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<h2>HL Paper 2</h2><div class="specification">
<p>Cobalt forms the transition metal complex [Co(NH<sub>3</sub>)<sub>4</sub> (H<sub>2</sub>O)Cl]Br.</p>
</div>
<div class="specification">
<p>Trends in physical and chemical properties are useful to chemists.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the melting points of the group 1 metals (Li → Cs) decrease down the group whereas the melting points of the group 17 elements (F → I) increase down the group.</p>
<p><img src="data:image/png;base64,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"></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>State the shape of the complex ion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the charge on the complex ion and the oxidation state of cobalt.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe, in terms of acid-base theories, the type of reaction that takes place between the cobalt ion and water to form the complex ion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any three of:</em></p>
<p><em>Group 1:</em><br>atomic/ionic radius increases</p>
<p>smaller charge density</p>
<p><em><strong>OR</strong></em></p>
<p>force of attraction between metal ions and delocalised electrons decreases</p>
<p><em>Do not accept discussion of attraction between valence electrons and nucleus for M2.</em></p>
<p><em>Accept “weaker metallic bonds” for M2.</em></p>
<p><em>Group 17:</em><br>number of electrons/surface area/molar mass increase</p>
<p>London/dispersion/van der Waals’/vdw forces increase</p>
<p><em>Accept “atomic mass” for “molar mass”.</em></p>
<p><strong><em>[Max 3 Marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«distorted» octahedral</p>
<p><em>Accept “square bipyramid”.</em></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Charge on complex ion:</em> 1+/+<br><em>Oxidation state of cobalt:</em> +2</p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Lewis «acid-base reaction»</p>
<p>H2O: electron/e<sup>–</sup> pair donor</p>
<p><em><strong>OR</strong></em></p>
<p>Co<sup>2+</sup>: electron/e<sup>–</sup> pair acceptor</p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p><span class="fontstyle0">An equation for the combustion of propane is given below.</span></p>
<p style="text-align: center;">C<sub>3</sub>H<sub>8</sub>(g) + 5O<sub>2</sub>(g) <img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABcAAAAPCAYAAAAPr1RWAAAAtklEQVQ4EWP4T0PAQEOz/w8yw//e+L/AL+h//f6n//8S8DYZLv/7/+P+uv+68n4ELSDD8P////99+n9/nd9/ZXmL/6nzr/z/jMMH5BkOMuzzlf8Lki3+K8tr/feqXvr/7POfGFZADX/8f0Oy4X9leQUKcO7/Dc9/o1hAD5ejWEgE5/3/s31B/5Xl/f7XrL9BzTD/+//z2Un/vWiSWsDpPOJ//9n3BH1IfpgTNPr/YMv+RLgYpgQAW3wPIx3NN5kAAAAASUVORK5CYII=">3CO<sub>2</sub>(g) + 4H<sub>2</sub>O(g)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Determine the standard enthalpy change, </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>H</mi><mo>⦵</mo></msup></math><span class="fontstyle0">, for this reaction, using section 11 of the data booklet.</span></p>
<p> </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><span class="fontstyle0">Calculate the standard enthalpy change, </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>H</mi><mo>⦵</mo></msup></math><span class="fontstyle0">, for this reaction using section 12 of the data booklet.</span></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><span class="fontstyle0">Predict, giving a reason, whether the entropy change, </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>S</mi><mo>⦵</mo></msup></math><span class="fontstyle0">, for this reaction is negative or positive.</span></p>
<p> </p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>S</mi><mo>⦵</mo></msup></math> <span class="fontstyle0">for the reaction in </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math><span class="fontstyle0">, using section 12 of the data booklet.</span></p>
<p><span class="fontstyle0">The standard molar entropy for oxygen gas is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>205</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></span><span class="fontstyle0">.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate the standard Gibbs free energy change, </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi mathvariant="normal">G</mi><mo>⦵</mo></msup></math><span class="fontstyle0">, </span><span class="fontstyle4"><strong>in</strong> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="bold">kJ</mi></math></span><span class="fontstyle0">, for the reaction at 5 °</span><span class="fontstyle0">C, using your answers to (b) and (d). Use section 1 of the data booklet.</span></p>
<p><span class="fontstyle0">(If you did not obtain an answer to (b) or (d) use values of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>-</mo><mn>1952</mn><mo> </mo><mi>kJ</mi></math></span><span class="fontstyle0"> and <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>+</mo><mn>113</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">respectively, although these are not the correct answers.)</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Bonds broken</em>: 8(C–H) + 2(C–C) + 5(O=O) / 8 × 414 «kJ mol<sup>−1</sup>» + 2 × 346 «kJ mol<sup>−1</sup>» + 5 × 498 «kJ mol−1» / 6494 «kJ» ✔</p>
<p>Bonds formed: 6(C=O) + 8(O–H) / 6 × 804 «kJ mol<sup>−1</sup>» + 8 × 463 «kJ mol<sup>−1</sup>» / 8528 «kJ» ✔</p>
<p>«Enthalpy change<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>=</mo></math>bonds broken<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo></math>bonds formed <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>=</mo><mn>6494</mn><mo> </mo><mi>kJ</mi><mo>−</mo><mn>8528</mn><mo> </mo><mi>kJ</mi><mo>=</mo><mo>»</mo><mo>−</mo><mn>2034</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo> </mo></math> ✔</p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>4</mn><mo>(</mo><mo>−</mo><mn>241</mn><mo>.</mo><mn>8</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo></math> AND</strong> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>3</mn><mo>(</mo><mo>−</mo><mn>393</mn><mo>.</mo><mn>5</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo></math></em> <em><strong>AND</strong> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mn>1</mn><mo>»</mo><mo>(</mo><mo>−</mo><mn>105</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo></math></em> ✔<br><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mi mathvariant="normal">Δ</mi><msup><mi>H</mi><mo>⦵</mo></msup><mo>=</mo><mn>4</mn><mo>(</mo><mo>−</mo><mn>241</mn><mo>.</mo><mn>8</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo><mo>+</mo><mn>3</mn><mo>(</mo><mo>−</mo><mn>393</mn><mo>.</mo><mn>5</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo><mo>–</mo><mo>«</mo><mn>1</mn><mo>»</mo><mo>(</mo><mo>−</mo><mn>105</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo><mo>)</mo><mo>=</mo><mo>»</mo><mo>−</mo><mn>2043</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</p>
<p><em>Award <strong>[2]</strong> for correct final answer. </em></p>
<p><em>Award <strong>[1 max]</strong> for <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo mathvariant="italic">−</mo><mn mathvariant="italic">2219</mn><mo mathvariant="italic"> </mo><mo>«</mo><mi>k</mi><mi>J</mi><mo>»</mo></math>.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>positive <em><strong>AND</strong> </em>more moles «of gas» in products ✔</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>4</mn><mo>×</mo><mn>188</mn><mo>.</mo><mn>8</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> <em><strong>AND</strong></em> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>3</mn><mo>×</mo><mn>213</mn><mo>.</mo><mn>8</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> <em><strong>AND</strong></em> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mn>1</mn><mo>×</mo><mo>»</mo><mn>270</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> <em><strong>AND <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>5</mn><mo>×</mo><mn>205</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math></strong></em> ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mo>∆</mo><msup><mi>S</mi><mo>⦵</mo></msup><mo>=</mo><mn>4</mn><mo>(</mo><mn>188</mn><mo>.</mo><mn>8</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>+</mo><mn>3</mn><mo>(</mo><mn>213</mn><mo>.</mo><mn>8</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>–</mo><mo>[</mo><mn>1</mn><mo>(</mo><mn>270</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>+</mo><mn>5</mn><mo>(</mo><mn>205</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>]</mo><mo>=</mo><mo>»</mo><mn>102</mn><mo>«</mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo> </mo></math> ✔</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi mathvariant="normal">T</mi><mo>=</mo><mn>5</mn><mo>+</mo><mn>273</mn><mo>=</mo><mo>»</mo><mn>278</mn><mo> </mo><mi mathvariant="normal">K</mi></math> ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msup><mi>ΔG</mi><mo>⦵</mo></msup><mo>=</mo><mo>−</mo><mn>2043</mn><mo> </mo><mi>kJ</mi><mo>−</mo><mo>(</mo><mn>278</mn><mo> </mo><mi mathvariant="normal">K</mi><mo>×</mo><mn>0</mn><mo>.</mo><mn>102</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>=</mo><mo>»</mo><mo>−</mo><mn>2071</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many candidates had difficulty determining the number and type of bonds broken or formed and consequently this was the part of question 3 that was most poorly attempted. Those that could identify these bonds performed the calculations correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Enthalpy calculations using enthalpy of formation data were generally well done.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most knew that entropy increased however some lost the mark by not including an explanation based on increase number of mol of gaseous products.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Calculating ΔS<sup>ө</sup>, like most other calculations, was well done.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ΔG<sup>ө</sup> calculations were also well done, with some not seeing that specific units were to be used.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Ammonia is produced by the Haber–Bosch process which involves the equilibrium:</p>
<p style="text-align: center;">N<sub>2 </sub>(g) + 3 H<sub>2 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> 2 NH<sub>3 </sub>(g)</p>
<p>The percentage of ammonia at equilibrium under various conditions is shown:</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p style="text-align: center;"><sup>[The Haber Bosch Process [graph] Available at: https://commons.wikimedia.org/wiki/File:Ammonia_yield.png</sup><br><sup>[Accessed: 16/07/2022].]</sup></p>
</div>
<div class="specification">
<p>One factor affecting the position of equilibrium is the enthalpy change of the reaction.</p>
</div>
<div class="specification">
<p>The standard free energy change, Δ<em>G</em><sup>⦵</sup>, for the Haber–Bosch process is –33.0 kJ at 298 K.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the expression for the equilibrium constant, <em>K</em><sub>c</sub>, for this equation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State how the use of a catalyst affects the position of the equilibrium.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>With reference to the reaction quotient, Q, explain why the percentage yield increases as the pressure is increased at constant temperature.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the enthalpy change, Δ<em>H</em>, for the Haber–Bosch process, in kJ. Use Section 11 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the value obtained in (b)(i) might differ from a value calculated using Δ<em>H</em><sub>f</sub> data.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Demonstrate that your answer to (b)(i) is consistent with the effect of an increase in temperature on the percentage yield, as shown in the graph.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State, giving a reason, whether the reaction is spontaneous or not at 298 K.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the value of the equilibrium constant, <em>K</em>, at 298 K. Use sections 1 and 2 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the entropy change for the Haber–Bosch process, in J mol<sup>–1 </sup>K<sup>–1</sup> at 298 K. Use your answer to (b)(i) and section 1 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, with reference to the reaction equation, why this sign for the entropy change is expected.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>K</mi><mi>c</mi></msub><mo>=</mo><mfrac><msup><mfenced open="[" close="]"><mrow><mi>N</mi><msub><mi>H</mi><mn>3</mn></msub></mrow></mfenced><mn>2</mn></msup><mrow><mfenced open="[" close="]"><msub><mi>N</mi><mn>2</mn></msub></mfenced><msup><mfenced open="[" close="]"><msub><mi>H</mi><mn>2</mn></msub></mfenced><mn>3</mn></msup></mrow></mfrac></math> ✔</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>same/unaffected/unchanged ✔</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>increasing pressure increases «all» concentrations<br><em><strong>OR</strong></em><br>increasing pressure decreases volume ✔</p>
<p><em><br>Q</em> becomes less than <em>K</em><sub>c</sub><br><em><strong>OR</strong></em><br>affects the lower line/denominator of Q expression more than upper line/numerator ✔</p>
<p><br>«for <em>Q</em> to once again equal <em>K</em><sub>c</sub>,» ratio of products to reactants increases<br><em><strong>OR</strong></em><br>«for <em>Q</em> to once again equal <em>K</em><sub>c</sub>,» equilibrium shifts to right/products ✔</p>
<p> </p>
<p><em>Award <strong>[2 max]</strong> for answers that do not refer to Q.</em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>bonds broken</em>: N≡N + 3(H-H) /«1 mol×»945 «kJ mol<sup>–1</sup>» + 3«mol»×436 «kJ mol<sup>–1</sup>» / 945 «kJ» + 1308 «kJ» / 2253 «kJ» ✔</p>
<p><em>bonds formed</em>: 6(N-H) / 6«mol»×391 «kJ mol<sup>–1</sup>» / 2346 «kJ» ✔</p>
<p>Δ<em>H</em> = «2253 kJ - 2346 kJ = » -93 «kJ» ✔</p>
<p> </p>
<p><em>Award <strong>[2 max]</strong> for (+)93 «kJ».</em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«N-H» bond enthalpy is an average «and may not be the precise value in NH<sub>3</sub>» ✔</p>
<p> </p>
<p><em>Accept ΔH<sub>f</sub> data are more accurate / are not average values.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>increased temperature decreases yield «as shown on graph» ✔</p>
<p>shifts equilibrium in endothermic/reverse direction ✔</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>spontaneous <em><strong>AND</strong> </em>Δ<em>G</em> < 0 ✔</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ln</mi><mo> </mo><mi>K</mi><mo>=</mo><mo>⟨</mo><mo>⟨</mo><mfrac><mrow><mo>∆</mo><mi>G</mi></mrow><mrow><mi>R</mi><mo>.</mo><mi>T</mi></mrow></mfrac><mo>=</mo><mo>⟩</mo><mo>⟩</mo><mo> </mo><mo>-</mo><mfrac><mrow><mo>-</mo><mn>33000</mn></mrow><mrow><mn>8</mn><mo>.</mo><mn>31</mn><mi>x</mi><mn>298</mn></mrow></mfrac><mo> </mo><mo>/</mo><mo>«</mo><mo>+</mo><mo>»</mo><mn>13</mn><mo>.</mo><mn>3</mn></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>K</mi><mo> </mo><mo>=</mo><mo> </mo><mn>6</mn><mo>.</mo><mn>13</mn><mo>×</mo><msup><mn>10</mn><mn>5</mn></msup></math> ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept answers in the range 4.4×10<sup>5</sup> to 6.2×10<sup>5</sup> (arises from rounding of ln K).</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>G</em> = «Δ<em>H</em> – <em>T</em>Δ<em>S</em> =» –93000 «J» – 298«K» × Δ<em>S</em> = –33000 ✔</p>
<p>Δ<em>S</em> = 〈〈<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mo>-</mo><mn>93000</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><mo>-</mo><mfenced><mrow><mo>-</mo><mn>33000</mn><mo> </mo><mi mathvariant="normal">J</mi></mrow></mfenced></mrow><mrow><mn>298</mn><mo> </mo><mi mathvariant="normal">K</mi></mrow></mfrac></math>〉〉 = –201 «J mol<sup>–1 </sup>K<sup>–1</sup>» ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> penalize failure to convert kJ to J in <strong>both</strong> (c)(ii) and (c)(iii).</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer</em></p>
<p><em>Award<strong> [1 max]</strong> for (+) 201 «J mol<sup>–1</sup> K<sup>–1</sup>».</em></p>
<p><em>Award [2] for –101 or –100.5 «J mol<sup>–1</sup> K<sup>–1</sup>».</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«forward reaction involves» decrease in number of moles «of gas» ✔</p>
<div class="question_part_label">c(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Deducing the equilibrium constant expression for the given equation was done very well.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; however, some misread the question as asking for the effect of a catalyst on equilibrium, rather than on the position of equilibrium.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance; very few identified the effect of increasing pressure on all concentrations. Consequently, <em>Q</em> becomes less than <em>K</em><sub>c</sub> (it affects the denominator of <em>Q</em> expression more than the numerator) was not addressed. Question was often answered with respect to kinetics, namely greater frequency of collisions and speed of reaction rather than from equilibrium perspective based on effect of increase in pressure on concentrations.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; often the bond energy for single N–N bond instead of using it for the triple bond and not taking into consideration the coefficient of three in calculation of bond enthalpies of ammonia. Also, instead of using BE of bonds broken minus those that were formed, the operation was often reversed. Students should be encouraged to draw the Lewis structures in the equations first to determine the bonds being broken and formed.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Outlining why Δ<em>H</em><sub>rxn</sub> based on BE values differ due to being average compared to using Δ<em>H</em><sub>f</sub> values was generally done well.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; some did not relate that increased temperature decreases yield «as shown on graph» and others arrived at incorrect shift in equilibrium for the reaction.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Reason for the reaction being spontaneous was generally very done well indeed.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; for ln<em>K</em> calculation in the equation ΔG = RTln<em>K</em>, ΔG unit had to be converted from kJ to J. This led to an error of 1000 in the value of ln<em>K</em> for some.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very good performance; since the unit for <em>S</em> is J mol<sup>˗1</sup> K<sup>˗1</sup>, Δ<em>G</em> and Δ<em>H</em> needed to be converted from kJ to J, but that was not done in some cases.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Average performance for sign of the entropy change expected for the reaction. Some answers were based on Δ<em>G</em> value rather than in terms of decrease in number of moles of gas or had no idea how to address the question.</p>
<div class="question_part_label">c(iv).</div>
</div>
<br><hr><br><div class="specification">
<p>Oxygen exists as two allotropes, diatomic oxygen, O<sub>2</sub>, and ozone, O<sub>3</sub>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a Lewis (electron dot) structure for ozone.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss the relative length of the two O−O bonds in ozone.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why there are frequencies of UV light that will dissociate O<sub>3</sub> but not O<sub>2</sub>.</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>Explain, using equations, how the presence of <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>CCl</mtext><mtext>2</mtext></msub><msub><mtext>F</mtext><mtext>2</mtext></msub></math> results in a chain reaction that decreases the concentration of ozone in the stratosphere.</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><img src="data:image/png;base64,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" width="437" height="78">✔</p>
<p><em>Accept any combination of lines, dots or crosses to represent electrons.</em></p>
<p><em>Do <strong>not</strong> accept structures that represent 1.5 bonds.</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>both equal ✔</p>
<p>delocalization/resonance ✔</p>
<p><em><br>Accept bond length between 121 and 148 pm/ that of single O−O bond and double O=O bond for M1.</em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bond in O<sub>3</sub> is weaker<br><em><strong>OR</strong></em><br>O<sub>3</sub> bond order 1.5/< 2 ✔</p>
<p><em><br>Do <strong>not</strong> accept bond in O<sub>3</sub> is longer for M1.</em></p>
<p><br>lower frequency/longer wavelength «UV light» has enough energy to break the O–O bond in O<sub>3</sub> «but not that in O<sub>2</sub>» ✔</p>
<p><em><br>Accept “lower frequency/longer wavelength «UV light» has lower energy”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>CCl</mtext><mtext>2</mtext></msub><msub><mtext>F</mtext><mtext>2</mtext></msub><msub><mtext>(g) →∙CClF</mtext><mtext>2</mtext></msub><mtext>(g) Cl</mtext><mo>∙</mo><mtext>(g)</mtext></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>Cl•(g)+O</mtext><mtext>3</mtext></msub><msub><mtext>(g)→O</mtext><mtext>2</mtext></msub><mtext>(g)+ClO•(g)</mtext></math><br><em><strong>AND</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>ClO∙(g)+O</mtext><mtext>3</mtext></msub><msub><mtext>(g)→2O</mtext><mtext>2</mtext></msub><mtext>(g)+Cl</mtext><mo>∙</mo><mtext>(g)</mtext></math> ✔</p>
<p><em><br>Do <strong>not</strong> penalize missing radical.</em></p>
<p><em>Accept:for M2:</em><br><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>Cl∙(g) + O</mtext><mtext>3</mtext></msub><msub><mtext>(g) → O</mtext><mtext>2</mtext></msub><mtext>(g) + ClO</mtext><mo>∙</mo><mtext>(g)</mtext></math><br><em><strong>AND</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>ClO∙(g) + O(g) → O</mtext><mtext>2</mtext></msub><mtext>(g) + Cl</mtext><mo>∙</mo><mtext>(g)</mtext></math></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(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">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>Carbon forms many compounds.</p>
</div>
<div class="specification">
<p>C<sub>60</sub> and diamond are allotropes of carbon.</p>
</div>
<div class="specification">
<p>Chlorine reacts with methane.</p>
<p style="text-align: center;">CH<sub>4</sub> (g) + Cl<sub>2 </sub>(g) → CH<sub>3</sub>Cl (g) + HCl (g)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>two</strong> differences between the bonding of carbon atoms in C<sub>60</sub> and diamond.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why C<sub>60</sub> and diamond sublime at different temperatures and pressures.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State two features showing that propane and butane are members of the same homologous series.</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>Describe a test and the expected result to indicate the presence of carbon–carbon double bonds.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAsUAAADoCAYAAAAHZpnZAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAyxSURBVHhe7d1/6NT3fcDxl+JCab7IYmki8s0hbmLVVr6z335hpWzJbDTIKreUjXRLv5h5K/lhyTRsYlJCkUw7SDwioRNnV4lxy8KSHqYIndiasnSZukOy+m3Dl4bs/FbONhX58v2GYL/7uvt+PfO1336zJqmTu3s9HnDkc5/7+L333X3+ePLhdZdZFxsCAAASm938LwAApCWKAQBI7xfGJwqF7uYWAAB0tlptqLk1QxRf+SAAAHSi6d1rfAIAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJCeKAYAID1RDABAeqIYAID02iiKT0eltCIKhe53vvXsjOpY8/D35ULUq0ejWr/QvA8AQAZtFMU3R3HvK1GrDV26HXsyVse8WL3r36f2ndwcK+c0D38fxqpPxu3FHfHiGVEMAJCJ8QkAANLrsCieGH+oRLnU1xypWBK3P3zginGI4Rg8sitKSy+PXPRFqXw4BkfGY6y6M3qLO+NcnIpy8SPRU67G2OWRjV97LAMAgFbWQVE8HiPV3bG+uD1OferrMTAxTjHwfNx59okort8d1ZGxGD76WKy7+3As+Ltj8XqtFgOHvxixZ2M8+C+DMXvl5jhR2RzzYnlsqvwwTm5aGXMuj2z8mmMZAAC0tg6K4nNx4rlnY6DnvtjSvzy6JnZ1LY/+LfdFz8Cz8dyJN+LN8+ditJG6N8z9YOOFz46uJZ+PvT94NQ6uX9Jpl8wBAHgPOqcFx38Wr//XTyNOfilWLbw8HtEdC1d9KU7GcJw9//OY/+l7Y9vqH0e5+NEoLN0Q5ecr8UK1HuPNPwEAQE4dd4H0+s8/Hd+//GsUb99eib3FmyevHK/f+3IMHPnH2LXjtohD2+P+4u/H2keORF0ZAwCk1TlRPPtDsfBjH47R578d1eH/q3BnR9fi34ti8c7YtPe7cWRbbwzs+0a8/BPfpAMAyKqDrhTPi97P/kksG/3n+Mpj37l05Xe8Hsd3bYilhT+LfYPDcabyQCxduiF2HW+OTIz8KF76t8GInt5YfuOcmLNgUfTGaLwx/NbEowAAJNFBUTw7ulbeE/sqj8THj90XfRNzxQt7o/+V5bGj8nj0L54bC9ZtjQMPzY9Dn+2NhRMzx8vuiGdueiAqe/40Fk+8Ezf2xV3rb4j9/T1RKFWi7ifZAABSmHWxobk9+cW0iRlcAADoZNO7t+O+aAcAAO+VKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJCeKAYAIL02juKxqFc2RqGwJsrVkea+aeqVKBW6o6dcbRw9k9NRKa2IQs/OqM54wNV4jhZZ5zV5rZ2yzgbnzpR2Wadz5wrtss4WOXfaZZ3OnSu0yzpb5NxpiXW2vlkXG5rbjTejO2q1oeY9AADoTNO71/gEAADpiWIAANITxQAApCeKAQBITxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANJr4ygei3plYxQKa6JcHWnum6ZeiVKhO3rK1cbRMzkdldKKKPTsjOqMB1yN52iRdV6T19op62xw7kxpl3U6d67QLutskXOnXdbp3LlCu6yzRc6dllhn65t1saG53XgzuqNWG2reAwCAzjS9e41PAACQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPTaK4rHqlHu6Y5CYabbZ+Lh/cejPt489v/d6aiUVkShVIn65P0LUa8ejWr9wuQ9AADaR1teKZ636WC8VhuK2tu3gTiy63fiPx++P758sBbXrIuvMFZ9Mm4v7ogXz4hiAIB20yHjE3NjcfEv4p7Vb8Whb1bjJ829AADwbnT0TPF4vRqV8oZYennE4vaHY3+13rySPB4jg4ejXOp7ewRjaWlXHBkcnnw06pUoFVZEqXL60v0JM+1r+Hl1Z/QWd8a5OBXl4keip1yNscvjFT07ozrWPBAAgJbUIVE8HIOVv4/d//qBWPuHK+PGiV0jx+OJ9Z+LraduicpAbXLE4vCdP4vtxXvjier5xj/5buxYtzG+tWBHHHt9KGoD34ot8XTc/eDzMfge5y9+Y+XmOFHZHPNieWyq/DBObloZc+LmKO59JWonN8fKOc0DAQBoSW0ZxefK62LR5au/k7dlsWrrj2PN1w/EY8VC40WNx/CJF2LPQG9s2fLHsaRr4mXOjSX9m2JLz0Dsee5kDL95Ps6ONnbfMDcmH+5aHuv3HovawfWxuKOvnwMAMF1b5t/UF+1ei2NP3RPLYkGsvndDfO7WxdE1ecSFOPv6j2I0XoxHVv32VDwvXBWPnByN0bPn4835fxB/te3W+O/yH8WyQl+Uys9E5YXqNfz1CgAAWkWbXxO9Lubf8tfxD7t+N1567C9/+Zcnrv/zeOr7E6MTV/5SReO2txjzJ64cr98dPxj4Tjy166FYG4dj6/3rom/to3HUz6oBAKTSAYMC18WCdQ/GjrURh7Y+HgcnfxLturhp4W/F9aPfjsPVc5cOeyddi+OWYjHu2PS1OHXk0egZeDaefvls88FfNHbmtTjR3AYAoHN0xvTs7O749BfuimWjz8XWbYfizPjsmNv7mfjCsp/G/q/sbl75vRD147ujtHRJrNv3aiNwK3HP0r4o7fpec2RiOAZfejkG42PxqeUfjvjgb8ZN15+Ll755NF4dGY/x+vfiq199Jt4psecsWBS9MRpvDL/V3AMAQLvokK+UzY6ulf2xfdMnYvTQ9tg2MUbR9Yl4YN/T8Tcf/4/o71sUhcKi6Os/Hst3/FPs6V/SiNi18eUDD8RNh+6OvoWXvqx32zMfiocqj0f/4g9EzP1kfPHA38YdQ4/GbcsKsfDWr8X/fPK2WNZ8xl9yY1/ctf6G2N/f0/y/3PlJNgCAdjHrYkNze/LLaBMztwAA0Mmmd2+HXCkGAID3TxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJBeG0fxWNQrG6NQWBPl6khz3zT1SpQK3dFTrjaOnsnpqJRWRKFnZ1RnPOBqPId1TnkXz3FNXuuveo6GlvhMvJ9TrsY6W+QzaZd1tsS50y7rbHDuTGmXdbbEudMu62y4Gn+jxc262NDcbryh3VGrDTXvAQBAZ5revcYnAABITxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJBeG0fxWNQrG6NQWBPl6khz3zT1SpQK3dFTrjaOnsnpqJRWRKFnZ1RnPOBqPId1TnkXz3FNXuuveo6GlvhMvJ9TrsY6W+QzaZd1tsS50y7rbHDuTGmXdbbEudMu62y4Gn+jxc262NDcbryh3VGrDTXvAQBAZ5revcYnAABITxQDAJCeKAYAID1RDABAeqIYAID0RDEAAOmJYgAA0hPFAACkJ4oBAEhPFAMAkJ4oBgAgPVEMAEB6ohgAgPREMQAA6YliAADSE8UAAKQnigEASE8UAwCQnigGACA9UQwAQHqiGACA9EQxAADpiWIAANITxQAApCeKAQBITxQDAJDerIsNze0oFLqbWwAA0NlqtaHm1rQoBgCAjIxPAACQnigGACC5iP8FypuUVUaaQGkAAAAASUVORK5CYII="></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the full structural formula of (Z)-but-2-ene.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Write the equation for the reaction between but-2-ene and hydrogen bromide.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> differences in the <sup>1</sup>H NMR of but-2-ene and the organic product from (d)(ii).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict, giving a reason, the major product of reaction between but-1-ene and steam.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the mechanism of the reaction between 1-bromopropane, CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>Br, and aqueous sodium hydroxide, NaOH (aq), using curly arrows to represent the movement of electron pairs.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the splitting pattern in the <sup>1</sup>H NMR spectrum for 1-bromopropane.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the enthalpy change of the reaction, Δ<em>H</em>, using section 11 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw and label an enthalpy level diagram for this reaction.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">f(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Any <strong>two</strong> of:</p>
<p>C<sub>60</sub> fullerene: bonded to 3 C <em><strong>AND</strong> </em>diamond: bonded to 4 C ✔</p>
<p>C<sub>60</sub> fullerene: delocalized/resonance <em><strong>AND</strong> </em>diamond: not delocalized / no resonance ✔</p>
<p>C<sub>60</sub> fullerene: <em>sp<sup>2</sup> <strong>AND</strong> </em>diamond: <em>sp<sup>3 </sup></em>✔</p>
<p>C<sub>60</sub> fullerene: bond angles between 109–120° <em><strong>AND</strong> </em>diamond: 109° ✔</p>
<p> </p>
<p><em>Accept "bonds in fullerene are shorter/stronger/have higher bond order <strong>OR</strong> bonds in diamond longer/weaker/have lower bond order".</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>diamond giant/network covalent <em><strong>AND</strong></em> sublimes at higher temperature ✔</p>
<p>C<sub>60</sub> molecular/London/dispersion/intermolecular «forces» ✔</p>
<p> </p>
<p><em>Accept “diamond has strong covalent bonds <strong>AND</strong> require more energy to break «than intermolecular forces»” for M1.</em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>same general formula / C<sub>n</sub>H<sub>2n+2</sub> ✔</p>
<p>differ by CH<sub>2</sub>/common structural unit ✔</p>
<p> </p>
<p><em>Accept "similar chemical properties".</em></p>
<p><em>Accept “gradation/gradual change in physical properties”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>ALTERNATIVE 1:</strong></p>
<p><em>Test:</em></p>
<p>add bromine «water»/Br<sub>2</sub> (aq) ✔</p>
<p><em>Result:</em></p>
<p>«orange/brown/yellow» to colourless/decolourised ✔</p>
<p><em><br>Do not accept “clear” for M2.</em></p>
<p><strong><br>ALTERNATIVE 2:</strong></p>
<p><em>Test:</em></p>
<p>add «acidified» KMnO<sub>4</sub> ✔</p>
<p><em>Result:</em></p>
<p>«purple» to colourless/decolourised/brown ✔</p>
<p><em><br>Accept “colour change” for M2.</em></p>
<p><strong><br>ALTERNATIVE 3:</strong></p>
<p><em>Test:</em></p>
<p>add iodine /<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>I</mtext><mn>2</mn></msub></math> ✔</p>
<p><em>Result:</em></p>
<p>«brown» to colourless/decolourised ✔<br><br></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<p><em>Accept</em></p>
<p><img src="data:image/png;base64,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"></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>CH=CHCH<sub>3</sub> + HBr (g) → CH<sub>3</sub>CH<sub>2</sub>CHBrCH<sub>3</sub></p>
<p>Correct reactants ✔</p>
<p>Correct products ✔</p>
<p> </p>
<p><em>Accept molecular formulas for both reactants and product</em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«electrophilic» addition/EA ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> accept nucleophilic or free radical addition.</em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong> Any two of:</em></p>
<p>but-2-ene: 2 signals <em><strong>AND</strong> </em>product: 4 signals ✔</p>
<p>but-2-ene: «area ratio» 3:1/6:2 <em><strong>AND</strong> </em>product: «area ratio» 3:3:2:1 ✔</p>
<p>product: «has signal at» 3.5-4.4 ppm «and but-2-ene: does not» ✔</p>
<p>but-2-ene: «has signal at» 4.5-6.0 ppm «and product: does not» ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>but-2-ene: doublet <em><strong>AND</strong> </em>quartet/multiplet/4 ✔</p>
<p>product: doublet <em><strong>AND</strong> </em>triplet <em><strong>AND</strong> </em>quintet/5/multiplet <em><strong>AND</strong> </em>sextet/6/multiplet ✔</p>
<p> </p>
<p><em>Accept “product «has signal at» 1.3–1.4 ppm «and but-2-ene: does not»”.</em></p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>CH<sub>2</sub>CH(OH)CH<sub>3</sub> ✔</p>
<p>«secondary» carbocation/CH<sub>3</sub>CH<sub>2</sub>CH<sup>+</sup>CH<sub>3</sub> more stable ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> accept “Markovnikov’s rule” without reference to carbocation stability.</em></p>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>curly arrow going from lone pair/negative charge on O in HO<sup>–</sup> to C ✔</p>
<p>curly arrow showing Br breaking ✔</p>
<p>representation of transition state showing negative charge, square brackets and partial bonds ✔</p>
<p>formation of organic product CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH <em><strong>AND</strong> </em>Br– ✔</p>
<p> </p>
<p><em>Do not allow curly arrow originating on H in HO<sup>–</sup>.</em></p>
<p><em>Accept curly arrow either going from bond between C and Br to Br in 1-bromopropane or in the transition</em><br><em>state.</em></p>
<p><em>Do <strong>not</strong> penalize if HO and Br are not at 180° to each other. </em></p>
<p><em>Award <strong>[3 max]</strong> for S<sub>N</sub>1 mechanism.</em></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>triplet/3 <em><strong>AND</strong> </em>multiplet/6 <em><strong>AND</strong> </em>triplet/3 ✔</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bond breaking: C–H + Cl–Cl / 414 «kJ mol<sup>–1</sup>» + 242 «kJ mol<sup>–1</sup>»/656 «kJ»<br><em><strong>OR</strong></em><br>bond breaking: 4C–H + Cl–Cl / 4 × 414 «kJ mol<sup>–1</sup>» + 242 «kJ mol<sup>–1</sup>» / 1898 «kJ» ✔</p>
<p> </p>
<p>bond forming: «C–Cl + H–Cl / 324 kJ mol<sup>–1</sup> + 431 kJ mol<sup>–1</sup>» / 755 «kJ»<br><em><strong>OR</strong></em><br>bond forming: «3C–H + C–Cl + H–Cl / 3 × 414 «kJ mol<sup>–1</sup>» + 324 «kJ mol<sup>–1</sup>» + 431 kJ mol<sup>–1</sup>» / 1997 «kJ» ✔</p>
<p> </p>
<p>«ΔH = bond breaking – bond forming = 656 kJ – 755 kJ» = –99 «kJ» ✔</p>
<p> </p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[2 max]</strong> for 99 «kJ».</em></p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>reactants at higher enthalpy than products ✔</p>
<p><br>ΔH/-99 «kJ» labelled on arrow from reactants to products<br><em><strong>OR</strong></em><br>activation energy/<em>E</em><sub>a</sub> labelled on arrow from reactant to top of energy profile ✔</p>
<p> </p>
<p><em>Accept a double headed arrow between reactants and products labelled as ΔH for M2.</em></p>
<div class="question_part_label">f(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>A challenging question, requiring accurate knowledge of the bonding in these allotropes (some referred to graphite, clearly the most familiar allotrope). The most frequent (correct) answer was the difference in number of bonded C atoms and hybridisation in second place. However, only 30% got a mark.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Again, this was a struggle between intermolecular forces and covalent bonds and this proved to be even harder than (a)(i) with only 25% of candidates getting full marks. The distinction between giant covalent/covalent network in diamond and molecular in C60 and hence resultant sublimation points, was rarely explained. There were many general and vague answers given, as well as commonly (incorrectly) stating that intermolecular forces are present in diamond. As another example of insufficient attention to the question itself, many candidates failed to say which would sublime at a higher temperature and so missed even one mark.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This easy question was quite well answered; same/similar physical properties and empirical formula were common errors.</p>
<p>Candidates misinterpreted the question and mentioned CH3<sup>+</sup>, i.e., the lost fragment; the other very common error was -COOH which shows a complete lack of understanding of MS considering the question is about butane so O should never appear.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well answered by most, but some basic chemistry was missing when reporting results, perhaps as a result of little practical work due to COVID. A significant number suggested IR spectrometry, very likely because the question followed one on H NMR spectroscopy, thus revealing a failure to read the question properly (which asks for a test). Some teachers felt that adding "chemical" would have avoided some confusion.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most were able to draw this isomer correctly, though a noticeable number of students included the Z as an atom in the structural formula, showing they were completely unfamiliar with E/Z notation.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well done in general and most candidates wrote correct reagents, eventually losing a mark when considering H<sub>2</sub> to be a product alongside 2-bromobutane.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very well answered, some mentioned halogenation which is a different reaction.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A considerable number of students (40%) got at least 1 mark here, but marks were low (average mark 0.9/2). Common errors were predicting 3 peaks, rather than 4 for 2 -bromobutane and vague / unspecific answers, such as ‘different shifts’ or ‘different intensities’. It is surprising that more did not use H NMR data from the booklet; they were not directed to the section as is generally done in this type of question to allow for more general answers regarding all information that can be obtained from an H NMR spectrum.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Product was correctly predicted by many, but most used Markovnikov's Rule to justify this, failing to mention the stability of the secondary carbocation, i.e., the chemistry behind the rule.</p>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>As usual, good to excellent candidates (47.5%) were able to get 3/4 marks for this mechanism, while most lost marks for carelessness in drawing arrows and bond connectivity, issues with the lone pair or negative charge on the nucleophile, no negative charge on transition state, or incorrect haloalkane. The average mark was thus 1.9/4.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another of the very poorly answered questions where most candidates (90%) failed to predict 3 peaks and when they did, considered there would be a quartet instead of multiplet/sextet; other candidates seemed to have no idea at all. This is strange because the compound is relatively simple and while some teachers considered that predicting a sextet may be beyond the current curriculum or just too difficult, they could refer to a multiplet; a quartet is clearly incorrect.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only the very weak candidates were unable to calculate the enthalpy change correctly, eventually missing 1 mark for inverted calculations.</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates drew correct energy profiles, consistent with the sign of the energy change calculated in the previous question. And again, only very weak candidate failed to get at least 1 mark for correct profiles.</p>
<div class="question_part_label">f(ii).</div>
</div>
<br><hr><br><div class="specification">
<p>Hydrogen peroxide can react with methane and oxygen to form methanol. This reaction can occur below 50°C if a gold nanoparticle catalyst is used.</p>
</div>
<div class="specification">
<p>Now consider the second stage of the reaction.</p>
<p style="text-align: center;">CO (g) + 2H<sub>2</sub> (g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CH<sub>3</sub>OH (l) Δ<em>H</em><sup>⦵</sup> = –129 kJ</p>
</div>
<div class="specification">
