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</div><h2>SL Paper 3</h2><div class="specification">
<p class="p1">This question is about the Doppler effect.</p>
<p class="p1">Georgia carries out an experiment to measure the speed of mosquitoes. She sets up a microphone to record the sounds of passing mosquitoes.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-02_om_15.22.46.png" alt="N14/4/PHYSI/SP3/ENG/TZ0/03"></p>
<p class="p1">One mosquito is moving in a straight line with constant speed and passes very close to the microphone as seen in the diagram. The mosquito produces a sound of constant frequency.</p>
<p class="p1">The speed of sound in air is \({\text{340 m}}\,{{\text{s}}^{ - {\text{1}}}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The maximum frequency recorded is 751 Hz and the minimum frequency recorded is 749 Hz. Explain this observation.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the speed of the mosquito.</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">as the mosquito approaches the wavelength perceived by Georgia is shorter and therefore the perceived frequency is higher;</p>
<p class="p1">as the mosquito is moving away, the wavelength perceived is longer than the emitted and therefore the perceived frequency is lower;</p>
<p class="p1">due to the Doppler effect;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">approaching \(751 = f \times \frac{{340}}{{340 - u}}\);</p>
<p class="p1">moving away \(749 = f \times \frac{{340}}{{340 + u}}\);</p>
<p class="p1">to produce \(u = 0.45{\text{ m}}\,{{\text{s}}^{ - 1}}\);</p>
<p class="p1"><strong><em>or</em></strong></p>
<p class="p1">emitted frequency is \(\frac{{751 + 749}}{2} = 750{\text{ Hz}}\);</p>
<p class="p1">applying the Doppler effect for approach (or recession), \(751 = 750\frac{{340}}{{340 - u}}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)\(749 = 750\frac{{340}}{{340 + u}}\);</p>
<p class="p1">to produce \(u = 0.45{\text{ m}}\,{{\text{s}}^{ - 1}}\);</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">In (a), many candidates drew the classic diagram with wavefronts closer in front of the source and further apart behind. However, very few related this to the situation and the values given.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(b) was a more difficult question with few working through to the solution.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is about the Doppler effect.</p>
</div>
<div class="specification">
<p class="p1">A child on a carousel (merry-go-round) moves with a speed of \({\text{6.5 m}}\,{{\text{s}}^{ - 1}}\) along a horizontal circular path ABCDA. A stationary observer is at a large distance from the carousel.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-11_om_10.34.17.png" alt="M14/4/PHYSI/SP3/ENG/TZ2/02.b"></p>
<p class="p1">The child blows a whistle while moving from position B to position D. The whistle emits sound of frequency 850 Hz. The speed of sound in air is \({\text{330 m}}\,{{\text{s}}^{ - 1}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe what is meant by the Doppler effect.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Determine the minimum frequency of the sound heard by the observer.</p>
<p class="p1">(ii) Describe the variation of the frequency of the sound heard by the observer.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">change in the observed/perceived frequency;</p>
<p class="p1">when there is relative motion between the source and the observer / when either the source or observer is moving;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>\(f = 850\left[ {\frac{{330}}{{330 + 6.5}}} \right]\);</p>
<p class="p1">\(f = 830{\text{ (Hz)}}\);</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for correct answer if moving observer equation is used with 6.5 in the numerator or if the approximate formula is used.</em></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>frequency increases;</p>
<p class="p1">(from 830 (Hz)) to 870 (Hz);</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">(a) was usually answered correctly, but it is worth emphasising that it is the perceived frequency that changes.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (i) there were many correct answers, but sometimes the wrong Doppler equation was used or an incorrect sign convention chosen. Having found the minimum frequency (at position B) the vast majority then stated, in (ii), that frequency decreased from B to C. This is a question that needs careful discussion in class with future candidates.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is about interference.</p>
<p class="p1">Light from a laser is incident on two identical parallel slits. The light from the two slits produces a fringe pattern on a screen.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-12_om_05.46.22.png" alt="M14/4/PHYSI/SP3/ENG/TZ2/19"></p>
<p class="p1">A central bright fringe is produced at C. The next bright fringe is produced at A. There is a dark fringe at B.</p>
</div>
<div class="specification">
<p class="p1">The light from the laser is coherent and monochromatic.</p>
</div>
<div class="specification">
<p class="p1">The distance from the two slits to the screen is 1.5 m. The distance BC is 1.8 mm and the distance between the slits is 0.30 mm.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline what is meant by the term</p>
<p class="p1">(i) coherent.</p>
<p class="p1">(ii) monochromatic.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the phase difference between the light waves from the two slits that meet at B.</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">(i) Show that the laser produces light of wavelength equal to 720 nm.</p>
<p class="p1">(ii) State the path difference, in metres, between the waves that meet at B.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the number of lines per metre of the diffraction grating.</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 class="p1">(i) constant/zero phase difference (between the light waves);</p>
<p class="p1">(ii) single/same wavelength/frequency; <em>(allow “narrow band” OWTTE)</em></p>
<p class="p1"><em>Do not allow “single colour”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">\(180^\circ /\pi {\text{rad}}\);</p>
<p class="p1"><em>Do not accept </em>\(\frac{\lambda }{2}\)<em>.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) <span style="text-decoration: underline;">use</span> of \(\lambda = \frac{{sd}}{D}\);</p>
<p>\(s = \underset{\raise0.3em\hbox{$\smash{\scriptscriptstyle-}$}}{2} \times 1.8{\text{ (mm)}}\); <em>(award this mark for any evidence for the factor of 2)</em></p>
<p>\(\lambda = \frac{{{\text{2}} \times {\text{1.8}} \times {\text{1}}{{\text{0}}^{ - 3}} \times {\text{0.30}} \times {\text{1}}{{\text{0}}^{ - 3}}}}{{{\text{1.5}}}}\) / <em>OWTTE</em>;</p>
<p>\({\text{(}} = 7.2 \times {10^{ - 7}}{\text{ m)}}\)</p>
<p><em>Exact answer is given, award marks for correct working.</em></p>
<p>(ii) \({\text{3.6}} \times {\text{1}}{{\text{0}}^{ - 7}}{\text{ m}}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)360 nm;</p>
<p><em>Allow ECF from (c)(i).</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><span style="text-decoration: underline;">use</span> of \(d = \frac{{n\lambda }}{{\sin \theta }}\);</p>
<p class="p1">\(d = \frac{{3 \times 720 \times {{10}^{ - 9}}}}{{\sin 39^\circ }} = 3.4 \times {10^{ - 6}}{\text{ (m)}}\);</p>
<p class="p1">\(N = \left( {\frac{1}{{3.4 \times {{10}^{ - 6}}}} = } \right){\text{ }}2.9 \times {10^5}\);</p>
<p class="p1"><em>Award </em><strong><em>[3] </em></strong><em>for a bald correct answer.</em></p>
<p class="p1"><em>ECF examples:</em></p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>if n = 2 is used (gives 4.4 </em>\( \times \)<em> 10<sup>5</sup>).</em></p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>if 78° is used (gives 4.5 </em>\( \times \)<em> 10<sup>5</sup>).</em></p>
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>if 13° and n = 1 used (gives 3.1 </em>\( \times \)<em> 10<sup>5</sup>).</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 class="p1">This question is about diffraction and resolution.</p>
</div>
<div class="specification">
<p class="p1">A parallel beam of monochromatic light is incident on a narrow rectangular slit. After passing through the slit, the light is incident on a distant screen.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-10_om_13.06.01.png" alt="N10/4/PHYSI/SP3/ENG/TZ0/A2.a"></p>
<p class="p1">Point X is the midpoint of the slit.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>On the axes below, sketch a graph to show how the intensity of the light on the screen varies with the angle \(\theta \) shown in the diagram.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-10_om_14.30.23.png" alt="N10/4/PHYSI/SP3/ENG/TZ0/A2.a.i"></p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>The wavelength of the light is 520 nm, the width of the slit is 0.04 mm and the screen is 1.2 m from the slit. Show that the width of the central maximum of intensity on the screen is about 3 cm.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Points P and Q are on the circumference of a planet as shown.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-10_om_14.46.03.png" alt="N10/4/PHYSI/SP3/ENG/TZ0/A2.b"></p>
<p class="p1">By considering the two points, outline why diffraction limits the ability of an astronomical telescope to resolve the image of the planet as a disc.</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">(i) <span class="Apple-converted-space"> <img src="images/Schermafbeelding_2016-11-10_om_14.36.49.png" alt="N10/4/PHYSI/SP3/ENG/TZ0/A2.a.i/M"></span></p>
<p>general correct shape touching axis and symmetric about \(\theta = 0\) (at least onesecondary maxima on each side); <em>(judge by eye)</em></p>
<p>central maximum wider than secondary maxima;</p>
<p class="p1">secondary maxima at most one third intensity of central maximum;</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>\(\frac{d}{2} = \frac{{D\lambda }}{b}\);</p>
<p class="p1">\(d = \frac{{2.0 \times 1.2 \times 5.2 \times {{10}^{ - 7}}}}{{4.0 \times {{10}^{ - 5}}}} = 3.12 \times {10^{ - 2}}{\text{ m}}\);</p>
<p class="p1">\( \approx 3{\text{ cm}}\)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Award </em><strong><em>[2 max] </em></strong><em>for a sensible argument.</em></p>
<p class="p1"><em>e.g. </em>light from each point forms a diffraction pattern after being focussed by the eyepiece of the telescope;</p>
<p class="p1">if the diffraction patterns are not sufficiently well separated then the points will not be resolved as separate sources;</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for the conclusion.</em></p>
<p class="p1"><em>e.g. </em>if the points cannot be resolved as separate sources the planet cannot be seen as a disc;</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">Intensity distributions were often drawn well but quite a few candidates did not have their graphs in contact with the \(\theta \) axis. Candidates’ working was often difficult to follow in the calculation part of this question.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Very few candidates recognised the role played by diffraction in the resolution of the planet as a disc.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">This question is about a diffraction grating.</p>
</div>
<div class="question">
<p class="p1">For a particular grating, the distance between adjacent slits is \(2.0 \times {10^{ - 6}}{\text{ m}}\). Determine, for light of wavelength 520 nm, the maximum theoretical order of diffraction.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">\(n = \left( {\frac{d}{\lambda } = } \right){\text{ }}\left( {\frac{{2.0 \times {{10}^{ - 6}}}}{{5.2 \times {{10}^{ - 7}}}} = } \right){\text{ 3.85}}\);</p>
<p>so \(\max = 3\);</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">The application of the formula in part (b) was often done well.</p>
</div>
<br><hr><br><div class="specification">
<p>This question is about the Doppler effect.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe what is meant by the Doppler effect as it relates to sound.</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>An ambulance is travelling at a speed of 28.0 ms<sup>–1</sup> along a straight road. Its siren emits a continuous sound of frequency 520 Hz. The ambulance is approaching a stationary observer. The observer measures the frequency of the note to be 566 Hz. Determine the speed of sound.</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>observed/perceived change in pitch/frequency;<br>when there is relative motion between source and observer;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>recognize that \(f' = \left[ {\frac{v}{{v - {u_{\rm{s}}}}}} \right]f\);<br>\(566 = \left[ {\frac{v}{{v - 28}}} \right]520\);<br>to give <em>v</em>=345(ms<sup>-1</sup>) ;<br><em>Award <strong>[0]</strong> for use of the moving observer Doppler equation.</em><br><em>Award <strong>[2 max]</strong> for the use of +28 to give -345(ms<sup>-1</sup>).</em><br><em>Otherwise award only the first marking point for substitution of the incorrect </em><em>values in the correct equation.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about radio telescopes.</p>
<p>A distant galaxy emits radio waves of frequency 6.0×10<sup>9</sup> Hz and is moving with speed 6.0×10<sup>6</sup> ms<sup>–1</sup> directly away from an observer on Earth.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the wavelength of the radio wave as measured by the observer on Earth.</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 radio signals from two stars on opposite sides of the galaxy are detected on Earth using a radio telescope. The telescope has a circular receiving dish.</p>
<p>(i) State the Rayleigh criterion for the images of two point sources to be just resolved.</p>
