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<h2>SL Paper 2</h2><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="specification">
<p>In acidic solution, hydrogen peroxide, H<sub>2</sub>O<sub>2</sub>, will oxidize Fe<sup>2+</sup>.</p>
<p style="text-align: center;">Fe<sup>2+</sup> (aq) → Fe<sup>3+</sup> (aq) + e<sup>−</sup></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 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" 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>Write the half-equation for the reduction of hydrogen peroxide to water in acidic solution.</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 a balanced equation for the oxidation of Fe2+ by acidified hydrogen peroxide.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</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>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>H<sub>2</sub>O<sub>2</sub>(aq) + 2H<sup>+</sup>(aq) + 2e<sup>−</sup>→ 2H<sub>2</sub>O(l) ✔</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>H<sub>2</sub>O<sub>2</sub>(aq) + 2H<sup>+</sup>(aq) + 2Fe<sup>2+</sup>(aq) → 2H<sub>2</sub>O(l) + 2Fe<sup>3+</sup>(aq) ✔</p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</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>
<br><hr><br><div class="specification">
<p>Two hydrides of nitrogen are ammonia and hydrazine, N<sub>2</sub>H<sub>4</sub>. One derivative of ammonia is methanamine whose molecular structure is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-22_om_18.03.06.png" alt="M17/4/CHEMI/SP2/ENG/TZ1/04"></p>
</div>
<div class="specification">
<p>Hydrazine is used to remove oxygen from water used to generate steam or hot water.</p>
<p style="text-align: center;">N<sub>2</sub>H<sub>4</sub>(aq) + O<sub>2</sub>(aq) → N<sub>2</sub>(g) + 2H<sub>2</sub>O(l)</p>
<p>The concentration of dissolved oxygen in a sample of water is 8.0 × 10<sup>−3</sup> g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>−3</sup>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the H−N−H bond angle in methanamine using VSEPR theory.</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>Ammonia reacts reversibly with water.</p>
<p>NH<sub>3</sub>(g) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> NH<sub>4</sub><sup>+</sup>(aq) + OH<sup>−</sup>(aq)</p>
<p>Explain the effect of adding H<sup>+</sup>(aq) ions on the position of the equilibrium.</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>Hydrazine reacts with water in a similar way to ammonia. Deduce an equation for the reaction of hydrazine with water.</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>Outline, using an ionic equation, what is observed when magnesium powder is added to a solution of ammonium chloride.</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>Hydrazine has been used as a rocket fuel. The propulsion reaction occurs in several stages but the overall reaction is:</p>
<p>N<sub>2</sub>H<sub>4</sub>(l) → N<sub>2</sub>(g) + 2H<sub>2</sub>(g)</p>
<p>Suggest why this fuel is suitable for use at high altitudes.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the enthalpy change of reaction, Δ<em>H</em>, in kJ, when 1.00 mol of gaseous hydrazine decomposes to its elements. Use bond enthalpy values in section 11 of the data booklet.</p>
<p>N<sub>2</sub>H<sub>4</sub>(g) → N<sub>2</sub>(g) + 2H<sub>2</sub>(g)</p>
<div class="marks">[3]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The standard enthalpy of formation of N<sub>2</sub>H<sub>4</sub>(l) is +50.6 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>. Calculate the enthalpy of vaporization, Δ<em>H</em><sub>vap</sub>, of hydrazine in kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>.</p>
<p>N<sub>2</sub>H<sub>4</sub>(l) → N<sub>2</sub>H<sub>4</sub>(g)</p>
<p>(If you did not get an answer to (f), use −85 kJ but this is not the correct answer.)</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate, showing your working, the mass of hydrazine needed to remove all the dissolved oxygen from 1000 dm<sup>3</sup> of the sample.</p>
<div class="marks">[3]</div>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the volume, in dm<sup>3</sup>, of nitrogen formed under SATP conditions. (The volume of 1 mol of gas = 24.8 dm<sup>3</sup> at SATP.)</p>
<div class="marks">[1]</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>107<sup>°</sup></p>
<p> </p>
<p><em>Accept 100° to < 109.5°.</em></p>
<p><em>Literature value = 105.8°</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>removes/reacts with OH<sup>−</sup></p>
<p>moves to the right/products «to replace OH<sup>−</sup> ions»</p>
<p> </p>
<p><em>Accept ionic equation for M1.</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>N<sub>2</sub>H<sub>4</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> N<sub>2</sub>H<sub>5</sub><sup>+</sup>(aq) + OH<sup>–</sup>(aq)</p>
<p> </p>
<p><em>Accept N<sub>2</sub>H<sub>4</sub>(aq) + 2H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> N<sub>2</sub>H<sub>6</sub><sup>2+</sup>(aq) + 2OH<sup>–</sup>(aq).</em></p>
<p><em>Equilibrium sign must be present.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bubbles<br><em><strong>OR</strong></em><br>gas<br><em><strong>OR</strong></em><br>magnesium disappears</p>
<p>2NH<sub>4</sub><sup>+</sup>(aq) + Mg(s) → Mg<sup>2+</sup>(aq) + 2NH<sub>3</sub>(aq) + H<sub>2</sub>(g)</p>
<p> </p>
<p><em>Do <strong>not</strong> accept “hydrogen” without reference to observed changes.</em></p>
<p><em>Accept "smell of ammonia".</em></p>
<p><em>Accept 2H<sup>+</sup>(aq) + Mg(s) → Mg<sup>2+</sup>(aq) + H<sub>2</sub>(g)</em></p>
<p><em>Equation must be ionic.</em></p>
<p><strong><em>[2 mark]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>no oxygen required</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>bonds broken:</em><br>E(N–N) + 4E(N–H)<br><em><strong>OR</strong></em><br>158 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>» + 4 x 391 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>» / 1722 «kJ»</p>
<p><em>bonds formed:</em><br>E(N≡N) + 2E(H–H)<br><em><strong>OR</strong></em><br>945 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>» + 2 x 436 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>» / 1817 «kJ»</p>
<p>«ΔH = bonds broken – bonds formed = 1722 – 1817 =» –95 «kJ»</p>
<p> </p>
<p><em>Award [3] for correct final answer.</em></p>
<p><em>Award [2 max] for +95 «kJ».</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p><em><strong>OR</strong></em><br>Δ<em>H</em><sub>vap</sub>= −50.6 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup> − (−95 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>)</p>
<p>«Δ<em>H</em><sub>vap</sub> =» +44 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>»</p>
<p> </p>
<p><em>Award [2] for correct final answer.</em></p>
<p><em>Award [1 max] for −44 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>».</em></p>
<p><em>Award [2] for:</em><br><em>ΔH<sub>vap</sub> − = 50.6 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1 </sup>−<sup> </sup>(−85 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>) + = 34 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>».</em></p>
<p><em>A</em><em>ward [1 max] for −34 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup>».</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>total mass of oxygen «= 8.0 x 10<sup>–3</sup> g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup> x 1000 dm<sup>3</sup>» = 8.0 «g»</p>
<p>n(O<sub>2</sub>) «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{8.0{\text{ g}}}}{{32.00{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}} = ">
<mo>=</mo>
<mfrac>
<mrow>
<mn>8.0</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>32.00</mn>
<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>
<mo>=</mo>
</math></span>» 0.25 «mol»</p>
<p><em><strong>OR</strong></em><br>n(N<sub>2</sub>H<sub>4</sub>) = n(O<sub>2</sub>)<br>«mass of hydrazine = 0.25 mol x 32.06 g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup> =» 8.0 «g»</p>
<p> </p>
<p><em>Award [3] for correct final answer.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">h.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«n(N<sub>2</sub>H<sub>4</sub>) = n(O<sub>2</sub>) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{8.0{\text{ g}}}}{{32.00{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}} = ">
<mo>=</mo>
<mfrac>
<mrow>
<mn>8.0</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>32.00</mn>
<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>
<mo>=</mo>
</math></span>» 0.25 «mol»</p>
<p>«volume of nitrogen = 0.25 mol x 24.8 dm<sup>3</sup><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>» = 6.2 «dm<sup>3</sup>»</p>
<p> </p>
<p><em>Award [1] for correct final answer.</em></p>
<p><strong><em>[1 mark]</em></strong></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.</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>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>
<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 src="data:image/png;base64,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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>
<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>
<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>Ethane-1,2-diol can be formed according to the following reaction.</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 (g)</p>
<p>(i) Deduce the equilibrium constant expression, <em>K</em><sub>c</sub>, for this reaction.</p>
<p> </p>
<p>(ii) State how increasing the pressure of the reaction mixture at constant temperature will affect the position of equilibrium and the value of <em>K</em><sub>c</sub>.</p>
<p>Position of equilibrium:</p>
<p><em>K</em><sub>c</sub>:</p>
<p> </p>
<p>(iii) Calculate the enthalpy change, Δ<em>H</em><sup>θ</sup>, in kJ, for this reaction using section 11 of the data booklet. The bond enthalpy of the carbon–oxygen bond in CO (g) is 1077kJmol<sup>-1</sup>.</p>
<p> </p>
<p>(iv) The enthalpy change, ΔH<sup>θ</sup>, for the following similar reaction is –233.8 kJ.</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>Deduce why this value differs from your answer to (a)(iii).</p>
<div class="marks">[7]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the average oxidation state of carbon in ethene and in ethane-1,2-diol.</p>
<p>Ethene:</p>
<p>Ethane-1,2-diol:</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 why the boiling point of ethane-1,2-diol is significantly greater than that of ethene.</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>Ethane-1,2-diol can be oxidized first to ethanedioic acid, (COOH)<sub>2</sub>, and then to carbon dioxide and water. Suggest the reagents to oxidize ethane-1,2-diol.</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>(i)<br><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\ll {K_{\text{C}}} = \gg \frac{{\left[ {{\text{HOC}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{OH}}} \right]}}{{{{\left[ {{\text{CO}}} \right]}^{\text{2}}} \times {{\left[ {{{\text{H}}_{\text{2}}}} \right]}^{\text{3}}}}}">
<mo>≪</mo>
<mrow>
<msub>
<mi>K</mi>
<mrow>
<mtext>C</mtext>
</mrow>
</msub>
</mrow>
<mo>=≫</mo>
<mfrac>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>HOC</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>OH</mtext>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>CO</mtext>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msup>
</mrow>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mrow>
<mtext>3</mtext>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> </p>
<p> </p>
<p>(ii)<br><em>Position of equilibrium:</em> moves to right <em><strong>OR</strong></em> favours product<br><em>K</em><sub>c</sub>: no change <em><strong>OR</strong></em> is a constant at constant temperature</p>
<p> </p>
<p>(iii)<br><em>Bonds broken:</em> 2C≡O + 3(H-H) / 2(1077kJmol<sup>-1</sup>) + 3(436kJmol<sup>-1</sup>) / 3462 «kJ»</p>
<p><em>Bonds formed:</em> 2(C-O) + 2(O-H) + 4(C-H) + (C-C) / 2(358kJmol<sup>-1</sup>) + 2(463kJmol<sup>-1</sup>) + 4(414kJmol<sup>-1</sup>) + 346kJmol<sup>-1</sup> / 3644 «kJ»</p>
<p>«Enthalpy change = bonds broken - bonds formed = 3462 kJ - 3644 kJ =» -182 «kJ»</p>
<p><em>Award<strong> [3]</strong> for correct final answer.</em><br><em>Award <strong>[2 max]</strong> for «+»182 «kJ».</em></p>
<p><br>(iv)<br>in (a)(iii) gas is formed and in (a)(iv) 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>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Ethene:</em> –2</p>
<p><em>Ethane-1,2-diol:</em> –1</p>
<p><em>Do <strong>not</strong> accept 2–, 1– respectively.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ethane-1,2-diol can hydrogen bond to other molecules «and ethene cannot»</p>
<p><em><strong>OR</strong></em></p>
<p>ethane-1,2-diol has «significantly» greater van der Waals forces</p>
<p><em>Accept converse arguments.<br>Award <strong>[0]</strong> if answer implies covalent bonds are broken</em></p>
<p>hydrogen bonding is «significantly» stronger than other intermolecular forces</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>acidified «potassium» dichromate«(VI)»/H<sup>+</sup> <strong><em>AND</em> </strong>K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>/H<sup>+</sup> <em><strong>AND </strong></em>Cr<sub>2</sub>O<sub>7</sub><sup>2- </sup></p>
<p><em><strong>OR </strong></em></p>
<p>«acidified potassium» manganate(VII)/ «H<sup>+</sup>» KMnO<sub>4</sub> /«H<sup>+</sup>» MnO<sub>4</sub><sup>-</sup></p>
<p><em>Accept Accept H<sub>2</sub>SO<sub>4</sub> or H<sub>3</sub>PO<sub>4</sub> for H<sup>+</sup>.</em><br><em>Accept “permanganate” for “manganate(VII)”.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><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 style="text-align: center;"><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 style="margin-right: auto; margin-left: auto; display: block;" src="data:image/png;base64,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" width="317" height="189"></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;">Product<strong> A</strong> contains a carbon–carbon double bond. State the type of reactions that compounds containing this bond are likely to undergo.</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;">State the name of product <strong>B</strong>, applying IUPAC rules.</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;">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(iii).</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 <strong>B</strong> is −213 kJ. Predict, giving a reason, which product is the most stable.</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;">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="data:image/png;base64,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" width="639" height="621"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Deduce whether the product is <strong>A</strong> or <strong>B</strong>, using evidence from these spectra together with sections 26 and 27 of the data booklet. </span></span></p>
<p> </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;">One piece of evidence from IR:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">One piece of evidence from <sup>1</sup>H NMR:</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> </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)<br><em><strong>OR</strong></em><br>2C<sub>2</sub>H<sub>2</sub> (g) + 5O<sub>2</sub> (g) → 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="data:image/png;base64,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" width="282" height="30"> <strong>[<span style="background-color: #ffffff;">✔]</span></strong></p>
<p> </p>
<p><em><strong><span style="background-color: #ffffff;">Note:</span></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<br><em><strong>OR</strong></em><br>«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>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Do <strong>not</strong> accept just “intermolecular forces” or “van der Waals’ forces”.</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;">«electrophilic» addition/A<sub>«E»</sub> <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “polymerization”.</span></em></p>
<div class="question_part_label">c(i).</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(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«sum of bond enthalpies of reactants =» 2(C–H) + C≡C + 2(O–H)<br><em><strong>OR</strong></em><br>2 × 414 «kJ mol<sup>–1</sup>» + 839 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>» + 2 × 463 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>»<br><em><strong>OR</strong></em><br>2593 «kJ» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«sum of bond enthalpies of A =» 3(C–H) + C=C + C–O + O–H<br><em><strong>OR</strong></em><br>3 × 414 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>» + 614 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>» + 358 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>» + 463 «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: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">mol</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;">–1</sup>»<br><em><strong>OR</strong></em><br>2677 «kJ» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«enthalpy of reaction = 2593 kJ – 2677 kJ» = –84 «kJ» <strong>[✔]</strong></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>
<div class="question_part_label">c(iii).</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<br><em><strong>OR</strong></em><br>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(iv).</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></span></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><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/<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>CHO present<br><em><strong>OR</strong></em><br>«signal at» 2.2<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>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<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>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<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>6.0 «ppm» AND absence of «H-atom/proton next to» double bond/C=C <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “two signals with areas 1:3”.</span></em></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;">Conditions:<br>distil «the product before further oxidation» <strong>[✔]</strong></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><br>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>Almost all candidates recognized the products of the complete combustion of ethyne, and over two thirds managed to balance the equation. It was good to see candidates using integers for the balancing.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority of candidates drew the Lewis structure of ethyne. A few teachers commented that they did not cover alkynes assuming they are not included in the syllabus. Please check the current syllabus carefully when preparing students.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A very well answered question. The vast majority of candidates understood that triple bonds are stronger than single bonds and result in a shorter bond length. It was disappointing, however, to see a considerable number of candidates stating that ethane has a double bond.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates could not relate evaporation of a liquid to the breaking of its intermolecular forces and gave irrelevant answers such as “evaporation”. Other candidates gave general answers such as “the intermolecular forces” or used the term “van der Waals’ forces” which did not gain credit as too vague. The current guide is clear that “London/dispersion forces” is the appropriate term to use for instantaneous dipole-induced dipole forces. Less than 40 % of the candidates scored the mark. It was disappointing to see some candidates state “covalent bonding” as the type of interaction that must be overcome when liquid ethyne vaporizes. Some teachers thought the wording of the question may have been vague and candidates may have been confused about what was meant by the “type of interaction”.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About 60 % of the candidates stated “addition” as the type of reactions that compounds containing carbon-carbon double bonds underwent. It was disappointing to see a variety of answers including substitution, condensation and combustion showing a total lack of understanding. Some candidates gave specific types such as "bromination" or “hydration” which did not receive the mark.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>60 % of the candidates were able to name compound B as ethanal. Some candidates did not recognize it as an aldehyde and gave names related to carboxylic acids or other homologous series. Other candidates called it methanal.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates were confident in using average bond enthalpies for calculating the enthalpy change for the reaction. Mistakes included forgetting to include the breaking of the O-H bonds in water and reversing the signs.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Reasonably well answered. About half of the candidates showed understanding of the relation between stability and the enthalpy change from the same starting materials. ECF was applied in this question based on the answer in part (iii).</p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority of candidates handled this question competently and nearly half of the candidates obtained both marks. They obtained the value of the absorption from the spectra provided and compared it to the values in the data booklet to deduce the identity of the product. Common mistakes included not identifying the peaks and signals precisely (for example C=O instead of CHO for <sup>1</sup>H NMR signal at 9.4-10.0 ppm). Some teachers commented that the TMS signal should not have been included as the SL do not know about it. Other teachers commented that using the 'actual' rather than an ‘idealized’ IR spectrum may have caused confusion due to the peak at around 3400 cm<sup>-1</sup> which could be confused for O-H in alcohols. Thankfully both of these answers were hardly seen in the scripts. The peak at 3400 cm<sup>-1</sup> was not at all broad and did not confuse the majority of students. Please note that real spectra are usually used in examination papers, and it is worth encouraging students to check more than one peak to confirm their deductions.<br><br></p>
<div class="question_part_label">c(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Surprisingly, this question was not answered well by the majority of the candidates. However, it did discriminate well between high-scoring and low-scoring candidates. Common mistakes included incorrect formulas (such as K<sub>2</sub>CrO<sub>7</sub>), missing the acidic conditions and stating “reflux” instead of “distillation”. Many candidates gave completely irrelevant reagents and conditions such as “oxygen, pressure and a nickel catalyst”. It is possible that some candidates did not think of “distillation” as a “condition”.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About 60 % of the candidates determined the average oxidation state of carbon in ethanal. A couple of teachers commented that asking SL students to determine an “average oxidation state” seems a little difficult. Please note that this term has been used in recent papers whenever there are two or more atoms of the element in different parts of the compound. There was no evidence of confusion on the part of the candidates and most answered the question well.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a challenging question with a demanding markscheme. Most students missed the fact that ethanal can form hydrogen bonds with water. And students who did state this often achieved only 1 out of the 3 marks because they did not offer a full explanation. Some candidates stating "hydrogen bonding" showed confusion by mentioning the hydrogen of the aldehyde group. Few identified the lone pairs on oxygen as the reason for the ability to hydrogen bond. Most candidates just stated that ethanal is polar and dissolves in polar water achieving no marks. However, one mark was awarded for “dipole-dipole interactions with water”.</p>
<div class="question_part_label">d(iii).</div>
</div>
<br><hr><br><div class="specification">
<p>Magnesium reacts with sulfuric acid:</p>
<p style="text-align: center;">Mg(s) + H<sub>2</sub>SO<sub>4</sub>(aq) → MgSO<sub>4</sub>(aq) + H<sub>2</sub>(g)</p>
<p>The graph shows the results of an experiment using excess magnesium ribbon and dilute sulfuric acid.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-25_om_09.45.43.png" alt="M17/4/CHEMI/SP2/ENG/TZ2/05.a.i"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the rate of the reaction decreases with time.</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>Sketch, on the same graph, the expected results if the experiment were repeated using powdered magnesium, keeping its mass and all other variables unchanged.</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>Nitrogen dioxide and carbon monoxide react according to the following equation:</p>
<p>NO<sub>2</sub>(g) + CO(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> NO(g) + CO<sub>2</sub>(g) Δ<em>H</em> = –226 kJ</p>
<p><img src="data:image/png;base64,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"></p>
<p>Calculate the activation energy for the reverse reaction.</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>State the equation for the reaction of NO<sub>2</sub> in the atmosphere to produce acid deposition.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>concentration of acid decreases<br><em><strong>OR</strong></em><br>surface area of magnesium decreases</p>
<p> </p>
<p><em>Accept “less frequency/chance/rate/probability/likelihood of collisions”.</em></p>
<p><em>Do <strong>not</strong> accept just “less acid” or “less magnesium”.</em></p>
<p><em>Do <strong>not</strong> accept “concentrations of reagents decrease”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>curve starting from origin with steeper gradient <em><strong>AND</strong> </em>reaching same maximum volume</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>E</em><sub>a(rev)</sub> = 226 + 132 =» 358 «kJ»</p>
<p><em>Do not accept –358.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>2NO<sub>2</sub>(g) + H<sub>2</sub>O(l) → HNO<sub>3</sub>(aq) + HNO<sub>2</sub>(aq)<br><em><strong>OR</strong></em><br>2NO<sub>2</sub>(g) + 2H<sub>2</sub>O(l) + O<sub>2</sub>(g) → 4HNO<sub>3</sub>(aq)</p>
<p> </p>
<p><em>Accept ionised forms of the acids.</em></p>
<p><strong><em>[1 mark]</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">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>A student titrated an ethanoic acid solution, 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 its concentration.</p>
<p>The temperature of the reaction mixture was measured after each acid addition and plotted against the volume of acid.</p>
<p><img 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"></p>
</div>
<div class="specification">
<p>Curves <strong>X</strong> and <strong>Y</strong> were obtained when a metal carbonate reacted with the same volume of ethanoic acid under two different conditions.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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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 solution.</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 the experiment by analysing the graph.</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>Calculate the concentration of ethanoic acid, CH<sub>3</sub>COOH, in mol dm<sup>–3</sup>.</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>Determine the heat change, <em>q</em>, in kJ, for the neutralization reaction between ethanoic acid and sodium hydroxide.</p>
<p>Assume the specific heat capacities of the solutions and their densities are those of water.</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>Calculate the enthalpy change, Δ<em>H</em>, in kJ mol<sup>–1</sup>, for the reaction between ethanoic acid and sodium hydroxide.</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>Explain the shape of curve <strong>X</strong> in terms of the collision theory.</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>Suggest <strong>one</strong> possible reason for the differences between curves <strong>X</strong> and <strong>Y</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><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.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>29.0 «°C»</p>
<p><em>Accept range 28.8 to 29.2 °C.</em></p>
<p><strong><em> </em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1</strong></em></p>
<p>«volume CH<sub>3</sub>COOH =» 26.0 «cm<sup>3</sup>»</p>
<p>«[CH<sub>3</sub>COOH] = 0.995 mol dm<sup>–3</sup> \( \times \frac{{50.0\,{\text{cm<sup>3</sup>}}}}{{26.0\,{\text{cm<sup>3</sup>}}}} = \)» 1.91 «mol dm<sup>−3</sup>»</p>
<p><em><strong>ALTERNATIVE 2</strong></em></p>
<p>«<em>n</em>(NaOH) =0.995 mol dm<sup>–3</sup> x 0.0500 dm<sup>3</sup> =» 0.04975 «mol»</p>
<p>«[CH<sub>3</sub>COOH] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.04975}}{{0.0260}}">
<mfrac>
<mrow>
<mn>0.04975</mn>
</mrow>
<mrow>
<mn>0.0260</mn>
</mrow>
</mfrac>
</math></span> dm<sup>3</sup> =» 1.91 «mol dm<sup>–3</sup>»</p>
<p><em>Accept values of volume in range 25.5 to 26.5 cm<sup>3</sup>.</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«total volume = 50.0 + 26.0 =» 76.0 cm<sup>3</sup> <em><strong>AND</strong></em> «temperature change 29.0 – 21.4 =» 7.6 «°C»</p>
<p>«<em>q</em> = 0.0760 kg x 4.18 kJ kg<sup>–1</sup> K<sup>–1</sup> x 7.6 K =» 2.4 «kJ»</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em>(NaOH) = 0.995 mol dm<sup>–3</sup> x 0.0500 dm<sup>3</sup> =» 0.04975 «mol»</p>
<p><em><strong>OR</strong></em></p>
<p>«<em>n</em>(CH<sub>3</sub>COOH) = 1.91 mol dm<sup>–3</sup> x 0.0260 dm<sup>3</sup> =» 0.04966 «mol»</p>
<p>«Δ<em>H</em> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" - \frac{{2.4\,{\text{kJ}}}}{{0.04975\,{\text{mol}}}} = ">
<mo>−</mo>
<mfrac>
<mrow>
<mn>2.4</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kJ</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.04975</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» –48 / –49 «kJ mol<sup>–1</sup>»</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Negative sign is required for M2.</em></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«initially steep because» greatest concentration/number of particles at start</p>
<p><em><strong>OR</strong></em></p>
<p>«slope decreases because» concentration/number of particles decreases</p>
<p>volume produced per unit of time depends on frequency of collisions</p>
<p><em><strong>OR</strong></em></p>
<p>rate depends on frequency of collisions</p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mass/amount/concentration of metal carbonate more in <strong>X</strong></p>
<p><em><strong>OR</strong></em></p>
<p>concentration/amount of CH<sub>3</sub>COOH more in <strong>X</strong></p>
<div class="question_part_label">e.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[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.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.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Consider the following Hess’s law cycle:</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the type of reaction in step 1.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the standard enthalpy change, Δ<em>H</em><sup>Θ</sup>, of step 2 using section 13 of the data booklet.</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 standard enthalpy change, Δ<em>H</em><sup>Θ</sup>, of step 1.</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>Suggest one reason why the calculated value of Δ<em>H</em><sup>Θ</sup> using Hess’s Law in part (c) can be considered accurate and one reason why it can be considered approximate.</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>«electrophilic» addition/A<sub>E</sub><br><em><strong>OR</strong></em><br>reduction ✔</p>
<p><em>Accept “hydrogenation”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«(−286 kJ) + (−1411 kJ) =» −1697 «kJ» ✔</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«−1697 kJ + 1561 kJ =» −136 «kJ»</p>
<p><strong>OR</strong></p>
<p>«Δ<em>H</em><sup>Θ</sup> = Δ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="H_{\text{f}}^\theta ">
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi>θ</mi>
</msubsup>
</math></span> (products) − Δ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="H_{\text{f}}^\theta ">
<msubsup>
<mi>H</mi>
<mrow>
<mtext>f</mtext>
</mrow>
<mi>θ</mi>
</msubsup>
</math></span> (reactants) = −84 kJ − 52 kJ =» −136 «kJ» ✔</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Accurate:</em><br>no approximations were made in the cycle<br><em><strong>OR</strong></em><br>values are specific to the compounds<br><em><strong>OR</strong></em><br>Hess’s law is a statement of conservation of energy<br><em><strong>OR</strong></em><br>method is based on a law<br><em><strong>OR</strong></em><br>data in table has small uncertainties ✔</p>