<p>Hydrogen peroxide can react with methane and oxygen to form methanol. This reaction can occur below 50°C if a gold nanoparticle catalyst is used.</p>
</div>
<div class="specification">
<p>Methanol is usually manufactured from methane in a two-stage process.</p>
<p style="text-align: center;">CH<sub>4 </sub>(g) + H<sub>2</sub>O (g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CO (g) + 3H<sub>2 </sub>(g)<br>CO (g) + 2H<sub>2 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CH<sub>3</sub>OH (l)</p>
</div>
<div class="specification">
<p>Consider the first stage of the reaction.</p>
<p style="text-align: center;">CH<sub>4 </sub>(g) + H<sub>2</sub>O (g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CO (g) + 3H<sub>2 </sub>(g)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The diagram shows the Maxwell-Boltzmann curve for the uncatalyzed reaction.</p>
<p>Draw a distribution curve at a lower temperature (T<sub>2</sub>) <strong>and</strong> show on the diagram how the addition of a catalyst enables the reaction to take place more rapidly than at T<sub>1</sub>.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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" width="486" height="385"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The hydrogen peroxide could cause further oxidation of the methanol. Suggest a possible oxidation product.</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>Determine the overall equation for the production of methanol.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>8.00 g of methane is completely converted to methanol. Calculate, to three significant figures, the final volume of hydrogen at STP, in dm<sup>3</sup>. Use sections 2 and 6 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the enthalpy change, Δ<em>H</em>, in kJ. Use section 11 of the data booklet.</p>
<p>Bond enthalpy of CO = 1077 kJ mol<sup>−1</sup>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>one</strong> reason why you would expect the value of Δ<em>H</em> calculated from the <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msubsup><mi>H</mi><mi>f</mi><mi mathvariant="normal">⦵</mi></msubsup></math> values, given in section 12 of data booklet, to differ from your answer to (d)(i).</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the expression for <em>K</em><sub>c</sub> for this stage of the reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State and explain the effect of increasing temperature on the value of <em>K<sub>c</sub></em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The equilibrium constant, <em>K</em><sub>c</sub>, has a value of 1.01 at 298 K.</p>
<p>Calculate Δ<em>G</em><sup>⦵</sup>, in kJ mol<sup>–1</sup>, for this reaction. Use sections 1 and 2 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate a value for the entropy change, Δ<em>S</em><sup>⦵</sup>, in J K<sup>–1</sup> mol<sup>–1</sup> at 298 K. Use your answers to (e)(i) and section 1 of the data booklet.</p>
<p>If you did not get answers to (e)(i) use –1 kJ, but this is not the correct answer.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Justify the sign of Δ<em>S</em> with reference to the equation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict, giving a reason, how a change in temperature from 298 K to 273 K would affect the spontaneity of the reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmcAAAHpCAYAAADH4JskAAAgAElEQVR4Aey9D2hUd77/LRcpUkREithS9163TyhykSKLLO7i00d7K4vPEkqQUMLi7WP7q3evzz5SQpESFim2v3bv5pawDDLIEAaZhtEn0YzZecIggwQZJOvPWLN2VgYJEkIIg1hJRSsin4f3d/KJ3xzPTObvmTNn3geG7/d8/5/XOXPmPZ/vvzXCgwRIgARIgARIgARIwDcE1vimJWwICZAACZAACZAACZCAUJzxISABEiABEiABEiABHxGgOPPRzWBTSIAESIAESIAESIDijM8ACZAACZAACZAACfiIAMWZj24Gm0ICJEACJEACJEACFGd8BkiABEiABEiABEjARwQoznx0M9gUEiABEiABEiABEqA44zNAAiRAAiRAAiRAAj4iQHHmo5vBppAACZAACZAACZAAxRmfARIgARIgARIgARLwEQGKMx/dDDaFBEiABEiABEiABCjO+AyQAAmQAAmQAAmQgI8IUJz56GawKSRAAiRAAiRAAiRAccZngARIgARIgARIgAR8RCAQ4uzp06eSyWQELg8SIAESIAESIAESaGUCgRBn9+/fl0gkIo8fP27le8G2kwAJkAAJkAAJkIAERpyNjIxQnPGBJgESIAESIAESaHkCgRFnsViM4qzlH0deAAmQAAmQAAmQQGDEGbs1+TCTAAmQAAmQAAkEgUBgxBktZ0F4HHkNJEACJEACJEACgRBni4uLnBDAZ5kESIAESIAESCAQBAIhzjhbMxDPIi+CBEiABEiABEhAJDizNdmtyeeZBEiABEiABEggCARoOQvCXeQ1kAAJkAAJkAAJBIZAYMQZLWeBeSZ5ISRAAiRAAiTQ1gQCIc44IaCtn2FePAmQAAmQAAkEikAgxBknBATqmeTFkAAJkAAJkEBbEwiMOGO3Zls/x7x4EiABEiABEggMgcCIM+4QEJhnkhdCAiRAAiRAAm1NIBDijGPO2voZ5sWTAAmQAAmQQKAIBEKcccxZoJ5JXgwJkAAJkAAJtDWBwIizkZERefz4cVvfTF48CZAACZAACZBA6xMIjDjjmLPWfxh5BSRAAiRAAiRAAgHZvgkWM4ozPs4kQAIkQAIkQAJBIEDLWRDuIq+BBEiABEiABEggMAQCI864zllgnkleCAmQAAmQAAm0NYHAiDN2a7b1c8yLJwESIAESIIHAEAiEOOM6Z4F5HnkhJEACJEACJND2BAIhzrDOGbs12/5ZJgASIAESIAESCASBwIgzdmsG4nnkRZAACZAACZBA2xMIhDhjt2bbP8cEQAIkQAIkQAKBIRAIccbtmwLzPPJCSIAESIAESKDtCQRGnHHMWds/ywRAAiRAAiRAAoEgEBhxxjFngXgeeREkQAIkQAIk0PYEAiHOuH1T2z/HBEACJEACJEACgSEQCHHGMWeBeR55ISRAAiRAAiTQ9gQCI85GRkYEFjQeJEACJEACJEACJNDKBAIjzjjmrJUfQ7adBEiABEiABEhACQRCnHGdM72ddEmABEiABEiABFqdQCDEGcectfpjyPaTAAmQAAmQAAkogcCIM65zpreULgmQAAmQAAmQQCsTCIw445izVn4M2XYSIAESIAESIAElEAhxxjFnejvpkgAJkAAJkAAJtDqBQIgzjDljt2arP4psPwmQAAmQAAmQAAgERpyxW5MPNAmQAAmQAAmQQBAIBEKcsVszCI8ir4EESIAESIAESAAEAiHOuJQGH2YSIAESIAESIIGgEAiMOOOYs6A8krwOEiABEiABEmhvAoERZxxz1t4PMq+eBEiABEiABIJCIBDiDBueU5wF5ZHkdZAACZAACZBAexMIhDjjmLP2foh59SRAAiRAAiQQJAKBEWcjIyMCCxoPEiABEiABEiABEmhlAoERZ+zWbOXHkG0nARIgARIgARJQAoEQZ1znTG8nXRIgARIgARIggVYnEAhxxjFnrf4Ysv0kQAIkQAIkQAJKIDDijOuc6S2lSwIkQAIkQAIk0MoEAiPOOOaslR9Dtp0ESIAESIAESEAJBEKcccyZ3k66JEACJEACJEACrU4gEOIMY87YrdnqjyLbTwIkQAIkQAIkAAKBEWfs1uQDTQIkQAIkQAIkEAQCgRBn7NYMwqPIayABEiABEiABEgCBQIgzLqXBh5kESIAESIAESCAoBAIjzrh9U1AeSV4HCZAACZAACbQ3gcCIM445a+8HmVdPAiRAAiRAAkEhEAhxhg3PKc6C8kjyOkiABEiABEigvQkEQpxxzFl7P8S8ehIgARIgARIIEoHAiDOucxakx5LXQgIkQAIkQALtSyAw4ozdmu37EPPKSYAESIAESCBIBAIhzrjOWZAeSV4LCZAACZAACbQ3gUCIM445a++HmFdPAiRAAiRAAkEiEBhxxjFnQXoseS0kQAIkQAIk0L4EAiHO2K3Zvg8wr5wESIAESIAEgkYgEOKM3ZpBeyx5PSRAAiRAAiTQvgQCI87Yrdm+DzGvnARIgARIgASCRCAw4oxLaQTpseS1kAAJkAAJkED7EgiEOOOYs/Z9gHnlJEACJEACJBA0AoEQZxxzFrTHktdDAiRAAiRAAu1LIDDibGRkRLABOg8SIAESIAESIAESaGUCgRFnHHPWyo8h204CJEACJEACJKAEAiHOYDGjONNbSpcESIAESIAESKCVCQRCnHHMWSs/gmw7CZAACZAACZCATSAw4ozrnNm3lX4SIAESIAESIIFWJRAYccZuzVZ9BNluEiABEiABEiABm0AgxBnXObNvKf0kQAIkQAIkQAKtTCAQ4oxjzlr5EWTbSYAESIAESIAEbAKBEWccc2bfVvpJgARIgARIgARalUAgxBm7NVv18WO7SYAESIAESIAEnAQCIc7Yrem8rTwnARIgARIgARJoVQKBEWfs1mzVR5DtJgESIAESIAESsAkERpxxKQ37ttJPAiRAAiRAAiTQqgQCIc445qxVHz+2mwRIgARIgARIwEkgEOKMY86ct5XnJEACJEACJEACrUogMOJsZGREsAE6DxIgARIgARIgARJoZQKBEWccc9bKjyHbTgIkQAIkQAIkoAQCIc5gMaM401tKlwRIgARIgARIoJUJBEKcccxZKz+CbDsJkAAJkAAJkIBNIDDijOuc2beVfhIgARIgARIggVYlEBhxxm5Nfz2CsGZikkYynZREImH8iWTC+N3CZmZm/HUBbA0JkAAJkAAJNIlAReLsdu624EfXbwfXOfPbHRHJZCZkzZo1ZX8grnmQAAmQAAmQAAmIVCTOzo+eNwPvY7Ezkk6n5cbNG/Lo0aOmc4RgZLdm02/Digbcu79oBBpEmn6++vJLI9Z6unqWwzRufn5+RX6ekAAJkAAJkEC7EqhInM3OzpruKVg58AmFwsZFN9UPP/zQNIacENA09BVVnEimjDj78GhvRfmYmARIgARIgATaiUBF4kzB5PN5yWazxnoWiQwagQY3mUxKJpORhfyCJvXEpTjzBHPNlZwfvWjE2bFjx2suiwWQAAmQAAmQQFAJVCXObBiPH983g77RrWhb0zAY3KuuKogz7hBg3xV/+oeHh4046+vt82cD2SoSIAESIAES8AGBmsUZrgGLwN64fkNiI1EJh08XPpGQwJoWH47L3TuNnYlHy5kPnqQymkDLWRmQmIQESIAESKDtCVQlzh49eiizM7Ny7fo1gTVEx55BiKFbc25+TvLzeZm+OS3xeExC4VMN7erkbM3WeI4pzlrjPrGVJEACJEACzSVQsTibmpqSSCS6ogvz28i3Roy5XQomCqC7E/kaddBy1iiy9S2XEwLqy5OlkQAJkAAJBJNAReLs4tJSGpHIaRkdjsu1a9cEkwNKHejyxHi0W7dulUpWUxzEGZfSqAmhJ5nVcnbi6Mee1MdKSIAESIAESKAVCVQkzjAbEx8IrnIPpG30xABazsq9G81NpxMCuJRGc+8DaycBEiABEvA3gYrEWSWizMvLpuXMS9rV16WWM87WrJ4hc5IACZAACQSfQEXiLJ+/b6xgC/MLxoVFTP1OF4LpyZMnnhCk5cwTzDVXouLsWO9/1lwWCyABEiABEiCBoBKoSJyhS1N3ByjXzU5l5enTpw3lh7XW0B6/WvYaevEtVHi5EwIgticyE03ddaKFsLKpJEACJEACASNQkTi7PHHZDLzH0hgQQ/HhIbk4etGsZTYYLWzpFA6fEuzBOTo8KtFoYVbn1cmrDcVWsJxFKc4aSrn2wodHz5XcIQA7Sxw6fFh27NghnQd+K1u2bZPPP/+jPH32rPbKWQIJkAAJkAAJtAiBisQZRFB/f0ji0Zjr5WGPTYi23EzOxMOShXOsg9ZIqxbaxR0CXG+JrwKxyfm+PfskFOl3bRdm3K5Zs8ZsDYYEWH5l65atgvvLgwRIgARIgATahUDZ4uzZs2cynhqXs7Gzkr/nvnwGui8vX74sqVRqmd/9+3k5EzsjuTsFwbYcUUdPwXLGbs06Im1KUTO3Z4yYx7Omx+s/e43iTGHQJQESIAESaAsCZYszCK+hoSGz2XkpMnOzcxKNnlmR5PzwqHz33Xcrwup5AnHGdc7qSbT5ZWGySWdXp/yfv+1s+JjF5l8tW0ACJEACJEACzwmULc6QBQII3Yeljmw2a9LZabCtE3cIsInQvxqB7p4e08WZm86ulpTxJEACJEACJBAoAmWLM3Q1XfzrRYlFYpLLuXdRLi7el7HhhOn+VErzs/MyOBiVmZnGbX7OvTWVduu7GJv4ybFP5N/27lseu9j6V8UrIAESIAESIIHyCZQtzlAkrGJmgH8kIhj8ryv/Y/9MbHiucTohQMMQ3ugJAY2uo3ykTFktATwjBw4ckI6ODnn8dLHaYpiPBEiABEiABFqaQEXiDFc6PTUp54fPmxmY4fBpObW0rAb86Pa8eiUjOqD73PCwEWxXr2UaColjzhqK17PCx8YSpivzt+91yskvT8qJkyeNC8soDxIgARIgARJoFwIVibPFxcfLg7Nh5biduy2Tk9ckez0rc/NzK5hhAgFEU6MXoEWlnK25An3LnlxKp+XEiRMvfCjOWvaWsuEkQAIkQAJVEKhInGGHAEwIgBjy00Fx5qe7wbaQAAmQAAmQAAnUQqBscVZYSiO2tGSFv7qZIM64lEYtjwHzkgAJkAAJkAAJ+IVA2eIM3ZhYEsOPA+9pOfPL48R2kAAJkAAJkAAJ1EqgbHGGir7//ntjobqcviyzMzm5l79nujghjuzPw3sPPZ1t9+ABNj7n3pq1PgzMTwIkQAIkQAIk0HwCFYkzbHKOfTLDkcIm57CiuX1iQyt3CGj0ZVKcNZowyycBEiABEiABEvCKQEXiDOuWYX2zZCIhmBxgPqlkIQwuwpbOvboA1IPFb/3Y3eolA9ZFAiRAAiRAAiQQDAIViTO/XjK6VKMxdmv69f6wXSRAAiRAAiRAAuUTCIw4i0S+beguBOUjZUoSIAESIAESIAESqJ5AVeJsfiEvf5vOSHr8kmAcGo6F/ILZwml+Yb761lSZk2POqgTHbCRAAiRAAiRAAr4jUJE4e/TokaTTaRmMDJrZkVhaIxw+ZS5q5s6MRCNR82nkJuduBCHOsCF7I/fvdKuXYSRAAiRAAiRAAiRQbwIVibOpqSkJRfollUwZIYSB+Ji9qQc2QMdisCMjCQ3yxH0+IcBfOxd4cvGshARIgARIgARIIFAEKhJn2Mgc4uvBgwcGAgbiY8Nz+8jdzslgNOLJnppaLycEKInmu9j0Hvcjn89LbiYnmcyEYM/M4eHhFz6JZMrEI93MfM7ko/Wz+feQLSABEiABEmgugbLF2ZMnT2RoaMh0a2qTC+Ks0K2pYfhxhmCbn/du7BnawUVo9Q5460JMoav72LFj0tnZKf+64y3p6OiQ9Rs3ypo1a8xn3csvy7ZtW+WfXy98tm4puBoPd9369bJ58xaT99d79sjRj47K1wNfSTZ7y9sLYm0kQAIkQAIk0GQCZYsz7K0Zj8bMmmba5oIoiuipcfFjPRAaEHRxenWgHdiQnVYXb4iDN9a7O3r0yLIAg8Da+Oqrsm/PPunp6ZFIJCzTU9OrNgjP1c3rN839O3bsuBw4cED+pWPbinL3Heg069h5PZZx1cYzAQmQAAmQAAk0gEDZ4gx1nx89b7o1Fx8UNj7Hj7SzW/PGtety5oy3OwSoSKQ4a8ATslTk4ycPTTfl5yc+lze3dxhL18YNG6Sru0v+609fybXMpLGWPnz4sKZGPH66KIsLi3Lj5nXzrP3h2B9ky5bXZO3aNfLali3GOnc6fHq5a72mypiZBEiABEiABHxIoCJxhh0CsBI/urFwQBSFQgPLlwXLBsakafxyRIM9i4tPuUNAAxmji7qnq2fZmrVn717DG/ffiwPWNVjqOrsOLLdhx44dS/fcmzZ4cZ2sgwRIgARIgARAoCJxhqU0sEUTBBpE2HhyXE5HwjKRmpRzw3ETjskAc3NzntItrHMWYbdmHanDCnnj5t/lyJEjsnnLFnnllU3Sc6hHkheTUqt1rNpmQqRh8sBf/vIXefPN7Uao7XzrLfm6v99Y7TDekQcJkAAJkAAJtDqBisSZXuzs7KxZcHZ4OGFEGoRaMjkuf5v6m7GmaTqvXIqz+pGGwDl1Kiw7d+02XYl7du+RaDQq9xfv1a+SOpSEPwrXr1+Xzz77TDa+8ops2rRJPu391NOJKHW4DBZBAiRAAiRAAi8QqEqcvVBKkwPQvfbtCLdvqvU2YBLH8d5eY5HC4P5wOFRrkZ7kh5Wvs7Nrud2JxLAn9bISEiABEiABEmgEgcCIMy6lUdvjAeuYsZa99JKcPPG56T6srURvc8OSFomcFizTsWH9Bunu7pZb2dveNoK1kQAJkAAJkEAdCFQszmBdwU4ByeSIJFPJwie95Cafn9ehbWUX8XyHgMdl52HCAoH8fF4+7C0M9oe1DOMJW/3o7ukuWNFeecU8q61+PWw/CZAACZBAexGoSJzlcjkzxgzLZ+BH/HS48FG/utGot0tpcOPz6h7abPbv8otdu4yQeb+np+WsZcWuGlY07Eiwffub8vM3Osyaa82axFCsjQwnARIgARIggWIEyhZnGCh+/vx5s3TGzZs3BBYXiCJ8MOZLXVixHt2vba2rYo0tFo66sek61zkrRmhl+L2FvBzv6zOD6LsOHpRsNrsyQUDOFhcX5fcf/d6Iz91v75F0Ku3ptmIBwcjLIAESIAES8JhA2eIMwgezMv24Er9Zby0Zojgr4+FBtzTGY2FFf8zEbAdBi8ki2B4K15xMJMugxCQkQAIkQAIk0DwCZYszrDE1FB8y4qx5zXWvGeIsFom1hdBwJ1Be6ORkxgz6X7/+ZWM583o9uvJa2ZhU48mk2bcTS24kxyjQGkOZpZIACZAACdSDQNniDJXpArR+s7ZAnGG8m9/aVY8bVK8y8vm8WQ8M1qMvTnxRr2JbqhxYDTEjFVa09FSSXZwtdffYWBIgARJoHwIViTNYWtC1eSWT8ZUQwpgzWs6KP7QQr3v2vC1bXt8sI4mktPNK+nfu5ORfd+yQjevXSyjUGuu4Fb+zjCEBEiABEggigYrEGfbMhDjT2ZpnzsQkfi4u0diSGy248eFznrKCOKPlzB051v6CpWj7v74pd+/OuCdqs9CF+QU5fPSIrHv5Zenp6RbseMGDBEiABEiABPxCoCJxFl/aPxNCqNQHAs7Lo9CtyR0CbOYYI4jJG+jGxAdbHfFYSeDwv39o2Ozfv29lBM9IgARIgARIoIkEKhJnWCsKQkiXzYCLD5bPsMNw7uWBuqMxLqVhMz8TixmL2S9++QvB+nQ8XiSgS4pgR4FvBr55MQFDSIAESIAESKAJBCoSZ01oX1lVckLASkzz8/PLFrOgrmG28oprOzt0+LDh5cdlYmq7MuYmARIgARJoRQJVibNnD59JLpeVycykXLl0xVz3gwcPZHp6WrA6u9cHLGfcW7NAHTNW9767V97c/qZkMpNe34qWrO/e/Xuy59e7jUALR8IteQ1sNAmQAAmQQHAIVCTOMI4J+2oOxs5IKBSWwaFBObX0Y3b79m0zDi0WG5K5hXlPCT2895ATAkRkcnLSLJfxs9d/JrOzdz29B61eGZYa6e7qkfXr10s8PtTql8P2kwAJkAAJtDCBisRZbjq7JMBigjWjsIUTRJoeEG6YKIBZnV4eGOMW4g4BZg0vDP73ekKGl/e60XV1dnbK1i1bzfPd6LpYPgmQAAmQAAm4EahInF3860Wzh+X8kmUMY73C4VMryr12/ZpEB73d+Ny0Ix6WJw+erGhLu5xgKYg9e/cIBraHBkJcXLWGG5+7nRNYHjs6OowlsoaimJUESIAESIAEqiJQtjhDlyaW0sCgaT10IL6ew8WYp1BowFPLAyxnkUj7LqXR23vcjJfC2l08aicAyyMskNh7FBZiHiRAAiRAAiTgJYGKxBl+tCYyE8vtK1jOTi+fqweL1GLGoFdHQSS251IamcyEWUz1wIEDgnFTPGongCVjBv4clnUvvyTdnd0yd2+u9kJZAgmQAAmQAAmUSaAicXZueFhG4iPLMzIL4mxlt+ad7B0ZjEQ87VrDbM123L4pm8vKv/zs5/LBB4c95V3ms9XyyU5HTxsL2nu/fY98W/5u8gJIgARIoHUIlC3OcEkY6I8B/5gYgAPizJ4QgDB0fWKDdC+PguWsvTY+17XMsDWT14v+enlvm1kXuvL7evuMQMNzz4MESIAESIAEvCBQkTjL38ubmYDRaNQINSzdcCp8yoi1q1czEo/GCuLN4xXp222ds6fPfpJjHx0zouHPf/qTF89JW9fxu57fmXXjsI4fDxIgARIgARJoNIGKxJk2BhudhyL9xmrm3GPT62U00KbChID2sZzlZnJGmG3bvt1MwND7QrcxBNRKiUkCsNLyIAESIAESIIFGEqhKnP300yOBQMC6ZhMTE5LJZOS76WkzCQBWHa8P/GC2y96amA3b+d578tZbb1GYefig/fc3A0YQf3j4MLl7yJ1VkQAJkEA7EqhKnPkNVGHMWfBnay4uLkp3T4+ZnXn9+nW/3YZAtwfjzwYG+g377u5uwZZPPEiABEiABEigEQQCI86+HQn+OmdffXXSWG+O9fY24llgmWUQAHt0b/Z/1V9GaiYhARIgARIggcoJBEacRSPBtpzNzOfk5290mK2FsIo9j+YQmJm5Izt27JAtr70u2JmBBwmQAAmQAAnUm0BwxFksuOIseytrRNkbb2wTiDQezSWALs63/+3f5Ne7d3OCQHNvBWsnARIggUASCIw4w6xRDJYP4qFdadg3k4c/CExMpAsTBI6yi9kfd4StIAESIIHgECgqzjD4HIvJZrOFBWdxyQiDAILlwE+Hma0Z0G7NhYUF2bRpk+zavVvu3V/0E/a2b0v3wYNGoIUjL25h1vZwCIAESIAESKBqAkXFGdZ26u//wiyToaVDrGHjcz+Ks6BOCDhy5Ijp0gyqVVCfrVZ0c7mcbHz1Veno6OAG6a14A9lmEiABEvApgZLiDF2Fw8Pn5Wn+qTx++sj4Ic5+/PFHY0GDYCj28fJ6g2o5w4r0W7ZslpNffuklTtZVAYFkLCYbN26Q/fv3CXbQ4EECJEACJEACtRIoKs5QMPbJPB0Jmy2ZBqODxg1HQhKJDC5t4zQoURMeNW4sFjPu0FC81nZVlD+Ii9BiVuDWLVvlzTfflIeLDyviwcTeEhiKx0335sGD3b6zKntLgrWRAAmQAAnUg0BJcQarGLZjCiVDcjZ2VsKhiBFo8MOqFoudNSIN1jQIs0jk2+XzejSu3DIKi9AGa0LA8iSA0EC5GJiuSQTQzf/h0cL6Z1wcuEk3gdWSAAmQQIAIlBRnuM5nz54Za8CTJ0/k4uh5M+YM3Zo4EIYfJog4uPbHS0ZB69aczk7La6+/biYBsKvMyyep+rrwHdjz692y/539XF6jeozMSQIkQAIkICKrijOb0uT1SclOPZ+9acc10w9xFpQJAfiR/9XOX5luspmZmWZiZd0VEkinCstrYCINDxIgARIgARKolkBF4kwrgYUMguju7F2zATo2Qc/n88aCBkub10eQLGex6BkjzD45dsxrjKyvDgSwOC22dxpPpepQGosgARIgARJoRwIVizNsWTM6OlqYHBA+LYORQQmFwhIOnzbjzS6lLpnuTS9hGnEWgB0CHj16JB1vFrZomp276yVC1lUnAvh+YGkNzLJF9zQPEiABEiABEqiUQEXiDGufYSJAKDRgxp5NT00Lut7wmchMmDjET09PVdqOmtJDnKFedAm28pFIpozVJZlOtvJltH3b0fW/bv160z2NZ5MHCZAACZAACVRCoCJxhpmbEEE3b958QQihO3Nx8b6Mnx83lrVKGlFr2iB0a6Kr+O29b0vXwYO14mB+HxD48uRXRmgfP37cTKrxQZPYBBIgARIggRYhULY4g1UqGosZi1kpCxU25oaA8/KAOGvlCQEQZliOZO3adYJB5TxanwCeyW3bt8vGV16R/DwXp239O8orIAESIAHvCJQtzrBsxtDQkFn3bLXmnQqfkpmZ+dWS1S2+1S1nD+7fkx07dkjHP79m9i+tGxgW1FQC2Jd28+bN8tlnnzW1HaycBEiABEigtQiULc7QbRkbGpJEMlFywD/GpUGclbKu1RuREWctPCHg6B/+YLrA4ucu1BsNy2sygfFUUtauXSsnTp4o+b1pcjNZPQmQAAmQgI8IlC3O0GYdc1ZqFho2R8e2T14eEGetOiHghx9+MNs07dy5nYuXevnQeFjXnt17jPjOZCY8rJVVkQAJkAAJtCqBisTZ3N05I4IGB6MyMZGW7PfZ5bXOsG0NRNlgJCI3rt/wlEcrd2se6T1ifrjTaa6L5elD42Flly9dNrM339m7jwLcQ+6sigRIgARalUBF4gwXiWUzsI8mVkGHtQprnNnucDLpefcNxFkrTgjAmCQsWNrZ2dmqzw/bXQYBTGn4U6MAACAASURBVPjo6+0z95q7B5QBjElIgARIoM0JVCzOwAtiCMIinb4sqWRKksmUXL2aMbsF/PTTI8+Rtqrl7Ojvf29+sC+cT3jOjBV6SwBjMPe9vc/cb+4e4C171kYCJEACrUagKnHmt4s04qzFJgRg4sSG9Ruku6dbsDMAj+AT0N0Dfv5GhyzkF4J/wbxCEiABEiCBqggERpy12oQAdA1jXTNMCODRPgSmpqZk7do1EhoItc9F80pJgARIgAQqIhAYcRaNRD1dvqMiyi6Jd/9yt3z8+9+7xDAo6AQ++6xPtrz2ukx5vM1Z0Lny+kiABEggKAQCI85aaUIAdgPARAAurRCUr1Fl14Eube69WRkzpiYBEiCBdiIQGHHWKpazhw8fys5du+W111/nbgDt9E1zXOunvZ8agY49OHmQAAmQAAmQgE0gOOKsRSYE/GXgL+ZH+c9/+rN9H+hvMwJYXuPQ4cOy9qWXJByJcnP0Nrv/vFwSIAESKEWgInGG7hgsCeDl1kylGq9xmK3ZKhMC9u0rrBaPNvNobwL4HmFPVXRx53LZ9obBqycBEiABElgmUJE4Oz963ixAm0qlBLPO/LIcQKusc4btr9a9/LIc7z1OS8nyI9jenuHhc0acdR086Pnize1NnldPAiRAAv4lUJE4SyfTxkIFK5XuCpDJZMxyEM20pkGc+X1CAPgcOHBANr7yCpfP8O/3oSkt+/BorxFo2AKNBwmQAAmQAAlUJM4wTgZC6M6dO5JOT8hgNCrh8Ckj1M6fPy8QatjeCem8PFrBcjZxecL8AH/8+yNeomFdLUAgP5+XXbt/KbCe8SABEiABEiCBisSZG665+TmZykzJaPK8RCIQa6flTOyMoAsveyvryfg0I858PCEAYhVWMyyf8P3fv3fDyLA6ENA/DxgbmZvJSXZ62nS/T/9tSp4++2m5BlgxU+mkxOPnJD4cl9jQkMTiQ8Z/cfT8C7No5xfmBeL6b1N/k6nJKZmenpbs7Vtyd/Zu3Z5vPBfYMeLd/QdeqH+54fSQAAmQAAm0BYGaxZlSepp/Ksl0crm7U7s+4cKa1sgD4gz1NLNrtdT1oX3ozoRA89qqWKpdQYrDvY9EwuY5sJ+9/lBYsK6c89lIJpMSj8YErv3Bzg3OtLnp7HK54Uho2R8Khc0z78YR99lZjls6O6ynp9tYV9F+HiRAAiRAAu1LoGpxhh8fiK7Ll9LG4nB66YdxeHhYpm98J9O563J5/LLgxwzdnw8ePGgYZb93ayYvJs2SCbC48KiewIP7D8ysxv81+b9emIzycPGhYKIKLLaTk5PGunU7d1tgRcPzUcthW+RgLcvNzAvKnp76TvL5/IqiF+YXzDMfiQyayTOYRIM2YQINhgOUOnK5f0hHR4e88ca2F8otlY9xJEACJEACwSJQkTjDjxT2gpy8PvncerA0OQDdQ277RELAwRKQzTZuqQD8+Pp5QsCRI0ekq7MrWE+OR1fz448/ynR22li/bKtVI5+nWi8N3wO0L/ntiETj0eXvCix7zu8IvlP2ARGH7m9az2wq9JMACZBAexEoW5xhzE7mcsZYAzCuDD8eY8mE3M7eKmmZ+PHxY4lGzxhLRqPQ+tlyBsvNpk2bZCh2plGXH9hy52fn5UwsZp41iP90+rJ5jmC9cooav0JAOx/cv2cseLOzsy80M51OGcszrH6wrOJ5+eiDj8zem/DzIAESIAESaD8CZYszoJnIXK54RibG3eRu327oIGcjznw4IeDRo0fS09Ujm7dskfy9ld1f7feoFb/ixcVFM4Afk0ucB4QYtrwK6rGwsGCsbFcmrpgJCvjTgxnQeGZgQbt+42ZQL53XRQIkQAIkUIRAReKsSBlND4Y4w49apQOwG91wWD6w+ntnZ2ejq2rZ8rXbG/cvlUy17HXUs+HXs9NyfGnts0OHe+pZNMsiARIgARJoAQIVibPLExmZSE/IE8c4Gfs6MUAaXVFeCiW/dmt+8803RpxFT5+yEbW1H918uF/Xrk7KyMhZI6pHR0fNciy0Lj5/NGB1PfzvH8q6l16SUChkunHj5+JmWIGZYDA9aSYNtEr37vMro48ESIAESGA1AiXFGQZjz96dkdmZWbOm07n4kJyNnZU7M3cK3VCzcyZc4+GmJy6btc7yee/Gy/ixWxPstnW8afZOfLbaXWijeIj3cCgi8eFh00Xuly3A/HoLeg4dMgIff3gw4xm7CKRSlyQej8vpSMS4mJ0KMceDBEiABEggGARKijPMLIvGns82w7pO6H5S1+nHOT5YK8rLA+Ls28i3nlrrVrs+cECXJtbY4vGcACyqeK68tKw+r731fFhMF8/R1i1bVzQe/NBtjokSeNbIcwUenpAACZBASxMoKc5wZdev3TDrNI0nxyU6WBBf8KNrBa6uLQU/FvNE+N07jV101kncb5YzDGDft2+//Oxf/kWwNU87Huhuy+VyxjqG+8OjegLJRNLM+P3vb755oZBnz569MHMVa75hSY7bt2+bLmR2fb6AjQEkQAIk4GsCq4ozu/UQX7AE+e1ljx9/P1kP0PUEawfWN2vXAyId9wQfWH941Ebg8KEes8tEOaXAohaK9C/zx73gQQIkQAIk0DoEKhJnWOrAj2svGctZJOqbrp3jn31qxFlqvL1mH6Jr7dr1a6ZbOxqNypXLEyXXwGudr0nzW4rv3ebNm2Xnrt3itl6as4X4TuBPAv5Q4V5gv9tMJmPGiDrT8pwESIAESMBfBEqKM1g88NHxLBBnGraa6+VlGnHmk3XOMDAb3Zl79u4N9PpczvuL9chgJVMRgHvCo74EhmJxI/oPHuyuyHoNS/eNGzeMUJuYuFLfRrE0EiABEiCBuhMoKc76+0MSjUSXt5wZHR4VhGG2HQbgw8VH06nbzhMCstez5ge03SYCLC7el0w6Q0tZ3b+izwuEyOrr7TPPF9x6HJic4UdreD2ujWWQAAmQQKsSKCnOMFYFH7WcoZtEw5bdyymz9tmlS5eW4/Aj7eXhJ8vZqXBIXt/2hjx+HGzLkT4TXt5n1lUg8PbefUagjY+P14xkempaTkfCZnkOWMMfPlysuUwWQAIkQAIkUBuBkuKs2qIfP/X2BQ9x5pcJAdgN4NixY9Wia4l8WKsMlkGs7s/DewKZzIQRZzt27KhL5dhYXidvxGJnzX2l+K4LWhZCAiRAAlURaIg4q6olNWQyljMfTAjI5bKy7uWXzfIiNVyOb7OiWw2CDOPKIpGozM29uJG3bxsfsIZFB6Kyfv3LEo6crmj8WTEMWAx4KpOR4eFhCUdCgiEMiwHe07QYB4aTAAmQgB8IlBRnExNpuZwubHaeTl+WifQVSU8k5fKVCcmkJmTi8uVl/+XLlySdyciV9GW5kmm/bs2nTx9JZ2e3bPnn1xq6yXuzHhqMS8KCp4ORQbl69WpdBEGzriUI9cI6ffLLr8wMTnxP67W8DcrBn52bN2/Wrcwg8OY1kAAJkICXBEqKMwzwR3dHf/8XxsU/ag3TbpD+0MBylwjCQm26QwDG66xZs0727z/g5f3zpC4spKs7RWQns57UyUpWJ4Cux46ODtPFmc02/r6gDkz84EECJEACJNBYAiXFGV7G+GCld7i3b2UlN10IW47L3jZxem7S5W43ttWO0v0wIWDoTGGZgz//+U+O1rX+aW7mtpw/P2r2WH367KfWv6AAXQG6mLHgcdfBgw2/qqH40PJSKffutefOFw2HzApIgARIQERKirNWIeSHCQE9h3rMj+RsQFfDr1e3Was8U63Uzg+P9ppnr17LaxS79qf5pxKNxYylPBaJSTKd5NIpxWAxnARIgARqIFBSnOEH+cmTJyuKR1cKwjVOf7SRTsOceVYU0ICTZk8IwHVj9fZ3A9Kl6fX9a8Aj0XZF/mb/vxmBNhSPN/zaYR0//9eLRqTBcje/MN/wOlkBCZAACbQTgZLiDIvJ4oOFKnEksfl5LCLR6BnjIm4wOri0Xc+ZZfdc/JynDJvdrTk+npKNmzbK9ZuTnl53IyrDbEx0X3Fh0kbQbVyZs7N3zfgz/EnI3fZmL1NY0v7+/d8DOQGmcXeKJZMACZDA6gRKijMM8LfFWSqZMutbIWwkMmIGiZ+NnTX/oL+NfVvo7ojFJB6PrV5zHVNAnGHHgmatzXTi5Emz52EdL8nzomD9y05lzT3EMgo8WpPA1i1bBV3szTzwZ65Z38VmXjfrJgESIIF6ESgpzvCCtV+y+AHXMKeLrjANe/L0ab3aV1Y5zbacvfP2Xjl69GhZbfVjItw37P4AMY51rrA/KI/WJBAKh8xae7iX+L4240ilUuY5Qvfn4qK3C1I343pZJwmQAAnUm0BJcVbvyhpVHsQZfowgMrw+UOeadWsknUp7XXVd6sMPOAZ2gx9W/QdLHq1NYM/uPWb8WTKRbMqFoEsc1nU8U1gbD13lzRKKTQHASkmABEigRgJViTP8G8a6XpOTkzIxcVnS6QmzaCVeys14CRvLWZN2CDj68VHZsH6DPGzR1dTVYgZrRzPEbY3PL7O7EEhdGpd169fL7j2/bprYxncSz5aKtPHUeNPa4oKIQSRAAiTgawIViTMIL2x4HokMmn/F2DAZL199AYdCA3Ju+JznXRlGnMWinosLrP+GH8HO33b6+iaXahyENhaZ5REsAtPXp2Xbtp8JxqB9d+t60y4O7wz8kcN4VXxfeJAACZAACaxOoCJxlslkCl0V8ZjpqrCLh0BC91g0EhFszOzlgbqbMSHg7EjCdB993d/v5eWyLhIoiwC6FbFAbU/PobLSMxEJkAAJkIA/CJQtzp49eybnR88bKxk2SS52YN/FM2fOFItuSHizLGefHS8s/nklc6Uh19WIQsEKHx7BJwCraGdXp6x96SUZTzZn/Fkxymgb/uxh0gC704tRYjgJkEC7EihbnAFQNBw11rFSsPCiDYXCL1jWSuWpNQ5ioxkTAnbu2m0sE7W236v8ygmDtHm0BwHsiwvr2Y4dO5bXK/TDleuzqBNRuK6eH+4K20ACJOAXAmWLM4wdweKkE6m0wIpW7EA6jEX7cf6+PC2Rrlj+asLxoo96PCFgOjttfvTC4XA1TfY8D5bHwDIZ+DH8/vvvPa+fFTaHwMDJAfnFr3cZ69n+/fsk76M9MfFH7mrmqnkmo9GoXLt+nVa05jwmrJUESMBnBMoWZ2h3YTJARO7M3HW9DAizK1euyOiot4uYGnHm4YQACJ13390rHT/vkB9//NGVhZ8CwQfCDB/4ebQPAdzvc8Nx6e391PyZ+M27B3wngCDSbt++bTZVj0Sipquzfe4Qr5QESIAEXiRQUpxhpW/7g64HWF4wKzOTzpgtfjQ+n8ubdbLQpQmrkpcHfoC8nBCAWWdr1qyTrs4uLy+zqrrABuuXhUIhCrOqCLZ+JqzBl0gk5MCBA0agYaN0P47zwrOaTI7I7Oxs60PnFZAACZBADQSKijN0XQ5EQ3ImekYikbBxo9HCEhoQaPo5E4tKLBKT0GDIjDVDuBebL9vXjJd61EPL2YXhEfMjd/LLk3YzfOnHWnQQzDdv3vRl+9ioxhMYHx+X5NiYJJIJeXvP/2Ge3W98OsMY1nceJEACJNDuBIqKM4CBxcXtg/00EX525KyMxF5Mgx8BLw+IM4hCr6wBJ74oDLL2esmQapiCDVZo59GeBLC8TV9fn7Gc4TsbjUVk3bo1svGVV1pic3s8v2j35PVJX01oaM+niVdNAiTgFYGS4gxip5oP9tn08jCWMw8nBOz6xS6zuCf/5Xt5l1lXNQT6+/qlq/ugJMYSkkwmZSw5JuH+kGx57XXp7n7fsz801bQdebDkxuhw3Cx8DZdbQVVLkvlIgARaiUBJcVbthXi9lZERZx51axbGm/2TDCf9uxyFVxbEap8P5vOOAIYk/MfHR2VsbMyIM4w9S6YSMtD/jdkgfd++PS1hQZubm1+ekJS6mJKZ2VxTtorz7s6xJhIggXYmULE4wwQAdDFgQgBmb+KDrhO4CEOXJrZz8vKAOPNqQgCuraOjQx5nvd9kfTWmsORNTU1JPOot/9XaxfjmEkgmEuZ7CcsZxBm6CRHW3dNjxp/1HOppGaGDraAwhKE/EjHbQjWXLGsnARIggcYQqEicwWqk+2jqhAB1w+HT5qUJNxYL7g4BvZ98Im/vfUceP11szB2podSbt2+awf+p/2+8hlKYNWgEUpdSRpSZbs2liQHo3hw6E5Pd+/bL+vUvy8Rlb7dcq4Vxfi5vNlV/cP9eLcUwLwmQAAn4lkBF4gzrl0GMXb2SMf9aL6Uvm4VpscRG7vZtmZhIy2A0Inh5enl4OeZs51tvyZcnv/Ty8latSy1mWIgXFkysw8aDBEAA3434uXOmWxNWs+XuzTH4MQ4tIe+9955s2rRJkolky1jQnHcX3wG8hzgO1EmG5yRAAq1IoCJxBqsZukT0QBeDswtTuzo1jRcufoAgGhs91uqHx49NN9BkbtKLyyq7jlwua64fA6Z5kIBNANs3dXd1m/Fm2q1pu/DH43EzexPbPGGvy1Y80G68A0ZGzrZi89lmEiABElhBoGxxhn+ksTPYW/N59wdmUqEbE+JIj4W7C2albz33wjWWMw8mBHx46N9lw/qNJbev8uJ67TpwD2KxocKG9D7amsduI/3NI4Dtm7q63zdWMrWcqQsrGsaIjiUS8lnfZ7Ju/XrZtesXLTmWC98D/DHENlD4w3jt+jVa0Zr32LFmEiCBGgmULc5glcJLL5NOLlcJwYZ/qxiErgeWkAxHQp6uSQRx1ugJAagDlgXsT+inA105uC+Nthr66ZrZlvIJ9PX2mYH/mABgW8wg0PCxw7BzAJ7xX+38Vcs+T7qLCd5LEGs42NVZ/vPClCRAAv4gULY4Q3OxNyO6QPRlh10EYtGY+fetl4PxTrCm4SXp1eGF5exK5qr54cIehX47YDXgQQJuBNCtebCne8WYsxWWs6VxaGb8WSIhBw8eNM/5Bx98sPw9dyvXr2HPIMbyT2Xy2qQMRiISH47Lg/sP/NpctosESIAEXAlUJM6wFRD+keLfNva/gzi7+NeLJuzWzVtGkF2+nJZINOpaWaMCjThr8CK0n39e2BUgkbjQqMtguSRQdwJYhPZg98HnEwEsa5np1lRxlhyTxNkRs0jt0Y+PmjXQTnz+ed3b42WB9+7fM2Po9M+kl3WzLhIgARKohUBF4gwvOXQfYq9GrG2GQ9cdQlcmhJvdnVBLwyrJC3GGehvZtdfV3WUsCl5aBCthwLQk4Ebgiy/6pHNpQoBZ3yyZXO7K1G5Nu2sTY9Cw+fihDz80zzu+VzxIgARIgAS8JVCROEPTIICyuVuSy+ZMSyHYINBSqZSMjCTk0qWU2XLFy8vwolvztddflwP/+y4vL8u1LvC/lL4kVzNXXeMZSAI2Acxe/KT3uCTHCmPMVljLMCFALWeWH2Hnzg3J/9bRYSYJDMWDs6gxJgpgVvPNm7dastvWvrf0kwAJBJdAxeLMjyggzho5IQBWQgyU9sMG4ph8AWsGBDEPEiiHgNkhwOrOVEuZWs7g2n7E44M9OPHcYxYndsTw48LL5Vy/nQbfYXx/8JmcyNhR9JMACZCAbwhUJc5gLcvP5+V27rZ89913MjU9LXfv3m1ot2IpYo20nOFau/bvEVjOHj/FXNTmHXf+Udi6ZizZuouFNo9e+9aculTY8BwCbHkR2iJ+tayZtMmEfN0/YBao3bZtq0xOXg8ERLwvrly9agQaJgzczt4OxHXxIkiABIJDoCJxBqGSzWXNulr453k6jH+gg4KV6XX7JnS5IZ2XhxFnDZoQgC2rYDk4+H6Pl5f0Ql0Y63YmdsbMPnu4+PCFeAaQgBsBPDex2DmzlpmKM3VViKmrFjV1jZBLJeVU6C+ydctWI9Ky2b+7VdOSYQsLC2a5DUxgGomfbdqfy5aEx0aTAAk0lEBF4gxdaf39hYH/WO8ML35shI5Pbjq7PFnAXvesoa1fKhziDGKxERMCEsmU6do5+dVJLy7FtQ69vkgk3JBrdK2UgYEgoDsEFAb6FzY+V/EF154kYPsh4JKpQjz8+H5tfOUV2blrdyC42BeB95gfhizYbaKfBEigvQlUJM502YyZ3IwrNVjMMCFgKObtNkLGctagHQK+PPm5EWfJ5JjrNXsRiGVL0P1SjLsXbWAdrUkAS2m857KUhtNaZqxkyZXiTdOYuHRSTvzxhFlio7OzU+bm5loTSJmt9tr6X2azmIwESKBNCJQtzmCVwgK0+Ldd6oBQCtIOAd3d3UacYWHLZh6NsAo283pYtzcEYDk71NNjrGC2xcxYxizLGc7VcqauplE3OZIwO2RgkkDPoeZ28zeanloV+b1rNGmWTwIk4EagbHH25MkTGRoakrS1fZNbgViYNig7BODf86ZNm+Td/QfcLpVhJOB7AhAXY1hg1mW2pm0ZK2Y5WyHoxrDERtx8H9a+9JIc7T0m9/ILvmdQTQOvZK6YrlzsinL3rntPQTXlMg8JkAAJlEOgbHGGwi6O/rWwwXaJF/LNmzdlKHamnLrrlsZ0azZgQsDNGzdNN87MTLZubS23IAhDWOuePvup3CxMRwKuBLAGoS3EINRwbofZfo13E3TJsTHB0hyHDn8ka9eukbf37vV8XUPXi2xAIIRt+lJaTg2GJTGcMLuiNKAaFkkCJEACLxCoSJxh4CwGBqN70zmAFmICEwEwcxNLa3h56ID5endBhEID0tHR4ekm7soNLEPJkODaeJBALQQwsN9NaDnDtDtTXVjNVljOsB6a2UEgabpJv/iwsGvGFye+qKV5vs+bncya9x7efV5PdvI9HDaQBEigIQRKijMMQodZHy/oc8PD5gPxhZcUtnDC0g7nR4dldHhUBqOFhR1PR8Krjkur95UYy1kDJgT857Fj8pvf/KbezV21vHw+L0OxIYlHY7K4+HjV9ExAAsUI9Pf3y/s9h8RsbF5iwH8xy5ltRbOtbQjH5+Dv3jfWZcxmXlxcLNaMlg/HH9OJiQkzQ73lL4YXQAIk4HsCJcWZLpsBMaafUKTfCLOCQBuw/GGzzAZEWyzm7XYvEGeN2CFg/64Dcryvz9ObCAskLBfgiyVKeJBALQT6j4akq6fL/GFyWsFwrlYypxVNzzVe82q4uojfsWOHmTSDZ5YHCZAACZBA7QRKijOIHuwEgH+NcBfmF4x7L39vOQx+ky6fN3Gw+iDMy6MRljN0kW7eskWGhrxbFgSTKbD330BowLheMmRdwSTw9dcnpLv7fRm7UHpvTRVb6tpWMtuqZvs17alTp0z3PybPhEIhefToUTBhulwVujkxxAN/qniQAAmQQL0IlBRnq1UCAfP48aI8fnxfMJuzWYcRZ3WeEBCLxow14N5974Rm/l7e7LgwkZ7gy75ZD1PA6sVSGl1Y5yw5tmL8mIostYjpuboQXuq3XduvaRAGC9pv3vmN+c589NFHbSPQxpKFBXox/GN+YT5gTw8vhwRIoFkEqhJnsI5hM3B0X0bMGLRvzcsZ/yJ//PFHz68F4gxdKvWcELBt+3bTXePlxWQyGbPYrJd1sq5gE0C3ZmdXd9FuTRVncPWjXZlqGTNuujCpYEXY0hg2DYslY3LgwAEj0GBBa4cD++3CchaLFN6FeAfW8z3UDgx5jSRAAi8SqEicwXQ/nZ2WwcFBI4ai0agRaBBpg5FB0x2HCQKLD7wdGFzvbk28bLHQZnf3wReJNTAEondhLpjrRjUQG4suQaDQrXmwrL01IbJgBVPB5rSSIdwZpueaJxEvWNDQxRkJR9rGgraQX5DR0VHzXsRuIuzmLPFQMooESGBVAhWJs1zu+ZRyCBgdsP7D43kzBg3WNFiwvJ5uDnFWzwkBup/miZPN209z1TvHBCRQBgFYwXqP9b6wlIaKKdtVi5m6iFM/XLWQ2WF2fiyzgbiR5IgZg4Y/OO00SQAWM7z78GeV1rMyHk4mIQESKEqgbHGGwep/TV2UcCgid2eLr5idvpxuymzNaB2X0vifX35tLGfD54aLgmMECbQKgbFUYcHZFUJqFSuZ0yKGvG5ham1TF+kuXLggAwPfyNYtW2XD+g1GoLXTJIFWeS7YThIgAf8SKFucwUyP7Zvw77jUgZcwtm/K570bHFvvCQHdBzuNOMMs1UYeELyow8tJB428HpbtTwK17hCgogyu7bcFmfqNmxwzAg3vit+8W5gk0Pnee23Txel8CmZnZyWdTnNBaScYnpMACRQlUJE4g7k+k84ULQwREHHY+Hxmxrs1uuo9IQDrNmFCQKMPbTde3DxIoBEEHmcfG0s2RJPTcoZz7aJ0iy8Vhrxanls67EpgukKTCenp6TF/dk6c8HbNwEbwrKbM7FRhOAgW9cZwEHZ5VkOReUigvQiULc5g5cEuAVi1vlQXxcydGTkd9nYxSmM5q1O3JixZ2NQ5HA43/EmAKMOYnJlc8W7ihjeCFQSaAJbS6O753QqLl4oq2wpm+yG2ilnJyk1nCzZY0A4ePGh2EjjxxRdtaUGam5uTWGzIfN8vpy8ZBpw0EOivHi+OBGoiULY4Qy0qJrDkg9uBCQL4d4iXv5cHxFm9JgRg6YF169c3vPlqNUsmRxpeFytoXwIFcdZjvpNqJVN3hYBysazZ8Sro4Gp+DdN0ONcwO51JP5JY3kngaO+xtrwhsJjppCn8KcPMdx4kQAIk4EagInGGsVHRpT00o7GYTE5Oyq2bt+T69etm3zms9QOL053cHbe6GhZWL8vZTz89km3btsrOt3Y2rK1a8NXJq2Zv0sVFriyuTOjWn8DIyFnpPfaJWYQWIsq2fBXzazoVWnY6FWJurp3O9pvyxscE+/Lu3LVb1q5dI2disbZdbiKXy5k/seDCgwRIgATcCFQkzlAATPE3/37TbHaOf3/Y6BzuYHTQWNbm52fd6mlomBFnddgh4MbN62ZszJHf/75h7UX3cC6bE6wRh/EnPEig0QQwpTwHLQAAIABJREFU/usFsTQ2trw0hsZBjKkfru0vJtQ0Haxj8BdNZ3YoGJPkyIj83//5/8g//dMa6ezslPm5uUZfvm/Ld+6qwm5O394qNowEPCdQkThzG8iKrkxd78zz1i9VqF2Ebu2rpE3YggVrM4UG+ivJVnFa3V2BL+OK0TFDFQTSqfSyEFOLl4oodTXcdm2/poOrH+3edEvnDDP5l9ZBg1js7CrMiN6ze0/T3x9VIG1Ilvn5GdPVWet7rCGNY6EkQAKeEqhInI0lEsYcv7jo7Q4AqxGpV7fm55+fNOIslRpfrcqq42E5e5p/2paDoquGxoxVE5idmZXBwTMrrGAQTmrxcvO7hak4s61pmg4u4u0426/plsMSCTk3HJeenn+Xl9a9LBBok9euytNnz6q+zlbPiGu3x/TincY/b61+V9l+EqieQNniDCb4ofiQjMRGfDcVvF7dmgd+U9gXMH/vQfVEmZMEfEQAEwIOYuPzpW5Mp6uiyg63hZj61UU69avrzItzO+wFcYa2jCUkmUjIn7/6Sja+8ops3rxZxhMpH5HzvikQY5jVGY/HJRQKL6+NRpHm/b1gjSTQbAJlizM0FC9jjC9r9OKslUKBOPt25NuaRSNWNMfGzTxIICgE+nr7pLunMFtTxZTtomtSLV8aXqq7Emk0XtNrmJYD1/ZrOmcYuvd1y6eOjg6zo0B6ytuZ3n68z/aszv7+kORmcn5sJttEAiTQQAIVibPbd7JmQcuh2JD5V5fJXDUzNTFbUz+Tk9fk5s2bDWzyi0XXw3KGmahr1q6RVKoxC8Ji8D9fsi/eO4Y0lgAsZ11LljMVSera1i3b7xYPYVXMIuYUXZpWy4Gr5atfz9WChlneW1573VjRTp061VgoLVL63bt3zR/i7I1bguEQPEiABNqHQEXibGQkYSxnodCAcWFFgx//7jQMuwMg3MsD4gx11jKQFoOmsb5ZIyY3oFsC67/B4lBLG71kyrqCQcCsc9bVbX7k3SxeKqDcBBbinHk0nR1XKkzj1NXycG78SzsJYJJAZOCkbHz1VTPuE+3mdyUYzyCvggRIoHICFYmzf3z/j2ULmVrKnG7TLGc17hDQ399v1jdrxPiOubuzZr/RHBedrPwJZY6aCPT39RcsZy6LzKr1qphFzI5XceXmOtOVU55bnguJC2adxF/84peydu06OfqHYxwU77j7eD/hnYuhJY14Vzmq4ykJkECTCFQkzprUxlWrrUe3Znd3lxz6H4dWravSBPj3j5lpxXZVqLQ8pieBSggYy1lPj+sYMAgk7WZ0E11qVUM6WLnKEV0oR4WXXbYd5kyz4jyVlOFz5+Tjjw/Lpk2bBBumYzgAhUjhroNDKpmScCQi2AaKIq2SbwPTkkDrEChbnOGl4NcXZK0TAn54/Fj27dwh/ScG6n7npqamTJcr2siDBLwmgI3PI5Hwim5Nu2tRBRhc2w/BhI8zzJnOjnfGoR5nGcXqXlFfslBvX1+f6eLc9uqrks15v7i11/eqkvqm/1Z4r2A4B94x7AKuhB7TkoD/CawqzrCm2d8yf5OLoxfNuKnR4VG5evWqr14GtVrO5vM/ymuvv27+sdfzlqFd+GEcHR31rbCt5/WyLH8SwHgup0jCuVqz1IW4Uj9c26/pKw1T8ab5tA49t92xZGHXguWwREKOfnzMjAV9441tcnaE2x3ZT9js7KzoOODLE2m+Y2w49JNAixMoKc4wOB4vU/w7wwdr79iuX6xBBRFU/YSA7FTW/EOv92zKbDZreMHlQQLNIpBMTZRlOStl6VKR5SbyVgtTaxnKUP9qebS+ZHJE0DW7cf168x0NhUK++mPYrHtq14sN1BPDiYZMZrLroZ8ESMA7AiXFmYqLWDwq8OfzeTP+48LwsGBW5tXMVe9aWqImYzmrYULA8b5e2bB+Q93/eT569IhjQkrcN0Y1ngC+t6GBv5iNz58LnoIlbdlCVaWVTMtDOeqHq+XafjtMrXBOV9PYrrGmJRPyzZ/7BWuh4Xs6ODjYeHAtVAOGm/ht15YWwsemkoAvCZQUZ7FYzFh+nBYyiA5Y0AajUV9clBFnVW58jmvBEhr7D7zji2thI0igngROnjhRdIcAWwQ5LVkaV47o0rS2a/tVhDnDnOLNGY9zDcN6aFiw9uPDH8val16S/fv3yeTkZD1RBaqs/P0FSV9KczJFoO4qL6adCJQUZxBgWJ/L7UD3BOL9MBAV4qzaHQIymQnTXdJ3tM/tMhlGAi1NQGdrJkeW1hVzDPwv1c0I8aTx6jpFHM7LDUN5ttjTMtV9oZyko+ylHQWw48GaNWvMjgJY3PnxU3/t9euHByY/nzfvZ7yjsWdnI9Zv9MN1sg0kEFQCJcUZFpbFPm9uh1k00kfiLFql5SwWi5sXffh02O0yKw5DF8Pd2bu+EK0VN54ZAkcgl8vJqdApGRt3DLa3rFJqnbKFE4SShtuu7dc01YZVVR8mDVy4IL3Hes1+nNiX85uBgboPSQjCgzA3O7e0mfqg+ZN9/fo17jQQhBvLa2gLAiXFGf51RWMxVxDYF89PlrNq23Li5Ekjzuq1bROseGgLJhnwIAE/ELBna0IQFbNUabi6TkuWU0zZ56X8GucsT+tR1xmPfPpxxiEPtnzSHQWiMc7kLPasYS00vJN0M3Va0YqRYjgJ+IdASXGGL3P8XBHL2dIszidPnjT9asyYsyonBPS8/74Zc3Y7d7vm60D3yvWrN4y10Q/dvTVfEAsIBIFUKuVqBVPBo5YvCCH1w7X9SIuPM6yWdCra7HrVr3HaRttFnSZdIiHRaFj2v/MbM1Hg494jZtJSIG5anS8C7yPsLIAuTh4kQAL+J7CKOBsoLs7SSTkd9s+Ys2q6NdEFufOtndLRsb0u3SL4hzoYjchMbsb/d54tbAsCE4m0/PHEiRWiSoWPLbRsvx1vRNDYyi5RjbfjbL+WZadTYadhKrBUdDnzaHpnOhO+tB6ayWvWcBuRj3532Cy3gfXQogNRWXz4oC3ub60XiXcg/0jWSpH5SaD+BEqKM2xoDnO42wdxEEQapxufw9qGWZ5eHtVOCIB5H2NW+nprnwyAFxy6enHtfNl5efdZVykCX3zRJxhAryII4ki7EdWvcRquLsLVr66mtV3br+JLy4Zrh9l+LVNdt3LcwrRMuMhr0qQS5l2EmdeYLHD46OFSWBi3RABrO+Kdxa5OPhIk4C8CJcWZvehsOHzabN4NMQY/4k6FT0k4fMq8FAthAyYs6vESG6Zbs4oJAZlM2rzIp7O1T8nHat1gk7qU8tcdZmvamsDyxucl1iKDuFHLle26Wq0cVjSksfMUE1NuddhCTctwhmm47cIPUQbXpMcyG2MJwdi6U6dOyZ69e8zG6Z98ckzwbuBRnMC9e/dkKDZk3l0TExOC2a88SIAEmk+gpDj74YcZuT+Tl/n5GbOYqu1H3I+zP0o+P2++0HCxjx/+gSGdlwdewBBGlVqsPjzaayxn9WgrNjZHG9C1yYME/EIgFOmXzq7OZcuZLZ6K+W2BpFYtde08mq5UGNK45dU8xeKdZRdL90LZ2Jfz2xE5dPiw+eOFCQMUHKWfRrw3wRHvLyy9gndZpe/S0jUwlgRIoFICJcVZpYUh/bOlTBjL4NVhLGcVTghA+7AlzJ69b9elmQsLC4JtVHiQgJ8IYBHa7u73n1uZXDYzV6uUCiK4xcI03HZtv4ouN9dOZ/uRFuduYauVo23WfTlN+lTS7JP7u57fGQvam9vfNILDT/fFj225MzMjqWTKiLTLExN+bCLbRAJtQ6Du4qwZ5Krp1sSaPxib8sknvc1oMuskAU8IwBLS1X1QxtD15+i+tMWQ7dd0y8LH0ZVpi7diosqtPFto2fHF6ilVtrMNWvZyuUmIvYREYxF59513ZN1L6+TIsSOSvcUlblZ78PL373FS02qQGE8CDSYQGHFW6Q4BGAQLcRYaCDUYMYsngeYR6D8aMhMCIGZUBKmrgkZd7SKEizANd7qaX12Nx7mWoWHqalrb1bTq2vk1neZ3uppHXWc8zk1YutCmPbv3mO/71i1b2c3ZvMeRNZMACZRJIDDirNKlNP7nl1+bl/XY2GiZqNyTLS7er8syHO6lM5QEaiMwM58T7H6xbFGyrGDOMBVE6mp8sXM7XP3quuXVMLi2HyJKz5Ff/aulU0Gm6YvmTY7JueFzy7sKYEYnlhfBvro8yiOAXU/i8XMyNTXFteTKQ8ZUJFATgcCIs0onBGDBSljOstnquznu339sxmdk0pmabgIzk0AjCWDhUbe9NVXcqKvCCq7tR7xaqNziEKbx6mqZtlvM71amlmOXDT/KsMvRME3njFuOTxXaGIk831XgaO+xRmIPVNmYIBCNFpZVQq8DZ8EG6vbyYnxIIDDiLFrhhIAD7xww4mxxsfpNk7O5W2ZJkWvXa1+Kw4fPBpsUEALJ1CXRAfNqZXKzSi0LmSURpGk1XM8hgNTvVk45YXZ+uzytS123dG5hKsqccXY58INDfDguPe91ykvrXpL9+w9ImsvflPWkw9IIy9m5eFzOxM5IOj0hC/mFsvIyEQmQQGUEgiPOKlznbPOWLXL4UPULVeKf5FA8LiPRs/LTT+weqeyxY2qvCCQSw/Lpp8dlDLM0zWr6iWWrGISMLV5skYQ4p9CpJEzFku3a9RWrV8PVdctjx2mbi7XVLa3JMz4uJz8/KTt27JC1L70knZ2dkrl61avb0vL13Lh5w4jcS6lLLX8tvAAS8COBwIizSiYEwCSPLk2s6F/tgX+QhXXNuGhjtQyZr/EEMFuzs6tbklbXpHYZ2sLJ9quggatpNcwtnVvYanlXy6P1uqVzC1utPsTrNaBsfBLJQndt975u8z7AbiGZDJeQqOSp9HLJpEraxbQk0OoEAiPOKpkQgJWwN6zfUPW9e3D/gdnyZHh4WLxbza3q5jJjGxPAtmqHej6QseTzpTRUpNjWJrcwOx6CCOeVhKFMZ3q7nlLxdjqtW8PULVa2Mx7nrmnNrgIJGUtekL6+Pnnzze2yefNmM4N7Zn6GE32q+N5gEe7vpr8zi9g+e6arXlZRELOQQJsTCIw4q2RCwEAoJB0dHVXfeuxHh/qwkjYPEvA7gcTZpf0nl6xHKl7gqt/NGqVhSFOpJUvzwnXLa8drG+z2qN+u2y5H/XZeDVPXrsNuhzOPWtBG4mfNewFW9Z07d3G/ySoebPRG4N2IDxflrgIgs5DAEoHAiLNKJgQcO3ZMOjt/W/VDcPfuXRkZSciDBw+qLoMZScArAslLzy1HtmCxrUm2H2lwXipMBc5q6ewyivmL1afhWpe6KEf96jrDcL5afcpiebLE+JgMRqLS1dMlmzZtMjuIfH7yJJfcqOBBxVjcm9dumvFoEGjopYA1jd2fFUBkUhIQkeCIswomBLz7zrvy6fHPqn4AaK6vGh0zekwAP5ZjoyuFiooeFSfFzm1xo2nqGabCCq5TTFVan30tWp4dhvLt+rR8dU0cujmRbiQhQ7GYmSQAkbbzrZ2SSKa4fESFz+787Lxg6AdE2nhqvMLcTE4C7U0gMOKs3AkB2JgdXZp4YfAggaATwHN+9OOjRphod5+6tniBOEG4HWb7Vdi4hSFO49Utlq5Y3Ui/Wh5n2Xa9bnk1TPNp3epqPNzlsKVJAlo2dhDBorXo6sRm6jwqI4A/B9h4PjuZlR8ez1eWmalJoI0JBEaclTshAC+K17ZskWRyrI1vOy+9XQj09/XLwZ5uV+FjW5Nsi5iKGXXtONsPUaPnmlZdhMOv8eo641UgIV7TOF3Noy7i1a9tcObBuR1m59G8djzCtHvTxMOKhutLJiQcCsnOXbtl3csvC7Z/GowOspuuxi8QRFsta0zWWD2zk4DvCQRGnMFCgC/8ageWwKh2ZwBY3TB+ggcJtAqBL77oKyyl4bBuqUBRV0USzpetSJZFabV0Gm+7KMcu182vYXDV72wDzt3C7PTqt91ifruNtl/TrwjDLNck1oYbkRN9J8y7A++P48ePc8JADV8C/EmORWJmOaNy3ts1VMWsJNCSBAIjzsqdEPBV6Cvzgq10X72HDx+a5TMSiQsteaPZ6PYkgHXOursPmkVoIT5sa5HtV2Fiu6tZm7Q8Zzk4Xy3MLd6uWwWSW7pqwtzyaH3OOK172R1PCma8jo0nJBoOy4Hf/tYsXLt//z45Nzxc1p/C9nz6il81/uRe/OtFM7wkFjsjuVyOHIvjYkwbEgiOOCtzQkBHx3YzwLfSez19a9q8SG7dmK40K9OTQNMIQJx1db+/bJWyhUgxv5voUqFi51ktDPGaXstUV8Nt1/aXSoc4u2zNp2Hqajrb1bTqIm2peKTTtNrtCfeb//5G9u3cbraAwhhWdHVW+oevaQ+FjyqG1WxyclIwLAW9H1cyVyjSfHR/2JTmEQiMOCtnQoDuDHDkyJGKiWPpDLw8uOFvxeiYoYkE+o+GpLunZ0W3oN1tCXHiFCj2uaZV1xYybuk0bLV0znjNB1c/SKPp7DD47S5TTaNtVFfD7XLsMC3HWTbO7XS2X+NMWHpKent7l7s6e4/1ctB7lc/6fH7W3FNsqs6DBEigzZbSuJK5al6kJ7/8sqJ7D0EWiZzmorMVUWNiPxDADgEffPB/lezWhNBYtg6NjRlhssJi1KAwFTrqVtoGZz49VxflOf3OOjReXWc8zl3DkkucsJF6PL7c1Ym9Os/EhjhhoMqH3238mVtYlcUzGwm0DIHAWM7KGXP2zTcDRpydHz5f9g1CVwX+zWG9Hh4k0IoExsYLQkIFiLq26LD9tljTtOq6pXMLc7M2IZ1djvrhIq6ccjSN5tG2arjt2n5nezTOWU4l6bRu4yYSEj4dFoxDw0bqu3+527w3KCxq+8ZgElZsaMh0fbLXojaWzN1aBAIjzsqZrdnbe9yIs0o2Ny5YzSKSTqdb686ytSSwRKAw2/D5LEy3bj+IFHyc4sQOs/12Ottvp9F61EU622+nRVw55WgalKN+t7zlll1uOmd9yKfXYsrAjM6RhJl92P/1wPLaaO/uP2DW+eLDWD0BvHtDobAZVjJ5fZKzZKtHyZwtRCAw4qycdc66Dx6U9RvXy93Zu2XfImw7AoHGwb5lI2NCHxHA85scey661GKkLoSF7bcFj4bbru2309rlII2dzoiXpUH8yKNxdrgzjzMd4u06bH85eZ1ttcvX9hQrx1l30XTo6jw7IsmxCxI+dcpY0XRttE97P+V41Sq/F3iG8c5OjBT27URPBiYRcEuoKoEyW0sQCIw4W21CALoXsJDkzp3b+ZJsiUeTjawHAczWxMr2yZTD0uNiqVJLkLoqaCCEnGEapy7i1a+uii+3vJrG6WpazeuM13ONh+v0axmaVl0NV1fD1dWy7PIQp/G2a/s1/XLY8tpoSfm6f0C2bd9uLPa79+0XrLNIUVH9k4310XD/ODmreobM2RoEAiPOVrOc/fhjXjp+3iGdnd3CvTFb4+FkK2sngB0CsJTG2IXC8hPLAqIMS5YzrVqYIEbUb1uRVKTYYW7pNEzTq6vhtmv70R6c42MLLA3TeHXtvLbfrk/96trp3Mqx06kfruYzYWOFdkIQJxMXZCR+Vv5w9Jhs3LDBdHd+fPgjyWazFGk1PN5um6lT9NYAlFl9RyA44iwWLbo+ztNnP0k+lzcDdaOx8vfU5PYivnte2aAKCSSTCfms77PlrYlURMAt5ncTJaXCEGcLFU3rdO36SuXRsjS9LX7sMLsMhGs+O736NZ/t2n67rc5y3NKtFqbxKBdj/hJjFyR+LiZYbuNffvbzgiXtl7tN91yFt5TJixDA5uoYn4ZhKBRqRSAxuGUIBEacrTYhAP+0se3K4+zqWzzp3YsPxyU3k9NTuiTQkgRgwVEhA+FhW51UiGi87apf8+g58qtfXS1TXQ23XduvZdquHa/l2PEapunsOIRpPFxNo349Rx589NzOo3Eapuk0re3afmc6t3KW70E6KclUQnp6epYnDXx4tJfbwtXhmzWRnjDdnf39IbPsEWZ6crZsHcCyiKYQCIw4W61b81BPj7yy+ZWyIeey0xIOn5aHiw/LzsOEJOBHAuPjqRVWMhUTat2Ba/shPJxhyOMM03QqVOwy1O+syz5Xv7rIA7/mVVfj1dVw27X9dhnq13htq912xNllq19dzWu7dh6to1jZWpfmN5Y0bKh+6pT8ctcu86dxW8ebcvz4MSPSaPWp7lsEbrOzs8Z6Fg6fMkuZqCWtuhKZiwSaRyAw4my1CQEbX31V9uzeUxZp/NuCJQ6WMx4k0OoE0hj7ZFnM1DKkYkJFiNPVeLjOPHacXbaW4YzXc7sc9auraZyulgnX9tvpbL+dBmVrnNajrobDtcPUr66dTst2C0OcWx6EaXqNN665Lwnp6+2TrVu2GpG28ZVXzKSBVn/mmt1+jElLpguzOzG+jwcJtBqBwIizUpazufk58+I7fPhwWfcHm/BCnF3LTJaVnolIwK8EIpGwfHTk965jzlQwwFWrju3afk3jFqbl2HG2X/NqOj2HmEE6FTxueRCmgkbzFUun5bmls+txq88OU7+6dn0Iw7kd5lYfwjS/5tGwFXnHMBt0ROLnhuTokaPy8zc6BMtvdHZ2ysTEBLvlavhiPX66KPm5/AvLIMHCRutkDWCZ1RMCwRFnJSYEpFLjRpz91399XRbUS+mUhLiPZlmsmMjfBDBb82BPt+tsTVskqF8FBc41zOlqGqdrp7P9Kl6c4sSZX8+deTVcXcSrX11nHj1HPPx6bru2X9tYbpjzWpDPzmv7S5a9tA2UKS+VkAvD/68c/6zPLPvzT/+0RrCp+h//+Efh5KT6fc+uXb8uF/960VgoybV+XP1cEsR4Pp83wwZgVS3n02wBHxhxVmpCQCQcMeIsFi+vmzIWiZl/635+2Ng2EiiHwBdf9ElnV/dytxrEigoauLZVSsPdwjTOzlMqnYoXp7taOVqmnc72o7xSZTrjtDyEq98uz/Zr3krSaR646ncr047XdG5hZvmN5Igkvx2R473HBcMxMJEJe3ZijTQOcC/nqS+dBj/MeMfjNwML2oIrJg/wCDYBrNSAe17up9nftcCIs1Ldmsf7+swLbuLy5bKevmRyjAvVlkWKifxOAIvQdve8v7zxuQoDteyokFjtHOnsNOqHa/tRfrEwrVvTqGu3Qf0aV03ZWoad1/Zr2XA1rbpIp364mk/9GqfpNF5dO94uH/GaBq6WZ6dZzgtrGraDSiQkGotJ7ye9smnTJjO785133zGCghaf2r55WG4DY9GGh8+ZH2vsnXzz5s3aCmVu3xKAFezq1atmskgqdUmSyZSgRy0cLmwLlkyOC5YdQhw+mEhCcVaH24kvWqkJAT093eYfaG6aA0PrgJtFtBCB/qMh6e7pMT/0ahFSV4UBRAE+CNcwdTWtHadhKiY0re3afk2nddjnSKflueUpFYZytCxNV6wOO63mcQvTcmzX9tttVb+6djpthzNM6y6WR+ONC4GGpTcSCYlFI/Krnb9aXn4Du51gRjmP2glg1wFY0PCDzKO9COC+w5IGDeG3oy0sZ+++864RZ/fu5f3Gn+0hgYYS+Oqrk9LdfXDFhAAVAGrJgYBQvzNOz+E609hxdhlI50xb7BzhWo6msV3br3W4hTlFkKYp1W5NY7u2360+u63qV9fOq347TsNsd9m/NPYM58thY2NGLMOKNrYUHwr9Rbq7u2XD+g3y2uuvS8+hHrmauSpYaJtH9QSwd7LTGglrS7PHHVV/RcxZDoFoNGrEmfPel5O30WmCI86KTAh48uSJvLm9Q/bs3dtoliyfBHxHIJVOyok/npDEWKELz/7hL+ZXUaKCZ7V0drzmXS1stXit2+lqPhU96mq47Rbzl9tGTadtsMtzC1stHnm0TLvd6lfXlANBtiTO4Np+lHFuOC7/cfSoGYu29qWXZO/ed8yPDMZT8agPAVhTIpHT5s/D1cmr8vAh17ysD1n/lKLijJazBt2Twpco4tpHjH8+WDsIY29WO7ii9GqEGN+KBNA1pmICrluXmh2vIgGuplW30nR2Gc68dj0a5wyzw51tKFW25kMe279aHk3rdO1yNE7bo66Gq6vXUiwe6TSt09U86q6Ix/1El+cIBPeInOg7IWvXrjHjavGuw/3mAPf6fFOns9NG9IZCYdP1iS5Qsq0PWz+Uwm7NBt8FiLNiEwKwzg1mO01Plx6fgZWlh+JDDW4piycB7wmMj4+/YHlxWmOclhk9V4GhLsLVr66mtePsMAgLnDvDNL+6djzC9Fzj1dVwuJrODnOrb7V4tzxatgojZxnaHnW1PVqW03Xmx7mdp1R9rnm1KzQ5JqdOheTDw0fMOml43+3a9Qs5fdqfY2m8/wbUVuPT/FPJ5m7J8PB5I9QwecCPlpbarrI9c6vljN2aDbr/+KIUmxCQTqXNINrVqsZgULwcmz1DY7V2Mp4EKiWg4sHN1TAVIDh3WmvcwjS9ulqOM6/Gq6vp7DLd8jjDkN6ZV8uEa/s1nTNMw9V1xhcrB+k1j5vf2dZS5WhaLc+tDYhDOmdcqbwmbbqQD3t1bly/vmBJe/VVGRk5Kz88Ln9P4Uqfr3ZJj14YWM5wH2g9C8Zd12U1/Ci2gzPmLBJ1FVanIxEz5qzUowRBNjo6aqbalkrHOBJoNQLYIeA/Pj5qfujxA+60wKhIUNeOt/2ad7Uwt3KK5dW06tplO8OM+HBY0+z0tr+c+pC+nDyaRtujroY73VLxzrR6rnnU1XC4CNNzjVdXw42LMYXm/qKrMyFnolH54INDZlsojEnD7M7PPvtM7t2/12qPsO/a6zZJAKINS3O4xfnuAtigZQJqOaM4W0ZSXw/ARotMCOjt7ZX3urpKVogvFhR0nrM5S3JiZOsRwA4B7y3N1tQfercf9xU/9FY3pKbVvCqSbLdYXhVJ6trpbL9bfKkwxNnt0rTqurW1kvpKla112OVpejtIowJdAAAgAElEQVTM9mseuHbbNI3mV9cZjnMNs91ifp3daeKTCfnmT/9lllPB7E7M8sTWUBgGwskD9fs+X8lMmt8gTCCYmLgiGKv2ZPFR/SpgSQ0hoOJscZFLaTQEMMQZxJVblySmnR89eqxkvTBTY2AgDxIIGgF09x9bspzpj7/tql+Fg7oarl1pcDVOwzQNXNuPdJpWXWc8zlcrR8stJ69dj5arYepWUo7mUVfLVFfD4WqYfU0ar9eg55pWXQ23XduvbXYLs8vWeLc2mMkD3+L+jci7+w+Y7k6MS8On2HszaN8Dr64nlUwZpuCK3xT88X/qVeWsp2ICnBBQMbLKMhjLWZFuzV/+8tfy1VdfFS1wYX5OMBMnk8kUTcMIEmhlAqlLz7vGbGuL/qDDdYbjvNIwFRLF8jrr0/RwtS71a5ydR8OQVv3qan47zg6z/fb1an517fzlhNnl2v5i7bbrRnpnHj3XutVFuPrV1bRwbf8L8Us7DozhPicvSP/XA3Log9+ZZTgg0Pbu3SsnTp6Umze4Qn49vuezs3dlYnpCzsWHKX7rAbSBZajl7P79xQbWUl3RgRlz5jYhAIM2t23bWtIqpla32ZnZ6ggyFwn4nEAykRbs2ajWGv3xdgoIjVdX45HeGaZxcG1/sbI1jV2O+uHa8epXV8uEq347r4a5uXaeYvFaj7qrla3laDo91/zqOuOLtUXTqYt06ldXy7TjNAyu7df22Gk1DFY0lGmsacmknDx5cnnXAQg1TCbI57lWWqO+0tq7o26j6mG55RGAhRMf6AC/HYERZ25LaczMZGXz5i1mDy2/gWd7SMALAhhLER8eWmFZwQ+509ritLzouf6owy03TMu38zjz4txZtqaxXduv5TrzarjTRToIEbjFynHmwbndLrf4UuVpXrf6ipWteeBqPjusnDZoPtu1/VrGi2EJiQ5GpPdYr+zevdt0dWIfz8MffSSJZEp++onjpur5PTW9PLGYXPzrRcnlcq5DcepZH8sqTeC55ay0OMN9w3fSyyU3giPOXCYEYHkMzFTK5e6UvkOMJYGAEsCEAOytqcLA+ePsFAQarz/mTlfjbdf22+ltgaFpitXnjNe8Gg7XDlO/unY8wjSf068c7HbaeW2/5tWybNf2a1nOMG2bus54nLuF2W0s1QY7HcrRtNoejbfrsP2a/kLigiRTEOwJiQ/HzUbrb+3YYYTa5s2bzXZR8aG4pz9MAf06yrNnzyQ3k5MrE1dkcGnrIAi16b9NST7P7QW9vu/YFg3fg1Kia25+TrC2HSxsXt6jwIgzgHOaihEGU70fTZZeP4Ssrz0JYGeMzq5O8wIy3VkOy5AdBj9eVOrqj7vT1Xik1bhSYRqnadW18zvD3PLYYepXV/M7XcRrmKZVV8OdrsbbeZ1tdebReM2Lc/Wra4dpejtM0znLxrkzzM6vcZpfXQ23XdtvysBOA1Z3sfGnkkasRSLfLo9Lw3t065atZvcB53u2Pb9ZtV81lt3Abg74ncInyY3Xa4da5xIwNAqTBmDowT3ycoZzYMSZW7fmocMfy8YNG1xvFza6nZqaonBzpcPAoBCAOOvqft9YaPDDa1tO9Idaw8yPtSXeNNx2bT/y63mpvBqnaeHafi3HLczZxmrzupXtFqb1qVtNfXo9Tt7l1Kd5na5bXjvM9mvecsOQXu+RuiYsBfE9YiYQvN/TbTZah0jb9Ytd8qf+frl+/brgPcqjNgKw2mCNtLm5uRUFgS2F8Aoknp9AQC/kF+Tu7F1azqqhD8uY24SAbdu3m8UX3crElwFKGCZmHiQQVAL9R0PS1dP1gnVEf5D1xxiu7dd4tcKoq+FOV+PtMtSvcXYe26/pnGEa7uY6w1bL64zXc22buii3nLJXS6flO11n2Ti360Z6Zx49d+bV8HLz2Pnteu1y7DSmXbCiwUIKC1sqKX29fSsmEOzfv4+r5Tfo5QHu+I3Cmmk4KNQaBLqMYmEx6+8PeWrMCazlDANZ161fL93d77mix0KBePBn5zhL0xUQAwNB4OuvTxjLWXJszPzo29aUYn78WGuc/WNth2s8XHyQzhmm6bWMYvGazo4vFYY4LdPpOsvQdjnD9dyZ31k20mlap+vMa8fb/lLX4pZO22DH2X638laLd8tTKsytDQmMTUskZGgoJn84dkz27N5jFrWFNW3Pnj3yzcCA+bOLcVU8aifwj398L6PDo4JdbrRrDZMIeHhPQC1n9/Le7bARHHHmmBBw4+Z1M97s5Jdfut5JPOwY/MoXiSseBgaEALo1u7FDgDWgXkWF/YNu+0v9aJdKpz/oml9duz74tQzbjzB8NK26mtZ2bb/WsVoY4rVMdTXMzmv7yy27WDqtB66Wa4dpPqeraeFq+tXCVou3y1E/XM1n+xGm4U5X0yEcQu38xfPy1YmT0tn5nmzessW8c/91+5ty4osvTNtLDbQOyFes4ZfxcPGh6fZMpVKiswu9HPvU8AtsgQrmZuckHAlxQkCl9wrdmrCC2WZfiC/8o4uEIy8Up+m5ee0LaBgQMAIYV4m1rCAA7B9lPdcuNT1X1y1tqTgtR11Na7u2H+UjrYZpfZpfXTte02heuKXCNC9c2+/Mo3F2uIatltdug+axy4Ffr8X2a5idxy5Ly3CmQ3q3MLsct3g7TP1wNZ8dpnW/4DrWysNg9sJ6aSinsMsKuj03vvKKeffi/btj507T3oB9rZp2OfjNwnfa/q1rWmPaqOLczLzRGF6K4uBYzhw7BHz1pz+ZF8T4+KUXHiEMZD0Xj78QzgASCCIB/ON2WkBw7gxz/hgb64g1I1PTu6XDj7zGw7X9GmeH2X63+HqFaVtRn/rhav22v1iYhjtduzxtr7p2Wk1XKgz5VkvnbKtdnp3fLme1PCjDWU65YVo2hB2WJMBSHBiXdu58XPr6+qTLsqb9/I0OOXb8mJw7c84MsA7i96xZ1/Tw4aLpBTo/OmqEG7rguAF7fe/G3PysRGMxjjmrFCssYc6Nzw8fPmzE2e3c7ReKw48Vt2t6AQsDAkoA+/2Z9XxGEpLAD6gluNzERKkwzWv/oNv+UnltAbFaHrd6tGy7HBUIq4UVq0/rKVaOXaddBvx2HpxrfKk8bnHFytHy7LLh1zaXG+9Mr+dar12O3T47nR1utwfhms4up1B2QrBlVDQakQ8+OGSW5Vi/caNs2FjYfP0vf/mLmfHJrs/aXjwYmoP7cH74vBEQ6Po8Ezsj6fSEzM7O0spWG96m5Q6M5ezbyLcrHsLOzk7Z9uqrruuSwDRJs3DTnjlW7CEBdIFgL0Xdrgc/mvpjav+wIsyta8sOQ3pnnmJhxcrTuuHafrscO6+zPmce+9zZ1lLl2PU569BytGyNd5an6dTVdOpquJYD1/bb6dSvrjOvhtuu+t3K1DiUo351tWx1Ndx2bb9buzUecSXLWdouSsuIRMKyZ+/e5W5PM5lg716zjpSHX4vAVYV7gBUIcOD3LTGcMN1w8XgscNfaLhcUGHGGMWa24Nq9+5eyY8dOefCg9LYM7XKjeZ3tSQA7BLzXfXBZFOiPKlxYOvCjqRYP+N3inWF2Xtuv5ajrVp6m1zS2a/s1HdxS5Wg6t7wI07x2PMJwbodpOVqfM07LURfx6tfyNK9dll2O7de8zjA9t8ssFqbh6paTx26jWxu07Vqm09U6nOE4fyHMdHU6Zgmb+zkmI8Mj8skf/mBmfOpEgo6ODun99FOzGvvMzEx7fmGrvOqJzITZDsrOjh4lWM6cB7o9Ecc16pxk/HUeGHFmTwiASNuxY4ccOHBghWDzF3q2hgQaT+CLL/qku6vbCAm1cKhr/1CrHz++bvH6Q27Hl5vOzqt+rc/parztaj3qOvPgvJwwu8xieZBG0znrs+Pg13i4Wr+G6bnt2v5S6ex6SqXT8rS9Tlfj1XXG2+daj7qax+kiXsPs/AjTcNu1/ZreWHGtyQRnY2elt/eYbHz11WWLGiYV9Pb2cg21Cl4R5Y4zgyEDv5e4lxTBFQD2OGkgxBk2d7bF2aP7D82G5//58X96jJPVkYC/CExk0vLll1+asT/4oXRaN/QH0w5HmKslZGmtNM2jrp1X61gt7P9v73tAo7zSvUspIkUuspRiF9u7bpESipRQpGSLLO1+K8VPgkgJJZTcYvvV7YYiJZSwBAklW6y3uf2CDBJkCINEGb2JmmbnC4MMIUgo2RKtWTdIKCJSpARRUW/dIuX5+J3Jb3zm5LyTyf/JO8/A8Dzn+XfO+3sn7/vk/NX6UBwtA6/tNe+//KN0vhzluWR+G1AXry+qXu0zly3rpw8p5ZpqPmSn9ax3qWW8ZsSdT2y2l7Tgm5k5mH5o0P0+sZjgPw9/IY2NDVL7Sq2sf/ppl6z94Y9/kKPd3TI6OraiE7Ir6y956Vrz/fdTMpYdk950PklDsoY52NgJ3z6Vg0AskrP81hipQi8Zxtxx4Hn/qVNFSGMDv5GRnK1kKULFCnFHIJM97xYE8KU96yWpXrZ8AdPWp4UXqxrWg4wxQWlTSkYbTTWv2xFqg47t61mOikdf6MmD0p7+pJSTalvKQKN4xgH169M+vp3WaZ52vmw+sdkWxtC+jE8bvxzygQxfHYd29KeOcm2vZehZw8rP3uPHpb29Xfbs3SPP/uoZeeqpJ+RXv3pGcCrB5x2fu2E8jJKU22MU579znHQz320esJAACRnmqmUyg/KPy/+YBRGw1dOFZhmYYNkQiE1yhi5a/ojwY8NEU7/LFrst9ycf2y0bqhbYEKggBHLo8Zk54JovXL4oSSn3KfWgmvftOBymh71KyXx/lllHKA51sNWxKQ9RLYviWTdpKLaW+XZRcbUcPvTTlDxsWQd56kA1r+OC98uIQ3sdU9tRT0o7Uso11Txi0ZbU17NMPSnloFEyZzOzrxp4/H6xh5q/mABTV77o7Jr1rK+gP78VaQruBxcELFWF6PQA7nYG9VIhOr84sUnO9LDm+VzWdYlrKJC4YYkxTpe3w0U0MsbHGQHs6ffV/+0qvKz1i1H3VmgeNij7MspJ+bL37SjXlPEoQ5k8KGMwNinlmmqeMSAjT6rtNF9u7Cg7xgf140b50M73pVxTzdMeMr8+2rFOn9IHch0nZEdZuXasW1PNM95cslB9+joL/MweaoMDZ6U/fUra2g66I6M2bXpG1q1f5/4ZxxFSRxIJtz3H9PR0nP+sZ10bhoSvXLkyS74YwYMHDySdPu2OjsrPUTslY2Njbpd8doQsJr75lkYgFsnZvXuPiuacYQwdK3/0Z/LipDt+wU4F0KgYH3cEcHxT/d6GWT1neHnii5cfX5DkdZk9G6TQkSdlHE3JMybKlPl8qD7K6KPrjZKxPfQF1Tz1oIyhZdqW+pAMOupBGUPL4Ec5qa9HuVwZ4/n2SxGbMVGHvl7GJqUdqObpE5L5MaN8Ycd6SLWMvOsBzmUkk823AbZfHvrSLf7SJxNs3Voj7ze3VM1+lnivPZp+tOSPMwxrIjZWgyaTJySR6HLvWpwOYZ/lRSAWydmtW7eKNqHF6QBvvfVWAblHv/zLZf996b6CzBhDoBoQ+KL1kLw9j7M19QsWvR54KZYjgw17SXwf6qgH1XxIvxwyv11oQ0jGukkX0taQD+KF6tMy+mkZ2wEZ9aS0Y1lTzTNGubKots4Vh+0hLbe+kJ1ug693uqH88VHY6BZJ25m+Pvn4k4/dnLStv90q6zdscD1qdXV1bu4a5lVh6M82vV34kw9bc4xcuCATkxNFQbAtB+a8GbZFsCyqEIvkDGPj+oQAnA6AZdj83Lh+XRLJpOuSpcyoIVANCLiDzxsbg6s1/RceX6ikvh7lcmVRMUJyLSMP6tdHXVQbqA8lEFE+fgJQyg461jGXnY47Hx/ELSe2bzeXz3K0ATF1veT9ulimPey0jPcrJKOOsUkp92khdmZA0qle6TrylbzzbqPbWunpDfnVn7/evFkaGt6Wrs5O+Xb8kpurvNaH6dD+1UyMrkxecT1qyWSPO0pqeDhXOJ3AFmws7E0Tm+RMnxCA1TyHOjsLiGBCI8bMb1ybKsiMMQSqAYHO5oTs3VsvGW9BAF5qeBlyCIlln8KmlJ3/QmU5FIcy2viUek01X6qt2o5xfRnlpL4e5XJk9PcpfX05y9T7lNdF6utZpp6UclLKQ/VRR1tNNU9fUM3ThjKWNdU87UJxaAcd2+XztKGeZVI/PuxCOi3DdBcMdW6vq3MrP7FoDF/sr4Z91sbGx9bsIwHXv9QLAuYLBoY/sSUH2oL3bSLR7ejkVP7kgvnGq3b7WCRn/j5n6NJO9aQK9/bW7VuuG/Zf/7KlAAVQjKkKBDq7OmRvwztFPWd8sbEXAlTzeKGxTFvQkEzbQk97zWuZttcxQ7Eho1zH0zLGK0fGduh6tQyxWNbxNM/6aKt1mqeeFDpfzzLrJKVcU837bdBlbad5HZs8KezAa3u2m5Q61sWypprXselDqu0oAy3VhpAPZdqXMk3BZ9xvOn8wOxYV9PT0SGtrq9TX73bzkzEEin3Vnt/0vOtVwz/3o2Nj7oSZtdDzMzDQLxMTxUONq/WAe/jontz98a5bmIF7OjFRvFABvXz8rlYb10K9sUjO8vucPT5bc+OGDTKQya4F/K2NhsCyIsBhTazm4gvT742AnF++6EA1T9+QDDrGJIUdeVLfl3JSX49yKZnfZrbRlzOG1lPGukkhJ6/tNa99yZNqO8YhpY1PtQ91voxyn9KOcpQpA2XdpLTzKfSUaX/KSP04ug7aaKp52IZi+7JQHX4clmlLCjl46v3YLFPvaC4jqe5u2de0T35X+zvXm8ZeNS4s6O8v3jNzWf9oFxAcE/QxQrRWPuhZ4zYd892fba1c42LbGZvkjHPOpian3ETQsbFvFouN+RsCax6B0dER+aqzSwawFUGJ3hHd04AXFsrlyopedDMLCFxvhVpMwFhsA8uaaj7UBr5YQ3Z+G2jD+nw945MyNin9SX07yHVs345l2tHfp9qOuigZ26brpSzKhzFJQ3bQ6ZiwCdn5MtatfTUfFSdUH2Wa6vo0D5tyY9OWlG3242WwuGBwQAZO9bstl9raW2XPnt2CURj8s//UuvWyecuL0ri3QY4cOSK5bE5wRuVqzvPSDyckOku9lYaOv9Q85qSdTJ90w57Y4iplpxTMgjgWyRkON+9N5g8+7x845bqnr9n8slk32wTViUA2O3vIKvRy44vLp7ClzH+pMQ70Wqd5/WJErwZ9KCfVPro+8roOLaO/T3U8zdMuJINuvrFD8fzYOmY5Om3P+D4tFUdfRyk76Hw9y2gDeVK2i2VNNR+y0/GoJ9W+vE5fRltSX4/yXLKyfDOPf+9I2NLptCSOJuTjj5qlvr5eXti82fWuYRj0pZdell31O92B7ZjTFjpofCWeOkjOKmVYs9zrxQkF2P4DSS7my53P5uT777+f5Y4969b6go1ZF1WGIBbJGYY1E5mEu4EYxsF+N9M385sQTk1O2HlsZfwQzCS+CGQGcoVhHv3SxotKDwfxxUXq21KuKXnGIfV9UfZl9CXVeh2HPKm2oy+o5v36Qj4hGWKwHh2PMlL4kg/Z6diwY1nzWsZ6QzIdn3a+jH6aar6UvW+nbUvpeP36mjQfFYcxoWcMykhDvrQlpa1PqWcMX88y7UC1jDxp5kR/fp/A3Ex7ZyjObt62rbZoGBTDoTjFAMN2mBy/Uvtq4lpXe0HAcjxBMeTJvdWw1xpO/bl/8/ZyVFVxMWOTnKHn7P7/3JWWfa3u0PMHD352yRq6TrHM1z6GQDUikM1k5fPPO4rO1sRLx+9lmKvHgT58YWkKX74IQRlL876MZe0bJdOxdTu0veZpo2Wap55xtU7ztAOlLSnswPv2Wk9/befzfmzEY2yt8+uhHeuYS087HZNtKdfXt+O1lorD+rSv5tmucmSsp5TPYuoL+TpZNr/XH9rorhlTBPoHZHBoUPpOn5ZUb1IOHz4szc375a3f75CNGze6hA1bd2CBwe/f+IO0HTwofX19y7a9BHqWfnkQvwVv2D8Np5wAd2zTgaS352SPnPtbZtZea3F7vscmOcNNww8UZ61t2fK8u0/4ryWZTBV60eJ28+x6DIG5ECicEOAlGO4l48nYk6B1mufLKyTzfWnrU/pqOX21DHa01ZRy+lDn+6Lsy2hL6uvL8WH92pdt0TLYUQ5KHesm1XJfRh0p9Zrq2KzP16NMGWNpqvlSdtCxDvqEZNSBar5UbNrBJsqOclL6+JR6v63aTvO0B6UPqbbTvPPB9jQz538WfHMjrpctkewU9KxhgQHmrHGBAShk0GEo0j//ea6/52rW4/0OvEayObep/GhudNah93jnx2UINDbJGcb779yZdt3Mda+/7n7D6FZG0rYWlkJX8x+dXfvyIcDVmm4X9ZkeM7xk2FOBl4rm+QIKybQf9aCap79PaeNeaqp+yEMy1qX98MJEmTJNNc9r0jK/PYxPWk4bdDzNM4YvY8xy2xMVh3F1PNoyNsrUU0c/TTVfrh3jwlfz9A/JqFtIfSHf+cbRbZqvr7aP4kNthMzJM4OODgyedQnYyZMn5fPDHdLU1OR60XC0ILbuwJmgOBu09pVaaWxqlK++/ErGvhkr7LQ/n/cWEpJ7Dx4s34OkwiLjen18MHcNeUA6fdKdoY0eN0x5CtlW2OUEmxOL5AwLAtBDhvFp/GeCPwLcuGSyW4ayQ8ELN6EhUA0IYO7lyd5eN6zJFxbpXC+ekB1ePpSDMgb5chMoxqE/qOYLL7rB/IsOOtar+blkoXogC9UXJWMMTdkGUMajnjK2jdj4+ig7yjXVPOvTMvC6Hup0G+hXjow2jAMaxfO6SKPsGJM0yo7t9OPBDz7anzx1jElfHSvkS3tSHY++lGl/1qfr0TLnO5Okwe9xfCRw/e6oKRzS3t7aJu/te69w5BR72La8sEX++Ic/uqTt845DbmuoUosN1uKCgKV+/uKdf+PaDTeNCR0zOLS9u/uoS9jWYh4Qi+Qsv89Z0o1B48d94MABmbo2JZ2dCZkct92Jl/qPwOKtLQQw7wwvDg7V8GWjZf5LBmVfpv3A6zJi+/asj5R67UcZKW21jY6t5fQB1by20b5+7JBPSIZ49CWFHXnW5/tSD0qd5rWMdVDGmJrqeJRTBj/ypDoW7UGpLyWjr6ZRvB9H20FHPev19SjPJdN6HYc8qbbTdbMNpL4dy9TTF1THJg9Kn1IyxqOtpo7PzZxdi8PccxmXSOAUg9rttbLpueeKhkPxbttWWyttLW2SyeWHRO/fv+8eRmjD1IS96/wn883pacHw5+RYMTYY/sSJEFhEUalDobFJztCdOZjJuh8zuofHx8bdkOYPN3/w75eVDYGqQiB7Plt4kfA/eFK8PEI8ZJRrSl6/ZCjji0iXyZP6NpBrGXnSkB9lmmoebWMZcTSv2+3XATvaktLGp9CHZKyb/pqSpx/KlPmUNqDUlZLBRuvZDspYph1jktKOlHbEC2Xa+ryOTXtfVq5vlJ2WR7WRdfpU+1JXjoy2pOX4wAZftNG3n0vm6sE8Nvx+MwOSOt4jia6EtB9sk33735ddb+2SX2/a5N5xTz75lNuVoKamxp1y0NDQIJ91tLv91ypl77VKf8ieO3fO5QjIHXpPnnT3bGRkxI3AVULbY5Gc8fgmbGaH/y5SqaQDGP+JxGVyYCX8WKwNaw8B/A10tHW4B4/+bx8vArwstEzzWh+ygwxf2NHWp6XiaVvYMRZ5Ut+OZepJKfepr+e1+PWxDKp5xPNjaj14v465fKAP+TCuXx/L9AH1ZSyTMpZPqQdlPMqiroUxtB15TTXv+/g61k3q61kO6X3ZXO2Gnu0hZXxSyhmblHpS2pFqOWWg8KeONEpGe+0PH+eHnrXMzL3C38nMNh6tbW1u8Ru28sD8NQ6HkmI7D/TAoU6cHIDeIfvMRgBTodCzBowxPx1f3IdK+MQiOcOwZiqdko6Oz9yP9HwuVwnYWhsMgVVHAAsCcLZmqRMC+N8+Xgb6v33NU1euzL1YInoPGIuULyXEJk+q64OMZepJKdcxfJ71kWq9lpEn1bEpA2XdpLRj2afU63q1jLFDMr8+2rAOljXVvO+vy9qu3Hjap1S7y7XT7UEb6BdqT0i2FG0IxUU7QvL51sfr43WBan5WvMxsPf6GB7FBLo5i68dK0QG3PUfqeFI6v+iST//S6uaoYeuOX89slPvUunVutei/b85v6YGFB591dDi/y5cuuxMO1uqE+aV8uGK+GnDASNv0D9OC80H1B/cn3ZeW3PlhGR0bWZG9U2OTnPUn++WDDz9wyVmpiZMacOMNgbgj0NXR5Q5yHpw5vsl/SeDFw5eE5qNeHvTXlP6aah62jMc6ovS0JV0qu3Lj6OtiW30Z20YKO/Kki6nP99Xt0Loonm0A9X21D+0o8+2jfOnH6yZlHNCQjH7ajjLWrSntGAuUMlDN+3F8nR/D12t/X6fr1Tzt/Nj6GmhPW59qX+0HO99Wy/jPlvMZHHRz1U4eP+kSNxzsji90x451y6H2DjnQ8ok0Nja6hQc41QAbtaOXDaccYPXo6zt2uMTuQEuLHDmScAsQLl0en7UiMu7Py6jru379ulycmBAMeyJJW4ktUGKTnOGEgIb6BveDQ0+afQwBQ0Dc5OGGxkb3sgy9CPRQC3jYkOqXhfalvpSMvrDhFzL6Uk+qY2l7zZfjG1UH69FU87p+1kPq22lbX+f7wLaUTF8f4zImfVlmHNr5vlqufciT+nEo9ynsQrJQPbSjjnVQrqnmaQ9KH1LKaB9qj/aHHW19ypikvl77Iibj+naUaxstoz3rIaXcp77vgvQzQ3L96VN5DGc2zXWxOSTqsMn/fWNOG4ZH06leaWhski01NbLxuedk/fon3PuTQ6Mueduwwe3L9sWhDsldvOiSEhsiXZk3SyySM26lUVf3mmzdWiPfX/te7t6+tTIIWi2GQAUjwGFN7HPmvwj0f8isjOUAACAASURBVOaaxwtC/5fu6xBnLpnW4wXFeGwDyuRJtQ/bAEpe10sfUu1brp32YR1R7WI9pNo3JNN6HZu8pvQHpd9cMu0PH/qB0teXsUw9qfbRMtYBme/Lsqaa13HIk9IuquzLYU8f0JCebY2yow+ptgv5UgZaykfrYYe45cSmra4n5Mu6SWFDnhSyVG9KsJ8a47k2ZPJ/xxgGxXAo24qTDXDA++DQgGSGBt0QaV/6tCSPHZNDhw5J66etsr+5Wfbs3SO1tTXulAMmbDj1AIfB126vcwsRmvbtk7b2djl58rSMjo7I9K38sYkV/EhcM02LRXKGnjK8ANA9ixMCcML9xOTEmrkJ1lBDYLkQcJvQ7q13E175MCflw5pln1LvU/yt+TL6luop0D6apy9lKJcbB7b80ke3jzLEJs/6dD2UsQ0+pS+p1odkWr/Q2Lp9jBeSQUc9aKg9fhui4kTZMT5ja3/6aBntdHu0jD4hGXWsk+UQpT8pfXxKPamv17HBh+xK+Wid5hk3SsZ6aKfr1jztouKcSJ6Q3t5ThcQtyg4x9dfZneh3w6GYFI9zRF3PGobqM+p3lRkQPEv2Ne1zG71vee452bBx9kIEJHHohcOChC8Pfel66LAgAcOA1uM2v6d8bJIzrLLAmWZ79+6VY91JuXb92vyQMGtDIIYIdLZ1CoY13X/SJSb8z6XHQ5w2eLiTB9U8dNpW66J42ms9ZaCM6VPa01brqaMMZfK0p42m2g721NGXlHJtr2Wa1/XRn1T7axl9QjLqdB2a1z7kSX07lLUsFDskW4hPKE6oXSG7paovFBsyyknRrhA2bC/pfNpFH5/6MaiHnDxoqD1ONjToVhmmZ7aDYDzti+tCGUke9Y6quaiujN42b/Nc1u18h/B7GZD+dL/0pI5Jd6JbPv/8c/nzx81uztrunfVSW7fNnW/9uLft31zvG7b9wNw2bPuB+eGHDh92c+VwKgL2JbVPMQKxSc462tvdkmJMekwlU24VSvGlWskQqD4E0Kt8ui9d1LPChzYexprni4m06CFeYqgzZMeXASltQvWFZEvRBtYJqnnG9tsWZad90dZy7BibdC4fjYGuj20NyXRsn4+qj3ag+Pp2uh3Uk/ptoG2UnvbEbL52sGcdjAVKGanWaR+tJ0/KOFG+obbSR9eh/XVs+pNqu/nIGJM0Kg5OyOk//d+ut4s29CGlXFPN6+sCz3b6VCdv1LlpE26uW/7IKpT7zvS5U3qO/NeX0t7eJs0ffyzvNDa50S1MQXqpZqtbmIAVpUjkQLGPG4ZMcToCkrgPm5vls8863H5vp/vOuH3c/vHPf6zIasnVflvEJjnDrsm4wdjbJdWbXG1crX5DoGIQyGVz7oXGhzQpHqzgWfYp9T7lEAsp9ORJo+LqOsjTx68H5XJliMU4jAtKnnG0HWWaap6+Og7r8O1CtloGe99nsTLER3sYl20jpZzUbw/L1PuUelDN0471kFKuqeYZw5dRHqKh2CGZ9qWeFDrypGgDeVK/XSj7MtqSan1IxnZpu1Iy6KL0lGtKewxHumFJ5a/tWH9IxnZDR56UfpqSZ90oU+bozKkHaA/i8JsfLs3v1UZfLEzAnDiMfB040Crb6+rcsOhTT+UXJ5CyF86nb+54073zsZEs9izD0Cm/a32P09gkZ3/+8M+y/ul10rJ/n3z9t8rYRK5i3s7WkKpGAOfK8eGp/1OO4mELndZTxjiawk4/9Onn+1AOqnn6QkYelDaa9339Ovx2Uc9Ymmq+XDu2D77kSf14lINC5+t9Ge0hp0+pdvFaGZf+pJRrqvlyYrMO2s43Nv11veR1LMpIqSOlHDQkY/t8O5bpQ6rjaBnjkNKfFLbkQTUf5bMYO7aNFLHIk6JeJDiOlphWoPXw9dulr4WxtWxB1xe1KGEGO+zXxl63wcxZyZzNryQ9c7rPbSZ/pCshHR3t0traIh/9qVkaG/9Ddu/ZJa+/9rps27bN7eemN+EFjz3eMP/8tddel507d870wO2XtrY2+aKzU44lk26fNyxgwFw4JHWV+IlFcobjKjDXbN36pwXDm5f/cbkSsbY2GQIrjgCOf/nww/0lXyJ86PKBzAc3H+b6hbCYhzXjsT5S1ruY2OX4sp7Q9bEtuo2+ndaF6qOeOr8+yjXVPNswl4xxtZ3mS8VhG0npx5iklGuqefpr6utRDsm0j66PPCj9KEOZPPW08am2Q12+HmVfpn20LopnXK1njCgZ9aC00TxklJNqH9bpU2ebHpD+s/leVD8OYzAmaSgObX1KHz+2juF8ZuawaTvG0rICP5O8MQ6HTN0+brx3gwP54dqZo63ym/HmE9IMfhfouRsckJ6epHR2dUl720Fpbjkg+957X/bs3Sv1bzbI71/fIa+8us3NfcOh8tjnTSd1Tz75hJNhJSrmxdXX17sD6ffv3y84jaHryy7Xu4ceOpxV/OjRT8v+LI9FcoZ5NVilCbAnL07akU3L/rOxCtYKAlhhVb+3wb3YMLyAhyAflqD+8IWWad63YxwdS9tT79NQnJDMj6vjkIcN7bQsKh7lvg99QcnDRtuTJ6WdpprX/vCBjnqto0xTzZdqa6k40PHrx2NMX48yr8/nGYN6lrUdZZpq3q9P6zQPO5R9GesmnrpuP7bW+XFCsWmjY7MdpLTxqW4XbUNU2zGGXx/8aEcbTTUPW9aDYcF0Oh30ZTwdm36Mx7K2hY56Tcn78Ur5Qkc/2rGsKXk/tt8+2oHqeI7HUGlh1Sn2dsNq1Jlk7sTjYdZTvafkRO8JtxckRt4wXx0Hzm8MHIflD6c+fPRo2V8BsUnOarbVyG9/+5tlB8wqMATWEgKYf/mn5ma3wgoPMvzHygcdeMo0r/XkSbVdyJcyUPqQal/Naz15UNpoHjLKNdU82wAZ40XpaUsaspvrWqj3fVk3qdaHZLoN1IPST/MhGfX0ZbtItQ9lrNOntPUpY2s5ZaRaB55yUq1nvXPJ5tIjDmP5NMqX7QGljeYh03LEjfLxdeW2QdtpXtfNNpDOamMGqzVTku5NF9qnbRmXMk2j+JAPr137aBl5Um0XijeXnj6gjEkKX8d7q02pd744Agt7umFLEPS+IQ6GfwfPzhwuj1MUZhYwcB+4oYzzQZzjx1NuaLWzs0vaPzsora2t8tHHzdLU+B8r8gqITXKGvVWwysM+hoAhUIxAFsMB6j9y/Z+mfpiR13rypKEHpY7NGLTTOspIaUtKuaaaj7Kj3Kf09eUsU6+p5mkHGsVre/LatpQsSke5T3kPSLVe8yE926Tt/OvSOs3TF5SxyWs7zdOHMtpTDlquTMcgD6p5xvNlIbuFyhib7WaZmJBS7lP4aRl5xvP1Wl4qNuJA72zQa+TVwzLr01TzsKNtqfpgA7321Txj6HiU+XaUk1Lv+1KvKdtICh15tk/HI+9T32dW3TjLFNiwNy63MnPaY5Gc3Zq+5YY09+zeXfxWspIhYAhINnu+6EHKB5z+z1XzWk8eFDbaDg+5hcqWKk6pNuiHMOrzr4V63RbNl4o9l91c+oXE1u2nP+li6kOMUrF1HfwdRPnoOGzTXDLG13a+jLE0pb2WaZ4xtAw+KGtZyC4km8sn1J6QLBRby7QPedKoNrhTACJ6wnVs8oxH6mMCOeuiDakv98u+HfWgUTzbBUp/yuDDBIoy2ul4lGkKPeP5tpjf5stg68uwr5uL6Xrd8vxKvFZikZzhJHmMCWPynn0MAUPgMQLTN6flZPq/ix44+mEV4vUDSvN8aM1H5j8oUUYcxvIp26Pr0PxCfFmnT/26GTvUhpBvyI4yxCJPGiWbK7avR5kxSecTOyoeYlCneV/Gsk9L+Wid5hkjJIPOvz7fjnpS6MmTliNjXPiQB/V5xiSlXpcp8yltSKEnD0r7UpjQxqfwOXs2f9g5dL6eZV1PyI51g+LL9tE/5EMdbUkpJ6WclHJNNa/bQh+fanvN09eXwb8cGf1JfZ/HT9jl42KRnGF3YSRnjU2Ny4eURTYE1iACWBDQNHPwOf/7JMWDRz/sKCf19SxDT540Sob4fjxdJ/1JaavjaZ52fgzKfcp4vpxl6kkhJ09KW59SD0odZToO20obn9Inyo5ynzKOL9dlxialj6aa176ap40fBza+jLagmme8kEzHYTzI6EO970tbUujJk/o+KC9EthAf3f5SfFRbKY/yZZuSyROFBQGU0ZeUclAt07yuB3bah7qQDDrGIQ3Z+TLaRsWmHFTXgTjwZTzqtT101JP6PpRrqnkdj20FXYlPLJKzkeFhl5y1fPrpSmBmdRgCawYBJGd7G95x/y3qBw0eQPq/Qc1TF5LxweXrEDskoz1jkvq2LPtxKNdU86XiaTvN0wdUYwKbcu1CvpRFxQnFXkqZjx3bo+lc9REP2JEn1b6aD+lRJ2y0XUimfcmTal/Nl4qzEN9QvJBsrjaEfBYjC9WHeLxGUNhgeA6n4vT2nnQ6J1O9oGyD76vLrIsx6UM5KHVaRjsdi+2jnS5TBqp5xoGM9qTaDrKQL/19qn01T7uFylbiBRCL5Ax7j6DnrCuRWAnMrA5DYM0g0NmckL2Ne93qJP7nx4ceKHk8rMhrGvKhjFTH8Xk/Lnwoi/KnXreDMlDNl6rPt2N9pNQjhm6XXy/tfMo4pFqvecbzZWw79aE41IFST6rjaZ5xKdO+WsbYlGmqeT8edL6eZcb0fVAOtZv29NdU89p/Pj6MwbpJKfcp9aE6fFuW6UNKuaaaD8UOyXwf2vgUdthKoz99askwDl1LSIa26PaAj7JDO3lN2gcy7UOelDHpq+OEZLDnl3q/Ppap11TzjEMKHdq1Ep+KTs6+Gf1GMrn8SwPgDGUzMpQZmiVLHEnIH3fukmPdRyWXywl2RM8MZSTbl5VMdtD5QP515py7adls1v23ARn+60DspZQhFmIiNutYThliY7mwrmM5ZRoz1rucMo3jUt+rUDyN40rcv1AdC7l/6b60O3sOv/3+TL/7O2ja96E0Nr7rfoeoZym+I7mRBceh73BuODJGSBeSha6FdqSwieK1P9ulZT6v40CnfXxdlK/20TbaX/Paxvil+f3GDcfh8zl3gDgSh7hdW6Vez/T09LLnZxWdnJV79diEFr1na/0srXKv1+wMgXIRwLDmwbaD5ZqbnSFgCKxBBPBP8sTExBpsuTU5CoHYJGfo1rXkLOo2m7xaEUByhuNH7GMIGALxRQAjABctOYvVDY5Fcnb37m3pTVrPWax+mXYxS4JAV0eX29l6SYJZEEPAEKhIBJCcWc9ZRd6aBTcqFskZhjVP9J+wnrMF/wzMMa4IoOesvaMjrpdn12UIGAIibo7z5OSkYREjBGKTnOFsMRvWjNEv0y5lSRD44ot2+UvrX5YklgUxBAyBykTAes4q874splWxSM7u3bvnlhJbcraYn4L5xhGBzrZOaWtvj+Ol2TUZAobADAKWnMXvpxCL5AzDmrYgIH4/TruixSOQSHbKgZaWxQeyCIaAIVCxCLgFARcvVmz7rGHzRyA2yZltpTH/m28e8Uego71d2my1ZvxvtF1hVSNgPWfxu/2xSc6s5yx+P067osUjYAsCFo+hRTAEKh0BJGe2IKDS79L82heL5Oyn2w+kO91tCwLmd+/NugoQsAUBVXCT7RKrHgHrOYvfTyAWydmjR49kcnxSQO1jCBgCjxEYHR+Xb0ZHHwuMMwQMgdghcOPaDflxBY4Uih1wFXxBsUjOKhhfa5ohYAgYAoaAIWAIGALzQsCSs3nBZcaGgCFgCBgChoAhYAgsLwKWnC0vvhbdEDAEDAFDwBAwBAyBeSFgydm84DJjQ8AQMAQMAUPAEDAElhcBS86WF1+LbggYAoaAIWAIGAKGwLwQsORsXnCZsSFgCBgChoAhYAgYAsuLgCVny4uvRTcEDAFDwBAwBAwBQ2BeCFhyNi+4zNgQMAQMAUPAEDAEDIHlRcCSs+XF16IbAoaAIWAIGAKGgCEwLwQsOZsXXGZsCBgChoAhYAgYAobA8iJgydny4mvRDQFDwBAwBAwBQ8AQmBcClpzNCy4zNgQMAUPAEDAEDAFDYHkRsORsefG16GsMgZs3bwq+Dx8+XGMtt+YaAoaAIWAIxAUBS87iciftOhaEAJKwqatT0rTvXdm6das88+wzsvGZZ2TLluel4e0GGR8fl0ePHi0oNp3gP3VtSv75z39SNG/67bffyiu1r0qiKzFv39VwGDhzVmq318lnn31WdvW5bE5q67a56yzQ116Vbdu2Sa2iwKG1rU1+/vnnsmOboSEQBwRGR7+Rc31pSc98+2aoL+vr65M796fjcMlVew2WnFXtrbcLv3X7ljQ2Ncq/bfg3+e2LW6W1tVWOJBLy1Vdd0rS/UZ599ll54oknpPGdxkWB1fGfn8v6DRsk2Z1ccJzR3KhryxdftC84xko6pnpSrr379+8vu9q2gwedz6uvvioHDhwo+c0MZMqOa4aGQFwQSJ9OSyLRLblcTkZGRgXJWv6b5yG7cGFU8M/cYv+pjAtma/U6LDlbq3fO2r1oBNo7Olwy8Pym591Qph8QPTlIzvAdHR3x1WWXm/c3uxjd3Qvv9RobzydnbS1tZde7moa9vb3umueTnDU0NDifrs7O1Wy61W0IVCwCyWRS8L19+7ZroyVgFXurFt0wS84WDaEFWIsITE/fl5oXX3DJwFAm3AuDB18y1e1smt7bF3mZ129cd8OW6IkLfZCgIMEr1XP24N4DFwPz3UIP3JHhYRejo33les7u3btX8rr8awUOaD8+C+k5e3bTJneNI6OjfmgrGwJVjwASsu7uY4J/fH755ZeqxyPuAFhyFvc7bNcXRKClpSWfdDU2yqM5HnR/+/pvcu3ataI4ZzGn6pVXXAz2roG++mqtJBKJQoK1708fyPp165zd+qefdvPZeo/3uliYh/bxnz8W9NzpGBhm/ejD/UWLEi5cKE7Obty4Jv/+mxelre0vRe1CYeTCqKvnjT+84drx6aefuvLGDRvy9JlnZOPGjQVZTc3Lhf/E//Wvn+RU/4DU1dUVtQnz8Vo/bZWffvqpqL4fp3+U/717V7HtS1tl3wf7nKzcnjPgCwww/Is22McQMASKEbh8+bJ0dx+Vy+OXixVWiiUClpzF8rbaRc2FAJOhTC7cazaXP5IILBzo7+8vJFEtB/IJH2JPjk+6EAP9/W5iPGT1e+uls/OvbpEBFiL8rvZ3LiHZUlMjf7/4d2ePeEzW9BAmh1jhz8+Ouh2yc/uuQv2UdxzKD9fua87P98pmB6SzrVP++tc2V39nc0K6ur50E+3Rrjff3EFXSafThSTpXF+fk4+OjsrG555zcgyp8INrwJw9xNi1a5frNUOShQn8kOFbbnLG62tsXNz8PrbNqCEQNwTwd4j5ZvapDgQsOauO+2xXqRDA8ACTB87dUOqSLIYc6+v3Ov9s9nyRLXp8tr+63ekOHT5c0IWGNQczGWf36vbthV4rOoyMjDgdEqKfH+V7kfyeM9ii9w+9bDenb9DVUSRKuL50b7pIrgu96ZPOBonU5NUpp3r48La8vO0V13s1NFSctE7fnJb6PXvk5W3bCsngxYsXXf2ftHyiQ8uPN390Cyzmk5wljyVde9BD927ju9L0/vuCRO3dpnelsbHB8ZA1vfeeYLjVPoZAtSHwdeacG9bEYoBS30vfXKo2aGJ5vZacxfK22kWVQgDzopiclbKL0qHHCA/H0IeJWLuaG0aZP+cMyQ226gh90D4kZ0wesSABMt2bRtn7zS2FEGgbr42+BeUMc+fOHdfrhx46PVybmUkYo3qv2Lt1InnCRUIvHuoKLZb4c3N+nl25PWfYGoPtLkWRvOEa7WMIVBsC6NXmggBN0Zumy+hhs8/aR8CSs7V/D+0K5okAel6YAHAC+zxDOHPEGR+fkMHTJ6UrkZA/H2iWTb/e7GKXk5yxTiRRoxdG5Vh3t9u/a+/b+Z65DRufKSRnFy5ccHH1ggDM//rVr37lerqmp3904TKZQWfX2vI4YWM9oBNXJt1+bk+tWydn+/u1ytUNXJoa3xesmPyyq6uI/uVgPoHa15RfHLHjjTfkySeflB9uzt5PCVuSIFZzc3NRHVGFtxvell9v3izZTFaG0TOQzQkWQeCL5I+yb78diwphckMgtgjgH6pUKiVD2SG5ce2Gm0JAimcYvj/c+MHR23fDC5NiC05ML8ySs5jeWLus0gjUvbnTJQ9fdHaVNhSR4eFhGR65UOixQc/N/g8+ECQ4SECefXaTm2e1Z89ueaW21slCydnRo4/ni2B4FFtrvFTzkrNHrK2/3ermkH20//84GXrO7t7NL5kPDWui4c0ffeRsGRvDfi9s3ixYjep/Jicn5cUXtzj7z9qLN4dFe5r2feh06J16rW67vPba626+3O+3v+ooynWv1rrhVMSu2VYj69Y/LbdvzX4ZzHe15gu/+Y28+cZOv8lWNgQMARHB3y56x658N2F4VAkClpxVyY22yyxGIHOi3yUitbU1haSr2OJxaVf9TjdJ/86d/IpNTuTfu7e+aFgQHuhVQsIWSs70sCZ28IYdvhgeRMKHBIlDdpAjObt3L5+cjYzk91zTCwJQX3omDibm44M5ZGiv/8HKUMRD3NCwJer+6/v5Hrv+ZL5HDbJSH+Dw1FNPuP/WfTtcK+oqd1gTtth41j6GgCEwGwEsXMLw5WJ6+mdHNUklI2DJWSXfHWvbsiFw//59ebmmxiUQZwcGgvUgORnIZN2k97fqdzmbqamrbhhx85YXZ20rAYMdO3a4mHMlZ/v25ZO4/+qa3XP37fglF+OZOYY1UR+3oNhWs00mJi663rzD3iauuI6397ztYu7avbuQAPoXnepLy5NPPuUWPIQSsyuTV93QJ1eWtncccjGHhy/4oeRAywGnK2dYs/OLLmf7VdeXs+KYwBCodgTwt5hKpuRo91FbDFNFPwZLzqroZtulFiPQ1p6fQ4VtMUL/kXICPHp10NOFz8T4hEsk0EPlJzDonYItvqHkTJ8QwN3wdW8aW4ejoxBj/fqNhTlnnPyvFwTQHj1hsOcqTQyB6A9364dN1CIB2nMbDySl/ocLGyYv5uODYjuRA4F5ZdxOo5yeM/Reom3A2z6GgCFQjAD+Zjs7E25Ys1hjpTgjYMlZnO+uXVtJBG79OC3YCwybxG79983S2NQkB9s/k7aDbbK3Ya+bbI+kAWdrckduLALYXlcnTz75hGBfMyRtp/vOCI6CernmZUGPGnz0EB3O7ISs7vUdzu6b0VE5mjjqZFtfetEdZj4w9LU717O+vl5+vWmTbNjwtOuhu/H9dXcNoQUBvDgklthSA3VgUr3/4Wa5DY0Nbr7YgZYWOdDysXxy4BPJ8y2CzWTxOZbsdvVu2fSMHP6q0/UcYv4YkknMi/v4gw8K4ZGcHvy0xbUVOPb2ph0e77zbJOvW5+fjzZWc3Zr+0dWHtmMhBBLNxnfflX3781tpYA5dQ1ODNL3b5LbUOHrs8by9QkOMMQRijMDVqaszqzGPldxCg9tr/PBj/m85xpBUxaVZclYVt9kushQCWCn5zjvvuPlamAy/5YUtbgJ803tNMjKQFv+gFMwLa2trc3uCoaeppqZGdu58U46nemRsbMxt6vqnDz8qVHnt+2uCpOull7bKli3Py5EjR5wu2d8rO//wlls9iTrr6l6TlpZWuXHjunzySYtgk9nx8W+d7aUrl1051XuqEFczu3fvdsnZp5/OXqVZX79Hfr9jh2sXYmLTWVDIQPHF3mT8YHuPjz7a764P7UW7YXPoy8OzeguBzaEvu+TN2hqHG/DbW79benp6XD3/dbj0UOU/p6aK2sK2kbKNpKnuFJtp1BCoCgSuXLki2Obm63NfO3quLz1Dz8m5zBk5c66voO/LpOXu7btVgUvcL9KSs7jfYbu+eSGAJev4cmJ+KWfYwBbz18r5hGKj94nycmJE2SCZQe9TaDgyymcuOa/vzv3ZW2WEfO/P4BHSLYcMQ70Yyt303HOuRxA42scQMAQeIzA2PiZY4JNKp2Tymq30fIxM5XOWnFX+PbIWGgIlEUBPF4Y10YsXdfh6yQBrUJnNZtzWI9jPrePQIXlh8wtuIYOdHrAGb6Y1eckR+OXBLzIwMiDn+s4JNrseGx2TVOp4cG7tklduAZcEAUvOlgRGC2IIrDwCWF7fObPZK3rN9G7/K9+ala0RL5y+dH6RBmrGAgx9osLKtsZqMwQqC4GHj+4JFuzoBUD9/adcolZZLbXWRCFgyVkUMiY3BCocgYZ33nFDmUjMPv6k+HzLCm/6opuHIdf/TqcFPWfvvtckv3nhBTe8OT1d3hDsohtgAQyBCkcAidnExITgOKdsNutOGJi4aEObFX7bCs2z5KwAhTGGwNpCAEOYePByo9q11fqFtxbz9LDZb13d6zKQ7ZPJ8atuzpnrOQucVrDwmszTEFibCCAx604mZGR01A1l3nvwQNLpk+6kgbV5RdXXakvOqu+e2xUbAmsaAfSa4XQCnoqArUQw326LOih+TV+gNd4QWCQC+JvA3mg3rk25SJjygBMGqmnqwyIhXHV3S85W/RZYAwwBQ2C+CORyWbf1yLZttfK/3nhTWv/yqdsK5fqN/BFb841n9oZAnBBA7/JoblROp0/LwEC//O3/ZWV4ZFhGRkfidJmxvhZLzmJ9e+3iDIH4IsCtPkD5wUvJPoaAIZBHAAsD9Ef/rWi58ZWHgCVnlXdPrEWGgCFgCBgChoAhUMUIWHJWxTffLt0QMAQMAUPAEDAEKg8BS84q755YiwwBQ8AQMAQMAUOgihGw5KyKb75duiFgCBgChoAhYAhUHgKWnFXePbEWGQKGgCFgCBgChkAVI2DJWRXffLt0Q8AQMAQMAUPAEKg8BCw5q7x7Yi0yBAwBQ8AQMAQMgSpGwJKzKr75dumGgCFgCBgChoAhUHkIWHJWeffEWmQIGAKGgCFgCBgC/tg6awAACNtJREFUVYyAJWdVfPPt0g0BQ8AQMAQMAUOg8hCw5Kzy7om1yBAwBAwBQ8AQMASqGAFLzqr45tulGwKGgCFgCBgChkDlIWDJWeXdE2uRIWAIGAKGgCFgCFQxApacVfHNt0s3BAwBQ8AQMAQMgcpDwJKzyrsn1iJDwBAwBAwBQ8AQqGIELDmr4ptvl24IGAKGgCFgCBgClYeAJWeVd0+sRYaAIWAIGAKGgCFQxQhYclbFN98u3RAwBAwBQ8AQMAQqDwFLzirvnliLDAFDwBAwBAwBQ6CKEbDkrIpvvl26IbDaCExNTUkul5NsNuu+mUzG0ZDs5s2bq91cq98QMAQMgRVBwJKzFYHZKjEEDIEQApOTk5JMJsv6Xrt2LRTCZIaAIWAIxA4BS85id0vtggyBtYPAd999J93JhGS/zgp6xkp9Hz58uHYuzFpqCBgChsAiELDkbBHgmashYAgsDoGLFy+6XrORkdziApm3IWAIGAIxQsCSsxjdTLsUQ2CtITAxMeGSs+HhC2U3/dGjRzJ1bUquXr0q6E27d++efPPNqORyI/Lt+Ldy+/Zt+eWXX4rioQxbzHEbHR2VkZFhGR8fdzLfFr13GG7FB0OpsEU7f/rpJyeDPWxyuayLhXhow40bN5zfrdu3pNDGK5OujqLGiDgZ6kAc+xgChoAh4CNgyZmPiJUNAUNgxRD4rpCcld9zhsSnv7/fJXVIjFKplAwMDMq5vrR0d+fnryHx0p9Lly5Jb2+vJJPHJJvJyvnzw5JOn3QxciM5l0zRHr15ie6jcvHiqCSTKTk5Yzd9a9qZjFz4Rrq7j0p+8cJ5R3tSKenrO+PiIQHEZ2x8LB8/l5uVLF6e0V2duspqjRoChoAhUEDAkrMCFMYYAobASiPAnjOszkTP1p2HN+X+w9uOv3//vuB7586dot4nnZx1diZcLxrb/XiBQXfBB3HziVlSpm/mEyzYQ44kL5HoltHcKEMIh1qxUGFq4nEPGgzQFsjRXv35++iIkzufmeQM8bnYAbz+MLlEL599DAFDwBDwEbDkzEfEyoaAIbBiCCA5w4IAJDHoAUMSdTyVcj1W6I1KpXok1ZuSocxQoU06OUPPmf4wEUMsJkSX/3FZjiWTwSFE2PT19bn6mSiNjY5Jd/cxJ0Nd/Pzy4JdC7xuHOKlDubu72/lMXX3cGzaYyeRlMwkb7H+8+aOToUfukTf8ynhGDQFDoLoRsOSsuu+/Xb0hsKoIsJeqO5l0vVjoUQp9dU8VEir2PN28Wby9BnWp5OPkLJPJSrovHXmdiO16vK7lhyPRJiSMmVymyAfzwzqTSTeMWaSYKQxk+iWqJ0+3H0OuqG8sOxYKYzJDwBAwBMSSM/sRGAKGwKohgK00kKhcOD+/BQFIzpCAYZhRf9irhl63hw/vOdXX585IT0/KJVVnzp1xiRro6b4+J0uljruhzasziwDcnLNEtxve1LG/v3HdtTWbfdyLp/VIwDBEOvV9PsmD7u7tu9KdSLp5a7T9+sw56UomZOr7xz1s1Bk1BAwBQwAIWHJmvwNDwBBYNQQ45wxbaRSvr4xu0s8//+x6znpSPXLnTvFqRyZnGNa8dy8/z2tg4KycTp92Ky5RH79XvptwqyuvTFxyMqyyxMf1nLkFAReLGvHDTHI2lMkWyVkYHhrO98CpIUys7MS1IQGdnp52Q6sYYkVP3s9qyJQxjBoChoAhAAQsObPfgSFgCKwaAhzW1MN+5TSGPWfXrhX3nMGXQ54PH+Yn2yN2qWFNvz62CVR/MCctkeyMjNXbh7lySbddh/ZD7x561LBYAUOlsPFja3vjDQFDwBCw5Mx+A4aAIbBqCLDnbL77nA2c6pfu48fk/o37RW1Hzxl0x3qS8uDBz0737fi4m+CP5Mjf0wwG2BIDyRsm6uODxAkLAvwECrFhl0z2CHvZnIOI3L57yw2zIgkLbY9x7tw5GcoOuQUFPcmU3L//eNUoYxg1BAwBQ4AIWHJGJIwaAobAiiOABAg9SejdwhYa6GW6jy01ZrbP4JwybqmBBmLSfybT7xKdqAUBvcleYc8ZkirUgS82iuXHxcllXK8WettQxgdtSiS6ZiVn9EMChoQObUNsUOydxjq4zxntQbkIADbwtY8hYAgYAqUQsOSsFDqmMwQMgWVF4OJEfuXisWS320ID22agZwlbamDeGL7JREqOHU+6HjE0BnO1kEzl55wVD2siWXJDnmorDfhMXp50SVhPKp8cnc+eL2xCiwn63EYDtvmeM2xCWzysSSCu/vOqS8TQRvSkgfb0Hpe+vtNOHkrOMN8MG9cisbt0+RJDGTUEDAFDIIiAJWdBWExoCBgCK4EAdt3HcKP7Xs7TK5NX8hP1Zyj1OLKJH/CQs7eLclDqkKjpD8oYcvz76N9l9JsLMj7+nZug79tho1rE1hvWIg6GRGn74N4DN7cMdqgP8pHzwy75un7juq7W8T/f/dklmEjkcNSTfQwBQ8AQKIWAJWel0DGdIWAIGAIzCKB3LT8sORDEBL1o2OdM98LREHukYUsNf+806o0aAoaAIaARsORMo2G8IWAIGAIRCKB3DD1fWCzwww+P567BHAek87xNusMevWRI1nLDOTneg+097Lgm4mPUEDAEohGw5CwaG9MYAoaAIVCEACb/o/cMc8dAsTIUFF8kbnqYlbZ5+y7xj5oqCmwFQ8AQMAQUApacKTCMNQQMAUNgLgR+uHlDsOEshjHxxerLkQsXZPrW3SLXh4/uSeZvg85mODci/nmcRcZWMAQMAUNAIWDJmQLDWEPAEDAEDAFDwBAwBFYbAUvOVvsOWP2GgCFgCBgChoAhYAgoBCw5U2AYawgYAoaAIWAIGAKGwGojYMnZat8Bq98QMAQMAUPAEDAEDAGFgCVnCgxjDQFDwBAwBAwBQ8AQWG0ELDlb7Ttg9RsChoAhYAgYAoaAIaAQsORMgWGsIWAIGAKGgCFgCBgCq42AJWerfQesfkPAEDAEDAFDwBAwBBQClpwpMIw1BAwBQ8AQMAQMAUNgtRH4/9P/TzqTK36jAAAAAElFTkSuQmCC" width="430" height="342"></p>
<p>curve higher <em><strong>AND</strong> </em>to left of T<sub>1</sub> ✔</p>
<p>new/catalysed <em>E</em><sub>a</sub> marked <em><strong>AND</strong> </em>to the left of E<sub>a</sub> of curve T<sub>1</sub> ✔</p>
<p><em><br>Do <strong>not</strong> penalize curve missing a label, not passing exactly through the origin, or crossing x-axis after E<sub>a</sub>.</em><br><em>Do <strong>not</strong> award M1 if curve drawn shows significantly more/less molecules/greater/smaller area under curve than curve 1.</em><br><em>Accept E<sub>a</sub> drawn to T<sub>1</sub> instead of curve drawn as long as to left of marked E<sub>a</sub>.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>methanoic acid/HCOOH/CHOOH<br><em><strong>OR</strong></em><br>methanal/HCHO ✔</p>
<p><em>Accept “carbon dioxide/CO<sub>2</sub>”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>4</sub>(g) + H<sub>2</sub>O(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CH<sub>3</sub>OH(l) + H<sub>2</sub>(g) ✔</p>
<p><em><br>Accept arrow instead of equilibrium sign.</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>amount of methane = « <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>8</mn><mo>.</mo><mn>00</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>16</mn><mo>.</mo><mn>05</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac></math> = » 0.498 «mol» ✔</p>
<p>amount of hydrogen = amount of methane / 0.498 «mol» ✔</p>
<p>volume of hydrogen = «0.498 mol × 22.7 dm<sup>3 </sup>mol<sup>−1</sup> = » 11.3 «dm<sup>3</sup>» ✔</p>
<p><em><br>Award <strong>[3]</strong> for final correct answer.</em><br><em>Award <strong>[2 max]</strong> for 11.4 «dm<sup>3</sup> due to rounding of mass to 16/moles to 0.5. »</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Σbonds broken = 4 × 414 «kJ» + 2 × 463 «kJ» / 2582 «kJ» ✔</p>
<p>Σbonds formed = 1077 «kJ» + 3 × 436 «kJ» / 2385 «kJ» ✔</p>
<p>Δ<em>H</em> «= Σbonds broken − Σbonds formed =( 2582 kJ − 2385 kJ)» = «+»197«kJ» ✔</p>
<p><em><br>Award <strong>[3]</strong> for final correct answer.</em><br><em>Award <strong>[2 Max]</strong> for final answer of −197 «kJ»</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bond energies are average values «not specific to the compound» ✔</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>K</mi><mi mathvariant="italic">c</mi></msub><mo>=</mo><mfrac><mrow><mfenced open="[" close="]"><mi>CO</mi></mfenced><msup><mfenced open="[" close="]"><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub></mfenced><mn>3</mn></msup></mrow><mrow><mfenced open="[" close="]"><msub><mi>CH</mi><mn>4</mn></msub></mfenced><mfenced open="[" close="]"><mrow><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi></mrow></mfenced></mrow></mfrac></math> ✔</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>K<sub>c</sub></em> increases <em><strong>AND</strong> </em>«forward» reaction endothermic ✔</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Δ<em>G</em><sup>⦵</sup> = − <em>RT lnK<sub>c</sub></em>»<br>Δ<em>G</em><sup>⦵</sup> = − 8.31 «J K<sup>−1</sup> mol<sup>−1</sup>» × 298 «K» × ln (1.01) / −24.6 «J mol<sup>−1</sup>» ✔</p>
<p>= −0.0246 «kJ mol<sup>–1</sup>» ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1 max]</strong> for +0.0246 «kJ mol<sup>–1</sup>».</em></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Δ<em>G</em><sup>⦵</sup> = Δ<em>H</em><sup>⦵ </sup>− <em>TΔS</em><sup>⦵</sup>»</p>
<p>Δ<em>G</em><sup>⦵</sup> = −129 «kJ mol<sup>–1</sup>» − (298 «K» × Δ<em>S</em>) = −0.0246 «kJ mol<sup>–1</sup>» ✔</p>
<p>Δ<em>S</em><sup>⦵</sup> = « <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mfenced><mrow><mn>129</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>+</mo><mn>0</mn><mo>.</mo><mn>0246</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfenced><mo>×</mo><msup><mn>10</mn><mn>3</mn></msup></mrow><mrow><mn>298</mn><mo> </mo><mi mathvariant="normal">K</mi></mrow></mfrac></math> = » −433 «J K<sup>–1</sup> mol<sup>–1</sup>» ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award<strong> [1 max]</strong> for “−0.433 «kJ K<sup>–1 </sup>mol<sup>–1</sup>»”.</em></p>
<p><em>Award <strong>[1 max]</strong> for “433” or “+433” «J K<sup>–1</sup> mol<sup>–1</sup>».</em></p>
<p><em>Award<strong> [2]</strong> for −430 «J K<sup>–1</sup> mol<sup>–1</sup>» (result from given values).</em></p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«negative as» product is liquid and reactants gases<br><em><strong>OR</strong></em><br>fewer moles of gas in product ✔</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>reaction «more» spontaneous/Δ<em>G</em> negative/less positive <em><strong>AND</strong> </em>effect of negative entropy decreases/TΔ<em>S</em> increases/is less negative/more positive<br><em><strong>OR</strong></em><br>reaction «more» spontaneous/Δ<em>G</em> negative/less positive <em><strong>AND</strong></em> reaction exothermic «so <em>K</em><sub>c</sub> increases » ✔</p>
<p><em>Award mark if correct calculation shown.</em></p>
<div class="question_part_label">e(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(iv).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Ethyne, C<sub>2</sub>H<sub>2</sub>, reacts with oxygen in welding torches.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Ethyne reacts with steam.</span></p>
<p><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>2</sub> (g) + H<sub>2</sub>O (g) → C<sub>2</sub>H<sub>4</sub>O (g)</span></p>
<p><span style="background-color: #ffffff;">Two possible products are:</span></p>
<p><span style="background-color: #ffffff;"><img src="images/4c.PNG" alt width="316" height="190"></span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Product <strong>B</strong>, CH<sub>3</sub>CHO, can also be synthesized from ethanol.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write an equation for the complete combustion of ethyne.</span></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><span style="background-color: #ffffff;">Deduce the Lewis (electron dot) structure of ethyne.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Compare, giving a reason, the length of the bond between the carbon atoms in ethyne with that in ethane, C<sub>2</sub>H<sub>6</sub>.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Identify the type of interaction that must be overcome when liquid ethyne vaporizes.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the name of product <strong>B</strong>, applying IUPAC rules.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the enthalpy change for the reaction, in kJ, to produce <strong>A</strong> using section 11 of the data booklet.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The enthalpy change for the reaction to produce B is −213 kJ.</span></p>
<p><span style="background-color: #ffffff;">Predict, giving a reason, which product is the most stable.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The IR spectrum and low resolution <sup>1</sup>H NMR spectrum of the actual product formed are shown.</span></p>
<p><span style="background-color: #ffffff;"><img src="images/1civ.PNG" alt width="606" height="608"></span></p>
<p><span style="background-color: #ffffff;"><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Deduce whether the product is </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">A</strong><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> or </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">B</strong><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">, using evidence from these spectra together with sections 26 and 27 of the data booklet.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Identity of product:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">One piece of evidence from IR:</span></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">One piece of evidence from <sup>1</sup>H NMR:</span></span></span></span></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the splitting pattern you would expect for the signals in a high resolution <sup>1</sup>H NMR spectrum.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">2.3 ppm:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">9.8 ppm:</span></span></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest the reagents and conditions required to ensure a good yield of product <strong>B</strong>.</span></p>
<p><span style="background-color: #ffffff;">Reagents: </span></p>
<p><span style="background-color: #ffffff;">Conditions:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the average oxidation state of carbon in product <strong>B</strong>.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why product <strong>B</strong> is water soluble.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>2</sub> (g) + 2.5O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + H<sub>2</sub>O (l)</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">2C<sub>2</sub>H<sub>2</sub> (g) + 5O<sub>2</sub> (g) <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">→</span> 4CO<sub>2</sub> (g) + 2H<sub>2</sub>O (l) <strong>[✔]</strong></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/1bi.PNG" alt width="291" height="27"> <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<p> </p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Accept any valid combination of lines, dots and crosses.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«ethyne» shorter <em><strong>AND</strong> </em>a greater number of shared/bonding electrons</span></p>
<p><em><strong><span style="background-color: #ffffff;">OR</span></strong></em></p>
<p><span style="background-color: #ffffff;">«ethyne» shorter <em><strong>AND</strong> </em>stronger bond <strong>[✔]</strong></span></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">London/dispersion/instantaneous dipole-induced dipole forces <strong>[✔]</strong></span></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">ethanal <strong>[✔]</strong></span></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«sum of bond enthalpies of reactants =» 2(C<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">—</span>H)+C ≡ C + 2(O<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">—</span>H)<br></span><span style="background-color: #ffffff;"><em><strong>OR<br></strong></em></span><span style="background-color: #ffffff;">2 × 414 «kJ mol<sup>-1</sup>» + 839 «kJ mol<sup>-1</sup>» + 2 × 463 «kJ mol<sup>-1</sup>»<br></span><span style="background-color: #ffffff;"><em><strong>OR<br></strong></em></span><span style="background-color: #ffffff;">2593 «kJ» <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">«sum of bond enthalpies of A =» 3(C<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">—</span>H) + C=C + C—O + O—H<br><em><strong>OR</strong></em><br>3 × 414 «kJ mol<sup>-1</sup>» + 614 «kJ mol<sup>-1</sup>» + 358 «kJ mol<sup>-1</sup>» + 463 «kJ mol<sup>-1</sup>»<br><em><strong>OR</strong></em><br>2677 «kJ» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>«enthalpy of reaction = 2593 kJ – 2677 kJ» = –84 «kJ» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Award <strong>[3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">B <em><strong>AND</strong> </em>it has a more negative/lower enthalpy/«potential» energy</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">B <em><strong>AND</strong> </em>more exothermic «enthalpy of reaction from same starting point» <strong>[✔]</strong></span></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Identity of product:</em> «<strong>B</strong>»</span></p>
<p><span style="background-color: #ffffff;"><em>IR spectrum:</em><br>1700–1750 «cm<sup>–1</sup> band» <em><strong>AND</strong> </em>carbonyl/CO group present<br><em><strong>OR</strong></em><br>no «band at» 1620–1680 «cm<sup>–1</sup>» <em><strong>AND</strong> </em>absence of double bond/C=C<br><em><strong>OR</strong></em><br>no «broad band at» 3200–3600 «cm<sup>–1</sup> » <em><strong>AND</strong> </em>absence of hydroxyl/OH group <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em><sup>1</sup>H NMR spectrum:</em><br>«only» two signals <em><strong>AND</strong> </em>A would have three<br><em><strong>OR</strong></em><br>«signal at» 9.4–10.0 «ppm» <em><strong>AND</strong> </em>«H atom/proton of» aldehyde/–CHO present<br><em><strong>OR</strong></em><br>«signal at» 2.2–2.7 «ppm» <em><strong>AND</strong> </em>«H atom/proton of alkyl/CH next to» aldehyde/CHO present<br><em><strong>OR</strong></em><br>«signal at» 2.2–2.7 «ppm» <em><strong>AND</strong> </em>«H atom/proton of» RCOCH<sub>2-</sub> present<br><em><strong>OR</strong></em><br>no «signal at» 4.5–6.0 «ppm» <em><strong>AND</strong> </em>absence of «H atom/proton next to» double bond/C=C ✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept a specific value or range of wavenumbers and chemical shifts.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “two signals with areas 1:3”.</span></em></p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2.3 ppm: doublet <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">9.8 ppm: quartet <strong>[✔]</strong></span></p>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Reagents</em>:<br>acidified/H<sup>+</sup> <em><strong>AND</strong> </em>«potassium» dichromate«(VI)»/K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>/Cr<sub>2</sub>O<sub>7</sub><sup>2-</sup> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Conditions</em>:<br>distil «the product before further oxidation» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “«acidified potassium» manganate(VII)/KMnO<sub>4</sub>/MnO<sub>4</sub><sup>-</sup>/permanganate”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “H<sub>2</sub>SO<sub>4</sub>” or “H<sub>3</sub>PO<sub>4</sub>” for “H<sup>+</sup>”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “more dilute dichromate(VI)/manganate(VII)” or “excess ethanol”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award M1 if correct reagents given under “Conditions”.</span></em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">–1 <strong>[✔]</strong></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any three of:</em></span></p>
<p><span style="background-color: #ffffff;">has an oxygen/O atom with a lone pair <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">that can form hydrogen bonds/H-bonds «with water molecules» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">hydrocarbon chain is short «so does not disrupt many H-bonds with water molecules» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">«large permanent» dipole-dipole interactions with water <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>All candidates were able to write the correct reactants/products for combustion of ethyne, but a few failed to balance correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most drew correct Lewis structures for ethyne, though some drew ethene.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Surprisingly very few explained the difference in bond length/strength looking at electrons shared and just gave the shorter/triple or longer/single bond answer.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good to see that most candidates identified the specific IMF correctly.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates gave the correct IUPAC name.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates were able to calculate the Δ<em>H</em> of the given reaction correctly; a few inverted the calculations or made mathematical errors.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally well done, most common error was stating that the enthalpy change was “larger” without the indication that it was an exothermic change or the sign.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Interpretation of spectra was very good and the few candidates that lost marks with <sup>1</sup>H NMR data rather than IR, for example simply mentioning two signals for B. However, most candidates that attempted this question got full marks.</p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The stronger candidates were able to predict the splitting pattern correctly, others inverted the answer, but many others repeated the information for protons with the given chemical shift, which is unexpected since wording was straightforward.</p>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates seemed to be confused by the prompts, reagent and conditions, so often included the acid among conditions. Careless errors were common such as the wrong charge on the dichromate ion. Few candidates suggest permanganate as an option.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates were able to calculate oxidation state of carbon in B.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates did not understand that they must mention the IMF responsible for the solubility. Most candidates explained the polarity of the aldehyde and water but did not mention that this results in permanent dipole-dipole interactions; many did mention H-bonding. The mention of the lone pair on O atom and short hydrocarbon chain were very rare.</p>
<div class="question_part_label">d(iii).</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about ethene, C<sub>2</sub>H<sub>4</sub>, and ethyne, C<sub>2</sub>H<sub>2</sub>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Ethyne, like ethene, undergoes hydrogenation to form ethane. State the conditions required.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the formation of polyethene from ethene by drawing three repeating units of the polymer.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Ethyne reacts with chlorine in a similar way to ethene. Formulate equations for the following reactions.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </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>Under certain conditions, ethyne can be converted to benzene.</p>