<p>(ii) The galaxy is 2.0×10<sup>21</sup>m from Earth and the stars are separated by 5.0×10<sup>19</sup>m. Determine the minimum size of the telescope dish required to resolve the images of the two stars at a wavelength of 5.1×10<sup>–2</sup>m.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(\left( {{\rm{since}}\frac{v}{c} \ll 1} \right)\)\(\Delta f\left( { = \frac{v}{c}f} \right) = \frac{{6.0 \times {{10}^6}}}{{3.0 \times {{10}^8}}}6.0 \times {10^9}\left( { = 0.12 \times {{10}^9}{\rm{Hz}}} \right)\);<br>\(f' = f - \Delta f\left( { = 5.9 \times {{10}^9}{\rm{Hz}}} \right)\);<br>\(\lambda '\left( { = \frac{c}{{f'}} = \frac{{3.00 \times {{10}^8}}}{{5.9 \times {{10}^9}}}} \right) = 5.1 \times {10^{ - 2}}\left( {\rm{m}} \right)\);</p>
<p><em>Award <strong>[2 max]</strong> if ƒ'=ƒ+Δƒ used to give </em>λ<em>'</em>=4.9x10<sup>-2</sup>(m).</p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p>(i) the two (point-like) sources generate diffraction patterns with central maxima;<br>the central maximum of one pattern overlaps with the first minimum of the second diffraction pattern;</p>
<p>(ii) \(\theta \approx \frac{d}{D} = \frac{{5.0 \times {{10}^{19}}}}{{2.0 \times {{10}^{21}}}} = 0.025({\rm{rad}})\)<br>\(\left( {b > 1.22\frac{{5.1 \times {{10}^{ - 2}}}}{{0.025}} = } \right)2.5\left( {\rm{m}} \right)\);</p>
<p><em>Allow <strong>[1 max]</strong> for solution that omits 1.22.</em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p> was well done by some, although many used the equation appropriate for sound not the approximation for light where c >> v.</p>
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<div class="question_part_label">a.</div>
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<p>In (b) (i) candidates often got the first mark by implication when gaining second mark. There was a lot of confused algebra in (b)(ii).</p>
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<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p class="p1">This question is about resolution and polarization.</p>
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<div class="specification">
<p class="p1">A ship sails towards two stone towers built on land.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-11_om_10.38.34.png" alt="M14/4/PHYSI/SP3/ENG/TZ2/03.b"></p>
<p class="p1">Emlyn, who is on the ship, views the towers. The pupils of Emlyn’s eyes are each of diameter 2.0 mm. The average wavelength of the sunlight is 550 nm.</p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the Rayleigh criterion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Calculate the angular separation of the two towers when the images of the towers are just resolved by Emlyn.</p>
<p class="p1">(ii) Emlyn can just resolve the images of the two towers when his distance from the towers is 11 km. Determine the distance between the two towers.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Emlyn puts on a pair of polarizing sunglasses. Explain how these sunglasses reduce the intensity of the light, reflected from the sea, that enters Emlyn’s eyes.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">for the images (of two sources) just to be resolved/distinguished/seen as separate;</p>
<p class="p1">central maximum of one diffraction pattern must coincide with first minimum of second / <em>OWTTE</em>;</p>
<p class="p1"><em>Accept a suitably drawn diagram for the second marking point.</em></p>
<div class="question_part_label">a.</div>
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<p>(i) \(\theta = \left( {\frac{{{\text{1.22}} \times {\text{550}} \times {\text{1}}{{\text{0}}^{ - 9}}}}{{{\text{2.0}} \times {\text{1}}{{\text{0}}^{ - 3}}}} = } \right){\text{ }}3.4 \times {10^{ - 4}}{\text{ (rad)}}\)\(\,\,\,\)<strong><em>or</em></strong>\(\,\,\,\)0.019°;</p>
<p>(ii) \(d = 11 \times {10^3} \times 3.4 \times {10^{ - 4}}\);</p>
<p>\( = {\text{3.7 (m)}}\);</p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for a bald correct answer.</em></p>
<div class="question_part_label">b.</div>
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<p class="p1">reflected light is (partially) polarized parallel to sea surface/horizontally polarized;</p>
<p class="p1">sunglasses have a transmission axis at 90° to reflected light/vertical transmission axis;</p>
<div class="question_part_label">d.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p class="p1">An improvement in the answers to (a) was noted.</p>
<div class="question_part_label">a.</div>
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<p class="p1">In (b) very few omitted to use the factor of 1.22 and full marks were often scored for both calculations.</p>
<div class="question_part_label">b.</div>
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<p class="p1">(d) was poorly answered with many being unable to make it clear that reflected light from the sea would be partially horizontally polarized. Some just referred to the darkness of the sunglasses' lens.</p>
<div class="question_part_label">d.</div>
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<br><hr><br><div class="specification">
<p>This question is about the Doppler effect.</p>
<p>The sound emitted by a car’s horn has frequency ƒ , as measured by the driver. An observer moves towards the stationary car at constant speed and measures the frequency of the sound to be ƒ '.</p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, using a diagram, any difference between ƒ and ƒ<em>'</em>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
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<p>The frequency ƒ is 3.00×10<sup>2</sup>Hz. An observer moves towards the stationary car at a constant speed of 15.0ms<sup>−1</sup>. Calculate the observed frequency ƒ' of the sound. The speed of sound in air is 3.30×10<sup>2</sup>ms<sup>−1</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>circular wavefronts around source, equally spaced;<br>moving observer intercepts more wavefronts per unit time / the time between intercepting successive wavefronts is less;<br>hence observes a higher frequency / ƒ′ > ƒ;<br><em><strong>or</strong></em><br>circular wavefronts around source, equally spaced;<br>the velocity of the sound waves with respect to the observer is greater;<br>since \(f' = \frac{{v'}}{\lambda }\), observed frequency is also greater;</p>
<div class="question_part_label">a.</div>
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<p style="text-align: left;">\(f' = f\left( {\frac{{v + {u_o}}}{v}} \right) = 300\left( {\frac{{330 + 15}}{{330}}} \right)\);<br>=314 Hz; <br><em>Award<strong> [0]</strong> for use of moving source formula.</em><br><em>Award <strong>[1]</strong> for use of v-u<sub>o</sub> to give 286 Hz.</em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p>This question is about using a diffraction grating to view the emission spectrum of sodium.</p>
<p>Light from a sodium discharge tube is incident normally upon a diffraction grating having 8.00×10<sup>5</sup> lines per metre. The spectrum contains a double yellow line of wavelengths 589 nm and 590 nm.</p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the angular separation of the two lines when viewed in the second order spectrum.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State why it is more difficult to observe the double yellow line when viewed in the first order spectrum.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\(d = \frac{1}{{8.00 \times {{10}^5}}} = 1.25 \times {10^{ - 6}}{\rm{m}}\);<br>\(d\sin \theta = n\lambda \Rightarrow \theta {\sin ^{ - 1}}\left[ {\frac{{n\lambda }}{d}} \right]\);<br>\({\sin ^{ - 1}}\left[ {\frac{{2 \times 589 \times {{10}^{ - 9}}}}{{1.25 \times {{10}^{ - 6}}}}} \right] = {\rm{ }}70.5^\circ {\rm{ }},{\sin ^{ - 1}}\left[ {\frac{{2 \times 590 \times {{10}^{ - 9}}}}{{1.25 \times {{10}^{ - 6}}}}} \right] = 70.7^\circ \);<br>70.7°−70.5°=0.2°;</p>
<div class="question_part_label">a.</div>
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<p>the lines are closer together / not clearly separate in the first order spectrum;</p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
<div class="question_part_label">a.</div>
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[N/A]
<div class="question_part_label">b.</div>
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<p>This question is about the Doppler effect.</p>
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<p>Describe the Doppler effect.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
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<p>A spectral line from a source on Earth has a frequency of 4.672×10<sup>14</sup> Hz. When this same line is observed from a distant galaxy it is found to have shifted to 4.669×10<sup>14</sup> Hz.</p>
<p>(i) State the direction of the motion of the galaxy relative to Earth.</p>
<p>(ii) Deduce the speed of the galaxy relative to Earth.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(apparent) shift in frequency of wave;<br>when relative motion between source of waves and observer;<br>approach gives increase in frequency / recession decrease in frequency;<br><em>Allow answer in terms of red or blue shifts.</em></p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p>(i) galaxy moving away from Earth;</p>
<p>(ii) rearranges data book equation thus \(v \approx \frac{{\Delta f}}{f}c\);<br>\(v = \frac{{3.0 \times {{10}^{11}} \times 3 \times {{10}^8}}}{{4.672 \times {{10}^{14}}}}\);<br>\(v = 1.93 \times {10^5}{\rm{m}}{{\rm{s}}^{ - 1}}\);</p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
<div class="question_part_label">a.</div>
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[N/A]
<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p class="p1">This question is about diffraction and resolution.</p>
<p class="p1">Monochromatic light is incident normally on a single narrow slit and gives rise to a diffraction pattern on a screen.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-31_om_09.44.32.png" alt="N15/4/PHYSI/SP3/ENG/TZ0/03"></p>
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<p class="p1">Sketch, for the diffraction pattern produced, a graph showing the variation of the relative intensity of the light with the angle measured from the centre of the slit.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-31_om_09.48.03.png" alt="N15/4/PHYSI/SP3/ENG/TZ0/03.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The single narrow slit is replaced by a double narrow slit. Explain, with reference to your answer to (a), how the Rayleigh criterion applies to the diffraction patterns produced by the light emerging from the two slits.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<p class="p1">Two lamps emit light of wavelength 620 nm. The lights are observed through a circular aperture of diameter 1.5 mm from a distance of 850 m. Calculate the minimum distance between the lamps so that they are resolved.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">large central peak and at least one subsidiary maximum on each side;</p>
<p class="p1">minima have intensity of zero and intensity of secondary maxima at most 25 % of central maximum; } <span class="s1"><em>(judge by eye)</em></span></p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">explanation of resolving – seeing images as being from separate objects;</p>
<p class="p1">idea of diffraction patterns overlapping;</p>
<p class="p1">central maximum being at least as far from companion as the first minimum;</p>
<p class="p1"><em>Marking points may be seen on graph in (a).</em></p>
<p class="p1"><em>Marking points may be seen from diffraction pattern showing resultant intensity from two sources with a slight dip in the centre. </em></p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">equating \(1.22\frac{\lambda }{b}\) to \(\frac{x}{D}\);</p>
<p class="p1">0.43 (m);</p>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The majority could correctly sketch the diffraction pattern and only a few showed non-zero intensity at the minima. The definition of Rayleigh’s criterion was well known but candidates found it difficult to gain full marks explaining how the Rayleigh criterion applies to diffraction patterns, as asked. The calculation was well-attempted.</p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">The majority could correctly sketch the diffraction pattern and only a few showed non-zero intensity at the minima. The definition of Rayleigh’s criterion was well known but candidates found it difficult to gain full marks explaining how the Rayleigh criterion applies to diffraction patterns, as asked. The calculation was well-attempted.</p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p class="p1">The majority could correctly sketch the diffraction pattern and only a few showed non-zero intensity at the minima. The definition of Rayleigh’s criterion was well known but candidates found it difficult to gain full marks explaining how the Rayleigh criterion applies to diffraction patterns, as asked. The calculation was well-attempted.</p>
<div class="question_part_label">c.</div>
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<p>This question is about two-source interference.</p>
<p>Coherent light is incident at right angles to a double slit. An interference pattern is observed on a distant screen.</p>
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<div class="question">
<p>The number of slits is now increased. State and explain the effect, if any, this has on the appearance of the bright fringes.</p>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>brighter / more intense<br>sharper / more well-defined</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
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<p>This question is about a double-slit experiment.</p>
<p>Coherent monochromatic light is incident on two narrow rectangular slits. The diagram shows the fringes produced on a screen that is some distance from the slits. M is the middle of the central bright fringe and P is the middle of the third bright fringe.</p>
