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</div><h2>HL Paper 2</h2><div class="specification">
<p>This question is about an ideal gas.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how the ideal gas constant <em>R</em> is defined.</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>Calculate the temperature of 0.100 mol of an ideal gas kept in a cylinder of volume 1.40×10<sup>–3 </sup>m<sup>3</sup> at a pressure of 2.32×10<sup>5 </sup>Pa.</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>The gas in (b) is kept in the cylinder by a freely moving piston. The gas is now heated at constant pressure until the volume occupied by the gas is 3.60×10<sup>–3 </sup>m<sup>3</sup>. The increase in internal energy of the gas is 760 J. Determine the thermal energy given to the gas.</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>After heating, the gas is compressed rapidly to its original volume in (b). Outline why this compression approximates to an adiabatic change of state of the gas.</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>defined from the equation of state of an ideal gas <em>PV</em>=<em>nRT</em>;<br>all symbols (<em>PVnT</em>) correctly identified;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>390/391 K;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>work done\( = \left( {P\Delta V = 2.32 \times {{10}^5} \times 2.20 \times {{10}^{ - 3}} = } \right)510{\rm{J}}\);<br>thermal energy\( = \left( {760 + 510 = } \right)1.27 \times {10^3}{\rm{J}}\);<br><em>Award <strong>[1 max]</strong> if volume is taken as 3.6×10<sup>–3</sup>, giving an answer of 1600 J.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>an adiabatic change is one in which no (thermal/heat) energy is transferred between system and surroundings / no energy enters/leaves system;<br>a rapid compression means that there is insufficient time (for energy transfer) / <em>OWTTE</em>;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Properties of a gas</p>
<p>A fixed mass of an ideal gas is at an initial volume of 2.0×10<sup>–3 </sup>m<sup>3</sup>. It undergoes an adiabatic expansion to a volume of 5.0×10<sup>–3 </sup>m<sup>3</sup>. An identical ideal gas undergoes the same change of volume but this time isothermally.</p>
<p>The graph shows the variation with volume <em>V</em> of the pressure <em>P</em> of the two gases.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using data from the graph above, identify which gas, A <strong>or</strong> B, undergoes the isothermal expansion.</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>Using the graph opposite, estimate the difference in work done by each gas.</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, with reference to the first law of thermodynamics, and without further calculation, the change in temperature of the gas undergoing the adiabatic change.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>choice of two data points;<br>to show <em>P×V</em> constant for gas A / not constant for gas B;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>identifies area between lines as work done;<br>counts squares (14 squares);<br>each square 12.5;<br>175 J;<em> (allow answers in the range of 150 to 200 J)</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Q</em>=Δ<em>U</em>+<em>W</em> and <em>Q</em>=0; <em>(both needed)</em><br>so Δ<em>U</em>+<em>W</em>=0;<br>work done by gas is positive;<br>so Δ<em>U</em> decreases therefore temperature decreases;</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="specification">
<p class="p1">This question is about the thermodynamics of a car engine and the dynamics of the car.</p>
<p class="p1">A car engine consists of four cylinders. In each of the cylinders, a fuel-air mixture explodes to supply power at the appropriate moment in the cycle.</p>
<p class="p1">The diagram models the variation of pressure <em>P </em>with volume <em>V </em>for one cycle of the gas, ABCDA, in one of the cylinders of the engine. The gas in the cylinder has a fixed mass and can be assumed to be ideal.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-07_om_09.01.07.png" alt="M14/4/PHYSI/HP2/ENG/TZ2/09"></p>
</div>
<div class="specification">
<p>The car is travelling at its maximum speed of \({\text{56 m}}\,{{\text{s}}^{ - 1}}\). At this speed, the energy provided by the fuel injected into one cylinder in each cycle is 9200 J. One litre of fuel provides 56 MJ of energy.</p>
</div>
<div class="specification">
<p class="p1">A car is travelling along a straight horizontal road at its maximum speed of \({\text{56 m}}\,{{\text{s}}^{ - 1}}\). The power output required at the wheels is 0.13 MW.</p>
</div>
<div class="specification">
<p class="p1">A driver moves a car in a horizontal circular path of radius 200 m. Each of the four tyres will not grip the road if the frictional force between a tyre and the road becomes less than 1500 N.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">At point A in the cycle, the fuel-air mixture is at 18 °C. During process AB, the gas is compressed to 0.046 of its original volume and the pressure increases by a factor of 40. Calculate the temperature of the gas at point B.</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">State the nature of the change in the gas that takes place during process BC in the cycle.</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 class="p1">Process CD is an adiabatic change. Discuss, with reference to the first law of thermodynamics, the change in temperature of the gas in the cylinder during process CD.</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 class="p1">Explain how the diagram can be used to calculate the net work done during one cycle.</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 class="p1">(i) Calculate the volume of fuel injected into one cylinder during one cycle.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Each of the four cylinders completes a cycle 18 times every second. Calculate the distance the car can travel on one litre of fuel at a speed of \({\text{56 m}}\,{{\text{s}}^{ - 1}}\).</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A car accelerates uniformly along a straight horizontal road from an initial speed of \({\text{12 m}}\,{{\text{s}}^{ - 1}}\) to a final speed of \({\text{28 m}}\,{{\text{s}}^{ - 1}}\) in a distance of 250 m. The mass of the car is 1200 kg. Determine the rate at which the engine is supplying kinetic energy to the car as it accelerates.</p>
<div class="marks">[4]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Calculate the total resistive force acting on the car when it is travelling at a constant speed of \({\text{56 m}}\,{{\text{s}}^{ - 1}}\).</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>The mass of the car is 1200 kg. The resistive force <em>F </em>is related to the speed <em>v</em> by \(F \propto {v^2}\). Using your answer to (g)(i), determine the maximum theoretical acceleration of the car at a speed of \({\text{28 m}}\,{{\text{s}}^{ - 1}}\).</p>
<div class="marks">[5]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Calculate the maximum speed of the car at which it can continue to move in the circular path. Assume that the radius of the path is the same for each tyre.</p>
<p class="p1">(ii) While the car is travelling around the circle, the people in the car have the sensation that they are being thrown outwards. Outline how Newton’s first law of motion accounts for this sensation.</p>
<div class="marks">[6]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">535 (K) / 262 (°C);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">constant volume change / isochoric / isovolumetric / <em>OWTTE</em>;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Q</em>/thermal energy transfer is zero;</p>
<p>\(\Delta U = - W\);</p>
<p>as work is done by gas internal energy falls;</p>
<p>temperature falls as temperature is measure of average kinetic energy;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">work done is estimated by evaluating area;</p>
<p class="p1">inside the loop / <em>OWTTE</em>;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>\(1.6 \times {10^{ - 4}}{\text{ (litre)}}\);</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>one litre \( = \left( {\frac{1}{{4 \times 18 \times 1.64 \times {{10}^{ - 4}}}} = } \right){\text{ }}87{\text{ s of travel}}\);</p>
<p class="p1">\((87 \times 56) = 4.7{\text{ (km)}}\);</p>
<p class="p1"><em>Allow rounded 1.6 value to be used, giving 4.9 (km).</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">use of a kinematic equation to determine motion time \({\text{(}} = 12.5{\text{ s)}}\);</p>
<p class="p1">change in kinetic energy \( = \frac{1}{2} \times {\text{1200}} \times {\text{[2}}{{\text{8}}^2} - {\text{1}}{{\text{2}}^2}]{\text{ (}} = 384{\text{ kJ)}}\);</p>
<p class="p1">rate of change in kinetic energy \( = \frac{{{\text{384000}}}}{{{\text{12.5}}}}\); } <em>(allow ECF of 16<sup>2</sup></em> <em>from (28 </em>\( - \)<em> 12)<sup>2</sup></em> <em>for this mark)</em></p>
<p class="p1">31 (kW);</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">use of a kinematic equation to determine motion time \(( = 12.5{\text{ s)}}\);</p>
<p class="p1">use of a kinematic equation to determine acceleration \(( = 1.28{\text{ m}}\,{{\text{s}}^{ - 2}})\);</p>
<p class="p1">work done \(\frac{{F \times s}}{{{\text{time}}}} = \frac{{1536 \times 250}}{{12.5}}\);</p>
<p class="p1">31 (kW);</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>\({\text{force}} = \frac{{{\text{power}}}}{{{\text{speed}}}}\);</p>
<p class="p1">2300 <strong><em>or </em></strong>2.3k (N);</p>
<p class="p1"><em>Award </em><strong><em>[2] </em></strong><em>for a bald correct answer.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>resistive force \( = \frac{{2300}}{4}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)\(\frac{{2321}}{4}{\text{ }}( = {\text{575)}}\); <em>(allow ECF)</em></p>
<p class="p1">so accelerating force \((2300 - 580 = ){\text{ }}1725{\text{ (N)}}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)1741 (N);</p>
<p class="p1">\(a = \frac{{1725}}{{1200}} = 1.44{\text{ (m}}\,{{\text{s}}^{ - 2}})\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)\(a = \frac{{1741}}{{1200}} = 1.45{\text{ (m}}\,{{\text{s}}^{ - 2}})\);</p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>for an answer of 0.49 (m</em>\(\,\)<em>s<sup>–2</sup> (omits 2300 N).</em></p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>centripetal force must be \( < 6000{\text{ (N)}}\); <em>(allow force 6000 N)</em></p>
<p class="p1">\({v^2} = F \times \frac{r}{m}\);</p>
<p class="p1">\(31.6{\text{ (m}}\,{{\text{s}}^{ - 1}})\);</p>
<p class="p1"><em>Allow </em><strong><em>[3] </em></strong><em>for a bald correct answer.</em></p>
<p class="p1"><em>Allow </em><strong><em>[2 max] </em></strong><em>if 4</em>\( \times \)<em> is omitted, giving 15.8 (m</em>\(\,\)<em>s<sup>–1</sup>)</em>.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>statement of Newton’s first law;</p>
<p class="p1">(hence) without car wall/restraint/friction at seat, the people in the car would move in a straight line/at a tangent to circle;</p>
<p class="p1">(hence) seat/seat belt/door exerts centripetal force;</p>
<p class="p1">(in frame of reference of the people) straight ahead movement is interpreted as “outwards”;</p>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">This simple gas law calculation was surprisingly badly done. Certainly similar questions have attracted better scores in previous examinations. Common errors included the inevitable failure to work in kelvin, and simple arithmetic errors.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most candidates were able to describe the constant volume nature of the change in question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates scored full credit in a question that has been well rehearsed in previous examinations. The zero change in thermal energy transfer was common and many were able to deduce that \(\Delta U\) is therefore equal to \( - W\). This led immediately to a deduction of temperature decrease.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Almost all recognised that the work done was related to some area under the graph. In a small minority of cases the exact specification of the area was too imprecise to gain the second mark.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) It was common to see a correct value for the volume of fuel used though not a correct unit.</p>
<p class="p1">(ii) Many were able to arrive at a travel time for the fuel and therefore the distance travelled. However, routes were indirect and lengthy and few could see a direct way to the answer.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">There were at least two routes to tackle this problem. Some solutions were so confused that it was difficult to decide which method had been used. Common errors included: forgetting that the initial speed was \({\text{12 m}}\,{{\text{s}}^{ - 1}}\) not zero, power of ten errors, and simple mistakes in the use of the kinematic equations, or failure to evaluate work done \( = {\text{force }} \times {\text{ distance}}\) correctly. However, many candidates scored partial credit. Scores of two or three out of the maximum four were common showing that many are persevering to get as far as they can.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) Many correct solutions were seen. Candidates are clearly comfortable with the use of the equation force = power/speed.</p>
<p class="p1">(ii) The method to be used here was obvious to many. What was missing was a clear appreciation of what was happening in terms of resistive force in the system. Many scored two out of three because they indicated a sensible method but did not use the correct value for the force. Scoring two marks does require that the explanation of the method is at least competent. Those candidates who give limited explanations of their method leading to a wrong answer will generally accumulate little credit. A suggestion (never seen in answers) is that candidates should have begun from a free-body force diagram which would have revealed the relationship of all the forces.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) The major problem here was that most candidates did not recognise that 1500 N of force acting at each of four wheels will imply a total force of 6 kN. Again, partial credit was available only if it was clear what the candidate was doing and what the error was.</p>
<p class="p1">(ii) Statements of Newton’s first law were surprisingly poor. As in previous examinations, few candidates appear to have learnt this essential rule by heart and they produce a garbled and incomplete version under examination pressure. The first law was then only loosely connected to the particular context of the question. Candidates have apparently not learnt to relate the physics they learn to everyday contexts.</p>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about thermodynamics.</p>
<p>The <em>P</em>–<em>V</em> diagram shows the expansion of a fixed mass of an ideal gas, from state A to state B.</p>
<p style="text-align: center;"><img 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" alt></p>
<p style="text-align: left;">The temperature of the gas in state A is 400 K.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the temperature of the gas in state B.</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>(i) Calculate the work done by the gas in expanding from state A to state B.</p>
<p>(ii) Determine the amount of thermal energy transferred during the expansion from state A to state B.</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>The gas is isothermally compressed from state B back to state A.</p>
<p>(i) Using the <em>P</em>–<em>V</em> diagram axes opposite, draw the variation of pressure with volume for this isothermal compression.</p>
<p>(ii) State and explain whether the magnitude of the thermal energy transferred in this case would be less than, equal to <strong>or</strong> greater than the thermal energy transferred in (b)(ii).</p>
<p> </p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>realization that since<em> pV</em> = constant, the temperature must be the same<em> i.e.</em> 400 K / full calculation using gas law to get 400 K;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) work done is area under curve;<br>and this is \(\left( {\frac{{4.0 + 8.0}}{2} \times 4 \times {{10}^2}} \right) = 2400{\rm{J}}\);<br><em>Award <strong>[2]</strong> for correct bald answer.</em></p>
<p>(ii) (<em>Q</em>=Δ<em>U</em>+<em>W</em> with) Δ<em>U</em>=0;<br>so <em>Q</em>=2400J;<br><em>Award <strong>[0]</strong> for correct answer with no or wrong argument.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) curve under given straight line starting at B and ending at A;</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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" alt></p>
<p>(ii) it would be less;<br>since the work done would be less / area under curve is less (and Δ<em>U</em> = 0 );</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="specification">
<p class="p1">This question is about nuclear fission.</p>
</div>
<div class="specification">
<p class="p1">Some nuclear reactors have a heat exchanger that uses a gas that is kept at constant volume. The first law of thermodynamics can be represented as \(Q = \Delta U + W\).</p>
</div>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>State the meanings of \(Q\) and \(W\).</p>
<p class="p1">\(Q\):</p>
<p class="p1">\(W\):</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Describe how the first law of thermodynamics applies in the operation of the heat exchanger.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>Discuss the entropy changes that take place in the gas and in the surroundings.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>\(Q\): is the energy transferred between the system and surroundings;</p>
<p class="p1">\(W\): work done on/by system;</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>\(Q\) transferred from reactor to gas;</p>
<p class="p1">no change in volume therefore \(W = 0\);</p>
<p class="p1">internal energy of gas increases;</p>
<p class="p1">\(Q\) transferred from gas to surroundings therefore internal energy of gas</p>
<p class="p1">decreases;</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>entropy of the gas initially increases as energy transferred from the reactor;</p>
<p class="p1">entropy of the surroundings increases as energy transferred (from the gas);</p>
<p class="p1">entropy of gas decreases on cooling;</p>
<p class="p1">overall the entropy of the total system increases;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>The meanings of \(Q\) and \(W\) were often expressed poorly and incompletely.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Some candidates are confused about the statement of the first law of thermodynamics and quoted the second. Others gave vague and uncreditworthy accounts that showed that they were not answering in the context of the reactor heat exchanger. There was no real attempt by most candidates to arrive at four points in the answer, despite the fact that there are two exchanges going on in the reactor.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>As in part (ii) some candidates did not focus on the context intended. The failure to identify all exchanges and entropy changes was common as in part (ii).</p>
</div>
<br><hr><br><div class="specification">
<p>This question is in <strong>two</strong> parts. <strong>Part 1</strong> is about processes in a gas. <strong>Part 2</strong> is about rocket motion.</p>
<p><strong>Part 1</strong> Processes in a gas</p>
<p>In a toy, the air in a cylinder is compressed quickly by a piston. The diagram shows the toy before the air is compressed.</p>
<p><img 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ggggAACCCCAAAIIIIAAAggEIPDTAK7lUgQQQAABBBBAAAEEEEAAAQQQQMAWIMHAGwEBBBBAAAEEEEAAAQQQQAABBAIWIMEQMCEFIIAAAggggAACCCCAAAIIIIAACQbeAwgggAACCCCAAAIIIIAAAgggELAACYaACSkAAQQQQAABBBBAAAEEEEAAAQRIMPAeQAABBBBAAAEEEEAAAQQQQACBgAVIMARMSAEIIIAAAggggAACCCCAAAIIIECCgfcAAggggAACCCCAAAIIIIAAAggELECCIWBCCkAAAQQQQAABBBBAAAEEEEAAARIMvAcQQAABBBBAAAEEEEAAAQQQQCBgARIMARNSAAIIIIAAAggggAACCCCAAAIIkGDgPYAAAggggAACCCCAAAIIIIAAAgELkGAImJACEEAAAQQQQAABBBBAAAEEEECABAPvAQQQQAABBBBAAAEEEEAAAQQQCFiABEPAhBSAAAIIIIAAAggggAACCCCAAAIkGHgPIIAAAggggAACCCCAAAIIIIBAwAIkGAImpAAEEEAAAQQQQAABBBBAAAEEECDBwHsAAQQQQAABBBBAAAEEEEAAAQQCFiDBEDAhBSCAAAIIIIAAAggggAACCCCAAAkG3gMIIIAAAggggAACCCCAAAIIIBCwAAmGgAkpAAEEEEAAAQQQQAABBBBAAAEESDDwHkAAAQQQQAABBBBAAAEEEEAAgYAFSDAETEgBCCCAAAIIIIAAAggggAACCCBAgoH3AAIIIIAAAggggAACCDhPoDBbq14cqR7J7TUqo9BPfMUqzJpunZOgxHZDtSr/pJ/zwrX7iLJXztaom1qpxYhMFYWrWupBwBaI/PvvLHoCAQQQQAABBBBAAAEEEHCKQHF+pl6Z87yeXZbjuUGPV1O/wR1X9tIV2mXu5Ave0uNzeunGqZ1Vy+/5oTlgYl64bJHmzdmgAk8Vtf0HHZogKDV2BUwybskSLZy+rOR3wZKI1PuPEQyx+zak5QgggAACCCCAAAIIOEwgV688NEFv7f2mmp/+11Xq7beqpckoxP9BTw1uH/bkgnRYbzz9hN7I/afDLAknNgR+VPbcp7Rw++f61gFDZn7yH2uLDXhaiQACCCCAAAIIIIAAAu4QOKxV93bXoxvMoxHxum3+ek1Jq+fw0It1ZOVgXTv8XTs5Urv3fO2MwGgKhyMRXsgEnPH+YwRDyDqYghFAAAEEEEAAAQQQQODMBM5X63bJZ3ZpxK6K0zn16ysuYvVTcWwLxKlek0RdEGEEEgwR7gCqRwABBBBAAAEEEEAAAQQQQCBQgbh6DVQ/0EICvJ4EQ4CAXI4AAggggAACCCCAAAIIIIAAAhIJBt4FCCCAAAIIIIAAAggggAACCCAQsAAJhoAJKQABBBBAAAEEEEAAgWgVOKLslemaem8HJTZO8Hx10MBnFioz/6RPo3M176ZmPud4zzXf22tUhpms0WfLT1eP0vI8596UroM+p1T7pVmi78WR6pFcQT2mkOJ8Zc6frIHtWqlHeq6nWNOu2Rp1U6uSmJNv1qj0TB0srk6txSrMXqO5I25WU28b2g3Q1JXZKtNK/4XZMc08Vb9dTkWuvkV4Y77a0w4TxxJPGSm69t50ZRdWqwG+hfK62gLV/V2oqMCTOpjx2unvmcamzyZrXpXvmyD1e0W/c573b4sRmdVctaWitp2+jwTD6R78hAACCCCAAAIIIIAAAkagcIum3tRZdyzIV8IDa5R3MF95eRmae2cDbZ4zTgM6d9X9K/NUckubogFvvq8VY7taaz54t1qK7/2Ssg5uKb8CRMJArTn4gaZ1MStDXKy0sSuU9eZANfZeWuV3n5v8K3vp0SnLtKvsEn0m8fDMAF2bmKYBT76kjALPCcV5WnVfD906/FktzzleUlNRjpZPHKS+o9+tIklwRFnP3KZ2Pafro189oHfyLJODe7Rh0jU6uuBP6v98lsfDfwOK85fp/mt76YW95+v2hdnW9fuVtXqybmv1vTKM6+/u1NSsI6UFFOdn6hXTjsZtfWL+twozHlf3nqM9bShSwYa/6C8bvi69jhdBFKjR70KZeguzNO/eruoy5j398/rntdv8Hpn3zPzBar77FU0e3kvtbpqurDLJoaD3u/U7t3LDGKWaJV1VVy17P6zH5mco14pndxBXOyHBUKb/+REBBBBAAAEEEEAAgZgXKHxXo66/S3O/+YPmLHxKt6U2LCGJS9Bvh9+lDvZNyhd6d9RjeiXPO5KhoVIHTtTTvS/z8MXp/OTLVNXikrVa99Oo/m2qPO+0PineqZeGjtDUZTl+Pnm1lrkc3l+PztmgAt8Liz/RvNv+pPWJw7Ri5/6Sm/uVD6il3R7rJn31cmUc8TcKwCQXBqrvnP26Ymy6XnykqxrbS0bUVuO0gZqy8Em1+OZzP/GUBGGSC0PumKzv7l2slVP7KLWeKcCa/T+1j3X9dN0WbwVSlK25fR7QPNv1sN54+mE9XaYdxXvn6v5ZDfXfO3Ot5MQYpZnr4n+jG1o38G0tr4MhcEa/C56Ki/dqXv97NHnTxRq9aJYeTkvwrDJi3jPD9OLip9XV6ruinFnq2+95nyRDKPr9pA7tzNFXStWglZlaM3Wo7imNJxhQJWWQYAieJSUhgAACCCCAAAIIIBAFAt8qc9JELS/4pdIefUCd7Ztgn2Y1bKcbOnrSBkV79Y+dR30Onq/OY8aW3CjrpHYtWK1sv/frW7V+k9Shb3cl1nRtx7g2GvF+rpUg8I6C8AnBftlIvV42owN2a8XgFM9BK57pC3V07OtKH9nr1M19m8EaN8BzTtF2rX+volEA1oiJjOl6cE621HqonunftPxylPWu1e09E8oG4vOzuWmcrHd1g4bcllz59UVZ+uuK3dZoCG879mvb9K6y8yCW6ydvFui304aoTb1aVnJioNK3WhZbZ6pXQm2f+ngZuEAgvwsnlTd/gp7dcVLxPfvr1sTyfROXcIsmPnqd3a9FOXP14KQMzwiaYPe79ZhF+oPqO00a/j+va0QbT8IwcKByJZBgKEfCDgQQQAABBBBAAAEEYlegOHu+xi/7TKp1lW647oIKIBrp5sdG25+8Vvipue+N9hfrtXTjtxWUYd18rVquzRf00Z96NKrgeHV31VNCyq8qOfkXuuKqK1Vya1dbLUdMqeDmyveck/r26Iny5RXv04pZb1mjIepVkhDxLaeCIrL/qhc2FKpWi7ZqVTZpY59+ti5NusyTRCjSF2v/rpzS5Eyczqlf35OUqKWLBzyieyq4YS1fK3sCEQjod6Fws9JfzrJGtPxSza9p4WeETpwa9hik/heb1JEZQTNfK0pHBJnIg9HvJSNv7nj5bA1fPC3kSaizAgHnWgQQQAABBBBAAAEEEIgmgR+V8z8Z+sI0qdlVat2w4qEFcQm99eLW3n4a/gulDhiktHnDlVH0mdbMWqOBnQaePkqheLdWLtipC258RK0qrsJP2WV311L9BueW3Rn0n4tz3tBfd5j5GlKU3KSqhz4qqr5Ihz7KKnHdMFxXNx5e0Umn7/vuqAr/be0q5xNntblu+d2nX81PAQsE8rtQrCMblmuNPe9Hsq5pfb7/aOKaqeuNCZo7x5qAtGin3sr4XAMSvaNufC87k373PNaz+iJNCkNywURLgsG3z3iNAAIIIIAAAggggEBMCxQqP/ebwAUaXq8/DZhrTVqYq6IdK7Qyp69GpP6itNzinL/r7S8uVfffNXPBjbJPckDnqoH1WELNt38qf98h+7LavedrZxAn1at5LFxRPYFAfheOK+cfuyqdj+NUDN6RK9bvivX4y759X1rfUzwjWU6dVfNX39pzhtw9J18dps8K+cgFb3w8IuGV4DsCCCCAAAIIIIAAAjEvcEJHv/VM2nj0qI6VDtGvKcwv1OrWWz0z1udq/qx3dGpdhG+1afF6fd1lkO71STrUtIbwnX8qOXDmdf6oY0dKXIuPHNMPZ14QV4ZNIJDfhW+Ut7ewmpH6PgYhndy7X19W88rKTiveNEMPWXOGFFmzOmRMm6XMMqtUVHZtIMdIMASix7UIIIAAAggggAACCESrwNd5yg/gpiQusbvu9EwGWbRhrl7O/rFE6shmvb76e3Xo1k6hm2rOaZ1y6ma16NN9+vyMEzdOa1eMxBPQ78L3OlpYdg3V091qJSQp2bOr1vkNrUUkA9/iOj6uBWPblYyEKFihx0as1MEwvO9IMATed5SAAAIIIIAAAggggECUCNRRg/M9s937XVHBt6k/Knv+Ej8rRViTQT7QRxfbp+frjcUfWJ+lWs+mv/eONsvfBJK+ZTvx9SHtz//nGQT2KyU29czd8EWG3s3xJFv8lmQ5rV2jTZXfl/q9mgPBEAjkd8HnWn2jfQeqO5qhli5IqXpp1+q17udK7P+0Jv3O/AZaE0j+z9N6ZP5e6zcwtBsJhtD6UjoCCCCAAAIIIIAAAi4S8F2VwRpaPeOvfpIHniYV71Hm/tq6tNxEhCXH41L/qIe6mBtrzwz5uTlavWi7LrAmgbzZzwSSzsP6meo1PMcT1hFt2Z53BjdpvmVYj4w8tUh5ld3pWatWrF5/SHW5W4vg2yGQ34Xz1bqdd0zCP5W7/6tK3zPFhdbjSHZLE4I7L0lconpNfcKzbOxxZU+8X2MzKlrVJXjMvGWDZ0lJCCCAAAIIIIAAAgi4XMCaO+F3aZ5RB1ZTvlikCc9usUYeVLRZS03On6vcNldX8qjDBUrre4PizeVFWXrlkcf1yo5fBfcmqqLQgrrP18RaPnLeXL1xpLLsQEWV+5ZhUeyYqeGPr/MzZL1YhRsX6Z3Lfh3gChsVxcG+6guc3mc1+12opUvSunrmILHeM6tXapPfx42s/j6Qp69NYBenqWurU5OhVj/WSs6sl6ZRsweppT036WdaPmZGSOdjIMFQSV9wCAEEEEAAAQQQQACBWBOIa3Wz/tja+xT4ce2aM0h3j0hXZr5n8kcDUpitVS+O0/Dp0u+uu6ASojjV63SLbr7Y3N1YoxhydqsgFDdRlUQQjENxrX6r7nYbTDPe1ZiB8ysYgfCt3n/nH9Y6ACXbyQ+36WOfPEQ519eH6PqeIzUvI//Up9vF+cpMH6O7/7Rf19/aws8KG8U6dvT4qWuC0UDKqFCgXJ/V4HchLrGHhvS8rKTcgrc0e/k+P3121FpxwqwgUVepd91cSVLpTPvd+h1sM0TTR3jnY1iswf0rev9WSFDjnSQYakzGBQgggAACCCCAAAIIRLFAXFPdM22o59NX004rybBskgZ0bqbExgklX1f20qNT1uus4Q9X/ahD3JW6d9h1nmX36ilt2B+V6ueRilOqRdZN9PeeHwu1N8/f0pm+553UkWNl5zYo1g/Hjnlu7LxLAJ6qpfwrP+dYbbjvBe+nwGYEwiR17zlGy7M9a2NYCZflIx7UC3vPOrW84Bcv64H7hmngb/6kVWbEQzlXq5ycZZrcP00pXtfENA2YuFrf3tRftyZ65sIoF2SRvjvyg/5dbj87gi5Qrs9q8rtwvjqPmaxBrUyyzno8YeoEvZLnTT+dirQ4b41mrz6s+N89pmf7N/WTVDLnV93vRfn7te9U0T6vavvMx2Dev9PUb/S7fkYm+Vx2Bi9JMJwBGpcggAACCCCAAAIIIBDNAnGJ/TVvyQOeYdUVtbSuWg6eq3kDK7sh8l4Xp4ZdblOPeGsUQ63qTe5YnP+W5q7O9xRwUnvXrlVWBUPMTz+vUJsXLD79PDOXwaKt1q1ZyXZy0yqt9R2JYXYX52ntkg9PjTyo6Bzrts98Cvz8X+4uNSnKWaxRPdt6Ei636/nCnpo6tE2ZG8Rf6ddPPlqahLFdl41RmrGocKtl3Wg+rUWTu8ozJWTJWYVbNOP59VXEWGGB7AxQIKDfhXrtNfyFKepjkgxFWzW57wN6rnTEykkdzJih+/s+p686W30+p7cal0281aTfC7O0YFEl72MzH8Pofmppe1ijiZYNLz8yKUArc/lP/mNtQSiHIhBAAAEEEEAAAQQQQCDaBMyjEEuWaOH0Zdpl36VbiYXeg9Tvjj7qlVqTRSYPa9W93TVGj+uDl3tVMmdDoTJH3KABywoqlKzde752Tu1sjRKo7Lzaajl2hZ7XBHWZuL3CctRqjDa8ebeU3reKcwaqcZkSivMz9cqc5/XsspySxEV8Fw26r69639VZF20cqSv7f6hfDx6oO3v3VucEP6MQyrlauZdWvfXIn+/XPWkJPkmKIh2sLEZrNY7RmYs0IMFfwqJM8Px45gLl+qwmvwtHlL1yiZYumKvlOcc9MVR2fU36vbLfBasq+71uvY/z09Wj8yTtqlAgeO8jEgwVArMTAQQQQAABBBBAAAEEgiZwZJUGtpur5GWrNSI1yJPYBS1ICkIAgUAFeEQiUEGuRwABBBBAAAEEEEAAgUoEflS2tfJCxgUhmCG/klo5hAAC4RcgwRB+c2pEAAEEEEAAAQQQQCB2BIr36N2131QxQ37scNBSBKJZgARDNPcubUMAAQQQQAABBBBAIKICxSrcuFJvfH2V7uyV7DO3QESDonIEEAiRAAmGEMFSLAIIIIAAAggggAACMSVgrcaw6r4O1qoKKbr23me0ylrCsTh/pUaNWa8LR1RjOcuYwqKxCESnAJM8Rme/0ioEEEAAAQQQQAABBMIrUJSpUS37a/lJ32pLlrN8dWT705dd9D2F1wggEDUCjGCImq6kIQgggAACCCCAAAIIBCZQUFCg4cOGyXyv8Varve6febda2ism1lJ8l/s1bXWm1pBcqDElF0ROYOmSpZqXnh65AFxeMyMYXN6BhI8AAggggAACCCCAQLAE1r29TkOHDNHf3n1XSclJwSqWchBwhcD+ffv1+65d1e+uuzRuwnhXxOy0IBnB4LQeIR4EEEAAAQQQQAABBCIksH3bNtVvUJ/kQoT8qTayAlMmT7YDGDT4/sgG4uLaSTC4uPMIHQEEEEAAAQQQQACBYAq8//5mderUKZhFUhYCrhDYvGmzMjMyNHrsGMXHx7siZicGSYLBib1CTAgggAACCCCAAAIIhFnAzLtwIO+Arr6mXZhrpjoEIi/wpPVIhBm90+eOOyIfjIsjOMvFsRM6AggggAACCCCAAAIIBElgR9YOu6Q2bdoEqUSKQcAdAmZSR5Ncmzl7turUqeOOoB0aJSMYHNoxhIUAAggggAACCCCAQDgFmH8hnNrU5RSBEydO6MU5c9Q5LU3dundzSliujYMEg2u7jsARQAABBBBAAAEEEAieAPMvBM+SktwjMH3aszp29JiGDH3APUE7OFISDA7uHEJDAAEEEEAAAQQQQCAcAsy/EA5l6nCagFmWcuGCBfaylKmpqU4Lz5XxkGBwZbcRNAIIIIAAAggggAACwRNg/oXgWVKSewTMspRmYkeWpQxen5FgCJ4lJSGAAAIIIIAAAggg4EoB5l9wZbcRdAAC695eZy9Lef/gwSxLGYBj2UtJMJQV4WcEEEAAAQQQQAABBGJMgPkXYqzDY7y5ZmLHGc9NV5PEJixLGeT3AgmGIINSHAIIIIAAAggggAACbhJg/gU39RaxBkNgyeLF9rKUT4wbz7KUwQD1KYMEgw8GLxFAAAEEEEAAAQQQiDWBje9ttJvcpk2bWGs67Y1BAZNQ8y5L2aFjhxgUCG2TSTCE1pfSEUAAAQQQQAABBBBwtMC2f2y1J7pLSk5ydJwEh0AwBObOedFelnLU6NHBKI4yygiQYCgDwo8IIIAAAggggAACCMSSwMaNG9WpU6dYajJtjVGB7Ozs0mUpSaiF5k1AgiE0rpSKAAIIIIAAAggggIDjBfbv229/mnv1Ne0cHysBIhCowOyZs+zROsMffSTQorjejwAJBj8w7EYAAQQQQAABBBBAINoFsrKy7CYy/0K09zTt812Wsk6dOoCESIAEQ4hgKRYBBBBAAAEEEEAAAacLMP+C03uI+IIhYJalfOLxx+xlKQcMHBiMIinDj8BZfvazGwEEEEAAAQQQQAABBKJcgPkXoryDaZ4tYJalPHb0mGY8/wIiIRaIWILBPO9lhmTt3bNHhw4d8tvM5i1a6KKLLpIZtsVEHH6ZOIAAAggggAACCCCAQI0EmH+hRlyc7FIBsyzl5ImT1DktTSxLGfpODGuCwQxNMdmjpUuW6EDeAbt19RvU15VXpvpt6eyZM0uPNUlsomEPD1e37t1K9/ECAQQQQAABBBBAAAEEai7A/As1N+MK9wlMe+YZO+inJ010X/AujDhsCYalS5Zq2tRn7KEprdu01qQpU9Tpuk6Kj4+vks072mFe+ksaOmSIZjzXRE+MG08Gqko5TkAAAQQQQAABBBBAoGIB5l+o2IW90SNglqVcs3qNhgwdWq37zuhpeeRa8pP/WFsoqzejFv784EPKzMiQSSyMeewxpab6H7FQVSxm9s8Zz023R0D0u+sujZswvqpLOI4AAggggAACCCCAAAJlBNq2bq1OnTpp+owZZY7wIwLRIXDbLbcoPz9f723aJFaOCE+fhnQVCZNcuMdKApjkwuixY7R85cqAkguGxDwesfqNN2SSCwsXLJB505h62BBAAAEEEEAAAQQQQKB6Asy/UD0nznKvgBlBvyNrhx4dMZLkQhi7MWQJBm9ywXTqzNmzFczlQEz2yYxcMI9ZmPLNCAk2BBBAAAEEEEAAAQQQqJ4A8y9Uz4mz3Clg7kXN4/lmDr/b+9zuzka4NOqQJRjGPf64ffNvkguhmpTRvFnM8zRmhMS89HSXdgFhI4AAAggggAACCCAQXgHmXwivN7WFV+CluS/Zc/9NffbZ8FZMbQrJJI+bN20unUwjVMkFb989PPxhffnFIXvpkTZt2wb8CIa3XL4jgAACCCCAAAIIIBCtAhs3brTnX4jW9tGu2BUwy1KalQh79OzBvWEE3gYhGcHwpPX4ghmOct+g+8LSpAlPPSWz3OXsmbPCUh+VIIAAAggggAACCCDgVgHmX3BrzxF3VQImufDI8OH2aY+OHFnV6RwPgUDQV5EwqzyYpSRD+WhERQ7mEYnJEydpxepVZKoqAmIfAggggEBIBBIbJ4SkXApFAAEEEEAgGgXyDuYHtVlmKcrMjExtskbl7MrJscs2CwwEcw7AoAYc5YUFPcFgVnUoLCzUuxs2hJXOTOTx/65oaa8uwdKVYaWnMgQQQCCmBUyC4aX5r8a0AY1HAAF3Ccx7aa52f7xLM/6b0b/u6jn3R3tf/7sVaILBjFLY+N5Gbdnyof39h++/t2HiGzVSweHD+vnPf66t27exckSE3i5BnYPBdLZZ1cFMvBjuzawsYZauXLv2TXuFiXDXT30IIIAAAggggAACCLhBwCQXWlgfzLEh4BYBM8ff9u3b9dabb+qzzz6zw65tJRIub9pMF19yiRKaNNHePXvsBMPvr/89yYUIdmxQEwwmuWC2zmmdI9Kkq66+WgsXLJAZJpOamhqRGKgUAQQQQAABBBBAAAGnChy2PuH9pzXy9/LLmzo1ROJCQL6jFNa+8WapiBml0OG6zmrSJFENzzuvdL954R3J0Kx589P280N4BYKaYDh8+Es7+kjd3KekpNj1f3X4KxIM4X0fURsCCCCAAAIIIICASwR+aY38TUxOdkm0hBkrAv5GKfy/1NaloxR+9rOz/XL8pmMnbdu6xe9xDoRHIKgJhj2ffGKvHhGe0MvXkpScZO/0JjrKn8EeBBBAAAEEEEAAAQRiV6CR9Qkwcy/Ebv87qeX+Rik0th538DdKwUnxE0vFAkFNMHz//Q+67LLGFdfEXgQQQAABBBBAAAEEEEAAgZgWeG76c6fNpVCvfgOZUQqJSUlqdNFFqmyUQkzDuaTxQU0wuKTNhIkAAggggAACCCCAAAIIIBBigWPHjurjnF36dO8ebfvHVru22TNnyoxS+O3vr9dFF11cbi6FEIdE8SEWIMEQYmCKRwABBBBAAAEEEEAAAQRiQeDkv/6lvLz92pebq4+spSK/+fpru9mMUoiF3i9pIwmG2OlrWooAAgggEAGBv72zPgK1UiUCCCCAAALhETCrN3z33Xf6yprwv+Crr0orZZRCKUVMvSDBEFPdTWMRQAABBMIpcCAvTyuXLQ1nldSFAAIIIIBA2ATOqlVL/1dUZNfHKIWwsTu6IhIMju4egkMAAQQQiAaBFatXVWv55MTGCbq6/a/D2uRtWz5U3sH8sNZJZQgggAAC7hLYv2+/srKytH7dOm3etKk0+IsvuURJySnMpVAqwgsSDLwHEEAAAQQQQAABBBBAAAEESgVOnDih7B3ZytiwQe9lZurzzz+3jzFKoZSIF34ESDD4gWE3AggggAACCCCAAAIIIBArAv5GKTRt1txe8SGhSaLq1q0bKxy08wwFSDCcIRyXIYAAAggggAACCCCAAAJuFahslMLV7drLPP7QOKGJW5tH3BESIMEQIXiqRQABBBBAAAEEEEAAAQQiJbBk8WJNnjjJrp5RCpHqheirlwRD9PUpLUIAAQQQQAABBBBAAAEEqiXw8IhR1TqPkxCojsBPq3MS5yCAAAIIIIAAAggggAACCCCAAAKVCTCCoTIdjiGAAAIIIFCJgJkQy2z39b/b/s5/EEAAAQQQQACBWBYgwRDLvU/bEUAAAQQCEkhKTtJjTzyh4uL/81tO3brnKDk52e9xDiCAAAIIIIAAAtEiQIIhWnqSdiCAAAIIRESgZ69eqlfv3IjUTaUIIIAAAggggICTBKIywWBmQ/XOiOokbGJBAAEEEEAAAQQQQAABBBBAIFoFojLBMHrsGA0YODBa+4x2IYAAAghEqUBi44QobRnNQgABBBBAAIFYEGAViVjoZdqIAAIIIIAAAggggAACCCCAQIgFSDCEGJjiEUAAAQQQQAABBBBAAAEEEIgFARIMsdDLtBEBBBBAAAEEEEAAAQQQQACBEAuQYAgxMMUjgAACCCCAAAIIIIAAAgggEAsCJBhioZdpIwIIIIAAAggggAACCCCAAAIhFojKVSRCbEbxCCCAAAIIIIAAAggggAACDhQ4/sNxrXt7nQ4f/lLXXddZSclJDowyekMiwRC9fUvLEEAAAQQQQAABBBBAAIGYEpg1c2ZpeydPnKT21/5aL86dqzp16pTu50XoBHhEInS2lIwAAghEvcD+fft14sSJqG8nDUQAAQQQQAABdwps+eBD9b3jTncG78KoSTC4sNMIGQEEEHCKwJTJk/XnBx9ySjjEgQACCCCAAAIIlBP4eNcu+7GJcgfYEXQBEgxBJ6VABBBAIHYELrnkEu3cmR07DaalCCCAAAIIIOBKge3btrkybrcFTYLBbT1GvAgggICDBJo2a6ZjR4/JPCrBhgACCCCAAAIIOFXg0KFDTg0tquIiwRBV3UljEEAAgfAKpFyeYleYm5sb3oqpDQEEEEAAAQQQqIFA8xYtanA2p56pAAmGM5XjOgQQQAABpaam2gp79+5FAwEEEEAAAQQQcKxA57TOjo0tmgIjwRBNvUlbEEAAgQgIdE5L0ye7d0egZqpEAAEEEEAAAQSqFmickFD6oUjVZ3NGIAIkGALR41oEEEAAAZkhh5kZGUgggAACCCCAAAIRFzj77LPLxdDrllvK7WNHaATOCk2xlIoAAgggECsCTZs2tZuanZ3NpwOx0um0EwEEEEAAAYcKPPzIcLVp29aO7sILL9S17drr7LN/5tBooy8sEgzR16e0CAEEEAirQEqKZ6LHT3NJMIRVnsoQQAABBBBAoCIB7xxRFR1jX2gFeEQitL6UjgACCES9QFJykuo3qK+9e/ZEfVtpIAIIIIAAAgi4S8D8jfLlF1+6K2gXR0uCwcWdR+gIIICAUwSuvDJV77+/2SnhEAcCCCCAAAIIIGALmL9RDh06hEaYBEgwhAmaahBAAIFoFmjXvp0O5B3QiRMnormZtA0BBBBAAAEEEECgEgESDJXgcAgBBBBAoHoCl19eMtHjvn37qncBZyGAAAIIIIAAAghEnQAJhqjrUhqEAAIIhF8gtXWqXWnWRx+Fv3JqRAABBBBAAAEEEHCEQFSuIjF54iSZLzYEEEAAgfAK8P/f8HpTGwIIIIAAAggg4CSBqEwwjB47RgMGDnSSM7EggAACUS8wfNgwbdy4UR/t2BH1bQ1VAxMbJ4SqaMpFAAEEEEAAAQRCLhCVCYaQq1EBAggggEA5gWbNm2vN6jUqKChQfHx8uePRuMNMarlk8eJKm1a37jnq/ofuqlOnTqXncRABBBBAAAEEEHC7AAkGt/cg8SOAAAIOEWjTtq0dyb7cfTGTYHj7rber9UheyuUpSk0tmafCId1FGAgggAACCCCAQNAFSDAEnZQCEUAAgdgU8N5Ab9++XR06dogJhNv73K4xo0bppfmvVtjeA3l5mjLxqQqPsRMBBBBAAAEEEIg2AVaRiLYepT0IIIBABAVat2mtT3bvjmAEVI0AAggggAACNRE4fvx4TU7nXAQqFWAEQ6U8HEQAAQQQqInAFVe01MIFC2pyCecigAACCCCAQAQF0ufMVnyjRrr00svUJClJjRpdFMFoqNrtAiQY3N6DxI8AAgg4SOCqq6+2Ewz79+1XUnKSgyIjFAQQQAABBBDwFTCr7l13XWe9916m1r29Ttu2brG/av/852psrWp08aWXKqFJourWret7metef/99oc49t57r4nZrwCQY3NpzxI0AAgg4UCAlJcWOKjc3lwSDA/uHkBBAAAEEEPAVMB8GmC+TbDArI23auEnbt23TmjVrtHfPJ/ap9eo3UMrll+viSy5R44Qmvpe74vWOrB0aMnSoK2KNhiBJMERDL9IGBBBAwCEC3lEL5o+Tbt27OSQqwkAAAQQQQACBqgTMcsrm327zNW7CeJnRiGVHN5gymjZr7rrRDeec4+5RGFX1nZOOk2BwUm8QCwIIIBAFAp3T0vTxx7uioCU0AQEEEEAAgdgV8De64Y0oGt0Qu70bupaTYAidLSUjgAACMSnQvEULzZ45Mybb7q/Rt/bs5e9Quf3btnxYbl+odyRaz9qyIYAAAgggUFOBEyeOl87dYK514+iGmraZ8ysXIMFQuQ9HEUAAAQRqKHDVVVfZV2RnZys1NbWGV0fX6U0SE/XHu+7Rj//6MboaRmsQQAABBBDwCBQVFenId9/pq8OHVVDwlaPmbjCPeZitbt1zPNHyLdQCJBhCLUz5CCCAQIwJJKck2y3O+uijmE8wGIgOnTrF2DuA5iKAAAIIxLLAYSvRkLdvn3ZkfRTx0Q3HrREWZku5vGQS6ljul3C1nQRDuKSpBwEEEIgRgfj4eNVvUF97PimZfTpGmk0zEUAAAQQQQMASaNSokf1lEuwn//Uv5eXt1//u3Knd1vxMFa1M0eiii/Szn52NXZQIkGCIko6kGQgggICTBDpZf1Tk5OQ4KSRiQQABBBBAAIEwC9T++c/V4oqW9pep+r7+d2vSlClav26dNm/aZI9wMPsbN2liLZeZoosuulgNzzvP7ArKlvtprl1O3TqsIhEU0GoUEtQEw7nnnsMflNVA5xQEEEAg2gWaNW+uNavX2Gtqm2Wv2BBAAAEEEEAAASNwe5/b7a8TJ04oe0e2MjZs0HuZmfr7396xgerVb6DLGjdWYlKSAh3dcPz4D3aZ3mW07R/4T0gFgppg8P5BGdKIKyncO4lHo0YXVXIWhxBAAAEEQi3Qpm1buwrzh0OHjh1CXR3lI4AAAggggIDLBMwHEOZvBPM1bsJ4mXu5rKws/e2dd7Txvff0v9k77BYFMrrhyy++dJmK+8MNaoLh8sub2iKRmjk8N7dkCExKCpN4uP+tSQsQQMDNAsnJJRM9fvrpXhIMbu5IYkcAAQQQQCBMAmaUgfkyIxx8RzeYZMOZjm44dOiQOqelhakFVGMEgppgSG1dshxZZkZmRGYO3/D3d+2JxRgCw5sbAQQQiKyA+VSiSWITbd2yVQMGDoxsMNSOAAIIIIAAAq4S8B3dYAIvKCiwRjVs1JYtH2rtG29We3TDZ58d1GWXNXZV290e7E+D2QDzRjAZotcXvRbMYqtVlnnTmed9b7zxpmqdz0kIIIAAAqEV+M1vOmjnzuzQVkLpCCCAAAIIIBD1AmaFKjOy4fkXXlDewXy9unChhgwdqv8UF9ujGxbMn6f56S+VcziQd0Dt2rcrt58doRMI6ggGE2avW25RZkaG1r29Tt26dwtd5GVKfmvtWntP3//6rzJH+BEBBBBAIBICTZs108IFC+xPHcwfBtG8mVmx2RBAAAEEEEAgPALeuRseHv5wudEN3gi88/PVrXuOdxffwyDwk/9YW7Dr6dqli44dO6b3rKVHzKiGUG9m9MK17drboyfmzX851NVRPgIIIIBANQTMfDy39uylmbNnhzXhXI3QOAUBBBBAwMUC5vn8fv/1R/3vzp2nteKKli21aPHrYbn/OK1ifnCUgLk3NB9sbN60WXf366cVq1dF5PF9R6GEMZigPiLhjXvqs8/q2NFjGvf4495dIf0+dMgQu/ynJ00MaT0UjgACCCBQfYHU1JJ5efbu3Vv9izgTAQQQQACBKgTGjBpdLrlgLvl41y498KeS+4IqiuBwFAt4R02aiabN5p14Ooqb7KimhSTBYP6oNM/EmDkRli5ZGtIGTxg3XjuydmjSlCl2piqklVE4AggggECNBMy8PJ/s3l2jazgZAQQQQAABfwLm0+m333rL32HrU+tN9nKHfk/gQMwI7PnkE3vC6XCMqI8Z1Go0NCQJBlOveR6mdZvWGjNqVMiSDCa5YJ7v7XfXXfakH9VoL6cggAACCIRRoHmLFva8PGGskqoQQAABBKJYwHywWNX23nuZVZ3C8RgQyMnJYQWJCPRzyBIMpi2vWDf/3iSDSQaY56WCsZnM5YD+95YmF8ZNGB+MYikDAQQQQCDIAk2bNrVLNPMxsCGAAAIIIBCowOHDXwZaBNfHgIC572QFich0dEgTDGY4yvKVK+0RBmakwXUdO9qrS5xpU80bZV56uv7QrZv9idjosWNEcuFMNbkOAQQQCL1ASkqKXUnup7mhr4waEEAAAQSiXqBN27ZVtrFRo4uqPIcTolsge0fJBxvVeb9Et0T4Wxf0ZSoraoJJAqRZK0s8aX03EzLOeK6JbujW3Vr1oXOVM3qapIJ5g2Rs2KC1a9+0J480oyLSX365ymsrioV9CCCAAALhE0hKTlL9BvW1d8+e8FVKTQgggAACUStg5nqrW7eujh8/XmEbzQecHTt1rPAYO2NHYPv27XZjmeAx/H0ekmUqK2vGurfX6RVrKcmyz0+ZicB8t++/Lyx3To+ePdTDWvLMrHvKhgACCCDgDgHzSJv5f7oZ0caGAAIIIIBAoALe5QcrKmfa9OnqdUuvig6xL4YEbrvlFru1/O0R/k4PywgG32Z1697NXg/dzKOwL3efzPIhP/xwvNws4+eeW89eieKcc+rq8subKrV1Kmva+kLyGgEEEHCJQLv27TR54iR7Hh5mcnZJpxEmAggg4GAB82HjqwsX6onHH9Pnn31uR3reeefpu+++08GDBx0cOaGFQ8CMgDcfZptVDdnCLxD2BIO3iWZ9UvPFaASvCN8RQACB6BQwSWKz7du3j0fborOLaRUCCCAQdgFzD5G5ceNp9Q4fNkyzZ86s1mPYp13ID1El4J1/4aqrroqqdrmlMSGd5NEtCMSJAAIIIBA6ATMCzWxZH30UukooGQEEEEAg5gUmPPWUPe/PiEceCdrqdTGP6kIAM3ef2bx/f7iwCa4OmQSDq7uP4BFAAAHnC5jHIpokNtGeTz5xfrBEiAACCCDgWgHz782M51+wlyecPu1Z17aDwAMTMAsDmLn7eCwzMMczvZoEw5nKcR0CCCCAQLUFWrVqpY1lhrJW+2JORAABBBBAoJoC5tGJfnfdpYULFshMLs8WWwL79+23Vx3s8tuusdVwB7WWBIODOoNQEEAAgWgVaNa8uf0Pvpnglw0BBBBAAIFQCgx/9BGZZe3NJJDmhpMtdgQWvfaa3ViWKo1cn5NgiJw9NSOAAAIxI9CmbVu7rWb1IDYEEEAAAQRCKWCGxk+e8oxdxehRI5mPIZTYDiubxyMi3yEkGCLfB0SAAAIIRL1AamrJRI9maWI2BBBAAAEEQi2QlJykJ5962l6u8M8PPhTq6ijfAQKbN23m8QgH9AMJBgd0AiEggAACsSBghqtu3bI1FppKGxFAAAEEHCDQrXs3jR47RpkZGZowbrwDIiKEUAqsWb3KXkWExyNCqVx12SQYqjbiDAQQQACBIAhccUVL+4+8IBRFEQgggAACCFRLYMDAgaWTPi5dsrRa13CS+wTMHE9rVq/RjTfexOoREe4+EgwR7gCqRwABBGJF4Kqrr7abyoRbsdLjtBMBBBBwhoB30scxo0axsoQzuiToUcyd86Jd5qDB9we9bAqsmQAJhpp5cTYCCCCAwBkKpKSk2Ffm5uaeYQlchgACCCCAQM0FzKSPr1jLVppH9YYOGUKSoeaEjr7ixIkT8k7uGB8f7+hYYyE4Egyx0Mu0EQEEEHCAgJlwy2zbt21zQDSEgAACCCAQSwIkGaK3t5csXmxP7vhf/fpFbyNd1DISDC7qLEJFAAEE3C7QOS1NH3+8y+3NIH4EEEAAARcKkGRwYadVEbIZvfDinDkyf194V6yq4hIOh1iABEOIgSkeAQQQQOCUQPMWLewlw07t4RUCCCCAAALhEyDJED7rcNQ0fdqz9uiFIUMfCEd11FENARIM1UDiFAQQQACB4AhcddVVdkHZ2dnBKZBSEEAAAQQQqKFA2SQDq0vUENAhp5tJoxdac2v0u+suRi84pE9MGCQYHNQZhIIAAghEu0BySrLdxNxPmegx2vua9iGAAAJOFvBNMpjVJSaMG+/kcImtAoEpkyerfoP6YuWICnAiuIsEQwTxqRoBBBCINQEzu7P5Y2DbP7bGWtNpLwIIIICAwwS8SQbzCbj5JHxA/3tlnulnc76AGXWSmZGh+wcPFitHOKu/SDA4qz+IBgEEEIh6gU6dOiknJyfq20kDEUAAAQScL2CSDOMmjNfosWPsG9Z7rGSDGXrP5lwB0z/Tpj5jLzs6YOBA5wYao5GRYIjRjqfZCCCAQKQEmjVvrgN5B/iUKFIdQL0IIIAAAuUEzI3qzNmzlZ+frz6399a6t9eVO4cdzhAYPWqkHcjkKc84IyCiOE2ABMNpHPyAAAIIIBBqgTZt29pVZO9gosdQW1M+AggggED1Bbp176YlS5cpISFBQ4cMsedl4JGJ6vuF40wzV8aOrB168qmnlZScFI4qqaOGAiQYagjG6QgggAACgQkkJ5dM9Pjpp3sDK4irEUAAAQQQCLKAuWl9xbMygZmXoefNN4uVj4KMfIbFmVEl3lUjTDKIzZkCJBic2S9EhQACCEStgHnetUliE23dwkSPUdvJNAwBBBBwsYB3XoZXFy7UsWPHdGvPXnpu+nM82hfBPjXJBTOqpHWb1vacGREMhaqrECDBUAUQhxFAAAEEgi/wm9900M6dPCIRfFlKRAABBBAIlkCHjh303qZN6tGzh2bPnGmPZti8aXOwiqecagqYSR2fePwxO7lgRpewOVuABIOz+4foEEAAgagUaNqsmY4dPaaCgoKobB+NQgABBBCIDgEzmmH6jBnyjma4u18/DR82jH+/wtS9JrlgJt00m5mE0/QHm7MFSDA4u3+IDgEEEIhKgZTLU+x2mYma2BBAAAEEEHC6gHc0w5ChQ7Vm9Rpd26695qWn89hECDvOPBbx+65d7RrM5Jvx8fEhrI2igyVAgiFYkpSDAAIIIFBtgdTUVPvcvXuZ6LHaaJyIAAIIIBBRAfPp+cPDH9YHW7eoc1qaJk+cpOs6diTREIJeWbpkaemcC+YxFVaMCAFyiIr8yX+sLURlUywCCCCAAAJ+BQb0v9c+Nm/+y37P4QACCCCAAAJOFTCrS8yeOUuZGRmq36C+7h88WH3uuINh/AF0mFkWdPq0Z+3VIsyEjmbOBR6LCAA0ApeSYIgAOlUigAACCMiekdtMmpV3MB8OBBBAAAEEXCtQUaLhDzfeyJD+GvaomW9h8P2DdCDvgMyjKGa0CJv7BHhEwn19RsQIIIBAVAg0bdrUbgfri0dFd9IIBBBAIGYFzGN/ZjTeitWrdOWVqfajE2aOhgnjxot/46p+W5hRC2Y+CzPfglkW1EyoSXKhajennsEIBqf2DHEhgAACUS5gPqkwf0xMmjJFt/e5PcpbS/MQQAABBGJFwPz7tui11+xh/qbNTRKbaMDA+9T9D90Z7l/mTWCW/Xxywnh71IKZ1+LpSRMZ+VHGyG0/kmBwW48RLwIIIBBFAm1bt9aNN96kcdYfF2wIIIAAAghEk4D5ZP7tt962Pp1/yb6BNm3r0bOHuvy2qzp26hjTyQbfx0pMAuYJa7SHWamDzf0CJBjc34e0AAEEEHCtgJno8fvvC7V85UrXtoHAEUAAAQQQqErA3FC/ueYNrV37po4dPWafHovJBrP05Crr33wmxqzqHePe4yQY3Nt3RI4AAgi4XsA8c2mW+frfj3fF9Cc5ru9IGoAAAgggUG0B81hAxoYNpyUbzIoJv7/+erVp21bepZyrXaDDTywoKNDri17X+nVv2yM5WHHD4R0WYHgkGAIE5HIEEEAAgTMXMH9k3d2vnz0xVrT9QXXmKlyJAAIIIBArAmZkQ2ZGprZ8+IF2ZO0obbaZj6Bd+3Z2wiE5Odl1SXgzD0VWVpZWLF9W2i6TRLnHGrnYrXu30nbyIvoESDBEX5/SIgQQQMA1AuZTDTPT9uixY6wJsAa6Jm4CRQABBBBAINgC5t9Ek2TYvm2b3n9/c+m8DaYeM09Bq1at1Kx5czvpcOGFFzpqMkSTUMjNzS0Xu4n7hm7ddWffOx0Vb7D7jvJOCZBgOGXBKwQQQACBCAh07dLF/uODJakigE+VCCCAAAKOFTCTRGbvyNann+7V1i1btXNndun8Dd6gzaiAc8+tZ492MPvMIxZmC9WoB++ym1kffaQvv/hShw4dsudTsCv1/MfMLXH1NdboizZtlJSc5HuI1zEgQIIhBjqZJiKAAAJOFjB/QJmtTp06Tg6T2BBAAAEEEIi4gPk3c9++fcr9NFdffvmlPtm9W599dvC00Q5lg/QmIXz3N2/RQuecU9d3V+lrb+LAu6Oy8s2jHJdccomaNmtGQsELFuPfSTDE+BuA5iOAAAIIIIAAAggggID7BcwjFl999ZXdEDPCwLuZ0Q9lN7OKQ2WbSRz4bmY+CLM1anSRLmx0oZz2iIZvrLyOrAAJhsj6UzsCCCCAQMACxSrMel5395mlXQ3/oGmLp6lXQu2AS6UABBBAAAEEEEAAgZoJ/LRmp3M2AggggAACThM4ruylK7SryIqr4C09PmeLzEs2BBBAAAEEEEAAgfAKkGAIrze1IYAAAggEXaCuUm+/VS1rWQXH/0FPDW4v85INAQQQQAABBBBAILwCPCIRXm9qQwABBBBwm8CRtZr6xuUa0T/FbZETLwIIIIAAAgggEFYBRjCElZvKEEAAAQTcJfCjsufN04fF7oqaaBFAAAEEEEAAgUgIkGCIhDp1IoAAAgi4QqA4b5Emzst1RawEiQACCCCAAAIIRFqABEOke4D6EUAAAQScKVC4RdOHzVQ2M0Y6s3+ICgEEEEAAAQQcJ0CCwXFdQkAIIIAAApEWKM5fp7H9BmluzvFIh0L9CCCAAAIIIICAawRIMLimqwgUAQQQiDKBwmytSp+sge06aFRGod244vxMzRtxs5o2TlCi9dX0ppGal5GvKqdAMGW9OFI9ktuXllVWq6Ky567MVmHxXs0b85oO2hccUXb6ferYeYiWlCYXTmrXxN/b8ZiYEpuOVGaFoxpO6mDGa5rrE39i4xRde+9kzTP1lA3I9+fifGXONxat1CPd+0iGFcvK2Rp1U6uSupNv1qj0TB2sEsO3YF4jgAACCCCAAALhE2AVifBZUxMCCCCAgJUqKMxeq6WLX9GMZTkquU+P123z39Koc1/V3X1maVe5m/e6ajl4rl4d2V71ThP0V9Z6TUnzPdM6L+t5q+w1On/QExo7rKsax1kFWUmJ5ZPG63ETR6sx2vDmQDX2Kb8oY6Su7L9MJ1VbLce+oTUDK1lFojBL84b/WZN3X64hk8bqobQExVlXHsyYo4lj5iijoEi1Wj2gRQv/rDb1TOWezSRG5s7W9DkbVGDv8tTVP06rBt+tR//nC++Znu+1FN97tt6e2rWMRZnT+BEBBBBAAAEEEIiAACMYIoBOlQgggEDMChRt0pQ7hmlqaXKhROL/cudpwEN71HFuhnIP5isvL0PzHuiiePvwce2aM0gD0veePpKheKdeGjqiXFnlbM15D83V3o7DNOURT3LBnFQvVbdNnac5vS8rd0mNdpgREP3v0eRNF2v0oll62E4umBJqq3HaML24+Gl1ja+lopxZ6tvveWUVeocgHNaq4f31aGlywVNr8Sead9uftD5xmFbs3K+8g/uVtfIBtaxljhepYPVyZRzxluG5hm8IIIAAAggggIADBEgwOKATCAEBBBCIGYFanTVlr5VAOPiBpnXxjjIo0OpXv9Cdf/W5OY9LUOdHZmnh2Hay76t1XNkvL9Sm0ptzSyyujUa8n1umrPKSxTl/19tflBsW4TnxfHUe+aDSzip/XfX2nFTe/Al6dsdJxffsr1sTa5e7LC7hFk189Dq7HUU5c/XgpAzP4xKN1OvlbCv+3Vox2Ds6wnocY/pCHR37utJH9lKqPdohTvXaDNa4AZ5zirZr/Xtfl6uHHQgggAACCCCAQKQFSDBEugeoHwEEEIhJgfPVul2yp+XWIxKTnlKvhLI357WV2P8R9b+4JMWggvV6fUNFN9b1lJDyK7+K/z52VN9ZR4s2LdfqvJPlz2vYTjdcU7f8/ursKdys9JezrHEFv1Tza1r4eWwhTg17DPK0w4xAmK8Vp8XxC11x1ZXWeAezWY9IjJiiEW0alqnd95yT+vboiTLH+REBBBBAAAEEEIi8AAmGyPcBESCAAAII+BOIa6auNyZ4jv5Tufu/Ov0xCftILdVvcK6/EvTT+g10njlatFWTr79do5aVnXDRGkkwss9p8y/4Ley0A8U6smG51ljzK0jJuqb1+acdPe0H33YU7dRbGZ+fdpgfEEAAAQQQQACBaBAgwRANvUgbEEAAgagV8P3kvkjfHflB/65hW+Na3aw/tvaMUCjK0fIRvdSm3QBNrWplhyrrOa6cf+zyTFRZ1cln69KkyzyPe5zUvn1fVvO6qsrlOAIIIIAAAggg4BwBEgzO6QsiQQABBBCoQKBWQpI1PiCALa6pBsx/RaO7XHyqkIINmju8JNHwXHWWwTx1pc+rb5S3t9LFJ33OjdM59etbK0uUbCf37teXPkd5iQACCCCAAAIIRIMACYZo6EXagAACCCBQuUC9Nhrw8rvaMN+a0NFa0aF0sxINs/vfrFvGrNPBgBZm+F5HC/1NJFlSm2+ipNb5DXWGsz6Uhs4LBBBAAAEEEEDAaQIkGJzWI8SDAAIIIOBHoJbOa3iOzvwfrpJlI9O3btGK6ff7JBqsZTBfH6VH5pdZBtNPFKd211GD870TU36jfQeqO5qhli5IuczPhJCnSucVAggggAACCCDgNoEz/zvNbS0lXgQQQAABVwoUFx7VMTvyXyol6cLSxwzOvDENlXrLSKV/8DfNvbPVqWUwF7yhnBqNYvBdCcPfBJSnojzVjpb1ZtEAAAV7SURBVAR1/12zILTjVNm8QgABBBBAAAEEnCBAgsEJvUAMCCCAAAJ+BIpVeCBP9uKU8Tfozi4X+DnP/+6ijKc0ZOXh8ifEJei3k+ZoUpd6Jce+O6rCGs0gWUuXpHVVqv3ERZG+WL1Smwr9ZSh82nFxmrq2+kX5eNiDAAIIIIAAAgi4XIAEg8s7kPARQAAB9wsUam/eN36a8bU2rtturbhQV6n39lPHet5pEv2cXuHuE/pg3VYdqfCYzyiElCQl+EzPULq8pbUw5rGjxytYHlOKS+yhIT0vKym54C3NXr6vwvOko9aKE7kl7bjrZrU6k2ZUGD87EUAAAQQQQAAB5wiQYHBOXxAJAgggEKMCJ7Xr5VeVWe7Tf+tT/4xZmr6hULVaD9Uz/Zv6eaygyEoAfO+xO6kjx34s51i0YbwGpVc0x4L3WiuBcWMHXeJzZdylyUopOzqhOF9/HzNMz2V76zhfncdM1qBWZsrG48qeOkGv5J30KaXkZXHeGs1efVjxv3tMz5ZrR7F+OHbMk5iozhKW1TmnXAjsQAABBBBAAAEEQi5AgiHkxFSAAAIIIFC5QG3Fa70G93tcy7O94wyOKHvZ47p70GIdafWAFs3vr0Q/n/oX57+luavzPVUUavOCxcoql6ywbv4n9tYtI2Zr1Wl1PK0J875SyzunlL/xr9dc17T0rPVQsFgDrkxSYuLNmnVub/VP9XnEoV57DX9hivqYJEPRVk3u+4BOLX15UgczZuj+vs/pq85Pa9Gc3mpcth3F+7R60VZrdEPJdnLTKq3NL5OkKM7T2iUfyru3wnMqR+YoAggggAACCCAQcoGf/MfaQl4LFSCAAAIIIHCaQJEOpvdVl4nbrb3xum3+a7r92Ar9ZdrLyigoudWu1aq3ht3VR7ffkupnxYVCZY64QQOWFZxWcskPtdVy7BtaMzBFZg6GPx+7V//d+lMt/PtWffjyK546aim+yz0a0LeP+qUlVDw6ojBL84b/WZM3fCHVaqXbJo7XqN7+4rGSIiuXaOmCuVqec9wTU1217D1I/e7oo16pDcvE6WtQ5pD5sdUYbXjzbqnUyd85A9W4gkPsQgABBBBAAAEEwi1AgiHc4tSHAAIIIGAJ+N5cmwTDek1J80y2iA8CCCCAAAIIIICAKwV4RMKV3UbQCCCAAAIIIIAAAggggAACCDhLgASDs/qDaBBAAAEEEEAAAQQQQAABBBBwpQAJBld2G0EjgAACCCCAAAIIIIAAAggg4CwBEgzO6g+iQQABBGJEwLs8pGluxUtLxggEzUQAAQQQQAABBKJGgARD1HQlDUEAAQTcI1C9pSXd0x4iRQABBBBAAAEEEJBYRYJ3AQIIIIBA+ATy09Wj8yTt8lejvTQjyy7642E/AggggAACCCDgZAESDE7uHWJDAAEEEEAAAQQQQAABBBBAwCUCPCLhko4iTAQQQAABBBBAAAEEEEAAAQScLECCwcm9Q2wIIIAAAggggAACCCCAAAIIuESABINLOoowEUAAAQQQQAABBBBAAAEEEHCyAAkGJ/cOsSGAAAIIIIAAAggggAACCCDgEgESDC7pKMJEAAEEEEAAAQQQQAABBBBAwMkCJBic3DvEhgACCCCAAAIIIIAAAggggIBLBEgwuKSjCBMBBBBAAAEEEEAAAQQQQAABJwuQYHBy7xAbAggggAACCCCAAAIIIIAAAi4RIMHgko4iTAQQQAABBBBAAAEEEEAAAQScLECCwcm9Q2wIIIAAAggggAACCCCAAAIIuESABINLOoowEUAAAQQQQAABBBBAAAEEEHCyAAkGJ/cOsSGAAAIIIIAAAggggAACCCDgEgESDC7pKMJEAAEEEEAAAQQQQAABBBBAwMkC/x87RqJzRxHq8QAAAABJRU5ErkJggg==" alt></p>
<p>The air in the cylinder can be regarded as an ideal gas. Before compression, the air in the cylinder is at a pressure of 1.1×10<sup>5</sup>Pa and a temperature of 290K. The volume of the air in the cylinder is 6.0×10<sup>–4</sup>m<sup>3</sup>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the number of moles of air in the cylinder.</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 cork leaves the toy after the air is compressed to a pressure of 1.9×10<sup>5</sup>Pa and a volume of 4.0×10<sup>–4 </sup>m<sup>3</sup>.</p>
<p>(i) Deduce that the compression of the gas is not isothermal.</p>
<p>(ii) Outline why the compression might be adiabatic.</p>
<p>(iii) The work needed to compress the air in (a) is 15J. Determine, with reference to the first law of thermodynamics, the change in the internal energy of the air in the cylinder.</p>
<p>(iv) Calculate the change in average kinetic energy of an air molecule as a result of the compression.</p>
<div class="marks">[9]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The piston is now pushed in slowly so that the compression is isothermal. Discuss the entropy changes that take place in the air of the toy and in its cylinder as the air is compressed.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(n = \frac{{pV}}{{RT}} = \frac{{1.1 \times {{10}^5} \times 6.0 \times {{10}^{ - 4}}}}{{8.31 \times 290}}\);<br>0.027;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) calculate <em>pV</em> correctly for both states: 66 and 76; } <em>(do not penalize 66 k/K and 76 k/K </em><em>as k may be a constant)</em><br>isothermal change would mean that <em>p</em><sub>1</sub><em>V</em><sub>1</sub>=<em>p</em><sub>2</sub><em>V</em><sub>2</sub>;<br>so not isothermal</p>
<p>(ii) no heat/thermal energy transferred;<br>(because change/compression) occurs (too) quickly/fast; [2]</p>
<p>(iii) <em>Q</em>=0;<br><em>W</em>=−15; <em>(minus sign is required)</em><br>so <em>ΔU</em>=(+)15J; } <em>(symbols must be defined)</em><br><em>(allow ECF from second marking point)</em></p>
<p>(iv) number of air molecules=0.0274×6.0×10<sup>23</sup>(=1.64×10<sup>22</sup>);<br>9.13×10<sup>–22</sup>J;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>entropy is a property that indicates degree of disorder in the system / <em>OWTTE</em>;<br>gas occupies a smaller volume;<em> (do not allow “compressed”)<br></em>entropy of gas/air in toy decreases because more ordered;<br>energy reaches surroundings/cylinder / entropy cannot decrease;<br>so entropy of surroundings/cylinder increases; } <em>(do not allow ECF from “entropy of gas increases”)</em></p>
<div class="question_part_label">c.</div>
</div>
<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">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">This question is about simple harmonic motion (SHM), wave motion and polarization. </span></p>
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<p>A liquid is contained in a U-tube.</p>
<p><img 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" 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<p>The pressure on the liquid in one side of the tube is increased so that the liquid is displaced as shown in diagram 2. When the pressure is suddenly released the liquid oscillates. The damping of the oscillations is small.</p>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(i) Describe what is meant by damping. </span></p>
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<p>(ii) The displacement of the liquid surface from its equilibrium position is <em>x</em>. The acceleration <em>a</em> of the liquid in the tube is given by the expression</p>
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<p><em>\(a = - \frac{{2g}}{l}x\)</em></p>
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<p>where <em>g</em> is the acceleration of free fall and <em>l</em> is the total length of the liquid column. Explain, with reference to the motion of the liquid, the significance of the minus sign.</p>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(iii) The total length of the liquid column in the tube is 0.32m. Determine the period of oscillation. </span></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 string in (c) is fixed at both ends and is made to vibrate in a vertical plane in its first harmonic.</div>
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<div class="column">(i) Describe how the standing wave in the string gives rise to the first harmonic.<br>
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<div class="column">(ii) Outline how a travelling wave in a string can be used to describe the nature of polarized light.</div>
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<div class="marks">[6]</div>
<div class="question_part_label">d.</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) the amplitude of the oscillations/(total) energy decreases (with time); because a force always opposes direction of motion/there is a resistive force/ there is a friction force;<br> </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPS'; font-style: italic;">Do not allow bald “friction”. </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(ii) the displacement and acceleration/force acting on (the surface); are in opposite directions; </span></p>
<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">(iii) \(\omega = \sqrt {\frac{{2g}}{l}} \);<br>\(T = 2\pi \sqrt {\frac{{0.32}}{{2 \times 9.81}}} \);<br>=0.80s;</span></p>
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<p><em><strong> </strong></em></p>
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<div class="question_part_label">b.</div>
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<p>(i) wave <span style="text-decoration: underline;">reflects</span> at ends (of string);<br>interference/superposition occurs (between waves);<br>regions of maximum displacement/zero displacement form (that do not move);<br>one region of max displacement/antinode forms at centre with zero displacement/node at each end; {<em>(allow these marking points from clear diagram)</em></p>
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<p>(ii) the waves (in a string) are transverse and vibrate only in one plane;<br>light waves are transverse electromagnetic waves;<br> (and) for polarized light the electric field vector vibrates only in one plane;</p>
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<div class="question_part_label">d.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<div class="column">Candidates had some uncertainty in discussing the negative sign in the SHM equation for the U-tube example. They were unclear about the terms in the equation and the relative direction of the vector quantities concerned.</div>
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<div class="question_part_label">b.</div>
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<p>(i) Although there were many suggestions that the wave is reflected at one end of the string and that this interferes in some way with the incident wave to produce the standing wave these were generally weak and incomplete. Some candidates focussed entirely on the shape of the standing wave (not really the question). It was rare to see 3 marks awarded; 2 was more common.</p>
<p>(ii) Candidates were vague as to the nature of polarized light (a clear description in terms of the field vectors was required), as to the description of the travelling wave on the string, and as to the way in which it could be used. Many will have seen the demonstration in the laboratory but could not describe it with clarity.</p>
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<div class="question_part_label">d.</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 internal resistance of a cell. <strong>Part 2 </strong>is about expansion of a gas.</p>
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<p class="p1"><strong>Part 1 </strong>Internal resistance of a cell</p>
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<p class="p1">The graph shows the voltage–current (\(V\)–\(I\) ) characteristics of a non-ohmic conductor.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-01_om_05.44.26.png" alt="N14/4/PHYSI/HP2/ENG/TZ0/08_Part1.d"></p>
<p class="p1">The variable resistor in the circuit in (c) is replaced by this non-ohmic conductor.</p>
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<p class="p1"><strong>Part 2 </strong>Expansion of a gas</p>
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<p class="p1">Outline, with reference to charge carriers, what is meant by the internal resistance of a cell.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<p class="p1">On the graph, sketch the variation of \(V\)<em> </em>with \(I\)<em> </em>for the cell.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
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<p class="p1">Using the graph, determine the current in the circuit.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.ii.</div>
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<p class="p1">The graph shows how the pressure \(P\)<em> </em>of a fixed mass of gas varies with volume \(V\). The lines show the state of the gas sample during adiabatic expansion and during isothermal expansion.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-01_om_08.16.32.png" alt="N14/4/PHYSI/HP2/ENG/TZ0/08.e"></p>
<p class="p1">State and explain whether line A <strong>or </strong>line B represents an adiabatic expansion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
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<p class="p1">Determine the work done during the change represented by line A.</p>
<div class="marks">[4]</div>
<div class="question_part_label">f.</div>
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<p class="p1">Outline, with reference to the first law of thermodynamics, the direction of change in temperature during the adiabatic expansion.</p>
<div class="marks">[4]</div>
<div class="question_part_label">g.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p class="p1">charge carriers/electrons move through cell;</p>
<p class="p1">transfer energy to the components of the cell (which is not therefore available to external circuit);</p>
<p class="p1">energy dissipated in cell equivalent to dissipation in a resistance;</p>
<p class="p1">causes potential difference of cell to be less than its emf;</p>
<div class="question_part_label">b.</div>
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<p class="p1">straight line of negative gradient; <em>(allow any straight line of negative gradient)</em></p>
<p class="p1">intercept at \({\text{1.25 V (}} \pm 0.05{\text{)}}\) and position/gradient as shown;</p>
<p class="p1"><em>Watch for ECF from (c)(iii).</em></p>
<p class="p1"><em><img src="images/Schermafbeelding_2016-09-01_om_07.54.53.png" alt="N14/4/PHYSI/HP2/ENG/TZ0/08.d.i/M"></em></p>
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<p class="p1">uses a point at which lines intersect;</p>
<p class="p1">reads correct current value from their own graph;</p>
<p class="p1">\(0.28{\text{A}} \pm 0.1{\text{A}}\); <em>(award for correct answer only)</em></p>
<div class="question_part_label">d.ii.</div>
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<p class="p1">\(PV\) is a constant for A / B is a steeper curve / final temperature/pressure lower for B than A;</p>
<p class="p1">(hence) B;</p>
<div class="question_part_label">e.</div>
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<p class="p1">number of small squares below \({\text{A}} = 180 \pm 20\);</p>
<p class="p1">area of 1 square \( = 6.25{\text{ J}}\);</p>
<p class="p1">adds additional 64 squares below false origin;</p>
<p class="p2"><span class="s1">answer within the range of 1400 to 1650 J; } </span><em>(allow ECF for an area that excludes the area below the false origin – giving an answer within the range of 1000 to 1250 J)</em></p>
<p class="p1"><em>Award </em><strong><em>[2] </em></strong><em>for a mean P of </em>\(4.65 \times {10^5} \times \Delta V\) of \(4 \times {10^{ - 3}}\) <em>giving an answer of 1860 (J).</em></p>
<p class="p1"><em>Accept working in large squares (= 16 small squares) using equivalent tolerances.</em></p>
<div class="question_part_label">f.</div>
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<p class="p1">no thermal energy enters or leaves / \(Q = 0\);</p>
<p class="p1">work done by the gas / \(W\) is positive;</p>
<p class="p1">so internal energy decreases / \(\Delta U\) is negative;</p>
<p class="p1">temperature is a measure of internal energy and so temperature falls;</p>
<div class="question_part_label">g.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">This was a 3 mark question about internal resistance, so reasonable detail was expected. Candidates needed to refer to electrons/charge dissipating energy in moving through a cell and the effect on terminal potential difference.</p>
<div class="question_part_label">b.</div>
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<p class="p1">Very few correct answers were seen. The equation of the line required is \(V = E - Ir\). Hence a line of negative gradient \({\text{(}}-{\text{1.9 }}\Omega )\) was required with a y intercept of 1.24 V.</p>
<div class="question_part_label">d.i.</div>
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<p class="p1">If a candidate drew any kind of line, ECF was used when the coordinate of the intersection of the two lines was used to determine a current.</p>
<div class="question_part_label">d.ii.</div>
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<p class="p1">Most candidates were able to identify B as the adiabatic – either by referring to the gradients or lower pressures and temperatures compared to A, or by showing PV was constant for A but not B.</p>
<div class="question_part_label">e.</div>
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<p class="p1">This was a 4 mark question and so candidates needed to give a detailed response. Many stated the 1st law, identified the three symbols and explained the change in each during an adiabatic expansion. Others were far less systematic. Most eventually predicted that temperature would decrease, but lost marks in their explanation.</p>
<div class="question_part_label">f.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">This was a 4 mark question and so candidates needed to give a detailed response. Many stated the 1st law, identified the three symbols and explained the change in each during an adiabatic expansion. Others were far less systematic. Most eventually predicted that temperature would decrease, but lost marks in their explanation.</p>
<div class="question_part_label">g.</div>
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<p>A cylinder fitted with a piston contains 0.23 mol of helium gas.</p>
<p><img 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" alt></p>
<p>The following data are available for the helium with the piston in the position shown.</p>
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<p> Volume = 5.2×10<sup>–3</sup>m<sup>3<br></sup> Pressure = 1.0 ×10<sup>5</sup> Pa<br> Temperature = 290K</p>
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<div class="column">(i) Use the data to calculate a value for the universal gas constant.</div>
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<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
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<div class="column">The gas is now compressed isothermally by the piston so that the volume of the gas is reduced. Explain why the compression must be carried out slowly.</div>
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<div class="question_part_label">b.</div>
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<div class="column">After the compression, the gas is now allowed to expand adiabatically to its original volume. Use the first law of thermodynamics to explain whether the final temperature will be less than, equal to or greater than 290K.</div>
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<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>(i) use of \(R = \frac{{pV}}{{nT}}\); <em>(award mark if correct substitution seen) </em></p>
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<p>\(\left( {\frac{{5.2 \times {{10}^{ - 3}} \times 1.0 \times {{10}^5}}}{{0.23 \times 290}}} \right) = 7.8{\rm{J}}{{\rm{K}}^{ - 1}}{\rm{mo}}{{\rm{l}}^{ - 1}}\); (accept Pa m<sup>3</sup> mol<sup>−1</sup> K<sup>−1</sup> )<em><strong> <br></strong></em></p>
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<p>(ii) the gas is ideal;</p>
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<div class="question_part_label">a.</div>
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<p>constant temperature required; <em>(do not allow “isothermal”)</em></p>
<p>a slow compression allows time for (internal) energy to leave gas / <em>OWTTE</em>;</p>
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<div class="question_part_label">b.</div>
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<p>(for adiabatic change) <em>Q</em>=0;<br> <em>W</em> is positive / work is done by the gas;</p>
<p><em>∆U</em> =<em>−W</em> so <em>∆U</em> is negative;<br> (<em>T</em> is a measure of <em>U</em> therefore) <em>T</em> less than 290K<strong><em>;</em></strong><em><strong><br></strong></em></p>
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<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<div class="column">(i) Very many candidates were able to arrive at a value for R from the data given. Some however fudged their answer to arrive at the accepted value of 8.31! It was common to see a unit of Pa m3 K-1 mol-1 which, while it is acceptable, shows that the candidate quoting it has little sense of the true meaning of R.