<p>Determine the standard enthalpy change, Δ<em>H</em><sup>Θ</sup><em>, </em>for the reaction stated, using section 11 of the data booklet.</p>
<p style="text-align: center;">3C<sub>2</sub>H<sub>2</sub>(g) → C<sub>6</sub>H<sub>6</sub>(g)</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the standard enthalpy change, Δ<em>H</em><sup>Θ</sup><em>, </em>for the following similar reaction, using Δ<em>H</em><sub>f</sub> values in section 12 of the data booklet.</p>
<p style="text-align: center;">3C<sub>2</sub>H<sub>2</sub>(g) → C<sub>6</sub>H<sub>6</sub>(l)</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, giving two reasons, the difference in the values for (c)(i) and (ii). If you did not obtain answers, use −475 kJ for (i) and −600 kJ for (ii).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard entropy change, Δ<em>S</em><sup>Θ</sup>, in J K<sup>−1</sup>, for the reaction in (ii) using section 12 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine, showing your working, the spontaneity of the reaction in (ii) at 25 °C.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One possible Lewis structure for benzene is shown.</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-07_om_14.31.21.png" alt="M18/4/CHEMI/HP2/ENG/TZ1/03.d"></p>
<p>State one piece of physical evidence that this structure is <strong>incorrect</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>nickel/Ni <strong>«</strong>catalyst<strong>»</strong></p>
<p> </p>
<p>high pressure</p>
<p><strong><em>OR</em></strong></p>
<p>heat</p>
<p> </p>
<p><em>Accept these other catalysts: Pt, Pd, Ir, </em><em>Rh, Co, Ti.</em></p>
<p><em>Accept “high temperature” or a stated </em><em>temperature such as “150 </em><em>°</em><em>C”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2018-08-07_om_13.51.15.png" alt="M18/4/CHEMI/HP2/ENG/TZ1/03.a.ii/M"></p>
<p> </p>
<p><em>Ignore square brackets and “n”.</em></p>
<p><em>Connecting line at end of carbons must </em><em>be shown.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>ethyne:</em> C<sub>2</sub>H<sub>2</sub> + Cl<sub>2</sub> → CHClCHCl</p>
<p><em>benzene:</em> C<sub>6</sub>H<sub>6</sub> + Cl<sub>2</sub> → C<sub>6</sub>H<sub>5</sub>Cl + HCl</p>
<p> </p>
<p><em>Accept “C</em><sub><em>2</em></sub><em>H</em><sub><em>2</em></sub><em>Cl</em><sub><em>2</em></sub><em>”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em><sup>Θ</sup> = bonds broken – bonds formed</p>
<p><strong>«</strong>Δ<em>H</em><sup>Θ</sup> = 3(C≡C) – 6(C<img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAANCAYAAACgu+4kAAAAUklEQVQ4EWP8////fwYKABMFesFaB9qAfwwUuuAdA4uKgiJKMNx5cJ+BWDGGf28YGCmKhX83KPQCkwgDo7K8AlnpAORVBoZ/FHqBgYFCLwwKAwBbdR/JDJ9lrwAAAABJRU5ErkJggg==">C)<sub>benzene</sub> / 3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span> 839 – 6 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span> 507 / 2517 – 3042 =<strong>»</strong> –525 <strong>«</strong>kJ<strong>»</strong></p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for “+525 </em><strong><em>«</em></strong><em>kJ</em><strong><em>»</em></strong><em>”.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for:</em></p>
<p><strong><em>«</em></strong><em>Δ</em><em>H<sup>Θ</sup></em><em> =</em><em> </em><em>3(C≡</em><em>C) –</em><em> </em><em>3(C</em><em>–</em><em>C) –</em><em> </em><em>3(C</em><em>=</em><em>C) / </em><em>3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span></em><em> </em><em>839 –</em><em> </em><em>3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span></em><em> </em><em>346 –</em><em> </em><em>3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span></em><em> </em><em>614 / 2517 </em><em>– </em><em>2880 </em><em>=</em><strong><em>» </em></strong><em>–</em><em>363 </em><strong><em>«</em></strong><em>kJ</em><strong><em>»</em></strong><em>.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em><sup>Θ</sup> = ΣΔ<em>H</em><sub>f</sub> (products) – ΣΔ<em>H</em><sub>f</sub> (reactants)</p>
<p><strong>«</strong>Δ<em>H</em><sup>Θ</sup> = 49 kJ – 3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span> 228 kJ =<strong>»</strong> –635 <strong>«</strong>kJ<strong>»</strong></p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for “+635 </em><strong><em>«</em></strong><em>kJ</em><strong><em>»</em></strong><em>”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em><sub>f</sub> values are specific to the compound</p>
<p><strong><em>OR</em></strong></p>
<p>bond enthalpy values are averages <strong>«</strong>from many different compounds<strong>»</strong></p>
<p> </p>
<p>condensation from gas to liquid is exothermic</p>
<p> </p>
<p><em>Accept “benzene is in two different </em><em>states </em><strong><em>«</em></strong><em>one liquid the other gas</em><strong><em>»</em></strong><em>” </em><em>for M2.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>Δ<em>S</em><sup>Θ</sup> = 173 – 3 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \times ">
<mo>×</mo>
</math></span> 201 =<strong>»</strong> –430<strong> «</strong>J K<sup>–1</sup><strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>T = <strong>«</strong>25 + 273 =<strong>» </strong>298 <strong>«</strong>K<strong>»</strong></p>
<p>Δ<em>G</em><sup>ϴ</sup> <strong>«</strong>= –635 kJ – 298 K × (–0.430 kJ K<sup>–1</sup>)<strong>» </strong>= –507 kJ</p>
<p>Δ<em>G</em><sup>ϴ</sup> < 0 <strong><em>AND </em></strong>spontaneous</p>
<p> </p>
<p><em>ΔG</em><sup><em>ϴ </em></sup><em>< 0 may be inferred from the </em><em>calculation.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">c.v.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>equal C–C bond <strong>«</strong>lengths/strengths<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>regular hexagon</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>all<strong>» </strong>C–C have bond order of 1.5</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>all<strong>» </strong>C–C intermediate between single and double bonds</p>
<p> </p>
<p><em>Accept “all C</em><em>–</em><em>C</em><em>–</em><em>C bond angles are </em><em>equal”.</em></p>
<p><strong><em>[1 mark]</em></strong></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.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.v.</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>The photochemical chlorination of methane can occur at low temperature.</p>
</div>
<div class="question">
<p>The overall equation for monochlorination of methane is:</p>
<p>CH<sub>4</sub>(g) + Cl<sub>2</sub>(g) → CH<sub>3</sub>Cl(g) + HCl(g)</p>
<p>Calculate the standard enthalpy change for the reaction, Δ<em>H </em><sup>θ</sup>, using section 12 of the data booklet.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>«Δ<em>H </em><sup>θ</sup> =» –82.0 «kJ» –92.3 «kJ» – (–74.0 «kJ»)</p>
<p>«Δ<em>H </em><sup>θ</sup> =» –100.3 «kJ»</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Soluble acids and bases ionize in water.</p>
</div>
<div class="specification">
<p>A solution containing 0.510 g of an unknown monoprotic acid, HA, was titrated with 0.100 mol dm<sup>–3</sup> NaOH(aq). 25.0 cm<sup>3</sup> was required to reach the equivalence point.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The following curve was obtained using a pH probe.</p>
<p><img src="data:image/png;base64,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"></p>
<p>State, giving a reason, the strength of the acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a technique other than a pH titration that can be used to detect the equivalence point.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the p<em>K</em><sub>a</sub> for this acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.vi.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The p<em>K</em><sub>a</sub> of an anthocyanin is 4.35. Determine the pH of a 1.60 × 10<sup>–3</sup> mol dm<sup>–3</sup> solution to two decimal places.</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>weak <em><strong>AND</strong></em> pH at equivalence greater than 7<br><em><strong>OR</strong></em><br>weak acid <em><strong>AND</strong></em> forms a buffer region</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>calorimetry<br><em><strong>OR</strong></em><br>measurement of heat/temperature<br><em><strong>OR</strong></em><br>conductivity measurement</p>
<p> </p>
<p><em>Accept “indicator” but not “universal indicator”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«p<em>K</em><sub>a</sub> = pH at half-equivalence =» 5.0</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.vi.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>K</em><sub>a</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{10^{ - 4.35}}/4.46683 \times {10^{ - 5}}">
<mrow>
<msup>
<mn>10</mn>
<mrow>
<mo>−</mo>
<mn>4.35</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mo>/</mo>
</mrow>
<mn>4.46683</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
</math></span></p>
<p>[H<sub>3</sub>O<sup>+</sup>] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\sqrt {4.46683 \times {{10}^{ - 5}} \times 1.60 \times {{10}^{ - 3}}} \,\,\,/\,\,\sqrt {7.1469 \times {{10}^{ - 8}}} \,\,/\,\,2.6734 \times {10^{ - 4}}">
<msqrt>
<mn>4.46683</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>5</mn>
</mrow>
</msup>
</mrow>
<mo>×</mo>
<mn>1.60</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
</msqrt>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mrow>
<mo>/</mo>
</mrow>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<msqrt>
<mn>7.1469</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>8</mn>
</mrow>
</msup>
</mrow>
</msqrt>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mrow>
<mo>/</mo>
</mrow>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mn>2.6734</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mrow>
<mo>−</mo>
<mn>4</mn>
</mrow>
</msup>
</mrow>
</math></span> «mol dm<sup>–3</sup>»</p>
<p>pH = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" - \log \sqrt {7.1469 \times {{10}^{ - 8}}} = ">
<mo>−</mo>
<mi>log</mi>
<mo></mo>
<msqrt>
<mn>7.1469</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>8</mn>
</mrow>
</msup>
</mrow>
</msqrt>
<mo>=</mo>
</math></span>» 3.57</p>
<p> </p>
<p><em>Award <strong>[3]</strong> for correct final answer to two decimal places.</em></p>
<p><em>If quadratic equation used, then: [H<sub>3</sub>O<sup>+</sup>] = 2.459 × 10<sup>–4</sup> «mol dm<sup>–3</sup>» and pH = 3.61</em></p>
<p><strong><em>[3 marks]</em></strong></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">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.vi.</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>Limestone can be converted into a variety of useful commercial products through the lime cycle. Limestone contains high percentages of calcium carbonate, CaCO<sub>3</sub>.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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" width="538" height="218"></p>
</div>
<div class="specification">
<p>Thermodynamic data for the decomposition of calcium carbonate is given.</p>
<p><img 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"></p>
</div>
<div class="specification">
<p>The second step of the lime cycle produces calcium hydroxide, Ca(OH)<sub>2</sub>.</p>
</div>
<div class="specification">
<p>Calcium hydroxide reacts with carbon dioxide to reform calcium carbonate.</p>
<p style="text-align: center;">Ca(OH)<sub>2 </sub>(aq) + CO<sub>2 </sub>(g) → CaCO<sub>3</sub> (s) + H<sub>2</sub>O (l)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calcium carbonate is heated to produce calcium oxide, CaO.</p>
<p style="text-align:center;">CaCO<sub>3 </sub>(s) → CaO (s) + CO<sub>2 </sub>(g)</p>
<p>Calculate the volume of carbon dioxide produced at STP when 555 g of calcium carbonate decomposes. Use sections 2 and 6 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the enthalpy change of reaction, <em>ΔH</em>, in kJ, for the decomposition of calcium carbonate.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the change in entropy, Δ<em>S</em>, in J K<sup>−1</sup>, for the decomposition of calcium carbonate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the temperature, in K, at which the decomposition of calcium carbonate becomes spontaneous, using b(i), b(ii) and section 1 of the data booklet.</p>
<p>(If you do not have answers for b(i) and b(ii), use Δ<em>H</em> = 190 kJ and Δ<em>S</em> = 180 J K<sup>−1</sup>, but these are not the correct answers.)</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch an energy profile for the decomposition of calcium carbonate based on your answer to b(i), labelling the axes and activation energy, <em>E</em><sub>a</sub>.</p>
<p style="text-align:center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUkAAAFCCAYAAAB8TS9rAAAMe0lEQVR4Ae3aQWqVBxSGYXei4EKkmyjdQlyCXYFdgFmMc8eOHTt1muktf+EWKSa5CXyhefNcECW5HHOe8/NypX118iJAgACBWwVe3fod3yBAgACBk0h6CAgQIHCHgEjegeNbBAgQEEnPAAECBO4QeFQkb25uTscvLwIECNQFHhzJI45vX785vb+6Esr602E/AgQe9h9ujkAecTwi+dfHj0LpASJAIC/woE+S5zAekTwH8/rTdR7JggQIvFyBiyN5xPD8T+wjksdLKF/ug2NzAi9F4KJI/hzIA+YcyePPQvlSHhV7EniZAvdG8sePH/9+gjwT/RzJ42vHe/74/fd/fj+/x+8ECBAoCNwbyV8t+d9I/uo9vkaAAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgTuFPj8+fPp+tP1ne+57ZsieZuMrxMgkBH4/v376f3V1aNCKZKZx8AiBAjcJXBzc/OoUIrkXaq+R4BASuAcyj8/fDgdf77kJZKXKHkPAQIZgSOORySPf35fEspHR/Lt6zcnvxh4BjwDz/kZ+Pr1673xf1Qk753qDQQIEPifCnz79u3027t3py9fvlz0E4rkRUzeRIBAQeAI4/HJ99JAHjuLZOHydiBA4F6BI4zHJ8jjk+RDXiL5EC3vJUDgWQqcA3n8/5IPfYnkQ8W8nwCBZydwxPExgTwWFclnd24/MAECTykgkk+p7e8iQODZCYjkszuZH5gAgacUEMmn1PZ3ESDw7AT+Blr8tweMCM54AAAAAElFTkSuQmCC"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State how adding a catalyst to the reaction would impact the enthalpy change of reaction, Δ<em>H</em>, and the activation energy, <em>E</em><sub>a</sub>.</p>
<p><img src="data:image/png;base64,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" width="679" height="174"></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Write the equation for the reaction of Ca(OH)<sub>2 </sub>(aq) with hydrochloric acid, HCl (aq).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the volume, in dm<sup>3</sup>, of 0.015 mol dm<sup>−3</sup> calcium hydroxide solution needed to neutralize 35.0 cm<sup>3</sup> of 0.025 mol dm<sup>−3</sup> HCl (aq).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Saturated calcium hydroxide solution is used to test for carbon dioxide. Calculate the pH of a 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> solution of calcium hydroxide, a strong base.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the mass, in g, of CaCO<sub>3 </sub>(s) produced by reacting 2.41 dm<sup>3</sup> of 2.33 × 10<sup>−2</sup> mol dm<sup>−3</sup> of Ca(OH)<sub>2</sub> (aq) with 0.750 dm<sup>3</sup> of CO<sub>2</sub> (g) at STP.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>2.85 g of CaCO<sub>3</sub> was collected in the experiment in d(i). Calculate the percentage yield of CaCO<sub>3</sub>.</p>
<p>(If you did not obtain an answer to d(i), use 4.00 g, but this is not the correct value.)</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how <strong>one</strong> calcium compound in the lime cycle can reduce a problem caused by acid deposition.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>CaCO3</sub> = <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>555</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>11</mn><mo>.</mo><mn>09</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac></math>=» 5.55 «mol» ✓</p>
<p>«<em>V</em> = 5.55 mol × 22.7 dm<sup>3</sup> mol<sup>−1</sup> =» 126 «dm<sup>3</sup>» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept method using pV = nRT to obtain the volume with p as either 100 kPa (126 dm<sup>3</sup>) or 101.3 kPa (125 dm<sup>3</sup>).</em></p>
<p><em>Do not penalize use of 22.4 dm<sup>3</sup> mol<sup>–1</sup> to obtain the volume (124 dm<sup>3</sup>).</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>ΔH</em> =» (−635 «kJ» – 393.5 «kJ») – (−1207 «kJ») ✓</p>
<p>«<em>ΔH</em> = + » 179 «kJ» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award<strong> [1 max]</strong> for −179 kJ.</em></p>
<p><em>Ignore an extra step to determine total enthalpy change in kJ: 179 kJ mol<sup>-1</sup> x 5.55 mol = 993 kJ.</em></p>
<p><em>Award <strong>[2]</strong> for an answer in the range 990 - 993« kJ».</em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Δ<em>S</em> = (40 J K<sup>−1</sup> + 214 J K<sup>−1</sup>) − (93 J K<sup>−1</sup>) =» 161 «J K<sup>−1</sup>» ✓</p>
<p><em><br>Ignore an extra step to determine total entropy change in JK<sup>–1</sup>: 161 J mol<sup>–1</sup>K<sup>–1</sup> x 5.55 mol = 894 «J mol<sup>–1</sup>K<sup>–1</sup>»</em></p>
<p><em>Award <strong>[1]</strong> for 894 «J mol<sup>–1</sup>K<sup>–1</sup>».</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«spontaneous» if Δ<em>G</em> = Δ<em>H</em> − <em>T</em>Δ<em>S</em> < 0<br><em><strong>OR</strong></em><br>Δ<em>H</em> < <em>T</em>Δ<em>S</em> ✓</p>
<p>«<em>T</em> ><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>179</mn><mo> </mo><mi>kJ</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>16</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac></math>=» 1112 «K» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept “1056 K” if both of the incorrect values are used to solve the problem.</em></p>
<p><em>Do <strong>not</strong> award M2 for any negative T value.</em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>endothermic sketch ✓</p>
<p>x-axis labelled “extent of reaction/progress of reaction/reaction coordinate/reaction pathway” <em><strong>AND</strong> </em>y-axis labelled “potential energy/energy/enthalpy✓</p>
<p>activation energy/<em>E</em><sub>a</sub> ✓</p>
<p><img 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"></p>
<p><em><br>Do <strong>not</strong> accept “time” for x-axis.</em></p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em> same <em><strong>AND</strong> </em>lower <em>E</em><sub>a</sub> ✓</p>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Ca(OH)<sub>2 </sub>(aq) + 2HCl (aq) → 2H<sub>2</sub>O (l) + CaCl<sub>2 </sub>(aq) ✓</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>HCl</sub> = 0.0350 dm<sup>3</sup> × 0.025 mol dm<sup>−3</sup> =» 0.00088 «mol»</p>
<p><em><strong>OR</strong></em><br><em>n</em><sub>Ca(OH)2</sub> = <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math> <em>n</em><sub>HCl</sub>/0.00044 «mol» ✓</p>
<p><br>«<em>V</em> = <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mstyle displaystyle="true"><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>×</mo><mn>0</mn><mo>.</mo><mn>00088</mn><mo> </mo><mi>mol</mi></mstyle><mrow><mn>0</mn><mo>.</mo><mn>015</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup></mrow></mfrac></math> =» 0.029 «dm<sup>3</sup>» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1 max]</strong> for 0.058 «dm<sup>3</sup>».</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>Alternative 1:</strong></em></p>
<p>[OH<sup>−</sup>] = « 2 × 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> =» 0.0466 «mol dm<sup>−3</sup>» ✓</p>
<p>«[H<sup>+</sup>] = <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>1</mn><mo>.</mo><mn>00</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>14</mn></mrow></msup></mrow><mrow><mn>0</mn><mo>.</mo><mn>0466</mn></mrow></mfrac></math> = 2.15 × 10<sup>−13 </sup>mol dm<sup>−3</sup>»</p>
<p>pH = « −log (2.15 × 10−13) =» 12.668 ✓</p>
<p> </p>
<p><em><strong>Alternative 2:</strong></em></p>
<p>[OH<sup>−</sup>] =« 2 × 2.33 × 10<sup>−2</sup> mol dm<sup>−3</sup> =» 0.0466 «mol dm<sup>−3</sup>» ✓</p>
<p>«pOH = −log (0.0466) = 1.332»</p>
<p>pH = «14.000 – pOH = 14.000 – 1.332 =» 12.668 ✓</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1 max]</strong> for pH =12.367.</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>Ca(OH)2</sub> = 2.41 dm<sup>3</sup> × 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> =» 0.0562 «mol» <em><strong>AND</strong></em></p>
<p>«<em>n</em><sub>CO2</sub> =<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>750</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup></mrow><mrow><mn>22</mn><mo>.</mo><mn>7</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup></mrow></mfrac></math>=» 0.0330 «mol» ✓</p>
<p>«CO<sub>2</sub> is the limiting reactant»</p>
<p>«<em>m</em><sub>CaCO3</sub> = 0.0330 mol × 100.09 g mol<sup>−1</sup> =» 3.30 «g» ✓</p>
<p> </p>
<p><em>Only award ECF for M2 if limiting reagent is used.</em></p>
<p><em>Accept answers in the range 3.30 - 3.35 «g».</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>2</mn><mo>.</mo><mn>85</mn></mrow><mrow><mn>3</mn><mo>.</mo><mn>30</mn></mrow></mfrac></math> × 100 =» 86.4 «%» ✓</p>
<p> </p>
<p><em>Accept answers in the range 86.1-86.4 «%».</em></p>
<p><em>Accept “71.3 %” for using the incorrect given value of 4.00 g.</em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«add» Ca(OH)<sub>2</sub>/CaCO<sub>3</sub>/CaO <em><strong>AND</strong> </em>to «acidic» water/river/lake/soil<br><em><strong>OR</strong></em><br>«use» Ca(OH)<sub>2</sub>/CaCO<sub>3</sub>/CaO in scrubbers «to prevent release of acidic pollution» ✓</p>
<p> </p>
<p><em>Accept any correct name for any of the calcium compounds listed.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Enthalpy changes depend on the number and type of bonds broken and formed.</p>
</div>
<div class="specification">
<p>Enthalpy changes depend on the number and type of bonds broken and formed.</p>
</div>
<div class="specification">
<p>The table lists the standard enthalpies of formation, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H_{\text{f}}^\Theta ">
<mi mathvariant="normal">Δ<!-- Δ --></mi>
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi mathvariant="normal">Θ<!-- Θ --></mi>
</msubsup>
</math></span>, for some of the species in the reaction above.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-10_om_08.21.04.png" alt="M18/4/CHEMI/SP2/ENG/TZ2/04.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Hydrogen gas can be formed industrially by the reaction of natural gas with steam.</p>
<p> CH<sub>4</sub>(g) + H<sub>2</sub>O(g) → 3H<sub>2</sub>(g) + CO(g)</p>
<p>Determine the enthalpy change, Δ<em>H, </em>for the reaction, in kJ, using section 11 of the data booklet.</p>
<p>Bond enthalpy for C≡O: 1077 kJ mol<sup>−1</sup></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>Outline why no value is listed for H<sub>2</sub>(g).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the value of Δ<em>H</em><sup>Θ</sup>, in kJ, for the reaction using the values in the table.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The table lists standard entropy, <em>S</em><sup>Θ</sup>, values.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_15.07.35.png" alt="M18/4/CHEMI/HP2/ENG/TZ2/05.c"></p>
<p>Calculate the standard entropy change for the reaction, Δ<em>S</em><sup>Θ</sup>, in J K<sup>−1</sup>.</p>
<p>CH<sub>4</sub>(g) + H<sub>2</sub>O(g) → 3H<sub>2</sub>(g) + CO(g)</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard free energy change, Δ<em>G</em><sup>Θ</sup>, in kJ, for the reaction at 298 K using your answer to (b)(ii).</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the temperature, in K, above which the reaction becomes spontaneous.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>bonds broken:</em> 4(C–H) + 2(H–O)/4(414) + 2(463)/2582 <strong>«</strong>kJ<strong>»</strong></p>
<p><em>bonds made: </em>3(H–H) + C≡O/3(436) + 1077/2385 <strong>«</strong>kJ<strong>»</strong></p>
<p>Δ<em>H </em><strong>«</strong>= ΣBE<sub>(bonds broken)</sub> – ΣBE<sub>(bonds made)</sub> = 2582 – 2385<strong>» =</strong> <strong>«</strong>+<strong>» </strong>197 <strong>«</strong>kJ<strong>»</strong></p>
<p> </p>
<p><em>Award </em><strong><em>[3] </em></strong><em>for correct final answer.</em></p>
<p><em>Award </em><strong><em>[2 max] </em></strong><em>for –197 </em><strong><em>«</em></strong><em>kJ</em><strong><em>»</em></strong><em>.</em></p>
<p><em><strong>[3 marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H_{\text{f}}^\Theta ">
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi mathvariant="normal">Θ</mi>
</msubsup>
</math></span> for any element = 0 <strong>«</strong>by definition<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>no energy required to form an element <strong>«</strong>in its stable form<strong>» </strong>from itself</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>ΔH</em><sup>Θ</sup> <strong>« =</strong> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\sum {\Delta H_{\text{f}}^\Theta } ">
<mo>∑</mo>
<mrow>
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi mathvariant="normal">Θ</mi>
</msubsup>
</mrow>
</math></span><sub>(products)</sub> – <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\sum {\Delta H_{\text{f}}^\Theta } ">
<mo>∑</mo>
<mrow>
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi mathvariant="normal">Θ</mi>
</msubsup>
</mrow>
</math></span><sub>(reactants)</sub> = –111 + 0 – [–74.0 + (–242)]<strong>»</strong></p>
<p>= <strong>«</strong>+<strong>» </strong>205 <strong>«</strong>kJ<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>Δ<em>S</em><sup>Θ</sup> = Σ<em>S</em><sup>Θ</sup><sub>products</sub> – Σ<em>S</em><sup>Θ</sup><sub>reactants</sub> = 198 + 3 × 131 – (186 + 189) =<strong>» «</strong>+<strong>» </strong>216 <strong>«</strong>J K<sup>–1</sup><strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>Δ<em>G</em><sup>Θ</sup> = Δ<em>H</em><sup>Θ</sup> – TΔ<em>S</em><sup>Θ</sup> = 205 kJ – 298 K × <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{216}}{{1000}}">
<mfrac>
<mrow>
<mn>216</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span> kJ K<sup>–1</sup> =<strong>» «</strong>+<strong>» </strong>141 <strong>«</strong>kJ<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>Δ<em>H</em><sup>Θ</sup> = TΔ<em>S</em><sup>Θ</sup><strong>»</strong></p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{T}} = \frac{{\Delta {H^\Theta }}}{{\Delta {S^\Theta }}} = \frac{{205000{\text{ J}}}}{{216{\text{ J }}{{\text{K}}^{ - 1}}}}">
<mrow>
<mtext>T</mtext>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mrow>
<msup>
<mi>H</mi>
<mi mathvariant="normal">Θ</mi>
</msup>
</mrow>
</mrow>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mrow>
<msup>
<mi>S</mi>
<mi mathvariant="normal">Θ</mi>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mn>205000</mn>
<mrow>
<mtext> J</mtext>
</mrow>
</mrow>
<mrow>
<mn>216</mn>
<mrow>
<mtext> J </mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>K</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span><strong>»</strong></p>
<p><strong>«</strong>T =<strong>» </strong>949 <strong>«</strong>K<strong>»</strong></p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>award a mark for negative value </em><em>of T.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Dinitrogen monoxide, N<sub>2</sub>O, causes depletion of ozone in the stratosphere.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Different sources of N<sub>2</sub>O have different ratios of <sup>14</sup>N : <sup>15</sup>N.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">The Lewis (electron dot) structure of the dinitrogen monoxide molecule can be represented as:</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right: auto; margin-left: auto; display: block;" src="images/3d.PNG" alt width="373" height="54"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why ozone in the stratosphere is important.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Dinitrogen monoxide in the stratosphere is converted to nitrogen monoxide, NO (g).</span></p>
<p><span style="background-color: #ffffff;">Write <strong>two</strong> equations to show how NO (g) catalyses the decomposition of ozone.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State <strong>one</strong> analytical technique that could be used to determine the ratio of <sup>14</sup>N : <sup>15</sup>N.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">A sample of gas was enriched to contain 2 % by mass of <sup>15</sup>N with the remainder being <sup>14</sup>N.</span></p>
<p><span style="background-color: #ffffff;">Calculate the relative molecular mass of the resulting N<sub>2</sub>O.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Predict, giving <strong>two</strong> reasons, how the first ionization energy of <sup>15</sup>N compares with that of <sup>14</sup>N.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why the first ionization energy of nitrogen is greater than both carbon and oxygen.</span></p>
<p><span style="background-color: #ffffff;">Nitrogen and carbon:</span></p>
<p><span style="background-color: #ffffff;">Nitrogen and oxygen:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State what the presence of alternative Lewis structures shows about the nature of the bonding in the molecule.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State, giving a reason, the shape of the dinitrogen monoxide molecule.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the hybridization of the central nitrogen atom in the molecule.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">absorbs <span style="text-decoration: underline;">UV/ultraviolet</span> light «of longer wavelength than absorbed by O<sub>2</sub>» <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">NO (g) + O<sub>3</sub> (g) → NO<sub>2</sub> (g) + O<sub>2</sub> (g) <strong>[✔]</strong><br>NO<sub>2</sub> (g) + O<sub>3</sub> (g) <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">→</span> NO (g) + 2O<sub>2</sub> (g) <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Ignore radical signs.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept equilibrium arrows.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[1 max]</strong> for NO<sub>2</sub> (g) + O (g) <span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline;white-space: normal;float: none;background-color: #ffffff;">→</span> NO (g) + O<sub>2</sub> (g).</span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mass spectrometry/MS </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{(98 \times 14) + (2 \times 15)}}{{100}}">
<mfrac>
<mrow>
<mo stretchy="false">(</mo>
<mn>98</mn>
<mo>×</mo>
<mn>14</mn>
<mo stretchy="false">)</mo>
<mo>+</mo>
<mo stretchy="false">(</mo>
<mn>2</mn>
<mo>×</mo>
<mn>15</mn>
<mo stretchy="false">)</mo>
</mrow>
<mrow>
<mn>100</mn>
</mrow>
</mfrac>
</math></span> =» 14.02 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«M<sub>r</sub> = (14.02 × 2) + 16.00 =» 44.04 <strong>[✔]</strong></span></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two</em>:</span></p>
<p><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>have same nuclear charge /number of protons/Z<sup><sub>eff</sub></sup> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>neutrons do not affect attraction/ionization energy/Z<sup><sub>eff</sub></sup><br><em><strong>OR</strong></em><br>same <em><strong>AND</strong> </em>neutrons have no charge <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>same attraction for «outer» electrons <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>have same electronic configuration/shielding <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: bold;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">Note: </span>Accept “almost the same”.</span></em></p>
<p><em><span style="background-color: #ffffff;">“Same” only needs to be stated once.</span></em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Nitrogen and carbon:</em></span></p>
<p><span style="background-color: #ffffff;">N has greater nuclear charge/«one» more proton «and electrons both lost from singly filled p-orbitals» <strong>[✔]</strong><br></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><em>Nitrogen and oxygen:</em></span></p>
<p><span style="background-color: #ffffff;">O has a doubly filled «p-»orbital<br><em><strong>OR</strong></em><br>N has only singly occupied «p-»orbitals <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept “greater e– <sup>-</sup> e<sup>-</sup> repulsion in O” or “lower <span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">e– </span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">-</sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;"> e</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">-</sup> repulsion in N”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept box annotation of electrons for M2.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">delocalization</span></p>
<p><span style="background-color: #ffffff;">OR</span></p>
<p><span style="background-color: #ffffff;">delocalized <em>π</em>-electrons <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “resonance”.</span></em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">linear <em><strong>AND</strong> </em>2 electron domains</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">linear <em><strong>AND</strong> </em>2 regions of electron density <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “two bonds </span><span style="background-color: #ffffff;"><strong>AND</strong></span> <span style="background-color: #ffffff;">no lone pairs” for reason.</span></em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">sp <strong>[✔]</strong></span></p>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates sometimes failed to identify how ozone works in chemical terms, referring to protects/deflects, <em>i.e.</em>, the consequence rather than the mechanism.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates recalled the first equation for NO catalyzed decomposition of ozone only. Some considered other radical species.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>All candidates, with very few exceptions, answered this correctly.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates were able to calculate the accurate mass of N<sub>2</sub>O, though quite a few candidates just calculated the mass of N and didn’t apply it to N<sub>2</sub>O, losing an accessible mark.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students realized that neutrons had no charge and could not affect IE significantly, but many others struggled a lot with this question since they considered that <sup>15</sup>N would have a higher IE because they considered the greater mass of the nucleus would result in an increase of attraction of the electrons.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mixed responses here; the explanation of higher IE for N with respect to C was less well explained, though it should have been the easiest. It was good to see that most candidates could explain the difference in IE of N and O, either mentioning paired/unpaired electrons or drawing box diagrams.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates identified resonance for this given Lewis representation.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Though quite a number of candidates suggested a linear shape correctly, they often failed to give a complete correct explanation, just mentioning the absence of lone pairs but not two bonds, instead of referring to electron domains.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Hybridisation of the N atom was correct in most cases.</p>
<div class="question_part_label">d(iii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about sodium and its compounds.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">The Born-Haber cycle for sodium oxide is shown (not to scale).</span></p>
<p><span style="background-color: #ffffff;"><img src="images/3d.PNG_1.png" alt width="391" height="427"></span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Sodium peroxide is used in diving apparatus to produce oxygen from carbon dioxide.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2Na<sub>2</sub>O<sub>2</sub> (s) + 2CO<sub>2</sub> (g) → 2Na<sub>2</sub>CO<sub>3</sub> (s) + O<sub>2</sub> (g)</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Plot the relative values of the first four ionization energies of sodium.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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"></span></p>
<p><span style="background-color: #ffffff;"> </span></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><span style="background-color: #ffffff;">Outline why the alkali metals (group 1) have similar chemical properties.</span></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><span style="background-color: #ffffff;">Describe the structure and bonding in solid sodium oxide.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate values for the following changes using section 8 of the data booklet.</span></p>
<p><span style="background-color: #ffffff;"><br>ΔH<sub>atomisation</sub> (Na) = 107 kJ mol<sup>−1</sup><br>ΔH<sub>atomisation</sub> (O) = 249 kJ mol<sup>−1</sup></span></p>
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</math></span></span>O<sub>2</sub>(g) <span style="background-color: #ffffff;">→ </span>O<sup>2- </sup>(g):</p>
<p><span style="background-color: #ffffff;">Na (s) → Na<sup>+</sup> (g):</span></p>
<p> </p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The standard enthalpy of formation of sodium oxide is −414 kJ mol<sup>−1</sup>. Determine the lattice enthalpy of sodium oxide, in kJ mol<sup>−1</sup>, using section 8 of the data booklet and your answers to (d)(i).</span></p>
<p><span style="background-color: #ffffff;"><br>(If you did not get answers to (d)(i), use +850 kJ mol<sup>−1</sup> and +600 kJ mol<sup>−1</sup> respectively, but these are not the correct answers.)</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Justify why K<sub>2</sub>O has a lower lattice enthalpy (absolute value) than Na<sub>2</sub>O.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write equations for the separate reactions of solid sodium oxide and solid phosphorus(V) oxide with excess water and differentiate between the solutions formed.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Sodium oxide, Na<sub>2</sub>O:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Phosphorus(V) oxide, P<sub>4</sub>O<sub>10</sub>:</span></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Differentiation:</span></span></span></span></p>
<p> </p>
<p> </p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;"><span style="background-color: #ffffff;">Sodium peroxide, Na<sub>2</sub>O<sub>2</sub>, is formed by the reaction of sodium oxide with oxygen.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2Na<sub>2</sub>O (s) + O<sub>2</sub> (g) → 2Na<sub>2</sub>O<sub>2</sub> (s)</span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;">Calculate the percentage yield of sodium peroxide if 5.00g of sodium oxide produces 5.50g of sodium peroxide.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the enthalpy change, <em>ΔH</em>, in kJ, for this reaction using data from the table and section 12 of the data booklet.</span></p>
<p style="padding-left:90px;"><span style="background-color: #ffffff;"><img src="data:image/png;base64,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"></span></p>
<div class="marks">[3]</div>