<p><img 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" alt></p>
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<p>Explain why an interference pattern is produced on the screen.</p>
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<p>The two slits are separated by 2.2 mm and the distance from the slits to the screen is 1.8 m. The wavelength of the light is 650 nm. Calculate the distance MP.</p>
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<div class="question_part_label">b.</div>
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<p><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">reference to</span></em><span style="font-size: 11.000000pt; font-family: 'Arial';"><em>:</em><br> diffraction at slits / slits are coherent sources;<br> path/phase difference;<br> constructive and destructive interference;<br> </span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Do not reward just “interference” as this is mentioned in the question. </span></em></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial';">for single fringe: \(s = \frac{{650 \times {{10}^{ - 9}} \times 1.8}}{{2.2 \times {{10}^{ - 3}}}}\left( { = 5.3 \times {{10}^{ - 4}}\left( {\rm{m}} \right)} \right)\); } </span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">(also award this mark if t</span><span style="font-size: 11pt; font-family: 'Arial,Italic';">he factor of 3 is seen in the numerator)</span></em><span style="font-size: 11.000000pt; font-family: 'Arial';"><br>distance \(MP = \left( {5.3 \times {{10}^{ - 4}} \times 3 = } \right)1.6 \times {10^{ - 3}}\left( {\rm{m}} \right)\);</span></p>
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<p><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Allow ECF from first marking point.<br>Award </span><span style="font-size: 11pt; font-family: 'Arial,BoldItalic';"><strong>[2]</strong> </span><span style="font-size: 11pt; font-family: 'Arial,Italic';">for a bald correct answer. </span></em></p>
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<div class="question_part_label">b.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'ArialMT';">In part (a) diffraction at each slit, followed by a path difference and subsequent constructive or destructive interference was very often given, but sometimes in a clumsy fashion. It is evident that not all candidates take 30s to plan the order in which they are going to present the steps in their argument. </span></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'ArialMT';">Part (b) was not difficult, but many lost 1 mark for not using n </span><span style="font-size: 12.000000pt; font-family: 'SymbolMT';">= </span><span style="font-size: 10.000000pt; font-family: 'ArialMT';">3. Highlight this fact in the stem and these kind of careless errors can be avoided. </span></p>
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<div class="question_part_label">b.</div>
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<p>This question is about standing waves and the Doppler effect.</p>
<p>The horn of a train can be modeled as a pipe with one open end and one closed end. The speed of sound in air is 330ms<sup>–1</sup>.</p>
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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>On leaving the station, the train blows its horn. Both the first harmonic and the next highest harmonic are produced by the horn. The difference in frequency between the harmonics emitted by the horn is measured as 820 Hz.</p>
<p>(i) Deduce that the length of the horn is about 0.20 m.</p>
<p>(ii) Show that the frequency of the first harmonic is about 410 Hz.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Describe what is meant by the Doppler effect.</p>
<p>(ii) The train approaches a stationary observer at a constant velocity of 50ms<sup>–1</sup> and sounds its horn at the same frequency as in (a)(ii). Calculate the frequency of the sound as measured by the observer.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) \({f_1} = \frac{v}{{4L}}\), \({f_2} = 3{f_1} = \frac{{3v}}{{4L}}\);<br>\({f_2} - {f_1} = \frac{v}{{2L}} = 820\left( {{\rm{Hz}}} \right)\);<br>\(L = \frac{{330}}{{2 \times 820}}\);<br>(<em>L</em>=0.20m)</p>
<p>(ii) \(\lambda = 4L = 0.80\left( {\rm{m}} \right)\);<br>\(f = \left( {\frac{{330}}{{0.8}}} \right) = 413 {\rm{Hz}}\);</p>
<p><em>This is a question testing units for this option. Do not award second marking point for an incorrect or missing unit.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) a change in the observed frequency/wavelength of a wave;<br>when there is relative motion of observer and source;</p>
<p>(ii) \(f'\left( { = f\frac{v}{{v - {u_s}}}} \right) = 410 \times \frac{{330}}{{330 - 50}}\);<br>\(f' = 480\left( {{\rm{Hz}}} \right)\);<br><em>Allow ECF from (a)(ii).</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about the Doppler effect in sound.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A fire engine is travelling at a constant velocity towards a stationary observer. Its siren emits a note of constant frequency. As the engine passes close to the observer, the frequency of the note perceived by the observer decreases. Explain this decrease in terms of the wavefronts of the note emitted by the siren.</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 frequency of the note emitted by the siren is 400 Hz. After the fire engine has passed, the frequency of the note detected by the observer is 360 Hz. Calculate the speed of the fire engine. (Take the speed of sound in air to be 340 ms<sup>–1</sup>.)</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<p>diagram showing (non concentric) wavefronts closer together in front/further apart behind source;<br>frequency is higher as source approaches (because more wavefronts are received per unit of time);<br>frequency is lower as source recedes (because fewer waverfronts are received per unit of time);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(360 = 400\left( {\frac{{340}}{{340 + {u_{\rm{s}}}}}} \right)\);<em><br>u</em><sub>s</sub>=38ms<sup>–1</sup>;<br><em>Award <strong>[2]</strong> for a bald correct answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about resolution.</p>
<p>Light from two monochromatic point sources passes through a circular aperture and is observed on a screen.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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" alt></p>
<p style="text-align: left;">The graph shows how the intensity <em>I</em> of the light on the screen varies with the angle <em>θ</em> .</p>
<p style="text-align: center;"><img 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" alt></p>
<p style="text-align: left;">The two sources are just resolved according to the Rayleigh criterion.</p>
<p> </p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what is meant by resolved in this context.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
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<p>The wavelength of the light from the two sources is 528 nm. The distance of the two sources from the aperture is 1.60 m.</p>
<p>Using data from the graph opposite, determine the</p>
<p>(i) separation of the two sources.</p>
<p>(ii) diameter of the aperture.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<p>the two sources are seen as two distinct sources / two distinct images are formed / the central maximum of one source coincides with the first minimum of the other;</p>
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<div class="question_part_label">a.</div>
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<p>(i) realization that the diffraction angle of the one source diffraction pattern is at 0.008 radians;<br>and so separation (=1.60×0.008=1.28)≈0.013m;</p>
<p>(ii) \(\left( {1.22\frac{{528 \times {{10}^{ - 9}}}}{b} = 0.008 \Rightarrow } \right)b = 0.081{\rm{mm}}\);</p>
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<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p> </p>
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<div class="question_part_label">a.</div>
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<p> </p>
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<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p>This question is about the Ω<span style="font-size: 7.000000pt; font-family: 'TimesNewRomanPSMT'; vertical-align: 5.000000pt;">– </span><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">particle. </span></p>
<p>The Ω<sup>–</sup> particle is a baryon which contains only strange quarks.</p>
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<p><span style="font-size: 12.000000pt; font-family: 'TimesNewRomanPSMT';">This question is about laser light.<br> </span></p>
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<p>Deduce the strangeness of the Ω<sup>–</sup> particle.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The Feynman diagram shows a quark change that gives rise to a possible decay of the Ω<sup>–</sup> particle.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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sWLsXf//uptgS+99FItA3FOqaYgX8yRRyRAAqEgQDEJBWXmoW2kJRhkky1fwuyZM2tsxKW2BVYbbcl4ieyLsm79+uptgaUXw0AC4SFwFt+tfxLjdx5FZXgKENZcKSZhxe+czNWU4B15eaitd6J6I9LLUEE24tr01lte3bBI2twWWNHi93kCe7DlsZsgG7IZf8Zi0dFz1bDO7RqLzkZxh2/BwepYPhxEHcS7w/+CmXvLfIhsrygUE3u1p2VrIxtqqTB08GCftgVul5CAZcuX+7Sjo+qtSB7cFliRdvL3jei94p/YtWUankproQNxFdrPycMX+xcgo+XFIeNGnRbg4/0fYu2wq7W4UXeNxqQtu7F3WW+01d1d+2E0rv79nzDhjr9j/cJ8FLtqj223q9y2124tauH6iOlK3+Pwti2wzPgS85U/2wLLJl5JHTtqtZcxFb24WBgJixYSAqUoXjEUDz1TjAoAUSnP4s1FvdHe41XadTQH0wc/g9xOC5A9IxltPa77WlRXyUKMTvkA0Tkr8UKnZr7eFvHx6okr4uvNCoSBgMy06tipU3XOsiWwiIt+a2DZFlhMWv4IiSSoX2fCnkk1Yh5oBFqg/dDn8Hy/8z2UyrxnMWHzYfdxDdfneDtrHja0nYmVAQiJZNcwvjf6p32F3C2fotRBLXCxn+egSrOq4SOweu3a6m2By8rKID0KEQJZeJjcvTu3BQ5f09g754bt0TUzE8OLnsSyQ9+jOGs+lnSeg4z4aADfoWjeKEyufBIrnutZo8fiP5hrcGfabxD1x0/xydNdkeqQX1mHVNP/x4F3BI+A7Gdi9p4mIkoqJCUlqUN+k8BFAjE98Nj09/H+gHdwoOIdLJ15F7ov6oHY/CkY/WYKJm/qjy4x5hhrGrVPQq/KrSg89BNS2//sYhlsfGQOORsDYtUigwBNW5HRTuEtZRRiOs3E0tk3ozEAMXeNmzUdU8c2wUNvTsRDLaWXYlKI+SWu++XnKNzzfyYlaP1kKCbWbyOW0E8CdHPvJzBHRW+MVmlPY9rvRE6+x6Gc7Tg6ffwFc5eJIBrGo82tUfi66KBjxk0oJiY+P0wqfASU40cpgVrTEr7SMOdQEpB1S7WtXapRloY3o/czT6Gf6AlO4tDKzdhWbvY83hg0vSIalaUncbJGAex5gmJiz3Z1bK3q60jSscAitOLiSUG8HaT16oWUbt2waeNGP2pSiuL1G/DBTbejndy1fzlmLCvCMT9S8Dlq0Vc4eHFtpM+3RWJEDsBHYquxzDUIKJ9c7JXUQGObE+I9Qdo5Ly9PmwUoa4lkMaxMuNBPDa+9wpUo3zUbw/LT8MyyPyB6SV8MWP4dji17BjN+u9z8dSEnv8LB0nOAboFk7eWL3KsUk8htO5bcgADHSwygROgpmaEnwqFERHyxySzAlxYvrrcp01WyGE/+0YX+2x9El5hoYORTGP6+TBf+DNuyVuP369KRatKMrgjFXu9iU0zqjY43WokAtwW2UmvUvywy9rEjN1cTEWlT8RIta5BkwauISUChvACr0t/Bz15Zf3HAXT9dWDN3dUHSuI5oHlBG+psP4dCRn4CWMfqTtjymmNiyWVkpEogcAjL+IWMeevOVOO6UHojv5qs66usqRv6MGdjYawFy3FycyHThp/D0sN3BNXfVUTw7XKaY2KEVWYdqAoFuCyymFZkZptatcFvgarReD4TZoIEDsWjJEp96D4pxXm6uZsJSHhAmTZ4cHJ9qrmJ88Odh+HOjacj+440GvY6r0WHcS5hzaCAmvv8Ztj02CXHrZmNqIreC9troBhcoJgZQeMqAwNGFGHHXQhQYXAISkLp2HV7opOvKn9uKBf8xFks950U2S8cL//hT0FxM1Hc2l5hXZFvgzZs21ajhjMaNMeCRR7gtcA0y0AbCRUjEv5qYp8RBp1FQ5isRahkDESef0vsYPGRIvcc/jPJxP1eK4u2LsWb+Omw4dAXaz2mHNr7MX63IxWsPnsPxueMwJTXBQHzcczH+6yi+2VsO4ErjyzY8S6/BNmzUoFXJdQCfrJyOrGc+xgEtE3Hn/Sre7HsNogwzrcDRHWMwfGQB/ueudIx49AGM7NLSS1zDBHw+KXtWSPDXY7C8JcsUU703Y2+Zyr4q/jqg9JaWHc6rHoly1CkCIU46VRDzlTaAnpuriY3MvpKPjIGYZr5SmXl++/EyI3uZ3DlgKy465NEn1gOjCua5uavXX/V+LPupPICJH15b80XL+00RfYU9k4huvhAXvmE73PHYy1jW5rxAnBeU2soQjSZw4US/xdg8I6XeLr1ry8HzmpinfHU/L2/ImRMm4NSpU9XJiNfilO7dtTTU2/Rzzz6Lf//733hp4UJtGqrZfsWqM4+gA08hkaKLqKx//XV8WlSkmQrlnEzblem7vraJaQga9cDYXT0w1ocEz+9lssCHmH5EcZXhZKmz9lukmPjxfDCqEGiMlskz8PSw/tqAZfHE8Rj/cy/z88u3Ysm8mzBp/e+CLiSt4uPxbUmJT9sCyw9h5sSJmrlFtanMGhKbvX6ditoWWMQjrXdvLaoMFDtdTIyERHEUwU3t0SOg6bsqrYj+dp3A8W9FTK7Dda3p6DGi25KFDyaBq9FB5udfJ8at8/Pza7qj+A5F81fju6yhIZm3rzwFS29DehTegohBcrdu1UIiYyyZkyYhZ80aNyHR3y8CIz0WCZK+k4Ow7X///W570Oh53HzLLdo0Xr0o66/z2L4EfBmOsm/tWbP6E9Dm5/e44I5iHZa+d0S32ZCsMp6HqY3GY4rbNMz6Z1fXnWoPeIlntC2wrJyWgeJJEydWm7WkNyI2fm+Dxvo8xfQlQUxiMhbgtCD8Jmdm4u7kZHz99ddeqy9iKz0XBucRoJnLeW1uUo3d5+e7bTZUvhUvTWuFjPV31HMmjP9FFNPToMGDtYH0w4cPo0/PntqMIXlDlhlEYgJTQXojs+fO9cuOr58lJpt62T2IIMjguYiICISavps1Ywbi4uK0qdMlR45ovUC1YFQxkfv04q7OO/K7WRu0beGMn1ln1NKRT3EoKn3B3KW5o1CbDf0GpzXz1suYEGK3FLJK+ssvv8TuXbu0ysuAsJppJCdEEKQXMnjw4ODPJgoFfpPzUBMOPKfvygC65+pzzwF1uVfERe6lSxsAPx7DD2cBmLhFisnNbXpyFBPTkTosQb07Ctls6PF3gZbjPVYZh46J57bAkrP8uMmYirwtB31KauiqakpOavW59EBEEKSHJ0Ixe84cv1iJ2MjH6ZMTTGmUCE2EYhKhDWedYrubuw5tvQOjCm4PmXnLiIP8oPFHzYjM+XNittKvPg/b9F3vRYz8K5c1xxXSK+nQBm0d8ivrkGpG/rNp7RpcjQ4D++Gu5d5WyFu79P6WLtLMONLjUGMfIiSyuDC5e/daZ7D5y4TxSYBiwmeABHwgIGMBKkTCtFcxX4mAyFRoGTcS05V8TPG+q0Dw2zuBhpcjrpWxXwjvN0X2FYpJZLcfSx9iAvpZXSHOus7spNchAqL3vuv/5lF1ZsMIvhBoGItmLSgmvqBiHBJwFAH5kZZgpV6Jmr6rRERN3w1k8yhHNWpQK9sSP0+MAfYHNRNLJc6eiaWag4WxKgG1EC/c4yVq+q70PkzfPMqq8COyXDFodW1L4KMTOOYC4IDl4RSTiHxQrVboChz98r/xrVasT7Dtb8V4+FGjfSOsVm7fy6PWq4SjZ6Km7+rNVzLN2dTNo3xHwZg+EYjGVTfdhvb7jwVZTH7AZ/Nuwe3jz//vcy9aKgYWbcDq25u4nw7SXxSTIIF1RrLHUDTvDxiw7Jiuut/j0Nw03DkXiB65Drse72CrdVuxTZvq6hqcQ+kFyYC/fvquuG0P2uZRwamG41Nt2LItbq7cisJDPyG1vY/OHl17sHNuf/Sd9CWO1kXw7r8if+tQdB1XgqpxdUUO/nWKSfAZ2ziH5ugwbif2WuBBDiZkvS+uYPVMlPnKc/V5cDePCiY1po3Y3yD53mV45chpwCcxKcP+5b3xH5MORSQ8B1jyIrJdWGgLEQiWLy4RKdmYK61XL6R066b1RmT6bl5+frUDymCJl4Xw2rgo8eiQ2gaf5X+OUl9qeXIN5i8eiVePnEFVZR5ebnkP0vdWoKqqClVVJ1G89DqgZSZeOlF5/tz2oehqoV9w9kx8aWTGIQE/CIhIDB40CGUnz+9Z3Pe++zBz9mwtBbX6XK1b4epzP8BGXNQoxHa6G73GbsbrI3+FjPjaHHWdQ9nfv0Grd7PwkMQ7WYwDpZfqalyKIwdKgZvb4oamFlIQXQkpJjoYPCSBQAnIeMcD/frh7Fnx8nc+yL7yMvPqxIkT1f6rOH1X0bH5d2xfjMzaiB7T1qPj/IfRxavz00aIvWc2/qzHEZWAG1vWJkD6yOE/ppiEvw1YAosTiG/durqEMrZRW5Btgysr3bdrdblcKC8v10xXnt53a0uL1+xAoDFa/X4MHn93DIYvv8HnCSmuo3tQVBmLaxUC19f4+rMf0ajDtWhvzY6JE2Y/q9bgNwnUj4BeANTixdpS8hQTiSsr5/Xp1HY/r9mMwGVX49qWMX5U6hzKvylGwV3tLGvSMqqMRTXOqKg8RwLhIyAD4xJkzEMtYDQqzaGDB41O45JLLnH8lr+GYGx/shJl+bMw9n9HYtmw23ycJv8v7N6+C7BwL8So2SgmRlR4jgQ8CMgujhJk2977+/atsc+8iIxsCzw9K8vjTuC3v/0tUv/wByx68UUkJiQgIz1dc8BYmyjVSIQnIpOAqxBvTv0J9z15fy3jJe5Vcx1ZjbULfkSLdq3Qwv2S7q9D2PbwCnwgq+stEjhmYpGGYDGsTUD2R+mTlgYZTJdtgWUqr7hyl/EUGSfxZVvgjNGjNRHakZur9VJkP3pJQ1azS/qcBmztZ8D/0kmvZCnmdxuJPJ/WmUgOR1CU81esPHcruv7iSnj+QJ9bsxHLxvwaUxtsx9oev8MrFuoONKiSScwMJEACdRKQnsSo9HRtZpZRZH+3BZb0jFa6i7Aos5pRPjwXKQQO44MnB+KV1E3ITr7Cp0K79o1Cj8TFeK/lKEwrfB5Pt1azucqwf1kHtB+hFjTeg34712B958t9SjcUkSgmoaDMPGxFQAbhc7KzoRYzivNH+fEXlyeBbAss6WrrUC6My0iaIiyBpmsr+JFUmXNbMf+2tSh7cwWm+tgzcR15GsPavIadCzfggxE3u5u5yv+GFcP6Y9i6O9H1tQVY/+D17tfDzIZiEuYGYPYkYERAuVfx9A4sOyRyVpgRMeudcxVn4b4+LvT/eBoeirWQPSpIqCgmQQLLZEnALAJiDhNRkV6L9F5ETKTHImMtHGcxi7LZ6VSibMdQ/OrFZKzcNAhJ9tcSUEzMfoaYHgkEmYASFb1L+pTu3SGuWQIxswW52A5L/oJH7f2ZeHtZb7R1QO0pJg5oZFbRvgTED5jWa8nNddvrXXouNIeFs90Po2BSH4z4YZpjxMRz5lk46TNvEiABPwmImUs+atqxGsRX045ljEUG8GkO8xNsoNFdJfjXngrg6kATipz7KSaR01YsKQnUSkB6IjKOIh8J2syw3FxtMaXaH57TjmtFaN5F1wkc/7aSYmIeUaZEAiQQLgIytVitVxFz2KaNG7VV+JkTJmgD+GZMZw5X3Ziv9QiwZ2K9NmGJSMB0AmLmypw8WUtXTTsWcRFzWKekJM0U5u+0YzGpSVqqJ2R6oSM5wR+P4QfZhaD0RJD3gLcOJIqJddqCJSGBkBAQc9igIUO0j5p2LMIguz4qc5haMFlbgUSMxL2MBAqKB6nTx/B9BYBvjlNMPNDwTxIgARsSEPHQj7OoAfzMiRM178iaKczLtGMZk5EgvRsJFBQNw/l/WrRFYjOgQHfK7ofsmdi9hVk/EvCDgAzQy0dMYjLOovVYXnyxetqxrGURc1jJkSOaB2WVNAVFkfD4PvkVDpaeA1ra/6fW/jX0aFv+SQIk4BsBNe1YTGLKHCa9kdmzZiEuLq5GIuU0vSkAAAUtSURBVBSUGkgcdcIBi/wd1Z6sLAkEhYAyhy1avBh79+9HgwYNDPMRQclZtcrwGk/amwDFxN7ty9qRgOkExPx17Ngxr+lKz2XAgw/WuiOl15ttd+E4jpWds12tjCpEM5cRFZ4jARLwSkBmcRmFVvHxuPLKKyEu+X/44Qckdexo/c2/XAfw8V+34ZvKQuQ83xx3F8xDhhnjG42uwbW3RgMfHsNxionR48JzJEACJABtMaSMqSQmJkI2BZNBe8+g3/zL32nHnmkF5+9jKHrhEQxZpnpZPXB3cDJyRKrsmTiimVlJEjCPgFr8WFeKMs4iU4vlI8Fo2rGIUPg2/2qODuN2Yu+wtZj6myy8IetCTAtNcflVapdE0xK1dEIcM7F087BwJGAfAmrK8Y78fGx66y2tVyMmMzGHDRo4UBu4lxX1IQ+XNccVpv/ux6Cp+YmGHI0/GbJn4g8txiUBEjCFgNEqfJl2LOYwuSbCI4sg6e3YFNwhSYRiEhLMzIQESMAbATXtWK2gF1ERk9io9HS3VfjKXOYtHWueb464WGf8zNLMZc0nkKUiAccSENGQcRkxh+WsWYP41q01b8eJCQnISE/XvB/X2xxW/jF2LH0EvRISkJhwK+6cuBYFJaYOlni0WxyaO0RMnCGZHs3LP0mABCKDgFqFb8bmX66jOZg++BnkdvgLXijKRlLMGXy3MwtjRv43YsXDbzBC4zhc0cQZ7+zOqGUwHhKmSQIkEFICavMvWYVfuHs3MsaM0XyEyThLncH1Od7OmocNbWdi5aw+SIqRn77GuLrLTKwY1wJFweqcRF+OuMuc8TPLnkmdTyEjkAAJWI2A57Tj2stXibL855D1fnPcseTXaO/22x6F2Bs6Ign/CI6H3w5t0NYhv7JuWGtvEF4lARIggUgkUIJPd3yOCtyCTjc0q1mBC+7ia14I5MxRfLO3HNHX/xzXBJJMBN1LMYmgxmJRSYAE6kHg3B58lltejxsDuMVVhuP/aozbbvkFTF/CEkCxgnkrxSSYdJk2CZBA+AmUHsTekyEuRvn/4NCR9riudZMQZxy+7Cgm4WPPnEmABEJBoNqMFSoPvpUo2/UeNiXcjdR2PwtFDS2RB8XEEs3AQpAACQSNQKMbcVv3GAD/RN5//QuVQctIJVyCotwv0bxPZ9zhoF9YB1VVNTS/SYAEnEUgHnekdUU7VKB0/jIsKXFfVOL634M4oJ0yp+fiKtmCN7a0R8qvfoEoB4GmmDiosVlVEnAmgSjEdMrEs0+1R+OKd/DS8BmYVXhU66G4vt2IF5Z/gJ80MDvxWs9bkNg3G4WuepIqL0DOlBUo6NYPDzjIxCW0GlRVVVXVExtvIwESIIEIIlCK4u2LsWb+Omw4JMaum5D0xCg89WAFcn+dhbyBjyO1SRyS/vj7C4sa/a3aWXz35gPoNr0NRv1tDjLinTKP6zwniom/zwvjkwAJkIAhgbP4bv1kPHfNE5jbpaWjTFyCg2Ji+FDwJAmQAAmQgD8EOGbiDy3GJQESIAESMCRAMTHEwpMkQAIkQAL+EKCY+EOLcUmABEiABAwJUEwMsfAkCZAACZCAPwQoJv7QYlwSIAESIAFDAhQTQyw8SQIkQAIk4A8Biok/tBiXBEiABEjAkADFxBALT5IACZAACfhDgGLiDy3GJQESIAESMCRAMTHEwpMkQAIkQAL+EKCY+EOLcUmABEiABAwJUEwMsfAkCZAACZCAPwQoJv7QYlwSIAESIAFDAhQTQyw8SQIkQAIk4A+B/wfa+khLBweqoAAAAABJRU5ErkJggg==" alt></p>
<p>(i) Identify X.</p>
<p>(ii) Identify Y.</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 number of lines per millimetre in the diffraction grating in (b) is reduced. Describe the effects of this change on the fringe pattern in (b).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>-3;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) anti u (quark) /\(\bar u\);<br>(ii) W<sup>–</sup>;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>principal maxima broaden;</p>
<p>secondary maxima appear;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
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<p> Many candidates knew about the idea of strangeness, but did not assign a numerical value. </p>
</div>
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</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
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<p> Was reasonably well answered. </p>
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</div>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
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<p> There were almost no correct answers. Candidates clearly need a lot of practice answering questions on the diffraction grating. </p>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p>This question is about resolution.</p>
<p>A car is travelling along a straight road at night. To a distant observer the two headlamps of the car appear as a single point source. With the aid of an appropriately labelled sketch graph, explain this observation.</p>
<p><img 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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>graph: <strong>[2 max]</strong></em><br>correct single slit diffraction pattern with appropriate labelling (eg angle/<em>θ</em>) of horizontal axis;<br>identical diffraction pattern with peak separated by less than half the width of central maximum;</p>
<p><em>explanation:</em> <strong><em>[2 max]</em></strong><br>light from each lamp produces a diffraction pattern on retina of eye;<br>some statement/Rayleigh criterion quoted to the effect that because the minimum of one falls too close to the maximum of the other they cannot be resolved, so diffraction pattern looks the same as that from a single lamp/source;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>This question is about two-source interference.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Light from a monochromatic source is incident at right angles to two slits. After passing through the slits the light is incident on a distant screen. Point M is the mid-point of the screen.</p>
<p><img 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" alt></p>
<p>The separation of the slits is large compared to their width. A pattern of light and dark fringes is observed on the screen.</p>
<p>(i) State the phenomenon that enables light to reach point M on the screen.</p>
<p>(ii) On the axes below, sketch the intensity of light as observed on the screen as a function of the angle <em>θ</em> . (You do not have to put any numbers on the axes.)</p>
<p>(iii) The distance of the screen from the slits is 1.8 m and the slit separation is 0.12 mm. The wavelength of the light is 650 nm. Point Q on the screen shows the position of the first dark fringe.</p>
<p>Calculate the distance MQ.</p>
<div class="marks">[6]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why, even though there are dark fringes in the pattern, no energy is lost.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) diffraction;</p>
<p>(ii) correct general shape (cos<sup>2</sup><em>θ</em>) touching the horizontal axis;<br>constant amplitude;<br>equally spaced maxima; <br><em>Diagram must have at least three fringes.</em><br><em>Award<strong> [0]</strong> for single slit diffraction pattern.</em></p>
<p><em><img 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" alt></em></p>
<p> </p>
<p><em>Award <strong>[3]</strong> for correct graph that shows modulation by single slit diffraction.</em></p>
<p>(iii) \({\rm{MQ}} = \frac{1}{2}\frac{{\lambda D}}{d}\);<br>\({\rm{MQ}} = \left( {\frac{{650 \times {{10}^{ - 9}} \times 1.80}}{{2 \times 0.12 \times {{10}^{ - 3}}}} = } \right)4.9{\rm{mm}}\);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>the energy gets redistributed/the total energy in the pattern is the same as the total emitted energy;<br>the energy that would have appeared at minima now appears at the maxima;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
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<p> </p>
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</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
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<p> </p>
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<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about interference of light at two parallel slits.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the condition necessary to observe interference between two light sources.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The diagram below shows an arrangement for observing a double slit interference pattern. A parallel beam of coherent light of wavelength 410 nm is incident on two parallel narrow slits separated by 0.30 mm. A screen is placed 1.60 m beyond the slits.</p>
<p><img 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" alt></p>
<p>Calculate the fringe spacing on the screen.</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 slits in (b) are replaced by a large number of slits of the same width and separation as the double slit. Describe the effects that this change will have on the appearance of the fringes on the screen.</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>the light from the sources must be coherent / phase difference must be constant <em>(allow “in phase”)</em> / the electric fields must have the same polarization;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fringe spacing=\(\frac{{1.60{\rm{m}} \times {\rm{410nm}}}}{{0.30{\rm{mm}}}}\);<br>2.2 mm;<br><em>Award <strong>[2 max]</strong> for a response that makes use of nλ in the double slit formula</em><br><em>Award ECF <strong>[1 max]</strong> if answer is for a value of n greater than 1.</em><br><em>Award <strong>[2]</strong> for a bald correct answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>sharper fringes / <em>OWTTE</em>;<br>brighter;<br>same spacing;</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>This question is about diffraction and polarization.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Light from a monochromatic point source S<sub>1</sub> is incident on a narrow, rectangular slit.</p>
<p><img 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" alt></p>
<p>After passing through the slit the light is incident on a screen. The distance between the slit and screen is very large compared with the width of the slit.</p>
<p>(i) On the axes below, sketch the variation with angle of diffraction <em>θ</em> of the relative intensity <em>I</em> of the light diffracted at the slit.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>(ii) The wavelength of the light is 480 nm. The slit width is 0.1 mm and its distance from the screen is 1.2 m. Determine the width of the central diffraction maximum observed on the screen.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Judy looks at two point sources identical to the source S<sub>1</sub> in (a). The distance between the sources is 8.0 mm and Judy’s eye is at a distance <em>d</em> from the sources.</p>
<p>Estimate the value of <em>d</em> for which the images of the two sources formed on the retina of Judy’s eye are just resolved.</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>The light from a point source is unpolarized. The light can be polarized by passing it through a polarizer.</p>
<p>Explain, with reference to the electric (field) vector of unpolarized light and polarized light, the term polarizer.</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>(i)<img 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" alt></p>
<p>overall correct shape with central maxima at <em>θ</em>=0; { <em>(only one secondary </em><em>maximum required each </em><em>side of θ=0)</em><br>secondary maximum no greater than ¼ intensity of central maximum; { <em>(judge by </em><em>eye)</em></p>
<p>(ii) \(\theta = \frac{\lambda }{b} = \frac{x}{D}\) (where <em>x</em> is the half width of central maximum);<br>\(2x = 2\frac{{D\lambda }}{b}\);<br>\(\left( {\frac{{2 \times 1.2 \times 4.8 \times {{10}^{ - 7}}}}{{{{10}^{ - 4}}}}} \right) = 12{\rm{mm}}\);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>diameter of pupil =3.0 mm; <em>(accept answers in the range of 2.0 mm to 5.0 mm)<br></em>\(\theta = \left( {1.22 \times \frac{\lambda }{b} = 1.22 \times \frac{{4.8 \times {{10}^{ - 7}}}}{{3.0 \times {{10}^{ - 3}}}} = } \right)1.95 \times {10^{ - 4}}\left( {{\rm{rad}}} \right)\);<br>\(d = \frac{{8.0 \times {{10}^{ - 3}}}}{{1.95 \times {{10}^{ - 4}}}} = 41{\rm{m}}\);<em> (accept answer in the range of 20m to 70m)<br></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>in unpolarized light the plane of vibration of the electric (field) vector is continually changing / <em>OWTTE</em>;<br>in polarized light the electric vector vibrates in one plane only;<br>a polarizer is made of material that absorbs/transmits either the horizontal or vertical component/only one component of the electric vector;</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>This question is about resolution.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Two point sources S<sub>1</sub> and S<sub>2 </sub>emit monochromatic light of the same wavelength. The light is incident on a small aperture A and is then brought to focus on a screen.</p>
<p><img 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" alt></p>