<p> </p>
<p><em>Approximate:</em><br>values were experimentally determined/had uncertainties<br><em><strong>OR</strong></em><br>each value has been determined to only three/four significant figures<br><em><strong>OR</strong></em><br>different sources have «slightly» different values for enthalpy of combustion<br><em><strong>OR</strong></em><br>law is valid until disproved<br><em><strong>OR</strong></em><br>law of conservation of energy is now conservation of mass–energy<br><em><strong>OR</strong></em><br>small difference between two quite large terms «leads to high percentage uncertainty» ✔</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>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>Outline why the value of enthalpy of reaction calculated from bond enthalpies is less accurate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</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>bond enthalpies<strong>» </strong>averaged values <strong>«</strong>over similar compounds<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>bond enthalpies<strong>» </strong>are not specific to these compounds</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.iii.</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>
<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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Z475kTpu/M2xst8128bpP9xrvOpjT38Cq7Brfafi2Pr65mvre2yhwACCIxCgCgdJVP8RACB3Qn0sDEMgVg3z+nT1LkVeQmobvyn+oXYqW3qBv2R2KtibMp2CJl6hBjIdlP+ppDINvUcIiF8y2spMML+Iz+jTdpeEnFpuxWJNYa518+yCOGVT0tz3PYc8aYwjHlQjxR9S/Fkm4hnaaz6wUEdI17n+K1v+T78mvogIMd+RZTGuHVO5lj1vDRv5/rXD1xCRKfwrHbr64itFdstnz3epw972GYTAQQQGIEAUTpClviIAAKHEOhpY1jFSfoV59iYx718+jUHJkRDKy5CLFRhOCUi1oi9aJOCL30LW1UApF+PRGm0C5/Sl7AXwiBizHs5Rm+iNPx7hsVXAX18fBVbxJhxxTnizfjmcpCM1orSGC/s1nFiToT9R0fkss1xzr25vulfnOeOKjwz3to2fHtl3qaNNt6cR3k/znGtFeyPYqv993idOdrDNpsIIIDACASI0hGyxEcEEDiEgI3hIZgNggACDQG1pwHiLQII3I4AUXq7lAsYAQTmCNgYzpFxHQEE9iSg9uxJl20EEBiBAFE6Qpb4iAAChxCwMTwEs0EQQKAhoPY0QLxFAIHbESBKb5dyASOAwBwBG8M5Mq4jgMCeBNSePemyjQACIxAgSkfIEh8RQOAQAjaGh2A2CAIINATUngaItwggcDsCROntUi5gBBCYI2BjOEfGdQQQ2JOA2rMnXbYRQGAEAkTpCFniIwIIHELAxvAQzAZBAIGGgNrTAPEWAQRuR4AovV3KBYwAAnMEbAznyLiOAAJ7ElB79qTLNgIIjECAKB0hS3xEAIFDCNgYHoLZIAgg0BBQexog3iKAwO0IEKW3S7mAEUBgjoCN4RwZ1xFAYE8Cas+edNlGAIERCBClI2SJjwggcAgBG8NDMBsEAQQaAmpPA8RbBBC4HQGi9HYpFzACCMwRsDGcI+M6AgjsSUDt2ZMu2wggMAIBonSELPERAQQOIWBjeAhmgyCAQENA7WmAeIsAArcjQJTeLuUCRgCBOQI2hnNkXEcAgT0JqD170mUbAQRGIECUjpAlPiKAwCEEbAwPwbzZIL/85b9+/PSn//CRecvz97//lx8///k/bTbOGkNffvnlV2PG2OlHnsPHX/3q39eY+bpN2vv88x9+Yu8nP/m7w+P72jEvdiGQc2UX44wigAACAxAgSgdIEhcRQOAYAjaGx3B+d5QQeN/97p9/ItYyf/UcwnXvI0RiHXPudQjMEJuPjhDUczbq9W9967OPX/zinx+Zc38AApnXAVzlIgIIILALAaJ0F6yMIoDAiARsDPvPWoiwzFOcQ8B98cUXf+J4XKuida+npiEw65PREJ2tSPzNb/7jo4rW8GtJmNYno9G29T2foIYgTQ5h3zE2gczl2FHwHgEEEHidAFH6Ojs9EUDgYgRsDPtOaDz1zByFGGzFaOt9FYwhDrc+qv1WPLZjVd9/9KO/aW9/9T6uZ3zxld+lI8RpFbCPxl+y5d75BDLv53vCAwQQQOAcAkTpOdyNigACHRKwMewwKcWlfPoZTwmXnjZmlxCt+UQxBNyWR31iu1YQ1t9/bX/HtIrWR4K0xlGF8SORXvt53RcBtaevfPAGAQSOJ0CUHs/ciAgg0CkBG8NOE/Px8dXXYjM/a0VgRJNfnZ37imuIw7CXtus5xOHcE9YqkNdSC9EY9qNvK0pTXK4V3Dlm2Emf52LMts79Esgc9ushzxBAAIF9CRCl+/JlHQEEBiJgY9hvsupXW9c8JV0TSbWZuZ86T/2eaLZ75qnmnE8hfN+xl4I2bGzFZs5X1/chkPnfxzqrCCCAQP8EiNL+c8RDBBA4iICN4UGgXxgmv4YbAmyLoz4dnRKWcS3nQ4xdj9p3i7/u+669d/vX2Lw+h0DOtXNGNyoCCCBwPgGi9Pwc8AABBDohYGPYSSIaN+LpX+Zm7o8ENV0evk2Ru/SV1/zqb4xdf1+zCta5r/c+dKA0eNde/X3UEKiO8Qjk/B7Pcx4jgAAC2xAgSrfhyAoCCFyAgI1hn0nM38WM/CyJyK29r08g6++AzonVV8d/1179vVKi9NUsnNtP7TmXv9ERQOB8AkTp+TngAQIIdELAxrCTRDRuHClK4/dHQ9hVoRjzgihtkuLtpgTUnk1xMoYAAgMSIEoHTBqXEUBgHwI2hvtw3cJq5marr++GT/G14BCg+VXeHGPqXEVpfYK69dd369eE13Lz9d21pPptl3OuXw95hgACCOxLgCjdly/rCCAwEAEbw36Tlf8Ey1Z/6CjE5JQYjWshOvO/nBNVlNZ/o9QfOup3zozkWc6zkXzmKwIIILAlAaJ0S5psIYDA0ARsDPtNX/067TP/7Em0DaEZ/auATJEbOQ8BOmWzPhGtorR+nXjqL/cuUQybMXYd891/Eubzz3/49R+CmopjyR/3+iCg9vSRB14ggMB5BIjS89gbGQEEOiNgY9hZQoo7IQozPyHo1h5TTzXr113bf4O02q1/FbeK0miTQjAE7zNCMMVw+8T3VXtVIIfwdoxJIOf2mN7zGgEEEHifAFH6PkMWEEDgIgRsDPtOZAq6EIJrf/cy+8Q5jypUl+xk35gXrSitNtY+La19WjFcRfczvzcb4jbn7VQs9QlztK1Pi5OH8/kEMofne8IDBBBA4BwCROk53I2KAAIdErAx7DApxaUq3EJgTYmw0vzrp5mR1yoC65PSVmxm//rV3eg/1S6fbsb9R09vq+9VIOd4ca5PZh8J03g6W8efEsZhI8ZKTml/iz/OVP32+n0Cas/7DFlAAIGxCRClY+eP9wggsCEBG8MNYe5kqhWL8b4VWXGtPuVsBVsIunjaGvmOdlVwhq0QczkX8jz1hDHEXh0nRGIrTsN2fVr56ClvHTtst/bC97iW/od/U1/bDd/iXts/+rU8dkoVs08QyHn2RBdNEUAAgUsRIEovlU7BIHAPAr/+9a93CdTGcBesmxsNgVhFWeZt6lyfkFZH6ldpp/rFk9japhV3aStEYhWSU7byWojWfGqZ/afOddzsO3UOBnPxTdmNa0TpHJlzr2d+9/Lid7/7z4/f//73e5lnFwEEEHibAFH6NkIGEEDgKAL/8i//5+M73/n2xw9+8Fe7DLn3xnAXp29sNITilCAMQRn3QjAuHfEUs+0fwrEKvfyKbJyXjrAVY06J5XgyOfWkdcle3JuLL56Mxr1nj4gh/FsjjJ+1rf17BPasPb/97W8/Pvvszz6+972/IEzfS5PeCCCwIwGidEe4TCOAwPsE4tP9FKO5cfOk9H2uLNyHQAjY/Nnx1d0+85752cO7FKUxBmG6B2E2EUBgCwJE6RYU2UAAgc0JhBj92c/+8atP+HPDFue9npJGADnO5sEwiEAHBPJ3YB899e3A1du5sHftIUxvN6UEjMBwBIjS4VLGYQSuTSB+9+nv//6/fyJGc9MWT033OnKMveyzi8DZBPKpqa/wnp2JPx3/iNpDmP4pc+8QQKAvAkRpX/ngDQK3JRBi9Mc//tuvn1bmJq2e4/dJ9zxyrD3HYBuBMwnkP4dT/+Lwmf4Y+w8Ejqo9hKkZhwACvRIgSnvNDL8QuAmB+P3Qv/7r/7ooRnPDtudT0sCd49wEvTAvTCBEZ8zn9g8sxZPS+GNHj/4I1IXRdBnakbWHMO1yCnAKgdsTIEpvPwUAQOAcAiFG4/dDczP26Bx/PXLvI33Yexz2ETiCQPwV4vr7o/k7pa/85d4j/L3zGEfXHsL0zrNN7Aj0SYAo7TMvvELgsgTav6Sbm7FH5/ijR3sf6cPe47CPwBEE2n9D9bvf/fOX/imZI3y9+xhn1B7C9O6zTvwI9EWAKO0rH7xB4JIEpv5Zl9yErTnHU9Ij/uH39OWSSRAUAgh0S+Cs2kOYdjslOIbA7QgQpbdLuYAROJbAv/3b/539S7q5EXt0PuIpaVBJP44lZDQEELg7gTNrD2F699knfgT6IECU9pEHXiBwWQLxhDP+wfbcdL1yjr/Me8SRvh0xljEQQACBJHB27SFMMxPOCCBwFgGi9CzyxkXgRgTeEabxz8QcdZy9MTwqTuMggEBfBHqoPYRpX3OCNwjcjQBRereMixeBkwi8KkyPekoaWHrYGJ6UHsMigMCJBHqpPYTpiZPA0AjcnABRevMJIHwEjiTwrDA98ilpcOhlY3hkToyFAALnE+ip9hCm588HHiBwRwJE6R2zLmYETiQQwvTb3/5/vhaAuRmbOse/ZXrkkT4cOaaxEEAAgd5qD2FqTiKAwNEEiNKjiRsPgZsTiH+nNDdgS+cf/OCvDieV/hw+sAERQODWBHqsPYTpraek4BE4nABRejhyAyJwXwJVkP63//b/Lv5V3qOfkkZWetwY3ne2iByB+xDotfYQpveZgyJF4GwCROnZGTA+AjchUAVp/q7o3O+Yxj8hc8bR68bwDBbGRACB4wj0XHsI0+PmgZEQuDMBovTO2Rc7AgcRmBKkOfSUMI32Zxw9bwzP4GFMBBA4hkDvtYcwPWYeGAWBOxMgSu+cfbEjcACBJUGaw1dh+p3vfDsvH37ufWN4OBADIoDAIQRGqD2E6SFTwSAI3JYAUXrb1Ascgf0JrBGk6UUK07OekoYfI2wMk5czAghch8AotYcwvc6cEwkCvREgSnvLCH8QuAiBZwRphhzC9MxjlI3hmYyMjQAC2xMYqfYQptvnn0UEEPj4IErNAgQQ2JzAK4J0cydeMDjSxvCF8HRBAIFOCYxWewjTTicStxAYmABROnDyuI5AjwRGFaTBcrSNYY/55xMCCDxPYMTaQ5g+n2c9EEBgngBROs/GHQQQeJLAyII0Qh1xY/hkijRHAIEOCYxaewjTDicTlxAYlABROmjiuI1AbwRGF6TBc9SNYW9zgT8IIPAcgZFrD2H6XK61RgCBaQJE6TQXVxFA4AkCVxCkEe7IG8Mn0qUpAgh0RmD02kOYdjahuIPAgASI0gGTxmUEeiJwFUEaTEffGPY0L/iCAALrCVyh9hCm6/OtJQIIfEqAKP2UiSsIILCSwJUEaYR8hY3hytRphgACHRG4Su0hTDuaVFxBYDACROlgCeMuAr0QuJogDa5X2Rj2Mkf4gQAC6whcqfYQputyrhUCCPwpAaL0T3l4hwACKwhcUZBG2LkxdP4GFt/EwM/B8XNgRfkdoglhOkSaOIlAVwSI0q7SwRkE+idwVUEa5G3Cj9+EY465OfDHOdD/CrDeQ8J0PSstEUDg44MoNQsQQGA1gSsL0tUQNEQAAQQQWEWAMF2FSSMEEPggSk0CBBBYSYAgXQlKMwQQQACBrwkQpl+j8AIBBBYIeFK6AMctBBD4AwGC1ExAAAEEEHiVAGH6Kjn9ELgPAaL0PrkWKQIvESBIX8KmEwIIIIBAIUCYFhheIoDAJwSI0k+QuIAAAkmAIE0SzggggAAC7xIgTN8lqD8C1yVAlF43tyJD4C0CBOlb+HRGAAEEEJggQJhOQHEJAQT89V1zAAEEPiVAkH7KxBUEEEAAgW0IEKbbcGQFgSsR8KT0StkUCwIbECBIN4DIBAIIIIDAIgHCdBGPmwjcjgBReruUCxiBeQIE6TwbdxBAAAEEtiVAmG7LkzUERiZAlI6cPb4jsCEBgnRDmEwhgAACCKwiQJiuwqQRApcnQJRePsUCROAxAYL0MSMtEEAAAQT2IUCY7sOVVQRGIkCUjpQtviKwAwGCdAeoTCKAAAIIPEWAMH0Kl8YIXI4AUXq5lAoIgfUECNL1rLREAAEEENiXAGG6L1/WEeiZAFHac3b4hsCOBAjSHeEyjQACCCDwEgHC9CVsOiEwPAGidPgUCgCB5wkQpM8z0wMBBBBA4BgChOkxnI2CQE8EiNKessEXBA4gQJAeANkQCCCAAAJvESBM38KnMwLDESBKh0sZhxF4nQBB+jo7PRFAAAEEjiVAmB7L22gInEmAKD2TvrEROJAAQXogbEMhgAACCGxCgDDdBCMjCHRPgCjtPl5uB4cAACAASURBVEUcROB9AgTp+wxZQAABBBA4hwBheg53oyJwJAGi9EjaxkLgBAIE6QnQDYkAAgggsCkBwnRTnIwh0B0BorS7lHAIge0IEKTbsWQJAQQQQOBcAoTpufyNjsCeBIjSPemyjcCJBAjSE+EbGgEEEEBgFwKE6S5YGUXgdAJE6ekp4AAC2xMgSLdnyiICCCCAQB8ECNM+8sALBLYkQJRuSZMtBDogQJB2kAQuIIAAAgjsSoAw3RUv4wgcToAoPRy5ARHYjwBBuh9blhFAAAEE+iJAmPaVD94g8A4BovQdevoi0BEBgrSjZHAFAQQQQOAQAoTpIZgNgsDuBIjS3REbAIH9CRCk+zM2AgIIIIBAnwQI0z7zwisEniFAlD5DS1sEOiRAkHaYFC4hgAACCBxKgDA9FLfBENicAFG6OVIGETiOAEF6HGsjIYAAAgj0TYAw7Ts/vENgiQBRukTHPQQ6JkCQdpwcriGAAAIInEKAMD0Fu0EReJsAUfo2QgYQOJ4AQXo8cyMigAACCIxBgDAdI0+8RKASIEorDa8RGIAAQTpAkriIAAIIIHAqAcL0VPwGR+BpAkTp08h0QOA8AgTpeeyNjAACCCAwFgHCdKx88fbeBIjSe+df9AMRIEgHShZXEUAAAQS6IECYdpEGTiDwkABR+hCRBgicT4AgPT8HPEAAAQQQGJMAYTpm3nh9LwJE6b3yLdoBCRCkAyaNywgggAACXREgTLtKB2cQ+IQAUfoJEhcQ6IcAQdpPLniCAAIIIDA2AcJ07Pzx/toEiNJr51d0AxMgSAdOHtcRQAABBLokQJh2mRZOIfBBlJoECHRIgCDtMClcQgABBBC4BAHC9BJpFMTFCBClF0uocMYnQJCOn0MRIIAAAgj0TYAw7Ts/vLsfAaL0fjkXcccECNKOk8M1BBBAAIFLESBML5VOwQxOgCgdPIHcvw4BgvQ6uRQJAggggMAYBAjTMfLEy+sTIEqvn2MRDkCAIB0gSVxEAAEEELgkAcL0kmkV1GAEiNLBEsbd6xEgSK+XUxEhgAACCIxFgDAdK1+8vR4BovR6ORXRQAQI0oGSxVUEEEAAgUsTIEwvnV7BdU6AKO08Qdy7LgGC9Lq5FRkCCCCAwJgECNMx88br8QkQpePnUAQDEiBIB0walxFAAAEEbkGAML1FmgXZGQGitLOEcOf6BAjS6+dYhAgggAACYxMgTMfOH+/HI0CUjpczHg9MgCAdOHlcRwABBBC4FQHC9FbpFuzJBIjSkxNg+PsQIEjvk2uRIoAAAghcgwBheo08iqJ/AkRp/zni4QUIEKQXSKIQEEAAAQRuSYAwvWXaBX0wAaL0YOCGux8BgvR+ORcxAggggMC1CBCm18qnaPojQJT2lxMeXYgAQXqhZAoFAQQQQODWBAjTW6df8DsTIEp3Bsz8fQkQpPfNvcgRQAABBK5JgDC9Zl5FdT4BovT8HPDgggQI0gsmVUgIIIAAAgh8fHwQpqYBAtsTIEq3Z8rizQkQpDefAMJHAAEEELg8AcL08ikW4MEEiNKDgRvu2gQI0mvnV3QIIIAAAggkAcI0STgj8D4BovR9hiwg8BUBgtREQAABBBBA4F4ECNN75Vu0+xEgSvdjy/KNCBCkN0q2UBFAAAEEECgECNMCw0sEXiRAlL4ITjcEkgBBmiScEUAAAQQQuCcBwvSeeRf1dgSI0u1YsnRDAgTpDZMuZAQQQAABBCYIEKYTUFxCYCUBonQlKM0QaAkQpC0R7xFAAAEEELg3AcL03vkX/esEiNLX2el5YwIE6Y2TL3QEEEAAAQQWCBCmC3DcQmCGAFE6A8ZlBOYIEKRzZFxHAAEEEEAAgSBAmJoHCDxHgCh9jpfWNydAkN58AggfAQQQQACBlQQI05WgNEPg4+ODKDUNEFhJgCBdCUozBBBAAAEEEPiKAGFqIiCwjgBRuo6TVjcnQJDefAIIHwEEEEAAgRcJEKYvgtPtVgSI0lulW7CvECBIX6GmDwIIIIAAAggkAcI0STgjME2AKJ3m4ioCXxEgSE0EBBBAAAEEENiCwLPCNPYgP/7x324xNBsIdE+AKO0+RRw8iwBBehZ54yKAAAIIIHBNAmuFad2D/O53/3lNGKJCoBAgSgsMLxFIAnUx8CllUnFGAAEEEEAAgXcJPBKmdQ/yzW9+w9PSd4HrPwQBonSINHHySAJ1MSBIjyRvLAQQQAABBO5BYE6Y1j1ICNL8z9PSe8yLO0dJlN45+2L/hEBdDAjST/C4gAACCCCAAAIbEWiF6f/+3//f1yI0xWief/azf9xoVGYQ6JMAUdpnXnh1AgGC9ATohkQAAQQQQODGBKowTQE6df7ssz/7+P3vf39jUkK/OgGi9OoZFt8qAgTpKkwaIYAAAggggMDGBP7H//jZ7BPSKlA9Ld0YPHNdESBKu0oHZ84gQJCeQd2YCCCAAAIIIFD3IFWATr2Op6UOBK5KgCi9ambFtYpAXQz8DukqZBohgAACCCCAwAYE6h5kSoROXYs+DgSuSIAovWJWxbSKQF0MCNJVyDRCAAEEEEAAgQ0I1D3IlPicu/ad73x7g9GZQKA/AkRpfznh0QEE6mJAkB4A3BAIIIAAAggg8BWBugeZE59L16O/A4GrESBKr5ZR8TwkUBcDgvQhLg0QQAABBBBAYCMC8e+Nxu+GLonOR/e+972/2MgbZhDohwBR2k8ueHIAAYL0AMiGQAABBBBAAIFZAvFPu8R+JL6K+0iAzt3/9a9/PWvfDQRGJECUjpg1Pr9EgCB9CZtOCCCAAAIIILATgVfF6Q9+8Fc7ecQsAucQIErP4W7UgwkQpAcDNxwCCCCAAAIIrCYQTz5DaM49GZ267mnparwaDkCAKB0gSVx8jwBB+h4/vRFAAAEEEEDgGAIhNP/6r//rKnHq72IckxOjHEOAKD2Gs1FOIkCQngTesAgggAACCCDwMoH4g0ghOqeekNZr0c6BwBUIEKVXyKIYJgkQpJNYXEQAAQQQQACBQQiE6PzZz/5x9i/2elo6SCK5+ZAAUfoQkQYjEiBIR8wanxFAAAEEEEBgikD8xd45cepp6RQx10YjQJSOljH+PiRAkD5EpAECCCCAAAIIDEog9jn1n5MJsepAYHQCROnoGeT/JwTydzB8peUTNC4ggAACCCCAwEUIhDj93vf+4quv9saTVAcCIxMgSkfOHt9nCUShdiCAAAIIIIAAAlcnEH+x97e//e3VwxTfxQkQpRdPsPAQQAABBBBAAAEEEEAAgZ4JEKU9Z4dvCCCAAAIIIIAAAggggMDFCRClF0+w8BBAAAEEEEAAAQQQQACBngkQpT1nh28IIIAAAggggAACCCCAwMUJEKUXT7DwEEAAAQQQQAABBBBAAIGeCRClPWeHbwgggAACCCCAAAIIIIDAxQkQpRdPsPAQQAABBBBAAAEEEEAAgZ4JEKU9Z4dvCCCAAAIIIIAAAggggMDFCRClF0+w8BBAAAEEEEAAAQQQQACBngkQpT1nh28IIIAAAggggAACCCCAwMUJEKUXT7DwEEAAAQQQQAABBBBAAIGeCRClPWeHbwgggAACCCCAAAIIIIDAxQkQpRdPsPAQQAABBBBAAAEEEEAAgZ4JEKU9Z4dvCCCAAAIIIIAAAggggMDFCXQvSr/5zW98+A8Dc8AcOGMOXLz+Cw8BBDohcEZ9M6Z11RwwB2IO9HIQpUQv0W8OmAMzc6CXQs0PBBC4NgHigDgwB8yBs+ZAL9V1GFHaCzB+IIDA9QnkwnD9SEWIAAI9EFBzesgCHxC4F4He6g5Req/5J1oEEFhBoLdCvcJlTRBAYGACas7AyeM6AoMS6K3uEKWDTiRuI4DAfgR6K9T7RcoyAgj0QEDN6SELfEDgXgR6qztE6b3mn2gRQGAFgd4K9QqXNUEAgYEJqDkDJ4/rCAxKoLe6Q5QOOpG4jQAC+xHorVDvFynLCCDQAwE1p4cs8AGBexHore4Qpfeaf6JFAIEVBHor1Ctc1gQBBAYmoOYMnDyuIzAogd7qDlE66ETiNgII7Eegt0K9X6QsI4BADwTUnB6ywAcE7kWgt7pDlN5r/okWAQRWEOitUK9wWRMEEBiYgJozcPK4jsCgBHqrO0TpoBOJ2wggsB+B3gr1fpGyjAACPRBQc3rIAh8QuBeB3uoOUXqv+SdaBBBYQaC3Qr3CZU0QQGBgAmrOwMnjOgKDEuit7hClg04kbiOAwH4EeivU+0XKMgII9EBAzekhC3xA4F4Eeqs7ROm95p9oEUBgBYHeCvUKlzVBAIGBCag5AyeP6wgMSqC3ukOUDjqRuI0AAvsR6K1Q7xcpywgg0AMBNaeHLPABgXsR6K3uEKX3mn+iRQCBFQR6K9QrXNYEAQQGJqDmDJw8riMwKIHe6g5ROuhE4jYCCOxHoLdCvV+kLCOAQA8E1JwessAHBO5FoLe6Q5Tea/6JFgEEVhDorVCvcFkTBBAYmICaM3DyuI7AoAR6qztE6aATidsIILAfgd4K9X6RsowAAj0QUHN6yAIfELgXgd7qDlF6r/knWgQQWEGgt0K9wmVNEEBgYAJqzsDJ4zoCgxLore4QpYNOJG4jgMB+BHor1PtFyjICCPRAQM3pIQt8QOBeBHqrO0TpveafaBFAYAWB3gr1Cpc1QQCBgQmoOQMnj+sIDEqgt7pDlA46kbiNAAL7EeitUO8XKcsIINADATWnhyzwAYF7Eeit7hCl95p/okUAgRUEeivUK1zWBAEEBiag5gycPK4jMCiB3uoOUTroROI2AgjsR6C3Qr1fpCwjgEAPBNScHrLABwTuRaC3ukOU3mv+iRYBBFYQ6K1Qr3BZEwQQGJiAmjNw8riOwKAEeqs7ROmgE4nbCCCwH4HeCvV+kbKMAAI9EFBzesgCHxC4F4He6g5Req/5J1oEEFhBoLdCvcJlTRBAYGACas7AyeM6AoMS6K3uEKWDTiRuI4DAfgR6K9T7RcoyAgj0QEDN6SELfEDgXgR6qztE6b3mn2gRQGAFgd4K9QqXNUEAgYEJqDkDJ4/rCAxKoLe6Q5QOOpG4jQAC+xHorVDvFynLCCDQAwE1p4cs8AGBexHore4QpU/Mvy+//PLj5z//p4/vf/8vPzKRef7pT//h41e/+vcnrD3X9PPPf/jVmHHe4vjiiy++juEXv/jnLUyebiMZffe7f366L60D4VPMla3y19rf4/1PfvJ3X/n8Cs+YU/mzsefPxR5xh830fS/77CKAAAKVwJ1rzi9/+a8fsYdKBnmOvVbsufY6Ym3KsbZYp664r9qL/SO7d95/PGKz5f2c/1vafMcWUbqSXv6AZALnziE6QrxufaTg2krUXLF4JqNXRNTW+WrtEaUtkb7f5893317yDgEErkLgjjUnhGCujRn/3DmE69YHUbo10e3s5Z77lf3c6B+Kb0fxsaX8eXvc8pgWROkDziEw65PRED7tk8Xf/OY/PvIHKBIcP0RbC9MUXFuJ0gdhD3k7Gb1SxPYOOBfeu+Rv9EWht0K99/xkHwEEziVwt5pT14iIPZ6Ixofl9YhruXZmm3r/3ddbi9J3/dF/GwJ1bm3xBHwbr/q00lvdIUofzJMqSB99jSQ+ycsE/+hHf/PA8nO3U3DdRdQ8R+cPrZMRUfoKvW37jL4o5M/xtlRYQwABBKYJ3Knm1L1S7LFaMdoSqvuweAiw1UGUbkWyLzuj7z+OpNlb3SFKF7JfJ/YjQZpm6u9FbPkJTQouojRJf3pORkTpp2yOvlJ/drb8OTgqjt4K9VFxGwcBBM4hcKeak08/v/Wtz1Z9qyxEa7QNRlvugYjSc+b63qOOvv/Ym0+131vdIUprdprXtXA2t2bf5u9qRt+5zXgI3BRQOSHiHJ8GzonfbL9UkGO8+jXitBk/oO2Rfkaben9tkU42MV49Wj/Ddv2UM/rV8cKPKuTDn7D5yqehOXaMEUc7dtgOvu1Xq+unttW3Gle+zoUxfG6PsN3GmvlMXm3+0udoF+xr/3jdHuFrm+OwneO07WvbudjierCJ/2pc2Td5trYjR3O5qzbnfg7iett/KZZ2/D3fJ489x2AbAQQQSAJ3qTl1bZhbt5JJPed6FOepI9aTsJcc6znWmak9RfTJdnPrVIwVdnMNz/ZhM/Yv9ZjbV0WbXOvbPUDtX9lU262fc/um2ids1f3EFmur/UfN1jVe53zuJRqidCYTUcAyWVF8tjiisKSoSdtT5ygkrXB6VNCyYE/Zi2ttIZwrnm3xm4s7C3S7QFQ/l3zKRWKOR1yvBXbOj3o9xw7f8vUUjynb6UfLqdqv4rUucO3vHbdjhs3k1dpPP+Pr3lP96vhTbWqfiKFdWMO3HHsq7mCcsUe7Ou8yf3G9PeriWX3I19k33rc+ha25zUP2jzEr43b8vd+nH3uPwz4CCCAQBO5Sc+o6Vtebd2ZBtZkcp86xbtXj0X4n1qBcH6fsxbW6vs3tq2LMXOvbPUD1p66rdf9T/Yy1c86nXOPr+tv6/ep+9hHjGLuyiLjsP2p2+3yd86MX74jSmUzUTXOIkXeP+OHMQhKis/3hjff1U60Yvx5LBS2KTE6saJeb+RizFpJajOaKZy1+rY/VnxQ6UfzqkX6mP3XM8Cv7xf3gEe8r38o9fH/maMeO/rWw10Ld2q4M5xbKZBl5qkdej5jaeFuf4n096v1a1INV5V/HiNc1rrpIhY16L8aqYjr61qOOn/Mm7yevyFE9ol3mt53LNX/ZpsYRdmqbGKP6G77mHInzXC6qP3u8Tt/3sM0mAggg0BK4S82p+6CWwSvv63pS19+0Vdf2GLseS/udWJfS18hNjJNHrFN5L865hsU589gK4Fxr2z1A2ozzGlEa9tt1t40x2sTamutnrNl1f9mu9dWHqdf2H1NUrnEt52sv0RClM5moP+TP/gBPmayFMwtY264WtCgo9ZgraLVPK5ayf/aNyZdFqvarxXOpSKe9OKdwmPMzxqpFPPvWoluLed6PcxbAuP/MUeOcWpzCVm1Tbde4p/wObrkI1fuP+sUYdTGI8etR/al5qG3qGHNxVaHYjhG26nzODwHqnJyyG7mNPLaiNH2eE41VBEf/8D+POu8qx7wf52A9N79quz1fh9/xnwMBBBA4gsAdak7U9oyz/YD0Vca5Lrd7kWov17IYO9agPOraWtepuF/75JqZ/eJc++b6Wde3dj3PdXNqfU67dX8052fEm/u47BfnXDMjxvSn3q97hLm1t7bP11Nx5r08V9tT8dl/JKn+zvnz2ItnROlMJmpBqsVhpvlml3OCtD/YcwWtCoupwhmOVZGQhXKueNYC1BbpGmQWwHYhSD8jjqnCWcedW5RqTHXMR6/r2HM5q7bbNhlTyz7GnVsscp4sCejKtLVdfZ7iFWNXkT7XJtotxRb9Mr7wtS4icx9mZGzRL4+avxhv7qhx1XmUPlabUzay3RLXqX5bXcufw63ssYMAAggsEbhDzanrR7t3WGLz7r1cT4JxXY/q2lyvx3ix9kT7ufUx2uQHzrme1fhyr5W+55rY7gHyfpzn9hnVzynBGX1zvQ6fY32fOnKOLa3dbT/7j5bItd7nnOglKqJ0JhP1B7wVLzNdXroctqNAxH8pGmKStIVrrqBlwYg+zxxzxbMWv7ZIV/vpa7uwpJ9ZpGufeF3HnSuMcT1/UJ5hn2MvCZla9NvCvTRucm7zkotS3F86coFr+6/xOfs+GqMKzXZBDN/q/eQb55ZDxpE/AzWX9QOOuX7Rv7Ks8yg5tvMmx8xz9XVpnGy/9Tn5bG2XPQQQQGCKwB1qTl3/H60BU4yeuRZrYKxDuY4l37oeze136voTNtYeNb52Dc61vt0DVNt1f1L3PtXP1m72zziX9j/J4Bn29h/TAj+5j37OOdFLHETpTCbqpnrLTXFs6nNjnpNh6twWrrmClqKoCoeZkP7k8lzxrMWvFu8/6Vy+KtIWtzk/s//cuHk/zpV9Lcy1zdTrHHuJRS36bXxzC1E8ZcwctQvU3PXWv8zTXF6XfF47xpKf6U/9Gk3YbePJdnHORa76VnNT27avq3itnMNWxrP2HLaOPtK3o8c1HgII3JPAXWpOxvnoQ9ZnZkGsfbE2pYDKMabOdT2K19mmXq/r15wInPJvaX+T+5N2D1Dt1P1J3fvM+Vn7Tq3X9X68zljbfVvbrr7PPkt7hWhv/1GpjfM689uLx0TpTCZqcdhqU5xFIydBnqM4xw98FUVt4ZoraLnJr8JhJqQ/uTxXPNcUvzCU47bFbc7PHHxu3Lwf5yp8amGubaZe59hLLGpe6yKU9lI8xjmP6k8U3npkDh8V7PQtzvXI63M+V16Pxgi7j/ypcyzaLvHN+Vp9qyxqHO3ruXmU8yb9XHN+ZlPQ+vHq+/Tr1f76IYAAAs8QuEvNyTWgrrHPcGrbxpo2JUbjWqxX+V/yrev+3DpV9wnPrD91vW775Vrf7gFqPHXcujbP+Vn7Tq3X9X68Tgbtvq1tl+9rPPYfSeVa55wTvURFlM5kov4wzn2Hf6brV0UwCm/8EKeIqcUmitKc0M0J0hauuYKWIqoKhzm/6vUaXy2ea4pf2MmFpS1uc37m2HPj5v04B7fkEO3XHjn2Eouah7o45RhTY6fdqU92089HBTvzFLbqkbaXfF47xppPKtOPtLm0MZha5CqfGkf7un7SXDnnvHn2Z6q1v/f75LP3OOwjgAACQeAuNSfXlYg390drZkC0DaEZ/ev+KdeUsBfr05TNum7V9Whuv1PXr7o/euTn0v4m1/p2D1Bt1v1J3fvM+Vn7Jtc1e4lou/bIefloj2P/sZZoX+0yv714RZQuZCKLSBTCqUI31zWLZN3wpxhYKhj1h7otXOlLe71+FXjOn7ienyRm/7niWYtfLfyt7bTXFrc5P7P/3Lh5P851AamFubaZep1jLzGuRb8uTmmv+hd+1PdTPDKvU4I1bcY5eSX/vLfG5+z7aIz6FHRqIa1f3a3zZm6xmVrk6mId480dNYeVc8b7KJY5u0dd761QHxW3cRBA4BwCd6k5dY8xt/ZMZaCu3bkW1/Voas1LO3Xtq+tR9aVer2vpko/tOlf3C60/ufbVfWH6l+dqr+595vzMfnGeWq/r/Xidc6zdt7Xt6nv7j0rjeq9zTvQSGVG6kIlaBNc+2al9alFKobpUDGrfOfHSXq9FrBbVGtZUgZ0rnrVt9X/OXhtPFt7Wz+w/N27ej3ONqRbm2mbqdY79jigNu2knFo/0JQrz1AcTudjN3Q97lWnLJcda8jkF5NIYMU76EkUmxqzHlA+5iE21j755v/pWPzgJNnNH+hy267ysPj6T27lx9rreW6HeK052EUCgDwJ3qjm5H4o1be06kH3qelT3TEt2sm+7Hi2JvfAt2rdrdp0tuc7l2hw+ZB7b/VO2rf5XW/E624SNGs+Sn2ljar3Oe3lO39p9W96fOqdPGeNUm7hW13b7jzlK/V3POdGLZ0Tpg0ykaIjELW3Cw0wtHG3hySdqcwUuClAtnG279KO9Xovg3CdwWVRqoav9avGsomOucFV7bZs5PxPz3Lh5P84pBKu/9f7c6xy7ZV/b10WsiqW5NmmzjTPbV7EXRXnqqLza/KX9JZ/rvJobo/rRjhE5zblVNwFxPRfeqbkTMUcOWt8ynmqrxl19if6Vc81/2Jk76hwIP48+wu/4z4EAAggcQeBONaeuabH2xLqwdOQ6GYzqfqU+Ka3rTLVV15LoX9tVP+r16J/rX/TJJ7PVbl3ncn9Q17fqZ/Srom0q3movxqxtlvxMn9Lfdr3O+3EOu/Ff+lvvzb2uY9t/zFEa93rOiV4iIEofZCIKQ27oI3lRHFtxGj+0WRCizdRmvRbGtiDEvRQHOUFakZBFuRUc4X4tdnE/i1ls5qtftaBEmxyrLZ45VtyvvkbRTEGSfev98CX7TvkZ95fGzVRUVhlL3ls659hLRXmNKA1uGV+epxal9KXyDx4posL39CnttFzy/pLPMU7lHq8rl3b+RJ7qUf1rc1151PkR/XPutL7F2Dlf415lU+1lzO1iX/2J+Ov9sJ3jRv/WpxrXnq/T9z3HYBsBBBBIAnerOXWdj9jjfbt2xbVYY5JNux7EWlvXorqWTO1Xwk5dr6J92q59Iyd1nYs2de0MG+lX3e9Fn7RX24e9Olb0reO1a3jYCFt51L61X96Pc66bYXvuSN+i7TOH/ccztMZqm3OiF6+J0hWZiMJXfygziVPn2GTXYpLmw0YIzak+eS0KU44Tha4eKV7iPHXUjX7aq+ewW4+l4hnFPAt9tZGv60LRFrdHfi6Nm/6F/RxrimW2a8859lJRrqJprriH3cxD+NHmoh23bZ++5zls5QLW5m+Nzzle9Slt13P42cZUF7N2DqTd9CFs1U3B0iIXdpfmSJ2PrU8xbr1fY6iv27mV/h5xTj+OGOuoMX7/+99/xH8OBBDoj8AVa84jyiHultaRZBLnVuSl7bqm1/b5OvZdtU3sL/Ko6+PUOhXrYa7daa+e2zX30f4m19RqI1/HOHN7n0d+Rjxpe2n/k2O9srbaf+SsudY550QvURGlT2QiCkMUjakiGpvs+gncnNmp/nEtxddc8Unh0IqaOk70zcKUEy3aT/n1qHjG/Vogw14UpRgjjizUbXF75OejccN2HTe51DjnXufYS0W5Lk4Zy5S9YJYMI7drjuiTPkTfmCcRSxzJK+7XI9sv+VzbxxhtjmPRzXFq2/ggJMcNX+ZYxvWc09E++sWR48z5Fu1qrnKOxEK+hnPwnxKncW0pNzXGvV5n7veyf6Tdf/u3//vx4x//7Vfz+de//vWRQxsLAQRWErhSzVkZ8tfNYh2ZEj25tuWa9HWH5kWsF23/WFtjHcoj19q6Bke/5L605oR/uZZm+7jW+rVmfxM+pS9hq+4T6rpZ1+s1fj5ar4ND+t7u25LRo7P9xyNC493POdGL50RpL5ngR1cE6uKytFh15TRnMWpHcgAAEwtJREFUNiPQW6F+NrDf/va3H3//9//947PP/uzrjUjERJQ+S1J7BI4hMHrNOYaSURBAYEsCvdUdonTL7LJ1GQL5BDA+qXXcj0BvhXpNBn73u//8+F//639+fOc73/4TIZqxxJkoXUNSGwSOJ5A/p8ePbEQEELgrgd7qDlF615ko7kUCIUbjhzXEqeN+BHor1HMZiN8R/Zd/+T8fP/jBX80K0YwlzkTpHEnXETiXQP6cnuuF0RFA4E4Eeqs7ROmdZp9YVxHI33OM3/Vof2dklQGNhifQW6FugdbfE01f15yJ0pak9wj0QSB/fvvwhhcIIHAHAr3VHaL0DrNOjA8JpBDNH9A4xy/1O+5JIOdBT9HP/Z5o+rrmTJT2lFG+IPBHAvnz+8crXiGAAAL7Euit7hCl++ab9UEI1L96F39ljyAdJHE7udlLoV7ze6Lp65ozUbrThGEWgTcJ5M/vm2Z0RwABBFYT6K3uEKWrU6chAgjchcCZhfrZ3xNNX52/ser3anHCaW4OnFnf0qczfTA2Agjci0BvdYcovdf8Ey0CCKwgcGahJkqJppx/zsfOhRWlYbcmmevdBmAYAQQQaAj0VneI0iZB3iKAAAK9FGpf3zUXEbgHgV5qzj1oixIBBIJAb3WHKDUvEUAAgYZAb4U63POHjpokeYvAhQj0WHMuhFcoCCAwQaC3ukOUTiTJJQQQuDeB3gp1mw3/JExLxHsExibQe80Zmy7vEUBgikBvdYconcqSawggcGsCvRXquWQ8+/un/vruHEnXETiXwCg151xKRkcAgS0J9FZ3iNIts8sWAghcgkBvhXoN1DW/f0qUriGpDQLHExix5hxPyYgIILAlgd7qDlG6ZXbZQgCBSxDorVA/C3Xu90+J0mdJao/AMQRGrznHUDIKAghsSaC3ukOUbpndi9r68ssvP37+83/6+P73//Lrv9SVE/mnP/2Hj1/96t8PjTz8+Na3PvsIv+aO9Pnzz3/4ic8/+cnffRXPXN96PdpGrN/97p/Xy4uv5/qET+F3+O/om0DO7769XOdd/f1TonQdM60QOJrAlWrO0exGGu+Xv/zXj9g3Zb7zHPuC2GcdeWy1TzrSZ2NtSyDn37ZWX7dGlL7O7hY9U2DlxJ07h/hbEolbwYqiHT4sFe9sM+drXg+B+Itf/POiaxn/FqI0BkrflvxfdMjNQwjkHDlksIMGid8/jf8cCCDQH4Er1pz+KJ/nUXx4H/uIzPPSOYTr3kfuRZb8iHtr9kl7+8r+fgQy//uN8JxlovQ5XrdpHQKzPhkN0dkKuN/85j8+UrTFxI6Cu6cw/eKLLx4+taxPRsOfVvzlJ4NRaPOHMWKYOzK+rURpjJMLU8Tj6JNAzo0+veMVAghcjYCac7WM/jGe2DtlfuMc+5J2/Y9ruTfINn+0sO2rrfdJ23rH2pEEcl4eOebSWETpEp0b36uCtBV2LZb4VC8n9o9+9Dft7c3eZyFtxXEOEGOnH/H1mKUjxGnaW1oA9hCluUDF+I4+CeQ86tM7XiGAwNUIqDlXy+gf4qn7o9hXtWK0jbruveKD/62PPfZJW/vI3nEEeqs7ROlxuR9mpBRNS2KtDab+jsQev2MaNsOfuSeWtfA/EqTV97oATC0We4jSGD8/Ed2DVY3P69cI9FaoX4tCLwQQGIWAmjNKpp7zM9f6+HbWmm+SxT4kv8m19QfXe+2TniOidU8Eeqs7RGlPs6MTX2oRXetSFNIUjXNCK67HU9f8IajnEJJLnwrmU825p7YpLtcW/owrxW74MvU13r1EaXLY88lyxuj8PIGcm8/31AMBBBB4noCa8zyz3nu88gF/xJT7jqk9Sdx/dS+11z6p9zzwb55Ab3WHKJ3P1S3vhDDMSfrME8dHsOpXRtL+1Hnqq7kpeKP9lHB91+cs1GG//SQzF4e5J7RTca/pU32eekI7Zde14wjk3DxuRCMhgMCdCag518t+3fe0e4tXo602c85Mndu9VN1zvLK3W9onvRqLfucTyLlzvid/8IAo7SUTnfiRT/BiosZXPbY4qs2pYhjX8gcjnnS2R/afuhdt8/6rPi/1XyMwW3/X9smv6MT4jr4I5HzsyyveIIDAVQmoOdfLbK7xIei2OOpe5dm9VO37yt7u3f5bxM/G9gR6qztE6fY5HtpiFYhTTyVfCS4Lc4i1uSOFXPyAtE8O85PBOE8d7/pcf8+iFYjp19ZPSiOOR3FNxeraMQR6K9THRG0UBBA4i4Cacxb5fcaNJ6OZ07m9y7Mjv7OX2nOf9Gwc2vdDIOdoLx4Rpb1kohM/UoTFRG3F4Z4u1k/h2t9JzULcCsb0512f6++VtmNU2/nDu/b8SMhmzBGfoy8CmeO+vOINAghclYCac63M1l87in3EUUfuK2I+1b1U3cu8srdb2icdFZtxtifQW90hSrfP8dAW3y1czwQfv/MQBbSO2RbSWtjnvnJS+29dbKvt/OFde34kSusT2lf8foa1ts8RyBw/10trBBBA4DUCas5r3HrtVfcusY/Y81izl6p7mVf2G0Tpnhk8z3ZvdYcoPW8udDly/ZRtq6/vRqDxVZawnU898wdh6lw/3auFsF6v8OrXUl4ptlUcho/1yEL+SGC+0mdNbNWu18cRyHl53IhGQgCBOxNQc66X/czpVl/fDUKv7qX23CddL3P3iSjnaC8RE6W9ZKITP+ITt5ykc08mn3U1xO2UGI1rIQLzvxy3is8q3OYEZ/TPvq/4vNR/T1FaP0mtMT/LV/vtCeR82t4yiwgggMCnBNScT5mMfiU+zI68bvWHjt7ZSy3tc9Zwfrf/mjG0OZ5Ab3WHKD1+DnQ9YhVK8cnaM0cUrSjCca5//jwLc0z+9l7arwWvCrQ1ojQKdf5gPetzjJ//BmrYqH7HPaI0M3Svc86ne0UtWgQQOIuAmnMW+f3Gzf3D1N5iadTYh8SH9tG/ftD+zl5qz33SUizu9U2gt7pDlPY9X07xLkVaFMVWpC05lAWzfipYvxrb/rtZ1Vb9asmcKK3Xa994/arPVYTHAtAeuahEbGuPtX2q4F6Kbe242m1HoLdCvV1kLCGAQI8E1Jwes/KeT3WNjw/e1x5T31h7dy8VY++1T1obl3b9Eeit7hCl/c2R0z2qBXHtk8fap4rPen3u67cRcAra+AGpAq2KxvqJYQupFv9nfn+j/oPQU/6tFZjVn7V96iJTx64CPXiEPcexBHor1MdGbzQEEDiagJpzNPFjxsu9TXzIX9f5pdGzT/0w/N29VIy31z5pKRb3+ibQW90hSvueL6d5l5+oxYR99AlfLXS1iIbzVXhVsVkDq1/djfHadlHM1/hRxdwjYRpPgGuMc+J7rcCs8aztk3FHfHmE38EwvmoTR5zjffjqOI5Ab4X6uMiNhAACZxBQc86gvv+YdX8UH4I/EqZ1X1I/4N9iLxXR7rFP2p+iEfYi0FvdIUr3yvTgdqNwhhjKCRuFshWnUWxTgEW7qU8C83cj4n7Yq4IzBFeIsBwjz+0T0WzzSGgG8myb47U+hz9xLYVutFt6Epnxhe9rj7V90teMK5iHP63P8T6uP1rM1vqn3WMCwTv+cyCAAAJHEFBzjqB8zhi5hmeO431+8JwexbW652o/KN9iL5Vj5d4j/IkxY+x6PLtPqn29HotAzslevCZKe8lEh35EYarFKyfv1DlE65xoql87meobnx7WNm2BjPfRrz5RXMJVbU2Nl9fCXv0kcsrmWoFZ+67tk8K4jbfaitf5CWkr1tt23m9HIOfIdhZZQgABBOYJqDnzbK5wJ9bvXPMz13PnuX3Jo73No71U5fjIVvq2Zp9U7Xo9FoHMcy9eE6W9ZKJjP+LpZginqYIan+atEUthoxW4IWRr8c2vrcS5HvkEMX542k8Xa7v2dfjcjhk2QjQ+EoJpa63AzPZxXtMn4shiEOJ/6Qhfo+2c6F/q695rBDI3r/XWCwEEEHiOgJrzHK9RW8/tS0JQxr1H+4F39lJTzOb8eWafNGXXtTEI9FZ3iNIx5s3tvUxx2X6lZVQw+XsdEdejI75es6bdIzvuryfQW6Fe77mWCCAwIgE1Z8Ss8RmBsQn0VneI0rHn0228j08H44cnntZe4cinzhHX0hGfVoYoffTp6ZIN954n0Fuhfj4CPRBAYCQCas5I2eIrAtcg0FvdIUqvMa9uEUV+vbd+5XfEwPN3OdqvKbexxNdqQrw+85Xl1ob3rxHorVC/FoVeCCAwCgE1Z5RM8ROB6xDore4QpdeZW5ePJH+3NJ4cjnyE/1EIln5HNL/eu+b3dUdm0avvvRXqXjnxCwEEtiGg5mzDkRUEEFhPoLe6Q5Suz52WHRBIsTbq09J8ShpPQaeO+JpuPEH1hHSKznHXeivUx0VuJAQQOIOAmnMGdWMicG8CvdUdovTe83HI6OOv1IVoG+33LMPf8Dv8nzviXhSJR79rOtff9W0I9Faot4mKFQQQ6JWAmtNrZviFwHUJ9FZ3iNLrzjWRDUYgvqqbBWLqPPd0dbAwh3A3+Q/hLCcRQGB4AmrO8CkUAALDEeit7hClw00hDiOAwN4EeivUe8fLPgIInEtAzTmXv9ERuCOB3uoOUXrHWShmBBBYJNBboV501k0EEBiegJozfAoFgMBwBHqrO0TpcFOIwwggsDeB3gr13vGyjwAC5xJQc87lb3QE7kigt7pDlN5xFooZAQQWCfRWqBeddRMBBIYnoOYMn0IBIDAcgd7qDlE63BTiMAII7E2gt0K9d7zsI4DAuQTUnHP5Gx2BOxLore4QpXechWJGAIFFAr0V6kVn3UQAgeEJqDnDp1AACAxHoLe6Q5QON4U4jAACexPorVDvHS/7CCBwLgE151z+RkfgjgR6qztE6R1noZgRQGCRQG+FetFZNxFAYHgCas7wKRQAAsMR6K3uEKXDTSEOI4DA3gR6K9R7x8s+AgicS0DNOZe/0RG4I4He6g5ResdZKGYEEFgk0FuhXnTWTQQQGJ6AmjN8CgWAwHAEeqs7ROlwU4jDCCCwN4HeCvXe8bKPAALnElBzzuVvdATuSKC3ukOU3nEWihkBBBYJ9FaoF511EwEEhieg5gyfQgEgMByB3uoOUTrcFOIwAgjsTaC3Qr13vOwjgMC5BNScc/kbHYE7Euit7hCld5yFYkYAgUUCvRXqRWfdRACB4QmoOcOnUAAIDEegt7pDlA43hTiMAAJ7E+itUO8dL/sIIHAuATXnXP5GR+COBHqrO0TpHWehmBFAYJFAb4V60Vk3EUBgeAJqzvApFAACwxHore4QpcNNIQ4jgMDeBHor1HvHyz4CCJxLQM05l7/REbgjgd7qDlF6x1koZgQQWCTQW6FedNZNBBAYnoCaM3wKBYDAcAR6qztE6XBTiMMIILA3gd4K9d7xso8AAucSUHPO5W90BO5IoLe6Q5TecRaKGQEEFgn0VqgXnXUTAQSGJ6DmDJ9CASAwHIHe6g5ROtwU4jACCOxNoLdCvXe87COAwLkE1Jxz+RsdgTsS6K3uEKV3nIViRgCBRQK9FepFZ91EAIHhCag5w6dQAAgMR6C3ujOMKE1wzt/4wAADc+CYOTDcCsNhBBAYkoCafkxNxxlnc+DTOdBL0SRKv/lpckxYTMwBcyDmgAMBBBA4goA1x5pjDpgDZ82BI2rcmjG6F6VrgtAGAQQQQAABBBBAAAEEEEBgTAJE6Zh54zUCCCCAAAIIIIAAAgggcAkCROkl0igIBBBAAAEEEEAAAQQQQGBMAkTpmHnjNQIIIIAAAggggAACCCBwCQJE6SXSKAgEEEAAAQQQQAABBBBAYEwCROmYeeM1AggggAACCCCAAAIIIHAJAkTpJdIoCAQQQAABBBBAAAEEEEBgTAJE6Zh54zUCCCCAAAIIIIAAAgggcAkCROkl0igIBBBAAAEEEEAAAQQQQGBMAkTpmHnjNQIIIIAAAggggAACCCBwCQJE6SXSKAgEEEAAAQQQQAABBBBAYEwCROmYeeM1AggggAACCCCAAAIIIHAJAkTpJdIoCAQQQAABBBBAAAEEEEBgTAJE6Zh54zUCCCCAAAIIIIAAAgggcAkCROkl0igIBBBAAAEEEEAAAQQQQGBMAkTpmHnjNQIIIIAAAggggAACCCBwCQJE6SXSKAgEEEAAAQQQQAABBBBAYEwCROmYeeM1AggggAACCCCAAAIIIHAJAkTpJdIoCAQQQAABBBBAAAEEEEBgTAJE6Zh54zUCCCCAAAIIIIAAAgggcAkCROkl0igIBBBAAAEEEEAAAQQQQGBMAkTpmHnjNQIIIIAAAggggAACCCBwCQJE6SXSKAgEEEAAAQQQQAABBBBAYEwCROmYeeM1AggggAACCCCAAAIIIHAJAkTpJdIoCAQQQAABBBBAAAEEEEBgTAJE6Zh54zUCCCCAAAIIIIAAAgggcAkCROkl0igIBBBAAAEEEEAAAQQQQGBMAkTpmHnjNQIIIIAAAggggAACCCBwCQJE6SXSKAgEEEAAAQQQQAABBBBAYEwC/z+JtnUISNnDewAAAABJRU5ErkJggg==" width="538" height="218"></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>Thermodynamic data for the decomposition of calcium carbonate is given.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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" width="205" height="119"></p>
<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.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The potential energy profile for a reaction is shown. Sketch a dotted line labelled “Catalysed” to indicate the effect of a catalyst.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="454" height="317"></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>Outline why a catalyst has such an effect.</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>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">d(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">d(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">d(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">e(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 e(i). Calculate the percentage yield of CaCO<sub>3</sub>.</p>
<p>(If you did not obtain an answer to e(i), use 4.00 g, but this is not the correct value.)</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>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">f.</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.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>lower activation energy curve between same reactant and product levels ✓</p>
<p><em><br>Accept curve with or without an intermediate.</em></p>
<p><em>Accept a horizontal straight line below current line with the activation energy with catalyst/E<sub>cat</sub> clearly labelled.</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>provides an alternative «reaction» pathway/mechanism ✓</p>
<p><em><br>Do <strong>not</strong> accept “lower activation energy” only.</em></p>
<div class="question_part_label">c(ii).</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">d(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»<br><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>«<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">d(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>»<br>pH = « −log(2.15 × 10<sup>−13</sup>) =» 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">d(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><br>«<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><em><br>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">e(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><em><br>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">e(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><em><br>Accept any correct name for any of the calcium compounds listed.</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">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">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">f.</div>
</div>
<br><hr><br><div class="specification">
<p>Trends in physical and chemical properties are useful to chemists.</p>
</div>
<div class="specification">
<p>The Activity series lists the metal in order of reactivity.</p>
<p style="text-align: center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJ4AAABBCAYAAAAg7R2BAAAQxElEQVR4Ae1dC1RU17n+ZhiuaRXwekuaIVhtYvCRqK0N9bHwZhAEjLkqJpjoUmKxGANGIRZi0lgw9W0TNQY0vvAmViMkPtJoBSEDhigRe298AT7SgvJoQxOBIU29zMy+a5/XnHNmzswZO6NEzqzFOo/9739/+9v/2a+Zw6cjhBBoH42B28yA/jaXpxWnMcAwoAWeFgh3hAEt8O4I7VqhbgPPXpeOeJ0OOp0Ogdkfo8UVX/Yy7IoNdG/jKp+He21tbR4sRMkiDLqwV5Dfbhcl8qcduPz2IAansg1v6+2xBXVH5iB2Sy2s3ma9rfZynBwnipz5D5zbwGOLNaJfRD9gw3EcdNGg9ssHsOV/H4DJ6FuQ06ZN897hOBOiWj9C0WdfO+e1V+PEjhsYO7aXc9q/eqf9IHZNew81Bt2/6sm/+Z1wBiPiuasgzauQFqIiFHyITlVpvWZn4AUccdGgHbhirkKfN5fg5z4EVV9fj4qKChw6dMg7r33G44m0BlSWnnPqnekDsnzs68gc54fA8w6lZg1AVeDhvihMWuyiQWkvsioWKVH/FJFpR8fxWITpZmDB0WLsyghjhzfdcDz82h9RbnE1DIqyA9i9ezdzgz9KU91d9cd/Top00TuzD8igJyLxH07ZW1B3NB3Z49npgk4Xj+jNJVKclnKUbI5GNDftkNi05+OloelYb7WiZf5QBCoNW+35yA4MxL0vvoG1M/tIpyb2i6jeIvIf/RLSj9ahVYzVfhGf7ZmBZ8PYqY9OF4Z7X9yB/IvtYivYm/a55twlzn+w0w8GM3cevwvlkiayMu0ZGPiyYwqjBq8ElfOFusDDDxEZHwn8Tz0uiUDRXuS1xDhM6Wtw9owivL2+AteeqwXdKrQ1pmLKsUTMyKuWEuoiJx9whw8fhldzPQQgePR0ZOIyLrb8n8Mz94AkjZaHXQvqtiRg+FQLGtdeQxeDcyb+6+R0RE/ZhKJOWtlGnNk8B5Or5+LVDhtXl8kYs28KZr13GdaQNKytzUOWwQDjtlp0uRm2dKFWtL53EdeWNYHY6nD8mVEw2qtx4BejMe7UU5jfeBOEdMGS909Ypk5FbFEDN2dsxJk1CYgqeQwJ1dSGgNiOYZ/+N0hfuIvDCdgbc5E6MBlL9Zthplgta5FZm4SJGYdwLsgVTvGM9B4MeiwecSXHUHRZ3JE04ExxNZA5EYl0OFaF10G94hndQFb62GrTSByMxLitltja8kiWYTpJq/2WM28ndfmjiKm4lZC2PJJtBDFklZFmYiPtJTHEiJ+xaYLzq6RsSTBB3E5itgk3nU7MZjPd0Bb+CgoKnGycbthKyc4YA+f7r6Q0sx+DuYszpPUIf6GUfEU4DMaXSV6bjcGdZYggIwrrCW/LZGHqamDrbSslO6J7Sfw5lS+yl/gRG0o44hO6OK6SRLzSNPa+wbBUhHO4jE9C2Pbh87aTS1sfJODrxhQh8++EU5aHq2vo6iryJQ+RycOXLfPH28jxCveVT1T2eABC4hH/QjkOflLPPoVCL9JPMailCaEIfygUOH8VNW6GW7634/Nu3LiRP1V5DEXkpJ+idf9JVDK9Mz/MjoQUqQ0dpw9gj3Ukoob/EJI+O2gwhjwGtF5pxtf6wRgZG4qWnAKsOHEIuYdqPfbYKoECYHuTFuMgPGz8N1E2A/r0H4wJ1uPsvDokDeu6zsE89gIO5eYiNzcX722ORszQfJTwuezVqCxqAIYPwrAgvlkNCJ5YimZSiLwh9/CWykf9GCQsGIEbyw6hiFlIfoOm4t3YMGYu0sZR9lTiVS5BSOERCjeUTuwYIGlQ++UP8VZqIpJ8vBqSLyjOnj0LuthQ/9Ej+OfTkVlxhB0y7NX4eOsMjjixly789c/1TosQsYX1bD0u2MPx6CunUZP/Pdx/IA3LE4fhXoX5lTivV+ctq5HeN4CbC7NzuABxUIFOCUYiLDgaiRXforV/f9R9tQR5p55DHP6MmmudXhWnbNwb98fPRSa/kLRX4djWcwhNfhyJfUSh4hGvcgl8isgbf0vpaBA1aBuulFxC1IyfIFTJ/Bbu096uvV06WaZu5L2gR9fi3vnyh9ixYKqUOMZBIO57YCDc7QIZRg7EYIYhI4ZOy0XqxmYQ0ommT+djSUsG0ieudUy4PYJyYxC3E2YbYedudP4m/J2BOe4HsNetwOI0O0IL69FlXou8efOQm5uAcMtVnHfj9paSQuKRwC0k2y4fQKF5ChLHD5SOCB7wqinXi8ATDbfmP6Lkv59EUoSK7lsNCs5G3tvxWb0OPKF3LkbRkUsYEy0jjnEcwDxIsw1nUXn+b9KNX8sl1FUAoQ+FuXiweiNs3Kt4PmUMjC1XpYsYHrDq4wA8Gh8Jw8dnUN4sWgzBis7PZiFaNwPpdd+g8/olnMdQ2ZTgJiw3Ohwl6SMRlTTAaSrDfgkQhrDtdRCtCx35nM5YTNjwPvL3H0VJXIKondXgFS9MnJwLN7wLPK5Bv353O7amjkeUl7mFUl2c0NUrXcXSz4ABAyQWDQ0N+PzzzyX33F9wvXPlO1h88mkRcbJcIYlIefMe1MxahuSTLWzwdR7FjgXZWB+1DptmRsBgL8POCffg3hc/cGyxWCpQcqQGrSnP4Dn68AUNxuDxAYxzfUcrWtW1MAADgmNWY/+sd7Dyle3Y10SDz4rO2hV4LfMALq5egtwhvbkH5CCKdp7ARcb3N2j+dCFeyagWTRWCMeiJRVg68A3krihl7eznYN5xECWmLKYueieckpktR44BwWPnYdWY7fh17k0Ynxonamc1eNV1Rl6GDtugi6r/HSaTq15E1rBeXJaXlyMnJwc3btyQzOnosFNQUOBl4HG9c1o9DAljRcTJARkx5PljOH84COEv/QiBdJ8uaBN+P+4AzB8uRhKd1+hj8It33kVe399gVjA3DwvOQE6/Tdi7/AmMoAzqx2DS0hgMnj8UASHpyJVsR8jLlF3rIzH9rY9wJPJ9bAvvBZ0uEEExf0F9WgXM2aPZHjfkWWSceAFzqybjkQA6BxyDiWWxmL7/VWQZHD2l/v5FWFlUgDVdc1m7gATMtK9G4bvpXF3kOB15Jaj6TMbU2QMA43TMn/SAdJhVg1fizPWFji54XSfd2bv0+2H66abw7iw5d0HpXvZ4d0GNtSp0Cwa0wOsWzdDzQGiB1/PavFvUWAu8btEMPQ+EFng9r827RY21wOsWzdDzQGiB1/PavFvUWAu8btEMPQ+EFng9r827RY3dBx79uTT9qXX0BuFXrhLU3M+56RfQ9Les7BfSjyK65O8SM+1CY0DOgPvA463L1yP9Lc8/WdcPyUMxYX/Kw2fVjhoDrhjwGHik1YB+ETdhePm3SP/Mi3ddXZWm3dMY4BjwGHjUrldGATYll6NoaYHrIZdzpg21WlypZUBV4MEQgcSVv0JKZbaqIVdt4Zpdz2VAXeDRn5yFZ+G13/9UG3J7bqz4tOaqA8+O3rj/qTy8pWLI9SlCzdldyYDqwGNqr4/ENNGQ66t3m+5KZrVKuWXAu8CTDbkpleJ3Qd2WoyVqDEgYcPW2h8TA+YIfcqPx5KpvEOVsoN3RGPDIgNc9HuORH3L/Uo5Kqy/frPWIVzO4Sxi4tcDjh9yNkW5fiL5LONKq4QcGtLfM/ECq5tIzA7fc43l2rVloDCgzoAWeMjdaih8Z0ALPj+RqrpUZ0AJPmRstxY8MaIHnR3I118oMaIGnzI2W4kcGtMDzI7maa2UGtMBT5kZL8SMD6gNPkG3qhi/z8NicNBr8yJwn15ZyHF04FYvr1P2HTE/u/JYux8lxqSgh5iMgqgOPalrsrUjFytyvXCrn+AjPXeLGio6qFfhlXi/pv7jtdrVzgVMfg5TSLnStm+DXr0NVBt4XKN+xBxWZTyHt6ccxYf1WrOjuT3K3a2QNkIQBZQkMUYpYZMOd4EiHmRxbPowYGYGUR8iw5bvItsVGmeiHyK+bU15kxY2JI0kisOK47erM1riX7KSYGIxGEpq5neRdaJOY2q4XkkKhHlTsJY6Y3iwm5g5eGaaLWC7ksXXjxWBM2STtSC35UhCYcYjEsMIzkiIEERUj9b3hRZJspPYOURrf4KRldpKmk5kkK8rA1tmYTJI+qlPE2cZxyWL+Byva4iSKIxOAIYSowStmgP6rVw8feSGcGowcjO00+SC5NzHM2U1KmQZqJrX5I9gglKjNeCiOS/ZH4Nmu55AUQwQZtuoTcoGJIRajwfA8ybl+ky3ZspesGRkssqGkbiJLx/YiguINb7PlHKeA00maih8nJvAqO0oKOOK68zYQOLM1fEI+6bARn+EknaRxfyRhgnsf+1BYLi4icwQ1Ix4Dj5tGEKuSxD8sUvUgHj+rkCTYqOGVz8odPQeeDAjNx4JxPJ0OCSRRAzIFyCScZIW7u/R94ClJWolJZOWwBCknAaD0YXPdGIKxqDcTNag4mTnnG13MI03wHU55ELEQxP55+S8RTnl7e5SZEvsTV1LMq/g+e+5xjkcXFfvLRiIqdoQw2dRHTMfTMWdFiwxWasg64VGYwsQ/h+dkpCSD+x26aC9G8d4OOERTeBwsRuueUhxsByPB1NX1WyQ3bmekm15/fRm2ZwzB4AVf8BmgD49CbNRBbNv1B5R/sMZJQVEwvJUTH+Jk2y5UptfxICb8rh2kOAUmvQpdBE8yU6rwOpfjIfA6cLWiGCX4E8rjQx2SRwGxmFdmBdtYzk5vhe/blce6PgZhgvwn/df9IZKgAtW5mNkXQY8sR37HfbBYAtBk+hCntz7oEC/pMxNZR4/j8JAyHN24DOmP9IVEStQHlfEJTh/gAH27UIXMlEe8Mizu37lo34MdCxsYOcxrqUOkegf0H/b8YDFWFCZjQWqgzG33vKT/jsO47Tyc6iLApVLpi5BaMRc5199Abjjfe3+Bj38lUY8Fgkx4PIX+bcU6qiW7dznys+Mx8XoZrq0zobfg0/sTn+L0vnjnHIzM1MvYUHoObT/iZKbyHTonnvE6u3TT41kZdcMNSHUW2aB+GDDfR8v7J3HC/mNOGumKTJmxFY1XZA3mjOH23OHwtlbVoEbSSTfizKr+0DGbz9+yeIePkk4Z7F+jrdWmjFP/MEbPXo1nZwWDCu+JNX2VMymk+BAnOyVqZVQoHa1AH65B0DFyVTcVQMhvu5GZUoVX7o/O4BU/7ieHdEFhqZrpWMnRVe3sYBKa+T637dBM6vbFEBPdbujGq1oW42SSVHVDtCiIIzEljayGre0CObWK2yLi6sEuLuKIiVkpUgK7iKUmhywZGSxo3zoWIJ2k/ct2qR4uw7nS4oK4XNXeCk5mK4VZbTvqI1+hy3Ha5IsLPj4se8k6ZkuG1S8W6/K6WoVL8fJOHEfFwGMB8Q3iyCA5k4N02scrJEUrB96+wOP31ORHYevHef/NMGcdyfm0yREYtgvkdL6JfWCYhyaZJO0+Rk7tMxHHareTNH2aQ9Y801sQdAbdH3u3itumoUv/s6R0CbdfKJQvZk858JhAlu0T3hpOWp5sH4/uG+afUsRZ1SXdTnEg5kWV0x1bT0KiCl4FW/bEzy/70G59FB7+YhuuefkVjCYp5WJ4uotuuZnjeVNLKzqOxyIwcB7Sa3i9WaowuBgrFj6ExCdHCVsxar3ymq1q7TW77xYDPgo8Kie5CZUFFnTG0q0Fuk3RBwPeHoYHKnZi7+i+3y1WNLR+Z8DPQ63f8WsFfEcZ8FGP9x2tvQb7jjGgBd4do75nF/z/U6NFz1Ygn7EAAAAASUVORK5CYII="></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the general increasing trend in the first ionization energies of the period 3 elements, Na to Ar.</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>Explain why the melting points of the group 1 metals (Li → Cs) decrease down the group.</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>State an equation for the reaction of phosphorus (V) oxide, P<sub>4</sub>O<sub>10</sub> (s), with water.</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>Describe the emission spectrum of hydrogen.</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>Identify the strongest reducing agent in the given list.</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>A voltaic cell is made up of a Mn<sup>2+</sup>/Mn half-cell and a Ni<sup>2+</sup>/Ni half-cell.</p>