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why bond enthalpy values are not valid in calculations such as that in (g)(i).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">An allotrope of molecular oxygen is ozone. Compare, giving a reason, the bond enthalpies of the O to O bonds in O<sub>2</sub> and O<sub>3</sub>.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why a real gas differs from ideal behaviour at low temperature and high pressure.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The reaction of sodium peroxide with excess water produces hydrogen peroxide and one other sodium compound. Suggest the formula of this compound.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the oxidation number of carbon in sodium carbonate, Na<sub>2</sub>CO<sub>3</sub>.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">k.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="392" height="260"> <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<p><em>Notes: Accept curve showing general trend.</em><br><em>Award mark only if the energy difference between the first two points is larger than that between points 2/3 and 3/4.</em></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">same number of electrons in outer shell</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">all are s<sup>1</sup> <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[</span>✔<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">]</span></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«3-D/giant» regularly repeating arrangement «of ions»<br><em><strong>OR</strong></em><br>lattice «of ions» <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">electrostatic attraction between oppositely charged ions<br><em><strong>OR</strong></em><br>electrostatic attraction between Na<sup>+</sup> and O<sup>2−</sup> ions <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><em><strong>Note: </strong>Do <strong>not</strong> accept “ionic” without description.</em></span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</math></span></span>O<sub>2</sub>(g) <span style="background-color: #ffffff;">→ </span>O<sup>2- </sup>(g)</p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">«ΔH<sub>atomisation</sub> (O) + 1st EA + 2nd EA = 249 k Jmol<sup>−1</sup> − 141 kJmol<sup>−1</sup> + 753 kJmol<sup>−1</sup> =» «+»861 «kJmol<sup>−1</sup>» <strong>[✔]</strong></span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">Na (s) → Na<sup>+</sup> (g)</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">«ΔH<sub>atomisation</sub> (Na) + 1st IE = 107 kJmol<sup>−1</sup> + 496 kJmol<sup>−1</sup> =» «+»603 «kJmol<sup>−1</sup>» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">lattice enthalpy = 861 «kJ mol<sup>−1</sup>» + 2 × 603 «kJ mol<sup>−1</sup>» −(−414 «kJ mol<sup>−1</sup>») <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«= +» 2481 «kJ mol<sup>−1</sup>» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;font-weight: bold;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">Note: </span><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-variant: normal;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">Award [2] for correct final answer.</span></span></em></p>
<p><span style="font-size: 14px;"><em><span style="background-color: #ffffff;"><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">If given values are used:<br>M1: lattice enthalpy = 850 «kJ mol<sup>−1</sup>» +<br>2 <span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">×</span> 600 «kJ mol<sup>−1</sup>» −(−414 «kJ mol<sup>−1</sup>»)<br>M2: «= +» 2464 «kJ mol<sup>−1</sup>»</span></span></em></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">K<sup>+</sup> ion is larger than Na<sup>+</sup></span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">smaller attractive force because of greater distance between ion «centres» <strong>[✔]</strong></span></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Sodium oxide:</em><br>Na<sub>2</sub>O(s) + H<sub>2</sub>O(l) → 2NaOH (aq) <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Phosphorus(V) oxide:</em><br>P<sub>4</sub>O<sub>10</sub> (s) + 6H<sub>2</sub>O(l) → 4H<sub>3</sub>PO<sub>4</sub> (aq) <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;"><em>Differentiation</em>:<br>NaOH/product of Na<sub>2</sub>O is alkaline/basic/pH > 7 <em><strong>AND</strong> </em>H<sub>3</sub>PO<sub>4</sub>/product of P<sub>4</sub>O<sub>10</sub> is acidic/pH < 7 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">n(Na<sub>2</sub>O<sub>2</sub>) theoretical yield «= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5.00{\text{g}}}}{{61.98{\text{g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5.00</mn>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>61.98</mn>
<mrow>
<mtext>g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span>» = 0.0807/8.07 × 10<sup>−2</sup> «mol»</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span><span style="background-color: #ffffff;"><br></span></p>
<p><span style="background-color: #ffffff;">mass of Na<sub>2</sub>O<sub>2</sub> theoretical yield «= <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5.00{\text{g}}}}{{61.98{\text{g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5.00</mn>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>61.98</mn>
<mrow>
<mtext>g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span></span> × 77.98 gmol<sup>−1</sup>» = 6.291 «g» </span><strong> [✔]</strong></p>
<p><span style="background-color: #ffffff;">% yield «= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5.50{\text{g}}}}{{6.291{\text{g}}}}">
<mfrac>
<mrow>
<mn>5.50</mn>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>6.291</mn>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> × 100» <em><strong>OR</strong> </em>« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.0705}}{{0.0807}}">
<mfrac>
<mrow>
<mn>0.0705</mn>
</mrow>
<mrow>
<mn>0.0807</mn>
</mrow>
</mfrac>
</math></span> <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> 100» = 87.4 «%» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Award [2] for correct final answer.</span></em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>∑Δ</em><span style="background-color: #ffffff;"><em>H<sub>f</sub></em> products = 2 × (−1130.7) / −2261.4 «kJ» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">∑Δ</em><em>H<sub>f</sub></em> reactants = 2 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> (−510.9) + 2 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">×</span> (−393.5) / −1808.8 «kJ» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;"><em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Δ</em><em>H</em> = «<em>∑</em><em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Δ</em><em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H<sub>f</sub></em> products − <em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">∑Δ</em><em style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H<sub>f</sub></em> reactants = −2261.4 −(−1808.8) =» −452.6 «kJ» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Award<strong> [3]</strong> for correct final answer. </span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[2 max]</strong> for “+ 452.6 «kJ»”.</span></em></p>
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">only valid for covalent bonds</span></p>
<p><em><strong><span style="background-color: #ffffff;">OR</span></strong></em></p>
<p><span style="background-color: #ffffff;">only valid in gaseous state <strong>[✔]</strong></span></p>
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">bond in O<sub>3</sub> has lower enthalpy <em><strong>AND</strong> </em>bond order is 1.5 «not 2» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “bond in ozone is longer”.</span></em></p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em></span></p>
<p><span style="background-color: #ffffff;">finite volume of particles «requires adjustment to volume of gas» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">short-range attractive forces «overcomes low kinetic energy» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">NaOH <strong>[✔]</strong></span></p>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">IV <strong>[✔]</strong></span></p>
<div class="question_part_label">k.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Generally well done with a correct plot of ionization energies.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority answered correctly stating same number of valence electrons as the reason. Some candidates stated same size or similar ionization energy but the majority scored well.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates lost one or two marks for missing “electrostatic forces” between “oppositely charged ions”, or “lattice”. Some candidates’ answers referred to covalent bonds and shapes of molecules.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance with typical error being in the calculation for the first equation, ½O2 (g) → O<sub>2</sub><sup>−</sup> (g), where the value for the first electron affinity of oxygen was left out.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates earned some credit for ECF based on (d)(i).</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Average performance with answers using atomic size rather than ionic size or making reference to electronegativities of K and Na.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>An average of 1.1 out of 3 earned here. Many candidates could write a balanced equation for the reaction of sodium oxide with water but not phosphorus(V) oxide. Mediocre performance in identifying the acid/base nature of the solutions formed.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority earned one or two marks in finding a % yield.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The average was 2.2 out 3 for this question on enthalpy of formation. Enthalpy calculations were generally well done.</p>
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority of candidates referred to “bond enthalpy values are average”, rather than not valid for solids or only used for gases.</p>
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates recognized that ozone had a resonance structure but then only compared bond length between ozone and oxygen rather than bond enthalpy.</p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few candidates could distinguish the cause for difference in behaviour between real and ideal gases at low temperature or high pressure. Many answers were based on increase in number of collisions or faster rate or movement of gas particles.</p>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Na<sub>2</sub>O was a common formula in many candidates’ answers for the product of the reaction of sodium peroxide with water.</p>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The vast majority of candidates could correctly state the oxidation number of carbon in sodium carbonate.</p>
<div class="question_part_label">k.</div>
</div>
<br><hr><br><div class="specification">
<p>Ethane-1,2-diol, HOCH<sub>2</sub>CH<sub>2</sub>OH, reacts with thionyl chloride, SOCl<sub>2</sub>, according to the reaction below.</p>
<p style="text-align: center;">HOCH<sub>2</sub>CH<sub>2</sub>OH (l) + 2SOCl<sub>2</sub> (l) → ClCH<sub>2</sub>CH<sub>2</sub>Cl (l) + 2SO<sub>2</sub> (g) + 2HCl (g)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard enthalpy change for this reaction using the following data.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard entropy change for this reaction using the following data.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAuYAAABNCAYAAADq3aFXAAAgAElEQVR4Ae2dD3RU1b3vvxkpVQzBsqTlRCxcEgnXG6olKa3WpROiQYs+eUTwVsgEw2qxRUsvJUmDeJ9VhAeTG2oLVuybmBCkBZwslcdVIgm5FtsLd+LVwnthIvBAYIZeXEhI5H9mv7XPnHPmnDPnzP9JZpJf1sqac/bZfz+/3977d/bZfzIYYwz0RwSIABEgAkSACBABIkAEiMCAErAMaOqUOBEgAkSACBABIkAEiAARIAIigWHEIfUIZGRkpF6mKEdEgAgQASJABIgAESACSSEgT2AhwzwpeOOPVBZQ/DFRDEQgfgL8ZZF0Mn6O/RUDyau/SA+NdEif0kvOJK/0lhdNZUkv+VFuiQARIAJEgAgQASJABAYpATLMB6lgqVhEgAgQASJABIgAESAC6UWADPP0khfllggQASJABIgAESACRGCQEiDDfJAKlopFBIgAESACRIAIEAEikF4EyDBPL3lRbomAROA8utrqUV30NJq914hKwgj40NvVhvrq/47y5hPxxdrbhbb6ahSVN8MbX0xpFpp0M2qBRa0rCdTTqDNLAYjAQBAYOu0KGeYDoV/9mmYvOmqLwFdp59Z2QGvCXYO3+SnxWUaQ8XAF3o5/xZu15cjOyPD7ychGUfXv0dzWhV6zMvAO5s1alGfLYTKQXV6LN3VhrnXUIpfHm1uLDm2mAG8zysU0n4rQ6OSdVLsur1NQXrsVbV3nVTmNlYUqCvWlz4uOt7egtnyKxIeXeQaq65t16QK41oHaXP68CLUdenon0Fyei4yMXHNjsHc/aouykTGjHl0+noluHGxchbXtMrxL6Kqfi4yMh1HbcU6dyzS45rrWbMCxDV29YmF1ZYhFNyPVER96Dm7DwrUHdGmGu/Wht2MdijKyMaP+EMRc9xxE48K1aJeD+g6hfkY2MorWocOwXLLHVP3lHeNWrZyyy1H7ZrtOTnrdVJcnwjjirS/qJPl1SrdLAPS6os8/zqGj9mFkZMxFfdclAHo9Tef6H1RYxcHn7UBzUB9UH9y+SiG4/7d1/U9GUTXqm/U6qiQR+iKo3Q3t3f90cMoiXMlj7tMjrJvBfZ4+RwZtsN6L4X0Kyouf/El/qUUA4DvTJeqvh7nsVn66K8uxu9hVTbRXmce5SHwGm5N5lGfdrNNRwQTA/yzoV2DWmhbm6VMCiBd9nhZWYxUiCnPVZWc5PN4cO3NpM8WYx8lsYpqLmNOjf6hNk7HLzNP6PLMG5VHOewmraT3J/FmNhYU+Pem+5wBz2PJNysrTVqfLGLvqYvYc7m5ldlePLtLPmNOWw4AcZnN+pnvGby8yt2MOAwpYVesZ6bkcRsWou5VVCWAocTC3TjYGkUbllFidVCcdRn7WOubqURcmFt0Mk4ZGVnKdMJOFOu+q675O5igRGIQa1tot5VfWY6Vu9bHu1homQGAljk5JJ1VxJPAy4fLqO8laa0rM9d36PGv1XJZKYKCb/Ek0ccRVX7QgU79dYoE2T9EVXRncDlYCMKGqlXWLjwz0NC3rv7ac6rvQcpvJ7K4vVN77WE9nA7Px9s+sL9DoqCqo6aVRu2vqWfsgibLQJmR8l/D6b5yMxjWWPj20jPV2hkm7IufCqA2Wn4X7TTF50Yi54RvUUHbkb50O/GRhPbzIh83+Htw9feIe1qzPA1dDFazwon11ORY0SCODHJfvEBoWlGN1uxeCbT32eS77w/S40WK3QRDD1ODX7Z8nFK6vazMWFD+Pdp7Xur3w9DEw1oce93uw2/IBtGD1/A1oP2808hprVs6h49VfYuGmg4Bgg73FjR7G02Xo8+xDQ1WJP93if0KDOLoVazpSuPN/hmPFdkAowYzC0eaRZX0LM8oKgJZX4EgwZ/NE43ziO4p312wUR5UFWwM6RV27DE/r87DyqNvtWL6tyz8Cjdh0M/k64sP59k1Y0eKFUHY/CrPMmlULsgrvR5ngRcuKTQnWyTjlEDL4JXQ1/BOKV7eI+l63z4M+Ud+74W6pg03gcnoe83+9F+rvU9ooExGHNsaI7gZFu/Q52h2voAUFKJvxLWSZFTwd679ZWXAJh9/9vdifQKiAo7Nbal9bUGPlCrcTlcubpa+H/IuIC6/+pAabvFxF69Di9vtn7DI8rk2o4mHan0fxgs2BMKZpSw8ibXeN4hlUsjAqYALcElo3I22DTfKdavIK9yJBz/ufQGLfdqMcJZbfOjWjM2oGl9lJ52L/aLoyOiiPBIIhaISTj5R1MkdFDXO85VJG2WN5u1bnwn99hrVWFTBAYFb7PqYfh+5zN7CKqtfYWy5PQkfM+6TRK+0Itip3fceYs8I/mq6McMU8AqhiqxlNMxo9kEfR1CNrqnzFcZlYnVRlROGi+6JjpIdGbqqo+NeTYN2MVkdkhtGMmMtp6MIEjZjzzMpyU3/90BQiITcJlZc8mgT9KCXPKh9VXMqqHDuYK9SIebRxKHoRyxcmGaGq7qR0uxRmxFxhp/o6xoz0VHZLo/oviyroN9Bvab+qyqPYUH2dMnLTRth30skqxNH0SOudSnc07W4f63G/x+zy11JrFWtwudm+oK/SyZOFtmTGdwmt/8ZJBLlG16er+EZYNwNtp7oeyNkwaYNZesrLbGjH5LWCnAc9gV4P3Af4UjUrls6dZjA6Mxy33D8bZXzQwvsXfPTpBQAX8OlHfxEXuOXMvBd3ZOrUyjIZFY5VqHi0AILuUVw8rx3HR84OAHmYWXQ7MnWRWSaVw7HmR3i0QEDikvWh9+RhiDOQc/4Rc++9WZcqAMutuH/eIxAROT/Cp/I08GCfEbichWtXC7wQUHLf7fhGyBDD8I38aeDj9d6m3XAl9CtByIRjf2i5EaNzOCngSOVyPCvPz+c6s8sjjpJ51kz362EsutkfOnL+r9jVxPVwKu7LHxOGxRjk3zcVQAeadv01xAhzmGj68fG1Tz+CkzcJOVYU3XGTLuXrManiX7Cm4mEUCMN1zwK3iYgjEFukV4OhXfLhvGs3mjj/kmnI/0aow7rTsP6binIYRo6W6tKROix7Vl7bxPVtm/9rrGcVpotfp3px0n1UjClnaSnuNfhiZbnlXszjXxPRAedHx3VrrYwyYdzu+k69hSXWB1HJv5byv/a1WPBINTb8p/5L8GCShRGfeN0SXDdN2uB0lVfi7JV45UThk07gSGUhvqIs5OQLEb+C7NKN2nS/PIfT4hYSeZiYfb32mXyXmY28KdyYOoEDx78A8AWOH+A7WOTg+xO/jlBdhxyF8nukEoVfCSwU5YtUM7JLsUnxEOLizHEcOMKfh8irSfCIWBiG9eHLc2f9u2x8fyKyDQtrQea4XEzh4Y8cxvEzasu8HZWFI1WLRXnZv4nSTWJBglP0fY5jH3sAZOPOCTeHfcGwjJ2AO8U3gsM4dvpKcHyp5mKZhLkvr/ZPh0AL1i4sRXHeKGRk8MW7W/B2h1eaxgIgFt2MQ0ciReU7fQwf8zoj5GLCWHPj1B/fcIydkOt/afv4GE4ncoZVpBmOyt81nDl+GKJ2mup7uAjjiSPK+qLJSvq1S5rsizdXcPrYYbG9Ee6cgLFheuy0q//BBZZcrsekuf8Mhzgd0Yv2tT9GaXEeRmZImwm83QGvUncu4txpvuA9VP+TiXF5E8W4jxw4jjOm6UoPDNvdSzi864+o53Xd+jxaxemal+HZfCc+2yIZ6qp4B48sVIWK5DKiPj2OummQB+M2OH3lFaaaGxAgJyJgSuACTp/7MmBImfpL9IOzONejNn4THf8Axuf7EmeP8J5gJMaMMnlRUmdvxCiMGcEdzuBsWjCxIHNyOV7vcOEtB1+/IP8dxKbKeZhVWIIn6w+a7wIkew/7mzwd8fWc9RuuI0Zj1IhwTaoFI0aNhiiiI2fRoxgXYQsw8B5On4s/v4mII2oS6dwuXUPPWb8ZOWLMKL/ehCp/2tX/EIXJzEfF6y1wvfWaf4645NW7qRJzZhWi4MlGHErW7kZG7a7vGPZu3cvfwFFS9jis4hei4RCmL8ZzVXw0Xvc3mGShK1ribhNTNw3b4DSWV7heJHH8KaYBJ5Bjd+GqtEiRL1Rk7Co8zkXafN14E8aKMwvcOOrh23IZ/ClTCm7FlPFfA/A1jJ9yK59AgSNnozTMc+xwXfUvnPTniYF5nLAZJBvkNGY8puRw1+iN0IhYBCXIHSy48abR4ognPjwKj+H7gHq6Sy7Gj1EPq1thd/X4P8UqsvgMTptYkOAUlRHf4EeDycUiFODRijXYw5n0uNHqlDvjg9i0Ygv282k5sehmHDoSGV/VaHBkAdLM1zCMGZ8LUTtjfpGIJ44o64uGbvq1S5rsizfyyGLwkyHhYhFQ8OiPsGYPn9bWDXerEw5xcT3g3fRbvL7/LIAbcNNYPsXqCD48+l8m01RU012mjEe4CWcwancVY13/9fJ6jBozckiII6JCRtSnx1E3gzJh0gansbzIMA8S8hB3UKaptKPulRacChrRu4JTu5v9cx6FuzD1Nj72NwK3Tb1LNFaP7PwAnwSNYnyOtuU/N9jvOE7Ww8ZjaikfqXBj557/Gzyqer4NyxcG76EeX6rqaSqNeOWd48FfCHwnsPuNHf7Pz6VTcZvaLo82ccWwjDZgOvj34XzbcmmffHl/ZgCZkzB99o/wUu1Sv0Eor2WIRTeTriMqozMdkMeQx2G3TUUpf1k/0o49n+j3yOcyfAkLg84M0CaUiDi0MUZyNxjaJdmAiaS8g8jP+TZUi2dhqM4FQBYmTZ+NipdWwS6+KcrzxVXTVOpexzungqfw+U59gDfEdSAFKJ06Pvx0S6N2V1kP48HHxz5XtfuX0H2mZxDB74+iJLJumrTBaSwvMsz7QwfTKQ0+53dVpTilwFv/NObXNKHDKzV0/ECdxucwv3SDuBjRunQWpokLbSzImjYLS8UtqZbikcW/w35VmP3rfoH5q19G5Zwn8Iyy9V0UUHxe7F8nH3TEDzlqlg40GY1pc+f5t2+sXIjF6z5U5h36vB9i3TNLsLq+EnOKV2BbLNsWmqRrmTQbq+wzARxEfemPUdO4X5XufjTW/Bil9XzO4UwsnTvVYAFtFGVXGpcenOk2+YKhju5CN87w9bgYg9Ej43kjUEearGt5+0Ae/3aseMkR0Jveg9j0m0b/FBH5BTAm3YxfR0RdUg6RmoHq5kOal0DLyNH+F4gLZ9F9IehNVgfPhwvdZyGKKGc0RqZDC5w1FXOXcn3ficpHlmDdfnne/xV49/8Oz8xfgfrKf0TxM2+ab0WXiDh0JNW3xjJKcrsEXv4NgcPUipajWTzQLH6dC5QtsAjywpluv94EHgZfpVX9D86+4iJvXwe+tehqvKzo3Hkc2vQK6sRFD7KRzeejL4Od9z/eDSid/xwalbUp/DCyJtTMf1qaGz4Pc6eNBkzadiV9o3bXMgH3PH6P+GW4pWkr2sU+7gq8bRvw4lq++Fv3N1hkoStWYm4TWzcN2+B0lpe82Qz9pg6BxG51FNh2amAPGAITbA2sUzosJvKtlS5Lh7L4t7nyb1Wo3pYu3OEx+czmOCBtpRgNC3k7J5N0++2AIXkbKP2hNLJ7PqtwHlMOq1G2clS2skyMXidWJ9V5Um1xaHgwiFp+PFwyDhhSpyHLHUyocLKTfRJnkeeX0kFPuu26lO3s5jCH+2KgcLK7sJg5T8qH7wS2dlO20gyESNhVwuUV7nAgoYI5Ov1H3zBmrJthDxhSxxHVdomhZRT6EJNY26WrjEnyFeUob+WpbK0XTbvE1Vo6HEyjK1wdAvqoPTgs4O7XU7/qpF/9N1f5wBaHxocGqfsTzinyA4ZkdiZtu5glWYe17a5hnoRZzPaEf3tcdR+bLFmYEws8SXj9D0RtehV5nx44NDCaumnarvAcyfUH2jY4XeXF57rSX4oRSGylisYYVYPg+3/uYdvtNtUJoAKzVr3GnK3uoD3DlZA9bta63a49gc1apdnDnPuNpRKLja+rjlmDTsg0z2tgD3OeahwsDNPtZu7WPwb2tBUNyxJW5XCyVrdspEhkojI0FJqajllvyMmNWqCDkjucdNvH+DLzuHYwR5X2ZEnBZmfbDXXNXN7mumkeRqsjqhMq1YaiKJIvmMs+kwE6w1wxRPV7JMvGmdrwlzt8vV+1zOO/TmwbIufHTN/Ve5j7/QbrZpRxxFxfTGSU1HaJNy37mJ2feqwY5ry8UeiccoKxWlckZrLRoX/Zll+WFD1N1/ov60bwb5/Hxd5yVGlPdhZszL59D3NrTgSWwprJ2Wnin8vIsG03Y8llGtjHXLDVsRb3SYPTtc3CB5cxGS7Jqf+hcxpbn87rTmQ2A0/dvF0xa1fTU15kmIfWtQF5OhCVakAKGmWicqXUHHseZRyxeB+odJW8mnXMigf5wqxxkp/H/ks6KRvZRi89UXTCEcsydlnxkENTXqFkFB/PkKFlAxnJetmKtF5H6i9kaQwfDlZ9Ctm2B9XVwMAO1F825JcyzYBR8mRhKCCd42CVl66YqlujNjh95UWGuUq0qXI59CpVePKBBlT9yTx8uHh9DFS62nzLo4BhOn65IylxMHefNoZ474a2TqoMPtV0LA1TuXPWj2pqPMmdh/bzuMZLgm6GnrwikFGC2GqiUYxyg5Fujcd4buRRXaOXQlW8VP9VMMJfhm/b9e1uQA68fgX9q431JMoifMmG6It5UBucvvIiwzwSLe9nP0OvUw0DWKlw/WuUK5+nlU/FYfKZzMdSQ6+fzhJIUp6rHcZ4DwSI6mro6mSgcQ9MGTJCJxvdIfj3HWPOinzVUeJG8STGbWjJK1IZJYZtIBbZcEumUS6nJo3Amr74Uf2XSUX0G2mfEtTu8ml3Tt30RT7F06GavphcWURSvqFV/2UiRm1wesorgxcpMatsKZZEEeCnX5JYZJp8O7YVmFy82n/apuicA5tzDxpn873Tk/U3UOkmqzzxxTt0dfJztFU/iGLNrguL4PSsx2whdXe9GVryGiAZ8S39JhdjrXhSslS/bE54Gmf7zzmIr8qlVOjBpU+Dv20fXPJKqaqQlMzo5UWGeVIwxxepXkjxxUahiUD8BEgn42fYnzGQvPqT9uBPi/QpvWRM8kpveaXDLrrpRZhySwSIABEgAkSACBABIkAEYiCgjJjzNyz6IwJEgAgQASJABIgAESACRKB/CchTmDWTJGXH/s0KpaYnQJ+h9ETofqAJkE4OtASiS5/kFR0v8h2aAOlTaD6p9pTklWoSCZ0fvbxoKktoXvSUCBABIkAEiAARIAJEgAj0CwEyzPsFMyVCBIgAESACRIAIEAEiQARCEyDDPDQfekoEiAARIAJEgAgQASJABPqFABnm/YKZEiECRIAIEAEiQASIABEgAqEJaBZ/hvYa29OLFy/ixIkTYuARI0Zg3LhxsUVEoYgAESACRIAIEAEiQASIwCAmkNQR8z+983v8Q46AvLw88f/WW2/FD2yL8eXFi4MYKRWNCBABIkAEiAARIAJEgAhETyBKw9yH3q52vFlbjuyMDPAtXjIypqC8divaus5rU+/dj3nzq3Dpxm9iY2Mj9u7dgydmWfFu0ytY+fa/a/3SHREgAkSACBABIkAEiAARGOIENAcMhdvH3HeqGT/6TinqvQbUhAo42tahYnIW+PSV/73+p5hb1YCGxkbc9b3vKQHmP/YgTvq+ib+8txnjaVqLwkV9od/TUv2MronAQBAgnRwI6rGnSfKKnR2FDCZA+hTMJJVdSF6pLJ3gvOnlFYVh/jnaqh9E8doOCLYGtG0ow+RMC3zeD/HyL5/C0k0HIVQ48R+/n40v3c3Iu700OHWVi7Xs59izaZ3KhS5lAnohye70SwQGigDp5ECRjy1dklds3CiUMQHSJ2MuqepK8kpVyRjnSy+vKKayXMS50+cACJhy33cxKdMf1CJ8H8/8rBw5ALzvuuDu9eHWCQ9h29oFYg62O51wu93K/3em/B2Ef7gPDat+YZxDciUCRIAIEAEiQASIABEgAkOQQBSG+Rjk3zeVm99oWTgHT9Y2o8N7RUQ2rGAZDjMG5lmF6VkW3HDDDXj4yQrcOvImLF/zClwHD+LChV5sefVX+I8D/w8//MUymsYyBJWNikwEiAARIAJEgAgQASJgTiCKqSwAeg+ifvEPsXDTQSlGAdaqX+Hncx/GIwUC9FY+35Xl3kd/rEn9vllPYOeW/4Ubb7hB4043AQL6zxqBJ3RFBAaGAOnkwHCPNVWSV6zkKJwRAdInIyqp60bySl3ZGOVML6/oDHMxxivwdrTg3W2/xcK1LVIa+bA5/oANFfnI1KV69uxZdHZ24m9/+xvy8/MxadIknQ+61RPQC0n/nO6JQH8TIJ3sb+LxpUfyio8fhdYSIH3S8kj1O5JXqktImz+9vGIwzAMR+rz70fTr57BANNDnwOHehIpJ1wc80FVMBPRCiikSCkQEEkiAdDKBMPshKpJXP0AeQkmQPqWXsEle6S0v/ewT49J4m1Eu7lk+F/VdlxQ/FmEayp+tRpXAnc7gbM815RldEAEiQASIABEgAkSACBABIhA5gcgM8xtvwljR+N6LpoY/weuTEziPQ2++gSa+r7lwF6beNkJ+QL9EIH4CvftRW/R9VLd9HhyXz4uOxmoUyQddFVWjscMLRTXFEHzaVROqi7Klw7BmoLpxv0p/g6MVXXq70FYfiDu7fB3e1x+gZRKUnJNN4Dy62upVMs2AVj58W9dCSd7yIWjq30KVPsWoHwD418LG6hlSOtkoqm5SFsMnm8DQjj+c/P10tPLJQEZRNerf7tDV/Rjl7zuE+hlym6LWLe3A1dCWU7JKzw85bEO9UvcykJFdjtr3u9BrmuQVnGp+GtnZy9F2XttDaPUklnp8Dh21DyO7ug26IxZNczN0H/jQ27EORQZyACKsixH1+8GE45dzcJxJdWHSHwD50uD3MjvpXMwEgHF/wf8lrKb1JOszCElO0RMILYvo40vLED0HWEPVLHY3ClhV6xltEfqOMWeFldkcB1iP+KSbuZ01zIo5zOG+KPn162yOrYF19nDN7GM9biersuawEkenua6KcRcwa5WTucVwjPV5WliNdRazu77Q5mMI3aWGTkrtkGBjdfs8fhn2edi+OhsThMXMefKyuUR69jG7NYdZ7fskneljPa46ZlWHk2Wv+DGOru+kk1XkVDBHZ7ffQ08nc1aVMJQ4mDtFGsHUkJcxv9hdI5S/LMeqTczl4TpxmXn2rWc2Qd2WxC5/1t3KqgR1WxN7idIlZKrok1j3hHxmq9vLPGJdk2WbzyqcxwzbdX8YMAg1rLVbVUHFNqFAFU7SL2sdc0ltf2j5dLPOhipWcrfAhKpWJrUGoYP009NUkVeguH2sp/MNVlVSECwH3jdH0hZH1O8HUlSu4pazElPSLvTyUqxx/YPgHFxmHtcO5uAdkGKcC8xa9Rp7yyV1ksGByCUGAuFlEUOkaROE69kmVmV7me1zvcZKggzzPtbdWsMEfSPLzrDWqoJAAyl2nuqOmAMwCyvDkZ5rDHz+7CJzO+aklOEl57i/flNCJ/s6maPEoBM0c1fgfMFc9pkMmg5Xpy+i33D6wT0ZhWPMb6zp9U3JQL9fpIS8El1qMznr3PvcDlZiUocDBpSRHCORfyR+El3wgY8vNfRJaoeD2n4zd8ZYzwHmsN3NrFa9QWgiR8N+I5h/n2cfa6hazOz79hq3ScFB+tUlNeQlFbnPw1wNNcxm38NcvB8Nkl8kddFEXmbtsULbJFyEclaiSfKFXl7DIh+OHw6h4GFU8P81kYcin0QgGgK+rs1YsOwEqrfUoLBns0HQs3DtagHK1qIwSz0T62ZMX+OCRwzhw3nXbjShBJsLR6visCBr+ip4/J5U7vLlFZw+dhheIRcTxg6XHQEMx9gJuRBa3sPew09gEi1wVrHpx0vLZFTs8qDCJEnvx8dw2gdo1AL88+nrWFZ5GlWtZSiQDkYzicLv7D2MY6evAFkGC9nP/xW7moCyzd9CljqSrOlY43GpXeg60QQikr8PY08exgEhF9UGdRgrdsP1rBXTNcLTZTSU/CG1EVMexLhIdEkXNd3GQ+B6TKrYBmbaAOjr7Tl0vPpLrBj2FBqf2IH2/xFp2h58fOxz+HBz0BbQYgy+Q2hY8AIOV2/EysIeNEQa7ZD0dwldDcuw7PACbFn5PfQ0vBIdBaUu9kbQ70cXNRBGztFGl0D/assmgdFSVEQgNgKW7IfRsOM5TBfUhrEqLt/nOPbxOUzJGwGPaq6xdp6x3Hn+HUZ52gPzEcPORVSlY3h5FO6T5jMZDYOQYz8RGIGSx+9Grr5F851Ayyv1cFcsx8+sN6vyMhrT5s5DXlMzdp/yH5QGnxeu3X9Fnn0Z5pq8fPlOH8PH3onIG3VKtQ5hCsprd6GrVzt/VZUYXSadgCx/qe6bpSd39IhN/kAvTrqPQhh7As1PTpHWGHD5Bw7cM0ua3JNMoORB3JMrv0xLL+R1E7D+hUcx/jp92hZkTZuFpXkteGP3CWlt0hV4XX/C/rxKrJo7ydgo59FYxuGhhj9i1fRbzP3okxuy98OR/dA67Fj1AAR926wwiaAuRtTvKxGqLuKQsyqW/r40RdXfGaH0iIBIIPPrEEKNRPV64D5wAb1NNViy+1b8vNUDxvrQVTMam3+wHM2ikeXvPNG7BcuW/AkTfr6DT9kC66rE6M2LsKT5uG6RqMxeGhmXb5XfMJ294o8u+p/AFZx6az1WHHgQi2ZMDOoofYdbsbH+qyibdy9u0bR2FmQW/AQbV/4XSsd91W9gXTcOxR2zsXHptKDzGPzl8qGXj8biKJqWPY/dE36GVq5X7EPUjN6GHyx5C6fINu9nFdDLX6r7YXMRi/z5ql//wEDeLXej/PUD/naFfYhnJ7qw7IkN6KCXs7DkE+3Bd+pfsWZFJyoWFQdezHtdeHXZB5i5YyVm32IyyJM5DUs3/hQnSyfgOnETga8iu/j/oGzjT8J8WcuEIL7aPWcAAAxCSURBVOhPbEl0qQZLfBZkCl83aU/lMkZQFyPq9+X4dL8xy1kXTz/earqqfkyXkiICcRDw4s/Dy/DblfJbuAWZk2eivPTf8fRv9gZWx/95DMp+Wx0Yfc+8HY+V34V3n96Idt3qfH9mLMiyLsL6h1rw4v9slXZwuALvfgfWbD2Du+PIMQVNBgEfeg/9Acuf/hQLNtdgVlAHfAmH976HFus8zJ2mntLE88J3U3gM1n+bic6ePsnA6kbn4x/iB0824lBIA8uD4WWrsVIZMcvC5MfmofTdVfhNu8EOQskoOsXJreQw8g8FKUb5i9NpDmOPZgQwC5Puvx/T3HYs39Zl8tIfKi/0LGYCvQfRsHwVji6ow8pZ4/0v5r7jaF7yU+ycWYOnCm4yidq/Q0ix9UM83tkt1f8+9HTOxL/9YDHqD9EeKybgkuAcaV2MsN/X5DA95UyGuUaIdJMuBIQ7J2CsRnszMS5vIuR5xmI5guaKW5A5LhdTlM/ZBqW1jMfsl7dg+ejNKLiOb4X2CH7d+R288HIZMjEReeNopMSA2gA4caOsCYun1wIr/wXLFSNZlRXfMezd+hFKyh7Ct/VfYc5/hG11p1FWPhOTlWeSgf3+b/H6/rOqiPSX2bhzgm7+aWY28qack+am6v3TfeIJmMnf3w6ETS8u+RvELsofOOD2hNi2zyAcOcVOoPcg6hf/ECvwDH63vFiaKsG/oNjx9NF5qH2qMMRI7Vns3/YG3GXz8NhkecGBPMDzCVa87goM8MSeQwoZCYEo6mJE/b4mzfSUs8a00ZQnRW98XfWYkZGL8uYTKZrDQLbSKa+BXKf4Vda3MKOsIEwmR6NwRgnErffD+DR8nDkJDyxrhEecprALa8oLMdLjX1CmXRRqGJock06Af8X4nWSU/wEbKvINO2Df4T9ja8tNwUY0pMXB/PwF/Z9oYHnQtOuvBh2zBVmF96MsZsXSJ0b3sREIJX+z6WhSSuLL+jD/4vCo5R9bbilU4gn4vB9inWiUL0PbhrLAy7XvKHZtbIa3fSkKR14nrQG4AXkLtwPe1SgeNQ4z6g/BJy7i7jDImDTA07QbLsOvqgZByCkOAhG2xRH1+wbZSFM5p5Fhzg8WaEbNohVoMeCfWk7plNfUIhc+N1nI++73gKCGk88tPQXrA/nItliQmVeIh9CCXS71yKc0R9h6F+7INp53KL5MBR2A4J9jjrL7dTvBhM8t+UgwAd8ptC1/BNnffQdj1283NcoBaRqLUIIZmp15eH5CGNjiXMZslM3Q7boiFyMzB9996HKw4S6Gm4wH7hgbNM9dDkq/CSAQVv5mX8XkBeG5GJc5zPwFK4z8/YMt6kOqpDKFCZeAklMUIoEr8Lb9CsXZc/DO2F+hXW2U8+fSzj3imiJxYIWvAbkIt2MOINSgtfskdlVMhsXU0JMW91Jb30/6FmlbHEm/b5DlNJVz+hjm1/4Tr5a+ja/NeCD2kVADuSXFKZ3ymhQAyYx0OG4psWFp3ja8+JpL+mzMR9C2otH5bTzzwzvF0VPLLdPx06VjsfbFJmVBls/7Fzga/4KHnpkdPLVByrIl9248PmWbdo55x3Y4tmZj/c/u0W6Rl8xiUtwGBM6ho24Rild7UOF8DatnTzYcKfcHlBYBTuGGmEEzl1WIJ1cW4uNd76BNOdVVOsk4z2hOupQdy60o+WkF8tbW4bWOc35Hnxf7HY1wPlSBH37bbE6rQXHIKUoCkcnfkluMRRWdWPHSVmmtgH+dyEsrjqKq+r9hEleHGOVvmTQbq+xj0dS4U7UOwa83zof0O/9EWTzyHoYAny+8AU8UPw93xXpsXj0bk4zqdphY/I9HY9qTz+CBj3fhzTb51FA+PWonGpvGYuncqdTWR8QxAZ4iqouR9fvBuUlTOcv7pus3OJfdA7/SJv5BBzdIPq66mD2HnwpqZXaX/zzGQNge5rJbxYOJcuwudjXwgLG+k6y1Rj60KPwJoldddpaDHGZzfqaOpZ+urzKPc5H/gCWbk3nCpBprXsPLIkzCg+Sx/6AQk0NbetysxW5TTqMVbHWsxa0/e62buVvqmE2QTqsVbMze4pZOfuSQZJ3WpuE/PELWSX6IlnyC4CABG0MxUkEn/fpgdPKwLF/1yX7+QytCn8bZzdytDlZlFaRD0/KZzf6ecuIrxySnGTiYRnRlPe73mN2WbxouBsQJDZIK8kpogVSy4GUz/FcOLuGn/LZqD8Pjdd/pkk6LlHMWo/z5gSlOe6BdQQmrcrRq9EZOYbD8poQ+SQdJGcpe1AltOx5gb3YAUbCeBPUjcpqKbgViFa90h1vpng7YbUrIK6j0ZnLgHsPXRTG6cP2+obwikHNQXvvXQS8vvhpZ/NM/kN0Dv58xpy3H4NQmyUcshrmRUe5xMptBwysb9LEau4FyxHOlM8yTlNfwsoinDBSWCERPgHQyemYDGYLkNZD0B1/apE/pJVOSV3rLK/KTP89/in3vH4GQqLlXfK7gigoUr+YzxktQ01ovbT82G42MoTH4m4Tocs3EfUCchTTK64AAokSJABEgAkSACBABIkAEIiVgMPnSOKj/xDsBU/KyQ8zrNA4b5GpqlAf5jNzhWgdqc/n2dkWobevA+7XlyBYPDZiB6uZD6MV5dL2/DuXZ3E82iqqb0OGVTvwTU+ELNtvxphIuAxlF1ahX5p9FnhXySQSIABEgAkSACBABIkAEoiUQ4Yi5tMMB7oHjnglx7jpwFocaXsF8caQcyLGvwgtGexCblGRYwTIcZstMnnLndlQWF6qet2Bt6RJcq7oZf1i7Bf4dsrxoX2vDI7gFh9ZMR5Z4UAXfE3kBNqm30Gpfi4XtTWiyv4Udy8xOA1QlpbsMn1ddALolAkSACBABIkAEiAARGLIEIhwxl3Y4CDqwJXpuRypLMGVhvWQgA0d2foBPQp6yF30agq3Bf5pfzz7YrXzT4RbUNV2PleIJX1/AZZ8pRup1foRP+dwYXxe2LakRjXIlLLsMT+vzsMKL9soX8Kq8A0P02aEQRIAIEAEiQASIABEgAkQgLIHIDHNpk/aEzS/nc8q3v4al3GZut2PZq/K2d2HzG4GHgsBpfpm3o2hmnhhGUE74ugl3FFmRo4rJfxAJHyqfg5XPPi4dVjAcwvTFeK6KH2azE6/uOYKUmt+uyj9dEgEiQASIABEgAkSACKQ/gYgM84TOL5cXej5WjqXrF0NI+Ij0SIwZdX2QZEaMGYURQa5+B1/PWRzhlznTcMdEddjrMWrMSNHTkQPHccYkPDkTASJABIgAESACRIAIEIF4CURgmMvzy/PwwB3jxPnl1zpqkcsXVubWoiPKYeTAnPLhuGXW01hZwofNd6Jy2evKQTDxFira8JaRo/0j6Ef245Ojl1TBL6H7TI94nzNlPMaontAlESACRIAIEAEiQASIABFIJIEIDHN5fvldmHqbf8w5YMi+D+cHp+Djiyc/+QA7xWHnPEzMVo86h8iuZRLmrqqElXtJ+JSWEOnqHomnPYovCNu1p8W1bcCLazsAzMRTRTmIcKWsLna6JQJEgAgQASJABIgAESAC4QmEN8yl+eV4oBB/n+X37j/yOF9cVLm6eByuy7gOIwuXoh0CrPYKlAiRmrAWZH57Np6p4HEN4CJL1QuCd9MC/P3I65CR8VVkFz8vlemf8VQBHbUdXp3IBxEgAkSACBABIkAEiECsBMIa5vL88pL7bsc35FQs4zH7ZSda7DbwiSjin2CD3bkDW5ZGua2gZTxmvfArVIgR7UTl8mZ0+eRI++vXgsyCJdjh3oPt6jJZq+BobY9pq8T+yjmlQwSIABEgAkSACBABIjA4CGTwg0t5UTIyMiBdDo6SpXEpSBZpLLxBmnXSyfQSLMkrveSV6rklfUp1CWnzR/LS8kj1O728wo6Yp3qBKH9EgAgQASJABIgAESACRGAwECDDfDBIkcpABIgAESACRIAIEAEikPYEyDBPexFSAYgAESACRIAIEAEiQAQGAwEyzAeDFKkMRIAIEAEiQASIABEgAmlPgAzztBchFYAIEAEiQASIABEgAkRgMBDQ7MoyGApEZSACRIAIEAEiQASIABEgAulEQN4ZUTkJSHZIp0JQXokAESACRIAIEAEiQASIwGAhQFNZBoskqRxEgAgQASJABIgAESACaU2ADPO0Fh9lnggQASJABIgAESACRGCwEPj/7PkHddQXT78AAAAASUVORK5CYII="></p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The standard free energy change, Δ<em>G</em><sup>θ</sup>, for the above reaction is –103 kJ mol<sup>–1</sup> at 298 K.</p>
<p>Suggest why Δ<em>G</em><sup>θ</sup> has a large negative value considering the sign of Δ<em>H</em><sup>θ</sup> in part (a).</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>Δ<em>H</em><sup>θ</sup> = [–165.2 + 2(–296.9) + 2(–92.3)] – [–454.7 + 2(–245.7)]</p>
<p>«Δ<em>H</em><sup>θ </sup>= +»2.5 «kJ»</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1]</strong> for –2.5 «kJ».</em></p>
<p><em>Do <strong>not</strong> accept ECF for M2 if more than one error in M1.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Δ<em>S</em><sup>θ </sup>= [208.5 + 2(248.1) + 2(186.8)] – [166.9 + 2(278.6)]»</p>
<p>«Δ<em>S</em><sup>θ </sup>= +» 354.2 «J K<sup>–1</sup> mol<sup>–1</sup>»</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«3 moles of» liquid to «4 moles of» gas</p>
<p><em><strong>OR</strong></em></p>
<p>«large» positive Δ<em>S</em></p>
<p><em><strong>OR</strong></em></p>
<p>«large» increase in entropy</p>
<p><em>T</em>Δ<em>S</em> > Δ<em>H</em> «at the reaction temperature»</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>White phosphorus is an allotrope of phosphorus and exists as P<sub>4</sub>.</p>
</div>
<div class="specification">
<p>An equilibrium exists between PCl<sub>3</sub> and PCl<sub>5</sub>.</p>
<p style="text-align: center;">PCl<sub>3 </sub>(g) + Cl<sub>2 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> PCl<sub>5 </sub>(g)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch the Lewis (electron dot) structure of the P<sub>4</sub> molecule, containing only single bonds.</p>
<p> </p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Write an equation for the reaction of white phosphorus (P<sub>4</sub>) with chlorine gas to form phosphorus trichloride (PCl<sub>3</sub>).</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the electron domain and molecular geometry using VSEPR theory, and estimate the Cl–P–Cl bond angle in PCl<sub>3</sub>.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the reason why PCl<sub>5</sub> is a non-polar molecule, while PCl<sub>4</sub>F is polar.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard enthalpy change (Δ<em>H</em><sup>⦵</sup>) for the forward reaction in kJ mol<sup>−1</sup>.</p>
<p style="text-align:center;">Δ<em>H</em><sup>⦵</sup><sub>f</sub> PCl<sub>3 </sub>(g) = −306.4 kJ mol<sup>−1</sup></p>
<p style="text-align:center;">Δ<em>H</em><sup>⦵</sup><sub>f</sub> PCl<sub>5 </sub>(g) = −398.9 kJ mol<sup>−1</sup></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the entropy change, Δ<em>S</em>, in J K<sup>−1 </sup>mol<sup>−1</sup>, for this reaction.</p>
<p style="text-align:center;"><img src="data:image/png;base64,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"></p>
<p style="text-align:center;"> </p>
<p style="text-align:center;"><em>Chemistry 2e, Chpt. 21 Nuclear Chemistry, Appendix G: Standard Thermodynamic Properties for Selected Substances https://openstax.org/books/chemistry-2e/pages/g-standard-thermodynamic-properties-for- selectedsubstances# page_667adccf-f900-4d86-a13d-409c014086ea © 1999-2021, Rice University. Except where otherwise noted, textbooks on this site are licensed under a Creative Commons Attribution 4.0 International License. (CC BY 4.0) https://creativecommons.org/licenses/by/4.0/.</em></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the Gibbs free energy change (Δ<em>G</em>), in kJ mol<sup>−1</sup>, for this reaction at 25 °C. Use section 1 of the data booklet.</p>
<p>If you did not obtain an answer in c(i) or c(ii) use −87.6 kJ mol<sup>−1</sup> and −150.5 J mol<sup>−1 </sup>K<sup>−1</sup> respectively, but these are not the correct answers.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the equilibrium constant, <em>K</em>, for this reaction at 25 °C, referring to section 1 of the data booklet.</p>
<p>If you did not obtain an answer in (c)(iii), use Δ<em>G</em> = –43.5 kJ mol<sup>−1</sup>, but this is not the correct answer.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the equilibrium constant expression,<em> K</em><sub>c</sub>, for this reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State, with a reason, the effect of an increase in temperature on the position of this equilibrium.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(vi).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYkAAACYCAYAAAARIBU3AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABu6SURBVHhe7d0PeBTlnQfwH9jawnEczSPlluLpSQ3wXNRQkD4tXJuiBqt9DgrlrtpjaSNteSpoaUsQpT7omVNZDu4g95SzhEqqPtzhpmDPw9DGgk0eH2oQPPIUQ5XakialFRDMIVaSuf2+O28y2exkd2dndmZ3v5/neZ+d/ZNNsjM733nn/TPDjBghIiJKYrh5S0RENAhDgoiIbDEkiIjIFkOCiIhsMSSIiMgWQ4KIAuedd96R2tpadZsMHm9oaDDvkZcYEkQUKAiAu+66S5YvX65uE4NCP79gwQIVJOQthgQRBcqJEydk69atavmVV14ZFBLt7e19z9fX18vp06fVMnmDIUFEgVJaWirNzc1qeePGjVJSUqKWtfLycvX89ddfr045JT5P7mJIEFGwnHtenlk4Sy3OmjVLhg0bllCukcde7JAHtv5YJkyYoF5H3mFIEFGeaZP6lV+UW26+V7a9es58jLzCkCCiYKqsk/YeQzC93IDS0ykHNoQl1LVN1kR+Kr/rNV9PnmBIEFF+GR6SGXc/KLVVZdK1bYc0vnbBfIK8wJAgovwzfJyUzZwSWzgu7R3d8cfIE0UfEh0dHVJdXT2om52W6nkiokJW1CGBAJg/f75EIpGkg3ZSPU9EPuk9KW0tR0VClTJnOrvAeomnm4gor/R2HZSGDffLsm1tElp0o0wfzd2Yl4r+ynSoLWzatEkeeOABGTFihPlov1TPE5HLzj0vqybfIOu6zPt2KtZK01OrZXboUvMB8kJxR3BsY9w843J1OmnkyJFJB+3ct6NFbl6yhgFBFBShsER2PiutDIicYD1tSPFBOzdUrOCgHaJcsxsn0bldvvOFW2QaAyInGBLAQTtEREkxJIbCQTtEVOQYEqlw0A4RFTGGBBER2WJIpMJBO0RUxBgSQ+CgHSIfjJ4tj3YaYjRWSWmKr1xLS4uaNge35A3u9WDvHTLpksQxEsPkkvHTZcHKeumqWCtPfHOWjDZfTkTBcPLkSTXOCRcnYlB4gyExFA7aIQq0z372s7JkyRK1zKDwBkMCOGiHKC9hJgRMm6ODYsWKFWoqHXIPQ4KIfIMjf5zaRbuCU9ageOmll9TMzQwK9zAkiMgXCAicIoIxY8aoW6cYFN5hSBBRzlkDAjt2nCYairVDiR0GhTcYEkSUU4kBgR27W7MsMyjcx5AgopzBDlvXGtwOCI1B4a6iv+hQKseOHZPz589LeXm5+QgROYEdNXbY2HFnGhDW00zp7rJwueHbbrtNdu/eLddff700NDTIhAkTzGcpXaxJpPD000/L1KlTZe/eveYjRJSpbALCKbx/bW2tCgjWKJxjSKQwefJkdbtmzRp1ZEJEmfEjIDTUHFCDYFA4x5BIASM69Qa2Z88e81EiSoefAaExKLLDNok0WHtjnDp1SkpKOBssUSpuBoSTNolE1r8HgbF///6cB1Y+Yk3CAqeTkp1SmjlzpsydO1ctb9myRd0SkT3rDhnfHT9qEIkSaxR33XUXTyGnAzWJYtPY2IhDEaO5udl8xDDOnz9vxI52jM2bN5uPDNTe3q5+BgXLRJTciRMnjNiOWH1XcIv72dLfPZRsWf8+fOfx3Sd7RRcS2CD0BoKw0HQI4Dk7K1euVK/BLREN5kVAAN5PFzcwKNJXdCGxfft2tWHEqsADNoxDhw6px4cKgFOnTvVtqNZaCBF5FxCgv3cobmFQpKeo2iROnz4tixcvVsuxMBhwjvT48ePqdqiJxtBgvXnzZrWMC53wfCZRHL5b1kbhfBi4Zm2j2Lp1K9sobBRVSDzyyCPqFj0t0Bht1d3drW71uAg7d9xxh9qoMIqTXWKJ4h0+Vq1alVcBoTEo0mDWKApeqoZn3d5gbaewE41G1WtjGxarqFTUsP3jVI3+Prh5islKf3dRvGDdP/DU00BFU5PA6SGoqamR0tJStWx15swZdXvllVeq26GgWo1ufThyqqurMx8lKi444saRN47A860GkQj7hObmZrXMGkUCMywKGhqZ8a+ioPE5Gf18ukdCuqE7k58hKhS5qkFo+ruG4iXrvoI1iriCDwmsZGzEWOk4TZQMXuNkA2SXWCpGuQ4I0N/PTL+jTjAoBir4kEin/SCdMRLJWM9jomZBVOj8CAjQ3zOUXLAGRU1NjflocSrokLCOaxiqQTqdMRJ2MEIbP4txF0SFzBoQKMk6gHhF/06UXLEGhd1MDMWgoBuun3rqKXWLRubKykq1nIweI+HE7bff3tclltecoEJlbaSG2A40aQeQQoJu8vg/Yfny5eraFEXJDIuCYz0VlOqIR4/CtmuzSIVdYqmQJdYgcISda/p3o+RasdcoCrYmoY94MLI61RFPW1ubueSM9ZoTO3fuNB8lyn/JahCJA1ELXdHXKMywKCjW5E+nYU33UsrmHKv1d9p1syXKN/q7gYJt3C/6b0Dxi/U7Xkw1ioIMCTQiZ7Ii9YrPtiFOV8mLvTcEFQbdKQPFz4AA/Xeg+KkYg6LgQsJJ+4BbG18m7SBEQRakgAD9t6D4zfrZFENQFFRIIBQQDlh56TZCW3fsbkAtAu+FWgVRPgpaQID+e1CCoJiCoqBCQq+4TMYs6JBwa9Q0rzmRC2eN9qaoUVdd2fdZi4SMiurHjF2tnUaP+aqB3jM6o1+3vD55CYUjRtT2PQpfEAMCrOsoKIolKAomJJzunPXpKbdCAnSXWnaJdVuP8XZ71KiuCPWt68ElFhar9xqdg/bybxutkYokr09WbjUirWfMn8szZ5uM6lCy/0mXMiMc2WE0tZ81f6BfUAMCrP9DkNgGRRbrIWgKJiR0L4xMd/Y6JNI9PZUOJ6e9KJVYQBx93AgP+cXTJRYUkQOxWLD6rRENT0zyWptSWWe052N1IuXOySyhKqPuaP8OKsgBAda/PWiSfnYO10MQFURIZNNgrMPF7Z05pgHB+yIs2CXWBW8fMCLWGkRFtVHX1N4XBD2drUY0EjZC+vnQnUa0413z2Zj3Wo3IRPO5iRGj9T3z8T4JIRRabTSdzcOU0Dsnu5Dr6TQObIh/TqGqqNERe42u+aJgOYj034cSRDoo+g5SHayHoCqIwXTV1dXqNraiHE8VUFZWZi65A9OA6GtO6OlByKkLcuy/1svKfV3xuxUbpPXHD0vV7FIZFX9EhoemyfxvPSi1VeZ67HpOdh84GV+GP/5GjrxuLs+8Ssa/z1zuM1xGTZ4tc2+aGL/bdVre+r/e+HIhGR6SGXfHP6eubTuk8bULfYNJ8f0Jh8NqmTKzbNkyiR0Yqu98WpKsh6DK+5DAfEmYNwkwj1Km9MWIvLB27Vp1i1Gax44dU8vkQPf/yjM/jI94FblVIuu/ItNGJdl0h18hf/eNxRLfzb8uLcf/IBfVcq+cO9oqP1HLIhOvuULGmssDnPuVHPiJmSQTPypXjB2UJIVh+DgpmzkltnBc2ju61YjqWA1c7ejIORwYZjQaPWE9BFVehwSmDFizZo1ajkajUlJSopaduPzyy80l95SXl6tpQUBPa0CZu9j+gmwxaxGh6m/J16aNUcvJvG/8VTL4a/on+f0br0n8HSbGKhIfloG7/z9J18EGWb/8blmnXhSSiqWfkkkBzghs+5gewo2rp+FqcoU+WV++6ejokPr6evOev/I6JPbs2dN38XXMn5Qp69H9iBEjzCV34SgNUGM5fPiwWqZMXJDjr/wiVi+AabJozrUyWi0n1/v2W/J7c7lft3S065l+X5f6BX8lw4YNs5QPyPjpC2RlvTmHV8XX5btfKu87lRVEGzduVDVUR5fZ7D0pbS1HY1lYKXOmOz+woizZrAcEBC6RvHjx4kDME5W3IXH69GlZsGCBWsYXJpud/JIlS8wl9+EoDed6QZ9+okxYd/DT5eNT7GsROK3U3fGaHFHLIZlY8mfxDbz3TXnjcKd6dGhlEo5EpfWp1TI7dKn5WPBg29+1a5daRg0Vp4rS1dt1UBo23C/LtrVJaNGNMn10fuwCDNV23X+b74ZaD2+++aY6+AXUJtyoLWZFNV/nIT2yOZOBc4l0D6RMu81mil1is2Htuvp1I9o5qFtSv543jGhVmfnahUZd+zvxx9PojhgKP24cfTt/ejNh4kpsU4O6q6bb9bJirdHUaen9Re7Kcj1gvWL95urKf0PJy5DIpsurFXbYeI9cdPvTvwsrngPsMvFHo6l6mrm+LTv+QXqMt1s3GBXmdmHtetjTXmdUmo+HqpsM3Su9p7PZ2BDWoZJsbEUeSrVzCoWNyM5njVYGhLcKaD3kZUjosQ3Z1gB0bSQXR/cIhkxnpyV4x2ivW2h+uex35D2de43VfeMoyoyq6Bvm1BrW6ThCRmXdUfPxuJ6OqFGlv8yJYyvykd45ORgMGP+MWLIpfbJYD0GTd20SLS0tfd1W77nnHnXr1FtvvaVur7rqKnXrJbSZ6J5OaHDEeWVKxwflo7NulvjFZ7tk38o75M71jXKs2xzD0NslBxvWy1emVcrDugdU1QPy4LwrzAa3C9J5XJ+znyQ3XTdhQEPc8I/cIqseWhi/09Ug/9F4XApwdATlCDpCFJq8Cgk04OiA2L59e1ZdXmHfvn3qduTIkerWa+hDrYPikUceUbeU2vDS+fLPkVvNe21Sv/JmmfTnl8R7Jl0yXqYvWCn15jg7qVgrTzz0OflI35Z9Rn5z5IS5PEmuGv9Bc1mLhdCcL0qsNhHTJXvX1Mu+c8UZE7GDRnOJnCrEzzCvQgJdXjFwDl1eFy40j/6yoHsQeDFGwo7uSYWw4wC7dI2RaUvXS7Q6Xp+wEwrXyoHEnkkX/yDHW4YeIDf8I5+SLy2aFr/TtVcaW/OjltfQ0OB6zxfs5FicF7dgvWL9BkHehAROz+ijb5xmynZcA/oia16NkUgGg5ZqamrUsp5OhNIwarLMf3SntDftkEjYOoUKuq0+KbtaO6Vj+50yI7HrasrpOOAyqbjjG+YprYPywydfkN8FvDKB/vPoAu5onAQFGtYn1ivWbyCupx1Lv7ygJ9DKpsurle4h5cfFgXjNCcoGth/dpRrl0KFD5jMxBdRgaqX/V5S8kMV6wPrU/yvWs98ThObFJ46+wvpDG/CFyEKuxkjYYZdYyobtOIkM4Gex/QehL34q+vuPUgzQLR/rNwjrJi9ON23atEndotEX8yG5obs7PqGW27O/pgvTiMQ2AtUugrYWokxgJP/+/fszm1AuwcmTJ1XbGKaAsJ5+Jf9hNt7nnntOrWe/BT4kMN+R7tHk5vQZr776qrodNcqfGXrQDvLQQw+pZZx7ZJdYylS2bWkzZszoO1BhUARPtr033RL4kNDzHWVzrYhk9BiJcePGqVs/6GtOAK85QbmGo1T0oGFQ0FACHRL6WhHYiJ1cK2IoeozE2LFJryyQM+vWrVO3vOYE+YFBkT18XqiVFWpvxcCGBLqB6WtFoMur21UvPUbisssuU7d+Qe1ID7DjNSfID8mCgt1q04OAwOeFz23MmKFmKM5jZgN24Ojr7qLLq/PeP9bJ4ZKXUDhi7LRcK9kP7BJLQaB7TGE7RNfwIPW6098PlKCwfl64LdReioEMCfd2mqlDIl7KjHDdEV+DwjoOhF1iyS9BDQrr9zUIEgMiCF1VvRLIkEDfbb2RZkeHhN0U0+8anQdqjTAGvfg8Ayi+jHqj4zUnyE9BDAr8Lbr4rZgCAgIXEm5dKyIuVUjAu0ZH9E4jlGQa6VzjADsKiqAFhd4noPip2AICAtdwrcdEYH6j3Fyc/VIJlX1MrpEuOdLeKfEhdv5AAxi6xKIRrK6uznyUKPesjdnoUME5ouKdaXQjNT4XfD74nApdoEIC14rQPXyWLl2qbouN7umELrHsikh+YlD0w/+N/7/YAgICExJYCStWrFDLblwrIn1/kq62l+WITJNFc66V0eajfrFec0JPR0LkF+wIH3vsMbVcrEGhAwL/f7EFhGKedvKdN+fjU7RJ9HQardGI2XC92mg6G4xpM91tlyHKHnoZ6m3SjzYK/btRcgn/J/5f/F7sm4qhDSJRIELCOvUxZmd1T7pdYCuN1U0dvjZaJ3J7anSibPkZFP3f1dztshgQcYEICe92iKlCoswIR540drV2BiogwLvgJHLOr6Do/87mZpfFgOjne0hYT624da2Iful0gQ0udomlILIGRU1Njfmot/TvQ/EaA2Ig3xuudW8mN68VUSis15zYuXOn+SiRv9C5IhYUavm+++4LxiU2XWJtpAY02hdVI3UyZlj4wnqZPm/SOr9rEmA9avP7MoZEVtZtE6eMvaR/D4pXrDUIFPx/5HNNwnqtiCClNS4AFJQxCjhqi224annLli3qligIrDUKjOvJ5xpFYg0C/1c2V/0rKGZY5FxuzrdnXpOwTi6IOaSCcDTBLrEUZLmoUej3R3EbaxBD8yUksFIQDlgh3k5m5+x0k+5tpQt6Xfm94bg36SGR+7wOCv3eKG5D47t+bwbEYL6EhN4JuzktNo6w3ayRoEaRLCzQHdW7mo89aw2HGzIFkZdBod8XxU3W7zi/V8nlPCTc3tnh/fRRNm7dliwsUAtCDSjXYeHOhZiIvGP9rrgZFPo9UdzCgEhPzkPCzR26btfQxctBZ9gp4/fp02QoWMaOG0GSC/gbcnOajsg5L4JCvx+KGxgQ6ctpSLjVAIvustaGJhxZ56pBN1lYoGCjy0VYIAjx+/D7cxVORJlyOyj0e6FkiwGRmZyGBHbmWDFOR2liB61Pueji5xE1NjD9P+mCDdDrwNK/040vH5FX3AwK/T4o2WBAZC5nIYEVoleOkyNg7HitO2ScrgrKcPlkYYG/z6uwsA5CzFUNisgJt3bK+j1QnGJAOJOTkMjmXDp+1tpFDe8T1AnvsMPWbS664L4XG6T+PbglCjI3ds7651GcsP4NWKb05SQkEAxYOdjBY6efLmxQ1nP/CAsntRCcorKrdegQcrNWgrCwBhsKahpuhgX+Xv3e7k+MSOSubINC/yxKphgQ2fE8JLBT1yso3Y0DP2M9IkdQON0R6g0E75EYBAgI3QCe7Pls4f+wbqAoCAuEZiZhaUe/N96TKOis34VMg0L/HEomrL8Ty5Q5z0NCH1GnuyNL7DmEWoDTHao1BFASgwbP69/lRUhoOiys/xeWsw0LvK9+z0xP4xH5wWlQ6J9BSRcDwh2ehgROu+iVlKqBFTtoL7q16qCw2yDxe/G7vAoIK/wtiSGIZWzA2OE7gffT75NN4BDlipOg0K9HSQfeV7+eAZGdzEPibJNRjWtCW1bawIKrve0wmtrPptW4ih1bkLq15oIOC4ST9f92EhZ4L/0+f1/S/16DS/96IfKbtc0unaCwbsupMCDc5UFImGXsgr5lux0fagrWHSXCJBdH9EGCDToxLPAFyqQWhdNoS8K3GF++rP89bEuoyqg7yqAgf+HgxnrmYEBQZHAgmogB4T7nIVFZZ7QnuzB0T6dxYEPY+MvYShpZeqPx5J7B3VWxgViPJHCqpNiv44yN2/qlQUFoph0Waa6XUOx9Q1VRoyNoF/WmomMbFOkeiCYc8DAgvOF+SEDPG0a0qiy2sgZP0Y0VaT0njx2h0/PxhQihoE/T6TJUm0qfLNcLkR+sQdF3WtpmW8ZrlCQHPAwI73hzZbrh46Rs5pTYwnFp7+hWD+HKT9XV1TJr1ix1zeZYUMihQ4dk3bp1UlJSol5DIqWlpeoziYWFxGpb6jFcLQuf27x586SlpUU95kiS9ULkpxEjRsimTZskGo3K3LlzzUeTi+2v4gvDQzLj7geltqpMurbtkMbXLsju3bvVU7GAkGXLlqllcodtSODynW5ewvPll1+WSCSilrEi9+/fL+Xl5eo+DYawuPfeeyVWy1KfF+CLgLCYMWOG7N27Vz3mJgT54cOHzXtEuYGgmD9/fmaXC0044EHANDY2MiA8kDQkEA5YaSiOgqL3pLS1HBUJVcqc6fFawpQpU9TRAo6QsSKxYVBqqGXh80JYbN++XdXAUBObM2eOuhZ3RpKsF01f43fq1KnZ1VaIfICAqaysNO+Rm5KGBKp/2BGh1NfXm4+mp7froDRsuF+WbWuT0KIbZfro+K/Azg6hgyNkyhw+v3A4rGpgCFscNWUStHbrRfv5z3/edxH4FStWqNAgCqwhDnjIZfGmiYF0YxIKlgdIt+dBxVqjqfNd84fIcy6sFzT4oVNBsXVDpoBJ0Qmjp7PViEbMhuvqJoMdur1l27sJ4TAoICDVzigUNiI7nzVaGRC55dJ6YUCQ73ggGii2Ddc4lTHk6YzKOomlvOpxMKB0bpfvfOEWmRa61Hxhv2HDhrG4XAZxsF6sJkyYYC4RBVQoLLEDHml9arXMTrE9U/ZsQ4LyQ9KgICoEWR7wkDsYEnkOXxoiIq/YhoTb4yRg0BEBS9bFbceOHTOXiIhSjJNA/3x2hSwetbW1MmnSJI6TIKI+SUMC4YAxEhjhW1dXZz5KhQzBsHz5crWMUd0ZD9QjooI0zEhyzkLXJK677jo1sI6jo4sDahIIiubm5symSCBy07nnZdXkG2TdNXXSvqdKStly6qukIQEIipEjR3LyvSKDNgmOiicqIMZZ+eXOjbJ23WOy8+AFmfW9F2Tf0jK5xHw6FduQICKifHdR/tC4Rj5986PyKu5OXik/bvon+dz4D6hn08GKHBFRgTJO75cN3/z3eEDIJ2TFv35Tbs0gIIAhQURUiIw/SvO/1cijr+LaMaNk8or75Z7K8ZLp8FuGBBFRwTHkwi9/JOs3/Cx+9+qvSmTlDfJhBxM0MCSIiAqNcUL+5182yjPqApRXy23fXSpzQu9XT2WKIUFEVFB65PTPvi/3/SDeEjHqpuWyasHV4iwiGBJEFFCpRv5zChkbvcfl2c1PmI3Vn5Q77/kHuXak84lAGRJEFDgY2ImR/7hNhlPIGHKx+5R0vdktF81H4gw5f+gZ+d6uN9S9D932Dfnq347NuLHaiiFBRIGCGoKeIga3iRONcgqZ8/Lr/14r88qvlPFjPyVf+89fyXvmM2J0yvNbH5cX1Z2b5d5vf04mvj+7ywkwJIgoUDDiH9dwB0wRk3ghLEwZs3nzZrWM54tvVoheee/MSTn2OlqlD8kPltwtNS/8Xl2ur/fXz0vdE23qVaPm3S7zp/6FWs4GR1wTUSClmiKmqKeQMd6UFx/+slTe96yoDkxqJPUqufzpxVJ+97OxBz4pq5p+JA/P/nBWp5qAIUFElI8u/loali+UBVsOxu6MkqurviwVv3hcvt8Wi41PrJfWn35LpmXRYK0xJIiI8pRxZr+snfN5efClM+YjcKXMq98r0UVXu9KewDYJIqI8NexDs+Tbm+6RT5j3lVGz5YufvsK1nTtDgogob10ioz/+FXn0/s+Y90U+9I+fl89cfql5L3s83URElOeMC11y5MVD8ltjnPzNx66Vvx7jdHz1YAwJIiKyxdNNRERkiyFBRES2GBJERGSLIUFERLYYEkREZIshQUREthgSRERkiyFBREQ2RP4fsZOCWDF1KrUAAAAASUVORK5CYII=" width="282" height="109"></p>