<p>The images of the two sources on the screen are just resolved according to the Rayleigh criterion. Sketch, using the axes below, how the relative intensity <em>I</em> of light on the screen varies with distance along the screen <em>d</em>.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABdQAAAKsCAYAAADlZz/fAAAKqGlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUFEkax6u7JwfSwEhmiEOQnEFyHILkaGKYIQxhGAYGFTOyqOAaUBEBRdBVEAVXJYgJEcW0CAYw7yCLiHouBkyocw0cw+3du7t3//fq1a+/rv7q6+qq9/4NAOUqWyDIgOUAyOTnCsP9PBmxcfEMvBggAA+IgAQgNidH4BEaGgRQzfR/1cd+AE32d0wnc/37/f8qeW5SDgcAKBTlRG4OJxPlU2g7zhEIcwFAuGhcd2muYJI3oqwoRAtEuWqSU6b5+CQnTnPX1JjIcC+U7wNAoLDZwhQAyH+gcUYeJwXNQ8GgbMHn8vgo26Dsykllo/NQ0HtgbmZm1iTvR9kw8Z/ypPwlZ6I0J5udIuXpd5kSwZuXI8hgL/8/l+N/KzNDNDOHDtooqUL/8Mn50DWrS88KlDI/cX7IDPO40zVNcqrIP2qGOTle8TPMZXsHzrAoPcpjhtnC2Wd5uazIGRZmhUvz8zPmB0nzJ7GknJTjEzHDyTxf1gznp0bGzHAeL3r+DOekRwTOjvGSxoWicGnNyUJf6Ttm5szWxmHPzpWbGuk/W0OstB5ukrePNM6Pko4X5HpKcwoyQmfrz/CTxnPyIqTP5qIbbIbT2AGhs3lCpesDeCAYsAEnN2nZ5L4CXlmC5UJeSmouwwM9JUkMFp9jNpdhZWFpB8DkmZv+pO/pU2cJol+fja1vBsDlvEQiOTMbC9wGwEkmAKTe2RhzOwCyagBcreGIhHnTscmtDrDoOZYFikAFaAJdYAhMgRWwA87AHfiAABACIkEcWAw4IBVkAiFYClaCdaAIlIBtYBeoANXgAKgDx8AJ0ArOgovgCrgBesE98AiIwTB4BcbARzABQRAeokI0SAXSgvQhE8gKcoBcIR8oCAqH4qAEKAXiQyJoJbQeKoFKoQqoBqqHfoVOQxeha1Af9AAahEahd9BXGIEpsCKsARvA5rAD7AEHwpHwIjgFzobz4UJ4C1wO18JH4Rb4InwDvgeL4VfwOAIQMkJHtBFTxAHxQkKQeCQZESKrkWKkDKlFGpF2pBu5g4iR18gXDA5DwzAwphhnjD8mCsPBZGNWYzZjKjB1mBZMF+YOZhAzhvmBpWLVsSZYJywLG4tNwS7FFmHLsIewzdjL2HvYYexHHA5HxzFx9jh/XBwuDbcCtxm3F9eE68D14YZw43g8XgVvgnfBh+DZ+Fx8EX4P/ij+Av42fhj/mUAmaBGsCL6EeAKfUEAoIxwhnCfcJowQJohyRH2iEzGEyCUuJ24lHiS2E28Rh4kTJHkSk+RCiiSlkdaRykmNpMukx6T3ZDJZh+xIDiPzyGvJ5eTj5KvkQfIXigLFmOJFWUgRUbZQDlM6KA8o76lUqgHVnRpPzaVuodZTL1GfUj/L0GTMZFgyXJk1MpUyLTK3Zd7IEmX1ZT1kF8vmy5bJnpS9JftajihnIOclx5ZbLVcpd1puQG5cniZvKR8inym/Wf6I/DX5Fwp4BQMFHwWuQqHCAYVLCkM0hKZL86JxaOtpB2mXacOKOEWmIksxTbFE8Zhij+KYkoKSjVK00jKlSqVzSmI6Qjegs+gZ9K30E/R++tc5GnM85iTN2TSncc7tOZ+U1ZTdlZOUi5WblO8pf1VhqPiopKtsV2lVeaKKUTVWDVNdqrpP9bLqazVFNWc1jlqx2gm1h+qwurF6uPoK9QPqN9XHNTQ1/DQEGns0Lmm81qRrumumae7UPK85qkXTctXiae3UuqD1kqHE8GBkMMoZXYwxbXVtf22Rdo12j/aEDlMnSqdAp0nniS5J10E3WXenbqfumJ6WXrDeSr0GvYf6RH0H/VT93frd+p8MmAYxBhsMWg1eMJWZLGY+s4H52JBq6GaYbVhreNcIZ+RglG6016jXGDa2NU41rjS+ZQKb2JnwTPaa9M3FznWcy59bO3fAlGLqYZpn2mA6aEY3CzIrMGs1e2OuZx5vvt282/yHha1FhsVBi0eWCpYBlgWW7ZbvrIytOFaVVnetqda+1mus26zf2pjYJNnss7lvS7MNtt1g22n73c7eTmjXaDdqr2efYF9lP+Cg6BDqsNnhqiPW0dNxjeNZxy9Odk65Tiec/nQ2dU53PuL8Yh5zXtK8g/OGXHRc2C41LmJXhmuC635XsZu2G9ut1u2Zu6471/2Q+4iHkUeax1GPN54WnkLPZs9PXk5eq7w6vBFvP+9i7x4fBZ8onwqfp746vim+Db5jfrZ+K/w6/LH+gf7b/QdYGiwOq541FmAfsCqgK5ASGBFYEfgsyDhIGNQeDAcHBO8Ifjxffz5/fmsICGGF7Ah5EsoMzQ49E4YLCw2rDHsebhm+Mrw7ghaxJOJIxMdIz8itkY+iDKNEUZ3RstELo+ujP8V4x5TGiGPNY1fF3ohTjePFtcXj46PjD8WPL/BZsGvB8ELbhUUL+xcxFy1bdG2x6uKMxeeWyC5hLzmZgE2ISTiS8I0dwq5ljyeyEqsSxzhenN2cV1x37k7uaJJLUmnSSLJLcmnyixSXlB0po6luqWWpr3levAre2zT/tOq0T+kh6YfTJRkxGU2ZhMyEzNN8BX46vytLM2tZVp/ARFAkEGc7Ze/KHhMGCg/lQDmLctpyFVFzc1NkKPpJNJjnmleZ93lp9NKTy+SX8ZfdXG68fNPykXzf/F9WYFZwVnSu1F65buXgKo9VNauh1YmrO9forilcM7zWb23dOtK69HW/FVgUlBZ8WB+zvr1Qo3Bt4dBPfj81FMkUCYsGNjhvqN6I2cjb2LPJetOeTT+KucXXSyxKykq+beZsvv6z5c/lP0u2JG/p2Wq3dd823Db+tv7tbtvrSuVL80uHdgTvaNnJ2Fm888OuJbuuldmUVe8m7RbtFpcHlbft0duzbc+3itSKe5WelU1V6lWbqj7t5e69vc99X2O1RnVJ9df9vP33a/xqWmoNassO4A7kHXh+MPpg9y8Ov9QfUj1Ucuj7Yf5hcV14XVe9fX39EfUjWxvgBlHD6NGFR3uPeR9razRtrGmiN5UcB8dFx1/+mvBr/4nAE50nHU42ntI/VdVMay5ugVqWt4y1praK2+La+k4HnO5sd25vPmN25vBZ7bOV55TObT1POl94XnIh/8J4h6Dj9cWUi0OdSzofXYq9dLcrrKvncuDlq1d8r1zq9ui+cNXl6tlrTtdOX3e43nrD7kbLTdubzb/Z/tbcY9fTcsv+VluvY29737y+87fdbl+8433nyl3W3Rv35t/r64/qvz+wcEB8n3v/xYOMB28f5j2ceLT2MfZx8RO5J2VP1Z/W/m70e5PYTnxu0Hvw5rOIZ4+GOEOv/sj549tw4XPq87IRrZH6F1Yvzo76jva+XPBy+JXg1cTror/J/63qjeGbU3+6/3lzLHZs+K3wreTd5vcq7w9/sPnQOR46/vRj5seJT8WfVT7XfXH40v015uvIxNJv+G/l342+t/8I/PFYkimRCNhC9pQVQNAGJycD8O4wANQ4AGi9qH+QmfbEU4KmffwUgf/E0755SqhzaUS7SSvk1QHAcbQZuAMgg15PWqJIdwBbW0vbP5STbG01nYuCOkvsZ4nkvQYA+HYAvgslkom9Esn3g2ixDwDoyJ724pPCoX8ojXhXjveCvnbzteBf9HcIWQN53PJn6wAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAxtpVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6dGlmZj0iaHR0cDovL25zLmFkb2JlLmNvbS90aWZmLzEuMC8iCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPHRpZmY6T3JpZW50YXRpb24+MTwvdGlmZjpPcmllbnRhdGlvbj4KICAgICAgICAgPHRpZmY6WVJlc29sdXRpb24+MTQ0PC90aWZmOllSZXNvbHV0aW9uPgogICAgICAgICA8dGlmZjpSZXNvbHV0aW9uVW5pdD4yPC90aWZmOlJlc29sdXRpb25Vbml0PgogICAgICAgICA8dGlmZjpDb21wcmVzc2lvbj4xPC90aWZmOkNvbXByZXNzaW9uPgogICAgICAgICA8dGlmZjpQaG90b21ldHJpY0ludGVycHJldGF0aW9uPjI8L3RpZmY6UGhvdG9tZXRyaWNJbnRlcnByZXRhdGlvbj4KICAgICAgICAgPHRpZmY6WFJlc29sdXRpb24+MTQ0PC90aWZmOlhSZXNvbHV0aW9uPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+MTQ5MjwvZXhpZjpQaXhlbFhEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlBpeGVsWURpbWVuc2lvbj42ODQ8L2V4aWY6UGl4ZWxZRGltZW5zaW9uPgogICAgICA8L3JkZjpEZXNjcmlwdGlvbj4KICAgPC9yZGY6UkRGPgo8L3g6eG1wbWV0YT4KMdflTQAAQABJREFUeAHs3X+QnwV9J/CPJtsyNHiBPWVbMzHbBRpmNJrQaKgTUCSWn1d/UEamc1JtKKROp/WstKBzwJ2CFvvL4w4ZEAZ6jJ3Uq706CicafpUai5A2tAVD1gQvdybSLVsZmbSZPe+7m2wQ2CSfwD77/X6fz2tndDff72ef5/m83t/xj/c8PvuyH3a+whcBAgQIECBAgAABAgQIECBAgAABAgQIECBwUIGXH/RdbxIgQIAAAQIECBAgQIAAAQIECBAgQIAAAQJTAgp1HwQCBAgQIECAAAECBAgQIECAAAECBAgQIJAQUKgnkIwQIECAAAECBAgQIECAAAECBAgQIECAAAGFus8AAQIECBAgQIAAAQIECBAgQIAAAQIECBBICCjUE0hGCBAgQIAAAQIECBAgQIAAAQIECBAgQICAQt1ngAABAgQIECBAgAABAgQIECBAgAABAgQIJAQU6gkkIwQIECBAgAABAgQIECBAgAABAgQIECBAQKHuM0CAAAECBAgQIECAAAECBAgQIECAAAECBBICCvUEkhECBAgQIECAAAECBAgQIECAAAECBAgQIKBQ9xkgQIAAAQIECBAgQIAAAQIECBAgQIAAAQIJAYV6AskIAQIECBAgQIAAAQIECBAgQIAAAQIECBBQqPsMECBAgAABAgQIECBAgAABAgQIECBAgACBhIBCPYFkhAABAgQIECBAgAABAgQIECBAgAABAgQIKNR9BggQIECAAAECBAgQIECAAAECBAgQIECAQEJgfmLmkCMjS4YPOWOAAAECBAgQIECAAAECBAgQIECAAAECBAj0ksDo9m2HdTkv+2Hn67B+4wDDk6X64Z78AIfyMgECBAgQIECAAAECBAgQIECAAAECBAgQaEzgxfbZHvnSWCQOTIAAAQIECBAgQIAAAQIECBAgQIAAAQJtElCotylNuxAgQIAAAQIECBAgQIAAAQIECBAgQIBAYwIK9cZoHZgAAQIECBAgQIAAAQIECBAgQIAAAQIE2iSgUG9TmnYhQIAAAQIECBAgQIAAAQIECBAgQIAAgcYEFOqN0TowAQIECBAgQIAAAQIECBAgQIAAAQIECLRJQKHepjTtQoAAAQIECBAgQIAAAQIECBAgQIAAAQKNCSjUG6N1YAIECBAgQIAAAQIECBAgQIAAAQIECBBok4BCvU1p2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEGhNQqDdG68AECBAgQIAAAQIECBAgQIAAAQIECBAg0CYBhXqb0rQLAQIECBAgQIAAAQIECBAgQIAAAQIECDQmoFBvjNaBCRAgQIAAAQIECBAgQIAAAQIECBAgQKBNAgr1NqVpFwIECBAgQIAAAQIECBAgQIAAAQIECBBoTECh3hitAxMgQIAAAQIECBAgQIAAAQIECBAgQIBAmwQU6m1K0y4ECBAgQIAAAQIECBAgQIAAAQIECBAg0JiAQr0xWgcmQIAAAQIECBAgQIAAAQIECBAgQIAAgTYJKNTblKZdCBAgQIAAAQIECBAgQIAAAQIECBAgQKAxAYV6Y7QOTIAAAQIECBAgQIAAAQIECBAgQIAAAQJtElCotylNuxAgQIAAAQIECBAgQIAAAQIECBAgQIBAYwIK9cZoHZgAAQIECBAgQIAAAQIECBAgQIAAAQIE2iSgUG9TmnYhQIAAAQIECBAgQIAAAQIECBAgQIAAgcYEFOqN0TowAQIECBAgQIAAAQIECBAgQIAAAQIECLRJQKHepjTtQoAAAQIECBAgQIAAAQIECBAgQIAAAQKNCSjUG6N1YAIECBAgQIAAAQIECBAgQIAAAQIECBBok4BCvU1p2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEGhNQqDdG68AECBAgQIAAAQIECBAgQIAAAQIECBAg0CYBhXqb0rQLAQIECBAgQIAAAQIECBAgQIAAAQIECDQmoFBvjNaBCRAgQIAAAQIECBAgQIAAAQIECBAgQKBNAgr1NqVpFwIECBAgQIAAAQIECBAgQIAAAQIECBBoTECh3hitAxMgQIAAAQIECBAgQIAAAQIECBAgQIBAmwQU6m1K0y4ECBAgQIAAAQIECBAgQIAAAQIECBAg0JiAQr0xWgcmQIAAAQIECBAgQIAAAQIECBAgQIAAgTYJKNTblKZdCBAgQIAAAQIECBAgQIAAAQIECBAgQKAxAYV6Y7QOTIAAAQIECBAgQIAAAQIECBAgQIAAAQJtElCotylNuxAgQIAAAQIECBAgQIAAAQIECBAgQIBAYwIK9cZoHZgAAQIECBAgQIAAAQIECBAgQIAAAQIE2iSgUG9TmnYhQIAAAQIECBAgQIAAAQIECBAgQIAAgcYEFOqN0TowAQIECBAgQIAAAQIECBAgQIAAAQIECLRJQKHepjTtQoAAAQIECBAgQIAAAQIECBAgQIAAAQKNCSjUG6N1YAIECBAgQIAAAQIECBAgQIAAAQIECBBok4BCvU1p2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEGhNQqDdG68AECBAgQIAAAQIECBAgQIAAAQIECBAg0CYBhXqb0rQLAQIECBAgQIAAAQIECBAgQIAAAQIECDQmoFBvjNaBCRAgQIAAAQIECBAgQIAAAQIECBAgQKBNAgr1NqVpFwIECBAgQIAAAQIECBAgQIAAAQIECBBoTECh3hitAxMgQIAAAQIECBAgQIAAAQIECBAgQIBAmwQU6m1K0y4ECBAgQIAAAQIECBAgQIAAAQIECBAg0JiAQr0xWgcmQIAAAQIECBAgQIAAAQIECBAgQIAAgTYJKNTblKZdCBAgQIAAAQIECBAgQIAAAQIECBAgQKAxAYV6Y7QOTIAAAQIECBAgQIAAAQIECBAgQIAAAQJtElCotylNuxAgQIAAAQIECBAgQIAAAQIECBAgQIBAYwIK9cZoHZgAAQIECBAgQIAAAQIECBAgQIAAAQIE2iSgUG9TmnYhQIAAAQIECBAgQIAAAQIECBAgQIAAgcYEFOqN0TowAQIECBAgQIAAAQIECBAgQIAAAQIECLRJQKHepjTtQoAAAQIECBAgQIAAAQIECBAgQIAAAQKNCSjUG6N1YAIECBAgQIAAAQIECBAgQIAAAQIECBBok4BCvU1p2oUAgb4XuOnGG2NkyXDf72EBAgQIECBAgAABAgQIECBAgEAbBRTqbUzVTgQI9KXAzp0745qPXz117Zs2berLHVw0AQIECBAgQIAAAQIECBAgQKDNAgr1NqdrNwIE+krghus/s/96/+t/uW7/z34gQIAAAQIECBAgQIAAAQIECBDoDQGFem/k4CoIECguMHl3+m233hrvvfDCKYm7N2wId6kX/1BYnwABAgQIECBAgAABAgQIEOg5AYV6z0XigggQqCgwfXf6xesumVr/6GOODnepV/wk2JkAAQIECBAgQIAAAQIECBDoZQGFei+n49oIECgh8KN3pw8NDU3tfMm6deEu9RLxW5IAAQIECBAgQIAAAQIECBDoIwGFeh+F5VIJEGinwPPvTp/c8j0XXBDuUm9n3rYiQIAAAQIECBAgQIAAAQIE+ldAod6/2blyAgRaIDDT3emTay1YsCDcpd6CgK1AgAABAgQIECBAgAABAgQItEpAod6qOC1DgEC/Ccx0d/r0Du5Sn5bwnQABAgQIECBAgAABAgQIECDQGwIK9d7IwVUQIFBQ4EB3p09TuEt9WsJ3AgQIECBAgAABAgQIECBAgEBvCCjUeyMHV0GAQEGBg92dPs3hLvVpCd8JECBAgAABAgQIECBAgAABAt0XUKh3PwNXQIBAQYFD3Z0+TeIu9WkJ3wkQIECAAAECBAgQIECAAAEC3RdQqHc/A1dAgEBBgczd6dMs7lKflvCdAAECBAgQIECAAAECBAgQINBdAYV6d/2dnQCBggLZu9OnadylPi3hOwECBAgQIECAAAECBAgQIECguwIK9e76OzsBAgUFDufu9Gked6lPS/hOgAABAgQIECBAgAABAgQIEOiegEK9e/bOTIBAQYHDvTt9mshd6tMSvhMgQIAAAQIECBAgQIAAAQIEuiegUO+evTMTIFBQ4MXcnT7N5C71aQnfCRAgQIAAAQIECBAgQIAAAQLdEZjfndM6KwECBGoKLD3xxLj6E5+IoaGhwwaYvEv9P/3nj8Vjjz122L/rFwgQIECAAAECBAgQIECAAAECBF66wMt+2Pl66YeJGFkyHKPbt83GoRyDAAECpQX872np+C1PgAABAgQIECBAgAABAgQIzIHAi+1fPPJlDsJxCgIECBAgQIAAAQIECBAgQIAAAQIECBDofwGFev9naAMCBAgQIECAAAECBAgQIECAAAECBAgQmAMBhfocIDsFAQIECBAgQIAAAQIECBAgQIAAAQIECPS/gEK9/zO0AQECBAgQIECAAAECBAgQIECAAAECBAjMgYBCfQ6QnYIAAQIECBAgQIAAAQIECBAgQIAAAQIE+l9Aod7/GdqAAAECBAgQIECAAAECBAgQIECAAAECBOZAYP4cnMMpCBAg0McC43H3pWfG2vU7D7zDssvja39xUSw58IR3CBAgQIAAAQIECBAgQIAAAQIEWiDgDvUWhGgFAgSaFFgYb/3dr8fo9m/G+nXLY2D/qQZi6G2Xx+f/ZmuMKtP3q/iBAAECBAgQIECAAAECBAgQINBmAYV6m9O1GwECsygwGCedf2YsnT7i0Hnxsd97fyxfOG/6Fd8JECBAgAABAgQIECBAgAABAgRaLqBQb3nA1iNAYPYE9mzbGo9PHW4gFr3z3XGKMn32cB2JAAECBAgQIECAAAECBAgQINAHAgr1PgjJJRIg0AsCz8TfPfg3sXvqUobj7LefGO5N74VcXAMBAgQIECBAgAABAgQIECBAYO4EFOpzZ+1MBAj0s8DEo3HXF7ft3WDgNXHc4h/v521cOwECBAgQIECAAAECBAgQIECAwIsQUKi/CDS/QoBAPYGJzV+NL+3YM7X4wClnxKmD7k+v9ymwMQECBAgQIECAAAECBAgQIFBdQKFe/RNgfwIEEgITMf7t0dg1NbkwVp+1KgYTv2WEAAECBAgQIECAAAECBAgQIECgXQIK9XblaRsCBBoR2BX3fvnBmLo/fWBlnPmWYxs5i4MSIECAAAECBAgQIECAAAECBAj0toBCvbfzcXUECPSCwNjGuOO+8b1XcuxIDC/0uJdeiMU1ECBAgAABAgQIECBAgAABAgTmWkChPtfizkeAQJ8JTMTYPXfG/XtvT49F554ey/TpfZahyyVAgAABAgQIECBAgAABAgQIzI6AQn12HB2FAIHWCvzI415iOM5++4mhT29t2BYjQIAAAQIECBAgQIAAAQIECBxUQKF+UB5vEiBQXmDiu7H1Wz/Yy7DotFiz7MjyJAAIECBAgAABAgQIECBAgAABAlUFFOpVk7c3AQIpgYnNX40v7Zh83suAx72kxAwRIECAAAECBAgQIECAAAECBNoroFBvb7Y2I0DgJQs8E5u/siF2TB1nME5eOeJxLy/Z1AEIECBAgAABAgQIECBAgAABAv0roFDv3+xcOQECTQtMPBp3fXHb3rMMvC7e+Pqjmj6j4xMgQIAAAQIECBAgQIAAAQIECPSwgEK9h8NxaQQIdFfg2ce9dB74csoZceqgP0fa3UScnQABAgQIECBAgAABAgQIECDQXQGFenf9nZ0AgZ4VmIjxb4/GrqnrWxirz1oVgz17rS6MAAECBAgQIECAAAECBAgQIEBgLgQU6nOh7BwECPShwK6498sPxuSfI42BlXHmW47twx1cMgECBAgQIECAAAECBAgQIECAwGwKKNRnU9OxCBBoj8DYxrjjvvGpfTzupT2x2oQAAQIECBAgQIAAAQIECBAg8FIEFOovRc/vEiDQUoFnYtNNN8SGqdvTj4ilq17rcS8tTdpaBAgQIECAAAECBAgQIECAAIHDEVCoH46WWQIECgiMxab1H4urbtqyb9eJeHLjvbFpfKLA7lYkQIAAAQIECBAgQIAAAQIECBA4mMD8g73pPQIECJQRmHgofvfUC+KGHVO3pf/I2nti59eujvPecHXnWepr4tqN18e7Buf9yPt+JECAAAECBAgQIECAAAECBAgQqCKgUK+StD0JEDi4wLyT4tK/3BKXHnzKuwQIECBAgAABAgQIECBAgAABAoUFPPKlcPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAUjdrckAABvbSURBVAIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECBAgAABAgQIECBAgAABAgQIECBAoLCAQr1w+FYnQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAQj1vZZIAAQIECBAgQIAAAQIECBAgQIAAAQIECgso1AuHb3UCBAgQIECAAAECBAgQIECAAAECBAgQyAso1PNWJgkQIECAAAECBAgQIECAAAECBAgQIECgsIBCvXD4VidAgAABAgQIECBAgAABAgQIECBAgACBvIBCPW9lkgABAgQIECBAgAABAgQIECBAgAABAgQKCyjUC4dvdQIECBAgQIAAAQIECBAgQIAAAQIECBDICyjU81YmCRAgQIAAAQIECBAgQIAAAQIECBAgQKCwgEK9cPhWJ0CAAAECBAgQIECAAAECBAgQIECAAIG8gEI9b2WSAAECBAgQIECAAAECBAgQIECAAAECBAoLKNQLh291AgQIECBAgAABAgQIECBAgAABAgQIEMgLKNTzViYJECDwQoGJbXH3jb8d7zh+OEaWTP5ndVz0yT+LTeMTL5z1CgECBAgQIECAAAECBAgQIECAQF8LKNT7Oj4XT4BANwUmtq2PS97887H2s0/FOeu/GaPbt8WWuy+LVz1wZZx3xrq4adNYNy/PuQkQIECAAAECBAgQIECAAAECBGZZYP4sH8/hCBAgUEJgskz/wAUfjbvGTorL7vx0rB05YmrvecNnxcdv2R3fW/WhuOb8pyPuvGX/eyVgLEmAAAECBAgQIECAAAECBAgQaLGAO9RbHK7VCBBoSGDisbjlQx+Lu3ZGDL3z/XHevjJ9/9kGz4hfW3tCxJ6N8akP/3GMevrLfho/ECBAgAABAgQIECBAgAABAgT6WUCh3s/puXYCBLogMBHj994Wtzzcufs8BmP1GStj4Quu4shY9vbTYlHn9T0P/7f4xJ//3xdMeIEAAQIECBAgQIAAAQIECBAgQKD/BBTq/ZeZKyZAoKsCu2LD7XdE5+b0iIHXxRtff9SMVzPvtW+Mk6eeAjMeG/7gj2OTu9RndPIiAQIECBAgQIAAAQIECBAgQKCfBBTq/ZSWayVAoPsCYxvjjvvG917HsSMxvHDezNc08Oo47oS9z1WPHRvirs3PzDznVQIECBAgQIAAAQIECBAgQIAAgb4RUKj3TVQulACB7gtMxNg9d8b9e/ZdyTHHxNEH6NMjXhUjS6cfBvO9ePzb+0r47i/hCggQIECAAAECBAgQKChw/333x8iS4bjqiitj586p/89tQQUrEyBA4KULKNRfuqEjECBQRuBf4jtbn4jpPv2IpcfFqw+4+4/FwsFX7Ht3PP7qG9/a/3sH/BVvECBAgAABAgQIECBAoCGB5SuWx3svvDBuu/XWePOqkxXrDTk7LAEC7RdQqLc/YxsSIDBrAv8a42PfTx5tII4+5t/sn50Yeyqyv7n/l/xAgAABAgQIECBAgACBWRJYsGBBXHHVlfHAxq8r1mfJ1GEIEKgpoFCvmbutCRB4UQLfi9HHph/dckQcf/yrYyB5nD1PjsXTyVljBAgQIECAAAECBAgQaEpgaGhIsd4UruMSIFBCQKFeImZLEiBAgAABAgQIECBAgAABAgSeFVCsP2vhJwIECByOgEL9cLTMEiBAgAABAgQIECBAgAABAgRaJKBYb1GYViFAYE4EFOpzwuwkBAi0Q2BBHPPKI5Kr/CC2Pf6/988e/A+Y7h/zAwECBAgQIECAAAECBLoioFjvCruTEiDQhwIK9T4MzSUTINAtgYUxfMKr9p18dzz++P+JPalLGYh/O/iK8D+4KSxDBAgQIECAAAECBAh0UUCx3kV8pyZAoC8E5vfFVbpIAgQI9ITAj8fi417T+UOkW6aK9Imxp+L7nesanPHanomnxnbve+cn4oTjfjLmzTg384sjS4ZnfsOrBAgQIECAAAECBAgQ6ILAbbfeGpP/eWDj12OydPdFgACBqgIK9arJ25sAgRchMC8GV6yMpXFXPNL57T1PjsXTne8zFuoT342t3/rBvnMcH29a8cr0+Ua3b0vPGiRAgAABAgQIECBAgEBTAjt37owbrv/MVJE+eY73XnihMr0pbMclQKBvBBTqfROVCyVAoCcEFq+Oc1YcFY883KnSH30wHh57fywZnOHe8/En4vFdex8IM7BiTbx18UBPXL6LIECAAAECBAgQIECAwKEEZirSL153iTL9UHDeJ0CghIBCvUTMliRAYNYE5h0f7/ylVfGph++KPXueiK3f+ZfOLepHvuDwE995PLZM9ekLY/UvnR0jM3TuL/glLxAgQIAAAQIECBAgQKCLAor0LuI7NQECfSOgUO+bqFwoAQK9IdB57Ms7/kP81u0b45qHt8X//NwD8avL18TC51zcM7H5KxtiR+e1gRW/Fr/zjp96zrv+QYAAAQIECBAgQIAAgV4SUKT3UhquhQCBXhd4ea9foOsjQIBAzwnMWxrvu/bXY/nAntj5hZvj86PTf3x075VOjN4eH79pS6dNXxW/de2/d3d6zwXogggQIECAAAECBAgQmBSYLNKvuuLKePOqk6eekz75jPTJPzp6xVVXeryLjwgBAgQOIOAO9QPAeJkAAQIHE5g38v646U++H7/8nuviUx/8ZCz5o9+O04cHYnzTzfHhddfGpsE1cdn118TakSMOdhjvESBAgAABAgQIECBAYM4F3JE+5+ROSIBAiwQU6i0K0yoECMylwLxYeNKH4n98ZUXctv72uOKtJ8bFk6cfeltc/Ks3xEcufGss8dz0uQzEuQgQIECAAAECBAgQOISAIv0QQN4mQIBAQuBlP+x8JeYOOTKyZDhGt2875JwBAgQIECBAgAABAgQIECBAgACBuRXY+vjW+Pk1a6ZOOvlol4vXXeKxLnMbgbMRINBjAi+2z3aHeo8F6XIIECBAgAABAgQIECBAgAABArMtsOCoBXHZRy6Pc849V5E+27iOR4BAKQGFeqm4LUuAAAECBAgQIECAAAECBAhUFBgaGoq1F11UcXU7EyBAYFYFXj6rR3MwAgQIECBAgAABAgQIECBAgAABAgQIECDQUgGFekuDtRYBAgQIECBAgAABAgQIECBAgAABAgQIzK6AQn12PR2NAAECBAgQIECAAAECBAgQIECAAAECBFoqoFBvabDWIkCAAAECBAgQIECAAAECBAgQIECAAIHZFVCoz66noxEgQIAAAQIECBAgQIAAAQIECBAgQIBASwUU6i0N1loECBAgQIAAAQIECBAgQIAAAQIECBAgMLsCCvXZ9XQ0AgQIECBAgAABAgQIECBAgAABAgQIEGipwPyW7mUtAgQIECBAgAABAgQIECBAgEAfCkzE+KYvxue/+WTn2v8xvvHZL0R8+M/jxnf/VB/u4pIJECDQPgGFevsytREBAgQIECBAgAABAgQIECDQlwJb4qZ/9wtxzebdz179wJq49i3HPvtvPxEgQIBAVwU88qWr/E5OgAABAgQIECBAgAABAgQIEJgWOCHW/sWjMbp9S3ztIyv3vnjsSAwvnDc94DsBAgQIdFlAod7lAJyeAAECBAgQIECAAAECBAgQIPBcgW3x1S8+0nlpIBade3os06c/l8e/CBAg0EUBhXoX8Z2aAAECBAgQIECAAAECBAgQIPACgbG/i288OvnYl+E4++0nhj79BUJeIECAQNcEFOpdo3diAgQIECBAgAABAgQIECBAgMDzBSZi7J474/49ndcXnRZrlh35/AH/JkCAAIEuCijUu4jv1AQIECBAgAABAgQIECBAgACB5wrsinu//GBM9ukDP3N8LHZ7+nN5/IsAAQJdFlCodzkApydAgAABAgQIECBAgAABAgQI7BeY+G5s/dYPOv9cGKvPWhWD+9/wAwECBAj0goBCvRdScA0ECBAgQIAAAQIECBAgQIAAgY7AxOavxpd2dO5PH1gZZ77lWCYECBAg0GMCCvUeC8TlECBAgAABAgQIECBAgAABAm0X2B3bN/z3uOHSX4ilS4ZjZMkJ8eZfuTE2jT8dm7+yIXZ01h845Yw4ddDzXtr+SbAfAQL9J6BQ77/MXDEBAgQIECBAgAABAgQIECDQrwLjD8VNv7Im3nb5PfHPb7oyNm7fFqPbvx7XrXowfvO9vx6f/sK2zmZHxNJVr/W4l37N2HUTINBqAYV6q+O1HAECBAgQIECAAAECBAgQINAbAhMxvunGuOiMC+Kav39DXPu56+LSdy/vPCl98mswll90ZfzGK/827ts5+edIF8fP/eyiqXf8FwECBAj0lsD83rocV0OAAAECBAgQIECAAAECBAgQaJtAp0x/6A/jl99zXTwyeE6nTL823jV8xPOWPDKOHtz32qLTYs2yI5/3vn8SIECAQC8IuEO9F1JwDQQIECBAgAABAgQIECBAgEB7BcY3xCc+cEM8suc18YtX/8cZyvTJ1Z+Jp8Z2d74PxKJzT49lHp/e3s+DzQgQ6GsBhXpfx+fiCRAgQIAAAQIECBAgQIAAgd4WeDLuvvrj8ac7I4bO/0j8zmmvnPlyxzbGHfeNd94bjJNXjoQ+fWYmrxIgQKDbAgr1bifg/AQIECBAgAABAgQIECBAgEBLBTqPetnwB/HR9U90bjw/Kd538ep9z0x//rq7Y/TP/jTun3x8+sDr4o2vP+r5A/5NgAABAj0ioFDvkSBcBgECBAgQIECAAAECBAgQINA2gV2x4fY7onNzegyc8ovxzpHnPzd9377j98eNn30opvr0U86IUwfdn962T4J9CBBoj4BCvT1Z2oQAAQIECBAgQIAAAQIECBDoJYH9j3FZGKvPWtV5mMtMX9OPhJms0w82N9Pveo0AAQIE5lpAoT7X4s5HgAABAgQIECBAgAABAgQIFBCYiLF77tz7GJc4Pt60YqZnp08+EubT8Ue7lsTrBiZJDjRXgMuKBAgQ6BMBhXqfBOUyCRAgQIAAAQIECBAgQIAAgX4S+H/x9D+NTz3G5UBXPTF6c1zymUVx+dk/Fo9N3qC+6KQ4afFUs36gX/E6AQIECHRZQKHe5QCcngABAgQIECBAgAABAgQIEGi7wD/HP41PNubPfk1sWx8f+OA/xPmfPD12/K8HO8X7QCw69/RY9vRjsWnb7mcH/USAAAECPSWgUO+pOFwMAQIECBAgQIAAAQIECBAg0A6BgXj1yHDs/TOkW+LmK66Ph8YnOquNxab1l8e7z/yT+OkrPhrvWvSd+OsHxjuvD8bJK38y/uGeJ+IViw/wx0vbAWMLAgQI9LWAQr2v43PxBAgQIECAAAECBAgQIECAQK8KDJz6vvjgiqOmLm/P5uvi/DccFyNLfjbO+/1/jHM+d2NcelLnz5Tu2BqPTd2QPj/GNn4uvnHMihiZ16sbuS4CBAgQUKj7DBAgQIAAAQIECBAgQIAAAQIEmhCYtzTW3nxLXPa2RfuOvihOW/d78fk7r4+1yztl+uTX4tVxzmTpPvQzceL/b+8ObrKKojCKSicSmnBkEXZg4QQ6QROnThD2NffL+geM4Lx31pntEPj248vP73/756V/vtVXAgQIEPj/Ag9vvz+f8RpPXx+/PL++fMYoMwgQIECAAAECBAgQIECAAAECBAgQIECAQCbwrz3bb6hnJzGYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEBPWla9qFAAECBAgQIECAAAECBAgQIECAAAECBDIBQT2jNZgAAQIECBAgQIAAAQIECBAgQIAAAQIElgQE9aVr2oUAAQIECBAgQIAAAQIECBAgQIAAAQIEMgFBPaM1mAABAgQIECBAgAABAgQIECBAgAABAgSWBAT1pWvahQABAgQIECBAgAABAgQIECBAgAABAgQyAUE9ozWYAAECBAgQIECAAAECBAgQIECAAAECBJYEHt5+fz660NPXx4+O8PMECBAgQIAAAQIECBAgQIAAAQIECBAgQOCowPPry7ue9ylB/V1P9M0ECBAgQIAAAQIECBAgQIAAAQIECBAgQOBCAX/y5cKjeWUCBAgQIECAAAECBAgQIECAAAECBAgQOC8gqJ8390QCBAgQIECAAAECBAgQIECAAAECBAgQuFBAUL/waF6ZAAECBAgQIECAAAECBAgQIECAAAECBM4LCOrnzT2RAAECBAgQIECAAAECBAgQIECAAAECBC4UENQvPJpXJkCAAAECBAgQIECAAAECBAgQIECAAIHzAoL6eXNPJECAAAECBAgQIECAAAECBAgQIECAAIELBQT1C4/mlQkQIECAAAECBAgQIECAAAECBAgQIEDgvICgft7cEwkQIECAAAECBAgQIECAAAECBAgQIEDgQgFB/cKjeWUCBAgQIECAAAECBAgQIECAAAECBAgQOC8gqJ8390QCBAgQIECAAAECBAgQIECAAAECBAgQuFBAUL/waF6ZAAECBAgQIECAAAECBAgQIECAAAECBM4LCOrnzT2RAAECBAgQIECAAAECBAgQIECAAAECBC4UENQvPJpXJkCAAAECBAgQIECAAAECBAgQIECAAIHzAr8A6LPmakRkKyYAAAAASUVORK5CYII=" alt></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>A car is travelling at night along a straight road. Diane is walking towards the car. She sees the headlights of the car as one single light. Estimate, using the data below, the separation <em>d</em> between Diane and the car at which, according to the Rayleigh criterion, Diane will just be able to see the headlights as two separate sources.</p>
<p>Distance between the headlights = 1.4 m<br>Average wavelength of light emitted by the headlights = 500 nm<br>Diameter of the pupils of Diane’s eyes = 1.9 mm</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>The light from the car headlights in (b) is not polarized. State what is meant by polarized light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p>correct shape of two diffraction patterns showing central maximum and at least one secondary maximum each side of central maximum;<br>intensity of secondary maxima no greater than one third intensity of central maxima; } <em>(judge by eye)</em><br>first minimum of one pattern coincident with central maximum of other pattern;</p>
<p><strong>or</strong></p>
<p><em>Allow just the approximate dotted resultant intensity patterns:</em><br>correct pattern of two symmetrical principal maxima;<br>with local minimum between them;<br>at least one secondary maximum on each side which are no more than \(\frac{1}{3}\) of the intensity of the principal maxima;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>angular separation for resolution=\(1.22\frac{\lambda }{b} = 1.22 \times \frac{{5.0 \times {{10}^{ - 7}}}}{{1.9 \times {{10}^{ - 3}}}} = \left( {3.21 \times {{10}^{ - 4}}} \right)\left( {{\rm{rad}}} \right)\);<br>=\(\frac{{1.4}}{d}\);<br><em>d</em>=4.4(km);<br><em>Award <strong>[2 max]</strong> if 1.22 not used and answer is 5.3 km.</em><br><em>Award <strong>[3]</strong> for a bald correct answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>light in which the electric/magnetic field (vector) vibrates only in one plane/direction;</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>This question is about diffraction and resolution.<br>Monochromatic light is incident on a narrow rectangular slit.</p>
<p><img 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" alt><br><br>The light is observed on a screen far from the slit. The graph shows the variation with angle <em>θ</em> of the relative intensity for light of wavelength 7.0×10<sup>–7</sup>m.</p>
<p><img 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" alt></p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the width of the slit.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>On the graph, sketch the variation of the relative intensity with <em>θ</em> when the wavelength of the light is reduced.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State and explain, with reference to your sketch in (b), whether it is easier to resolve two objects in blue light <strong>or</strong> in red light.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial';">diffraction angle=</span><span style="font-size: 11.000000pt; font-family: 'Arial';">0.05 rad;<br>\(b = \left( {\frac{\lambda }{\theta } = \frac{{7.0 \times {{10}^{ - 7}}}}{{0.050}} = } \right)1.4 \times {10^{ - 5}}\left( {\rm{m}} \right)\); </span><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';"><em>(do not accept use of 1.22)</em> </span></p>
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<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. </span></em></p>
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<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p><span style="font-size: 11.000000pt; font-family: 'Arial,Italic';">same shape with narrower central maximum; <br><em>Ignore height of intensity peak.</em> </span></p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p>blue light gives better resolution;<br> blue light has shorter wavelength than red light;<br>giving smaller angle of diffraction;<br> <em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Allow reverse argument for red light. </span></em></p>
<div class="question_part_label">c.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p><span style="font-size: 10.000000pt; font-family: 'ArialMT';">Parts (a) and (b) on single slit diffraction were well answered. </span></p>
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<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
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<p><span style="font-size: 10.000000pt; font-family: 'ArialMT';">Parts (a) and (b) on single slit diffraction were well answered.</span></p>
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<div class="question_part_label">b.</div>
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<p><span style="font-size: 10.000000pt; font-family: 'ArialMT';">However there were fewer correct answers for part (c) where effect of the different wavelengths of red and blue light were sometimes confused and the smaller </span><em><span style="font-size: 12pt; font-family: 'SymbolMT';">θ </span></em><span style="font-size: 10.000000pt; font-family: 'ArialMT';">interpreted as poorer resolution. Often the ability to resolve was explained incorrectly in terms of the intensity of the graphs drawn. </span></p>
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<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 laser light.<br> </span></p>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Laser light is monochromatic and coherent. Explain what is meant by</p>
<p>(i) monochromatic.</p>
<p>(ii) coherent.</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>A beam of laser light is incident normally on a diffraction grating which has 600 lines per millimetre. A fringe pattern is formed on a screen 2.0 m from the diffraction grating.</p>
<p><img 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" alt></p>
<p>The fringe pattern formed on the screen is shown below.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" alt></p>
<p>Determine the wavelength of the laser light.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>(i) single frequency/wavelength / narrow range of frequencies/wavelengths;</p>
<p>(ii) in phase;<br>constant phase difference/relationship;</p>
<p><em>Award <strong>[2]</strong> for any correct reference to constant phase difference. </em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\theta = {\tan ^{ - 1}}\left[ {\frac{{0.65}}{{2.0}}} \right]\left( { = 18^\circ } \right)\);<br>recognition that <em>n</em>=1;<br>\(d = \frac{1}{{600}}\left( { = 0.0017{\rm{mm}}} \right)\);<br><em>λ=</em>(=<em>d </em>sin <em>θ </em>= 0.0017 x sin18º) = 520(mm);</p>
<p> </p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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<p>(i) was very well done.</p>
<p>Many candidates got one mark for “in phase” in (ii), but few got two marks for “constant phase difference” even though this is the standard definition for coherence. This is a standard question that has been in several papers over the last few years. Teachers and candidates should take note of the following clarification - there can be two sources which are in phase (that is, have exactly the same phase) and so are coherent. There can also be two sources which have different phases at any one instant but have a constant phase difference/relationship and so are coherent. Thus “constant phase difference” is a better answer than “in phase” because “in phase” is a special case of “constant phase difference” (that is, the constant phase difference is zero). </p>
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<div class="question_part_label">a.</div>
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<p>Most candidates used the equation for double-slit interference rather than the equation for diffraction grating. Candidates appear to be far more comfortable with the double-slit case than the diffraction grating case. </p>
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<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p>This question is about diffraction and resolution.</p>
<p>Two identical sources of electromagnetic radiation, S<sub>1</sub> and S<sub>2</sub>, emit monochromatic coherent waves of wavelength 59 μm. The waves pass through a circular aperture and are incident on a screen.</p>
<p><img 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" alt></p>
<p>S<sub>1</sub> and S<sub>2</sub> are at the same distance from the aperture. The diameter of the aperture is 0.18 mm. The angle between the lines joining the sources to the aperture is 0.25 rad.</p>
</div>
<div class="question">
<p>S<sub>1</sub> is turned on and S<sub>2</sub> is turned off.</p>
<p>(i) Show that the angle at which the first minimum of the diffraction pattern occurs is 0.40 rad.</p>
<p>(ii) On the axes below, sketch a graph to show how the intensity <em>I</em> of the radiation from S<sub>1</sub> varies with the diffraction angle <em>θ</em>.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABgoAAALACAYAAABCaykFAAAKqGlDQ1BJQ0MgUHJvZmlsZQAASImVlwdUFEkax6u7JwfSwEhmiEOQnEFyHILkaGKYIQxhGAYGFTOyqOAaUBEBRdBVEAVXJYgJEcW0CAYw7yCLiHouBkyocw0cw+3du7t3//fq1a+/rv7q6+qq9/4NAOUqWyDIgOUAyOTnCsP9PBmxcfEMvBggAA+IgAQgNidH4BEaGgRQzfR/1cd+AE32d0wnc/37/f8qeW5SDgcAKBTlRG4OJxPlU2g7zhEIcwFAuGhcd2muYJI3oqwoRAtEuWqSU6b5+CQnTnPX1JjIcC+U7wNAoLDZwhQAyH+gcUYeJwXNQ8GgbMHn8vgo26Dsykllo/NQ0HtgbmZm1iTvR9kw8Z/ypPwlZ6I0J5udIuXpd5kSwZuXI8hgL/8/l+N/KzNDNDOHDtooqUL/8Mn50DWrS88KlDI/cX7IDPO40zVNcqrIP2qGOTle8TPMZXsHzrAoPcpjhtnC2Wd5uazIGRZmhUvz8zPmB0nzJ7GknJTjEzHDyTxf1gznp0bGzHAeL3r+DOekRwTOjvGSxoWicGnNyUJf6Ttm5szWxmHPzpWbGuk/W0OstB5ukrePNM6Pko4X5HpKcwoyQmfrz/CTxnPyIqTP5qIbbIbT2AGhs3lCpesDeCAYsAEnN2nZ5L4CXlmC5UJeSmouwwM9JUkMFp9jNpdhZWFpB8DkmZv+pO/pU2cJol+fja1vBsDlvEQiOTMbC9wGwEkmAKTe2RhzOwCyagBcreGIhHnTscmtDrDoOZYFikAFaAJdYAhMgRWwA87AHfiAABACIkEcWAw4IBVkAiFYClaCdaAIlIBtYBeoANXgAKgDx8AJ0ArOgovgCrgBesE98AiIwTB4BcbARzABQRAeokI0SAXSgvQhE8gKcoBcIR8oCAqH4qAEKAXiQyJoJbQeKoFKoQqoBqqHfoVOQxeha1Af9AAahEahd9BXGIEpsCKsARvA5rAD7AEHwpHwIjgFzobz4UJ4C1wO18JH4Rb4InwDvgeL4VfwOAIQMkJHtBFTxAHxQkKQeCQZESKrkWKkDKlFGpF2pBu5g4iR18gXDA5DwzAwphhnjD8mCsPBZGNWYzZjKjB1mBZMF+YOZhAzhvmBpWLVsSZYJywLG4tNwS7FFmHLsIewzdjL2HvYYexHHA5HxzFx9jh/XBwuDbcCtxm3F9eE68D14YZw43g8XgVvgnfBh+DZ+Fx8EX4P/ij+Av42fhj/mUAmaBGsCL6EeAKfUEAoIxwhnCfcJowQJohyRH2iEzGEyCUuJ24lHiS2E28Rh4kTJHkSk+RCiiSlkdaRykmNpMukx6T3ZDJZh+xIDiPzyGvJ5eTj5KvkQfIXigLFmOJFWUgRUbZQDlM6KA8o76lUqgHVnRpPzaVuodZTL1GfUj/L0GTMZFgyXJk1MpUyLTK3Zd7IEmX1ZT1kF8vmy5bJnpS9JftajihnIOclx5ZbLVcpd1puQG5cniZvKR8inym/Wf6I/DX5Fwp4BQMFHwWuQqHCAYVLCkM0hKZL86JxaOtpB2mXacOKOEWmIksxTbFE8Zhij+KYkoKSjVK00jKlSqVzSmI6Qjegs+gZ9K30E/R++tc5GnM85iTN2TSncc7tOZ+U1ZTdlZOUi5WblO8pf1VhqPiopKtsV2lVeaKKUTVWDVNdqrpP9bLqazVFNWc1jlqx2gm1h+qwurF6uPoK9QPqN9XHNTQ1/DQEGns0Lmm81qRrumumae7UPK85qkXTctXiae3UuqD1kqHE8GBkMMoZXYwxbXVtf22Rdo12j/aEDlMnSqdAp0nniS5J10E3WXenbqfumJ6WXrDeSr0GvYf6RH0H/VT93frd+p8MmAYxBhsMWg1eMJWZLGY+s4H52JBq6GaYbVhreNcIZ+RglG6016jXGDa2NU41rjS+ZQKb2JnwTPaa9M3FznWcy59bO3fAlGLqYZpn2mA6aEY3CzIrMGs1e2OuZx5vvt282/yHha1FhsVBi0eWCpYBlgWW7ZbvrIytOFaVVnetqda+1mus26zf2pjYJNnss7lvS7MNtt1g22n73c7eTmjXaDdqr2efYF9lP+Cg6BDqsNnhqiPW0dNxjeNZxy9Odk65Tiec/nQ2dU53PuL8Yh5zXtK8g/OGXHRc2C41LmJXhmuC635XsZu2G9ut1u2Zu6471/2Q+4iHkUeax1GPN54WnkLPZs9PXk5eq7w6vBFvP+9i7x4fBZ8onwqfp746vim+Db5jfrZ+K/w6/LH+gf7b/QdYGiwOq541FmAfsCqgK5ASGBFYEfgsyDhIGNQeDAcHBO8Ifjxffz5/fmsICGGF7Ah5EsoMzQ49E4YLCw2