudakQAgggIB7AYJG7l04igACCCAQ4QKDBg0Oag3Nt+eJiYnWuYfM0LKLL77YZYJqW9CIgFFQm4LMEUCghQK21Ry/++47lZeX23PLzZ1r3/a0YQsS9erVkyG2npA4jgACCISwAEGjEG4cioYAAgggENoCpseQ+WdWLjP/zMpl//7v/868Q1YN/oMAAuEkYOtxaZuTzQwxM6s6lpV96Vc1CBL5xUViBBBAIOQFCBqFfBNRQAQQQACB1hawzS9k7muGkf385xfqZz/7mbW3kDnWrVu31i4S90MAAQRaLGCbk81MTm3+ffXVIbV0sn6zwtnVV19tXc0xOTlZnTp1anE5yQABBBBAIHQECBqFTltQEgQQQACBVhSYOfP31p5BtlvSQ8gmwSsCCESqwN13T2pR1UyAKDX1F/b52D74YGuL8uNiBBBAAIHQFyBoFPptRAkRQAABBIIgMHz48CDkSpYIIIBA+AuY4NBFF/2nunfvZp2b7fzzz3cadmubjy38a0oNEEAAAQSaEiBo1JQQ5xFAAAEEEEAAAQQQiCABxyG4zMkWQQ1LVRBAAIEgCBA0CgIqWSKAAAIIIIAAAgggEGoCDCcLtRahPAgggEDoC8SEfhEpIQIIIIAAAggggAACCCCAAAIIIIBAawsQNGptce6HAAIIIIAAAggggAACCCCAAAIIhIEAQaMwaCSKiAACCCCAAAIIIIAAAggggAACCLS2AEGj1hbnfggggAACCCCAAAIIIIAAAggggEAYCBA0CoNGoogIuBewqKZ8h95dNFm9uiYp2fxcPllPl5SqwuL+Co4igAACCCCAAAIIIIAAAggg4KsAQSNfpUiHQEgJVKu8ZK5+PeQ+Lf/+Jr2z/ysdPPKV9qy+TVr7gAbc9IS2VZwJqRJTGAQQQAABBBBAAAEEEEAAgfASIGgUXu1FaRGQVK2yFbM1elqRjg17QsvmjVRKe/NRjlH7lCGaOm+2bvx6uSZNzCdwxPsFAQQQQAABBBBAAAEEEECg2QIEjZpNx4UItIWARTWlryg7d4Nq1V8zsocqodGnOCZhqKbP6i8dWK6pc9fpOEPV2qKhuCcCCCCAAAIIIIAAAgggEPYCjR43w74+VACByBawlOuduc+rzNSyd4b6dY91U99Yde+foZ6Satfn6fH3joq4kRsmDiGAAAIIIIAAAggggAACCHgVIGjklYeTCISSgEXVO17XU5/XSopTz1HXqbuHT3BMUi8N7GTKXqGNhVv1FVGjUGpIyoIAAggggAACCCCAAAIIhIWAh0fOsCg7hUQgygR+UOnmbTIhI6mzenQ9Xx4/wO0SdeVNifU+nxeqaMfJKLOiuggggAACCCCAAAIIIIAAAi0V8PjM2dKMuR4BBAIsUL1fW4qPNmR6sZIvau/lBrHqcP7PGs6f1P4j3zNEzYsWpxBAAAEEEEAAAQQQQAABBFwFCBq5mnAEgZAUqDv4mdbXdzOSdJ46ntvOSzljlZCU3HC+Vvt2HtB3XlJzCgEEEEAAAQQQQAABBBBAAIHGAgSNGouwj0BICtTp5NHDqrKVrVOSLu7sLWhkS9jw+ulhHa9rdIxdBBBAAAEEEEAAAQQQQAABBLwIEDTygsMpBEJHoE6nqn7wozjt1DkxSR1tV1Qe1rGTRI1sHLwigAACCCCAAAIIIIAAAgg0LeBHV4WmMyMFAggES6BOpyodgkaJnXRugEO+yV2TvBa+qfNeL27lk5Q1eODYBsc2nFyNQDiVl7Lyng2X9+zFSfV/h8PhPRtOZTXtH07lpayB/51lM7XlPGjQYNtmyL9S1uA1UTjZBk/Bt5wD/Njp201JhQACLRS4oGPAg0YtLBGXI4AAAggggAACCCCAAAIIRJgAPY0irEGpDgL1AhbVVlfpjB8cB48cdpva9o2np/NuL2qjg7ZvDD74YGsblcD324ZTWU2twqm8lNX396G/KbH1V8y39Lj65tScVOFoG05/b8OhrOZ9Y3sfhEN5KWtzPum+XWOz5f8TffPyNVU4uZo6hVN5bWX1tS2ClY6eRsGSJV8EgilwokqnLN5uYFFtVaXsi63FddJ/xPFx9ybGOQQQQAABBBBAAAEEEEAAAWcBniKdPdhDIEQFYpWQlHy2bEcrmwganU1q3fppR3UgaNQIhV0EEEAAAQQQQAABBBBAAAFvAgSNvOlwDoGQEWi0GlqT5Wq02trVSUpgMGqTaiRAAAEEEEAAAQQQQAABBBA4K0DQ6KwFWwiEtEC75Ks0LK6hiJWHdexknZfyOq62FqeeAy7ThV5ScwoBBBBAAAEEEEAAAQQQQACBxgIEjRqLsI9AqAp06KEbMhMbSndQh4+f9lLSKh37oqLh/FUa2f8S8WH3wsUpBBBAAAEEEEAAAQQQQAABFwGeI11IOIBAqAqcp7SMdNV3Nvpa2/f+Ux7nwq4+qE8+rKyvSO8M9eseG6qVolwIIIAAAggggAACCCCAAAIhKkDQKEQbhmIh4CoQow7X36kZvU3YqFb7dh7Qd66JrEcs3x7RfuvSafG6ceJgdeeT7kGKwwgggAACCCCAAAIIIIAAAp4EeJT0JMNxBEJRICZFo+fcq1RTts1v6/1yd0PUqrRn7RrtkxQ3bLYevTWRoWmh2JaUCQEEEEAAAQQQQAABBBAIcYF/+/HHH38M8TJSPAQQcBKoUumiu3Vbwd+VmrVCf5reR+3t5y2qKXtd2aNytPWSSVpeOFPp8efYz7KBAAIIIIAAAggggAACCCCAgK8C9DTyVYp0CISMQEelZS3Rm9n9dKxgqrIXf6QK6+RG1SrfssQaMPq432y9ScAoZFqMgiCAAAIIIIAAAggggAAC4ShAT6NwbDXKjIBV4IwqSjfr/eIXNH/lXuuRuIypmjv2Zg1JT3HofQQXAggggAACCCCAAAIIIIAAAv4LEDTy34wrEEAAAQQQQAABBBBAAAEEEEAAgYgXYHhaxDcxFUQAAQQQQAABBBBAAAEEEEAAAQT8FyBo5L8ZVyCAAAIIIIAAAggggAACCCCAAAIRL0DQKOKbmAoigAACCCCAAAIIIIAAAggggAAC/gsQNPLfjCsQiEIBM+n2Bq0ueVk5w65QctckJXdN0z0l/4hCC6qMQAsEasq1zelzZD5L1+meRX/S6m3lqmlB1lyKQPQIVKt8W4leeXSEkq9apNI6f2tuUU35Dr27aLJ6Wf+eJSn58sl6uqS0YTVSf/MjPQKRJtCSz5jDtbbPV9crdNOjL/N3LtLeJtSnBQIOn5Nm/R1zd+szOl4yvf7vWsDyrL9PO3e34xgCCCBQL2CCRW9rySNP6I0DtVJchqY8/oSeOu8K3cAKbbxJEPBD4Iwqdr+sx8bn6eN+UzX/iS2amxYv6zc3JpD09ivKnzBPL459Qk8/dKtS2vOdjh+4JI0KAfM/2Nu1/7P3NKdgs2ptde6Ubtvy8bVa5SVPadq0t6WxT+id/S8opb1UU75Fy/Me0IAXbtbywplKjz/Hx/xIhkCkCATgM1bzhV6ZNknzN1c0QqlV2cr5mrHS/K/kbL38+G91DZ+xRkbsRr5AAD5jXpAsx9fp8YdLzv599JLW31P8X6m/YqRHIFoEasq0+tExGpD5iN44kKw75r+lnfuXaVrmSI0gYBQt7wLqGRABi2pKX9DdY0zAaL5WPZ2lEbaAkcm/fYrSJzymZU/fqGMrp2v0zPd03BKQG5MJAhEiUKeKkmdUdOT/KSYpQ7/NiG9mvapVtmK2Rk8r0rFhT2jZvJENAdoYtU8ZoqnzZuvGr5dr0sR8bas408x7cBkC4SgQgM+Y5ahWz3QXMHL2qN2cp9snvqDSGv7QOcuwF9kCAfiMeQOyHNWa+XnaaP9GxVti/8/R08h/M65AIOIFLBUfacmj2Sow3xTFDVXOu3kan9oh4utNBREIioClXO/MfV5lStQdY4cq1W0vonOUcOu9mlG4UfPXL9JzOwZofnrnoBSHTBEIP4F2ih/5iOY3FLwu8bhWbl6sKr8qYoK3ryg7d4Nq1V852UOV0Oir05iEoZo+621tzF2uqXOv0IYlI13S+HVLEiMQNgIt/Yyd0fH3FilnfYXiMqZq7tibNcT2BaOlQqXvvaHnH16srbYH2gPPK2fZtfrT9D5qHzZGFBSBlgi09DPm7d4WVe94yfr585aqJeca/blsSVZciwACkSBgqdiieRMnETCKhMakDiEhULdnnZ753Pyfcm9d84uOnssU8zN1vOCnko5q9eb9qvackjMIRLVAu4QkpfkrYA/emo9ihvp1j3WTQ6y6989QT0m16/P0+HtHRV8IN0wcingBvz9jlsPaVFiqa3PX6sPl0zXKFjAyUjHxShs5Xc9vXa6xl8U12NWqbNlafVLNJyzi30xU0K2A358xt7k0HKz5VC/nrVH3sb/W9d7SteAcQaMW4HEpAhEnULNbiydO1Uozf5HSNGXlH+hhFHGNTIVaV6BOJ48ebugR8YOqTvk2Y29tRVVQxqS3bt25GwKhImC+hX1dT1mDt3HqOeo6dffwf8AxSb00sJMpd4U2Fm7VVzzThkojUo4QFrB89ZHWJkxX7rgrPPYciokfpN8/ca9SbfWo3aYtpT/Y9nhFAIFmCVSpdNkCPauJyhn/SwVrGJmHP5nNKjEXIYBAWAs0/NKxBozilJr1kCaleekVEdZ1pfAItJZAjOI6dlL9d6uf6a21+zyvkGb5l6pO/K+kOPUccJkubK0ieAuKeQAAIABJREFUch8EIl7gB5Vu3tYQiO2sHl3Pr5+E3l292yXqypsS6898XqiiHSfdpeIYAgjYBer03ReVutnNkE97EutGjNpfeaNu623rbXRK31addk7CHgII+CFghl2/qpwCacoTdynt3OCFdoKXsx/VJSkCCLS1gO2XTml9QeL+WzPvvtrjt0VtXVruj0D4CMSo/UVJ6m4tcK3KChZoean7mVjMN7UlpidE3I2acGOS54fa8Kk8JUUgNASq92tL8dGGslys5Iu8zaISqw7n/6wh7UntP/I9Q9RCoxUpRcgKmLlapmt8irshn40KHXOReqZf0nAwXpcn8uVkIyF2EfBdoOZTLX+kUGqFL/oJGvneLKREIHIFHOd6ML0cZt2p6zvw6yFyG5yataZATPfBmjDMttpTqZ4d+3/0SlmjGYtqvtCreS9on+J14/9M1y0JLPfdmm3EvSJboO7gZ1pvm4BX56njud468McqISm5AaRW+3Ye0HeRzUPtEGgjgWQlJfgQaGqj0nFbBEJb4OywtPmTg/9FP0+Fof1uoHQItIKA41wP5nZXaWT/S+jl0Ary3CJKBGISdUvObN1o65Ffu0Hz/+su5W47Xt+DwXJc2/If1vzNF+qOp1foyZGJfP6i5K1BNVtDwHFeMUmdknRxZ29Bo0Zl+vSwjvs2FVmjC9lFAAFXgSod+6Ki/nDvNF1+oR+fRdfMOIJAlArYRog0DEtzuypvYGn4pAbWk9wQCEMBx7keGlaV+fkxbSvZp68/eUXzV+6118llGVX7GTYQQMCbQEzCrXry3RrVjcppWHJ4r1ZOGK3jWQ+q//d/0vxPr9RTm2ZoREoHb9lwDgEE/Bao06kqfybbbafOiUkyg2asA0krD+vYyTqlxfO/zH7TcwECjQWqD+qTDyslJeqO6Tcrhe4LjYXYR6BpAfuwtBdabf5ZPqpNNwspEIhsAae5HiR9Plejs9eqsmNPjX58tQ4e+Up7NhUqZ2wv1W5erJkTRurXj5aovIYlZSL7jUHtAisQo/apd2rhu/M12NbjSBXaWvCI5q+8RE8V5hAwCiw4uSHQIFCnU5UOQaPETgriXKGoI4CARwGLqks/0GozVLT3RI27vrPHlJxAAAFPAq07LM1WCoJGNgleEYhSAcu3R7TfPtdDvAbnrtWHy6drVHpKw0TYMWqfkq7x857RU9Z5WWpVtvIRTcv/QBXEjaL0XUO1myfgLnBkclqjGRPna3V5o3mOmncTrkIAAW8CF3QkaOTNh3MIBEvA8g998KeNqlWapswZSS+jYDmTbwQLtP6wNBsmQSObBK8IRKmA5VSljtnr3l39+3d3v2qa07wstSp7Zane3ON+FSh7dmwggICTgKVilwrzl+mfmQ9be+/ZTx4o0owRM/TM7gpWarKjsIFAWwhYVFtdpTNtcWvuiUDECpj5M19SzvpqpbbCSk8Ry0jFolvAPiztoVYblmYDJ2hkk+AVgagUaDRBaBOrysQkDNBtmYkNUqV6uXiP6BsRlW8cKu23gEU1ZSt17+BJ2nDRY3pp3mSNf/xV/Tl3qOyj1Wo3q2DM7zTPNkG23/fgAgQQaFLgRJVOee0la1FtVaXsHXDjOuk/4vjf5SZdSYCAN4GaT/Vy3tvSsCe0LKuP+y8nvV3POQSiXqBthqXZ2PkraJPgFQEEfFhV5jylZaTbH3Jr//yZDrKqDO8cBJoQMAGj15VtJsG+5F7NnzlI8da/vh2UOqFAG1dMUqo9h71aeX++1hynn4OdhA0EWiQQq4Sk5LM5HK1sImh0Nql166cd1YGgUSMUdhHwQ8ByVKtnTtWzulcr8m9VAk+ffuCRFAEj0HbD0mz+fGxtErwiEJUCMYrr2MkeBGqaIEbtL0pS96YTkgIBBGwCpjvxtD9oa22i7ph9h9KclkY9R/HpM/XSqtlnJ8iuLVHO/HU67rU3hC1zXhFAwLvA2dXQvKeznW202trVSUpg4TQbDq8I+ClQrbKiPyjnyM1aXvi7Rn///MyK5AhEq4ClXO/MLZTacGgnfwaj9c1HvRGwCpwNAu0z+z4sLRxzbkddgB4CCPgoYFH1J2v18gHrcjG65hdmIe/G/85RfJ/fat7S7/XPCctVJql2/Vbt/u5mjWCZ78ZY7CPgt0C75Ks0LE56w3wMm/w757jaWpx6DrhMF/p9Ry5AAAHpjCq2PaPsJ6UZ7z6o9PhzQEEAgWYI1O1Zp2c+r1TV57fpygIfM6hcrNuSFzckvkxTit/StLT2Pl7smoyeRq4mHEEgqgRift5VPeyTqvygqlN+jDdj6eKoeq9Q2eYI/KDSzdvq50fplKSLO3v6rsb0OHpA87PSGm5yUIePn27ODbkGAQQaC3TooRvs8/E19dmq0rEvKhpyuEoj+18i/me5MSj7CDQlYIZlv6XHpv9Dt72bp/GpHZq6gPMIIBDCAvwdDOHGoWgItIqA0/9Mf6aSv3zt4+pNceo56jp157dIqzQTNwlXgdP6vxWnfCx8R1158y3q6WNqkiGAgK8CjvPxfa3te//p+e9c9UF98mFlfca9M9Sve6yvNyEdAghYBWzz+K1SwqIc3UXAiPcFAi0SaJc2XZ8cOayDTf18vEiDbXfqNFVvHbRds65FvYxMljzu2WB5RSBqBTrr+vETGx5Ua7Xv3Y/0lZe5VOqOH1ap1YpvYKP2LUPF/RDorMsHXF6f/n+rVF3r5cNl/ijbh38mKymBh1U/oEmKgBeBGHW4/k7N6G261dZq384D+s5Dasu3R7TfunRavG6cOJgvRjw4cRgB9wIOAaOlz+mx9ATvD5s1u/XMoh2sxOsek6MIhIwAQaOQaQoKgkDbCcSkjFSObVjM52v05z1VHgpTpb3bd6pKcUrNytLoFB5qPUBxGIEGgVh1759RH5St3aYtpT94kbGo+u+f6WNJcWMzNYj5jLxYcQoBPwViUjR6zr31KxVuflvvl7sb/lmlPWvXyMzxFzdsth69NdH7A6+fRSA5ApEt4E/A6IwqSl9XzpiH9d1Vl4vBa5H9zqB24S9A0Cj825AaIBAAgY5Ky1qkp4bFSyrVs4+8qtKaxj0ibMs9liou4/9o4eSr1fzp1AJQZLJAIEwEYlIytSB3qOJ0VG/kvaBtFWfcl7zmU72c97ZqL5ukxVP68T/R7pU4ikAzBWLUPu2uhnnDPtNba/epxikn88C7Vs8vK5XMZ3DOcJYGd/JhBwFvAraAUY621u7Vygn9dWnXJCV7/EnVgMxH9MbX/XRD2nneMuYcAgiEgABBoxBoBIqAQEgIxCRqRP4KPTW2l3RgoSZMW6Kt5dX1RbNUqLSkQNljn5fGLtI7T9+pVKdlw0OiBhQCgRAV6KDUCXlaZQJHB5Zr0uAH9HRJqSrscdlqlW9boZwxE/TyRQ/qzcKZrDIToi1JsUJAwFKhT976s7VHnrU0ldv07tqyRgEgT+U0X5As0ZvZ/XSsYKqyF3/U8DmsVvmWJcoelaOP+83mM+iJj+PRIeD3Z+yMKna/aP38bLUO7fSdKS5zkNI68DjquxgpI0LA789Y29f633788ccf274YlAABBEJHwDzAvq8/r1yoZzfbVpCJ1+Csabp14EANT4unu37oNBYlCTMBS0Wp1n24Xe89ulhn/+c6TqljZ+iejF/phvQUevCFWZtS3FYSqCjRPddO11ZvtzMTf+6erjRPixTarzVDYzbr/eIXNH/lXuvRuIypmjv2Zg3hM2hXYiPKBJr7GfPlOreUibpjxTuan97Z7VkOIhBxAr58Vnz+O+ZGxzH/luTjJmuCRm5QOIQAAggggAACCCCAAAIIIIAAAghEuwD9AaP9HUD9EUAAAQQQQAABBBBAAAEEEEAAATcCBI3coHAIAQQQQAABBBBAAAEEEEAAAQQQiHYBgkbR/g6g/ggggAACCCCAAAIIIIAAAggggIAbAYJGblA4hAACCCCAAAIIIIAAAggggAACCES7AEGjaH8HUH8EEEAAAQQQQAABBBBAAAEEEEDAjQBBIzcoHEIAAQQQQAABBBBAAAEEEEAAAQSiXYCgUbS/A6g/AggggAACCCCAAAIIIIAAAggg4EaAoJEbFA4hgAACCCCAAAIIIIAAAggggAAC0S5A0Cja3wHUHwEEEEAAAQQQQAABBBBAAAEEEHAjQNDIDQqHEEAAAQQQQAABBBBAAAEEEEAAgWgXIGgU7e8A6o8AAggggAACCCCAAAIIIIAAAgi4ESBo5AaFQwgggAACCCCAAAIIIIAAAggggEC0CxA0ivZ3APVHAAEEEEAAAQQQQAABBBBAAAEE3AgQNHKDwiEEEEAAAQQQQAABBBBAAAEEEEAg2gUIGkX7O4D6I4AAAggggAACCCCAAAIIIIAAAm4ECBq5QeEQAggggAACCCCAAAIIIIAAAgggEO0CBI2i/R1A/RFAAAEEEEAAAQQQQAABBBBAAAE3AgSN3KBwCAEEEEAAAQQQQAABBBBAAAEEEIh2AYJG0f4OoP4IIIAAAggggAACCCCAAAIIIICAGwGCRm5QOIQAAggggAACCCCAAAIItK3AGVWUbtDq4kW65/KxeqX8dNsWh7sjgEBUCrSLylpTaQQQQAABBBBAAAEEEEAgZAVOq3xFroosnfXtH5doa21/9Q/ZslIwBBCIZAGCRpHcutQNAQQQQAABBBBAAAEEwlAgVikTFmi+Tqs8Zo+25oZhFSgyAghEhADD0yKiGakEAggggAACCCCAAAIIIIAAAgggEFgBgkaB9SQ3BBBAAAEEEEAgMgRqvtArk65TctfrdM/ij1RhCYVqVat8W4leeXSEkieVqCIUihTxZQiuuaV8hUZ1Zb6eiH8bUUEEEAhbAYanhW3TUXAEEEAAAQQQQCB4AnVfbtQzm+vDMlsXvqGbbuujEfFt87+OlopSrdtQrOdyX1OZrcoZtg1egyHQOuan9dVfNmtf7ww92T02GNUgTwQQQACBFgrQ06iFgFyOAAIIIIAAAghEokC7S2/UgxnxkuI1OPsO9b2wbQJGspTp1QeW6WBI9HSKxJZ2U6fWMrd8rQ/f/Zt6jrpO3XkqcdMQHEIAAQTaXqCN/vq3fcUpAQIIIIAAAggggIAXgfZXaPzyjzTeS5JWORWTqvHvPCfJot92+4kGTChSbavcOIpv0krmlq8+Ukn5QE24MUnEjKL4/UbVEUAgpAUIGoV081A4BBBAAAEEEEAAgXqBGMV16KhzJIJGrfaWCKZ5/dC0rzInaVCCadUI/mcp0yujMjX/cx/CnXHjtPzjOUrvQBgtgt8RVA2BsBIgaBRWzUVhEUAAAQQQQACB6BVol5CkNElbo5eg1WseNHPr0LRvNWJ6D3Vo9Vq18g1Nz63VX7R9r71Wrja3QwCByBAghB0Z7UgtEEAAAQQQQAABBBAIG4H6oWn9dEPaeWFTZgqKAAIIRKMAQaNobHXqjAACCCCAAAIIIIBAmwnYhqYNUhrDsNqsFbgxAggg4IsAQSNflEiDAAIIIIAAAggggAACgRGwDU3LiIKhaYERIxcEEECgzQQIGrUZPTdGAAEEEEAg0gQsqinfoXcXTVavrlO1uqKuoYLVKt+2Sk9Puk7JXZOU3PUK3fTo6yqtOOMMYKlQ6ZqXlTPsioZ01+meRSWu6Zyvsq6qZe67uniR7rnc5N/wc/lkPV28wYfrz6iidINWr3hUN9mutb6a+/9Ja0sr5Hm19/prrXW+apFKbVV2qcsI5by6WxWeM3KpVf2Bf2j1pLSzdXIqn824ThUlUz2kSVKyY7msmbrLc7ieLq1pVAbTbiV65dERSp5UoopGZ+t3g1B/q92fHN4vSeo1aZFWe20Ht4XzftDcp8TxPfP/t3c2UFFcWR7/b6+b8bDIwsRR1t2oBJDFiB/E7CHRY1CRqKsBycRE4wGMGI1JFM2o66qAwZndJDMgHSdxFING1B2MgF9rogjE49dEbcGPKILLqCN01BFsSG000m9PdVdVVxXd0FBN0+D1HE6/qnrvvvt+71K213vv4/d7F0orTQBfuDh1n50122PCM/gfKydhf3h9C0oroSZqXyHr70377VfreP5XiP/dcwNzAYD21LTOeteodrBdNqSS4fDSDFNpKoYODMWktOMAjiN9QiiCYragss3vEYeT0AMiQASIQOsEGP0hAkSACBABIkAEiIAWAg1XWUnBZrZq4mAWOGCg8PMeK6z9ibGGK6xw5cuy++LzgSwwNJkV3npgmbmptoilKsbL+k3Us7MNTQ40vM+u5Mxnz87JYIVna5m11wNWe3a7TZ/QJKb/VnymEtNUy05nJbGwAQNZ2Jxt7IowT1Ptt2ybpHcEm5tzkTXIh/Jr3p3B5obK9Byewc7+xJjjtQxmkzO+VcqRy3TYvs+uFukVc4XNL2C31EiasbajtzRHE2u4ss0iM2yOnh25et/2pPYs26de25wCViv1YIx1yPqbWMPVAuu+TVzJtkn7Ka4/gs1dmcwmizam1kmuX2vthotsy5wIFjbnM3a61mqDjKnsRpLP6/UNK8xZaZub14F/LrMfm+2LNjGYTU4pYrXqfVLoptF+mdbxbmQurfv/2NWcN1jYyhJmszrpYcuNTn3XqFRrkw2pxtIlESACRKALEaBIo9b9atSDCBABIkAEiAARcEigEYZNKdhRWYvvr6uOk264iK1LN6B6ZCqO/W81qv58DWWHMzEj1MsqjSvE6k9P4L7xCD6Y9yV8522z3+/yBqR/WWkn2qcehszZePXYKGxftwgx4f6wfrF5Av7hM7EmR49Z/FxcEbJefQd6Q71qFQ9Rs/dDvJlRBM4rHvqMmQjxtkrQ+T+HWcsWY4ZFVSOK0/4Tuyt/FMbfRel//Qo7rqnWiyaYKnIxf14JApYXouzP/JorcGzXcoyzyOFQkZUlk6NSx+GlD4LHz0Pab2IhkAOe9IWgqm2Udwhi/n0V3hX5IhCjRgXC29ZD1tLBS/cIdxCL9A/mYVyweH7VX7Bv1cf40/XvcUu9PGl0x6zfXLMXy2IWYyfmI2/XB5gl7Se//vewoWg5euQXokLSo72NeovNpp+Ihj7jLYz0F497F+xm868RLYEG8KgM2dMT8H7adtXc9/DdF7/Br2+PxZZTFaji9/viIWxcFCXsE4eKrQsxJ+u0g4gjrfardTzgPuayvTKdwhcf3URMm1PTOvNdI9Pf0myjDamH0zURIAJEoCsR6EIOLlKVCBABIkAEiAAR8GACTVdzWKwYBTJgDItduVkWxSEq3sTul6RYInsskRmhUSx2+UY7/RhTyHs5h11VRGw0sYazejZ5QBzLPFsnCld9WiMapAgQtYymK2zLy0J0lBAlpBRwh5WsHCNESY1hq0ruKB8zlY6qaCVbZ7keg1lszhUhIsrWw6nW/RK2SoxsCk1hJfcVQAQRzs7VWrSHap+kqBulpoo90rL+puuscH4EC2zLfjrQSamhnSuRo9095/sLDJvJf8BuFSTbbHeAo0gua/QPH71mtXFbRJ1NG632q3U8b7xuZC4tXLArh/YrdWyxobS7jn7X2FGl3TZkRxbdIgJEgAh4OAGKNOpKHj7SlQgQASJABIiABxPQBQzFi36igsOQ+G68LIpDvK+DT/hYxIiRHFwoEpNn2+kH6PoOxBCxX2U1bjXKCnmYK7F7zQZU+I3GmKG+onDVZw/08pUd511uwHe3xaJDfB2XH1B3w2E4DYCe8Hny7wWZDfi+Xow0sk2j6+WLX4iXqmgl8TYvJ2Dos7BqyeFaVa2DyBPbCLstn+GYNjfc+ogrxRHDPTvdeiIw+pdCpAyHCwUncU2GTRrQaiFiHbz/KQCB0gD7Ddesn4/4ysTqg0Zg2FT823BH+ynnaF8fp+5y9fie3/a6Yzh6Xh19xkvoieC4JMz4O7W0J9Cnf3+IcUkYNg9L45+xE8nlg5D4ZLw/TDBe7hC2HKpWRspptV+t4+Fm5hLKezAUlQJx2k5Nc+u7RtJd1mi3DclkUJMIEAEi0EUI9OgiepKaRIAIEAEiQASIQHch4OWDJ38GoCV/Db9WeT+uDvc5MyAcz20ppFvOC9BjepDeSTJVqK75EfAXErZ6BGHSoon4PK0MEYuiMag934p698dgP6C4DsDPfOHj1fr/x3HGesvSxYQwJ5UH4IvhU6YiLMuAC7iBPUUXsTQyEko5ZnDGm5AyBcv34UBZLJLDlY4YsRDxonCZU02liMIhpHomXbpi/eZqHM45ZGHiGzkUAS0g1PXyw1MA7Ll6JJ1aa3j5oi/vz+EMWD9rKf52azreeU5MbRQGe/8jgvo0tCzpF77o5UhX3QC8MG0EUM4XMBacd/EhCBb6a7VfrePhbuYiSdNFHMkHYj5106lp8neIqIO9T3k/1bvGXne4yobsCqebRIAIEAHPItCer0eetQLShggQASJABIgAEXjMCDzC7Uu84wSA30LknV6M8HZ9o/FBSOJnOJ+oxsefhlWMk9/sRmrWZfXDTr3WBT6P2GFeuFDOgcvNRkFCBBKCe8p0uocz+XvxKDQIXperwMGAz/PL8Ga43Ln0I64d/wYP5y7ASMEJJxPg9qbNAeKH8IA+aGkrnXJktbYC76cx8kV/7OQjmyz1roqwKWoh0hfMwFSxjpIuBAlrQlqT1MLznggcFYUwHLfa6Y06NPARXxankVb71ToecDtzCykzTIYS7EEk9C04K1uA6jmP3GJDnrNc0oQIEIHHm4Cj/x95vKnQ6okAESACRIAIEAEPJvAIDfX2UrM0qmw5dvxzrJ40AtGfXgZGvA39olCNQl08XIxgsYg9h8Lj1xVpT+bK/cjKfwErduql9CguvwQGkyxHzZKaBkyfEmYntcrF+rYqTuYAabWvizro+mNq6lprkXRBJFekx/txz2PQpFXYWlrZvvRBlXqK9Mq6aty8K6ZGarVf7eMlp6tK5469dE1qWsfq6KR0N9mQk9pQNyJABIhAhxIgp1GH4iXhRIAIEAEiQASIgOsJPEJDneA0UvxjvL0zmVB55BO8NeR5JO75AWP1J3E+ezGmRQ5SpX61V74rx7VUs0iMIJqCkb4B1vQofmruEPKK/yI4l8wwHd2B3+FFvBAoj1BypY5tkfUjaqqr2jLAJX11/uORtqtQdtKZIPbydqQnRuOFpA04Y3yobS4x5amZFK32q3V85zCHmJrW5lPTmgH0iBtusSGPWCkpQQSIwONOgJxGj7sF0PqJABEgAkSACHRpAuU4c6X9FW7MxpP4JOklTJqzA1i2Hyey35MdP++ZYHT9RmN6XH+rcuVFOHFNKNBtOcr8JyGCSO5cMuJQTrFQEJuP9jiBwGnPI9DjvgXWwVB9G2I8TofT9w7GuMV/wInDOVg9a6hiOq7oQ7w++2OUanUciVL9AvBUb3uJd9rsF9A63l3Mbalp47t6apq4p/ynO21IPi+1iQARIAJuJOBxXxfcuHaaiggQASJABIgAEeiSBHqiX0CQoPkN7PnjMdTIsq8cLclceRj7K2UnoDVewrZVS5BVZITXpOVIs3sSliNpnXn/5wiPioT1bC4xRe0haor34GBcEqYJNY7sOpcs0R59ETtqgLW8TmcuwzJ3D/TysxXjrr90A3fdqpMO3sGRSFhbgLLDG/FulL9t9svZWLj+BEy2O+1vPRuAfpLPSKv9ah3fGcy7UWpaMytwkw01m5duEAEiQATcQ4CcRu7hTLMQASJABIgAESACLiPQA32eCUeYII87+CHW7r2hqO3TfKp6lB28Bu++4oHpZpjO5OF3RUa+mjYiXhqJfl3mW5EOPuFjEWPxGnG48NEOHK2/hsM5FzFJkfqjdC7l7S9HDV+IODjKQ1LT+F16An0HBgoOMAAnzuGKvP5S84203blTby0ubbvjXMu4D2lbKlT2wv/DfwKSs7/GgbSJkj7cgXOoam/o090b+I4/VQ9eCBsdij6SdlrtV+v4TmDezVLT4C4bkmyGGkSACBCBziPQZb4edR4impkIEAEiQASIABHwNALiKWJWvYw4lPwePiitUTkCRK3NaKzYj+y//gvCpdPCOFSdO2055l3s1aU+fYZgvJiixh3Cjt9uRB7eQPyY3rJl6OAzZqZQEJtDxaZ1SNtahpjFU6Sj32WdO6kpd4Dx9Ze+xMebzzpXiFo8kazNmjehpuCkkK6nHuyDkPgVSJ8kizhSd3Hq2gzTlXM4xff1ikZidIAiskur/Wob727m3TE1zR025JShUSciQASIQIcTIKdRhyOmCYgAESACRIAIEAGXE9AFYMLsaCkiBDiP3MRXMD+zEAZ5HZrGSpTmZ2HJtAIMihnuoLB1HU6dqWqWhmQ2XsDxS5ZQEQAPcKf+BwdOKZevzgmBvTEmYbYQbWVEce4pDJg9rnmdIvlpa9wpFP9pODyupoxPBOKXjRLWzKEiay1+a88BaK5B6Wc5KBbpPKiHiXMiL1HsL/8s34cDZQ5qYel+jqcG+Vl79/dDL0fflluMirKmY3HwQsjcmRjfT4xwE5TQar9ax7uVeTdNTXOFDcltktpEgAgQAQ8l4OivQQ9Vl9QiAkSACBABIkAEPJYAZ8JfH4ja3UN9gzN5Pe3t9wT6vbwU+gR5AWMjirMWY3pECIIGBlh/hkQjaUk2br26AK8P9xWVs6QMBY14TnI6cbkr8Cv9SRh5H4TZCENhJubP24MmfzGpiMO1qlo04iGMp3Ox9ahQeUdKQeL9Sk46MdqbViXTnm8qok28ojF93D8rolms3eUFsQGvuLGyaCuVQNWluaEed8R7Z6tRY287XbL+ngj+5QqsluoJiQ7Aw6hstDqFzMbTyE1Zhjzff8UYUSfuCyS9loKczLfxarN0M7GTo08D1q/8vf1C1+Z7uHmVdxb2x4yWorIUp9LJ5zGj0bATH+fegFfUCmTMfRbe8seWtlb71Trejcw7IjXNre+aZpsn3HCBDTkSTfeJABEgAh5EgJxGHrQZpAoRIAJEgAgQga5LwISK/D9kSGTsAAAD2UlEQVRiDyeu4Bzyco9bnTDiLcunCRW5m/C5GMCDc8jb+pXkHLB1daKfrh8iU/+A/14SJTl/bOPFlhdCEvTYnDoe/opvPXzq1hxZGpIRxRkzMfrpAAQ9PR6rzwRg6fa1eDNquCSby52N8IEvIuXSCLxiSQMzoeKrr60pSPx0fJpY/uXmqVXmGhzbUwoprqW8ANuPOkqlE/V24lOKIvJC2LKZGCOl3inH2gpi90eMouaRsp/iylyDo7kFuCDerCvF3mNqnV24fu9nkLAuW+Y44h2Ab2HSkECL829QRCJ2PrkIH814BlI9aUE3XdBcfBIfYsdhJirv4PNyNpLGvYN1hQabnTZWojgrHasP9sGMdRuxPFKe7qeSE+yH6//xGuZn2pxbFofjthS8FpeBm1Hp2LVuJkK8FYZnE6LJfnmvoRb750/+cgdzITUteLYqddKGoe2tTnjXOFJSqw05kkv3iQARIAIeROBvGGPMg/QhVYgAESACRIAIEIEuReARjIVLMDp5n0OtfRftxqnFg3A+czqmZ1122A9RmTiWPQVwSl64zHnwEEZDMU5+sxupWUVCnSIvhMx6H2/HTcbkcH/HDgXeSbDpIySL40LfwOrlCXglMtgaHdJ4CVuTk5DOn7AWtRDpC2Zganhv3G5RRz+MW7cXG2N9YWhxzaF4Nz8PyeHN41AcQ1I+MVduwSsTihB7OBsJwqlpyh78lRmm0jUYvQDQn0pFpAPnknVcoxM678DrN1Ja2HMt6zehsvRrHMjNwHpLkXJYuK+ZNQUT+D0xFuKtiA+BRUswc8pLiAz2ab7c1u7wRYy/GoSU+H9A2YFTuF51QGY3/hjXguxHhkxExOmtDsCoTBxd2x+nd36G1aL98DFsUQsh6duaLpbnGuzXJeM7kvldlK6agayg9did2A7HnoKfJ7xrBIU02JBiSXRBBIgAEegCBMhp1AU2iVQkAkSACBABIkAEiAAR6HwCaqfRsexYaC2Z3fmrIg2IABEgAkSACDgm4CBe1vEAekIEiAARIAJEgAgQASJABIgAESACRIAIEAEi0P0JkNOo++8xrZAIEAEiQASIABEgAkSACBABIkAEiAARIAJtJkBOozYjowFEgAgQASJABIgAESACRIAIEAEiQASIABHo/gTIadT995hWSASIABEgAkSACBABIkAEiAARIAJEgAgQgTYTIKdRm5HRACJABIgAESACRIAIEAEiQASIABEgAkSACHR/AuQ06v57TCskAkSACBABIkAEiAAR0Eqg8RK2f5qHelFOUQ5+X1iBRvGaPokAESACRIAIdEMC/w+iYia+aTEDQQAAAABJRU5ErkJggg==" alt></p>
<p> </p>
<p>(i) Suggest why, for any given height, the mean wind speed above the sea is greater than the mean wind speed above the land.</p>
<p>(ii) There is a choice of mounting the wind generators either 60m above the land or 60m above the sea.</p>
<p>Calculate the ratio</p>
<p style="text-align: center;">\[\frac{{{\rm{power available from a land - based generator}}}}{{{\rm{power available from a sea - based generator}}}}\]</p>
<p>at a height of 60m.</p>
<p> </p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between photovoltaic cells and solar heating panels.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The diagram shows 12 photovoltaic cells connected in series and in parallel to form a module to provide electrical power.</p>
<p><img 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" alt></p>
<p> </p>
<p>Each cell in the module has an emf of 0.75V and an internal resistance of 1.8Ω.</p>
<p>(i) Calculate the emf of the module.</p>
<p>(ii) Determine the internal resistance of the module.</p>
<p>(iii) The diagram below shows the module connected to a load resistor of resistance 2.2Ω.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" alt></p>
<p> </p>
<p>Calculate the power dissipated in the load resistor.</p>
<p>(iv) Discuss the benefits of having cells combined in series and parallel within the module.</p>
<div class="marks">[8]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The intensity of the Sun’s radiation at the position of the Earth’s orbit (the solar constant) is approximately 1.4×10<sup>3</sup>Wm<sup>–2</sup>.</p>
<p>(i) Explain why the average solar power per square metre arriving at the Earth is 3.5×10<sup>2</sup> W.</p>
<p>(ii) State why the solar constant is an approximate value.</p>
<p>(iii) Photovoltaic cells are approximately 20% efficient. Estimate the minimum area needed to supply an average power of 850kW over a 24 hour period.</p>
<p> </p>
<div class="marks">[5]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) mention of blades/propeller and turbine/generator/dynamo; </p>
<p>kinetic energy of wind <strong>→</strong> kinetic energy of turbine; </p>
<p>(rotational) kinetic energy<strong> →</strong> electricity/electrical energy;</p>
<p> <em>Award <strong>[1 max]</strong> for statement of (unqualified) kinetic energy to electrical energy</em></p>
<p>(ii) <em>A</em>(=π<em>r</em><sup>2</sup>)=6.4×10<sup>3</sup>(m<sup>2</sup>);<br>(<em>P</em>=)1.95 MW;</p>
<p>(iii) 0.24×1.95MW (=0.47 MW/0.48 MW); <br>(0.47 MW = 470 kW thus) two generators would meet the maximum demand;<br><em>Allow only two generators for the second mark. Do not accept fractional generators.</em></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) sea is smoother (does not interrupt wind flow) / no obstacles on sea / less friction / less turbulence (vice versa for land) / <em>OWTTE</em>; <em>Allow named obstacles, eg trees/buildings/hills, etc.</em></p>
<p>(ii) \(\frac{{{v_{land}}}}{{{v_{sea}}}} = \frac{{10}}{{12.4}}\);<br>\(\frac{{{P_{land}}}}{{{P_{sea}}}} = {\left[ {\frac{{10}}{{12.4}}} \right]^3} = 0.52\);<br><em>Award <strong>[1 max]</strong> for 1.9 due to inverted ratio.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>photovoltaic cells generate emf/electricity; <br>solar panels generate thermal energy/heat / <em>OWTTE</em>; </p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) emf=3.0 (V); </p>
<p>(ii) series combination of resistance=7.2(Ω);<br>use of parallel resistance formula; <br>2.4(Ω);<br><em>Award <strong>[3]</strong> for a bald correct answer</em></p>
<p>(iii) attempted use of<em> IV, I<sup>2</sup>R </em>or \(\frac{{{V^{\rm{2}}}}}{R}\)<em>;<br></em>0.94 (W);<br><em>Allow ECF from (d)(i) and (d)(ii).<br>Must see values substituted to gain first mark as compensation.</em></p>
<p>(iv) (series) increases the total emf/voltage;<br>(parallel) increases the current/decreases internal resistance/ensures some power if single cell fails / <em>OWTTE</em>;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) the solar radiation is captured by a disc of area <em>πR</em><sup>2</sup> where <em>R</em> is the radius of the Earth;<br>but is distributed (when averaged) over the entire Earth’s surface which has an area four times as large;</p>
<p><strong>or</strong></p>
<p>rays make an angle <em>θ </em>with area of Earth’s half-sphere and so average intensity is proportional to average of cos<sup>2</sup> <em>θ</em> i.e. \(\frac{1}{2}\);<br> there is an additional factor of \(\frac{1}{2}\) due to the other half of the sphere;</p>
<p>(ii) variation of solar emission / Earth’s orbit is elliptical/not quite circular;</p>