<p><em>Accept any diagram with each P joined to the other three. <br>Accept any combination of dots, crosses and lines.</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>P<sub>4 </sub>(s) + 6Cl<sub>2 </sub>(g) → 4PCl<sub>3 </sub>(l) ✔</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Electron domain geometry</em>: tetrahedral ✔</p>
<p><em>Molecular geometry</em>: trigonal pyramidal ✔</p>
<p><em>Bond angle</em>: 100«°» ✔</p>
<p><em><br>Accept any value or range within the range 91−108«°» for <strong>M3</strong>.</em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>PCl<sub>5</sub> is non-polar</em>:</p>
<p>symmetrical<br><em><strong>OR</strong></em><br>dipoles cancel ✔</p>
<p> </p>
<p><em>PCl<sub>4</sub>F is polar:</em></p>
<p>P–Cl has a different bond polarity than P–F ✔</p>
<p>non-symmetrical «dipoles»<br><em><strong>OR</strong></em><br>dipoles do not cancel ✔</p>
<p><em><br></em><em>Accept F more electronegative than/different electronegativity to Cl for <strong>M2</strong>.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«−398.9 kJ mol<sup>−1</sup> − (−306.4 kJ mol<sup>−1</sup>) =» −92.5 «kJ mol<sup>−1</sup>» ✔</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«ΔS = 364.5 J K<sup>–1 </sup>mol<sup>–1</sup> – (311.7 J K<sup>–1 </sup>mol<sup>–1</sup> + 223.0 J K<sup>–1 </sup>mol<sup>–1</sup>)=» –170.2 «J K<sup>–1 </sup>mol<sup>–1</sup>» ✔</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«ΔS =» –0.1702 «kJ mol<sup>–1 </sup>K<sup>–1</sup>»<br><em><strong>OR</strong></em><br>298 «K» ✔</p>
<p>«ΔG = –92.5 kJ mol<sup>–1</sup> – (298 K × –0.1702 kJ mol<sup>–1 </sup>K<sup>–1</sup>) =» –41.8 «kJ mol<sup>–1</sup>» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>If –87.6 and -150.5 are used then –42.8.</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«ΔG = –41.8 kJ mol<sup>–1</sup> = <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mrow><mn>8</mn><mo>.</mo><mn>31</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow><mn>1000</mn></mfrac></math> × 298 K × ln<em>K</em>»<br><em><strong>OR</strong></em><br>«ΔG = –41800 J mol<sup>–1</sup> = –8.31 J mol<sup>–1 </sup>K<sup>–1</sup> × 298 K × ln<em>K</em>»<br><br>«ln<em>K</em> = =» 16.9 ✔</p>
<p>«<em>K</em> = e<sup>16.9</sup> =» 2.19 × 10<sup>7</sup> ✔</p>
<p> </p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em></p>
<p><em>Accept range of 1.80 × 10<sup>6</sup>–2.60 × 10<sup>7</sup>.</em></p>
<p><em>If –43.5 is used then 4.25 × 10<sup>7</sup>.</em></p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>K</em><sub>c</sub> =» <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mfenced open="[" close="]"><msub><mi>PCl</mi><mn>5</mn></msub></mfenced><mrow><mfenced open="[" close="]"><msub><mi>PCl</mi><mn>3</mn></msub></mfenced><mfenced open="[" close="]"><msub><mi>Cl</mi><mn>2</mn></msub></mfenced></mrow></mfrac></math> ✔</p>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«shifts» left/towards reactants <em><strong>AND</strong> </em>«forward reaction is» exothermic/ΔH is negative ✔</p>
<div class="question_part_label">c(vi).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(vi).</div>
</div>
<br><hr><br><div class="specification">
<p>Organic chemistry can be used to synthesize a variety of products.</p>
</div>
<div class="specification">
<p>Combustion analysis of an unknown organic compound indicated that it contained only carbon, hydrogen and oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Several compounds can be synthesized from but-2-ene. Draw the structure of the final product for each of the following chemical reactions.</p>
<p><img src="data:image/png;base64,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" width="651" height="241"></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>Determine the change in enthalpy, Δ<em>H</em>, for the combustion of but-2-ene, using section 11 of the data booklet. </p>
<p style="text-align:center;">CH<sub>3</sub>CH=CHCH<sub>3 </sub>(g) + 6O<sub>2</sub> (g) → 4CO<sub>2 </sub>(g) + 4H<sub>2</sub>O (g)</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>State the hybridization of the carbon I and II atoms in but-2-ene.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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"></p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAsUAAABjCAYAAABzEX3CAAAST0lEQVR4Ae2dwWtbVxaH+5/IoJUNhpbZeNXVLNwsTOhqIJsOTiBdFLrrgI27yWoKDs2mqxmZli47MgNDobSIbrpwEMxAKEYMA6UYMWSRMaIEE8QZnvSu3tOJFEv3Xendq/MVjBVJ9+ic75z8/Mvtfc9vCf9BAAIQgAAEIAABCEDAOIG3jNdP+RCAAAQgAAEIQAACEBBMMUMAAQhAAAIQgAAEIGCeAKbY/AgAAAIQgAAEIAABCEDgNVPcbGwJXzBgBpgBZoAZYAaYAWaAGbAwA+6fAzNNsXuR7xBYB4HsLxz/QQACEPAhgH74UGMNBCCQEdD6gSlmLmonoIey9oRIAAIQSIYA+pFMq0gUAtER0PqBKY6uRfYS0kNpjwAVQwACvgTQD19yrIMABLR+YIqZidoJ6KGsPSESgAAEkiGAfiTTKhKFQHQEtH5giqNrkb2E9FDaI0DFEICALwH0w5cc6yAAAa0fmGJmonYCeihrT4gEIACBZAigH8m0ikQhEB0BrR+Y4uhaZC8hPZT2CFAxBCDgSwD98CXHOghAQOsHppiZqJ2AHsraEyIBCEAgGQLoRzKtIlEIREdA6wemOLoW2UtID6U9AlQMAQj4EkA/fMmxDgIQ0PqBKWYmaiegh7L2hEgAAhBIhgD6kUyrSBQC0RHQ+uFhim+k323L48O94tdB7x/JWacng8rlDuW6cyK7jS3ZPerIdeV4BEiBgB7KFHImx3UQKPSgedCS3nAdn8lnpEYA/UitY6vO97l0jt6VZmNH7rYuZSjoyKqJpxxf68eSpvhaLlsPR6Y1CzT9tScPWs8qGuNieDHFKY/ZcrnroVxuNe/eXAKFHmCKN7fLVStDP6oS3LT1mOJN6+gq69H6sZQpHvZacjczw9v35clFX0YbN8O+PP38/tgob59I57rKdk7xQxBTvMoxiCu2Hsq4siOb+ggUeoAprq8LsX8y+hF7h9adH6Z43cRT/jytH0uY4pfSa92TZmNPPmz/MjbEjsTwUs4enkwfoRj05IfT3CyPdpX35MHpd9IbZKa5+GG3e/hIPhsdxXhXjjv/LY5PfNKSH748kjujtQdy/OWF9Mt+e9CTTsu9viXN/SP5qpsb9Syv644cb2cG/kjOL74tjnvsn8h5j4MZrnUxfNdDGUNO5BADgUInMMUx9CPOHNCPOPtSX1aY4vrYp/fJWj8WN8WZ8T3YkWbjnpz1Xt5S+Qvpnr6vjldkxy1mnPGZHMOYNsVZotNfO3Ln9GJ8PGNwIY/3s1z0e0qG3Zni196zJfyAvaV9a35ZD+WaP56Pi5YApjja1kSUGPoRUTOiSAVTHEUbEklC68eKTLGmcSNX7Y9LF9CVfthtfyznVzciw99k8NuryU5xc/+RdPo3InIj/c6j8Y7x6HhG8Z7dwy/k6cz3DIud4kZx1nl41ZYPs93jhYy9roE/r4qAHspVfQ5xUyNQ0gkutEuteWvLF/1YG+pEPghTnEijokhT68cKTfFQBr0f5bzdlvPSMYfxWeHih9302eE5z0/tUv+aX1ma7Sw/L6BOvedlyRSXdrYnu8el54oIPKqJgB7KmtLgY6MjUOgB/3cnuuZEkxD6EU0rIkkEUxxJI5JIQ+vH4qZY3nSm+Bc5P3lUOlPsjk8cyHGrLZ3ei8kO8NpNcfniP0xxlEOqhzLKJEmqBgKY4hqgJ/eR6EdyLVtxwpjiFQPeqPBaP5YwxSK33n3CHUtw5nNyNOJKOicHozPAi5ri5vZDObvMLohb8vjE/hPpZhfzTXIo3RHDPefy3KjWpluMHsp0KyHzsAQwxWF5bmY09GMz++pfFabYn529lVo/ljLFIgvep3hiPksXwv3+Pbmz7X4pR/HDbt7xiSzR6S93kZ6IzL3Q7kA+7VyN74zhcmCnOPop10MZfcIkuCYChU5wfGJNyBP8GPQjwaatNGVM8UrxblhwrR9LmuKMxuu/0W738FT+NvUb7bLzxG05zu8QMbog7upf47tXjHZySxfLTf3muuKH4O4nLfnO3f+4UeWWbOwUxz7Deihjz5f81kWg0ANM8bqYp/c56Ed6PVttxpji1fLdrOhaPzxM8WYBoZr6CeihrD8jMoAABFIhgH6k0inyhEB8BLR+YIrj65G5jPRQmgNAwRCAgDcB9MMbHQshYJ6A1g9MsfmRqB+AHsr6MyIDCEAgFQLoRyqdIk8IxEdA6wemOL4emctID6U5ABQMAQh4E0A/vNGxEALmCWj9wBSbH4n6AeihrD8jMoAABFIhgH6k0inyhEB8BLR+YIrj65G5jPRQmgNAwRCAgDcB9MMbHQshYJ6A1g9MsfmRqB+AHsr6MyIDCEAgFQLoRyqdIk8IxEdA6wemOL4emctID6U5ABQMAQh4E0A/vNGxEALmCWj9wBSbH4n6AeihrD8jMoAABFIhgH6k0inyhEB8BLR+zDTF2Zv4ggEzwAwwA8wAM8AMMAPMwKbPgLPrM02xe5HvEFgHgewvG/9BAAIQ8CGAfvhQYw0EIJAR0PqBKWYuaiegh7L2hEgAAhBIhgD6kUyrSBQC0RHQ+oEpjq5F9hLSQ2mPABVDAAK+BNAPX3KsgwAEtH5gipmJ2gnooaw9IRKAAASSIYB+JNMqEoVAdAS0fmCKo2uRvYT0UNojQMUQgIAvAfTDlxzrIAABrR+YYmaidgJ6KGtPiAQgAIFkCKAfybSKRCEQHQGtH5ji6FpkLyE9lPYIUDEEIOBLAP3wJcc6CEBA6wemmJmonYAeytoTIgEIQCAZAuhHMq0iUQhER0DrB6Y4uhbZS0gPpT0CVAwBCPgSQD98ybEOAhDQ+oEpZiZqJ6CHsvaESAACEEiGAPqRTKtIFALREdD6gSmOrkX2EtJDaY8AFUMAAr4E0A9fcqyDAAS0fmCKmYnaCeihrD0hEoAABJIhgH4k0yoShUB0BLR+YIqja5G9hPRQ2iNAxRCAgC8B9MOXHOsgAAGtH5hiZqJ2Anooa0+IBCAAgWQIoB/JtIpEIRAdAa0fmOLoWmQvIT2U9ghQMQQg4EsA/fAlxzoIQEDrB6aYmaidgB7K2hMiAQhAIBkC6EcyrSJRCERHQOsHpji6FtlLSA+lPQJUDAEI+BJAP3zJsQ4CEND6gSlmJmonoIey9oRIAAIQSIYA+pFMq0gUAtER0PqxhCl+Jf32R9J8+1S6r3RdA+mevjfnNf3ePE7jIznvvxZIv7n051/l/PAdaR62pV96tnio4vbb8qDxjjxo/1q8pcqjYV+6/+hKf5gFUZ9VJS5rRQ8lSCAAAQgsSgD9WJQU74MABDQBrR8JmWJdiv7zKo3qMqZf58WfbyOgh/K29/M6BCAAAUcA/XAk+A4BCCxLQOsHpnghgpjihTB5vkkPpWcYlkEAAgYJoB8Gm07JEAhEQOvHCkzxc+kcvSvN/SfSHYzOGoxTv+7I8faO3G09k6vsGEbjQP509IHsNrak2diRO0dfS7d/k5c5Piqx+8F9+eP2+PW7rW/lm6njE9fS+/6JPBi9viXN/U/k8dGBNN2xjPLxidHjLI7+cscrbqTfbcvjw73Sew7k+MsL6Q9zQzxZ+5487r4YHyVxnyUiw/6FfDX6/PFn7B6eynm3L2MCeT2Hn8lfJ+/Jam5Lr8woUJNTC6OHMrX8yRcCEKiPAPpRH3s+GQKpE9D6sQJTPJTrzonsNt6V487znJd77p6c9Qa5odyS3cOv5HIwlGH/J3mSGdKDlvRGLjI/P9x4f2RAh/1n8s/+v0tniocy6D6RO40DOW5fykBupH/xRW6Q87PKZVOsuzZ4JmeHe8Xn91pyt7EnD1rPZJC9d9iXp5/fL9Wgd4rVUY3BhTze35Hdwy/kaWbsJ+vH+Yu4ely+Lv/sHwmXuXHWSdr5sx5KO5VTKQQgUJUA+lGVIOshYJeA1o/lTfFkx1Tvum4VF9oNL+XsYEd2jzpyPWKd7x6PTK8zlJlBfjnpxHBkTLNd2MyW5iZyYpKzt+XPjS60K8dzIfLn3O7tPFM8/EXOH+5Jc/+RdCY70y5G8X2cj9tJfpMpvsn/ETBdj0wxmFFP/vr8CweLXDb9kR7KTa+X+iAAgXAE0I9wLIkEAWsEtH4sb4oXuvvES+m17kmzkRvFydGJbFc0N8U6zpSJLRtg16LSc6+68vjtLfndaVeK+1c4s/2mneIX0j19X5rbD+XscmzXXfRsd7f797act9ty3jqSOyPzv4gpzmLOuvNG2biXcp984KznJi+aeqCH0lTxFAsBCFQigH5UwsdiCJgmoPVjRaZYRCZG+Gf53+g4hdtJrcsU38hV+2PZbRzIp52rqSMLw/738un+jjT3j+QsM8XtH+Wy+xe5O7ml25t2iueZ4tz0jna7ZxngWc/ZnE09lDYpUDUEIOBDAP3wocYaCEAgI6D1Y3WmWPKd0u0/yIMPyueF3Y6uM8lZWu6MrTo+MXVP4rKJLO/Cusa63elZO8UufuncsFsm+brtE+lcuwsD3RnoRXaKlzg+MbeeSTImH+ihNAmBoiEAAS8C6IcXNhZBAALrNcXOiGZnj8sXlDlTXNx9wV1ot/uwLVflC+3mmkgX25ncN19oN7xqy4fbO3Ln5Pv8l2+UZ8EZYLeDPJRBry3H2c7xZKc4z3linF0NuQFf9EK7ufWU87H3mB9q9npOxRAIRQD9CEWSOBCwR0Drxwp3irMN4PEFd5OzxSPezmDel8/+nN3hYWyap29PVt4Vdk3Sz2W3Ufs6N69vuiXbz+Mzv3MuEBydS57cLSK/eDA7RvHN6ehuFu5iwckRi5FR/o/XLdmmL6rT9bg67X3XQxmWQM5Zn2GffIj7B477vxSTF4oH+S39ps+wFy8Xv+GwSowAebqLUVdaK3kWnQ8xO7fxFJFb5++2GCHyDBHjtjwLsss8Qj8yWrexXaB/IWKsY1bJs/TX47a+ox8lWDMfav1YwhTPjHfLk7OOOdyyhJfNEdBDaQ4ABUMAAt4E0A9vdCyEgHkCWj9WaIrdEYfy/YrN8wfADAJ6KGe8hacgAAEIzCSAfszEwpMQgMACBLR+rMgU51v62S/E+PynGed4F8iUt5ghoIfSTOEUCgEIVCaAflRGSAAImCWg9WNFptgsXwr3IKCH0iMESyAAAaME0A+jjadsCAQgoPUDUxwAKiGqEdBDWS0aqyEAAUsE0A9L3aZWCIQloPUDUxyWL9E8COih9AjBEghAwCgB9MNo4ykbAgEIaP3AFAeASohqBPRQVovGaghAwBIB9MNSt6kVAmEJaP3AFIflSzQPAnooPUKwBAIQMEoA/TDaeMqGQAACWj8wxQGgEqIaAT2U1aKxGgIQsEQA/bDUbWqFQFgCWj8wxWH5Es2DgB5KjxAsgQAEjBJAP4w2nrIhEICA1g9McQCohKhGQA9ltWishgAELBFAPyx1m1ohEJaA1g9McVi+RPMgoIfSIwRLIAABowTQD6ONp2wIBCCg9QNTHAAqIaoR0ENZLRqrIQABSwTQD0vdplYIhCWg9QNTHJYv0TwI6KH0CMESCEDAKAH0w2jjKRsCAQho/cAUB4BKiGoE9FBWi8ZqCEDAEgH0w1K3qRUCYQlo/cAUh+VLNA8Ceig9QrAEAhAwSgD9MNp4yoZAAAJaPzDFAaASohoBPZTVorEaAhCwRAD9sNRtaoVAWAJaPzDFYfkSzYOAHkqPECyBAASMEkA/jDaesiEQgIDWD0xxAKiEqEZAD2W1aKyGAAQsEUA/LHWbWiEQloDWD0xxWL5E8yCgh9IjBEsgAAGjBNAPo42nbAgEIKD1A1McACohqhHQQ1ktGqshAAFLBNAPS92mVgiEJaD1A1Mcli/RPAjoofQIwRIIQMAoAfTDaOMpGwIBCGj9wBQHgEqIagT0UFaLxmoIQMASAfTDUrepFQJhCWj9wBSH5Us0DwJ6KD1CsAQCEDBKAP0w2njKhkAAAlo/MMUBoBKiGgE9lNWisRoCELBEAP2w1G1qhUBYAlo/MMVh+RLNg4AeSo8QLIEABIwSQD+MNp6yIRCAgNYPTHEAqISoRkAPZbVorIYABCwRQD8sdZtaIRCWgNYPTHFYvkTzIKCH0iMESyAAAaME0A+jjadsCAQgoPVjpinO3sQXDJgBZoAZYAaYAWaAGWAGNn0GnL9+zRS7F/gOAQhAAAIQgAAEIAABKwQwxVY6TZ0QgAAEIAABCEAAAnMJYIrnouEFCEAAAhCAAAQgAAErBDDFVjpNnRCAAAQgAAEIQAACcwlgiuei4QUIQAACEIAABCAAASsE/g9sQdF9+ZvItAAAAABJRU5ErkJggg=="></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw diagrams to show how sigma (σ) and pi (π) bonds are formed between atoms.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABJQAAAHkCAYAAABosHUjAAAgAElEQVR4Ae3d4Y3k1rEG0M3jwQkYSsBQBFYEVgRWBFYEVgZWBFYEVgRWBN4MNoPNYB5qjTI4FMnp6a7BVt05BAY9zSYv657in/lw2fPhyUaAAAECBAgQIECAAAECBAgQIEDgFQIfXnGsQwkQIECAAAECBAgQIECAAAECBAg8CZTcBAQIECBAgAABAgQIECBAgAABAq8SECi9isvBBAgQIECAAAECBAgQIECAAAECAiX3AAECBAgQIECAAAECBAgQIECAwKsEBEqv4nIwAQIECBAgQIAAAQIECBAgQICAQMk9QIAAAQIECBAgQIAAAQIECBAg8CqBw0DpD3/4vyc/DNwD7gH3gHvAPeAecA+4B9wD7gH3gHvAPeAecA+4B46SpsNAKQ6MG8ZGgAABAgQIECBAgAABAgQIECDwPgWusiGB0vu8J8yaAAECBAgQIECAAAECBAgQIHApIFC65PEhAQIECBAgQIAAAQIECBAgQIDAXkCgtBfxngABAgQIECBAgAABAgQIECBA4FJAoHTJ40MCBAgQIECAAAECBAgQIECAAIG9gEBpL+I9AQIECBAgQIAAAQIECBAgQIDApYBA6ZLHhwQIECBAgAABAgQIECBAgAABAnsBgdJexHsCBAgQIECAAAECBAgQIECAAIFLAYHSJY8PCRAgQIAAAQIECBAgQIAAAQIE9gICpb2I9wQIECBAgAABAgQIECBAgAABApcCAqVLHh8SIECAAAECBAgQIECAAAECBAjsBQRKexHvCRAgQIAAAQIECBAgQIAAAQIELgUESpc8PiRAgAABAgQIECBAgAABAgQIENgLCJT2It4TIECAAAECBAgQIECAAAECBAhcCgiULnl8SIAAAQIECBAgQIAAAQIECBAgsBcQKO1FvCdAgAABAgQIECBAgAABAgQIELgUEChd8viQAAECBAgQIECAAAECBAgQIEBgLyBQ2ot4T4AAAQIECBAgQIAAAQIECBAgcCkgULrk8SEBAgQIECBAgAABAgQIECBAgMBeQKC0F/GeAAECBAgQIECAAAECBAgQIEDgUkCgdMnjQwIECBAgQIAAAQIECBAgQIAAgb2AQGkv4j0BAgQIECBAgAABAgQIECBAgMClgEDpkseHBAgQIECAAAECBAgQIECAAAECewGB0l7EewIECBAgQIAAAQIECBAgQIAAgUsBgdIljw8JECBAgAABAgQIECBAgAABAgT2AgKlvYj3BAgQIECAAAECBAgQIECAAAEClwICpUseHxIgQIAAAQIECBAgQIAAAQIECOwFBEp7Ee8JECBAgAABAgQIECBAgAABAgQuBQRKlzw+JECAAAECBAgQIECAAAECBAgQ2AsIlPYi3hMgQIAAAQIECBAgQIAAAQIECFwKCJQueXxIgAABAgQIECBAgAABAgQIECCwFxAo7UW8J0CAAAECBAgQIECAAAECBAgQuBQQKF3y+JAAAQIECBAgQIAAAQIECBAgQGAvIFDai9z5/rff/v30009/fwrQ7c/33//l6eef/3E66i+//PPL8d9++6fTY1b/IHzC7NOnT2VT/fjxP1/GvLIvu5iBCBAgQIAAAQIECBAgQIDAOxMQKBU0/Icf/vosRNoGSvn7N9/88SlCp/323gOltwx+fvzxb+VB1b5/3hMgQIAAAQIECBAgQIAAgfcoIFB6sOu5uiYgY4XS58+fn40YgdF33/35S7ARoVLlKpxnFxr6JmzCZe9WMZ2wjrFjlZiNAAECBAgQIECAAAECBAgQqBMQKD1oGYFFIEZwdLZFWBKPtGXodHbce9ufq7Pe8rG0fAzx11//9d54zZcAAQIECBAgQIAAAQIECLyZgEDpAdpYAROA8fPSCptcyRQrcmz/FciQ7SW7R7yyR9wfUXQuAQIECBAgQIAAAQIECBB4LiBQeu7xqncZVgTi0fcj3TJYrtI5+1LuCKJyFVRcJ76vKb536Oy8OCbrieO23+8Uocp2pU6MkaHOduyjus++dDzG3455dO7Rvjgnr3n0eeW+mHeabMeNR+Fiv0fitip+J0CAAAECBAgQIECAAAECLwvE39Nn24ezD65OOjtn1f0ZVkToc8+jW2fBUKzaybHDe/+Tj3Ltg6g8LldE5fvta4RD+YXV2/3xe8wjgrLtdjVWnv/auWfQ9dJ58XkGP3mtq9ejcCvrjzlvtxxXoLRV8TsBAgQIECBAgAABAgQIEHhZIP42P9sESmcym/2xCmi7gihAI6CIECPCope2s0BpG/hsx4nAZHu9s0Ap6ojQJsOheM3VSHn+NszJFUNxXoRVuUX4FPviZx/IxGfbMV/z6FrWEH5nWwY+ef1bXo8CpbhGnBvXtBEgQIAAAQIECBAgQIAAAQKPC8Tf2WebQOlMZrc/wppccXMUekQwsg2FtqcfBUoxXo5zFZDEMWeB0n5/XDNX6sR52zAp68k5xGtuuRLqbBXPNoi6CodyvHi9JeDZBmpRz3bsDMfOTLfXit8j6ErPONdGgAABAgQIECBAgAABAgQIPCYQf2efbQKlM5mL/RHUxE+uwMkgI14jlNmv4jkKlDL4OQqF8tIZ/uyPyesdBUbb1UbbgCbHzOuehUd53PZ1G37F+LdsOed4pO9o2455NI84J44J4+1qqqOxcl/24yigy2O8EiBAgAABAgQIECBAgAABArcJCJRuc7r7qAhEIqDJoGe7+icGzXBlGwzl6pz9sdsiMvzZnhef53WOVu9sA6XtWPl7jnkVKEUQFcfFT65eymveGii9dJ00eekRtbx+jPfSFk5R55HLS+f6nAABAgQIECBAgAABAgQIEHguEH9jn21WKJ3J3LE/Q5QA365SyvBkGwxloLT/zqLtZY/Oi88z3DkKTu4NlGJVz9UXhOc1qwKlDIrOVjClQ65kiuBpa5qfb18FSlsNvxMgQIAAAQIECBAgQIAAgccEBEoP+GVIccsKmbjMUfByFAxloNRhhdL2O5Ki/gh5Yr75k6FOfFYVKGX4tg3Zztp066Ns2aujoO1sbPsJECBAgAABAgQIECBAgACBYwGB0rHLTXvze4yuHhHbDnRroHRLoJLX3ocueY2j4OSeFUoZxJytltqOeWuglCHa2QqkHPOlR97C9tZAKY+7tcZt3/xOgAABAgQIECBAgAABAgQIPBcQKD33eNW7DD4CMUKgqy1Don1IkuHKNhjarvo5+hLp7efb8+L61YFSjncWxGSwFcedHbN3ueW/vOUjdleuOU5c++hLxvO6/stbSnglQIAAAQIECBAgQIAAAQI1AvG3+NnmO5TOZDb7t4FK/L4PgCLoyEfYAnsfkBwFSjH89pztaqMYP1cNxXhvHSjlyp5YhRVBVm5Rx/bLxqOW/dzz2KPXHPcsCIprxTHxc3ZMGr20QizqivpiLBsBAgQIECBAgAABAgQIECDwuED8nX22CZTOZHb7t6FSgJ797MOkGOYsUIpVNblKZz9eBCN5zX2YksduQ6gsd7uiKvdtX3MV1XbM3Jfj7l/j86gn9h/Nbzv+9ves/+qcCJIyPIsv6s4tbPL8qPWlL+TOL/nejhFjxblR93a+eQ2vBAgQIECAAAECBAgQIECAwLlA/D19tgmUzmQO9kdYsw1XMniJsCX2b1f3bE8/C5TymP2YEaTEWLH/KAzJ61YFSlFHrPDZh1sRzuScbl0plHPKMaPWmM9LW8x1f/0IgWL/LVueu38kT6B0i55jCBAgQIAAAQIECBAgQIDA7wXib/qzTaB0JtNgf666uSWQaVDuYQm5+uilFUaHJ9+4M1Y5HQVvN57uMAIECBAgQIAAAQIECBAgQOBAQKB0gPK1d+WqpWjOUdgS++55zOxrz2t//ZznrSuN9uff8j5XT+1XJ91yrmMIECBAgAABAgQIECBAgACBYwGB0rHLV90bj5JFY+InHsvafil1/J6PakWolI+dfdWCH7h4rFKKeRwFZw8M++XUdAwvGwECBAgQIECAAAECBAgQIFAnIFCqsywdKb8jKYOlo9cVVt3kI2lvsUopVydND91KbyyDESBAgAABAgQIECBAgACBAgGBUgHiWw0RgVGGIttAKcKXlUKS/D6oyjm9ZVD1Vv02LgECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlKZ1SJwECBMzjDcYAABe2SURBVAgQIECAAAECBAgQIECgiYBAqUkjlEGAAAECBAgQIECAAAECBAgQmCIgUJrSKXUSIECAAAECBAgQIECAAAECBJoICJSaNEIZBAgQIECAAAECBAgQIECAAIEpAgKlBzsVgC/9fPvtn55+/vkfT58/f/7d1X755Z9fzo9j7tlizG+++ePTjz/+7Z7Tf3fODz/89SlqOar1dwfbQYAAAQIECBAgQIAAAQIECLxLAYHSg21/KUzafh5BzadPn55d8dFAKQKgCJSqAqCoL2quCqieTdYbAgQIECBAgAABAgQIECBAYAkBgdKDbczA6Lff/n060q+//uvLqp849vvv/3J63Gs/iHFjzFj9VLn99NPfv4x7NafK6xmLAAECBAgQIECAAAECBAgQmCUgUHqwX7cESnGJCGfy2I8f//PgVf97eqx4qlydlEXFaqeo9bvv/py7vBIgQIAAAQIECBAgQIAAAQIE/icgUPofxX2/ZEh0y2qeCGji+IoVRfmoXKwmeostHnmLWmMVlI0AAQIECBAgQIAAAQIECBAgsBUQKG017vj9NYFSPO62D5QyGHrtl3JnOFW12mk/9Xyc7ugRvZzH0Wf7cbwnQIAAAQIECBAgQIAAAQIE1hMQKD3Y09cEShkCbVco3RMoRYgU143H3Y62eGQtQ5+s7+r1bBVSjB/n7b9IPMcWKB3p20eAAAECBAgQIECAAAECBNYXiLzgbPtw9sHVSWfnrLo/g5qXHnnbfofSNqC5J1CKQCquG//h7WjLwCdre+n1LFCK8ePcbQB2dD37CBAgQIAAAQIECBAgQIAAgfclEHnB2SZQOpPZ7M+w5ipQygAojt2HQPcESldBT4RDsRIqQ6tYZbStLWvZ7ttM59mv+d/e4vuUbAQIECBAgAABAgQIECBAgACBFBAopcSdrxko3fIaQU88jrbd7gmU4vuW4npHK4si/MkwKf9b2/Z7ljIkymO2tex/z/Ap6rYRIECAAAECBAgQIECAAAECBFJAoJQSd77eEiTFiqKzx8buCZTymi+tMorQKI7dhkf539v2wdbR9O+p7Wgc+wgQIECAAAECBAgQIECAAIG1BARKD/bz1nDn7DL3hDa3XjNWMMWx2/Aowq2zL/Pe13hPbfsxvCdAgAABAgQIECBAgAABAgTWExAoPdjTW8Ods8vcE9rkf197aYVSrIrah0fxhd37fZW1nY1lPwECBAgQIECAAAECBAgQILCOgEDpwV5+jUDp6juUttOJ7z7af/9RvL81UMrvUIoQykaAAAECBAgQIECAAAECBAgQSAGBUkrc+fo1AqWr//KW08jH3eLY7bYPlCI0OlvplF/g7b+8bQX9ToAAAQIECBAgQIAAAQIECAiUHrwHvkaglCuH9mHRdioRHEVtcex224dR+xVM22PPxtge43cCBAgQIECAAAECBAgQIEDg/QkIlB7s+dcIlD5+/M+XsOjs0bX8Xqaobb/6KMOorPsslIov8s5jtl/qHVzxCFx85lG4B28epxMgQIAAAQIECBAgQIAAgaECkQucbR/OPrg66eycVfdn6LIPbm6db4Y/8b1Ir9ly9VCES/stH3c7e1RtGwjtw6IcK8c4Co225+fxXgkQIECAAAECBAgQIECAAIH3I3CVDQmUGt8HGUTF9xy9xZaPxt0blL1FTcYkQIAAAQIECBAgQIAAAQIEeggIlHr04a4qYlVTPPZ2tsrorkGfnp4+ffrkkbZ78ZxHgAABAgQIECBAgAABAgTegYBAaXCTc5XS/ou3H51SPCoXN4bVSY9KOp8AAQIECBAgQIAAAQIECKwpIFAa3td4NK1ylVKuTjr7/qXhXMonQIAAAQIECBAgQIAAAQIECgQESgWIX3OICIAiUKoKgCKgikfpqh+j+5pGrk2AAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK2AQKnW02gECBAgQIAAAQIECBAgQIAAgeUFBErLt9gECRAgQIAAAQIECBAgQIAAAQK1AgKlWk+jESBAgAABAgQIECBAgAABAgSWFxAoLd9iEyRAgAABAgQIECBAgAABAgQI1AoIlGo9jUaAAAECBAgQIECAAAECBAgQWF5AoLR8i02QAAECBAgQIECAAAECBAgQIFArIFCq9TQaAQIECBAgQIAAAQIECBAgQGB5AYHS8i02QQIECBAgQIAAAQIECBAgQIBArYBAqdbTaAQIECBAgAABAgQIECBAgACB5QUESsu32AQJECBAgAABAgQIECBAgAABArUCAqVaT6MRIECAAAECBAgQIECAAAECBJYXECgt32ITJECAAAECBAgQIECAAAECBAjUCgiUaj2NRoAAAQIECBAgQIAAAQIECBBYXkCgtHyLTZAAAQIECBAgQIAAAQIECBAgUCsgUKr1NBoBAgQIECBAgAABAgQIECBAYHkBgdLyLTZBAgQIECBAgAABAgQIECBAgECtgECp1tNoBAgQIECAAAECBAgQIECAAIHlBQRKy7fYBAkQIECAAAECBAgQIECAAAECtQICpVpPoxEgQIAAAQIECBAgQIAAAQIElhcQKC3fYhMkQIAAAQIECBAgQIAAAQIECNQKCJRqPY1GgAABAgQIECBAgAABAgQIEFheQKC0fItNkAABAgQIECBAgAABAgQIECBQKyBQqvU0GgECBAgQIECAAAECBAgQIEBgeQGB0vItNkECBAgQIECAAAECBAgQIECAQK3AqwOlOMEPA/eAe8A94B5wD7gH3APuAfeAe8A94B5wD7gH3APugaOY6sPRTvsIECBAgAABAgQIECBAgAABAgQInAkIlM5k7CdAgAABAgQIECBAgAABAgQIEDgUECgdsthJgAABAgQIECBAgAABAgQIECBwJiBQOpOxnwABAgQIECBAgAABAgQIECBA4FBAoHTIYicBAgQIECBAgAABAgQIECBAgMCZgEDpTMZ+AgQIECBAgAABAgQIECBAgACBQ4H/Byq1bqlzO5aLAAAAAElFTkSuQmCC" width="693" height="286"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch the mechanism for the reaction of 2-methylbut-2-ene with hydrogen bromide using curly arrows.</p>
<p style="text-align:center;"><img src="data:image/png;base64,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" width="225" height="109"></p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the major organic product is 2-bromo-2-methylbutane and not 2-bromo-3-methylbutane.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce two features of this molecule that can be obtained from the mass spectrum. Use section 28 of the data booklet.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="660" height="270"></p>
<p style="text-align:center;">NIST Mass Spectrometry Data Center Collection © 2014 copyright by the U.S. Secretary of Commerce <br>on behalf of the United States of America. All rights reserved.<br><br></p>
<p><img 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" width="764" height="248"></p>
<div class="marks">[2]</div>
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the bond responsible for the absorption at <strong>A</strong> in the infrared spectrum. Use section 26 of the data booklet.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="692" height="321"></p>
<p style="text-align:center;">NIST Mass Spectrometry Data Center Collection © 2014 copyright by the U.S. Secretary of Commerce <br>on behalf of the United States of America. All rights reserved.</p>
<p> </p>
<div class="marks">[1]</div>
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the identity of the unknown compound using the previous information, the <sup>1</sup>H NMR spectrum and section 27 of the data booklet.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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" width="387" height="329"></p>
<p style="text-align:center;">SDBS, National Institute of Advanced Industrial Science and Technology (AIST).<br><br></p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">g(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the stereoisomers of butan-2-ol using wedge-dash type representations.</p>
<div class="marks">[1]</div>
<div class="question_part_label">h(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how two enantiomers can be distinguished using a polarimeter.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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7E9MEUMMYvBLBX7sPSbsaLcTvZxKKY2M8Wvh8p18Uibd0SKaYbPQxdTu39Y7xVJGxpO80Vwe21DHeDD9AuYOTO1Pc/1qhigmGYwbYtVllBlHKK0Xb3XRwc1tG7duvZ1RBFUzFglDSNaVXAzTL+AiWIqnmVeJQMU0wy2qxCMjOYzd4koIvcVelucUE+SXQ7MPqkKbobpF/pOMfXxIG2KZqAzooo+cmDHG2ZgViEYw9CEWaWIqa/4STs2JpmdhsrNMP0CToqpeJt5lQw0VkwxUGWBqMg6ctm2hQfloST7FF8E0bdvsBchxnGQgE3KfMW5Cm6G6RfwUEx9o4F2RTLQSDEV4ciThySmExGyfgLVW4btQctE+uAbwMP0C3ViEtNBPGN/FVz7+oR2bgYopq1WMivLElcEdSjJ7ucwfeqtD2x2Wd71srgJtV/DcC51NGISbE3PGymm+KXH3e1BS6gzAlvshgng3vr2AMesDqf/9jJ37txkG28XYZ/M/nCsKsS0t1/SD+mnvb3rrru2fxzK6tcwnEsdF9d2/4HJ3q6Ca+kf8+EZaKyY+lDWRDEFZp9UBTe28Pj2C30X8QldTH0xVcG1j89pk80AxTSDn1CDeCL96idQ/coyaGnvmkgfBh1b9g/TL9SlmAqDzKtkgGKawXYVgpHRvHMXTgPlVJ1389M0UUzTnLCkfAYophkchyqm/R5vyoDRtaufEA8zA6yCm2H6BbAU0y6Xc6MiBiimGURXIRgZzTt32SKT5waQq55dDsw+qQpuhukX+k4x9fEgbYpmgGKawWgVgpHRfOYue4Y5jACivqRhRKsKbobpFzBRTMWzzKtkgGKawXYVgpHR/MBdct0UuS2O/SquWLEiuc4KXBAqScOIVhXcDNMvYKKYimeZV8kAxTSD7SoEI6P5gbvsa6cirCjrFUqUicDADtt2Gka0quBmmH4Bl2C1ebDx1rk+DKYquK6TEy1tU0wzPBlDENuDUwTVlQNPr5ACvn0M2PikKrgZpl/oO8XUx4O0KZqBxohp0cSFdjz7Gmo/MYX4QZz6pWFEi2Laj8nBZaFyPbjntBjEAMV0EEOR7cdgxewTCwQWuUtEI4PG7pKBoBmgmAbtHnaODJCBWBigmMbiKfaTDJCBoBmgmAbtHnaODJCBCTGwebVZNmuB+eHG7RM6jE9liqkPS7QhA2QgMga2mS0Pj5p50842P1z7UiV9p5hWQjMbIQNkoDoGtpqnb/2ImTLlnMqEFNgoptV5mC2RATJQOgPrzP8tm2UOnnSSOfWhjaW3ZjdAMbXZ4DoZIAMRMzA2I53ZOtIcf9fzleOgmFZOORskA2SgeAZESPcx0y55wDxXfAMDj0gxHUgRDcgAGQidge1PjZqTRlpm0kk3mPvLv3Hflw6KaV9aWEgGyECQDGx/0Nx57jQz0trH7HftE2YbOrnlanP+wZNMa+Q0M/pUNXfu+3FDMe3HCsvIABkIlAE5nW+Ni+cz5p7Fe5iWLa419ZxiWhPxbJYMkIFhGXhqXEBHzJQ5R5mZrXpP7wUFxVSYYE4GyEA0DMg10rEvpNVz976XLIppLyPcJgNkIAIGHjW3n7mbabVGzJSzbjUP1nTTySaKYmqzwXUyQAYiYWCb2XTz/5pZyx6u5TGofiRRTPuxwjIyQAbIQE4GKKY5CaM5GSADZKAfAxTTfqywjAyQATKQkwGKaU7CaE4GyAAZ6McAxbQfKywjA2SADORkgGKakzCakwEyQAb6MUAx7ccKy8gAGSADORmgmOYkjOZkgAyQgX4MUEz7scIyMkAGyEBOBiimOQmjORkgA2SgHwMU036ssIwMkAEykJMBimlOwmhOBsgAGejHAMW0HyssIwNkgAzkZIBimpMwmpMBMkAG+jFAMe3HCsvIABkgAzkZoJjmJIzmZIAMkIF+DFBM+7HCMjJABshATgYopjkJozkZIANkoB8DFNN+rLCMDJABMpCTAYppTsJoTgbIABnoxwDFtB8rLCMDZIAM5GSAYpqTMJqTATJABvoxQDHtxwrLyAAZIAM5GWi0mF500UXmgx/8YHu59957c1En9ZCHko499lgjy/XXX+/drbvvvjuph/qbN2/2rlum4ac//emkX3naefHFF5N6Z555Zp6qpdr++Mc/Tvr17LPP5mpr7ty57bonnHBCrno0ro6BRovpqaeealqtVntZtWpVLtalHvIdO3bkqluWsd2nRYsWeTezfPnyhAccY/369d51yzQcGRlJ+pWnna1btyb1pk+fnqdqqbann3560q/HH388V1uTJ09u133Vq16Vqx6Nq2OAYkoxNRTTagYcxbQanutqhWJKMaWYVjT6KKYVEV1TMxRTiinFtKLBRzGtiOiamqGYUkwpphUNPoppRUTX1AzFlGJKMa1o8FFMKyK6pmYophRTimlFg49iWhHRNTVDMaWYUkwrGnwU04qIrqkZium4mO6+++5m6tSp3ov9TGeIz5nuv//+5sQTT/RaDj300OT5x1CfM/XFAjs84C7+CfU50zlz5nj5RnBPmjSJz5nWJJK+zVJMx8VUBt8weYhiOgwOqRPiQ/vSt7x5qGKaF4fY86F9X2mr3o5iSjFNZnEyYCmm5QxE+zRfuM6bU0zL8U0RR6WYjovp/PnzzVVXXeW92IMgxJnp0UcfbS699FKv5ZRTTukS1BDF1BcL7PDNBfFPqDPTxYsXe/lGcO+88848zS9C8Uo8BsV0XEz5bv7YNwogQiGKaZ4xwHfz87BF26IYoJhSTHk3v6jRNOA49mk+P3QygKwId1NMKaYU04oGLsW0IqJraoZiSjGlmFY0+CimFRFdUzMUU4opxbSiwUcxrYjompqhmFJMKaYVDT6KaUVE19QMxZRiSjGtaPBRTCsiuqZmKKYUU4ppRYOPYloR0TU1QzGlmFJMKxp8FNOKiK6pmUaL6cKFC820adPayx133JHLBVIPeYhvQPEP9cZeQgj1DSg+Z5pruEVh3GgxjcJD7CQZIANRMEAxjcJN7CQZIAOhM0AxzfDQ0qVLzZIlS8yjjz6aYRXPrtWrV5tf/epX8XQ4o6ebNm0yK1asaC8ZZlHtEjwbNmyIqt/s7BgDFNOMSMDnzvDhj2XLlmVYxbNrr732MpMnT46nwxk9/ctf/pJ8GSrDLKpd8qWrO++8M6p+s7NjDFBMMyKBYppBTs27KKY1O4DNpxigmKYo6RRQTDtchLZGMQ3NI+wPxTQjBiimGeTUvItiWrMD2HyKAYppipJOAcW0w0VoaxTT0DzC/lBMM2KAYppBTs27KKY1O4DNpxigmKYo6RRQTDtchLZGMQ3NI+wPxTQjBiimGeTUvItiWrMD2HyKAYppipJOAcW0w0VoaxTT0DzC/lBMM2KAYppBTs27KKY1O4DNpxigmKYo6RRQTDtchLZGMQ3NI+wPxTQjBiimGeTUvItiWrMD2HyKAYppipJOAcW0w0VoaxTT0DzC/lBMM2KAYppBTs27KKY1O4DNpxigmKYo6RRQTDtchLZGMQ3NI+wPxTQjBiimGeTUvItiWrMD2HyKAYppipJOAcW0w0VoaxTT0DzC/lBMM2KAYppBTs27KKY1O4DNpxigmKYo6RRQTDtchLZGMQ3NI+wPxTQjBiimGeTUvItiWrMD2HyKAYppipJOAcW0w0VoaxTT0DzC/lBMM2KAYppBTs27KKY1O4DNpxigmKYo6RQccMABZt999zU333xzpzDitQ996EPmwAMPjBhBp+uPPPJI2zfwj5YELFjuv/9+LZAahYNi2ih3EywZIANlMUAxLYtZHpcMkIFGMUAxdbj7H//4h7nxxhvNT3/6U/Pzn//c4LQy5vT000+bX//6120811xzTfSnkk888UTbPz/72c/ML37xC/O3v/3N7NixI1oXPffcc+aXv/xl2z/XXnutufvuu81LL70ULZ4mdjyXmH7gAx8wrVarvTzzzDO5+JJ6r3nNa3LVq9r4pptuSjBKn+18wYIFVXdp6Pa2bdtmIDY777yzE9NJJ5009PHrqPiNb3zDiQV+wv6YRAj+ecUrXuHE9L3vfa8Omr3axFiQsbFs2TKvOmL0nve8J6kbk7+k//1yiuk4K5h9vvWtb80MbAmc3XbbzeQNnn7kl1mGH4WRkZEkYKXv/fL3ve99Zvny5WV2Z0LH/u9//2uWLl1q9t9/fy888OPvf//7CbVZduUf/ehH5nWve50Xnje96U3t2XfZfcp7fIppN2ONF1PcOX3Xu96VBPUrX/lK84lPfMIgUK6//vr26dYtt9xiRkdHzWGHHZbYQZS+853vdLMZwNbatWvN0UcfnfwoYNZz7LHHtvHgkgVOH3H54lvf+pY57rjjDPCKwH7yk58MAEF3FzZt2mRmzpyZ9HHXXXc1mE2j//DPn/70J3P11Ve38R166KGJHXCff/75QZ76z5kzJ+nnTjvtZI466qh2fMEv8M/KlSvbeObOnZvYAc9nPvMZs2XLlm6CatyimHaT33gxnTVrVhKwEJVLLrmkm6GeLQxiER/koZ2ifO5zn0v6N3ny5IFictlllyX2wPPQQw/1IK5389WvfnXSPwg/fiyyEmaw9mnzT37ykyzzyvcdc8wxCR70E9d7s9I555yT2MM/3/zmN7PMK91HMe2mu9FiilNBEcY3vOENBjNQn3TGGWck9aZOnWq2b9/uU610mxUrViRCAhG66667vNrEzEh4wIsKuBkSQlq0aFHSLwgPZm4+6Wtf+1pSD2cToSRcShGe3/a2t5kHHnhgYNdefvll87GPfSyp9+Y3vzmYeKOYdruv0WJ68sknJ0G6cOHCbmYGbO25555J3VBmP/Yp+5e+9KUBCDq777vvvgQLBvu5557b2Vnjmn1NETM034QbbyJayENJxx9/fNKvvPH22te+Nqm7Zs2aICBRTLvdkCvStN3Nx5MFMujyzsYWL15s9tprL/PVr37V/Pa3v+1mtYatK664IsECTHkHHG5C7b777mb+/Pnm9ttvrwFBd5N//etfEzzgOW/68Ic/3Mbz+c9/3vzhD3/IW71w+/Xr1yd48HRF3stDZ511VvupDFwvDgEPCKKYdodJY8X0C1/4QhLcX//617tZiXALg0x+GPbbb78IEXR3GTM3wfOVr3yle2eEW/alFNwQ1JAopt1ebKyYvuUtb0kG67PPPtvNSoRb06dPT/CEctlhIjTaP3ahXHaYCB75YUAOEdKQKKbdXhxaTE855RRz5plnei8STPZD+//617/MIYccUsmCx2sk4YaRfcdXyovIcbe5Kkz2YzK77LJLIqa4aVFUwvXHKvD0vjxw5JFHJnjuuOOOouC0j4NLAGVjsuMNjUr8I//2t79dKJ7PfvazpeMRvuyO22I6e/Zsby2AbrzxjW9MOMl7ycPuQ0jrQ4upHRx51m0xXbduXUJonmMMYwvxlPTiiy92tSvlReR///vfu449TF996zz//PNJl+06SWEBKwh0+9hlrWNmbSf7DZnNmzfbuya8bt/MKQsPbgZKwo+b3U7RZw643m0fv8x1wYTcFtOJtEkxHX+tNC+JtphiZgWHVLVIIPznP//pCj4pLyLHbLsqPMAhyfaDlBWR4+2jKvD0Pt9rv0iBPhSZcNmgbEz286CIc9s/ePe+yIRna8vGI8e3+40yG9ew640X05jfzQ/10Rk7UPOuy4esEdAakv3kyJNPPhk9JFtofvCDH0SPBwBsMc37erV95kExjfxDJ3g7SAJcQ2TjIXDBs2HDhugh4Tqg4Bn0llAMYAULcoiQhkQx7fZirmmMPVuIeWYKCuzXSPM+kykUDnq1UeyqyO1Hb4Z9lOixxx6roqtebeD5XREgPNObN+G5zqeeemrg67R5jzus/Tvf+c4EzzD+wewN1+NxVhVKoph2e6KxYnrvvfcmwY33pfMmudGEGS4e46k72Z+mw6uxeRM+KIKbdHig/KMf/Wje6oXb41RYxHQYfr///e+368M/+IBL3SK0ZMmSBA9uGOVNeDUYfMA/ed+eytuWryPeJhMAAAowSURBVD3FtJupxoopaLBfV8x7aozvTMpg/9SnPtXNag1b+IKS9Ac5/nAuT4KASv2DDz44T9VSbP/5z38m/cH3D/ImfPlL8OCxsboTniCRx/Hw3YS84o7HqQTPF7/4xbrhtNunmHa7odFian+RJ8/n5zZu3Gjsh/5DeP0Sbp0xY0Yy4A4//PBuT2ds4QMpMlCRX3nllRnW1e2yL8UAj68APfjggwkezOTs53Gr6326JbwSKjyfdtppaQNHCW7AyeNcEOQ///nPDstqiymm3Xw3WkxxaivBjdz3q+b4OLTUmzZtWjejNW71Ps941VVXefVmypQpCR6ITyhfwbrooouSfoFvfEXKJx1xxBFJvRNPPNGnSiU2+HauxA1E0eerXi+88ILBN0+l3h577FFJX30aoZh2s9RoMQUV9uktAvbjH/+4cb1eisc/DjrooCSw99lnH7N169ZuRmvewncGZOBB9DH7dv1/1Z133mk+8pGPJPYQVfyXUkgJ/hA8EBVcG3b919Pq1avbbwKJPX4Y7rnnnpDgmAsvvLDrg9x4asF1IxNf83rve9+b4AcufDg6lEQx7fZE48UUdNgzMxmI+H95BP4NN9xgzjvvPPP617++K6hht2rVqm42A9nCNU/BITnuJuPGBf5MDw+U258QFJveB+cDgWPsV0ulr/gLE8xcgQffl4Vwyj7kEF68QBFiwpe57L5iHV/Guvjii811113X9hO+4NVrU/SbUxPlhmLazSDFdJwP+9umvUHcu42/zrj88su7mQxsCzM4ueHR2//ebbzKib80CTXh5uCXv/xlA957+95vG/8B9bvf/S5UOO3LKPaMux8GuwzvsUNkQ0sU026P5BJTPN6BZ+Sw5L2oL/VC/9wd/i0Sf/2B626YzSGQcTcZH/bFKfNtt93WzWDAW3jWErNr3P3F/0Ltvffe7Vn429/+9vY2ZkhFv9pYJh141vKCCy4w+EYpPlYC/+DP5t797nebE044wZx99tnB/9FhLz/4Yz3cmML/QsEveKztHe94RxsfPggSyrdLe/uNbVxWkXGN68F50ne/+92kbtGvC+fpR5G2ucS0yIZ5LDJABsiAJgYoppq8SSxkgAzUxgDFNIN63E3Fq6Z5H+jPOGStu/BXIMCkIeGRIfhm2FeBQ+RA8IT2hEiIXIXYJ4pphlfkS0x5v4iTcchad+GOMV6v1JDwhpfcpNGABxgEDx5ZY4qPAYpphs8ophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNigGKaQU7NuyimNTuAzacYoJimKOkUUEw7XIS2RjENzSPsD8U0IwYophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNigGKaQU7NuyimNTuAzacYoJimKOkUUEw7XIS2RjENzSPsD8U0IwYophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNigGKaQU7NuyimNTuAzacYoJimKOkUUEw7XIS2RjENzSPsD8U0IwYophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNigGKaQU7NuyimNTuAzacYoJimKOkUUEw7XIS2RjENzSPsD8U0IwYophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNigGKaQU7NuyimNTuAzacYoJimKOkUUEw7XIS2RjENzSPsD8U0IwYophnk1LyLYlqzA9h8igGKaYqSTgHFtMNFaGsU09A8wv5QTDNi4PLLLzdLly41jz32WIZVPLtuu+02c9NNN8XT4Yyebtq0ydx4443tJcMsql2CZ8OGDVH1m50dY4BiykggA2SADBTAAMW0ABJ5CDJABshAo8X0wgsvNO9///vbyz333JMrGqQe8lDSvvvua2S57LLLvLv1m9/8JqmH+s8//7x33TINDzvssKRfedp54YUXknrHHXdcnqql2p533nlJv9auXZurrQMPPLBd94ADDshVj8bVMdBoMT311FNNq9VqL6tWrcrFutRDvmPHjlx1yzK2+7Ro0SLvZpYvX57wgGOsX7/eu26ZhiMjI0m/8rSzdevWpN706dPzVC3V9vTTT0/69fjjj+dqa/Lkye26uCnKFCYDFFOKqaGYVjM4KabV8FxXKxRTiinFtKLRRzGtiOiamqGYUkwpphUNPoppRUTX1AzFlGJKMa1o8FFMKyK6pmYophRTimlFg49iWhHRNTVDMaWYUkwrGnwU04qIrqkZiinFlGJa0eCjmFZEdE3NUEzHxXSnnXYyeRb7mc4QnzO1+5d3PcTnTPNiEPtQnzOV/uXN+ZxpTUrp0SzFdFxM8wa1bU8x9Yi0IUzsh/ZtvvOsU0yHIJ5VhmKAYjoupnvuuafZe++9vRd7QIcoplOnTk1elbVffe23Pm3atOTNHOAKcWbar9+usoMOOijBE6qY4vVQV//7leOsCb7hzHQonaukEsWU10x5zbSSoWYMr5lWRHRNzVBMKaYU04oGH8W0IqJraoZiSjGlmFY0+CimFRFdUzMUU4opxbSiwUcxrYjovs1sM1seHjWz5q826/run3ghxZRiSjGd+DjyOgLF1IumEozWmf+7+ggz7bRbzIPbSzj8+CEpphRTiml546vryBTTLjqq2dh+v1l9xh5mylm3liqkAEMxpZhSTKsZ1rybXxHPSTObV5vrTh8xk0680qzeXOKUdLxBiinFlGKajL5yVzgzLZffrqNjRnrmiGnNvNBcu6V8IUXbFFOKKcW0axSWt0ExLY/briOLkI6cZE59aGPXrjI3KKYUU4ppmSPMOjbF1CKjtNWtZu01B5qR1j5mv2ufMNtKayd94EaL6cUXX2wOP/zw9nLfffel2ckokXrIQ0kLFiwwsvzxj3/07tYjjzyS1EP9f//73951yzS84IILkn7laefll19O6l166aV5qpZqe8sttyT92rgx34xp8eLF7boLFy4stY8xHXz72ivMBf+zi2mNnGZGn3rJGLPNbLlrrpnZaplJJ91g7q/m7D6hrNFimrDAFTJABuJjQE7nx8XzyY1Xm/MPnmSJa7WQKKbV8s3WyAAZKJKBLeMC2ppp5syZYlo1nN4LHIqpMMGcDJCBCBmQa6StsS+FVXj3vpcsimkvI9wmA2QgLgY2/tDMH4GYHm5mrVpb6U0nmyiKqc0G18kAGYiQgUfNrScfY0YfzndTr2igFNOiGeXxyAAZaCQDFNNGup2gyQAZKJoBimnRjPJ4ZIAMNJIBimkj3U7QZIAMFM0AxbRoRnk8MkAGGskAxbSRbidoMkAGimaAYlo0ozweGSADjWSAYtpItxM0GSADRTNAMS2aUR6PDJCBRjJAMW2k2wmaDJCBohmgmBbNKI9HBshAIxmgmDbS7QRNBshA0QxQTItmlMcjA2SgkQxQTBvpdoImA2SgaAYopkUzyuORATLQSAYopo10O0GTATJQNAP/D/nr+8oTFomCAAAAAElFTkSuQmCC" width="197" height="194"></p>
<p><em>Penalize missing hydrogens in displayed structural formulas once only.</em></p>
<p><em>Accept condensed structural formulas: CH<sub>3</sub>CH(OH)CH<sub>2</sub>CH<sub>3</sub> / CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub> or skeletal structures.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Bonds broken:</em><br>2(C–C) + 1(C=C) + 8(C–H) + 6O=O / 2(346) + 1(614) + 8(414) + 6(498) / 7606 «kJ» ✓</p>
<p><em><br>Bonds formed:</em><br>8(C=O) + 8(O–H) / 8(804) + 8(463) / 10 136 «kJ» ✓</p>
<p><em><br>Enthalpy change:</em><br>«Bonds broken – Bonds formed = 7606 kJ – 10 136 kJ =» –2530 «kJ» ✓</p>
<p> </p>
<p><em>Award<strong> [3]</strong> for correct final answer.</em></p>
<p><em>Award<strong> [2 max]</strong> for «+» 2530 «kJ».</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="480" height="81"></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Sigma (σ):</em></p>
<p><em><img src="data:image/png;base64,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" width="513" height="49"></em></p>
<p><em>Accept any diagram showing end to end/direct overlap of atomic/hybridized orbitals and electron density concentrated between nuclei.</em></p>
<p> </p>
<p><em>Pi (π):</em></p>
<p><em><img src="data:image/png;base64,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" width="102" height="58"></em></p>
<p><em>Accept any diagram showing sideways overlap of unhybridized p/atomic orbitals and electron density above and below plane of bond axis.</em></p>
<p> </p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>Alternative 1</strong></em></p>
<p><em><strong><img 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" width="512" height="97"></strong></em></p>
<p><em><br>Penalize incorrect bond e.g., -CH-H<sub>3</sub>C or –CH<sub>3</sub>C only once in the paper.</em></p>
<p><em><strong><br>Alternative 2</strong></em></p>
<p><em><strong><img src="data:image/png;base64,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" width="517" height="96"></strong></em></p>
<p> </p>
<p>curly arrow going from C=C to H of HBr <em><strong>AND</strong> </em>curly arrow showing Br leaving ✓</p>
<p>representation of carbocation ✓</p>
<p>curly arrow going from lone pair/negative charge on Br<sup>−</sup> to C<sup>+</sup> ✓</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«2-bromo-2-methylbutane involves» formation of more stable «tertiary» carbocation/intermediate<br><em><strong>OR</strong></em><br>«2-bromo-3-methylbutane involves» formation of less stable «secondary» carbocation/intermediate ✓</p>
<p>«intermediate» more stable due to «increased positive» inductive/electron-releasing effect of extra –R/alkyl group/–CH<sub>3</sub>/methyl ✓</p>
<p><em><br>Do <strong>not</strong> award marks for quoting Markovnikov’s rule without any explanation.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>m/z 58:</em><br>molar/«relative» molecular mass/weight/Mr «is 58 g mol<sup>−1</sup>/58» ✓</p>
<p><em><br>m/z 43:</em><br>«loses» methyl/CH<sub>3</sub> «fragment»<br><em><strong>OR</strong></em><br>COCH<sub>3</sub><sup>+</sup> «fragment» ✓</p>
<p><em><br>Do <strong>not</strong> penalize missing charge on the fragments.</em></p>
<p><em>Accept molecular ion «peak»/ CH<sub>3</sub>COCH<sub>3</sub><sup>+</sup>/C<sub>3</sub>H<sub>6</sub>O<sup>+</sup>.</em></p>
<p><em>Accept any C<sub>2</sub>H<sub>3</sub>O<sup>+</sup> fragment/ CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub><sup>+</sup>/C<sub>3</sub>H<sub>7</sub><sup>+</sup>.</em></p>
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C=O ✓</p>
<p><em><br>Accept carbonyl/C=C.</em></p>
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Information deduced from <sup>1</sup>H NMR:</em></p>
<p>«one signal indicates» one hydrogen environment/symmetrical structure<br><em><strong>OR</strong></em><br>«chemical shift of 2.2 indicates» H on C next to carbonyl ✓</p>
<p><em><br>Compound:</em></p>
<p>propanone/CH<sub>3</sub>COCH<sub>3</sub> ✓</p>
<p> </p>
<p><em>Accept “one type of hydrogen”.</em></p>
<p><em>Accept <img src="data:image/png;base64,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" width="88" height="60">.</em></p>
<div class="question_part_label">g(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="383" height="115"></p>
<div class="question_part_label">h(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>enantiomers rotate «plane of» plane-polarized light ✓</p>
<p>equal degrees/angles/amounts <em><strong>AND</strong> </em>opposite directions/rotation ✓</p>
<p><em><br>Accept “optical isomers” for “enantiomers”.</em></p>
<div class="question_part_label">h(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">h(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">h(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Copper forms two chlorides, copper(I) chloride and copper(II) chloride.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Two electrolysis cells were assembled using graphite electrodes and connected in series as shown.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><img src="data:image/png;base64,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"></span></p>
<p> </p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Copper(I) chloride undergoes a disproportionation reaction, producing copper(II) chloride and copper.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2Cu<sup>+</sup> (aq) → Cu (s) + Cu<sup>2+</sup> (aq)</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Dilute copper(II) chloride solution is light blue, while copper(I) chloride solution is colourless.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the electron configuration of the Cu<sup>+</sup> ion.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Copper(II) chloride is used as a catalyst in the production of chlorine from hydrogen chloride.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">4HCl (g) + O<sub>2</sub> (g) → 2Cl<sub>2</sub> (g) + 2H<sub>2</sub>O (g)</span></p>
<p><span style="background-color: #ffffff;">Calculate the standard enthalpy change, Δ<em>H</em><sup>θ</sup>, in kJ, for this reaction, using section 12 of the data booklet.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The diagram shows the Maxwell–Boltzmann distribution and potential energy profile for the reaction without a catalyst.</span></p>
<p><span style="background-color: #ffffff;">Annotate both charts to show the activation energy for the catalysed reaction, using the label <em>E</em><sub>a (cat)</sub>.</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right:auto;margin-left:auto;display: block;" 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" width="657" height="313"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain how the catalyst increases the rate of the reaction.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Solid copper(II) chloride absorbs moisture from the atmosphere to form a hydrate of formula CuCl<sub>2</sub>•<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math>H<sub>2</sub>O.</span></p>
<p><span style="background-color: #ffffff;">A student heated a sample of hydrated copper(II) chloride, in order to determine the value of <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math>. The following results were obtained:</span></p>
<p><span style="background-color: #ffffff;">Mass of crucible = 16.221 g<br>Initial mass of crucible and hydrated copper(II) chloride = 18.360 g<br>Final mass of crucible and anhydrous copper(II) chloride = 17.917 g</span></p>
<p><span style="background-color: #ffffff;">Determine the value of <em><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math></em>.</span></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><span style="background-color: #ffffff;">State how current is conducted through the wires and through the electrolyte.</span></p>
<p><span style="background-color: #ffffff;">Wires: </span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Electrolyte:</span></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write the half-equation for the formation of gas bubbles at electrode 1.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Bubbles of gas were also observed at another electrode. Identify the electrode and the gas.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Electrode number (on diagram):</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Name of gas: </span></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the half-equation for the formation of the gas identified in (c)(iii).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the enthalpy of solution of copper(II) chloride, using data from sections 18 and 20 of the data booklet.</span></p>