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<p> </p>
<p>(ii) Most recognized that the gas has to be ideal for the calculation in (i) to be carried through.</p>
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<div class="question_part_label">a.</div>
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<div class="column">Many were able to say that the temperature must not change (isothermal). Too many simply repeated the word “isothermal” from the stem, this gained no credit. However, only a few stated with clarity that the system needs time to allow the energy to leak out <em>to the surroundings.</em></div>
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<div class="question_part_label">b.</div>
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<div class="column">This part was done well, unlike similar questions in recent examinations. Candidates can explain the direction of energy flow and its consequences for the system in terms of the first law of thermodynamics. However, too many failed to use the first law and wrote in general terms about pressure and volume changes.</div>
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<div class="question_part_label">c.</div>
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<p><strong>Part 2</strong> Thermodynamics</p>
<p>A fixed mass of an ideal gas undergoes the three thermodynamic processes, AB, BC and CA, represented in the <em>P</em>–<em>V</em> graph below.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State which of the processes is isothermal, isochoric (isovolumetric) or isobaric.</p>
<p>Process AB:</p>
<p>Process BC:</p>
<p>Process CA:</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 temperature of the gas at A is 300K. Calculate the temperature of the gas at B.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The increase in internal energy of the gas during process AB is 4100J. Determine the heat transferred to the gas from the surroundings during the process AB.</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 gas is compressed at constant temperature. Explain what changes, if any, occur to the entropy of</p>
<p>(i) the gas.</p>
<p>(ii) the surroundings.</p>
<p>(iii) the universe.</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>process AB: isobaric;<br>process BC: isochoric / isovolumetric;<br>process CA: isothermal;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>use of \(\frac{{{V_2}}}{{{V_1}}} = \frac{{{T_2}}}{{{T_1}}}\);<br>to give 750 K;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>W</em>=(<em>P</em>Δ<em>V</em>=9×10<sup>5</sup>×[5-2]×10<sup>-3</sup>=)2700;<br><em>Q</em>=Δ<em>U</em>+<em>W</em>=4100+2700=6800J;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) same number of molecules occupy smaller volume, so disorder and hence entropy decrease;</p>
<p>(ii) heat flows from gas to surroundings, so temperature of surroundings increases, so entropy increases;</p>
<p>(iii) from second law, entropy of universe increases during any process;</p>
<p><em>Award <strong>[0]</strong> for simple statement of entropy increases/decreases.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
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<div class="layoutArea">
<div class="column">
<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';">Properties of a gas<br> </span></p>
</div>
</div>
</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>With respect to a gas, explain the meaning of the terms thermal energy and internal energy.</p>
<p><img 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x6ZpClfW/BQxy1obdn00L1ZePDfZnSPgc7eGLU2CBAgQIAAAQIECBAgQGBPBYQweyr3opy3Lot/ui5dbk55UUayw07bmvPja8/JW08+P4tzRr752J25bPLbMnroS3d42h7vbH0wD62uPRh4j1vZ6Ymt3/ppVu9N/IZROfPL12bSwU/ntiuuy6KO5bTbmn+Y66/4ch4deGpmfv707dxW9LKMPH1K3lfJcObPzZ2rKuHcs/nxgkdywulHxGN3dzqdDiBAgAABAgQIECBAgEDhAkKYwsn3pMOBGXHk0dUVcTbesCjLaw9/7dbUc1nV+KPUFpDutruQDRvTdM3H8w9X/yCvP/faXN350OFe6HzAATli/AFJnsjXFvy484HE3Xpq+0Ua71/fbfOubhgw4siMqywDtWFh7lze/UG4tXbaVj2Q+5t3L6VpGPq3+cj5U/K+sfvkWxPfnBHDhuegYz6Xp46bmduXXbPjVYwGH5F3nj06yQO56qYVaak8u+aJYzP+iI5bk2oD80qAAAECBAgQIECAAAECfUJACPOiTsOz2dj1oas9jqchgw46MsdVl67+Rq686rtp7unum02P5p6f/rF9+eJt2tnVfrY5ac9+eP4Xuf/mpiQH5uQTDu7yoN89a3L7Zw3OQUeNrtbbOn92rm5cv3U1qc6TKrfoNOahtl15qHDnSdu+GfSGHHVCZenqdbntii+nsXnztvurP23MQ4sfTVu3JaP/mN9tbH/AcveTNmf9wgvy0Z8el/M/c0H78tHV5b8XdVw5tLMxD8kRE96ewyqrKC1YkG9+457899vfkjf6VnentoUAAQIECBAgQIAAAQJ9QMCfay/qJPSw8k2eS8szf+g2qob9x2RK9aqH1qy8aUpOmXpdlnXcvlI5uK35wcz/3DczeMJf93ArSk/9dHTR2pJn/lh5X7/MdLfud7Khp6Chh+fXdPZV2deaTSvvyqKHNrW33faHbPxddSA76at+9z7Z/6T350MHV9KpRzJ/8rvykdn3ZdWmWkK1Oc1N/5Erbtgn449/ZZd+ehpzW1pbNqYasdQ/Z6bhdTnx7PdnVKWFJ+ZmytiPZ87SVekYeQU/TbfMztzBf5fjuz2LpbVzlav6kVfet63/dv75/1ue1wz/f3sIzroe3fPPDSMn5NxJByStd+XyS3+dCcce2MNKTD2faysBAgQIECBAgAABAgQIFCsghHnB3i1Zec93sqLazoasuLsxKztDgJ4arz/+l7lv0Y+2uaqlbf3y3L5gXfXEjfcuzvLOqy6GZPS512XuWYdX97UuuTpTT26/faX9FpZpuX/EmXnXyNryyNv2871HftPDVSKbs37ZoiyqPk5lQ1Z858dZX8svKr1sWpnv3P1gexEbGvOfy+uvNNmc5uWLc191taPWPPr1e/NQpe4Bb8jxH6jcIlN/1UhLVjXOz5wvL8lvq62ty22T/y7vvXVg/ubwykpP7Q+Uvf3h9ue6bLz3gTyyQ8P2IVX/f9DRmXZj5bkqlSCmOcuumZpxb3pj9baeEcNG5bhJ38+I6e/oeK5KfT91Y6411/brfPfr97Y/fLf1oTQ2NXeYNWTQ6HPy1XlT2oOY1iX5wodPyRHDhrf384a3ZPL3Rubcd4/sCEDasmllY771g/aloDY2PpI19a4d/bU1r8l/tTbn3ukn5KBaW91eJ2bmLQ9u8xmpDbf99RU56vR3V8c1cNKUvLNz/rc9qmrcdF3GV9ofd/l2rubpek7t581pbrx8989tW5/GiydmxLBDM/7ipTuoodZP+2tb89LMGndoRgybmFk9Xt207fHtP+3hGLOH56mt2ySYt64ke/jZ8pnsCllJrP0u6aLi+9YFZE+/N3t6ns9k1wmIz2RXEv8O6CoS37fuJP35d0n3am2pExDC1GHs3ttNaZr9towY9uaMn3VP56o5rUtmZnw1BJiWRV2fD/J8U+YcWX98+1Utx73hbZnTtDHNC6floLfOyL21Z8xWrro45phMXfjr9qE17J8xl9ySxfMuzvuqoUNl88CMmjQzcxbcmS9NPrT99p8e+nl01qk5aNjorW1VjxmV46cv3Dr2xTNyfN1YRrxpQi5bUnvCTOVKk2Nz0JSFae4497jJc7OyhvbE1TnjTRMyp2lARp/9uXzl3JMysDr+IzP+wm9k5eCTMu28j+X976mESEMz9lNz89WLT8zQhorjhBxx+tVd2jpq61hrfWzntWHoiZl1x8LMnfWP7SFJ9bjD875Z19c9V2Un/TQvzNQ3nJDzFvdQb7W9fTJ0zD/l6/fdmJmT2oOw6uaD/zEzr/tm7v3KpIwaVPk6dfTz9zOzrDaPD1+ScW8YnhEVu7oaBhzxvnzlsvox1+3sfPtIbps5OR++5sGtV9507qu8acigI07JGW8ekYknvamHq6C2OdgPBAgQIECAAAECBAgQIPAiCrxky5YtW3bWf+VKi9Vr1+zsMPsJENgtgZasvOWWPPjXZ2bSqO2tZ9SSVUtvypUXPp+PfH9GRg/ooYO2lbnpPbfnwBsvyJhut0P1cLxNBAgQIECAAAECBAgQINBrAjvKUFwJ02vsGiawI4HKZapfzDV/Oinv324AUzl/cEb+3Sk59qhXZd8ev62VW6yW5IHjTs1RApgdgdtHgAABAgQIECBAgACBF12gxz/rXvRRGQCBfi5QeSjvpR9bmAz5i51U2hGyvGFUXtPjt/XZ/HjByhw74bBeXolqJ8O0mwABAgQIECBAgAABAgR2KtDTzQ07PckBBAi8MIHaQ3k3Tv9kLt54Vv7m8LfmbaOH1q1s1JZNq5Zn6QP3Zt7yv8zn5vxVDyFLS1YtvC7XPDM217+x9kDmFzYuZxMgQIAAAQIECBAgQIBA7wl4Jkzv2WqZwPYFKk9Dv+SjmXLTI9s/pvrQ5csz5/+8IyMrD/3t6ZyDp2TujZ/JmKH77KAduwgQIECAAAECBAgQIECgKIEdPRPGlTBFzYJ+CNQLVFe6uiPLJy7Ljx5Znq/M+r9bV4eqrB517vS844QTtr06pmFQXjN8/wzMI2lNZfWnGfnAu49vD2jq2/aeAAECBAgQIECAAAECBPqkgCth+uS0GBQBAgQIECBAgAABAgQIECDw5yiwoythenzU559jkcZMgAABAgQIECBAgAABAgQIEOjLAkKYvjw7xkaAAAECBAgQIECAAAECBAj0GwEhTL+ZSoUQIECAAAECBAgQIECAAAECfVlACNOXZ8fYCBAgQIAAAQIECBAgQIAAgX4jIITpN1OpEAIECBAgQIAAAQIECBAgQKAvCwhh+vLsGBsBAgQIECBAgAABAgQIECDQbwSEMP1mKhVCgAABAgQIECBAgAABAgQI9GUBIUxfnh1jI0CAAAECBAgQIECAAAECBPqNgBCm30ylQggQIECAAAECBAgQIECAAIG+LCCE6cuzY2wECBAgQIAAAQIECBAgQIBAvxEQwvSbqVQIAQIECBAgQIAAAQIECBAg0JcFhDB9eXaMjQABAgQIECBAgAABAgQIEOg3AkKYfjOVCiFAgAABAgQIECBAgAABAgT6soAQpi/PjrERIECAAAECBAgQIECAAAEC/UZACNNvplIhBAgQIECAAAECBAgQIECAQF8WEML05dkxNgIECBAgQIAAAQIECBAgQKDfCAhh+s1UKoQAAQIECBAgQIAAAQIECBDoywJCmL48O8ZGgAABAgQIECBAgAABAgQI9BsBIUy/mUqFECBAgAABAgQIECBAgAABAn1ZQAjTl2fH2AgQIECAAAECBAgQIECAAIF+IyCE6TdTqRACBAgQIECAAAECBAgQIECgLwsIYfry7BgbAQIECBAgQIAAAQIECBAg0G8EhDD9ZioVQoAAAQIECBAgQIAAAQIECPRlASFMX54dYyNAgAABAgQIECBAgAABAgT6jYAQpt9MpUIIECBAgAABAgQIECBAgACBviwghOnLs2NsBAgQIECAAAECBAgQIECAQL8REML0m6lUCAECBAgQIECAAAECBAgQINCXBYQwfXl2jI0AAQIECBAgQIAAAQIECBDoNwJCmH4zlQohQIAAAQIECBAgQIAAAQIE+rKAEKYvz46xESBAgAABAgQIECBAgAABAv1GQAjTb6ZSIQQIECBAgAABAgQIECBAgEBfFhDC9OXZMTYCBAgQIECAAAECBAgQIECg3wgIYfrNVCqEAAECBAgQIECAAAECBAgQ6MsCQpi+PDvGRoAAAQIECBAgQIAAAQIECPQbASFMv5lKhRAgQIAAAQIECBAgQIAAAQJ9WUAI05dnx9gIECBAgAABAgQIECBAgACBfiMghOk3U6kQAgQIECBAgAABAgQIECBAoC8LCGH68uwYG4E+IbA5zY2XZ/yw4Rkx7vI0Nm/etVG1rU/jxRMzYtihGX/x0jS37eJpzUsza9yhGTFsYmY1rs+unbaHY8wenqe2bpPZZt66mOzhZ8tnsotjEt+3bia+b11JfN+6isTvku4kfpd0M/G7pCuJ3yVdRfb4d0n3hmypExDC1GF4S4AAAQIECBAgQIAAAQIECBDoLYGXbNmyZcvOGh8xbHhWr12zs8PsJ0CAAAECBAgQIECAAAECBAiUWmBHGYorYUr90VA8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKktYPAQIECBAgQIAAAQIECBAgUGoBIUypp1/xBAgQIECAAAECBAgQIECAQFECQpiipPVDgAABAgQIECBAgAABAgQIlFpACFPq6Vc8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhE75roEAACAASURBVDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKki51P23ZtOr+LFr49cyZ8paMOHJ2mp4vNYjiCRAgQIAAAQIECBAgQKCEAgNKWPMelrwpTbPPyBnXPLGd8w/OJxbcnumjB21nf3k3t626OWeefEkerRHsV3vjlQABAgQIECBAgAABAgQIlEfAlTC7PNeDMnrGt7N67cosnzclo2rnHTwlc1eszOq13xbA1Ey6vDaMnJw71z6RxbOO7bLHjwQIECBAgAABAgQIECBAoDwCQpjdnut9MvS4cTm542qOIaeMy3FD99ntVrZ/Qls2Nd2Txub+dr/OgOw75BXbL9seAgQIECBAgAABAgQIECDQzwWEMH1tgtt+naU3NOZ/+tq4jIcAAQIECBAgQIAAAQIECBB4QQJCmBfEt7dPbsnKm/81Mxe37u2GtUeAAAECBAgQIECAAAECBAi8yAJCmBd5ArZ235KV887Pe2bdExHMVhXvCBAgQIAAAQIECBAgQIBAfxEQwuz1mWzJqsa7smjB7Ew9ZHSmLvx1tYe25gcz/8KJGTFseEYMm5iZC1dmU63vTSuz6MIzM74zgLkr5x0zsv3Ybss5V9q/o32p52pbwzNi3IW5qXHV1vYq7W5alcaFC3Pn7LNz+LBpWdS8OZtW3ddx3qEZf/HSNLd0PabyHJrNaW66NTPHHdre/7iLs2hVS22kda+VZacbc1NnTZW63pKps+9IY4/H1526R293pe4uS2FPWZjmSl9tzWm65cKMr3odmvEXLsyqTW09j6LiVp27Sj2VfyrHz+tSU0/9tGTV0usy9ZD2+Z3VuD6dPVT6v+trW017bDNJ88JMrc1p3etRs5uy9QlBz6d54bSOsVX62voZSypB3kdz+LDhOXzK/KzcXo09V24rAQIECBAgQIAAAQIECPSygCWq9yrwc1k172MZN+uBjlb3y9i0ZdPK+fnUO2dmWeclLo/ktumT80y+ni+cdkAaBo3KxH9elImfWJipx8zIsrw9V624OhOHdpmetvVpvOSTufJPZ2bOnAcyfVAla1mauVdclMsm35nbz7o2X734xAx9qtZOrbhTs3HFtXnv9OuzsmPTr35zX655712544naoN6e9j/iL9j2apwnbs55E1uSJVdk4v61BxBXHh58fd57+peSs67N8l+cmKENtSt5PptlN/wgV21zfG0ce/i6i3W/+skuS2GfVAmjfpabpk/JZUuqcUyS1qycPyPveia55/rTsn9dDNnWvDSXfvDf86dz/iVXPz4jg1IJVm7KlZ+8JFPm35lJ876Yi8a8Ok8t/FSOm37X1mJO+l1+NPuDOe+apo5tT+WpjR2xSa3/35ySq679YS4bOThtzT/M9Rd+KlNOvmRrG9kvY+f8Z7604tbqvmuq4x2dTyz4aqaPHlJ33IAMPe3a/PzQ0XnXxB/ltDuvyFmjBtft95YAAQIECBAgQIAAAQIE+qpA3Z+gfXWIf07jellGTp6f1b+4JzPfPLA68OfXfDuzb/mf/MOih7N67ZqsfuzuzDxpaOWyh9x7d1Oe2uXynsuqmz+baU+dmRsuPS0jB1WmriGDRp6caeefk8Mq4cJNl+b6+59Ohp6Wr6xdk5/fd3EOq7Z/T666e1AuqS6lvaY6jkfmfi7/uvhndcf8PmvuuSHzN5yebz72ZFavfTIPfeeyjK2U0fq9fOu/6ka66SeZe8GXsjInZupHT8jQ6qdocEZ9YHrOq9Td9fhdrrGnA3e97m5LYf9pdb5z9e3Z8L6b81DFfu3D+dasU1MtafGyPPjU1utL0rYyt5xzaZ46Z3YuOW1UBlWHMjgjTzw7n/lsZWntRzL/Y1/O/S0N1RBkdf2S20u+lm/9r09n+S/abVev/WH+vRKuZWOabrgoly3ZJ+87/5OZOLI9LGkY+pZ8vDpnSQaelqt+UFnivClfOe11qe679PycUv34/EX22/dlPaBsTvPPfpYBn52eM7cJYAZn1OQv5pG1a/LI3EkZVf2M9HC6TQQIECBAgAABAgQIECDwoggIYXqDveHlGfKqlyb5Y367cWTOvvTjGdvxB3gGjcrfTzi6vdefrMn6uhxgh0NpWZGbP/+rTHzvcdtcvVE5p2H44TmhumT2uixa8lhqNw817Dskr6o2emzOO39yjuphKe2txzybjcPOzCUzTt4a8Iwak/FvrTS8IU1rntp6S8ym3+Txzito6kbdWXfdthf6drfrrlsKu/mPOXDqBZl+4sjOUGXUqX+fY6pjWp0165/rGF1bWu6/NVetGpMzxr4u234pXpbhh/9VqteitDZmadOzHefU9fPmc/KZT7ylI4yqK/j5X+T+mytXx7w+I17bHuvU9jaMPCmTT9ovab038+5ds/XWpcp87n9qZlSDnwdy1U0rOuezdm7a1uS+G5/OhGMP7DLWziO8IUCAAAECBAgQIECAAIE+KNDlfpc+OMI/6yG9NK89clSXP84H5JUHDK/+Ub9xl2trS0vTd7OodV1aJx+d23ZwXuuja/PbtmTwNknCKzJk351N9YE58i9f3eWP+iF5/aFDkyUbtu3x1aMzftzQrMjYHP3q+nZrxz/REdq8LvV7t21kV356gXW/9tD8Zdfg6ZUH5JD9kmXblPRsmpY0prV1XaYcfvMOBvZ0Hlv7TNryym2dXjUk+27j3dHE0+vyeLWfnvy3Wv1qwx+qIczWJl6WkadPyfs+/0Bumz83d551TM4aufWKmLYnf5i7DzsrX63btoNB20WAAAECBAgQIECAAAECfUTghf2N3EeK6P/D2Jzfrn0yrTk4n1hwe6aP3vaqisLrbzggE7/4w0zs7Ljy0Nxl+cGSG3PZ/Cc6t77wNwXV3fZMfvno08l+03L7gzMyem99KzoDn4fz4//emIlDX9kDycC8fr+XbxvqVI4afETeefbo3HbNT3P73Y/mXTOO7ria57k8+UBT/vKkCfEkmB44bSJAgAABAgQIECBAgEAfFtj6H9/78CAN7fn8fkPlNpg/5JmW2i00fUClcyWht2T6kmfzv0//t/zHuQfvxYEVVHfbH7JhXWvyx41pae1c0+iF1zHgkIw/t/I8mW1vE6s23PabPNr4yyRH5rQebysakiMmvL39WT833J0ft3SMa9Oj+dadr8qJo1/xwsenBQIECBAgQIAAAQIECBAoVEAIUyj3C+1sXRb/dN3WZ7O80Ob2+PzNaX7wS5n616dk2rcH5B8W/TDf+ucPZcLo13S/omOP+6g/saC6Wx/MQ6trq0XV97+n71+WkR/4fOaedXha58/OlbVlydua8+Mv/Fuuenhwxs76p7xrO7cVNYyckHMnHZC0fiPXLFiVtrSl5cf35HtjTs1R295vtqcDdB4BAgQIECBAgAABAgQIFCgghCkQe8+7GpgRRx5dXdVn4w2Lsrx2VUS3Bp/LqsYfpbYYc7fde2VDZXnqL+fD77kiyw78VObNqXvo8F5pv76RguoecECOGH9AkifytQU/7v4g3NqQ2n6RxvvX137atdeG/XP8R6flrElvzf9z9+QcMWx4RrzhxFz81FvyLwvuzJcmH9pxm1FPzb0iR53+7oxKax79/K25v+XpNC35XU6bcNgOzumpHdsIECBAgAABAgQIECBAoC8ICGH6wizsdAwNGXTQkTmuurbyN3LlVd9Nc093zWx6NPf89I/VsGbbJp/Nxt/v6jJM257Z/afW/Px7i7MyyZBTjs3hvboM8gutu/voe94yOAcdNbp96er5s3N14/ptVitqP6ctmx5qzENt+3Rv4ncb8/ue5iNJ2/qF+cQ5j2f8//lMPj33h+3LlK/9WceVQ0N3cuVQQwYdcUrOqC77fW9u/8aCfOeJ0XnrG7c+pLf7YGwhQIAAAQIECBAgQIAAgb4qIITpjZlp+0M2/u6P1SWqf7exfeWbrd20pbVlYzZXNnR9BknHg1yTB/OdFZUgoCUr5/1b5q96Lg37j8mUs0cnac3Km6bklKnXZdmq2mLUSVvzg5n/uW9m8IS/7uGBrc9mw3ZCmLbfb8zvqoPrKah5Li3P/KG6d/MzLel6o073bV2O3/Sz3LrwZx23Tz2f32+sLe+8VWNn73a/7rp+egpHWlvyTGVqtnm+zj7Z/6T350MHV1KuRzJ/8rvykdn3ZdWmWrKyOc1N/5Erbtgn44/v4eG66zb0HMK0rctdl12R5fu/PkMH7uFXrWFk3jnj3RmY5tx76XX577e/JW/cw6Z2Zm0/AQIECBAgQIAAAQIECPSugD/ndtt3c5qXL859HUscb7x3cZY3VyOVjpYqV0zcm9sfrkQWrXn06/fmoc4/5iuXRvw63/36ve2BRutDaWxq3nrVRcPLs98BlSCgOfdOPyEHDXtz3vOjERlbvfJhSEafe131+SKVjlqXXJ2pJ785Iyq3twwbnoOOmZb7R5xZ93yRlqy85ztZUR3VL/O9R36ztZ/OmjfmobvvyqPVn9tX4dnUua9yFcfy3L5gXXVL608eSFO1zoE56IRxGVUZQ+dVI23ZtKoxN83+apZ2WLTO/2BGv2dh9j9mZPsy1ZUHyn79p+2tb1ie+x/Z1QW6d7Pu+n4evivfeqi+n81Zv2xRFlXTpKfT9N2Ht15RNOjoTLvx2kyqBjHNWXbN1Ix70xs7fEfluEnfz4jp78jI2jdm08p85+4HO+r5SR5d08MDk9uezpoVzWldPCPHv6F9nmrztfX10Iy/8NYO2zr8zrcNGXzUhPaAaOC7c+7pI3dw9czGNM1+V0YMOzTjL166tbbOtvb0zeY0N16e8ZXP2rjL07jN530HbbatT+PFE3d7PG3NSzNr3KEZMWxiZvV4VVJPfe7hGLOH56mt2ySYt64ke/jZ8pnsCln5l5HfJV1UfN+6gOzp92ZPz/OZ7DoB8ZnsSuLfAV1F4vvWnaQ//y7pXq0tdQK1PynrNnnbs8CmNM1+W0YMG5XjJs+t3o5TPe6JuZlyzKiMGPa2zGlqTtPsCTni9Kvr9l+dM950VKYu/HXSvDBT33BCzltce2pL5aqLY3PQlIXtz3FpGJUzvzw35540NMnQjD33K/nmle/I/rVZatg/Yy65JYvnXZz3VcOCyggGZtSkmZlT/3yR55sy58g3Z/ysezquXmnNo7NOzUHDRrePo3Ja9Zgjc8Y1TR3ltmblNWfkiGHTsqj5uTQvnJaD3joj99Yuf6nWeUymLlyfQaPPypyvfipjB3aMf9xF+eZ/D87fnzsjH580oRrQDDzp/PzHjZ/JmKH75Pmm2TnqTWfkC0/UGmvKF04/MiNqdXeMYLsvu1j3jvv5dRZNOSbHT1/YaVK5oui4N1Tqbb9Vq2HoiZl1x8LMnfWP1Rrax3N43jfr+ty+7JqcNap9Uej2fibksiW1eXwgl518cEZU7epu+xrwpvzDVy+vm6ueKmzNyvkX5IwPfjlN9WFd/aGDDsv49x6Zgaf/XUZ7IG+9jPcECBAgQIAAAQIECBD4sxJ4yZYtW7bsbMSV/2q/eu2anR1mPwEC2wi0ZdPKb2bufx2SKWdu7wG8lauIlmbuFV9LPnZDpo8etE0L7T88l1XzPpubh12Uy8b0cDtUD2fYRIAAAQIECBAgQIAAAQIvjsCOMpTaNRYvzsj0SqAfC7Q1fzf/NuePGf+P2wtgKsU3ZNDIv8344w7JfvsO6FmjcovV8lF551Gv6Hm/rQQIECBAgAABAgQIECDwZyEghPmzmCaD/LMTqDyU95ILsyCD8vKdDb4asrwih72mh5WXKo9n/vE9eeC4k3JEr65EtbNB2k+AAAECBAgQIECAAAECL1RgO//p/YU263wCJReoPZR3wwU5+6JnM/VvjsjfjB+dofWx56ZVaVzy/Sy98aGM+Pw/Z3S3kKVyq9J/5srZLZn0xeE7eCBvya2VT4AAAQIECBAgQIAAgT8TAc+E+TOZKMP8cxOoPBX/yny4/iHOPZVw8Ady1bXnZeLIykN/ezrn8Eya98VcNGZ/IUxPfrYRIECAAAECBAgQIECgjwns6JkwroTpY5NlOP1FYJ8MHXNB7loxLt9e8VB+9OWrclvn6lDJwJOm5ZKJJ+Qt21wdMyCDXnNgXjswWdlaWfXqM/nMWadnTDWg6S8u6iBAgAABAgQIECBAgEB5BVwJU965VzkBAgQIECBAgAABAgQIECCwlwV2dCVM/RMq9nK3miNAgAABAgQIECBAgAABAgQIEKgJCGFqEl4JECBAgAABAgQIECBAgAABAr0oIITpRVxNEyBAgAABAgQIECBAgAABAgRqAkKYmoRXAgQIECBAgAABAgQIECBAgEAvCghhehFX0wQIECBAgAABAgQIECBAgACBmoAQpibhlQABAgQIECBAgAABAgQIECDQiwJCmF7E1TQBAgQIECBAgAABAgQIECBAoCYghKlJeCVAgAABAgQIECBAgAABAgQI9KKAEKYXcTVNgAABAgQIECBAgAABAgQIEKgJCGFqEl4JECBAgAABAgQIECBAgAABAr0oIITpRVxNEyBAgAABAgQIECBAgAABAgRqAkKYmoRXAgQIECBAgAABAgQIECBAgEAvCghhehFX0wQIECBAgAABAgQIECBAgACBmoAQpibhlQABAgQIECBAgAABAgQIECDQiwJCmF7E1TQBAgQIECBAgAABAgQIECBAoCYghKlJeCVAgAABAgQIECBAgAABAgQI9KKAEKYXcTVNgAABAgQIECBAgAABAgQIEKgJCGFqEl4JECBAgAABAgQIECBAgAABAr0oIITpRVxNEyBAgAABAgQIECBAgAABAgRqAkKYmoRXAgQIECBAgAABAgQIECBAgEAvCghhehFX0wQIECBAgAABAgQIECBAgACBmoAQpibhlQABAgQIECBAgAABAgQIECDQiwJCmF7E1TQBAgQIECBAgAABAgQIECBAoCYghKlJeCVAgAABAgQIECBAgAABAgQI9KKAEKYXcTVNgAABAgQIECBAgAABAgQIEKgJCGFqEl4JECBAgAABAgQIECBAgAABAr0oIITpRVxNEyBAgAABAgQIECBAgAABAgRqAkKYmoRXAgQIECBAgAABAgQIECBAgEAvCghhehFX0wQIECBAgAABAgQIECBAgACBmoAQpibhlQABAgQIECBAgAABAgQIECDQiwJCmF7E1TQBAgQIECBAgAABAgQIECBAoCYghKlJeCVAgAABAgQIECBAgAABAgQI9KKAEKYXcTVNgAABAgQIECBAgAABAgQIEKgJCGFqEl4JECBAgAABAgQIECBAgAABAr0oIITpRVxNEyBAgAABAgQIECBAgAABAgRqAkKYmoRXAgQIECBAgAABAgQIECBAgEAvCghhehFX0wQIECBAgAABAgQIECBAgACBmoAQpibhlQCB7QhsTnPj5Rk/bHhGjLs8jc2bt3Ncl81t69N48cSMGHZoxl+8NM1tXfZv58e25qWZNe7QjBg2MbMa12fXTtvDMWYPz1Nbt9kzb11J9vCz5TPZFTLxfetm4vvWlcT3ratI/C7pTuJ3STcTv0u6kvhd0lVkj3+XdG/IljoBIUwdhrcECBAgQIAAAQIECBAgQIAAgd4SeMmWLVu27KzxEcOGZ/XaNTs7zH4CBAgQIECAAAECBAgQIECAQKkFdpShuBKm1B8NxRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKktYPAQIECBAgQIAAAQIECBAgUGoBIUypp1/xBAgQIECAAAECBAgQIECAQFECQpiipPVDgAABAgQIECBAgAABAgQIlFpACFPq6Vc8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKktYPAQIECBAgQIAAAQIECBAgUGoBIUypp1/xBAgQIECAAAECBAgQIECAQFECQpiipPVDgAABAgQIECBAgAABAgQIlFpACFPq6Vc8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKktYPAQIECBAgQIAAAQIECBAgUGoBIUypp1/xBAgQIECAAAECBAgQIECAQFECQpiipPVDgAABAgQIECBAgAABAgQIlFpACFPq6Vc8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqASFMqadf8QQIECBAgAABAgQIECBAgEBRAkKYoqT1Q4AAAQIECBAgQIAAAQIECJRaQAhT6ulXPAECBAgQIECAAAECBAgQIFCUgBCmKGn9ECBAgAABAgQIECBAgAABAqUWEMKUevoVT4AAAQIECBAgQIAAAQIECBQlIIQpSlo/BAgQIECAAAECBAgQIECAQKkFhDClnn7FEyBAgAABAgQIECBAgAABAkUJCGGKktYPAQIECBAgQIAAAQIECBAgUGoBIUypp1/xBAgQIECAAAECBAgQIECAQFECQpiipPVDgAABAgQIECBAgAABAgQIlFpACFPq6Vc8AQIECBAgQIAAAQIECBAgUJSAEKYoaf0QIECAAAECBAgQIECAAAECpRYQwpR6+hVPgAABAgQIECBAgAABAgQIFCUghClKWj8ECBAgQIAAAQIECBAgQIBAqQWEMKWefsUTIECAAAECBAgQIECAAAECRQkIYYqS1g8BAgQIECBAgAABAgQIECBQagEhTKmnX/EECBAgQIAAAQIECBAgQIBAUQJCmKKk9UOAAAECBAgQIECAAAECBAiUWkAIU+rpVzwBAgQIECBAgAABAgQIECBQlIAQpihp/RAgQIAAAQIECBAgQIAAAQKlFhDClHr6FU+AAAECBAgQIECAAAECBAgUJSCEKUpaPwQIECBAgAABAgQIECBAgECpBYQwpZ5+xRMgQIAAAQIECBAgQIAAAQJFCQhhipLWDwECBAgQIECAAAECBAgQIFBqgZds2bJly44ERgwbvqPd9hEgQIAAAQIECBAgQIAAAQIECHQRWL12TZctyU5DmG5n2ECAAAECBAgQIECAAAECBAgQILDbAm5H2m0yJxAgQIAAAQIECBAgQIAAAQIEdl9ACLP7Zs4gQIAAAQIECBAgQIAAAQIECOy2gBBmt8mcQIAAAQIECBAgzzWbOgAAAENJREFUQIAAAQIECBDYfQEhzO6bOYMAAQIECBAgQIAAAQIECBAgsNsCQpjdJnMCAQIECBAgQIAAAQIECBAgQGD3Bf5/EGIkp+UhRxoAAAAASUVORK5CYII=" alt></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 graph shows how the pressure <em>P</em> of a sample of a fixed mass of an ideal gas varies with volume <em>V.</em> The gas is taken through a cycle<strong> ABCD.</strong></p>
<p><strong><img src="data:image/png;base64,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" alt></strong></p>
<p> </p>
<p style="text-align: center;"><em>V / 10<sup>–6</sup> m<sup>3</sup></em></p>
<p style="text-align: left;">(i) Estimate the net work done during the cycle.</p>
<p style="text-align: left;">(ii) Explain whether the net work is done on the gas or by the gas.</p>
<p style="text-align: left;">(iii) Deduce, using the data from the graph, that the change <strong>C</strong> is isothermal.</p>
<p style="text-align: left;">(iv) Isothermal change <strong>A</strong> occurs at a temperature of 450 K. Calculate the temperature at which isothermal change <strong>C</strong> occurs.</p>
<p style="text-align: left;">(v) Describe the changes <strong>B</strong> and <strong>D</strong>.</p>
<div class="marks">[10]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>(Q)</em> energy transferred between two objects (at different temperatures);<br><em>(U)</em> (total) potential energy and (random) kinetic energy of the molecules/particles (of the gas);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) use of area within cycle;<br>each large square has work value of 250 (J);<br>estimate (16 x 250= )4000 (J); (allow 3600 − 4100)<br><em>Award <strong>[3]</strong> for same outcome with small squares of area 10 (J). </em></p>
<p>(ii) (work is done by the gas because) area under expansion is greater than that under compression/pressure during expansion is greater than during compression;</p>
<p>(iii) clear attempt to compare two <em>PV</em> values;<br>evaluate two <em>PV</em> values correctly <em>eg</em> 75 x 80= 6000 and 200 x 30= 6000; </p>
<p>(iv) use of <em>PV</em> =<em>nRT</em> or equivalent;<br>1350/1330 (K);</p>
<p>(v) both changes are isochoric/isovolumetric/constant volume changes;<br>B: temperature/internal energy increases, D: temperature/internal energy decreases;<br>B: thermal energy/heat input (to system), D: thermal energy/heat output (from system);<br>B: pressure increases, D: pressure decreases;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Few candidates were able to explain thermal energy was the energy transfer between two objects at different temperatures. Many knew the definition of internal energy but a high percentage omitted to mention the potential energy (probably assuming that the gas was ideal).</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) Many candidates appeared to attempt to calculate area without actually saying what they were doing; although this was obvious when they referred to the area of a square, in many case it was not obvious and marks were lost when the candidates technique produced an answer out of tolerance. In examples like this there will be a reasonable tolerance for the area and it is not expected that candidates will waste considerable time in counting the small squares.</p>
<p>(ii) Although some candidates were aware that a clockwise cycle applies to net work done by the gas, this does not explain the choice. Simply saying that the area under the expansion was greater than the area under the compression was all that was needed.</p>
<p>(iii) This part was mostly well done by candidates. It is accepted, in line with SL A1, that showing constancy of two PV values does not prove that the change is isothermal; however in terms of deducing that the change is isothermal this technique is fine – that is, the candidates are told that it is isothermal and they are simply illustrating that this is the case. Often examiners will expect three values to be taken in questions such as this.</p>
<p>(iv) This part was well done by those many candidates who used any appropriate variant of the ideal gas equation to calculate the temperature.</p>
<p>(v) The large majority of candidates did well here although a minority were deducted marks when they used contradictory statements such as isochoric and compression or expansion.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Gas in an engine</p>
<p>A fixed mass of an ideal gas is used as the working substance in an engine. The graph shows the variation with volume <em>V</em> of the pressure <em>P</em> of the fluid.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>For the cycle identify, with the letter I, an isochoric (isovolumetric) change.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The temperature at point X is 310 K. Calculate the temperature at point Y.</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>The shaded area WXYZ is 610 J. The total thermal energy transferred out of the gas in one cycle is 1.3 kJ.</p>
<p>(i) State what is represented by the shaded area WXYZ.</p>
<p>(ii) Determine the efficiency of cycle WXYZ.</p>
<p>(iii) Explain why the total thermal energy transferred out of the gas is degraded.</p>
<div class="marks">[5]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The work done on the gas during the adiabatic compression XY is 210 J. Determine the change in internal energy during the change from X to Y.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="font-size: 11.000000pt; font-family: 'Arial';">vertical line identified; <br></span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Do not penalize candidate who identifies both vertical lines.<br> Award </span><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';"><strong>[0]</strong> </span></em><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>if vertical and another line identified.</em> </span></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 12">
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<p><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>at point X:</em> \(nR = \frac{{1.42 \times 1 \times 100}}{{310}} = 0.4581\);</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>at point Y: \(T = \left( {\frac{{0.44 \times 5.2 \times 100}}{{0.4581}} = } \right)500{\rm{K}}\)<br></em></span></p>
<p><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Award </span><strong><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';">[2] </span></strong><span style="font-size: 11pt; font-family: 'Arial,Italic';">for a bald correct answer.<br> Must be clear what units are here, </span>º<span style="font-size: 11pt; font-family: 'Arial,Italic';">C unacceptable unless converted correctly. </span></em></p>
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<p><em><span style="font-size: 11pt; font-family: 'Arial,Italic';"> </span></em></p>
<div class="question_part_label">f.</div>
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<div class="question" style="padding-left: 20px;">
<p>(i) <span style="font-size: 11.000000pt; font-family: 'Arial';">(net) work done by engine in one cycle; } </span><em>(must imply “by engine” and “one cycle”)</em></p>
<p>(ii) <span style="font-size: 11.000000pt; font-family: 'Arial';">efficiency=</span><span style="font-size: 11.000000pt; font-family: 'Arial';">\(\frac{{610}}{{1300}}\);<br>0.47 </span><em><strong><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';">or </span></strong></em><span style="font-size: 11.000000pt; font-family: 'Arial';">47%; <br></span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Award </span><strong><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';">[2] </span></strong><span style="font-size: 11pt; font-family: 'Arial,Italic';">for a bald correct answer.<br></span><span style="font-size: 11pt; font-family: 'Arial,Italic';">Award </span><strong><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';">[1] </span></strong><span style="font-size: 11pt; font-family: 'Arial,Italic';">for </span><span style="font-size: 11pt; font-family: 'SymbolMT';">\(\frac{{610}}{{\left( {610 + 1300} \right)}}\)=</span><span style="font-size: 11pt; font-family: 'Arial,Italic';">0.32.</span><span style="font-size: 11pt; font-family: 'Arial,Italic';"><br>Award </span><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';"><strong>[0]</strong> </span><span style="font-size: 11pt; font-family: 'Arial,Italic';">for any fraction that would exceed 1 even if later fudged.<br>Award </span><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';"><strong>[0]</strong> </span><span style="font-size: 11pt; font-family: 'Arial,Italic';">for efficiency \(=\frac{{{T_C} - {T_H}}}{{{T_H}}}\)=</span></em><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>38%, question does not imply that this is a Carnot cycle.</em> </span></p>