<p>(iii) input power needed =(5×850(kW)=) 4.25×10<sup>6</sup> (W);<br>\(\frac{{4.25 \times {{10}^6}\left( {\rm{W}} \right)}}{{3.5 \times 10^2\left( {{\rm{W}}{{\rm{m}}^{ - 2}}} \right)}} = 1.2 \times {10^4}\left( {{{\rm{m}}^2}} \right)\);<br><em>Award <strong>[2]</strong> for a bald correct answer.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) Many did not mention the kinetic energy of the wind (often referring to ‘wind energy’). All types of kinetic energy were referred to as ‘mechanical’ energy by many candidates. The general structure of this type of wind generator was generally well-known. <br> <br>(ii) This part was generally well answered with those candidates completing the area calculation usually going on to gain both marks. <br> <br>(iii) Again, this was well answered with nearly all candidates recognising that is not possible to have fractional generators and, therefore, rounding up their answers to 2 from the 1.7 calculation.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) Most candidates were able to suggest why the winds above the sea are higher than those above the land for the same height. A minority incorrectly answered this in terms of convection currents and sea versus land temperatures. <br> <br>(ii) Nearly all candidates were able to correctly read the two values from the graph and a slight majority of these went on to correctly cube the ratio.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates knew the difference between photovoltaic cells and solar heating panels. A minority believed that both would normally produce electricity.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) This was not well known and many candidates simply added the emfs to give a value of 9.0 V rather than the correct 3.0 V. <br> <br>(ii) Nearly all candidates correctly calculated the resistance of the series portions of the modules but there were frequent errors in combining these to find the total resistance – with the parallel formula often being incorrectly written in shorthand <br> <br>(iii) Although many candidates recognised how they should use the power formula, very few were able to used the correct resistance and the correct voltage. <br> <br>(iv) Many candidates knew that a failing cell would still allow current in other parallel branches, but few explained that the series combination increased the emf and the parallel combination increased the current in a module.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) A significant minority of candidates insisted that the reduction in the Sun’s intensity was due to radiation reflected from atmosphere. Few went on to do the calculation to support their answer but there were a small number of very good answers to this part. <br> <br>(ii) Here again, many mentioned radiation reflected by atmosphere rather than variations in solar emissions or the non-circularity of Earth’s orbit. <br> <br>(iii) This part was generally poorly done. The ‘24-hour period’ confused many candidates and few were able to follow the argument through to a logical conclusion.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about wind power. <strong>Part 2</strong> is about radioactive decay.</p>
<p><strong>Part 1</strong> Wind power</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline in terms of energy changes how electrical energy is obtained from the energy of wind.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Air of density <em>ρ</em> and speed <em>v</em> passes normally through a wind turbine of blade length <em>r</em> as shown below.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAcwAAAIECAYAAACUiB7CAAAKqGlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUFEkax6u7JwfSwEhmiEOQnEFyHILkaGKYIQxhGAYGFTOyqOAaUBEBRdBVEAVXJYgJEcW0CAYw7yCLiHouBkyocw0cw+3du7t3//fq1a+/rv7q6+qq9/4NAOUqWyDIgOUAyOTnCsP9PBmxcfEMvBggAA+IgAQgNidH4BEaGgRQzfR/1cd+AE32d0wnc/37/f8qeW5SDgcAKBTlRG4OJxPlU2g7zhEIcwFAuGhcd2muYJI3oqwoRAtEuWqSU6b5+CQnTnPX1JjIcC+U7wNAoLDZwhQAyH+gcUYeJwXNQ8GgbMHn8vgo26Dsykllo/NQ0HtgbmZm1iTvR9kw8Z/ypPwlZ6I0J5udIuXpd5kSwZuXI8hgL/8/l+N/KzNDNDOHDtooqUL/8Mn50DWrS88KlDI/cX7IDPO40zVNcqrIP2qGOTle8TPMZXsHzrAoPcpjhtnC2Wd5uazIGRZmhUvz8zPmB0nzJ7GknJTjEzHDyTxf1gznp0bGzHAeL3r+DOekRwTOjvGSxoWicGnNyUJf6Ttm5szWxmHPzpWbGuk/W0OstB5ukrePNM6Pko4X5HpKcwoyQmfrz/CTxnPyIqTP5qIbbIbT2AGhs3lCpesDeCAYsAEnN2nZ5L4CXlmC5UJeSmouwwM9JUkMFp9jNpdhZWFpB8DkmZv+pO/pU2cJol+fja1vBsDlvEQiOTMbC9wGwEkmAKTe2RhzOwCyagBcreGIhHnTscmtDrDoOZYFikAFaAJdYAhMgRWwA87AHfiAABACIkEcWAw4IBVkAiFYClaCdaAIlIBtYBeoANXgAKgDx8AJ0ArOgovgCrgBesE98AiIwTB4BcbARzABQRAeokI0SAXSgvQhE8gKcoBcIR8oCAqH4qAEKAXiQyJoJbQeKoFKoQqoBqqHfoVOQxeha1Af9AAahEahd9BXGIEpsCKsARvA5rAD7AEHwpHwIjgFzobz4UJ4C1wO18JH4Rb4InwDvgeL4VfwOAIQMkJHtBFTxAHxQkKQeCQZESKrkWKkDKlFGpF2pBu5g4iR18gXDA5DwzAwphhnjD8mCsPBZGNWYzZjKjB1mBZMF+YOZhAzhvmBpWLVsSZYJywLG4tNwS7FFmHLsIewzdjL2HvYYexHHA5HxzFx9jh/XBwuDbcCtxm3F9eE68D14YZw43g8XgVvgnfBh+DZ+Fx8EX4P/ij+Av42fhj/mUAmaBGsCL6EeAKfUEAoIxwhnCfcJowQJohyRH2iEzGEyCUuJ24lHiS2E28Rh4kTJHkSk+RCiiSlkdaRykmNpMukx6T3ZDJZh+xIDiPzyGvJ5eTj5KvkQfIXigLFmOJFWUgRUbZQDlM6KA8o76lUqgHVnRpPzaVuodZTL1GfUj/L0GTMZFgyXJk1MpUyLTK3Zd7IEmX1ZT1kF8vmy5bJnpS9JftajihnIOclx5ZbLVcpd1puQG5cniZvKR8inym/Wf6I/DX5Fwp4BQMFHwWuQqHCAYVLCkM0hKZL86JxaOtpB2mXacOKOEWmIksxTbFE8Zhij+KYkoKSjVK00jKlSqVzSmI6Qjegs+gZ9K30E/R++tc5GnM85iTN2TSncc7tOZ+U1ZTdlZOUi5WblO8pf1VhqPiopKtsV2lVeaKKUTVWDVNdqrpP9bLqazVFNWc1jlqx2gm1h+qwurF6uPoK9QPqN9XHNTQ1/DQEGns0Lmm81qRrumumae7UPK85qkXTctXiae3UuqD1kqHE8GBkMMoZXYwxbXVtf22Rdo12j/aEDlMnSqdAp0nniS5J10E3WXenbqfumJ6WXrDeSr0GvYf6RH0H/VT93frd+p8MmAYxBhsMWg1eMJWZLGY+s4H52JBq6GaYbVhreNcIZ+RglG6016jXGDa2NU41rjS+ZQKb2JnwTPaa9M3FznWcy59bO3fAlGLqYZpn2mA6aEY3CzIrMGs1e2OuZx5vvt282/yHha1FhsVBi0eWCpYBlgWW7ZbvrIytOFaVVnetqda+1mus26zf2pjYJNnss7lvS7MNtt1g22n73c7eTmjXaDdqr2efYF9lP+Cg6BDqsNnhqiPW0dNxjeNZxy9Odk65Tiec/nQ2dU53PuL8Yh5zXtK8g/OGXHRc2C41LmJXhmuC635XsZu2G9ut1u2Zu6471/2Q+4iHkUeax1GPN54WnkLPZs9PXk5eq7w6vBFvP+9i7x4fBZ8onwqfp746vim+Db5jfrZ+K/w6/LH+gf7b/QdYGiwOq541FmAfsCqgK5ASGBFYEfgsyDhIGNQeDAcHBO8Ifjxffz5/fmsICGGF7Ah5EsoMzQ49E4YLCw2rDHsebhm+Mrw7ghaxJOJIxMdIz8itkY+iDKNEUZ3RstELo+ujP8V4x5TGiGPNY1fF3ohTjePFtcXj46PjD8WPL/BZsGvB8ELbhUUL+xcxFy1bdG2x6uKMxeeWyC5hLzmZgE2ISTiS8I0dwq5ljyeyEqsSxzhenN2cV1x37k7uaJJLUmnSSLJLcmnyixSXlB0po6luqWWpr3levAre2zT/tOq0T+kh6YfTJRkxGU2ZhMyEzNN8BX46vytLM2tZVp/ARFAkEGc7Ze/KHhMGCg/lQDmLctpyFVFzc1NkKPpJNJjnmleZ93lp9NKTy+SX8ZfdXG68fNPykXzf/F9WYFZwVnSu1F65buXgKo9VNauh1YmrO9forilcM7zWb23dOtK69HW/FVgUlBZ8WB+zvr1Qo3Bt4dBPfj81FMkUCYsGNjhvqN6I2cjb2LPJetOeTT+KucXXSyxKykq+beZsvv6z5c/lP0u2JG/p2Wq3dd823Db+tv7tbtvrSuVL80uHdgTvaNnJ2Fm888OuJbuuldmUVe8m7RbtFpcHlbft0duzbc+3itSKe5WelU1V6lWbqj7t5e69vc99X2O1RnVJ9df9vP33a/xqWmoNassO4A7kHXh+MPpg9y8Ov9QfUj1Ucuj7Yf5hcV14XVe9fX39EfUjWxvgBlHD6NGFR3uPeR9razRtrGmiN5UcB8dFx1/+mvBr/4nAE50nHU42ntI/VdVMay5ugVqWt4y1praK2+La+k4HnO5sd25vPmN25vBZ7bOV55TObT1POl94XnIh/8J4h6Dj9cWUi0OdSzofXYq9dLcrrKvncuDlq1d8r1zq9ui+cNXl6tlrTtdOX3e43nrD7kbLTdubzb/Z/tbcY9fTcsv+VluvY29737y+87fdbl+8433nyl3W3Rv35t/r64/qvz+wcEB8n3v/xYOMB28f5j2ceLT2MfZx8RO5J2VP1Z/W/m70e5PYTnxu0Hvw5rOIZ4+GOEOv/sj549tw4XPq87IRrZH6F1Yvzo76jva+XPBy+JXg1cTror/J/63qjeGbU3+6/3lzLHZs+K3wreTd5vcq7w9/sPnQOR46/vRj5seJT8WfVT7XfXH40v015uvIxNJv+G/l342+t/8I/PFYkimRCNhC9pQVQNAGJycD8O4wANQ4AGi9qH+QmfbEU4KmffwUgf/E0755SqhzaUS7SSvk1QHAcbQZuAMgg15PWqJIdwBbW0vbP5STbG01nYuCOkvsZ4nkvQYA+HYAvgslkom9Esn3g2ixDwDoyJ724pPCoX8ojXhXjveCvnbzteBf9HcIWQN53PJn6wAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAxppVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6dGlmZj0iaHR0cDovL25zLmFkb2JlLmNvbS90aWZmLzEuMC8iCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPHRpZmY6T3JpZW50YXRpb24+MTwvdGlmZjpPcmllbnRhdGlvbj4KICAgICAgICAgPHRpZmY6WVJlc29sdXRpb24+MTQ0PC90aWZmOllSZXNvbHV0aW9uPgogICAgICAgICA8dGlmZjpSZXNvbHV0aW9uVW5pdD4yPC90aWZmOlJlc29sdXRpb25Vbml0PgogICAgICAgICA8dGlmZjpDb21wcmVzc2lvbj4xPC90aWZmOkNvbXByZXNzaW9uPgogICAgICAgICA8dGlmZjpQaG90b21ldHJpY0ludGVycHJldGF0aW9uPjI8L3RpZmY6UGhvdG9tZXRyaWNJbnRlcnByZXRhdGlvbj4KICAgICAgICAgPHRpZmY6WFJlc29sdXRpb24+MTQ0PC90aWZmOlhSZXNvbHV0aW9uPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+NDYwPC9leGlmOlBpeGVsWERpbWVuc2lvbj4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjUxNjwvZXhpZjpQaXhlbFlEaW1lbnNpb24+CiAgICAgIDwvcmRmOkRlc2NyaXB0aW9uPgogICA8L3JkZjpSREY+CjwveDp4bXBtZXRhPgqnHeq3AABAAElEQVR4Ae2dC3hV1Zn3X0CmPpYQIqNylWvCRYxEtINlAEHxWhBBBWurVaHUMn6tVVFxWnVG8VJpZz6GzyKIlVGrKHi/IsFqFVpJQlFuCSEgl8BYLrnYYYYGvrN2sg4nyTnJuex9ztpr//bzxL3P3mu9631/75H/Wfvy7jbHQouwQAACEIAABCDQIoG2LR7lIAQgAAEIQAACDgEEky8CBCAAAQhAIA4CCGYckGgCAQhAAAIQQDD5DkAAAhCAAATiIIBgxgGJJhCAAAQgAAEEk+8ABCAAAQhAIA4CCGYckGgCAQhAAAIQQDD5DkAAAhCAAATiIIBgxgGJJhCAAAQgAAEEk+8ABCAAAQhAIA4CCGYckGgCAQhAAAIQQDD5DkAAAhCAAATiIIBgxgGJJhCAAAQgAAEEk+8ABCAAAQhAIA4CCGYckGgCAQhAAAIQQDD5DkAgTgJzH39ctpZtjbM1zSAAAdsItOEF0rallHi8IPDiCy/K7Lvvlk45OVJUUuzFENiEAAQMJ8AM0/AE4Z4ZBDZv2uQ4cujgQSkpKTHDKbyAAATSSgDBTCtuBvMrgfXr10t2drbjfumWUr+Ggd8QgEAKBBDMFODRNTgE1oVmlRMnTXICrqmpDk7gRAoBCIQJIJhhFGxAIDqB2tpa50BWhw5yeq9esmb1mugN2QsBCFhNAMG0Or0E5waBsrIyx0z+WWdJ9x495Nixo26YxQYEIOAzAgimzxKGu5klkJWVJTt27MisE4wOAQhkhACCmRHsDOonAvomn1NPPVXycnOlYluFn9zHVwhAwCUCCKZLIDFjLwF9k88pIcFkgQAEgksAwQxu7ok8CQKndeni9PKy4o+6ychL+0mETRcIQCBEAMHkawCBVghs2rjRuTtWNTvttNOc1jW1Na30Su6wEssbb7hBPvxwVXIG6AUBCHhGAMH0DC2GbSFQVVXt3B3rdTxaLIuLKL3nNWvsQyAZAghmMtToEygCR48ef4zkm9/8phN75Z5KVxkglq7ixBgEPCGAYHqCFaO2Eujdp48T2p49u10LEbF0DSWGIOApAQTTU7wYt4HA7z/8UPLy8jwJBbH0BCtGIeAJAQTTE6wYtY2AKovn9oJYuk0UexDwlgCC6S1frFtIQL21ZPeu1E7JIpYWfjEIyXoCJ1gfIQFCwGUCg4cMkZ07dyZtde/evXLrzJnS0t2wDz80R9QfCwQSJVC+nUpUiTKLtz0zzHhJ0S6QBHQBAV2w4DiEY8c3E9wqKy1rUSwTNEdzCEAgTQSYYaYJNMP4k4AuUKALFugojh5NXjBHjhop8+bPd2aZ2l7T9T33zpZp06c33c1nCEAggwSYYWYQPkMHl8Bll1/miGZwCRA5BPxHAMH0X87wOMME1CMm6lGTVBdEM1WC9IdAegkgmOnlzWgWEHDzERNE04IvBCEEhgCCGZhUE2gyBIrWrnW66Qo/ydhorY8SzZdfWS45J+e01pTjEIBABgkgmBmEz9D+IaBryHrlcUFBgbzw4lJE0yvA2IWACwQQTBcgYgICbhDon9sf0XQDJDYg4BEBBNMjsJi1l8A3G8rk6Wc03YxUi2ZWVkc3zWILAhBwgQDPYboAERPBItCvXz8nYP2MptvRK9FUfywQgIBZBJhhmpUPvDGMQHV1jWEe4Q4EIJApAghmpsgzri8IbNywQc4bMcIXvuIkBCDgLQEE01u+WIcABCAAAUsIIJiWJJIwIAABCEDAWwIIprd8se5zAkePHo0ZQeWeypjHOAABCNhHAMG0L6dE5DGBM0Lvw1TLnj2pvUTaYzcxDwEIuEwAwXQZKOYgAAEIQMBOAgimnXklKpcIfPnlDsnKynLJGmYgYCCBQ6vlsQn50q93vkyc/bZsrzPBx/1SsmyhPHbzSOk3YaFsN8GlkA8IpiGJwA0zCVRsq5C83FwzncMrCLhA4Ejxq/LMevW8cY18/vxv5YMvj7hgNTkTdRWr5OlHp8mI3ufIVbfPkQUrdyVnyKNeCKZHYDELAQhAwA8E2p89UW7IV2dRsuTM7/5ALjy9fWbcriuSuTfOky1GzHCjI6A0XnQu7IUABCAQDAKdzpNZr6+XWZmOtt0wmfXh8pAXdbJ/wC0y4vYVkrm5bnQYzDCjc2EvBFolQNm8VhHRAAJJEGgnHXNypF0SPb3ugmB6TRj7VhJQ5fJU2TwWCEDAfQLt+/QXE+8cQDDdzzUWIQABCEDAQgIIpoVJJSQIQAACEHCfAILpPlMsWkKgpKTEieS0Ll1iRHQsxn52QwACNhJAMG3MKjG5SuC0006Lau/oUQQzKhh2JkGgVBZNGBQqHtAnyt81sqhC3S96RLYvvCbK8YY+A++SVY1uK41m8zy5u/BQE//iKRJwWLYXPisLZl0hAyPHqauQVYsflunD8xr8GinTH18RX/EDp+88udspmlAfw8AJd8miworQfbJmLgimmXnBKwhAIFAE8mTa63+Qlx+7Vs6MeAyy/dmz5f3ypTKtj9rZXnpPXyrl616Wey7oEUEn9PzkLc9L0eZHZUxEXxFl8wspWvZPjs32+dfKI6+8KY+M7eT0dYoE/OYumZjbQpGAQyWy3GkzSC646efy2NL14Uc96iqWyo9GXCzT/uVJKdyrlXqXFP7HTLnunhXSVJaPO1wnh0oWynTV98k/y6k/fU1Kt1dI+fa18rvvtZM3Z1whkx8slK+OdzBmC8E0JhU4AgEIBJtAZym45hcyd9bwkDQ2LDmdpVPT5ys6DZNpc38hV3fRrbrKty86S+plUHfU63aS1fZvclCGyx2/DvUp6NxwoFSe/slD8um2ffKV1jrdJbzeI8tv/z+ypOyv4T31GyF7a+fK5O+/L33vfFGKHLHbJCsX/qBB7I/I3qWPy5MlTfvV964rXyzTrpkjhXKVLHp3gfxsbJ+GR0hU/HNk2bu3ygkfrZG9TUY14SOCaUIW8AECEICAQ+BE6TfpahnZoIVHPnpXfr8/ygnKTiNkypV9GphVyFvvb4pxGvOvsv79Qtk36mq5st+JEYzV7PMDWfjYU/L63HHHBTqihUg3mfTUx/Lq3HmybOmPJDynPbxcZj8s8vM3F8isyQUNQn2i9B53p9w3La9ln+o2y9N3zpOSI73k6jm3yZhmvwZE2vW7Tu4N22nkUMY/IJgZTwEO+JFAt27d5PcffuhH1/HZdAKdR8p3r+xV7+WRz+SdD/dF8fgkyb/qKilwhPWI7HrjA1kfRVelbpOseOOgjLxsuOi5ZWNj7aRT334S/Sr98ZbtOp0sOfpj+3Ey5+mfyrBmYneSDDl3qNTL8hHZV7qjyWnZw1K++AF5vDhUt7bHpTJl9CnaYpN1pJ0mhzL8EcHMcAIY3p8Eusa8c9af8eC1SQROkVHXXtowozskH7+9RvY3c69OanZUSKU+nbrrHXnx982v+tWt/0De2jdULj0/tiQ2EsNm4zTs6NFfBuoJarscyenY9Dxx845HvtofKucesdRtkGXPFDnXQE/89rdkSAsm2uacLH8f0dWUTQTTlEzgBwQgAIEGAu3yL5TLe9Sflz2ycoE81ex64D4pfO4D+VuXUxpOp+6QV5/7uImwqtOxH8vfrrxaxnZuQZ3SRN0R711K4U+U3NzuMU4D1zsTl4inye/IYRDMSBpsQwACEDCBQLtBMm587GuUdSX/Kf/+0VC5643/kJu0sDa93umcjhW54toRMW4ISmegR2Tn2iIx62VdicePYCbOjB4BIVC6pdSJ9NRTTw1IxIRpDoGWrlFGzBxPGXJcWI+skeeXlzXc/BN648erC2SxjJRx+ScZENbXUlG20wA/UnMBwUyNH70tJlBTU+1EdwqCaXGWzQ2tXb/L5bujGh4W2VUoK9Y3PKax/135f4uONMwcI4W1Rkqeea3h5p998vu318lp4y+U/MyfjW0C+bCUle0OP8/Z5KDRHxFMo9ODcxCAQHAJnCajLzu34VqffnQkdKfp8pfk01Ez5OaC+pljVGHdv0be+ShHLr9okCGvyfo76dS5YziVhzdvld3hT/7ZQDD9kys8hQAEAkWgnXQ+/5KGZzJDj44sWiCvfbU+dKdpuXy70WMijYX1td99LOUfvisfnzbWkNOxKmnfkNP79zp+o8+mz6Q42vOl0fJ74IAcjPbITLS2Hu9DMD0GjHkIQAACSRPoPFwu1adlQ9col9z9a3lNJsuPJ3aLMBkS1okzGm7+CVXZeeWXcvviTTLytu9LgTGnYyPFP+T6kQ9l7qOFTZ7TjAgpcvMvB+TQ0cgdmdtGMDPHnpEhAAEItEKgm1zxT1Mbnsmskc9XbpCuN1zR/Lpk5F21R8rl89JBLT572cqg3hzufIn8OFzBR5XP+xe5e1l58wpFdeWy/OEl8rn2ou6gHKw2Y4qJYOqksIZAAgT0K7/0K8AS6EpTCCREIPKZTGk/XL47KTfKdcnIm39CZdpHXSKj43z2su5Q6JSn9qh0qzgvRtGf9XrXVtl8uOFDvALW7FTqSVIw436ZkZ/VYGiXrLj9Spk86wUpOVQviHUVK+RXP/yxPN9pqAzWYx9ZIXdePkMemTVJxj5a1Fxgdbs0rBHMNEBmCPsIxHrll32RElHGCYRnj+2lx7QZckUMITx+80+nFkrhNYkmNJt77Yk3jz8fefhTefH1prO+/VK09B3ZrLuqU8OL/tT8dGrI1hsvfCpaV2XXm7Lg1Sa2Op0ns5YsiBDN0Kx56T1y1dD+zuvB8sbMlGWd75BFt+Q3+1HQduCtsviOYc32a7fSsUYw00GZMSAAAQgkTSA0e7xobOi0bJ9W7nptuPmn/blxnI49JKtmnSf9+l0od74fWU5AzfoulLze6r2ZXzW8f/McueaJkojHQEIi98R3ZVjvQTJxoXpWOR5bES/7UqL5+ip5ee4dcnV4thmaFedfI7PmvihvPTauodBC6LVl19whv3xlrZSvWSSzbhojvTN8TbbNsdCSdB7pCAGLCSxauFAefmiOfLJmTbMoN3zxhfxw2jR5+ZXlUlBQ0Ow4OyAAAfsIMMO0L6dEBAEIQAACHhBAMD2Aikk7CKxZvUaGnHmmHcEQBQQgkDIBBDNlhBiwmUBWx+PVSWyOk9ggAIHWCSCYrTOiBQQgAAEIQEAQTL4EEIAABCAAgTgIIJhxQKIJBCAAAQhAAMHkOwABCEAAAhCIgwCCGQckmgSTwLFjhlR8DiZ+ooaAcQQQTONSgkOmEGippMepDS+VLt2iKp2wQAACQSCAYAYhy8ToOoFTGgSzpqbaddsYhAAEzCSAYJqZF7yCAAQgAAHDCCCYhiUEdyAAAQhAwEwCCKaZecErCEAAAhAwjACCaVhCcAcCEIAABMwkgGCamRe8MoDAl1/ukKws/XZ4AxzCBQhAIKMEEMyM4mdwkwlUbKuQvNxck13ENwhAII0EEMw0wmYoCEAAAhDwLwEE07+5w/MAEHjgvvsDECUhQsAfBBBMf+QJLwNGoLa2VpRYLnnmmYBFTrgQMJfACea6hmcQCCYBJZY33nCDFBcVBxMAUUPAUALMMA1NDG4FkwBiGcy8E7U/CCCY/sgTXgaAAGIZgCQToq8JIJi+Th/O20IAsbQlk8RhMwEE0+bsEpsvCCCWvkgTTkJAEEy+BBBIksCQM8+UTRs3Jtm7vhtimRI+OkMgrQS4SzatuBnMJgJZHTtKVVVq78OM527Yfr372ISNWNJEoHx7RZpGCs4wzDCDk2siNZDAjTfdbKBXuAQBCEQjwAwzGhX2QSBNBC67/LLQSPPl1pkzY47ITCEmGg5AIK0EmGGmFTeDQaA5ASWa8+bPb36APRCAgFEEEEyj0oEzQSWAaAY188TtJwIIpp+yha9WE0A0rU4vwVlAAMG0IImEYA8BJZq/XbJEck7OsScoIoGAJQQQTEsSSRjuElDPR2ZqGTlqpLzw4lJEM1MJYFwIxCCAYMYAw+5gEygrK3MA5J91VkZA9M/tj2hmhDyDQiA2AQQzNhuOQKBVAseOHWu1TbINtGgm259+EICAuwQQTHd5Yi1gBLwUTIVSiSYLBCBgBgEE04w84AUEIAABCBhOAME0PEG4BwEIQAACZhBAMM3IA15AAAIQgIDhBBBMwxOEexCAAAQgYAYBBNOMPOAFBCAAAQgYTgDBNDxBuAcBCEAAAmYQQDDNyANeQAACEICA4QQQTMMThHsQgAAEIGAGAQTTjDzgBQQgAAEIGE4AwTQ8QbgHAQhAAAJmEEAwzcgDXkAAAhCAgOEETjDcP9xziYB6XZV+A0dTk0Vr1zbd1eLnYeecE/V4bm6udOjQIeoxdkIAAhDwOwEE06cZ3Lt3r1RWVjrea8Grrq6RjRs2OPuqqg5JcVFxRqM7e9jZkp3dyfFh8BlnSMeOWc62Fly/C2y3bt1CjBP7sZHRhDA4BCCQEgEEMyV83nYuKSmR2ppa2bJls+zetVt27twpO3Zsl23l26IOnHNyjgwdWuAcO/300+XiSy4Jt8vK6ih5A/LCnyM3Cgrq+0Tui7Ud70w1UryVrfnz5sUyKX379ZVevXqLFtUBAwZK165djX9TR9cuXaRiW0XMuDgAAQjYRQDBNCCfShhLt5TK7t27nRniunUlcvDAwUaeaTH8x38cKVOmTpVIAUxE8BoZTeKDOuUaa7xY+yOHiTYzXrN6jdMkmqhqMR1+3nDp1q275OXlGS+kkfGyDQEI2EMAwUxzLrU4/umPa+TLL79sdtp0zNixMn78BOneo7v4ZaaVCMIuoVmZ+lOLFthp06eHTegZbOWeStmzZ7coMVWz6lWFheE2akNxUjPSgQMHIqKNyPABAhDwigCC6RXZkF31j39JcYl89tlnsvrTTxqJo54x3nPvbCuFMVmsegYbTUzVjw0lpJs3b3Zm4pEzUs1TzUTVNVLdP1k/6AcBCECgKQEEsymRFD63JJDqBpiZt94q5557ruTm5YZnWSkMF7iuSgTV32WXXxaOfWvZVikqKpLNmzbJH/7wcaOZqJqFjrvoIhk2bBinccPE2IAABJIlgGAmS66hn7om9/sPfy8r3n+/0T/WSiDV7JHZToqAW+neP7d/IzFU+VB3B3/2pz85Ajr77rsdC2oGqk51j73gAik4u4DHX1rhymEIQKA5AQSzOZNW96hZzeuvvy7vvP1W+I5VdXPK9TfcwD/IrdLztoG6PqpmoHoWqn/QqGvGS555xvlTHky8cqJccOE4GTV6FOLpbUqwDgFrCCCYcaZS/cP75htvyIsvvBAWST2LPP/8MY1mOXGapFkaCCgBnTJ1ivM399e/lo8/+lgKV66UN954XV595VXHAy2eWmTT4BZDQAACPiSAYLaStLffeluWL1sWPt2qZpJzHnlERp8/muuQrbAz8fDIUSNF/d33wP3NxPMXP68/bXvd975nouv4BAEIZJgAghklAWo2+fxzz4f+nnWeh1TXv9QNOxMmTGAmGYWXX3dFiqf6YbTygxXh07axijz4NVb8hgAEUieAYEYwVI8tvP7qa+HrXOouy0mTJ4evh0U0ZdMyAvq655133eWcen/mt7+1LELCgQAEUiWAYIYIKqGcP+8/wqdd1c076rScugOTJVgE1DVPVUhB3d181ZWTnODbtm0rx44dc/6CRYNoIQCBSAKBFsxIoVSnXdVjIN8ZP55rk5HfELbl6NGjDoU2bdo4ayWeLBCAQPAIBFIwVYGBub98PHzqVQnl1Guv5fGC4H3/E4pYC6WacWoRTcgAjSEAAV8TCJxgvvjCi/LLxx51buZRp15n3PIjZpS+/gqn33ktlm3a1s841XO5nL5Pfx4YEQLpJhAYwVR3vv7z7Hud65Tq+cmFTz1FvdF0f9ssG68m9P5RtVw8bpxzF/UPZ/yQsxSW5ZhwIBBJoG3kB1u31SMD37nsMkcs1enXl0LPVVKc29Zspy8uVSheL6oQ/HXXflfUbJMFAhCwk4D1gvnAfffLrTNnSp8+feS9FSucOyDtTCVRZZrAhi++kEkTJ4r6gcYCAQjYR8BawVQ39lwdeoZS1Q9V1yqfDq25zmTfF9ikiNRNQV9//bXzA+1Xc39lkmv4AgEIuEDAymuYSixvDImkemuFKmOnaomyQCCdBNQp2v37/yIPzZmTzmEZCwIQ8JCAdYIZKZbz5s+nSo+HXx6bTRetXeuEd+qppyYd5gvP/87pi2gmjZCOEDCKgFWnZBFLo75bVjhzSgqCqQAo0VTX0VkgAAH/E7Bqhnnfz3/unIZlZun/L6ZJEaibedb/+c9hl04Llc/r27dv+HNrG+o6+rnf+hZnO1oDxXEIGE7AGsFUBQnU+w3VYyO819Dwb50P3Kuprna8HDF8eExvO3XqFPNY0wPqTu28vBXceNYUDJ8h4CMCbUJ39vm+MKYqSqCesxw6tEAWLX7KR/hx1UQC6rGQWXfcIf/93//tmnuqDu0ZQ4bIa6EXV7NAAAL+JGDFNcxfPlpf6u7BOQ/5Mwt4bQwB/dxuU7E86aSTJG/gQOl5eq+kfFW/S7/4/HOe0UyKHp0gYAYB388wVWUVVZpMnYpVr2VigUCyBNTMUp06jVzOKiiQMWMvlFNPOy28+38OH5YtW7bIB++9K3/5y1fh/fFsdOvWTT7+9JN4mtIGAhAwjIDvBVPNCNRNFX/+4nPqeBr25fKTO/q0/sEDB8NuT73u+5J/1lnhz003lHC+9+7bsubTT5seavHzb5cskZGjRrbYhoMQgIB5BHx/SvaN0DUhVcknsq6neZjxyHQCC574jfMGG+1na2Kp2n3jxBNlwsRJzqla3S+edeHKlfE0ow0EIGAYAV8LpnoBtJoRjL3gAsOw4o7fCKgfXnpRp2Fbmlnqdnp95eSr9WZc61eWL4+rHY0gAAGzCPhaMEu3lDo0c/NyzaKKN74ioH94aafP+/Y/6s241tnZ2TL829+Oq61qVFNTI+oUsN8Wdb+AKg7CAoGgEvC1YNbU1D8r1yX0IDkLBJIloH946f6n90r8Ttjeffrp7nGtKysr42pnUqNHHn5YXvhdfbk/k/zCFwiki4CvBTNdkBjHbgL6h5eKUj06ksySSBGDZOxnuo+aha8qLJTfPPEEs8xMJ4PxM0YAwcwYegY2kcCBv+w30a2M+zR/3n84Pqh7Bp5c8GTG/cEBCGSCAIKZCeqMaRSBAQOOzyrVc5XqcZFEl+3bKxLt4pv2enapHVavLvPjNVjtP2sIJEvA14Kp/6FTNyOwQCBZAk1vGlNFCRJd1v7xjwl1KQjdieuXRc8uI/1Vj+GwQCBoBHwtmPofuqKioqDljXhdJKBuGjt72Nlhi6+/siyhWeaf/rgmoYo/Q848MzyW6RtNZ5faX1UshFmmpsE6KAR8LZj6H7qXX1oalHwRp0cEbrzp5rDlv/71r7J40cK4RPO/9u2T9995O9w3no3xE8bH08yINtFml9oxZpmaBOugEPC1YKokqX/oiouKRf0SZoFAsgTUK+HGjB0b7r7zyx2OaFZVVYX3Nd1QM8snn5gvSmATWb4z3h+CGWt2qWNllqlJsA4KAd/XklUPUp8/ahSv9grKN9bDOKPVk1XDqco/ffr2ky5dujqjqxt81DXLRAuvq85Tv3utPDRnjmPH9P9MC/0YVY+StLSospT3PXB/S004BgFrCPheMFUm1MujZ999t8x55BGZMnWKNckhkPQTUDeQ3fKjGbKtfJsng3+yZnVIeM0vtKFml1ddOSkuBn6JKa5gaASBFgj4/pSsik2JpLpp45ePPSrcMdtCtjnUKoH+uf3llddeC32fhrXaNtEG6hV0fhBLFVdL1y6bxs21zKZE+GwrASsEUyXn4UcedXJ0z913UYnE1m9rmuJSb765+JKLndFuuPFGaXpXq6ode9Ell4TaXBK3R2cNHeqb97W2du2yadBcy2xKhM+2ErBGMNXM4F/+9UHnBqAbQ9dVKBJt61c2vXH9cMYMWbBwoXyyZk347+333pP77r9fcnPjK/rfsWNH+X+/eSK9jqcwWiKzSz0Ms0xNgrXNBKwRTJUkdafjvPnzEU2bv7E+i+2b3/ymvLRsmW9OxSY6u9TpYJapSbC2mYBVgqkSpURT3bmnHjVhpmnzV9fb2HQVqe0VyZe8U2K5/NVXRZ398MuSzOxSx8YsU5NgbSsB6wRTJUrd5h450+RGIFu/vt7F1SGrg2P866+/TmoQdRrWb2KZ7OxSA2KWqUmwtpWAlYKpkqVPz1aEZghTp1wjb7+VWDUWWxNOXN4TGDR4sLzz/nu+mlkqKs8uWZIyHGaZKSPEgMEETjDYt5RdU6KZl5fnPFd368yZsvKDifLAv/6rqLsgWSDgBQFVmOCe2bN9+R2b++tfi/qLtfTr3cc5VG7xm1lixc5+CCgC1s4wdXr1c3Xquuarr7zqVAX6+KOP9WHWEEiawP/87/+G+6ofYeoygKriww+yMBY2IGAVAesFU2VL/QOmrmv+tuGU0w+uv15U2S/etmDVdzljwYwMlWZ874MVzmWAjDnBwBCAgOcEAiGYmuLIUSPlw48+kpm33urUyBwx/Dx54L77eWZTA2IdN4G2bdvKN/7u75z2v13yjG8eG4k7QBpCAALNCARKMFX0arb5s9t/FnoIfbXzdgp1Z58q3r4o9HA6xQ6afT/Y0YRAmzZtRP0dPXq0yRE+QgACthMInGDqhKqanosWPyUvv7LcedPJww/NcYRTzTg5VaspsdYEtFAeO3ZM1B8LBCAQPAKBFUyd6oLQq5sihVPNOPWpWvVcGkswCXz6yadO4G1Cp16VWCKUwfweEDUEIglY/VhJZKCtbWvhVEUOnnv2WVHCqf769usbKpr9Q7n8O5dz92NrEH1+XJ1ZeP6550N/z8rBAwedaI6FTr0yo/R5YnEfAi4RCPwMsylH9RiKuqP2z198Lup1TGpR79o8a8iZcvtttwmPpDQl5u/P6rq1ep/q1ZMnO2cW5s+b55yi/9kdd/g7MLyHAARcJ8AMMwZSdXPQtOnTnT91avb1V1+TN9543XmWM+fkHBk/foKMveACUXfesviLgBLJj37/UaiQxQonn8p7dSZB/UD6zvjxzh2vKue/etxfceEtBCDgLQEEMw6+6nSt+rv9zjvC/9DqU7ZKPEePHi0XXDhORo0exWnbOHhmook61V5UVCQvv7TUKcyvfFC5UwUtrvve93xXxi4TDBkTAkEngGAm8A1Qs05Vbk/9qRJ7apby2Z/+FJ55KlNnDzvbebHwsHPOcUQ2AfM0dZGAmkWWFJdI4cqV8oc/fCzbyrc51tVMUj2HO2bsGPLjIm9MQSAIBBDMJLMcKZ7qmmf9mx5WyepPPxH1iIpexowdK8PPGy4IqCbizVrdsFNWWiafffaZkwP1eje9qByoG7eGDRvGTFJDYQ0BCCRMAMFMGFn0Dvq0rYSKIujZjf7HO1JA1Qz0vG+PkIEDBzqF4f30rsTokWdmr/qBUrR2rWzauFHWr18fnkEqb5RAMovMTF4YFQI2E0AwPciumn2qm4GcG4IiBHTLls2yZvUaUXdiRi5KRIeE7sLt3qO7MxPt2rUrpdYaAKlrj5WVlaLYRRNHfQ15ytSpzOIjv1RsQwACrhNAMF1H2txgpICqO2/VooSgtLRU9uzZ7YiougNXP/unLaiZUnZ2R1HvV+zWrbt07dZVbBRTxaKmtkZKt5RKTU21w6Oq6lD45hzNQ11/7NWrtyhxHDBgoOTm5fLDQsNhDQEIeE4AwfQccfQB1KlYfTpWi6g6lVtWVuYIx+7du2Xjhg3O6Ub1WrKmixYPtV9dI1WLFlW1nUlhVdcT1Y+EvZV7HSFU/mgxVNtqlq2WdetKmv1IUPt1bOoxj6ysjpI3IE9yc3O5A1nBYYEABDJGAMHMGPrmAyuRCV8LbXJYvbxXPQIxcNAgZxamTk9WVVXLjh3bnTevNGne7KM67Zud3anRfj17bbQzjg/V1TWOmDdtqnzRd6M2PRb5WfuinmVVp6G1KGZS5CP9YxsCEIBANAIIZjQqhu3TxeCVWE6ZOiWmd/rUpmoQOaNTn/WsTm3rRd0sE232qo+3tFani5su+fn5zulSdZOTOj7uoouc2aFql9UhKzyjbtrPr5+LioulT98+fnUfvyEAgQQJIJgJAstEc3XTi1rUqcmWFn2KV7VRM9XIRZ/2jdzn1faLL7zgXHttSdy9Gjvddk8/vVe6h2Q8CEAgQwSoJZsh8IkMW1tTm0jzjLdVN+ao08UsEIAABGwigGD6IJvqkQq1NJ01muq6ujaqrmeyQAACELCJAIJpUzYNiUU9BhPPzT+GuIsbEIAABOIigGDGhSmzjdQNO+rOUr8t6jEZFghAAAK2EEAwfZLJpo+EmOy2qpurFvVMKQsEIAABWwggmD7IpHrAv2fPnj7wFBchAAEI2EsAwfRBblXJPPWAv18WVZVHLao4OgsEIAABWwggmIZnUhctUNVw/LKoikUsEIAABGwjgGAantF4ixaYFoaqB6vK97FAAAIQsIUAgml4Jv1WtEDjpHiBJsEaAhCwhQCCaXgmddECfV3QcHfD7lG8IIyCDQhAwBICCKZPEum364IUL/DJFws3IQCBuAkgmHGjykxDVbRAXQ/062J78YK2bflfyK/fTfyGQKIE+L89UWIZaK+uB/pt8XvxAvVuTrXs27fPb+jxFwIQ8IgAgukRWLfMqqIF6nogS3oJdOnSxRlw39696R2Y0SAAAWMJIJjGpqbeMVW0QF0P9NuiZ2gUL/Bb5vAXAhCIRQDBjEXGgP26aIEBriTsgp6hJdyRDhCAAAQMJYBgGpoY5ZYuWqCvBxrsalTXck7OoXhBVDLshAAE/EgAwfRj1nzi89ChBVJVVe0Tb3ETAhCAQMsEEMyW+WT0qL7+57eiBZHQduzYHvmRbQhAAAK+JYBg+iB1fitaoJEOP2+4bCvfpj+yhgAEIOBrAgimwelTxcv9XLTAYLS4BgEIQCBhAghmwsjS10Fd//Nj0QJNaMCAgc5mSUmJ3mXVeuMXX/Bi77gyeli2Fz4rixYuDP3Nk7sn5MvAm5fL/si+h0rkpVlXyMDeeTJi1go5FHmMbQgYQuAEQ/zAjSgE1PW//Pz8KEf8satDlt3vxayqqvLVi70z8q2pK5LHRl8rC3YdiRi+vfS4pZd0athTV7FUZl77z7Jib32bva9/ICUPjZMx7SO6sAkBAwgwwzQgCbFcUNf//Fi0QMejixeUbinVu1gHjUC7YTLrD6VSvr1UVt57bkP0feTyiwZJu9CnpmLpNPj7k6UT/zIF7Zvii3j5WhqaJhuKluviBTU1PFpi6NcsjW4dkYMHqurH6zFWxuWfJHJotcz9yVNSd/PvpKhssVx9ojocmn2Ov1DylZqyQMAwAgimYQnR7pSVlTmbfi1aoONQxQt279qtP7