<p><span style="background-color: #ffffff;">The enthalpy of hydration of the copper(II) ion is −2161 kJ mol<sup>−1</sup>.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the cell potential at 298 K for the disproportionation reaction, in V, using section 24 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Comment on the spontaneity of the disproportionation reaction at 298 K.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the standard Gibbs free energy change, Δ<em>G</em><sup>θ</sup>, to two significant figures, for the disproportionation at 298 K. Use your answer from (e)(i) and sections 1 and 2 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest, giving a reason, whether the entropy of the system increases or decreases during the disproportionation.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce, giving a reason, the sign of the standard enthalpy change, Δ<em>H</em><sup>θ</sup>, for the disproportionation reaction at 298 K.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Predict, giving a reason, the effect of increasing temperature on the stability of copper(I) chloride solution.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e(vi).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Describe how the blue colour is produced in the Cu(II) solution. Refer to section 17 of the data booklet.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce why the Cu(I) solution is colourless.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">When excess ammonia is added to copper(II) chloride solution, the dark blue complex ion, [Cu(NH<sub>3</sub>)<sub>4</sub>(H<sub>2</sub>O)<sub>2</sub>]<sup>2+</sup>, forms.</span></p>
<p><span style="background-color: #ffffff;">State the molecular geometry of this complex ion, and the bond angles within it.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Molecular geometry:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Bond angles: </span></span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Examine the relationship between the Brønsted–Lowry and Lewis definitions of a base, referring to the ligands in the complex ion [CuCl<sub>4</sub>]<sup>2−</sup>.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">f(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">[Ar] 3d<sup>10</sup><br><strong><em>OR</em></strong><br>1s<sup>2</sup> 2s<sup>2</sup> 2p<sup>6</sup> 3s<sup>2</sup> 3p<sup>6</sup> 3d<sup>10</sup> ✔</span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">Δ<em>H</em><sup>θ</sup> = ΣΔ<em>H</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-style: normal;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span><sub>f</sub> (products) − ΣΔ<em>H</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-style: normal;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span><sub>f</sub> (reactants) ✔<br>Δ<em>H</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-style: normal;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> = 2(−241.8 «kJ mol<sup>−1</sup>») − 4(−92.3 «kJ mol<sup>−1</sup>») = −114.4 «kJ» ✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"> NOTE: Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="296" height="255"></p>
<p><span style="background-color: #ffffff;"><em>E</em><sub>a (cat)</sub> to the left of <em>E</em><sub>a</sub> ✔ </span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><img 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" width="296" height="250"></span></p>
<p><span style="background-color: #ffffff;">peak lower <em><strong>AND</strong> E</em><sub>a (cat)</sub> smaller ✔</span></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«catalyst provides an» alternative pathway ✔</span></p>
<p><span style="background-color: #ffffff;">«with» lower <em>E</em><sub>a</sub><br><em><strong>OR</strong></em><br>higher proportion of/more particles with «kinetic» <em>E</em> ≥ <em>E</em><sub>a(cat)</sub> «than <em>E</em><sub>a</sub>» ✔</span></p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass of H<sub>2</sub>O = «18.360 g – 17.917 g =» 0.443 «g» <em><strong>AND</strong> </em>mass of CuCl<sub>2</sub> = «17.917 g – 16.221 g =» 1.696 «g» ✔</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">moles of H<sub>2</sub>O = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.443{\text{g}}}}{{18.02{\text{g mo}}{{\text{l}}^{ - 1}}}}"><mfrac><mrow><mn>0.443</mn><mo> </mo><mtext>g</mtext></mrow><mrow><mn>18.02</mn><mo> </mo><mtext>g mo</mtext><msup><mtext>l</mtext><mrow><mo>−</mo><mn>1</mn></mrow></msup></mrow></mfrac></math></span>=» 0.0246 «mol»<br><em><strong>OR</strong></em><br>moles of CuCl<sub>2</sub> =<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">«</span><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.696{\text{g}}}}{{134.45{\text{g mo}}{{\text{l}}^{ - 1}}}}"><mfrac><mrow><mn>1.696</mn><mo> </mo><mtext>g</mtext></mrow><mrow><mn>134.45</mn><mo> </mo><mtext>g mo</mtext><msup><mtext>l</mtext><mrow><mo>−</mo><mn>1</mn></mrow></msup></mrow></mfrac></math></span>= » 0.0126 «mol» ✔<br></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">«water : copper(II) chloride = 1.95 : 1»<br></span></p>
<p><span style="background-color: #ffffff;">«<em><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math></em> =» 2 ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept «<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math> =» 1.95.</span></em></p>
<p><em><span style="background-color: #ffffff;">NOTE: Award<strong> [3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Wires</em>:<br>«delocalized» electrons «flow» ✔<br></span></p>
<p><span style="background-color: #ffffff;"><em>Electrolyte</em>:<br>«mobile» ions «flow» ✔</span></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2Cl<sup>−</sup> → Cl<sub>2</sub> (g) + 2e<sup>−</sup><br><em><strong>OR</strong></em><br>Cl<sup>−</sup> → <span class="mjpage"><math alttext="\frac{1}{2}" xmlns="http://www.w3.org/1998/Math/MathML"> <mfrac> <mn>1</mn> <mn>2</mn> </mfrac> </math></span>Cl<sub>2</sub> (g) + e<sup>−</sup> ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept e for e<sup>−</sup>.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«electrode» 3 <em><strong>AND</strong> </em>oxygen/O<sub>2</sub> ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept chlorine/Cl<sub>2</sub>.</span></em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2H<sub>2</sub>O (l) → 4H<sup>+</sup> (aq) + O<sub>2</sub> (g) + 4e<sup>–</sup> ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept 2Cl<sup>–</sup> (aq) → Cl<sub>2</sub> (g) + 2e<sup>–</sup>.<br>Accept 4OH<sup>−</sup> → 2H<sub>2</sub>O + O<sub>2</sub> + 4e<sup>−</sup></span></em></p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">enthalpy of solution = lattice enthalpy + enthalpies of hydration «of Cu<sup>2+</sup> and Cl<sup>−</sup>» ✔</span></p>
<p><span style="background-color: #ffffff;">«+2824 kJ mol<sup>–1</sup> − 2161 kJ mol<sup>–1</sup> − 2(359 kJ mol<sup>–1</sup>) =» −55 «kJ mol<sup>–1</sup>» ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept enthalpy cycle. <br>Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>E</em><sup>θ</sup> = «+0.52 – 0.15 = +» 0.37 «V» ✔</span></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">spontaneous <em><strong>AND</strong> E</em><sup>θ</sup> positive ✔</span></p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">Δ<em>G</em><sup>θ</sup> = «−<em>nFE</em> = −1 mol × 96 500 C Mol<sup>–1</sup> × 0.37 V=» −36 000 J/−36 kJ ✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept “−18 kJ mol<sup>–1</sup> «per mole of Cu<sup>+</sup>»”.<br></span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept values of n other than 1.<br></span></em></p>
<p><em><span style="background-color: #ffffff;">Apply SF in this question.<br></span></em></p>
<p><em><span style="background-color: #ffffff;">Accept J/kJ or J mol<sup>−1</sup>/kJ mol<sup>−1</sup> for units.</span></em></p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2 mol (aq) → 1 mol (aq) <em><strong>AND</strong> </em>decreases ✔</span></p>
<p><em>NOTE: <span style="background-color: #ffffff;">Accept “solid formed from aqueous solution <strong>AND</strong> decreases”.<br>Do <strong>not</strong> accept 2 mol <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">→</span> 1 mol without (aq).</span></em></p>
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">Δ<em>G</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> </span><span style="background-color: #ffffff;">< 0</span><span style="background-color: #ffffff;"> <strong>AND</strong> </span><span style="background-color: #ffffff;">Δ</span><span style="background-color: #ffffff;"><em>S</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> < 0 <strong>AND</strong> Δ<em>H</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span></span><span style="background-color: #ffffff;"> < 0</span><em><span style="background-color: #ffffff;"><br><strong>OR</strong><br></span></em><span style="background-color: #ffffff;">Δ<em>G</em></span><span style="background-color: #ffffff;"><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> + <em>T</em>Δ<em>S</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> < 0 <strong>AND</strong> Δ<em>H</em><span style="font-size: 14px;"><sup><span style="text-align: left;color: #000000;text-indent: 0px;letter-spacing: normal;font-family: Verdana,Arial,Helvetica,sans-serif;font-style: normal;font-variant: normal;font-weight: 400;text-decoration: none;display: inline !important;white-space: normal;float: none;background-color: #ffffff;">θ</span></sup></span> < 0 ✔</span></p>
<div class="question_part_label">e(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>T</em>Δ<em>S</em> more negative «reducing spontaneity» <em><strong>AND</strong> </em>stability increases ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept calculation showing non-spontaneity at 433 K.</span></em></p>
<div class="question_part_label">e(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«ligands cause» d-orbitals «to» split ✔</span></p>
<p><span style="background-color: #ffffff;">light absorbed as electrons transit to higher energy level «in d–d transitions»<br><em><strong>OR</strong></em><br>light absorbed as electrons promoted ✔</span></p>
<p><span style="background-color: #ffffff;">energy gap corresponds to «orange» light in visible region of spectrum ✔</span></p>
<p><span style="background-color: #ffffff;">colour observed is complementary ✔</span></p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">full «3»d sub-level/orbitals<br><em><strong>OR</strong></em><br>no d–d transition possible «and therefore no colour» ✔</span></p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">octahedral <em><strong>AND</strong> </em>90° «180° for axial» ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept square-based bi-pyramid.</span></em></p>
<div class="question_part_label">f(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any <strong>two </strong>of:</em><br>ligand/chloride ion Lewis base <em><strong>AND</strong> </em>donates e-pair ✔<br>not Brønsted–Lowry base <em><strong>AND</strong> </em>does not accept proton/H<sup>+</sup> ✔<br>Lewis definition extends/broader than Brønsted–Lowry definition ✔</span></p>
<div class="question_part_label">f(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f(iv).</div>
</div>
<br><hr><br><div class="specification">
<p>3.26 g of iron powder are added to 80.0 cm<sup>3</sup> of 0.200 mol dm<sup>−3</sup> copper(II) sulfate solution. The following reaction occurs:</p>
<p style="text-align: center;">Fe (s) + CuSO<sub>4</sub> (aq) → FeSO<sub>4</sub> (aq) + Cu (s)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the limiting reactant showing your working.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The mass of copper obtained experimentally was 0.872 g. Calculate the percentage yield of copper.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The reaction was carried out in a calorimeter. The maximum temperature rise of the solution was 7.5 °C.</p>
<p>Calculate the enthalpy change, Δ<em>H</em>, of the reaction, in kJ, assuming that all the heat released was absorbed by the solution. Use sections 1 and 2 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State another assumption you made in (b)(i).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The only significant uncertainty is in the temperature measurement.</p>
<p>Determine the absolute uncertainty in the calculated value of Δ<em>H</em> if the uncertainty in the temperature rise was ±0.2 °C.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a graph of the concentration of iron(II) sulfate, FeSO<sub>4</sub>, against time as the reaction proceeds.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how the initial rate of reaction can be determined from the graph in part (c)(i).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, using the collision theory, why replacing the iron powder with a piece of iron of the same mass slows down the rate of the reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A student electrolyzed aqueous iron(II) sulfate, FeSO<sub>4</sub> (aq), using platinum electrodes. State half-equations for the reactions at the electrodes, using section 24 of the data booklet.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>n<sub>CuSO4</sub> <strong>«</strong>= 0.0800 dm<sup>3</sup> × 0.200 mol dm<sup>–3</sup><strong>»</strong> = 0.0160 mol <em><strong>AND</strong></em></p>
<p>n<sub>Fe</sub> <strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3.26\,{\text{g}}}}{{55.85\,{\text{g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>3.26</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>55.85</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span><strong>»</strong> = 0.0584 mol ✔</p>
<p>CuSO<sub>4</sub> is the limiting reactant ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> award M2 if mole calculation is not shown.</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em><br><strong>«</strong>0.0160 mol × 63.55 g mol<sup>–1</sup> =<strong>»</strong> 1.02 <strong>«</strong>g<strong>» ✔</strong></p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.872\,{\text{g}}}}{{1.02\,{\text{g}}}} \times 100 = ">
<mfrac>
<mrow>
<mn>0.872</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>1.02</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
<mo>=</mo>
</math></span><strong>» </strong>85.5<strong> «</strong>%<strong>» ✔</strong></p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em><br><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.872\,{\text{g}}}}{{63.55\,{\text{g}}\,{\text{mo}}{{\text{l}}^{--1}}}} = ">
<mfrac>
<mrow>
<mn>0.872</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>63.55</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span><strong>»</strong> 0.0137 <strong>«</strong>mol<strong>» ✔</strong></p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.0137\,{\text{mol}}}}{{0.0160\,{\text{mol}}}} \times 100 = ">
<mfrac>
<mrow>
<mn>0.0137</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.0160</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
<mo>=</mo>
</math></span><strong>»</strong> 85.6 <strong>«</strong>%<strong>» ✔</strong></p>
<p> </p>
<p><em>Accept answers in the range 85–86 %.</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p>q = <strong>«</strong>80.0 g × 4.18 J g<sup>–1</sup> K<sup>–1</sup> × 7.5 K =<strong>»</strong> 2.5 × 10<sup>3</sup> <strong>«</strong>J<strong>»</strong>/2.5 <strong>«</strong>kJ<strong>»</strong> ✔</p>
<p><strong>«</strong>per mol of CuSO<sub>4</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{ - 2.5\,{\text{kJ}}}}{{0.0160\,{\text{mol}}}} = - 1.6 \times {10^2}">
<mfrac>
<mrow>
<mo>−</mo>
<mn>2.5</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kJ</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.0160</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mo>−</mo>
<mn>1.6</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mn>2</mn>
</msup>
</mrow>
</math></span> kJ mol<sup>–1</sup><strong>»</strong></p>
<p><strong>«</strong>for the reaction<strong>»</strong> Δ<em>H</em> = –1.6 × 10<sup>2</sup> <strong>«</strong>kJ<strong>»</strong> ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>q = <strong>«</strong>80.0 g × 4.18 J g<sup>–1</sup> K<sup>–1</sup> × 7.5 K =<strong>»</strong> 2.5 × 10<sup>3</sup> <strong>«</strong>J<strong>»</strong>/2.5 <strong>«</strong>kJ<strong>»</strong> ✔</p>
<p><strong>«</strong>n<sub>Cu</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.872}}{{63.55}}">
<mfrac>
<mrow>
<mn>0.872</mn>
</mrow>
<mrow>
<mn>63.55</mn>
</mrow>
</mfrac>
</math></span> = 0.0137 mol<strong>»</strong></p>
<p><strong>«</strong>per mol of CuSO<sub>4</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{ - 2.5\,{\text{kJ}}}}{{0.0137\,{\text{mol}}}} = - 1.8 \times {10^2}">
<mfrac>
<mrow>
<mo>−</mo>
<mn>2.5</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kJ</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.0137</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mo>−</mo>
<mn>1.8</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mn>2</mn>
</msup>
</mrow>
</math></span> kJ mol<sup>–1</sup><strong>»</strong></p>
<p><strong>«</strong>for the reaction<strong>»</strong> Δ<em>H</em> = –1.8 × 10<sup>2</sup> <strong>«</strong>kJ<strong>»</strong> ✔</p>
<p> </p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>density <strong>«</strong>of solution<strong>»</strong> is 1.00 g cm<sup>−3</sup></p>
<p><em><strong>OR</strong></em></p>
<p>specific heat capacity <strong>«</strong>of solution<strong>»</strong> is 4.18 J g<sup>−1</sup> K<sup>−1</sup>/that of <strong>«</strong>pure<strong>»</strong> water</p>
<p><em><strong>OR</strong></em></p>
<p>reaction goes to completion</p>
<p><em><strong>OR</strong></em></p>
<p>iron/CuSO<sub>4</sub> does not react with other substances ✔</p>
<p> </p>
<p><em>The mark for “reaction goes to completion” can only be awarded if 0.0160 mol was used in part (b)(i).</em></p>
<p><em>Do <strong>not</strong> accept “heat loss”.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="0.2\,^\circ {\text{C}} \times \frac{{100}}{{7.5\,^\circ {\text{C}}}} = ">
<mn>0.2</mn>
<msup>
<mspace width="thinmathspace"></mspace>
<mo>∘</mo>
</msup>
<mrow>
<mtext>C</mtext>
</mrow>
<mo>×</mo>
<mfrac>
<mrow>
<mn>100</mn>
</mrow>
<mrow>
<mn>7.5</mn>
<msup>
<mspace width="thinmathspace"></mspace>
<mo>∘</mo>
</msup>
<mrow>
<mtext>C</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span><strong>»</strong> 3 %/0.03 ✔</p>
<p><strong>«</strong>0.03 × 160 kJ<strong>»</strong> = <strong>«</strong>±<strong>»</strong> 5 <strong>«</strong>kJ<strong>» </strong>✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="0.2\,^\circ {\text{C}} \times \frac{{100}}{{7.5\,^\circ {\text{C}}}} = ">
<mn>0.2</mn>
<msup>
<mspace width="thinmathspace"></mspace>
<mo>∘</mo>
</msup>
<mrow>
<mtext>C</mtext>
</mrow>
<mo>×</mo>
<mfrac>
<mrow>
<mn>100</mn>
</mrow>
<mrow>
<mn>7.5</mn>
<msup>
<mspace width="thinmathspace"></mspace>
<mo>∘</mo>
</msup>
<mrow>
<mtext>C</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span><strong>»</strong> 3 %/0.03 ✔</p>
<p><strong>«</strong>0.03 × 180 kJ<strong>»</strong> = <strong>«</strong>±<strong>»</strong> 5 <strong>«</strong>kJ<strong>» </strong>✔</p>
<p> </p>
<p><em>Accept values in the range 4.1–5.5 «kJ».</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p> </p>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p> </p>
<p> <img 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"></p>
<p>initial concentration is zero <em><strong>AND</strong> </em>concentration increases with time ✔</p>
<p>decreasing gradient as reaction proceeds ✔</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>draw a<strong>»</strong> tangent to the curve at time = 0 ✔</p>
<p><strong>«</strong>rate equals<strong>»</strong> gradient/slope <strong>«</strong>of the tangent<strong>»</strong> ✔</p>
<p> </p>
<p><em>Accept suitable diagram.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>piece has smaller surface area ✔</p>
<p> </p>
<p>lower frequency of collisions</p>
<p><em><strong>OR</strong></em></p>
<p>fewer collisions per second/unit time ✔</p>
<p> </p>
<p><em>Accept “chance/probability” instead of “frequency”.</em></p>
<p><em>Do <strong>not</strong> accept just “fewer collisions”.</em></p>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Anode (positive electrode):</em></p>
<p>2H<sub>2</sub>O (l) → O<sub>2</sub> (g) + 4H<sup>+</sup> (aq) + 4e<sup>–</sup> ✔</p>
<p> </p>
<p><em>Cathode (negative electrode):</em></p>
<p>2H<sub>2</sub>O (l) + 2e<sup>–</sup> → H<sub>2</sub> (g) + 2OH<sup>–</sup> (aq)<br><em><strong>OR</strong></em><br>2H<sup>+</sup> (aq) + 2e<sup>–</sup> → H<sub>2</sub> (g) ✔</p>
<p> </p>
<p><em>Accept “4OH<sup>–</sup> (aq) → O<sub>2</sub> (g) + 2H<sub>2</sub>O (l) + 4e<sup>–</sup>” <strong>OR </strong>“Fe<sup>2+</sup> (aq) → Fe<sup>3+</sup> (aq) + e<sup>–</sup>” for M1.</em></p>
<p><em>Accept “Fe<sup>2+</sup> (aq) + 2e<sup>–</sup> → Fe (s)” <strong>OR</strong> “SO<sub>4</sub><sup>2-</sup> (aq) 4H<sup>+</sup> (aq) + 2e<sup>–</sup> → 2H<sub>2</sub>SO<sub>3</sub>(aq) + H<sub>2</sub>O (l)”</em><br><em>for M2.</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.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Propene is an important starting material for many products. The following shows some compounds which can be made from propene, C<sub>3</sub>H<sub>6</sub>.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><br>Propene (C<sub>3</sub>H<sub>6</sub>) → C<sub>3</sub>H<sub>7</sub>Cl → C<sub>3</sub>H<sub>8</sub>O → C<sub>3</sub>H<sub>6</sub>O</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Consider the conversion of propene to C<sub>3</sub>H<sub>7</sub>Cl.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">An experiment was carried out to determine the order of reaction between one of the isomers of C<sub>3</sub>H<sub>7</sub>Cl and aqueous sodium hydroxide. The following results were obtained.</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right: auto; margin-left: auto; display: block;" 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" width="367" height="138"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the type of reaction.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the IUPAC name of the major product.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why it is the major product.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write an equation for the reaction of the major product with aqueous sodium hydroxide to produce a C<sub>3</sub>H<sub>8</sub>O compound, showing structural formulas.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the rate expression from the results, explaining your method.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the type of mechanism for the reaction of this isomer of C<sub>3</sub>H<sub>7</sub>Cl with aqueous sodium hydroxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Sketch the mechanism using curly arrows to represent the movement of electrons.</span></p>
<div class="marks">[4]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write an equation for the complete combustion of the compound C<sub>3</sub>H<sub>8</sub>O formed in (a)(iv).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the enthalpy of combustion of this compound, in kJ mol<sup>−1</sup>, using data from section 11 of the data booklet.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the reagents for the conversion of the compound C<sub>3</sub>H<sub>8</sub>O formed in (a)(iv) into C<sub>3</sub>H<sub>6</sub>O.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why the compound C<sub>3</sub>H<sub>8</sub>O, produced in (a)(iv), has a higher boiling point than compound C<sub>3</sub>H<sub>6</sub>O, produced in d(i).</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why the <sup>1</sup>H NMR spectrum of C<sub>3</sub>H<sub>6</sub>O, produced in (d)(i), shows only one signal.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Propene is often polymerized. Draw a section of the resulting polymer, showing two repeating units.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«electrophilic» addition ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Do <strong>not</strong> accept “nucleophilic addition” or “free radical addition”.<br>Do <strong>not</strong> accept “halogenation”.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2-chloropropane ✔</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">secondary carbocation/carbonium «ion» is more stable<br><em><strong>OR</strong></em><br>carbocation/carbonium «ion» stabilized by two/more alkyl groups ✔</span></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">CH<sub>3</sub>CHClCH<sub>3</sub> (l) + OH<sup>−</sup> (aq) → CH<sub>3</sub>CH(OH)CH<sub>3</sub> (aq) + Cl<sup>−</sup> (aq)<br><em><strong>OR</strong></em><br>CH<sub>3</sub>CHClCH<sub>3</sub> (l) + NaOH (aq) → CH<sub>3</sub>CH(OH)CH<sub>3</sub> (aq) + NaCl (aq) ✔</span></p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">Rate = <em>k</em> [C<sub>3</sub>H<sub>7</sub>Cl] [OH<sup>−</sup>] ✔<br></span></p>
<p><span style="background-color: #ffffff;">«[OH<sup>−</sup>] held constant and» [C<sub>3</sub>H<sub>7</sub>Cl] triples <em><strong>AND</strong> </em>rate triples «so first order wrt C<sub>3</sub>H<sub>7</sub>Cl» ✔<br></span></p>
<p><span style="background-color: #ffffff;">[C<sub>3</sub>H<sub>7</sub>Cl] doubles <em><strong>AND</strong> </em>[OH<sup>−</sup>] doubles <em><strong>AND</strong> </em>rate quadruples «so first order wrt OH<sup>−</sup>» ✔</span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">SN2 ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept ‘bimolecular nucleophilic substitution.’</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="628" height="118"></p>
<p><span style="background-color: #ffffff;">curly arrow going from lone pair on O/negative charge on OH<sup>–</sup> to C ✔<br></span></p>
<p><span style="background-color: #ffffff;">curly arrow showing C–Cl bond breaking ✔<br></span></p>
<p><span style="background-color: #ffffff;">representation of transition state showing negative charge, square brackets and partial bonds ✔<br></span></p>
<p><span style="background-color: #ffffff;">formation of CH<sub>3</sub>CH(OH)CH<sub>3</sub> <em><strong>AND</strong> </em>Cl<sup>–</sup> ✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;">NOTE: Do <strong>not</strong> allow arrow originating on H in OH<sup>–</sup>.</span></em></p>
<p><em><span style="background-color: #ffffff;">Allow curly arrow going from bond between C and Cl to Cl in either reactant or transition state. </span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> award M3 if OH–C bond is represented.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept formation of NaCl instead of Cl<sup>–</sup>.</span></em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2C<sub>3</sub>H<sub>8</sub>O (l) + 9O<sub>2</sub> (g) → 6CO<sub>2</sub> (g) + 8H<sub>2</sub>O (g)<br><em><strong>OR</strong></em><br>C<sub>3</sub>H<sub>8</sub>O (l) + 4.5O<sub>2</sub> (g) → 3CO<sub>2</sub> (g) + 4H<sub>2</sub>O (g) ✔</span></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>bonds broken:</em><br>7(C–H) + C–O + O–H + 2(C–C) + 4.5(O=O)<br><em><strong>OR</strong></em><br>7(414 «kJ mol<sup>−1</sup>») + 358 «kJ mol<sup>−1</sup>» + 463 «kJ mol<sup>−1</sup>» + 2(346 «kJ mol<sup>−1</sup>») + 4.5(498 «kJ mol<sup>−1</sup>») / 6652 «kJ» ✔<br></span></p>
<p><span style="background-color: #ffffff;"><em>bonds formed</em>:<br>6(C=O) + 8(O–H)<br><em><strong>OR</strong></em><br>6(804 «kJ mol<sup>−1</sup>») + 8(463 «kJ mol<sup>−1</sup>») / 8528 «kJ» ✔</span></p>
<p><span style="background-color: #ffffff;"><br>«Δ<em>H</em> = bonds broken − bonds formed = 6652 – 8528 =» −1876 «kJ mol<sup>−1</sup>» ✔</span></p>
<p> </p>
<p><em>NOTE: <span style="background-color: #ffffff;">Award<strong> [3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>/Cr<sub>2</sub>O<sub>7</sub><sup>2–</sup>/«potassium» dichromate «(VI)» <em><strong>AND</strong> </em>acidified/H<sup>+</sup><br><em><strong>OR</strong></em><br>«acidified potassium» manganate(VII) / «H<sup>+</sup> and» KMnO<sub>4</sub> / «H<sup>+</sup> and» MnO<sub>4</sub>– ✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept “H<sub>2</sub>SO<sub>4</sub>” or “H<sub>3</sub>PO<sub>4</sub>” for “H<sup>+</sup>”.<br>Do <strong>not</strong> accept HCl.<br>Accept “permanganate” for “manganate(VII)”.</span></em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">C<sub>3</sub>H<sub>8</sub>O/propan-2-ol: hydrogen-bonding <em><strong>AND</strong> </em>C<sub>3</sub>H<sub>6</sub>O/propanone: no hydrogen bonding/«only» dipole–dipole/dispersion forces ✔<br></span></p>
<p><span style="background-color: #ffffff;">hydrogen bonding stronger «than dipole–dipole» ✔</span></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">only one hydrogen environment<br><em><strong>OR</strong></em><br>methyl groups symmetrical «around carbonyl group» ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept “all hydrogens belong to methyl groups «which are in identical positions»”.</span></em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOcAAABxCAYAAAAuy7R+AAAK2ElEQVR4Ae2dsWvryBbG599Q7TZdule5crP1bVWkSbG9Id32glRbLQhueSEIDI8LS8Dc5jUX1N3CqFtCULPFYlxcghHfQ7ZsK+OxbDmaYx3vFwjRjCWdM7/5PsmamSAD/pAACfSSgOllVkyKBEgANCdFQAI9JUBz9rRjmBYJ0JzUAAn0lADN2dOOYVokQHNSAyTQUwLKzTlHNv2CKLyBMWb9G4SInr4hWxQ75HmC0BgMohTLXW21tUAaDWEGEdL9D/f2Pqvi0vHPShrAIsP0KUIYVGyNQRBGeJpmWGzP+YIkHBzkt0wjDMwQUbo7YntoJxtL5Mk9zKEYyxTR4FDfd5KAt5PoNWfxiunDCKY04/NGLG/Iv/++ElMQfsZsY9BLm+PS8c+QT5E/42EYIAgf8ZzN12cocnx/DBGYG4Txj8qgNOcZeE86RKk53/Ca/IrA/IIo/cdqaIH59AGBCTCKZ1jdPy9tjkvHtwgdLRZ/Ibm7gRk+It1c4LYH/Y3p+BbGfEKc/QRAc27RdLyh05zFDPEogBnFyGrfXrdsihzpJMEkzWnOLZTTN4osxqh+cbMOLfIUk+Qr0vyN5rTYdFlUac5j4tkDdOk716Xj7wFpqviJLP5UuzM27Vt+xjvnMULnfq7SnOtBhgHC5OW0dlfm2A4abQaP6n8FBoQuFv80StVe1QCZuUeSnzJCVpmzznJvW2JAaDdo5eLsHgxsBUZ853+VOd0dxNHa96o705wHLm4crX1Pt01JpTmxuhPWBnyOtbjN18rtiGR5JQ4wHCfvp2WOxXJ93ia+63jRus3UxGbA51jwdl9ri/x/eNxOfY0wTma1aZljsVyfb/I9cHfmVIoLmse6YwNCKLDIviGZpMjLAaOTzVGN9A5/w7Qc7Fj8QBze7kZ9z23SyfHPDdDtccef6cv55Uk14NbGnOVI738wfHhGXhRYzD4jDE69CBxqI815iMyF6punUtadHmAYfV9flc82R/UVL0yQf6SlZ8f/SNAPHNs4lTLHLL6rTWO1MaeV0+qu1mLswDp8XaQ5nVguWulchDBH9vzY2SKE9UT8Le6Sv9ZTMuc2WJs5ATgXISwyPEddLUJ4Qz79DcPgVySv5ZTMuT8057nk/B63ms/8A+Nh0PHyvU2HG5jhA5LNCplzW6PQnGVTV/OZ8RjD2uhrN8v3NiO8XTzTb/qKz5znylPpcdXX5+AB07lrtYPSZvUl7errczCeolog2JfMepGHztFaSXSru96Bq7JkHlcZq7rrHZiGucomt2gUzfkOVnWn3K4ptcvvdmahLYHVnfJ2N1Bnl9ue78r3pzntDn43z1n+i1TtvzLsfVluTeD9POcNwujPj88jt85CxwE0p45+Ypb/QgI054U6vVz/yR9/BK6B79UoRFtnMF9/xizPrI2viwbN6aIiUKdNPMxXQBRWCJrTAiJVpNj9ktbG10WD5nRREajTJh7mKyAKKwTNaQGRKlLsfklr4+uiQXO6qAjUaRMP8xUQhRWC5rSASBUpdr+ktfF10aA5XVQE6rSJh/kKiMIKQXNaQKSKFLtf0tr4umjQnC4qAnXaxMN8BURhhaA5LSBSRYrdL2ltfF00aE4XFYE6beJhvgKisELQnBYQqSLF7pe0Nr4uGjSni4pAnTbxMF8BUVghaE4LiFSRYvdLWhtfFw2a00VFoE6beJivgCisEDSnBUSqSLH7Ja2Nr4sGzemiIlCnTTzMV0AUVgia0wIiVaTY/ZLWxtdFg+Z0URGo0yYe5isgCisEzWkBkSpS7H5Ja+ProkFzuqgI1GkTD/MVEIUVgua0gEgVKXa/pLXxddGgOV1UBOq0iYf5CojCCkFzWkCkihS7X9La+Lpo0JwuKgJ12sTDfAVEYYVQbs45sukXROFN88tzrUZfrLjIMH2KVm/eLsVe/u6/jPZi2e0HVpVvgUX2DU+rN2+v2RpTvijpC6YfffnxPhmRGr3mdL52/g3599/3XzsvgrI5iPM17ts3mt0gjH9g0XwK0U915Vu9wn5lxt1by7ZvNAvuEM/0vZ5XqTmr92aaXxCl/1iiLTCfPiAwAUbxDL14H3X1Bmezfe9nPeW/MR3fwphPiLOf9Q8ut60s3+I1wV0Q7N77WSc3n2IcGJhRjKwXYqgn17yt05zFDPEoOAy8yJFOEkzSvBfmLLIYo4aLRZGnmCRfkeZvzb0l9KmufH8iiz81XNzekKdfkUxS5DSnfwUdE4//DNpEOCaeNueS2FdZvscu1BLIPMVQeedcphEGZoAwefGEpcvTLpBGQxhzjyRfdnliT+dSlu8yRTQwMGGC3BORS52W5vROXpnYoSxfmtO7gtsFyBOEDc9w7U7me+8l8uS+4ZnId/y259eW7wuScHB4/KFt83u0f+OdczMX16e/K3ZHnzPWc171QYBLtGHTz8efkcv52sm7ASzmu5mrPPx3zfeEZ+RyvtYacLsE36aYG63U/zaas75jv7abp1IWs88IDw2tX6IhjVMTc8ziOwTOaaFLJAtAWb6NUymLH4jLRSrOaawL8T0xrFJzlgJ6xfRhBBOEiJ6zagJ/juz5Uc8ihEWG59WKFiWLEHqbr2sRQvnt6c/16jEuQjjxctDlbqv5zD8wHgYqlu+t5jPjMYbV0r3ya06fl+/pyrecz/wv4vFopwUu3+vSbTwXCZDAhoDer7WbFvAvCVwpAZrzSjuWzdJPgObU34dswZUSoDmvtGPZLP0Ersac5cinph/m67e3tPF10dClaFcLqjptncF8Gzqzg4+08XU1meZ0URGo0yYe5isgCisEzWkBkSpS7H5Ja+ProkFzuqgI1GkTD/MVEIUVgua0gEgVKXa/pLXxddGgOV1UBOq0iYf5CojCCkFzWkCkihS7X9La+Lpo0JwuKgJ12sTDfAVEYYWgOS0gUkWK3S9pbXxdNGhOFxWBOm3iYb4CorBC0JwWEKkixe6XtDa+Lho0p4uKQJ028TBfAVFYIWhOC4hUkWL3S1obXxcNmtNFRaBOm3iYr4AorBA0pwVEqkix+yWtja+LBs3poiJQp008zFdAFFYImtMCIlWk2P2S1sbXRYPmdFERqNMmHuYrIAorBM1pAZEqUux+SWvj66JBc7qoCNRpEw/zFRCFFYLmtIBIFSl2v6S18XXRoDldVATqtImH+QqIwgpBc1pApIoUu1/S2vi6aNCcLioCddrEw3wFRGGFoDktIFJFit0vaW18XTSUmvMFSTiAGURIl+tm1TtjmUYYmCGidOFqs3xdniA0BoMoRZXu6h2S60QWSKPhu7bIJ2hFVJXvEnlyD2P191YPyxTR4D17q7W9LdKcEl2jSuwAVOVLc0pIuEWM/Ttn/WANd85dvjrunP3N123Obb68c25RCG3QnF5BO+6cu3h9u5jQnLu+6cUWzem1G2hOr3hPPbnuZ05jVgMr5cP//m//BoT2c6zlXRvcOrXzvO1XmVNHvps7Z42lQw/1wThv3Do+sW5zHhA0nzk/qBLeOT8IsJvDac5uODafRZXY3aO1uwbymXPHwu8WzemX7/rsNKdHypuvtQceYzha65G989QcEHJi6apS1cWE5uyq2zs6D83ZEUj3aWhONxfhWn6tlQCuSux85pSQxCkxlJrzlKZxHxLQTYDm1N1/zP6KCdCcV9y5bJpuAjSn7v5j9ldMgOa84s5l03QToDl19x+zv2ICNOcVdy6bppvA/wE6a5X7qHn/aAAAAABJRU5ErkJggg==">✔</span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;">NOTE: Continuation bonds must be shown. </span></em></p>
<p><em><span style="background-color: #ffffff;">Methyl groups may be drawn on opposite sides of the chain or head to tail. </span></em></p>
<p><em><span style="background-color: #ffffff;">Ignore square brackets and “n”.</span></em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Magnetite, Fe<sub>3</sub>O<sub>4</sub>, is another ore of iron that contains both Fe<sup>2+</sup> and Fe<sup>3+</sup>.</p>
</div>
<div class="specification">