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<div class="column"><span style="font-size: 11.000000pt; font-family: 'Arial';">(iii) it has gone to the surroundings / it is dissipated;<br>it cannot be used for further useful work; </span></div>
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<div class="question_part_label">g.</div>
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<div class="question" style="padding-left: 20px;">
<p><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';">Δ<em>Q </em>= </span><span style="font-size: 11.000000pt; font-family: 'Arial';">0;<br> 210 (J); </span><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>(do not accept negative sign)</em> </span></p>
<div class="question_part_label">h.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">h.</div>
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<br><hr><br><div class="specification">
<p><strong>Part 2</strong> Thermodynamic cycles</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A gas undergoes a thermodynamic cycle. The <em>P</em>–<em>V</em> diagram for the cycle is shown below.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAoIAAAISCAYAAABYlq5WAAAgAElEQVR4AeydC5xN5f7/P0eliKmD/y+lGJch19GUauigG1Edl/rJrYNy75RKpVySyDlCSLl2wkFKuR2VE8rohOI0jEhmBkMmHDM6xjQj/cz+v57FXrNm355nzzx777X2/uzXS/Ps9Tzr+/087++aPNbls37ncrlc4IcESIAESIAESIAESCDmCJSLuRlzwiRAAiRAAiRAAiRAAgYBLgR5IJAACZAACZAACZBAjBLgQjBGC89pkwAJkAAJkAAJkAAXgpE6BvIzkLL6A0zv3wljUnJ8qChCfsaXWLNyGgbeNBYpeUU+xnATCZAACZAACZAACZSewKWl35V7lppA0X4s6jMeW+IO4ItN5dGjt3ekooy/o9/ELaj8zUZ8iT+hp/cQbiEBEiABEiABEiCBMhHgGcEy4SvlzuUaoM+KJZgzchCa+glRLqEvPlwwEy+90MrPCG4mARIgARIgARIggbIR4EKwbPy4NwmQAAmQAAmQAAk4lgAXgo4tHYWTAAmQAAmQAAmQQNkIcCFYNn7cmwRIgARIgARIgAQcS4APizi2dBeE14uvHXAGLZJbBuxnJwmQAAmQAAmQQGwQWLZsqfdExSvm+IkMgfPpC1yda7V2jd500o+AQlf6gl6uug1fdm06fd7PGP+b69aK99/pcrk+/2JzwH7RKRsj61eJIcZ0794zoBZdeWRxZP2HDh1yTZ8+I+Ras7KOuMSfQB+ZVrGvjKuuPDItO3ftdv33v6cDTUeqVewsyyPr1xVDxlVXHtl8VOqnQ6tK/WRaVZjo0KpDR7i0quTRMR8dXHVoFf8PEMdSoI8OrSp5dHDdsGGjS/wJ9NGRR+X3XCWPP7a8NOy9NuYWEiABEiABEiABEogJAlwIxkSZOUkSIAESIAESIAES8CbAhaA3E24hARIgARIgARIggZggwIVgRMqcg5TRbVD/3nH4DkewrG8L1Ou0EBnWt8jlpWBMo4bo8MoWoODv6N+sKbos3A/rkIhIZ1ISIAESIAESIIGoIcCnhiNSympoO2EzMicESB7XFuO/P4TxAYawiwRIgARIgARIgATKQoBnBMtCj/uSAAmQAAmQAAmQgIMJcCHo4OJROgmQAAmQAAmQAAmUhcDvhP9NWQJwX/sSEGbT8xYssq9Ai7L58+ZiwMBBli32bJ48eRI7d6aiXbv29hToocopXIVsavUonqav5KoJpEcYcvUAoumrk7ju3bPHmHXjJk00zT60YQRbGkoHcn2Mwj4aSnsXVWa6KeunobQ3U7FFxk3FkNif2ak1oyyPrF9Fq0oMu2hVMZrVoVWlfircZGN0aJXlUDkGVMbo0KqSR8d87KJVxehZh1aVPDq40lA6tAtXRicBEiABEiABEiABEggxAd4jGGLADE8CJEACJEACJEACdiXAhaBdK0NdJEACJEACJEACJBBiAlwIhhgww5MACZAACZAACZCAXQlwIWjXylAXCZAACZAACZAACYSYABeCIQbM8CRAAiRAAiRAAiRgVwL0EbRrZTTooo+gBogeIegj6AFE41cn+YdRq8bCW0KRqwWGxia5aoRpCUUfQWGAxI+tCdBH0Ls8Mu8oWT99BL2Zii0ybio+dDr8w2Q6VLSqxLCLVvoIeh+PKvXTMUbHMaDreJTNxy5aVfz9dGhVySNjplIb+ghaVsVskgAJkAAJkAAJkAAJOI8A7xF0Xs2omARIgARIgARIgAS0EOBCUAtGBiEBEiABEiABEiAB5xHgQtB5NaNiEiABEiABEiABEtBC4FItURiEBKKWwDn8tHoE7luQiBWr+uKyqJ0nJxa9BFzISxmLO/r+HQU+J1kdjR/siHLXN0fbhDifI7iRBEggegnwjGD01pYz00Gg6BA2LFiPgrSN2HrgrI6IjEECYSbwO8S1HYfdWTvwTu+aQOJYrDt4CJlZ4s9+fLXySVydugT9O43Aov15YdbGdCRAApEmwIVgpCvA/DYmUIT8XRvxzR398L8Vd2L1lsMosrFaSiOB4AmUR/Wknnh0yMNoWvBPTF2cCi4Fg6fIPUjAyQRoKO3k6km001BaAkjafRq7Fy7GiXsfwTUb/oK3tjXDo6M6ovCHnWjXrr10bzsMoJFsaKrgTK7ieB6Ht7LaY+zL7VHDchqgKPszvDb6PZxo8wxe79scFUODTRrVmVyl04r4AHINTQloKO3t48ktNiNAQ2nvgshMRK3959MXuB4etcl12nXedXrTy66mtVq7nlyW6po+fYZ3YMsWawzL5hJN2RgVo2BZDJFQZs6qK49MCw2lS5Tf+CJjJgbJxqjUr/gYOOnaNKq1q+4fF7jSzxfrOX9su2vUn9q46jYc7Fr4w+niDktLpX4yrSrzKdZqSe7RlOWR9avoUBmjQ6tKHh3zsYtWFaNnHVpV8ujgGi2G0nxYJDT/UGBUxxM4iwNbMtGqa2fEoRzQuieGJ36EyVv24/p6jp8cJxDLBNLGoUOdcR4EqqLHwvHo04APi3iA4VcSiHoClosDUT9XTpAE1AnkfY2/r62H+5tffWGfcrXQsstNOLthIw7knVePw5EkYDcCXg+LTEOHZuexrO+DGLhwL/Ltppd6SIAEQkqAZwRDipfBnUmgCHmpm7Dm279jmdeZkyuwK+Na46ER/ivKmdWlaisB8bBIZ3QZ9gtueXMixr/yF6xo9Q76JFxhHcQ2CZBAFBPgQjCKi8uplZJAUQZWzbwUb+4+gLZxluVe0RHM7/MQJn1/BAeKgARLVykzcTcSsAeBcnGo1bQakPYjMrPzAS4E7VEXqiCBMBDgX2VhgMwUTiJw0TLmwW5obV0EiimUux7J97fCJTmZ9BR0UkmpVU6g6Feczj0H4AbUq1FJPp4jSIAEooYAF4JRU0pORAeBolO7MGXUalSNryoeEfH4lEPF6jfgavyE8U9NRcpx8RcnPyTgbAJFx1OxbfVijFmXhwZ9+qF9XV4WdnZFqZ4EgiPAS8PB8eLoKCZQlLEQrw2fgR/FHPu2wZ5XVmJF3wbmglD0P9H3LeSK/n3voP/t69Fj4QqMb1stiqlwas4n4PmKOR9PDddogzEzF6P9/Umo7v0vIOcj4AxIgAT8EqChtF80zu+gobT+Gp48eRI7d6bSUFo/WtD0NgRQAXINDVZyJVfQUNrD5JNf7UeAhtLeNZGZiMr6Dx06RENpb6xS42MVQ2IdRrKy+gnpsjGyfhHDLlqDM5T2UbiLm2RzVqmfLIYKe7twDZdWlTx24apDq4rRs45jQCWPDq7RYijNiwAh+ldN4LB5yEhZi1XTBuCW0Sl+3u15DsdT38OYDo1RLz4ZA9/chuN80W1grOx1BIFTp045QidFkgAJkEAsEOBCMOxVPouMhSPwlyXvYeyMjfD9uEER8lPn4vFRh3D3gp3IPLgCPXOn4PEZO2j2GvZ6MaFuAv/68kvc3fZOpKSk6A7NeCRAAiRAAkES4EIwSGBlH34FEvrOxrvzXsHwRD+vdi/KwIpx/0DSiEFoW708UO46tB3+JJLmz8CKjLNll8AIJBBhAoezsvDk0KFcEEa4DkxPAiRAAlwI2vAYKDqwDavTrinp5xXXBHd3PYHVWw4bb7Wwoeyol7R0yRIMHTIEc2fNwvBnn0V2dnbUzzmUEywsKIR1QXgq13geO5QpYyp2WloaHu/3GHZs24o/Pfooz8DGVPU5WRJQJ8CFoDqrMI08iwNbNuK7inVR65ryHjnP4btV24y3Wnh08GuICUz6618xcfwEpO/7Aed+/RVrVq5Cm1Z3ICMjI8SZoz+8e0F4MCOdZwg1lXv79u3o2e0RbN60yYi49V9fYciAgXhr5luaMjAMCZBAtBCgj6DtKpmP7MwfgYR7UKMS1+l2KI8487fk74vx66+/esnpcG87r2122yBshJzwcblcxhnC/n37OUEunMLVDfO3337D9KlT0bNXT1SpUsW9mT9JgARinAB9BCN1ABTtx6IuXTG16dv4akJbxJk6cpAy+iH0/64f1q3qa3mfre/tsr+MWiS3NCOzUToC/zlxHIcPHizdztyLBGxGoHGzRFS88kqbqaIcEiCBcBBYtmypVxqeEfRCEukNlVCj3g3AykPIzi9Cguf7bj3kZWYd8thS/FUsEn0V3T3ii01f4q47W7u/+vwpGyPrF0FVxvTo0SvkWlW0+NK6ceNGDO4/wCcfbiQBJxG4/PLLMWXqZCQkJJSQ7eu4tw7YlfYdasfXwlVXFf+T1dov2rIYKmNk/x9QiaFDh0oeHVpV8uiYj120nj6dh0NZh9E8samYus+PDq0qeXRw3bjxc2MO99xzt8+5iI068hw+bLzvCrVq3VCmPIKtrw8Xgr6oRHTbFajb6h40hccCrygXh787g6ZdklGXV4zDWqGkpCS/+fo89hjGvDymRL/dfvED/WNA1/9gZHO2LiTWrF6N4U8/U4KZ5xfB9Yk/P+F1CVOWR9Yv8sjGyPpFDB1/WankkY3xVz/xkIj7/kAr2ysqVMD1119v3cQ2CZBAjBPgksKGB0C5usnonLAVn6dajHfzjyEzoxE6t6plvvvWhtKjUpK4n+qdhQtQoWIFc36XXXYZklrcgueef87cxkbZCYgF4PbUb43FNe9jKz3PVyeMx+897gO8slIlzJ43FxUqFB/Hpc/APUmABKKFABeCdqxkuQQ8NPaPSJ00FynHzwFFPyFl6kykDhiGhxKusKPiqNfUtm1bbP7qK3Oejw3oj0V//zv/UjWJlK0hFoDNb2nBBWDZMJp716hRA19uKT5eOz/UFZu+3Ixbb73VHMMGCZAACQgCXAiG/TgoQl7KWDSrcx/GpxWgYEk/JMX3xqISRtHlUClpEP72alW8d1cD1KszBJ/XexF/G9YClcKulwndBKxnqOrXr89FoBtMGX5azwCKs6z86CNgPfP3hz/8wesyu75MjEQCJOBkArxHMOzVK4e4tuOwO2ucJHN5VG8xGPO+HywZx24ScB6BAYMHYcDAgVycOK90VEwCJBBlBLgQjLKCcjokYHcCnTp3Rie7i4wyfceOHY+yGXE6JEACugjw0rAukoxDAiRAAjYjUDO+lqHo6NEL9hM2k0c5JEACNiBAQ2kbFCFUEoSP4LwFi0IVXmvc+fPmYsDAQVpjhiLYwH59jLD9BgxEcstWoUihNaZTuIpJU6vW0hvBFi14F1u+3IxWrdugT7/H9CfQHJHHgGagF8ORa2i47t2zxwjcuEmT0CTQHFUcBz7txFz8RC2BurXiA87t8y82B+wXnbIxsn6VGGJM9+49A2rRlUcWR9YvmIo/SxYv9qtXFkOFSVbWEZf4E+ijkkfGVVcemZadu3a7/vvf04GmIz0GVLjJdOiKIeOqK49sPrL6jRo50jhexc9AH1kelfrJYqgwsQvXcGlVyWMXrjq0iv8HiGMp0EfHMaCSRwfXDRs2usSfQB8deWS/5yK/Sh5/bHlpWPOKm+Fig8C+fftiY6KcJQmQAAmQQFQT4EIwqsvLyekmUP2663SHZDwSIAESIAESiBgBLgQjhp6JnUgg0OvmnDgfaiYBEiABEohtAlwIxnb9OXsSIIEYIHAgMzMGZskpkgAJlIYAF4KlocZ9SIAESMABBFq0aGGo3PHNdgeopUQSIIFIEOBCMBLUmZMESIAESIAESIAEbECAC0EbFIESSIAESIAESIAESCASBGgoHQnqYcpJQ2n9oOfMegupO3bQoFc/WhpKh4Dptq1bsGD+PCPyW3PnoXz5y0OQRV9IGh/rY2mNRK5WGvraNJQO5KDIPlsQoKG0dxlkppuy/ief+LPUoFcWQ6iSjQm1gaibjK48svmoGBL7Mzt1a1XhJtOhK4ZdtMrqt3XrVuN4Ff8vSE9Pt6Is0ZZxU6mfLIYKe7twDZdWlTx24apDq4rRs45jQCWPDq40lNa3qGYkEnAcgfeXvuc4zRQcewSqVasWe5PmjEmABIIiwHsEg8LFwbFOoG69erGOgPMnARIgARKIIgJcCEZRMTmV0BOoeGXF0CdhBhIIAYGcnJwQRGVIEiABpxPgQtDpFaR+EiABEvBDICEhwez5z4kTZpsNEiABEnAT4ELQTYI/SYAESIAESIAESCDGCHAhGGMF53RJgARik8CxY8djc+KcNQmQQEAC9BEMiMfZnfQR1F+/z/65Dis+eN8IPHbCRNSoUUN/Eo0R6R+mEaYllJO4jnjuWfycm+sI70sncaVWyy+ExqaTuNJHUJgK8WNrAvQR9C6PzDtK1r9p0yapL5sshlAlGyPzh1OJIcbIPLl05ZHNR8WHTqZVZc4yHbpi2EWrSv1uSbq5zN6XKvXTwd4uXFWOEx1aVfLYhasOrSr+fjq4quTRwZU+ghr/BcBQJEACJEACoSFw+RVXGIG3btkSmgSMSgIk4GgCvEfQ0eWjeBIgARIITODyyy+8Vu5I1uHAA9lLAiQQkwS4EIzJsnPSOggUFBToCMMYJBA2AqdOnQpbLiYiARJwBgEuBJ1RJ6q0CYEKFy+zCTlZhw7ZRBVlkIB/ApUqVTY7c3NzzTYbJEACJCAIcCHI44AEgiBwTfXqQYzmUBIgARIgARKwNwEuBO1dH6ojARIggTIRcD8sIoJ8v3dvmWJxZxIggegjwIVg9NWUMyIBEiABk8All1xittkgARIgAU8CNJT2JBJF32korb+YJ0+exPixY3C2sJAGvZrxOslI1mlac0+exMHMDNsfs07jOmDgIM2/BaEJR66h4UpDaeEuyY+tCdBQ2rs8MhNRWf+hQ4dc93foGNCgVxZDqJKNUTEKlsUQeWTmrLryyLSoGBLLtKpwk+nQFcMuWlXqJ7SOGjmyTMesSv10sLcLV5XjRIdWlTx24apDq4rRsw6uKnl0cKWhdGgW2IzqJlB0HKmLR+P++NqoF5+MgdM2ICO/yN3LnyRAAiSgTOD6628wxr6/9D3lfTiQBEggNgjwHkFb1vm/SJ3xEub8fD/+dvAQMve8g1Z7X8ZDz/8DP3EtaJuKHcjMtI0WCiGBQASuvZZPuwfiwz4SiGUCXAjasPpFGasxfn5N9Ox7G6qLClVqjEdfHYE7Nk/D7C9zbKg4tiTFXXWVMeEd32yPrYlzto4lEF+7tqk9IyPDbLNBAiRAAlwI2u4YOIsDWzbiu4TaqFGpuDzlqjfEbQk5WLNxD/Jspzm2BFWuXGzQG1sz52ydSqBixYqmdL4Rx0TBBgmQAA2l7XgM5CM780dvYeWqolbTaij4LgsneHnYmw+3kAAJ+CVw/fXXm318I46Jgg0SIAEuBO14DFRCjXo3AGkbsfXAWS+BFZvG45riE4Ve/dwQegLly5c3k/Aym4mCDRsTqFChgqnu2LHjZpsNEiABEqCPoB2PgbwUjLm9H9a0HI8Pp/dEg0r/h+OpH+HtUVOw55FlWNG3gfluQOEVGOjTIrlloG72lYJAwS+/YO/uNGPPxs0SUfHKK0sRhbuQQHgJZKbvx8+5ufh91aqoV79BeJMzGwmQgC0ILFu21FuH8Abix24EzrvOpK93TXv8dsP7q+njb7hWLhjl6lirl2theqGyWPoIeqOSeUfJ+oWP4OjRY4y6CL7p6eleSWQxxA6yMSr+cLIYIo/Mk0tXHpkWFR86mVYVbjIdumLYRatK/dxaZ8+abRy3d7ZpIzCU+Mi4qdRPFkMklI1xay0hzuOLLIasX0WHyhgdWlXy6JiPXbSq+Pvp0KqSRwdX+gh6rym5RRuBcqiUcC+efmcbMrMOYfc7Q9AEWfixd390SbhCWxYGKh2B8pddZu7Id7eaKNiwOQG3hcyRrMMoLCy0uVrKIwESCBcB3m0WLtKlznMOx1Om4ukPbsPCF1sjrtRxuKMuAm77GF3xGIcEwkHAaiFz9OjRcKRkDhIgAQcQ4ELQtkUqQn7Gl1g17Qk8sKQqxi0YhCSLnYxtZVMYCZCALQlUq1bN1HX48GGzzQYJkEBsE+BC0Hb1L0Jeylg0i6+L5k+tR95NLyDlncG4pXrxk6q2kxyDgmrG1zJmvWPHjhicPafsRAI1atQwZZ84zieHTRhskECME7g0xudvw+mXQ1zbcdidNc6G2ijJTaBlq1YQ91rxQwJOItC+Ywd89uk67Nu3z0myqZUESCCEBHhGMIRwGTr6CfB9w9Ff42iaYXx8vDGdrVu2RNO0OBcSIIEyEOBCsAzwuGvsErj++huMyfN9w7F7DDhx5vXr1zdk88lhJ1aPmkkgNARoKB0arraIKsym5y1YZAstMhHz583FgIGDZMMi3n/y5Ens3JmKypUqYcH8eYYeOzN2ClcBklpDc3hbuWZnZ2Pc6JFGorETJsJ632BosgcX1ao1uD3DP5paQ8PcSVz37tljQGjcpEloYGiOKtjSUNrDmDTav9JQ2rvCMhNRWb8wlJ4+fYZr9apVpqn00aNHSySSxRCDZWNUjIJlMUQemTmrrjwyLSqGxDKtKtxkOnTFsItWlfpZtebm5prHrTiG3R8ZN5X6yWKosLdqdWvz/CnLI+tX0aEyRodWlTw65mMXrSpGzzq0quTRwZWG0ppXqgxHAk4i0KhxY1NuQUGB2WaDBOxMoEqVKnA/8Z6enm5nqdRGAiQQJgK8RzBMoJkmegnk5ORE7+Q4s6gjIJ54F5+srKyomxsnRAIkEDwBLgSDZ8Y9SADXX3+9SeE/J06YbTZIwO4EGjZsaEgUNjL8kAAJkAAXgjwGSKAUBCpUqFCKvbgLCUSeQJ26dU0RGRkZZpsNEiCB2CTAhWBs1p2z1kDAfa8V3y6iASZDhI1AzZo1zVx81ZyJgg0SiFkCXAjGbOk58bIScN9rVdY43J8EwknAahmTmZEZztTMRQIkYEMCXAjasCiU5CwCfEuDs+pFtUD3Xj0NDJtTNhEHCZBAjBOgoXQUHwA0lNZfXLehdLt27bFt6xbbm0o7yZyVWvUfryKiL67WY/etufNQvvzloUkeZFRfWoMMEbbh1Boa1E7iSkNpT5dPfrcdARpKe5dEZiIq63cbSovI/kylZTHEvrIxKkbBshgij8ycVVcemRYVQ2KZVhVuMh26YthFq0r9fGndtWuXaSydnp4uPR5V6qeDvS+tombWjyyPrF/E0jFGh1YVLdGkVcXoWQdXlTw6uNJQOjT/GGBUEnAMAZpKO6ZUFOpB4IYbLrwrW2z+fu9ej15+JQESiCUCvEcwlqrNuYaMAE2lQ4aWgUNAQLxhpMVttxqR+dR7CAAzJAk4iAAXgg4qFqXai0BCQoIpiKbSJgo2HEIg6eabDaV82MkhBaNMEggRAS4EQwSWYWOLwLFjx2Nrwpyt4wnclJRkzOFI1mHwjLbjy8kJkECpCXAhWGp03JEEim04jh79kThIwFEE3K+aE6J/PHLYUdoplgRIQB8BLgT1sWSkGCbAy2sxXHyHTt1qLP3TTz85dBaUTQIkUFYC9BEsK0Eb708fQf3FsfoIiuhWP7Z5CxbpT1jGiE7y5KLWMhbbz+6BuC5a8C62fLkZdeol4MVRo/1ECN/mQFrDp0ItE7WqcQp2lJO40kfQauzEti0J0EfQuywy7yhZv9VHUET35SUoiyH2k41R8YeTxRB5ZJ5cuvLItKj40Mm0qnCT6dAVwy5aVeoXSKv1+M3NzRV4fH5U6qeDfSCtbmGyPLJ+EUfHGB1aVbREk1YVfz8dXFXy6OBKH8Fgl/kcTwJRSIBeglFY1BiakvX43b9/fwzNnFMlARJwE+A9gm4S/EkCpSBQsWJFcy8a85oo2HAIAasFUtquNIeopkwSIAGdBLgQ1EmTsWKOgPWG+/z8/JibPyfsfALde/U0JrE5ZZPzJ8MZkAAJBE2AC8GgkXEHEihJwP2Ghn379pXs4DcScACBFi1aGCp3fLMdp06dcoBiSiQBEtBJgAtBnTQZKyYJ1K1Xz5j3gczMmJw/J+1sAtb7BFNTU509GaonARIImgAXgkEj4w4kUJKA25hXnFHhhwScRkDcJ1i1WjVD9k4uBJ1WPuolgTIT4EKwzAgZINYJVKpUyUSQnZ1tttkgAacQSLp4eXjdp586RTJ1kgAJaCJAQ2lNIO0YhobS+qviaSgtMojF37jRI41kYydMhPUBEv0KgovoJHNWag2utqqjVbjuTP0Ws2e+aYScOHkqql08Q6iaQ9c4Fa26cpU1DrWWlaDv/Z3ElYbSbndP/rQtARpKe5dGZiIq6/c0lBYZhBGvYC3+CINeWQyxj2yMilGwLIbIIzNn1ZVHpkXFkFimVYWbTIeuGHbRqlI/Fa0fLF9R4hgWnKwflfrpYK+iVZZH1i/mpWOMDq0qWqJJq4rRsw6uKnl0cKWhtO/FPLfqIpCfgS+mDUCz+NoQZ/aa9Z+JLzLydEVnHI0EqlSpYkY7duy42WaDBJxCQJwBdD/9vn79eqfIpk4SIAENBHiPoAaI2kMUHcGa5/+Ep/e2wYd7DiAzaz/W987D1E5TkZJXpD0dA5adQPuOHYwgR4/+WPZgjEACESDQpu2dRtbPPl2HwsLCCChgShIggUgQ4EIwEtQlOYsOfIGF68qjU+/70KCSKFF5VG/9MLolbMXnqfT5kuCLSHd8fLyR9/2l70UkP5OSQFkJJLdMNkPs2rXLbLNBAiQQ3QS4ELRhfctdE48mFXOQuvMQzHdV5B9D5pGWuDup+DKkDaXHrKT69eubcz937lezzQYJOIWA9Rjm6+acUjXqJIGyE+BCsOwM9UeIa44uA27E/hlP4dmFe5Ff9BNSpm/C/8wbgtZxLJl+4GWPGF+7thnk5Mkcs80GCTiFQIUKFeB+3dzyD953imzqJAESKCMBrirKCDA0u1+NpGFv4/1nm+DrVx5A8zov4HCPl/Bki+pgwUJDvKxRrXYb/znBB0bKypP7R4ZA2zsv3Cd4JOuwYYsUGRXMSgIkEE4CXFeEk3YwucpVxFU1m+OxYY+gAbZg/FNTkXL8XDARODaMBKzegT///HMYMzMVCegjkJSUZAZL2bTJbLNBAmeFD8IAACAASURBVCQQvQRoKG3L2uZh/8LxmHX1k5jWuSZw/HO82u8pLMFgLP/wCSQZD5BcEC6sZQJ9WiS3DNTNPo0Efvh+L86cPo3fV62KevUbaIzMUCQQPgJ70nahsKAAFSpWRJPE5uFLzEwkQAIhJ7Bs2VLvHFbTULbtQeB8+gJX51q9XAvTC4sFndnumnbfTa7OC35wnS/eGrBFQ2lvPDITUVm/L0Npd5bXJ00yTXnd2/z9lOVRMQqWxRC5ZeasuvLItKgYEsu0ivnI8sj6dcWwi1aV+gWrdcnixeZxLMzSxUelfjrYB6vVEOfxHx06REhZHB1aVfLIdKjEsItWFaNnHVpV8ujgSkNp7zUlt2ghUIT87EM44BmrUm00v7mq51Z+txEB61OXp07R5sdGpaGUIAi47xMUu6SmpgaxJ4eSAAk4kQDvEbRd1coh7pYH8FjDnZg66SPszxcG0kXI3/9PvPdJE/RtV5sPjNiuZhcEWZ8czs3NtalKyiKBwATE/a4142sZg1atXBl4MHtJgAQcT4ALQTuWsFILPLVgIV6o/iHub1IX9eLrouXkn9F9+Th0uq68HRVTEwDrk8Pf791LJiTgWALdHuluaBdvGeHZbceWkcJJQInApUqjOCjsBMpVb4HeE9ag94Swp2bCUhKwPjmcnp5eyijcjQQiT8D6lhFxebja/7sm8qKogARIICQEeEYwJFgZNFYJuA15s7KyYhUB5x0FBBITE83Lw7SRiYKCcgokEIAAF4IB4LCLBIIlcP31Nxi7iEtq/JCAkwm4Lw+L92fn5Z128lSonQRIIAAB+ggGgOP0LuExOG/BIkdMY/68uRgwcJDttZ48eRI7d6aiXbv2PrXuTP0Ws2e+afSNnTAR1svFPncI8UancBUYqDU0B0NpuR48eAB/Hf+qIWrIk0/hpqSbQyPQErW0Wi0hwtak1tCgdhLXvXv2GBAaN2kSGhiaowq29BH08JuK9q/0EfSusMw7StYfyEdQZEtPTzc92DZs2OAt4OIWWR4VfzhZDJFK5smlK49Mi4oPnUyrmI8sj6xfVwy7aFWpX1m03tmmjXE89+jewyW82QJ9dLAvi1a3Nh06VI4THVpV8uiYj120qvj76dCqkkcHV/oIal6pMhwJRAOBhIQEcxonjvOdwyYMNhxJwH15ePu2beCrEx1ZQoomASkB3iMoRcQBJBAcgcSL72vdt29fcDtyNAnYjID16eG0tDSbqaMcEiABHQS4ENRBkTFIwEIgvnYd45u4yZ4fEnAyAevTw5+sXevkqVA7CZCAHwJcCPoBw80kUFoCVapUMXfNzs4222yQgBMJuC8Pf7FxI82lnVhAaiYBCQEuBCWA2E0CwRKoWSve3OXIkSNmmw0ScCKBB//4oCl73aefmm02SIAEooMAF4LRUUfOwkYErJYxBw8csJEySiGB4AmI47lBo0bGjh/z8nDwALkHCdicABeCNi8Q5TmTQPuOHQzhW7dudeYEqJoELATu+MMfjG87vtmOjIwMSw+bJEACTidAQ2mnVzCAfhpKB4BTyi6ZobQ77Ccfr8WaFR8ZXyNp6u0kc1ZqdR89en/q4HrmzBkMf+rPhrBODz2M+x8ovlysU60OrTr1BIpFrYHolL7PSVxpKO127+RP2xKgobR3aWQmorJ+maG0yChiCDNpwV/8ESbTnh9ZHhWjYFkMkVNmzqorj0wLDaU9jwC5ObbYQ8ZVpX6yY0Alj6jfgMf7G8ezMJn29ZFpVcmjQ6sOHeHSqpJHx3x0cNWhVcXoWYdWlTw6uNJQuvQLfu5JAlFPoFatWuYcDx8+bLbZIAGnEuj2yCOG9CNZh7Ft2zanToO6SYAEPAjwHkEPIPxKAjoIWN8wkpmRqSMkY5BARAk0bdbMzP/Jxx+bbTZIgAScTYALQWfXj+ptTKB7r56Gus0pm2ysktJIQI3AFVdcgedGjDAGC7P0U6dOqe3IUSRAArYmwIWgrctDcU4m0LBhQ0O+eNKysLDQyVOhdhIwCNx9z90miX99+aXZZoMESMC5BLgQdG7tqNzmBOrUrWsqTE9PN9tskIBTCYhbHlrcdqsh//1ly5w6DeomARKwEOBC0AKDTRLQSaBBgwZmuKxDh8w2GyTgZALde/Qw5Isz3WlpaU6eCrWTAAkAoI9gFB8G9BHUX1xVH0F35r++NgEHMzPQqnUb9On3mHtz2H46yZOLWkNzWOjmavUUvLdDB/xvt+7ahOvWqk2Yj0DU6gOKhk1O4kofQWEqxI+tCdBH0Ls8Mu8oWb+qj6A78+uTJpl+gu5t4qcsj4o/nCyGyCPz5NKVR6aFPoLW6l9oy5jpOk5kx4BKHs/6WY/r3NxcY0I65qNDqw4dKkx0aFXJo2M+dtGq4u+nQ6tKHh1c6SOoYeXPECQQ7QRuSkoyp8hXc5ko2HA4gXbt25sz4EMjJgo2SMCRBHiPoCPLRtFOIeB+cljopbG0U6pGnTICiYmJfGhEBon9JOAQAlwIOqRQlOlMAjVq1DCF70xNNdtskIDTCVgfGuGbRpxeTeqPZQJcCMZy9Tn3sBBwG0uv+/TTsORjEhIIBwHr5WG+aSQcxJmDBEJDgAvB0HBlVBIwCbRo0cJoi3e0Zmdnm9vZIAEnE6hQoUKJN43k5OQ4eTrUTgIxS4ALwZgtPSceLgKNGjc2U+3bt89ss0ECTidgfdPIN19vc/p0qJ8EYpIAF4IxWXZOOpwExNsY3B/eJ+gmwZ/RQEAc2+07djCmsmbFR3yVYjQUlXOIOQI0lI7iktNQWn9xgzWUditYtOBdbPlyM+rUS8CLo0a7N4f8p5PMWak1NIdDqLnu+34vpk1+3RDfb8BAJLdsVeqJhFprqYX52JFafUDRsMlJXGkobViI8j92JkBDae/qyExEZf3BGkq7Faxetco0lhYGvLI8uoyeZeasuvLI5uNpSOzmYv0p0yrGyvLI+nXFsItWlfrp0CqrX/du3YzjW/wM9JHVR4dWWQ6VY0BljA6tKnl0zMcuWlWMnnVoVcmjgysNpTWs/BmCBGKFgPU+wf3798fKtDnPGCFAK5kYKTSnGZUEeI+gLcuag5TRbSAu7Xr96bQQGUW2FE1RAQhY7xP86l//CjCSXSTgPAJWK5klixc7bwJUTAIxTIALQTsWP28PPl95xIeyimjaJRl1WTUfbOy/iX6C9q8RFZaOgLCS6fTQw8bOn326DnydYuk4ci8SiAQBLikiQT1gziLkpe5F+VlbkJ51CJnmnx14p/fd6NyqFli0gABt22n1E6Tnmm3LRGGlJNC6TVtzz0ULF5ptNkiABOxNgGsK29Xn/1BQ40E80/a6Egu+ooyPMeO7JLSse4XtFFOQGgHrfYI/HjmsthNHkYBDCFSuXBmDhg4x1L6/9D2cOnXKIcopkwRimwAXgrarf3lUT6iJSiV0ncWBLd/g2n538bJwCS7O+mK9TzAzM8NZ4qmWBBQIdO7SxRy1/IPlZpsNEiAB+xLgQtC+tSlWVnQYW9deh253XV/iLGHxALacQsB9xmTDunVOkUydJKBMQPxjx30v7JRJk3hWUJkcB5JA5AjQUDpy7JUzF2UsxCOL4vG3CW0R57GXeKo40KdFcstA3ewLM4HcnBwczEg3sjZuloiKV14ZZgVMRwKhJXAmLw8/7N1jJKleowZuqFkrtAkZnQRIQJnAsmVLvccGMv9knx0IFLrSFzzpGr3pZNBiaCjtjUxmIirrL62htFvJ0aNHTWNpYTLt76NiFCzTKmLLzFl15ZFpkRkSq2gVY2R5ZP26Ysi46sojm49K/XRoVamfVavbYFr8P6igoEDgMD7WMe5t1p86tMpyiHw6xujQqqIlmrSqGD3r4KqSRwdXGkp7rym5JRQEjMvC/w93J1UJRXTGDDOBGjVqoMVttxpZ169fH+bsTEcC4SHw1NNPm4nWf/aZ2WaDBEjAfgR4j6D9alJCUdGBbfi44R+QFMdSlQDj4C9t2t5pqBd+a4WFhQ6eCaWTgG8CycnJ5j94ZkyfzuPcNyZuJQFbEODqwhZl8CdCPC2cihvvaeJ1b6C/Pbjd/gQSmyeaInft2mW22SCBaCLgPit4JOsweFYwmirLuUQbAS4E7VxRcVn4mwbocgsvC9u5TMFqa968ublL2q40s80GCUQTAZ4VjKZqci7RTIALQTtXt1wD9Jn9BJIqsUx2LlOw2sTruBKTkozdln/wfrC7czwJOIYAzwo6plQUGsMEuMKI4eJz6pEjkHTzLUZycdksOzs7ckKYmQRCSMDzrOC5c7+GMBtDkwAJlIYAfQRLQ80h+wiPwXkLFjlC7fx5czFg4CDbaz158iR27kxFu3bty6RVvGt45PPDjRj9BgxEcstWZYrnb2encBX6qdVfFcu2PdJc932/F9Mmv25MQnasR1prMKSpNRha6mOdxHXvngt+mY2bNFGfYARHCrb0EbQaVsVAmz6C3kWWeUfJ+svqI+hWJPLc2aaN4Sk4dMgQ92bzp4o/nEyrCCbz5NKVR6ZFxYdOplXMR5ZH1q8rhl20qtRPh1aV+gVi7/YVvPXmW0r4CpoH/MWGDq2BdLjz6RijQ6uu41E2H7toVfH306FVJY+MmUpt6CMYwVUtU5NANBDo9kh3YxrCRubUqVPRMCXOgQR8EnDfKyjerMMniH0i4kYSiBgB3iMYMfRMHOsEklsmmwj2799vttkggWgj4HmvIP/hE20V5nycTIALQSdXj9odTaB+/fqm/q/+9S+zzQYJRCMB91lB8YDU8g+WR+MUOScScCQBLgQdWTaKjgYCwkZm0NAhxlTmzpodDVPiHEjALwFxVrBOvQSjf8qkSV63Q4i37BT88ovf/dlBAiQQGgJcCIaGK6OSgBKBmy76CYrBaWk0l1aCxkGOJdCtRw9Tu/usoFgAfrh8OVredjuyj/5o9rNBAiQQHgKXhicNs5AACfgikGRZCG7bug2JicWvn/M1nttIwMkE6tSpi+69euL9pe9BnBWsHFcZ785/B//5zwkUFhSi8lVXOXl61E4CjiTAM4KOLBtFRwuBKlWqoH3HDsZ0+JaRaKkq5xGIQJ++fc3ucS+PxeGsLGMRKDa6XC6zjw0SIIHwEKChdHg4RyQLDaX1Y9dlKG1VtjP1W8ye+aaxaeLkqahWrZq1u0xtJ5mzUmuZSu13ZztxPXPmDNb+YzU2f/EFXEVFXporVKyIGW87435ZO3H1AumxgVo9gGj6SkNptzMnf9qWAA2lvUsjMxGV9es0lHarO3r0qGEsLeq1ZPFiY7OKUbBMqwgkM2fVlUemRcWQWKZVzEeWR9avK4ZdtKrUT4dWlfoFYl9QUGAc241vbGge6+J49/zTpGEj4/gP9J9AeVTqq2uMDq4qWmTzVYlhF60qRs86tKrk0cGVhtKaVtQMQwKxTqBGjRpocdutBoaP166NdRycfxQSeOrPT2Lc2LE4W1gYcHaFBQUB+9lJAiSgnwDvEdTPlBFJIGgCDzz4oLHPjm+2Izs7O+j9uQMJ2JnAm2/NRNeHH8Zl5cvbWSa1kUBMEuBCMCbLzknbjUDbO+80JaVs2mS22SCBaCAgPDP/OmkSnnp2OK66+upomBLnQAJRQ4ALwagpJSfiZAK8POzk6lG7KoEGDW7Ehi8+R/uOHSEeDOGHBEgg8gS4EIx8DaiABAwC1svDx48fJxUSiEoCwjLp7VlvY9Lk132eHRQG0/yQAAmEjwAXguFjzUwkEJCA9fLwN19vCziWnSTgdAId77/fPDtY7pJLzOls2bLFbLNBAiQQegL0EQw944hloI+gfvSh8BG0qvzraxNwMDPDeCfri6NGW7tK1aZ/WKmwSXciVymioAb8c92nWLn8A2Of+jfeiOdGvBTU/pEYzGMgNNSdxJU+gsK8iB9bE6CPoHd5ZN5Rsv5Q+AhaVQofQbe32tdfb7d2ebVlWsUOMk8uFR86lTyyMSo+dDKtYj6yPLJ+XTHsolWlfjq0qtSvrOynTplqHvsbNmzwOt7dG2R5ZP0qx4DKGB1cVfLomI9dtKr4++nQqpJHB1f6CIbmHwOMSgIxTYCXh2O6/DE9+SFDh+Cyyy4zGEycMAG8VzCmDwdOPowEeI9gGGEzFQnICFifHv7i889lw9lPAlFDQFjMXHfDDcZ8jmQdxqKFi6JmbpwICdiZABeCdq4OtcUkAffTw3t276a5dEweAbE76f+5prr5lp0pkyYhIyMjdmFw5iQQJgJcCIYJNNOQgCoB6+VhmkurUuO4aCHw6oQJ5lSmT5tmttkgARIIDQEuBEPDlVFJoNQExOXhJs2aGfv/7Z13Sh2HO5KAEwkkJCTguREjDOmffboOGzdudOI0qJkEHEOAC0HHlIpCY4lAt0e6G9MV90qlpaXF0tQ5VxJAn759UDO+lkFCPDhy6tQpUiEBEggRAS4EQwSWYUmgLASaNGli7r5tK82lTRhsxAQB8eDIyNEXfDTFP4Z4Zjwmys5JRogADaUjBD4caWkorZ9yqA2lrYrfnjkDaampqFqtGsa9NhHly19u7VZqO8mclVqVShr0ICdzXbTgXWz5crMx5xfHvIw6deoGPf9Q7eBkrqFioiOuk7jSUNrt7smftiVAQ2nv0shMRGX9oTaUdisWRsErV642DXa3bt3q7jJ/yrSKgTJzVhVDYpU8sjEqhsQyrWI+sjyyfl0x7KJVpX46tKrUTwd7T61Hjx41fwfubNPGVVBQEJZjQOU48dQq9vH86GCiI4ZdtKoYPevQqpJHB1caSutY+jMGCZCAXwKNGjUy+z75+GOzzQYJxAoB8eDU1OkXnhwWl4hXrlgRK1PnPEkgbAR4j2DYUJc20TkcT/0nVk0bgGbxtdFsdAryShuK+zmKwBVXXGE+Pfn+0vd4w7yjqkexugi0a9/e9BYcO3oMvTV1gWUcErhIgAtBOx8KRcfx7zefQLveK3C41qNYsecAdk9oizg7a6Y2rQSSWyab8VJTU802GyQQKwTEgyNWb8HFCxfw9XOxUnzOMywEuBAMC+bSJPkvUmc8gcd234x3v3gbT3dtjYRKLFdpSDp5n8TERNNG42/z5zt5KtROAqUmILwFx00Yb+x/MDODl4hLTZI7koA3Aa4svJnYYEsR8lMXY8z8mhj/6mO4pXp5G2iihEgReLx/fyP1jm+285VbkSoC80acQNeHHipxiZivn4t4SSggSghwIWjHQhZlYMW4BUDXpij64Anj3sB6jQZg+ucZyLejXmoKKYEOHTua8T/f+LnZZoMEYomA5yXil0eP5iXiWDoAONeQEeBCMGRoSx+46MA2rE67AUkNmiJ52HzszkrDJy9cincffxHvpP639IG5pyMJVKlSBe07djC0L//gff7l58gqUrQOAuIScffejxqhxBlyPkWsgypjxDoBGkrb7ggoQl7KONwxFHjz67FoG3dxrV60H4u6dMV4PI91q/oi4eJmYRod6NMiuWWgbvY5hMB/f/4ZGT/sM9Qm3NgQV//+9w5RTpkkoJfA+fPnsW/PdygsKDACN26WiIpXXqk3CaORQJQSWLZsqffMPA0w+T3SBApd6Qt6ueo2fNm16fR5ixh/2y1DPJo0lPYAosGQOJyG0sIs2P0RRrrCUFfUdOiQIcZmFUNUmTmriiGxSh7ZGBVDYplWMWlZHlm/rhh20apSPx1aVeqng72q1vT0dNNounu3bobRtPt3RYcOleNEVatbl7+fMr2yfidpVTF61sFVJY8OrjSU9l5TcosWAuVxTXxdVCw4gMMnznlHTKiNGnx62JtLlG8R90d1e6S7McvPPl1HL7UorzenF5iA9SlicYl40cJFgXdgLwmQgF8CvEfQL5pIdZRDXNKd6FTxAL7Z+x8UmTLykZ15Ak27JKMuq2ZSiaXGg3980Jzu2n+sNdtskEAsErA+RTxl0iSkpaXFIgbOmQTKTIBLijIjDEGAuJYYMvF2fDXyL1i8X7xH5ByO7/gI7333R4x5OAEsWgiYOyCkeN1Wi9tuNZSKh0bOnfvVAaopkQRCQ0CcJZ/yxhtm8GeGDeODVCYNNkhAnQDXFOqswjiyPK7rPA4rZjbCli6JqBd/Ex5fE4fBcwchiZeFw1gH+6V6fMAAQ5R47+qBzEz7CaQiEggjAc93Eb82YUIYszMVCUQHAS4EbVvHOCTc/STmfX8ImVl78cmEnkiisbRtqxUuYa1atTLfNPLF5xvDlZZ5SMC2BDp17mzaK4l3cu9M/da2WimMBOxIgAtBO1aFmkjADwHrQyNpqal8aMQPJ26OLQLjJ0ww/4E0e+ab/L2IrfJztmUkQB/BMgK08+7CY3DeAmc8TTd/3lwMGDjIzjgNbSdPnsTOnalo1659xLTm5ORg5PPDjfydHnoY9z9Q/BCJpyincBW6qdWzenq+xwrXfd/vxbTJrxvQ6tRLwLPPP4/y5S/XA9FHlFjh6mPqId3kJK579+wxWDRu0iSkTHQFF2zpI+jPyClKt9NH0LuwMu8oWX+kfAQ9ZyK8BEV9xR/hMejvI/PkUvGhkzERuWVjVHzoZFpV8sh06IphF60q9dOhVaV+OtiXVevsWbPN3wvR9vexg1a3NpkWWb/KMV1Wrrq0qvj76dCqkkcHV/oI6lqiMg4JkEDQBHo/euE1W2LHLVu2BL0/dyCBaCTQp28fiLOB4iMsZbZt2xaN0+ScSEArAd4jqBUng5FAeAgkJyejarVqRrK/zZ8fnqTMQgI2JyDuoe0/aLCpctRLL/F+QZMGGyTgm0CULwTPImNhb4h75erFt8GYlBzfFLiVBBxI4N77OhiqxZsVaKbrwAJSckgIVKtWDXPeufCPI2GzNPG11+gvGBLSDBotBKJ7IZj3NZYe6o/ULGHBshnj2144gxItxeM8YptAi1tvMwF8uHy52WaDBGKdwD333INBQ4cYGMQrGfkKulg/Ijj/QASieCF4Dj99sQYrFz2BHqPfQ+pxH+/tDUSGfSRgcwKVK1c2/7IT/mmnTp2yuWLKI4HwEfjzk0+ab+IR9wtu3EjfzfDRZyYnEYjihaB4O8c07N6zGsOrbkLffnORml/85l4nFYlaScAfgc5duphdyz/gWUETBhsxT8D9Crqa8bUMFoP7D+D9gjF/VBCALwKhWQjmfYmZi/fDFsuuSgm465m/4M2bU7Dq3zxj4usg4DbnEkhISDDfqiDeP1xYWOjcyVA5CWgmIF5B99pf/mJGfbRXL/6OmDTYIIELBDwMpf8Px1c/izueXuuDT3XcNWwEBvfoKHnVWRHyUhbiHzV6onfCFT7iqG7KQ0bKZuzZ+Q+8ltsLX0xoizjPXYuOI3XpWxgzZin2V7wHwxaNxxMtqsN7dSseGnkBf49/2bxPsChjIR66dxy+84wJMc9n0fOB9mib4JXRa7SdN9BQWn917GAo7Tkrq5FuvwEDkdyylTnESeas1GqWTWuDXIFPPl6LNSs+Mri2at0Gffo9VmbG5FpmhD4DOIlrFBtKn3ed3vSyq2mteNfNb3zr+s1wkvzVdWz7bNeAhvGuuve96fr2zHm3v6SPnyddm2Ysd6UHGuJjr5KbCl3pCwa7+j3e3dDRdNQm1+mSA1wu18+ub9/o7ur48kbXsfMu1/ljG11j7+vumvbtz14jjb4/vuradNpTlMjTy1X3jwsu6j3vOpO+yjX6vkauug0Huxb+4J3VK7iNN9BQ2rs4MhNRWb9dDKXFzKxau3frZhjpip/Wj8ycVcWQ2JrHGtvalo1RMSSWaRX5ZHlk/bpi2EWrSv10aFWpnw72OrT602E1YR81aoz18PXZ9hfHPViHVl3Ho1O0qhg96+CqkkfGTKU2MWAoXRMdbqqJS401e3lUb9Ebgwc0BPZ9FPgSa973+O73zVDX+7Scz9W/741XIKHvbLw77xUMT6zoc0hRxmqMn18fzw+/E9XLAeWq34lnR9THu+NWI0Ncky46gjVD7sX9Hdqg+ejv0XrKMLSNk4kqh0oJnTHuzefRtOCfmLo4FXk+s3MjCdiLQPcePQxBwkqGJrr2qg3V2IOA9X3E7y9ZzN8Te5SFKmxAwMfKqACZO3egoGJb3J1UxSLxLPJyf7F899UsQl5qJn5/ey0fl2d9jS/ttrM4sGUjvkuojRqV3FMoh7ikO9EpYyO2HjgLlKuJTrM34JN1m7H7nSdxVxCXectdE48mFYGC77JwwhY3OpaWE/eLFQLt2reH+6b4N6dPj5Vpc54koEygSpUqmGsxX6fZtDI6DoxyAu5VVPE0i7LxXcphoMQiCyj66SssX3kE8FogFu8KnELq7sq4ra6fewOPrcTjfRbhB8+nd4uy8cXIXhjxhaLhc9FhbF21ExWbxuMarxnsxOoth8v0oErRiSzsKUBxfHEv4uLRuN8wpq6Neh3GYk0GzxVaK892ZAmIJyS7PdLdECHOCmZkZERWELOTgA0JiIerFi97z1AmzKb58IgNi0RJYSfgtYwqOrANq9MKihdBOIfjqavx5suTsL6gGXrPGoTW/i6xyi4LX/sAJvTJwrAnFlsWg//Ft2+8gEX1XsKYuxQNn/OPITMDqFvvWlTSgSzjG2y9uLArOr4Nb0+ai++QhMe6NkccziLj78+h79ZbMP/gIWTu+RhjaqzH8OdWXrgErSM/Y5CABgLdHulmRlm0cKHZZoMESKCYgHg9Y6eHHjY2iMXgc8OH80niYjxsxSABj4VgEfKzD+EAquN2rEEP4wxYA9zRdQFy7xiD5V9/iFfaXufnsq/KZeHyuPaul7BQLAaHrUZ2UR5+ePdFjDzVF3/t20TPoq40RSz4J8a3TzReRVf/9p6Yj26YuvJtPJV0dXG0qlfDuApdqS5a3lG3eDtbJGATAuLS13MjRhhqhME0zwrapDCUYTsC9z/woGm7xDeP2K48FBRmAheeBTGTnkLqxhQUVGyHni+MRdsJ08weeePiZeHWfi4LmwHEYvAZzMh6Ab3vnonyySOxcMK94OOUmwAAIABJREFUuNZjSWoO99WodC3qJQBrMo8hHw28bWV87RNoW+JYrFvVFwk+NYgHV5Zgt3Fm9J/4fPMKjJ2xBUi8J1BE9pFARAjcfc/dEG9REJ/PN34eEQ1MSgJOIDBl6lScys2FuJVC/M5ce211dOrc2QnSqZEEtBIoufT5vyPY9ckRr/sDlTLKLgsrBVEcVK4WWna5yWvwhXv7bkLnVnofVhGXi2f274yXN5/GZW1G4sNXin3avERwAwlEkIC4B6p7r56GAvGX22+//RZBNUxNAvYl4PnmkeFPP8Mnie1bLioLIYEShtIXTJYnA6+sxIq+DfxcAvalJhgT6XPIXvkCHvv3/Vg44TacXvgChmU+5PusYNF+LOrSFVObvo2vPAylDa2dDmHY12Mv2sIIDeNwx7TaWOH37J6ndmE03R8dVt3j/4ygoaEHVndZdpGJwj6eaSL0nYbS+sHb0VDac5bZ2dkYN3qksbl6jRp4dcJEzyG2/O4kI1lqDc0hFAmuBw8ewF/Hv2pOaOLkqahWTX6/eiS0miKDbFBrkMAUh0efofT5w67Vg2931a3VwTXt2zNuz0zFn6om0r+6fvr8FVe7Py107TNNqU+79v1tmOuxv33n8sp6/gfXwj82cpXVUNr/JIQpddfAJtmnN7lGN2zk6vjGdkPf+WPbXYtH/dFVt+HLrs+/3+rafKDQf/gI99BQ2rsAMhNRWb9dDaU9Zzpq5EjDYFocA7m5uZ7d5ncVQ2IZExFMNkbFkFiHkaxMh4pWlRh20apSPx1aVeqnwk02RodWWQ5fx8DWrVvN35c727RxHT16VHpM69DqS4vYZv2UZj7W/UXbLlpVjJ51aFXJo4NrVBlK/1/qNNxSpw2GrzsOYB/e6nobuiwM4l3BqpeFj32M0YviMePtR3Gj6f8Xhxv7Po9emX/BeNM+RpzdG4tmde7D+LQCFCzph6T43liUcdayTr8aScOmYVzV99GuTm3U77cJ9V6bVvIBD8toz6Y4o9gl/iZ0m5EK7HsD3Zo09T3nuJZ4YlZPYEY3NG80AG/ujcNd9zRHxYJd2LS/CpLqyO6J9MzM7yQQegL3P/CAmWT5B8vNNhskQALeBMSTxO4HrcSTxBNfew3nzv3qPZBbSCAKCRgPi1ya9Az+nfVM6acX1xpPPqqw+7Vd8bdFPsaVq4G7Ji7FXWZXOcS1HYfdWePMLT4b5arjlqfmY/dTPnsDbiyX0BersvoGHHOhszyqtx2FT7JGWcYKbZavbJKAzQiIv9ha3HareSN8n759IO6J4ocESMA3gcFDBhsd4t5a8STx8eMn0Kb1Hfy98Y2LW6OIQMmHRaJoYpwKCcQ6gaeeftpEsP6zz8w2GyRAAr4JiH8wte/YwehMS03FWzNn+h7IrSQQRQS4EIyiYnIqJGAlIM4KVqh44V3dM6ZPp2muFQ7bJOCDgPEk8dSp5mJw7qzZmDN7jo+R3EQC0UOAC8HoqSVnQgJeBK6vWcvYJu574llBLzzcQAJeBMRicPyECah68clhcamYi0EvTNwQRQS4EIyiYnIqJOBJ4Orf/964V1Bs51lBTzr8TgK+CYi39Awf8RJqxl/4h5RYDG7bts33YG4lAYcTKOEj6PC5UL4HAfoIegDR8NUJPoLWaQr/sDvuuAPTJr9ubO43YCCSW9rTEJ1eZ9bK6WuTa+lZ5uTkYOqkvyA3J8cI8szzL6Bho8ZGm1xLzzXQnk7iGn0+gp7GQ/zueAL0EfQuocw7StbvFB9B98zdnlzdu3UzfNKER1pBQYG726XiQydjIoLJxqj40Lm1muJ8NGR5ZP0qWlVi2EWrSv10aFWpnwo32RgdWmU5VI4B6xirx6D4f6r4Lj46tFrzGEF9/EfHfOyiVcXfT4dWlTw6uEaVj2Cg1Tn7SIAEnE/A/QQx7xV0fi05g/ASEA9dLV72npn00R49eZnYpMFGNBDgPYJ2rmJeCsY0qg1xiffCH09TbTuLpzY7EXD7CgpN4p2qp06dspM8aiEBWxPwtRgs+OUXW2umOBJQJcCFoCqpsI87h5++WIM1BZbEifegZV2+ycRChM0gCLjPCopd5s+bH8SeHEoCJOC5GEzf9z3Ee735IQGnE+BC0K4VzE/D8gVV8ObuA8jMOnThz5q+SGDF7Fox2+uynhWcP2cO1q5da3vNFEgCdiIgfoemTp9mSPrtt9/waK9eXAzaqUDUUioCXFaUCluodypC3r8/xrtp72Py6wuxJiUD+aFOyfgxQeDFkSPNeT739DOYM3u2+Z0NEiABOYFOnTuXeC8xF4NyZhxhbwJcCNqxPkUZWDXtIxSgAPuXjMfwvp3xyOjVyMgvsqNaanIQgcTERFPt+fPnsXrFR3jyiaG8Z9CkwgYJyAmI9xJXr1HDGCgewOJiUM6MI+xLgAtBO9amXAP0WbMXmQe3YfnMMejRENi/ZBSenv8tzwzasV4O1iQub32/Zw/uvetuZGRkOHgmlE4C4SVwQ81aPDMYXuTMFiICNJQOEVitYYt+Qsq4Iej/YXO88/VYtI0rXr+Lp4kDfVoktwzUzb4YJLBj21afs/7d736HGjVr4trrLpzp8DmIG0mABEoQ+PHIYRy/+NDIZZddhvi69SDe6MMPCdiRwLJlS71l+fCv5CY7Eji9yTW6YWvX6E0nldXRUNoblcxEVNbvVENpKwlxXPj706h+A9fQIUNLmE7LmIjYsjEqhsQ6jGRlOlS0qsSwi1YaSluP7AttlfrpGGM9BmbPml3id8ptOq0jj44YVq3exPRxk2lVMXrWoVUlj0yroCIbQ0Np7zUlt4SSQKVrUS+hDurVqBTKLIwd4wR+/fVXfPbpp3igQ0c+DRnjxwKnr05A3DNI02l1XhxpLwLF1xjtpYtqPAnkH8Oh5n3QJYE+gp5o+F0/gcNZWfjg/ff1B2ZEEohSAp4+g+INJPu+3xuls+W0ookAF4I2rGbR8VR8vDYVxy8+JFx0fBtmvr4TbYe0RJwN9VJSdBEYMHgQtqd+i2eHD4+uiXE2JBBiAp6LwWmTX8ea1atDnJXhSaBsBLgQLBu/EO39M/4961HcUac26jUagDe3/ob7XhyGttXLhygfw5IAUKlyJXy5dQtGvPgiqlSpQiQkQAKlIOC5GBSvdJwze04pInEXEggPAS4Ew8M5qCzlqt+NV9btvfA2ke/n4+murZFQiaUKCiIHKxGoeOWVuKddO2Ns/pl87Ni+XWk/DiIBEvBPQCwG121Yj6rVqhmDpkyaZCwGCwsL/e/EHhKIEAGuLiIEnmlJIJIEKsfFYdyE8fhw5Sq8NGo0Wtx2qyFHnL04depUJKUxNwlEBYGEhAQMH/ESasbXMuYjFoPPDR8OLgajorxRNQn6CEZVOUtORngMzluwqORGm36bP28uBgwcZFN1xbJOnjyJnTtT0a5d++KNNm754rpt6xbcfMstKF/+clP5wYMH8Nfxrxrf7+3QAf/brbvZF66GL63hyh1sHmoNlpja+GjkmpOTgw+WLUVaaqoBITEpCY/06IVqF88WqpEp26ho5Fo2Inr23rtnjxGocZMmegKGOIo4Dugj6M9AKUq300fQu7AyXyhZfzT4CFqpWH3oRo0caXqhpaenm8NkTMRA2Rj6CJo4zYaMmQpXa/3MwB4NHb5sKvXTMR8dWnXoUGEfjNaCggLX0CFDzN+vO9u0cR09etSolEyvrF+3Vo/Dp8RXmRZZv4q/XzBcS4izfFHJI9MqwsnG0EcwxCtXhicBEggvgSFDh5oJp0+bZrbZIAESKBuBChUqYMrUqRg0dIgRSLyfuE2rO7Bt27ayBebeJKCBAO8R1ACRIUggGgjUqFHDfHfqZ5+uw8aNG6NhWpwDCdiCgFgMPv/CC+bvmBAlvAbFrRr8kEAkCXAhGEn6zE0CNiPQp28f8+b2iRMm8MZ2m9WHcpxPwPMtJAvmz8Pk11/n75rzS+vYGXAh6NjSUTgJ6CcgzloMe/ppI7C4fLVyxQr9SRiRBGKcgNtexv1E8dxZs40nivnEfowfGBGaPheCEQLPtCRgVwKdOnc27WTGjh4D8dQjPyRAAnoJCHuZxUuXQjxFLD7idoyHu3ZFRkaG3kSMRgISAlwISgCxmwRikcCrEyaY0/5k7T/MNhskQAL6CIj7cgcMGlziIZIO97bja+n0IWYkBQJcCCpA4hASiDUC4myF+wnHLV9u5tONsXYAcL5hIyD8PMVDJFOnFz+pL4zded9g2EoQ84loKB3FhwANpfUXNxoMpVWpnDlzBhNffQW5OTnGq7LGvTaxhAm1ahzVcTS9VSUV3DhyDY6X6uhQcBXG7vNnzzJ+54SOOvUS0H/Q4DKbT4dCqyqnYMc5SSsNpS3mjWzakwANpb3rIjMIlfVHs6G0Ny2Xa/WqVaYJ7uxZs30NMbbJuKkYEuswkpXpEGJlY2T9IoZdtNJQ2vuQVKmfjjE6jgFfx2Nubm4J82nx//ENGzZ4T9SyRTafUGm1SDCaMh0qRs86tKrkkWkVE5KNoaF0sMt8jicBEnAcAfHgiPtmdvGuVN7I7rgSUrDDCFSpUgVvz5plvAvcLX1w/wEYPWoULWbcQPhTKwHeI6gVJ4ORQPQR6Nz1YXNSfOOIiYINEggpgV69e2PFmtXGbRki0ftL38P9HTogLS0tpHkZPPYIcCEYezXnjEkgKAKebxxZs3p1UPtzMAmQQOkIJCYmYuTLr6B9xw5GAOHt+VCnzli6ZAnPDpYOKffyQYALQR9QuIkESKAkAesbR2ZMnw4a35bkw28kECoClStXNi4VW58qFv6ej/Xty1s1QgU9xuJyIRhjBed0SaA0BMQbR6bNmGHsKs5KvDF1amnCcB8SIIFSEhD3627e8pVp9r7jm+0QnoPi7OC5c7+WMip3IwGAC0EeBSRAAkoExGWq7r16GmPF/UobN25U2o+DSIAE9BAQt2m8u3BhiQdJxNnBNyZP5tlBPYhjMgoXgjFZdk6aBEpH4Nnhw+F+P+rECRN4n1LpMHIvEig1AXF2XjxIsm7DevPs4MHMDOPs4JzZc/g7WWqysbsjDaWjuPY0lNZf3FgylPZHb2fqt5g9802j+94OHfC/3br7GxrUdicZyVJrUKVVHkyuyqiMgeKS8Ff/+hfeX7LY3LFqtWr4U7/H0LBRY3MbuZootDZoKO3pJMnvtiNAQ2nvksgMQmX9sWYoLQj6YjJq5EjTaHrXrl0+x1jp01DaSuNC2xdXz1GyMTSU9iTm+3j1HCXjKsbLxugwPlbJI9MhYvx98XteJtTid/To0aPG1O2iVcXoWYdWlTwqXGVjaCitdV3NYCRAAk4iMGToUFPuM8OG8WZ1kwYbJBB+AuLeQWFCLZ4sdt+6Ie7jbdPqDuNhkvPnz4dfFDM6hgDvEXRMqSiUBOxDQPzF47azEE8Rr1m9yj7iqIQEYpSAeLL4o5UrMWjoEJOAeJjku52poP+niYQNDwJcCHoA4VcSIAE1AuIvHbfR7YZ16/jGAzVsHEUCISUgXlH3/AsvlHiY5LfffsPwp59Bj0cewbZt20Kan8GdR4ALQefVjIpJwDYERo4aZWoRl4gLCwvN72yQAAlEjkBCQgKWffABFi97D5dddpkhRHgPPtqjp7Eg5KvqIlcbu2XmQtBuFaEeEnAQAc9LxG/NnOkg9ZRKAtFPIDk5GU1vSipx/6BYEIpX1Y0eNYpn8qP/EJDOkAtBKSIOIAESCERAXCJOTEoyhsydNZuXngLBYh8JRIDAJZdcAvF7+sm6dXhuxAhTgXigRCwIxSXjfd/vNbezEVsE6CMYxfWmj6D+4tJH0DfTM2fOYOKrryA3JwfCx2zky69AvCM1mA+9zoKhpT6WXNVZBTPSyVzF7+uXm1OwZsVHJaZcp14C2nfogMZNmqB8+ctL9IXri5O40kfQcCfif+xMgD6C3tWR+ULJ+ukj6M1UbBHcNmzYYHoLCg8z64c+glYaF9qyY02Mko2hj2BouKqw1+F3p5JHdgyoxPCnNTc317Vk8WLXnW3amL+74u8N8V1sF/3Wj0yLrF/F38+f1mB0qOSRaVXhSh/BcP3zgHlIgAQcQeCee+4p8S5i2lU4omwUGcMExBPG4nV14pJxvwEDTQ9CYQklbGduTbrZuI/Qzk8aFx1Pxccrp2Fgo9oQV8HqxXfCa++txw85vyBj7QZkFMVwgRWnznsEFUFFdFjREawZ0gZdFu4Hj+mIVoLJJQRGjR5t/mUi7Cqys7Mle7CbBEgg0gTE+4uTW7bCFykpxlPGblsooUvcRyieNL6rbVt88vFaZGRkRFruxfzncHzHHAy+6wn843BtDP5iPzKzDiEz60P0b/wbUmc/gQ7v8P8/KsXiQlCFUkTHnMNP/5iGMetyIqqCyUlAhYD4C2XajBnm0ImvvUZLGZMGGyRgfwLiKWPxlpLNW74yHixxv6nEMI5f8RE63NvOeLhk6ZIlEX3iuOinT/Fqn5nIHvAm3nimM5Kql78ItzyuSbwfPZ97Hn/Gj8jO5+kT2VF3qWwA+yNJoAj5qfPxyteX4/aKwMlISmFuElAkkJiYaPwFMmXSJHz26Tq0bNkSjZsmKu7NYSRAAnYgIKyhBg8ZjD59+2DXrl345OOPjbODQpuwnxF/xEcsFDt07Ig7/vAHiIdQyvI5deoUCn75xTjrWLVqVYhL174/p/HlrGlYj4fxzuM3o5KvQRUa4rHhcdjlq4/bShDgGcESOGz2Jf9bvDMLGPzUvbjGZtIohwQCERB/ebS47VZjiLjXKCM9PdBw9pEACdiUgHHZODkZE157DVPffAtz3plvvlFISBZnCoVtlLh8PPypPxtnC+fMnoONGzcGdRl53ty5xj2Je3enGWcdxf2JKSkpPqkUZX+NGUuOAAm1UaOSv2VMOcS17ojWcf76fYaOyY08I2jbsv8XqfOXA0NHIanSLvBNrrYtFIX5ICD+8pjyxhvGS+9F97Qpk9GixS246qo4H6O5iQRIwAkEhCXUXXe2hngwTJy9279/P77617+MhaBbv/VsoXubuOcwPj4e119/A347fx5XVrwCFStWhDjrKD7iLSfTpkx1Dzd/PjFoMFZ/vBbiLSnFnyKczTmGAwAqNo3HNVznFaMpZYsLwVKCC+1u4pLwUsxBN7yRdDWQF9psjE4CoSAg/icvzh4M7j8A/zlxAhMnTMC8d+aHIhVjkgAJhJmAuGwr7icUf8S7jcVDJMuXf4TCgnzzErJbkrhFpDSfX3/9FStXrMCIF18sze7cR5EADaUVQYV1WP4OzJx8HA+NfRDXiX/t5KVgzO1PYM8LK7GibwNY/wEkHpcP9GmR3DJQN/tIIOQEMtP34+fcXCNPrTp18D/XVA95TiYgARKILIGzZ8/ibGEhCgsK8Msv+cjPy8Nvv/0WtKjKV12FGxs1LrGf65ej+G73EZyr2gDN61cFz2iVwBPwy7JlS737rSaNbNuBwM+ub2dMdq3O/rVYzOlNrtENG7k6L/jBdb54q7RFQ2lvRDITUVk/DaW9mYotgbgVFBS4km+9zTSsTU9P9xlEh5FsIB3upLIxsn4Rxy5aaSjtrmrxT5X66Rij4xgQqmVaZP0qMeyiVRg9f7Z+o0v8P2Dr1q2u1atWGX/69elj/v9B/L1l/SOMrT0/n29c4lr4x0auug1fdm067f23Ig2lPYld+O7vOLCeXPJeJXJL+Ank7cKqOW9jeMsGF80xa6Nes35YVlCA7165D/Xje2NRxtnw62JGEiglAXG/4Eujx5h7DxowgJYyJg02SCC2CPzP//yPcc+fuKQs3n8s/ox/7TWfEK66+mrjiWSvznI10OWZh1Gx4CNM/tu3yPcaIDb8huOp3yCD9jE+6Vg3ciFopWGHdlxbjP9emGJa/uxegB4VK6LpK/9EetYS9Em4wg5KqYEElAncULMmxk+caIwXTxk+N3y48r4cSAIkEN0ExP3E6zas95rkPz752I+FTDnEtR2OD19pjR9n9MUjoxciJcNyM/0vB/DtJ+vxzZUNkeD3qWKvdDG7gQvBmC09J04C4SXQ8f77zVfQiZvHhSEtPyRAAiQgCJR8MvgCE/dTxb4JxaFB3xlYv3IyumEV+t+bWPyKuTUHcOVt7dCpAV0KfLMruZX3WJbkwW8kQAIhJCBeQbd1yxbDe0z4CzZp2hTCgJofEiABEgieQHlUT+qIPuLPhOK9T5/Ow6Gsw8Ub2ApIgGcEA+KxSadxuXgvVnk8MWwTdZRBAsoExP2Ci5cWP7X2zLBhfB+xMj0OJAESIAH9BLgQ1M+UEUmABAIQcPsLiiHifkG+jzgALHaRAAmQQIgJ0EcwxIAjGV54DM5bsCiSEpRzz583FwMGDlIeH6mBJ0+exM6dqWjXrn2kJASV185cP/l4Ldas+MiYT6eHHsZPP/3kiGNACLYzV88DhFo9iej5Tq56OFqjDOzXx/rV9n9/7d2zx9DbuEmTErrt+kUcs/QR9G2tE7Vb6SPoXVqZJ5esnz6C3kzFFhm3nbt2u4S3l/Uj/AWHDhlieobde087a7fPtiyPrF8ElY2R9YsY/vy4rKJlcWT9KlrpI2glfqGtg6sKex3HgEoeHfOxi1aZv5/VPzDQ318yJrI8KtxVxmzYsNEl/gT6yLSq5FH5PVfJ4+844KVhuy7dqYsEopyAuF9w5KhRqBlfy5jpwYz0oF5SH+V4OD0SIAESCAsBLgTDgplJSIAEfBEQ9wtOmzHD7BJm0+Jl9vyQAAmQAAmEhwAXguHhzCwkQAJ+CAj7mKnTpxm94uGRMaNH880jflhxMwmQAAnoJsCFoG6ijEcCJBA0AfGaqf93zTXGfsJs+q2ZM4OOwR1IgARIgASCJ8CFYPDMuAcJkEAICNxQKx7tO3YwIs+dNZtvHgkBY4YkARIgAU8CXAh6EuF3EiCBiBC45JJLMH7CBPPhEfHmkW3btkVEC5OSAAmQQKwQ4EIwVirNeZKAAwhUqVKlxJtHHu3Rk28ecUDdKJEESMC5BGgo7dzaSZXTUFqKKOgBNJQOGpnyDlaD3n3f78W0ya8b+1atVg0jX34FlStXVo4V6oFWraHOVdb41FpWgr73J1ffXMqylYbSZaEn31ccszSUDuT6GIV9gQw5VUwsVcaomFiqjPFndOkui0oMHWNkMWgo7a5IyZ8ybr4MpUtG8DZpXrJ4sWk2LYynhQG1LI+sX+SUjZH1ixiy41VXHpkWFaNZHVpV6ifTqsJEh1YdOsKlVSWPjvno4KpDq8zomYbSgrL3R+X3XOU48XccXCpfQ3IECZAACYSfQK/evXHmTD6mTJoE8SSx+Dz0v93DL4QZSYAESCCKCfAewSguLqdGAk4n0KdvH/NJYrEYFO8n5ocESIAESEAfAS4E9bFkJBIgAc0ExGvopkydiha33WpEXrPiI6xZvVpzFoYjARIggdglwIVg7NaeMycBRxAwFoNvvGHaygx/+hnayjiichRJAiTgBAJcCDqhStRIAjFOQLyTePHSpSYFYSuTlpZmfmeDBEiABEigdAS4ECwdN+5FAiQQZgJiMfjM8y+YWZ8ZNowegyYNNkiABEigdAS4ECwdN+5FAiQQAQINGzXG4mXvGZmPZB3Go716cTEYgTowJQmQQPQQoKF09NTSayY0lPZCUuYNNJQuM0K/AYIx6BVPD4sHR8RHGE6Pe20iype/3G9s3R3BaNWdO9h41BosMbXx5KrGKZhRNJQOhlbwY8UxS0Npb5/GqN5CQ2nv8spMN2X9NJT2Ziq2yLipGBL7Mzu1ZrTmmT1rdtCG0yparTmsua3tYLVa93W3VfLIxqgYzerQqlI/mVYxb9kYHVplOVR0qIzRoVUlj4752EUrDaVFxb0/shqr/J7LYois/o4DGkoHv6jmHiRAAjYgMHjIYJw5k4e5s2abhtMPdupiA2WUQAIkQALOIcB7BJ1TKyolARLwIPDnJ58sYTg9f+4cFBYWeoziVxIgARIgAX8EuBD0R4bbSYAEbE/AbTjdvmMHQ2taairemjnT9ropkARIgATsQoALQbtUgjpIgARKRcBzMSguFc+ZPadUsbgTCZAACcQaAS4EY63inC8JRCEB92KwTr0EY3ZTJk3iYjAK68wpkQAJ6CfAhaB+poxIAiQQAQJiMdh/0GDzVXRcDEagCExJAiTgOAL0EXRcydQF00dQnZXqSPoIqpIKfpwuX7acnBxMnfQX5ObkGCI6PfQw7n/gweAFBdhDl9YAKbR1Uas2lCUCkWsJHFq+0EdQC0a/QcQxSx9Bb/ueqN5CH0Hv8sq8lmT99BH0Ziq2yLip+ND587iyZpTlcfcfPXrUdWebNqbPoPAcdH/cY9zfPX/K+sV4nVo981u/y7So+Ivp0KpSP5lWMS/ZGB1aZTlUdKiM0aFVJY+O+dhFK30ERcW9P7Iaq/yey2KIrP6OA14a9rt2ZgcJkIBTCYj3Ei9eupSXiZ1aQOomARIIGwEuBMOGOshERcfx7zcHoFl8bdSL74Qxq/cjP8gQHE4CsUyAi8FYrj7nTgIkoEqAC0FVUmEd91+k/WMr0O1t7M7aj68+7IATIwdiUsqFe57CKoXJSMDBBHwtBsV7ivkhARIgARK4QIALQRseCUUH9+H0rQ/glurlAZRH9RYPo2dXYM3GPcizoV5KIgE7E/BcDK5Z8RGtZexcMGojARIIKwEuBMOKWy1ZuTrJaH2dWARe/BTl4vB31+Gxrs0R597GnyRAAsoEPBeDtJZRRseBJEACUU6AC0FbF7gI+RkpWPTy2zj0zFQ8lXS1rdVSHAnYmYB7MVi1WjVDJheDdq4WtZEACYSLABeC4SIddJ4cpIy+E83v7YfxSz7Hjo3bcSC/KOgo3IEESKCYgFgMDh/xUomniSe//joKCwuLB7FFAiRAAjFEgIbSdi920XGkLn0LY8YsxY8dpuGfb3fGdZbluzCNDvRpkdwyUDf7SCAmCZw9exZZBw/gzOn5K4FJAAAgAElEQVTTxvwrX3UVEhrciEsuuSQmeXDSJGAHAju2bS0hg39/lcCh5QsNpb19HB2ypdCVvqCXq27Dl12bTp9X1kxDaW9UMtNNWT8Npb2Zii0ybiqGxP7MTq0ZZXlk/VatBQUFrqFDhpim06IttqnECLdWKwNrW8VoVodWlfqpcJON0aFVlsN6DFhZerZlcXRoVdEi06ESwy5aaSjteZRd+C6rscrvuSyGyOTvOLhUyxKTQUJM4ArUbXUPmuJQiPMwPAnEDgHxbuIpU6caE/7s03UQf8Sn3X33xw4EzpQESCDmCXAh6IhDoAj52YfwY5ubUL+S5bqwI7RTJAnYl4CvxeC/t+/ALTc3h7ifkB8SIAESiHYCXFXYrsLn8NPqZ9Csw2gsST0O8XhI0fFNeGPaz3jy6btK3B9oO+kURAIOJOBeDD43YoShPjcnB4/26oXs7GwHzoaSSYAESCA4AlwIBscrDKMvRVzDm3H74aV4pWsy6scnY/CyM/jj3Cno04AugmEoAFPEIAGxGBw8ZDDci8EjWYeNxeC2bdtikAanTAIkEEsEeGnYdtUuh0oNemPe971tp4yCSCDaCYjF4NHsn/D+ksUwFoM9emLxsveQnJwc7VPn/EiABGKUAM8IxmjhOW0SIAHfBO66+x5j8efufbRHTyxdssT9lT9JgARIIKoIcCEYVeXkZEiABHQQEGcAxZnAmvG1jHBjR48x3k9M42kddBmDBEjATgRoKG2namjWIsym5y1YpDlqaMLNnzcXAwYOCk1wjVFPnjyJnTtT0a5de41RQxfKKVwFATtqzcnJwdRJf4F4gER8EpOSMGDQYCxauNARx6tduRowffzHjseAD5nGJmr1R6b02wf261NiZ7v//bV3zx5Db+MmTUrotusXcczSUNq3l2PUbqWhtHdpZaabsn4aSnszFVtk3FQMif2ZnVozyvLI+lW0esY4evRoCePp7t26uTp37mqV5bPtGcdzkKxfRauK0awOrir10zEfHVp16FBhr0OrSh4d87GLVhpKe/5f4MJ3WY1Vfs9lMUQmf8cBHxax69KdukiABGxBQPgJWo2nd3yzHZdddhkyMjKQkJBgC40UQQIkQAKlJcB7BEtLjvuRAAnEDAFhL/P2rFmmvcxvv/2GDve2A+1lYuYQ4ERJIGoJcCEYtaXlxEiABHQTEPYyU6dPM8OKJ4rnzJ5jfmeDBEiABJxGgAtBp1WMekmABCJKoFPnzki4saH5RPGUSZPwxNCh4BPFES0Lk5MACZSSABeCpQTH3UiABGKXwNW//z0WL11qLgY/+3QdHuvbl6+li91DgjMnAccS4ELQsaWjcBIggUgSEA+RfLJuHdp37GDIEA+RiHcU877BSFaFuZ1CQJxBFw9cWf94arf2iTY/oSFAH8HQcLVFVPoI6i8DfQT1M3VHdLIv2ycfr8WaFR+5p4LuvR+FeEOJHT5O5moHfv40kKs/MurbR734Ak6eOKG0Q8MmTfDM8OeVxoZrEH0EfdvhcKuNCNBH0LsYMq8lWT99BL2Zii0ybio+dP48rqwZZXlk/SpaVWL40rp161aX+J1z//nTo31cBQUFVvkl2ip5ZGNU/MV8aS0hRFP9ZFpV2OvQqkNHuLSq5NExHx1cdWj19BHctGmT68b/3969wEVR7v8D/xx+HTMOUqbneCtFAT2mgmKWqC/FUsvsBGqRmR3RvGSno5lZHoXUA1ZaiZfynlfSLl6gLE9Kif3zlrqK12Ah0cTwp5ghP7zk2f2/ntFZdtllZ1hml9ndz75e687OM/M833k/AzzO5Tth4ZafGflnp+KnWCY3N1eEIL2UTCq2I69n/alUh1hWaZlt2zLN4u3spVSHmnbU/Jyraaey/YCnhj31Xwe2QwEK+LSAeCzdjp3fW64b3PndDvTr21c69eXTG86No4CLAjExMWjcpIni2l26dWPOTkUl1xfgQNB1O65JAQpQwEZAvm5w0LODpfmnC05J+QYzMzNtluMXClDgpkDStKlSgvbKPETy9kmT/1VZMedrIMCBoAaIrIICFKCALCCST6fMmCFdJyjPe2HESLwzaxZTzMgg/KTALQGlo4I8Guj+XYUDQfcbswUKUMAPBcTNIhsy0i2nihcvWMgUM364H3CTlQUqOyrIo4HKdloswYGgFoqsgwIUoIADgcjISKzfuNEmxUyPrt3AU8UOsDjLbwUqOyrIo4Ge2SU4EPSMM1uhAAX8VODuu++WnlM8PSXZIiBOFa9asZynii0inPB3AXFUsOKL1wZWFHHPdw4E3ePKWilAAQrYCDw7ZIjNqWLeVWzDwy9+LiCOClZ8hYeHV5zF724QYEJpN6DqpUomlNa+J5hQWntTuUZ/SdB7+fJlrF65HNkGg7zpbk1A7S+uFkwPTdBVe+hRw4baVLpkxSqb73r7woTSzjIoskwXAiIpp7OXmgSUSssolYv21SxTWaJLOX41dWixjFIdTCgt94jtp5KbPySUthVR3u9TUt60SaT74pgx5jNnzthUo+SqJtGs0s+WaFCpHTX9p1SHmna0iFWLODwVq5p2tNgeLVy1iFUp0XPFRNKiTUcvJROldkSdSnWoWYYJpfU2NGc8FKAABbxIILpLV2zZthWdHnxAivrrr7aAN5J4UQcyVAr4iACvEfSRjuRmUIAC3icgroFavnIlRr84xhK8uJEkccoUXLx40TKPExSgAAXcJcCBoLtkWS8FKEABFQIiAfXE116zuZHk44/W4skBA3DQcEBFDVyEAhSggOsCHAi6bsc1KUABCmgmIOcctH483cL583h0UDNhVkQBCjgS4EDQkQrnUYACFKgBAZFzUDyebtGypZYnkshHB5mEugY6hE1SwA8EOBD0g07mJlKAAt4l0KtXL+mJJF2795ACP11wCrx20Lv6kNFSwFsEmEfQW3rKhTiZR9AFNIVVmEdQAagaxczL5hhPXCf46bq1KL5wQVqgXv36iH9mMDpEdXS8QoW5dK0AotFXumoEaVUN8whaYbhhUuyz69Z9ZF+zoxw9nOcbAswjaN+PSrmjlMqZR9DeVMxRclOTh06LXGdKcaiJVU0dno61uLjYPGXyZLu8g3v2/GAWuQSdvbSIVU3/qXFTWkaLWJXaULMPqFlGi1jVtKPF9uglVqX8fswj6PgnWU2+UDX7SWX7AU8N24+NOYcCFKCArgQcXTso8g4++3Q8tm3dymcW66q3GAwFvEuAA0Hv6i9GSwEK+LGAuHbwyy1bbPIOvj0jBcMTEmA0Gv1YhptOAQq4KsCBoKtybl3PhFLjNswZEQ1xnV9YSCyS1uxDkcmtjbJyClDACwSs8w62jYiQIt639wf07d0H78yaxUTUXtCHDJECehLgQFBPvXErFtPZrVixBeg3ZyfyCnLw/Wd9ce6tBDw/dx9KdRgvQ6IABTwvIPIOznznXYwdP97S+OIFC6VE1Bnp6ZZ5nKAABSjgTIADQWc6NVJ2FQV5dTHwpd4IDxLdUwsNOyVg4msdkLN0M/aX8LBgjXQLG6WADgVq166N2Lj+2LHze1gnop7w8ng88/TTPF2swz5jSBTQmwAHgnrrEdRGi+4PorFNz9RCg5BQBOouVgZEAQroQaBJkyZSIuo169ZaElHLp4sLfsrn6WI9dBJjoIBOBWyGGzqNkWHdEqjVowNaSkcJSUIBClDAXiA6Olq6mWR6SrKl8Py5c3ggqiPE6eIrV65Y5nOCAhSggBBgQmmv2A8uICvxXzg04B28HHWXTcTiZhJnr07RXZwVs4wCFPBRgatXr+LM6VP4tbjYsoV//OMfERIahrvq1rXM4wQF9CKwb/cum1D498uGQ5MvTCjtOFejzuf+13z5wPvmkbN/MF+uYqRMKG0PppR0U6mcCaXtTcUcJTc1CYkrS3Zq3aJSO0rlamJVU4deYlWTaLbfY4+bB8XH2ySjFt9zc3MttErbrKb/lOpQY68XV0/FqqYdvbhqESsTSgtF+5dSH6v5OVeqQ7Ra2c8XTw1rMsZ2YyWlB7BiY11MGNkRQW5shlVTgAK+KVAnOBjrPvkE781Jtbt+MHHKFBQWFvrmhnOrKEABVQIcCKpiqqGFTKexeXkB+kwahFa8NrCGOoHNUsA3BGLj4qTrB199/XXLBn380Vr06NoNX27+gjeUWFQ4QQH/EuBAUK/9bTqLrPe/RlB8bPkgsPQY0lbuRoleY2ZcFKCArgVEMuoXxryAHwwHLOlmRMAZG9ZLN5QsWriIN5TougcZHAW0F+BAUHvT6tdYmoOMN8ZgxOw3MaJzq1tPF2mOsLbx2IC7eYq4+sKsgQJ+LSA/u3jLtq02A8J3Z85Ev759eYexX+8d3Hh/E+BAUG89bjqNjIkJmJB22EFkHRDXtRnYaQ5oOIsCFKiyQHh4uJR/cFLSG+j04APS+qcLTkEkpOaAsMqcXIECXilwm1dG7ctBBzRF7MLdiPXlbeS2UYACuhJo0SIUIz75BLt378a8OXMgklHLA8KmIc0Q238AGg0ahDvvDNZV3AyGAhSovgAPLlXfkDVQgAIU8AkBkZBa3GEsnlBifYRwfmoq4p98kqeMfaKXuREUsBVgQmlbD5/6JpJNL1mxyiu2aemSxRg5arTuYz1//jwOHjSgT59HdB+rCNBbXBmr+3an6uwDJ44fQ8amTfgpz2gJsF79+nii/wB0vP9+1Kp1u2W+FhPViVWL9qtSB2Otipa6ZUcNG2qzoN7/fh07elSKt03btjZx6/WL2GeZUNo+j6NPz2FCafvuVUq6qVTOhNL2pmKOkpuahMSVJTu1blGpHaVyNbGqqUMvsapJNKtFrKtWrzEPHDDAJil1zx49zGlr1piLi4ulLlLjprSMFrEqtaFmH1CzjBaxqmlHi+3RS6xMKC39qNj9o9THan7OleoQjVa2H/DUsF6H7oyLAhSggE4EIiIi8eHyFXanjKcmJlnSzly+fFkn0TIMClCgKgK8WaQqWlyWAhSggB8LiGsIxdv6phLBIdLOiFfuj8cQ178/xN3IfFGAAt4hwCOC3tFPjJICFKCAbgSsbyoZ9OxgS1yLFyxE3959IB5dJwaLfFGAAvoX4EBQ/33ECClAAQroUkAMCFNmzIBITN21ew9LjOLRdc89MxjPPP007zS2qHCCAvoU4EBQn/3CqChAAQp4jYA4FTx02HDp0XXWzzIW+Qjl5NTi8XW8jtBrupSB+pEAB4J+1NncVApQgALuFBCPrhPPMj5y4jjem5MKkYxavERyanEd4YSxL/G0sTs7gHVTwAUB5hF0Ac1bVmEeQe17inkEtTeVa2ReNllC28+adhW5CL/9JhPZBoPNhrUIC0ePnj3Rtl0E6tSpI5XVdKw2ASp8YawKQC4UM4+gC2hVWEXss8wjaJe9x7dnMI+gff8q5VpSKmceQXtTMUfJjXkE7d2UzNS4qskvVlnuMOuIlGJR039KdeTm5ppfeeVVm1yE4neUeM+aOdN86NChSvOcVSVWpTjUuKpZRgtXNe1osT16iZV5BK335PJppT5W83OuVIdorbL9gKeGqzCa5qIUoAAFKOCagLiOsN/jf7OcNpYfYSdqE3cbD4yNw9HsQ/goLQ0XL150rRGuRQEKVFmAA8Eqk3EFClCAAhRwVeCOO+5AbFyc9EzjDRnpGP3iGEtVV8rKICepllPQXLlyxVLOCQpQQHsBDgS1N2WNFKAABSigQiAyMhITX3tNuttY3FxyR2CgZS05BU2/vn0h7jjOzs62lHGCAhTQToADQe0sWRMFKEABCrggIO42FkcJ20a2l3ISWqegke84FqeORV5CceNJYWGhC61wFQpQwJEAB4KOVDiPAhSgAAVqREBcSyinoFmzbi2sn1wi8hJ+nLYGPbp2sySr5vWENdJNbNSHBPisYR/qTG4KBShAAV8RENcSys82fmXCBBgMBny4dCnEYFC8xKc8/chjfdF/wABERUX5yuZzOyjgMQEOBD1GzYYoQAEKUMAVAXHquFevXtL708824vdrZdj8xReWgeDXX22BeItXZFQULv92Efd36oQmTZq40hzXoYBfCTChtA93NxNKa9+5TCitvalcIxP0yhLafvqy64ULF7B3z258vyMLxRcu2MGJpNUPdO6MiMj2qF+/vl15dWb4smt1XKqzLhNKV0dPeV0mlC7P3eg3U0wobd/VSkk3lcqZUNreVMxRclOTkLiyZKfWLSq1o1SuJlY1deglVjWJZrWIVU3/qXFTWqY6sYqE1Glr1ph7P9zbYdLqnj16mBcuWCglrt7yn63Wu5XDaXfGat2gUjtK5Wr26eq4ahkrE0pba5ZPK/Wxmp9zpTpEa5XtBzw1rDyI5hIUoAAFKKBzAZGKRrwbNWmKVi1DkbV9u83pY/nuY3kzRP7CDlFR0nWF4tQzXxTwVwEOBP2157ndFKAABXxUQFwb+OyQIdJbpJo5ceIENm3caLmOUGy2eJqJ/BJPOekR0xPRXaLRsmVLiBtV+KKAvwhwIOgvPc3tpAAFKOCHAmJQKN7iZhPxlJJDhw5h9eo1yDlxHOIooXhZ34Esvou7kBs3uRf33tMIIp0NXxTwZQEOBH25d7ltFKAABShgEZBT0ly5+jse6tkdRqMRP+zdi127dtkcLZTvQF6xdIm0rshl2KlTJ9zXpg0HhhZNTviKAAeCvtKT3A4KUIACFKiSgDjaJ97iNLJITJ2Tk4PsQ9nYkbXdkppGVCgedyfe8ksMDP/3XJE0kOQRQ1mFn94qwIGgt/Yc46YABShAAc0ExA0jcgJr8WQTka/w7rrBOGgwYMtXX1lOI4sG5UFh3959pPbFqeQuXbqgRWgoWrVqBd58olm3sCIPCDCPoAeQa6oJ5hHUXp55BLU3lWtkXjZZQttPumrjKXIW/nz6FPLyjDDs2+cwb6HcUr369RHVqRPuuedeNG0Wgj//uT5q1bpdLvb4p7fsA8wj6N5dg3kEy1P2+M0U8wjad7VSriWlcuYRtDcVc5Tc1OShqyzHlXWLSu0olauJVU0deolVTX4xLWJV039q3JSW0SJWpTbU7ANqlomLG2DetWuXlJtwUHy8w9yF4new/BbLzJo505y+aZM5NzfXXFZWJu3aSvEqlauJVQtXNe0oxco8glKX2/2j5Kbm51ypDtFoZfsBTw27dwDO2ilAAQpQwAcFateubXMqWdyRnJubi4KTJ7Fv3z7s2rnT5nRyxTuTBUnTkGa4t2mI9Ei8vzRogKZNm/KxeD64r+h9kzgQ1HsPMT4KUIACFNC9gLgjWU5qHRsXJ8UrrjMUKWh+ys+XchnK1xbKGyPS14j3zu92yLOkT3HNYUhIiJTT8EzhL0xjY6PDL1oLcCCotahm9ZlQavwe3xw5gC+TL2HwjqmICQ7QrHZWRAEKUIAC7hUQzzeWb0ARLaXMmAGR4FpcbygfOdz29Va76w3l9DVydKnvzJImReLr0LAwtG7dGkFBQVI6G3kZ//m8gMMrX8GoYcWVbHIEBrw+CK3uaY72kZUswtk2AhwI2nDo54vJuBrD3tyJOnsz8R3+jsH6CY2RUIACFKCAiwJygmtx9FAcOXyo1yOI7twJZ86cwalTp3CuqEg6eljx1LJoztHpZTkMcZq5S9euuPPOO6UjiX8KCkKzZs3kYh/6rI+IhNnIm29CUud/4OhrG7EhoRVuHiYpgTFrI5a+mYy3cu/A3uLVmJ3QBkE+tPXu2BQOBN2hqkGdAeEJ+GzFIBhXjsB3N/8zqEGtrIICFKAABfQmIE4ryzkNrWMT1x2u35CORg3/jP8rLZWuPfz1119tkl/Ly8unmeXvFT9FFglxyrlu3bqWwaJYJqR5cwQGBkpHKiuu48nvIrl3xZc4eioGzupfwQiPScCUlq0RPPZFrJz2BpZFfIiXo+5SX4UfLsmBoB92OjeZAhSgAAX0LyAGiGIgJJ6CIl7ytYdiWiTALi4ulo4i7t27D1fKSqVlKl6HKM289U/FU87WZWJ6euJkyyx50ChmyEcZjx47YbmxRZz2tn7Vq1fP+muVpsWAT87JaL3i430fwzdZ26uel/FPrfHYC0Nxdmwq3p+ejn6bEhDOK6usaW2mORC04eAXClCAAhSggP4FRNJq8RZHEgP+p5ZlsCiuQxQv+QibON381ptv4amnnsKZMz9LZc4Gi/KWKw0a5eXUfMqDymvXrqOkpETKq2i93v59+62/WqYvl5Rg/WefYdTo0ZZ5aicC6jXHg+GB2JqdiV35gxAeXlvtqn63HBNK67rLr0qnhvvOCsWyPY5vFhGH+529OkV3cVbMMgpQgAIU8FOB33//Hb9fvy5tvTgN/d//3pCmr127hmtXr0rTN27cwOXffqsxoTp33om/3tfGvv0bxcjbn4uye9qh3T1B+IPdEtdxMTcb+cVA3ZaRCKtXy24Jf5yxbt1H9pttl9mQM3QkcMWcu+JZc2jrN8zbf/tvleNiQml7MqWkm0rlTChtbyrmKLmpSUhcWbJT6xaV2lEqVxOrmjr0EquaRLNaxKqm/9S4KS2jRaxKbajZB9Qso0WsatrRYnu0jFUkwhYJsa3fIrG2SJSdkvKm9CmmxTttzRrzlMmTLe9XJ7xqHjVylOW7XNa9WzdL4m05Abf8OX/efMFk85JMfttuTmx9nzluxY/min8dbyau/s68fUp3c2iz7ubE7edt1hdftHDdti3TLN7OXlq0o+bnXE07le0HPDVsPzbmHApQgAIUoAAFHAjIN7ZYF4nT0+JV5867Laeorcvl6d9+K8HJglNoH9lOniV9ZmdnY3D80xBHIq1fdwTegUcefcR6lvpp0yWcOnIBQAeENeF9w87gePmkMx2WUYACFKAABSjgVgGRSmda8r8tbYgBYJ3gYMxfsEC6BtJSUIUJU/FJ7DWWIbDvk+gdyusDndFxIOhMh2UUoAAFKEABCrhd4Kn4ePxgOIA2EZHYmJGBXXv3ICYmxrV2/+8Evlq0ClvLojB8ZAwac6Tj1JGnhp3ysJACFKAABShAAU8IiLugA//0J5ePAgJyQulZ2JjbGENWzsdY5hBU7DoOBBWJamiBkiwkdR6GdWWi/Z0YEbEe7aZZZ1CvobjYLAUoQAEKUKDGBCo8Ym7ao2g5zSqYwF4YMTkFKY1CMCimsVUBJysT4ECwMpmanh8cg+TjJ5Fc03GwfQpQgAIUoIBuBG49Ym7VzSTbjsKSb0pxVMZ59gI8c25vwjkUoAAFKEABClDALwSYUNqHu1kkm16yYpVXbOHSJYsxclTVs8d7euPOnz+PgwcN6NPHxZQGHg7YW1wFC2N1z85BV7pyH3DPPnDs6FGp4jZt27qnAY1rFfsBE0o7y/rog2VMKG3fqUpJN5XKmVDa3lTMUXJTk5C4smSn1i0qtaNUriZWNXXoJVY1iWa1iFVN/6lxU1pGi1iV2lCzD6hZRotY1bSjxfboJdabiZ4Pi82u9KVFrGra0cLVVxJK89SwxiNuVkcBClCAAhSgAAW8RYADQW/pKcZJAQpQgAIUoAAFNBbgQFBjUFZHAQpQgAIUoAAFvEWAA0Fv6SnGSQEKUIACFKAABTQW4EBQY1BWRwEKUIACFKAABbxFgANBb+kpxkkBClCAAhSgAAU0FmAeQY1B9VQd8whq3xvMI6i9qVwjc53JEtp+0lVbT7k2usoS2n56kyvzCFaaBYgFehFgHkH7nlDKHaVUzjyC9qZijpKbmjx0WuQPU4pDTaxq6tBLrMwjaL8/quk/LZbRYh/Qan9U2h69xKomv58WsappR8lMTd8wj6C2/wlgbRSgAAUoQAEKUIACHhbgNYIeBmdzFKAABShAAQpQQC8CHAjqpScYBwUoQAEKUIACFPCwAAeCHgZncxSgAAUoQAEKUEAvAhwI6qUnGAcFKEABClCAAhTwsAAHgh4GZ3MUoAAFKEABClBALwIcCOqlJxgHBShAAQpQgAIU8LAAE0p7GNyTzTGhtPbaTCitvalcozclkmWscq9p+0lXbT3l2ugqS2j7yYTS9nk8OUdnAkwobd8hSklElcqZUNreVMxRcmNCaXs3JTM1rkwo7R5XNfZaJD5W044W+4leYlWT6FmLWNW0o4UrE0prO7BmbRSgAAUoQAEKUIACHhbgNYIeBmdzFKAABShAAQpQQC8CHAjqpScYBwUoQAEKUIACFPCwAAeCHgZncxSgAAUoQAEKUEAvAhwI6qUnGAcFKEABClCAAhTwsAAHgh4GZ3MUoAAFKEABClBALwIcCOqlJxgHBShAAQpQgAIU8LAAE0p7GNyTzTGhtPbaTCitvalcI5PeyhLaftJVW0+5NrrKEtp+epMrE0rb5/HkHJ0JMKG0fYcoJRFVKmdCaXtTMUfJjQml7d2UzNS4MqG0e1zV2GuR+FhNO1rsJ3qJVU2iZy1iVdOOFq5MKK3tfwJYGwUoQAEKUIACFKCAhwV4jaCHwdU3dx1FhrVI6tsGYSHRGDVvN4pM6tfmkhSgAAUoQAEKUEBJgANBJaEaKTeh1LAYz085iYdXHETeTxswuPhdPD93H0prJB42SgEKUIACFKCALwpwIKjHXjUZsWH654h6fTRiGtYCAhojZsI/EbV0LjYYr+oxYsZEAQpQgAIUoIAXCnAgqMNOM+XvRnp2A4Q1CSqPLrgtHh5wDuk7T4FniMtZOEUBClCAAhSggOsCHAi6buemNa8if2cmjgSGolmDWhXauI4jm3YjnyPBCi78SgEKUIACFKCAKwK3ubIS13GnQCkK834GwnuhSZDyOF3kCnT2Uip3tq6ny7wp1vmpqZ7mcbk9b3JlrC53s9MV6eqUx+VCurpM53RFb3J1uiFeUsiBoJd0VGVh5hWcrKwI4ofJWXmlK2pccO3aNdx+++0a12pf3Y0bN3Dbbe7fpT3l6ontEW2Il7vd1OwDnnK133O8d46a/tPC1RP7orf1ghauetpmNT+jWsSrtC9p5eqJ7bl69eY1+7Vr163seQIAAA9hSURBVNaCptI6lMwqXbFCgbB19FI+5ORoLc5zo0AQmoTdCxhPorDUN84Be2IQKDrE3YMZN3a6w6o9sT2iDU+046l9wCGkD8/0VP95Yh/x4W7yik3z1M+op/YlT2yPGAC6exAodh53m3EgqLsf0doI7doL7SrGZSrGqSOX0a5/NELZaxV1+J0CFKAABShAARcEOKRwAc3dqwSERiMufBe+MVwsb6r0F+QZ70Nc12Zgp5WzcIoCFKAABShAAdcFOKZw3c59awaEY+DUJ2CYuRhZRdcB01lkvTcfhpHjMDDcvdciuG+jWDMFKEABClCAAnoT4EBQbz0ixROAoKjR+PDf9bD2oVYIazEG34RNwofjOsEqs6AuI2dQFKAABShAAQp4j4D7b7H0HgudRVoLDTu9gCXHX9BZXAyHAhSgAAUoQAFfEfiD2Ww2+8rGcDsoQAEKUIACFKAABdQL8NSweisuSQEKUIACFKAABXxKgANBn+pObgwFKEABClCAAhRQL8CBoHorLkkBClCAAhSgAAV8SoADQZ/qTm4MBShAAQpQgAIUUC/AgaB6Ky5JAQpQgAIUoAAFfEqAA0Gf6k5uDAUoQAEKUIACFFAvwIGgeivvWNJUBMOaRPQLaY6w+0Zi/r4imLwjcn1HWWpEVvonmDMiFklZF/QdqzdFV2rEt6kjESH215A26Je4FgbxNB2+qidgKsL+ebJrLJLSc1BavRq5tiMB02lkjOmB/itz+HvWkY8r80qykHSf+H0gv4dglfGqKzVxnYoCYnzwhfg7Fo2wkB6Wv2UcCFaE8urvl2CYOx5JeT3x4U8nkfvtIBS/MR7zDJe8eqtqPHhTDlYNnY61GXPwfiYtNesP02lsXp4FPP4eDhecRO6eZXi0aD7ihy2GoZT/fXHd+RKyP98FxH+AwwU5+P6zvjg3eRRm8j8wrpM6XPM6zn6eiqQt/I+hQx6XZl7H2W8zkFFmtXJkL3QJ5aNVrURcmjQV7cb8Uf2RkHEWzYasxqGCHUiOqS/VxYGgS6T6XMlkTEfy0paYOKEnGgYAAQ174pXXW2L59HQY+XfV9U4LaIWhG9KwaPJotHO9Fq5ZQcBUUIjgJ4fiofBgqSSgYTT+8fpotDuxHpv2X6ywNL+qFTD9dAK/PfA47m9YC4B4QtGTGDwAyMg8ihK1lXA5BQETSg1LMW3P7egcqLAoi9ULlGbj0xV3Y97hfOQVnLz5zkhAOEcq6g0dLVm6D/OGTcKRiNnYumQ8+seE2zyulryO0Lxy3lXk78zEkfDmaBIkd2sAgqN6ItaYiV35PLTuld3qw0EHtIhG98ZisFL+CmgQgrb8w1oO4sKUnaupGKeONMbwAe1xc8jtQqVcxVag9ACWLQBeGNsbDWxL+M1lARNK9m/G8uyP8c6slcjIMvJyBpctrVe8BMPSt7E8ZDymvRQtHSSyLhXT8oih4nx+9zYB0yns2nQQge1C0MCuVw8ifecpXsPibX3qr/HeHoX7W3LIUv3uN6HUmIVVb3yAk+Pfw9iou6pfJWsAIP6wfgq8+Cyigv6HIloJmIzYlLoeZShDTloyJiTE4enEdBh5mUi1hKUzhXNvIPbBMnw6Slwb2BwRI+bjW2P5+QG7IUO1WuTKNSdQ+gvyjEBoWCObQ741FxBbpkBVBUwoMfw/HP37YDxc4UhhVWvi8heQldgT7XsPQ3LaN9iX+QPy+QdVg91CnBL+CIsQjxEcWGvgaVWFuAQn4xjyftqNT+cn4ZnWQE7aFLy89ACPDFoxVW3y1pnC1u3QKuIhjF22G3lHN2MC1mLU2FWWa7E5EKyaKpemAAXcJVB6AMvT7kbSyI78z0y1jesjJmXHzT+qyf2BtPEYOPFznOW1wtWTLT2AFRlNMW1cJ+6j1ZOsfO2Ahoj623Akf7kNy4aGIWfpZuwv4Y5bOZizklIU5v2MwI698ERUw5ungIPa4DnpWuxFSF5vlM4UciDozNCbyoIaISwcyM/7hf978qZ+Y6y3BC7BsHwr6k58DlGWa1yJU20B8Uf1uUTMmdYVZTsOIpdHBatBKvbRHWg6+hE05l/OajiqXDWgMWImjMczyMI3Bt48plLNdjHp+mD7u9oDQqMRF1k+XuDubMvmvd8CmqFL/w528ZvOFeBoWQfEdW3GC0LtdDhDHwLXcfaLz3D8kX9iaCteG6h9n9RGaNdevOO9urAlh7Bp0QeY0KVVeY67iGFYV1aGI9MeRcsQ5rurLrHd+tIBjhYIaxJkV8QZKgQC6qFZu/ooO1KAc3YHVW+3XErGgaAKS+9Y5OYv+9CN22GwHEY3obTwJPKZh8k7utAvo7yOoqxV2FCnHwZbBoElyFmzFt9Z9mO/hNFwo2/+Hvi5Rwe05NFW112DY5B8/FZKEzm1yeEVeCYwEO2m/Qe5BWkYGs58d64DO1iz9BecbD8U/enqAEfNrLsR1SsGgcZsHLdO1C/dU3Cf5QARB4JqLL1kmYDwOCSNzMU7721HkQkwFW3H7Jm5GD41jnmYvKQP/SvMEhjTZ+D5hDcxN6ErWlqeJBCJfuuvoxEHLS7sDtdxNn08IvomIs1w86lC0u+B1F/xz5cf4ilNF0S5imcETEUGbP7CIP3tEi1KCZBnHUTMmC5Me+RyFwQguPvzSO6xB0lvfIoccWmIeOrQyk9wdOQ4DLw1wOZA0GVgPa54F6LGpWJ6vY/Rp0VztBy2HWEzUpk2otpdJe7A7IGWvafjCE5jXUInhMWuZJLuarmKActUDHx5NXLs6glEu/7RCOVvJzsZ5Rm3Ibh1R3Q+9RGmDYhGy5BovLDuMp5Y/C5PuyvjcYkaFfgV+xc8h24tbj4edd6u3/HopHGIkRKj12hg3t14QFPEvrMac9rswFNtQxHWYjQy6g7HQqsbnv5gNpvN3r2VjJ4CFKAABShAAQpQwBUB/p/bFTWuQwEKUMDvBC7BkDoQ96cacEOTbRfXh85AP3FJwH1jsCqnPMGtJtWzEgpQQJUAB4KqmLgQBShAAX8WEImU1yBprkE7hJI9+PhwH3xSkIPv3qyNJV/laTTA1C5E1kQBfxDgQNAfepnbSAEKUKA6AlIi5boY8Y/W1anFdt3g7nh5bCcElZ7Evv3AUz1a4DbbJfiNAhTwgAAHgh5AZhMUoAAFHAuYUJK1HGnGq46LdTFXTqT8GJppPVIrSseoto8iqagVujUO1MXWMggK+JsAB4L+1uPcXgpQQBsBMYixpLxpfjPJ8Ih0FInaK5RFJGbB8RVwF2E4XAcPhlYz/1ypEVnpn2DOiFgkZdk/SUCEZCrah7TE2FsPnV+E/dZ5xZyImIxf48um8fibO57/3DAOS37ajeURBzB89Freie+kH1hEAXcJcCDoLlnWSwEK+LaANIjZgff6NgQQhZc2HkTesjiIb2gYhwUbx+IuROCZOf/BrpQYx7nQSo7jSN2I6qXKMeVg1dDpWJsxB+9nXnJsXroP84a9jbxeC5FbkIOtQ4oxddjiWw+dP4OMEVHlT8uwDG7HIqPoEg5tXoVVL/dAy5B2iJ97ApfmDkRnzW4YARDQEPfH90Pn07/ist3TDxxvDudSgALaCWh9oF+7yFgTBShAAb0LBATiznq1gLrd0D3irvJoS4/howXb8MCcRZge17SSxzuaUGLIQ93OD1RSXl6d06mAVhi6IQ3PGVdi4PYVDha9CuP6uVje8Z/4Pqax1FbDmNGYmPkMktf3wYaEVohdZkCsgzWlWeO/Qt54MVUKQ2o8RiEFe8ZHaXg933UU/XgM5/t1RRj/IlXWC5xPAbcJ8Iig22hZMQUo4PsCV/Fb0WWgaV3Usfw2vQTD0hR82mY6ZlU6CBQyGp0WVkI2ncKuTcctzxW9ubh49FQX5G/ajfwaOgpnMq5Ef+noYwc8n9kcSS/xCRJKXclyCrhDwPKryx2Vs04KUIACPi1w439x8sCvCGwXggbSb1ORG+8DJG3tguSRHRHkbOOVTgv/shHPD12FH8VjoaxfpkJ8O/lZvP6t42sBrRcV06b83UjProO2IfXsjzxmZ2JXvtobVYIQNf4r7K94NFBcn7gxFaM6TEXWpbPYP28kIsQAr+8MZBVdr3BtYtrNx1yJM8LhCdgkPbP3GL5MGYwoPkGiYtfxOwU8IsCBoEeY2QgFKOCTAhdO4/ivQK16wRD3vJrOfoV/j7+AUR+ORpTTZyXLp4Wb2Q/OZKhGjyNlaAHG/WON1WDwEg7Mfg2rwv6FpIfqy0s6+TShtPAk8nEvwpo4HZY6qcNZ0QVkvT0CI16Zh2+vncWhrCLc89JSHD76KV7CWoxN/AAZP96FuJQM5O5ZhgGFszFpvREVhrbOGmAZBSjgZgEOBN0MzOopQAHfFbhx9iQMqIuo5n/BbabT+CJ5Pf6SOlHFHbZqTgvXQqOH/oWVYjA4Lh2FphL8uHwSJl9MwNsJbZ0fbfQYeX3EpHyNLdO6AmiM9g+1R0PxVyWoOdp3rI+y83XRtnu4FGvAX+5B81rXkJ/3C0o9Fh8bogAFlAQ4EFQSYjkFKEABhwImlJVcwnU0xH1NA5Cz+l2sbDkOr966IcPhKvJMpdPC8nIQg8HxmNt1K4Y8HItxeQOxMqU3Gqn+zR2AoCbNEYqfkVfI4ZeFlRMUoIBFQPWvE8sanKAABShAAQDXca4gH2Vohrqn12LS9w/gbaXrAiU3FaeFNfQNCI1GXGStCjXeij2yF7pUN4dhhZr5lQIU8C4BDgS9q78YLQUooBuBUhTm/QzgP0ieXIiEf8ejldPrAuXA1ZwWlpe9jsKNb0hHAtd+k4G5YRuQkLgNv1TlIruAZujSvwEyMo9aJbUWsZ9Du/7R1cthKIfJTwpQwGsFOBD02q5j4BSgQI0KmIpx6oi4czcKL6VNRazaJ2+oPi18Hb98+xaGZ3TA3MkPo1FAMP46fBbmhn2JxJVHq3CdXW2EPzkOww/Mx+ysszBB3Nm8GO8ceAJJT4ZXfrNKjeKycQpQwFMCfzCbzWZPNcZ2KEABCviMwA0D5nT6B46PW4bZCW1U3rwhni28Ep83GYwh4QqPlRPpYyZdxsQPnsNfrY80ivQxia/h615zMVO6c/gCshIHYkTa6XLayKnYsikB4Vb/1TcV7cYHia9gbmYJWg2ZguSXnqx+yhbxVJP+A5CcXXar7a5I+vpV4LVny+cF/h3LtnbHN31GYJ28mJi3Zypigq0CLI+eUxSggAcFOBD0IDabogAFKEABClCAAnoS4H/H9NQbjIUCFKAABShAAQp4UOD/A2y7IBGmEYmBAAAAAElFTkSuQmCC" alt></p>
<p>In the changes of state B to C and D to A, the gas behaves as an ideal gas and the changes in state are adiabatic.</p>
<p>(i) State the circumstances in which the behaviour of a gas approximates to ideal gas behaviour.</p>
<p>(ii) State what is meant by an adiabatic change of state.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
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<p>With reference to the first law of thermodynamics, explain for the change of state A to B, why energy is transferred from the surroundings to the gas.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
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<p>Estimate the total work done in the cycle.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>(i) low pressure;<br>high temperature;</p>
<p>(ii) no thermal/heat energy is transferred (in change of state); <br><em>Allow “heat energy” but not “heat”.</em></p>
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<div class="question_part_label">a.</div>
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<p>work is done (by the gas) because there is an increase in volume/gas expands;<br>so <em>W</em> is positive;<br>Δ<em>U</em> is greater than zero (because <em>P</em> is constant and <em>V</em> increases);<br>from first law <em>Q</em>=Δ<em>U</em>+<em>W</em> means that <em>Q</em> is positive which means energy transferred into gas;</p>
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<div class="question_part_label">b.</div>