<p>Deduce the equation for the cell reaction.</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>The voltaic cell stated in part (ii) is partially shown below.</p>
<p>Draw and label the connections needed to show the direction of electron movement and ion flow between the two half-cells.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>increasing number of protons</p>
<p><em><strong>OR</strong></em></p>
<p>increasing nuclear charge</p>
<p>«atomic» radius/size decreases</p>
<p><em><strong>OR</strong></em></p>
<p>same number of shells</p>
<p><em><strong>OR</strong></em></p>
<p>similar shielding «by inner electrons»</p>
<p>«greater energy needed to overcome increased attraction between nucleus and electrons»</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>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 <strong>not</strong> accept discussion of attraction between valence electrons and</em><br><em>nucleus for M2.</em></p>
<p><em>Accept “weaker metallic bonds” for M2.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>P<sub>4</sub>O<sub>10</sub> (s) + 6H<sub>2</sub>O (l) → 4H<sub>3</sub>PO<sub>4</sub> (aq)</p>
<p><em>Accept “P<sub>4</sub>O<sub>10</sub> (s) + 2H<sub>2</sub>O (l) → 4HPO<sub>3 </sub>(aq)” (initial reaction).</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«series of» lines</p>
<p><em><strong>OR</strong></em></p>
<p>only certain frequencies/wavelengths</p>
<p>convergence at high«er» frequency/energy/short«er» wavelength</p>
<p><em>M1 and/or M2 may be shown on a diagram.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mn</p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mn (s) + Ni<sup>2+ </sup>(aq) → Ni (s) + Mn<sup>2+ </sup>(aq)</p>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>wire between electrodes AND labelled salt bridge in contact with both electrolytes</p>
<p>anions to right (salt bridge)<br><em><strong>OR</strong></em><br>cations to left (salt bridge)<br><em><strong>OR</strong></em><br>arrow from Mn to Ni (on wire or next to it)</p>
<p><img src="data:image/png;base64,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"></p>
<p><em>Electrodes can be connected directly or through voltmeter/ammeter/light bulb, but <strong>not</strong> a battery/power supply.</em></p>
<p><em>Accept ions or a specific salt as the label of the salt bridge.</em></p>
<div class="question_part_label">e.iii.</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.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>
<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="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.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State one 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;">Suggest why it is surprising that dinitrogen monoxide dissolves in water to give a neutral solution.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><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.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass spectrometry/MS <strong>[✔]</strong></span></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>
<mo>=</mo>
</math></span>» 14.02 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«<em>M<sub>r</sub></em> = (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>:<br>same <em><strong>AND</strong> </em>have same nuclear charge/number of protons/Z<sub>eff</sub> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>neutrons do not affect attraction/ionization energy/Z<sub>eff</sub><br><em><strong>OR</strong></em><br>same <em><strong>AND</strong> </em>neutrons have no charge <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><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>same attraction for «outer» electrons <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><span style="background-color: #ffffff;">same <em><strong>AND</strong> </em>have same electronic configuration/shielding <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><span style="font-size: 14px;"><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 “almost the same”.<br>“same” only needs to be stated once.</span></em></span></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">oxides of nitrogen/non-metals are «usually» acidic <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>60 % of the candidates were aware that ozone in the atmosphere absorbs UV light. Some candidates did not gain the mark for not specifying the type of radiation absorbed.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well answered. More than half of the candidates stated mass spectrometry is used to determine the ratio of the isotopes.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates successfully calculated the relative atomic mass of nitrogen in the sample. M2 was awarded independently of M1, so candidates who calculated the relative molecular mass using the <em>A</em><sub>r</sub> of nitrogen in the data booklet (14.01) were awarded M2. Many candidates scored both marks.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a challenging question for many candidates, while stronger candidates often showed clarity of thinking and were able to conclude that the ionization energies of the two isotopes must be the same and to provide two different reasons for this. Some candidates did realize that the ionization energies are similar but did not give the best reasons to support their answer. Many candidates thought the ionization energies would be different because the size of the nucleus was different. Some teachers commented that the question was difficult while others liked it because it made students apply their knowledge in an unfamiliar situation. The question had a good discrimination index.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only a quarter of the candidates answered correctly. Some simply stated that N<sub>2</sub>O forms HNO<sub>3</sub> with water which did not gain the mark.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Lithium reacts with water to form an alkaline solution.</p>
</div>
<div class="specification">
<p>A 0.200 g piece of lithium was placed in 500.0 cm<sup>3</sup> of water.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the coefficients that balance the equation for the reaction of lithium with water.</p>
<p style="text-align:left;"><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the molar concentration of the resulting solution of lithium hydroxide.</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 volume of hydrogen gas produced, in cm<sup>3</sup>, if the temperature was 22.5 °C and the pressure was 103 kPa. Use sections 1 and 2 of the data booklet.</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>Suggest a reason why the volume of hydrogen gas collected was smaller than predicted.</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>The reaction of lithium with water is a redox reaction. Identify the oxidizing agent in the reaction giving a reason.</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>Describe two observations that indicate the reaction of lithium with water is exothermic.</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>2 Li (s) + 2 H<sub>2</sub>O (l) → 2 LiOH (aq) + H<sub>2 </sub>(g) ✔</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>n</mi><mrow><mi>L</mi><mi>i</mi></mrow></msub><mo>«</mo><mfrac><mrow><mn>0200</mn><mo> </mo><mi>g</mi></mrow><mrow><mn>6</mn><mo>.</mo><mn>94</mn><mo> </mo><mi>g</mi></mrow></mfrac><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0288</mn><mo>«</mo><mi>m</mi><mi>o</mi><mi>l</mi><mo>»</mo></math>✔</p>
<p>«n<sub>LiOH</sub> = n<sub>Li</sub>»</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced open="[" close="]"><mi>LiOH</mi></mfenced><mo> </mo><mo>«</mo><mo>=</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>0288</mn><mo> </mo><mi>m</mi><mi>o</mi><mi>l</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>5000</mn><mo> </mo><mi>d</mi><msup><mi>m</mi><mn>3</mn></msup></mrow></mfrac><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0576</mn><mo> </mo><mo>«</mo><mi>m</mi><mi>o</mi><mi>l</mi><mo> </mo><mi>d</mi><msup><mi>m</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo>»</mo></math> ✔</p>
<p> </p>
<p>Award <strong>[2]</strong> for correct final answer.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msub><mi>n</mi><msub><mi>H</mi><mn>2</mn></msub></msub><mo>=</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>×</mo><mn>0</mn><mo>.</mo><mn>0288</mn><mo> </mo><mi>m</mi><mi>o</mi><mi>l</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>0144</mn><mo> </mo><mi>m</mi><mi>o</mi><mi>l</mi><mo>»</mo></math></p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mi>V</mi><mo>=</mo><mfrac><mrow><mi>n</mi><mi>R</mi><mi>T</mi></mrow><mi>P</mi></mfrac><mo>=</mo><mo>»</mo><mfenced><mfrac><mrow><mn>0</mn><mo>.</mo><mn>0144</mn><mo> </mo><mi>m</mi><mi>o</mi><mi>l</mi><mo>×</mo><mn>8</mn><mo>.</mo><mn>31</mn><mo> </mo><mi>J</mi><msup><mi>K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mi>m</mi><mi>o</mi><msup><mi>l</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>×</mo><mfenced><mrow><mn>22</mn><mo>.</mo><mn>5</mn><mo>+</mo><mn>273</mn></mrow></mfenced><mi>K</mi></mrow><mrow><mn>103</mn><mo> </mo><mi>k</mi><mi>P</mi><mi>a</mi></mrow></mfrac></mfenced><mo> </mo><mo>«</mo><mo>×</mo><msup><mn>10</mn><mn>3</mn></msup><mo>»</mo></math>✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>V</mi><mo>=</mo><mn>343</mn><mo> </mo><mo>«</mo><msup><mi>cm</mi><mn>3</mn></msup><mo>»</mo></math>✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept answers in the range 334 – 344 cm<sup>3</sup>.</em></p>
<p><em>Award <strong>[1 max]</strong> for 0.343 «cm<sup>3</sup>/dm<sup>3</sup>/m<sup>3</sup>».</em></p>
<p><em>Award<strong> [1 max]</strong> for 26.1 cm<sup>3</sup> obtained by using 22.5 K.</em></p>
<p><em>Award<strong> [1 max]</strong> for 687 cm<sup>3</sup> obtained by using 0.0288 mol.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>lithium was impure/«partially» oxidized</p>
<p><em><strong>OR</strong></em></p>
<p>gas leaked/ignited ✔</p>
<p> </p>
<p><em>Accept “gas dissolved”.</em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>H<sub>2</sub>O <em><strong>AND</strong> </em>hydrogen gains electrons «to form H<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>H<sub>2</sub>O <em><strong>AND</strong> </em>H oxidation state changed from +1 to 0 ✔</p>
<p> </p>
<p><em>Accept “H<sub>2</sub>O <strong>AND</strong> H/H<sub>2</sub>O is reduced”.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two:</em></p>
<p>temperature of the water increases ✔</p>
<p>lithium melts ✔</p>
<p>pop sound is heard ✔</p>
<p> </p>
<p><em>Accept “lithium/hydrogen catches fire”.</em></p>
<p><em>Do not accept “smoke is observed”.</em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(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;">
<p>This part-question was better answered than part (ii). 50% of the candidates drew a correct arrow between n=2 and n=3. Both absorption and emission transitions were accepted since the question did not specify which type of spectrum was required. Some teachers commented on this in their feedback. Mistakes often included transitions between higher energy levels.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><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>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Bonds broken:</em> <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>8</mn><mo>(</mo><mi mathvariant="normal">C</mi><mo>–</mo><mi mathvariant="normal">H</mi><mo>)</mo><mo>+</mo><mn>2</mn><mo>(</mo><mi mathvariant="normal">C</mi><mo>–</mo><mi mathvariant="normal">C</mi><mo>)</mo><mo>+</mo><mn>5</mn><mo>(</mo><mi mathvariant="normal">O</mi><mo>=</mo><mi mathvariant="normal">O</mi><mo>)</mo></math> <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>/</mo><mn>8</mn><mo>×</mo><mn>414</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo>+</mo><mn>2</mn><mo>×</mo><mn>346</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo>+</mo><mn>5</mn><mo>×</mo><mn>498</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo>/</mo><mn>6494</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</p>
<p><em>Bonds formed:</em> <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>6</mn><mo>(</mo><mi mathvariant="normal">C</mi><mo>=</mo><mi mathvariant="normal">O</mi><mo>)</mo><mo>+</mo><mn>8</mn><mo>(</mo><mi mathvariant="normal">O</mi><mo>–</mo><mi mathvariant="normal">H</mi><mo>)</mo><mo>/</mo><mn>6</mn><mo>×</mo><mn>804</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo>+</mo><mn>8</mn><mo>×</mo><mn>463</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo>/</mo><mn>8528</mn><mo> </mo><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</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> </p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></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> ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msup><mi>ΔH</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> </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>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was generally well answered. The mean mark on the question was 1.8 out of 3 marks. Mistakes included three C–C (instead of two), missing C–C bonds completely, subtracting bonds formed bonds broken, 3 and 4 instead of 6 and 8 for bonds formed coefficients, and bond enthalpies of C=O and O=O double bonds treated as single bonds.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About half of the candidates obtained both marks. In the incorrect answers coefficients were sometimes ignored, some candidates used the wrong state for water, and some candidates did not realize the heat of formation of O<sub>2</sub> was zero and inserted the bond enthalpy for O<sub>2</sub> in the calculation.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">The following shows some compounds which can be made from ethene, C<sub>2</sub>H<sub>4</sub>.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">ethene (C<sub>2</sub>H<sub>4</sub>) → C<sub>2</sub>H<sub>5</sub>Cl → C<sub>2</sub>H<sub>6</sub>O → C<sub>2</sub>H<sub>4</sub>O</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the type of reaction which converts ethene into C<sub>2</sub>H<sub>5</sub>Cl.</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;">Write an equation for the reaction of C<sub>2</sub>H<sub>5</sub>Cl with aqueous sodium hydroxide to produce a C<sub>2</sub>H<sub>6</sub>O compound, showing structural formulas.</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;">Write an equation for the complete combustion of the organic product in (b).</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 the organic product in (b), 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 and conditions for the conversion of the compound C<sub>2</sub>H<sub>6</sub>O, produced in (b), into C<sub>2</sub>H<sub>4</sub>O.</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;">Explain why the compound C<sub>2</sub>H<sub>6</sub>O, produced in (b), has a higher boiling point than compound C<sub>2</sub>H<sub>4</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;">Ethene 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.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">CH<sub>3</sub>CH<sub>2</sub>Cl (g) + OH<sup>−</sup> (aq) → CH<sub>3</sub>CH<sub>2</sub>OH (aq) + Cl<sup>−</sup> (aq)<br><em><strong>OR</strong></em><br>CH<sub>3</sub>CH<sub>2</sub>Cl (g) + NaOH (aq) → CH<sub>3</sub>CH<sub>2</sub>OH (aq) + NaCl (aq) ✔</span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>6</sub>O (g) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 3H<sub>2</sub>O (g)<br><em><strong>OR</strong></em><br>CH<sub>3</sub>CH<sub>2</sub>OH (g) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 3H<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>5(C–H) + C–C + C–O + O–H + 3(O=O)<br><em><strong>OR</strong></em><br>5(414«kJ mol<sup>−1</sup>») + 346«kJ mol<sup>−1</sup>» + 358«kJ mol<sup>−1</sup>» + 463«kJ mol<sup>−1</sup>» + 3(498«kJ mol<sup>−1</sup>») / 4731 «kJ» ✔</span></p>