IOKoG6TbLijQon+vYDcuX0dl/JqjkPyacj7pdfTh8mndoPkYsn9BLpcrH85JoznNlnUFERt7kEuIZpbm6s8EwVL9i5c6cVsRBECgS+LJZPneuYnWTkZWdJzbI58u/yE/ntXec1XMs8RcY89qGUpzAEXSHgNQFmmF4TTtK+DUULdOhVVdzzqFkEc10n+4s/k80q+PbnykU9PpC7n+shP589NnzjTzC5ELXfCCCYhmfMr0ULNFZVvKC4qFh/ZB1IAvvk929/Js49sKd9UyqWlcqFv5wpwzpxoTKQXwcfB41gGpo8ihYYmhjcSpzA/jXyzkf1Zxna/+1zKcudLjf2c+7wSdwWPSCQQQIIZgbhtzS034sW6Nj8XrygprZWh8I6SQJ1X5ZJacNjmEdOGCc/vmkgN/UkyZJumSWAYGaWf8zRVdGC7OyOMY/75YCfixeMPv98KS3lGdLUvmt/lfXvF8oux0gnGXvb96WAM7GpIaV3xgggmBlD3/LAfi9aoKOjeIEmEdB1xOMk0mOq/Hhit4CCIGwbCCCYBmbRhqIFGivFCzSJgK4P7ZCyfep8LAUJAvoNsCpsBNPAdNpStECjpXiBJhG0dehxkg/flY+d65fHy+EFjQLx2kMAwbQnl8ZGQvECY1PjsWMRj5OcOFTOHRIqh8cCAR8TQDANTJ5NRQs0XooXaBIBWtdVytYtXzsBtx/xD5LP20cClHw7Q6U0nsF59XvRAo1WFS94+KE5+qMV6w2hd2GqRT82Y0VQbgfR8KaSWW7bxR4EMkSAGWaGwLc0LEULWqKTvmNt27ZpdTA/PzbTanA0gAAEGhFAMBvhMOODLUULNE09CyspKdG7fLJuXTB9EghuQgACLhBAMF2A6LYJVbTApoVZmE3ZJBYIBJcAgmlg7lXRAnXdz5Ylq0OWE0rpFqrm2JJT4oBAEAkgmIZl3aaiBRpt/9z+zmZNTbXexRoCEICA7wggmIalTBct0Nf9DHMvJXd279qdUn86QwACEMgkAQQzk/RbGNu2635jxo6VnTt3thCxeYd69uwpGxseHzHPOzyCAATSTQDBTDfxVsbTRQt00fJWmvvqsN+KF3Tv0V2qqqp8xRhnIQAB7wggmN6xTcmyLlqekhGDOg8+4wwpLio2yCNcgQAEIJAYAQQzMV6et1ZFC1SxctuWjh3r75S1LS7igQAEgkMAwTQs16pogSpWbtvSrVt3J6StZVttC414IACBgBBAMA1LtN+u88WLr2u3rk7TmtqaeLsY3a68vNzxz8ZrzUaDxzkIZJAAgplB+NGGVtf5bCpaoGPUxQsq91TqXb5ef11b6/hv27VmXycF5yHgMQEE02PAmK8noIsX7NnDs5h8JyAAAX8SQDANypsuTm5j0QKNubrajlOyOh7WEIBAcAggmAbm2raiBRqxKl6wccMG/ZE1BCAAAV8RQDANSpcuTs6NJAYlBVcgAAEINBBAMA36Kuji5LbeSKKKF6wqLDSIeMuu6EdhtldUtNyQoxCAQCAIIJgGpVkVJ7exaIFG7LfiBfpRmK+//lqHwBoCEAgwAQTToOSr4uQ2Fi3QiPWMjeIFmghrCEDATwQQTIOyZWvRAo1Yz9hsKV6g42INAQgEgwCCaVCebS1aoBHbVLygqLhYhhbYV8JQ54o1BCDQnACC2ZwJezwiYFvxguzsbI9IYRYCEDCRAIJpSFaCULRAo6Z4gSbBGgIQ8BMBBNOwbNlatEBjpniBJsEaAhDwGwEE05CMUbTAkEQk4EabNgk0pikEIOB7AgimISm0vWiBxuyn4gW64pJ+lZeOQa/btOF/H82CNQSCQID/4w3Jsu1FCzRmPxUv0BWX9Ku8dAysIQCBYBJAMA3Ju+1FCzTmrKyOzibFCzQR1hCAgF8IIJiGZMr2ogUac96APGfT78ULdu/aJdnZ9eKvY2MNAQjYTQDBNCS/thctaIq5ck9l012++vzljh0yaPBgX/mMsxCAQGoEEMzU+NE7QQIFDdVx9uzZnWBPmkMAAhDILAEEM7P8ndGDVLRA46Z4gSbBGgIQ8AsBBNOgTNletECjPnvY2bJxwwb90fh1TW2t8T7iIAQg4D0BBNN7xq2OoIsW6OLkrXbweYPs7E6+iUAVWC8tLfWNvzgKAQh4RwDB9I5t3JZ10QJdnDzujj5t2LNnT1lVWOgL7ymw7os04SQE0kIAwUwL5pYHUUULgrR079Hd1+F+/fXXvvYf5yEAgeQIIJjJcXO1lypaoIqSB2XRxQv27t1rfMhtohSM3V5R4fg97JxzjPcfByEAAfcIIJjusUzaUlCKFmhAunhBZaX5z2JGE0wdB2sIQCBYBBBMA/KtihaoouRBW2pruPs0aDknXgj4mQCCaUj2/FSUPFVkunjBli2bUzXleX9V/k6VwWOBAAQggGBm+DugixZ06+bvG2EyjNGz4VX5O1UGjwUCEIAAgmnId6Brt66GeJIeN1TxgjWr16RnMJdHqeUuWZeJYg4C/iCAYGY4T7oIeVCKFmjcfipeoH3W621btzqb+tSy3s8aAhCwmwCCmeH86iLkQSlaoHGr4gXr1pXoj6whAAEIGE8AwcxwioJahFwVLzh44GCG6TM8BCAAgfgJIJjxs/KkpSpCHqSiBRqiX4oX6JuxdLEC7T9rCEAgeAQQzODl3IiI/VK8QN+MRTk8I742OAGBjBJAMDOKX5wi5EEsWqCx+7F4QWlZmfTp20eHwBoCEAgIAQTTgEQHqWiBxq3vMPVD8QLts17X1NTI6af30h9ZQwACASGAYGYw0VvL6h9P0NfJMugKQydIIEpN9gQt0BwCEPAbAQQzgxmrqa1xRtfXyTLoSkaG9kPxgq5d6wtKrP/znxsxatOG/3UaAeEDBAJA4IQAxGhsiEEtWqAT4ofiBV26dNHuhtc11dVy4imnhD/bsrFo4cK4qi9Nu+nmmCGPu+gimTJ1SszjHICAnwkgmBnMXlCLFmjkqnjBG2+8rj/6Zv3F55/LPffO9o2/8Tqq3u/58ENzWm2+qrAwZpsH5zwU8xgHIOB3ApxXymAGg1q0QCOneIEmYcZa3YiVyjPB199wg0SbkZsRHV5AIHUCCGbqDJO2ENSiBU2B7d27t+kuoz7n5OSIepQkCMvMW/8p6TBn3PKjpPvSEQJ+IIBg+iFLlvqoTgGqpbKy0ugI8886S9SjJGqxvYBBsrNMZpdGf4VxziUCCKZLIJMxo64FBblogWZmevGCNhHPkOgSeVrsdQw2rSdNnpxwOMwuE0ZGBx8SQDAznLQgFi3QyHNzc51N04sXRAqm9t3m9WWXXyZ9+/WNO0Rml3GjoqHPCSCYGUogRQtEOnTokCH6iQ2rzgKs/uSTxDr5vPVtP7s97giYXcaNioY+J4BgZiiBQS9aoLGrmcya1Wv0RyPXkWcBysvLHR91QQMjHXbBqXhnmcwuXYCNCd8QQDAzlKqgFy3Q2Hv16q03fbH+urbW8TMIj0/EM8tkdumLry1OukQAwXQJZKJmgl60QPPKzu4oO3Zs1x+NXA8YMNDxa8MXXxjpn1dOtTbLZHbpFXnsmkoAwcxQZoJetEBjHzR4sGwr36Y/GrnukHX8WmtRcbEMDT3gH5SlpVkms8ugfAuIUxNAMDWJNK9V0QJVfJylnkBtw6lOE3lkdchy3Nq3b5+zzsnpZKKbnvgUa5bJ7NIT3Bg1nACCmcEE+aH4uNd49POMZQZX0umf29/BsC9UkUjdLduz5+leYzHKfrRZJrNLo1KEM2kigGCmCXTTYVTRAlV8nMUfBCLL46kauEFams4ymV0GKfvEGkkAwYykkebtoP3DGw2vLl5QtHZttMPG7Dtr6FB5/913HX/0TUDGOJcGRyJnmcwu0wCcIYwkgGBmIC26aEFWVscMjG7WkH4pXnDGkCFhcLl59RWKwjsCsKFmmT169JAJV1zBG0kCkG9CjE6A92FG5+LpXl20IG9Anqfj+MW4Kl6waeNGo92dMGGCPPef/ynfmTA+sILx4Jw5EsQfC0Z/MXEurQQQzLTirh9MFy3IwNBGDqmKF1RVVRvpm3ZK3fjz1rvvBFYsFYeRo0ZqHKwhEEgCnJLNQNp10QL1KiUWET8UL1B5CkJ1H76PEIBAbAIIZmw2HEkTAT8UL0gTCoaBAAQMJoBgZiA5qtg4RQuagze5eEFzb9kDAQgEjQCCmaGMU7TgOHg/FC847i1bEIBAUAkgmBnI/Lp1JRQtyAB3hoQABCCQCgEEMxV6SfY9eOCgULTgODy/FC847nH91qKFC+VXc38l+rnapsf5DAEI2EUAwUxzPveG6pGqhaIFx8H7pXjBcY/rt1TFn/nz5snF48bJuAsuQDybAuIzBCwjgGCmOaGVlZXOiBQtaAzeD8ULGntc/1xizsk5zm71ijLEsykhPkPALgIIZprzWVtTm+YR/TGcH4oXRCM5fvyEZrsRz2ZI2AEBKwggmGlO45Ytm50RKVrQGLxfihc09lpkbOhUbEsL4tkSHY5BwF8EEEx/5ctab/1avECVi9OnZVtLTlPxfOC+++Xjjz5urRvHIQABQwggmGlOBEULWgbux+IF0U7LthyliBLPJc88Iz+4/nqZdtPNrTXnOAQgYAABBDMDSaBoQXPo+h2TZWVlzQ8avqe107Itua8qPv3b//33lppwDAIQMIQAgpnmRFC0IDrwDlkdoh/wwd5ETstGhqPE8unQLNOvj9VExsI2BIJAAMFMc5YpWhAdeNeuXZ0DRWvXRm9g+N5ET8siloYnFPcgEIUAghkFile7KFoQm6zfX52VyGlZxDL294AjEDCZAIKZxuxQtKBl2Opu000bN7bcyNCj8Z6WRSwNTSBuQSAOAghmHJDcakLRgpZJDh1aIFVV1S03Mvjo6NGjW/Wuru5oq21oAAEImEkAwUxjXiha0DrsqqpDrTcytMUFF46L6ZmaWf5y7lz587p1cuMNN4gfH5+JGRwHIBAQAghmQBLthzCHnzdciouK/eBqVB9HjR4Vdb8+DTtp8iSZN3++EyOiGRUVOyFgNAEEM43poWhBGmFnYCj1eMjEKyc2GlmLpX505LLLL0M0GxHiAwT8QwDBTHOuKFoQG7guXlBSUhK7keFHIk/LNhVL7TqiqUmwhoC/CCCYacwXRQtahu3n4gU6Mn1aNpZY6naIpibBGgL+IYBgpjFXFC1oGbYuXlC6pbTlhgYfVade77l3dlwVfBBNgxOJaxCIQgDBjALFi126aIEXtm2xqYsX1NT499ESlYtp06fHXe4O0bTl20scQSCAYKYpy7powbBzzknTiP4cRhUv2L1rtz+dT9JrRDNJcHSDQJoJIJhpAk7RgvhAq+IFO3fujK+xRa0QTYuSSSjWEkAw05RaXbQgNzc3TSP6dxg/Fy9IhTqimQo9+kLAewIIpveMG42gn8drtJMPYQJ+L14QDiTJDUQzSXB0g0AaCCCYaYCshlBFC/r265um0RjGzwQQTT9nD99tJoBgpjG7vXr1TuNo/hzKhuIFbpBHNN2giA0IuEsAwXSXZ0xrqmhBdnbHmMc5UE/AhuIFbuUS0XSLJHYg4A4BBNMdjq1aUUULBg0e3Gq7oDewoXiBmzlENN2kiS0IpEYAwUyNX1y9eZVTXJicRrYUL4g/4tZbIpqtM6IFBNJBAMFMA+WysjJnFIoWxAc7iMULWiODaLZGiOMQ8J4Aguk9Y0ZIkEBQixe0hgnRbI0QxyHgLQEE01u+jvWitWudNUUL4ocd1OIFrRFCNFsjxHEIeEcAwfSObTPLFC1ohiTqjqAXL4gKJWInohkBg00IpJEAgpkG2Js2bqRoQRo4B2kIRDNI2SZWUwggmGnIRFVVtVC0IH7Q3bp1dxqXlJTE3ymALRHNACadkDNKAMFMA/4dO7ZTtCABzl27dU2gdbCbIprBzj/Rp5cAgpkG3tvKt1G0IAHOWR2ynNalW0oT6BXcpohmcHNP5OklgGB6zJuiBYkD7p/b3+lUU1OdeOeA9kA0A5p4wk4rAQTTY9wULUge8O5du5PvHMCeiGYAk07IaSWAYKYVN4PFS2DM2LGyc+fOeJvTroEAoslXAQLeEUAwvWPrWKZogceAMd+MAKLZDAk7IOAKAQTTFYytG6FoQeuMIlsMPuMMWVVYGLmL7QQIIJoJwKIpBOIkgGDGCSrZZhQtSI5cx471d8om15teigCiyfcAAu4SQDDd5dnMGkULmiGJa4cuXrC1bGtc7WkUnQCiGZ0LeyGQDAEEMxlqCfShaEECsCKa6uIFNbU1EXvZTIYAopkMNfpAoDkBBLM5E1f3ULQgOZy6eEHlnsrkDNCrEQFEsxEOPkAgKQIIZlLY4utE0YL4OEVrpYsX7NnDs5jR+CSzD9FMhhp9IHCcAIJ5nIXrWxQtSB1pdTWnZFOneNwConmcBVsQSJQAgpkoMdqnjYAqXrBxw4a0jReUgRDNoGSaON0mgGC6TTTCHkULImCwaRQBRNOodOCMTwggmGlIFEULkoNM8YLkuMXbC9GMlxTtIFBPAMH08JugihbknJzj4Qh2m6Z4gff5RTS9Z8wI9hBAMD3MpSpaMHRogYcj2G2a4gXpyS+imR7OjOJ/AgimhzlURQtYkidA8YLk2SXaE9FMlBjtg0gAwfQw66powfDzhns4gt2mKV6Q3vwimunlzWj+I4BgepQzihakDpbiBakzTNQCopkoMdoHiQCC6VG2ddGCAQMGejRCcMxSvCC9uUY008ub0fxDAMH0OFcdsjp4PILd5ilekJn8IpqZ4c6oZhNAMD3KT+mWUsdy165dPRoBsxDwlgCi6S1frPuPAILpUc5qaqody126dPFohGCYpXhBZvOMaGaWP6ObRQDB9Cgfu3ftpmiBC2wpXuACxBRNIJopAqS7NQQQTI9SuXPnTooWuMA2K6ujY2Vr2VYXrGEiWQKIZrLk6GcTAQTTo2xWVR3yyHKwzOYNyHMCrqnlNV+ZzjyimekMMH6mCSCYHmWguKiYogUusq3cU+miNUwlSwDRTJYc/WwggGDakEWLYygoqK/Fu2fPbouj9FdoiKa/8oW37hFAMN1jGbZUUlLibFO0IIwk5Q2KF6SM0FUDiKarODHmEwIIpoeJomiBO3DPHna2bNywwR1jWHGNAKLpGkoM+YQAgulBoiha4C7U7OxO7hrEmmsEEE3XUGLIBwQQTA+SRNECd6H27NlT1q2rP83trmWsuUEA0XSDIjb8QADB9CBLFC1wF2r3Ht3l4IGD7hrFmqsEEE1XcWLMUAIIpgeJoWiBu1B18YK9e/e6axhrrhJANF3FiTEDCSCYHiSFogXuQtXFCyoreRbTXbLuW0M03WeKRXMIIJge5IKiBR5ADZmsran1xjBWXSWAaLqKE2MGEUAwDUoGrkQnoIsXbNmyOXoD9hpHANE0LiU45AIBBNMFiJEmKFoQSYPtIBNANIOcfTtjRzA9yitFC9wFq4oXrFm9xl2jWPOcAKLpOWIGSCMBBNNl2BQtcBlogzmKF3jDNR1WEc10UGaMdBBAMF2mTNECl4E2mKN4gTdc02UV0UwXacbxkgCC6TJdiha4DLTBHMULvOGaTquIZjppM5YXBBBMl6lStMBloA3mKF7gDdd0W0U0002c8dwkgGC6STNki6IFLgNtMEfxAm+4ZsIqopkJ6ozpBgEE0w2KETZU0YLBZ5wRsYdNNwlQvMBNmpmzhWhmjj0jJ08AwUyeXcyeHTtmxTzGgeQIULwgOW4m90I0Tc4OvkUjgGBGo5LkPl20oFu37klaoBsEgkUA0QxWvv0eLYLpQQa7duvqgVVMUrzAzu8AomlnXm2MCsF0Mau6aEFWB07Juog1bIriBWEU1m0gmtal1MqAEEwX06qLFvTP7e+iVUxpAhQv0CTsXCOadubVpqgQTBezqYoWsHhHgOIF3rE1xTKiaUom8CMaAQQzGpUk96miBWPGjk2yN93iJbB37954m9LOhwQQTR8mLSAuI5gBSbQNYQ475xwnjMrKShvCIYYWCCCaLcDhUMYIIJguol9VWEjRAhd5xjJF8YJYZOzaj2jalU8bokEwXc4iRQtcBhphLjc31/m0ZcvmiL1s2kwA0bQ5u/6LDcF0KWdby7Y6liha4BLQKGY6dOgQZS+7bCeAaNqeYf/Eh2C6lKua2hrHEkULXAIaw0zffn1lzeo1MY6y21YCiKatmfVXXAimS/mq3FN/IwpFC1wCGsNMr169Yxxht+0EEE3bM2x+fAimSznas6f+GUyKFrgENIaZ7OyOsmPH9hhH2W07AUTT9gybHR+C6VJ+qqvrT8m6ZA4zMQgMGjxYtpVvi3GU3UEggGgGIctmxohgupSXjRs2ULTAJZbxmKmtrY2nGW0sJYBoWppYw8NCMA1PEO41JqCLF5SVlTU+wKfAEUA0A5fyjAeMYLqUAooWuAQSMxBIgACimQAsmqZMAMFMGeFxAxQtOM7Cqy1dvKBo7VqvhsCuzwggmj5LmI/dRTBdSB5FC1yAGKcJihfECSpgzRDNgCU8Q+EimC6Ap2iBrjjgwAAAEWlJREFUCxATMKGKF2zauDGBHjQNAgFEMwhZzmyMCKYL/Cla4ALEBEyo4gVVVdUJ9KBpUAggmkHJdGbiRDBd4E7RAhcgJmCC4gUJwApgU0QzgElPU8gIpgugKVrgAsQETFC8IAFYAW2KaAY08R6HjWC6AJiiBS5ATMIExQuSgBagLohmgJKdplARzDSBZhj3CFC8wD2WtltCNG3PcHrjQzBd4E3RAhcgYgICHhFAND0CG0CzCKZLSadogUsg4zBD8YI4INGkEQFEsxEOPiRJAMFMEpzuRtECTSJ9a4oXpI+1TSMhmjZlMzOxIJgpcqdoQYoAk+xO8YIkwQW8m+uiWVchqxbPk7sn5Eu/CQtle0p890vJsoXy2M0jpd/Au2TVkZSMudA5wp+UY3PBHQNMnGCAD752QRct8HUQPnSe4gU+TJohLivRFJkvt86cKTfecIM8/cwzkthZizo5VPKGvPz+m/L0Eytlr44rX28ktq6rWCVL3ntXXpu7VD7XInliYjbcbO34s/Q5WeRCbG76ZYItZpgpZkEXLSgoKEjREt0TJbBjx/ZEu9AeAg6BlGaa+1+TO299U/6y/yvZnzLPPfLag3Pl0wN/S9mSKwbqimTujfNkS50r1qwzwgwzxZRStCBFgEl2H37ecFF3J7NAIFkCSc80O0+ShX+YFBr2r3Jx5yvlqidKk3Uh1K+bTHrqTZkkdbJ/QI2MuH2F6ElmCkaT79pumMz6cHmov/Lnlsz7k3wknvRkhpkiVlW04OxhZ6dohe7JEqB4QbLk6KcIpDTTlG/I6f17SXtXULaTzmefKwNdseWGkXbSMSdH2rlhyiIbCKYLyczO7uSCFUwkQmDAgPp/WsrKyhLpRlsINCOQvGjaLSrt+/SX3Ga0gr0DwUwx/+q0YM+ePVO0QvdECXTI6pBoF9pDICaB5EUzpkkOWEgAwXQhqd17dHfBCiYSIdC1a1enedHatYl0oy0EYhJANGOi4UADAQQzha+CLlqQldUxBSt0TYZAly5dkulGHwi0SADRbBFP4A8imCl8BXTRgrwBeSlYoWuyBHJOzpFNGzcm251+EIhKoKloRm3U4k71wP/8+mIGvftIv955MuLmh+XpworQvaduLYdle+GzsujRaTLCGUONo/7yZeKsefGPFVl4ocHOwAl3yaKEfFXPpb4qi35zl0zM1X6E1rlXyN2/eVZWVRx2K+iM20EwU0hBbU1tCr3pmiqBoUMLpKqqOlUz9IdAMwJaNBO+oe/Qanlswhi56vbH5aX1NQ12j8jelU/KgzddIZNnvy3bU1XNkMh9MHuKXHLTz+XxTwbJ/123Vcq3V0jpqidl5gXZ8vnSX9WP9ehqOdQsMr1DidxCmT7iYpn25J/l1J++JqUhG+Xb18rvvtdO3pwR8vXBQvlKN4+53i9Fj14tI+5bLZL3I1lWpmxskpWL/4+M7bxJXnrk5zLtoily7wo3fyzEdMbzAwhmCoi3bNns9KZoQQoQU+xaVRX7n4QUTdM94ASUaC5a/FT8FP6rUB66/n4pG3G/vNwgYuXrlssj1+Q3PHpSI58//1O57p4VLQhZa8MdlvLFs+Wfnl8vR9qPkzlP/1SGdap/+KNdn3Hys8duk7HOcy6hsZ64X54s+WtUg3Xli2XaNXOkUK6SRe8ukJ+N7dPwCElnKQjtX/burXLCR2uOVzGKauUrWTVrslz3yQhZsmSOTAvbOFF6j71NfvO7B2Vcl5AzR9bLC9NvlHsLW5ffqMMYtBPBNCgZuJIYAVW8oLioOLFOtIaAVwT2/4/k3ve8LLxrkhQ0iJh0KpCrH1ssz91S0CCaodnm0sdjClmrrtVtkGXPFNUXN2iXIzkdmzwp2Xm4XDpKP+b2X1K2LcoPyrrN8vSd86TkSC+5es5tMkb7GjF4u37Xyb3TWrrUFJqhFv5a/nmpyMSfXh8W7QgT0q7Pd2TGlX0adu2Ql36xWEpSnV1HDpCBbQQzBehrVq+haEEK/OgKAasIDLpUrhnWOUpInWXYHXPkjrOzGo5VyFvvb0rueubRajnwl5ZqAZ0kOZ11IdrD8tWBppeN1Az1AXm8OHS6uMelMmX0KVH8VbtOkiHnDhVtqVmjunXy5C9elr0n/oNcPDKWjfaSc3L28a67iqToy5Z8P97U1C0EM8XMJHyNI8Xx6H6cgC5eUFJScnwnWxAwkUC7XLnyuuHhWeauNz6Q9cnMttrny9U3qtlqlpx540QpSLTMUMQM9cRvf0uGNJmgRqJrm3Oy/H3kjojtuvUfyFu7QuJ3eKlMi7zRp9ENSHlywUOfRfTaKVsrvo747L9NasmmkLN160pk/PgJKVigayoEKF6QCj36ppeALn23Qj5XA+8rl4pDdVLQuQXFiupgaLZ613LZfFfTg+qu2ZflvXdfkl8v3dv0YPhzWOhCc8fc3O4NAh4+3GijXaeTJSe0Z1ejverDEdm5tqh+/4nXyKLPH5UxiQp3M5v+2MEMM4U8HTxwUChakALAFLvq4gWlW1Ipfp2iE3SHQLwEevSXgfoc55FDcqD6aLw9Y7dzHgt5WKYPz5dL/i0kxf/wU5lzTaxnlCOELrbFOI4ckYMHquJoZ18TBDPJnO7dW/8rjqIFSQJ0oZsuXlBTw6MlLuDEhK8IhJ71XDpbJg4cK7e8WiMXPbFaNr/+qMyYXODMCqOH8rVUlO2Mfiihvf8rh/Y3/D93OPQYiTo1G5AFwUwy0ZWVlU5PihYkCdClbqp4we5du12yhhkIpIlA+05ycsfk/vmtq3hb7lXPes56U2Ta87Lm9TlydUG0m41aiuWwlJXtduFVYmXyx2L/Py7SEqnIY8llLNJCQLcpWmBG4lXxgp073fjVbEY8eBEQAqf1kz5RHudoNfpQYYS5P7lbXggVRWh/9q0y947zRD9E0mpf+Tvp1Pl4Gc/Dm7dKcj81vyl9cns2DHdIPn7uLSmP4wamupIX5OkYz4W27rsZLRDMJPNA0YIkwXnQjeIFHkDFpOsE6r74k6x2qsS1lx7jL5T8RO/3US91Xvm0LHYqCJ0oAy8dLf0SstHk/Z2bPpPi/XEonSJx4IAcDDdtLz3PGSY9GggdKZ4ndy3e3MpjMl/JRy9tkezTv+E613QaRDDTSZuxXCdA8QLXkWLQEwKhu1jXrpN9ynb78+Un04Ym8XLmGln/x89TOI0aulP3/EtkpL6j9ciHMvfRwviqDv3lgByKuEepXf6FcnkPbahGSh6aLjOXlccQzVCRg6IlMv8vZ8rohO8K9iQZSRtFMJNER9GCJMHRDQJBJBB+/rGHjHvkLrkiZeE4LJvXfCH7m7Csq/hUPtisn3WsC93NWtNYxDpfIj8OV/BRVYf+Re6OJnR15bL84SX1j8CoMeoOysHq8BRTpN0ZMvmGYRGPpeySFbdfKZNnLWxcbP1QiSz/zWz5wdQ3pP/UkZLoldYm4WX8I4KZQgooWpACPJe6UrzAJZCYSZ3Af30mH5Q0lTBlNlRz9Z7bZcGuE+XMWx6TRyb3izq7rDsUOu3ZohdZkv8PZ4ZF6sjK++VmXcxdPV6y8C6Z/P2lUneKrq5zRPaV7gjNIEOz2xVz5bFX94SsnyQFM+6XGfm66pAWuhekJPRcqFrqKlbIr374Y3m+01AZ7OwJ/efICrnz8hnyyKxJMvbRopAInyj9bnpQ5lykT8yqhqH6tUtDNWXHDGp4c0rojSVDJ8mdj7wiX435sfwoZlUhPYj5awQzyRypogU9e/ZMsjfd3CJA8QK3SGInGQJt+1wit+ni6ntXyMNXTpTpjy4Pi0/olSDy0qxpcssr2TJ14Wuy7K4YN+mEZnSvPfHm8SIBh9+Rf/9V07eNhE6pTvxZRIk9Vcx9plzQLyRM/S6Wf17TX+57c6HcedmgCFG9Xb7V+1vy0+Jvyw8ndqsPsdN5MmvJggjRVEJ3j1w1tL8jdHljZsqyznfIolvymwl724G3yuI7htXvb9dPJj2xRBZ8VxeXj0awvXS56EF57olrpHdC11uj2cr8vjbHQkvm3fCfB+rdc/fcO1umTZ/uP+ct8lg9Dzti+Hky55FHZMrUKRZFRii+IqBOPb70J9m65llZsPJ4bZz2+dfIbRMvkYtvGBNDMA6F3vhxqUyLWZ2ni1y9+B15ZGzEvbBKhOfcLz9fGnpjiYLU5QKZcedM+WHoGUynlXrF2PUzZIG6kzY0/h0//ZHcGH6TSCRV9d7OF+TFZxaEX0Xm+HvDVJmibFUslIlj5olcM0Ouv3aqTIr56EpklaEGn0KS3eWCG2XadVPl+qhjR/rhn20EM4lc8Y90EtA87MKPFw/hYhoCEAgT4JRsGEX8GxQtiJ9VOlpSvCAdlBkDAhBAMJP4DlC0IAloHnaheIGHcDENAQiECSCYYRTxb1C0IH5W6WpJ8YJ0kWYcCASXAIIZ3NxbE/ngM86Q4qJia+IhEAhAwEwCCGYSeaFoQRLQPOzSsaN+pszDQTANAQgEngCCmeRXgKIFSYLzoFu3bt0dqyUlJR5YxyQEIACBegIIZhLfBFW0IDv7eNX/JEzQxUUCXbt1ddEapiAAAQhEJ4BgRufS4t6DBw7KoMHholEttuWg9wSyOtSfki3dUur9YIwAAQgElgCCmWDqVdECFrMI9M/t7zhUU9PwFniz3MMbCEDAEgIIZoKJ1EULhp1zToI9ae41gerqGq+HwD4EIBBgAghmgsmnaEGCwNLUfMzYsbJxw4Y0jcYwEIBAEAkgmAlmXRctyM3NTbAnzSEAAQhAwM8EEMwks9ehQ4cke9LNCwKqeMGqwkIvTGMTAhCAgEMAwUzwi7Bp40bp269vgr1o7jUBihd4TRj7EIAAgpngd6Cqqlp69eqdYC+ae01AFy/YWrbV66GwDwEIBJQAgplg4nfs2E7RggSZpaO5Ll5QU8udsungzRgQCCIBBDPBrG8r30bRggSZpaO5Ll5QuacyHcMxBgQgEEACCGYCSa+trU2gNU3TSUAXL9izZ3c6h2UsCEAgQAQQzASSXVZW5rSmaEEC0NLclOIFaQbOcBAIEAEEM0DJtj1UihfYnmHig0BmCSCYCfAvWrvWaU3RggSg0RQCEICAJQROsCSOtIShT8WeNeTMtIzHIBCAAAQgYA4BZpgJ5KKgoCCB1jSFAAQgAAGbCLQ5FlpsCohYIAABCEAAAl4QYIbpBVVsQgACEICAdQQQTOtSSkAQgAAEIOAFAQTTC6rYhAAEIAAB6wggmNallIAgAAEIQMALAgimF1SxCQEIQAAC1hFAMK1LKQFBAAIQgIAXBBBML6hiEwIQgAAErCOAYFqXUgKCAAQgAAEvCCCYXlDFJgQgAAEIWEcAwbQupQQEAQhAAAJeEEAwvaCKTQhAAAIQsI4AgmldSgkIAhCAAAS8IIBgekEVmxCAAAQgYB0BBNO6lBIQBCAAAQh4QQDB9IIqNiEAAQhAwDoCCKZ1KSUgCEAAAhDwggCC6QVVbEIAAhCAgHUEEEzrUkpAEIAABCDgBQEE0wuq2IQABCAAAesIIJjWpZSAIAABCEDACwIIphdUsQkBCEAAAtYRQDCtSykBQQACEICAFwQQTC+oYhMCEIAABKwjgGBal1ICggAEIAABLwggmF5QxSYEIAABCFhHAMG0LqUEBAEIQAACXhBAML2gik0IQAACELCOAIJpXUoJCAIQgAAEvCCAYHpBFZsQgAAEIGAdAQTTupQSEAQgAAEIeEEAwfSCKjYhAAEIQMA6AgimdSklIAhAAAIQ8IIAgukFVWxCAAIQgIB1BBBM61JKQBCAAAQg4AUBBNMLqtiEAAQgAAHrCCCY1qWUgCAAAQhAwAsCCKYXVLEJAQhAAALWEUAwrUspAUEAAhCAgBcEEEwvqGITAhCAAASsI4BgWpdSAoIABCAAAS8IIJheUMUmBCAAAQhYRwDBtC6lBAQBCEAAAl4QQDC9oIpNCEAAAhCwjsD/Bz3Swq3wwLb7AAAAAElFTkSuQmCC" alt></p>
<p>(i) Deduce that the kinetic energy per unit time of the air incident on the turbine is</p>
<p>\[\frac{1}{2}\pi \rho {r^2}{v^3}\]</p>
<p>(ii) State <strong>two</strong> reasons why it is impossible to convert all the available energy of the wind to electrical energy.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Air is incident normally on a wind turbine and passes through the turbine blades without changing direction. The following data are available.</p>
<p style="padding-left: 30px;">Density of air entering turbine = 1.1 kg m<sup>–3</sup><br>Density of air leaving turbine = 2.2 kg m<sup>–3</sup><br>Speed of air entering turbine = 9.8 m s<sup>–1</sup><br>Speed of air leaving turbine = 4.6 m s<sup>–1</sup><br>Blade length = 25 m</p>
<p>Determine the power extracted from the air by the turbine.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A wind turbine has a mechanical input power of 3.0×10<sup>5</sup>W and generates an electrical power output of 1.0×10<sup>5</sup>W. On the grid below, construct and label a Sankey diagram for this wind turbine.</p>
<p><img 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" alt></p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>one</strong> advantage and <strong>one</strong> disadvantage of using wind turbines to generate electrical energy, as compared to using fossil fuels.</p>
<p> </p>
<p>Advantage:</p>
<p> </p>
<p>Disadvantage:</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">kinetic</span> energy of wind transferred to (rotational) kinetic energy of turbine/blades;<br>kinetic energy changed to electrical energy in generator/dynamo;<br><em>Generator/dynamo must be mentioned.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) volume of cylinder of air passing through blades per second =<em>vπr</em><sup>2</sup>;<br>mass of air incident per second=<em>ρvπr</em><sup>2</sup>;<br>kinetic energy per second= \(\frac{1}{2}m{v^2}\);<br>leading to \(\frac{1}{2}\pi \rho {r^2}{v^3}\) <br><em>Award <strong>[3]</strong> for answers that combine one or more steps.</em></p>
<p>(ii) the speed of the air/wind cannot drop to zero;<br>wind turbulence / frictional losses in turbine/any moving part / resistive<br>heating in wires;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>kinetic energy per second of air entering turbine \( = \frac{1}{2}\pi \times 1.1 \times {25^2} \times {9.8^3} = 1.016 \times {10^6}\);<br>kinetic energy per second of air leaving turbine \( = \frac{1}{2}\pi \times 2.2 \times {25^2} \times {4.6^3} = 2.102 \times {10^5}\);<br>power extracted \( = 1.0 \times {10^6} - 2.1 \times {10^5} = 8.062 \times {10^5} \approx 8.1 \times {10^5}{\rm{W}}\);</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p>correct shape of diagram (allow multiple arrows if power loss split into different components);<br>relative width of arrows correct;<br>labels correct;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Advantage:</em><br>wind is renewable so no resources used up / wind is free / no chemical pollution / no carbon dioxide emission / does not contribute to greenhouse effect / is “scalable” <em>i.e.</em> many sizes of turbine possible;</p>
<p><em>Disadvantage:</em><br>expensive initial cost / large land area needed / wind not constant / effect on movement of birds / aesthetically unpleasant / noise pollution / high maintenance costs / best locations far from population centres / low energy density;</p>
<p><em>Accept any other suitable advantage or disadvantage.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about energy sources.</p>
<p>A small island is situated in the Arctic. The islanders require an electricity supply but have no fossil fuels on the island. It is suggested that wind generators should be used in combination with power stations using either oil or nuclear fuel.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest the conditions that would make use of wind generators in combination with either oil or nuclear fuel suitable for the islanders.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Conventional horizontal-axis wind generators have blades of length 4.7m. The average wind speed on the island is 7.0ms<sup>−1</sup> and the average air density is 1.29kgm<sup>−3</sup>.</p>
<p>(i) Deduce the total energy, in GJ, generated by the wind generators in one year.</p>
<p>(ii) Explain why less energy can actually be generated by the wind generators than the value you deduced in (b)(i).</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The energy flow diagram (Sankey diagram) below is for an oil-fired power station that the islanders might use.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>(i) Determine the efficiency of the power station.</p>
<p>(ii) Explain why energy is wasted in the power station.</p>
<p>(iii) The Sankey diagram in (c) indicates that some energy is lost in transmission. Explain how this loss occurs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The emissions from the oil-fired power station in (c) are likely to increase global warming by the enhanced greenhouse effect.</p>
<p>Outline the mechanism by which greenhouse gases contribute to global warming.</p>
<p> </p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nuclear fuel must be enriched before it can be used. Outline why fuel enrichment is needed.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The nuclear equation below shows one of the possible fission reactions in a nuclear reactor.</p>
<p>\[\left( {{}_{\rm{0}}^{\rm{1}}{\rm{n + }}{}_{92}^ \cdots {\rm{U}} \to {}_ \ldots ^{92}{\rm{Kr + }}{}_{56}^{141}{\rm{Ba + }} \ldots {}_0^1{\rm{n}}} \right)\]</p>
<p>Identify the missing numbers in the equation.</p>
<div class="marks">[3]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A nuclear reactor requires both control rods and a moderator to operate. Outline, with reference to neutrons, <strong>one</strong> similarity and <strong>two</strong> differences in the function of each of these components.</p>
<div class="marks">[3]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
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<div class="column">
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">needs to be windy/high average wind speeds; space/land/room for wind turbines;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">ability to import oil/nuclear fuel;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">ability to dispose of nuclear waste;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">comment relating to need for geological stability; </span></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(i) π</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">4.7</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 5.000000pt;">2 </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-weight: bold; font-style: italic;">or </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">69.4 m</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 4.000000pt;">2</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">power </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">15300 to 15400 W;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">470 to 490 GJ; </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">(ii) wind must retain kinetic energy to escape </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-weight: bold; font-style: italic;">or </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">not all KE of wind can be converted to KE of blades;<br> </span></p>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">energy lost to thermal energy (due to friction) in generator/turbine/dynamo; </span></p>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">turbine will suffer downtime when no wind/too much wind; </span></p>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">Allow any two relevant factors.</span></p>