rDHsebhm+Mrw7ghaxJOJIxMdIz8itkY+iDKNEUZ3RstELo+ujP8V4x5TGiGPNY1fF3ohTjePFtcXj46PjD8WPL/BZsGvB8ELbhUUL+xcxFy1bdG2x6uKMxeeWyC5hLzmZgE2ISTiS8I0dwq5ljyeyEqsSxzhenN2cV1x37k7uaJJLUmnSSLJLcmnyixSXlB0po6luqWWpr3levAre2zT/tOq0T+kh6YfTJRkxGU2ZhMyEzNN8BX46vytLM2tZVp/ARFAkEGc7Ze/KHhMGCg/lQDmLctpyFVFzc1NkKPpJNJjnmleZ93lp9NKTy+SX8ZfdXG68fNPykXzf/F9WYFZwVnSu1F65buXgKo9VNauh1YmrO9forilcM7zWb23dOtK69HW/FVgUlBZ8WB+zvr1Qo3Bt4dBPfj81FMkUCYsGNjhvqN6I2cjb2LPJetOeTT+KucXXSyxKykq+beZsvv6z5c/lP0u2JG/p2Wq3dd823Db+tv7tbtvrSuVL80uHdgTvaNnJ2Fm888OuJbuuldmUVe8m7RbtFpcHlbft0duzbc+3itSKe5WelU1V6lWbqj7t5e69vc99X2O1RnVJ9df9vP33a/xqWmoNassO4A7kHXh+MPpg9y8Ov9QfUj1Ucuj7Yf5hcV14XVe9fX39EfUjWxvgBlHD6NGFR3uPeR9razRtrGmiN5UcB8dFx1/+mvBr/4nAE50nHU42ntI/VdVMay5ugVqWt4y1praK2+La+k4HnO5sd25vPmN25vBZ7bOV55TObT1POl94XnIh/8J4h6Dj9cWUi0OdSzofXYq9dLcrrKvncuDlq1d8r1zq9ui+cNXl6tlrTtdOX3e43nrD7kbLTdubzb/Z/tbcY9fTcsv+VluvY29737y+87fdbl+8433nyl3W3Rv35t/r64/qvz+wcEB8n3v/xYOMB28f5j2ceLT2MfZx8RO5J2VP1Z/W/m70e5PYTnxu0Hvw5rOIZ4+GOEOv/sj549tw4XPq87IRrZH6F1Yvzo76jva+XPBy+JXg1cTror/J/63qjeGbU3+6/3lzLHZs+K3wreTd5vcq7w9/sPnQOR46/vRj5seJT8WfVT7XfXH40v015uvIxNJv+G/l342+t/8I/PFYkimRCNhC9pQVQNAGJycD8O4wANQ4AGi9qH+QmfbEU4KmffwUgf/E0755SqhzaUS7SSvk1QHAcbQZuAMgg15PWqJIdwBbW0vbP5STbG01nYuCOkvsZ4nkvQYA+HYAvgslkom9Esn3g2ixDwDoyJ724pPCoX8ojXhXjveCvnbzteBf9HcIWQN53PJn6wAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAAxtpVFh0WE1MOmNvbS5hZG9iZS54bXAAAAAAADx4OnhtcG1ldGEgeG1sbnM6eD0iYWRvYmU6bnM6bWV0YS8iIHg6eG1wdGs9IlhNUCBDb3JlIDUuNC4wIj4KICAgPHJkZjpSREYgeG1sbnM6cmRmPSJodHRwOi8vd3d3LnczLm9yZy8xOTk5LzAyLzIyLXJkZi1zeW50YXgtbnMjIj4KICAgICAgPHJkZjpEZXNjcmlwdGlvbiByZGY6YWJvdXQ9IiIKICAgICAgICAgICAgeG1sbnM6dGlmZj0iaHR0cDovL25zLmFkb2JlLmNvbS90aWZmLzEuMC8iCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPHRpZmY6T3JpZW50YXRpb24+MTwvdGlmZjpPcmllbnRhdGlvbj4KICAgICAgICAgPHRpZmY6WVJlc29sdXRpb24+MTQ0PC90aWZmOllSZXNvbHV0aW9uPgogICAgICAgICA8dGlmZjpSZXNvbHV0aW9uVW5pdD4yPC90aWZmOlJlc29sdXRpb25Vbml0PgogICAgICAgICA8dGlmZjpDb21wcmVzc2lvbj4xPC90aWZmOkNvbXByZXNzaW9uPgogICAgICAgICA8dGlmZjpQaG90b21ldHJpY0ludGVycHJldGF0aW9uPjI8L3RpZmY6UGhvdG9tZXRyaWNJbnRlcnByZXRhdGlvbj4KICAgICAgICAgPHRpZmY6WFJlc29sdXRpb24+MTQ0PC90aWZmOlhSZXNvbHV0aW9uPgogICAgICAgICA8ZXhpZjpQaXhlbFhEaW1lbnNpb24+MTU0NjwvZXhpZjpQaXhlbFhEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlBpeGVsWURpbWVuc2lvbj43MDQ8L2V4aWY6UGl4ZWxZRGltZW5zaW9uPgogICAgICA8L3JkZjpEZXNjcmlwdGlvbj4KICAgPC9yZGY6UkRGPgo8L3g6eG1wbWV0YT4Kz3i9IwAAQABJREFUeAHs3Q+MXfV1J/DDmtlYhHbdsi1O5Y1tsGm8CW68Wdpos4bihij/nMZQAlTqbkPjEJSgtiJg/on8WUiwE9KqLAUMC1WiCkhDk9aF0JpACG1KNyVmTRARsWsToY1pazqqrSztMJmd8YzBYzzjmeOZ99499zNSFL9599z7O59zr4c3X7/7jhoa/gpfBAgQIECAAAECBAgQIECAAAECBAgQIECAQCsF/k0ru9Y0AQIECBAgQIAAAQIECBAgQIAAAQIECBAgsE9AUOBEIECAAAECBAgQIECAAAECBAgQIECAAAECLRYQFLR4+FonQIAAAQIECBAgQIAAAQIECBAgQIAAAQKCAucAAQIECBAgQIAAAQIECBAgQIAAAQIECBBosYCgoMXD1zoBAgQIECBAgAABAgQIECBAgAABAgQIEBAUOAcIECBAgAABAgQIECBAgAABAgQIECBAgECLBQQFLR6+1gkQIECAAAECBAgQIECAAAECBAgQIECAgKDAOUCAAAECBAgQIECAAAECBAgQIECAAAECBFosICho8fC1ToAAAQIECBAgQIAAAQIECBAgQIAAAQIEBAXOAQIECBAgQIAAAQIECBAgQIAAAQIECBAg0GIBQUGLh691AgQIECBAgAABAgQIECBAgAABAgQIECBwdJbgxEWLs6XqCBAgQIAAAQIECBAgQIAAAQIECBAgQIAAgRkS2L5zxxHtKR0UjBz1SA9+RCtXTIAAAQIECBAgQIAAAQIECBAgQIAAAQIEWiww8g/6Z+L39G491OKTSOsECBAgQIAAAQIECBAgQIAAAQIECBAgQEBQ4BwgQIAAAQIECBAgQIAAAQIECBAgQIAAAQItFhAUtHj4WidAgAABAgQIECBAgAABAgQIECBAgAABAoIC5wABAgQIECBAgAABAgQIECBAgAABAgQIEGixgKCgxcPXOgECBAgQIECAAAECBAgQIECAAAECBAgQEBQ4BwgQIECAAAECBAgQIECAAAECBAgQIECAQIsFBAUtHr7WCRAgQIAAAQIECBAgQIAAAQIECBAgQICAoMA5QIAAAQIECBAgQIAAAQIECBAgQIAAAQIEWiwgKGjx8LVOgAABAgQIECBAgAABAgQIECBAgAABAgQEBc4BAgQIECBAgAABAgQIECBAgAABAgQIECDQYgFBQYuHr3UCBAgQIECAAAECBAgQIECAAAECBAgQICAocA4QIECAAAECBAgQIECAAAECBAgQIECAAIEWCwgKWjx8rRMgQIAAAQIECBAgQIAAAQIECBAgQIAAAUGBc4AAAQIECBAgQIAAAQIECBAgQIAAAQIECLRYQFDQ4uFrnQABAgQIECBAgAABAgQIECBAgAABAgQICAqcAwQIECBAgAABAgQIECBAgAABAgQIECBAoMUCgoIWD1/rBAgQIECAAAECBAgQIECAAAECBAgQIEBAUOAcIECAAAECBAgQIECAAAECBAgQIECAAAECLRYQFLR4+FonQIAAAQIECBAgQIAAAQIECBAgQIAAAQKCAucAAQIECBAgQIAAAQIECBAgQIAAAQIECBBosYCgoMXD1zoBAgQIECBAgAABAgQIECBAgAABAgQIEBAUOAcIECBAgAABAgQIECBAgAABAgQIECBAgECLBQQFLR6+1gkQIECAAAECBAgQIECAAAECBAgQIECAgKDAOUCAAAECBAgQIECAAAECBAgQIECAAAECBFosICho8fC1ToAAAQIECBAgQIAAAQIECBAgQIAAAQIEBAXOAQIECBAgQIAAAQIECBAgQIAAAQIECBAg0GIBQUGLh691AgQIECBAgAABAgQIECBAgAABAgQIECAgKHAOECBAgAABAgQIECBAgAABAgQIECBAgACBFgsIClo8fK0TIECAAAECBAgQIECAAAECBAgQIECAAAFBgXOAAAECBAgQIECAAAECBAgQIECAAAECBAi0WEBQ0OLha50AAQIECBAgQIAAAQIECBAgQIAAAQIECAgKnAMECBAgQIAAAQIECBAgQIAAAQIECBAgQKDFAoKCFg9f6wQIECBAgAABAgQIECBAgAABAgQIECBAQFDgHCBAgAABAgQIECBAgAABAgQIECBAgAABAi0WEBS0ePhaJ0CAAAECBAgQIECAAAECBAgQIECAAAECggLnAAECBAgQIECAAAECBAgQIECAAAECBAgQaLGAoKDFw9c6AQIECBAgQIAAAQIECBAgQIAAAQIECBAQFDgHCBAgQIAAAQIECBAgQIAAAQIECBAgQIBAiwUEBS0evtYJECBAgAABAgQIECBAgAABAgQIECBAgICgwDlAgAABAgQIECBAgAABAgQIECBAgAABAgRaLCAoaPHwtU6AAAECBAgQIECAAAECBAgQIECAAAECBAQFzgECBAgQIECAAAECBAgQIECAAAECBAgQINBiAUFBi4evdQIECBAgQIAAAQIECBAgQIAAAQIECBAgIChwDhAgQIAAAQIECBAgQIAAAQIECBAgQIAAgRYLCApaPHytEyBAgAABAgQIECBAgAABAgQIECBAgAABQYFzgAABAgQIECBAgAABAgQIECBAgAABAgQItFhAUNDi4WudAAECBAgQIECAAAECBAgQIECAAAECBAgICpwDBAgQIECAAAECBAgQIECAAAECBAgQIECgxQKCghYPX+sECBAgQIAAAQIECBAgQIAAAQIECBAgQEBQ4BwgQIAAAQIECBAgQIAAAQIECBAgQIAAAQItFhAUtHj4WidAgAABAgQIECBAgAABAgQIECBAgAABAoIC5wABAgQIECBAgAABAgQIECBAgAABAgQIEGixgKCgxcPXOgECBAgQIECAAAECBAgQIECAAAECBAgQEBQ4BwgQIECAAAECBAgQIECAAAECBAgQIECAQIsFBAUtHr7WCRAgQIAAAQIECBAgQIAAAQIECBAgQICAoMA5QIAAAQIECBAgQIAAAQIECBAgQIAAAQIEWiwgKGjx8LVOgAABAgQIECBAgAABAgQIECBAgAABAgQEBc4BAgQIECBAgAABAgQIECBAgAABAgQIECDQYgFBQYuHr3UCBAgQIECAAAECBAgQIECAAAECBAgQICAocA4QIECAAAECBAgQIECAAAECBAgQIECAAIEWCxzd4t61ToAAAQIECBAgQIAAgQkEBmP3PRfGWy7eHAMTbDHy7bnvuz0e33B69E2yjacIECBAgAABAgQI9LqAdxT0+oSsjwABAgQIECBAgACBLgjMiePO2hjf3bktHrvnI3HyuCRgQaz6yMb42vYd8aSQoAuzcUgCBAgQIECAAIGZFhAUzLSo/REgQIAAAQIECBAgUEhgTsx70+p497K5Yz31xYILfzdu/ugZsWhOoTa1QoAAAQIECBAg0GoBQUGrx695AgQIECBAgAABAgQOKzC4J55/fnBss8XxrrctCxnBYdVsQIAAAQIECBAg0CABQUGDhmWpBAgQIECAAAECBAh0XmBw6wNx77Njn1SwYFWcsfyYzi/CEQkQIECAAAECBAjMooCgYBZx7ZoAAQIECBAgQIAAgaYLDEb/322P5/a1MXzbodVvjeXeTtD0oVo/AQIECBAgQIDAQQKCgoNAPCRAgAABAgQIECBAgMDLAs/Fw/d9K0bfT+C2Qy+7+BMBAgQIECBAgEAlAUFBpWnqhQABAgQIECBAgACBmRXY/Wh89Rv9o/uc+8Y45Q1uOzSzwPZGgAABAgQIECDQCwKCgl6YgjUQIECAAAECBAgQINCDAoOx++v3xyNjH0/Q95ZfiOV9PbhMSyJAgAABAgQIECBwhAKCgiMEVE6AAAECBAgQIECAQFWBPbH1b54Yu+3QvFj5zjfHcVVb1RcBAgQIECBAgECrBQQFrR6/5gkQIECAAAECBAgQmFBgcHt865u7R5/uOyXe8YvHT7ipJwgQIECAAAECBAg0WUBQ0OTpWTsBAgQIECBAgAABArMmMLj1gbj32dH7DvWd+vY47bg5s3YsOyZAgAABAgQIECDQTQFBQTf1HZsAAQIECBAgQIAAgR4V+GFs/YsH49l9q+uL409aGPN6dKWWRYAAAQIECBAgQOBIBQQFRyqongABAgQIECBAgACBegKDT8XmTTvG+loc73rbsvB+gnpj1hEBAgQIECBAgMCogKDAmUCAAAECBAgQIECAAIGDBfqfie89N3rboViwKs5YfszBW3hMgAABAgQIECBAoIyAoKDMKDVCgAABAgQIECBAgMDMCAzG7q/fH4/sywn6YsHqt8ZybyeYGVp7IUCAAAECBAgQ6EkBQUFPjsWiCBAgQIAAAQIECBDonsBz8fB934rR9xO8Ok5a8hq3HereMByZAAECBAgQIECgAwKCgg4gOwQBAgQIECBAgAABAg0S2P1ofPUb/aML7jsl3vGLxzdo8ZZKgAABAgQIECBAYPoCgoLpm6kgQIAAAQIECBAgQKCswIG3HYroO/Xtcdpx7jtUdtwaI0CAAAECBAgQ2CcgKHAiECBAgAABAgQIECBA4CWBf4nvb3tm7LZD82LlO98cx730nD8QIECAAAECBAgQqCkgKKg5V10RIECAAAECBAgQIJAR6P+ruPvLO0Yr3XYoI6iGAAECBAgQIECggQKCggYOzZIJECBAgAABAgQIEJgNgRdi+x/dHl/ZNfoxxnH8ibF4ntsOzYa0fRIgQIAAAQIECPSWgKCgt+ZhNQQIECBAgAABAgQIdEVgd2z54ifj4g2Pjt12aHgRz30zvvTgjhjsynoclAABAgQIECBAgEDnBI7u3KEciQABAgQIECBAgAABAj0mMPBQXHby+fFHLxxiXQNb4661q+Ku4afmvu/2eHzD6dF3iM18iwABAgQIECBAgEDTBQQFTZ+g9RMgQIAAAQIECBAgkBfoOz2u++6OuC6/B5UECBAgQIAAAQIEGi/g1kONH6EGCBAgQIAAAQIECBAgQIAAAQIECBAgQIBAXkBQkLdTSYAAAQIECBAgQIAAAQIECBAgQIAAAQIEGi8gKGj8CDVAgAABAgQIECBAgAABAgQIECBAgAABAgTyAoKCvJ1KAgQIECBAgAABAgQIECBAgAABAgQIECDQeAFBQeNHqAECBAgQIECAAAECBAgQIECAAAECBAgQIJAXEBTk7VQSIECAAAECBAgQIECAAAECBAgQIECAAIHGCwgKGj9CDRAgQIAAAQIECBAgQIAAAQIECBAgQIAAgbyAoCBvp5IAAQIECBAgQIAAAQIECBAgQIAAAQIECDReQFDQ+BFqgAABAgQIECBAgAABAgQIECBAgAABAgQI5AUEBXk7lQQIECBAgAABAgQIECBAgAABAgQIECBAoPECgoLGj1ADBAgQIECAAAECBAgQIECAAAECBAgQIEAgLyAoyNupJECAAAECBAgQIECAAAECBAgQIECAAAECjRcQFDR+hBogQIAAAQIECBAgQIAAAQIECBAgQIAAAQJ5AUFB3k4lAQIECBAgQIAAAQIECBAgQIAAAQIECBBovICgoPEj1AABAgQIECBAgAABArMhcPddd8fevXtnY9f2SYAAAQIECBAgQKCnBAQFPTUOiyFAgAABAgQIECBAoBcEdu3aFZetuzQ23rKxF5ZjDQQIECBAgAABAgRmVUBQMKu8dk6AAAECBAgQIECAQBMFbrnp5hgYGIgbb7ghRkIDXwQIECBAgAABAgQqCwgKKk9XbwQIECBAgAABAgQITFtgy5YtsWnTn8Zzf//3cfmVV8RVV1w57X0oIECAAAECBAgQINAkAUFBk6ZlrQQIECBAgAABAgQIzLrAjTf8z/jQhRfGi4ODce5558Xjj2+JR77xyKwf1wEIECBAgAABAgQIdEtAUNAtecclQIAAAQIECBAgQKDnBO6797545pmd8YG1a/et7dhjj41P/o9r4pOf+HjPrdWCCBAgQIAAAQIECMyUgKBgpiTthwABAgQIECBAgACBRgvs3bs3fudz18fVH/v4uD7e+a53xsKFi+K2W28d930PCBAgQIAAAQIECFQREBRUmaQ+CBAgQIAAAQIECBA4IoG77rxzXyCw8tSVr9jPhy/6SNx8000xEib4IkCAAAECBAgQIFBNQFBQbaL6IUCAAAECBAgQIEBg2gK7du2KT1/7qbjs8ssPWbtixYpYvfo9cf1nPnvI532TAAECBAgQIECAQJMFBAVNnp61EyBAgAABAgQIECAwIwKfWb8+PnzRRbFk6ZIJ93fBhR+KTZv+NLZ9b9uE23iCAAECBAgQIECAQBMFBAVNnJo1EyBAgAABAgQIECAwYwJbtmyJhx9+OD54wQcn3ef8+fPjQxdeGNd9+tOTbudJAgQIECBAgAABAk0TEBQ0bWLWS4AAAQIECBAgQIDAjAp86ppr4pJL18Wxxx572P2ee9558cwzO+O+e+877LY2IECAAAECBAgQINAUAUFBUyZlnQQIECBAgAABAgQIzLjA3XfdHf39/XHOuedMad8jYcLVH/t4/M7nrvfBxlMSsxEBAgQIECBAgEATBAQFTZiSNRIgQIAAAQIECBAgMOMCe/fujc9sWB8bPju9DyheeerKWLhwUdx1550zviY7JECAAAECBAgQINANAUFBN9QdkwABAgQIECBAgACBrgtsvGVjnHbaabFixYppr+Wyyy+Pm2+6KXbt2jXtWgUECBAgQIAAAQIEek1AUNBrE7EeAgQIECBAgAABAgRmXWDkF/w33nBDXLJuXepYS5YuidWr3xO33HRzql4RAQIECBAgQIAAgV4SEBT00jSshQABAgQIECBAgACBjgj82aZNcfmVV8T8+fPTx7v4ko/Gd77zhM8qSAsqJECAAAECBAgQ6BWBo4aGvzKLOXHR4ti+c0emVA0BAgQIECBAgAABAgR6XuCoo46K5Mulnu/NAgkQIECAAAECBGoIzNTv6b2joMb5oAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIAojX4MAADCdSURBVECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkIClJsiggQIECAAAECBAgQIECAAAECBAgQIECAQA0BQUGNOeqCAAECBAgQIECAAAECBAgQIECAAAECBAikBAQFKTZFBAgQIECAAAECBAgQIECAAAECBAgQIECghoCgoMYcdUGAAAECBAgQIECAAAECBAgQIECAAAECBFICgoIUmyICBAgQIECAAAECBAgQIECAAAECBAgQIFBDQFBQY466IECAAAECBAgQIECAAAECBAgQIECAAAECKQFBQYpNEQECBAgQIECAAAECBAgQIECAAAECBAgQqCEgKKgxR10QIECAAAECBAgQIECAAAECBAgQIECAAIGUgKAgxaaIAAECBAgQIECAAAECBAgQIECAAAECBAjUEBAU1JijLggQIECAAAECBAgQIECAAAECBAgQIECAQEpAUJBiU0SAAAECBAgQIECAAAECBAgQIECAAAECBGoICApqzFEXBAgQIECAAAECBAgQIECAAAECBAgQIEAgJSAoSLEpIkCAAAECBAgQIECAAAECBAgQIECAAAECNQQEBTXmqAsCBAgQIECAAAECBAgQIECAAAECBAgQIJASEBSk2BQRIECAAAECBAgQIECAAAECBAgQIECAAIEaAoKCGnPUBQECBAgQIECAAAECBAgQIECAAAECBAgQSAkcnapSRIAAAQLjBI466qhxjz0gQIAAAQIEagj4GV9jjrogQIAAAQIHCwwNDR38LY8JtFpAUNDq8WueAIGZFGjrf2SM/AJF7zN5JjVjX+bezhcV5m7uzfgbauZW2eZzfkSxzf3r3d93M/c3STP25Jx3zjfjTJ25VY6c874IEBgv4NZD4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAAAECBAgQIECAAAECBAgQIECAAAECrRIQFLRq3JolQIAAAQIECBAgQIAAAQIECBAgQIAAAQLjBQQF4z08IkCAQEpgaGgoVVehSO8Vpjj9Hsx9+mYVKsy9whSn34O5T9+sSoXZV5nk9Pow9+l5Vdna3KtMcnp9mPv0vGxNoLqAoKD6hPVHgAABAgQIECBAgAABAgQIECBAgAABAgQmERAUTILjKQIECBAgQIAAAQIECBAgQIAAAQIECBAgUF1AUFB9wvojQIAAAQIECBAgQIAAAQIECBAgQIAAAQKTCAgKJsHxFAECBAgQIECAAAECBAgQIECAAAECBAgQqC4gKKg+Yf0RIECAAAECBAgQIECAAAECBAgQIECAAIFJBAQFk+B4igABAgQIECBAgAABAgQIECBAgAABAgQIVBcQFFSfsP4IECBAgAABAgQIECBAgAABAgQIECBAgMAkAoKCSXA8RYAAAQIECBAgQIAAAQIECBAgQIAAAQIEqgsICqpPWH8ECBAgQIAAAQIECBAgQIAAAQIECBAgQGASAUHBJDieIkCAAAECBAgQIECAAAECBAgQIECAAAEC1QUEBdUnrD8CBAgQIECAAAECBAgQIECAAAECBAgQIDCJgKBgEhxPESBAgAABAgQIECBAgAABAgQIECBAgACB6gKCguoT1h8BAgQIECBAgAABAgQIECBAgAABAgQIEJhEQFAwCY6nCBAgQIAAAQIECBAgQIAAAQIECBAgQIBAdQFBQfUJ648AAQIECBAgQIAAAQIECBAgQIAAAQIECEwiICiYBMdTBAi0SeCF2Png52PDb6yMExct3ve/171nXdxyz5bon1GGwejf8pW4bf0H4i1jxxk93spYu/7W+OMtu6dxtE6teRpLsimBRgh0+doZ/G7cdubyfX/PvP7Sh2JgSmZdXvOU1mgjApUEXHOVpqmXKgJdvC797K5yEumjMQKduN69Nm/M6WChHRMQFHSM2oEIEOhZgcEd8cAV58Tbz781vrfs6vja9h2xfedTcf9Fx8RXLzsn3vUbt8aW/sEZWP7ueGz92fHmNZfGHU8vjYu//LfDxxk51o54+qGrY9nTn49L1pwe713/14cPJzq25hlo2y4I9JJA16+dF2L77Z+Iz357z9RVur7mqS/VlgRKCLjmSoxRE8UEunpd+tld7GzSTq8LdOR699q8108D6+uSwFDy64SFi5KVyggQINBDAi9uG7pn7X8dOmHhyUO/fN03h/5p3NL+39C2jecO/ezw33c/u2bj0LYXxz05zQf797V06L+svXtox6H29eJTQ7euOXnfWs7a+NTQoTbZd9COrXmaLdqcQK8L9MC18+K2jUNnLVk0fJ2P/u8/XvLg0L9O5tYDa55seZ4jUE7ANVdupBoqINDl69LP7gLnkBaaI9CR691r8+acEFY6VYGZ+j29dxR0KaBxWAIEekFg5F8HXRVX/MWzEfPfHb95wc/HvHHLmhsnnv/ROH9BXwx8+4ZYd/t3I/2+gt33xXUbHh2+xcji+OUL3x2L5ow70OiDOa+L//6Rd8Tc2BNbNnwu/mT3oY7WwTUfYom+RaC5Aj1w7QzftuCOS26ILVO719AwdQ+subkDt3ICCQHXXAJNCYFZFujydeln9yzP1+4JHCjQoevda/MD0f2ZwDgBQcE4Dg8IEGiVwEv/gdAXC9acFafOO8Rv7+csizNWLx5mGfnl/Sfiju0vJIgGY/fX749HRn45OPeNccobjplwH32Ll8TSkWcHnoj//X8OcWuSjq15wiV6gkAzBbp+7Yy88Bm+5dATS+Lss14/NcOur3lqy7QVgTICrrkyo9RIIYGuXpd+dhc6k7TSBIGOXO9emzfhVLDG7gkICrpn78gECHRV4Iex5bZb4sF9/7L31XHSktfEIWKC4RUeE8vftioWjKx14LH4wpeeTLyr4Eex5/n+0Q8sfWH4MwmenfI/Jz5IqJNrPujQHhJotED3r53B7V+IdRuejDdc+vFY+7qJw8KXmbu/5pfX4k8E2iDgmmvDlPXYNIHuXpd+djftfLHeZgt06nr32rzZ54nVz7aAoGC2he2fAIHeFBh8KjZv2jG2tp+OpSeMv+nQgYue89qlcVLfyHcG4tlND8TWQ90R6MCCSf/8eHzhi1snDBsGdmyL743U950cP/9zPzZ+T11b8/hleESgcQLdvnbGblvwnZMvivXnL5sglDxItdtrPmg5HhIoL+CaKz9iDTZQoJvXpZ/dDTxhLLnRAl253r02b/Q5Y/GzIiAomBVWOyVAoNcFBrc+EPfu/5f9fQtjyWtfNfGS5y2MpcfvSwoinn0wNm/94cTbHvKZvvgP//lNo+9KGAkbbrs2rn9s9yG2/If4y/v/Zviu5H0xf83Zseq48e9x6OyaD7E83yLQUIHuXjtjty34v6fFp67/tThx/GU9oWh31zzhsjxBoKyAa67saDXWYIHuXZd+djf4tLH0hgp07nr32ryhp4hld0hAUNAhaIchQKCXBAaj/++2x3P7lzTnJ+InfnyS397N+bH4yZ/c//z345t/O/zhx9P8mrPi1+I3f2nsXQsDW+KWc8+PKzfvOOCdBS/Ezns+GVd98ZnoW35B/N4Vqw76YOXOr3maLdqcQI8KdPfaGb1twQ/ivZ+6Os5cPHeKRt1d8xQXaTMChQRcc4WGqZUyAt27Lv3sLnMSaaQxAp293r02b8yJYaFdEBAUdAHdIQkQ6LbAv8T3tz0z+pkBI0s5aUksHnvDwOFXNhj/9PyeA37Bf/iK0S1+Js68fkOcPX/sQANb4661/y0+dOtj0T+8t/7HbozfuuzPI37pirjz878Vb3rFByt3Y81T7c12BHpZoIvXzr7bFvx+/GDNlXHZqp+aBlIX1zyNVdqUQB0B11ydWeqkjkCXrks/u+ucQjppkECnr3evzRt0clhqhwWO7vDxHI4AAQI9IPCv0b/7n5PrGIh/HK790XD1/vcYTHlH886Ia++8JvrPuyo27xr5QONn48Fr3x+//ujr4x++8cNYee3d8QfvW3HQOwn2771La95/eP9PoLEC3bp29t+24B1x0+0Hv0PocJjdWvPh1uV5AlUFXHNVJ6uvJgt047r0s7vJZ4y1N1mgC9e71+ZNPmGsfRYFvKNgFnHtmgABAgcLzFn8vrjxzt+Nc5fv/6DiPfHE1x6N3cv+U7z1lGUThAQH78VjAgR6XeDl2xb8dpz+incI9frqrY8AAQIECLRPwM/u9s1cx+0W8Nq83fPX/aEFBAWHdvFdAgQIzJrAnMW/EL+y+s0x/4AjDGz9g7jgbecc9LkFB2zgjwQINEcgfduC5rRopQQIECBAoJSAn92lxqkZAlMV8Np8qlK2a4uAoKAtk9YnAQK9ITC4Pf74g++NX/lfr4qLH/qr+NKVZ7wcGIx9bsGH79me+AyE3mjPKggQePm2Bde84kPJ6RAgQIAAAQK9J+Bnd+/NxIoIdEDAa/MOIDtE0wQEBU2bmPUSIDADAv825h3348n99MW/H65N/eXZ/9exYc2auOShBXH5H34mzlz8M7Fi7U1x75eviFX7P+R4+HMLNl/86/HKsKBLa04qKSPQOwKdvXZm5rYFnV1z78zKSgh0S8A11y15xyUwsUDnrks/uyeegmcIdEagc9f7S/14bf4ShT8QOFDAhxkfqOHPBAj0rMDAg+vijed/MV444hXOj7Nv/7O4ZMnC6IunY+QjhQ/7Nbgnnn9+cGyzV8dJS14z/Q8yHn47823nXxC3bI1YceXH4v0nzh3b35yYt2Jt3Hznv4sPH/Ahx5svuyrueOMd8YGXtntVvLbTaz4sjA0IzI5AY6/34Rcc1//278cP1myI21b91BHguN6PAE8pgYSAay6BpoTALAt06Lr0s3uW52j3BKYi0KHrff9SvDbfL+H/CbxCQFDwChLfIECgFwX6Vq2PJ3eun7GlDW45MY6PzcP/fn/46+ltsWM4MVjUN8Huf/TP8fw/7o8UfjqWnjBvgg0n+vZg7P7K5+Kz394T0XdG/OqZS18RNIx+kFK8HBYMPBZf+NKT8f51bxrbdjhQOKGTa56oF98nMPsCTb3eB/5/e3cDZWVZJwD837Kzh6NpCGtyjJJxxHBLNnAt0rQE8ZSGIH6sxvoRiK6ufewR8CPLzdIUdM2zFiJKSWt+kIhpXyqj6Wa2BMPBWl1hGnTJdFlwzPJQNM2+984dnHe4w8y8Mwwz9/3dczhzn/c+z/M+/99zX8e5//s87+rlccfaxti69rw47N6uOW29d0aMbq075vJY8d1ZMTK56l3vXfNTi0DvCLjmesdRLwR6U6Bvrku/u3tzzvRFIKtA31zvLaPzt3nWWdIuHwKZds/IB40oCRCoZIFBY46NE0aUMgNbG6J+Y2sioEzUG9fHc61LGUZMiElj9ihTaWeHXokff39ly+qF/WqiesigspWLyYI758TY4rC2xcYHH421rQsZkhZ9O+ayQ3SQwIAUGIjXzkAc84B8cxg0gZKAa85bgUD/Exho1+VAG2//m3EjyrNA310//jbP8/tM7J0LSBR0bqQGAQKVKDDokJg0uboU2br42epNHUa5rWF9rCu+WhUjJh8bY8p/zt9h+4jfxZZNpUzD0KGxz07aD6o5IT5xdGnFwv9ticY/t+m2T8fc5ryeEhjoAn107bSshEgSjxt29u/5WPG5w7eLDj5tcTzXWr+4mqD0Uh+NeftAPCGQdwHXXN7fAeLvjwJ9cF363d0fJ96YcinQB9d7i6u/zXP5/hJ0lwUkCrpMpSIBApUlsEeMOeWU0rf3f5/sPvSbaPPl/TahvhG/WLmm5d4IVYfFmae8Z4dtg9pU7uDpW2PovqV7EmzZEq+WP1Gp7b4xbvyo4vOqIz8QY1LbIfXlmDsIxWECA1JgIF47A3HMA/LNYdAESgKuOW8FAv1PYKBdlwNtvP1vxo0ozwJ9df342zzP7zKxdy4gUdC5kRoECFSowKCaM+O6ueOTmxon2/zcf1880VjmE/ymZ+ORBxsSgb1i7Ny2NyHuDsp+8eHjD0/Okzw21sYja9/YSeNNsfrpwvqFIXHU8eNjWLuafTfmdidWJDDABQbitTMQxzzA3yaGn3MB11zO3wDC75cCA+26HGjj7ZeTblC5Feib68ff5rl9gwm8SwISBV1iUokAgcoUGBw1M66M2eP2inj5ofja0nXtVhVsjfrF18fi5P4FVeM+FdfNGF1+NUHjT2PeiWOiZmR1jD7xhli1Q8JhUAybeklcc9yIhPH5WHzlgjJ1CsJN0bjqrljyRGNyvgvj0qn7l2HvpTGX6dkhApUt0EvXTqfXe28q9tKYe3NI+iJQ0QKuuYqeXsENUIFeuC797h6gc2/Y+RPoheu9gLbTa97f5vl7X4m4WwLNGR8HHjAyY0vNCBAg0M8EXn2q+brJhzYfeNCJzZfcs7r51cLw/vSr5tr5M5uPOGBU8xEzbm1e/eqfOhj0H5sbbj21ufDfxJZ/o5un3Prf5ev+aX3zfbM+VKz37slzmxet+FXz9l4L57t1bvOUgzo7X6nrHo25/PAcJZALgR5dO9243jvETPfxN3Nqm//YYd3SCz0ac2ede50AgR0EXHM7kDhAYLcLZL4u0793DzxgJ/+v3mGQ6T787u4QygsEekcg8/VeOH36eu3wmve3ee/MlV76jUBvfU7/lkJE3coslCoXvjlbuFmfBwECBCpDYHPU3XdbfH3+7VH78rYkpKoYPvGTce700+OsCdXlVxK0Bl74xsJZ58fCtVuTNnPi5htmxNghHd2xeGtsqP1OPLry8fjGghXxcmsfMSImXPAPccThx3V+vu1tejDm7X14QiCPAj24drp1vZez3RYbFk2PiVevLL5YuJnxmnnHtGxNVq769mM9GPP2PjwhQKDrAq65rlupSaCvBDJel35399UEOQ+BXhTIeL0XRtDla97f5r04YbrazQK99Tm9RMFunkinJ0CAAAECBAgQIECAAAECBAgQIECAAAECWQR6K1HgHgVZ9LUhQIAAAQIECBAgQIAAAQIECBAgQIAAAQIVIiBRUCETKQwCBAgQIECAAAECBAgQIECAAAECBAgQIJBFQKIgi5o2BAgQIECAAAECBAgQIECAAAECBAgQIECgQgQkCipkIoVBgAABAgQIECBAgAABAgQIECBAgAABAgSyCEgUZFHThgABAgQIECBAgAABAgQIECBAgAABAgQIVIiAREGFTKQwCBAgQIAAAQIECBAgQIAAAQIECBAgQIBAFgGJgixq2hAgQIAAAQIECBAgQIAAAQIECBAgQIAAgQoRkCiokIkUBgECBAgQIECAAAECBAgQIECAAAECBAgQyCIgUZBFTRsCBAgQIECAAAECBAgQIECAAAECBAgQIFAhAhIFFTKRwiBAgAABAgQIECBAgAABAgQIECBAgAABAlkEJAqyqGlDgAABAgQIECBAgAABAgQIECBAgAABAgQqRECioEImUhgECBAgQIAAAQIECBAgQIAAAQIECBAgQCCLgERBFjVtCBAgQIAAAQIECBAgQIAAAQIECBAgQIBAhQhIFFTIRAqDAAECBAgQIECAAAECBAgQIECAAAECBAhkEZAoyKKmDQECBAgQIECAAAECBAgQIECAAAECBAgQqBABiYIKmUhhECBAgAABAgQIECBAgAABAgQIECBAgACBLAISBVnUtCFAgAABAgQIECBAgAABAgQIECBAgAABAhUiIFFQIRMpDAIECBAgQIAAAQIECBAgQIAAAQIECBAgkEVAoiCLmjYECBAgQIAAAQIECBAgQIAAAQIECBAgQKBCBCQKKmQihUGAAAECBAgQIECAAAECBAgQIECAAAECBLIISBRkUdOGAAECBAgQIECAAAECBAgQIECAAAECBAhUiIBEQYVMpDAIECBAgAABAgQIECBAgAABAgQIECBAgEAWAYmCLGraECBAgAABAgQIECCwiwSaorFueSycOyVGj6yOmsK/UVPi0luWR11jUy+csyk233dejP7QdVHXG931wogyd9FYF8tuuSSmjjokpi56PnM3GhIgQIAAAQIECBCQKPAeIECAAAECBAgQIECgnwhsjrpFF8QJJ30hfhBnxF1r1kf9hmdjxbXviiev/ec446yvxqqeJgua1sX9d66M/SYfG2MG9ZOwuzWMrbGhdknMm3lU1LxvWsy59t54Zlu3OlCZAAECBAgQIECAwA4CEgU7kDhAgAABAgQIECBAgECfCzTVx7LzpsYpVz8d+16wML457/QYO6TwSf7gGHnyZXHxxCGxbe0d8ZWl66InCwGa1j4Q31r99jjhuENiQOYJGr4Vn728Nrb0+QQ5IQECBAgQIECAQCULSBRU8uyKjQABAgQIECBAgMBAECgkCS44J+Y8vDGqxn0qbpj9wRiSGve+MW78qOTI61F3xwOxNnOm4I1Y+3BtbBwxISaN2SN1hgFTqJ4Vy5/+Zlx7+z0xP0meeBAgQIAAAQIECBDoDQGJgt5Q1AcBAgQIECBAgAABAhkFtkb94ivi8iRJEFXjY/b8M6Nmh6/6V8U7aqqTtQXJ45X6aMi6/VDTs/HIgy/GiAG77VBb4j1in2FFkbYHPSdAgAABAgQIECCQSUCiIBObRgQIECBAgAABAgQI9IZAU91NMSPZbmhbVMXwk2bEKTWdfPi9rTG2/PbPmU7dtPbR+N7Gdw3cbYcyRa0RAQIECBAgQIAAgc4FJAo6N1KDAAECBAgQIECAAIFdIdD0XHzjS3dGspYgWU3wkbj4kgntthxqPem2+HV9Q2xtLWb62bLt0CvjTomTB+q2Q6m494zqUe9MHVEgQIAAAQIECBAgkFVAoiCrnHYECBAgQIAAAQIECPRAoCk2L//XuH7160kfhdUEp8aEYTvsOdSD/ts1LW479GocNf2EMlsbtaurSIAAAQIECBAgQCBnAhIFOZtw4RIgQIAAAQIECBDoFwJNa+L2Gx9PthwqPKpjyhlHdrCaoPD676Nh3f8UnmR+FLcdeuV98bGP7Je5Dw0JECBAgAABAgQIVKqAREGlzqy4CBAgQIAAAQIECPRjgZb7BbSkCWLEhJi0s+2Amupj5VObW6IZXB01I6q6GVlp26GjPxofzrxqYWtsqF0S82YeFTUnLooNhRE01sWy686NI0cmYxp5VMxatCoaUyMrtPn3WDh3Sowu1inUK9W9blEsqyvFlGrTrlA4xy2XxNRRrW0PjiNn3hiPNfRsI6Z2Z1EkQIAAAQIECBDIuYBEQc7fAMInQIAAAQIECBAg0PcCL8UDN9/dcm+CZNuhEZOPjTE723Wo8YVY90opqXDwQVHd3TxB67ZDx4+PYd0NdvsH9YfExBlXxsIVxTsqJEmCn8a8s86OOQtWxMvFPjdG7byFUbu5qeUMSXJj2XmTkjZXxZLNH4+71qyP+g3rY9X9l8eE4a9E7YJrYs5JJ8eltZs6GFGSZHjkizH18L+PG1YOjbPu/XnSviHq638UXz7kl3HFcWfE1f/xmw7aOkyAAAECBAgQIECgewISBd3zUpsAAQIECBAgQIAAgZ4KbH46fvBE63fvq+OE4w6JjvMEyb0MHv9hPFnMEyRJhSPHRXdv4Zt926GXYtnFn44lK1+MTaU8RTH05CbM9869MX519v3xfH1t3HbRxBheuM/CMcfGuCGFSDbFY5fNjDkPJ0mFwk2a582IscXjg2LI2Flxy4KZMaLY0Qux9AuLo66UW3iTtSkaa6+K6bO+Gc8dOieW3HpJTBtbSnEMqo5jZt8cd15bHf/141LS4s2GnhEgQIAAAQIECBDIJPCXmVppRIAAAQIECBAgQIAAgUwCbT/4L3TwfCw86T2xsEt9dZZUKNdJ67ZD52fYdmj/mHb7kzEtkjHfd0EcefEjLfdU+OUj8Z9T7417Tq4pJjiOmX1b/GR2m3NvfjK+ff8LLQf2q4nqYpLgzdcHvff98cHBt8TSwu5BG1fFqhe3xdg2yySa6hfHueffFS9XjY/L5p9Z5ubLg2Pk1HNiyo0/ioUb22Yw3jyHZwQIECBAgAABAgS6I2BFQXe01CVAgAABAgQIECBAoIcCr8fanz1TuolxskLggu/E84UtdTr6t+qGmNC61VBn9zIoN7KebDu0vb9BMWzc4TG6tTxienxuxuidrIJordjBz7/YO4b+dWtQ7etsiicW3hl1yef/VUefGifVDG5foaU8qCYOP6LbGymV78tRAgQIECBAgACB3AtIFOT+LQCAAAECBAgQIECAQB8KtL0xcXS2QqDt6oMu3MugTBjZtx0q01nroaFDY5+O90qKGHZUfOKkA5Lae8XYs6fseP+FQXvF0KEddLB9NcLgGD3+vTu5p8JfxZBhe7eOyE8CBAgQIECAAAECPRKw9VCP+DQmQIAAAQIECBAgQKBbAi+ujqdat8vpdIXAK/Hj768srT7oLKlQbhTJt/Pv+kG8cvSnM2w7VK6/rh7bN46Z93jUz2tXv6khHrvjofjR8kWxdG1h36H2j7aJkcGx79C3tq/QplwV+wx9W5uypwQIECBAgAABAgSyC1hRkN1OSwIECBAgQIAAAQIEuimwrWF9rCu1GXzE++O9HXyxvlilzU2PqyaeHzPH7tG9sxW/nf9aHHX8+J18M797XXa/dnJj4rrlsXDulBhdc1Z8e9PgeP8XF8ZlY8ptKfSHeHH9C6XESPfPpAUBAgQIECBAgACBrAJWFGSV044AAQIECBAgQIAAgW4KbItf1zdEy3fph8QRH3h3dLRTf8QbUXfbwqgt3qv3gJg6/ahufthf+nZ+HB7XfGS/bo6zN6oXEgQPxK033xgLnxgap879bPyw/pgYWUyMPB+3lT3FH6Nx829Lr2yNTVt+V7aWgwQIECBAgAABAgR6W0CioLdF9UeAAAECBAgQIECAQBcE3h6jDhzScb3Gn8Q99zcUX68aNz1mfXjfjuuWfaVl26I4+vN9vO1QYTBbY8N9c2L6xQ/Fy8M/HvMfnh/TqsutICg78NLBpnh1y+vRlJR2tuhiZz14jQABAgQIECBAgEBXBWw91FUp9QgQIECAAAECBAgQ6EWBt8XQIR2tJ0hWA6xYGstfTpYTVI2P2fPPjJruflpe3LYodsO2Q8lKgtqrWpIEhZsZz/ynmNLlJMGeUT3qnSXjbbHxwUdjbSFT4EGAAAECBAgQIEBgFwtIFOxiYN0TIECAAAECBAgQINAqUBXvqKmOTr9b31gb8+c/nuzVn3zQPvfK+GRNpy1aT1D6Wdp2aL/T48Kp+7d7bVcXX4+6Hz4WLxdPs2ccVDO8GysCquKdf3dYjGgd4sa74+vLX2ot+UmAAAECBAgQIEBglwlIFOwyWh0TIECAAAECBAgQINBeoOpvPxBHFBcSvBZbGos3IGhXJbk3wcLrY2nySfvw466I62eM7sYH7a1dFbYdWhP7TT42xnR3JUJrF73yc3P8dGV9cfugtt01NayJn/9v+aUCg8aeGZ+Z2LolU2PUXnpRzFu1uW3zlueNj8ctt68pHd8azz39iyhTa8d2jhAgQIAAAQIECBAoIyBRUAbFIQIECBAgQIAAAQIEdpHAsI/GhecenHTeEN97+Nl2H6IXtu35cly0oCGGT5wTN887uXTz326Opbjt0D5xwnGHZEgydOFcz6+PhnI5jmLTv4ohw/YudZJsH3TbVfGFRxpa4mysi2XXnRsTPvP9+MP206yLn63eFMmdj2Pp9cvimab9Y8oVl8Wk4aVtmbbVxcLTZ8Slix6LDcXcQuEmyXfHpTOWRBxZcGx5bFvxLzFz7udj1ocujGWbyychWuv6SYAAAQIECBAgQKC9gERBexFlAgQIECBAgAABAgR2ocAeMXb2TXHZuMHpD9GT78PX3fv5OOf8h2LfT3w17rx1VowdkmU5QOu2QxNi0pg9eieOpvpY9pUl8Uxrb1ufinu+u+NKgZaXk/jOnx2nbv+gf23cPWtCHDyyOmred3YseW1a3HH/NTH5PXuWektWDVx8ZNR8dEG8NvHDcWgS8qDqk+PaBXNiQps+ll49IyYm2zbVjDwoDjvpa9E4/XMxa3T7+IbHx/7tSzFtWBa31uD8JECAAAECBAgQyKPAW5qTR5bAa5L/0a3f0JClqTYECBAgQIAAAQIECORdoKkhHlt8S9w07954pvjt/BEx4YKz4mPHTYtpY4f1QOelWDZzatx08IKoveSwHq4o2BYbFk2PiVev7HA8g09bHGvmHRPtb8vc1PBI3PTlq+JrKzYW21aNOS1mf/Yf45MTqpMxJasCVn01zjn95iT2veLQ0y6PKy8/dcfESGEFwt13x5IbWo2qkpUWM+Pii85NjPZuGdvte8f5Mz8ek06dvGP7DkftBQIECBAgQIAAgUoR6K3P6SUKKuUdIQ4CBAgQIECAAAECBAgQIECAAAECBAgQyJVAbyUKbD2Uq7eNYAkQIECAAAECBAgQIECAAAECBAgQIECAQFpAoiDtoUSAAAECBAgQIECAAAECBAgQIECAAAECBHIlIFGQq+kWLAECBAgQIECAAAECBAgQIECAAAECBAgQSAtIFKQ9lAgQIECAAAECBAgQIECAAAECBAgQIECAQK4EJApyNd2CJUCAAAECBAgQIECAAAECBAgQIECAAAECaQGJgrSHEgECBAgQIECAAAECBAgQIECAAAECBAgQyJWAREGupluwBAgQIECAAAECBAgQIECAAAECBAgQIEAgLSBRkPZQIkCAAAECBAgQIECAAAECBAgQIECAAAECuRKQKMjVdAuWAAECBAgQIECAAAECBAgQIECAAAECBAikBSQK0h5KBAgQIECAAAECBAgQIECAAAECBAgQIEAgVwISBbmabsESIECAAAECBAgQIECAAAECBAgQIECAAIG0gERB2kOJAAECBAgQIECAAAECBAgQIECAAAECBAjkSkCiIFfTLVgCBAgQIECAAAECBAgQIECAAAECBAgQIJAWkChIeygRIECAAAECBAgQIECAAAECBAgQIECAAIFcCUgU5Gq6BUuAAAECBAgQIECAAAECBAgQIECAAAECBNICEgVpDyUCBAgQIECAAAECBAgQIECAAAECBAgQIJArAYmCXE23YAkQIECAAAECBAgQIECAAAECBAgQIECAQFpAoiDtoUSAAAECBAgQIECAAAECBAgQIECAAAECBHIlIFGQq+kWLAECBAgQIECAAAECBAgQIECAAAECBAgQSAtIFKQ9lAgQIECAAAECBAgQIECAAAECBAgQIECAQK4EJApyNd2CJUCAAAECBAgQIECAAAECBAgQIECAAAECaQGJgrSHEgECBAgQIECAAAECBAgQIECAAAECBAgQyJWAREGupluwBAgQIECAAAECBAgQIECAAAECBAgQIEAgLSBRkPZQIkCAAAECBAgQIECAAAECBAgQIECAAAECuRKQKMjVdAuWAAECBAgQIECAAAECBAgQIECAAAECBAikBSQK0h5KBAgQIECAAAECBAgQIECAAAECBAgQIEAgVwISBbmabsESIECAAAECBAgQIECAAAECBAgQIECAAIG0gERB2kOJAAECBAgQIECAAAECBAgQIECAAAECBAjkSkCiIFfTLVgCBAgQIECAAAECBAgQIECAAAECBAgQIJAWkChIeygRIECAAAECBAgQIECAAAECBAgQIECAAIFcCUgU5Gq6BUuAAAECBAgQIECAAAECBAgQIECAAAECBNICEgVpDyUCBAgQIECAAAECBAgQIECAAAECBAgQIJArAYmCXE23YAkQIECAAAECBAgQIECAAAECBAgQIECAQFpAoiDtoUSAAAECBAgQIECAAAECBAgQIECAAAECBHIlIFGQq+kWLAECBAgQIECAAAECBAgQIECAAAECBAgQSAtIFKQ9lAgQIECAAAECBAgQIECAAAECBAgQIECAQK4EJApyNd2CJUCAAAECBAgQIECAAAECBAgQIECAAAECaQGJgrSHEgECBAgQIECAAAECBAgQIECAAAECBAgQyJWAREGupluwBAgQIECAAAECBAgQIECAAAECBAgQIEAgLSBRkPZQIkCAAAECBAgQIECAAAECBAgQIECAAAECuRKQKMjVdAuWAAECBAgQIECAAAECBAgQIECAAAECBAikBSQK0h5KBAgQIECAAAECBAgQIECAAAECBAgQIEAgVwISBbmabsESIECAAAECBAgQIECAAAECBAgQIECAAIG0gERB2kOJAAECBAgQIECAAAECBAgQIECAAAECBAjkSkCiIFfTLVgCBAgQIECAAAECBAgQIECAAAECBAgQIJAWkChIeygRIECAAAECBAgQIECAAAECBAgQIECAAIFcCUgU5Gq6BUuAAAECBAgQIECAAAECBAgQIECAAAECBNICEgVpDyUCBAgQIECAAAECBAgQIECAAAECBAgQIJArAYmCXE23YAkQIECAAAECBAgQIECAAAECBAgQIECAQFpAoiDtoUSAAAECBAgQIECAAAECBAgQIECAAAECBHIlIFGQq+kWLAECBAgQIECAAAECBAgQIECAAAECBAgQSAtIFKQ9lAgQIECAAAECBAgQIECAAAECBAgQIECAQK4EJApyNd2CJUCAAAECBAgQIECAAAECBAgQIECAAAECaYG3NCeP9KGulWpGVnetoloECBAgQIAAAQIECBAgQIAAAQIECBAgQIDALhOo39DQo74zJwp6dFaNCRAgQIAAAQIECBAgQIAAAQIECBAgQIAAgX4hYOuhfjENBkGAAAECBAgQIECAAAECBAgQIECAAAECBHaPgETB7nF3VgIECBAgQIAAAQIECBAgQIAAAQIECBAg0C8EJAr6xTQYBAECBAgQIECAAAECBAgQIECAAAECBAgQ2D0CEgW7x91ZCRAgQIAAAQIECBAgQIAAAQIECBAgQIBAvxCQKOgX02AQBAgQIECAAAECBAgQIECAAAECBAgQIEBg9whIFOwed2clQIAAAQIECBAgQIAAAQIECBAgQIAAAQL9QkCioF9Mg0EQIECAAAECBAgQIECAAAECBAgQIECAAIHdIyBRsHvcnZUAAQIECBAgQIAAAQIECBAgQIAAAQIECPQLAYmCfjENBkGAAAECBAgQIECAAAECBAgQIECAAAECBHaPgETB7nF3VgIECBAgQIAAAQIECBAgQIAAAQIECBAg0C8EJAr6xTQYBAECBAgQIECAAAECBAgQIECAAAECBAgQ2D0CEgW7x91ZCRAgQIAAAQIECBAgQIAAAQIECBAgQIBAvxD4f2UDYQQp07KAAAAAAElFTkSuQmCC" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>(i) \(\theta = \frac{{1.22 \times 59 \times {{10}^{ - 6}}}}{{0.18 \times {{10}^{ - 3}}}}\);<br>(=0.40rad)</p>
<p>(ii) central symmetrical maximum;<br>at least one secondary maximum on each side, no more than one third the height of the central maximum; <em>(judge by eye)</em><br>minima drawn to zero, <em>ie</em> touching axis at <em>θ</em>=±0.40 (and ±0.80);</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>This question is about the Doppler effect.</p>
<p>The diagram shows wavefronts in air produced by a stationary source S of sound. The distance between successive wavefronts is equal to the wavelength of the sound. The speed of sound is <em>c</em>.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>On the diagram, sketch three successive wavefronts produced when S is moving to the left at a speed of 0.5<em>c</em>.</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>A source of X-rays rotates on a turntable. Radiation of wavelength 7.5 nm is emitted by the source and undergoes a maximum shift of 0.50 fm. The distance between the source and the detector is large in comparison to the diameter of the turntable.</p>
<p><img 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" alt></p>
<p>(i) Determine the speed of a point on the edge of the turntable.</p>
<p>(ii) State the assumption you made in your answer to (b)(i).</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial';">3 circular wavefronts;<br> 2 centres/sources of wavefronts move left (by one box); </span></p>
<p><span style="font-size: 11.000000pt; font-family: 'Arial';"><img src="data:image/png;base64,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" 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<p><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Drawn circular wavefronts may be larger as in diagram here, or could be equal sized. Both are acceptable. </span></em></p>
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<div class="question_part_label">a.</div>
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<p><span style="font-size: 11.000000pt; font-family: 'Arial';">(i) \(v = \frac{{5 \times {{10}^{ - 16}} \times 3 \times {{10}^8}}}{{7.5 \times {{10}^{ - 9}}}}\);<br>20(ms</span><span style="font-size: 7.000000pt; font-family: 'SymbolMT'; vertical-align: 5.000000pt;">-</span><span style="font-size: 7.000000pt; font-family: 'Arial'; vertical-align: 5.000000pt;">1</span><span style="font-size: 11.000000pt; font-family: 'Arial';">);<br></span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">Use of sound equation not acceptable. </span></em></p>
<p><span style="font-size: 11.000000pt; font-family: 'Arial';">(ii) assume speed of X-rays \( = \)</span> <em><span style="font-size: 11pt; font-family: 'Arial,Italic';">c </span></em><span style="font-size: 11.000000pt; font-family: 'Arial';">/ assume speed of turntable << </span><em><span style="font-size: 11pt; font-family: 'Arial,Italic';">c</span></em><span style="font-size: 11.000000pt; font-family: 'Arial';">; </span></p>
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<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
<div class="question_part_label">a.</div>
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[N/A]
<div class="question_part_label">b.</div>
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