<p>Iron exists as several isotopes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the ratio of Fe<sup>2+</sup>:Fe<sup>3+</sup> in Fe<sub>3</sub>O<sub>4</sub>.</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>State the type of spectroscopy that could be used to determine their relative abundances.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the number of protons, neutrons and electrons in each species.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAA+UAAAEsCAYAAACluxLfAAAgAElEQVR4Ae3djZHkyHG3cfnxhhxgnAMMWsCzgLRAtEC0gPRAtIBnAWmBaIHowXpwHuwbuWJp66qBnk40BvWBHyJm0QOgKjOfTPyBbPT2/NtXCwIIIIAAAggggAACCCCAAAIIdCHwb12sMooAAggggAACCCCAAAIIIIAAAl815YoAAQQQQAABBBBAAAEEEEAAgU4ENOWdwDOLAAIIIIAAAggggAACCCCAgKZcDSCAAAIIIIAAAggggAACCCDQiYCmvBN4ZhFAAAEEEEAAAQQQQAABBBDQlKsBBBBAAAEEEEAAAQQQQAABBDoR0JR3As8sAggggAACCCCAAAIIIIAAAppyNYAAAggggAACCCCAAAIIIIBAJwKa8k7gmUUAAQQQQAABBBBAAAEEEEBAU64GEEAAAQQQQAABBBBAAAEEEOhEQFPeCTyzCCCAAAIIIIAAAggggAACCGjKb1ID//7v/++rHwzUgBpQA2pADagBNaAG1IAaUAPX1MCrraam/FVSkx8XJ54FAQQQ6EGA/vSgziYCCAQB+qMOEECgF4GM/mjKe2XpYruZorjYNeYQQGBxAvRn8QQLD4GBCdCfgZPDNQQWJ5DRH0354sVQwssURRljjQACCJxBgP6cQdEcCCBwhAD9OULNGAQQOINARn805WcQn2COTFFMEA4XEUBgIgL0Z6JkcRWBxQjQn8USKhwEJiKQ0R9N+USJfcfVTFG8Y8dYBBBAoCVAf1oifkcAgasI0J+rSLODAAItgYz+aMpbeov+nimKRREICwEEOhGgP53AM4sAAr7oTQ0ggEA3Apn7H015tzRdazhTFNd6xhoCCKxOgP6snmHxITAuAfozbm54hsDqBDL6oylfvRr+FV+mKG6CRJgIIHARAfpzEWhmEEDggQD9eUBiAwIIXEQgoz+a8ouS0ttMpih6+8o+AgisRYD+rJVP0SAwEwH6M1O2+IrAWgQy+qMpXyv3u9FkimJ3EjsQQACBAwTozwFohiCAwCkE6M8pGE2CAAIHCGT0R1N+APCMQzJFMWN8fEYAgXEJ0J9xc8MzBFYnQH9Wz7D4EBiXQEZ/NOXj5vFUzzJFcaphkyGAwO0J0J/blwAACHQjQH+6oWcYgdsTyOiPpvwm5ZIpipsgESYCCFxEgP5cBJoZBBB4IEB/HpDYgAACFxHI6I+m/KKk9DaTKYrevrKPAAJrEaA/a+VTNAjMRID+zJQtviKwFoGM/mjK18r9bjSZotidxA4EEEDgAAH6cwCaIQggcAoB+nMKRpMggMABAhn90ZQfADzjkExRzBgfnxFAYFwC9Gfc3PAMgdUJ0J/VMyw+BMYlkNEfTfm4eTzVs0xRnGrYZAggcHsC9Of2JQAAAt0I0J9u6BlG4PYEMvqjKb9JuWSK4iZILgnzN7/59ddg/8rPn//8p6//+Md/X+JXxshf/vJfX+PHgsBRAvTnKLn9ca2m/P3vf9s/+OvXr60WPT24887Qwd///nedvWB+FQL055xM/vTTX1+6l2m1KX6PsfVSHxPaNOJCh0bMynw+ZfRHUz5ffg95nCmKQwYM2iTQ3gjXF6K913/8439uznX1xmjEf/jhV98uwpryq+mvZY/+nJ/PVj8+urFtteh8j96f8Z///J+vf/jDf/zfjf/7M5oBga/f6gmH9wncpSmnQ+/Xihm+E8jc/2jKv3Nb+lWmKJYGcXFw7Y1weyO993vvJjjeIa596+3PxWlj7mQC9OdkoF//t9Goz9F4/ew8bbXofI/enzGejtcxvT+jGRDQlJ9VA3dpyunQWRVjniCQuf/RlN+kZjJFcRMkl4TZ3gjXN5zPXscT6p9//vkSH7eMaMq3qNh2lAD9OUpuf9yWfjzTjVaL9mfut8fNcD/2K1umP+dkV1N+Dkez3ItARn805TepjUxR3ATJJWG+ciPcflSq3GxHY9xr0ZT3Ir+mXfpzfl6LTrTr+G6KreUVLdoad+U2TfmVtO9ji/6ck+u2KX/2yZyPLNa6Fdo00kKHRsrG/L5k9EdTPn++X4ogUxQvTeiglwhkboTbY+MCWJb6IhHHxVP0+v9exratL3qKhj8unPUFMF7H/1vfOv7Lly8Px7Zjt94syNopcbX2ykU+Yq9jDh+i2Yjj95bwK45p/S3x1jz35rD9cwhEDiznEtiq87Jt6zxp9eWZN3EetsfHuRXn+dbSnscxdmtpz+niZ+hR8X1rHeNiad8sjHM6dKx890WMjbm2PmUUMbX2w8/YvnV82Gvjok9bWR1/W9SF5X0Ccb7V52c5H47MXM+zpxcxb5zzrT78+ONvn/5Xndqf8Lm+Vyp2Q8/ae5nWTjm2rIsOxfy1loT/r96T9dah8D18CIYlrrIuelh0uebo9XECwffVRVP+KqnJj8sUxeShDuV+iFwRvI9y0B5bN5HtBWDrItNeYPYa1NqfmKe+IW1vQutjy+sz7JQktfbC5zrWYrOs4+Z7qzH46GJaxtcX1eKD9ecTCP6WcwmUmt5ax3ndLq2+tPvj9zi32uPa+bduxNvzOObYWtpzu9z8fXT+lvM2tKf2Z0vjyrHF/isxha688iYlfSpU51pHzVjeJ3B1U751ftfnf+hM0ZA2uriv2Wo86/HxOmyU5VUdiuNrLQs/PronG0GHwof6DcyWRf17e59XGFnnCQTXVxdN+aukJj8uUxSThzqU++0N7pZzIZRbgh7by1JfAGrhLK/bG9Gt+cqx7TouXGVpb67bY+P3WqyP2snYa31oY21vFNrj29+3morij/XnEIgcWM4lUNd16EyrEfV5GpY/0qI491+9YWvPoVY3wtbW0vpYbqhfvRlum/KaQXldxx0aWra/sm4b8zauV+agT1uZ77st8mZ5n0B7rW11IGOhPpe29OKjhryMj7H1g4XiwysNeZmjxPGqDoWNVsvKXGVd68AIOhQ+t9eA4uvWOq4FW1wLX+vXCQTfVxdN+aukJj8uUxSThzqU+xkRrIWxvUhtXQDKhaQNOG4s67nidf3UPfa3ftXvFsd87c3vlq0z7Ozd9Nb+bl0o64tF/cZAXEjqm/KIJXwPBrHeiqPl5/fzCQR/y7kE6nM8zuf2XKrfbAvL7TnfetNqTJx3ZYlzqh7f3rC1tuPYraW1EePqpd1f74vXrS4Fg4iznaeMa2/MY/5ybGhIqy0RV9kfc8TrmnN5TZ8K4TnWkTfL+wTaprycDx+tay0pXtRjWr1oz/PYX1/X2/O2va6Xa36xETpQP+Rox8d5Xy8f6VAc2x4Ttlo/ypwj6FD7xkDcN9VLaF34GXFFHDWv+jiv8wSiNl5dNOWvkpr8uExRTB7qUO7XN7LlAvHKun1i014A4ve9pb0A1BezMiYEOC5ExZf2Jru9KG5dbM6ws3XTW9/wFn9rX8Pn+oJRM47XdcNexlv3JRA5s5xLoJy7sY66j6W9Ga3Ppfo8afPRnodbN9HtMbUmtPuKP23ErY7FuHpp99f74nWrSxHHlr7Fse2bhnua2T6RexZX2KuZFv/oUyEx5rqt9zG9HN+rq5rytmludSJI1cfE+VcvrdZtjY9jYo4439t7ho90KGy1x+zpyyg61Oau1rmandfnE8joj6b8fP5DzpgpiiEDmNSp9uIQefjoZ0ss2wvA1jGBKC4u9fx7F4o4tr0Zrd8IaG9+W3tn2Wlv5sP39gIZvrbx1zfi9ZPyEnscHz7XMU1aQku4HXmxnEug1HqsSxMc506tOfWbbfX2Nh/tDdtW4xne13PUT1ra87j400bcnsftzXK7vx3f6lJ7M14f3+pbrRn1ca2WxZuNZWnjCm70qdCZZ93W+zyej+VpqxPB9ZWfrTf56nGtXtQ60+4rRFpfyhv17Tlb61QZ+9H6Ix2K8e0x7T1SsTGKDrVPygv/8Dt+tnStxGD9HoFg/eqiKX+V1OTHZYpi8lCHcr++uBQR3FrHcSGM7U1qCaa9AOzdNLfvysYFYW9pj60vKu3Nb70v5mvHHrXTXkD3LsBt/PUN9t7FpuYc49sY9rjYfj4B+vM5TEuN1+dNe26Wum+1qPYojilzvbqubR49j1u9a8/z2sd43epS7UN7bPtJnmc3ne2xZa6jcdGnQnCMNf05Jw9tI/yqVmSb8lfnrY8r90StRjy7N9mj8pEOxbj2mGK/nbPVll46FH5tPcCoGcbruBaUNzjaWPx+jEBwfXXRlL9KavLjMkUxeahDuf/sRjjjaHsBqG/66nnai2a5Ia+PKa/bi1d97LN9Mf4sO2fc9IY/4W/7EdL2YhO/Rz5ccEoFXLemP+ezruu7bU7bm684z55p0ZGmvM7p0fM4xtVLq3P1vnjd6lIcv7c8i7cds2f3aFzhZ73Qp5rG9a/rWr3e+joWM9f9j6J+pl/1vldfl/uXViPK9o/8qffv6cGzY9pzvhw7kg6FT+21YY/vkTczSszWvyQQjF9dNOWvkpr8uExRTB7qUO5nBPmZ4+1FYu8C0F6Qngnr3hO18KOdp72wtfuP2jnrprewi5g+ajAiJ5ZrCdCf83nXN1NtTcd5Vb9JFU+qnmnRR+dMbat+XaJ69TxunxrFuHppda7eF69b3Ynj95Z2rp5PqIqP9KmQuHZNf87hPWNTvvWU/iMarXZsHd8eE9q0tbTHjaBD4UNofutbre3xOvJteZ9ARn805e/znmKGTFFMEdAkTj67Ec6E0Irn3gWgvTmOcXtLNNK1CMcNY1nam9+2KT/LTjtP21wUf16Nvxxf1uF3G2fE7Gl5IXTNmv6cz7k+d7fOm48a7dqj9thaC+rj9l6/eh7XbxSE/zGuXtrzvN4Xr1tdeqZvcTNeM9rTzLhBrY+LNw7K8mpcrd97tsq8ZU2fConPXUd+Le8TuKopr3WiPh9fiaA9Z7Pjw0Z7Pm/ZbY/ZO+dn0KG4Hwotat80PfL/8bdY3X1bRn805TeplkxR3ATJJWFe3ZRHUK2wbl0s4sJVX/jidf0Oboypb1RDsNvlDDvtBXSruQi7r14AWx/L7+1HtraYlGOtzydAfz6HaTlH986bVn/K8W0+4qas3pd9utQ2tjFXrScRfaspcUyc//XSnuf1vq054vi9Jd5YqGPaO7Z9067WOvq0R3eu7VEHlvcJXNWUt9frVic+iqTVva3xcd7HPUyc7+39wEc6FPbbY9o5io8z6VB7HdjTzBKb9WsEMvqjKX+N6fRHZYpi+mAHCqC9OBx17dULQMzfXjgj9/XHkOIi0fpV34jGHO0NdHnHNG60ywXuDDtn3PSWd3nDx4irvThGvM/egDiaE+NeJ0B/Xmf16pHBtPxE3W8t7Xlcjt/KR6sxbWMev8d5FFpR60mxW59jMX/RjNjfnoPFj6IlZY7Whzi3YynrNp6PbhpbnYvji83QsvYpVvvmJH0qmZl7vVXvc0fUx/uta345lz9at+dqfXyrX+153l7XY39sC40JPSrndKES29r5Y0xZtuKo93+kQzFPe0w9vtgp6xF0KHwJLvETOtfqe+hh8Ky5xbGW9wkE01cXTfmrpCY/LlMUk4c6lPutGB91LnMBCButuNZC275uL5YxPgS6Pa78HjfYZXnXzrs3vTG+bQaKn3vreIfcci2ByIXlXAJ1fYfO7C1t41nGtce3T0nKcXvr9oZtz87e+Nje3ky3T63L2HiiFUvc+JZtsd7SrjqubEztjTV9qmnO+zpqxfI+ga1mtj4fn71uz9X62C39ytxbxPi4Z6mX9pN8tb32devbRzoUdmJMPU+rHbUvvXUofNmLqY6hfh33Va0+1zF5/TqB4Prqoil/ldTkx2WKYvJQh3K/V1MeEF65SY4L397SXnSKYLdPyd6x8+5Nb/geF8NXG/Pw1XI9AfpzPvNyPsZ666a2WIyb1a3zo+yv123TW9uoX7cNecwRdlq9q8fEvlYr2pu+PfslvnZ/ezNdx1Jex5hnfoWPwSeOaxf61BKZ8/fIseV9Alc25eHt3j1IqyutjsTY0KNXxkfz3jb0rc4Ue0WHtnzb0o+aeG8dCl9efaMj9LB8OqmOwetjBDL6oyk/xni6UZmimC64gR1ubwaPutpeXD66ABQ7Iazl40rlwhLreNf0ozniQtW+uxoXsK1xR+2ccdNbYo0425v+EvMr8ZZ5rM8nQH8+h2mp7/pmcctSnBvl2LLeOi62xXkfx7faFTdqsf3ZzVoZW2zEOjQjxsXS+rF1Mx2fxGmfcsX5G0toTz33K035t4H/st3elNa+lePqNX2qacz7OmrG8j6Bq5vy8Dj0YOu6Hudy0ZVnkYXP7Xkf9RBztg8Y6nme6VAcd/SeLHxu/blSh8q9WqvvrVbXLLx+j0BGfzTl77GeZnSmKKYJiqMIIDAFAfozRZo4icCSBOjPkmkVFAJTEMjoj6Z8ipS+72SmKN63ZgYEEEDgOwH6852FVwggcC0B+nMtb9YQQOA7gYz+aMq/c1v6VaYolgYhOAQQuJwA/bkcOYMIIPAvAvRHKSCAQC8CGf3RlPfK0sV2M0VxsWvMIYDA4gToz+IJFh4CAxOgPwMnh2sILE4goz+a8sWLoYSXKYoyxhoBBBA4gwD9OYOiORBA4AgB+nOEmjEIIHAGgYz+aMrPID7BHJmimCAcLiKAwEQE6M9EyeIqAosRoD+LJVQ4CExEIKM/mvKJEvuOq5mieMeOsQgggEBLgP60RPyOAAJXEaA/V5FmBwEEWgIZ/dGUt/QW/T1TFIsiEBYCCHQiQH86gWcWAQS+/W17GBBAAIEeBDL3P5ryHhnqYDNTFB3cYxIBBBYmQH8WTq7QEBicAP0ZPEHcQ2BhAhn90ZQvXAh1aJmiqMd5jQACCLxLgP68S9B4BBA4SoD+HCVnHAIIvEsgoz+a8ndpTzI+UxSThMRNBBCYhAD9mSRR3ERgQQL0Z8GkCgmBSQhk9EdTPklS33UzUxTv2jIeAQQQqAnQn5qG1wggcCUB+nMlbbYQQKAmkNEfTXlNbuHXmaJYGIPQEECgAwH60wE6kwgg8I0A/VEICCDQi0BGfzTlvbJ0sd1MUVzsGnMIILA4AfqzeIKFh8DABOjPwMnhGgKLE8joj6Z88WIo4WWKooyxRgABBM4gQH/OoGgOBBA4QoD+HKFmDAIInEEgoz+a8jOITzBHpigmCIeLCCAwEQH6M1GyuIrAYgToz2IJFQ4CExHI6I+mfKLEvuNqpijesWMsAggg0BKgPy0RvyOAwFUE6M9VpNlBAIGWQEZ/NOUtvUV/zxTFogiEhQACnQjQn07gmUUAga/0RxEggEAvAhn9OdyUhxE/GKgBNaAG1IAaUANqQA2oATWgBtSAGnisgVffEHirKX/ViOP6E4iTxIIAAgj0IEB/elBnEwEEggD9UQcIINCLQEZ/NOW9snSx3UxRXOwacwggsDgB+rN4goWHwMAE6M/AyeEaAosTyOiPpnzxYijhZYqijLFGAAEEziBAf86gaA4EEDhCgP4coWYMAgicQSCjP5ryM4hPMEemKCYIh4sIIDARAfozUbK4isBiBOjPYgkVDgITEcjoj6Z8osS+42qmKN6xYywCCCDQEqA/LRG/I4DAVQToz1Wk2UEAgZZARn805S29RX/PFMWiCISFAAKdCNCfTuCZRQABX/SmBhBAoBuBzP2Pprxbmq41nCmKaz1jDQEEVidAf1bPsPgQGJcA/Rk3NzxDYHUCGf3RlK9eDf+KL1MUN0EiTAQQuIgA/bkINDMIIPBAgP48ILEBAQQuIpDRH035RUnpbSZTFL19ZR8BBNYiQH/WyqdoEJiJAP2ZKVt8RWAtAhn90ZSvlfvdaDJFsTuJHQgggMABAvTnADRDEEDgFAL05xSMJkEAgQMEMvqjKT8AeMYhmaKYMT4+I4DAuAToz7i54RkCqxOgP6tnWHwIjEsgoz+a8nHzeKpnmaI41bDJEEDg9gToz+1LAAAEuhGgP93QM4zA7Qlk9EdTfpNyyRTFTZAIEwEELiJAfy4CzQwCCDwQoD8PSGxAAIGLCGT0R1N+UVJ6m8kURW9f2UcAgbUI0J+18ikaBGYiQH9myhZfEViLQEZ/NOVr5X43mkxR7E5iBwIIIHCAAP05AM0QBBA4hQD9OQWjSRBA4ACBjP5oyg8AnnFIpihmjI/PCCAwLgH6M25ueIbA6gToz+oZFh8C4xLI6I+mfNw8nupZpihONWwyBBC4PQH6c/sSAACBbgToTzf0DCNwewIZ/dGU36RcMkVxEyTCRACBiwjQn4tAM4MAAg8E6M8DEhsQQOAiAhn90ZRflJTeZjJF0dtX9hFAYC0C9GetfIoGgZkI0J+ZssVXBNYikNEfTflaud+NJlMUu5PYgQACCBwgQH8OQDMEAQROIUB/TsFoEgQQOEAgoz+a8gOAZxySKYoZ4+MzAgiMS4D+jJsbniGwOgH6s3qGxYfAuAQy+qMpHzePp3qWKYpTDZsMAQRuT4D+3L4EAECgGwH60w09wwjcnkBGfzTlNymXTFHcBIkwEUDgIgL05yLQzCCAwAMB+vOAxAYEELiIQEZ/NOUXJaW3mUxR9PaVfQQQWIsA/Vkrn6JBYCYC9GembPEVgbUIZPRHU75W7nejyRTF7iR2IIAAAgcI0J8D0AxBAIFTCNCfUzCaBAEEDhDI6I+m/ADgGYdkimLG+PiMAALjEqA/4+aGZwisToD+rJ5h8SEwLoGM/mjKx83jqZ5liuJUwyZDAIHbE6A/ty8BABDoRoD+dEPPMAK3J5DRH035TcolUxQ3QSJMBBC4iAD9uQg0Mwgg8ECA/jwgsQEBBC4ikNEfTflFSeltJlMUvX1lHwEE1iJAf9bKp2gQmIkA/ZkpW3xFYC0CGf3RlK+V+91oMkWxO4kdCCCAwAEC9OcANEMQQOAUAvTnFIwmQQCBAwQy+qMpPwB4xiGZopgxPj4jgMC4BOjPuLnhGQKrE6A/q2dYfAiMSyCjP5rycfN4qmeZojjVsMkQQOD2BOjP7UsAAAS6EaA/3dAzjMDtCWT0R1N+k3LJFMVNkAgTAQQuIkB/LgLNDAIIPBCgPw9IbEAAgYsIZPRHU35RUnqbyRRFb1/ZRwCBtQjQn7XyKRoEZiJAf2bKFl8RWItARn805WvlfjeaTFHsTmIHAgggcIAA/TkAzRAEEDiFAP05BaNJEEDgAIGM/mjKDwCecUimKGaMj88IIDAuAfozbm54hsDqBOjP6hkWHwLjEsjoj6Z83Dye6lmmKE41bDIEELg9Afpz+xIAAIFuBOhPN/QMI3B7Ahn90ZTfpFwyRXETJMJEAIGLCNCfi0AzgwACDwTozwMSGxBA4CICGf3RlF+UlN5mMkXR21f2EUBgLQL0Z618igaBmQjQn5myxVcE1iKQ0Z9hmvKffvrr13C8/fnLX/5rMztfvnz5+sMPv/q6t39z0I03ZorixpiEjgACn0CA/nwCVFMigMBLBOjPS5gchAACn0Agoz/DNOXRXEeT/ery44+//dbAa8pfI5YpitdmdBQCCCDwGgH68xonRyGAwPkE6M/5TM2IAAKvEcjozzBN+e9//7uv8fPKUhr4CFRT/gqxr9/ewHjtSEchgAAC5xLIXJTOtWw2BBC4OwH6c/cKED8C/Qhk9GeYpvzVj6KXj63/+c9/8qQ8UWOZokhM61AEEEDgQwL050NEDkAAgU8iQH8+CaxpEUDgQwIZ/RmiKY9GO5yOJ+Wxjp/f/ObXX//+9789BBsfW//DH/7j6z//+T8fNuV//ON//t98Zd6P1mF3xSXitiCAAAI9CNCfHtTZRACBIEB/1AECCPQikNGfIZry8iVv8fS7LNGot415fFQ9tv3888+a8gLqxXWmKF6c0mEIIIDASwToz0uYHIQAAp9AgP58AlRTIoDASwQy+jNEU74XVTwRjyfjsZSPrUcDH0vmSfmqT7+/gXjxn0xRvDilwxBAAIGXCNCflzA5CAEEPoEA/fkEqKZEAIGXCGT0Z+imPJ6cl29kLx9bLwQ05YXEa+tMUbw2o6MQQACB1wjQn9c4OQoBBM4nQH/OZ2pGBBB4jUBGf6ZoyksDHoFt/ZSn6S2e8n/KPSn3f6ra2vA7AghcRyBzUbrOK5YQQOAOBOjPHbIsRgTGJJDRnyGa8vInzlqc8cVv8RH2raU06s/+JNqZTfk//vHfX8s3vpc3BqLZf2Z/y+9e2zJF0ctHdhFAYE0C9GfNvIoKgRkI0J8ZssRHBNYkkNGfIZry8v/F6wY3mu746Hrs21qubMrDr4C69xPNefgz8pIpipHj4BsCCMxHgP7MlzMeI7AKAfqzSibFgcB8BDL6M0RTHoijqa3/JFq8ftboXtWU1w15PHmv3ySIP9kWDXkAj3V8K/yoS6YoRo2BXwggMCcB+jNn3niNwAoE6M8KWRQDAnMSyOjPME35Z6B+9+Pr0YAHzPipn+LXvkYjXhrzsDfqkimKUWPgFwIIzEmA/syZN14jsAIB+rNCFsWAwJwEMvpzi6Y8gLzyE/9vvF7KU/Joup8t5bjyTfHPju21L1MUvXxkFwEE1iRAf9bMq6gQmIEA/ZkhS3xEYE0CGf3RlFcNe9uUx5fMBcyPnoCXj9LHsc8+ct+z3DJF0dNPthFAYD0C9Ge9nIoIgVkI0J9ZMsVPBNYjkNGfWzTlHz3p3iuB8rH0APrqT/w/8xGXTFGM6D+fEEBgXgL0Z97c8RyB2QnQn9kzyH8E5iWQ0R9N+ZM8H2nKf/rpr09m7LcrUxT9vGQZAQRWJEB/VsyqmBCYgwD9mSNPvERgRQIZ/dGUP6mA0pTH3yeffckUxeyx8h8BBMYiQH/GygdvELgTAfpzp2yLFYGxCGT0R1P+JHflT7TF/y2ffckUxeyx8h8BBMYiQH/GygdvELgTAfpzp2yLFYGxCGT0R1P+JHfxhDxgxk/998mfDBl2V6Yohg2CYwggMCUB+jNl2jiNwBIE6M8SaRQEAlMSyOjPUE15/Gmx8pHxCCKeVG81w+Xvj8cxP/74291vPC/HxZxHljpJSsIAAB6+SURBVPrvlD97Wl7+JFr4E3+3fMQlUxQj+s8nBBCYlwD9mTd3PEdgdgL0Z/YM8h+BeQlk9GeYprw0tuWL0qK5jaY8Guq60Y1tdYO8dUxJ3btNecxTPy0PW/WfTYumvdgI6CP/3/NMURR+1ggggMAZBOjPGRTNgQACRwjQnyPUjEEAgTMIZPRnmKY8mu9oeuul/P3v0qjHnxuL4Oq/BV6eZpdj6vGlYT76pLzMVTfmYX/rJ2yNvGSKYuQ4+IYAAvMRoD/z5YzHCKxCgP6skklxIDAfgYz+DNOUb2GOJ+QRTHkCHY1vpsE+qykP3+IJ+VZzHtvqp+dbcYywLVMUI/jLBwQQWIcA/VknlyJBYDYC9Ge2jPEXgXUIZPRn6KY8mt0IpjwFLx9dj4+6//DDr77ti231k/N10nhuJJmiONey2RBA4O4E6M/dK0D8CPQjQH/6sWcZgbsTyOjP0E15/N/x+sl4fKlbNOP1R8XjSXUcU/+/87sXwFb8maLYGm8bAgggcJQA/TlKzjgEEHiXAP15l6DxCCBwlEBGf4ZtyuPpeARSfzQ8mvK6SS+AolGPp+eWfQKZotifxR4EEEAgT4D+5JkZgQAC5xCgP+dwNAsCCOQJZPRnyKa8fGy9bbSjKa+/eb2g2dte9lt//fYGBw4IIIBADwKZi1IP/9hEAIF1CdCfdXMrMgRGJ5DRn+Ga8nhCHk++y5e71bCjId9qyuPpef2R9nqM1/9LIFMUmCGAAAJnEqA/Z9I0FwIIZAjQnwwtxyKAwJkEMvozVFNevi29fUJe4JQveCu/l7WPrxcS++tMUezPYg8CCCCQJ0B/8syMQACBcwjQn3M4mgUBBPIEMvozTFP+UUNeMMRH1eun6OWL3sp+620CmaLYnuFxa8wZP1v/z//x6F9uiTdYyvjy7fq/POL5b2XsEdsx8zvje/rO9ve/xvC8Qn65V75//UsgF/8W/M9e5DSfU/oxn37cNWdn6gX9+U7zrvUk7vm0r+c1/vsZ8/6rjP4M0ZSXv0deEtCu64+sx7Hxezkm/iTaly9f3qe2+AyZongVRcnBkca4p0BGfLP63pMb2/e6qL2qA68cR3++U3Ie3es8ejff746f9Vr3/Yx5/xX9+c7wrvUkbrr7/Sy49lVGf4Zoyq/Fc09rmaK4JyFRI4DAZxGgP59F1rwIIPARAfrzESH7EUDgswhk9EdT/llZGGzeTFEM5jp3EEBgcgL0Z/IEch+BiQnQn4mTx3UEJieQ0R9N+eTJftX9TFG8OqfjEEAAgVcI0J9XKDkGAQQ+gwD9+Qyq5kQAgVcIZPRHU/4K0QWOyRTFAuEKAQEEBiJAfwZKBlcQuBkB+nOzhAsXgYEIZPRHUz5Q4j7TlUxRfKYf5kYAgfsRoD/3y7mIERiFAP0ZJRP8QOB+BDL6oym/SX1kiuImSISJAAIXEaA/F4FmBgEEHgjQnwckNiCAwEUEMvqjKb8oKb3NZIqit6/sI4DAWgToz1r5FA0CMxGgPzNli68IrEUgoz+a8rVyvxtNpih2J7EDAQQQOECA/hyAZggCCJxCgP6cgtEkCCBwgEBGfzTlBwDPOCRTFDPGx2cEEBiXAP0ZNzc8Q2B1AvRn9QyLD4FxCWT0R1M+bh5P9SxTFKcaNhkCCNyeAP25fQkAgEA3AvSnG3qGEbg9gYz+aMpvUi6ZorgJEmEigMBFBOjPRaCZQQCBBwL05wGJDQggcBGBjP5oyi9KSm8zmaLo7Sv7CCCwFgH6s1Y+RYPATAToz0zZ4isCaxHI6I+mfK3c70aTKYrdSexAAAEEDhCgPwegGYIAAqcQoD+nYDQJAggcIJDRH035AcAzDskUxYzx8RkBBMYlQH/GzQ3PEFidAP1ZPcPiQ2BcAhn90ZSPm8dTPcsUxamGTYYAArcnQH9uXwIAINCNAP3php5hBG5PIKM/mvKblEumKG6CRJgIIHARAfpzEWhmEEDggQD9eUBiAwIIXEQgoz+a8ouS0ttMpih6+8o+AgisRYD+rJVP0SAwEwH6M1O2+IrAWgQy+qMpXyv3u9FkimJ3EjsQQACBAwTozwFohiCAwCkE6M8pGE2CAAIHCGT0R1N+APCMQzJFMWN8fEYAgXEJ0J9xc8MzBFYnQH9Wz7D4EBiXQEZ/NOXj5vFUzzJFcaphkyGAwO0J0J/blwAACHQjQH+6oWcYgdsTyOiPpvwm5ZIpipsgESYCCFxEgP5cBJoZBBB4IEB/HpDYgAACFxHI6I+m/KKk9DaTKYrevrKPAAJrEaA/a+VTNAjMRID+zJQtviKwFoGM/mjK18r9bjSZotidxA4EEEDgAAH6cwCaIQggcAoB+nMKRpMggMABAhn90ZQfADzjkExRzBgfnxFAYFwC9Gfc3PAMgdUJ0J/VMyw+BMYlkNEfTfm4eTzVs0xRnGrYZAggcHsC9Of2JQAAAt0I0J9u6BlG4PYEMvqjKb9JuWSK4iZIhIkAAhcRoD8XgWYGAQQeCNCfByQ2IIDARQQy+qMpvygpvc1kiqK3r+wjgMBaBOjPWvkUDQIzEaA/M2WLrwisRSCjP5rytXK/G02mKHYnsQMBBBA4QID+HIBmCAIInEKA/pyC0SQIIHCAQEZ/NOUHAM84JFMUM8bHZwQQGJcA/Rk3NzxDYHUC9Gf1DIsPgXEJZPRHUz5uHk/1LFMUpxo2GQII3J4A/bl9CQCAQDcC9KcbeoYRuD2BjP5oym9SLpmiuAkSYSKAwEUE6M9FoJlBAIEHAvTnAYkNCCBwEYGM/mjKL0pKbzOZoujtK/sIILAWAfqzVj5Fg8BMBOjPTNniKwJrEcjoj6Z8rdzvRpMpit1J7EAAAQQOEKA/B6AZggACpxCgP6dgNAkCCBwgkNEfTfkBwDMOyRTFjPHxGQEExiVAf8bNDc8QWJ0A/Vk9w+JDYFwCGf3RlI+bx1M9yxTFqYZNhgACtydAf25fAgAg0I0A/emGnmEEbk8goz+a8puUS6YoboJEmAggcBEB+nMRaGYQQOCBAP15QGIDAghcRCCjP2815WHIDwZqQA2oATWgBtSAGlADakANqAE1oAZ+WQOv9v9vNeWvGnFcfwJxglgQQACBHgToTw/qbCKAQBCgP+oAAQR6Ecjoj6a8V5YutpspiotdYw4BBBYnQH8WT7DwEBiYAP0ZODlcQ2BxAhn90ZQvXgwlvExRlDHWCCCAwBkE6M8ZFM2BAAJHCNCfI9SMQQCBMwhk9EdTfgbxCebIFMUE4XARAQQmIkB/JkoWVxFYjAD9WSyhwkFgIgIZ/dGUT5TYd1zNFMU7doxFAAEEWgL0pyXidwQQuIoA/bmKNDsIINASyOiPprylt+jvmaJYFIGwEECgEwH60wk8swgg4Ive1AACCHQjkLn/0ZR3S9O1hjNFca1nrCGAwOoE6M/qGRYfAuMSoD/j5oZnCKxOIKM/mvLVq+Ff8WWK4iZIhIkAAhcRoD8XgWYGAQQeCNCfByQ2IIDARQQy+qMpvygpvc1kiqK3r+wjgMBaBOjPWvkUDQIzEaA/M2WLrwisRSCjP5rytXK/G02mKHYnsQMBBBA4QID+HIBmCAIInEKA/pyC0SQIIHCAQEZ/NOUHAM84JFMUM8bHZwQQGJcA/Rk3NzxDYHUC9Gf1DIsPgXEJZPRHUz5uHk/1LFMUpxo2GQII3J4A/bl9CQCAQDcC9KcbeoYRuD2BjP5oym9SLpmiuAkSYSKAwEUE6M9FoJlBAIEHAvTnAYkNCCBwEYGM/mjKL0pKbzOZoujtK/sIILAWAfqzVj5Fg8BMBOjPTNniKwJrEcjoj6Z8rdzvRpMpit1J7EAAAQQOEKA/B6AZggACpxCgP6dgNAkCCBwgkNEfTfkBwDMOyRTFjPHxGQEExiVAf8bNDc8QWJ0A/Vk9w+JDYFwCGf3RlI+bx1M9yxTFqYZNhgACtydAf25fAgAg0I0A/emGnmEEbk8goz+a8puUS6YoboJEmAggcBEB+nMRaGYQQOCBAP15QGIDAghcRCCjP5ryi5LS20ymKHr7yj4CCKxFgP6slU/RIDATAfozU7b4isBaBDL6oylfK/e70WSKYncSOxBAAIEDBOjPAWiGIIDAKQTozykYTYIAAgcIZPRHU34A8IxDMkUxY3x8RgCBcQnQn3FzwzMEVidAf1bPsPgQGJdARn805ePm8VTPMkVxqmGTIYDA7QnQn9uXAAAIdCNAf7qhZxiB2xPI6I+m/CblkimKmyARJgIIXESA/lwEmhkEEHggQH8ekNiAAAIXEcjoj6b8oqT0NpMpit6+so8AAmsRoD9r5VM0CMxEgP7MlC2+IrAWgYz+aMrXyv1uNJmi2J3EDgQQQOAAAfpzAJohCCBwCgH6cwpGkyCAwAECGf3RlB8APOOQTFHMGB+fEUBgXAL0Z9zc8AyB1QnQn9UzLD4ExiWQ0R9N+bh5PNWzTFGcathkCCBwewL05/YlAAAC3QjQn27oGUbg9gQy+qMpv0m5ZIriJkiEiQACFxGgPxeBZgYBBB4I0J8HJDYggMBFBDL6oym/KCm9zWSKorev7COAwFoE6M9a+RQNAjMRoD8zZYuvCKxFIKM/mvK1cr8bTaYodiexAwEEEDhAgP4cgGYIAgicQoD+nILRJAggcIBARn805QcAzzgkUxQzxsdnBBAYlwD9GTc3PENgdQL0Z/UMiw+BcQlk9EdTPm4eT/UsUxSnGjYZAgjcngD9uX0JAIBANwL0pxt6hhG4PYGM/mjKb1IumaK4CRJhIoDARQToz0WgmUEAgQcC9OcBiQ0IIHARgYz+aMovSkpvM5mi6O0r+wggsBYB+rNWPkWDwEwE6M9M2eIrAmsRyOiPpnyt3O9GkymK3UnsQAABBA4QoD8HoBmCAAKnEKA/p2A0CQIIHCCQ0R9N+QHAMw7JFMWM8fEZAQTGJUB/xs0NzxBYnQD9WT3D4kNgXAIZ/dGUj5vHUz3LFMWphk2GAAK3J0B/bl8CACDQjQD96YaeYQRuTyCjP5rym5RLpihugkSYCCBwEQH6cxFoZhBA4IEA/XlAYgMCCFxEIKM/mvKLktLbTKYoevvKPgIIrEWA/qyVT9EgMBMB+jNTtviKwFoEMvozTFP+009//RqOtz9/+ct//SI78fsPP/zq23GxjnGjLn//+9++/vjjb/8vpj/+8T+7uZopim5OMowAAksSoD9LplVQCExBgP5MkSZOIrAkgYz+DNOUl2b7WUbimGhyf/7552+Hxe8R7D/+8d/PhnXZ989//s833/785z99s//ly5evv/nNr7/+4Q//0cWfTFF0cZBRBBBYlgD9WTa1AkNgeAL0Z/gUcRCBZQlk9GeYpvz3v//d1/jZW6IRjyfj0YjXSzS6PZ9A177Ur8On8K1eypsI5U2Fel+8jjccopn/jCVTFJ9h35wIIHBfAvTnvrkXOQK9CdCf3hlgH4H7EsjozzBN+VbDXaewfLw9njjPumjKZ80cvxFA4B0CmYvSO3aMRQABBFoC9Kcl4ncEELiKQEZ/hmjKo9EOp+NJeazjJ54yx//JLks0tNG41/9PO44Z+f+UF99jHX6H/8+e6ntSXhPzGgEEViGQuSitErM4EEBgDAL0Z4w88AKBOxLI6M8QTXl5Cl7+/3Ukrfwf7NKYx75oaqNxLx//jn0R7N7/KY8GOPZnftqPnJ9RQOF3+PBR0/3R/nd8CfsWBBBAoAcB+tODOpsIIBAE6I86QACBXgQy+jNEU74HKr4ULRrVWKIpj8Da/3P97P+ij9KUl/hKDOVNhNKsR1x7P+VNiTLH0XWmKI7aMA4BBBDYIkB/tqjYhgACVxCgP1dQZgMBBLYIZPRn6Ka8PB2PIOvXddB72+OY0pR/xtPv2ofM62cfYfekPEPSsQggMAuBzEVplpj4iQACcxCgP3PkiZcIrEggoz/TNOXl/5S3CYvGe6/pHrEpj8Z771vmNeVtdv2OAAIrEMhclFaIVwwIIDAOAfozTi54gsDdCGT0Z4imfK/hjua1/F3v8ne/y0e/S1LrY8q2su7ZlIdf5aP3xZ9Yx5PyeLq/tWjKt6jYhgACsxPIXJRmj5X/CCAwFgH6M1Y+eIPAnQhk9GeIpjy+1C2a1WjOyxJNeGyr/wRaNNn1U+byRW/t/zMvc5zZlMebAdFMB9zyE0/oa5+L3ViXL6+r/094jI8x5Yvq6uPjtaa8JeJ3BBBYgUDmorRCvGJAAIFxCNCfcXLBEwTuRiCjP0M05ZGgaKyj4S4Nb7zearajCS7HRBNbN71tos9qymubxXa9jkZ7y9dozGNfOTae+tdvMrT+fubv4YMFAQQQ6EGA/vSgziYCCAQB+qMOEECgF4GM/gzTlH8GrDOa8rohj/nqpjreEChN97Mn4J8RW3bOTFFk53Y8Aggg8IwA/XlGxz4EEPhMAvTnM+maGwEEnhHI6I+m/AnJaMADZvzsfUw9PopeGvNo2kddMkUxagz8QgCBOQnQnznzxmsEViBAf1bIohgQmJNARn9u0ZQHkFd+2i+RK0/Jo+l+tpTj4v/Aj7pkimLUGPiFAAJzEqA/c+aN1wisQID+rJBFMSAwJ4GM/mjKq4a9bcrj/4AHzI+egMf/J4/j4mfr/5aPUEaZohjBXz4ggMA6BOjPOrkUCQKzEaA/s2WMvwisQyCjP7doyj960r2X+vKx9AD66s+zL57bs3PF9kxRXOEPGwggcB8C9Oc+uRYpAqMRoD+jZYQ/CNyHQEZ/NOVP6uJIUx7fuD7ikimKEf3nEwIIzEuA/sybO54jMDsB+jN7BvmPwLwEMvqjKX+S59KUx98Xn33JFMXssfIfAQTGIkB/xsoHbxC4EwH6c6dsixWBsQhk9EdT/iR35e+mx/8tn33JFMXssfIfAQTGIkB/xsoHbxC4EwH6c6dsixWBsQhk9Geopjy+xbw8nY4goimu/y54wVz+/ngc8+OPv939crVyXMx5ZIkn5GEjfrb8ODJnrzERgwUBBBDoQYD+9KDOJgIIBAH6ow4QQKAXgYz+DNOUlz8rVv5Pdvz972jKo6GO12WJbfWT661jyrHvNuX13ymvbZb5y7r4HuBrX8v+EdaZohjBXz4ggMA6BOjPOrkUCQKzEaA/s2WMvwisQyCjP8M05dF8R4NdL+VPjZVGPb7ZPIKr/+xYaZzLMfX4d5vymKt+Wh7+1X82LWwXG+HXyP/3PFMUNUOvEUAAgXcJ0J93CRqPAAJHCdCfo+SMQwCBdwlk9GeYpnwr6HjqHMGUZjca4MxH0UvDnBmz5UfdmIc/Wz9ha+QlUxQjx8E3BBCYjwD9mS9nPEZgFQL0Z5VMigOB+Qhk9GfopjyeSkcw5Sl4+eh6fFz8hx9+9W1fbKufnNfpOqspjznDl63mPLbVT89r+yO9zhTFSH7zBQEE5idAf+bPoQgQmJUA/Zk1c/xGYH4CGf0ZuimP/8ddP+WOL3WLZrx+Kh1NcRwz6v/lHqWcMkUxis/8QACBNQjQnzXyKAoEZiRAf2bMGp8RWINARn+Gbcrj6XgEUj+Fjqa8btJLuqJRj6fnln0CmaLYn8UeBBBAIE+A/uSZGYEAAucQoD/ncDQLAgjkCWT0Z8imvHxsvW20oynf+hb0ve15dOuOyBTFuhREhgACPQjQnx7U2UQAgSBAf9QBAgj0IpDRn+Ga8nhCHk++42Pp7RIN+VZTHk/P64+0t+P87qKkBhBAoB+BzEWpn5csI4DAigToz4pZFRMCcxDI6M9QTXn5Yrb2CXnBXr7grfxe1j6+XkjsrzNFsT+LPQgggECeAP3JMzMCAQTOIUB/zuFoFgQQyBPI6M8wTflHDXnBEB9Vr5+ily96K/uttwlkimJ7hsetMWf8bP0//8ejf7kl3mAp48u36//yiOe/lbFHbMfM74zv6Tvb3/8aw/MK+eVe+f71L4Fc/FvwP3uR03xO6cd8+nHXnJ2pF/TnO8271pO459O+ntf472fM+68y+jNEU17+HnlJQLuuP7Iex8bv5Zj4k2hfvnx5n9riM2SK4lUUJQdHGuOeAhnxzep7T25s3+ui9qoOvHIc/flOyXl0r/Po3Xy/O37Wa933M+b9V/TnO8O71pO46e73s+DaVxn9GaIpvxbPPa1liuKehESNAAKfRYD+fBZZ8yKAwEcE6M9HhOxHAIHPIpDRH035Z2VhsHkzRTGY69xBAIHJCdCfyRPIfQQmJkB/Jk4e1xGYnEBGfzTlkyf7VfczRfHqnI5DAAEEXiFAf16h5BgEEPgMAvTnM6iaEwEEXiGQ0R9N+StEFzgmUxQLhCsEBBAYiAD9GSgZXEHgZgToz80SLlwEBiKQ0R9N+UCJ+0xXMkXxmX6YGwEE7keA/twv5yJGYBQC9GeUTPADgfsRyOiPpvwm9ZEpipsgESYCCFxEgP5cBJoZBBB4IEB/HpDYgAACFxHI6I+m/KKk9DaTKYrevrKPAAJrEaA/a+VTNAjMRID+zJQtviKwFoGM/mjK18r9bjSZotidxA4EEEDgAAH6cwCaIQggcAoB+nMKRpMggMABAhn90ZQfADzjkExRzBgfnxFAYFwC9Gfc3PAMgdUJ0J/VMyw+BMYlkNEfTfm4eTzVs0xRnGrYZAggcHsC9Of2JQAAAt0I0J9u6BlG4PYEMvqjKb9JuWSK4iZIhIkAAhcRoD8XgWYGAQQeCNCfByQ2IIDARQQy+qMpvygpvc1kiqK3r+wjgMBaBOjPWvkUDQIzEaA/M2WLrwisRSCjP5rytXK/G02mKHYnsQMBBBA4QID+HIBmCAIInEKA/pyC0SQIIHCAQEZ/NOUHAM84JFMUM8bHZwQQGJcA/Rk3NzxDYHUC9Gf1DIsPgXEJZPRHUz5uHk/1LFMUpxo2GQII3J4A/bl9CQCAQDcC9KcbeoYRuD2BjP5oym9SLpmiuAkSYSKAwEUE6M9FoJlBAIEHAvTnAYkNCCBwEYGM/mjKL0pKbzOZoujtK/sIILAWAfqzVj5Fg8BMBOjPTNniKwJrEcjoj6Z8rdzvRpMpit1J7EAAAQQOEKA/B6AZggACpxCgP6dgNAkCCBwgkNEfTfkBwDMOyRTFjPHxGQEExiVAf8bNDc8QWJ0A/Vk9w+JDYFwCGf3RlI+bx1M9yxTFqYZNhgACtydAf25fAgAg0I0A/emGnmEEbk8goz+a8puUS6YoboJEmAggcBEB+nMRaGYQQOCBAP15QGIDAghcRCCjP5ryi5LS20ymKHr7yj4CCKxFgP6slU/RIDATAfozU7b4isBaBDL6oylfK/e70WSKYncSOxBAAIEDBOjPAWiGIIDAKQTozykYTYIAAgcIZPRHU34A8IxDMkUxY3x8RgCBcQnQn3FzwzMEVidAf1bPsPgQGJdARn805ePm8VTPMkVxqmGTIYDA7QnQn9uXAAAIdCNAf7qhZxiB2xPI6I+m/CblkimKmyARJgIIXESA/lwEmhkEEHggQH8ekNiAAAIXEcjoj6b8oqT0NpMpit6+so8AAmsRoD9r5VM0CMxEgP7MlC2+IrAWgYz+aMrXyv1uNJmi2J3EDgQQQOAAAfpzAJohCCBwCgH6cwpGkyCAwAECGf3RlB8APOOQTFHMGB+fEUBgXAL0Z9zc8AyB1QnQn9UzLD4ExiWQ0R9N+bh5PNWzTFGcathkCCBwewL05/YlAAAC3QjQn27oGUbg9gQy+qMpv0m5ZIriJkiEiQACFxGgPxeBZgYBBB4I0J8HJDYggMBFBDL6oym/KCm9zWSKorev7COAwFoE6M9a+RQNAjMRoD8zZYuvCKxFIKM/mvK1cr8bTaYodiexAwEEEDhAgP4cgGYIAgicQoD+nILRJAggcIBARn805QcAzzgkUxQzxsdnBBAYlwD9GTc3PENgdQL0Z/UMiw+BcQlk9EdTPm4eT/UsUxSnGjYZAgjcngD9uX0JAIBANwL0pxt6hhG4PYGM/mjKb1IumaK4CRJhIoDARQToz0WgmUEAgQcC9OcBiQ0IIHARgYz+vNWUhyE/GKgBNaAG1IAaUANqQA2oATWgBtSAGvhlDbza/x9uyl814DgEEEAAAQQQQAABBBBAAAEEENgmoCnf5mIrAggggAACCCCAAAIIIIAAAp9OQFP+6YgZQAABBBBAAAEEEEAAAQQQQGCbgKZ8m4utCCCAAAIIIIAAAggggAACCHw6AU35pyNmAAEEEEAAAQQQQAABBBBAAIFtAprybS62IoAAAggggAACCCCAAAIIIPDpBDTln46YAQQQQAABBBBAAAEEEEAAAQS2CWjKt7nYigACCCCAAAIIIIAAAggggMCnE9CUfzpiBhBAAAEEEEAAAQQQQAABBBDYJqAp3+ZiKwIIIIAAAggggAACCCCAAAKfTkBT/umIGUAAAQQQQAABBBBAAAEEEEBgm4CmfJuLrQgggAACCCCAAAIIIIAAAgh8OgFN+acjZgABBBBAAAEEEEAAAQQQQACBbQKa8m0utiKAAAIIIIAAAggggAACCCDw6QQ05Z+OmAEEEEAAAQQQQAABBBBAAAEEtgn8fyLrYiwNR157AAAAAElFTkSuQmCC" width="502" height="151"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Iron has a relatively small specific heat capacity; the temperature of a 50 g sample rises by 44.4°C when it absorbs 1 kJ of heat energy.</p>
<p>Determine the specific heat capacity of iron, in J g<sup>−1 </sup>K<sup>−1</sup>. Use section 1 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A voltaic cell is set up between the Fe<sup>2+ </sup>(aq) | Fe (s) and Fe<sup>3+</sup> (aq) | Fe<sup>2+</sup> (aq) half-cells.</p>
<p>Deduce the equation and the cell potential of the spontaneous reaction. Use section 24 of the data booklet.</p>
<p><img 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" width="651" height="204"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The figure shows an apparatus that could be used to electroplate iron with zinc. Label the figure with the required substances.</p>
<p style="text-align:center;"><img 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EOWgAQkIIGVQqlQ+mMwIQGFckKYFiUBCUhAAkdDQKFUKI9msB5DQxXKY+gl2ygBCUhAAlMTUCgVyqnH1KLLUygX3f0GLwEJSGCxBBRKhXKxg38XgSuUu6BqmRKQgAQkcOgEFEqF8tDH6FG1T6E8qu6ysRKQgAQkMBEBhVKhnGgoWQwEFErHgQQkIAEJLJGAQqlQLnHc7yxmhXJnaC1YAhKQgAQOmIBCqVAe8PA8vqYplMfXZ7ZYAhKQgATGE1AoFcrxo8gSNgQUyg0KX0hAAhKQwIIILEYo//Zv//vqb/7mv66+851vr743QCLLa5AGkwTqCEwhlP/wrW8dzFglnqatLn7zJCABCUhgmQQWIZQf++hHN5PiG97wutVff/3ro6RSoVzmD0ufqMcK5ecfeWQzVinrr558cq9jtUkm/RnoMxo8RwISkMByCJy8ULIyWZ0Ur7vuTXudpJczvJYXKWOtXM3e5jUrk9Wxyi9A25RRPXes+FXbU75fXu8asQQkIAEJNBE4eaGsrvhkQqxOvNu8HztJN3WG+cdPgLGxzVgqz+WRjIxP98232uvY9B05Dz74wOrcuSsbT3/xxZ+u++D8+ecaz+kqg2tpI2U1JdpAOU2pq4wp2tmnjLHtJL6uMrp4nlI7u2Lt6vc+PLvK6MPzVNrZJ9au8dnFs0+fdPGcq51N/99MlX/yQukK5VRDxXL6EEAkSknc5rUrlH0Ie44EJCABCRwigZMXSib0Bz772c3KD7e7kcxtJvrquUiDSQJ1BMYIJeOMZyYpg43b3axaVsffNu/HjtW0pW5fF795EpCABCSwTAKLEEomYD7dzaS4zWTcdO7YSXqZQ20ZUU8xxhirY0UyY3fsWOX6pm0ZPWqUEpCABCTQh8BihJIJdorJPuX0ges5yyMw1RiLEI7d054xqUkmx5Y7pk1eKwEJSEACh0dAoRzwnZROpoc3kA+lRYyNsRI45fVjxyrXN22Hwtx2SEACEpDA/gkolArl/kfhCbVAoTyhzjQUCUhAAhLoTUChVCh7DxZP7CagUHYz8gwJSEACEjg9AgqlQnl6o3qPESmUe4Rv1RKQgAQksDcCCqVCubfBd4oVK5Sn2KvGJAEJSEACXQQUSoWya4x4fAsCCuUWsDxVAhKQgAROhsCihTLf98d3/lW3tk/aIg37Si+99NLqhRdeuGD71a/+376a1FlvXXvJO9QEy7o2w74r7Usoq+M378eOVa5v2rpYeFwCEpCABJZDYDahZFK67bZbVo888rn1l4y//PLLvSlzbZvg9TmWLzb/4L33rt761rdsJsn3vvc9q3PnrlpdccXrV7feesuK9+94x9vXxy+77NLVe95z24q/B17+dR3aM0dCYL75zf+x+tSnPrniL/xQ75vf/O9W99xz93q75ZZ3ra666ooV+yuvfMP6+Fve8ubVBz94z5rxPiTzBz/4/urxx7+4ev/7//2G8Z/92ftWV1991eptb7v+TNuJh414vvrVJ1ZcO3eCURi/8Y3n1u254oo3bNpJm9/0pmtXd91152bc0Bcw5roqY+LpMx7HnIMsMiYZq/w1Hep8/esvX7397Teu88i/7bZbV9dcc/WmD/jZe/TRz68Zb/uzl36q7ufuK+uTgAQkIIHDJTCbUILgn/7pn1avfe1rVjfe+Lb1RIco9VmpGjNJM/l+7KMf3UysyCJ5mdD/9E/fvEIc+TvKZR51Pvfcf1v99de/vv7TjQgb4slEzrFdJSZ75PfWW9+9lkQk4AtfeGwtDuUKWQSZfRLHEYyHH35oLaG08wMfuGtdXs7ZxZ56aScihth8+MP3rfuVWDgGO44nkR/B4TVjAKH8kz+5dvW61712fW5V1HLtVHu43X33XZtxGPn69a9/tamCNtNO2pjEdTB+9tln1u0ktne/++bNL0ljxmrGX92e8fm5v/iL1VVXXblCfPlzoozNp5/+xro9/MnGXEcbGecZ97QdxufOXbke67SR2Pr+7HF+3RYm7iUgAQlIQAKzCeV3v/svq0svvWQjFgjDk09+dXX55ZetRYJJsJy4y64ZMkkzwTKpMvkz+SI61XJY7XvNa159RiY5/+KL/3j1hcce20zQkclvfOO/bCbphx76D70m5DKOttfw+NKXHl8LN6th8CAhkzAqZZI8Ysk5nBe+Zd7Pf/7z9bWsvrIq+8wzTzcybmtb0zFWFFldhM/99390zbKsP20qZRJh4/wHHvjMmWJvuumdq+uvf+vqxz/+t42o3XHH7ZOuWjK+vva1p9YrdzfffNNGAmkPfX7+/HObNrGieu2115zhBXd++Sj7IjFSHuXQL+UvJ5G8ofvyFyJ+fh5+6KHNuPzaU0+tf6ZKmaRuxvC999yzPo/2kG644fp12+HPWGMsMK5gXvbZBsAfXnB901Y91/cSkIAEJLBcArMJJRM2K5NJTGxMaOQxoUVMHnzwgQskggmtz4TMis19H/rQ6vLLX7uWSSZaJlgkgJXIspy6lclIZymT5NF2bm+mDZlgOYaocayUjMTYtWdiT+yU+epXX7z64Q9/uLkMgaFupCUpMsk+ieOcV+aVfDmP1ShWhKkHmUMGmwQ+5dbtiZNb2sh4Yv/nf/7fF9SfNjX1eVk25zAWaHMSj0YQE1JHPaxgDmFMjDBO7IyFkieyDZNSJsm75JKLVgh5Ul1fJMZwp30ZG7ff/t5Vxl/GTd89j1c8/sUvrh9zQA6Rbcr9+P33b8YgMgmfMq8c66mL6+r4Jm5+3liFRYZZ2a4+dpB46vZh414CEpCABCQwm1D2EQvEgVUYVnuYwJBMVgJ5za1mhJEVG/a8Z+O2Hs+McQ4ieeONN2yed6xOsJzDRDtGJpnAKSdSwgR8770fWLcbwaTNrP5kQ+TYkM7kcRuaWCkH0UGaeBSgFKo6gSGPayIwDN+q1JBXlckMc/qAerhNSjspi2cEaX/ahnylzclD5jif29FsvOacpvrTpj59Xic71dip6x3vuPFM/bQp7Ut7aXvyPvjBe9eiRIy0l1vaVcaRqilkMiyoD9lGJu++6/e31LlNnWdxGbPIIuOYLeOY/bvedfP6lx/GMeOacZ7xVopjX5lkrNOeqqzXxZ1fnCKvMMvPHmXUbRlX7iUgAQlIQAKzCWVQt8lOOfGxsvTxj39svQrDZMaEywSNDCKdTHyZnNn3Xa3pK5PUSZnlyiSTOnkcS4o8IUGsOCKYDzzw2fU5rPowMbOxKki7eY4N8clqWx+hoq4pZLLkS5kRC1apImI8n8ftXtrKLfjkpy8i0lxfxl7lMZVMVmOHMQIZxohaE+NIbx3jxF7KJP06ZGWyZEEZWR3MLzQ8G4pgMk7ZkDe2W2559/pxDPIicl/+0pc214+VScY67Sl/UekTd/VnjzLqtvS5ewlIQAISkMCsQtlXJumWcpUqk/TYCZZyqh/AYWInv7zNjaSQVyeTrA5xjLQPocqQrat7G751YsHKKbGNlapdyeQcsW97m7scB8QNP4QyMonURTDZ1/1Ck19UGFs5d+xYTz0Zq7Szrc+b4ub6pi394V4CEpCABCQwm1BuIzulTNJFTGhTTLCUw0SfSZuVI/LqZPIjH/7w5jwEk5XJTPhcUyd0yTt0oeKrhYihXJ2LTJJXygX5xE5sSYmTfkpK3jHH/rnPPZxw1p+OHxJ3xlie281Y24dMMtZpD6mtz9vi5vqmbQPLFxKQgAQksHgCswllJqUQRzCTx2tSmVfKTs674473bSSP58zIZ59JGzHMucnLpFrml3ncbsy5OaeUybY8PjCRxOucmzxiqOaVMfaN+777PpQi15/gpcyy7iH18BxlUtpYigXH6vKTV9Z/arEnxpJH8rriznnsM67K8cZr8su88heaXD92rKeelMe+q89zbl3cOVbuM37cS0ACEpCABGYTynI1C5Hieb661azqc365jZgJksm47hZhnw8qMBlSDqtHdbe+WZEqb3PngwplXp5LK1fsqiuqDKus2I2Ju8piF/VwG7R6i5v21+XTF9VVu120iXr2FfvYuBljjM9SJqurlU1jMLeppxjrpbRWWdbFWJeXn71SIsvX/vcpAQlIQAISCIHZhDIVbiuTTIZMYpmgh8ok11NOX5nk3KpgMuGTx7GkUxMqbnE3ycWpyyT9WpXrbSWaMjJWI46Mm2pe9ReaXcgkddCerIQzZuv6ti1ujjVt+RlwLwEJSEACEphVKIfIJNcwoTEhj5FJJnfKqU7kdauQdR/KiUyWH8o5RZmE0VipgkvS0D7P9btgXCdVeYa0fH50W5mkrRmrhyCTEcqwHBI38TRtKde9BCQgAQlIYDah5KtI+BAMk3QSefxd5OotuU984s/P5DGhfeXLX16vDuaDMQgmXwCN/JS3GPlKHr6up1wVIo/veqSc8nYi319ZXYX86Ec+sj6vfI6S7xXkvNRNOZRJ3eWtb74KiK/bKYVqTNxw+vu//5+96+Hrfvrw5Wt2qtLIF4kTV/VDOXxPZXVl8lRjL58dHBp3xgZfv1Q3Bqu/0Nx1550X/JIzxVhPPbSH1NbnbXFzfdOWn2P3EpCABCQggdmEMn+7OcgRLfKqfyu57u8nM6HxYQgEMrcOeU0e3++XPEQnf8O4mkc+5SSfL44mj2uSV7cCWq5M5jzKQVrzXZLExGvyKC8pMZZ/ejB5feKmrDnqqVsFJIa6Fbq52jRXPXWxj4mbsdE2Bokr46huDDKepxjrqYf21P1M9Y2b65u2jHP3EpCABCQggdmEcoxUMaGNlUkmWMphMq+byPvKJBM+5SiTv//hOTWRHiOT/LLA2GB8RRoZdwhm9ZeXujE4tUzSBtpT/eWlr0zmZ4Yy6jb/+5SABCQgAQmEwGxCmQqHrNAxmWWCHrIyWa7W1E3kdTJJneVtburPhM+xpFMTKm7hj5UqBGbMLxD7WpVNn5ePMTB2tmlPOVb3LZOMddrDz1xSnUy2xc2xpi1lupeABCQgAQnMKpRDZBJhY0JD6MbIZFZrqitFdTKZD97kmclSJmkD7SGdokwi0XXPTG4jVccok0gk/TpGJok7Y/UQZJKxnrHKeK2Tya64ub5p879PCUhAAhKQQAjMJpRDZZKGMqGNlcms1mS1EknkS82rq5BIJHnlF6Z/5tOfXr+nDRHTY5bJZ5995gJpRCyIG+kopeqJJ76yfqaPeJNONfbyS8uHxs1YPRSZpB20h9TW521xN8lkys2YcC8BCUhAAssmMJtQchu0+iwXKzrVPCbB6moYk9e2H8ApxTG3uSkHISxXHPnrIcmLTLJqmby6FUzKoY3UkRRhPvTVufB9/vnn0/TaL2HnYN2K1jHLZN/Yx8TN2NjnM5MZ6xn/tGdM3FzftG0GkC8kIAEJSGDxBGYVyvJZrr4yicAwofH8YiSPCZJJm8mzmle9pV1OsJTD+XkWMiuO5PWVydzypg1JxyaT5WpjuTKZeNiPkarwqP6ysE2fzyHsdbGPjZsx1jYGM17rxuAUq/DVumlP9Re0beLm+qatHC++loAEJCCBZROYTSiHyiSTIRNaJuKhMsn1lFM3kdfJJLe8q7fDM+FTTlLk6VhWJrtkEtkYK1VjVqPnWgGtkypWwelzjiVt2x7GBmM047X8hSZ5dWMwY4tjOW/MWKcMyqI9XX3eFjfXN21h5F4CEpCABCQwm1AG9ZBVKiY0JsixEyzlMHkyeWfSrpNJ8jiXfc4rJ3yOkU5RJhGqsVJ1jCuTSCT9OkYmiZsyMmb2LZOM9YxVxmudRHfFzfVNW36m3UtAAhKQgARmFcohMkkXMaGNlcms1pQyyfOTyFP5zGQEkzojBpzHn2jM6hHHjlkmeX6SuFmJTIps8JVBpVRx7hVXHPfzouUKXVvs9GvS0Lgzbg5BJhnriWlo3FzftIWVewlIQAISkMBsQjlUJukiJrQhz0xGCBHBrNYkj8kWSeQT3MmLTJZ/Mi955Xm0h9WoY7zNjVwhiHyKOamUyeSxT3557jGLdN/Yx8TN2DgUmWRc054xcXN901aOFV9LQAISkMMsUDcAABhQSURBVMCyCcwmlNXboKw4Vj8swMRX92GMTNIRv6xWVj+A0DWRUw5llLevU2bEsU4myxVM6qacY5XJKt/IEyuTZUp+uYp57DLZJ/axcTM2quMyv9CUq+N1YzDjmnGccZm8apldYz3X054xcXN901aOF19LQAISkMCyCcwmlMhIEpMkkxwCmdQkk9Xn0sZMsEyMdRN5nUx+4bHHLrgdnropJymSVRXmMSuyKXPX0hp5KmXy17/+1WZlcmkyef78cxc8CrBtXzA2GCcRun3KJGM97cl4revztri5vmlLme4lIAEJSEACswllUG8rk0gVExoTdIRuzGoNt77zLCRl1snkP3zrW+s6qyuT1MvKEO0hRTZOSSYvv/yy0VJV5TGkzzNedsG4TqoQafp1rERnrDK29i2TecwjLIfETTxNW8p1LwEJSEACEphVKIeKBRPaWJnMak0pk/lQTnmbG5m87LJL15NoVpnIi0ySR3t2ITopc9crk/mARnVlEpkkr5QqRAtB3HWbDiF2+jVpaNyUcSgyyVhPTG19nnOIvRo3x5q2sHIvAQlIQAISmE0oh8okXcSEhtANXZnMbW7KiSSSx4dy3vWumzd5kck6wbz11ls251EOklVdiUO6qnlj4o5kVcscU08+oHHHHbdvRj8SEZncZP5BLsi/8873b7J30aaUuWtp7Rt7eAyJm7FxCCuT+cWJ9oyJm+ubts2g8IUEJCABCSyewGxCuc0zk1WxYEIbK5NZrUEoI5jlhx/aZLIUTASR9kwpeXMKFf1Q8o08lauV/FTU5aedpxz72LgZG9xqZoyVv7xUH7XIins5BpM3xVhP3bSnT583xc31Tdvi//cUgAQkIAEJbAjMJpSskiTxmkmOCTQpslLKTvKY0Dg3k2TfT7hGHMvVmuSVE/k2MslkT3toWxJtrkoW7R0j0ZRXLXNMPWFe8q2TCGKqy09fTNmmlFm2KXlT1tM39iniZmwcikzSDtpT8q2LsS4v/cD1TVvGv3sJSEACEpDAbEIZ1Jnc+8okYsGENlYmuZ5yWCnqksmcW12ZRCYjlIlnjORl0i4n/OTtQ6iIiZXK6u3vXbQpZR5S7IyPcqU2bdymL8qxml9e8gsN44pxzxgqx2DyyOf1FGM9ddOepDpx5Fhb3Bxr2lKuewlIQAISkMCsQjlEJpnUmdCYZIeuTHJtVmvKibxuZZJzEcnUyfvqhM8xkjJ5y5mVWjgd66osIpl+pW+HyCTjO+MmQrdPmWSsJ6YmmeyKm+ubNv/7lIAEJCABCYTAbEI5VCZpKBPaWJnMV6ggiJHEG25424oteeyRST7ljWzyPtJ53XVv2qwe0Z5jlUlE6aab3rneMgjYZ2US8UiKhFx//VvPiOOpxz4mbsbGocgk45f29O3zuri5vmnLOHEvAQlIQAISmE0ot3lmsnqLkQmtejuQlZ8+H37I5J7VGibZrDiWq5VtMlkKZibpahuPYXUuq27lbWZ+BNpkktvfpWQes0zSZ12xR6qGxs1Y3dcHcMqxzjgtx+rQuJtkknyTBCQgAQlIIARmE0qEK6lObJJXFTUmQiYvrs8kOUQmM7mOlcmIKe1NUib7/9WjUmza+rw6Dvoyzkp4XT1lHn1XFemxMplb3vu+zZ2fE5jxszMmboUyP+XuJSABCUigjcBsQplGRCLKSS55VYngHPKY1DJJDpXJCGX1AxHkV29z59zqymRuu9OepL6ikxi3iZtrkvrWM0aoqIsvNWd1bugKXeqnvUnHEjv9OjbucqzCoDreklddcc/Y4vgUYz31lGOV/qhKNHltcXOsaUv/upeABCQgAQnMKpRDxYIJjUl2jEwywVJO121u6uFPLnJunqMkr5zwOUaizEP/EEodc9peJxbI5MUX//FoqYJLUl39yWv6BYLjSX0ZR2TrhL3Mo9ym2OnXsbf3KYPxQrv3LZOM2YzVoXFzfdOWPnIvAQlIQAISmE0oIxHl5J68LrFgQhsrk0zulMNkn+2uO+888wEc8pFJpOoLjz22OY8P7lQ/lNNXdBLjkLgZnn3r2UaoPvGJP79AGiOT/L3nUqr4AE/1Qzl923RssZ8//9zmf4ShcTPGDkUmGc+0h9TW521xc33TtoHlCwlIQAISWDyB2YQSaRwqVUxo234AJ9JYTu6Uk/xyxTF5kcmvPfXU5rym2+HHujJJH1QFvpTJ8ieibiXvmGWyb+xj4maMHcLKZMY07RkTN9c3beVY8bUEJCABCSybwGxCOVQmERgmND7Bmkkyn2YtP/yQvPKWdimTXEs57MfIJHVSDiuCSVkdpL6kQ1yd6ysWxDBGqo459rFxMzbqxuBcz0yWdWfM9/kFoilu4mnaMtbdS0ACEpCABGYTyqCObFQnuTrZyWoYE9pYmczk2lcmqbP6oZzcdudY0qnJJKuVTXJx6quy9Gv1QzkZg31/gSjHan6h2ZdMMtZpDz9zSXWr0W1xc6xpS5nuJSABCUhAArMK5RCZZCJnQkMIswq57cpkZJRyqpN73W3uug/lRCZpA+WQTlEmiW2sVI1Zje4jreFeV0+ZRx/V/aJSJ1XkEXv5/Oi2MkldlMF4OwSZZKxnrMJiSNxc37Stfwj8RwISkIAEJLBarWYTyqEySS8xoY2VyazWMNFHMD//yCPrD+CUz0xGJu+4432b8z7z6U+vLr/8tZvb7rQnUkN5SYmxlJrkbbMiS9lJdfUkr66eMo8yeF+t+9lnn1nHzQdwkiJU7EupeuKJr6yfX61rE+fec8/dq69+9YnVz372s3U9Zf3HFvt9930oOFZtcbf1OWPjUGSSdtAeUluft8XN9U3bBpYvJCABCUhg8QRmE0qkpio2dbLDJFhdpWJCq/71kQhm+cxYJvIyD3nkfVZrIpNZcXz66W9sxDEyyT7n8ZpPfZfSSXtoI/UlRZ4OXajC9/nnn0/T1ytXxIQglon3xF6KZ2T2wx++74xovPrVF68efvihzeXhMbTPU0/JOHl1jMs8GtE2trpib4u7bE9iLOuGI2OtuhKeMcj1GVsZg4zl5GVcD12Fr9ZDe/r2eV3cXN+0bTrbFxKQgAQksHgCswolE3BS24RfXQ1jQptigqUcJu66ibyvTDLhU06XWEQ2DlGoSr5IBPGwL1OdXEToiJ1rqluYHHPsXXGHUWIsZZI8mByKTDLWaU/1F7S6Pm+Ku9rH5fuwcC8BCUhAAhKYTSiZbJO2kUkmQyax6gpOuQqJyDCJl3mcX7da01cmucVdXZnM6hHtSWoSizErsqW4pZ7kVQWGeso8zu/Lt04sWI1skotyVbYUi7ymH8LjGEWaVfCmFdnIMnwTY8k9ebDg3IzX6hgkv24MZmxN8YtT6qYs2tP1C0Rb3Onbun3GpnsJSEACEpDAbEIZ1H1lJwLF5MxkxiSZSbcUR473kUmup5zq91nWrUxye5tzy9vcqTuTNPFEIurE4hiFCplEqPpI1eOPf3HNKKKBbPLs5TGLNLHU3d7vK5PEThkRun3LJGOd9iQ1/QLRFjfHmraU614CEpCABCQwq1AOkUm6iAktQjdUJiOClJMJnw/lUHb5zCQSiVCxQpnzyHv96y/f3HbnmmOWST6gQQwIRlJkkrxSqnh9xRX1z4tGoD71qU+ufvzjfzsKmWyLHQFLaou77RcIuDJuDkEmGeu0hzQ0bq5v2sLKvQQkIAEJSGA2oRwqk3RR04S2z3xkqk0sMrTGxJ1V2rp6yjzq6ltPVnwRjKRSJpPHPvl84jmpKtL0QfJgwuukvm1KnOVKYPLKOFNPmUddfevpG3ufuKk37Snj3ueYbKp7TNxNZZJvkoAEJCABCYTAbEJZTrpUziRX/bBAJGJXYpFJMBNsWU8komnVLsAiEaXUJK8aY1/R2XXcaXvfuDm/jkfiLGOHKXGfSux94w6LU49bocxPj3sJSEACEmgjMJtQMgEnITZzyyR1Mzn2larz559b3/ouBTMSUQpV8k5FLHgOchupilCW/XusIr3UPm+LW6HM/1ruJSABCUigjcBsQplG7EsmqT+TI21IqpMnpIpzlyiT/JUcniHtGzucTkEml9znbWM9PzN1+/wMuZeABCQgAQnMKpT7lMm6lUm+4LoqT4gFUsUEmkQeK5CnsjLZFjd/x7uUya7YS07HsDLZFnsZS1fcxybRQ+OuE8nk5efDvQQkIAEJSGA2oTwEmSyFgecW+fRy+YGTyCRSlZS8O+98f7JqP4zBwWMQqr5xE0+f2MP0lGLvE3cGw6nHHXms24eBewlIQAISkMBsQrmPZybp3nJlMvJT9yGYSESdTJZ5x/zMZN+44VbHoy52mB6LVDEGGQ9JdTHW5dXFTRlLiLtOJJMXju4lIAEJSEACswklMpNUJzbJY5JOykRe5nGs70ReyiTXMRGmHsWiXhrhtI1UwbT6gSTYHsIvEBlH9vlwiY481u3D170EJCABCUhgNqEM6rrJPXmlOE4tk9TPpNhnlSrnLnFlkph5hrRv7DClr5KOVSaX3Of0YVN/14lk8tLn7iUgAQlIQAKzCmXEsVwdTN6uZZJ6mAjLuutW4hgSTK6cmxS5ra7E9V0pTYxl3cmbI+6+Er2tTMKj5HTMMrnkPi/7sDrWOda05efDvQQkIAEJSGA2oYxA7VOqqhPnTTe9c8VWpkgVskmKdF533ZvOrMQdq0wiDH3i7ht7mB6DTPaNfal9Xhd3k0ym38ufHV9LQAISkMByCcwmlNVVsgjmnCt0mQSzClPWzRBokkluAUcwOe+YZbL69Ud1cZMXueiKHabHIpN9Yu8bN4yWELdCSU+bJCABCUigi8BsQrnPlcnUzeSoTL7yoScGR1WiydtGqmB66B/Asc/b+7ytvxXKrv9CPS4BCUhAAhCYTSiDex8rk6mbybHPKhXnc27X6hznndIqFfFEMPvGDif6NCn9G4knP3nlinCT5PVd/aV86q6rp8xrqidxIlNJS+3ztrg51rSFm3sJSEACEpDArEK5b7FgYiylhu6vEwvyOLeUjb6ikxhLqUleWXeT6PStZxdCRdz85aC+MsnKJJySEuexxr7UPm+Lm2NNW/rdvQQkIAEJSGA2oeRvZl966SVnhA5hQ0oeeOAzZ3qCD41cf/1bz3wIhj8HiOggLUnkMdmVApN6yrzUw7lluuGG61eXXXbpGXGkPUjV+fPPbU69+uqrVtdee80F7eHasj3UTV5Zd9pTymTaM1fc1Xra4qa9pUh3xR6mpxD7Uvu8Le4mmUy/b35IfCEBCUhAAosmMJtQtk1MHmteBZKNbA51DCz6f06Dl4AEJCCBMwQUypZbeoc6kdsuJfMQxsCZ/0l8IwEJSEACiyagUCqUjc/IHYK02IbDledF/89p8BKQgAQkcIaAQqlQKpSOgUFj4Mz/JL6RgAQkIIFFE1AolYlBMuHK4eGuHM7RN4v+X9PgJSABCUjgAgKTCiWlzzGZWceyZcb+33//X/A/iRkSkIAEJLBoApML5SHTRERM0xKQ6bQ8LU0CEpCABCRwjAQUymPstQNqs0J5QJ1hUyQgAQlIQAJ7IqBQ7gn8qVSrUJ5KTxqHBCQgAQlIYDgBhXI4O6/8wzOzgpCABCQgAQlIYNkEFMpl9//o6F2hHI3QAiQgAQlIQAJHT0ChPPou3G8ACuV++Vu7BCQgAQlI4BAIKJSH0AtH3AaF8og7z6ZLQAISkIAEJiKgUE4EcqnFKJRL7XnjloAEJCABCbxCQKF8hYWvBhBQKAdA8xIJSEACEpDAiRFQKE+sQ+cOR6Gcm7j1SUACEpCABA6PgEJ5eH1yVC1SKI+qu2ysBCQgAQlIYCcEFMqdYF1OoQrlcvraSCUgAQlIQAJNBBTKJjLm9yKgUPbC5EkSkIAEJCCBkyagUJ509+4+OIVy94ytQQISkIAEJHDoBBTKQ++hA2+fQnngHWTzJCABCUhAAjMQUChngHzKVSiUp9y7xiYBCUhAAhLoR0Ch7MfJsxoIKJQNYMyWgAQkIAEJLIiAQrmgzt5FqArlLqhapgQkIAEJSOC4CCiUx9VfB9dahfLgusQGSUACEpCABGYnoFDOjvy0KlQoT6s/jUYCEpCABCQwhIBCOYSa12wIKJQbFL6QgAQkIAEJLJaAQrnYrp8mcIVyGo6WIgEJSEACEjhmAgrlMffeAbRdoTyATrAJEpCABCQggT0TUCj33AHHXr1Ceew9aPslIAEJSEAC4wkolOMZLroEhXLR3W/wEpCABCQggTUBhdKBMIqAQjkKnxdLQAISkIAEToKAQnkS3bi/IBTK/bG3ZglIQAISkMChEFAoD6UnjrQdCKWbDPY9Bvr++Dz44AOrc+eubDz9xRd/uh7P588/13hOVxlcCw/Kakq0gXKaUlcZU7SzTxlj20l8XWV08TyldnbF2tXvfXh2ldGH56m0s0+sXeOzi2efPuniOVc7m/6/mSpfoZyKpOVIQAISkIAEJCCBhRJQKBfa8YYtAQlIQAISkIAEpiKgUE5F0nIkIAEJSEACEpDAQgkolAvteMOWgAQkIAEJSEACUxFQKKciaTkSkIAEJCABCUhgoQQUyoV2vGFLQAISkIAEJCCBqQgolFORtBwJSEACEpCABCSwUAIK5UI73rAlIAEJSEACEpDAVAQUyqlIWo4EJCABCUhAAhJYKAGFcqEdb9gSkIAEJCABCUhgKgIK5VQkLUcCEpCABCQgAQkslIBCudCON2wJSEACEpCABCQwFQGFciqSliMBCUhAAhKQgAQWSkChXGjHG7YEJCABCUhAAhKYioBCORVJy5GABCQgAQlIQAILJaBQLrTjDVsCEpCABCQgAQlMRUChnIqk5UhAAhKQgAQkIIGFElAoF9rxhi0BCUhAAhKQgASmIqBQTkXSciQgAQlIQAISkMBCCSiUC+14w5aABCQgAQlIQAJTEVAopyJpORKQgAQkIAEJSGChBBTKhXa8YUtAAhKQgAQkIIGpCCiUU5G0HAlIQAISkIAEJLBQAgrlQjvesCUgAQlIQAISkMBUBBTKqUhajgQkIAEJSEACElgoAYVyoR1v2BKQgAQkIAEJSGAqAgrlVCQtRwISkIAEJCABCSyUgEK50I43bAlIQAISkIAEJDAVAYVyKpKWIwEJSEACEpCABBZKQKFcaMcbtgQkIAEJSEACEpiKgEI5FUnLkYAEJCABCUhAAgsloFAutOMNWwISkIAEJCABCUxFQKGciqTlSEACEpCABCQggYUSUCgX2vGGLQEJSEACEpCABKYioFBORdJyJCABCUhAAhKQwEIJKJQL7XjDloAEJCABCUhAAlMRUCinImk5EpCABCQgAQlIYKEEFMqFdrxhS0ACEpCABCQggakIKJRTkbQcCUhAAhKQgAQksFACCuVCO96wJSABCUhAAhKQwFQEFMqpSFqOBCQgAQlIQAISWCgBhXKhHW/YEpCABCQgAQlIYCoCCuVUJC1HAhKQgAQkIAEJLJSAQrnQjjdsCUhAAhKQgAQkMBUBhXIqkpYjAQlIQAISkIAEFkpAoVxoxxu2BCQgAQlIQAISmIqAQjkVScuRgAQkIAEJSEACCyWgUC604w1bAhKQgAQkIAEJTEVAoZyKpOVIQAISkIAEJCCBhRJQKBfa8YYtAQlIQAISkIAEpiKgUE5F0nIkIAEJSEACEpDAQgkolAvteMOWgAQkIAEJSEACUxFQKKciaTkSkIAEJCABCUhgoQQUyoV2vGFLQAISkIAEJCCBqQgolFORtBwJSEACEpCABCSwUAIK5UI73rAlIAEJSEACEpDAVAQUyqlIWo4EJHDwBB588IHVuXNXNrbzxRd/urrooletzp9/rvGcrjK4ljIoqynRBsppSl1lTNHOPmWMbSfxdZXRxfOU2tkVa1e/9+HZVUYfnqfSzj6xdo3PLp59+qSL51ztbPr/Zqr8xQkl/9G7ycAxcFpjYKr/EC1HAhKQgASGEViUUA5D5FUSkIAEJCABCUhAAm0EFMo2Oh6TgAQkIAEJSEACEugkoFB2IvIECUhAAhKQgAQkIIE2AgplGx2PSUACEpCABCQgAQl0ElAoOxF5ggQkIAEJSEACEpBAGwGFso2OxyQgAQlIQAISkIAEOgkolJ2IPEECEpCABCQgAQlIoI2AQtlGx2MSkIAEJCABCUhAAp0EFMpORJ4gAQlIQAISkIAEJNBGQKFso+MxCUhAAhKQgAQkIIFOAgplJyJPkIAEJCABCUhAAhJoI6BQttHxmAQkIAEJSEACEpBAJwGFshORJ0hAAhKQgAQkIAEJtBFQKNvoeEwCEpCABCQgAQlIoJOAQtmJyBMkIAEJSEACEpCABNoI/H/eEYPxym8yAAAAAABJRU5ErkJggg=="></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why, unlike typical transition metals, zinc compounds are not coloured.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Transition metals like iron can form complex ions. Discuss the bonding between transition metals and their ligands in terms of acid-base theory.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>1:2 ✔</p>
<p><em>Accept 2 Fe<sup>3+</sup>: 1 Fe<sup>2+</sup></em><br><em>Do <strong>not</strong> accept 2:1 only</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mass «spectroscopy»/MS ✔</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="515" height="88"></p>
<p><em><br>Award <strong>[1 max]</strong> for 4 correct values.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>specific heat capacity « = <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mi>q</mi><mrow><mi>m</mi><mo>×</mo><mo>∆</mo><mi>T</mi></mrow></mfrac><mo>/</mo><mfrac><mrow><mn>1000</mn><mo> </mo><mi mathvariant="normal">J</mi></mrow><mrow><mn>50</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>×</mo><mn>44</mn><mo> </mo><mi mathvariant="normal">K</mi></mrow></mfrac></math>» = 0.45 «J g<sup>−1 </sup>K<sup>−1</sup>» ✔</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Equation:</em><br>2Fe<sup>3+</sup>(aq) + Fe(s) → 3Fe<sup>2+</sup>(aq) ✔</p>
<p><em>Cell potential:</em><br>«+0.77 V − (−0.45 V) = +»1.22 «V» ✔</p>
<p><em><br>Do <strong>not</strong> accept reverse reaction or equilibrium arrow.</em></p>
<p><em>Do <strong>not</strong> accept negative value for M2.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>left electrode/anode labelled zinc/Zn <em><strong>AND</strong> </em>right electrode/cathode labelled iron/Fe ✔</p>
<p>electrolyte labelled as «aqueous» zinc salt/Zn<sup>2+</sup> ✔</p>
<p><em><br>Accept an inert conductor for the anode.</em></p>
<p><em>Accept specific zinc salts such as ZnSO<sub>4</sub>.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>« <em>Zn</em><sup>2+</sup>» has a full d-shell<br><em><strong>OR</strong></em><br>does not form « ions with» an incomplete d-shell ✔</p>
<p><em><br>Do <strong>not</strong> accept “Zn is not a transition metal”.</em></p>
<p><em>Do <strong>not</strong> accept zinc atoms for zinc ions.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ligands donate pairs of electrons to metal ions<br><em><strong>OR</strong></em><br>forms coordinate covalent/dative bond✔</p>
<p>ligands are Lewis bases<br><em><strong>AND</strong></em><br>metal «ions» are Lewis acids ✔</p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Ethane-1,2-diol, HOCH<sub>2</sub>CH<sub>2</sub>OH, has a wide variety of uses including the removal of ice from aircraft and heat transfer in a solar cell.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Calculate Δ<em>H</em><sup>θ</sup>, in kJ, for this similar reaction below using <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H_{\rm{f}}^\theta ">
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mrow>
<mrow>
<mi mathvariant="normal">f</mi>
</mrow>
</mrow>
<mi>θ</mi>
</msubsup>
</math></span> data from section 12 of the data booklet. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H_{\rm{f}}^\theta ">
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mrow>
<mrow>
<mi mathvariant="normal">f</mi>
</mrow>
</mrow>
<mi>θ</mi>
</msubsup>
</math></span> of HOCH<sub>2</sub>CH<sub>2</sub>OH(l) is –454.8kJmol<sup>-1</sup>.</p>
<p>2CO (g) + 3H<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> HOCH<sub>2</sub>CH<sub>2</sub>OH (l)</p>
<p>(ii) Deduce why the answers to (a)(iii) and (b)(i) differ.</p>
<p>(iii) Δ<em>S</em><sup>θ</sup> for the reaction in (b)(i) is –620.1JK<sup>-1</sup>. Comment on the decrease in entropy.</p>
<p>(iv) Calculate the value of ΔG<sup>θ</sup>, in kJ, for this reaction at 298 K using your answer to (b)(i). (If you did not obtain an answer to (b)(i), use –244.0 kJ, but this is not the correct value.)</p>
<p>(v) Comment on the statement that the reaction becomes less spontaneous as temperature is increased.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict the <sup>1</sup>HNMR data for ethanedioic acid and ethane-1,2-diol by completing the table.</p>
<p><img 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" alt></p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i<br>«ΔH = Σ Δ<em>H</em><sub>f</sub> products – ΣΔ<em>H</em><sub>f</sub> reactants = –454.8 kJ mol<sup>-1</sup> – 2(–110.5 kJ mol<sup>-1</sup>) =» –233.8 «kJ»</p>
<p> </p>
<p>ii<br>in (a)(iii) gas is formed and in (b)(i) liquid is formed<br><em><strong>OR</strong></em><br>products are in different states<br><em><strong>OR</strong></em><br>conversion of gas to liquid is exothermic<br><em><strong>OR</strong></em><br>conversion of liquid to gas is endothermic<br><em><strong>OR</strong></em><br>enthalpy of vapourisation needs to be taken into account</p>
<p><em>Accept product is «now» a liquid.</em><br><em>Accept answers referring to bond enthalpies being means/averages.</em></p>
<p> </p>
<p>iii<br>«Δ<em>S</em> is negative because five mols of» gases becomes «one mol of» liquid<br><em><strong>OR</strong></em><br>increase in complexity of product «compared to reactants»<br><em><strong>OR</strong></em><br>product more ordered «than reactants»</p>
<p><em>Accept “fewer moles of gas” but not “fewer molecules”.</em></p>
<p><br><br>iv<br>Δ<em>S</em> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{{ - 620.1}}{{1000}}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mo>−</mo>
<mn>620.1</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span>«kJ K<sup>-1</sup>»<br>Δ<em>G</em> = –233.8 kJ – (298 K <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{{ - 620.1}}{{1000}}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mo>−</mo>
<mn>620.1</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span> kJ K<sup>-1</sup>) = –49.0 «kJ»</p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em><br><em>Award <strong>[1 max]</strong> for «+»185 × 10<sup>3</sup>.</em></p>
<p><em>If –244.0 kJ used, answer is:</em><br>Δ<em>G</em> = –244.0 kJ – (298 K <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{{ - 620.1}}{{1000}}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mo>−</mo>
<mn>620.1</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span>kJ K<sup>-1</sup>) = –59.2 «kJ»<br><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p> </p>
<p>v<br>increasing T makes Δ<em>G</em> larger/more positive/less negative<br><em><strong>OR</strong></em><br>–TΔ<em>S</em> will increase</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Accept “none/no splitting” for singlet.</em></p>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p>A student titrated two acids, hydrochloric acid, HCl (aq) and ethanoic acid, CH<sub>3</sub>COOH (aq), against 50.0 cm<sup>3</sup> of 0.995 mol dm<sup>–3</sup> sodium hydroxide, NaOH (aq), to determine their concentration. The temperature of the reaction mixture was measured after each acid addition and plotted against the volume of each acid.</p>
<p><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using the graph, estimate the initial temperature of the solutions.</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>Determine the maximum temperature reached in each experiment by analysing the graph.</p>
<p><img src="data:image/png;base64,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"></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>Suggest why the enthalpy change of neutralization of CH<sub>3</sub>COOH is less negative than that of HCl.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>21.4 °C</p>
<p><em>Accept values in the range of 21.2 to 21.6 °C.<br>Accept two different values for the two solutions from within range.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>HCl:</em> 30.4 «°C»</p>
<p><em>Accept range 30.2 to 30.6 °C.</em></p>
<p><br> <em>CH<sub>3</sub>COOH:</em> 29.0 «°C»</p>
<p><em>Accept range 28.8 to 29.2 °C.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>COOH is weak acid/partially ionised</p>
<p>energy used to ionize weak acid «before reaction with NaOH can occur»</p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br>