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<div class="question_part_label">b.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">(i) indication that energy supplied to islanders is output and chemical energy </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">input / \(\frac{8}{{25}}\) u</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">sed; </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">32% / 0.32; </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">(ii) </span><span style="text-decoration: underline;">energy/it</span> is wasted due to inefficient burning of oil / <span style="text-decoration: underline;">thermal/heat energy</span> loss to surroundings/environment / <span style="text-decoration: underline;">electrical energy</span> is used to run the power station’s systems / <span style="text-decoration: underline;">energy/it</span> is wasted due to frictional losses in the turbine/generator;
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<p>(iii) heating of wires by electric current / inefficient transformers;
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<div class="question_part_label">c.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">radiation emitted by Earth in (long wavelength) infrared region;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">frequency corresponds to resonant frequency of greenhouse gases (either vibration or difference in energy levels);</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">radiation absorbed by greenhouse gases is (partly) re-radiated back to Earth; </span></p>
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<div class="question_part_label">d.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">percentage of U-235 in naturally occurring ores is too low to support fission </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-weight: bold; font-style: italic;">or </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">naturally occurring U-238 does not undergo fission;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">percentage of U-235 (which can usefully capture thermal neutrons) is increased; </span></p>
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<div class="question_part_label">e.</div>
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<div class="column">\(\left( {{}_{\rm{0}}^{\rm{1}}{\rm{n + }}{}_{92}^{235}{\rm{U}} \to {}_{36}^{92}{\rm{Kr + }}{}_{56}^{141}{\rm{Ba + 3}}{}_0^1{\rm{n}}} \right)\)</div>
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36;</div>
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3;</div>
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The number of neutrons must be consistent with chosen isotope of uranium.</em></div>
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<div class="question_part_label">f.</div>
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<div class="layoutArea">control rods absorb neutrons;
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<div class="layoutArea">moderators slow down neutrons;
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<div class="layoutArea">both affect the rate of reaction;
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<div class="layoutArea">both rely on the neutrons colliding with their atoms/nuclei;
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<div class="layoutArea"><em>Must see reference to collision/interaction for fourth marking point.</em></div>
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<div class="question_part_label">g.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
<div class="question_part_label">a.</div>
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[N/A]
<div class="question_part_label">e.</div>
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[N/A]
<div class="question_part_label">f.</div>
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[N/A]
<div class="question_part_label">g.</div>
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<br><hr><br><div class="specification">
<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about solar radiation and the greenhouse effect. <strong>Part 2</strong> is about a mass on a spring.</p>
<p><strong>Part 1</strong> Solar radiation and the greenhouse effect</p>
<p>The following data are available.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p><strong>Part 2</strong> A mass on a spring</p>
<p>An object is placed on a frictionless surface and attached to a light horizontal spring.</p>
<p><img 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" alt></p>
<p>The other end of the spring is attached to a stationary point P. Air resistance is negligible. The equilibrium position is at O. The object is moved to position Y and released.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the Stefan-Boltzmann law for a black body.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce that the solar power incident per unit area at distance <em>d</em> from the Sun is given by</p>
<p>\[\frac{{\sigma {R^2}{T^4}}}{{{d^2}}}\]</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate, using the data given, the solar power incident per unit area at distance <em>d</em> from the Sun.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>two</strong> reasons why the solar power incident per unit area at a point on the surface of the Earth is likely to be different from your answer in (c).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The average power absorbed per unit area at the Earth’s surface is 240Wm<sup>–2</sup>. By treating the Earth’s surface as a black body, show that the average surface temperature of the Earth is approximately 250K.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the actual surface temperature of the Earth is greater than the value in (e).</p>
<div class="marks">[3]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the conditions necessary for the object to execute simple harmonic motion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The sketch graph below shows how the displacement of the object from point O varies with time over three time periods.</p>
<p><img 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k5q09na551/fpcmNn+wWZi13YWEXxBAAAEEEEAAAQQQQAABBBBAAIHMCpDYdmxot6++T6ae+4i07zROLv7p16RO881xnDvLfpO/IcfvZWed4w9zL4bK1LnPy/33zpZHzu9jZuy6hfLM0t4L+w2oO0OunGodv9MEuWG5SVy/Kb+xzvvR47Ol7Yxfyl0XT5L9dsQ6YPAk+d7dM+WK0Z/cEdi7Muf2OTtmItuxFvD6/YXy6yff7djxX+pkcJyA73hrwAGHyKE77zjP+hZpWdclM5v74H9L683/mkuM/7vUTjlfzhmz4ybBjkNEcsntIXXyL/p7t3Pkjp/xo1wRxD3krO+f0cN45I4ff2I8HtvaHpK75v1dJtz0vMy59xFZ8OR5OxLvuQY++p3c/qsaueTu62Rq0+Bcy2Yzs5x/JBdN7Ei1myRz80X/Jo9+ZoYsuPdCmTB4R+dyNzU+95MfyFk67ttel1f/3/zxKyXWf8/FsOuOeB+SubdM2pG0zr3dNlN+sep0eWrudXKS3lzJxTvm4is741jfLM+1/W/TkaptOlv71NNO69LmhKam3I0OZm13QeEXBBBAAAEEEEAAAQQQQAABBBBAIKMCJLadGti/yIIZD0trLje705EnyZQ6zdjmBTmgTg7+bH6CNm8f+bgccPBB0ssZOnde/4zMmNPTUiEfl4bPHxXPJO484H/IPvvvGyc/dz75arntxLodSdrOvWTAcPlmLhGs87a3Lf2NPJ5EAvQfd5Hd/rm3JH8unvd/L7+8x6wTPliOP+2wHTO1rThzLwc0fkfuu3Jc1KedRk+SCftY59Pj92qSSQ0f73qg/jbgk7LbbnoHYossfHZRPFt+wK67Sbxgxs5flO/8+EvxDQA9XHJp9fFfOrgAU3vct8jy1f/ReQrzqsxYTZJ/99EHy3A9a8O35eeXHdrdrMvf39/kg83/R49I/Kc9W7umpqZLexd8+1vCrO0uJPyCAAIIIIAAAggggAACCCCAAAIIZFbgY5ntmY8di2cn7yzDxx2Qmxvb2/ZPsuvuu+Q+bO9th/7f32V3+bTJ324zS4VMkRP/PF1+OP0ka0kSk/C9UO5qzD/VANll4MAokZ0/N7rbng2fk2P2uldmrDd7rpM/Lcktn9JozQLPP6Cn33c/Qk6fsq80z/5AGr9+vDRo/lj31aRy1Ia+qT+3y/sv/F4WRoF+Snbb1UpY6y7Rz52lbtojsnxalzdzv1jHr79LvlJ3V/4OPf6+7e2Vsi63PMfuJtbYucddd7zZ1fSj5atkg0yQ/fo6pNtnFYi12zkLeWNHgr1JZ5wXckzp+/Q2W9ucsbGxUXTWtpnNnZ/4Lr1VjkQAAQQQQAABBBBAAAEEEEAAAQQQcE2AxLYzI2IlJnPzrD+9W9fZqF3D3ClXOO9TXd8q9rc4YWyW+TCFHq+Qr8y+Q5rOnyann3xy5xIYxZ7X3n/ACJl07GCZcaeZMf2RrFy5IVdAcWg8M9netffXn84tk/GCrL4pb49cMcj5Dzwjf5gzM1fE8qO8D/XXD6Xtz6/HRRv13cJ//l3WrXq343hTAHHutCKTzbmWdhnYkeDu7y5A4UH1smcFYu3lzK68rbO1r7hyeq9JazNr+ytTTojW2p46rdudCle6QhwIIIAAAggggAACCCCAAAIIIIAAAmUKsBRJmYCVO9xKTFbupH2cKZcwvv5+uedbE63lRtZL850/lKkTDpHJl86U+Wt7Sxj3cdouH1UgAd/lfLnCmq1zZMalx8vwujPl13/ZWQ758Qy5oqG3BVf+Q1Yv39LlDMX98n9ky/t/6zhkxSpZm3hyurjouu7tU6xdIy/0t75ma+s57FnbW7du1bf5iQACCCCAAAIIIIAAAggggAACCCCQMQES284MqJWYzM1u/ssHVUjK5QoSTrj4Hlkw/z654uQGaya1mcGdK3D4+VPkyufW5hbkKHXbSQbVDe5/ne9+T28S2k/ITWcfJWNOvl/W1n9Xfr96ocy8bJqcEBc17O8kK+XPS//S3069f/5RrnBmj8ud9H5Iap/4FGuBSDpb+7zzz+91traeirW2VYKfCCCAAAIIIIAAAggggAACCCCAQHYFSGw7Obbbc0XwPiwjoVxcpwYMniBTb3pK3sxPcG9rk1n/Ol3uX13qzO3t8rfNm3f0Y2eprx9kJc8LjfEjeefx78oxUy6SGW8eJD/946Nyw7Tc+tP5a233eLr/R+qG69rPXYs69rh79OZGeWrmH+Lij537LZffP99Tkc3OPTpebZQnbpwl7+S/XdXffYq1MJhCZmvrmZi1rRL8RAABBBBAAAEEEEAAAQQQQAABBLIrQGLbmbH9hAyu33tHNNtk/dPPS1vpU6VL6lVHgvsJWfTkdGmq3VFocVuL/K/fvFlikv2/5MMPtuxY43of+ezYvYqMKzdTu/lqOeOiZ3JlMj8pjWdfIMcP7m3ZkZ5ObZvm6mQueEye7CdJv731EXnkg3+WjnT4J6XhMwfuSMZ/KK333iFP9bc8y/uL5I+r/ykXbbU3n2ItzqaY2dp6ZmZtqwQ/EUAAAQQQQAABBBBAAAEEEEAAgWwKkNh2Zlx3kr3HjpE49bt+lvxyzsbkolt7v5x3Y0sPCesBsmvjNLnr4UukMcptb5P/L7fO9H+VFMlfZOmilR1H7tUkkxo+XuRZcsnk38/PJbXN9gnZv65WCpqoHbeSZ7ptkdx84R3SsqWXOwbbl8v9P3lZRn9+xI52BsjuRx0tR+zI8Uv7MzL9OzfK870mt/8i8298QLZ/YZzsHsdQrRc+xVqcSTGztfXMzNpWCX4igAACCCCAAAIIIIAAAggggAAC2RQgse3QuA5o/Jp8Z2Ln0hnNl39Lbmp5v3uEW16Qu+59bcf7H8nyRW/0sHRG98O6vvN/pf3Jx2VBL0neAfuNlkP+xWR0d5J/3n0X6e0P5aPlq2RD1xN3/pabvfy7BVtyv+8rJ119ljQWl5XuPE/06n15ZXH3pUC2r31NlvxHL4nq3HFdTXOztttul5OPPlduerxVTGQd246ilFdcJrfKF+VEOwG/+xFy+pR9dcfc8b+Sc3Nrj19+1xxpje20qOVUOX/BKDl94r/E+1f1hUux7rK7fFpvCJRReLOU2dpqzqxtleAnAggggAACCCCAAAIIIIAAAgggkD2B3vKV2eupFz3aU46/6gqZFC8D0iozTj1LLp85X96JcrcmgTpLLj/rQZHDhsY92jbvR3L2pd+XaYf/qzzxviZ57fWtRXpMQLf/Rq669PEd545P1/Fiy7uy8t+35fLaY+RrXxnV+0zptoflruaeijKa2cv/U5q37SS1J18plzd9Oq8B82vXGLvv8E+yay6p3rHllme552r5gRaz3NKaW8t6qjR951n5e3zgjgKRuc8eu/kJeT2i2FNOuOUmOUlNzb7t82TGRSfImP0GS130v/1lzJQL5aYnPy4X/vRrUtclAf9pmTD9yq7H59Yef+yGC+UrB+3f9fjZf5XJ110oE3a1TrB+lSzXJcp7LerYn0PcQetFT+uwlxlr7uzbt3wgm7WVMhLSsstA2V0ZPvqz/GGh+RvJ/f223CJfOeeJgm/ElDJbW8Nn1rZK8BMBBBBAAAEEEEAAAQQQQAABBBDIngCJbcfGdMDgE+WGOy+x1rjOJVGvPUsm1pkkrEnA3iFbzrhSpg3PX9ajVr5420/kBM0mbnlV7n1g0Y71rXOdfOt3Mrvb7O9t0v7Hy+ToKZfJPc1r42VJtq99Tn526a3SLA1y6i+vk2/W9b6u9U61f5f5506Vy2dbM6BNYvnS3Ozl2R/Igaf/XB6+ftKONavzsPNjbHtQbnjcnpX9cWk89+LOpLIpZjmtSYaaZPRBX5cH/3qCPPDkdXLsqE/sOPEWab7oMKk7+k7568TxcqAmVnedJNc+8nM5taGPla93apRzZ90uU3vqayHH5xaRmXTLvXKtncDfvlaen/mMLI+7vVyemb3EmimuYeeP1TMyUxP48bEmKXyv/OLJjoVZcnPPZf2Tv+q+5nepsZp2tq+Wp+58RtZrmx/9SR6da49Hxwfb1/5RHl2gTxLknhh4+unuy7vsdIB84Tid6f6uPHbWIR1/vxe8I6df8aWCl2r561+3yCWXXiY1NTUaVVE/zaztgQMHFnUMOyOAAAIIIIAAAggggAACCCCAAAIIuC/wD/+d28oN08x6Xf3O2nJPw/G2gJmRPGuWPHjLbHk9N3HaLAlSO/FsuehbU+WExl3knZlnyMR7d5Fzz/6yTDrpWGmMZwlvkfmXflGmztYEqH3S3OudT5Z7Xr9RJqzPrbE9u0HuuHg3WfDAH2Xxyw/JjHma0txLms6fJqeffLJM6KFY47bmy+Sgs2aLmYi888l3ywunfSj3336rdfwn5cCTp8nxR39Zzmwa3MNs735ilIPlivkPy9TBHWtZmET7L665Wu7YEd9ODSfLxd89T74ZndskfH8u3zj19pyTaXe6/HD6SZaH1f9conn+A8/IH+bMlMfaPuz4oHZiD4bWMV1evi+tjz8hzz37oNXXnqy2dYzPtYu7HN35y85y4JVPyZxpIvccd7xc36ZTujv36Hi1w2Gvl+TyA8+Sx3rbrWG6zJs7TfbrcnihsZqD+ou3xDiM963XylW3z4uKfx548rflO+d/rce/qS6hF/GL+bdHN/4NUgl+IoAAAggggAACCCCAAAIIIIAAAn4IlJNXJrHtxxg7FWXXxPZ98tpNE3JpdzYEqi9AYrv65rSIAAIIIIAAAggggAACCCCAAAIIVEqgnMQ2S5FUahQ4DwIIIIAAAggggAACCCCAAAIIIIAAAggggEBVBEhsV4WZRhBAAAEEEEAAAQQQQAABBBBAAAEEEEAAAQQqJUBiu1KSnAcBBBBAAAEEEEAAAQQQQAABBBBAAAEEEECgKgIktqvCnKVGtsvfNm+W7VnqEn1BAAEEEEAAAQQQQAABBBBAAAEEEEAAAa8ESGx7NVwuBPtf8uEHW2TbjlC2v79Z/uZCWMSAAAIIIIAAAggggAACCCCAAAIIIIAAAsEIkNgOZqgr09Hta5+TmU8vj0+2bcFDcm/L+/HvvEAAAQQQQAABBBBAAAEEEEAAAQQQQAABBJIWILGdtHBWzr92pkzeb7AMnXCBzGr7sLNX21plxoljpW6/Q+Xy5i2d7/MKAQQQQAABBBBAAAEEEEAAAQQQQAABBBBISOBjCZ2X02ZNYPA0mfPOtKz1iv4ggAACCCCAAAIIIIAAAggggAACCCCAgIcCzNj2cNAIGQEEEEAAAQQQQAABBBBAAAEEEEAAAQQQCFmAxHbIo0/fEUAAAQQQQAABBBBAAAEEEEAAAQQQQAABDwVIbHs4aISMAAIIIIAAAggggAACCCCAAAIIIIAAAgiELEBiO+TRp+8IIIAAAggggAACCCCAAAIIIIAAAggggICHAiS2PRw0QkYAAQQQQAABBBBAAAEEEEAAAQQQQAABBEIWILEd8ujTdwQQQAABBBBAAAEEEEAAAQQQQAABBBBAwEMBEtseDhohI4AAAggggAACCCCAAAIIIIAAAggggAACIQuQ2A559Ok7AggggAACCCCAAAIIIIAAAggggAACCCDgoQCJbQ8HjZARQAABBBBAAAEEEEAAAQQQQAABBBBAAIGQBUhshzz69B0BBBBAAAEEEEAAAQQQQAABBBBAAAEEEPBQgMS2h4NGyAgggAACCCCAAAIIIIAAAggggAACCCCAQMgCJLZDHn36jgACCCCAAAIIIIAAAggggAACCCCAAAIIeChAYtvDQSNkBBBAAAEEEEAAAQQQQAABBBBAAAEEEEAgZIGPhdx5+o4AAtkReHTWozJmzBjZv37/7HSKniCAAAIVFli1cpW0tLTIhg0bZPGrr8onPvEJGXfoOPnkJ3fh39AKW3M6BBDInoD5N/SFF+bL3/72YZd/Q/fcc5CMHjNaamtrs9dpeoQAAghUSKC1tVValiyRDes3yCd32UW+d9H3KnRmThOyAIntkEefviOQIYHpl18e9WZI3RA55dRT5dTTTpOampoM9ZCuIIAAAqUJbN26VWY98og8OmuWrFm9pttJ5jc3x++Zf0OnTjtHjvnyMfwbGqvwAgEEQhYo5t9Qk9z+5llny5eO+VLIZPQdAQQQiAXa29tlxp13ydNPz5XNH2yO35/Q1BS/5gUC5Qj8w3/ntnJOYI6t22+wrH5nbbmn4XgEEECgKAHzb49uA3cb2OU/lOb3884/P5egmaa78BMBBBAITsA8zfLTm27s9u/jQQc1yn/+539GM7YNip3cNr+bf0Nv/fkv5IgjjzC/siGAAAJBCtwzc6bcdeedRf8bam4S3nTzzdLY2BikG51GAAEEzE3Bu2fcLXfcdlsXDPPv47777icjR41ixnYXmbB/KSevTGI77L8deo+A1wJ2YtvcXDOPNs2d85Q8+MADcb/MzJnb7riDR0NjEV4ggEAIAubLxHf/7TtdEtaTp0yWyVNO6DVZvXDBQnngV7/qdsyPf/ITZm+H8EdDHxFAIBYwMwy/fcEFsrRlafzemV//upzx1a/2uOyd+Td3wYsL5InHH+/yb+gF3/62nHPuOfwbGivyAgEEQhAwyzadf9658ZOCZsLEscce1+u/oSGY0Me+BUhs9+3DpwggkFGB/MS2dtP8h/SG66+Pv1iY/5DOenR2j19E9Bh+IoAAAlkRyP8yYW7wTb/qqoJnDpqbhNddc02c0DHHX3/DjfwbmpU/EPqBAAJ9Cph/Q0895eR4lrZ5XP6a664teJKEuUl49Y9/FCd0zL+h9+cmXbBEXp/sfIgAAhkRePa3z0Y3BrU7ZmLFJZddVvC/oXocP8MSKCex/Y9hUdFbBBAIQcAUkLznvnvliiunR901a3mZLyjmP7JsCCCAQJYFNCGja2mb2YKP5WYQFvM4vNnXJGHM7ESzmRmL5t9Qc242BBBAIMsC5lrxC5MmxUnt6264IbqmLKYopFnC6cmnnso9ITM5ojL/hn4z9++pmQXOhgACCGRZwE5qm8ll5snpW269laR2lgfdgb6xFIkDg0AICCBQmkBvM7bts5lZMxd+9zvxF5TfPPlEUQke+1y8RgABBFwW0KS2FuYxXybKLWCW/wWFp19c/gsgNgQQKEfAXDN+48wzo1NUqs7Az275Wby+LDO3yxkdjkUAAdcFuGZ0fYTcjo8Z226PD9EhgECKAmbWjEnEmC8oZpt29tnMOkxxPGgaAQSSEUgiqW0iNYlxkyA3mz79wqzDiIP/QwCBDAmYf0PNRAiz6RJ2lSie+72Lvhf/G6ozt8163GwIIIBAlgRIamdpNP3rC0uR+DdmRIwAAkUKmKVJTHLbbJqY4UtFkYjsjgACzgqYf8+uuPyy+MmUSszUtjubn9w2BdX4N9QW4jUCCPgsYG7W6ZramtQ2146V2sy/obo8nklum8K+bAgggEBWBMyNwR98/6qoO0n8G5oVJ/qRnACJ7eRsOTMCCDgkYL6g2LMOzVqHbAgggEAWBH74/e/HhR4rndRWn/zEzC0/vVk/4icCCCDgtYC5WadLOF39k2sSKZQ7ddq0uG7B/OZmMUuUsCGAAAK+C5iJDuefd270byhJbd9H09/4SWz7O3ZEjgACRQrkJ2b4UlEkILsjgIBzAo/OelTmPDknissUezT/ziW12YmZB3PFJU3bbAgggIDPAuZa0MyiNpuZVZ3kv6E//PGPxKyzbbY7brtNWltbo9f8HwIIIOCrgJlcoQXLk7ox6KsNcVdPgMR29axpCQEEHBAwiZkJTU1RJHypcGBACAEBBEoWMI9+Tr/88uh4kyy56JKLSz5XoQeaNjQx89ObbhTW2y5Ujv0QQMA1AZNYNteCZjPXhuYaMent/txNQTOr0Wym7gvLOiUtzvkRQCApAXtyxQXf/naiNwaT6gPnzYYAie1sjCO9QACBIgR+/j9/EX+puPTii/lSUYQduyKAgDsCZl1ts5kkyfU33Cg1NTWJB2faMG2ZzTy6f9X0KxNvkwYQQACBSguYhLK5BjSb+TfUXBtWYzP/hs68996oKfNvqJntyIYAAgj4JmAmNpgJDmYzEx5MoVw2BNISILGdljztIoBAagLmS8WtP+/4AmMenbp7xt2pxULDCCCAQCkC98ycGT8+f8mllyWyJmxvcZmaBVoIzawVy5IkvUnxPgIIuCpgrv308XlzTViNG4Nq0djYKGZ2o9nMUlILFyzUj/iJAAIIeCFgJjZobQKd8OBF4ASZSQES25kcVjqFAAL9CRxx5BEyecrkaDfzGKp5pJ8NAQQQ8EHAzJK56847o1DN4/OnnHpK1cM2j+yzJEnV2WkQAQQqIGAvQWKuBc01YbW3c849R4bUDYmavTq39jZLklR7BGgPAQRKFXj2t8+KmdhgNjPRwUx4YEMgTQES22nq0zYCCKQq8OOf/CRekuSG669PNRYaRwABBAoVsGfJXHPdtYUeVvH9dIaOmbEz4867Kn5+TogAAggkIXDdNddEpzVLkJhrwTQ2M0P8pptvjpo2M8dnPfJIGmHQJgIIIFCUgLkJ94PvXxUdY27OVaM2QVEBsnOQAiS2gxx2Oo0AAkbAfKkwj/Cbzdx1Nnef2RBAAAGXBcxMQ3uWTG1tbWrhmhk6+jj9g7mCaCY2NgQQQMBlAXOtt7RlaRTi1T+5pqpLkOS7mCVJ9OnB66+9jmK8+UD8jgACzgmYm3C6BInenHMuSAIKToDEdnBDTocRQMAWMI/w6+P0t/7sFh4FtXF4jQACzglosTMzS+bU005LPT7zOL2Z9Wi2O267PfV4CAABBBDoTcCeaWiu/b50zJd627Vq719yWccEC9PgT2/sKMRWtcZpCAEEEChCwCyFZ27Cmc3clDM359gQcEGAxLYLo0AMCCCQqsD0qzoep+JR0FSHgcYRQKAfATPTUIudXfi9i1KdaaihmidfzKxHs/Hki6rwEwEEXBSwZxrqtV/acZqnbrQYrykkyZMvaY8I7SOAQG8C9rJz9k253vbnfQSqJUBiu1rStIMAAs4KmLvNpgCb2UxBNgr4ODtUBIZA0ALmqRKzmX+vXJhpqINhYtEiaBqjfsZPBBBAwAUBc22nRXddm2lonr7hyRcX/kqIAQEEehMws7XNsnNmMzfj0lwKr7cYeT9cARLb4Y49PUcAAUvg8iuuiH4za4ZRwMeC4SUCCDghYM/WvuDb33IiJjsIM4PcbGZGOfUKbBleI4CACwL2bG3XZhqaJ1/OO//8iMk8+cKsbRf+YogBAQRsAVO43GzmJpwLS+HZsfEaARLb/A0ggAACOQFTBO3Mr389smDWNn8SCCDgmoDOhDaztV1c09DM2tYnXzRW1wyJBwEEwhSwZ2ubaz0XZxpOnTYtfvKFegVh/p3SawRcFbALl5ubcOZmHBsCLgmQ2HZpNIgFAQRSFTj3/POi9pm1neow0DgCCOQJuD5bW8PVmeTM2lYRfiKAgAsC9mxtvdZzIa78GPTJF2Zt58vwOwIIpCnw0IMPRs0zWzvNUaDtvgRIbPelw2cIIBCUgJnBw6ztoIacziLghYDOgHZ1trYimpnkrLWtGvxEAAEXBHyYra1Odr0CZm2rCj8RQCBNAbO2tilsazZma6c5ErTdlwCJ7b50+AwBBIITOOOrX436zKzt4IaeDiPgpIAvs7UVT2ccmlnbCxcs1Lf5iQACCKQi4MtsbcU55dRTo5dm1vaqlav0bX4igAACqQjMuPOuqF1ma6fCT6MFCpDYLhCK3RBAIAwBs9a2rhP76KxZYXSaXiKAgLMCOlt79JjRTq6tnQ9nzzh84Fe/yv+Y3xFAAIGqCpi6KWabPGWyk2tr52OYomwmgWS2hx96KP9jfkcAAQSqJmBmaz/4wANRe8zWrho7DZUgQGK7BDQOQQCBbAuwTmy2x5feIeCLgCnWY2Y+m+2bZ53tS9iis7ZZJ9abISNQBDIpYJ54MU/gme2rZ57pRR9NUTaTQDKbSSiZxBIbAgggkIbAM08/HTf75WOPjV/zAgHXBEhsuzYixIMAAqkL2OvE3n/fvanHQwAIIBCmgK6xatatNjOhfdmOHH9kPONw7pynfAmbOBFAIGMC+sSL6/UJ8tntBJKdWMrfj98RQACBpAR8qk+QlAHn9UeAxLY/Y0WkCCBQRQGdcbi0ZamYWZNsCCCAQDUFzCw9M+PZbLrmajXbL6ctZhyWo8exCCBQCQH7iZcTTjyxEqes2jkoZl41ahpCAIFeBBa8uCB+4kVrUPWyK28jkLoAie3Uh4AAEEDARQEzO1LXOGTGoYsjREwIZFvg1w//Ou6gWXPVt40Zh76NGPEikC2Bhx58MOqQb0+86ChoIskspWISTGwIIIBANQXsJ15MDSo2BFwWILHt8ugQGwIIpCpgr3FoHsdiQwABBKohYP69+fXDHUXDzvz618XMgPZty59x6Fv8xIsAAv4KmCde5jw5J+qAb0+8qLpJJJmiwWZjWTxV4ScCCFRDwOcnXqrhQxvuCZDYdm9MiAgBBBwRsGccznrkEUeiIgwEEMi6QFYe/zxu8vHRUJkZh6aIGxsCCCBQDQF7XWr7Wq4abVeyDS0abJbFW7VyVSVPzbkQQACBXgX0aWXz9LJPNV567RAfZF6AxHbmh5gOIoBAqQJmxuHkKZOjwx+dNavU03AcAgggUJSAzs4zs/V8fvzTLsT7xOOPF2XAzggggECpAnrNZq7hzLWcr5u9LN7DD3U8xeNrX4gbAQT8EDBPDT74wANRsKef8VU/gibK4AVIbAf/JwAAAgj0JTB5ygnRx2tWr5GFCxb2tSufIYAAAmULmFl5Znae2XS2XtknTfEEU6edE7VuCmGa5QHYEEAAgSQFzLWauWYzm17DJdle0ufWxNLTT88VlsVLWpvzI4DAb5/5bYxw+hmnx695gYDLAiS2XR4dYkMAgdQFjjjyCDGFh8zWPG9e6vEQAAIIZFtg7ty5UQfN459Hjj/S+84e8+Vj4j7YywPEb/ICAQQQqKDAnCefiM5mrt3MNZzvmyaWKCLp+0gSPwJ+CNwz8+4o0AlNTV4/8eKHNlFWSoDEdqUkOQ8CCGRW4Itf6kjMmMeymC2T2WGmYwg4IaBFI4899jgvi0bmI5rCl6YAptl0eYD8ffgdAQQQqISAuUbzvWhkvoNZSoUikvkq/I4AAkkImKcG9YmXE048MYkmOCcCiQiQ2E6ElZMigECWBHS2jOmTKerGhgACCCQhYAosmll5Zjvjq9lZ17Bp4sSoTyzpFDHwfwggkJCA/Qi9z0Uj83l0WSqzTBVLOuXr8DsCCFRKQNfyp2hkpUQ5T7UESGxXS5p2EEDAWwFmy3g7dASOgFcC855/LorXPELvc9HIfHSWdMoX4XcEEEhC4DePzY5Om7VH6O1lqX798K+ToOOcCCCAgJi1/M1mnhpkQ8AnARLbPo0WsSKAQGoCzJZJjZ6GEQhCwH6EXgsuZqnjLOmUpdGkLwi4J2AX3s3aI/T2kk6/e7azsJt7o0BECCDgq4ApvJvFpwZ9HQ/iLk6AxHZxXuyNAAKBCjBbJtCBp9sIVEnAfoR+/FHjq9Rq9Zo57rjO2T8s6VQ9d1pCIBSBrBXezR83e0mn1tbW/I/5HQEEEChLwC68m6WnBstC4WBvBEhsezNUBIoAAmkKMFsmTX3aRiD7All9hF5HznxJ0gJouuSKfsZPBBBAoFwBncmclcK7+R5mSSez7q3Z5s55Kv9jfkcAAQRKFrCfGjzl1FNLPg8HIpCWAInttORpFwEEvBOwZ8uYR17ZEEAAgUoImGJgpiiY2bL2CL3t85WTTo5+nfPkHDFfotgQQACBSgiYGcymOK3Z9FqtEud17Rynn9FRVFjXwXUtPuJBAAE/Bewn6bJUeNfP0SDqUgRIbJeixjEIIBCkQJfZMnM7imsECUGnEUCgogIvvvBifD572aP4zYy8sJdYsZdeyUj36AYCCKQkoDOYzYxmc62W1U2XdDLr4Jr1cNkQQACBSgjok3Tmybra2tpKnJJzIFBVARLbVeWmMQQQ8F1Aq0TrI6++94f4EUAgfQFdhmTylMlilj3K6ma+LOlyJNrnrPaVfiGAQPUEdAazXqNVr+XqtmSWdBpSNyRqtHnevOo2TmsIIJBJAfPUoHmSzmz6ZF0mO0qnMi1AYjvTw0vnEECg0gL6iKt55JXiPZXW5XwIhCdgL0My8XOTMg+gX5rM0ium72wIIIBAOQJm5rKZwWy2M77asVRHOedz/dgvfumYKERN5rseL/EhgIDbAvZTg/aTdW5HTXQIdBUgsd3Vg98QQACBPgW6LEdC8Z4+rfgQAQT6F7C/UGR5GRKVOObLHUkZ87vdd/2cnwgggEAxAjpz2cxkNjOas76xHEnWR5j+IVBdAX2CjmVIqutOa5UVILFdWU/OhgACAQjoo64vvcT6hgEMN11EIFEB/UKR9WVIFNEstWL6ajbtu37GTwQQQKBYAZ25rDOZiz3et/1ZjsS3ESNeBNwVsJ8a1Cfq3I2WyBDoXYDEdu82fIIAAgj0KGAvR7Jq5aoe9+FNBBBAoD8B+wtFCMuQqIf2leVIVISfCCBQioC9DInOZC7lPL4do0l8Ter7Fj/xIoCAGwLmOkw3liFRCX76KEBi28dRI2YEEEhVoMtyJHPnphoLjSOAgL8C9lIcISxDoiOlBSTN77aBfs5PBBBAoBCB0JYhURNN4pu1xU1ynw0BBBAoRWDe889Fh7EMSSl6HOOSAIltl0aDWBBAwBsBXY7kd8/+1puYCRQBBNwS0KU4QlmGRPVra2tFk9uv/nmRvs1PBBBAoCgBXRLu8MOPKOo433dmORLfR5D4EUhfYOvWrTLnyTlRICxDkv54EEF5AiS2y/PjaAQQCFSA5UgCHXi6jUCFBEJdhkT59EuU+VJlvlyxIYAAAsUImKXg1qxeEx2i12TFHO/7vixH4vsIEj8C6QoseHFBHADLkMQUvPBUgMS2pwNH2AggkK4Ay5Gk60/rCPguYC/BEdIyJDpu9pco+8uVfs5PBBBAoC+BuTuWghu420Ax12ShbROaJkRdNsuRtLa2htZ9+osAAmUKsAxJmYAc7pQAiW2nhoNgEEDAJ4Hx48dH4b7yp5d9CptYEUDAAQFdgsMsyVFTU+NARNUNwV6ORL9cVTcCWkMAAZ8FdCk4XRrO576UEntjY6OYpL7Z5jfPL+UUHIMAAgEL6DIkXzj66IAV6HpWBEhsZ2Uk6QcCCFRdYOLnJkVtmorSZlkBNgQQQKAQAdY17FDSL1MvvvhiIWzsgwACCEQC5por5GVI9M9Ak/qa5Nf3+YkAAgj0JWAXnT3qqI6nP/ran88QcF2AxLbrI0R8CCDgrIC9fIC9rICzARMYAgg4IWAvvWEvyeFEcFUMQr9MmUfp7S9ZVQyBphBAwEMB+5qrcXSjhz2oTMi6trhJ8ps1x9kQQACBQgSa582LdhtSN0RMMVo2BHwXILHt+wgSPwIIpCZglg+Y0NQUta/LCqQWDA0jgIA3AotffTWK1XyhMEtyhLqZL1PGwGz6JStUC/qNAAKFC/zmsdnRzpOnTA5yKSeVspP6LS0t+jY/EUAAgT4FXnppYfS5FqHtc2c+RMADARLbHgwSISKAgLsCkz7/+Sg4s06ZWV6ADQEEEOhP4Omn50a78IVC5PDDO4q+6Zes/uz4HAEEwhYw11pmCTizHfKZcUFjmAkWJrlvNk32Bw1C5xFAoF8B83SHLuV08MEH97s/OyDggwCJbR9GiRgRQMBZAXsZgdalVKV3dqAIDAFHBFpbW8UsvWG2CU2sa8ij9I78YRIGAp4IsJRT14HS5L5J9jPBoqsNvyGAQHeBF17oKDZris8ecWTH5ILue/EOAn4JkNj2a7yIFgEEHBMwywjwKL1jg0I4CDgsML+58wtFY2O4a8PqENlfqniUXlX4iQACvQnoUk6jx4wOeikn9bEnWNhJf/2cnwgggIAt8Iff/z76dfz48fbbvEbAawES214PH8EjgIALArqcgC4v4EJMxIAAAm4KvPKnl6PAjj32ODcDTCEqHqVPAZ0mEfBUQK+1Dv3sYZ72oLJhmwkWJslvNk36V7YFzoYAAlkRsJdymvi5SVnpFv1AQEhs80eAAAIIlCmg65OZ5QWoSl8mJocjkGGB9vb2eG3Ygw85JMM9La5rPEpfnBd7IxCqgLnGYimn7qOvSX5N+nffg3cQQAABEfupDr0hhgsCWRAgsZ2FUaQPCCCQqoD9KL2uW5ZqQDSOAAJOCmjBMxPckeOPdDLGNILiUfo01GkTAf8E9BrLrA3LUk6d46f1Gphg0WnCKwQQ6C6gT3WwlFN3G97xW4DEtt/jR/QIIOCIgD5Kr+uWORIWYSCAgEMC855/LorGfKGoqalxKLJ0Q7FrFeiXrnQjonUEEHBRQK+xWBu26+iYJL9J9ptNk/9d9+A3BBBAQESf6tCnPDBBICsCJLazMpL0AwEEUhXgUfpU+WkcAS8EXnzxxSjOLxx9tBfxVjNIrVXw0ksLq9ksbSGAgCcCrA3b90Bpsl+T/33vzacIIBCaAEs5hTbiYfWXxHZY401vEUAgIQH7UfrWpa0JtcJpEUDAV4HW1tZ4bdgxY8f62o3E4tZaBWtWr6FWQWLKnBgBfwVYG7bvsdNCcGbJK3MTgA0BBBCwBfRpDpZyslV4nRUBEttZGUn6gQACqQrYj9I3z5uXaiw0jgAC7gm0LFkSBcUXip7Hxq5V0NLS0vNOvIsAAsEK6DJFrA3b85+AXQjOvgnQ8968iwACoQno0xz6dEdo/ae/2RYgsZ3t8aV3CCBQRQEepa8iNk0h4JkAXyj6H7AJTU3RTs/98Y/978weCCAQlIAuU8TasD0Puz3BQm8C9Lwn7yKAQGgC9lJOunxmaAb0N9sCJLazPb70DgEEqihgP0rf3t5exZZpCgEEXBawv1Do4+Iux5tWbJM+//mo6fnNzWmFQLsIIOCggFkb1ixTZDa91nIwzNRDYoJF6kNAAAg4KWAvk2kvn+lksASFQAkCJLZLQOMQBBBAoCeBxtGN8dsvvtBRJC5+gxcIIBCsgP2Fwn5cPFiQXjo+ZsyY+JOFCygiGWPwAoHABezliexliwJn6dZ9TfpTq6AbDW8gELSALpM5pG6ImKc72BDImgCJ7ayNKP1BAIHUBGpqakSTVq/+eVFqcdAwAgi4JcAXisLGY//6/cWsQW62xYsXF3YQeyGAQOYF9JpKlyvKfIdL7KA9wcK+GVDi6TgMAQQyIqBLOR1++BEZ6RHdQKCrAIntrh78hgACCJQl8IWjj46Of/FFZmyXBcnBCGRIgC8UhQ/mscceF+38yp9eLvwg9kQAgUwLzHlyTtS/cYeOy3Q/y+2cmWChyX+9GVDuOTkeAQT8FjDLY+pSTk0TJ/rdGaJHoBcBEtu9wPA2AgggUIrAmLFjo8M2f7BZzJqQbAggELYAXyiKG/+DDzkkOmBpy1Ixa5OzIYBA2AKtra0xwFFHTYhf86JnAU3+M8GiZx/eRSA0AXM9pZv9VIe+x08EsiBAYjsLo0gfEEDAGYHGxs51tl94Yb4zcREIAgikI8AXiuLcdTknc5S9NnlxZ2FvBBDIikDLkiVRV8wyRWa5Ira+BZhg0bcPnyIQmsDiV1+Numyur8xTHWwIZFGAxHYWR5U+IYBAqgKTp0yO2l/0CutspzoQNI6AAwJ8oShuEExRI1PcyGy6NnlxZ2BvBBDIkoBeS40fPz5L3UqsL0ywSIyWEyPgpcDTT8+N4j70s4d5GT9BI1CIAIntQpTYBwEEEChC4JDPdKwBOb+5uYij2BUBBLIowBeK4kdVixvp2uTFn4EjEEAgKwJ6LaXXVlnpV5L9YIJFkrqcGwF/BMyymGZ5TLMdfPDB/gROpAgUKUBiu0gwdkcAAQT6ExgzZky8i702ZPwmLxBAIAgBvlCUNsy6zrYpdmTWKGdDAIEwBRYuWBh33L62it/kRY8CehNAbwr0uBNvIoBA5gVaWlriPrK+dkzBiwwKkNjO4KDSJQQQSFfArAFp1oI0m64NmW5EtI4AAmkI8IWiNPUjxx8ZH2ivUR6/yQsEEAhCYPHixVE/WV+7uOG2bwIwwaI4O/ZGIEsCr/65Y1nMCU1NrK+dpYGlL90ESGx3I+ENBBBAoHwBXQtS14Ys/4ycAQEEfBPgC0VpI2aKG2kRSV2jvLQzcRQCCPgs8MqfXo7C12sqn/tSzdiZYFFNbdpCwF2BF198MQpu3KEdy2S6GymRIVCeAInt8vw4GgEEEOhRgMdAe2ThTQSCEuALRenDrUWOWGe7dEOORMBnga1bt4o+saHXVD73p9qx680AJlhUW572EHBDwF4Ob8zYsW4ERRQIJCRAYjshWE6LAAJhC/AYaNjjT+8R4AtFeX8DWuSIdbbLc+RoBHwVaF3aGoduX1PFb/KiTwG9GcA6230y8SECmRXoshxeY2Nm+0nHEDACJLb5O0AAAQQSEOAx0ARQOSUCHgnwhaK8wbKLHOmszfLOyNEIIOCTAOtrlzda9s0A1tkuz5KjEfBRwF4Oz8f4iRmBYgRIbBejxb4IIIBAEQI8BloEFrsikDEBvlCUN6Css12eH0cj4LsA62uXN4JMsCjPj6MR8F2A5fB8H0HiL0aAxHYxWuyLAAIIFCHAY6BFYLErAhkT4AtF+QPKOtvlG3IGBHwV0Cc19FrK136kGTcTLNLUp20E0hNgOVP6QYYAAEAASURBVLz07Gk5HQES2+m40yoCCAQgwGOgAQwyXUSgBwH7C8WwYcN72IO3ChFgne1ClNgHgewJ2Etn2NdS2etpsj3SmwKss52sM2dHwDUBlsNzbUSIJ2kBEttJC3N+BBAIVoDHQIMdejoeuMCKFStiAXut6PhNXhQkUD+0Pt5PZ2/Gb/ACAQQyK9CyZEnUt4G7DRRzLcVWmoB9U8C+WVDa2TgKAQR8EWA5PF9GijgrJUBiu1KSnAcBBBDoQYDHQHtA4S0EMi6w+NVXox6OHjNazFrRbKUJ1NbWypC6IdHBy5cvL+0kHIUAAt4JLHplURSzXkN51wFHArZvCujNAkdCIwwEEEhQoK2tLTr7yFGjEmyFUyPgjgCJbXfGgkgQQCCDAiNGjox6xWOgGRxcuoRALwIvvbQw+kTXiO5lN94uQODww4+I9tJCcgUcwi4IIOC5gF4z6VIanncn1fAnNDVF7b+1bFmqcdA4AghUR6C9vV3WrF4TNaZLulWnZVpBID0BEtvp2dMyAggEIDBm7Ni4l2bdXTYEEMi2AF8oKju+Bx9ySHRCsxTJ1q1bK3tyzoYAAs4J2Etm2EtpOBeoJwGNO3RcFKkWNPYkbMJEAIESBeyl21gOr0REDvNOgMS2d0NGwAgg4JNAY2NjHK5dyCN+kxcIIJApAb5QVHY4zXIuurUubdWX/EQAgYwK2Etm2EtpZLS7iXdLJ1hs/mCzMMEicW4aQCB1AZbDS30ICCAFARLbKaDTJAIIhCWgj4FqIY+wek9vEQhLQNeCNmtDs752+WNvr7O9ePHi8k/IGRBAwGkBXTJDr52cDtaD4Jhg4cEgESICFRRgObwKYnIqbwRIbHszVASKAAK+CvAYqK8jR9wIFC+ga0Hr2tDFn4Ej8gUaGhqit5a9+Wb+R/yOAAIZE9AlM/TaKWPdS6U7epOACRap8NMoAlUTMEu26fraw4cPr1q7NIRA2gIkttMeAdpHAIHMCwwb1nFhYR4DNevvsiGAQDYFzBcKXYpE14bOZk+r2ystIKcF5arbOq0hgEC1BMxSGeZayWy6hEa12s5yOyNHjYq619bWluVu0jcEghewl2yzl3ILHgaAzAuQ2M78ENNBBBBIW8Au3KFJr7Rjon0EEKi8AF8oKm9qzmgXkLMLyyXTGmdFAIG0BOxaJPYSGmnFk5V2Dz744KgrZiYnEyyyMqr0A4HuArpkm1kOzyzlxoZAKAIktkMZafqJAAKpCZh1dvWuuRb0SC0YGkYAgcQE3n57eXTugbsN5AtFBZXtAnJ2YbkKNsGpEEDAAYHlb70VRaHXTA6ElIkQmGCRiWGkEwj0K6BLtukSbv0ewA4IZESAxHZGBpJuIICA2wIHHHBgFOAbb7zudqBEhwACJQssemVRdOz48eNLPgcH9iyga8RqYbme9+JdBBDwWYCiZ8mMnplgYWZwmk0LHCfTEmdFAIE0BXTJNl3CLc1YaBuBagqQ2K6mNm0hgECwArrerlmKxKzDy4YAAtkT4AtFcmOqheS0sFxyLXFmBBBIQ8AueqZLZ6QRR1bb1ILGWuA4q/2kXwiEKmAv1WYv4RaqB/0OS4DEdljjTW8RQCAlAfuxWnsd3pTCoVkEEKiwgCl6ptvQYUP1JT8rJKCF5CjCWyFQToOAYwL2tVH90HrHovM/HHuChf+9oQcIIJAvYC/VZi/hlr8fvyOQRQES21kcVfqEAALOCZgCHmbdXbPpOrzOBUlACCBQsgBFz0qmK+jA+vrORBdFeAsiYycEvBKg6FmywzV0aOcNV3tmZ7KtcnYEEKiWgC7Vpku3Vatd2kHABQES2y6MAjEggEAQArrurq7DG0Sn6SQCgQi8+ueO9bX5QpHMgFOENxlXzoqAKwIUPUt2JMwMTp1gYc/sTLZVzo4AAtUS0KXadOm2arVLOwi4IEBi24VRIAYEEAhCYMTIkVE/dR3eIDpNJxEIRKCtrS3q6chRowLpcfW7SRHe6pvTIgLVEtBrI4qeJSd+0EGN0cl1ZmdyLXFmBBCopkB7e7uYpdrMNmzY8Go2TVsIOCFAYtuJYSAIBBAIQUDXiDV9tdfjDaHv9BGBLAuYLxRrVq+JukjRs+RG2l4jliK8yTlzZgSqLWAvjUGNguT0dSanzuxMriXOjAAC1RSwl2hrHN1xA6ua7dMWAmkLkNhOewRoHwEEghFobOy80LDX4w0GgI4ikFGBlStWxj2j6FlMUfEX9hqxK1d2mle8IU6IAAJVFVjx9oq4PftaKX6TFxUR0AkWFOGtCCcnQcAZgeXLl0exDKkbImbpNjYEQhMgsR3aiNNfBBBIVWD0mNFR+8vfeivVOGgcAQQqJ6AFYc0XClMoli0ZAdaITcaVsyKQtgA1CqozAhThrY4zrSBQbYFX/vRy1OThhx9R7aZpDwEnBEhsOzEMBIEAAqEIHPrZw6KuvvTSwlC6TD8RyLyAFoRtaGjIfF/T7iBrxKY9ArSPQOUFqFFQedOezmgX4dUZnj3tx3sIIOCXgC5FMnzECL8CJ1oEKiRAYrtCkJwGAQQQKERg+PCOgh5mPV7WiC1EjH0QcF+AomfVGyPWiK2eNS0hUA0Bcy1EjYJqSHe0oUV4dYZn9VqmJQQQSELArlEwZsyYJJrgnAg4L0Bi2/khIkAEEMiSgC5FYvrEGrFZGln6EqqAXQiWomfJ/xWwRmzyxrSAQDUFWpe2xs1RoyCmSOyFzujUGZ6JNcSJEUCgKgJ2jQKzZBsbAiEKkNgOcdTpMwIIpCZg1t8duNvAqP2WJUtSi4OGEUCgMgJ2IViKnlXGtK+zsEZsXzp8hoB/AlqjwFwbUaMg+fGzZ3TaMz2Tb5kWEEAgCQFqFCShyjl9EyCx7duIES8CCHgvoGvE6rq83neIDiAQsIAWgrWfxgiYI/GumzViTZFOs7FGbOLcNIBA4gJ6LTR+/PjE26IBEXtGJxMs+ItAwH8BrVGgS7X53yN6gEDxAiS2izfjCAQQQKAsAb3weO21zsdvyzohByOAQGoCb7zxetS2FoZNLZCAGj788COi3i57882Aek1XEcimgF4LjRg5MpsddLBXE5qaoqjeWrbMwegICQEEChWwaxQMG9ZRx6nQY9kPgSwJkNjO0mjSFwQQ8EKANWK9GCaCRKBfAfOFQtcp1cKw/R7EDmUL6BqxWrSz7BNyAgQQSEXA1CjY/MHmqG29NkolkMAa1QkWOtMzsO7TXQQyI0CNgswMJR0pU4DEdpmAHI4AAggUK8AascWKsT8CbgrYBWCHDh3qZpAZjMou0skasRkcYLoUjMCKFSvivtrXRvGbvEhEQGd2rlm9RswNWjYEEPBTgBoFfo4bUVdegMR25U05IwIIINCnAGvE9snDhwh4I6Drk5qiZ/a6pd50wNNA7SKdK97uTIx52h3CRiBYAV0n39QoMNdGbNURqB9aHzdkz/iM3+QFAgh4IUCNAi+GiSCrIEBiuwrINIEAAgjkC7BGbL4IvyPgn4CuT6oFYf3rgb8R6xqxWrzT354QOQLhCrzyp5ejzh9wwIHhIqTQ89raWjE3ZM2mMz5TCIMmEUCgTAFqFJQJyOGZESCxnZmhpCMIIOCTAGvE+jRaxIpAzwK6PqmuV9rzXrybhMDIUaOi02rxziTa4JwIIJCsQFyjYMSIZBvi7N0Exo8fH72nMz677cAbCCDgtAA1CpweHoKrsgCJ7SqD0xwCCCBgBOw1Ys2FCRsCCPgl0N7eLmZ9UrPpeqV+9cDvaLVYp0mMsUas32NJ9GEK2Ovj29dEYWpUv9cjRo6MGtUZn9WPgBYRQKAcAWoUlKPHsVkTILGdtRGlPwgg4IVAlzVireJJXgRPkAggICtXrIwV7PVK4zd5kaiAXazTLuKZaKOcHAEEKiZgr49vXxNVrAFO1KfAmLFjo883f7BZzI1aNgQQ8EtAaxQMqRtCjQK/ho5oExAgsZ0AKqdEAAEEChEwxZLMtvjVVwvZnX0QQMAhAV2X1KxTatYrZauugF2sU4t4VjcCWkMAgXIEdH18XS+/nHNxbPEC9fWdBSTtG7XFn4kjEEAgDYFlb74ZNat1m9KIgTYRcEWAxLYrI0EcCCAQnIAWS2KN2OCGng5nQEDXJdV1SjPQJe+6oAkxLeLpXQcIGIGABfTaR9fLD5gila7X1NSImelptsWLF6cSA40igEDpAvObm6ODtW5T6WfiSAT8FyCx7f8Y0gMEEPBUQC9EtHiSp90gbASCFNB1SXWd0iARUu60Fu3UIp4ph0PzCCBQhIBe++h6+UUcyq4VEmhoaIjOpDM/K3RaToMAAgkL2PWZqFGQMDan90KAxLYXw0SQCCCQRYExY8bE3bKLKMVv8gIBBJwUMOuRmnVJzabrlDoZaMaD0qKdpognBSQzPth0L1MC9jWPvV5+pjrpQWf0xqzO/PQgZEJEAIGcgF04khoF/EkgIEJim78CBBBAICUBe41Yu4hSSuHQLAIIFChgr0dqr1Na4OHsViEBu2gnBSQrhMppEKiCgL0uvn0tVIWmacISsG/M2jNArV14iQACDgpo4Uit1+RgiISEQFUFSGxXlZvGEEAAga4CukasFlHq+im/IYCAiwJaOJJK9OmOjinaaYp3ms1OlKUbFa0jgEB/Arouvl4D9bc/nycjYN+YtWeAJtMaZ0UAgUoJ6PJBWq+pUuflPAj4KkBi29eRI24EEMiEgBZN0iJKmegUnUAg4wJaOFLXJ814d53u3kEHNUbxaaLM6WAJDgEEIgFdF1+vgWBJR8AUkNQZnzoDNJ1IaBUBBIoR0OWDtF5TMceyLwJZFCCxncVRpU8IIOCNgBZN0iJK3gROoAgELEDhSHcGnwKS7owFkSBQiIBZD9+si282vQYq5Dj2SUZAZ3zqDNBkWuGsCCBQKYEuNQqGDa3UaTkPAl4LkNj2evgIHgEEfBewiybZFyq+94v4EciqAIUj3RpZCki6NR5Eg0B/AvZ6+PY1UH/H8XkyAjrjU2eAJtMKZ0UAgUoJ2HWZKBxZKVXO47sAiW3fR5D4EUDAawG7aJJ9oeJ1pwgegQwLUDjSrcGlgKRb40E0CPQnYK+Hb18D9XccnycjMNSa8UkByWSMOSsClRTQuky6jFAlz825EPBVgMS2ryNH3AggkBkBLZ6kFyqZ6RgdQSCDAhSOdGtQKSDp1ngQDQL9Ceh6+Hrt09/+fJ6sgD3jkwKSyVpzdgQqIfDee+9Fp9FlhCpxTs6BgO8CJLZ9H0HiRwAB7wW0eBIFJL0fSjoQgACFI90bZApIujcmRIRAbwIUjuxNJr33deYnBSTTGwNaRqBQAV02SJcRKvQ49kMgywIktrM8uvQNAQS8ENDiSRSQ9GK4CDJwAQpHuvcHQAFJ98aEiBDoSYDCkT2ppP+ezvykgGT6Y0EECPQlYC8XZC8j1NcxfIZACAIktkMYZfqIAAJOC9jFkygg6fRQEVzgAhSOdPMPgAKSbo4LUSGQL0DhyHwRN34ftNegKBCdCepGVESBAAL5AvZyQfYyQvn78TsCoQmQ2A5txOkvAgg4J2AXT6KApHPDQ0AIxAIUjowpnHpBAUmnhoNgEOhVwL7Gsa99ej2AD6oiMGbs2Lgde0Zo/CYvEEDACQFdLkiXD3IiKIJAwAEBEtsODAIhIIAAAlpEiQKS/C0g4K4AhSPdHBsKSLo5LkSFQL6AXuPoNU/+5/yejkB9fX3csD0jNH6TFwgg4ISALhekywc5ERRBIOCAAIltBwaBEBBAAIG99947QqCAJH8LCLgrQOFId8eGApLujg2RIaACeo2jRbP1fX6mK1BTUyND6oZEQWzcuCHdYGgdAQR6FdDlgigc2SsRHwQqQGI70IGn2wgg4JaAXqBQQNKtcSEaBGwBCkfaGm691kRZW1ubW4ERDQIIxAJ6jaNFs+MPeJG6QENDQxSD3sBNPSACQACBLgL2MkEUjuxCwy8ICIlt/ggQQAABBwTsCxT7wsWB0AgBAQRyAnbhSC1WCIw7ApooW7N6jTtBEQkCCMQCdnFsu2h2vAMvUhUYMXJk1L7ewE01GBpHAIFuAvYyQRSO7MbDG4ELkNgO/A+A7iOAgBsC9gWKfeHiRnREgQACmzZtihHsYoXxm7xIVcBOlNkJtFSDonEEEIgFKBwZUzj5QgtIbv5gc3Qj18kgCQqBgAW0cKQuGxQwBV1HoJsAie1uJLyBAAIIpCOgFa71wiWdKGgVAQR6EmhZsiR6e+BuA8UUK2RzS2D/+v3jgOwEWvwmLxBAIFUBLRyp1zqpBkPj3QTsApIrV6zs9jlvIIBAugJaOFKXDUo3GlpHwC0BEttujQfRIIBAwAJa4VovXAKmoOsIOCfw1rJlUUxapNC5AAlIJjQ1RQqaQIMEAQTcEXjvvfeiYPRax53IiMQImAKS5sat2d5+e3n0k/9DAAF3BHSZIF02yJ3IiASB9AVIbKc/BkSAAAIIRAKD9hoU/dSK17AggIA7AlqUcNyh49wJiki6CGgByTfeeL3L+/yCAALpC+i1jRbLTj8iIsgX0Bu3FJDMl+F3BNIVsOu86LJB6UZE6wi4JUBi263xIBoEEAhYwL5QoYBkwH8IdN05ga1bt4oWJaRwpHPDEwc0aFDHzcGlLUvj93iBAALpC9jXNHax7PQjIwJbQG/cvvvuO/bbvEYAgZQF7OWB7GWDUg6L5hFwRoDEtjNDQSAIIBC6gH2hYheqC92F/iOQtsDKlZ3rje6xxx5ph0P7vQjYCTMKSPaCxNsIpCBgF8W2i2WnEApN9iGgN27NjVxzQ5cNAQTcENDlgcxyQWbZIDYEEOgqQGK7qwe/IYAAAqkJmAsVrXStFzCpBUPDCCAQC9jFCO0ihfEOvHBCwE6Ybdq4yYmYCAIBBES0KLZe42DipkD90Po4MPuGbvwmLxBAIBUBXR5IlwtKJQgaRcBhARLbDg8OoSGAQHgCWulaL2DCE6DHCLgnoMUItTihexESkQqMHjM6eqmJNH2fnwggkJ6AFsXWa5z0IqHlvgRqa2vjj1uWLIlf8wIBBNIV0OWBdLmgdKOhdQTcEyCx7d6YEBECCAQsoJWutfJ1wBR0HQFnBLQYoRYndCYwAukmsM8++0TvaSKt2w68gQACVRfQaxq9xql6ADRYsIDewH1r2bKCj2FHBBBIToA6L8nZcubsCJDYzs5Y0hMEEMiAgK5vuPmDzaxvmIHxpAvZENBihFqcMBu9ymYvNHE2v7k5mx2kVwh4JtDe3i7mmsZsdpFsz7oRTLh6A3fdunXB9JmOIuCygL0sEHVeXB4pYktTgMR2mvq0jQACCOQJsL5hHgi/IpCywKqVq+II7OKE8Zu8cErATpyZhBobAgikK2AXwyYpk+5YFNL68OHDo930hm4hx7APAggkJ2AvC0Sdl+ScObPfAiS2/R4/okcAgYwJmPUNTcVrs9kXMhnrJt1BwBuBFStWxLHaxQnjN3nhlEB9vVX8bMVKp2IjGARCFNBrGXNtY6/hHKKFD33eY8894jBbW1vj17xAAIF0BDas3xA1rMsEpRMFrSLgtgCJbbfHh+gQQCBAAa14zfqGAQ4+XXZOQIsQalFC5wIkoC4CNTU18c3Bt99e3uUzfkEAgeoL6LWMXttUPwJaLEbAvoG7aeOmYg5lXwQQSECAOi8JoHLKzAmQ2M7ckNIhBBDwXYD1DX0fQeLPkoAWIdSihFnqW1b7ogk0TahltZ/0CwEfBNra2qIwxx06zodwiTEnoDdy9cYuKAggkJ6ALgtEnZf0xoCW3Rcgse3+GBEhAggEJsD6hoENON11WuC11zoexdaihE4HS3CRgCbQNKEGCwIIpCewZvWaqPE99xyUXhC0XJTAAQccGO2vN3aLOpidEUCgYgLUeakYJSfKuACJ7YwPMN1DAAH/BFjf0L8xI+JsCpjig5s/2Bx1zi5KmM3eZqdXw4Z1FD8zCbWtW7dmp2P0BAHPBOw1mocOHepZ9OGGO2ivjpsQ85ubw0Wg5wg4IECdFwcGgRC8ECCx7cUwESQCCIQkwPqGIY02fXVZYNOmzvVF99ijs6CWyzETm4g9VitXUkCSvwkE0hJY8XZn8d396/dPKwzaLVLAvpFrbvCyIYBAOgIbN3YUjhxSNySdAGgVAU8ESGx7MlCEiQACYQmwvmFY401v3RRoWbIkCmzgbgOltrbWzSCJqpuAnUCzE2vdduQNBBBIVGDDho6kjF7TJNoYJ6+YQH19fXyulSu4ORhj8AKBKgssemVR1GJDQ0OVW6Y5BPwSILHt13gRLQIIBCKghepY3zCQAaebTgpo8UEtRuhkkATVo8CEpqbo/eVvvdXj57yJAALJC+g1jK7ZnHyLtFAJgZqaGjE3dM329tvLK3FKzoEAAiUIUOelBDQOCVKAxHaQw06nEUDAdQEtVKcXNK7HS3wIZFFg3bp1UbdGjhqVxe5luk9777131L/33nsv0/2kcwi4LKBrNOuazS7HSmxdBfSGrt7g7fopvyGAQNIC1HlJWpjzZ0mAxHaWRpO+IIBAZgR0fUNTuI71DTMzrHTEM4GlLUujiIcP7yhG6Fn4QYc7fMSIqP+aWAsag84jkIKAfe2i1zQphEGTJQqMO3RcdGRbW1uJZ+AwBBAoR4A6L+XocWxoAiS2Qxtx+osAAl4I2MXP7AsbL4InSAQyINDa2hr3Yo89KRwZY3jyYuiwoXGkq1auil/zAgEEqiNgr81sr9lcndZppVyBPfccFJ1izeo15Z6K4xFAoAQBrfNiDqXOSwmAHBKUAIntoIabziKAgC8C5gJG1ze0L2x8iZ84EfBdYNPGTXEXGhsb49e88EPATqRxc9CPMSPKbAno2szmWsas2czml8DQoZ03B+0bvX71gmgR8Fdgw/qO4rtaM8TfnhA5AskLkNhO3pgWEEAAgZIEWN+wJDYOQqAiAsuXdxTMGj1mdEXOx0mqK2ASaUPqhkSNaoKtuhHQGgJhC+jazHotE7aGf73fv37/OOgVb6+IX/MCAQSqI/DGG69HDVHnpTretOK3AIltv8eP6BFAIMMCeiGjBewy3FW6hoBzAsvefDOKaZ999nEuNgIqTGDfffeLdtQEW2FHsRcCCFRCQNdm1rWaK3FOzlFdAb2xu2FDx8zR6rZOawiELaB1XgYN6lgWKGwNeo9A3wIktvv24VMEEEAgNQEtWKcXNqkFQsMIBCjw2msda2yPGDkywN5no8uaUNMEWzZ6RS8Q8ENA12bWtZr9iJoobQG9sas3eu3PeI0AAskJ2LVB7JohybXImRHwW4DEtt/jR/QIIJBhAbtgHesbZnig6ZpzAlu3bpXNH2yO4hozdqxz8RFQYQKaUNMEW2FHsRcCCJQrYF+z2Gs1l3tejq+ugN7Y1Ru91W2d1hAIV2DFis7lf6jzEu7fAT0vXIDEduFW7IkAAghUVcC+kLEL2VU1CBpDIECBlStXxr3eY4894te88EvATqjZiTa/ekG0CPgnYF+z2Gs1+9eTsCPWG7vmRm97e3vYGPQegSoKbNzYsfyP1gqpYtM0hYCXAiS2vRw2gkYAgVAE9IJGL3BC6Tf9RCBNgZYlS+Lma2tr49e88EvATqhR/MyvsSNavwUovuv3+Gn09o3dTZs26dv8RACBhAUWvbIoaqGhoSHhljg9AtkQILGdjXGkFwggkFEBvaDRC5yMdpNuIeCUwIb1HTNlJjQ1ORUXwRQvQPGz4s04AoFyBXRNZl2judzzcXw6AubG7sDdBkaN2zd804mGVhEIR+Ddd9+JOqvLAYXTc3qKQGkCJLZLc+MoBBBAoCoCekHD+oZV4aYRBCKBN954Pfo5ctQoRDwX0MSaJto87w7hI+CFgF6z6DWMF0ETZI8CBx3UGL2vN3x73Ik3EUCgYgKmzovWBhk2bHjFzsuJEMiyAIntLI8ufUMAAe8F9ILGrG9oLnTYEEAgeYGlLUujRgYNGpR8Y7SQqIAm1jTRlmhjnBwBBKJrFYrvZucPQW/w6g3f7PSMniDgpgB1XtwcF6JyW4DEttvjQ3QIIBC4gL2+oX2hEzgL3UcgMYFVK1fF5x46bGj8mhd+ClD8zM9xI2p/BexrFfsaxt8ehR253uDVG75ha9B7BJIXsGuC2LVCkm+ZFhDwV4DEtr9jR+QIIBCAgH1BY1/oBNB1uohAKgJ2gaz6+vpUYqDRygnYiTV7bCvXAmdCAAFbwF6LmeK7toyfr+0bvPaNXz97Q9QIuC+wYQN1XtwfJSJ0TYDEtmsjQjwIIIBAnoAWsNMLnbyP+RUBBCoo8Pbby6OzDakbIjU1NRU8M6dKQ8BOrNkJtzRioU0EQhDQtZj12iWEPme5j/YNXm4OZnmk6ZsrAloTZO+993YlJOJAwHkBEtvODxEBIoBA6AJ6YaMXOqF70H8EkhR4a9my6PT77rtfks1w7ioKaIJNE25VbJqmEAhO4L333ov6rNcuwQFkrMPmBq+50Ws2vfGbsS7SHQScEpjf3BzFM2gv6rw4NTAE47QAiW2nh4fgEEAAARG9sNELHUwQQCA5gba2tujk4w4dl1wjnLmqAlr8TBNuVW2cxhAITECvVYaPGBFYz7PbXb3Ru+iVRdntJD1DwAGB9vb2OAqtERK/wQsEEOhVgMR2rzR8gAACCLghYF/Y2Bc8bkRHFAhkS2DN6jVRh/bck5kyWRlZLX6mCbes9It+IOCagH2NYq/N7FqcxFOcgN7offfdd4o7kL0RQKAoAXu5H7tGSFEnYWcEAhQgsR3goNNlBBDwS8C+sLEvePzqBdEi4L5Aa2trHOQee+4Rv+aF3wJ2go3iZ36PJdG7LbByxco4QHtt5vhNXngpoDd69cavl50gaAQ8ENBaIAN3Gyh2jRAPQidEBFIVILGdKj+NI4AAAv0LmAsbc4FjNr3g6f8o9kAAgWIFNm3cFB/S2NgYv+aF3wJ2go2bg36PJdG7LaBrMJtrForvuj1WxURn3+i1bwAXcw72RQCB/gW0FshBB3EN2r8WeyDQKUBiu9OCVwgggICzAnqBoxc8zgZKYAh4LLBx44Yo+tFjRnvcC0LPFzAJNr05qIm3/H34HQEEyhfQ4rt6zVL+GTmDCwL2jV77BrALsREDAlkS0FogWhskS32jLwgkKUBiO0ldzo0AAghUSEAvcN544/UKnZHTIIBAvoAWxtpnn33yP+J3zwU00aaJN8+7Q/gIOCmwbt26KC69ZnEySIIqSUBv+OoN4JJOwkEIINCngNYC0dogfe7MhwggEAuQ2I4peIEAAgi4K6AXOEtblrobJJEh4LmAFsYaMXKk5z0h/HwBTbRp4i3/c35HAIHyBfQaZfjw4eWfjDM4JaA3fPUGsFPBEQwCGRCwa4DYtUEy0DW6gEDiAiS2EyemAQQQQKB8AfsCx77wKf/MnAEBBIzA1q1bRQtjDRtGUiZrfxWaaNPEW9b6R38QSFvAvjax12ROOy7ar4yA3vDVG8CVOStnQQABFbBrgNi1QfRzfiKAQO8CJLZ7t+ETBBBAwBkB+wLHvvBxJkACQcBzgZUrV8Y92GOPPeLXvMiGgJ1osxNw2egdvUAgfQH72sRekzn9yIigEgJ6w9fcADY3gtkQQKCyAloDhOK7lXXlbGEIkNgOY5zpJQIIeC5A8TPPB5DwnRdY8faKOMb96/ePX/MiGwJ2os1OwGWjd/QCgfQFNCkzpG5I+sEQQcUF7Bu+9o3gijfECREIVEBrgGhNkEAZ6DYCJQmQ2C6JjYMQQACB6gvohY5e+FQ/AlpEILsCGzZsiDqnBbKy29Nwe6YJN03AhStBzxGovICuvbzvvvtV/uScMXUB+4avfSM49cAIAIGMCGgNEK0JkpFu0Q0EqiJAYrsqzDSCAAIIlC+gFzp64VP+GTkDAgiowLI334xeaoEsfZ+f2RHQhJsm4LLTM3qCQPoCuvbyuEPHpR8MESQioDd+9UZwIo1wUgQCFdAaIIMGDQpUgG4jULoAie3S7TgSAQQQqKqAXujohU9VG6cxBDIu8NprrVEPtUBWxrsbZPc04aYJuCAR6DQCCQlo8d099yQpkxBx6qfVG796Izj1gAgAgYwI2LU/hg4bmpFe0Q0EqidAYrt61rSEAAIIlCVgX+jYF0BlnZSDEUAgKoS1+YPNkYQWyIIlewKacNMEXPZ6SI8QSEegtbXjxqBp3S7Umk40tJqUgN741RvBSbXDeREITcCu/WHXBAnNgf4iUKoAie1S5TgOAQQQqLKAfaFjXwBVOQyaQyBzAnYhLLtAVuY6GniH7ISbnYgLnIXuI1C2wKaNm+Jz2Ncq8Zu8yISA3vg1N4K3bt2aiT7RCQRcENDaH1oLxIWYiAEBnwRIbPs0WsSKAALBC+gFj14ABQ8CAAIVELALYdkFsipwak7hkICdcLMTcQ6FSCgIeCmwcWNH8V29RvGyEwTdr4B949e+IdzvgeyAAAJ9Cry1bFn0udYC6XNnPkQAgW4CJLa7kfAGAggg4K6AXvDoBZC7kRIZAv4IaCEsLYzlT+REWqyAJt40EVfs8eyPAALdBbQgq16jdN+Dd7IgYN/4tW8IZ6Fv9AGBNAXWrVsXNa+1QNKMhbYR8FGAxLaPo0bMCCAQrIBe8OgFULAQdByBCgpoIawDDjiwgmflVC4KaOJNE3EuxkhMCPgmoAVZ9RrFt/iJt3ABvQGsN4QLP5I9EUCgN4GlLUujj7QWSG/78T4CCPQsQGK7ZxfeRQABBJwU0AsevQByMkiCQsAzAS2ENWivQZ5FTrjFCmjiTRNxxR7P/ggg0F1AC7LqNUr3PXgnKwL77LNP1BW9IZyVftEPBNISWLVyVdy0XQskfpMXCCDQrwCJ7X6J2AEBBBBwR8C+4LEvhNyJkEgQ8EvAFMAyhbDMNmbsWL+CJ9qiBTTxpom4ok/AAQgg0EXALsRqX6N02YlfMiMwYuTIqC96QzgzHaMjCKQksGkTxXdToqfZDAmQ2M7QYNIVBBDIvkCX4mfWhVD2e04PEUhGwC6AZRfGSqY1zpq2gJ14sxNyacdF+wj4KmAXYrWvUXztD3H3LTBs2PBoB3ND2NwYZkMAgfIE3n57eXQCrQFS3tk4GoEwBUhshznu9BoBBDwW0AsfvRDyuCuEjkDqAnYBrNra2tTjIYBkBezEm52QS7ZVzo5AdgW0EKtem2S3p/TMCNg3gO0bw+gggEBpAm8tWxYdqDVASjsLRyEQtgCJ7bDHn94jgICHAnrhoxdCHnaBkBFwRkALYE1oanImJgJJVkATcJqQS7Y1zo5AtgW0EKtem2S7t/Ru//r9YwT7xnD8Ji8QQKAogXXr1kX7aw2Qog5mZwQQiARIbPOHgAACCHgmoBc+eiHkWfiEi4BTAloA61Of2sWpuAgmOQFNwGlCLrmWODMC2RfQQqx6bZL9HtPD0WNGRwh6YxgRBBAoXWBpy9LoYK0BUvqZOBKBcAVIbIc79vQcAQQ8FdALH70Q8rQbhI2AEwJaAEsLYjkRFEEkKqAJOE3IJdoYJ0cg4wJaiFWvTTLeXbqXE9hnn30iB70xDAoCCJQmsGrlqvhAuwZI/CYvEECgIAES2wUxsRMCCCDgjoB94WNfELkTIZEg4IeAKXxlCmCZTQti+RE5UZYjoAk4TciVcy6ORSBkAbsAq31tErJJCH3XG8F6YziEPtNHBJIQ2LRpU3xauwZI/CYvEECgIAES2wUxsRMCCCDgjkB9fX0cjH1BFL/JCwQQKEjALnxlF8Qq6GB28lbATsDZiTlvO0TgCKQkYBdgJSmT0iCk0KzeCDY3hs0NYjYEEChN4O23l0cHau2P0s7CUQggQGKbvwEEEEDAM4GamhoZuNvAKGq9IPKsC4SLgBMCduEruyCWE8ERRGICdgJu64ckZRKD5sSZF9ACrCRlMj/UXTpo3wi2bxB32YlfEECgX4G3li2L9tHaH/0ewA4IINCjAIntHll4EwEEEHBb4KCDGqMA9YLI7WiJDgE3BbTwlRbCcjNKokpCQBNx3BxMQpdzhiKgBVhJyoQy4h39tG8E2zeIw1KgtwiUL7Bu3broJCNHjSr/ZJwBgYAFSGwHPPh0HQEE/BXQCyC9IPK3J0SOQHoCWvhKC2GlFwktV1tAE3HcHKy2PO1lSeCvf90SdUcLsmapb/SlbwG9Iaw3iPvem08RQKAngaUtS6O3Bw0a1NPHvIcAAgUKkNguEIrdEEAAAZcE9AJIL4hcio1YEPBFQAtfaSEsX+ImzvIFNBHHzcHyLTlDuAJ6DaIFWcOVCK/nekNYbxCHJ0CPEShPYNXKVfEJhg4bGr/mBQIIFC9AYrt4M45AAAEEUhewL4DsC6PUAyMABDwSMIWvzKaFsDwKnVDLFNBEnCbmyjwdhyMQnIB97WEXZA0OItAO6w3hd999J1ABuo1AeQKbNm2KT1BfXx+/5gUCCBQvQGK7eDOOQAABBFIXsC+APtz6YerxEAACvgm0trbGIduFsOI3eZFpATsRZyfoMt1pOodABQXspIxdkLWCTXAqhwX0hvCa1WscjpLQEHBXQGt8DNxtoNTU1LgbKJEh4IEAiW0PBokQEUAAgXwBcwFkLoTM1rJkSf7H/I4AAv0IbNrYOVPGLoTVz2F8nBEBOxFnJ+gy0j26gUDiApqU0UKsiTdIA04J2DeE7RvFTgVJMAg4LLBh/YYouoMOanQ4SkJDwA8BEtt+jBNRIoAAAt0E9EJIL4y67cAbCCDQq8DGjR1fKLQAVq878kFmBfTmoCboMttROoZAAgJaeFULsSbQBKd0WMC+IWzfKHY4ZEJDwCmB9957L4pn5KhRTsVFMAj4KEBi28dRI2YEEEAgJ6AXQnphBAoCCBQusOiVRdHOWgCr8CPZMysCenNQE3RZ6Rf9QKAaAlp4Va9FqtEmbbgloDeG9UaxW9ERDQJuC8xvbo4CHDRokNuBEh0CHgiQ2PZgkAgRAQQQ6ElAL4T0wqinfXgPAQR6FtCCV1oAq+e9eDfLApqQ0wRdlvtK3xCotIAWXtVrkUqfn/O5L/CpT+0aBak3it2PmAgRcEOgvb09DmTosKHxa14ggEBpAiS2S3PjKAQQQCB1AftCyL5ASj0wAkDAAwEteLXnnsyU8WC4EglRE3KaoEukEU6KQAYF7IKr9rVIBrtKl/oQGHfouOhTvVHcx658hAACloBd26O+vt76hJcIIFCKAIntUtQ4BgEEEHBAwC7cY18gORAaISDgtIBd6GqPPfdwOlaCS07ATshxczA5Z86cPYEPt34Yd4qkTEwR3Au9Maw3ioMDoMMIlCjQsmRJfGRNTU38mhcIIFCaAInt0tw4CgEEEEhdoLa2No7BvkCK3+QFAgj0KGAXumpspBp9j0gBvGkn5Lg5GMCA08WKCeg1hynASlKmYqzenci+MWzfMPauIwSMQJUFNqzvKGA+oampyi3THALZFCCxnc1xpVcIIBCIgF4Q/e1vnbOnAuk63USgZAEtdDWkbkjJ5+BA/wVMQs4k5symiTr/e0UPEEheQJMyWoA1+RZpwUUB+8bw1g+3uhgiMSHgpMB7770XxfX/s3c/sHVl92Hnz+4ki6B4JEUNgvLxiaRM8ZESZQ/4R9lqthin4tRN1gs4cZx/dRZB1/EkDZw/8CZxsg66aLprx3aToovGjZ0ZJ27QXTtO1nYNN00bm2oTBOIGoqjKESXySRqJFP/sFh6K5MPCu4PBru558zs8Ev+9P/fP+fMlEOjqvnvP+f0+Rw7P/M679wwMDDgZH0Eh4JsAhW3fRox4EUAAAUtAJkSLN29aZzlEAIGjBG4tLuqPh4ZOH3UZn0UgIIU5KdRFkDIpItCxgBRlZAPWjhukAW8FZIF4aem2tzkQOAJ5C1y/vqC7rJxin5e87ekvTAEK22GOK1khgEAkAjIhkglSJGmTJgIdCaysrOj7ZeOrjhrjZq8FZHFQCnVeJ0PwCOQkcHl2VvfU3d2VU49046qALBDLgrGrcRIXAq4I1Ot1tfXalg5n+sIFV8IiDgS8FqCw7fXwETwCCMQuIBOiZIKUTJT4QQCB4wWuzV/TF3V1dR9/MVcELSCLg1KoCzpZkkMgBQF7o1WZg6TQLE14KiDf2pcFY0/TIGwEchOo1Wqmr3KZDcwNBgcIdCBAYbsDPG5FAAEEihboKu19W8qeKBUdF/0j4KrAndodE9ro2Kg55iBOAbswx+JgnP8GyLo1AXujVYoyrdmFeHWl0niVgiwYh5gjOSGQpsDy0rJprq+vzxxzgAAC7QtQ2G7fjjsRQACBwgVGqiMmBnuiZE5ygAACTwjs1vc2Wq1Wq098xl/iE7ALcywOxjf+ZNy6gD3XoCjTul9od9gLxPbCcWh5kg8CaQmsra3ppqamp9JqknYQiF6Awnb0/wQAQAAB3wVkYrS7u+N7KsSPQOYC81ev6j56T/aqUqmUeX904LaAXZizC3ZuR010CBQnIEWZSzMzxQVBz84I2AvE9sKxMwESCAKOCSzevKkjGhwcdCwywkHAXwEK2/6OHZEjgAACWkAmRnNX5hBBAIFjBNYeNr4pMzExecyVfByLgCwOSsEulrzJE4F2BKQo09PDHgXt+IV2T7JAnCwUJz+ycBxajuSDQJoCDx7c182dGx9Ps1naQiBqAQrbUQ8/ySOAQAgCMjGSiVIIOZEDAlkJrK6u6qZlw6us+qFdfwRkcVAKdv5ETqQI5C9w/fqC7lTmHvlHQI+uCchCsSwcuxYf8SDgksC9u/d0OGNjZ10Ki1gQ8FqAwrbXw0fwCCCAgFL9/Y2Ne2SihAkCCBwucHl2Vn/Y3b238erhV/NJDAJSoGNxMIbRJsdOBbZe29JNUJTpVDKc+wcGBnQysnAcTmZkgkC6AgsLjYXBpNVSF6/DS1eX1mIWoLAd8+iTOwIIBCFQ7i+bPOwJkznJAQIIaIHNzU0jMX3hgjnmIG4BKdCxOBj3vwOyP17AnmPYG68efydXhCxQOdX4goUsHIecK7kh0InAxvqGuX1yklfiGQwOEOhQgMJ2h4DcjgACCBQtYE+M6rv1osOhfwScFdjY2PsPCooyzg5T7oHZ35qyC3e5B0KHCDguYBdlRqojjkdLeHkJ2AvF9Trz0Lzc6cc/gfX1xj4vw2eG/QueiBFwWIDCtsODQ2gIIIBAswIyQVpaut3sLVyHQHQCy0vLJue+vj5zzEHcAvbioF24i1uF7BHYL0BRZr8JZ5SyF4prtRokCCBwiMCtxUX9ydDQ6UOu4DQCCLQjQGG7HTXuQQABBBwTkAmSTJgcC49wEHBCYG2t8U2ZSzMzTsRDEO4IyOKgFO7ciYxIEHBHYO7KnA5G5hzuREYkRQrYC8X2AnKRMdE3Ai4KrKys6LAuPn/RxfCICQFvBShsezt0BI4AAgjsCYyfP6//IhOmvU84QgABEVi8eVMf9vR0yyn+REALSKGOxUH+QSBwuMD29iP9IUWZw41i/WRqekqnLgvIsTqQNwJHCVybv6Y/7upiHnqUE58h0KoAhe1WxbgeAQQQcFCgUmls3CMTJgdDJCQEChd48OC+juHc+HjhsRCAWwJSqGNx0K1xIRq3BGSO0d/fmHO4FR3RFCkwODiou5cF5CJjoW8EXBS4U7tjwhodGzXHHCCAQOcCFLY7N6QFBBBAoHABe4K0ublZeDwEgICLAvfu3tNhjY2ddTE8YipQQL49JYW7AkOhawScFLCLMuX+spMxElRxArJgLAvIxUVCzwi4KbBb3zWBVatVc8wBAgh0LkBhu3NDWkAAAQQKF7AnSBsbG4XHQwAIuCawsLBgQip1lcwxBwgkAvbioF3AQwcBBBoC9tzCnnPgg0AiIAvGsoCMCgIIPCkwf/WqPtF7sleVSsxDn9Thbwh0JkBhuzM/7kYAAQScELAnSDJxciIwgkDAEYGN9b0Fn8nJSUeiIgxXBOxCnf2tKlfiIw4EihZYWrqtQ6AoU/RIuNm/vWBsLyS7GS1RIZC/wNrDxgbmExPMQfPXp8fQBShshz7C5IcAAtEIXJqZ0bnKxCmaxEkUgSYE1tcb/0ExfGa4iau5JDaBZHEwKdglPywOxjb65NuMgMwtKMo0oxXfNfaCcX23Hh8AGSNwjMDq6qq+YmBg4Jgr+RgBBFoVoLDdqhjXI4AAAo4KyERJJk6OhklYCBQicGtxUfc7NHS6kP7p1H0BKdhJAc/9iIkQgfwEZG4xfv58fp3Sk1cCsnAs3+73KniCRSBjgevXG6/Eq5xi892MqWk+QgEK2xEOOikjgECYAjJRkolTmFmSFQLtCaysrOgbLz5/sb0GuCt4ARYHgx9iEuxA4PLsrL67u7urg1a4NWQBWTiWheSQcyU3BFoRqNfrauu1LX3L9IULrdzKtQgg0IQAhe0mkLgEAQQQ8EFANu5JJk7JBIofBBDYE7g2f03/paure+8kRwhYAiwOWhgcImAJ2HMKijIWDIdPCMi3+be3d544z18QiF2gVqsZgq4Si4MGgwMEUhKgsJ0SJM0ggAACRQuUy2UTgj2BMic5QCBSgc3NTZP56NioOeYAAVtACnYsDtoqHCOglD2nsOca2CBgC1QqjVcsyLf77c84RiBmgeWlZZP+SHXEHHOAAALpCFDYTseRVhBAAIHCBeyJ0sb6RuHxEAACrghsbOz976FarboSFnE4JmB/i8ou5DkWJuEgkLuAXZTp6+vLvX869EPAXji2F5T9iJ4oEchOYHe38RTD1PRUdp3QMgIRC1DYjnjwSR0BBMITkAnT+vpaeMmREQJtCsxfvWruLJVK5pgDBGwBFgdtDY4R2BOgKLNnwdHhAva3+e0F5cPv4BME4hCYuzKnEx0cHIwjYbJEIGcBCts5g9MdAgggkKVAT88J3bxMoLLsi7YR8EVgZ2dXh3ppZsaXkImzIAEWBwuCp1unBWROQVHG6WEqPDj72/z2gnLhgREAAgULPHhwX0dwbny84EjoHoEwBShshzmuZIUAApEKXHz+os58e/tRpAKkjcB+gcWbN/XJgYGB/R9yBgFLgMVBC4NDBN4UoCjDP4VmBWQBWRaUm72P6xAIWeDe3Xs6vf7+xnvoQ86V3BAoQoDCdhHq9IkAAghkJCATpmvz1zLqgWYR8E/g+vUFHXTlFP9B4d/o5RuxLA5KIS/f3ukNATcFKMq4OS4uRtXT063DkgVlF2MkJgTyFLhTu2O6K/eXzTEHCCCQngCF7fQsaQkBBBAoXMCeMNkTqcIDIwAEChKo1+tq67Ut3fvY2NmCoqBbXwRkcVAKeb7ETZwIZCVgzyXsOUZW/dGu3wLyqgVZUPY7G6JHoHMB+33zk5OTnTdICwggsE+AwvY+Ek4ggAAC/gpUq1UT/G698V5hc4IDBCIUqNVqJmt7YytzkgMELAG7cGcX9KxLOEQgKgGKMlENd8fJygKyLCh33CANIOC5wNLSbZ1B78lezzMhfATcFaCw7e7YEBkCCCDQskCpVFIycWLjnpb5uCFAgY31DZPVSHXEHHOAwEEC9uKgXdA76FrOIRCDAEWZGEY5vRxLXSXT2MJC4zVg5gQHCEQosPZwTWc9McG3tSMcflLOSYDCdk7QdIMAAgjkJSATJ5lI5dUv/SDgosD6euM/KIbPDLsYHjE5JmAvDkpBz7EQCQeBXAVkLiFzi1w7pzPvBOxXLdgLy94lQsAIpCSwurqqWxo/fz6lFmkGAQSeFqCw/bQIf0cAAQQ8FxgYGNAZyETK83QIH4GOBG4tLur7h4ZOd9QON8cjIAU8KejFkzmZIrBfQOYSFGX223DmYAFZSJaF5YOv4iwCcQhcnp3ViXZ3d8WRMFkiUIAAhe0C0OkSAQQQyFKgcqqim2fjniyVadsXgZWVFR3qxecv+hIycRYswOJgwQNA904JUJRxaji8CEYWkmVh2YugCRKBDASSDczlZ/rCBTnkTwQQSFmAwnbKoDSHAAIIFC0gE6dk4x57QlV0XPSPQBEC1+av6W67urqL6J4+PRRgcdDDQSPkTATsOYTMLTLpiEaDEpBv98vCclDJkQwCLQiwgXkLWFyKQAcCFLY7wONWBBBAwEWBrtLeo272hMrFWIkJgSwFNjc3TfOjY6PmmAMEjhKQAh6Lg0cp8VkMAvYcolwux5AyOaYgUKk0nhyUheUUmqQJBLwUWF5aNnH39fWZYw4QQCBdAQrb6XrSGgIIIFC4wEh1xMTAxj2GgoMIBTY2NkzW1WrVHHOAwFECLA4epcNnMQlQlIlptNPL1V5ItheY0+uBlhDwQ2B3d0cHOjU95UfARImApwIUtj0dOMJGAAEEjhJg456jdPgsFoH5q1dNqqVSyRxzgMBRAiwOHqXDZzEJUJSJabTTy9X+dr+9wJxeD7SEgB8Cc1fmdKA9PSf8CJgoEfBUgMK2pwNH2AgggMBRArJxj0yojrqWzxAIVWBnZ1endmlmJtQUySsjAfl21fr6WkY90CwC7gvIHGJwcND9YInQGQH7lQv2t/6dCZBAEMhJYHv7ke6JDcxzAqebaAUobEc79CSOAAIhC8gESiZUIedKbggcJrB486b+aGBg4LBLOI/AgQLy7Sop7B14EScRCFzgwYP7OsNz4+OBZ0p6aQvIgvLaGouDadvSnj8C8p75/v7Ge+f9iZxIEfBLgMK2X+NFtAgggEBTAl1d3fo6mVA1dRMXIRCYwPXrCzqjyin+gyKwoc08HRYHMyemAw8E7t29p6OkKOPBYDkWYk9PYx4qC8yOhUc4CGQucKd2x/RR7mfzXYPBAQIZCFDYzgCVJhFAAIGiBdi4p+gRoH8XBLZe29JhjI2ddSEcYvBIQAp5LA56NGiEmqoARZlUOaNrTL7lL9/6jw6AhKMX2K03XoeXQLCBefT/HADIWIDCdsbANI8AAggUIWBPoNi4p4gRoM+iBRYWGt/WTuKwN7IqOi7690PA/naVXeDzI3qiRKBzAXvuYM8pOm+ZFmIQkAVl+dZ/DDmTIwK2gGxg3nuyV7GBuS3DMQLpC1DYTt+UFhFAAIHCBewJlEysCg+KABDIUWBjfcP0NlIdMcccINCMgF3Is7911cy9XINACAJLS7d1GhRlQhjN/HModZVMp/ZCsznJAQKBC6w9bLxffmJiMvBMSQ+B4gUobBc/BkSAAAIIZCIgG/fs7Ow9CpdJRzSKgIMC6+uN/6AYPjPsYHSE5LoAi4OujxDxZS1AUSZr4bDbn5zcK+bVd+thJ0t2CBwgsLq6qs+ygfkBOJxCIGUBCtspg9IcAggg4IqATKTYuMeVESGOPAVuLS7q7oaGTufZLX0FJMDiYECDSSotC1CUaZmMG54SSL7tn/zIt/+f+pi/IhC0ABuYBz28JOeYAIVtxwaEcBBAAIG0BCqnKropmVil1S7tIOCDwPb2jg5z/Px5H8IlRgcFWBx0cFAIKTcBmTvIXCK3jukoGAF5BYN8+z+YxEgEgWME6vW6YgPzY5D4GIEUBShsp4hJUwgggIBLArJxj0ysXIqNWBDIWuDy7KzuolJpLPBk3R/thycgBT0p8IWXIRkhcLCAXZSZvnDh4Is4i8AxArKwLN/+P+ZyPkYgGIFarWZyYQNzQ8EBApkJUNjOjJaGEUAAgWIF2LinWH96L05gc3PTdD46NmqOOUCgFQEWB1vR4tqQBOyiTFepK6TUyCVHge7uxr8dWWjOsWu6QqBQATYwL5SfziMUoLAd4aCTMgIIxCHAxj1xjDNZ7hfY2NgwJ/mmjKHgoEUBFgdbBOPyYAQoygQzlIUmYn/bP3kKgB8EYhFgA/NYRpo8XRGgsO3KSBAHAgggkIHA8Jlh3Sob92SAS5POCiwvLZvY+vr6zDEHCLQiYC8O2oW+VtrgWgR8FKAo4+OouRez/W1/+ykA9yIlIgTSFWAD83Q9aQ2B4wQobB8nxOcIIICAxwJDQ6d19DLB8jgVQkegaYHd3cbGkVPTU03fw4UIHCQgi4NS6DvoGs4hEJq71ISOAABAAElEQVSAzBlkDhFafuSTj8BIdcR0xOKgoeAgAoGVlRWd5cXnL0aQLSkiULwAhe3ix4AIEEAAgcwEZOOe7e1GoS+zjmgYAYcE5q7M6WgGBwcdiopQfBSQwp4U+nzMgZgRaFWAokyrYlx/mIAsMLM4eJgQ50MUuDZ/TafV1dUdYnrkhIBzAhS2nRsSAkIAAQTSE2DjnvQsackfgQcP7utgz42P+xM0kTopwOKgk8NCUBkLUJTJGDii5nt6TuhsZcE5otRJNVIBNjCPdOBJu1ABCtuF8tM5AgggkK0AG/dk60vrbgrcu3tPB9bfX3EzQKLyRqBSafwbujw7603MBIpAJwIUZTrR496nBeRVDNvbj57+iL8jEKQAG5gHOawk5bgAhW3HB4jwEEAAgU4EyuWyuZ2NewwFBwEL3KndMdmV+/f+/ZuTHCDQgsDo2Ki52i74mZMcIBCYAEWZwAa04HRkgVmeAig4HLpHIHMBNjDPnJgOENgnQGF7HwknEEAAgXAE+vr6TDL2RMuc5ACBwAR267smo2q1ao45QKAdAXtx0C74tdMW9yDgg4A9V7DnED7ETozuCdgLzCwOujc+RJS+wNramm700sxM+o3TIgIIHChAYftAFk4igAAC4QjIxj27u2wgGc6okslhAvNXr+qPek/2qlKpdNhlnEegKQG7sGcX/Jq6mYsQ8FCAooyHg+ZwyPYCM4uDDg8UoaUmsHjzpm6rp4eNI1NDpSEEjhGgsH0MEB8jgAACvguwcY/vI0j8rQisPWx8U2ZiYrKV27gWgUMFWBw8lIYPAhSgKBPgoBaYkr3ALAvPBYZD1whkLsAG5pkT0wEC+wQobO8j4QQCCCAQlgAb94Q1nmRztMDq6qq+YGBg4OgL+RSBJgVYHGwSisuCEKAoE8QwOpWEvJJhZ2fvVWFOBUgwCKQowAbmKWLSFAJNClDYbhKKyxBAAAFfBdi4x9eRI+52BK5fX9C3VU5V2rmdexDYJ8Di4D4STgQsQFEm4MEtKDV5JYM8DVBQGHSLQOYCbGCeOTEdIHCgAIXtA1k4iQACCIQjYG/cY0+4wsmQTBDYE9h6bUv/ZWzs7N5JjhDoQIDFwQ7wuNUrAXuOYM8dvEqCYJ0TODc+rmOSpwGcC5CAEEhJwH6P/OQkr8RLiZVmEDhWgML2sURcgAACCPgtYG/cs1vnMVC/R5PojxJYWGh8Wzu5plwuH3UpnyHQtIBd4LMLf003wIUIeCJAUcaTgfIsTFlolqcBPAufcBFoWmBp6ba+NtnAnB8EEMhPgMJ2ftb0hAACCBQiwMY9hbDTaQECG+sbpteR6og55gCBTgRYHOxEj3t9EqAo49No+RNrqatkgrUXoM1JDhAIRIANzAMZSNLwToDCtndDRsAIIIBA6wJs3NO6GXf4J7C+vqaDHj4z7F/wROysAIuDzg4NgaUsQFEmZVCa0wL2Kxnqu3VUEAhWgA3Mgx1aEnNcgMK24wNEeAgggEAaAgMDA7oZNu5JQ5M2XBW4tbioQxsaOu1qiMTlqQCLg54OHGG3JEBRpiUuLm5BQF7NIE8FtHArlyLgjQAbmHszVAQamACF7cAGlHQQQACBgwQqpyr6NBv3HKTDuVAEtrd3dCrj58+HkhJ5OCLA4qAjA0EYmQpQlMmUN+rGJyYaG+nJUwFRY5B8sAJsYB7s0JKY4wIUth0fIMJDAAEE0hBg4540FGnDdYHLs7M6xO7uLtdDJT7PBGRxUAp/noVPuAg0JSBFmekLF5q6nosQaFZAFpzlqYBm7+M6BHwRsN8fzwbmvowacYYiQGE7lJEkDwQQQOAIATbuOQKHj4IQqNf33ttJUSaIIXUqCVkclMKfU8ERDAIpCNhFma4Si4MpkNKEJSALzrIAbX3EIQJBCLCBeRDDSBKeClDY9nTgCBsBBBBoRYCNe1rR4lofBWq1mgmbb8oYCg5SEmBxMCVImnFWgKKMs0MTRGD2grO9EB1EciSBwGMBNjDnnwECxQlQ2C7Onp4RQACBXAXYuCdXbjrLWWB5adn02NfXZ445QCANARYH01CkDZcFKMq4PDr+x2Y/BWAvRPufGRkg0BBgA3P+JSBQnACF7eLs6RkBBBDIVYCNe3LlprOcBXZ3GxtHTk1P5dwz3cUiwOJgLCMdZ54UZeIc97yyHqmOmK7spwPMSQ4Q8FyADcw9H0DC91qAwrbXw0fwCCCAQPMCbNzTvBVX+icwd2VOB93Tc8K/4InYCwEWB70YJoJsU4CiTJtw3Na0wPCZYX2tPB3Q9I1ciIAHAvL+eHmfvAchEyICwQhQ2A5mKEkEAQQQOFpAJlrXry8cfSGfIuChwPb2Ix31xecvehg9IfsgwOKgD6NEjO0KSFGmUqm02wT3IXCkwNDQaf25PB1w5MV8iIBHAvZ74+33yXuUAqEi4LUAhW2vh4/gEUAAgeYFZKK19dqWsidgzbfAlQi4K3Bt/poOrr+fooy7o+R3ZLI4KAVAv7MhegT2BOw5wejY6N4HHCGQooAsPMvTASk2TVMIFCpgvzeeDcwLHQo6j1SAwnakA0/aCCAQnwAb98Q35rFkvLm5aVIt95fNMQcIpCkgi4NJm3YhMM0+aAuBIgQoyhShHl+fXV3dOmkWB+Mb+9AzZgPz0EeY/FwXoLDt+ggRHwIIIJCSABv3pARJM84JbGxsmJiq1ao55gCBNAVYHExTk7ZcEqAo49JohBuL/TSAvSAdbsZkFosAG5jHMtLk6aoAhW1XR4a4EEAAgQwE2LgnA1SaLFxg/upVE0OpVDLHHCCQpgCLg2lq0pZLAhRlXBqNcGOxX9FgL0iHmzGZxSLABuaxjDR5uipAYdvVkSEuBBBAIAMBNu7JAJUmCxfY2dnVMVyamSk8FgIIW4DFwbDHN9bsKMrEOvL55t3X12c6tJ8SMCc5QMBTATYw93TgCDsYAQrbwQwliSCAAALHC7Bxz/FGXOGfwOLNmzronp7G+zv9y4CIfRFgcdCXkSLOVgQoyrSixbWdCExNT+nb5SmBTtriXgRcEZANzOU98q7ERRwIxCJAYTuWkSZPBBBA4LGATLjYuId/DiEJPHhwX6dzbnw8pLTIxUEBFgcdHBRC6liAokzHhDTQpMDg4KC+Up4SaPI2LkPAWQH7ffH2e+SdDZjAEAhQgMJ2gINKSggggMBhAvaEy56IHXY95xHwQeDe3Xs6zP7+ig/hEqPHAiwOejx4hH6ggD0XsOcIB17MSQQ6FJAFaHlKoMPmuB2BwgXs98WzgXnhw0EAkQpQ2I504EkbAQTiFGDjnjjHPeSs79TumPTK/WVzzAECWQjYhT+7IJhFX7SJQB4CFGXyUKYPEZAFaHlKQM7zJwK+Ctjvi2cDc19Hkbh9F6Cw7fsIEj8CCCDQggAb97SAxaVeCOzWGxtHJsFOTk56ETNB+ivA4qC/Y0fkBwvMX71qPqAoYyg4yEjAXoC2F6Yz6o5mEchcYG1tTffBBuaZU9MBAocKUNg+lIYPEEAAgTAF2LgnzHGNNSspyvSe7I2VgLxzFGBxMEdsuspFYGensThIUSYX7ug7sV/VYC9MRw8DgLcCbGDu7dAReEACFLYDGkxSQQABBJoR6Ok5oS9j455mtLjGdYG1h41vykxM8G1t18cqlPhYHAxlJMkjEaAow7+DPAXspwJkYTrP/ukLgbQF2MA8bVHaQ6B1AQrbrZtxBwIIIOC1wMXnL+r42bjH62Ek+DcFVldX9dHAwAAmCOQiwOJgLsx0kpMARZmcoOnGCMjTAfK0gPmAAwQ8FGADcw8HjZCDE6CwHdyQkhACCCBwtAAb9xztw6d+CVy/vqADrpyq+BU40XorwOKgt0NH4AcIUJQ5AIVTmQr09HTr9uVpgUw7o3EEMhSw3xNvvz8+wy5pGgEEDhCgsH0ACqcQQACBkAXsidfm5mbIqZJbBAJbr23pLMfGzkaQLSm6IMDioAujQAxpCFCUSUORNloVODc+rm+RpwVavZ/rEXBFwH5PvP3+eFfiIw4EYhGgsB3LSJMnAggg8KaAPfHa2NjABQFvBRYWGt/WThIodZW8zYPA/RJgcdCv8SLawwUoyhxuwyfZCchCtDwtkF1PtIxAtgLynvhkA3P7/fHZ9krrCCDwtACF7adF+DsCCCAQuIA98ZIJWeApk16gAvXduslscpLNIw0GB5kKsDiYKS+N5yggcwCKMjmi09UTC9H2UwPQIOCbgLwnng3MfRs54g1NgMJ2aCNKPggggEATAmzc0wQSlzgvsLR0W8c4fGbY+VgJMBwBFgfDGcvYM6EoE/u/gGLytxeieXKwmDGg13QE5D3xbGCejietINCuAIXtduW4DwEEEPBYgI17PB48QjcCaw/X9PHQ0GlzjgME8hBgcTAPZfrIWoCiTNbCtH+YQPKUQPIjC9SHXcd5BFwWYANzl0eH2GISoLAd02iTKwIIIPCmABv38E8hBIHV1VWdxvj58yGkQw4eCbA46NFgEeqhAhRlDqXhg4wF5NUNskCdcXc0j0AmAmxgngkrjSLQsgCF7ZbJuAEBBBDwX6C/v6KTYOMe/8cy5gwuz87q9Lu7u2JmIPcCBFgcLACdLlMXoCiTOikNNikgr26QBeomb+MyBJwRYANzZ4aCQBBQFLb5R4AAAghEKFDuL5us2bjHUHDgkUC9vrdx5PSFCx5FTqghCLA4GMIoxp0DRZm4x7/o7CunGl+wkKcGio6H/hFoVYANzFsV43oEshOgsJ2dLS0jgAACzgpUq1UT22591xxzgIAvArVazYTaVeIb2waDg1wEWBzMhZlOMhSgKJMhLk0fKzA2dlZfI08NHHsDFyDgmIC8H17eF+9YeISDQFQCFLajGm6SRQABBBoCpVJJyURs/upVWBDwTmBjfcPEPFIdMcccIJCHwOTkpOmGxUFDwYFHAhRlPBqsAEMtdZVMVvbTA+YkBwg4LiDvh5f3xTseLuEhELQAhe2gh5fkEEAAgcMFZCK2s8M3tg9X4hNXBdbX13Row2eGXQ2RuAIXYHEw8AEOPD2KMoEPsOPp2YuD9tMDjodNeAgYAXk/vLwv3nzAAQII5C5AYTt3cjpEAAEE3BCQidjizZtuBEQUCLQgcGtxUV89NHS6hbu4FIH0BFgcTM+SlvIXkKLM+Pnz+XdOjwg8FpCFaXl6ABQEfBKQ98PL++J9ip1YEQhNgMJ2aCNKPggggECTAjIRk4lZk7dxGQJOCGxv7+g4KMo4MRxRBsHiYJTDHkzS8ru/u5s9CoIZVM8SkYVpeXrAs/AJN3IBeT88G5hH/g+B9J0QoLDtxDAQBAIIIJC/ABv35G9Oj+kJXJ6d1Y1VKpX0GqUlBFoQYHGwBSwudU6AooxzQxJdQLIwLU8PRAdAwt4K2O+FZwNzb4eRwAMSoLAd0GCSCgIIINCKABv3tKLFtS4J1Ot1E87o2Kg55gCBPAVYHMxTm77SFKAok6YmbbUrIE8LyNMD7bbDfQjkLcAG5nmL0x8CRwtQ2D7ah08RQACBYAXYuCfYoQ0+sVqtZnIsl8vmmAME8hRgcTBPbfpKU4CiTJqatNWugLzCIXl6wF6wbrc97kMgLwE2MM9Lmn4QaE6AwnZzTlyFAAIIBCnQe7JX58XGPUEOb7BJ2UWZvr6+YPMkMbcFWBx0e3yI7nABijKH2/BJfgL2KxzsBev8IqAnBNoTYAPz9ty4C4GsBChsZyVLuwgggIAHAhMTkzpKNu7xYLAI0QhIUWZqesqc4wCBIgRYHCxCnT47FaAo06kg96chMFIdMc3YC9bmJAcIOCrABuaODgxhRStAYTvaoSdxBBBAQKmBgQHNwMY9/GvwSWDuypwOt6fnhE9hE2uAAiwOBjioEaREUSaCQfYkxeEzwzpSWbD2JGzCjFxANjCX98RHzkH6CBQuQGG78CEgAAQQQKA4gcqpiu6cjXuKGwN6bl1ge/uRvuni8xdbv5k7EEhRgMXBFDFpKjcBijK5UdPRMQJDQ6f1FfIUwTGX8zEChQvY74OX98QXHhQBIBC5AIXtyP8BkD4CCMQtIBOyZOMefhDwReDa/DUdaldXty8hE2egAiwOBjqwAadFUSbgwfUwtfHz53XU8hSBhykQcmQC9vvg7ffER8ZAugg4JUBh26nhIBgEEEAgXwF7QrawsJBv5/SGQBsCm5ub5q7RsVFzzAECRQiwOFiEOn12IkBRphM97k1boFJpPDkoTxGk3T7tIZC2gP0+ePs98Wn3Q3sIINC8AIXt5q24EgEEEAhOwJ6Q1XfrweVHQuEJbGxsmKTK5bI55gCBIgRYHCxCnT47EaAo04ke96YtYC9Q208TpN0P7SGQloC8D54NzNMSpR0EOhegsN25IS0ggAACXgvIxj1LS7e9zoPg4xBYXlo2ifb19ZljDhAoQoDFwSLU6bMTAYoynehxb9oC9gK1/TRB2v3QHgJpCcj74NnAPC1R2kGgcwEK250b0gICCCDgtQAb93g9fNEFv7u7o3PmmzLRDb2zCbM46OzQENgBAhRlDkDhVGEC9gK1/TRBYQHRMQLHCMj74NnA/BgoPkYgRwEK2zli0xUCCCDgogAb97g4KsR0mMDclTn90eDg4GGXcB6BXAVYHMyVm846FKAo0yEgt6cuIAvV8jRB6h3QIAIpCsj74NnAPEVUmkKgQwEK2x0CcjsCCCDgu0B3d5dOQSZqvudD/GELbG8/0gmeGx8PO1Gy80aAxUFvhopAHwvI73qKMvxzcEVAXukgC9euxEUcCDwtwAbmT4vwdwTcEKCw7cY4EAUCCCBQmMD0hQumbzbuMRQcOCpwbf6ajqy/v+JohIQVmwCLg7GNuL/5UpTxd+xCjlxe6SAL1yHnSm5+C7CBud/jR/ThClDYDndsyQwBBBBoSqCr1PjGdnIxG/c0RcZFBQnYRZlyf7mgKOgWgScFWBx80oO/uStAUcbdsYk5Mnl6QBauY7Ygd7cF2MDc7fEhungFKGzHO/ZkjgACCGiBkeqIkWDjHkPBgYMCdlGmWq06GCEhxSjA4mCMo+5nzhRl/By30KMeHRs1KdoL2OYkBwg4IsAG5o4MBGEg8JQAhe2nQPgrAgggEKPA8JlhnTYb98Q4+v7kPH/1qgm2VCqZYw4QKFKAxcEi9em7FQGKMq1ocW1eAuXy3hNY9gJ2Xv3TDwLNCsh74OW98M3ex3VuCCQLZ3/+Z3/uRjBEkaoAhe1UOWkMAQQQ8FNgaOi0DvzW4qKfCRB1FAI7O7s6z0szM1HkS5L+CLA46M9YxRwpRZmYR9/d3Pv6+kxw9lMF5iQHCDgiIO+Bl/fCOxIWYTQp8B/+/X9Qf+/Hf1y948UX1R//6z9u8i4u80GAwrYPo0SMCCCAQMYCMkHb3t7JuCeaR6B9gcWbN/XNPT3d7TfCnQhkIMDiYAaoNJm6AEWZ1ElpMCWBqekp3ZI8VZBSszSDQKoC8h54eS98qo3TWOYCP/KjP6L+2Sc/qfv52Q98gAJ35uL5dUBhOz9rekIAAQScFZAJ2uXZWWdjJDAEHjy4rxHOjY+DgYBTAiwOOjUcBHOIAEWZQ2A4XbiAvNpBniooPCACQOApAfv97/Z74Z+6jL86LvDO/+ad6k+//nUK3I6PU6vhUdhuVYzrEUAAgQAF7AlavV4PMENSCkHg3t17Oo3+/koI6ZBDQAIsDgY0mIGmQlEm0IENJK29xcFHgWREGqEJ2O9/t98LH1qeseRDgTuskaawHdZ4kg0CCCDQloA9QavVam21wU0IZClwp3bHNF/u39toypzkAIECBVgcLBCfrpsSsIsy1Wq1qXu4CIG8BGTBWp4qyKtf+kGgWQH7/e/2e+GbvZ/r3BSgwO3muLQaFYXtVsW4HgEEEAhQwJ6g2RO3AFMlJU8FduuNjSOT8CnKeDqIAYfN4mDAgxtIavbv9lKpFEhWpBGKgL1gbT9dEEp+5OG/gLz/nQ3M/R/LgzKgwH2Qij/nKGz7M1ZEigACCGQqwMY9mfLSeIcC81ev6hZ6T/YqijIdYnJ76gIsDqZOSoMpC1CUSRmU5lIVsBes7acLUu2ExhDoQEDe/84G5h0genArBW4PBumAEP+z/+/xzwHnWzp15vRb1N37r7Z0DxcjgAACnQok/7+HHwQQQAABBBBAAAEEEEAAAQQQQCBtgeEzwyrZ5yf584P//S+opPjNT/oCndSV+cZ2+uNBiwgggAACCCCAAAIIIIAAAggggAACCCDgsUBS1P7oxz6mi9s/+4EPqHe8+KKy9/7xOLVgQv+2YDIhEQQQQAABBBBAAAEEEEAAAQQQQAABBBBAICWBf/yJj+uWknesf+Bnf0aNVEdSaplm0hCgsJ2GIm0ggEDhArwOqfMhWFhYUD/47h/QDf3F3BVlvzO289ZpAYHOBOTVQ5/9/d9XL7z9hc4a424EMhD4g8//gfrwr/yKbpnfSRkA02TbAsk3y77nHe/Q9//Rl76oJicn226LGxHISuCVl19Wv/6Rj+rH/f/061/PqhvaRaBlAfu/kf7jX32DvV5aFvTvhnq9rj7/uc+pT/32b6ut17bUxMSkLmjz+9PNsaSw7ea4EBUCCCCQu0C5XDZ9Jhv3UNg2HBwULJD8B4X8lLpKcsifCDglMDo2auLZ3Nzk/4caDQ6KFtit75oQ7E36zEkOEHBAoL+/oqNIHvvnBwGXBGQD8yQmNjB3aWTSj+XpgrZ8Q5uCdvrWabZIYTtNTdpCAAEEPBawC9nLS8t8o8vjsQwt9Ppu3aTExNJQcOCYAIuDjg0I4RgBijKGggOHBcr9e1+wSJ4y4FF/hwcrstB2dhqLg0mRk58wBSho+z2uFLb9Hj+iRwABBFIVmJqeUtfmr6nd3Z1U26UxBDoRWFq6rW/vPdnbSTPci0CmAiwOZspL4x0IUJTpAI9bcxOwnyawnzLILQA6QuAQgcWbN/UnPT3dh1zBaV8FKGj7OnJPxv2fP/lX/oYAAgggELPA4OCgTn/uylzMDOTumMDawzUdUfJ+O34QcFlAvs3F4qDLoxRfbBRl4htzHzO2X/FgP2XgYy7EHJbAgwf3dULnxsfDSizibJKCdvJe/7/19rfrd/sn/42R7EHxyu9+hqeWPfx3QWHbw0EjZAQQQCArAZmwbW8/yqoL2kWgZYHV1VV9z8DAQMv3cgMCeQrIt7lYHMxTnb6OE6Aoc5wQn7siIIuD8pSBK3ERR9wC8t53eQ983Bp+Z09B2+/xOyx6XkVymAznEUAAgQgFZMKWvI6EHwRcEbh+vbF5ZOVUY2MpV+IiDgSeFkgWB7/8pS8rFgefluHvRQpQlClSn75bEZAFbHnKoJV7uRaBLASS973Lj/0eeDnHn/4IJJvRv/QTP6G2XttSbArpz7g1EymF7WaUuAYBBBCIRMCesG1ubir7nbGREJCmgwLJBDT5GRs762B0hITAngCLg3sWHLkhQFHGjXEgiuYEZAFbnjJo7i6uQiA7Aft972xgnp1zHi0nm9F/93d/t/pvf/zHed1IHuA59kFhO0dsukIAAQRcF7A37tnY2KCw7fqARRBf8u0K+Sl1leSQPxFwUsBeHEwKiiPVESfjJKh4BCjKxDPWIWQqC9jylEEIOZGD3wLyvnc2MPd7HJPoX3j7C/r//M+EDJ4W4B3bT4vwdwQQQCBiATbuiXjwHU09+XaF/PBNGZHgT1cF7MVBu6DoarzEFb4ARZnwxzikDO0FbPtpg5ByJBe/BOR972xg7te4EW1cAhS24xpvskUAAQSOFWDjnmOJuCBHgaWl27q34TPDOfZKVwi0J8DiYHtu3JWdAEWZ7GxpOX0BewE7eXKQHwSKFpD3vcv734uOx8f+33j1j9Wvvus5deb0C+qll+fVIx+TIGanBShsOz08BIcAAgjkL9DT0607lYlc/hHQIwJ7AmsP1/RfhoZO753kCAGHBVgcdHhwIgxNfpdTlIlw8D1NWV75IAvbnqZB2IEIsIF5pwP5ulr92mfV52/sPm7ooZr9zS+ohdc7bZP7EXhSgML2kx78DQEEEIhe4Nz4uDZg457o/yk4AbC6uqrjGD9/3ol4CAKB4wRYHDxOiM/zFKAok6c2faUhIK98kIXtNNqkDQTaFWAD83bl5L5vVwN/+++pH32u6/GJU2rmF35YTX67fMafCKQjwOaR6TjSCgIIIBCMQH9/RefCxj3BDKnXiUhRprs7mRDzg4D7Asni4Je/9GXF4qD7YxVDhBRlYhjlsHKUpwtkYTus7MjGJwE2ME9ntJ55yzvVR77y+P/SaY5WENgnwDe295FwAgEEEIhboNxfNgBs3GMoOChAoF6vKynKTF+4UEAEdIlA6wIsDrZuxh3ZCFCUycaVVrMVqJxqfMFCFraz7Y3WEThcgA3MD7fZ+2RdffHjn1f3905whEDuAhS2cyenQwQQQMBtgWq1agLcrSfvQ+MHgWIEarWa6birxDe2DQYHTguwOOj08EQVHEWZqIY7mGTHxs7qXGRhO5jESMQ7AXnPu7z33bsEMg/4DfVo9rfUb/4F/72YOTUdHClAYftIHj5EAAEE4hMolUpKJnDzV6/GB0DGzghsrG+YWEaqI+aYAwRcFmBx0OXRiSs2ijJxjXco2Za6SiYV+6kDc5IDBHISkPe8y3vfc+rWn24e/aX6nX/6VbXpT8REGqgAhe1AB5a0EEAAgU4EZAK3s8MKfCeO3NuZwPr6mm5g+MxwZw1xNwI5CrA4mCM2XR0pQFHmSB4+dFRgcnLSRGY/dWBOcoBATgLynnd573tO3frRzRt31Rc/9CH16Rv8t6IfAxZ2lBS2wx5fskMAAQTaEpAJ3OLNm23dz00IpCFwa3FRNzM0dDqN5mgDgdwEWBzMjZqOjhCgKHMEDh85LSAL2vLUgdPBElywAvKed3nve7CJtpjYG6/+sfrVd79b/dK/e9jinVyOQDYCFLazcaVVBBBAwGsBmcA9eHDf6zwI3m+B7e0dncD4+fN+J0L00QmwOBjdkDuZMEUZJ4eFoJoQkAVteeqgiVu4BIHUBeQ972xgLrTfVAsv/6R6+6UPqM/b39S+8VH14um3qDP6/86p7395WW5488/H9/3vn1S/8q7n1PkPXVavP/Vp46/fUvdn/6X69Ie+T509+8vqslz0xqvq8su/rL6/Ku2/oF76jT9V99+wG3n8ru+FLzfulTguvl/9k9lX1ROX2bfoY6tPue/xn2ff9cvq0797+ak+9t3MCYcEKGw7NBiEggACCLgiIBv33Lt7z5WQiCNCgcuzszrr7m42joxw+L1OWRYHpbDodTIE760ARRlvhy76wGVBW546iB4EgNwF7Pe7s4G58D+rJl/6HfUX919Vdy9/WL1NTj/3YfX15Jz+v1vqyy+N6k/eePWy+r2Pv1/9zdMX1A/+wm+oP7SL4XLvowX1xZd/Xb108Tn14vv+gfrEF26Ywvcbr35B/f2/+T3q/R/5gvqGFLrVQzX7Wz+pvveHXlZ3ddX6m2r+4z+kLr77g0/cqza/rj75vu9TP/Ly7YOL24/m1Ss/8b3qx/7XNfWdf/d31e0k9ruz6pWfeVE9e+ML6hP/6H3qe9/9a+prr35LIuVPhwUobDs8OISGAAIIFCXAxj1FydOvCNTrdTlUfFPGUHDgiYAsDkph0ZOwCTMgAYoyAQ1mhKnIgjaLgxEOviMp2+93ZwPzdgZlWf3ez39E/dnypvrmobc/Upc/+kvq9+duqMVNU7nWVydF7Z/7n6+rCx/9t2pZF8yvqj/61Xeovjfbev3aP1cf+/KCuvyhH1E/t/yC+u3LtxqF9cfF6U+/9zn17fq6XbXwiX+i/tU3n/re9qMr6hM//t+p39j6MfX7v/PL6gcmn220+sxb1KVf/LT617/7d3U/r9/4rPqZn/+kmn/01P1vxsAf7ghQ2HZnLIgEAQQQcEaAjXucGYpoA6nVaib3crlsjjlAwAcBFgd9GKWwY9xY3zAJUpQxFBx4IiAL2snioL3Q7Un4hBmAgLzfXd73HkBKOacwqt7/la+p3/vMF9TnfrrxDe79AZxQlz7xNfXlz3xO/dmX/r46JRd869+o3/psSf3S73xUvX/mLeoZfT75tvg/VL/w4ok3r3qkZn/h59Qf/I1Pqz/7zAfVpbd8R+P84+L03/6f/kf1vlON0rZ6/RvqL/+jvcHl/60WPv0PH296WVbv+wc/ps40GpeeH//5jDrx3e9R3/fm/a/f+JfqU1//P63POXRRgMK2i6NCTAgggIADAr0ne3UUMrFzICRCiEjALsr09cn3MyICIFWvBVgc9Hr4ggh+fX1N50FRJojhjC4J+9UP9kJ3dBAkXJgAG5inRf/X1Fu/a0K9WXY+tNFnTpxUjf/yfHzJd/zX6ud/7Z3q9L6i819X3/3O73rz29iPL/vhf6T+2XvOvFn4tpp+5oz6rv/qzW9hq0fq9t3/a+/Db/6J+uevPH4H+KkZ9Y7n/treefvomS518qR0/kj9+R/PHfGtc/tGjosS+LaiOqZfBBBAAAG3BSYmJlXyjmM27nF7nEKNTooyU9NToaZIXoELJIuDybcNk8XBF97+QuDZkp5rAhRlXBsR4mlFwH7KIFnothcLW2mHaxFoV4ANzNuVa/O+7mfVdyZfsn7yjSRPNfaM6u7t1YXs5LJv3b6j1tQldfqpqw7/6xvqm//+T9SfJzc//JT6wTOfOvxS65PXl2pq5fHbSJ6VWrf1GYduCFDYdmMciAIBBBBwTmBgYEDHxMY9zg1NFAHNXZnTefb0yCOHUaRNkgEJsDgY0GB6mApFGQ8HjZCfEEieNkg2MZeF7ic+5C8IZCzABuYZAz/dfHdvo3B8ZGH76Zta/fv/o1buPGjUzpMNL7/yUgtF8Vb74vo8BXgVSZ7a9IUAAgh4JFA5VdHRsnGPR4MWUKjb2490NhefvxhQVqQSkwCLgzGNtnu5UpRxb0yIqDWBoaHT+gZ5+qC1u7kagfYF7Pe6y/ve22+NO90R+H/Vo2/uNMJZvqNezbSI7k7WMURCYTuGUSZHBBBAoA0Bmcglj9Lzg0DeAtfmr+kuu7q68+6a/hBIRYDFwVQYaaQNAYoybaBxi3MC4+fP65jk6QPnAiSgYAXs97rb73sPNuEYE/vWq+ruQyrboQw9he1QRpI8EEAAgZQF7IncwsJCyq3THAKHC2xubpoPR8cO20ndXMIBAk4KsDjo5LBEERRFmSiGOfgku7u7dI7y9EHwCZOgMwL2Bub2+96dCZBAUhC4rf7ka3fV41dnH/Ozrr748c+r+8dcxcfFClDYLtaf3hFAAAFnBeyJXH237mycBBaewMbGhkmqXC6bYw4Q8EmAxUGfRiusWCnKhDWesWYji4NJ/vZTCLF6kHd+AvJe9+Q97/yEJNClnvsbb1PJHpVK7aqFz3xS/atXv3V0gt+cU//u7n+hGstsR1/Kp8UJUNguzp6eEUAAAecFZEK3tHTb+VgJMByB5aVlk0xfX5855gABnwTsxUG70OhTDsTqp4AUZaamp/xMgKgReCxgL2zbTyGAg0DWAvJed3nPe9b90X5eAs+oZ//W96oXGpVtpTa/qj788x9XXzu0uP2f1OWP/wv1xvdcVM/mFSL9tCVAYbstNm5CAAEE4hCQCZ1M8OLImiyLFtjdbWzsQlGm6JGg/04FZHFQCo2dtsf9CDQjIL+ze3pONHM51yDgpIC9sM3ioJNDFGxQ8l53NjA/Yoi7n1XfKQVinzZifPYF9d53D5nEXr/xWfVTf+dH1K986stq4ZG8mOQN9Wjhy+rTH3q/+uk/O6/e++JfN9dz4KYAhW03x4WoEEAAAScE2LjHiWGILoi5K3M658HBwehyJ+GwBFgcDGs8fclmZWVFh0pRxpcRI87DBGSBm8XBw4Q4n4WAvNedDcyP0O3uVc8+8+bn3/o/1L/98//0+C+PC8Lzv6l+8Ce/qL5pbn1D7WxtmXdZf+v2HbVmPrMOHt5Rt+WtIIdu7PhkW9bdRxy+obZe2zX9K/Wd6tKHf1X9UJ9U5R/f+voN9Ycf+6D6wYkRdeb0Wx7/34iafvcH1Se+sK2+/6MfVJdOSKJHdMNHhQpQ2C6Un84RQAABtwXYuMft8Qk1uu3tRzq1c+PjoaZIXpEIsDgYyUA7lua1+Ws6Iooyjg0M4bQsIE8dyIJ3yw1wAwItCrCBeZNg3/5W9T3vkm8+P1B/+L7/slEQ/sB99d7/4Z17r+549JfqM/9iTr0uzd76N+oL83tlb336jVfV117+qtp78eVt9dUvXFWN/xqQGx//ua+tr6qX//RVq2idXJsU1z+j/pcvyUb0r6uHX/rsk+/SPvEO9ZHP/VP1o88d9ebsU+odv/kZ9ZGZ77QC4NBVAQrbro4McSGAAAIOCLBxjwODEGEIUpTp769EmD0phyTA4mBIo+lHLhRl/BgnomxOQJ46kAXv5u7iKgTaF2AD82btHn/z+dd/T73yMy+qxm44XeptP/xh9crn/rH6gbd8x+NGHqnLH3penZl4r/r0jd29Rl9fUJ9+zwV15uwvq8uvv67uv/zD6syZGfVT/9uNveL3440dv/Hb71XTp8+p73852XdnWb3yrnMHtHVDff6lGTV6+ofVK68+Lp2/fln9ytnH37Z+z2+pb5hK+uPbH79L+5cuPb7/XS+r+29G8sxb3qk+8pXL6o9+88Pqp1489ebZ5I9Tauanf029cvlP1afec0bxXW2LxuHDb3M4NkJDAAEEEChYoKu0t5KdbNwzOTlZcER0H7rAndodk2K5v2yOOUDAR4GnFwdLpZKPaRCzRwIUZTwaLEI9VkCeOpAF72Nv4AIEOhRgA/MWAJ95i7r0i6+ov/jFg+45oS594oq6+4mDPrPOvfQFdfcl6++HHL7/K7fU+w/5bO/0JfWx26+qj+2dOOboWTX5npf0/33omCv52G0BvrHt9vgQHQIIIFCowEh1xPTPxj2GgoMMBXbre9/qqFarGfZE0whkL/D04mD2PdJD7AIUZWL/FxBW/qNjoyYh+2kEc5IDBFIWYAPzlEFpDoEcBChs54BMFwgggIDPAmzc4/Po+Rf7/NWrJmi+3WooOPBUgMVBTwfO47Apyng8eIS+T6Bc3ntyy34aYd+FnEAgJQF5n7u83z2lZmkGAQQyFKCwnSEuTSOAAAIhCMjE7tbiYgjpkIPjAjs7jW9sX5qZcTxSwkOgOQEWB5tz4qp0BCjKpONIK24I9PU13t6bRGM/jeBGdEQRooC8z13e7x5ijuSEQGgCFLZDG1HyQQABBFIWkIndyspKyi3THAL7BRZv3tQne3q693/IGQQ8FGBx0MNB8zhkijIeDx6hHyggC93yNMKBF3ESgZQE5H3ubGCeEijNIJCDAIXtHJDpAgEEEPBZgI17fB49/2J/8OC+Dvrc+Lh/wRMxAgcIsDh4AAqnMhOgKJMZLQ0XJCAL3fI0QkFh0G0EAvZ73NnAPIIBJ8VgBChsBzOUJIIAAghkI8DGPdm40urBAvfu3tMfjI2dPfgCziLgmQCLg54NmMfh3qndMdFTlDEUHHguIAvdsvDteTqE77CA/R53NjB3eKAIDYGnBChsPwXCXxFAAAEEnhRg454nPfhbdgJ2UabUVcquI1pGIEcBFgdzxI68q916Y4+ChIGiTOT/GAJKX14JIQvfAaVGKo4JsIG5YwNCOAg0KUBhu0koLkMAAQRiFWDjnlhHPv+87W/KTE5O5h8APSKQgQCLgxmg0uSBAhRlDmThpOcC9tMH9gK452kRvoMCbGDu4KAQEgJNCFDYbgKJSxBAAIHYBaampzQBG/fE/i8h2/yXlm7rDnpP9mbbEa0jkKMAi4M5YkfeFUWZyP8BBJq+/fSB/VRCoOmSVoECbGBeID5dI9CBAIXtDvC4FQEEEIhFYHBwUKfKxj2xjHgxea49XNMdT0zwbe1iRoBesxK4NDOjm2ZxMCth2k0EKMrw7yBEgVJp79Vk9lMJIeZKTsUKyHvc5b3uxUZD7wgg0KwAhe1mpbgOAQQQiFhAJnjb248iViD1rAVWV1d1FwMDA1l3RfsI5CrQ09Ot+2NxMFf26DqjKBPdkEeTsCwOylMJ0SROorkKyHvc5b3uuXZOZwgg0LYAhe226bgRAQQQiEdAJnjX5q/FkzSZ5i5w/fqC7rNyqpJ733SIQJYCsjgohccs+6LteAWkKDM2djZeBDIPUkAWvOWphCCTJKlCBez3t9vvdS80KDpHAIGmBChsN8XERQgggEDcAvYEz574xa1C9mkLbL22pZukKJO2LO0VLSCLg1J4LDoe+g9PwP7dXOrae3VDeJmSUYwCsuDN4mCMo59Pzmxgno8zvSCQhQCF7SxUaRMBBBAITICNewIbUAfTWVhofFs7Ca1cLjsYISEh0L4Ai4Pt23FncwIUZZpz4io/BWTBm8VBP8fPh6jZwNyHUSJGBA4WoLB9sAtnEUAAAQQsATbusTA4zERgY33DtDtSHTHHHCAQggCLgyGMots5UJRxe3yIrjMB+ykEeyG8s1a5G4E9ATYw37PgCAHfBChs+zZixIsAAggUJMDGPQXBR9Lt+vqaznT4zHAkGZNmTAIsDsY02sXkSlGmGHd6zUdgcnLSdFTfrZtjDhBIS4ANzNOSpB0E8hegsJ2/OT0igAACXgqwcY+Xw+ZN0LcWF3WsQ0OnvYmZQBFoRYDFwVa0uLZVAYoyrYpxvW8CvSd7dcjydIJv8ROv2wJsYO72+BAdAkcJUNg+SofPEEAAAQSMABv3GAoOMhDY3t7RrY6fP59B6zSJQPECLA4WPwYhR0BRJuTRJbdEYGKi8a1teToBFQTSFGAD8zQ1aQuBfAUobOfrTW8IIICAtwJs3OPt0HkR+OXZWR1nd3eXF/ESJAKtCsjioBQgW72f6xE4SkCKMtMXLhx1GZ8h4K2ALHzL0wneJkLgzgnY721nA3PnhoeAEDhWgML2sURcgAACCCCQCLBxD/8OshKo1/fel0lRJitl2i1aQBYHpQBZdDz0H46AXZTpKrE4GM7IkoktIAvfLA7aKhynIcAG5mko0gYCxQlQ2C7Onp4RQAABrwTYuMer4fIq2FqtZuLlmzKGgoPABFgcDGxAHUqHooxDg0EomQnIwneyOGgviGfWIQ1HI8AG5tEMNYkGKkBhO9CBJS0EEEAgCwE27slClTaXl5YNQl9fnznmAIGQBFgcDGk03cqFooxb40E02QjYTyPYC+LZ9EarMQmwgXlMo02uIQpQ2A5xVMkJAQQQyEiAjXsygo282d3dxsaRU9NTkUuQfugCLA6GPsLF5EdRphh3es1XYKQ6Yjq0n1IwJzlAoE0BNjBvE47bEHBEgMK2IwNBGAgggIAPAmzc48Mo+Rfj3JU5HXRPzwn/gidiBFoQYHGwBSwubVqAokzTVFzoucDwmWGdgTyl4Hk6hO+IABuYOzIQhIFAmwIUttuE4zYEEEAgRgHZuEcmgDEakHP6Atvbj3SjF5+/mH7jtIiAQwIsDjo0GAGFIr+TK5VKQFmRCgL7BYaGTuuT8pTC/is4g0BrAvb72uU97q21wNUIIFC0AIXtokeA/hFAAAGPBOwJnz0R9CgFQnVQ4Nr8NR1Vfz9FGQeHh5BSFGBxMEVMmtICm5ubRmJ0bNQcc4BAiAKyAL6yshJieuRUgID9vnY2MC9gAOgSgRQEKGyngEgTCCCAQCwCbNwTy0jnl6ddlCn3l/PrmJ4QKECAxcEC0APvcmNjw2RIUcZQcBCoQFdXt85MFsQDTZO0chRgA/McsekKgYwEKGxnBEuzCCCAQIgCbNwT4qgWm5NdlKlWq8UGQ+8IZCzA4mDGwBE2T1EmwkGPOGX7qQR7YTxiElLvUIANzDsE5HYEHBCgsO3AIBACAggg4JMAG/f4NFruxzp/9aoJslQqmWMOEAhRgMXBEEe12JwoyhTrT+/5CthPJdgL4/lGQW8hCbCBeUijSS6xClDYjnXkyRsBBBBoU4CNe9qE47YDBXZ2dvX5SzMzB37OSQRCE5iantIpra+vhZYa+RQgIEWZwcHBAnqnSwTyFejr6zMd2k8rmJMcINCiABuYtwjG5Qg4KEBh28FBISQEEEDAZQE27nF5dPyLbfHmTR10T0/jvZn+ZUDECLQm0NNzQt8gBcnW7uZqBJ4UkKLMufHxJz/gbwgEKiAL4WtrLA4GOsS5piXva2cD81zZ6QyBVAUobKfKSWMIIIBA+AJs3BP+GOeZ4YMH93V3FGXyVKevIgVkcVAKkkXGQt/+C1CU8X8MyaA1AVkIl4Xx1u7magT2BO7U7pi/sIG5oeAAAe8EKGx7N2QEjAACCBQrwMY9xfqH1vu9u/d0SmNjZ0NLjXwQOFCAxcEDWTjZhgBFmTbQuMV7AVkIl4Vx7xMigcIEduuN1+ElAbCBeWHDQMcIdCxAYbtjQhpAAAEE4hJg4564xjvLbBcWFkzzpS42jjQYHAQtwOJg0MOba3IUZXLlpjNHBOSVEbIw7khYhOGhABuYezhohIzAAQIUtg9A4RQCCCCAwOECbNxzuA2ftCZQ362bGyYnJ80xBwiELGB/K2xjYyPkVMktYwGKMhkD07yTAvYrI+ynFpwMlqCcFmADc6eHh+AQaFqAwnbTVFyIAAIIICACbNwjEvzZicDS0m19e+/J3k6a4V4EvBIolfaeTrALk14lQbBOCFCUcWIYCCJnAXshnMXBnPED607e0z4wMBBYZqSDQFwCFLbjGm+yRQABBFIRYOOeVBijb2Tt4Zo2mJjg29rR/2OIDEAWB6UwGVn6pJuSAEWZlCBpxjsBWRCXBXLvEiBgJwSuX2+8Eq9yquJEPASBAALtCVDYbs+NuxBAAIGoBdi4J+rhTy351dVV3db4+fOptUlDCPggwOKgD6PkfowUZdwfIyLMRkAWxGWBPJteaDV0ga3XtnSKbGAe+kiTX+gCFLZDH2HyQwABBDIQYOOeDFAjbPLy7KzOuru7K8LsSTlmARYHYx799HKnKJOeJS35JSCvjpAFcr+iJ1oXBNjA3IVRIAYE0hGgsJ2OI60ggAACUQmwcU9Uw51JsvX63saR0xcuZNIHjSLgqoB8O+ze3XuuhkhcjgvYRZlyuex4tISHQLoC8uoIeWoh3dZpLQYBNjCPYZTJMRYBCtuxjDR5IoAAAikKsHFPipiRNlWr1UzmFGUMBQeRCJS69jaQtAuUkaRPmikIbKxvmFZGqiPmmAMEYhCQBfHkqQV7oTyG3MkxHQF5P/vwmeF0GqQVBBAoTIDCdmH0dIwAAgj4LcDGPX6PX9HRLy8tmxD6+vrMMQcIxCBgLw7a3xqLIXdyTEdgfb2x+S5FmXQ8acUvga7S3ivM7IVyv7Ig2iIFbi0u6u6Hhk4XGQZ9I4BACgIUtlNApAkEEEAgRgE27olx1NPLeXd3Rzc2NT2VXqO0hIBHAiwOejRYDoZKUcbBQSGk3ATspxTspxdyC4COvBfY3m7MQ9nA3PuhJAEEFIVt/hEggAACCLQlIBNBNu5piy/6m+auzGmDnp4T0VsAEKcAi4NxjntaWVOUSUuSdnwVkKcV5OkFX/Mg7mIEZAPzSqVSTAD0igACqQlQ2E6NkoYQQACBuAS6uxuPgcrEMK7sybZTge3tR7qJi89f7LQp7kfASwEWB70cNmeClt+9FGWcGRICyVlAXiEhTy/k3D3deSywublpoh8dGzXHHCCAgJ8CFLb9HDeiRgABBAoXkI17kkDYuKfw4fAugGvz13TM/f18U8a7wSPgVARYHEyFMcpGKMpEOewk/ZSALIyvrKw89Ql/ReBogY2Nvc132cD8aCs+RcAHAQrbPowSMSKAAAIOCrBxj4OD4klId2p3TKTl/rI55gCBmARYHIxptNPNlaJMup605qdAV1e3DlwWyv3MgqiLEGAD8yLU6ROB7AQobGdnS8sIIIBA0AJs3BP08Gaa3G5917RfrVbNMQcIxCRgf0usVqvFlDq5dihAUaZDQG4PQsB+hYT9FEMQyZFEpgJsYJ4pL40jkLsAhe3cyekQAQQQCEdganpKJ8PGPeGMaR6ZzF+9qrvpPdmrSqVSHl3SBwLOCfT19ZmY7EKlOckBAocIrK2t6U8uzcwccgWnEQhfwF4Yt59iCD9zMuxUQDYwHxwc7LQp7kcAAQcEKGw7MAiEgAACCPgq0NNzQocuE0Rf8yDufAXWHjaKMhMTk/l2TG8IOCYgi4Py7THHwiMcRwUWb97UkfX0NF7F4GiYhIVApgL2wrgsmGfaIY0HI/DgwX2dy7nx8WByIhEEYhagsB3z6JM7Aggg0KGAbNyzvf2ow5a4PSaB1dVVne7AwEBMaZMrAvsE5NtiLA7uo+HEEQIUZY7A4aOoBOSphZ2dvVecRQVAsm0J3Lt7T9/HBuZt8XETAs4JUNh2bkgICAEEEPBHQCaEbNzjz5i5EOn16ws6jMqpigvhEAMChQnIt8WkUFlYIHTslQBFGa+Gi2AzFJCnFuQphgy7oulABNjAPJCBJA0ELAEK2xYGhwgggAACrQmU+8vmBnuiaE5ygMBTAvV6XW29tqXPjo2dfepT/opAXAKyOCiFyriyJ9t2BBYWGguDyb327+B22uIeBHwXkMVBWTD3PR/iz17Afh/75CSvxMtenB4QyF6Awnb2xvSAAAIIBCtgb9yzW+cx0GAHOsXEarWaaa1c3lsYMSc5QCAiAbswyeJgRAPfQar13bq5m6KMoeAgUgFZIJcF80gZSLsFgaWl2/rqZANzfhBAIAwBCtthjCNZIIAAAoUIJBv3yMSQjXsKGQLvOt1Y3zAxj1RHzDEHCMQoYC8O2t8ii9GCnJsToCjTnBNXxSFQ6iqZRO2nGcxJDhB4SoANzJ8C4a8IBCBAYTuAQSQFBBBAoEiBiYnGY3wyUSwyFvp2X2B9fU0HOXxm2P1giRCBjAXsxUEpWGbcJc17LiC/a+V3r+fpED4CHQnYTy3YC+cdNcrNQQvIBubj588HnSfJIRCTAIXtmEabXBFAAIEMBAYGBnSrMlHMoAuaDEjg1uKizmZo6HRAWZEKAu0LSIFSCpbtt8SdMQjI71qKMjGMNjk2IyAL5bJw3sw9XBOvwOXZWZ18d3dXvAhkjkBgAhS2AxtQ0kEAAQTyFqicqugu2bgnb3k/+1tZWdGBX3z+op8JEDUCKQuwOJgyaODNUZQJfIBJr2UBWSiXhfOWG+CGaASSDczlZ/rCBTnkTwQQ8FyAwrbnA0j4CCCAQNECMjFMNu6xJ4xFx0X/bgpcm7+mA+vq6nYzQKJCIGcBWRyUgmXO3dOdRwL271j53etR+ISKQCYC8vSCLJxn0gmNBiHABuZBDCNJILBPgML2PhJOIIAAAgi0ItBV2nuUz54wttIG18YhsLm5aRIdHRs1xxwgELOAXaC0C5cxm5D7wQL279hyuXzwRZxFIDKBSqXx5KAsnEeWPum2ILC8tGyu7uvrM8ccIICA3wIUtv0eP6JHAAEEChcYqY6YGNi4x1BwcIDAxsaGOVutVs0xBwjELMDiYMyj31ruFGVa8+LqOATshXJ7AT2O7MmyFYHd3R19+dT0VCu3cS0CCDguQGHb8QEiPAQQQMAHAZkgsnGPD6NVXIzzV6+azkulkjnmAIGYBezFQbtwGbMJuR8sQFHmYBfOxi1gP71gL6DHrUL2BwnMXZnTpwcHBw/6mHMIIOCpAIVtTweOsBFAAAGXBHp6TuhwZMLoUmzE4o7A2sM1HcylmRl3giISBBwQkMVBKVw6EBIhOCggv2Mpyjg4OIRUmID9Sgl7Ab2wgOjYWYEHD+7r2M6NjzsbI4EhgEDrAhS2WzfjDgQQQACBpwQuPn9Rn9nefvTUJ/wVgT2B1dVV/ZeBgYG9kxwhgIBicZB/BM0IUJRpRolrYhSQBfOdnd0Y0yfnJgXu3b2nr+zvb7yXvcnbuAwBBBwXoLDt+AARGYbtFwAAQABJREFUHgIIIOCDgEwQ2bjHh9EqLsbr1xd055VT/AdFcaNAzy4KyOKgFC5djJGYihegKFP8GBCBmwI9Pd06sMWbN90MkKgKF7hTu2NiKPez+a7B4ACBAAQobAcwiKSAAAIIFC1gTxDtiWPRcdG/OwL1el1tvbalAxobO+tOYESCgAMCsjgohUsHQiIExwQWFhoLg0lY9u9cx8IkHAQKEZBXS8gCeiFB0KnTAvb71ycnJ52OleAQQKA1AQrbrXlxNQIIIIDAAQLVatWc3a3zGKjB4MAI1Go1c2xv9GROcoBAxAJ2oZLFwYj/IRyRen23bj6lKGMoOEBAC8iCuSygw4LA0wJLS7f1qd6TvU9/xN8RQMBzAQrbng8g4SOAAAIuCJRKJSUTRTbucWFE3IthY33DBDVSHTHHHCCAgFJ2odL+Vhk2CIiAFGWGzwzLKf5EAIE3BewFc/vpBoAQEAHZwHxigm9riwl/IhCKAIXtUEaSPBBAAIGCBWSiKBPHgsOhe8cE1tfXdERT01OORUY4CLghIIuDUsB0IyqicEXg1uKiDmVo6LQrIREHAs4I2Avm9kK6MwESSOECsoH5+PnzhcdCAAggkK4Ahe10PWkNAQQQiFZgYGBA5y4Tx2ghSPxAgbkrc/p8T8+JAz/nJAKxC7A4GPu/gKPz397e0RdQlDnaiU/jFZCnGWQhPV4JMj9I4PLsrD7d3d110MecQwABjwUobHs8eISOAAIIuCRQOVXR4cjE0aXYiKV4ge3tRzqIi89fLD4YIkDAQQEpWLI46ODgOBCS/G6tVBq/ax0IiRAQcEpAnmaQpxucCo5gChXY3Nw0/U9fuGCOOUAAgTAEKGyHMY5kgQACCBQuYE8U6/W9Ta4KD4wAnBC4Nn9Nx9HfT1HGiQEhCOcE5FtkUsB0LkACKkzALsqMjo0WFgcdI+CygCycr6ysuBwmsRUgYO9dYb+PvYBQ6BIBBDIQoLCdASpNIoAAAjEK2BPFWq0WIwE5HyJwp3bHfFLuL5tjDhBAYE/AXhy0C5l7V3AUqwBFmVhHnrxbEejq6taXy0J6K/dybdgCy0vLJsG+vj5zzAECCIQhQGE7jHEkCwQQQKBwAXuiaE8gCw+MAAoXsIsy1Wq18HgIAAEXBezFQft/My7GSkz5CsxfvWo6tH/XmpMcIICAsp9msBfUoUFgba2xgfmlmRkwEEAgQAEK2wEOKikhgAACRQlMTU/prnd3G5tcFRUH/bolsLR0WwfUe7JXlUolt4IjGgQcEbALliwOOjIojoSxs7OrI6Eo48iAEIaTAvbC+W698b8ZJwMlqNwFFm/e1H329DS+1Z97AHSIAAKZClDYzpSXxhFAAIG4BAYHB3XCc1fm4kqcbI8UWHvY+KbMxMTkkdfxIQKxC0jhUr5dFrsH+TcEpCgzMDAACQIIHCKQLJwnC+jJj/2UwyGXczoigQcP7utsz42PR5Q1qSIQjwCF7XjGmkwRQACBzAVkwigTyMw7pAMvBFZXV3Wc4+fPexEvQSJQlIB8m0wKmUXFQb9uCVy/vqADqpxi8123RoZoXBOQBXRZUHctPuIpRuDe3Xu647Gxs8UEQK8IIJCpAIXtTHlpHAEEEIhLQCaMMoGMK3uyPUzg8uys/qi7u+uwSziPAAKPBWRxUAqZoCBQr9fV1mtbGkJ+x6KCAAIHC8hTDbKgfvBVnI1JYGGhsTCY5GzvZRGTAbkiELoAhe3QR5j8EEAAgRwFSl1770+2J5I5hkBXjglsbm6aiKYvXDDHHCCAwH4BKVxKIXP/FZyJTaBWq5mUKcoYCg4QOFBAnmqQBfUDL+JkVAIb6xsm35HqiDnmAAEEwhGgsB3OWJIJAgggULjA5OTeO5Tru/XC4yGA4gU2Nvb+g4KiTPHjQQRuC9j/G2Fx0O2xyis6ijJ5SdNPCAL2AnrytAM/CKyvN/Z5GT4zDAYCCAQqQGE70IElLQQQQKAoAZk4Li3dLioE+nVIYHlp2UTT19dnjjlAAIH9Ava3yeyC5v4rOROLgBRlpqanYkmZPBFoW8BeHLSfdmi7QW70XkA2tB8aOu19LiSAAAIHC1DYPtiFswgggAACbQrIxPHW4mKbLXBbSAJra41vylyamQkpLXJBIDMBWRyUgmZmHdGwFwJSlOnpOeFFvASJQJEC9gK6vbBeZEz0XazA9vYjHcDF5y8WGwi9I4BAZgIUtjOjpWEEEEAgTgGZOK6srMQJQNZPCCzevKn/3tPT/cR5/oIAAgcLyOKgFDQPvoqzsQg8eHBfpyq/W2PJmzwRaFdAnm6QhfV22+G+MASuzV/TifT3V8JIiCwQQGCfAIXtfSScQAABBBDoRKCrq1HAlIlkJ21xr/8C1683dqM/Nz7ufzJkgEAOAlLAlG+Z5dAlXTgscO/uPR0dRRmHB4nQnBIYHBzU8cjCulPBEUyuAndqd0x/5f6yOeYAAQTCEqCwHdZ4kg0CCCBQuMDo2KiJwZ5QmpMcRCWw9dqWznds7GxUeZMsAu0KSAGTxcF2BcO5z/4dSlEmnHElk2wFZCFdnnbItjdad1nA3sC8Wq26HCqxIYBABwIUtjvA41YEEEAAgf0C9sRxt767/wLORCOwsND4tnaSsL2hUzQAJIpAGwJ2AdMubLbRFLd4LmAXZSYnJz3PhvARyEdAFtLlaYd8eqUXFwVkI/vek72qVCq5GCIxIYBACgIUtlNApAkEEEAAgT2BZOKYTCCTn/mrV/c+4Cg6gY31DZPzSHXEHHOAAAKHC9iLg3Zh8/A7+CRUAbsoE2qO5IVA2gL2Qrq9wJ52P7TnvsDaw8YG5hMTLAy6P1pEiED7AhS227fjTgQQQACBQwRkAikTykMu43TgAuvrjf+gkI2cAk+X9BBIRcBeHJTCZioN04h3ArcWF3XM8jvVuwQIGIECBOyFdHuBvYBQ6LJggdXVVR3B+PnzBUdC9wggkKUAhe0sdWkbAQQQiFRAJpAyoYyUIfq0567MaYOenhPRWwCAQCsCUsiUwmYr93JtOAIrKys6GfmdGk5mZIJAtgLDZ4Z1B7LAnm1vtO6qwOXZWR1apVJxNUTiQgCBFAQobKeASBMIIIAAAk8KdHd36RMyoXzyU/4Wi4Bs3HTx+YuxpEyeCKQiIIXM7e2dVNqjET8FZANRijJ+jh9RFycwNHRady4L7MVFQs9FCWxubpqu7Y3tzUkOEEAgGAEK28EMJYkggAAC7ghMX7hggrEnluYkB1EIyMZN/f18UyaKASfJ1ASkkMniYGqk3jVk/+6kKOPd8BFwwQKyoL69/ajgSOi+KAF7jwr7vetFxUO/CCCQnQCF7exsaRkBBBCIVsCeQNoTy2hBIkzc3rCp3F+OUICUEWhfwC5k2gXO9lvkTt8E7N+d9oaivuVBvAgUISAL6vLUQxEx0GexAvYG9n19fcUGQ+8IIJCpAIXtTHlpHAEEEIhTwJ5ALi8tx4kQedb13boRmJxkN3qDwQECTQjYhUy7wNnErVwSiIAUZXpP9qpkQ1F+EECgeQF7Qf1O7U7zN3JlMAKygf2lmZlgciIRBBA4WIDC9sEunEUAAQQQ6FBAJpJra2sdtsTtPgosLd3WYcsGTj7mQMwIFCVgFzKlwFlULPRbjIAUZWQj0WKioFcE/BSwF9RZHPRzDDuNWjawHxgY6LQp7kcAAccFKGw7PkCEhwACCPgqIBPJxZs3fU2BuDsQuLW4qO+WDZw6aIpbEYhSwCwOPmRxMMZ/ABRlYhx1ck5TIHnaIfmRhfY026Yt9wWuX1/QQVZOsc+L+6NFhAh0JkBhuzM/7kYAAQQQOERAJpIysTzkMk4HKrCysqIzkw2cAk2TtBDITEAWB6XAmVlHNOykgGwcKr9LnQySoBBwWECedpCFdodDJbSUBer1utp6bUu3am9on3I3NIcAAo4IUNh2ZCAIAwEEEAhNQCaSycQymWDyE5eAbNjU1dUdV+Jki0BKAlLQlAJnSs3SjAcC9oah8rvUg7AJEQGnBMbPn9fxyEK7U8ERTKYCtVrNtG9vaG9OcoAAAkEJUNgOajhJBgEEEHBHoKvUZYKxJ5jmJAfBCtgbNY2OjQabJ4khkKWAXdBkcTBLaffatt8JTFHGvfEhIj8EKpXGKyhkod2PqIkyDQF743p7Q/s02qYNBBBwT4DCtntjQkQIIIBAEAIj1RGThz3BNCc5CFbALspUq9Vg8yQxBLIUsAuaLA5mKe1e2/aGoRRl3BsfIvJDwF5Ytxfc/YieKDsRkI3rp6anOmmGexFAwBMBCtueDBRhIoAAAj4KyIRSJpg+5kDMrQvIRk3Jxk2lUqn1BrgDAQSUXdBkcTCufxA7O7s6YdlANK7syRaBdATshXV7wT2d1mnFZQHZuH5wcNDlMIkNAQRSEqCwnRIkzSCAAAII7BeQCaVMMPdfwZkQBWSjJtm4KcQcyQmBPASksMniYB7a7vQhvzNlA1F3IiMSBPwRSBbWkwX25EcW3P2Jnkg7EZCN68+Nj3fSDPcigIAnAhS2PRkowkQAAQR8FJAJpUwwfcyBmFsXkI2aZOOm1lvgDgQQSASksCmFTlTiEJDfmbKBaBxZkyUC6QvIAvvaw7X0G6dFJwWSPSmSjeuTn7Gxs07GSFAIIJCuAIXtdD1pDQEEEEDAEpAJZTLBZPMzCybwQ9moSTZuCjxd0kMgMwEpbEqhM7OOaNgZAbsoY28g6kyABIKARwKywL66uupR1ITaiYC9J4W9V0UnbXIvAgi4LUBh2+3xIToEEEDAawF7QmlPNL1OiuCPFNjc3DSf2xs3mZMcIIBA0wJS2GRxsGky7y+0f1fav0O9T4wEEChAQBbYL8/OFtA7XRYhYO9JYW9kX0Qs9IkAAvkIUNjOx5leEEAAgSgF7AmlPdGMEiOSpO0NmuyNmyJJnzQRSFXALmzaBc9UO6ExpwTs35X2BqJOBUkwCHgiYC+w2wvvnoRPmG0IyJ4UsoF9G01wCwIIeCZAYduzASNcBBBAwDcBmVju7u74FjrxtiEwf/WqvivZsCnZuIkfBBBoX8AubNoFz/Zb5E7XBaQoIxuHuh4v8SHgsoC9wG4vvLscM7F1JiB7UsgG9p21xt0IIOCDAIVtH0aJGBFAAAGPBWRiOXdlzuMsCL1ZAdmgSTZsavY+rkMAgYMFZHFQCp4HX8XZUASkKCMbh4aSF3kgUIRAssCeLLQnP7LwXkQc9JmfgOxJIRvY59czPSGAQFECFLaLkqdfBBBAIBIBmVg+eHA/kozjTlM2aJINm+LWIHsEOheQxUEpeHbeIi24LCBFGdk41OVYiQ0BHwRkoV0W3n2ImRjbE7A335UN7NtribsQQMAnAQrbPo0WsSKAAAIeCsjE8t7dex5GT8itCsgGTbJhU6v3cz0CCDwpIIuDUvB88lP+FpKAXZSRjUNDyo9cEChCQBbaZeG9iBjoMx8Bey8Ke4+KfHqnFwQQKEqAwnZR8vSLAAIIRCJgTywXFhYiyTrONO2NmewNm+LUIGsE0hGQxcGt17ZUUvjkJ1wBijLhji2ZFScgC+2y8F5cJPSctYC9F4W9gX3W/dI+AggUK0Bhu1h/ekcAAQSCF7AnlhvrG8HnG3OC9sZM9oZNMZuQOwKdCtiLg3bhs9N2ud89AbsoY28c6l6kRISAPwL2Qru9AO9PBkTarIDsRSF7UzR7H9chgIDfAhS2/R4/okcAAQS8EJAJ5vr6mhfxEmR7ArIxU7JRU7JhEz8IINC5gL04aBc+O2+ZFlwTkKLMpZkZ10IjHgS8FbAX2u0FeG8TIvBDBWQvCtmb4tAL+QABBIISoLAd1HCSDAIIIOCmgEww567MuRkgUaUiIBszyUZNqTRKIwggoGRxUAqfkIQpIEWZgYGBMBMkKwQKEEgW2pMF9+RHFuALCIMucxCQvShkb4ocuqQLBBBwQIDCtgODQAgIIIBA6AIywZQJZ+j5xpqfbMwkGzXF6kDeCKQt8Na3vk03KYXPtNunPTcE5Hdk5VTFjYCIAoFABGTBXRbgA0mLNCwBe/Nd2ZvC+phDBBAIWIDCdsCDS2oIIICAKwIywWTzM1dGJJs4ZGMm2agpm15oFYH4BKTQKYXP+ATCz9guykxfuBB+wmSIQI4CsuAuC/A5dk1XOQnYe1DYe1Pk1D3dIIBAgQIUtgvEp2sEEEAgFgF7gmlPPGPJP4Y879TumDTtjZrMSQ4QQKBtASl0sjjYNqHzN9q/G+3fmc4HToAIeCAgC+6yAO9ByITYooC9B4W9N0WLzXA5Agh4KEBh28NBI2QEEEDANwF7gmlPPH3Lg3gPF7A3ZLI3ajr8Dj5BAIFmBexCp10AbfZ+rnNfwP7d2NfX537ARIiARwL2gvvm5qZHkRNqswKyB4XsSdHsfVyHAAL+C1DY9n8MyQABBBDwQkAmmjLx9CJogmxaYGnptr422aAp2aiJHwQQSE/ALnTaBdD0eqClogVu37qlQ7g0M1N0KPSPQHAC9oJ7bbkWXH4kpJTsQSEb1mOCAALxCFDYjmesyRQBBBAoVEAmmjLxLDQYOk9d4Nbiom5TNmhKvQMaRCByASl4sjgY5j8EeffvwMBAmAmSFQIFCiQL7snCe/IjC/EFhkPXGQjIHhSyYX0GXdAkAgg4KkBh29GBISwEEEAgNAGZaMrEM7T8Ys9nZWVFE8gGTbF7kD8CaQtIwZPFwbRl3WhP3v0rG4W6ERVRIBCOgCy8y0J8OJmRib35rmxYjwoCCMQjQGE7nrEmUwQQQKBQAZlosvlZocOQWefX5q/ptmWDpsw6omEEIhWQgqcUQCNlCDJt+52/slFokImSFAIFCsjCuyzEFxgKXacsYO89UR2tptw6zSGAgOsCFLZdHyHiQwABBAIRsCea9gQ0kPSiTuNO7Y7J396gyZzkAAEEOhawC552IbTjhmmgcAF78117o9DCAyMABAISkIV3WYgPKLXoU7H3nrD3pIgeBgAEIhGgsB3JQJMmAgggULSAPdG0J6BFx0X/nQvYRRl7g6bOW6YFBBAQAbvgaf9vTj7nT38F5q9eNcHbvyvNSQ4QQKBjAXvh3V6Q77hhGihcQPaekL0oCg+IABBAIFcBCtu5ctMZAgggELeATDhlAhq3RjjZy0ZMw2eGVbJBEz8IIJC+gF3wtAuh6fdEi3kLrD1c013K78i8+6c/BGIQsBfeWRwMa8Rl7wnZiyKs7MgGAQSOE6CwfZwQnyOAAAIIpCYgE06ZgKbWMA0VKiAbMQ0NnS40DjpHIHQBKXxKITT0fGPJb3V1Vacq7wCOJW/yRCBPgWThPVmAT35kQT7P/ukrOwHZe0L2osiuJ1pGAAEXBShsuzgqxIQAAggEKiATTpmABppmdGnduHFD53zx+YvR5U7CCOQpIIVPKYTm2Td9ZScgvxPlHcDZ9UTLCMQtIAvwsiAft0YY2dt7Tth7UYSRHVkggEAzAhS2m1HiGgQQQACBVATsCac9EU2lcRopTODe3Xu67/7+SmEx0DECMQhI4VMKoTHkHHqO9rt+7XcAh543+SFQhIAswMuCfBEx0Ge6AvZrZey9KNLthdYQQMBlAQrbLo8OsSGAAAKBCdgTTnsiGliaUaWzsLBg8i33l80xBwggkL6AXfi0C6Lp90SLeQnYvwvtdwDn1T/9IBCTgCzAy4J8TLmHmqvsOdF7slfZe1GEmi95IYDAfgEK2/tNOIMAAgggkJFAMuFMJp7Jj0xEM+qKZnMS2FjfMD1NTk6aYw4QQCB9AbvwaRdE0++JFvMSkHf9Jr8b2Xw3L3X6iVXAXoC3F+Zj9Qghb9lzYmKCOWgI40kOCLQjQGG7HTXuQQABBBBoW0AmnjIRbbshbnRCYH19TccxNT3lRDwEgUDIAknhUxYHpSAacr4x5Cbv+pXfjTHkTI4IFCVgL8DbC/NFxUO/nQv81V99Qzcie1B03iItIICAbwIUtn0bMeJFAAEEPBeQiadMRD1PJ/rw567MaYPBwcHoLQBAIA8BKYBKQTSPPukjO4GVlRXduPxuzK4nWkYAgURAFuJlYR4VvwWuzV/TCcgeFH5nQ/QIINCOAIXtdtS4BwEEEECgbQGZeMpEtO2GuNEJgevXG+/YPjc+7kQ8BIFA6AKy+ZkUREPPN/T85Hfh2bNnQ0+V/BBwQkAW4mVh3omgCKItAXuvCXsPirYa4yYEEPBWgMK2t0NH4AgggICfAvbE056Q+plN3FHX63W19dqWRhgboygT978Gss9LQDY/k4JoXv3ST/oC9jt+7Xf/pt8TLSKAgAjIQrwszMt5/vRPwN5rwt6Dwr9MiBgBBDoRoLDdiR73IoAAAgi0LGBPPO0JacsNcUPhArVazcRQLpfNMQcIIJCdgF0AtQuj2fVIy1kJ2O/4td/9m1V/tIsAAkrJQnyyMJ8s0PPjr4DsNTF8ZpjNd/0dRiJHoGMBCtsdE9IAAggggEArAsnmZ8kENPmRCWkr93OtOwLLS8smmJHqiDnmAAEEshOwC6B2YTS7Hmk5KwF5x6/8TsyqH9pFAIE9AXsh3l6g37uCI18EZK+JoaHTvoRMnAggkIEAhe0MUGkSAQQQQOBoAZmA8n7Do51c//T2rVs6xEszM66HSnwIBCUghVApjAaVXETJyO/A5557LqKsSRWBYgXshXh7gb7YqOi9HYEbN27o22TviXba4B4EEPBfgMK2/2NIBggggIB3AjIBffDgvnexE/CewOrqqv7LwMDA3kmOEEAgcwEphEphNPMO6SATAXnHr7zzN5NOaBQBBPYJyIK8LNDvu4ATXgjcu3tPxyl7T3gRNEEigEDqAhS2UyelQQQQQACB4wRkAioT0uOu53M3BS7PzurAKqcqbgZIVAgEKiCFUCmMBppm0Gmx+W7Qw0tyjgvIgrws0DseLuEdIGDvMTE6OnrAFZxCAIFYBChsxzLS5IkAAgg4JGBPQO2JqUMhEsoxApubm+aK6QsXzDEHCCCQvQCbn2VvnHUP9rt97Xf+Zt0v7SOAgFJnz53TDLJAj4l/AvZrZOzXy/iXCREjgECnAhS2OxXkfgQQQACBlgXsCag9MW25IW4oTKC2XDN9V6tVc8wBAghkL1Ad3fvfnF0gzb5nekhLwP7dZ/9OTKt92kEAgcMFRsf2vuFrL9QffgefuCawtramQ5qannItNOJBAIGcBShs5wxOdwgggAACDQGZiMrEFBe/BJaWbuuAe0/2qlKp5FfwRIuA5wJ9fX0mg/mrV80xB/4IyLt95V2//kROpAj4L2AvyNsL9f5nFk8Gizdv6mQHBwfjSZpMEUDgQAEK2weycBIBBBBAIGuBt771bboLmZhm3R/tpytwa3FRNzgxMZluw7SGAAJNCUhBdO1h41trTd3ERc4IyLt95V2/zgRGIAhEIJAsyCcL88mPLNRHkHZQKcoeE7LnRFDJkQwCCLQkQGG7JS4uRgABBBBIS0A2HOT9hmmJ5tvOjRs3dIcXn7+Yb8f0hgACWkAKolIghcUvAfndJ+/69St6okXAfwFZmJeFev8ziieD5PUxW69t6YTZ5yWecSdTBA4ToLB9mAznEUAAAQQyFbAnorzfMFPqTBq/d/eebre/v5JJ+zSKAAJHC0hBVAqkR1/Npy4J3KndMeHY7/o1JzlAAIHMBWRhXhbqM++QDlIT2NjYMG2x+a6h4ACBaAUobEc79CSOAAIIFCvA+w2L9e+k94WFBXP76OjeBkzmJAcIIJC5gF0QtQulmXdMBx0L2EUZ+3dhxw3TAAIINC0gC/OyUN/0jVxYuIDsLZG8Tsbec6LwwAgAAQQKEaCwXQg7nSKAAAII8H5Df/8NLC8tm+BHqiPmmAMEEMhPwC6I2oXS/CKgp3YF5J2+w2eG2Xy3XUTuQ6BDAXth3l6w77BZbs9BQF4fI6+TyaFLukAAAYcFKGw7PDiEhgACCIQuIBNSmaCGnm8o+a2tNTarm5qeCiUl8kDAO4FkcTApjCY/Uij1LolIA567MqczHxo6HakAaSNQvIC9MG8v2BcfGREcJ7CysqIvGT9//rhL+RwBBCIQoLAdwSCTIgIIIOCqAO83dHVkjo5r8eZNfcFb3/q2oy/kUwQQyFRACqNSKM20MxpPTeDBg/u6LfkdmFrDNIQAAi0JyAK9LNi3dDMXFyZwbf6a7vvs2bOFxUDHCCDgjgCFbXfGgkgQQACB6AR4v6GfQy6b1VVOsXGknyNI1KEISGFUCqWh5BVyHvV6Xck7fcfGKMqEPNbk5r6ALNDLgr37EROh/dqYcn8ZEAQQQEBR2OYfAQIIIIBAYQK837Aw+rY73tzcNPdOX7hgjjlAAIH8BaQwmhRKk4IpP+4L1Go1E2S5TFHGYHCAQAECskAvC/YFhECXLQpsrG+YOyYnJ80xBwggEK8Ahe14x57MEUAAgcIFeL9h4UPQcgC15b2ijL15XcsNcQMCCHQsUB2tmjbsgqk5yYFzAva7fO3fgc4FSkAIRCBgL9DbC/cRpO5tirdv39axy2tkvE2EwBFAIDUBCtupUdIQAggggEA7AjIx5f2G7ejlf49sUtd7slclm9fxgwACxQn09f3/7d1b1F1XXSjw7Rk+5jyUp1SOgEnTNgUzSEIql6ZpU0GltqfcizBkoAIysEeRO4JXBOSuyCgXUcsAARUaKe1BoClpCq1tk49RsUmTNOgY1uapeTh99zBX+O/ML/m+L/u21pprrd96KCt7r7Xmf/7mZu9v//dc/7l+3PiB++8f79spV+DwoUNVcFfu3l1ukCIjMBCB/Af6/If7gXS/k92MsjFRRqaTnRA0AQILFZDYXiinixEgQIDAtALxh2n8oTrt+Y5vVuDQgw9WDT796W7/bFZeawRWFogE6SP/+cjKB3i0KIEf/OBfq3h++qd/uqi4BENgiALpB/oNGzdUXY8f7ofo0KU+R9mYKCPTpdjFSoBAPQIS2/W4uioBAgQITCgQf5jGH6oTnuawlgQeeOCBquVYtK6lMDRLgMCPBS556lOrvUiYgilb4OCBg1WAF2/eXHagoiMwEIEnP/kpVU/vufuegfS4u93My8XkZWS62yOREyCwCAGJ7UUougYBAgQIzCyQ/2F67Oixma/jxPoF0uJ0aZG6tMWidfW3qgUCBNYSeOITn1g9HQnTtY71XLsC+WfchRdd2G4wWidAoBKIH+r/4z/+nUjhAnm5mLyMTOFhC48AgZoFJLZrBnZ5AgQIEFhbIP/D9NFHT690vvZZnm1DIF+c7vzzz28jBG0SIHCGQJ4gXVpaOuNZ/yxJ4MiRI+Nwtm5VzmmMYYdAiwLxQ3364T79gG8rVyDKxVjnpdwxEhmBNgQktttQ1yYBAgQIjAXUNxxTFL9z5KHTSZkLNl1QfLwCJDAEgTxB+uh/+XGw5DE/fPhwFV7U9C05VrERGIrApgs3jbua/4A/ftBOMQJRLsY6L8UMiUAIFCEgsV3EMAiCAAECwxZQ37Ab43/40KEq0FisrhtRi5JA/wW2bd9WdTISp/3vcTd7GIskb9mypZsdEDWBHgqsX79+3KsD998/3rdTnkCUi4nyMeVFKCICBNoQkNhuQ12bBAgQILBMIP5A/f733Ua/DKawf8TidLFYXWHhCYfAYAWe9KQnVX2PxOlgIQrveHzGbb7kksIjFR6BYQnED/aP/Ocjw+p4h3prnZcODZZQCTQsILHdMLjmCBAgQOBsgahvePKxk+obns1TzCOxOF0sVldMYAIhMHCBSJTesXfvwCXK7f6JEydG6TMubfmiyeVGLDICwxGIH+zjB/zh9Lw7Pc3LxOTlY7rTA5ESIFCXgMR2XbKuS4AAAQITC+R/oOZ/uE58AQfWLnDs6LFxG/lideMH7RAg0JpAnihNCVRbeQJHjxwdB5Uvmjx+0A4BAq0JXHzxxVXb8QN+a4FoeFWBvExMXj5m1RM8QYDAYAQktgcz1DpKgACBcgXSH6hphfO05X+4lhvx8CI7cuT0wpH5YnXDk9BjAuUJ5InSPIFaXqTDjeihh04tHJk+69KiyTYCBMoROP+nzh8Hs7SkLN4Yo6CdKBMTZWMKCk0oBAi0LCCx3fIAaJ4AAQIETgnECueHHnwQSYECsShdLFJXYIhCIjBYgZQo3bBxQ9X/SKAOFqPQjsdnW3zWFRqmsAgMUiD/wf7IQ6d/yB8kRqGdjjIxUTam0DCFRYBACwIS2y2ga5IAAQIEzhaIP1QfeOCBs5/0SOsCsSjd0572s63HIgACBM4WePKTn1I9eM/d95z9pEdaF4jPtlgsufWABECAwDKB+OH+kUcsILkMppB/RJmYKBtTSFjCIECgAAGJ7QIGQQgECBAgMBrFH6rHHz6Oo0CBWJTuif/riQVGJyQCBCJh+v3vu42+tFfD448/PorPtlgsubQYxUNg6ALxw338kD90j5L6n5eHufDCC0sKTSwECBQgILFdwCAIgQABAgRGo/wP1fwPWDbtC+QLR+aL1LUfmQgIEAiBSJiefOzkyAKSoVLG/+aLIueLJZcRnSgIEEgCF2/eXEHED/lUyhHIy8NcsOmCcgITCQECRQhIbBcxDIIgQIAAgfwP1fwPWDLtCzz66KPjIPJF6sYP2iFAoHWBPGGa/3+29cAEMF4UOS0cmRZLthEgUJ7AhRedngmc/6BfXqTDi+jwoUNVp6NczPAE9JgAgbUEJLbX0vEcAQIECDQqECudxx+wjTausVUFYjG6tDhdWqTORoBAeQIpYZoSp2k7cP/95QU44IgsHDngwdf1zggsW0DyiAUkSxq4WDgyysWUFJtYCBBoX0Biu/0xEAEBAgQI/FggFpCMP2DBlCEQi9Ft2bKljIBEQYDAigJPf/rW6vFIpK54kAcbF4iFI+MzrvEANEiAwEQCMSP48OHDEx3voGYExgtH/rhcTDOtaoUAga4ISGx3ZaTESYAAgQEIxAKS8QfsALrciS7GYnSbL7mkE/EKksBQBWIByUikDtWhpH7nC0fGZ1xJ8YmFAIHTAk960pOqf1hA8rRJ23t5WZi8XEzbcWmfAIFyBCS2yxkLkRAgQGDwAhaQLO8lkBahS4vRpc3CkeWNj4gI5AKxgOTxh4+PUkLV1r5AvnBk/hnXfmQiIEDgTIH4Ad8CkmfKtPfvI1lZmLxcTHsRaZkAgdIEJLZLGxHxECBAYMACFpAsb/CPHjk6DsrCkWMKOwSKFMgXkMwTqkUGO5Cg8nrn+WfcQLqvmwQ6JZD/gJ/PFO5UJ3oWbJSFiTIxPeue7hAgsAABie0FILoEAQIECCxOwAKSi7NcxJUsHLkIRdcg0IyABSSbcZ6mlUf+85Hq8Phsm+ZcxxIg0KxA/gN+PlO42Si0lgtEWRgLR+Yq9gkQyAUktnMN+wQIECDQukAsrmUBydaHogrAwpFljIMoCEwqYAHJSaWaOS4+y+KzrZlWtUKAwCwC69atG23YuKE6NWYKz3Id5yxOIMrCXGzhyMWhuhKBnglIbPdsQHWHAAECXReIxbUsIFnGSFo4soxxEAWBSQUsIDmpVDPHxWdZfLY106pWCBCYVWDLli3VqTFTeNbrOG9+gbwcjIUj5/d0BQJ9FZDY7uvI6hcBAgQ6KnD+T50/jnxpaWm8b6d5AQtHNm+uRQLzClhAcl7BxZ2ff4ZZOHJxrq5EoE4BC0jWqTvdtfNyMBaOnM7O0QSGJCCxPaTR1lcCBAh0QCD/w/XIQ0c6EHF/Q7RwZH/HVs/6K2AByXLG1sKR5YyFSAhMKmAByUml6j8uysFYOLJ+ay0Q6LKAxHaXR0/sBAgQ6KlALLJ1+NChnvawG92ycGQ3xkmUBHIBC0jmGu3uH3rwwSqA+ExrNxqtEyAwiYAFJCdRauaYKAdj4chmvLVCoKsCEttdHTlxEyBAoMcCschWLLrV464W3TULRxY9PIIjsKqABSRXpWn0iQceeKBqLz7TGm1cYwQIzCRgAcmZ2Go5ycKRtbC6KIHeCUhs925IdYgAAQLdF4hFtmLRre73qJs9sHBkN8dN1AQsINn+a+Dxxx8fHX/4eBVIfKa1H5UICBCYRMACkpMo1XvMsjUKLrqw3sZcnQCBTgtIbHd6+ARPgACBfgrki2zlf9j2s7dl9srCkWWOi6gITCJgAclJlOo95ujRo+MG8s+08YN2CBAoVuDSn3tmFVvMGC420B4Hlq+zk6+/0+Mu6xoBAjMKSGzPCOc0AgQIEKhP4IJNF4wvnv9hO37QTu0C+Wz5vN5k7Q1rgACBuQXyBSSXDi7NfT0XmF7AwpHTmzmDQCkCF2YzhI8dPVZKWIOKI9bZsXDkoIZdZwnMJCCxPRObkwgQIECgboFYbCv+sK27PddfLhAr0W/YuGGU6k3aCBDojkC+gGQsAtud6PsRqYUj+zGOejFMgXyG8JEjR4aJ0HKvY50dC0e2PBCaJ9ABAYntDgySEAkQIDBEgVhs66679g+x+633OVaijzqTrQckAAIEphKIBSRjEdipTnbw3AKxcGTUO5/7gi5AgECjAjFTOH7ob7RxjY3izsEdl15KgwABAmsKSGyvyeNJAgQIEGhLIBbbSotvpUW4bM0KRF3JqDPZbOtaI0BgXoFIqMYisPNez/mTC+QLR0a988nPdiQBAiUIxEzhu7/33RLCGVQM+fo61igY1NDrLIGZBCS2Z2JzEgECBAjULZD/IZsvwlV3u64/GuX1JPM6k2wIEOiOwPZnPKMK9uRjJ0dpMVhbcwJ5XfO83nlzEWiJAIF5BS7evLm6RMwcnvd6zp9cIF9fJ193Z/IrOJIAgSEJSGwPabT1lQABAh0SSH/InveE86qI80W4OtSFzoaa15PM60x2tkMCJzBAgXzR16NHjg5QoL0uR13z9BmW6p3bCBDonkD+w34+g7h7PelexPf+yz1V0LHeTvd6IGICBJoUkNhuUltbBAgQIDCVQNSIjUW4pjrZwTML3HfvvdW5UV9y5gs5kQCB1gTSoq9p8de03Xfffa3FMcSGo655fIYN0UCfCXRdIP9hP59B3PV+dSH+WKMg1tvpQsxiJECgPQGJ7fbstUyAAAEC5xCIGrH79u07x5GeXqSAlegXqelaBNoTiMVfYzHY9iIZVstR1zw+w4bVe70l0B+BmDF8+NCh/nSq8J7kaxTEejuFhyw8AgRaFpDYbnkANE+AAAECqwvEoltqxK5uVMczUU/SSvR16LomgeYEYvHXWAy2uZaH21KqZ54+s9IWdc6Hq6HnBLotEDOG77prf7c70qHo83V13DnYoYETKoEWBSS2W8TXNAECBAisLbB129bxAWrEjilq3cnrSOYLeNbaqIsTIFCLQF4jNl8UtpbGXLQSiB8G0z/yOud4CBDonkDMGD7+8PFRmklsq18g1tWxRkH91log0BcBie2+jKR+ECBAoIcCasQ2P6h5HUkr0Tfvr0UCixTIa8QeOHBgkZd2rVUEDh8+XD2T6punzzAbAQLdFchnDOczibvbo/Ijt0ZB+WMkQgKlCUhslzYi4iFAgACBZQJqxC7jqP0fVqKvnVgDBBoViMSMGrHNsEc988su29lMg1ohQKA2gfXr14/SzOG0xUzi2hpz4UrAGgVeCAQITCsgsT2tmOMJECBAoFEBNWIb5R5Zib5Zb60RqFvgWc9+TtVELApbd3tDv37UM7948+ahU+g/gV4IPP3pp8rixUziXnSq0E5Yo6DQgREWgcIFJLYLHyDhESBAYOgCasQ29wpIXyhSHcm07dixo7mGtUSAQG0CUSM21X5WI7Y25urCy9YouOjCehtzdQIEGhF45rOeWbUTM4kbaXSgjVijYKADr9sE5hSQ2J4T0OkECBAgUK+AGrH1+uZXzxfo3HThpvwp+wQIdFQgXwRWjdh6BzFfoyD/7Kq3VVcnQKBOge3PeEZ1+ZOPnRylCQC2+gRijYJUQssaBfU5uzKBvglIbPdtRPWHAAECPRRQI7aZQX3oodOLnqW6kjYCBLovkBaBVSO2mXG0RkEzzloh0KTApk2nf+jPZxQ3GcNQ2rr7e9+tuvq0p/3sULqsnwQILEBAYnsBiC5BgAABAvUKRI3Yu+7aX29DA7961I+MBTsHzqH7BHojoEZsM0NpjYJmnLVCoEmBNHN4PMHi8KkJAE22P6S24ocDaxQMadT1lcD8AhLb8xu6AgECBAjULBA1YlP9ZzVi68OORc9iwc76WnJlAgSaFFAjtn5taxTUb6wFAm0JxAzimFHcVhx9bjdfo2D79u197qq+ESCwYAGJ7QWDuhwBAgQILF4gZsqkKy8dXFp8A644Onb02FghX7Bz/KAdAgQ6K5DXiM3/v97ZDhUYuDUKChwUIRFYkMCOSy+trhQzihd0WZfJBA7cf//4X6mElo0AAQKTCkhsTyrlOAIECBBoTSDVe44asVEHurVgetrwgQMHxj2z6NmYwg6BXgjkNWKPHDnSiz6V1on77ruvCmnDxg0jaxSUNjriITCfQL4Ibz6zeL6rOjsXOPTgg9U/r9y9O3/YPgECBM4pILF9TiIHECBAgEAJArt27arCiDrQJcTUpxgsetan0dQXAssF8hqx99177/In/WshAg/+279V17FGwUI4XYRAUQIW4a1/OPbt21c1EqWz6m9RCwQI9EVAYrsvI6kfBAgQ6LnA5ksuqXoYdaB73t3Gu2fRs8bJNUigUYGoEfuDH/xro+0OpbH4bLJGwVBGXD+HJhCL8MbM4qH1v87+pjUKTj52smrioosurrMp1yZAoIcCEts9HFRdIkCAQB8FokZs6psasYsdYYueLdbT1QiUKJDXiLUI72JHKC9NYNGzxdq6GoFSBGImccwsLiWuPsSR1y7fum1rH7qkDwQINCggsd0gtqYIECBAYHaBvO5zXg969is6MwQsehYS/pdAfwXyRXiPHj3a34620LMjD52uW27RsxYGQJMEGhCICRZpZrEJFosFjxJZ6XMqlc6yESBAYBoBie1ptBxLgAABAq0KxIIyUQ+61WB61LhFz3o0mLpCYBWBfBHeA/ffv8pRHp5FID6T4jNqlms4hwCBsgUswlvf+ESJrCiZVV9LrkyAQB8FJLb7OKr6RIAAgZ4KXPLUp1Y9i3rQPe1m4926+3vfrdq87LKdjbetQQIEmhOwCG891lGaIEoV1NOKqxIg0KaARXjr0U+lsaIUSZTMqqclVyVAoK8CEtt9HVn9IkCAQA8FduzYUfXq+MPHR6kutG0xAvGF4uLNmxdzQVchQKBIgVjYMBY6LDLIjgVl0bOODZhwCcwh8KxnP6c6+6679s9xFafmAksHl8b/zEtmjR+0Q4AAgXMISGyfA8jTBAgQIFCOQL6gTCRjy4mum5FY9Kyb4yZqArMIXHjRhePT8v/vjx+0M7VA/lmUf0ZNfSEnECBQvMDFF19cxZgmWFiEdzHD9dBDh6sLnfeE80apZJaNAAEC0wpIbE8r5ngCBAgQaE0g3Qa6YeOGqv3Dh0/9IdxaMD1pOGrtpi8UFj3ryaDqBoFVBPJFePMFD1c53MMTCFj0bAIkhxDoiUA+ozifadyT7rXSjXvuvqdqN0pltRKERgkQ6LSAxHanh0/wBAgQGJ5A1IGOutDDE1hsj32hWKynqxEoXSAWOIwFD0uPt/T4oiRBlCgoPV7xESAwu0CaURwTLGLh7dmv5swkEKWxolQWFQIECEwrILE9rZjjCRAgQKBVgVhYJt3+7TbQ+YcivlBsvuSS+S/mCgQIFC8QCxzGgofFB1xwgOkzKJUkSFuUKCg4XKERILAAARMsFoD440vkJbG2b9++uAu7EgECgxKQ2B7UcOssAQIEui/gNtDFjeGxo8fGF9v+jGeM9+0QINBfgfj/+snHTo7y94D+9ri+nuWlCPLPpvpadGUCBNoWiIW2TbCYfySiHF66knJ483u6AoGhCkhsD3Xk9ZsAAQIdFXAb6OIG7sCBA+OL5bV3xw/aIUCgdwKbNm0a9+nIkSPjfTvTC0QpglSawKJn0/s5g0AXBfKZxUePHu1iF4qJ+dCDD1axRImsYgITCAECnRKQ2O7UcAmWAAECBJLAli1bKgh1tud7PUSNXV8o5nN0NoEuCaRFeGN2cSx82KX4S4o1PoOiNEFJsYmFAIF6BNLM4rTgdtryGcf1tNbvq0ZJrCiR1e/e6h0BAnUJSGzXJeu6BAgQIFCbQCwwk24Dtc0u4AvF7HbOJNBlgVjoMBY+7HJf2oo91deOz6BY+6GtWLRLgECzArt27aoajAW4m229H62lUlipJFbaokRWP3qmFwQINC0gsd20uPYIECBAYG6B/DbQfOGZuS88oAv4QjGgwdZVAmcI7Nixo3okLXx44sSJM571z0kE1NeeRMkxBPopEBMsYgHufvay3l4ph1evr6sTGJKAxPaQRltfCRAg0BMBt4HOP5C+UMxv6AoEuiqwddvWcegx63j8gJ2JBNTXnojJQQR6KWCCxfzDqhze/IauQIDAKQGJba8EAgQIEOikgNtA5xs2Xyjm83M2gS4LqLM9/+hFfe1Y82H+K7oCAQJdETDBYv6RUg5vfkNXIEDglIDEtlcCAQIECHRSwG2g8w2bLxTz+TmbQNcF1NmefQTz+trxWTT71ZxJgEAXBUywmH3UlMOb3c6ZBAicLSCxfbaJRwgQIECgAwJuA519kHyhmN3OmQT6IqDO9uwjmdfXzj+LZr+iMwkQ6JpA/Kilzvb0I6cc3vRmziBAYHUBie3VbTxDgAABAgULuA109sHxhWJ2O2cS6IuAOtuzj2ReXzt9FtkIEBieQP6jloXMpxt/5fCm83I0AQJrC0hsr+3jWQIECBAoWMBtoLMNji8Us7k5i0CfBNTZnn00o772ZZftnP0iziRAoNMCJljMPnzK4c1u50wCBM4WkNg+28QjBAgQINARgfw20FTz1DaZgC8Ukzk5ikDfBdTZnn6E8/raOy69dPoLOIMAgd4ImGAx/VAqhze9mTMIEFhbQGJ7bR/PEiBAgEDBAstuAz24VHCk5YTmC0U5YyESAm0LqLM9/Qjk9bW3bd82/QWcQYBAbwTyCRa96VTNHVEOr2ZglycwQAGJ7QEOui4TIECgLwL5baBR87QvfaurH75Q1CXrugS6J6DO9vRjFp81GzZuGK1fv376CziDAIHeCOQTLPbfub83/aqzI8rh1anr2gSGKSCxPcxx12sCBAj0RuCaa66t+hI1T3vTsZo64gtFTbAuS6CDAnmd7du//a0O9qD5kOOzRn3t5u21SKA0ARMsph+RPTfvqU565rOeOf3JziBAgMAKAhLbK6B4iAABAgS6IxA1Tg8eODhSZ/vc4+YLxbmNHEFgSAJRZztq7w+p79P29cSJE6P0WZO2+OyZ9hqOJ0CgXwImWEw+nktLp8sGXnHFlZOf6EgCBAisISCxvQaOpwgQIECgfIG8xmle+7T8yJuP0BeK5s21SKB0gSt3n0ounHzs5CjV4LetLhBJ7XRE/tmz+hmeIUCg7wLxI5cJFuce6QP3318ddN4Tzhul2e42AgQILEJAYnsRiq5BgAABAq0JpBqnqdZp2vbefntrcXShYV8oujBKYiTQrMDWrVvHDeY1+McP2hkL3HfvvdV+Smqrrz1msUNg0AL5j1wmWKz9Urjn7nuqA3bt2rX2gZ4lQIDAFAIS21NgOZQAAQIEyhT4pedfXQV2110W7llrhP75G9+onvaFYi0lzxEYnsCVu3dXnf7WN785vM5P0eP4jInyLVOc6lACBHoqYILFZAObygXesXdvdfClP6e+9mRqjiJAYBIBie1JlBxDgAABAkUL7Nixo4rv+MPHR6kGqu1sgfSFIm6j94XibB+PEBiywHOf97yq+5F0GLLFan1PZVrSZ0za4jNntWM9ToDAsARMsDj3eOez2XddYcb2ucUcQYDApAIS25NKOY4AAQIEihXYuu30rfT7vrOv2DjbDMwXijb1tU2gbIHt27ePA9x/pztfxhjZTl6mZeflO7Nn7BIgMHSB+LHLBIvVXwn33Xdf9WQqH6iU0+pOniFAYHoBie3pzZxBgAABAoUJrFu3bryQ173/cqp+X2Ehth5O1B/3haL1oRAAgeIE0iJeaTGvtEXyobggWw4oPluibEvL4WieAIGCBEywOPdg/N/bbq0OuuwyPwyeW8sRBAhMIyCxPY2WYwkQIECgWIFf+MVfrGLbt8+M7ZUGKWrD+kKxko7HCBC45pprK4S7v/ddGCsI7Ll5T/VolG1Z4RAPESAwUIE0wSJ+9IofwQZKsWK3U5nAKOW0+6qrVjzGgwQIEJhVQGJ7VjnnESBAgEBRAldccWUVz8nHTo6WlpaKiq3tYHyhaHsEtE+gfIEdl15aBZlq8VurYPl45eVZ8rIty4/yLwIEhizwzGedWhAxfgQbssWZfc/LBOaz2888zr8JECAwi4DE9ixqziFAgACB4gTyW+nv2HtHcfG1GZAvFG3qa5tANwQu33X5ONBYaHb8wMB3ojxLKteSPmtsBAgQOFMgJlikx/Mfw848boj/jlns27ZvG6XZ7TYCBAgsUkBie5GarkWAAAECrQq4lX5l/vhCkW6T9YViZSOPEhi6QL5Wwe3f/tbQOZb1P2rDxmfMsif9gwABAj8SyCdYxI9hYE4JxCz2KBvIhQABAosUkNhepKZrESBAgECrAm6lX5k/vlCoDbuyj0cJEDglEEkHaxWcfkXkpZziM+b0s/YIECBwWiB+/Iofw04/M9y9fPZ6Pqt9uCJ6ToDAogUkthct6noECBAg0JqAW+nPps+/UKgNe7aPRwgQOC0QSQdrFZw2yUs55Z8xp4+wR4AAgVMC8eNXWijRWgWnTGL2ulJO/l9CgEBdAhLbdcm6LgECBAg0LuBW+rPJ995+e/Xgho0b1IY9m8cjBAhkAvmt9NYqOAUTpZzUhs1eKHYJEFhRIP/xK/9RbMWDB/JgzF6P2ewD6bZuEiDQoIDEdoPYmiJAgACB+gXiVvoov1F/i2W3cNdd+6sAL7tsZ9mBio4AgSIEIvkQyYgigmoxiPgsefFLXtpiFJomQKALAvkEi/hRrAtx1xVjXspp91VX1dWM6xIgMHABie2BvwB0nwABAn0TiFvpU7/yMhx96+ck/Tl29Ngo3Q6bNl8oJhFzDAECbqU//RrIP0OUcjrtYo8AgdUF4kew9KPY448/vvqBA3gmn7W+ddvWAfRYFwkQaENAYrsNdW0SIECAQG0C6Vb6VHYjbVHXr7bGCr/wd75zxzjCnZebsT3GsEOAwKoCbqU/TaOU02kLewQITCaQ/wi2dHBpspN6etS3vvnNqmdX7t49SrPZbQQIEKhDQGK7DlXXJECAAIFWBaLsxtBvpf/nb3yjGofrXnBdq+OhcQIEuiOQkg8pCZG2SEp0J/rFRnrLLV+rLvhLz796sRd2NQIEeiuQT7CIH8d629k1OpZmq9+xd291xHOf97w1jvQUAQIE5hOQ2J7Pz9kECBAgUKBAlN1IZThSOY4hbqmu4cEDB6uuX/Xzzx0igT4TIDCjQCQhUlJiqLfSp8+Ok4+drAR37Ngxo6TTCBAYokD8GBY/jg3R4M59d467veuKXeN9OwQIEFi0gMT2okVdjwABAgRaF8jLbuTlOFoPrMEAIqmdmty2fVuDLWuKAIGuC+RJiDw50fV+TRP/1752arb2eU84b5R/pkxzDccSIDBMgSt3X1l1PP04NtQJFrd/+1uVQfobdP369cN8Ieg1AQKNCEhsN8KsEQIECBBoWiDKb0Q5jqbbb7s9XyjaHgHtE+iuQEpCxA9i8V7S3d7MFnmUsrrmmmtnu4CzCBAYrMDWrVtH6UextMWPZEPD2LdvX9XlZz37OUPruv4SINCwgMR2w+CaI0CAAIFmBKL8Rpq5nMpyDGlLpQP23Lyn6vKLX/LSIXVdXwkQWJBAJCPivWRBl+3EZdJnRipllbYdl17aiZgFSYBAWQLxo1j8SFZWdCeP5j4AACF3SURBVPVGs//O/eNSTtde68fBerVdnQABiW2vAQIECBDopcDluy4f92vfd07NGhk/0POdvHRAXlKg593WPQIEFiiQJyNSkmJIW/6ZkX+WDMlAXwkQmE9gyOu9xKKZGzZuGKXFNG0ECBCoU0Biu05d1yZAgACB1gTWrVs3inIk//gPf99aHG00HKUD1DVsQ1+bBPohkJIRKSmRtkhS9KNn5+5FfGakz5D0WWIjQIDAtAJ5bf6hlSOJRTNjEc1p7RxPgACBaQQktqfRciwBAgQIdEpgiOVI8jIkUUqgU4MmWAIEihGIpEQkKYoJrMZAUhmSWHw3PkNqbM6lCRDosUBMsBhSORJlSHr8gtY1AoUKSGwXOjDCIkCAAIH5BfJbyPNby+e/crlXyMuQ5KUEyo1YZAQIlCoQ7yEnHzs5Gko5kvyzIv8MKXWMxEWAQLkC8eNYqtl/7OixcgNdYGRxh48yJAtEdSkCBNYUkNhek8eTBAgQINBlgSGWI4kyJL5QdPmVK3YCZQgMsRyJMiRlvPZEQaAPAvmPY0MpRxJ3+Fx22c4+DKE+ECDQAQGJ7Q4MkhAJECBAYHaBmC2Tbi1Pt5j3ecvLkEQJgT73V98IEKhfIN5LIllRf4vttaAMSXv2WibQR4F8gsUQypHkZUhe8cpX9nFI9YkAgQIFJLYLHBQhESBAgMDiBPLZMvkt5otroZwrKUNSzliIhEBfBIZUjiT/jMg/O/oylvpBgEDzAjHBYgjlSJQhaf71pUUCBEYjiW2vAgIECBDotUA+WyZuMe9rh6MMybbt20aphICNAAEC8woMqRxJfEakBd/SZ4eNAAEC8wqkH8nOe8J51WX6Xo4k7uyJO33mtXM+AQIEJhGQ2J5EyTEECBAg0GmBmC3T53IkeRmSF7/kpZ0eL8ETIFCWQCQpPnfTTaP0XtPHLS3slj4j0hafGX3spz4RINCsQPqR7Jprrq0a7XM5krwMSdzp06y01ggQGKqAxPZQR16/CRAgMCCB/Jbyr99ySy97npch2XXFrl72UacIEGhHIE9S5O817URTT6v5TMr8M6Oe1lyVAIEhCey+6qqqu30uR7Ln5q9WfbR4+ZBe2fpKoAwBie0yxkEUBAgQIFCjQF6O5Mtf+lKNLbV36b/5689WjacyJOvXr28vEC0TINA7gVSOJL23pC1KHvWtkzGT8ldf9SplSPo2uPpDoGWBnZfvHJcj+cLnP99yNItvPr9rMO7wWXwrrkiAAIGVBSS2V3bxKAECBAj0TOC6F7yw6lEfZ8ucOHFifAv9q3/t13s2crpDgEAJAlHiaM/Ne0bpPadP29LS0ih9NqQtZlb2qX/6QoBA+wJRjiTqULcf0eIiyO/k+ZVX/MriLuxKBAgQmEBAYnsCJIcQIECAQPcF+jxbJi+v4hb67r9W9YBAiQJ5iaN939lXYogzx/S1Pf9UnZsWeEufFTYCBAgsWuAVr3xldcmTj50c3XbrbYu+fKvXc9dgq/waJzB4AYntwb8EABAgQGA4An2dLRPlVa57wXVuoR/Oy1lPCTQqkEocpfeYtP3VZz7daNt1NpZuoY8ZlL/yilOJpzrbc20CBIYpkEo6pfrTaetTSSd3DQ7z9azXBEoSkNguaTTEQoAAAQK1CvRxtkx+C32UW6kV0cUJEBiswFU//9yq730q6ZRuoU8zKNOWL5JZPeA/BAgQWKDAb7zmtdXV+lTS6e++8HdjIXcNjinsECDQoIDEdoPYmiJAgACBdgXyBdC++pWvtBvMglqPW+jTLCC30C8I1WUIEFhR4PlXP793C6Dlt9CnzwgbAQIE6hLISzrlZeTqaq+J61p4twllbRAgsJaAxPZaOp4jQIAAgd4JxAJod+zd2/kF0NIt9J+76aZqjKxC37uXqg4RKFIgynWk8h3pPajL27Gjxyy82+UBFDuBjgnkJZ2ijFzHurAs3P137h8vvHvtdf972XP+QYAAgaYEJLabktYOAQIECBQhcPUvXz2OI799cvxgh3Zu/fqt42itQj+msEOAQI0CUa4jle9IZTy6vH3h85+vwk+LRrqFvssjKXYC3RGIsnGppFNKDHd523PzV6vw012DW7du7XJXxE6AQIcFJLY7PHhCJ0CAAIHpBdatWzf61Ve9qjrx775wKqkx/VXKOCMWcLty9+5RmgVkI0CAQN0CqVxHes9JW5TxqLvNOq6fLxqZFhZOnw02AgQI1C2QysbFIpKRGK67zTqunxaNTLXC0xa1w+toxzUJECBwLgGJ7XMJeZ4AAQIEeicQt0umGYe33XpbJ/uXLxr5whe9qJN9EDQBAt0UiPecgwcOjtJ7URe3fNHIWFi4i/0QMwEC3RN42fXXV0F3eRHJ/K7H/G7I7o2GiAkQ6LqAxHbXR1D8BAgQIDC1QLpdctv2bdV5XZ1x+PnPfa6KP836SQu62QgQINCUQL6IZCxg21Tbi2rnox/5cHWp9Flg0chFqboOAQKTCPzyNdeMD+vqIpJx12O6C9IdL+PhtEOAQAsCEtstoGuSAAECBNoXePWv/XoVRBdnHOa3f8asn/ZFRUCAwJAEfvP1r6+6mxawTe9JXdryO17is6BL8YuVAIFuC6TycVEW75M33ti5zqS7HdNdj2mLuyA71wkBEyDQGwGJ7d4MpY4QIECAwDQCXZ5xmN/+ef3LXz5Ntx1LgACBhQh0ecZh3PGSFo10x8tCXg4uQoDAlAKREO5iWby44yWtt2DRyCkH3uEECCxcQGJ74aQuSIAAAQJdEejijMO04JnbP7vyChMngf4KnDnjML03dWHL73iJz4AuxC1GAgT6JZASwrEQbySKu9DD/I6XWG+hC3GLkQCB/gpIbPd3bPWMAAECBM4hkM92/tSNnzzH0WU8/aUvfnF8++frXv+bZQQlCgIEBikQiy6mGYe3fv3WThjEe32arZ1/BnQieEESINArgUgMH3/4+Gj/nfs70bdPfPwvqzit8dKJ4RIkgUEISGwPYph1kgABAgRWEkiL3USNw1tu+dqoCzMOoxZjmuWTZkzaCBAg0JZAWnQxZhz+1Wc+3VYYE7ebZmunmuBpu+aaay14NrGcAwkQqEMglUJKCeK03fS3f1v9b8n/SbO179i7twrxN17z2pJDFRsBAgMSkNge0GDrKgECBAicLRCzntOMwzQbuuQtX6znDTf8Vsmhio0AgYEIxHtRmnGY3qNK3r5+yy3j8OK9f/yAHQIECLQg8MbffVPVakoYp8RxyVvM1k53vFz9y1eXHKrYCBAYkIDE9oAGW1cJECBA4GyBLtWJjRqMFus5exw9QoBAOwJdqROb7siJO17SnTrueGnn9aJVAgSWC+SztiNxvPyIMv6V7niJ2dppfYJ016ONAAECJQhIbJcwCmIgQIAAgVYFYuZeybO200zINCMybTFDslU0jRMgQODHAvGeVPKsbesTeLkSIFCqQBdmbb/rnb9X8VmfoNRXkbgIDFdAYnu4Y6/nBAgQIPBjgdJnbaeZhr//7ndV0Zqt7WVLgEBpAqXP2k4zDd/3p++t2MzWLu3VIx4CBEqftZ3X1jZb2+uVAIHSBCS2SxsR8RAgQIBAKwL5rO0Pf/BDrcSwWqP5TMOYGbnasR4nQIBAGwLx3pRmbX/5S19uI4RV2/zUjZ8cPxfv9eMH7BAgQKAAgXzW9v479xcQ0ekQokSK2dqnTewRIFCOgMR2OWMhEgIECBBoUSCftf25m24apRl+JWx5XViztUsYETEQILCSQD5r+4Mf+LNReu8qYTt29NgovaenzWztEkZEDAQIrCSQz9r+4z/6w5UOaeWxfLb2W976NrW1WxkFjRIgsJaAxPZaOp4jQIAAgUEJpJl8aTZK2qKWYNsAafZ4qv2dtve890/bDkf7BAgQWFUgZm2n96xPf+rTqx7X5BPvf9/7qubSe/ub3vLmJpvWFgECBKYSiFnbJd358tY3n3rf3LBxw+hl179sqv44mAABAk0ISGw3oawNAgQIEOiEQJq1nWoHpi2t/J5mqbS5pfbNNGxzBLRNgMA0AmnWdpoVnbZPfPzjozRbus0t3c6f3svTpi5smyOhbQIEJhFIs7bT3XlpK+HOl7/6zGfGC5f//h/8YRWX/xAgQKA0AYnt0kZEPAQIECDQqsD1L3/5KM1KSVuapdLm7fTvfc97qjjMNKwY/IcAgQ4I5He+xGzpNsJO791xO396T/+N17ymjTC0SYAAgakE3v6Od1THpztf/uDd757q3EUenEryffLGG6tLpmT7zst3LvLyrkWAAIGFCUhsL4zShQgQIECgDwLr1q0bxayUdCtoW7fTp1kyBw8crEjVNOzDK0sfCAxD4Mw7X9paSDK9d6f38LR94ENlLQg8jFeCXhIgMIvABZsuGL3hhhuqU/fcvKe1uwdTST6l8GYZQecQINC0gMR20+LaI0CAAIHiBdKslOtecF0VZ7qdvumSJOn2/ff96Xur9tMsGTUNi3/JCJAAgUwgzY7etn1b9Ui6nb7pxXjTe3Z6705bei9PJVJsBAgQ6IrAa1/32vGaL23cPZh+kIwyTu/4vXeO0g+WNgIECJQqILFd6siIiwABAgRaFfijP/mT1r5UvOPtbxv3PW5JHT9ghwABAh0QeN/7/6yKMs34a3Ix3lSCJBY7S2Wc0nu5jQABAl0SSHcPfvRjf16FnO48abIkSfohMv0gmbb0A6UyThWF/xAgULCAxHbBgyM0AgQIEGhPoK0vFR/58EfGJUje+/73j9ItqTYCBAh0TSC9d6WZfmlLM/9SeaUmtpQAihIkKTGU3sttBAgQ6JpAunswFuNNJUluu/W22ruQfhi84Q1vGJcgiR8oa29YAwQIEJhDQGJ7DjynEiBAgEC/Bc78UlF3rdj0pSVun1eCpN+vLb0jMASBNNMvvZelLZVX2n/n/lq7nZLnKQGUtlSj1mJntXK7OAECNQu86S1vHi9o/vvvftcolaqrc/vwBz9kckWdwK5NgEAtAhLbtbC6KAECBAj0RSB9qYhase98+9trS8ykLyvpS0vaNmzcMPrYX5y6BbUvjvpBgMAwBdJ7WSoJkrY3/s5v15aYST8MxtoE6T071ai1ESBAoMsC6Y6TGz/5qeo9NJV1uv5lLx2lWdV1bGnyxuduuqm6dFqbwPoudSi7JgECdQhIbNeh6poECBAg0BuB9KUi3YpZZ2ImJbXTl5X0pSW1k77EuH2+Ny8hHSEwaIH0XvalL/99ZRCJmUXPOsx/GEzvoR//xCe8hw76VafzBPojkMo6/fGfvKfqUHoPffWrXrXw5Hb6YTBN3khb+mHQ2gQVhf8QINARAYntjgyUMAkQIECgPYH0paKuxEye1E49TF9e1NVub6y1TIDA4gXSe1pKNqdt0cnt/D00JbXTe/X69esX3wlXJECAQEsCz7/6+eM1Cw4eOLjQ5HZKaqe62mnzw2BLA6xZAgTmEpDYnovPyQQIECAwFIGVEjPpy8A8W56QSddJiZ/05cVGgACBvgmk97ZFJ7fTe/AvPPe544XOPvPZz/phsG8vHP0hQKASSGsWxGKSkdxOf0fOs6XyI3lS2w+D82g6lwCBtgQkttuS1y4BAgQIdE4gEjNpRkuadZi+DKTFymbZ0peJPCEjqT2LonMIEOiSQLyHppjTe2h6D5x1Ud6PfPgjyxIy/3jzV0dbt27tEodYCRAgMJXAH/zRHy5LbqcydrMsypvqdL/pjW8clx+Ju13cMTjVcDiYAIFCBH7iv3+0zRvLxqf8zOjhf//hvJdxPgECBKYSSO89sXkPCgn/24TAmTOtUz3Cd77rXRMlVZaWlkaf+Phfju7Yu7cKNX2Z+OjH/ny08/KdTYSuDQIECLQukBIxaSHJlNxO25W7d4/ecMNvTfwe+tY3v3l0/OHj1bkSMhWD/xAgMCCBvHxI6nZa7PEtb3vbRGWY0rkf/ciHx++h6W/YNLlCCacBvYB0lUCBAvPklSW2CxxQIREgMJmAxPZkTo6qRyDNdvmd//Pb4wR1aiV9OXjxS1462nXFrmVfEE6cODFKt41+9StfOet4XybqGR9XJUCgbIH0A+E73v626r0xIk0J7he+6EXVe2meZEnvofu+s2/0j//w92cd/7G/+HMLRQag/yVAYDAC6T309b/5unGCOnU8Jbive8ELR1u3bV32vpiOPXDgwI/uMvz0suPfcMMNo9e+7rXLjh0MoI4SIFCUgMR2UcMhGAIEmhKQ2G5KWjtrCZw58yU/dsPGjT/6AvFw/lC1n2YYvuWtbxu97PqXnfWcBwgQIDAkgVSK5IMf+LPx7O2876u9h27YuGH0xt99kzUJciz7BAgMTiBNsvjSF784+uSNN079HvqBD31oortkBoeqwwQItCIgsd0Ku0YJEGhbQGK77RHQfi6QEty3f/tboz037xk/fGZSJs3ofvWv/fro8l2Xmx0zVrJDgMDQBVJy5s59d47+5q8/u2xG9pnvoWk24lU//1wJ7aG/YPSfAIFlAuk99Nav33rWXS0rvYemGd3K3y3j8w8CBAoQkNguYBCEQIBA8wIS282ba3EygVRH+/H/9/jogQceGG3ZsmW07n+uG23atEkyezI+RxEgMGCBlKA5evToWe+hFoYc8ItC1wkQmFgg3kMf/a9HRz/84Q9Hz37Os6tzvYdOTOhAAgRaEJDYbgFdkwQItC8gsd3+GIiAAAECBAgQIECAAAECBAgQIDCrwDyJ7f8xa6POI0CAAAECBAgQIECAAAECBAgQIECAAAECbQhIbLehrk0CBAgQIECAAAECBAgQIECAAAECBAgQmFlAYntmOicSIECAAAECBAgQIECAAAECBAgQIECAQBsCEtttqGuTAAECBAgQIECAAAECBAgQIECAAAECBGYWkNiemc6JBAgQIECAAAECBAgQIECAAAECBAgQINCGgMR2G+raJECAAAECBAgQIECAAAECBAgQIECAAIGZBSS2Z6ZzIgECBAgQIECAAAECBAgQIECAAAECBAi0ISCx3Ya6NgkQIECAAAECBAgQIECAAAECBAgQIEBgZgGJ7ZnpnEiAAAECBAgQIECAAAECBAgQIECAAAECbQhIbLehrk0CBAgQIECAAAECBAgQIECAAAECBAgQmFlAYntmOicSIECAAAECBAgQIECAAAECBAgQIECAQBsCEtttqGuTAAECBAgQIECAAAECBAgQIECAAAECBGYWkNiemc6JBAgQIECAAAECBAgQIECAAAECBAgQINCGgMR2G+raJECAAAECBAgQIECAAAECBAgQIECAAIGZBSS2Z6ZzIgECBAgQIECAAAECBAgQIECAAAECBAi0ISCx3Ya6NgkQIECAAAECBAgQIECAAAECBAgQIEBgZgGJ7ZnpnEiAAAECBAgQIECAAAECBAgQIECAAAECbQhIbLehrk0CBAgQIECAAAECBAgQIECAAAECBAgQmFlAYntmOicSIECAAAECBAgQIECAAAECBAgQIECAQBsCEtttqGuTAAECBAgQIECAAAECBAgQIECAAAECBGYWkNiemc6JBAgQIECAAAECBAgQIECAAAECBAgQINCGgMR2G+raJECAAAECBAgQIECAAAECBAgQIECAAIGZBSS2Z6ZzIgECBAgQIECAAAECBAgQIECAAAECBAi0ISCx3Ya6NgkQIECAAAECBAgQIECAAAECBAgQIEBgZgGJ7ZnpnEiAAAECBAgQIECAAAECBAgQIECAAAECbQhIbLehrk0CBAgQIECAAAECBAgQIECAAAECBAgQmFlAYntmOicSIECAAAECBAgQIECAAAECBAgQIECAQBsCEtttqGuTAAECBAgQIECAAAECBAgQIECAAAECBGYWkNiemc6JBAgQIECAAAECBAgQIECAAAECBAgQINCGgMR2G+raJECAAAECBAgQIECAAAECBAgQIECAAIGZBSS2Z6ZzIgECBAgQIECAAAECBAgQIECAAAECBAi0ISCx3Ya6NgkQIECAAAECBAgQIECAAAECBAgQIEBgZgGJ7ZnpnEiAAAECBAgQIECAAAECBAgQIECAAAECbQhIbLehrk0CBAgQIECAAAECBAgQIECAAAECBAgQmFlAYntmOicSIECAAAECBAgQIECAAAECBAgQIECAQBsCEtttqGuTAAECBAgQIECAAAECBAgQIECAAAECBGYWkNiemc6JBAgQIECAAAECBAgQIECAAAECBAgQINCGgMR2G+raJECAAAECBAgQIECAAAECBAgQIECAAIGZBSS2Z6ZzIgECBAgQIECAAAECBAgQIECAAAECBAi0ISCx3Ya6NgkQIECAAAECBAgQIECAAAECBAgQIEBgZgGJ7ZnpnEiAQCkCD//7D0sJRRwECBAgQIAAAQIECBAgQIAAAQINCPxkA21oggABArUISGjXwuqiBAgQIECAAAECBAgQIECAAIHiBczYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECuYDEdq5hnwABAgQIECBAgAABAgQIECBAgAABAgSKF5DYLn6IBEiAAAECBAgQIECAAAECBAgQIECAAAECucBP5v+YZX/jU36mOi3+d5ZrOIcAAQIECBAgQIAAAQIECBAgQIAAAQIECEwq8BP//aNt0oMdR4AAAQIECBAgQIAAAQIECBAgQIAAAQIE2hZQiqTtEdA+AQIECBAgQIAAAQIECBAgQIAAAQIECEwlILE9FZeDCRAgQIAAAQIECBAgQIAAAQIECBAgQKBtAYnttkdA+wQIECBAgAABAgQIECBAgAABAgQIECAwlYDE9lRcDiZAgAABAgQIECBAgAABAgQIECBAgACBtgUkttseAe0TIECAAAECBAgQIECAAAECBAgQIECAwFQCEttTcTmYAAECBAgQIECAAAECBAgQIECAAAECBNoWkNhuewS0T4AAAQIECBAgQIAAAQIECBAgQIAAAQJTCUhsT8XlYAIECBAgQIAAAQIECBAgQIAAAQIECBBoW0Biu+0R0D4BAgQIECBAgAABAgQIECBAgAABAgQITCUgsT0Vl4MJECBAgAABAgQIECBAgAABAgQIECBAoG0Bie22R0D7BAgQIECAAAECBAgQIECAAAECBAgQIDCVgMT2VFwOJkCAAAECBAgQIECAAAECBAgQIECAAIG2BSS22x4B7RMgQIAAAQIECBAgQIAAAQIECBAgQIDAVAIS21NxOZgAAQIECBAgQIAAAQIECBAgQIAAAQIE2haQ2G57BLRPgAABAgQIECBAgAABAgQIECBAgAABAlMJ/H8TKZNNxspmvwAAAABJRU5ErkJggg==" alt></p>
<p>(i) Label with the letter A a point at which the magnitude of the acceleration of the object is a maximum.</p>
<p>(ii) Label with the letter V a point at which the speed of the object is a maximum.</p>
<p>(iii) Sketch on the same axes a graph of how the displacement varies with time if a <strong>small</strong> frictional force acts on the object.</p>
<div class="marks">[4]</div>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Point P now begins to move from side to side with a small amplitude and at a variable driving frequency <em>f</em>. The frictional force is still small.</p>
<p>At each value of <em>f</em>, the object eventually reaches a constant amplitude <em>A</em>.</p>
<p>The graph shows the variation with <em>f</em> of <em>A</em>.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>(i) With reference to resonance and resonant frequency, comment on the shape of the graph.</p>
<p>(ii) On the same axes, draw a graph to show the variation with <em>f</em> of <em>A</em> when the frictional force acting on the object is increased.</p>
<div class="marks">[4]</div>
<div class="question_part_label">j.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">power/energy per second emitted proportional to surface area;<br> and proportional to fourth power of absolute temperature / temperature in K; <br></span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Accept equation with symbols defined. </span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">solar power given by 4</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">π</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">R</span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 6.000000pt;">2</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">σ</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">T </span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 6.000000pt;">4 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">;<br>spreads out over sphere of surface area 4</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">π</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">d </span><span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 6.000000pt;">2 </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">; <br>Hence equation given. </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;"> </span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\left( {\frac{{\sigma {R^2}{T^4}}}{{{d^2}}} = } \right)\frac{{5.7 \times {{10}^{ - 8}} \times {{\left[ {7.0 \times {{10}^8}} \right]}^2} \times {{\left[ {5.8 \times {{10}^3}} \right]}^4}}}{{{{\left[ {1.5 \times {{10}^{11}}} \right]}^2}}}\);<br><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">1.4<span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span>10<sup>3</sup></span><span style="font-size: 15.000000pt; font-family: 'SymbolMT'; vertical-align: -2.000000pt;">(</span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">Wm<sup>-2 </sup></span><span style="font-size: 15.000000pt; font-family: 'SymbolMT'; vertical-align: -2.000000pt;">);<br></span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Award </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-weight: bold; font-style: italic;">[2] </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">for a bald correct answer. </span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div title="Page 6">
<div>
<div>
<p>some energy reflected;<br> some energy absorbed/scattered by atmosphere; depends on latitude;<br> depends on time of day;<br> depends on time of year;<br> depends on weather (<em>eg</em> cloud cover) at location; power output of Sun varies;<br> Earth-Sun distance varies;</p>
</div>
</div>
</div>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;"> </span></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>power radiated = power absorbed;<br>\(T = {}^4\sqrt {\frac{{240}}{{5.7 \times {{10}^{ - 8}}}}} = \left( {250{\rm{K}}} \right)\);<br><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Accept answers given as 260 (K). </span></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>radiation from Sun is re-emitted from Earth at longer wavelengths; greenhouse gases in the atmosphere absorb some of this energy; and radiate some of it back to the surface of the Earth;</p>
<p> </p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div title="Page 7">
<div>
<div>
<p>the force (of the spring on the object)/acceleration (of the object/point O) must be proportional to the displacement (from the equilibrium position/centre/point O);<br> and in the opposite direction to the displacement / always directed towards the equilibrium position/centre/point O;</p>
</div>
</div>
</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div title="Page 7">
<div>
<div>
<div title="Page 7">
<div>
<div>
<p>(i) one A correctly shown;</p>
</div>
</div>
<div>
<div>
<p>(ii) one V correctly shown;</p>
<p><img src="data:image/png;base64,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" alt></p>
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<p>(iii) same period; <em>(judge by eye)</em><br> amplitude decreasing with time;</p>
<p><img 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" alt></p>
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<div class="question_part_label">i.</div>
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<p>(i) resonance is where driving frequency equals/is close to natural/resonant frequency;<br> the natural/resonant frequency is at/near the maximum amplitude of the graph;</p>
<p>(ii) lower amplitude everywhere on graph, bit still positive;<br> maximum in same place/moved slightly <em>(that is, between the lines)</em> to left on graph;</p>
<p><img src="data:image/png;base64,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" alt></p>
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</div>
<div class="question_part_label">j.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">The Stefan-Boltzmann law was poorly understood with few candidates stating that the absolute temperature is raised to the fourth power. </span></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">This question was poorly done with few candidates substituting the surface area of the sun or the </span><span style="font-size: 10.000000pt; font-family: 'Arial';">surface area of a sphere at the Earth’s radius of orbit. </span></p>
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<div class="question_part_label">b.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">Despite not being able to state or manipulate the Stefan-Boltzmann law most candidates could substitute values into the expression and calculate a result. </span></p>
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<div class="question_part_label">c.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">This question was well answered at higher level. </span></p>
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<div class="question_part_label">d.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">To show the given value there is the requirement for an explanation of why the incident power </span><span style="font-size: 10.000000pt; font-family: 'Arial';">absorbed by the Earth’s surface is equal to the power radiated by the Earth, few candidates were </span><span style="font-size: 10.000000pt; font-family: 'Arial';">successful in this aspect. Although most could substitute into the Stefan-Boltzmann equation they needed to either show that the fourth root was used or to find the temperature to more significant figures than the value given. </span></p>
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<div class="question_part_label">e.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">A surprising number of candidates could not explain the greenhouse effect. A common misunderstanding was that the Earth reflected radiation into the atmosphere and that the atmosphere reflected the radiation back to the Earth. </span></p>
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<div class="question_part_label">f.</div>
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<div class="question" style="padding-left: 20px;">
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">The conditions for simple harmonic motion were poorly outlined by most candidates. Few identified a relationship between force/acceleration and displacement, with most talking about it going backwards and forwards without slowing down. </span></p>
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<div class="question_part_label">h.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">This question was well answered by many. The only notable mistake was with reducing the time period of the damped oscillation. </span></p>
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<div class="question_part_label">i.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'Arial';">i) Identifying the peak of the graph with the resonant frequency was broadly successfully done but not many candidates stated that this occurs when the driving frequency is equal to the natural frequency. </span></p>
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">ii) This sketch was generally well done. </span></p>
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<div class="question_part_label">j.</div>
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<br><hr><br>