<p><span style="background-color: #ffffff;"><br><em>bonds formed:</em><br>4(C=O) + 6(O–H)<br><em><strong>OR</strong></em><br>4(804«kJ mol<sup>−1</sup>») + 6(463«kJ mol<sup>−1</sup>») / 5994 «kJ» ✔<br>«<em>ΔH</em> = bonds broken − bonds formed = 4731 − 5994 =» −1263 «kJ mol<sup>−1</sup>» ✔</span></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">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>» KMnO<sub>4</sub> / «H<sup>+</sup>» MnO<sub>4</sub><sup>−</sup> ✔<br></span></p>
<p><span style="background-color: #ffffff;"><em>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)”.</em><br></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">distil ✔</span></p>
<p> </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>2</sub>H<sub>6</sub>O/ethanol: hydrogen-bonding <em><strong>AND</strong> </em>C<sub>2</sub>H<sub>4</sub>O/ethanal: no hydrogen-bonding/«only» dipole–dipole 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><img src="data:image/png;base64,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" width="238" height="139"></p>
<p><em>NOTE: <em><span style="background-color: #ffffff;">Continuation bonds must be shown.<br>Ignore square brackets and “n”.</span></em></em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(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">e.</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>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;" src="data:image/png;base64,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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 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(ii).</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(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" 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>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>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><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(ii).</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(iii).</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>
<br><hr><br><div class="specification">
<p>1-chloropentane reacts with aqueous sodium hydroxide.</p>
</div>
<div class="specification">
<p>The reaction was repeated at a lower temperature.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the type of reaction.</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>Outline the role of the hydroxide ion in this reaction.</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>Suggest, with a reason, why 1-iodopentane reacts faster than 1-chloropentane under the same conditions. Use section 11 of the data booklet for consistency.</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>Sketch labelled Maxwell–Boltzmann energy distribution curves at the original temperature (T<sub>1</sub>) and the new lower temperature (T<sub>2</sub>).</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="449" height="297"></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>Explain the effect of lowering the temperature on the rate of the reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«nucleophilic» substitution/S<sub>N</sub>2 ✔</p>
<p><em><br>Do not accept if “electrophilic” or “free radical” substitution is stated.</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«acts as a» nucleophile/Lewis base<br><em><strong>OR</strong></em><br>donates/provides lone pair «of electrons»<br><em><strong>OR</strong></em><br>attacks the «partially» positive carbon ✔</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bond enthalpy C–I lower than C–Cl<br><em><strong>OR</strong></em><br>C–I bond weaker than C–Cl ✔</p>
<p><br>«weaker bond» broken more easily/with less energy<br><em><strong>OR</strong></em><br>lower Ea «for weaker bonds» ✔</p>
<p><em><br>Accept the bond enthalpy values for C–I and C–Cl for <strong>M1</strong>.</em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="437" height="284"></p>
<p>peak at T<sub>1</sub> to right of <em><strong>AND</strong> </em>lower than T<sub>2</sub> ✔</p>
<p>lines begin at origin <em><strong>AND</strong> </em>T<sub>1</sub> must finish above T<sub>2</sub> ✔</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«rate is» lower <em><strong>AND</strong> </em>«average» kinetic energy of molecules is lower<br><em><strong>OR</strong></em><br>«rate is» lower <em><strong>AND</strong> </em>less frequent collisions<br><em><strong>OR</strong></em><br>«rate is» lower <em><strong>AND</strong> </em>fewer collisions per unit time ✔</p>
<p>«rate is» lower <em><strong>AND</strong> </em>fewer/smaller fraction of molecules/collisions have the E ≥ <em>E</em><sub>a</sub> ✔</p>
<p><em><br></em><em>Lower «rate» needs to be mentioned once only.</em></p>
<p><em>Do <strong>not</strong> accept “fewer collisions” without reference to time/frequency/probability for <strong>M1</strong>.</em></p>
<div class="question_part_label">b(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(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</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>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> 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">b.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>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">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, giving two reasons, the difference in the values for (b)(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">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One possible Lewis structure for benzene is shown.</p>
<p> <img src="images/Schermafbeelding_2018-08-09_om_15.01.32.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/03.c"></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">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the characteristic reaction mechanism of benzene.</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, </em><em>I</em><em>r, </em><em>Rh, Co, Ti.</em></p>
<p><em>Accept “high temperature” or a stated </em><em>temperature such as “150 °</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_2018-08-09_om_14.47.44.png" alt="M18/4/CHEMI/SP2/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 </em><em>must 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>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=C)<sub>benzene</sub>/3 × 839 – 6 × 507 / 2517 – 3042 =<strong>»</strong></p>
<p>–525 <strong>«</strong>kJ<strong>»</strong></p>
<p> </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></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for:</em></p>
<p><strong><em>«</em></strong>Δ<em>H</em><sup>ϴ</sup><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 ×</em><em> </em><em>839 –</em><em> </em><em>3 ×</em><em> </em><em>346 –</em><em> </em><em>3 ×</em><em> </em><em>614 / 2517 </em><em>– </em><em>2880 =</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">b.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 × 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">b.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">b.iii.</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<strong>» </strong>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–C bond angles are </em><em>equal”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrophilic substitution</p>
<p><strong><em>OR</em></strong></p>
<p>S<sub>E</sub></p>
<p><em><strong>[1 mark]</strong></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.</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>Alkanes undergo combustion and substitution.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the molar enthalpy of combustion of an alkane if 8.75 × 10<sup>−4</sup> moles are burned, raising the temperature of 20.0 g of water by 57.3 °C.</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>Formulate equations for the two propagation steps and one termination step in the formation of chloroethane from ethane.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«<em>q</em> = <em>mc</em>Δ<em>T</em> = 20.0 g × 4.18 J g<sup>−1 </sup>°C<sup>−1</sup> × 57.3 °C =» 4790 «J» ✔</p>
<p>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msub><mi>H</mi><mtext>c</mtext></msub><mfrac><mrow><mn>4790</mn><mo> </mo><mi mathvariant="normal">J</mi></mrow><mstyle displaystyle="true"><mfrac><mn>1000</mn><mrow><mn>8</mn><mo>.</mo><mn>75</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn></mrow></msup><mo> </mo><mi>mol</mi></mrow></mfrac></mstyle></mfrac><mo>=</mo></math>» –5470 «kJ mol<sup>–1</sup>» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer. </em></p>
<p><em>Accept answers in the range –5470 to –5480 «kJ mol<sup>−1</sup>». </em></p>
<p><em>Accept correct answer in any units, e.g. –5.47 «MJ mol<sup>−1</sup>» or 5.47 x 10<sup>6 </sup>«J mol<sup>−1</sup>».</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Cl<strong>·</strong> + C<sub>2</sub>H<sub>6</sub> → <strong>·</strong>C<sub>2</sub>H<sub>5</sub> + HCl ✔</p>
<p><strong>·</strong>C<sub>2</sub>H<sub>5</sub> + Cl<sub>2</sub> → Cl<strong>·</strong> + C<sub>2</sub>H<sub>5</sub>Cl ✔</p>
<p><br><strong>·</strong>C<sub>2</sub>H<sub>5</sub> + Cl<strong>·</strong> → C<sub>2</sub>H<sub>5</sub>Cl<br><em><strong>OR</strong></em><br>Cl<strong>·</strong> + Cl<strong>·</strong> → Cl<sub>2</sub><br><em><strong>OR</strong></em><br><strong>·</strong>C<sub>2</sub>H<sub>5</sub> + <strong>·</strong>C<sub>2</sub>H<sub>5</sub> → C<sub>4</sub>H<sub>10</sub> ✔</p>
<p><em><br>Do not penalize incorrectly placed radical sign, eg </em>C<sub>2</sub>H<sub>5</sub><em><strong>·</strong>.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The Bombardier beetle sprays a mixture of hydroquinone and hydrogen peroxide to fight off predators. The reaction equation to produce the spray can be written as:</p>
<table style="width: 388.667px; margin-left: 120px;">
<tbody>
<tr>
<td style="width: 211px;">C<sub>6</sub>H<sub>4</sub>(OH)<sub>2</sub>(aq) + H<sub>2</sub>O<sub>2</sub>(aq)</td>
<td style="width: 18px;">→</td>
<td style="width: 195.667px;">C<sub>6</sub>H<sub>4</sub>O<sub>2</sub>(aq) + 2H<sub>2</sub>O(l)</td>
</tr>
<tr>
<td style="width: 211px;">hydroquinone</td>
<td style="width: 18px;"> </td>
<td style="width: 195.667px;">quinone</td>
</tr>
</tbody>
</table>
<p style="text-align: center; padding-left: 120px;"><br> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the enthalpy change, in kJ, for the spray reaction, using the data below.</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\begin{array}{*{20}{l}} {{{\text{C}}_{\text{6}}}{{\text{H}}_{\text{4}}}{{{\text{(OH)}}}_{\text{2}}}{\text{(aq)}} \to {{\text{C}}_{\text{6}}}{{\text{H}}_{\text{4}}}{{\text{O}}_{\text{2}}}{\text{(aq)}} + {{\text{H}}_{\text{2}}}{\text{(g)}}}&{\Delta {H^\theta } = + {\text{177.0 kJ}}} \\ {{\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} + {{\text{O}}_{\text{2}}}{\text{(g)}} \to {\text{2}}{{\text{H}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(aq)}}}&{\Delta {H^\theta } = + {\text{189.2 kJ}}} \\ {{{\text{H}}_{\text{2}}}{\text{O(l)}} \to {{\text{H}}_{\text{2}}}{\text{(g)}} + \frac{{\text{1}}}{{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(g)}}}&{\Delta {H^\theta } = + {\text{285.5 kJ}}} \end{array}">
<mtable columnalign="left" rowspacing="4pt" columnspacing="1em">
<mtr>
<mtd>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<mtext>6</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>4</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mrow>
<mtext>(OH)</mtext>
</mrow>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(aq)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<msub>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<mtext>6</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>4</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(aq)</mtext>
</mrow>
<mo>+</mo>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mrow>
<msup>
<mi>H</mi>
<mi>θ</mi>
</msup>
</mrow>
<mo>=</mo>
<mo>+</mo>
<mrow>
<mtext>177.0 kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>2</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>O(l)</mtext>
</mrow>
<mo>+</mo>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<mtext>2</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(aq)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mrow>
<msup>
<mi>H</mi>
<mi>θ</mi>
</msup>
</mrow>
<mo>=</mo>
<mo>+</mo>
<mrow>
<mtext>189.2 kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>O(l)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo>+</mo>
<mfrac>
<mrow>
<mtext>1</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</mfrac>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mrow>
<msup>
<mi>H</mi>
<mi>θ</mi>
</msup>
</mrow>
<mo>=</mo>
<mo>+</mo>
<mrow>
<mtext>285.5 kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
</mtable>
</math></span></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 energy released by the reaction of one mole of hydrogen peroxide with hydroquinone is used to heat 850 cm<sup>3</sup> of water initially at 21.8°C. Determine the highest temperature reached by the water.</p>
<p>Specific heat capacity of water = 4.18 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>kg<sup>−1</sup><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>K<sup>−1</sup>.</p>
<p>(If you did not obtain an answer to part (i), use a value of 200.0 kJ for the energy released, although this is not the correct answer.)</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>Identify the species responsible for the peak at <em>m/z</em> = 110 in the mass spectrum of hydroquinone.</p>
<p><img 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"></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>Identify the highest <em>m/z</em> value in the mass spectrum of quinone.</p>
<p><img 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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em> = 177.0 – <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{189.2}}{2}">
<mfrac>
<mrow>
<mn>189.2</mn>
</mrow>
<mn>2</mn>
</mfrac>
</math></span> –285.5 «kJ»</p>
<p>«Δ<em>H</em> =» –203.1 «kJ»</p>
<p> </p>
<p><em>Accept other methods for correct manipulation of the three equations.</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</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>203.1 «kJ» = 0.850 «kg» x 4.18 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>kg<sup>–1<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span></sup>K<sup>–1</sup>» x Δ<em>T</em> «K»<br><em><strong>OR</strong></em><br>«Δ<em>T</em> =» 57.2 «K»<br>«<em>T<sub>final</sub></em> = (57.2 + 21.8) °C =» 79.0 «°C» / 352.0 «K»</p>
<p><br><em>If 200.0 kJ was used:</em><br>200.0 «kJ» = 0.850 «kg» x 4.18 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>kg<sup>–1</sup><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>K<sup>–1</sup>» x Δ<em>T</em> «K»<br><em><strong>OR</strong></em><br>«Δ<em>T</em> =» 56.3 «K»<br>«<em>T<sub>final</sub></em> = (56.3 + 21.8) °C =» 78.1 «°C» / 351.1 «K»</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Units, if specified, must be consistent with the value stated.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C<sub>6</sub>H<sub>4</sub>(OH)<sub>2</sub><sup>+</sup></p>
<p> </p>
<p><em>Accept “molecular ion”.</em></p>
<p><em>Do <strong>not</strong> accept “C<sub>6</sub>H<sub>4</sub>(OH)<sub>2</sub>” (positive charge missing).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«highest <em>m/z</em>» 108</p>
<p> </p>
<p><em>Only accept exactly 108, not values close to this.</em></p>
<p><strong><em>[1 mark]</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">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>Ammonia, NH<sub>3</sub>, is industrially important for the manufacture of fertilizers, explosives and plastics.</p>
</div>
<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>
</div>
<div class="specification">
<p>The effect of temperature on the position of equilibrium depends on the enthalpy change of the reaction.</p>
</div>
<div class="specification">
<p>Ammonia is soluble in water and forms an alkaline solution:</p>
<p style="text-align: center;">NH<sub>3 </sub>(g) + H<sub>2</sub>O (l) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> NH<sub>4</sub><sup>+ </sup>(aq) + HO<sup>– </sup>(aq)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw arrows in the boxes to represent the electron configuration of a nitrogen atom.</p>
<p style="text-align:left;"><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the Lewis (electron dot) structure of the ammonia molecule.</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>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">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why an increase in pressure shifts the position of equilibrium towards the products and how this affects the value of the equilibrium constant, <em>K</em><sub>c</sub>.</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>State how the use of a catalyst affects the position of the equilibrium.</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>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">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the enthalpy change, Δ<em>H</em><sup>⦵</sup>, for the Haber–Bosch process, in kJ, using the following data.</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msubsup><mi>H</mi><mrow><mo> </mo><mi mathvariant="normal">f</mi></mrow><mo>⦵</mo></msubsup><mfenced><msub><mi>NH</mi><mn>3</mn></msub></mfenced><mo>=</mo><mo>-</mo><mn>46</mn><mo>.</mo><mn>2</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math>.</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>Suggest why the values obtained in (d)(i) and (d)(ii) differ.</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 the relationship between NH<sub>4</sub><sup>+</sup> and NH<sub>3</sub> in terms of the Brønsted–Lowry theory.</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>Determine the concentration, in mol dm<sup>–3</sup>, of the solution formed when 900.0 dm<sup>3</sup> of NH<sub>3 </sub>(g) at 300.0 K and 100.0 kPa, is dissolved in water to form 2.00 dm<sup>3</sup> of solution. Use sections 1 and 2 of the data booklet.</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>Calculate the concentration of hydroxide ions in an ammonia solution with pH = 9.3. Use sections 1 and 2 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="444" height="226"></p>
<p> </p>
<p><em>Accept <strong>all</strong> 2p electrons pointing downwards.</em></p>
<p><em>Accept half arrows instead of full arrows.</em></p>
<div class="question_part_label">a.</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 lines or dots or crosses for electrons, or a mixture of these</em></p>
<p> </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><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">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>shifts to the side with fewer moles «of gas»<br><em><strong>OR</strong></em><br>shifts to right as there is a reduction in volume✔</p>
<p>«value of » <em>K</em><sub>c</sub> unchanged ✔</p>
<p> </p>
<p><em>Accept “K<sub>c</sub> only affected by changes in temperature”.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>same/unaffected/unchanged ✔</p>
<div class="question_part_label">c(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">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>–92.4 «kJ» ✔</p>
<div class="question_part_label">d(ii).</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><em><br>Accept it relies on average values not specific to NH<sub>3</sub></em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration:underline;">conjugate</span> «acid and base» ✔</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>amount of ammonia <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>⟨</mo><mo>⟨</mo><mo>=</mo><mfrac><mrow><mi>P</mi><mo>.</mo><mi>V</mi></mrow><mrow><mi>R</mi><mo>.</mo><mi>T</mi></mrow></mfrac><mo>=</mo><mfrac><mrow><mn>100</mn><mo>.</mo><mn>0</mn><mo> </mo><mi>k</mi><mi>P</mi><mi>a</mi><mo>×</mo><mn>900</mn><mo>.</mo><mn>0</mn><mo> </mo><mi>d</mi><msup><mi>m</mi><mn>3</mn></msup></mrow><mrow><mn>8</mn><mo>.</mo><mn>31</mn><mo> </mo><mi>J</mi><mo> </mo><msup><mi>K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mi>m</mi><mi>o</mi><msup><mi>l</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>×</mo><mn>300</mn><mo>.</mo><mn>0</mn><mo> </mo><mi>K</mi></mrow></mfrac><mo>⟩</mo><mo>⟩</mo><mo> </mo><mo>=</mo><mo> </mo><mn>36</mn><mo>.</mo><mn>1</mn><mo> </mo><mo>«</mo><mi>mol</mi><mo>»</mo></math> ✔</p>
<p>concentration <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>⟨</mo><mo>⟨</mo><mo>=</mo><mfrac><mi>n</mi><mi>V</mi></mfrac><mo>=</mo><mfrac><mrow><mn>36</mn><mo>.</mo><mn>1</mn></mrow><mrow><mn>2</mn><mo>.</mo><mn>00</mn></mrow></mfrac><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>18</mn><mo>.</mo><mn>1</mn><mo> </mo><mo>«</mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo>»</mo></math> ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>[OH<sup>−</sup>] <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>⟨</mo><mo>⟨</mo><mo>=</mo><mfrac><msub><mi mathvariant="normal">K</mi><mi mathvariant="normal">W</mi></msub><mfenced open="[" close="]"><msup><mi mathvariant="normal">H</mi><mo>+</mo></msup></mfenced></mfrac><mo>=</mo><mfrac><msup><mn>10</mn><mrow><mo>-</mo><mn>14</mn></mrow></msup><msup><mn>10</mn><mrow><mo>-</mo><mn>9</mn><mo>.</mo><mn>3</mn></mrow></msup></mfrac><mo>=</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>7</mn></mrow></msup><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>2</mn><mo>.</mo><mn>0</mn><mo> </mo><mo>×</mo><mo> </mo><msup><mn>10</mn><mrow><mo>-</mo><mn>5</mn></mrow></msup><mo> </mo><mo>⟨</mo><mo>⟨</mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo>⟩</mo><mo>⟩</mo></math> ✔</p>
<div class="question_part_label">e(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most students realised that the three p-orbitals were all singly filled.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Even more candidates could draw the correct Lewis structure of ammonia, with omission of the lone pair being the most common error.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students could deduce the equilibrium constant expression from the equilibrium equation.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students realised that increasing pressure shifts an equilibrium to the side with the most moles of gas (though the "of gas" was frequently omitted!) but probably less than half realised that, even though the equilibrium position changes, the value of the equilibrium constant remains constant.</p>
<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;">
<p>It was pleasing to see that about a third of students gaining full marks and an equal number only lost a single mark because they failed to locate the correct bond enthalpy for molecular nitrogen.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very few students could determine the enthalpy change from enthalpy of formation data, with many being baffled by the absence of values for the elemental reactants and more than half who overcame this obstacle failed to note that 2 moles of ammonia are produced.</p>
<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;">
<p>About half the candidates recognised the species as a conjugate acid-base pair, though some lost the mark by confusing the acid and base, even though this information was not asked for.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About 40% of candidates gained full marks for the calculation and a significant number of others gained the second mark to calculate the concentration as an ECF.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was very poorly answered with many candidates calculating the [H<sup>+</sup>] instead of [OH<sup>-</sup>].</p>
<div class="question_part_label">e(iii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about compounds of sodium.</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;">Describe the structure and bonding in solid sodium oxide.</span></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><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;">Sodium oxide, Na<sub>2</sub>O:<br><br>Phosphorus(V) oxide, P<sub>4</sub>O<sub>10</sub>:<br><br>Differentiation:</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><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><span style="background-color: #ffffff;">Calculate the percentage yield of sodium peroxide if 5.00 g of sodium oxide produces 5.50 g of sodium peroxide.</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 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><span style="background-color: #ffffff;"><img style="margin-right:auto;margin-left:auto;display: block;" src="data:image/png;base64,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" width="219" height="96"></span></p>
<div class="marks">[3]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why bond enthalpy values are not valid in calculations such as that in (c)(i).</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;">The reaction of sodium peroxide with excess water produces hydrogen peroxide and one other sodium compound. </span><span style="background-color: #ffffff;">Suggest the formula of this compound.</span></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><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">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<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><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><em><span style="background-color: #ffffff;"><strong> Note:</strong> Do <strong>not</strong> accept “ionic” without description.</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;"><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) <strong>[✔]</strong></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 <strong>[✔]</strong></span></p>
<div class="question_part_label">a(ii).</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{ mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5.00</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>61.98</mn>
<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>» = 0.0807/8.07 × 10<sup>−2</sup> «mol»<br><em><strong>OR</strong></em><br>mass 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{ mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5.00</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>61.98</mn>
<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> </span>× 77.98 gmol<sup>−1</sup>» = 6.291 «g» <strong>[✔]</strong></span></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> x 100» = 87.4 «%» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ΣΔ<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;"><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;">Σ</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;">Δ</span><em>H<sub>f</sub></em> reactants = 2 × (−510.9) + 2 × (−393.5) / −1808.8 «kJ» <strong>[✔]</strong></span></p>
<p>Δ<span style="background-color: #ffffff;"><em>H</em> = «<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;">Σ</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;">Δ</span><em>H<sub>f</sub></em> products − <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;">Σ</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;">Δ</span><em>H<sub>f</sub></em> reactants = −2261.4 −(−1808.8) =» −452.6 «kJ» <strong>[✔]</strong></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">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">only valid for covalent bonds<br><em><strong>OR</strong></em><br>only valid in gaseous state <strong>[✔]</strong></span></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">NaOH <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept correct equation showing NaOH as a product.</span></em></p>
<div class="question_part_label">d.</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">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Disappointingly many students did not realise that sodium oxide was held by ionic bonds, many said it was covalent or metallic bonding. The ones that knew it was ionic failed to describe it adequately to earn the 2 marks.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very few students could correctly write out the two equations and so often were unable to realise it was acid/base behaviour that would differentiate the oxides.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates were able to correctly calculate the % yield but some weaker candidates just used 5.0/5.5 to find %.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The calculation of the enthalpy change using enthalpies of formation was generally answered well but common mistakes were students forgetting to multiply by 2 or adding extra terms for oxygen.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students didn’t gain a mark and “values are average” was the most common incorrect answer. The fact this was an ionic compound did not register with them. Some students did gain a mark for stating that the substances were not in a gaseous state.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some students correctly identified sodium hydroxide as the correct product, but hydrogen, oxygen and sodium oxide were common answers.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Oxidation number of +4 was often correctly identified.</p>
<div class="question_part_label">e.</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;">An electrolysis cell was assembled using graphite electrodes and connected 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>
</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;">Electrolyte:</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>
<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 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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><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><span style="background-color: #ffffff;">«water : copper(II) chloride = 1.95 : 1»<br>«<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» ✔</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 xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}"> <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>
<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>
<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>But-2-ene reacts with hydrogen bromide.</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>one</strong> difference between the bonding of carbon atoms in C<sub>60</sub> and diamond.</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 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,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"></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 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>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">e(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">e(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>C<sub>60</sub> fullerene: «each carbon is» bonded to 3 C <em><strong>AND</strong> </em>diamond: bonded to 4 C<br><em><strong>OR</strong></em><br>C<sub>60</sub> fullerene: delocalized/resonance <em><strong>AND</strong> </em>diamond: not delocalized/no resonance<br><em><strong>OR</strong></em><br>C<sub>60</sub> fullerene: single and double bonds <em><strong>AND</strong> </em>diamond: single bonds ✔</p>
<p> </p>
<p><em>Accept “C<sub>60</sub> fullerene: sp<sup>2</sup> <strong>AND</strong> diamond: sp<sup>3</sup>”.</em></p>
<p><em>Accept “C<sub>60</sub> fullerene: trigonal planar geometry / bond angles between 109.5°/109°/108°–120° <strong>AND</strong> diamond: tetrahedral geometry / bond angle 109.5°/109°”.</em></p>
<p><em>Accept "bonds in fullerene are shorter/stronger/have higher bond order".</em></p>
<div class="question_part_label">a(i).</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> </p>
<p><em>Do <strong>not</strong> accept “clear” for M2.</em></p>
<p> </p>
<p><strong>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> </p>
<p><em>Accept “colour change” for M2.</em></p>
<p> </p>
<p><strong>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 ✔</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> (g) + HBr (g) → CH<sub>3</sub>CH<sub>2</sub>CHBrCH<sub>3</sub> (l)</p>
<p><em><strong>OR</strong></em></p>