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<p><img 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akMmAPEik7YSg+azaWhECUOEFtJJ7x9hJoveGVBx/cJ7uxL5VA/5RgDsefvpW2/PYua11RPI687l879xyvp7zXY2TQnwjv80n/qNzsoFot5pwyOjI7S9u2P0ZvffDbV1tR4tR597Jfea0N9fUDK079/Riw73NFB0Wg0UAcZL7z4Iq1dk3DjTb5gYmKCSkpL2Hqog7+zztyYXMV776LLYIe8UNI+fAjE6Ysv7d1L373tdlqzZjWddOLLqaIicYS8hN2Vp2Qc/obV19exXLjqyoQnPIfft39/AlKcKNofpZ/89Gd03rvf5YepnwuYAXOAWHxTKgnSXojUqwrjUyiOAwo05RgDffT8N19Nx1+9iW7ZdS1trjM3rqT8F+mRf3o1nfXs1+jR+y6ijZOXb9yY+oWFL8XKyko6++xzAnwg6BA2LHFpdHSESkuDHii4VqqHL/ZwGI+Kgo+L9u7dS42NS6iysiqgTpIH9zHsoOY2M9l0JeRhh3kCx5IlS6gMX6i+UYGd2/iiQcKXMBI3dNKVcXWMTK4M+CYmxqmsLPEl7yme/JdtXcnyFi1aNNXOZJ3mPa4dHBr0PJPwnsOeLM/UM6+uZQgSxvULV3kSduD0l8HVPJBCRK37DyRly/1Q7rvyOEFHhIcCN/bcxomsC+MEKdMxBBxr165N4sC8lbG76pI4RL/o6OgUcUhzgyQPLZDnNbld8JCrqqpk+6iLLlee5L4hYz+yOTT43QCbwAX35ptvNB1i6jV49VSRvsk9BjrowJ87iF5+DDXXmMWI3IotW7akFD7zzDNetNPzzntPSj4+IDJpU9PKQD4y/vzCC3TsMcewZVK9nt4eqqyopDLGZfb222+nM844g51EJHl4JIAvwob6hgAOmy7IW7Jk8RQOPFZpa2+fkoFJGJP+mtWrqLS01Ms/0Nbmva5aGeQjXRlXB8JQjyvDLvNIb8S7yzAFavJNtnUly2trP+j59Pt1xilO4VCYcOdhXc1aKgqHRezJ8vxyXMv+tHMnnbhhg1+chwGZHIfpdHF1IAv1kss6u7qoPxql2EQsZaGVPF5s/VDqu9AllUEe3BK5secyTmy6ME6QMh1DwJHMgSfEcymXsbvqknjCF+1jjz0m4pDmBkke2iDNazabAMO6desymrtsulx5kvqGDbut76abQ7n+CZv8+tdPmO6Q8qoLjxQ6CuuD/44HWt/b20vNzcEzwXEDgMtHHXw5SmVSPZt7Hn7R4hcUJ1OS5+oKBnmrVzVRbW2tZ3w8Rtj2w3u9Lxdk1NTW0MuOOoqWNjZ65fhXMnl3B4sRf0pXxtUxMrmy7u5uaittp6OPDu7pybauZHkDQ0Pe3SrTPtzRwB2A+ro6WtXUNLUIs2FPlmfkmFfXsj179jpxAb0cv8DB5XPtwhfKzl27qLenl4aGEgdhg4vkfmrrh1LfhS6pDPJwnk2yDsOhyzix6XJ13QQODp8Nu6suiSe0y4ZDchO1yZPmNVu7WlpaMp67gF3S5cqT1Dds2FEm8WSbr20c7tjxW9NdU17T/yxOuVw/LGwGGmnVsY1Ez75ALf3qP+tiq+rqanrTmRupoqLC+1WL8PbJiw4XmblcxzxCGRsb8379YxFm7vzkcrtcsBcVFdGGE06g8vJyr2+sWLGCztx4hosoraMMFDQDuvDIK/PX0jFnnEtndWANmpRie+ilp0doxXmvT428mnSJvp1mYO2aNYQvFdxtaFyyZLqggN7h7gb+li1dSic2N1NfJMLuMyggSrymYvGxdGmj1zde/apXFuwirNDsru3NLgO68Mgun/MuLXzcu+lvX/kt2vZU9zSW/ufouV+9jd51+joNzjPNivVdYuOr9ZK8LmxauZJOOvHEwGOVvG60Nk4ZUAbmhAFdeMwJzXOoJHwG/e2/nUs7L7yRtraOEsX+SA9ffR3d+oXLaMv6oGfEHCJTVTnEwKKGBsKve03KgDKgDGSbAd1cmm1GZ1teZCtdfsLFdIPneHEdXVx/K137rUdo34fXT97NKKbqU79Nz/zoE3TFKWV0cfs5tHHrNnr0o6emPbCmvLyCqmtqvbgR/mbANQp+6FKSyqR62EHd091DRYyLLtzOsNvc98DIUy3JMwGO+vr6AxBtuiAPGxb9OLo6uwhnaLQdPEjljOcNlBw8dCigy2RIZVK+JC8S6fNc0jKtJ8lLh0+qh6ibHZ1dNDo2ZkSkvLrgk3QZwZzMiVjMiXebLk6PDQM8n/AYCofMHePb9Gvrh1LfhS6pzAT14saXyzix6cI4Qcp0DAEHh8+G3VWXxFNba5u3GVrCgQCSXLskeR4RkzF0zHvzamsXNmhmOncZuRx2V56kvmHDjjKJp3RzKIcdNjHuwKaN5lUXHoaJXHmt20zXt22m6614q2jlG75Lt7V9l26zXpdaODw8RNH+PjYgFToWF6gKEqQARyiT6tl2SUsBjmzyXHdkA1+yV4thpLOzk4peLKKVy5cHnuPvmzy3YfmyZebyqdd0ZVwdVEY9rqy0pITGxkbZsmzrsskrKgpT45LFhPM9/EnCbpPnWrYzvNOJC2Dm+JWw22wyPDxMrQda6dRTTqHly1P7gK0fSmMBuqQyyJMCrbmME5suVw8K4ODmBht2V10STzhZx4ZD8taQ5IEnaV6ztSslSByEJCUXXa48SX3Dhh1lEk+2+VpqF2zCnQkDSvRRS1LH0LfKgDKgDKRjIDx5gFy667RcGVAGeAZ04cHzornKgDKgDLAM4Nck0tBw4iwP9iLNVAaUAZEBXXiI1GiBMqAMKAMyA9gDpEkZUAYyZ0AXHplzpjWUAWWggBkYGBws4NZr05WBI2dAFx5HzqFKUAaUAWVAGVAGlIEZMqBeLTMkqhAuq6ioVHfaSUOnutPy558cPHRY7BZSmZQPQVxZJBKZdKedfV2mMRyOaXfacXNZyitXx1yQzbKEO23mXACLhEPKl+ognhEesxw40EojI6Ommd6rzSXR5ropldncHyWXSQCR5NnKjsR1E54N/mTD7qpLape606ayL/UNm01sfVfdaVP51U9ZZGBoaFDdaSf5NO60y5cu9WJzJNM87Qq6NDnbe5+ubPmyYB1UTLh1BstKS4on3WmDZdnWZZOX3p02c3xoN8eHDcfOcDjjOjZ5KOMwpLPJCy+8QPX19QE3UptLouR2CF1Smc39UXKZtMmzlR2J66a604JZInWnTfCA/+pOO82FvlMGZsQABg0SDtTRpAwoA8qAMpA9BnSPR/a4VEnKgDJQIAwUFSWeUkej0QJpsTZTGcgeA7rwyB6XKkkZUAYKhIHKysoCaak2UxnIPgO68Mg+pypRGVAG8pwBxGpBwqZbTcqAMpAZA+rVkhlfeX/14sWLCRva/Ak7nrl8c51UJtXDLumBAek8hDihnJMpyYMsqY5NF+RxOEZGRygejxO8SkqYQHZoN+RKSSqT8iV5CMoWm4jNiS7TFh5jyAsQx5e5cSG12YojFHLiwqZLapNUBzZZtWqVh+Nwx2FKPkHd1g+lvgs9UhnkSWVEmY8Tmy7DAzfuUMaNE8gDDq6ODburLomLhDwZB8o5jJK8RLsQMC84F9rahYVoNnW58iT1DRt2lEnYkY9yLkkcJrBzoT5pMqApJ03zCo4BuNOOjI55Qan8jccXMYJVSUkqk+qhUw4ODFJ3T3DtOz4+QZ2dXVTKRIWV5KHzYyOo370ReG26IK+joyOAo68vShMT49QbiZB5nu9ve09vxJ819Vkqk/JRkSvr7Y0QDqziyowyqUzKl3TZ5ME9D1gSe9XNldOv2dRlpHIyx8bGnLiATE6eLV8qAw/9/f1UXFLsRd8cHZ2O2Gvth5YxZOvXUpnLOEGbJHmJLwqMl1QXYa9OmvHKjX9wkW1dkjzMF+BDwiHODRaboN2SPAnHwEA047kLepA4XUdiE24OtdnE2nct9pe4gP5YTBcek+bVF4kBdaedZqars5NefLGEli1dSksWL54umHR9RQbnhjkbrpvj42NzosuGvbi4iJY2LrFEp50bd1rcfXLh3WYvTh6ul1xt4eI8Ojri9Y3GJUuoqWnlVP/AL2QpwqfkMovKUhnk4QuJc1dVd9op2j3XTfDB8eRqE41OO82vRqed5kLfKQOzxsCSJUtmTbYKzn0GzC9RDRSX+7bUFsw9A7q5dO45V43KgDKQ4wyYAHHJj1lyvEkKXxmYMwZ04TFnVKuiXGOgrLTUgxyLqedCrtlutvGaTYejo8H9ELOtW+UrA7nOgC48ct2Cin/WGCgrSyw8zK/bWVOkgnOSgXA4MX0ODQ3lJH4FrQzMFwNBl4L5QqJ6550BeLU0NCwiE7MhGRCeaXP55hqpTKrX19fveZtgI54/4Q5DT28Pq0+Sh3zsxudw2HSh3uGODm9DYDIO6B8dG6f+yZMpS0pKkou99xx2c5FUJuWjHlcG7MPDI2xZtnXZ5MFNEFiKBNdiDrtNnmsZ+ka2dWUqz+OhqNjzeMJ5Htj8WVGRCCRo64dS3wUXUllCHj/2XMaJTRfahZTpGAIOro4Nu6suiSeMVzsOfm6Q5HlECFzY2oWxmuncZdPlypPUN2zYE2U8T8CBcm6sIJ+zP3iIx/m7xbrwMFbXV4JXSzgcorra2gAbPd09bD4uPECtYplUD521qrKKqqqCJ0ACQ2VFJStTkmd8zDnsNl2Qx+GAfrhLlpaUUHlZGSUvPIwTLfL9KV0ZVwcyUI8rK68on8Iw27ps2IuKighYOIwSdps817IwcDjwDu6kelx+Opug3DyKQ33T72z9UOq7kCWVQR7czo18XGuSyzhBXUkXxgkSp8s2hqQ5w4bdVZeEHePVhkNqlyQP10vzmq1dmCcynbtsulx5kvqGDTvKJJ5s9pc4BA/moD1PcNI/XXgkkaFvibq6uqiWWXjgly6XbziTyqR6WDlj0cHXC1FZWRlbJskDjvGJcbaOTRfkcTg8/TW1Ho7S0lLCnz/hGilJZVI+5HBlWPiEi8JsmdHN1ZPkpasj14t7C6C50ZVAyeqKx524kNvF827jCTbBGS9wpe3r7/f6RnI/lvqhre/aynDWTbJ8gw1nqoAjrswmTyozv2Y5ebYxBBxcHeCUsLvqkrAn+oqMw8UmwJ9puxDF2cUmki5Xnmx9Q7IJMEg82eyfziaQ60+6x8PPSD58ju2kHf9+Jp0ZClEo9HLacM19tL2fv+WVD83VNigD88EATrZFUpfa+WBfdeYyA7rwyGXrsdgP0I5/eQ99sPcL9G8TcYr3X0+f3HU+vfn//Zj+qGsPljHNVAZcGDCbS3XzsQt7WqeQGdCFR55ZP7b7OrrimnfRxZtfTxtg3eq30kVf+id6/+1b6NJfdOZZa2e3OTU11Z4CbNTSpAz4GcC+F6RodMBfpJ+VAWXAwoAuPCzk5F5RH73w2AP08JuOpeaaadOGV55ObzhjFz3+iz9Se+41at4QDw4mNlshzoMmZcDPgLnjgXy96+FnRz8rAzIDobh5UClfoyU5w8CL9Mg/vZrOevZr9Oh9F9HGqbUHn79x48aUlkWjUSotLaO3vOWvU/LxAUHCEAuBS4hbgXpckurhLgJ2XnNBx/bu3UuNjUuosrIqIFKSh2iMCEiU/GVgKtt0JeThl2sizLmpMzg4QGXl5dRQ30BV1dXexkpTBs8KDJs4cyckNHm2g1TG5UMu6nFlwIcvNW6jJepg13iMWRhJ8my6bPKwibKyooLtA5KuI+FJatfg0JCHw9jCvB6JLo53G0+wydDwMNXX1REOEMNhYkXFYerp7vUitUr9UO67tvEV94KfcWPPbZzIusydvUzHEHCsXbvWmCLpVcbuqkviEOO1o6NTxOFiE3lek9uFgJPYrJ7Z3EVe7B9uDnXlSe4bMvYjm0OD3w2wCdyLv/71ryb1icTb4NWBSzQjdxhopFXHNhJ95X7a9vwFtHF94mwBg7/4Fevo+KnFCNH27dtNkfeKz/j7/Oc/l5KPD1IQK5QhmNLrTjs1UMdWD37fcNvjdo1fc821dN5576Hm5hMCMiUctvb+TFUAACAASURBVEBQNl2Qt3pVUwBHS8sueuKJJ+g1J5/sLWYWNTRMYYFr2fDICOt2aHahcy6JCDq2ZvWqKTnJbw4d7qBlSxuTs7z33d3d1NbeTidu2BAoO3joMDXU17GLEhddwA7XUG6R8+BDD9HJr3kNGyROwu7Kkw3Hww8/Qmed9aYAF666XHiCTX77u9/Rxo1nEO6KYTFkgsXZ+qHUd9EYqQzypCBxLuPEpsucxbB6VbCP2sYQcHBzhg27qy6JJ4zXe+75oYgDfYprlyQPPEnzmq1dwNDc3JzR3GXT5cqT1Dds2FEm8WSzv8ShsQna509JX0P+Iv2cewzU0nF/+ym6bMU2+tYX76KHPU+WAWp74ha6/9cj1HjsSgp+teVeK+cKcWtrm6fK/OqYK72qJ3cYMPs81LMld2ymSOefAV14zL8Nsoug7iN05S++SteOXUxn1xZRyfu30qO//T3teOL/0LtOX0d6iyu7dKu0wmbAPJbQYHGF3Q+09ZkxoAuPzPjKgauLqbr5k3T5f0W9fQhjt3+UTindT49/5mP0Od+jlxxozIKBqBtMF4wpFhQQs/dCg8UtKLMomAXOgP4AXuAGOjJ4A9T24PvojVd+lO78y0ZacWTCCrI2YnAMDQ0nNn5Ouk8WJBHaaJYBbILFXQ88jtNgcSxFmqkMBBjQOx4BSvIhY5yiO79JP7jmtfSy299KN/7+Ujq/Wk3tYlnzDF+dv1zYK4w65jh9daktDHtrK4+cAXWnPXIOF5CEcep76C20/pyHqX3jZbT5M/9AW966fsYbSp966jf0yKOPkt/Ndq4b+LOf/pROee1raenSpXOtekrf4cOHacdvfkNvOP10z2WypqaGystSvYSmLp7FN3Bxxm7zlStXzqKW9KJ37tzpuSpWVycOVUtfY3au2L17N61fv352hM9QKmwCd8UNk55Gff19XuROuBvPJT8LYZyAMuB429vfPkP2ZucyM17nG8cf/vAHWrFixbzOXcYmC2EOffp3T9PVV18VMLo+aglQkssZxVT75l9QWyKERMYNQXTakeEh1jVWcpmCEsntDGVSPZt71kMPPkTHHnNMRi5pR+IKJrnT/uGZP9CrXvEKOnjoENXW1EwFiptr181YbIJ1w51Ld9rdu3fR8mVL592d9s/PP89yMdc2OXBg/xQO6O6PRgmP5VYsXy66JEpjwTZObO6PLuPEpsvVdRM4OHd6G3ZXXRKHcN3EeJVwSG6ikjzbvGZrV+uBAxnPXTZdrjxJfcOGHWUST7b5WuLQ2ATt8ye9/+5nRD8rA0kMmEcto2NjSbn6VhmYZgDROZGwF0iTMqAMpGdAFx7pOdIrCpgB/IrVpAzYGChO2nSME001KQPKgJ0BXXjY+dFSZcBjQN0ltSPYGCgvTyxQtZ/YWNIyZSDBgC48tCcoAxYGzGZBPb3UQpIWUYk+btFeoAzMmAHdXDpjqvL/woqKCmpoWERmQ1Nyi7GBjss310hlUr2+vn7PEwCbmfwJX/I9vT2sPkke8kdGRtk6Nl2od7ijw9tUlYwD+oED7cLGQSTs98CZDRPjE17QvAgFsY8Mj3jXcmU484FrLypgAylXBuwItMSVwX1zYGDQixvjKU3656IL2NE2xKHxp4mJGAGL2c+QXC5hd+XJhgM2YbmYY5uAj2QcY2NjXj/pjUS8uC3ceJD6LriUyhL9mh97LuPEpgv2ReKw28aQGSde5aR/NuyuuiSeksdrEgTvbQIHPzdI8owMjgtbuzBWM527bLpceZL6hg27jSeb/SUOwUM8HjPNS3nVOx4pdOgHZSDIgPk1q+c0BLnRnFQGMOFrUgaUATsDesfDzk9BleLkxZ6ebjaKI1a8XHRHEHTgQKtYJtXDLwkpOi3uKiAcPadPkufqCgZ5SxsbA9Fp+/v6vbsbwIAVfTQ64OEtKSnxPovRaSfvgnDRaSORPjaiLTjELyWuzsT4OEUHomwZvCgQgpuLJuuiC3dppOi0RUVhqq2tYXFI2MGbE08WHOgbHE/OuhxtAj78OHB8+sDAgPcrL5O+C/vb+jXu5HHyXMaJTZf5dc/pSjdeuToYkxJ2V10ST8njFW1MTra5QZKH+tK8ZmtXeXlZxnOXTZcrT1LfsGG38WSzv8QhbBIK8fc2+Nxkq+l7ZUAZ8BjQX7PaEWwMmAVgf3/i0ZztWi1TBgqZAV14FLL1te0zYqC6KnFaJ/ZNaFIGJAbCk/0jFnc8wU8SrPnKQJ4xoAuPPDOoNmf2GJjQ5/ezR24eSDYbb/XOWB4YU5swqwzowmNW6VXh+cBAdXWV1wzdXJoP1py9NqQcJDY0NHuKVLIykOMM6ObSHDdgNuFXVFSqO+0kocnuedjECZda/GHx4eom6uLiio1b6k473ctxNyHZjdWUzLVN/O60BgcOEMOG2hf/8hLV1dWabO9VcjtEoVSGfKkMXLi4bkry0NeQzIZG78PkP5ShHsc9cHB1bNhddUnYk8drMm68T+BQd9ppLnj3bBtPNvvbbCK50+rCw99LC/gzgsSFw6HAbn1Q0tPdw+aj7AC1imVSPXTWqsoqzyvDTzkwVFZUsjIleTjPAsnvaYA8my7I43BAv+GirLSUenp6PPnw+hgNj1GcYp4HiJeZ9G98PBHTBdf5UySe8Brx5+Mz8HN1yivKqbSkhC1DnZLSEq/cL9NFF7BL8nCGCbBwGCXsrjzZcISBg+HWVZcLT+DB44PBgb6CuD5YoPr7otR3YTupDNwODgwGZKGOyzix6cI4QfLjRp5tDJlx4lVO+mfD7qpL4il5vCZB8N4CBxLXLkkerpfmNVu74PWW6dxl0+XKk9Q3bNhtPNnsL3EIHqR9cbrw8Lqk/jMMdHV1BVxLUYbn17W1qb/gTB28SmVSPfxygisoXy/kuYhyZZI8YBifGGfl2XRBHocj4aEQ8uQBR1v7Qa+5paWl3it+5RkvBi9j8p85fIsrwyVSPr7IuDIsOsJFYbYMLnMo5+q56AJ2WV5cLJOwA4MLT1Yc8bjYXhddLjyBIyIeR31DAw2Pjnqu2P7+a+u7trLuHmnsuY0TSZe5m+HHDY5sY4goMU5wnT9J2F11SdgTY0DGIc0NkjzTDo4LlEntgps1sHD1XHS58gSbSDgk7GiXxJPN/lK7jE0Ml8mvuscjmQ19rwwIDJhgcePj48IVmq0MEBWFE188uOOhcVu0RygDPAO68OB50VxlIIUB/KpHUlfJFFr0A8NAxWTAOBw6p0kZUAaCDOjCI8iJ5igDAQamzvIIlGiGMpDKgHmujRNnNSkDykCQAV14BDnRHGUgwIC546GPWgLUaIaPAXOQGI6t16QMKANBBnRzaZCTgs0pL6+g6ppa2tmyK8DB4OAAm28u5OqgTKqHXdLYDY2NSf6EL/fW1jbizn+U5CGmyfjEhBfzwi/Ppgvy9uzZG8DR1trmRaA17UL00UOHD3ubBuvr6igWi3turn5dZmECF1h/wi/hQ4c7/Nne54T8YFlfJEKIocPVQ53unh4KhxOPgZIFu+gC9sFBeDYF5cUmYtTV1U1j4xPJaqzYEbXWhScrjnic5cJVlwtPsAn44GxicET6IhSPo48MU2VlpceT1HdRKJWhX4+MjrBjz2Wc2HQZDwrj6uqBnvxnG0PAYcZJch0bdlddEk/+8erHIc0NkjxTP9N2Id5JpnOXTZcrT1LfsNnkSOZQjifYBBu+uRSc9bmrNK8gGBgeHqJofx9taD4h0F50LC4fFz7x5FNimVTPFnQIwbaamlZScwY4XAMcAd/qVU2BXeg4HB04ktv87J92em6SVZWVnssk555ndqFzZfv2H6BlSxsD3CIDX2JcWUlxkffFw5UdPHSYGurrWC8PF13ADlfVxG70VJjwrFm8eBEtWrQotcCCHZMmPFQ4Lmw8WXGEQixPrrpceIJNXtrzkh1HXa236GhcssTryyBNGgu2MvTr/QdaU/qhMYDLOLHpMmdxcAHf0o3X5HFi8Nmwu+qSOOTGazIO9CmuXZI81JXmNVu7drW0ZDx32XS58iT1DRt2lEk82ewvcQibwPOOS3wud6Xm5Q4D/dvpgWs20MpQyPOjLnn/V+mmlkju4F+gSI1ni7SKX6CwFdY8MFAyeSdvaFhPMJ0H+lXlAmdAFx4L3EAZw4vtoHs/8XZ6+wuX0ff6Jigej9LeCx+mba/4V9oa4W97ZayjQCtUlFd4LdcYYAXaATJoNg6SQlLPlgxI00sLhgFdeOSZqWPP30rfvH09vfHCt9FZNTBvFa08+1P0gVd+i7Y91Z1nrZ3b5pgNprG4LuDmlvnc0+Yd7jZ52JxuMs09+yni2WVAFx6zy++cSw+v2ECvKP4D7Xz6RZraqtj/HD3/7Efo/FODz+fnHGAOKzTB4vRRSw4bcQ6hT9/1ULfaOaRdVeUAA7q5NAeMlBHEuv9Dm66+jr50xf+ljfV30pMfidOTH7uXDjzyPfpiXeo6c/v27Smin3nmGertjVAL49WCHcrYLMSlw4cPs3VwrVQPQZ1wlj+3kRE7zffu3cupEuVhc+Hg0CD1Twa6Sq5s0wV8oyMjARzQDxzJXGCDZXd34q5RaUkpYRe4PxmPAK4sGo1O1Q/Ui0QImxb9CRu+4Blh9CaX9/b2ekd3J47wTi7BLX4XXf1ePBZOHoKiAQuX4OXBYUfMkuGh4Yx5AocmRo1f30QsxnLhqsuNpz4CH5xNknHAKwvXIM5PJBIR+y7aKI0T9OvOzi527LmME5sujBOkTMeQf5x4Qibju0jYXXVJPHHjNRmHNDdI8lBXmtdsNuno6Mh47rLpcuVJ6hs27Ecyh3LfDbAJPO+4pAsPjpWczltFJ3/2fnoitIne/fGTqPbj59PmXT+lO9eXB1rlX3js3bvPmyRbWloC13o7niP4ogumzq4uGhsdDRYQeV9WEaYe3E3xixCxDfwJwYr27NlDAwPBkx8lHPgiQCdvL2/3i/PcXiVdkIcvBz8OTCDA4eciEQAsRjU1NcQdEGXcaLkyPO+HuyWX4DILt0l/gnsrvhzb2oPt6u+PeosmLIj8yUUXsGPRwckDt4c7OijK2ETCDpdT8MVxYeMpHQ6OC1ddLjzBJuBjJji6u7oRNsNbxB46eIi4sQDb2fr1wECUrecyTmy6jE0yHUPcOIEejEkJu6suiSdpvBoc0twgyUM9aV6ztaujoxNVM5q7bLpceZL6hg37kcyhXL+GTbAA4pIuPDhWcj0vvIjqV72aLvrnRfS//7KNtn58A2244wra3JQIcGaat2XLFvPWe8VCBH/nnfeelHx8kFymUAa3s9eddmqgjq2ezT0LdxnOOOOMeXWnBQZMIn4u4FKLLx7s91i+bFmgzTY3Ubhurlm9KlAHGZI7LRZF+II7ccOGQL107rSZ6rK5sba1tdExRx897+60+PLmuMCvNRfXXVeb4G7TTHDgbhUWa3Cr7V0XYd1iYVhpfOGLUXKndRknNl2urpvA4R8n0GPD7qpL4kkarwaH5CYqyUM9aV6zteuee35Izc3NGc1dNl2uPEl9w4YdZRJPtvla4tDYBO3zp+BPJf8V+jnHGGin3be8h/6u7Fracu2v6OEDN9Jnx6+liy+8hbZFdVPkkRrTuNQiCJgmZSAdA+YcA7MgTXe9lisDhcCALjzyzMqx3dfSpZ9YRaedtIxwOyvcdAldd9/tdP3IFXTpfz1PwV0JeUbALDfHxGzRDaazTHSeiC+d9GxBpFqcZKpJGVAGiHThkVe9YJyi+5+jZ/1tqn4tvea0Kn+ufnZgoKLCnOWhXyIO9BVklcrJPjMyPFyQ7ddGKwN+BnTh4Wckpz8XU+3rPkSffOOP6FtfvIse7sejlXGKttxE3926iT7y1y/z7oLkdBPnGbw+aplnA+SgenP+S19U3Wpz0HwKeRYY0M2ls0DqvIqsfh99+gdEi7/0aTq79oMelOK//wp95ekP0SWrUjeX+nHi13xDwyIyG5qSy7F5j8s310hlUj24TKKMe/aNxxhwI+NkSvKQPzIyytax6UI9eGv4cUA/cHAYBgYHvTLsejdnNRgeRiaDw0Uo6HqKgGR+PaYevF24MmDHznauDPtMsHsdmyr9yUUXsE+MT7DysOMdWLigfhJ2yEKwKo4LG082HLAJy4WjLheewAP4mCkOPGLp7+8n3PF44cW/UFlZcBza+zU/9lzGCfqJpAvtQuL6PMpQj2uzNE5wfbZ1SfJs4zWBg58bJHlmPHFcJOTxNsFYzXTusuk6EptwOGzYbTzZ7C9xCP1x4bBFXXgYq+fRa7jpfXTR1/GXR41aQE3BhkHdXLqADLLAoWBxYxZs4+Nj7MJjgTdB4SkDWWVAFx5ZpTO3heE8hp6ebjaKI1a8XHRHtPjAgVaxTKqHXxKIWlpbWxsgDV/sDfUNrExJnqsrGOQtbWwM4MAhSsDBtbmnp9f75VdTXR04eMz8umcjskb62EitIAC/lLg6OIgM52BwZUNDw1RVxR/ChmO6uTo2XcAuRafFOSe1tTWsTAk7fgmJLq6Td4Q4jDYcsAlXx1mXA0+wCfjIBEd5ebl31wOLEK5P2fo17uRxdVzGCewv6TK/7jld6cYrVwdjUsLuqkvCbhuvtrlBkgeepHnN1q7y8rKM5y6bLleepL5hw27jyWZ/iUPYJBTid3PwuWBCkzKgDLAM4MsZaYw5uZStoJkFzwAOZsOiA4tFLPA1KQOFzIAuPArZ+tp2Jwbq6+u9enCR1KQMzIQBLDpM0qBxhgl9LVQGdOFRqJbXdjszgNupSNhUhz9NysBMGCgvS4QtiPRFZnK5XqMM5C0DuvDIW9Nqw2aTgYryxJeIPm6ZTZbzS3ZlZeIMGDxu0btl+WVbbU1mDOjm0sz4yuurKyoq1Z120sLp3PPgJjo0POy5C1ZXV0/1C5ubKG63c+6IqCy5pGLjlrrTTtHr3WHiOHR13XW1SSbutAY93GpHRke9Rcfzf36B6uqmN1ZLLonIl8rUndYwS54Lq92tV91pwZatPyXKeJ4wD6GcG3tS/1R32un+qe+sDMQpHA6xu/V7unvYfIg7QK1imVQPnbWqssrzyvBDAobKikpWpiQP51kgSZ4Gki7I48qgX+ICuoYqh2hwaIhwJLbZbAr9cJdESs7zMogoEk94jZjPya+QydUx4eG5MtQpKS3xIsomy8J7F13ALsnDIVjAIuHg8kfDYxSnGFvHxpMNRxg4Jjf3JrfZVZcLT+DB4yNDHLBXdWUlReNxb/GR3Fdt/XpwYJDt1y7jBJxJujAmkZJxGY7TjVeuDtorYXfVJWFPN16ldknycL00r9nahXN9Mp27bLpceZL6hg07yiSebPaXOAQPyXubPOGT//SORzIbBf4eu+27uroCrqWgBecQcK6vhjKpTKqHlTNcQfl6Ic9NlSuT5AHH+MQ4K8+mC/I4HGXel0qIlQddIyM1NBGLUXFxcYpLrTnMK1HfsDP9KuXji4wrM2HquTK4zKGcK4NGKV/SBeyyvLhYJskDBvwK5XDYeLLiiMdZea66XHgCR0SZ4wBPdXV1Xr8BLwjdYu562Pp1d4809tzGiaTL/Jrlxp1tDBHJ40TC7qpLwp7oYzIOaW6Q5KFfIHFcIF9qF9ysgYWr56LLlSfYRMIhYUe7JJ5s9pfaZWziEen7p3s8fIToR2VgJgwUFRd5l+GRC75ENCkDM2UAZ3ogdfd0z7SKXqcM5BUDuvDIK3NqY+aSgerqROA93WA6l6znvi4TsRZutXoCbu7bU1uQOQO68MicM62hDHgMVFclNpXiJEtNysBMGSguKvIe0eH67u6emVbT65SBvGFAFx55Y0ptyFwzgKB6SGa/wlzrV325y4Bxx+7o7MzdRihyZcCRAd1c6khcPlYrL6+g6ppa2tmyK9C8wcEBNt9cyNVBmVQPu6SxGxobk/wJ+yZaW9so7i+wyMNdh/GJCS8Ohb+aTRfw7dmzN4CjrbXNi6zKtcvowq/VQ4cPE86kBGZsFsQrElxg/Qk7vA8d7vBne5/HxsbYsr5IxDtim6uHOt09PRQOJ/abJAt20QXsg4ODrLzYRIy6urppbHwiWY0VO1yEY7E4y4WNJyuOeJzlyVWXC0+wCfjgbGLDkWxjPGLpRfROr68MeY9cpL42MjrCjj3wlOk4gcFsYxLlcJ30J9sYAo5MsUOeiy4J+0zGK9cuSZ5pf6btQrwTF5tAH6fLlSepb2DukvqTmdc4nmz2lziETaT9b8FZ3zCurwXHwPDwEEX7+2hD8wmBtmNQcPm48IknnxLLpHq2oEPwFGlqWknNGeBwDXAEfKtXNQV2oWMxARxcm5N1Vb1YSdHoANXU1FBZaemUnzvnXrhv/wFatrQxwC0y8CXGlZUUF3kTBVd28NBhaqivY708XHRh5zpcVRO70VNhhovCtHjxIlq0aFFqgQU7JivcDeK4MLv1pTIRRyjE8uSqy4Un2OSlPS9ljMNv4/q6Ws8lG54tg4NDYl/bf6CVLXMZJzCebUyinAv4lm68SuNEwu4a/EzCPtPx6u+8kjxcJ81rGP9Su3a1tGQ8d9l0ufIk9Q0b9uR5zc+Tzf4Sh7AJPO+4xOdyV2qeMqAMBBgwGwWllX2ggmYoA5MM4MsBKRG7hbu/p1QpA/nJgC488tOu2qo5YsBsMMVtdE3KQCYMYNFqfhFGJw9vyqS+XqsM5CoDuvDIVcsp7gXBgHGp1dgbC8IcOQfCbFDGbW5NykChMKALj0KxtLZzVhjAr1bzuEXveswKxXktFEdsI+FRnS5e89rU2rgkBnRzaRIZ+pZo8eLFxP36wo5nLt9wJpVJ9bAZ0MQGMDKmX+NeQCJOpiQPsiCTq2PTBXkcDtTBsdicPL8uHIWN66MDA16wN7QjUX+6ReadlA8vB65sdGzM86DgyrwvK8sjHq4OcEi6ECNlVNgMhiOYgYWTKcnD9ZDJ1TGxWqQyEUcoxMpz1WWzla1d4IPDbsMhyUPwONjyzy+8ENjYib4m9Xn0T2Dg+qhch0R5pj2cPJRx4yTRr+VxIuFw1WWXJ+Nw4Qlt47iw2QTBA7Opy5UnqW/YsKNMwo58yf7pbJLoI6n/deGRykdBf0J0Wrg/Go+DZDLgqsrlm2ukMqneyMioVxWxAfwJGAaHBll9sjxE8Rxl69h0Qd7A4IAXoyAZB/RLXGAQJusaHRnxvpSLhkemntlzZ3vAdZPLh95QiD8PZBgh1MfG2Hr4whobHWNd1lx0TYzHaIx4efjSBJbhCs5NmMeOiLGQybUZ+UhSmYQjBhyTrpjJ9nLV5cITePD4yBCHZGMsOoCju6fX847Ce5PQ16Q+7zJOIFeSZ8YJN5ZNmTRe+ToydiOPryfPDRL2TMar4dbGhbmGxye3C3c9M5277LoSXPA4ZJ6kvmHrT/55zeDCq7EXZ3+bTTBHcUkXHhwrOZ33Ij3yT6+ms77CPDM+5zv06H0X0UbhAdvQ0CD19HQHfnWBDvh2c252KDtwoFUsk+rZ3LOw4a6hvoGVKcnDLxMMTg6jTRfkLW1sDLjT9vf1e4sITp5f15LFi+m55//sXY+7H0ism2ikj83H9Tj3g6uDXxPRgShbNjQ07AW449xf4SnBybPpipDsTovgV7W1NaxMCTsmMiwSOBzQJfJkwYG+wclz1uXAE2wCPjLFIfEEOb29vVRTXU3YrLxoUYPHDf6hr2HS5/qhyzhJyOTHsqvrJnBw+GzYXXVJ4z+T8TpFruO8ZmtXeXlZxnMX8EhzqCtPUt+wYUeZ6xzK2R82CYX4Lxs+N9ky+j63GIg8QA/cySw6aAWtOO/19Ea1eNbtiQ2C2OeBX67406QMZMpAZWWlVyXSF8m0ql6vDOQcA/o1lHMmswEep74nnqA/3HqAxuJxwm2uxN8L9NAHV9C7Tl9HeovLxp97mfFu0YWHO4eFXLO0tMy7Y4Y7VbrJtJB7QmG0XRceeWXnEYqU/zN975ymlAVGbPdX6f0PfIzOPy4RjjuvmrxAGlNXW+chGRoaWiCIFEauMVBenhifGjgu1yyneDNlQBcemTK2oK+votUb11Pqodx99OdHH6fGG8/RxyyzaDtzxwOby8YtniazCEFF5zgDxi0b8Xc0KQP5zEAoLm07zedWF1LbYg/Tt9c+SGN/uo4216WuM7ds2ZLCxP79+71NpO9973tT8vEBG49qa2sD+cjo7OoibLDkklQPG+1whgE26fnTY4/90ovT0tiYuoTCdZI8uLHhSx+bu/zJpgvyqqqqAzg6OjqopWUXnXHGX/nFkaQrTiEPH+K2YCOmPyGmi1mg+Mtwp8QcJpVchqBt0WiUli5dmpztve/vj1JVZSUhjoo/uegCT6UlJay8v/zlJVq+fBmZvQjJ+iTsCKQGjxzJJpAhlUk49u7dR2vXrklW77131eXCE2xy8OAhetnLjsoIh8QThJgyyB4eHvbsgHz0tYGBKDv2XMYJZEpjCPZHkmxiG6/SOJGwu+qSsLuMVxsXKJPmNZtNMGc0Ni6hTOYumy5XnqS+YcMuzWvABxyS/W02wbzxpS9dDxEpKThjpRTrh1xnIPb8vXTNu86hd/kWHbneroWIHy6WSEnekAsRpmJawAwkvKJCXrRkuLdrUgbykQHda5iPVp1qEx6zPEnHvP1qWjGVN/3Gf8dj+/bthL/zznvP9EWT76QIhChGFMfXnXZqoA4ypHo2F9fEnYYz5jU6LTB0dHSyXGCFz7md4dn8zl27qCgcpjWrVwf4QCTUNatXBfKR4Y9cai7q7u6mtvZ2OnHDBpM19ZouOm2mutAmKSpsW1sbHXP00fMenfbQwUMsF1Z32snjyDn3V1ebwP2Vs4kNh2Rjv/17IxFCWPPly3CHqUKMhOoyTqDLNiZRzrlGphuv3JyBcSJFcXV1E5Wwu4xXGxcok+Y1W7vuueeH1NzcnNHcZdPlypPUN2zYpXkN+Gz2T2cT1PcnvePhZySfPsd20C+/eDadf2owlHk+66bcvwAAIABJREFUNXOhtMU8RoFniz7BXChWyT0c5pFbR2dn7oFXxMrADBjQhccMSMrVS/Qxy9xaDpsDcXAPzurD3gZNyoALA97+lnDYOx0Vd6E0KQP5xoAuPPLNolPtMY9ZXsE+Zpm6TN9klQFs9kTC6ZaalAEXBnBkemVFhVe1q6ubcEy8JmUgnxjQhUc+WTO5LbEd9Mg3NtHm1+tjlmRaZvt9TU21p2JQz/OYbarzWr45Bh97RgYGB/O6rdq4wmNAN5fmq83DZ9HH/3BWRq3DLvrqmlpv85m/4uDgAJtvrsMGIy5J9TCh9nT3eLv3/fWwsa61tc17ZOEvk+ThDgOCFSGWgz/ZdEHenj17AzjaWtu8DX5cu9LpGhkeJrhF4q+sbPrQNvySxQZDLsEVmCvri0Q8V0uuDHVw5kM4nIgPkyzXRRd4B2ZOHtxV8et7bDz461vCHotNeIH2jEtgMj7oQpLKRBzxOMuTqy4XnmAT8MHZxIZD4gk8cGUIXgge4C3F9UOXcQJd0hjCOEHKdAwBB4cP42RkdIQtc9UlYXcdr5I8j4jJjbjmvXm1tQsbNDOdu4xcjkNXnqS+YcOebl6T5muJQ9hEOslZFx7G6vpKCBIX7e+jDc0nBNjAoODycSF2f0tlUj3bLuni4mJqalqZ0c7wI9mRvXpVU+CcBMQHBQ6uXel0wTMEezxwuzz53At4UCxbGjybBBziS4wrKyku8iZvriydVwtXx6bL5tWCs0IWL140714t4VCI5QkTtBiQLo1XS6Y8wSYv7XkpYxySjSWbxGKLqf3QIS+A3No1q6m6OnE3DdcjuYwT1LONSZRn6tViGydz5dXiOl4lLsCDNK9h/Evt2tXSkvHcZdPl6tUi9Q0b9nTzGrzCuLOcJA5hE+x54xKfy12pecqAMjAjBkrLSr3ruPDtMxKgFykDk5N22WRfOnjokHKiDOQNA7rwyBtTakMWCgPm6GvcZsQtdE3KgCsDlRWV3q9GnLCKE2w1KQP5wIAuPPLBitqGBcUA9g3U1SWOl8e+E03KgCsDOIyuvi4RgDD5rgci2JaUJu6sucrWesrAfDGgezzmi3nVm9cMLGpYRAhxjjseFZNRR/O6wdq4WWMgFEr8PjR3PQ4dOky/fPxxqqqumjWdKlgZmE0GdOExm+yq7IJlAHc8EHcDv0zxyEXaZFWwBGnDM2KgqqrKC+72s/vup4GBAe9k3GLGmykjoXqxMjBPDOjCY56IX4hqy8sr1J120jCu7nnJ7m9dXV00Mjo65Vbr6rqJyKWc6ybupqg7bcJgNjdWm+uuq03mwp0WLUO7xscnqKWlhbq6u1OO4g8VhZ1cNyX3x+S+65+fUCa5U6o77TRb8AxRd9oEH+pOO90v9J2FgeHhIXWnneTH1T0v2f3t4MFFhOfy2GxaW1ND6k473fnMUeBc4DarW28BudOCLSwsdz/3R+/O2TR7iXfFRUVOrpuS+2Ny3/XrSuf+LrmdS26nrrok7K7jVZKH9qs77XQvsNlf4lDdaaf503fKwJwxsGhRg6fLPG6ZM8WqKC8Y+MtLL9Fvf/c7dtGBBoaEMxLyovHaiLxmQL1a8tq82rj5ZAB3OioqEieXjmnslvk0RU7qXtTQQDXV1YTHQVyS8rlrNU8ZWEgM6MJjIVlDseQdA/BuQcJxxJqUgUwYqK+vp1e/6lW0bu06KikpCVTFwmMipu7aAWI0Y8EzoAuPBW8iBZjLDJjzPDRoXC5bcX6x45jqN23cSMcec4znKWXQxONxb+Oy+ayvykCuMKBeLbliqTnCuXjxYs9tz68Ov9ixY1tKUplUD7vkBwakqJtxQjknU5IHWVIdmy7I43CgDlGcxZBOFzhKxm5OMI3HYx5GjkMEAkvoTC1FzBd4UHBlkItyKXF1cK2ka3x8jEbFfQMhTxcnU5IHbJDJ1UE+klQm4giF2DquuiQMNp4SnGeOQ+IpnS7YGTw1rVxJy5Yto127d1P3pIcLNi8n9zXIQpLGia3M2IKThzJunCS0yeNEwuGqyy5PxgF9XLskeYl2pY5jkwcepHoTk2M1W7pcecLcxbXZhj3dvCbZX+IigT1uaEt51YVHCh2F/QHRaUdGx7wASH4mEGUSO9SlJJVJ9dApBwcGqbsn2AXhPtjZ2UWlZWUBdZI8dH6cEjoyMhqsY9EFeR0dHQEc0A8cXLvS6QKAZBxwh40ODFCIQtTTGwngQwa+XLiy3t6IFxadK8MXGY7RNgdMJQvGbXiujk0X5I2OjrHy4DIJLETB/QYSdiy0YrE4jY0F2wxdSFKZhAMuxFy7XHW58AQewEemOCSebDZBu8BVsq5VTauooqKC9uzZ40WS5fqoNE6gSyozX3LJfdcz0uQC0TZeOQwYJ9nWJclzHq8O85qtXQMD0YznLsMxx+GR2ISbQ23Y081rkv1tNsH451Jw1ueu0ryCYECj006b2dU9j3MThFdLy67dhLLly5ZOK0l6J0UuLS0p9u4acPXSRafl6kClpMvmxlpcXERLG5fMe3TakuJilkNM0K7RaTPlCTbZt29vxjgk3m02Qbuw6PBjRETdnX/aSUetW0dLGxupsXFJUm+SI9DiIsn9keu7RqjNnVKj0xqWiDQ67TQX6k47zYW+UwbmnAHj3YJfvFiEaFIGjpQB3KnBYhBf+njcYu4gHalcra8MzAUDurl0LlhWHQXPQF1tItCXOUWz4AlRAo6YgerqasJZMVh0tLa1HbE8FaAMzBUDuvCYK6ZVT0EzkOzdAm8ETcpANhgITwaQ6+7u8fb7ZEOmylAGZpsBXXjMNsMqXxkg8jYDImgcks0TRclSBjJlAAHkkPSuR6bM6fXzxYBuLp0v5hegXni1VNfUepvP/PCkwFLmOmxY45JUz9s0191DRcXBLojHEZkGWjI7svv6+gMwbLqAb8+evQEc2QgS5weCL4hDhw978Tdqa2pTitFmbBb1p97eXurvj7JlJkic5NXCyYN8SRdu2Q8ODgpeLRN0uKOTRseCB6FJ8oynydDQsL9ZU3sSpDIJB06A5drlqgt7JTh5Np5gE3g8cfVsOCSebLogT9KFfNikrq6OIpFemojFpvqWNO6gSyrDOEHKdAyhXdz4Nx4UXJmrLgm763iV5HlETG7ENe/Nq61dcKPNdO4ycrPJE2zC4bBhP5I5lMOuQeKMZfXVygC8WspKS2j1qqbAdfhy5vJx4c6WPrFMqne4o4OqKquoqqoyoAub5pYsWczKlOTBx3xgcMDb4e8XaNMFeY2NjQEcoyMj3uY9rs3pdEE/PA38CZMSFh/xWIxqa6pTDoPq6u6hhvrEPpDUenECFq4MdfCcv5Q51RIeFFwdyJZ0RQeiVFpaxsrDJsb6+jpWpiQPd3ZGR0eouqo6tUlEBF1IUpmEAyd4cu1y1eXCE85IAB+Z4pB4stkE7cLCk9M1bZN6b9wODQ97fapp5Qrat28/O36gSxpDGCdIXN+1jSGMV2mcwFWdK3PVJWF3Ha+SPPAgzWsY/1K7/lRVnfHcZdPlypM0h9qwp5vXpPla4hA2CYeD7vdob/DnJnI15QkDA9T2+Fb65SO30qeuaqGOzzxM+254E62wtA6h3HFSoj/hzgSXb66TyqR6cN3EooOvF6KysjK2TJIHHOMT42wdmy7I43BAP86s4PHZdQGLVA9ukXgejwBfCR0JBvEYJvmz4RWLinBR6rWmLBwOe4sErh6ukfIlXXBHhT6+Xlwsk+QBAzx5OHnQJWG04ojHWXmuuiQMyJfalVjoZY5DkmfThTLYmeMQCyBjL5T3RhLniwwPj3h38KQ+KI0hjBMkrp5tDNnGCc7pkeS56JKwJ/jJfLxK8jwiBC5QJrWraHKscm120XUkNgEnHA4JO9rlOodyeoxNDJfJr7rHI5mNfHof20lPXvdaWnvms3Tv2q/TnX0TNJZm0ZFPzV+obTHeLThUTJMykE0GqioTdw/hXqsbmLPJrMrKNgN6xyPbjC4IeQfot//6Fjp992fp9j0fpvc1lS4IVAqCCN4t+OWL/RQjo6NUVqq20X6RHQbwGKq8vJyGh4eps7MzO0JVijIwCwzoHY9ZIHV+RY5T9KnL6JNX/Q398xd10TG/tuC1I9w5EjZzaVIGsslAZUWFJw6L2oMHD2VTtMpSBrLGgC48skblAhEUe4zuuuJeeu4fT6L1//kqWhkKUWjlB2jTz56jxNaxBYKzgGHg0CckRKzFHghNykC2GMB+kOpJ91o8ctGTcrPFrMrJJgOhuD4MzCaf8y4rtvti+usTXqDRrVfTv330NNoQbqfd//4WetPm1fTGJ++gu0+tn8K4cePGqfd4g4BjlZWVdPbZ56Tk4wPcs7CLnkvwXIAXApekevjCTex4Du563rsXniZLqLIycT5BslxJHjbaISARJl5/sulKyMP5Gqk44GbX0dFJa9eu9YvzotbadKEChyOZp4ZFizyPj/r6eiouKqZYPE7hUCoGyAE+PJZJbNRKhQLXUtxeJ+ZAMrhWFjFcQIKky+MJZ40w8vr6+wm/prk+IMmjUIhiExMsF2bBxfFkw4HFmvlVn8KGoy4XnmAT4KitqUmB4H2w4RBsbLMJOITbNGLU+JPNJsMjw954LikuIbj/JidpDKW1ieehEOyjGK/SOIHLL9tnJhfcov0FXRJ21/EqyQNfyeM1mT/MNVK74O2CzeqZzV2yriOxCT+HytiPbA4N9k/YBJ4yN998Yyp96tUS4CPHM8Ypuv85eqT4FLrxgtfSBu87eAWt/+hX6dofvoU+9Pl7aft9F9HGye/m7du3p7QXn/H3+c9/LiUfH+CnvaH5hEA+Mp548il63WmnsmVSPVvQqWuuuZbOO+891Mzok+TBVRU7wFevWhXAYdMFeXD38+/KbmnZRffc80OWi3S6AIDDkcwTFjU48MlziayrEwO3Ifx5W3s7nbhhQ6BdOEcCbpbcomTf/gO0ZnWQCwiRgpWBv/KyMlbegw89RCe/5jXzHiTu4YcfobPOelOAC5wLAW+YOsYjy3gGcGUuPMEmv/3d7zLGIfFus4l3Bg0TJA51bDbBGQ5l5YkfA8cc/TLP7dqQJo0h1yBxGK/cnIFxgoir3LzhqkvC7jpeJXngKnm8Gu7wamsX5ozm5uaM5i6bLleepDnUhj3dvIbx458ngV3i0NgkmTvzPvjz0JToaw4yMEgH/7KHxht9v0rCp9Abz19L9OwL1NKvt/YXgmHxuAWbTPGLa3wyRPxCwKUY8oOB4pIS78wYtAaLK9w106QMLBQGdOGxUCyRFRyVtPxl62hF+wu0s52JgvryY6i5Rk2eFaqPUAgWHSZ+iz6HP0IytTrLAO5e4Y4a+pduNGUp0sx5YkC/heaJ+NlRW0y1r303XVj8B3r82UM07TPRQfuf66EV572e3qgWnx3qHaQ2Llni1YL7oyZlINsM4Dh4c7ZHR2enBpHLNsEqz5kB/Rpypm6BVqz7AF36/TpqueAaurQlQkQD1Pa/19LNP/gs3fi+4/So2gVktoqKCiotLfU8W6LRYIyZBQRVoeQoA+ZsD8DXRy45asQ8hF1wCw94fZwLF9NQiEoue4Ta886oVdS06b/pTz8aoujZ9RQKHUuv/OFG+rvfXErnVxecuRe8dc2ZHjh3QZMyMBsMwAsI3iN45KIRbGeDYZWZKQNBH5hMJeTU9S/Sw58ooXf0TtADdfn8JbyCjn/7nXRb2510Wwb2KS+v0Oi0k3y5Rru0Rd2EaOwAT07YXIqItXCZhCcCNgUmp75IhHC8Ojwi/MlEpw2H4Q6cmrCw5urgKtTjyoAFUWE5ebGJGHV1ddPYeHCToiQvFpvwXJwRO8SfoAtJKhNxxOMsdlddLjzBJuCD49CGQ+IJPEhlkAfXTVZXBjZBH4J7I/oaHr/4+yEw2Pqu511jiSbNybNFQnXVhTZwulzHqyTP65zMeEW+rV3wDOGiwqKeiy5XnjC+OBw27CjDRvdMoxNL7dLotJO9KHbge/SDlhvpP99ZRs9ddyl95bSV+ujBjDDvS2CIov19rPsbBjvnFofqcDuTyqR6cBOT3LOwIa6paWVGLmlH4grGudPCLwg4uHal0wVOJHdaTl7D/nratfs5b7Mpos0mp5LiIhoZHaFlS4PRbtO503J1IBtfYlyZzZ0WgeoWL1407+60OOuEw44J2tWdlpNn4wk2eWnPSxnjkHi36fK+8HsjrK5MbYLotQMDA3T48GF67Skne4/5kvuaq+umbZzMlTut63iV5ifwIs1rGP9Su3a1tGQ8d9l0HYlNuDnUhj3dvCbN1xKHsAl3TgvaO4s/+1+k+y/4D9q+gLw3w6u20Hfa2mj3p/dTz+kfogueSj1YJ3kQ6ntlYK4YWL5smXd8Gb441bV2rlgvPD3GyyXu7ffYX3gEaIsXDAPMwmOE2u9+jbcHArchU/9eThuu2UbbDszgeXTkF3T7ydn0okCI9y/RD24+k04vuYK2RrgVzThFW75G17+vOrGH4/230H+1+rHiMcTt9G8/H6Of/PDpwB6P5D0gqW0PUejMy+nin+/Wo8cXTPfNDyDYYIoTY5HUtTY/bLoQW4H5DHfU8Es0Gk2czLsQcSqm/GeAWXiU0YpNT1HkwbNoBRGVXb+DhuNxisej1Pr4yXTyNzbRpr+/hbZFuS9+Q9g49f3v76nxrS/L0qOMcep78D108pcfo29esp0e9x+Q5anFouPT9LFX/5H2Xdnq4d174c/p0ld9gbYGFh/FVL36eGocxto/NYXX30IPxCP03DeOJqLzafOuIS/EdLzvUbr/zJ/Sj972JtrwmQdpp635qSL1kzKQloG6ujrvGuxtMMckp62kFygDGTJQ7J0fk+hr2GiKvR+alIG5ZoBZeCRDeA297pXrKHHwbhWtfMMN9I+XNBJt/z5t/XV38oW+93vp13ecTO86rtyX7/qxmGrPuZ/afnwjXfnpWl5I7Pf04HW30iM3X043NmNgVdHKc26iH7z/Jrr0xsdT72zE/kiP3PIwHfP2V3iLK16gL7dmI537uZvo2rM6qOPL/0Fbn9ezF3wM6ccjYADPQnHnA0nvehwBkVo1LQPFxSVUXp6Ym1/as1dPNU3LmF6QbQYEr5Yeev53f6T2Ff+XPnfqoiSdfdTXGdyhnnRB4q33mOV0uj3NsiZQ7wgyYs/fSt+841g6/u+XJN1lWUsnn3sK0Vsfokc/93o64/6/oqO/Xkyv2HEMrf3xf9Pd5yQOcJqx2vA6WvfKSqKHH6cf/WoP3bh+fZKuGUtZsBfiXImGhkVkNjQlA8UmNy7fXCOVSfWwcxplJo6GkYNX/OLv6e1h9UnykD8yMsrWselCvcMdHQEc0A8cXLvS6UIbuHq2fMisrKyg/mjU+6uvq/M2ZgE7PD84nnAMNoIwYW+IP+G2OlcH18FTgisbGR6hifEJVt7ERMzb7V7EBCuT5EEWdtdHqM8Pj6ALSSqTcMAmHHZXXS48wSbgI1McEk82m6BdsDOry8EmRhfsgo2m6G87fvc0Na1cMeXNwPVd2xiyjxN+3oA8pEx1YZxwdVzHqyTPAyfgS4x/HgfGaqZzl02XK0/SHGrDnihzm0Mlm8Tj/KMBfuER+yP98Rc9RL4jtuEV8v07+4hWnEPnpyxIDHV4NY9ZPpDmS7mPnrvpg3TT2d+lW7w7FEkyYn+kB9/6Q3rhrqto84zcXvvohcceoAfp1bR5TapXAKQ2jj9E337y03TBpt/Q8KYkPZm+jXVTbwfcCd9I7zp9HRXjcK4nrqSvX3YzfelxuAeuoMZP3kx3X/0u2pijR5MjYiwXTKunu4fNB4UHqFUsk+qhk1dVVnmRHP1mAIbKikpWpiQPX8BIHHabLsjjcEC/xEU6XRKOdDytXLGC+vqjFI/FvD1K2AxYXlFOpSUlXvA2P0/AUVJa4pX7yyLxRMA3fz4+ox5k+9P4+JgoD0e8AwtXT5I3Gh5DzGC2DnQhcfJsOMLAwWB31eXCE3jw+MgQh8QTeJDK0C4sLLk2u9jE6KooL/cWtv39iQUAPFPKyhJ33DIdQ7ZxMjgwKI5JYMlUlzT+XcerJA/YpPEKW0ntwoFtmc5dNl2Yu1x4kuZQG3aUueiSOAQPWNhziV14xJ6/l+56eJyKP7OOjvfuWgxQ26+/RN+7+cv0n+3n0FkPXkwfERcEk49Z7kj3mKWWjv/EFnrHW99LF3/1runFh7fouIz+G3miDq4p+N4/hjasSAyexBWJvRwvp6fIv8VUkODLjtBz+7tofH0TFcd20pPXf5A+cfsAFV/0t/TR48opdmALXflXu6j/8Q6Kn1pN0afeT39z2j/SBSdsoH0fzr27IXje29XVxUYgxC9dLjKhIUwqk+rhFxzCR/P1Ql6EVK5Mkgcc4xPjrDybLsjjcCQivoZYeel0oZzDbss37VqzahUdPHQIl3ocYNEBt0kuAq33eKakhC0z9T1Bvn/4wuLk4QsO+rgyhMyWyiR5UItfXpw8c5dGKpN0UTzOynPVhXocBuRL7QI28CHVk9osybPpQhnszOtys4nBAZloS3RggDo7Me5rPF1c37WNISJ5nHT38POGuYOTqS4zTsBLckrwI+OQ5gZJnpHN4UOZ1K6iybHK1XPR5coTbAJOOBwSdrRL4slmf6ldxiaGy+RX5mFIIrT6s3QiHRfZShd4ni3V1PSGJ+j+13+P7t7/P/SLNzfJdzMy8WYJn0Tn/PwGesen3ksX43jv5EWH/y5IMuo5e/8gPXzOKioBB0Un0uv+v1V0/E0P0ENffyedBOaiHbSXXkkb12PfSTFVr38jvXZFO3X8uU09X+bMRvmlCFFrkXArXE8zzS/bLsTWYK8HviDwOKezo3MhQlRMecgAc8djL/32gR3UvuJi+twN19LmbzJrE5GImT5mSRIwufigf3gnnblvDTXfknT3I+kyt7dmEUV0vJMAeLXcTres5+/ewAPmF7hj3L+d/ueWn1PL41vphnYsQTQpA24MYIMpFh/d3T00MqIbmN1Y1FqZMFBdVeWdnNo/PEw4lI47/C4TeXqtMpCOgeCqYvxpevrHfYH9HekEJcqz7c0yM61EtXTMGefSOUI4+I7iN1v2pMxUB3NdbCft+PczaenRP6H7y8+iv7nhi3QZfJA1KQNHwICJ3zI6ij0SmpSB2WUAz+FrJk/MRaTkSCS4GXh2Eaj0QmMgsPCIvbCdHnpxhVsI9UwesximzeOVy39Mjz786enHLqZ8hq/h495Nm878iedtMh0Ofi/tuO/31PCFd9L5me4XSau3j57/9jvotV94HW3585fplg+dS821eq8jLW16QVoGcMhTRUXiLpu0KzytEL1AGciAAWyKLJn0WNq3f7+e75EBd3pp5gykflPGdtCPr7uNHqRT6PyTVmX4yMDhMYtZdExtLk3s+SD/htOZtCt8Br33unfTrW/8El36hq/SLc2D9NwPPkrvu2Mzbfn9qygY6WImQmdyTR8d7h8nquui5371OB30qkzQ+K++Q9tO+odZWPDMBJPbNRUVlRokbpI616BTZhe6cYPzWwJxDbjkD7SExywdnV3U29PrneuBW+D+hMBi3T09FAoFfj94u8m5OpCB/SNcGZ7z4wAzTh4ClR3u6KTRsellvcEjycOiKRaL09BQ8JERdCFJZRKOMQG7qy782ue4sPHU29vrBW7j6tlwSDzZdEEeuOd0udjEpgsbEuHm3DbY7gWTW9bYSPAiQkK/hvcCNhL6E9rF9WtbQDLbOLHp8o8Tg8V1vEryjNxM24V4J1xwNshz0eXKE2zC4bDZZF6CxI0/tYnWn7aNXvQY307bTjuOVn7rkQy8M2bqzWJM2kfP/duWhPdK8kZSs+fjb+6gbf99MZ0/2c9xlPlfn7CVHvSqX0cX199K16bgK6bqU79Nd/3ySvr6R5dQ6PFGavzkdXTL0++j85uSPV2Mfv41Vc+LtPWEbbT1nO/Qo/ddRBtT5vdaOubtn6OvbP8EfXr1vbQVuj71r/SBC35Gt+94lL7zD5fTlqzfZeExZyt3aGiQykpLCEHT/GnPnr1sPq7b2dInlkn1cHYG58YKecXFRbRkyWJWpiQPrmADgwO0tDG4xLTpgrzGxsaAW+/oyIiHg+MinS60gcORKU/40oZrLTwOGuoTp00m26Wru8c7AjvhZZFckggEx9XBVajHlUUHolRamvB0SJWWCJhXX1/H1pPkjY6N0ejoCFVXBV3coQtJKpNw4Jc5h91VFwK3cfJsPMGjBe6nXD0bDoknmy7I6++PsrqAIVOb2HQl7F/ibTSFZw4WZab/28YQxqu5DvJNwjjp6OhgyyAPiRsnNl3S+Hcdr5I8YJPGq61df6qqznjusuly5UmaQ23Y081r0nwtcQibwK2XS1PL1+JT76YXjuiB8tH0ljtxzPhMUy0df8m9dAt3ORYfPzsppSRxlDl7ddJ1VbTydV+lG371VbohKTeTtzPTk5AYbvogfeq/8Jek4cuRnH4ur+60CVsaVzDOHQ1X2NzOUC7Vk/I5l7SXHXUU4RcUJhF84fojPao7bdK4c3TdhYSErVNl4ZNxO/WX5Is7rb9dcHHGDY2qqiqv3yFg4eDgEC1fvsw7wIxzO0/IkN1YJddNVzdRbpwAg+t4leQZbqTxKrVL3WkNc9M2mc6ZfpfyG346W98pA8rAfDMA7xb86sSvT3PuxXxjUv35zwDiuWDxgYQzZeBhpUkZyCYDuvDIJpsqSxnIMgPl5YkTRuFtEI8f0S3JLCNTcfnMQFlp6dTiA8HkcHS7JmUgWwzowiNbTKocZWAWGKirraOGhgbvrofZaDYLalSkMhBgAMeq47ESNgK3trfToEayDXCkGW4M6MLDjTetpQzMGQPGtRYTv971mDPaVRER1dQkjlHH4762tnZvEaLEKANHysDU5tIjFaT1c5+B8vIKdaedNKOre565K3Gk7rSmNwFHe3sbjU/EvEkfQb1gJyR0vLbeAAAgAElEQVTjThsOJ1weTR28Ym8IPDa4hHpcGVzw4MbKyYtNxKirq5vGmFvukjxEY4VnDiJ2+hN0IUllIo54nMXuqsuFp75IhMAHx6ENh8QTeJDKIA9us6wuB5vYdEk2wWI3Go160WwffeyXtGL5MvQwz374h3qZup3axgnKJNddySXVdbxK8kzjMm2XutMa5ohgEyxYuaQLD46VAs0bHh6iaH8fbWg+IcAABiCXjwufePIpsUyqhzDKiEzJ7RqHm2BT00pqzgAHBjx2ynPHPdt0AR9cAf04MK0CB9fmdLrACYfDhSfgiER66cTmZm+jHzxZGurrp87pgEsn55Wxb/8BWrY06FoMbPgS48rAH6KgcvIQqG7x4kW0aNGiQN+Q5OELBJtiuQikxqtBKhNxhEIsdlddLjyVFBfRS3teyhiHxJPNJt6XcG+E1eViE5sum03gFokFCDx9MC6OOfpo7z3k2cbJ/gOt7BgyYdS5cZJuvHJj0nW8SvMT2iWNV4x/qV27Wloynrtsulx5kuZQG/Z085o0X0scwiZ+Tzy0FUkftUwSkXcvka10+cqQ9wWFX3Wh0Ca6eHfwIKe8a3eeNggujYjjgl8Q+DLSpAzMJQNYjNZOPnbBoW8vvJg48WkuMaiu/GFAFx75Y8uklgxQ6wO30vfak7LOeQudfxwf7C7pKn27gBlYs3qVh+6555/3TjNdwFAVWh4ygF+vuDOIVyw+cLS6JmXAhQF91OLC2kKvE/0J3f7/3kSf632SNufY6akLndr5xIcYLpWVlXTo0GHCHpK1a9fOJxzVXYAM4IwPBJTDYxk936MAO0CWmqwLjywRuXDEjFPfE9+hm9tbaPzqdXT4r86gi995wizGqlk4LS8EJOZcD2y+PHT4ENXW1rB7MgqBC23j/DCAU3Th7YKNzlh8rFm7Zn6AqNacZUAXHjlrOgF47DG65/rHqJ3Gib72cbr6ayto6ydvpruvfhdtrEl9srZ9+/YUIc888wc6fPgwtTCBzLBDGZuFuCTVwbVSvZ7eHqqsqGS/NLHTfO/evZwqUR72PQwODVJ/X3+gnk0X8CGmgH9DJfQDB8dFOl0AwOFw4Qk4EO/C4OiP9k+51MLT4MW//IUWNTR4v0KTN3KhrLu7O8AFMuCVgQ2S/oS7KOUVibMb/GUTEzHvGG1/Pj5L8hBnZHhomBB8yp+M149UJuKIxdh2uepy46mPwAfHrxWHwHs6Dnt7I1RaEpyqXWxi05WpTTAfdHV3e3fgnnzyqcAGbYwTxBni5g2MSSRunKQbr5w81/EqzU/AJo1XW7swVjOdu2y6XHmS5lAb9nTzmjRfSxyCB3hrcSnYm7mrNC93GAifRRf9Yowuiu2kJ++8me795nfoS1/7R9q0dBXt/OypKXc+/AuPvXv3UU9PD7W0tATa6+14jvQG8pHR2dVFY6OjbJlUD26U+OWE2Ab+hGBFe/bs8dz3/GWSPEzC6OTt5ckbWxK1bbogD18gfhyYQICD4yKdLmjlcLjwBBwdHZ1TOLxzPDDzxolGR0a9zaaIUIsvAJw2iY3ESNHoAMEVk0tDQ0M0MhrcoAqecGAUvCX8CdwiYFV0YMBf5IVQ5+TB5RRfxCYgXHJF40YrldlwtLUHbeyqy4Un3G0CH5nikHgHL1IZ2jUwOEjj48EJ3MUmNl0uNsHCDf3sLy+9REuXNnrRlI2dMU4GBqKeV5bJM69GFzdOUCbNDdL4dx2vkjzglMarrV0Yq0gDzDhx0eXKkzSH2rCnm9dcbIITl7mkCw+OlXzIC2+g0y78Bp12wWY697K30Nk3/Tdt+/gpKXs+tmzZktJSLETwd95570nJxwfJZQplcDt73WmnBurY6tlc5vDr/owzzphXd1pgwCTCceFNIBbXXbSbcxN04Qk4sPgxONoPHqSf33f/FNfR/ijVTUauRcj44449lqqrqghuomYz6tTFk28kt06bO21bW5vnQjnf7rSHDh6iEzds8DfJ8/Rxcd114QkL1d7e3oxxSLyjMVIZfoX29EZo+bKlgTa72MSmy+ZOa+sbkUiEmpubPXyvftWrCTGGkDBOJLdTVzdRaR5yHa+SPOCXxqutXffc80OPi0yOArDpcuVJmkNt2NPNa5m60xqbeJ3B9y/408Z3gX7McQbCJ9FZV36OPtPxU9r2FH/rPcdbWJjwJ+83j46Oer++zZ2O5//8Z/auRGGSpK2eCwaKi4qn4rrA00U3nc4F67mtQ+945Lb9Zoa+5ng6tnENDaypntn1elVOMdAX6aNFixd5Hi9HH3WUd96HTv45ZcKcB4u4LvFYzIvnYtxsi5l9RDnfUG1AVhjQhUdWaFzgQvqfo7uaL6XvrddzPBa4pTKDF8LB1SFqaKinNavXUOOSxZnV16uVgSwyAFdvJMQUwuKjccmSLEpXUfnEgD5qySdrElHswDa69tr/pZ2TR+THWm+lz79zP737tjNoRZ61tVCbg8cq2Oi1csVy2rjxr2jdunVUwng9FCo/2u75YwCLj8qKRCyhA62t1NffN39gVPOCZUDveCxY0zgCC7XTwAMX0IlXjhOteD+df92FtPkn7w+40nLSKyoqqKFhEZkNTcnXYJMbl2+ukcqkenDdQ5nZ0Gbk4BXHgsONjJMpyUP+yMgoW8emC/XgreHHAf3AIWGw6UIbuHq2fKldwIGd7UYedu+vW7uWjjrqKM8DCRg9z5H+fs8zwvzqxOLE3ybDMbwQuLKR4RGaGJ/w4quYa80rdryDx6Li4JQhyYMsBBCLUPDLB7qQpDIJB9rLYXfV5cITeAAfmeKQeAIPUhnahbD0rC4Hm9h0ZdMm4BXeOOjXv37yKWpasSLFWwocIpl+7X2Y/JduvHJ1XMerNO4MHk4X6kj1MFYznbtsulx5kuZQG/ZEmdscyvEEHuJxDRJn7JvXr+GmS+i6X11C1+V1Kwu3cY2NjYS/5IQYGh0IyDY8TFg8YtLXpAzMJwMIUlZRVuZ9QWPh1NnZSY1LG7VvzqdRFpDu4M+XBQROocwtAzhLoKenm3UFxcqbcxEFwgMHWsUyqR5WyJJ7Fg7CaqhvYGVK8lxdwSBvaWNj4PAjHGwEHFyb0+kCJ1w9F56AA2cdcPKSsWMjH86kQCA53OqORPrYqLDAhl9lbFRYkqPT4pyT/7+9LwGPq7jSPd3ad1nyJtnGBrMYGwhJMAYGgonDkjAvCST2DBkCTJIBYhh4YQKBhMUsCQO8FwIBQsiQgYQAwYbMZAIBjMG8ELAxJGGxvGDjTQtI1tJSa+/lfX+1rtTqPqdaulZLre5T3yd1d9Wtc/76T1V19b116uCUVK6eJA+/oEQX14G7IJw83AURo9N6vSwG17pc8IRDz8AHh92GQ+LJZhPIwx0tTpcbm9h0OXefOF1ubAIb4g4Z+iQS+uSh8w8xi2PnFzLXr21zgzT+3Y5XSR7wSuMV4x93PDnsOFl4tHOXTZdbnqQ51IY90byGfhEbxRvYJQ5hE4+H383B50KaJmVAGZg0DBw0Z47BisOtcJtVkzKQCgx4vVlUXl5uFvG487Ft+wfqbpsKhplgDLrwmGADqHplYCwYwK9Kx4sAz9Y1KQOpwgACy+GXcm5ujoEEjxfc/dCUuQzowiNzba8tTzMGZs6cQVlZWYPP1dOsedqcScxAJKptCeXnR1z6W9vaqL6+wWycncTNUuguGdCFh0vitJoykGoMYNExc8YMA6vN1zYYTC7VcCqezGQAm55xnD/+kLB3ZcfOncYbKzMZydxW6+bSzLV9XMsLCgqpuKTUxGWJLUS0Q8Q1kJJUJtXDprnWllbWPRMumHV19YiDFpckedjwFwgGzUan2Eo2XZC3e/eeOByIuAgcXLsS6YJ+bLjiEicP10ntAg5s+uLqSdjxaxKT/K7du6mwMDLJR2NBuz76uDE6y7zHM3jsEeE2hAUCQWps2k99/fGRZiV5cKULhcLU3R0fKAq6kKQyCQfi0XDY3eoCT5w8YJPahTgt4IOrZ8MhybPpgjxJlxub2HQlwyYSdq/HS4i0vLuri/bs3UulJaVUUlICeOaOnTQ32MYJ+OXGiW28SvIMkIEYVc575xXyEBSR04WxOtq5y5HLycPchcTNJ7Z5DVxwOGzYbTzZdEkcYu6S9pvpwsOxur5Sd3cX5eXm0JzZs+LYwJczl48LN9e0i2VSPZydUVRYREVFkdMOoxXCQ2Pq1EpWpiQP0Rg7uzqNh0q0LLy36YI8uKfG4ujr7SXg4NqcSBd0wlMmNrnhCTgQlIzDIWEvKSmmv/7tHcovKKCy0hKzsS8aS3NLK00ZCCwXnY9Isbm5eSZCbXQ+3sM9sry8jK0nycMv2r6+Xiouij+q34lKK5VJOHBwGofdrS4EZ+Pkoc1SuxAaGHxw9Ww4ZHmyLsjr6PCzutzYxNauZNhEwg5d8ADBFxP+PF6vuROCU3gTjVduLLgdr9J8Ap6k8Yrxj/N0OBzvFxWPeu6y6QIXSNx8YuNJmkNt2BPNa9J8LXEIm3i9vGu/LjyMWfWfw0BzczPrMgW3OM6VyqknlUn1cCASvuz5eh7Ky8tjyyR5wBEIBtg6Nl2Qx+GAfhxIzuOz6wIWqZ6UL7ULOCJuk6UO1YOvEnbo2L79A7OAwK9YnO0RnfBIJtK+6Fwyrq8IR8+V4ctWKpPkQTq+VDh5cLNFksokXRQOs3Xc6pIwIF9qF7CBDw67DYckz6YLZXCN5HW5s4mEIxk2kbBDV3Z2DuEMGmyGxhk0uFPX09tDebl57Jg0PAnzUISf0Y9XadxBF5I0Xlta+fkQYxVYuHpudDkHx3HybPMa5i4Jh4Qd7XU7h3L4HJtEmBz+Xxcew/nQT8pAWjBQXFxsvjjNBJ+TY87FSIuGaSPSigFn3wfuZHV2dppHb3ikh37LfZmlVeMzuDG6uTSDja9NT18GwuEwzaquNg3Usz3S187p0rK83FyaUl4+6PXi8/lo2/btuvE0XQwc0w5deMQQoh+VgXRhoKJiChUXF5nHHXq2R7pYNX3b4dz9wMm73qwsc/djx84Pqalpf/o2OkNbpguPDDW8NjszGMCJpnimj13peI6uSRlIdQZw1seUsjJz9wN7lOrq66lmy1Y9dCzVDTcKfLrHYxRkpful6k47ZOHJ7E7rtMJxz+vq7ia4gDZ5vVQxpYL6+/sJ3hyxCS54eCyDY65jUygYoubmFuoPRNxgo8sleYi4CndaxCiJTdCFJJWJOMJhFrtbXfiVzXEBbFK72n0+Ah9cPRsOSZ5NF+TBJZXV5cImNl3JsImEPaEub6QfIn5UV3eXOZMGcUtgLy65Ha+SK6ijwxlDzme82lxS1Z12iCl1px3iQt9ZGIA7rb+jnRYtPDLuKgxALh8XvrFho1gm1bMFgoKb4KxZ1bRwFDjcBjgCPrjFxW5kw/QGHFybE+kCJ1wAKTc8AYfP18bikLBzNok8L+8xvyLhNjdjery7L3bJi8HZsrxUWVlBFRUVcX0DX4qcPHOXpVcISNceOTKbDUhmw+HxjKmuvftqWXlopNSunOws2rV7F1vP1mZJnk2XOT+hzcfq8rqwiU2X40ExljZpFbCPRhc8o/CoEFx83NhoFh8HzZlN2EDtJLfjVZqfIFcarxj/+2rr2DG5paZm1HOXTZfbIHHSHGrDnmhek4LESRzCJvBq4hKfy12pecqAMjBpGXCCyOFxC1wWNSkDk4UBfHmVFBebA8bwvq+vj7D3A6ee+v3+ydIMxRnFgC48osjQt8pAujKAszyc49ThtohfkZqUgcnEADxfKisqqLAwcuig3985uADB3R9Nk4cBtdbksZUiVQYOiAEEkSsoyDfPy9XL5YCo1MoTxEA4TASvl4opU4YtQBBwrqCwQO+ATJBdRqtWFx6jZUyvVwYmMQMHz5tnnrvieTk2O2pSBiYjA3jkErsAwaJEH8FMDmuqV8vksNO4oMTt+MrKShOULFYhdnJj85GUpDKpHr74sMmRT2GzkYyTKcmDLMjk6th0QR6HA3VwLDYnL5EutImrZ8uX2gUcwWCIlSdhdziVMJSXlxuuGvfvN26LcLdFCgT6qU/YDIYjmBE3JMKLoyHyCpdHLh/XQyZXhnwkqUzE4fGwddzqkjAg39Yu8MFht+GQ5CXShcdinC43NrHpSoZNJOxudXEcZg0sQsrKSk0fhfcV/tCvEQ4B8xq8aLjxII078ITE1cH4l+phrMJWXD2pzoAqto5jd04eyri5KyKPn0Nt2BPNa5IuqV0R7FyoTyJdeDhW11cTmwTuj86O82hKEPmVy3eukcqker29faYqYgPEJmCACx0nU5bXS5DJ1bHpgjwEl4vFAf0SFxhQiXRxONBOKV9qF3DgzgRXT8Lu8MnVQRkmamzQw5dCS2vrYFTQYCBE/dTP7v/AhN/T3UM9BfGusfBwdOJ8OLrxGgwECTL5ssgeE6lMwhECjoE4L2OhC+6ZnDzIltoFHgwfo8QhybPpAoc4hZbD6MYmdl1jbxMRe8CdLolDuO3CDbwgP98cvQ5u+vv6qLunx4wfHMkOW+fm5kZ3GxPRWhonuJArw/iXxivG6mjnLgcQrysyT9rKYucuyJPmUBv2kcxrnC6JC/AA+3NJFx4cK+mUF9pEz1z4Obr8Mxtp778ssK404U7b2opIqLPjGEBYZi4fF9bW1ollUj2bOy1uo04pn8LKlOThFwEGJ4fRpgvyEPkx1p22o73DPJLg5CXSBU64em54Ao6G/AZWnoR9JDY5csERtG37B8bO2LSHQ5t8JLvTRgLVlRDnaomzOLh8TGT4wuTKoAtJKhPder1eto5rXb52Vh6wSe3CLzzwwWG34ZDk2XRBHu6icLrc2MSmKxk2kbC71SVx6NgEx67jD6kXC4/ubrMQAQ5EysXCA1ziVF/cCZHmE9SXxivGP354cGMcEXcTzl0d6+nFR26m269YT+uhaOk1dP2FR9NJq9aT/w/fo+VR38pu3WmlOdSGPdG8Bt5i50nAlzjE3OXx8Ls5+FxI05QGDHRS3ZrL6PLHitKgLdqEsWQg2svF39mp+z3GklyVlRIMYEFdXlZmFhrFRUXmXB7c6Wvav98sut97f7P5sYLFybgl/xN01xdOp7M3/S86Z3ObuSMQ/v3nadrbj9MX38ucr+OotdW4Ua+KxoWBAPk3Xkpn/HERfS77r/TSuOhUJZOJAXi5+Dv9BLdEeLngwB9NykC6MYDHLMFQyCxA8FgAj0NwJwn7Pjo6OswiBHdCENeouKjYeH5hYe42YXHDp3Z6695r6Jqdl9BNT1xOV8weeOxTspQW/1OAXg//lJ5t/A4tr07/r+X0byHfA9I/17+afvyNo+lnz+fTHx57LP3bqy10xQAOFsMjF+cI63xXUrSSMjA5GMjOyiL8YS8IFiF4vOAcStbS0kctLa2DDWnz+WjX7t2Di5Hok1IHLxp4g8XGH559jtr9fvrbO+/Qtg8+oHO+9MXhe0r879Hq+2op+/xz6RJn0TEoqIQW3/fftHjwc3q/0YVHWtq3ljbd8VN6/5fP0Y2lj9Mf0rKN2qixYAC/9LD4wASLX384ajkvL28sRKsMZSClGcACpKio2JwJgkUI9on0BwKDG6+xmPD52ocFp8N4wQbnDr+fPvro48H2vblpE7W2tZnPwXDYnCfyyvpX6cwzTh+8Jrj7fXq6oYqmHVZN8QELBi/LiDe68Eg7M+MRy3V0Uc6Paf2SciKf3MBVq1YNK9y3b5/ZKLRmzdPD8vEBvwwQh4BL+5ubqa62lisS62GTGG6BYoNcbGpqaqJXX32Vahh9Eg64seEWKjZ3xSabLsh7v6g4Dgcw4I/jIpEu6OdwuOEpgmM/i0PCDv2j1VVcUkp1dXWUX5BHRYVFZrNpNI/gEEdUFzY0RGeb93hG3tTUGJePQGrY1MdxAXlIUlluTg5xp1Fis+r7mzePmS48Zmpv5weJ1C4EsAP+0eKQ5KExUhk4xGOw/fvjg/q5sYlNVzJsYsPuxv4ST2NtEyzA4QXj8/nMXYt9e/eaRQkwY/wDx65du/DRpO7umDAEHjJRdaPnj/bN+6iT+iin5g165uka8kZ5fEjjNZFNRjuHAntnp5+dyxPNa5IuaU7G3IUfM1zShQfHymTO86+mO3/wRXrixRMyflU9mc043tgRHBCub3B/1Tse482+6ks1BvDosa834hWDRUZpWZmBiL0h3V3d5q4HPMGQsH7AnZJwKGzcrKW2eKdMp6Opmf5U10ydWRVUMhChWbo+nfN14ZFW1q2ljTeuJu8jT9Ix8TcS4loae8dj/fr1hL+vfvUrcddKEQhxIaI4nnjCkrg6yJDq2Vxca2q20Kmnnjqh0WmBoalpP8sFVvg21120m3O1c8MTcODOj2QTLrKuW5ts/2AHtba2moVHUVGReQ7uGLW+vp4OnT9/wqPTfvzRx3TUokUOrMFXmxurcwYC55KK6LSIdMolKZpsS0sLtbW1jRqHJA+6pTK0CxFeZ86YHgfRjU1sumw8oUxycbbZRMLuWpcQCTkZNpH6BmcTzGeNTU20v2m/sRP2jRy5YAGdsOT4Qbttfr+USi/4Na1du5v2/PgKWhW1z+ONDa/RQR88Qf952t10fVS+W3daaQ7F3CVF1k00r0nutNIc78yhgwREvRnB11PU1fo2tRnw/Z6eefJ3dPOcPHObELcKPeWX0V2BADVcfCTleFbQZVtjbgmmdosU3TgygDgus2fNMhoRSA6PrjQpA8pAYgbwQ6O6qso8HsQjCSzSoxcdRoJ3Nn35h9+lb9D9dPPXb6ArN9STOT4xtJm2PvcrujDnaro2atGRWOvkvUIXHpPXdvHIy1bSHfXhiG94eOC17X66Ojubqh7aQv3hp+j+Beq3EE+c5jgMlJQUm8OV8Bkb6LDpTpMyoAwkZqBq5kxzl3D27Fn0yWM/wVbwzl5Fv3jzKXrqtD/Q6hNnUQ5+HM6+k/4y9XR64h/nWQ94ZAVO0kxdeExSwylsZSBZDMDLBXc/cKS63+8Xjz1Oln6VqwykMwPe2ctp+Y2bqd75cVj/KH3t+IMyak+eLjzSuYdr25QBlwzgVjGCbDmHLLkUo9WUAWVAGYhjwBOWorjEXaoZ6c7Axo1v0suvvEJLly6d0KY++4c/0OLjj6fp0+M31I0XsMbGRtr05pt09t///XipZPUAR0NDA33iE/ytW7bSGGU6QeTwCre46dOmk+0QpTFSaxWzdetWWrBggfWaZBfiLtCePXtoEbPJNdm6o+Vv3ryZ5s6dqzYhMnfmUsEm7773rgm6iHGCGFATlVJlDv3L23+hm2++KY4G9WqJoyRzMxAkrrenm/VQkXYugy033ho2r5a1L66lww49dMK9Wt752zssF4l2f4OTsfRqQZRNzmsINhlLrxbOJvDsqauvpxdfXEuHHjKf8Pw6Ntk8MsQgce2WIHEWD4oPtm9nvVDG26ultnbfqHFIPIFPqYzzoHD437p1i/F2qaiocLIGXyV5Nl1uPU1sNhlPr5axtslovFoc4vfu3WN+MB2/+Li4BaGbOdStV4s0h463VwvmUC7poxaOFc1TBpQBw8C0aVNNDAt8wHkGutlUO4YyoAwcKAO68DhQBrW+MpDmDBw8b545GClMYerq6tTNpmlub22eMpBsBnThkWyGVb4yMMkZwCbT/r5eKiwspL6+fvEY5EneTIWvDCgD48SALjzGiWhVowxMbgY8VF4eOTYa8Ve6e/QgusltT0WvDEwcA7rwmDjuVbMyMKkYQMAynPGBpCebTirTKVhlIKUYUK+WlDLHxILJzy8gRCnF7uvYhGf7XL5znVQm1TO79VtaKSs7vgvi7Ii6unoKO8KjXiV5CGmNjY/t7fHREG26IG/37j1xOOrr6s0ZFly7EukCXA4H8jl5yJfaBRzYic7Vk7A7dHF1bLpsPEXbBNEt/Z1d1LR/P00pn2J4ghdFbAqFghQKhU0k19gyyENyom9Gl6MM0Ua93qzobPM+FA4bD5DYAre6EFaAww75ODKeK2v3+QiLMK7MhkOSZ9MFeYFAkNcVDFFzcwv1B+JPl3WjKxk2kbC71SW1Kxk2kfqGzSZtPh8FQyFa98p6c2x6dD+VxrhzDTdeMSaRuPlkpOPVkY9XzF29fb3sfJJoXmsV5mupXZi74IrPpfhZn7tK8zKCgZ6ebkKU0kULj4xrLwYFl48L4U4rlUn1ONdNRylCUs+aVT2h7rQeIgIOrl0H4k7LyUO7JZ6Aw+drY3Ggjs2ddrS6RmOTbdu3E0KBIxgW0ozp8WcWYGIca3dar8czprrgMslhR5uwsODKcrKzaNfuXWyZrc2SPJsu8+XS5mN1ebO8VFlZMarAfTZdbt1pbTaBOy3HoVtdEofJsInUN2w2KS8rc+1Oy41Xt+600hw6nu60mLuc+QH9Ljrpo5ZoNvS9MqAMjIgBnGzqHKve2taqni4jYk0vUgaUATCgCw/tB8qAMjBqBuDpEr34wMmmegjyqGnUCspARjKgC4+MNLs2Whk4cAacxQckwdPF39l54EJVgjKgDKQ9A7rwSHsTawOVgeQxgMXHtMpKowDPvtXNNnlcq2RlIF0Y0M2l6WLJMWhHQUEBVVZWGi+KWHHY8YyNSVKSyqR6+JLq7OwSxIUJ5ZxMSR5kSXVsuiCPw4E6RGEWQyJdaBSH3ZYvtQs4gsEQK0/C7pAqYbDp4riIyJNtgo1sUyqmUH19g7FBUVERFeTnm7sggUC/yXMwOa/IR4rw7ORGXlHWN7BpdXgJEXk8bB3ccXGjS8KA/GAwKOoiGj0OSV4iXfAM4HgCBrSbK3OjKxk2kbC71SW1CzyMtU2kvgFdUruivVpOO/UzEDGYpHHnXMCNV8e2Utloxyuul3AkmtckXZK8CHbON5FIFx6O1fXVDFy4Pzo7zqMpgasql+9cI5VJ9Xp7+0zVQDDiVunIwSswdHV3sfpkeb0EmRwOmy7I6+zqpFgc0C9xgSxLSGoAACAASURBVAGVSBeHA22T8qV2AQdcCLl6EnaHS64OyiRdNp4S2QRy4X7Y29dHfa2tFCwtJQ95KBgIGc8WB5PzinwkeL3EJpT1U2Ryjy0LBYNCnaArXcDMYYBej4fH19PdYxYlXL1gQMYhybPpgjzsnWF1gYvuHuopiOfQna6xt4mI3aX9pXYlxyZ837DZJLq/xo4/adw5dWKvR74zJm1lsXMX6knjFXOXhGMk8xqnS5KHuUva96ULD8fq+kqITtva2sJGVoUfORdxFbTV1taJZVI9m+smXLBwPgSnT5KHXwQYnFwdmy7IQ/jq0tLSYT2go73DuIJx8hLpgiCunhuegKMhv4GVJ2GfKJugzXv37aOWllazCHHuepTFcAt8PrJEp6V2ys/Lo7y8vGE2wQf0DU4eJk18OXNlVl2+drYOdOGMEU4efuFlZY0ehyTPpgvtwi9sDgcwlJaWsGVudFl5cmkTCbtbXVK7kmETn9A3bDaxudNKcxfsL80Nbt1ppTkUcxcWM9z8lGheQx+MnSeBXWoX5i6Ph9/NoQsPMKdJGVAGxoQB52RTLD7aOzDxwJtfkzKgDCgDQwzwy5Ghcn2nDCgDysCoGMDio6IicqIpTiDFrVhNyoAyoAw4DOjCw2FCX5UBZWDMGMDiIzc31xx7j1u4uvgYM2pVkDIw6RnQhcekN6E2QBlITQbmHjTH7NOAB4AuPlLTRopKGZgIBnSPx0SwnqI64U47ZUoFORuaomFiQxWX71wjlUn1sCEJZdxubXxR4RhuTqYkD/nYNMXVselCvcampjgc0A8cnLxEusAJV8+WL7ULOLChjpMnYU8lmxQWFJDf76f+AXfswsJCsxjp7Yl4YjibDB3MeEUZPAc4Tw7YhOszuB6BxyR5kMuVYQ8KJw/XIxgYV4b+BBdnrsyGQ5Jn0wV5cCFldRk36464AIc2ebayZNhEwu5eF89FMmwi9Q2bTaLdaT/1yWNB92CSxrhzATfG0S4kqQwyub4hzaG4XsIRKXM3h3L4IqEU+CBxesfDsXo6vYY204bbF1G1x0Mez5l02pNbKT52aDo1WNuSqgxg8p4yZQphiyk8+jG5SS52qdoGxaUMKANjy4De8RhbPlNAWi29efeTtOuCv1L9df1U/+fL6dqlK2hFxcv0yhlTrfi6u7vVnXaAIXWnHd5VJPc8XIVfZYnc8w6eN5d27d5tItri11huXq7xeOHcRHFnQt1pI/xjoSa5pKo77VAfVXfaIS7wThqvqeJOq3c8httr0n8KbX2J/rriBjpvVi4RFVH1311PF125h1576V1qmPSt0wZMVgaw0TQ2qBy+VDUpA8pA5jGgC480s7l3wUV0yRwsOgZSaDftfPwoOucrn6IqJ09flYEJYMAJKldQkG+8XLq6u9XbZQLsoCqVgYlmQBceE22BpOkPkH/zA/Szb15Dv330KXp8SXnSNKlgZWCkDDiLD9wKxl4P9XYZKXN6nTKQPgzowiN9bBnVkp308ncrqeSoy2jlIw307h830Gsd/O7iqEr6VhkYFwaw+JhdXU2F+fnGc6itrc3EeBkX5apEGVAGJpwBT1i3mE+4EZIGILSZNv38crpm5Xp67RtP09u/OJeOiVpqcsdZH3PMJ2jhwkVJg6SClQGHAUSxnTV7tnEXRV51VRUFQ/YFMvpsKkxZ2CCLuzYTmVIBA9qvNhnqBR9//PHgh507dgy+z9Q3ZWVl9OCDD8Q1X71a4ihJowzvIlr87f+mn3s/RUfc/Ba91vFlOqZsaLKMncDXr19P+Fu1alUcCZtrttCihUfG5SPjjQ0b6cQTlrBlUj34fUtBh2655Tb66le/QgsZfZI83LKHPzvnXWHTBXlzZs+KC35UU7OF1qx5mm688fq4diXShQocDjc8AUdNTY3hIxaIhB3XudFl4ykZNgFOLDZ27NxpvF3wubioyNz9kLxa1q17mZYt+2wsFcZNVwwS1y4HpNu7r5YOmjM7Th4yPm5sohnTp8WVtbS00Ftvv01nnH56XBk2zEo4JHk2XZDX2uajmTOmx+l6ce1aOu7Tn6aKioq4Mje6nPMgWE+jdtnTyGYTCbtbXVK7kmETqW/YbPLan/9M06dPp+MXH0fFxcXD7CLNXbhIGq/O+RjcfOJmvGLu2ldbx87lieY1ab6W2uXMocNIGPgw9C3ElWpeGjBQSoeeeiYta8IpCpqUgdRiwNnzgdguSP7OToJbtyZlQBlIXwZ04ZG+th1oWYD8+7bRa+cfRyeXqLnT3tyTsIFYfDiB5QC/p7ub2trbU+KRyiSkUyErAynPgH4TpbyJRgOwk+qeOp5yTrmGrtxQTwEc+1z3AN1yYTV98+rPDdvfMRqpeq0yMB4MYPGBv7DHQ4H+furo6NDFx3gQrzqUgXFmQBce40x4ctXlUdlRJ9LXdt5F9544i3I8R9PRD1fRkjf/g+5fWJZc1SpdGRgDBvDIZcb06YS7IDixUxcfY0CqilAGUowB3VyaYgY5MDjZVLzwHnq0/h569MAEaW1lYMIYwAFjU6aU00cffTy4+CgpKTHeExMGShUrA8rAmDGgC48xo3LyC8rPL6DiklLCLuXY1NXVyeY713F1UCbVMzvDW1rZyJqIMlpXV2+CijnynVdJHmI1BIJBEzfEudZ5temCvN2798ThqK+rN9FOuXYl0gW9TlRJB4PzyslDmdQu4MBuc66ehN2tLhtPybAJcHI8AUd2VhYFggFq2t9smoMj17GrPhQOG28Tp43OKyK/hkJhE8nXyXNegR0JUX5jE1xB4SnBpf7+fras3eejUDDEltlwSPKgWyqDvEAgyOsKhqi5uYX6A8E4+JI8my4bTyjr6uoirzcrTpfNJhJ2t7qkdiXDJlLfsNkkOjotQgREJ2mMO9dwYxxjAUkaJ62jnEMxd/X29bLzSaJ5TdIltQtzF1y+uaQLD46VDM3r6ekmf0c762qFQWFzp5XKpHo2V7Ds7GyaNat6Qt1pEU0VOLh2JXI7Q/fh3N/gMsfJw/UST8Dh87Wx9VCHcwWGPDe6xtsmEk/ROODhsmv3Hurr6zPnZng8xLq4YoKW3FhtrptwmeRcZoFNct3Myc6iXbt3sfVsOCR5Nl2QB5dUDqM3y0uVlRUT7k7r9XhYfDbsNpugTHKnljhMhk2kvmFrV3lZmWt3Wm5uwFgYyTgxF0X9k+bQ8XSnxdwlnXWjezyijKVvlQFlILUYKCgooCMOP4yKi4vMr6fW1jazwEgtlIpGGVAGRsOALjxGw5ZeqwwoA+POQPRZH7jN7ff7zXkfsQfgjTswVagMKAOuGNCFhyvatJIyoAyMNwNwtS0sLDJqe3p6qMPfodFtx9sIqk8ZGAMGdI/HGJCoIpQBZWB8GGhqbKRD5x8ysO+jnwKBdiqJOZp6fJCoFmWAqLunZzDWEPjAZlosihsbm6jD7zcUYWN0JXOsfSbzpwuPTLZ+TNvxPL2ystJ4UcQUEXY8Y2OSlKQyqR42aHV2dgniwib2BidTkgdZkMnVsemCPA4H6hBFwrbHgkykC9dzOGz5UruAIxgMsfIk7A5eCYNNF8dFRN7Y20Tiw2Yv2AQ75WfOnEH79tUam2MDKiZ3r9djPjvtd14DgX7zNmJTJ3foVcoPBoOsPJwvQsTrQhn0cTIleUAilUEe2svJAwaUc2WSPJsuG08o65OC4nlkLiTsbnVJ7UqGTcAVx220Tfbu3Tu4wMD12ATd0PARNe3fb/pjf3+A5h50EC0+7tOu5lBHPzeWUTba8YrrpfGfaF6TdEnyItj5UB268EBv0TTAgMe4JDo7zqNpgasql+9cI5VJ9Xp7+0xVuEzGJrhFdnV3sfpkeb0EmRwOmy7I6+zqNK6b0TigHzh4eYl1cfUgX8qX2gUccCHk6knYnXZwdVAm6bLxlCybcBgT4XDqIAhXY1OTOd20s6uLcnJyKDsrG+FSHQrMazAQcemD10tsgsskl4/rIIYr6+mO/MrlyoKBIEEfVybJs+mCPOxl4eThSxhYegq4dvHY7bpkntCmfoosgmI5DAEHw60Vu8UmNl0Sh8mxCd83ottVWlJi9huhHyE5+44cd2HkH3LIIWb8SuPO4dPp185nvDpjwVY2mjkUiwEJB8qgb7S6JHmYuxw+otuE97rwiGUkgz93d3dRa2sL6woKP3LORRR01dbWiWVSvWiXyVjK4YI1pXwKK1OSh18EGDAcRpsuyJs+bVpcdNqO9g7jCsbJS6QL7eHqueEJOBryG1h5EvbJYhOJJ5u90DeiuZ1/yMHmoLHaujrz69/j9Zh9IDgHxEk+kqPT+nzt5nwQ59roV5z7wUVqxS+8rCwvW4bJG1/CXD1JHnRKZZCHX9icPGAoLS1hyyR5Nl1Wnkh2cYVNOHw27G51Se1Khk2kvhHdLrS7pa3NPF5xFh/RfejgefPo4HlzTZY0d6FQmhvcutNKcyjmLiwuoseQgzfRvIa2lpaWOpcPvkrtwtzl8fDbSPncQZH6RhlQBpSB1GUAHi8486WqaqZZKPb19ZvHUrhLpEkZGA8G8CiFW3Sgb/7dSSeOB4RJp0PveEw6kylgZUAZiGUABzfhNFGcytjd3WPufhUVFVFBfn7spfpZGRhTBoqLiigvL8/c9YgWfMjBB5u9R9F5+j7CgN7x0J6gDCgDacFAVnYW4ZhqBJpD6uzspPaOdvE5c1o0WhuREgzE3vXAo44TlhyfEthSEYQuPFLRKopJGVAGXDGA29s47wPP1vEej158Ph9h86kmZSBZDDh3PZxHLjNnzNC7HRay9VGLhZxMKyooKNQgcQNG1yBxw3s/dumPdeA+aMDGtNiEzXtSQCrgQIya2ITNhdhdHy0PXwKtAxv/cD0CiZWVlpEnyi0U13z0cWOsOPMZuriytrY2c14DVxYOh4w3FB73xCZJHq6TyiAPZ0NwupDf2LSf+vrjPcMkeTZd8JJB4rCjDEHiuM2C/QJPNuxudUntSoZNpL4htau4qNjwhzgpZWVlcf1UCqZmKg3Ea3LeO68YC0jR/Tq6zDZOuPGKcaJB4hwG9TUlGIBXS15ujgk8FgsIEVwRkIxLm2vgTcKXSfXgBllUWERFRYVxIrOzs2jq1EpWpiQPPuZwi4WHSmyy6YK8adOmxeHoQ4TU7CwWQyJd0M/hcMMTcLS0wNMonl8JO/S70WXjKRk2kXhKhIPjQrLJQXNm0/s1NebLFL9Kc/NyqbCgYDB4FYKOTSkvi+0y5nNzS6tQFjYBBLl68EDp6+sl50soWrAsj0gqg7yODj+LA19w5eVlbJkkD3ikMn9n5MArDjvKcnPzKDcnJ7pJ5j3cmCUuJOxudUnYcb4L+JBwuLGJ1DdsNsFx/gUF+TRv7lwTXyiaLGnuwjXSeMVYQOLmk0TjhJtDMU6amprY+UQaQ9Bv0yW1C3MXztbhkt7x4FjJ4Lzm5mbWZSorO5vNd6ji3KxQJtWD6ysWHXw9j9msxZVJ8qAL/uxcHZsuyONwYLMYDmji5CXShXKpnpQvtQs4Im6T8W5sEnboRxqtLhtP4AJYOJkSdmCw2UTCmAgHh8GmC66Dgf6AOW8Bv7Tx2AWnnUZsTIOvkBGd8KjGuSY6P/LlG2bLcB0OzeLqSfJQx1aG/QKcPHzZAgtXZpMnlTlncXDyUCbporDMhYTdrS4JezJsArtwXCBfaldz836aOXOmcXPGOTPRyTZOcB3XrzEWbGXc3BXRKY/XllZ5LreNV0mX1K4Id/zCQ/d4RKyk/5UBZSCNGcjOyaaFRy6gsrLIAg7HWeMPiwRNysBYMYAFiabEDChLiTnSK5QBZSANGMCvZWw6xeZTvMfz8+aWZvbUzTRorjZBGUhZBvRRS8qaRoEpA8pAMhiAu21xcRHt3bfPiMdzeRw4VlRYOLj3Ixl6VaYyoAxEGNA7HtoTlAFlIOMYQFA5nPmBxQYS7n60+Xx69yPjeoI2eCIY0DseE8F6iupUd9ohw6g77RAXeAc3Rs49D2WSmyDn4upIPRA3wZG6045EF043hTcEPIcQ4hwpC7FHyspMVGB4NsQmuOXilFSuLBQKGndaxBSJTbirwtXBdVIZ5MFtlqsHDM3NLdQfiLjBRuuT5Nl0wcZIHHaUwZ3W6x2KgePoC4XDPD4Ldre6pHYlwyZwp2V5t7QLi9dgKETrXllvFrYOR3iVxolzDdevD2SccONV3WkdtvV1jBkIkL/mp3T/rTfQtU92EtEZtPSBm+m+S06gRQnub8Gd1t/RTosWHhmHCYOCy8eFb2zYKJZJ9WyBwPBFgPgbC0eBw22AI+CDe2bsjnLsxQYOrs2JdIETLgiTG56Aw+drY3FI2CeLTSSeEvWNsbbJUYsWAgo1Ne2njz7+2ISox+eeXj/Nqq6Ki8ORk51Fu3bvohnT41238UUhBYnDlxhXB7qkMshrbfOx9bxZXqqsrKCKigqDP/qfJM+my/Gg4AK+oSw/L4/18vB6PCw+G3a3uqR2JcMme/fVjrpdOLp/+vTpdPzi4yjWq0WaC2ETaW5wGyROmkMxd+2rrWPnk0TzmhQkTmoX5i5ps22Cr6LorqzvJwMDodq76eLb5tOSh3BUtJ/qXqumOVecQqfduZHif7tNhhYpRmVgfBiYNm0qHXH4YYPnL+AXPg4g6+3rGx8AqkUZyBAGdOGRVoZup+3PLqJrH/siLS2BaYuo+u/uoevvm0tN9/43rfap62BamVsbM+YMOHs/4PmSk51t3G07OjrU9XbMmVaBmcyA7vFIK+uX0oJLvhDTokKaecg8ym4Kx+TrR2VAGZAYgOfLjBnTqbKi0jx+wWMD7C/AqaealAFl4MAY0DseB8bfpKmddf5xdLK5CzJpICtQZWCCGfDQzJkzzMFjcL/FYWP+zk7q6u42i5AJBqfqlYFJy4AuPCat6UYKfA+9uaaBvnjpMjpGrT1S0vQ6ZWCQAefxy6zqanPwGPZ+4PELFiHhsN5JHCRK3ygDI2TAE9aRM0KqJuNlAfJv/Gda8sJltP7GEyh2D/7SpUuHNQoHKSEQ1FlnfX5YPj7A/Q07pbmEAEyoxyWpHn49RgIIxZ/lv2cPArdNpcLCojiRkjzErQiFwuwuapuuiDy4CA7HAdc3eDnMnTs3DkMiXajA7eZ2wxNwIHgTAtnFJgk7rnOjy8ZTMmwi8ZQIx0TapLikxLhFgvvysnITiwixOXp7eiLeMB4PhYJB1v6hcIi8Hn71L5Z5PObuCvabxKb2jg7z6Icbl6I8xJIRcIB3q02ysghxWWIT7gCxj6As2N3qkrDDHsBRWlISC4/IpU3gFgvX6rhkadcHO3YMXh6JHzP40dUcmpAnE4Rt+NwFjfJ4DRv3bK7PJJrXpPk6Mg/F90/MXXDN/slPfjxEwsC7+KvjLtGMScuAfzXdee0pdO/vj49bdKBN69evH9Y0fMbfjTdePywfHySXKZTBFezEE5bE1bHVs7lM3nLLbfTVr35lQt1pa2q20Jo1T7NcJHI7Q7sld9rR8gQcNTU1ho9YghO5045W13jbROIpEQ6uf463TdaufYnO/vsvkN8Pl/XIQjM/P9+43vb19RHnkiq5gqK+VOa4pM6cMd3oif734tq1dNynPz3h7rTr1r1My5Z9NhqaeW/DPtbutDiH5a233xZxuHFxhjstohvHJlu78vLzXLvTcuPVrTutNIeOpzutM4fG8ofPuvDgWEmHvNAmeuLiTjr199+iZbq3Ix0sqm1IIQZ8Pp85IAp3CXH2BxYgeASDLyUcPIVf3njVpAwoA/EMMPeR4i/SnEnGQOhdev7831PrXRcMLTr8z9FNl71CDZOsKQpXGUhlBnBIFI5eP3T+IYPnf+DcD5z/4YR+T2X8ik0ZmAgGdOExEawnU2fHOlpz1Vn0+Sduo8tm55lfXfjl5Sn5Fv3i2Cr2kUsy4ahsZSATGHAWINiAmpeXF/GA8ftN/Be44WpSBpSBIQb0UcsQF5P/XWgTPXP5l2j5ryLPnYc36GQ655R5+mxtOCn6SRkYUwZKS0soTGHKyc6hpv37zYZC7GfIzc2h3r74+C1jqlyFKQOThAFdeEwSQ40Ipncxnfuon8KPjujquIsQJG7KlApyNjRFX4Bn11y+c41UJtVrb+8wz8OdTWaOHLxiJ3drWyurT5KH/N7ePraOTRfqNTY1USwO6AcOrl2JdKENXD1bvtQu4MDOcE6ehN3hkquDMkmXjadk2ETiIxEOrl3jbZNEfQMLkLKyUurp7qGm5mbq8Ieos7OT9uzda7zDYuN4IBhcbB8EP8FA0HjLsGXBEIGrLMbjRZIHmVJZ70BgOx+147JhCWXAwj0+AhcsPgt297p4nsBDMCjjgOcF1y6JCzQed4pH267oIHGf+uSxwzl0MYeiXUhcn080Trg5NDJO5PnE7RzK4YP+cJg/LVsXHsO6RqZ/gDuqh92R39rSyuaDsVqqE8ukehgARYVFVFQUCUsezTwwFBYUsjIleXA5ReK8CWy6II/DAf0SF4l0STjc8AQcOTk5bLsk7NDvRpeNp2TYROIpEQ7OxuNtkxH3jbIymjq1kj5ubCRsRHXcGAOBfsrLy6fsrCzzBQf8CMIWm/q8/ebLnivLysqi/IJ8tp4kD/KlMmBC4nShLCc3h2JdRHG9FzhGid2tLgk7eDB8CDjCFGIxSvLQLl84EhjPkBL1z2aTqMvixqw0d6GONF4xFpC4Pp9onHBzKNrb1dnFykOZG11Su6Bf2mCtCw9Dtf4DA93d3dTc3BwXqRVl+FUVG8E1mjWpTKqHXxJYdPD1POY5OVcmyQOWQDDAyrPpgjwOB57T42wPDkMiXSiX6kn5UruAIyvLy8qTsDt2Ga0uG0/gAlg4mRJ2tzwlwsFhcKvLZiupXW76BiLI9vX109TKSmppbTV3MXp6esx5HzgDAxN0RK5jvaFXnAnDl4XNQoArw5cwlw+pUplzN4OrhzIsOrgynO3B5g+4GXNlbnVJ2CMLIhkH7spwOCR5DvtcHZRJNrFFp5X6k6OL69cYC0hSGTd3ReTJ47WlVZ7L3c6hHL4Id7xnl24udayur8qAMqAMJJEB3O2YNavaHME+c8YMswDAFyJOQG1tbaHunh7zeC+JEFS0MpASDOgdj5Qwg4JQBpSBTGEAv7IRAwan8+J0XGxCxXmg2AOCPzy2wDHt+NOkDKQjA7rwSEerapuUAWUg5RlwFiBYhPT0dJuFBk49xWMI/OEOCfaShAeOMk/5BilAZWCEDOijlhESpZcpA8qAMpAsBhCXaOGRC+jgefMGDyKDJ0ZHh59ajGdTjwakSxb5KnfcGdA7HuNOeeoqhDttcUmpicsSixIBfxAbREpSmVQPO7KxGxobrmITJty6unpz+zm2TJIXDAQoEAwa98LYOjZdkLd79544HPV19eYMBq5diXRBv+MGF4uFk4drpHYBB+IrcPUk7I5Oro5Nl42nZNgEWDieEuHg2jXeNgEfo8Uh2ZizCe52wAsG7pkIOrdz1y6zATXLm0UFhQWUm5Nrgn01Nu2nvv6AY/LBV+D76OPGwc/Rb6SyYDBoLuvu7om+3LxHGY6E9zBB7voFXXClDASCLA63uiTsbW1toi7gQABJrl2SPDQaG345Dm3tinanxYm20clmf1zH9SeMBSQ344SbQzFOcJ4MpyvRGJLma6ldmLuwh4lL8bM+d5XmZQQD3d1dlJebQ3Nmz4prL76cuXxcuLmmXSyT6uHsDM6NFfKys7OMCyKnT5IHV7DOrk6azkRxtemCPER+jXXr7TO3urPYdiXShTZwONzwBBwIgCVxwWGfLDaReLLZC32D42K8beIGh9R3wYNU1traRnv37aOCgoJI9Ft8IXq9lJ8f2QdSUlJMU8rLIGJYam5pZfNxkVTm7/QbGcVFxcNk4QPKEIGac6eFuzeHoa+/39yx4crc6pKwI7IqFmucLuBAtGauXbK8SOA+SR7uRHFl0cTF9lPJxqgjzQ0YC0jcfJJonMCNOxYDxklTU1NcPnQkGkPSfC21C3MXHhVySRceHCsZnKfutBHjO65gnJsYrrC5naFcqiflS652wKHutNEDMjVcnN24Wks2RutsZfB6WbTwSOPujo2oPl+7uRvX2NhIBx00x0SnxXkgWAA4yeYmKpW5dXFVd1qHdSJ1px3iwplDh3KG3unCY4gLfacMKAPKQMoygLseB82ZQ8HqILW0tA7ihCcMEn7xF+TnD1uADF6kb5SBFGJAFx4pZAyFogwoA8pAIgZwxwKuuD3d3VRdXUWFhYWDd0E6/JHHJXiUUd5XRjnGM0Z9CBJxquXjy4AuPMaXb9WmDCgDysCYMRAKhsxdEJpDZvHha/eZV5yK2tERifOBk1HxKAf7M6QjrMcMkApSBkbAgC48RkCSXqIMKAPKQKozgKB0+MMipKu7mwoK8o0nB947CYsQnBkCbwMc+61JGZgIBnThMRGsp6hOdacdMoy60w5xgXdwO+Tc81AmudMlcs9DXTdugm5cASVdyOfk2drltm9IPNl02dwfbTaBMwFcWbHvo72j3XgsOK6N/f391NnVRV6P17jm5uflA4KxMV4RDTk2QRfcab3erNgiCoXD9HFjxPsiuhCRX4GBK4M8pNHqAnZOXrtxOw6xZcABd1pOlyQP2HB3iNNla5e60w71AHWnHeJC31kYgDutv6Pd7KCPvQyTM3bWc+mNDRvFMqkewigj4iLn5YHJ0sS0YPRJ8nDWBQIqzZk9Ow6iTRfkweUsFgecwICDa3MiXQDA4XDDE3D4fG0sDgk79LvRZeMpGTaReEqEIxVs4qZvSH0XPEhl6Gv7autY+4/WJggC6fd30patW+P6e25uDnV3hRD9jKZPnRr3SAZjC0e5RzwVgHgoeT0emjF92lDGwDtzHkubjy1zgp9xUVdturAQ4HTlZGfRrt272DLggMcOp0uShybs3VcrymsV2mXzapFsDF3SeMVYQOLmk0TjhJtDbf0pBQ+VTAAAIABJREFU0bwmzddSuzB3SXfV9I6HMav+UwaUAWUgvRmAVwz+Gpsq6bBD5w/uCcFiBJFzu3oiB4c1t7QQFiJ5uXlmbwhcdTUpA2PJgC48xpJNlaUMKAPKwCRgAAHo4BmDP5wiirNBPty1y0TIBXwsRPCHhF+tuGuABQh3x2MSNFchphgDuvBIMYMoHGVAGVAGxpMBuOdWVEwxJ/+Gw2EqKy0jeMdE7oT0mY2oeFSBPSLdPT2Un58/eIJp9KFl44lZdU1uBnThMbntp+iVAWVAGRgzBrChctA7hsjcDcHekA927Bzc9wFXXfw5CUeSY+Opuuw6jOhrIgZ04ZGIoQwqx/PfyspKE5QsttnYXY/NR1KSyqR6uHWL2AB8Cptbu5xMSR5kQSZXx6YL8jgcqIP4D5y8RLrQJq6eLV9qF3AEgyFWnoTd4VTCYNPFcRGRN/Y2kfiw2StVbOIGh8Q7eJDKYA+pDBjAFWdnuY6sK9Ln+b6LmDCI1WFcdAcWHj3dPdTe0UE+n49a29qcbmc2ZWMRAgw4VRXB7mLvjAQCkcc4js7Bysa7pp/6BFdfPBbi6mDxg2PspTLo48okeQ4erg504e4PVxbt1XLaqZ9xxJhXm01wAWdHR4dUNtrxautPKIO+0eqS2hXBHh7GgfNBFx4OE2n1GiD/5ofpv95aR89fMp9O+viHtLJsJD77HuN25uw4j6YEkV+5fOcaqUyq19vbZ6oi5klsgutbV3cXq0+W10uQyeGw6YI8BJeLxQH9wMHLS6yLq4d2SvlSu4ADLn9cPQm7wydXB2WSLhtPybIJhzERDr7O+NrETd+QeLfbpFe0lxub2HVFxiTP7/DxCo+a4pJi82cWER6PccfFF3JkEUCm3+LLB/FlENiuqLDQLEpwVyUYiEQtdeLDOH0Wryjrp8iXe3Q+3ns8ZDxUYvOxCMIigpcXNDK5MkleRJdHlIdHUpy8aFyxPNrsj3qx1yPPGQu2sti5C/WkvgF7SDhQBn2j1SXJw9wFnrikCw+OlUmeF9p6JR151T76zHv/Q49XXEcnjbA9cKdtbUUk1HiXVJy3wOVDdG1tnVgm1bO5gmEz25TyKaxMSR5W6RgwHEabLshD5MdYd9qO9g6zqY6Tl0gXOOHqueEJOBryG1h5EvbJYhOJJ5u90Dc4bsfbJm5wSH0XPEhlaBe+DLg2uxknNl3g3Y1N+nr7aMni40xdfPk7brtYcHzc2EglJSWmDP9QjtTb32vOESnMKjT7RfAFhfZgvwmS5LqLszg4t1j86kYwRa4MX6hYJHBlkjxgwIZbrg7kYXHFldncaSUbQ5c0N7i1idQ3bP0p0RhCe2PnSWCX2oW5y+Phf/DqwgPMpVnyLrif9r3QTtt//il6/OY0a5w2RxlQBlKWASwciouLzV9hYYFZTBxy8Dyz4MBm1e6ebnOaaiSmTNDsFYneL4KGdbS3U0lZ2eCeEm9WlvGoSdlGjwhYL+1f+33yLPqv+KurLqDLLz+BehctpqUl/Bd1fKXJnaMLj8ltP0WvDCgDykBKM4C9Y0hYkDhpx84PzT6JqZWV1NfXZxYkuBuCxQkOMevt6aH2mNv0eLyDU1iLivi7JI7siXzFoybnVNbhOPJo6uk/ov4NObTghAo6v+4+WlWdTdSxnl585Ga69opf0YNbC+n5+79OyzJg8aELj+G9Qz8pA8qAMqAMJJmBvLxcowFuvLFp54cfUpY3y2xIxR2SyJkifeYLHYuUWK8a1G9paaHm5hbC5k4sUJBw9yXL6zULG+yTwl/sJtdY3QfyeX9zszmWHY9N/ufZ5+gr53yZcF6KNZUspTP+dTH1dF5El153HX39lCW0918WULp/Mad7+6w210JlQBlQBpSB1GIAX9bcfgJ4x4SCQRONN+4uCXzQwmGzOIm94+DsyYhtJc4jce6gRJchii9S0/4mmjljenSRef9+TY15rRxYNGExg0XH3n37BjdTwr34lfWv0plnnB5XPz6jiKYtXkpfr1pDd655nV775gJamuZPXHThEd8LMiZn1apVw9q6b98+s1FozZqnh+XjAzYebRkYcLGFGHR1AxvTYsuketjUhQGLDWGxqampiV599VWqYfRJ8uByil80+fl5seLMrxBJF+S9X1QchwMY8MdxkUgXAHA43PAUwbGfxSFhh343usbbJhJPiXCkhk1G3zekvgsepDL0tc5OPzv23IwTmy7wPtY2kbC71QWePvzwQ4Mz+h/ceTv9fmpqajSB7Jw7KtjcCL+K5v3NtL+pyWx8ja4Hd9+G+vrorMH3cBWGzNiEfKRImYe8Xg91dXUPLjqc6+vq64eNW2Df6/NTJ3VT7boXaU3BUNTg/c1+KjiymOjtl+i/n5lJ+ylS5pYnqW/Y+lOiec02h3LfDcDQMcCVw4nzqgsPh4kMfF26dOmwVv/tb+/Q9u3baOHChcPy8QGRSRF0iEsf7NhBhx16KFck1mtta6XCgkL2COa33nqL5s2bR3Pnzo2TKeHArxq4b8EbJjbZdEHe1KmVcTj27NlD+OO4SKQL+jkcbngCBiQOh4Qd17vRZeMpGTaReEqEg+NivG3ipm9IfRc8SGVo1/79zezYc2MTmy7wPtY2kbC71SXxBHvs3LGDZlXPMm2I/gcOPdMq48Zkf38ffbDjQ5paWWHcfRHUzHH+xN2TcH09VVXFz3mVlZGzLnDmkZN27drtvMVxIibhUU90XwX2g8sLKZfyqHL+4bSwPHKWCS7+YEc7UWmYKGsKzTz0CFqYG3FfdsuT1Dds/SnRGJLma5tN9u2LeEoNkRN5pwuPWEYy6HPswgNNb2trpYVMVFgMSC4fdeDGKpVJ9Wwuk4WFRWbRwcmU5OHXhBt3WsjjotOiXcDBYUikC3U590c3PEEWfpVxOGzY3egab5tIPCXCwXEx3jZx0zekvgsepDK0Kzcvj7W/m3Fi0+XWddPGhYTdrS6JJ7TLhkOaG7JzctnIv5CHiLEnnrAEb4cl2CQ2YvCf896g7R98YDbM4mKcVXLo/PnD7Abs8zq8lEMlVDBvHi3E5tKB5Gt4mV7f2El07KdpyTHzaeHAjWC3PEl9w9afEo0h7vEX4NtssmnTW04Th70OtXxYtn5QBpQBZUAZUAaUgZEw8HcnnUilpSX0l7/+zWxuPeboo+joo44aSVX8tKCmTevp1w1H0TH3LKOT458+j1DO5LksA5o4eYyhSJUBZUAZUAYmJwNYaBQVFNAnP/GJkS864E7707+nVdetoaZv3Ey//srctPdogXV14TE5+7gdte8B+l51GR1x6U6ihtvpsvLZVP2LrRR/OLldjJYqA8qAMqAMjAUDkQPEck5YTTvp53TzrBzzOMZTehqd+czx9Pk7HqG//eJcOiZDvpH1UctY9KlUk1G2ku6oX0l3pBouxaMMKAPKQEYyEDlALBz+Hdt67CdZlCGLDhCgCw+2G2RmZkFBIRWXlNLmmi1xBHR1dbL5zoVcHZRJ9bCDurWl1YTSdmQ4r/DDx05pbFqKTZI8xGpAsCLEDYhNNl2Qt3v3njgc9XX15kwArl2JdEE/hwP5nDzkS+0CDmz64upJ2J32c3Vsumw8JcMmwMLxlAgH167xtgn4GC0OycY2m6BdvX29rC43NrHpAu9jbRMJu1tdEodux6skzxAhjFebTTBWRzt32XS55UnqGzbsicaQNF9LHMImOMmVS7rw4FjJ0DwEicvLzTFeHrEU4MsZ3h9c2lyD4Gx8mVSvsanJhNnG8cexKTs7y7i4cjIleQjpjCizCPgWm2y6IG/atGnmGOboen29vQQcHIZEuiCHw+GGJ+DAqYwcDgk79LvRZeMpGTaReEqEg+NivG3ipm9IfRc8SGVoF85D4NrsxiY2XeB9rG0iYXerS+LJ7XiV5IEHaQzZbIIzgeCez9nLjS63PEl9w4Y90RgqKiyKmydt/Qk2wRknXNKFB8dKBuc1NzezEQizsrPZfIcqLmohyqR6cG/DooOv5zHnanBlkjzoQnhoro5NF+RxOPLycBCZh5WXSBfKORy2fKldwIFD1jh5EnboQeLqIF/SZeMJXAALJ1OSB102m0gYE+HgMLjVJWFAvtQut31DkmfThbKWVmnsubOJhAO8I3H8urWJhN2tLgl7MmwicWGzCcaqm3Ei6XLLk228SjYBBtt45eZJ1ElkE1wTmzLoqVJs0/WzMqAMKAPKgDKgDIw3A7rwGG/GVZ8yoAwoA8qAMpDBDOjCI4ONr01XBpQBZUAZUAbGmwHd4zHejKe4PsQfwM7s2IQdz1y+c51UJtXDbm1sZuJTmFDOyZTkQZZUx6YL8jgcqIPDgDkMiXShTVw9W77ULuBA8CZOnoTd4ZSrgzKbLo6LiLyxt4nEh81eqWITNzgk3m02gT3keqO3iU1XpM/zfdetTSTsbnXZ5Y1+vEryIn2e58JmE4xVtI0be250ueUJ/ZPDYcOOMq4OuEA+yrkktSuCnfNNVHdajseMzYM7bW9fv4lDEEsC3OIQn0BKUplUD52yq7PLbJyLlRkIBE1gLMR5iE2SPHR+uNP29kaCK0XXs+mCPOy8x4ar6ITgVsDBtSuRLsjhcCCfk2euF/gFDkT45OpJ2J12cHVsumw8JcMmBsso7ZUqNnGFQ7CxzSboa1Kfd2MTm67IFwXfdxP1Da6v2bC71SVx4Xq8WmwCrkbbLoxVYBnN3AU9SJwutzxJfcNmk0TzmjRf22wSCunCY8C8+iIxAHdaf0c7GzQJZxYsYoLHQZY5/EYok+rZAoFlZ2ebaJxcMDBJHn5hYAc4F5zNpgvy4PoWu5MfTmDAwbU5kS5wwuFwwxNw+HxtLA4J+2SxicSTzV6pYhM3OKS+Cx6kMvQ1fCFx/dDNOLHpchuQzMaFhN2tLoknt+NVkmcbQzabIDw8oniPZu6y6XLLk9Q3bNgTzWtSkDiJQ9jE6+V3c/C5YEKTMqAMKAPKgDKgDCgDY8yALjzGmFAVpwwoA8qAMqAMKAMyA7rwkLnREmVAGVAGlAFlQBkYYwZ04THGhKo4ZUAZUAaUAWVAGZAZGL6VX75OSzKAgYKCAlJ32oihI7vJR++e5+xCx0YtLkn52FHOlUGeutNGM5kaNlF32pHZxNavIUHq825dNzl5NjdRCZ/TOkmeVE/daR3mIi64GCdc0oUHx0rG5nkI7k9OfIBoGuCqyuU710hlUj3H3RSxAWITMHR1d7H6ZHm9xoWVw2HTBXkILheLA/olLrAYgEybLq4M7ZTypXYBR39/P1tPwu7wOVpdNp6SZRMOYyIcfJ3xtYmbviHZGPaSytDXpDI3NrHririi8/xGymLHCeTZuJCwOzYerS5JntvxKsmzjSGbTTBWRzt32XW5twmHw4Z9JPMaZ3+JQ+gPh3Xh4dhXXwUG4E7b2opIqLPjrkD4ci4fF9bW1ollUj2byyRcsKaUT2FlSvLwywSTGIfRpgvyEEk21p22o73DuIJx8hLpAidcPTc8AUdDfgMrT8I+WWwi8WSzF/oGx+1428QNDqnvggepDO3ClzTXZjfjxKbLreumjQsJu1tdEk9ux6skzzaGbDbJz88b9dxl0+WWJ6lv2LAnGkOSO63EIWzi8fC7OfhcMKFJGVAGlAFlQBlQBpSBMWZAFx5jTKiKUwaUAWVAGVAGlAGZAV14yNxoiTKgDCgDyoAyoAyMMQO68BhjQlWcMqAMKAPKgDKgDMgMqFeLzE3GlcCddsqUCnI2NEUTgB3PXL5zjVQm1cOGJJRxu9pDoRC1trWy+iR5yMdGNg6HTRfqNTY1xeGAfuDg5CXSBU64erZ8qV3A0dPDcy9hnyw2kfiw2StVbOIGh2Rj8CCVIV8qczNObLrA+9jbhO+7bnVJXLgdr5I8Q4Qwjm02wVgd7dxl0+WWJ6lv2LBHytzNodx8Bx7C4ZDTvGGvuvAYRod+8Ho9hN3Lsam1pZXNx3W1VCeWSfXQyYsKi6ioqDBWFQFDYUEhK1OS5/j9c9htuiCPwwH9EheJdKFBHA43PAFHTk4OK0/CPllsIvFks1eq2MQNDqnvggepDH0NUUG5/uRmnNh0gfextomE3a0uiSe341WSBx6k8WqzCcbqaOcumy63PEl9w4Y90bzGzZPALnEIHjwehIqLT7rwiOckDXI6qf6NG+gn1/yU7nptAS380c/oqe+dTIsSPFjr7u6m5ubmONdSEJKVnc3mO2TFuqM6+VI93OnAooOv56G8vDy2TJIHffAx5+TZdEEehwP6iTysvES6UM7hsOVL7QKOrCwvK0/CDj1IEgZJl40ncDHWNpEwJsIhtctmf0mXLV/iyW3fkOQBg62spVUae+5sIukC7xIfbm0iYXerS8KeDJtIXCBfahfGqptxIulyy5NtvErYgcE2hrh5EnUS2QTXxKYEX0Wxl+vn1GcgQP6N/0LHfqmI5j3ZSeHgb+jepvPotDs3UlPqg1eEyoAyoAwoA2nOgC480s3AoVfpyctfoEWPXUkrZ+USeY+hZTddRxfdcCet2tqTbq3V9igDyoAyoAxMMgZ04THJDJYIbmj7M7T6rWW08KDioUvLzqQz/3U9/e5Puyn+gPKhy/SdMqAMKAPKgDKQbAZ04ZFshsdVfjvtePUFerHqUFpUlTtMs8cboIY1r9Nr/CbjYdfqB2VAGVAGlAFlIFkMeMJSFJdkaVS5SWRgJ7383U/Rsvfuplf++A1aOris5POlHcdJBKiilQFlQBlQBjKEgblz59Hu3bviWjv41RRXohlpzwDWnNF/r7zyCt10003D8qLLM+k9uDj11FOVi4E+Ai7ASSb1Aamt2jeGzxs6Tob4wPyp4yTCB3iYN28u+z2qCw+WlsmaOY1mHzaN6L0dVNOhz1QmqxUVtzKgDCgD6cyALjzSyrqldOipZ9KypvDwVoV2066/9FLVV0+ik9Xiw7nRT8qAMqAMKAPjyoB+DY0r3clX5j38XPrHYx+i1RtbhpR1bKNtfzqbzjllHumJcUO06DtlQBlQBpSB8WdAFx7jz3lyNXpPpX+870zafP499EBdH1HoXVp38+30yK3X0KoF+Vbd5eXlhD9NZHhQLoZ6gvYN5WKIgeHv5s2bNzwjgz/pOBkyvo0L9WoZ4imN3nVS/Z8vp+uWP0K/ajiDlj5wM913yQkJj0xPIwK0KcqAMqAMKAMpyoAuPFLUMApLGVAGlAFlQBlIRwb0UUs6WlXbpAwoA8qAMqAMpCgDuvBIUcMoLGVAGVAGlAFlIB0Z0IVHOlpV26QMKAPKgDKgDKQoA7rwSFHDjCesUN0T9Mv/XU04Qj3ngvvpCXjDZHRqoC3P3EZP3rKI8q95mRoymosA+WvupjvOKzb9w+M5k0772QbanJHn02HT9j/ThdUe8niqafpVT9N6PahvcHSEalfRN3O+QpdlbBRshKYoGxgnkT5S/YutGR2YM1S7mp58dEVkzFR/nx7wRSYOXXgMDpsMfeN/gu785D30+NmbKBj2057zn6MrP3kPrfZn5DcLEbXTtp+dRSt//jBddVMNBTO0WzjNDtXeTRffNp+WPNRO4bCf6l6rpjlXnEKn3bmRmpyLMuI1QP6Nd9Md4R/Sw/VhCtb+iK5tuJBOv3V9hi9MB4wf2kT/9YP/Q78MZGVEb+AaGar9Nf3m8faoopMz+OykyCL9ooOvp1v3fImWrG2jcP2PaGXZwJIDQeI0ZSoDvvC2B+eHs69eF64fpGBH+KXvVISrHtoS7h/My8A3wZfCDy/LjuEm03jwhbc8+Gz4nWB0uyN9hqquC9/fNqwg+qL0ex98Pfzgg7uixkR/2PfisnB29rWZxQNr2X3hN29YHP7Gt48IV9Hy8Mot3exV6Z25L/zmzQvDS19oSu9mjqh1/eGODeeFT87+evi8P9dHjZmhynrHI2p9mnFvQ5voT7+tpWmHVdO0wcbPpcWf/yQ1/fZ1ei1Tb3oMcpHpb0ppwSVfoGOGzRKFNPOQeZQdeyx/ulPlPZEuuST65N8uaviwlqbc+mVa7vyKS3cO2PbhTtB1dFH2T+iWc2azV2REpu/3tObBGlp/+1102cMvZPYjOP9quv+SZ6n98VvpVydVsadlD5tSMqKDaCMHGQhtf4aeeuUoOmLu1LjOMW3d87R6e8/gtfpGGYhmIOv84+jkkgydPjrW09qfnkvnvncPvXLNkqhFezRDGfLev5p+/I2jadVVx1NJhjQ5vpnttP3JH9Od2Ay2/k564Ftn0WlfvJ5WbfHFX5r2Oe20/Tc30LVTLqXzu66mb5r9UEfTolv+OGwxlqEzR9pbf0QN9O/bRu/RIbTwoOIRXa8XKQNEe+jNNQ30xUuXxdwJyQRuAtS+9nNUXXoanXHFOqrZ/Cqt3paJXy6OrWtp0x0/pfd/eTEtz+gppJQOv2RHZA/Un26nh66sIlp/O9288peZt1fOuYv+yYU0b9lj9Gh9P3Vs/ix9+tYv0or7Nw3uC9OFhzOG9FUZUAYSMIDb6qvoylkP0/1LMjGmTzaVnv4S1WOT7evfoasDd9HNy35Aq2oz0Qss0heuW/Q4PZ6RfYEbKkVUffK19C8/+YDqXvgCLV3/G3rg9ahgnVyVdMszAUkPp0VnnU3LZ+cSUTYVL7yVrr9vLjVd939p1YDHky480s3wo2hP8Zwj6Gj6kGr2+kdRSy/NWAb8q+nOa0+he79zfGY/XqAiqj7xx/Tvv7iYzmjYQK/WRHsyZEjvQF/4wZn04xXR+14ypO0Jm1lE1WfcSzf82wf02kvvZpTXU6hhM70TwIIjOpXSoaeeSWdEfdfowiOanwx77z38XFp+3K6YVnfRRx/upoYzzqLlh9uj2cZU1I/pzEBoEz1xcSed+vtv0bJM3dsRY19+/MRclJYfA9T+xsP0H+tW0CeycF4F/nKo7Ix11ECr6YEjC8hz5i9pfUZvTp9Gsw6ritm4n5adYVijvFWL6BPZ79C2PfuZ80uGHuvrwmMYbRn2wbuYPvOtKTGr8ibat62Vqr56Ep2svSPDOoTQ3NC79Pz5v6fWuy4YWnT4n6ObLnslo37NxbHTsY22v7eCTl1YGleU3hnOI6cwhcPOXz/5XlxGVbScVm7ppvAL36ClGT1/NNHe1WfR9SsOj9u4n9Z9o+xMOuvKQmraUEM1gwvPAGE/4cvLhn7MZnTXSOsOMKLGldLh/3Qr3frI9+nra+soRJ1U/+IVdN5j19I952XYgBkRXxl4Ucc6WnPVWfT5J26jy2bnDZ3KWPIt+sWxVRnzyCVyKufnhk5tDb1L6278MT37k5V0mXmWnYF9Q5scYSC0mf5828O02tnrE9pMb9x4Cf3fa66mizPO1Xo+Lf3f36ELfnUdnffQe2YzaajuMXrgllo654fnDi5GdeGR6YOn+Dy65q+X0hd+eQRleQ6jY59fQff/5UpaXpypXWPAcyHrc/TNdQEK3LWMqj0rMvMY6NAmeubyL9Hye7hD4zPrVEZv+fF04lc30PqVJ9JRWR7KuegF+tM//D9659KjM2bxlelTpdz+IPW03UAr5mBhfjQtuu1v9Nd/eJqeP2NWZt3tGCDIO/t6uuedS+mCV0+k6R4PZZ2/hRruennYJmQPzhKTCdUSZUAZUAaUAWVAGVAGxo6BTP1ZO3YMqiRlQBlQBpQBZUAZGDEDuvAYMVV6oTKgDCgDyoAyoAwcKAO68DhQBrW+MqAMKAPKgDKgDIyYAV14jJgqvVAZUAaUAWVAGVAGDpQBXXgcKINaXxlQBpQBZUAZUAZGzIAuPEZMlV6oDCgDyoAyoAwoAwfKgC48DpRBra8MKAPKgDKgDCgDI2ZAFx4jpkovVAaUAWVAGVAGlIEDZUAXHgfKoNZXBpQBZUAZUAaUgREzoAuPEVOlFyoDyoAyoAwoA8rAgTKgC48DZVDrKwPKgDJwQAzU0ls/mkP5d75FvQckh6mMYHbfrTbB/XIueJTWdQyGDGUu1ixlYHwY0IXH+PCsWpQBZUAZYBgIkH/jNXT1D2qZsgPNClD7i3fTw8trKBx8k57oWEU/r+k6UKFaXxk4YAZ04XHAFKoAZUAZUAZcMuBfTXf+4BT69i3TXAqwVcum0rP+kx5fUkz+bc/S2u3fpuWLCm0VtEwZGBcGdOExLjSrEmVAGRgfBgLU/tyldOXWnvFRd0BaamnjjavJ+8gKOiTngARZKvdSw1NLqGTh0/Ta+SfRwkKd8i1kadE4MaC9cJyIVjXKgDKQgIH6VXShx2P2I3ic1wufoc2oFlOWc83L1MCK20OvP3YcnXN4PlvqJjNUu5oe++WldNURlXTai/t5ER3r6YVbFlE1cFdfSF97vYECA1cGNq6gQ532RL3O+d4jdMPxd9ONs5O57yKPqla8TcHaf6NvvHs2nf7w1kFcfEM0VxlIPgO68Eg+x6pBGVAGRsJA9Sp6NPgmPX1BERGdTcs3tFL40XNpEepWr6KHNyyn+XQGLX1iC9Xf+Vmq4mT6XqJfHXcSnTxWM5vvAbrq+Efpxf98mO7efjCnkcj/HP3HRSvoqulP0jvhMAU3fZpmffkcOmttnfmSz17yFO0Ihyk87K+RfjflXlp73jzK8kynxdc1Ue/3FlNZMjaYEpF31nn0tXMOpZZWPwX5VmiuMjBuDIzV8Bw3wKpIGVAG0pgBbwWVT8simr+Uln+6fKih/ufokTvXU9FTD9Haf1xA/I6IALX/+a807QuHUPZQzQN7V7aSflL/X3TfjafyCx3qpLrnVtG3ff9O9198tMHlnbWSbvhNMb36hfvoIZ90N2MaHXdt48BipJE23T6N8u7YRL5rjqO8A0PM1w5to81/6qQTj52XHPm8Vs1VBlgGdOHB0qKZyoAyMDEM+Kj1o16i+RU0bXB2qqW37r2Mvr/4f+il5XMti4qxf8ySkIPQBnrhob8SfWoeHTGIN5tKjz+XvkPP0uqNLQlFJO+Cdtr+80Mjj66yrqYfLnyE7vvc1OSpU8nKwAgZGBy4KT77AAAD5ElEQVQqI7xeL1MGlAFlIHkMBHbSrg29lP0J54u8k+pfvIS+8JOVdP/li4U7HQNwRviYJbT1GvrcT9+lprhWdFLD81+jFS/El8RdOpAR2v4M/XbdNJp2WHUcNs+09+i1l94V9qJES4zc/eiR7nZ0rKfnsMdk+pfosq0f07Y/fI0urMZemDPptCe3Uhs1ROUdTYtuf402mxstpXT4JTsG7qq8QK98+wRapDN+NPH6foIY0G44QcSrWmVAGWAYaNxM7+0kyppaShVEFKq9i37wxYNo5V+upOXFtulq5I9ZvAtuol8ffhutGLb46KSGF/6ZvvbBtXT/mfyDHAbtQFY1HTF36vA7MSVH0BELx+KBz056+eYv0dnf/Dnd3dRDNWtfp3ePfYQerd9Hm35YQ+uvup0ufnTDQJ6fan9bQK3fv5ce2D4ZvHpkRrUkvRmwjeT0brm2ThlQBlKOgcC+Gvozzaf5B8+gvNAmenrlY7Tvf66n62fnJsA6mscsRVR15n/S44OLj97IomP79fTUvx4Td+cigeIkF8+nz/6ffbTtwflEVEYLT/88LTdczKTDFx9BVQ2bqanqlIG8Iqo6ZjEdTa/R7/60W71XkmwZFe+egbFYkrvXrjWVAWVAGRhkIEBd7S3URXPoUwd5aevPL6UrT/wNvXP6rOF3Ewavj3pjHrOcQr8a8U+pgcUH/TOtOK2J6Nx7xnbR0bGNttUEiD4VhVHfKgPKgGFgxMNU+VIGlAFlILkMdNFHH+6mBjqEluz4V/rsC5fRrxPt6zCARv6YZazxew8/l1ac9j5t27M/7g5DuOloOvlzxwjeMGONROUpA5OHAV14TB5bKVJlIM0ZaKLaD7Cx85f03aur6eL7zqdlJSOZokbzmMWhcGBPBx6vvPJ81GMXp3yEr97FdMo/zKaGNa/Ta4OeswFqf/MZuvuEi2jlSdipokkZUAaiGRjJqI6+Xt8rA8qAMpAcBkK7afffEMTsbFr+u9toVcJ9HQMwRujNMgQ6atFh9nTkxez5GLoy8btSOvyfbqV///g7dNlD71EThci/5TZa9U9+OvXGf6BzrBtiE0vXK5SBtGQgrEkZUAaUgVRgoP+p8B15c8MLf/ZuuHHEePrDvmcvCV+xpXvENYJbrg4vu/cdRoc/XPfHi8Ir3+gYkhV8KfzwsuwwEQ39nfFw+JXg0CV4F6x9PPzwlVWRa5ZeE77ijbpw//BL3H2K018Vrnro5fCL/1Y6hIeQ93a45sH5UXkUzr56XbjenVatpQwklQEPpKflikobpQwoA8qAMqAMKAMpx4A+akk5kyggZUAZUAaUAWUgfRn4/8W2MNyKGtDWAAAAAElFTkSuQmCC" alt></p>
<p>total work done = enclosed area / number of large squares ∼40(±5);<br>1 square=5 J;<br>work done=200J (±25) J;</p>
<p> </p>
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<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p>(i) Some candidates simply repeated the information they had already supplied in A4(a) without thinking the problem through afresh. The correct ideas of low pressure and high temperature were commonly seen in scripts.<br>(ii) Many recognized that adiabatic changes involve no energy interchange. Those who talked about no exchange of heat were penalized. The bald term “heat” is not awarded credit in this examination.</p>
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<div class="question_part_label">a.</div>
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<p>This was often well done with perhaps a third of the candidates gaining full or near-full marks for recognition of the work done and a deduction from this of the sign of Δ<em>U</em> and <em>W</em>.</p>
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<div class="question_part_label">b.</div>
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<p>Although about half were able to arrive at a close estimate of the work done in the cycle, sometimes explanations were brief and obscure. A string of numbers without explanation does not endear itself to the examiners who can only rarely give credit to partial solutions if it is not clear what ideas are in use or where the data is coming from.</p>
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<div class="question_part_label">c.</div>
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<br><hr><br><div class="specification">
<p>This question is in two parts. <strong>Part 1</strong> is about thermal properties of matter. <strong>Part 2</strong> is about quantum physics.</p>
<p><strong>Part 1</strong> Thermal properties of matter</p>
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<p><strong>Part 2</strong> Quantum physics<br>The diagram shows the end of an electron diffraction tube.</p>
<p><img 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" alt></p>
<p>A pattern forms when diffracted electrons are incident on a fluorescent layer at the end of the tube.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Three ice cubes at a temperature of 0ºC are dropped into a container of water at a temperature of 22ºC. The mass of each ice cube is 25 g and the mass of the water is 330 g. The ice melts, so that the temperature of the water decreases. The thermal capacity of the container is negligible.</p>
<p>(i) The following data are available.</p>
<p style="padding-left: 30px;">Specific latent heat of fusion of ice = 3.3×10<sup>5</sup> J kg<sup>–1</sup><br>Specific heat capacity of water = 4.2×10<sup>3</sup> J kg<sup>–1</sup> K<sup>–1</sup></p>
<p>Calculate the final temperature of the water when all of the ice has melted. Assume that no thermal energy is exchanged between the water and the surroundings.</p>
<p>(ii) Explain how the first law of thermodynamics applies to the water when the ice cubes are dropped into it.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the pattern demonstrates that electrons have wave properties.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Electrons are accelerated to a speed of 3.6×10<sup>7 </sup>ms<sup>−1</sup> by the electric field.</p>
<p>(i) Calculate the de Broglie wavelength of the electrons.</p>
<p>(ii) The cathode and anode are 22 mm apart and the field is uniform.<br>The potential difference between the cathode and the anode is 3.7 kV.<br>Show that the acceleration of the electrons is approximately 3×10<sup>16</sup>ms<sup>−2</sup>.</p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what can be deduced about an electron from the amplitude of its associated wavefunction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>An electron reaching the central bright spot on the fluorescent screen has a small uncertainty in its position. Outline what the Heisenberg uncertainty principle is able to predict about another property of this electron.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) <span style="font-size: 11.000000pt; font-family: 'ArialMT';">use of </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">M</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">4.2</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">10</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 5.000000pt;">3</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×∆<em>θ</em></span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">;<br></span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">ml </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">75</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">10</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 5.000000pt;">–3</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">3.3</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">10</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 5.000000pt;">5 </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">/ 24750 J;<br>recognition that melted ice warms and water cools to common final temperature;<br>3.4</span><span style="font-size: 8.000000pt; font-family: 'SymbolMT'; vertical-align: 2.000000pt;">°</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">C;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">(ii) work done on water by dropping cubes / negligible work done;<br></span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">W </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">negative or unchanged;<br>water gives thermal energy to ice;<br></span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">Q </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">negative;<br>water cools to a lower temperature;<br> </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">∆ </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">U </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">negative / </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">U </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">decreases; </span></p>
<div class="question_part_label">b.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">bright and dark rings/circles / circular fringes;<br>maximum and minimum / constructive and destructive;<br>mention of interference / mention of superposition;<br> link to interference being characteristic of waves; </span></p>
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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';">(i) (</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">p</span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">m</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: -3.000000pt;">e</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">v<span style="font-size: 12.000000pt; font-family: 'SymbolMT';">=</span></span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">) 3.2</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">8</span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">10</span><span style="font-size: 7.000000pt; font-family: 'SymbolMT'; vertical-align: 5.000000pt;">−</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 5.000000pt;">23</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">Ns; </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">\(\lambda = \left( {\frac{{\rm{h}}}{{\rm{p}}} = \frac{{6.63 \times {{10}^{ - 34}}}}{{3.28 \times {{10}^{ - 23}}}} = } \right)2.02 \times {10^{ - 11}}{\rm{m}}\);</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">(ii) \(E = \left( {\frac{{\Delta V}}{{\Delta x}}} \right) = \frac{{3.7 \times {{10}^3}}}{{22 \times {{10}^{ - 3}}}}\left( { = 1.68 \times {{10}^5}} \right){\rm{V}}{{\rm{m}}^{{\rm{ - 1}}}}\);<br>\(F = \left( {Eq} \right) = 1.68 \times {10^5} \times 1.6 \times {10^{ - 19}} = \left( {2.69 \times {{10}^{ - 14}}} \right){\rm{N}}\);<br>\(a = \frac{F}{m} = \left( {\frac{{2.69 \times {{10}^{ - 14}}}}{{9.11 \times {{10}^{ - 31}}}}} \right) = 2.95 \times {10^{16}}{\rm{m}}{{\rm{s}}^{ - 2}}\);</span></p>
<p><em><strong><span style="font-size: 11pt; font-family: 'ArialMT';">or</span></strong></em></p>
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">use of appropriate equation, eg v</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 4.000000pt;">2 </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">u</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 4.000000pt;">2 </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">+ </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">2as;<br>correct substitution (ignoring powers of ten);<br>a</span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">=</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">2.95</span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">×</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">10</span><span style="font-size: 7.000000pt; font-family: 'ArialMT'; vertical-align: 4.000000pt;">16 </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">ms</span><span style="font-size: 7.000000pt; font-family: 'SymbolMT'; vertical-align: 4.000000pt;">−2</span></p>
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</div>
<div class="question_part_label">d.</div>
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<div class="question" style="padding-left: 20px;">
<p>square of amplitude (of wavefunction);<br> (proportional to) probability of finding an electron (at a particular point);</p>
<div class="question_part_label">e.</div>
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<div class="question" style="padding-left: 20px;">
<p>relates position to momentum (or velocity);<br> large uncertainty in momentum / most information on momentum is lost;</p>
<div class="question_part_label">f.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
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<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>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
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<br><hr><br><div class="specification">
<p class="p1">This question is about an ideal gas.</p>
<p class="p1">The graph shows how the pressure \(P\) of a sample of fixed mass of an ideal gas varies with volume \(V\).</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-29_om_15.45.04.png" alt="N15/4/PHYSI/HP2/ENG/TZ0/04"></p>
<p class="p1">The temperature of the gas at point A is 85 °C. The gas can change its state to that of point C either along route ABC or route ADC.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the temperature of the gas at point C.</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 class="p1">Compare, without any calculation, the work done and the thermal energy supplied along route ABC <strong>and </strong>route ADC.</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 class="p1">use of \(\frac{{PV}}{T} = \) constant <strong><em>or </em></strong>use of \(T \propto PV\) <strong><em>or </em></strong>via intermediate calculation of \(n\) in \(PV = nRT\);</p>
<p class="p1">\(\frac{{1.95}}{{358}} = \frac{{8.55}}{{{T_{\text{c}}}}}\) <strong><em>or</em></strong> \(n = 6.55 \times {10^{ - 3}}{\text{ (mol)}}\); } <em>(allow power of ten omission provided same omission on both sides)</em></p>
<p class="p1">1570 K <strong><em>or </em></strong>1300 °C;</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for a bald correct answer ignoring small rounding errors.</em></p>
<p class="p1"><em>Omitting conversion to Kelvin yields answer of 373 – award </em><strong><em>[2 max] </em></strong><em>as one error.</em></p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>if 273 subsequently added (to give 646).</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">same temperature change so same change in internal energy/\(\Delta U\);</p>
<p class="p1">work done along ABC is larger/ADB is smaller because area under ABC is greater than area under ADC/\(\Delta V\) same in both, \(P\) greater for ABC so \(P\Delta V\) also greater for ABC;</p>
<p class="p1">because \(\Delta Q = \Delta U + W\) thermal energy transferred is greater for route ABC/smaller for route ADB;</p>
<p class="p1"><em>Must see reference to first law for MP3.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">It is sad that many young physicists at this level cannot negotiate their way correctly through a straightforward gas-law calculation. As usual, many failed to convert from degree Celsius to Kelvin before carrying out the numerical manipulation. This was an excellent way to lose marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">A good number were able to give answers to parts of this question but few could pull all the strands together convincingly. Frequent omissions were: to show that the internal energy changes are identical because the endpoint temperatures are the same, and to use the first law to confirm the final linking statement.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><strong>Part 2</strong> A heat engine</p>
<p>The piston of an engine contains a fixed mass of an ideal gas. During one cycle of the engine, the gas undergoes the thermodynamic processes shown below.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State what is meant by an isothermal process.</p>
<p>(ii) Show that process AB is isothermal.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the nature of process BC.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>During the cycle ABCD, the net work done by the gas is 550J. Calculate the net thermal energy absorbed by the gas.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why it is not possible for this engine, operating in this cycle, to be 100% efficient.</p>
<div class="marks">[3]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) a process in which temperature remains constant;</p>
<p>(ii) calculation to show that <em>pV</em>=16(×10<sup>2</sup>) at any point from A to B;<br>calculation to show that <em>pV</em>=16(×10<sup>2</sup>) at any other point from A to B;<br>pV is constant;</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>isochoric / isovolumetric / occurs at constant volume;</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\Delta U = 0\);<br>Q=W=550(J);</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>the gas/system must return to original conditions (<em>P</em>, <em>V</em>, and <em>T</em>);<br>(to do that) some of the thermal energy absorbed by gas must be given off to the <span style="text-decoration: underline;">surroundings</span>;<br>hence not all thermal energy absorbed by gas can be converted to work;<br>it is the second law of thermodynamics;</p>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 20">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">ei) Most recognized the meaning of isothermal. </span></p>
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">eii) The calculations were successfully done but some candidates missed a concluding statement. </span></p>
</div>
</div>
</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 20">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">This was well answered. </span></p>
</div>
</div>
</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 20">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">A significant number attempted a calculation based on the area under the graph on the previous page. </span></p>
</div>
</div>
</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 20">
<div class="layoutArea">
<div class="column">
<p><span style="font-size: 10.000000pt; font-family: 'Arial';">Many were able to relate this to the second law of thermodynamics and recognized that some of the thermal energy was given off to the surroundings. </span></p>
</div>
</div>
</div>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about an ideal gas cycle.</p>
<p>The <em>P</em>–<em>V</em> diagram shows a cycle ABCDA for a fixed mass of an ideal gas.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the total work done in the cycle.</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 change <strong>AB</strong> is isothermal and occurs at a temperature of 420K. Calculate the number of moles of gas.</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>Identify and explain the change, if any, in the entropy of the gas when it has completed one cycle.</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;">
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">use of area under the curve;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">each (1 cm </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">× </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">1 cm) square has energy of 250 J </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';">each small square has energy of 10 J;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">estimate (14 to 16 </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">× </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">250) </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">3500 to 4000 J; </span></p>
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</div>
</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
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<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">clear use of value on AB; (</span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">must see correct values</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">)</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">use of </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">PV </span><span style="font-size: 11.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 11.000000pt; font-family: 'Arial'; font-style: italic;">nRT</span><span style="font-size: 11.000000pt; font-family: 'ArialMT';">;</span></p>
<p><span style="font-size: 11.000000pt; font-family: 'ArialMT';">0.56 to 0.60 mol; </span></p>
</div>
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</div>
</div>
</div>
</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
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<div class="layoutArea">
<div class="column">entropy unchanged;</div>
<div class="column">gas returned to original state;</div>
</div>
</div>
</div>
</div>
</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>