<p>C<sub>4</sub>H<sub>8</sub> (g) + HBr (g) → C<sub>4</sub>H<sub>9</sub>Br (l) ✔</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«electrophilic» addition/E<sub>A</sub> ✔</p>
<p><em><br>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><strong>ALTERNATIVE 2:</strong></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>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><br>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><br>«ΔH = bond breaking – bond forming = 656 kJ – 755 kJ» = –99 «kJ» ✔</p>
<p><em><br>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">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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Shb04si5q0PBZx0H4w2L14P+cGWDGb0bZpnGHPD7I488si6GR9/6qmnlvvvv78aXWjTFx0Io9vOsLqypgOe6IEx++6jEqJCkUZ+6EkjnyQ9DiVL0VPc888/f1WsaeS7l1tvvbU8/vjjNQTemo/N70svvXRti2fgDznkkIHtsMMOK3vuuWcdVmccu3NWXHHF+nm66aar57a7g5wyx5vXo98MeK4fTQvJ0JJGPkl6HArVvPX2prSlWNutxJOhQ17ZGErerw5sOrMx4hMykipzjrWuO++Zx7/aaqvV9ntt81aJY+C1lQv3WwPeojYm0zGPQlyjnXgez2IYnXH7DLzoQTL0pJFPkh6GcoU2+Zlnnrn2xpaWHlT3EHkl3x555JHaq37ttdeuRjrytxXn2MJYx/cmvpsJz1S4PHiGV9u89MGuO6V4DuXPLHj6Bxifj9ZnStpPGvkk6WFCiepprT1eZydpQ6HIk6Eh8pA3b4paFTVGXtv21BjJKAexDTUqEhtuuGFdDtfQvYwmdYY08knSw1DejLnJUAyhCijYTij2pD3IQ00uvGCT3/CKuyX/PGc0N2hiMIzTCnhp5DtDGvkk6WHC29Mj2/C5UKxCs+nJdwfySbib9ysvtafLR3nYDYbSM3tW26hRo2onvzvvvLMO2UtDP/SkkU+SHoZiBS/QYiTWGg/Fmka+O2AkNbPoVf/Od76zzDHHHON++b+27m5CebQwjjHzf/zjH7vu+buRfMNJ0uMwEmPHjh1YnIZiZehTwXYHKmM2vdL1jtcmL++6sZKm3Bnbryz+4Q9/yIpmB0gpT5IehhJl2HW8szhNGHdpSXcgDy00Y4SE3unyUP51o4H03EYFaHIwEc+LL7447pdkqEgjnyQ9DKVquJLJcHS8C+89jfzIhfFubhDannvuuev4eCFv+deNlbV4XiF7Y+YtiqPSElvSftLIJ0kPw0jofMdjYiCS7kOnSQvI6Jne7U0syiNDv+SSS9aohEVrpPlfaeSHhjTySdLDUKiPPfbYeJ21kpFPGDwG0PBHq8WZFrbbPPdWwqDb60Son4H/5P92ewVmpJJvNUl6HPOczzbbbF1vIPqFZj6Jwtx99911ulmLzTCO3UwYcv9Du7xmJFP1MvLd/t9GKmnkk6THseSo8clp5LsHecXo6U9xww031HXgGfpu93YjQqFfQfQvMP7f/0pPfmjIt5okPQxD8cADD9T5yZPuoOnRamqxJOz6669f55XvdiI0DwvUGE5nbXv/2VwASftJI58kPY723DTy3QNDaOPF63BnEqMFFligJyIxzbC8/7PCCiuU22+/vXYujImbkvYyqJFv1iabn5Mk6R4oUm3ywvWdgr6IjVKPLb4nE6epb2+77bba4U7HSena6LsZhjyGANrrZ2D8vw54ydAwqJGXCSGUzUKXJEl3IeTLk++kHIf+sG+GYbPd9fXxzuhdlTMzFWqPtySs99lr3i4jrwJqLvtkaBhU4qLGrcAlSdK9MBazzDJLx2Q5DHx8jrZkaZ2saHQz3hMvXqVo/vnnr/rY517TxzPNNFNtitDvQC/7pP0MauQtIHDLLbfUhS3S0CdJd2JWsRdeeKEOoeuUgW0aeEOktLnySH3PcP2k4R16b2YpNB2x753Kv05jkp9HHnmkbkn7meY/Bec1JYcgPvjgg+Ub3/hGef7558uyyy5bxzTazzrrrHXx/6hVOt3xF1xwQV10wHSFkC5Mp5LQb70m/V/hNd6TVb+8C5WmWPbTAhMRfqOAX3311XqedD1OoVYb8zobOmO+Z1DaMa7UsWrCrukalm70WXrkkWdxb3vfPRPc+5lnnqnXlua735PeQkWdTP7+978vK6200rjUoSUMubKoZ/8xxxxTh/HpZLX88svXPT0y/fTTD+iQKMOXXHJJ/W3NNdes15EeeqTb26MnB+3UBx10UFlvvfXK1ltvXaMh3of34H3ZrCkv3Tsi+y+99FL9TlfQAY6XZnOMNDpGuvNDJ8kH+gI6+9FJwucnnXRSfQaVDHlD9ziXnnBve989K30WC+dMjh7xHCJNe+21V9lqq63KJptsUp81aH7udbzLwP9u13+foJGXZFNwhFGuvfbacvHFF9fMWGKJJcoOO+xQPvjBD1YD4UEUAL+HkVdwFDbHH3rooXVxjCa9nHHazBhhgrHLLruUpZZaqgrBd77znfou9ZRVmClcQnbWWWfVISTe184771xXmYpetT/72c+qgttggw3K5ptvXq9/4YUX1nftncuDD33oQ1XA7rnnnvKDH/ygPPXUU2WRRRYpe+65Z53rmgd11FFHVSUr73bbbbcy++yzD1Ti3G+bbbap1+gngeoXzj777Fp29LAXFu0EYQiUXWVKZVXZv/zyy8uVV15Zy6J25u23374aMUaGvnnllVfKpZdeOmDkpbkW/XH44YfXRVr6Ae+O7iXLhpgdcsghZeGFF6565Igjjqh9LIwxp0foW0b8hz/8YV3VzbukR1ZZZZX67rzPM888s173Ix/5SNl4442rrhEl+N73vld1Ff3CuNIBFo059dRTq5Gn348++uiy4IIL1ogMHTZ69Oj6TPKObhszZkw9RsRh1113rfrP9ScVzyifv/71r9fvX/rSlwYqHJicCkO30zEj72tcnNApUNdff305//zzaxvRvPPOW3/fbLPNamFSO3RO05Nvnq9Q2PcDkTEMsNo04bD3nVFVQyYAlK3OJow5hUd4QXgirEqoVJJkvE5TsUwohffEE0/UipR0lQnpIi7y6pe//GVdd/qwww6rgkcBuLc9BfCOd7yjRhfkiR6tvHjXIEyRb0nvQAHvs88+1QPkaXUCZVZ5UkbtfVfJuOmmm6oeEV1Q5vyukqoyrGy2GnnnhTz1mx5hLL07e7IvYuc9kFmGmR6hX3jU8H7pBscvvvjiVe+EPHvP0ukV+/ge0T3HRZ45Jt572ILYpDvP3m821/jFL35RrrnmmrLvvvvW/gNx3qTiGuecc04tGxwP+jGeZ3Ku0+34z0G883YwnpGPjy6uwJx++unVa1RgzDO87rrrlmWWWaYakuOOO66cdtpptaA5vjVcLy0yqknjdj1NFHRb8z/7jvg9PrcSaXGMvfcZ3wPHhXBC3vD2v/rVr1ZF2ry2c5v3bD239dpJ97P33nuX73//+wNNOZ3I4yinypUmoTPOOKN68dLpD16jyqYmBB6c3y1Wwog1w/WUfxinfsT/jvfYlNNWQs9G3sb7b+b1hHRHEPdxTBh/310zrh3nx7PEd47KT3/60/Lb3/62HHjggWWuueYauN6kEBUNlZf99tuvltdoVnKNSb1OL+CdBu387xOMhXjxPEnTDW677bbVoP/P//xPWW211WrNcZ111imf/exnqzcaNbsm8XAyr5V4+F7f/Hf71v8ctH5u3Zwf17Ch+T22eMfxPRRBCFpcJ84NJnRu0nuI7kT0rVM0yxVnQURKSPjEE0+sbbwrrrhibbZaY401yhe/+MXafDQhWstnv20hs6/3Huhg+yDOaxJpE9riN9eBfdyzuY9j4TMi3cZuTCmikqKYd9xxR63sxTWTqef/cqwFL1dNWy1bu+7JJ59c23vVttTcZMgWW2wxMMFGZHySJCMLTTsibJ0kKpj29Ih2Vv1EtBsff/zxdcEVekTzwZZbblmNfHiGSX8R5US0WD8NTTn6cEizJVPPoNbZNIO8d6E0AqjNRw9InTLUtFIok2TkIxqn01ZrtG0oCQVNP+gLoLPYKaecUp0Bw6SEdb/73e9WQx9K3m+p1PsP+W+T/6uvvnrtXNkvHSw7xXhGPoQTOlJ42Ya/MPbf/OY3616bb3TwQArmyCLysJmXSf8gzxl0m45qQuXRq75TlfIw3J7ByBE96xl6/UTstbtKp18cF5HALK/9C3uinOqPcfPNN9ey0Kny2uu8xpOPmpWQvB6dPHo1bgpD5x0her2zo90kSZKRR3jN0AGz04Th1twnFGv0B8VNj+gdrm+PkTnQlqtCEOck/UVUCpUJzTqG9/XLSIpOMEGp8tIpBjXwT3/609Wb1z6/xx571OFYQm96cMdkLVkDT5KRA2PJcPKUGU/zg0vrlJyG0rbXVCDyp6Ouse4HHHBA/XzffffVpj89syl0x3rWpD9RXozLN/b+ySefrE5k0h4maOS9cOETvel1jjHJgrY9w18I7Y033lg7z0Rti4AmSTL8kF0bo65nPYbDk/cMoEf0pjcfg3k2GHfDcY3lNuzKJE7RNp+efP8R5VX+23jynEeju5L2MN44ebV/IT4TtBA4AmpziFq2zyatMOGBWpewvYxxHs++dTKcpPOYmOKiiy4q+++/f23jyrzoL5pKUwe3mJqavKIT5YE+4I2J+tEj7hl6xGe/C82aY8OkLjbHCeO3zniX5XdkIm8gL82op8Kmz5ao0dTkG+Mu2mMmxI022qiv8r8ZyfK/2/XfxzPyPPMf//jHdTpVuEncmBCqcZvD/mtf+9p4s2c5ZkIz3iWdJ418f0OcKV4V8B133LF2oNXshk55yu4vDP+jH/2ofg8DL90zCMWaw14ToH4/fgv9YvKtNPIjnzAb7TbyrscG6f+lWaef6IiR91Gt3wsGwaMs4AF8txnXGoJr81t68iODNPL9DVmU55QlT0jok6EH2e0EdIJ1GaKznY23HmXRc/gceiQw9fKvfvWrNPJdgLxBu4288mvdDptIVNiffmCojPx4Ui9zhNG04THY5lqPaVLPPffcupgKA2I1osjIENgkSYafUL72JsKhdIP4bahxH5E+M+3RIzx3kT6bSiijICwfHXcpN+d0qhKSjFyUA1Pjml9BRdH32JIpYzypitqDTUe7L3/5y7VnvVWQzFPPO/zjH/9Ya99p2JNk5EEuKUQyGquVhfHslKJs6gYVDR6eFcwOPvjgGsLnoV1xxRUDXnzonCRRJlQOwchHBTCZciZYdfZijVXkyRNI7fCGv5hnWi9ZqxglSTLyCGMp2sYb4smTZ1snDWncyyI0mv84CCuvvHLdmxRHqD6Vd9KKciqabFNJzejO1POaN+glw8vlBeggo11Ez1frjltvmPJIkmRkwsA+8MADdW/Iq/1wKEtGnD4xsRYDb71yToLVLM3El9OXJq1o42dvNPNY4pzdifRkyhhP8ikD4RIKYbnllqs1cGE1i0wI2xuOo3NMzFSVJMnIIrxjRt5n447hcyc9Z/eiTxj3v/71r3UJWRWOb33rW+Wwww6ruoW3liRNognHPAp33XVXNfJhlzpZfnuJQav3Ot9ZPYqB33nnnetEOAy8eafnmGOOcUclSTKSoBBhvgtKcWp7O08JcT+b9lVD5d7+9reXPffcsyyxxBK1ue8LX/jCoEvMJv0LB1P5MReLjpkqiEEa+SljUCPvZZtiUG17zJgxZf311y+f+MQnBpaFTJJk5EER2kxGY+KqMKRhdDuJECs9IprAMTC73YYbblg+/vGPD/QVSJImyq5yYRilsmN582YTcjL5DPrWtLt/73vfK5///Odr71g9Y/WyP/HEE6tHnyTJyIMhpyh58rxonylHirJTRj7uI8Sqh7RlZU1s8pWvfKUcdNBBdTKtY489NvVI8hqUU+XGDI1zzjlnrRgagpmdvaec8Yy8FxybCTRMTEEwtcdbatYykZ/61KfKdNNNN+6MJElGGuSXkTdtbHg/0dbZKcIju/baa6se0fTHaTBKx57RtzpdkjRRXpUdNkYTsdkazcSqM570ZPIZz8h7iTY1cUtEUhJCbUsvvXRZdtlla097nWf6aRaiJOkmyC+DbiGYRRdddFxqZ2HcherpEWF6My/SGxamsdEjni3Dr8lgKMOai5966qna9BTlKZl8XuPJ601vLOsZZ5xRbrrppjo23rhW2z777FNOPvnkOgY3SZKRB0XI8xk7dux4s911EhWN3/zmN1VnnHPOOXUVy2aoXufdDNcnEyKcTHtDL43kUmHNCuGU8xpP3tAWY1gpCisBaRexHrQ0PR1jStukN5G3E8rfSJ/QNiFUGIPBzon96zGpxwWTe3wv4b+TVfvhWGIWlLS2eB127T/4wQ/WqUp955nRJ9pZ0zMbWTTlplWGfLeR69bj2mmAw8DbzzbbbNXQP/zwwwPpyeQz3gI1MtC4RDVsHR0IKCPvBVshyu8E1TCYZnuaUEquQjcymJoFauQvgbWPz84PAYtrRZHx3XFoCnrzd2Uj2oOlN4pbPXdiTT+t92lVJtKazxSfY9+PeN8mEXnf+95XLrvssrLOOuuM+6VzyBf6g8MgX+gTo3QiHxl402YLx8YqdH7jWBhPnwvUDB9NmULr99Y8kc9WLW3XAjVNlGX9wVQKDcPk1fdyefCuA/+zXf91PK3pojLNOtAWpBFeu/HGG8sdd9xRJ9ewfKTwvVBg0nvI/xBqhtmewNrgtyiI0uLYwWry8Tthjc+x4fU6g8VxgykNafFszev2M/KCJw+V7uHAM3AWHn300Rqu32+//WrF48477yyjR48uZ599du2Ix6tPRg4ho2jKPfmN9NhLC0IntBv6QRm2/kFzvHwyeYynnWWW5SF55T//+c/L1VdfXdf2PeWUU8pxxx1Xbr755rLZZpvlJBY9ivznTTUFGDyxEHSbzyqD8T2UQRAKQtMO4YxzQxm4h3LmGhPDNZzr+NZ7BK7r94g+Teh5+g09kr0HHWeHA/ks70WUOAbXXXddOf300+viND/4wQ+qHvnIRz5Sp81ORg5k6Omnnx6QIxU1fbD0n4jpZaXz2g844ICBcjZYJX9qIcc6bIr8qBy6VzL5jJc7Mks7nlAv426ZWWPjdZoRLrFYjfnrcwhdd0JobJQwQWZoGUjfpYvQmHJUeExabCp4BBvOu/LKK6viht9jH8bV5xtuuKEOt9x+++3L8ccfX5U+IRWmVY5MiGJlMj1nm9eI68ReBOnoo4+us1+5t3SGP86RdtJJJ5UjjzyyKqlmuuNi6ydE4swYZqzxcCCf9arfd999q3E///zzqx7xnXHQ+W7bbbcdtudL/g/y1dzkkzziOfvOuIrAXHXVVQOyJ51xZxueeeaZ+n0ojS8jr/lGmXavkO9k0nlNuN5LtJCEDg/a3/faa6/yuc99robpP/3pT9c2Em1tSfcR+UtYGHRrEVg6OGCIRW/s4Xh9MRhsxhlWJrz88strfw2oGDrOFkJ499131x7UDPP73//+cvHFF9fokAmWGHj3sLLhhRdeWMuT+1EicZ2mUX722WdrBcO1he9CqdjgPKNAjMfmbcQzeC6b70PlaYxE/N/WdeSHgygXOtwJyxuZY+lqemTXXXetlUllKRk+QoYgL2699dZq6MNDt5E5/a+UK0afPmAf9LEI2Roqw+v67mM4t8539ELcb6ju2YuMp/28VBnrBQqp8d7NmvXe9763KuVVVlmldrrLBWq6lzB4lnEUilNTl+/yXN7zrghxGFQd43SOmnbaaesxJlkR0ltsscXqd8eEUXZtRlctX/qhhx5a5yjntQvdWnZU/w6RIW2yNl6CITKBiqVzVSoYeNdU3txLG69mpKhwOM4zezbP7XOMDPH/GLt+m0Qj3kGsyT1cyDfPcsstt9SKnQ68FqtZccUVy+qrr14nOkk9MryQqZB7cmmdEh2ndd5VYZbOwN92223VITCREZk+66yzasV8qCO67k92tctbsTCdyynjNS6OlyrjKUnegNC92anUwHlnW265ZQpnlxLGzp7Q8LJ//etfV+NJoChmBlJTzfe///1ywgknlB/+8Ie1Zh8CrVzIf4In3K/NnfAxyDY1fV6B49XCXdMc6o5jdBlk4Tf3s+woZSJk77vncE/RBeFdtXeVjThf711GHioW/ofr21RMcOmll9ZOo7fffnsN4ffbcqbeCSM/3J486BEVOFFBFTsL1NAlvHrNfpFnyfAQFTHyq83bJEU77rhjjdxpsgvIuXxUETDNrIo4whEYKkInLbTQQvUZm0uc+y2ZNF5j5OPFWupPLe68886r4VATWthkcr+1cfYShJJRFUo3eoLwGGpFIct3eSuPY7PcIyFnnIXojbZYcsklq3FW6bNCoc3iRTx2YXnt8DxrXjxjreOm4ymRNdZYo96XZ6BN3nO4p+gAL2HUqFG1gkGw3Yci4bnvtNNOtTw6x4pmntUW/8k1lF1RpzPPPLMqKekMfTQ/9APep/wark53QZQnEUAVPpEcXr0KnIiOsqVCmAwf5MMmTC+vROcMvRQeF2EjT2RHBEa/Gn1fdJxUUVNB85tjhsrgejbXFmGw50QoV8nk8RojHxBMGSljeVA2bWp6yFLYSXfCGKqpM5TG0ZvwiOfOiyZUDKnw6re//e3a4e2oo44qK6ywQu3UpkLAq//ABz5QvXDhdusZWNeAMbdWuOgAA0MZCMsqQxtvvHENm0dnrF122aU2AWy11VZVoRitoWONpgPfhQfXXnvtGjFQuSDcKg0MGKNP0BkI/8UWHoV0HUe1A1Ncnlv7fz8N1Yr/OlxT2gbyA/LNpmlIpzuz4NEjOnOmHhleyIsKIZkWpieTmlV48/q4+F0+ki9yTOZVwn0mf81K9lCi6YlMi1DFPZNJ5zVvTMaqNQnHEkjCGIvTUNy5QE33Il+FzAm23teM6EYbbVTb0XlX8DkgUM5hSCGkJwTPWBN8NWwbr1vkx56S4K2pJJiIRXkRalehcB3lyDWka99X3giwiVHMjKY5QN8P46t5CgwBj56XL/Su+UCaCoVKgefQPOA5ce+991ZlwCNh4DfddNMREbruFHo8w/seTuSHvI1QvWYYeSiyYlU6USAVymT4IDvkTQWfbFrWVdRMc5rPwvIq5zrcxaRV9ENUrqUz8CF7Q0FUNDgOmu+a+imZNMYz8l6ontEyWAEIb8/iNMstt1ytkfOyZG7SnQi3a3dnKBn8GWecsU4fqR07PKsQrBBe+c2QOld5UKOPCgB8drzzpFHsv/vd78oee+xRO28y2FtvvXW9j7B89LIWFeLNq3B4Dr2uVQg+9rGP1eOEdF2T18AzFbLXKUgkwtA6xsI4bG2FPBGVB01Km2++eY0AqMRoQlBu+wXvT14M5xh0BkBkRv7pT6Hyx2mwOI0Od8oHPZOe/PBDdul6aw1otrNpf19ttdWqDK277rplgw02qJ/JNmOvQq9vljyVRkaHCmXZ89E7MdzWPaUnk8YbDhBDGwfPSXiWN8Sb0garDTQMvMVr1MiFeIV2Ai9cxYCS5TWF8k86j7zjcfNko4NbQPn6jYFUe6dofWcMedMrrbRSPUaljtENARamtxqhCI52dUY5jHxc3z7S3FeZcQ/euvZ64XdhPvcQdpcuLLjFFlsMRIacZ1wsg84YhBJRKdErm7FQ4SD0H/7wh6tCElbULLD77rvX8xkQYXpNANrno5d5PGevo5JjyKLKVbMi1klUyiwnq1Joelr5J/KiDNEb0iPSo8IIz6nsCR3TNdGnoF/ybTigt8kJWSVv9mTfRn/QCSJ1fiO7UZkXrSOPKu2+m8mQrOtvE3ahHfnm2q5D3jUX6htGj/iOXisb/m/gv7Xr/43nycfL5LVFhup4Rfjgu89+S7oPhUYF7fOf/3zZbrvtyg477FB7OetvoX2dQfzkJz9Z28UdK78Jt450DOb6669fPeZmYZwQyofKgCE3+nRssskmA+E+1xaq1bmOx60y4XpRqEWP3JNBYLS1sfPwVUQc+5nPfKZez1BOofuf/OQndQRIVAgi0uB7pPUT5j/wv8ny6+XTUOG+vHSbSqKNHmH85QcdEpW1ZPgI2WCYJ7Tx3ski2Qt7IC+lq5hLG2r5cn33pAeUmaHu7NeLvCZcTxk329x9jhdKKGV60p3IR16SiAtDSJDV5IVUGVBCK79bla9z/OY4vJ6AKUeOcbx7UQoUhLJl73ruH4Yf0m3Os/kMz+L4gMLxjH7ntTPqOgO1Eufj9Z63lzCqQEUp3uVw4L7yzabcoDUPI/ybDB/KiDwaLB9UxprlyOfIz+Y5Q5WPruueNvrJs+oz0Hym5PUZz8h7cTI2XmBkKKUtnWD6nHQn8tUmX20h4LGP35rHDPZ5YoRybx7PoPse92r93db6HJHW+rt963VatzgnvvcqoQTJJ/Su16wB6cOB9x2KOPSFvID0yJdkeAnZaJWV2EL24nvzc5w/lLh+lB+2R/NAzHyXdmjSeY2Rh+UehXDNMa0H88EHH1w/C7HqmT3UmZskyaQRskgBM6DC9fpMSB9OOXVvoxvMiaB/wDXXXFN71+tpr5+PiU1SjySvh4pG7DX16SwcFfxk0hjPyHt5hjGZwEJPRuOTdaagOHSUEh41JCmHviTJyIFXE14740kZDqenQ4+YL0EnS3qDLllrrbVqeypPjP740Ic+VJuLkmQwIhoUm07dylJ68pPHNP95kQMxPS9O5xgdHJov2EvlKdhrW4ueloF0M53p8KNjlnOS4cEQM7OL6YymvTrzordpGniQPyNk9GqX90057RSehx7Rqz7wLNLjWT1X9P8IXeN4UUQdLj1/pCcjj8hHut8MkxaREv1liNuVb3EPKOdG0riX6BCHs9fKRrPi4r+16/+NpwEInk4xatg6TNnr8BCdtAhfdMJKkmT4CWVgI5cmDDL8LIzncOBZOAJ0Rmz0iD29YouOVEkyGM2yrazoJGxYt5D9cJXtbiStdZJ0MRRg7M0GJlxvuBGvICvjSS9hgifGnpGPcp+8PqkFkqSLidCoPeXXHLKY3k7SS+jLYbisESSaCZJJI418kvQAPHdGXpMa0sgnvYYmIMPodOZs9vdIJk4a+STpYsKYC83reazdEr5nuD7pJZRnU+oa7aVtPpk0UgskSZcjXG/j4VghkFdvS08+6TXMAWGlRfO1JJNGGvkk6WKaHZCs/MbTCaOfnnzSa1gBTwXWaovJpJFaIEm6HAZdRySrC8YSswx8rr2d9BLKufHxhl9a9S4jVpNGGvkk6XIoOQowOt75nCS9iDUwlHEL1WTnu0kjjXySdDHhxfPcGXkd78LIZ7g+6SVUZg0Ptc79008/XV588cWs0E4CqQWSpAcwjawOSbycDF8mvQiDruJqlUVl/aWXXqppaegnThr5JOliGHSzgGmP1z6pTT4UX3rySa8hXL/wwguXF154oW7RLp8MTmqBJOkB7r///mrYhTKTpFdRqVXGVWyt0xAV2jT0g5NGPkm6mFBwxsj7HJPhJEmvEc1QVi80fbMyr5kKyn4yYdLIJ0kXE4rPbHc6JVF+SdLLCNmb3tYwuhwm+vqkkU+SLiY8GEbebHfZDp/0Mso7T17fEz3sjSzJjqYTJzVCknQxFBzDLnRpys9UeEmvwsAr3yJWllM2f/2rr76aofrXIY18knQxYdRNaavXcZL0Mso7712F1jj5WKgmK7eDk0a+x1CrzZptf6Hj3cMPP1yNfOZ9MlwwtGFs43M7ja9riVrZa5P3+fHHH6/lv5336TXSyPcYUdizbbY/kM+GEumANO+8845LTZKhhZ6JDeFcNCuZ7a5wxvXsrS2vbf6xxx6r31PfDU6+mR4khCFrt/1BKLp55plnXEqSDD086DCwrTrHXli93biu+zHwM8wwQ/nLX/5S0+L+yWtJI99jqOG++c1vrpNFJP2BOevxtre9re6TZKgxpaz2cO3ijL3NgjHSnnvuuTp+vd06KCoQDDodZzSJHvbS47fktaSR7wF0uvrJT35SzjjjjHLFFVeUe+65p5x99tnlpz/9aTn99NPreFJCQBCT3kKeWpGLd7PggguOS02SoeWWW24pu+66a9luu+3K0UcfXS655JKy++67l2222abuTbPcbuOrjEdYfqaZZqrNU9aVFzFIT35w0sh3OYRIDfrYY48tO++8c91fffXVZd999y077bRTOeigg8o//vGPelwISNI7yFNG3kx3FF87lWqSDIZOnkLmF110Ubn11ltrB7jLL7+8XHrppWX66acfaDoaSsfC9LYiCfRflvvBSa3f5Sjciy66aDXwxo/qgKVm+/LLL9dw2Q477FBXbcqabm8i/0Vq3v72tw9JG2iSTIi555677LjjjtWY0y1R9pZccsny8Y9/vM68KH0oHQuVDM0CdF0yOGnkuxxCRJg+/OEPl2WWWaam+W5bccUVy7bbblungcRIqe3Gc/RC7dt/iG240LueVxP5niRDjXK2wgorlDXWWKOWfQ4FJ2PzzTevege8+KEsj4y8ykWvrCvvP3iX7a4YpZHvcqJQjBo1qnz0ox+taQqLmvQee+xRa9qOkTYSBCGehQLwuZu3+A/xXocyNDkY7s2TN83nUHpNSdIKHbPpppuWWWedtZb9d7/73VUHMb7KYjggQ4VmAQ5MNEd28xa6BO3WI6kVupymwVx33XVr6F6tesMNNyxrr712rV2HoEUhGm6ahdizdfOGeK/DYWSFK5966qk6A1iSdAoetHK/6qqrVo+ewdU0uMgii7TdSA3GW97ylvoMmignJJvdtCEqRe3W09P854JTfUUZfsEFF9QhPO9617sGHjoZemSfzTuXD8cdd1w599xza4e71VZbrR4TBcd+uPMmKiRGBIwdO7brvU/vnLJhZM3C1en3e99995UllliinHnmmdWLcv9ue6dRNnWg0kubZ7jmmmsOpCcjD+VeOWNg5ZnOd7vsskuZc845OzZ8d/To0WX//fcv66+/fllqqaVqeelmvDcjZJT/MPjtII18j2GMqk1eRFv8SEJx430ef/zx5Q9/+ENXG3nlnJKbZZZZasfH5ZZbriNln7y5j+2yyy4r6623XrnhhhvKyiuv3JWyF8Y8jXx3QgZU3skyQ9WpPDMm/7TTTivXXXddjSSQi25FWecsqCgtu+yybX2PaeR7jBC2KPCdqlVPDoqcpVG1pXWzkQ8jZK+3sbbITpT9yGP7E044oey22241ZN+tS83Ge0wj3/3IM3RKDugQs96hm8uK90Zn60MVeqRd/yeNfI+h4Mf7H6n5EM+o6HW7kbfFe+7U/+E5qby5n2aZgw8+uM5AFmnd9k7jHaaR707kU+RVp/OrKQvdrEvY0Hh+n9vpyXfvW0kmiIKhwIMxHWm0CmMoiG7c0BTETioZ95W/hs+JIkRakgwHUfaasjHUuE9EKkPvdetGdzQdtHaSRr7HUEgUmNiPNKIQN5+zV7ZOEgphzJgxdXpP/S9CWSRJJ2mVA1snmNB9u30j1+2W4dQISdJlhBKwN0e43vXCltEPI0mSJEgjnyRdhho/1PpNhGPaYgbfxptPkiQJ0sgnSRfC0BtCZN5uU9oy8GH8kyRJgjTySdJlRPudZTYZd1PaJkmSTIg08knSZURI/plnnqmf55tvvrrPUH2SJK2kkU+SLsWEQjx6y8ymgU+SZEKkkU+SLoNB15OeJ2+WO6uBIcL4SZIkQRr5JOlCtMUz8maZDBj49OiTJGmSRj5JugwG3vA5CxGZ65phl5bj5JMkaSWNfJJ0GWHUw5NPDz5JksFII58kXQaDzpM3hM469tEW385FLZIk6Q3SyCdJF8KYW2JTz/okSZLBSCOfJF0GAy9cbwhdGvkkSSZGGvkk6UKE7IXrrUCXJEkyGGnkk6QLsercCy+8UOacc85xKUmSJK8ljXySdCFjx44tM8wwQ11HPkmSZDDSyCdJl6Fn/ejRowfGyCdJkgxGGvkk6TJ0vHvwwQfr6nNp5JMkmRhp5JOky2DkH3300TLjjDPWsfFJkiSDkUY+SboQRj473SVJ8nqkkU+SLkOI/oknniizzz57huuTJJkoaeSTpMsQrmfkR40aVT8nSZIMRhr5JOkyeO8PPfRQmWuuuWpP+yRJksFII58kXcazzz5bl5ll5NOTT5JkYqSRT5Iu47HHHqtz188222zjUpIkSSZMGvkk6TK0xwvZzzrrrOnJJ0kyUdLIJ0mX8cgjj9S2+OxdnyTJ65FGPkm6jIcffrjMPPPM1ZNPI58kycRII58kXQYjH+vIZ7g+SZKJkUY+SbqMMWPG1HnrGfg08kmSTIw08knSZeh4N++889bPOU4+SZKJkUY+SbqMP//5z9XIZ3t8kiSvRxr5JBnh8NZtjDoD/89//rOG65Hh+iRJJkYa+SQZ4TQN+QMPPFCN/Tve8Y5xKUmSJIOTRj5JugAz3PHmzVnP6C+66KJ1n23ySZJMjDTySTIZ8KJbt2b6UBDG/A1veMPAlLZvfetb62/SkiTpLlp1B8j4UDS/pZFPkslgQkIY7eVDIaBN3EfP+jnmmKNMO+20NW2oKhZJkgwt9MW//vWv+pkcR4W93dG5NPJJMhmEABLK2EBg//3vf9fPQ4V7mNJ2vvnmS+OeJF1MyK+oXOiRodIfaeSTZDIIgbz//vvL1VdfXV566aWBNAI7VESU4MEHH8xOd0nSA9AZ+thceeWVVY+EJ9/uiOAbDvgP4z5PMR7qjjvuqEtfzj333ONSk6Q3YcxffPHFctJJJ5Xf/va3Zc455xyv3IfRb6ewvvrqq7WmT8ZWW221Mv/889fncI92K4VOE+/K0ECVmDe/+c1lwQUXHPdrkvQeyjzokVNPPbX85je/qcNiLTpFFtrpMEzzn5tNddxPCPOcc86p82m/853vHJeaJL0HcVHe3/jGN5Ynn3yynHnmmWX06NFlzTXXLOuvv34ZNWrUgNFql/F1PW137unevlMC8RzdTKgf7+qVV14pF110Ue1z8J73vGfgPSZJrxGyq+L+17/+teqRu+++u6yzzjplo402KjPMMMO4I6eethh5D/qLX/yiLpzBo2nDJZNkRBJGRxkXXpt++unLr371q2qctttuu7LffvuVGWecsQpxu2rjrgX3ZOxdN0J78RzdSlNX+J+XXHJJueWWW6onnwY+6VWibNvb3vSmN1VvXvn/xCc+UXbbbbcy00wz1WOmlrZ58k8//XS59957qxJK4Ux6HWVcWPmFF14o5557bvn1r39ddt1117LHHnuU6aabrlZ822l8w7g3Ibqeo52hvU7Tqn7oER6NdHoldUnSq4T80iMvv/xy1SMM/Wc/+9my1VZbVQeiHbTFyLcyVL0Ek2S4IZTKt1CbSq12+b/97W9VKFddddXylre8ZdyRydTCyA+BekqSYUe55gSovOt8d/LJJ9cK7g477FDe9a53VQPfrgrukBj5JOlVQlzuueeecsopp5RVVlmlrLHGGmXmmWeuQpueZ5Ikk4JKrGmqTzzxxNoHhR6ZZZZZ6m+icyPayGe9IelVlG0C+Oyzz1aPXm9YewLZTsFMUo8kvQ0jL0yvh71RM/SHtNAjI9rIdzNeh5fb3DeJ9CZxnE0GxTGtbYqt58U5rcfEec301rQoDM5v0nyGJpHuvLhnXMs+jh/s/DgWcX4c0/wN0uM6DKB985jmfxnsfwRxXhw33MR/81zxH+N70n+0ltso0/E59s0yE+lxbjPNvlUmmr83ies1aR4Xv8VxcZ3mOU2ZivQJyZrzIj1kOmheMz7bo/kZ8T2OD6S5vn3r7/E5fmvSvF7rHq3HjzSazyl0HyF8zYHtevY08i14HdpYn3/++frZppejMIqXHsLXLEjx3RYCHkLQFJi4XhyLOMc+rhe/x7Wa320KQlwnjol7tJ6HuG6kqzn+4x//qPOfx7WC5jM43j6uE9/dKz43iWdC3Cuei2IwRMp7NURKIXa83+O81vs1n6uZniQjhSjnyqqyrSOmcmrMP+9MMw6aZTfKtbQo+yAj0eTTLPs+x/eQp6Z8tR4b8ulaTZnyW+zjsy2Ia0ZaHAO/GerFAJkXovmcfovnar2HdN/jOVqPkd7UZ2im+WyiGJvhqXGf5rHNd9C8R7wHxHkjmXhW+B/xX6aWNPItmHTku9/9brn00ktrwSB4OkFssMEGZdttt63Do1oLVNCabh9prb81C3IcF/s4Nmj+bmvWpOO3VprHN3+/8cYby7e+9a0yzzzzlIMOOqj+N7+HQMQ58Rk+N4Ukrhe/x73iM+J6KhPXX399WWutterefAp6oS+++OID141z4XNcI/ZB8xmSZCSgjNoY+O9///t1lIVySkZnnXXWsvnmm5cPfehDtUOm46IM+xxlPT4HcRz5gM/S0JSZ5rlxfhzne5wP36MSEcQ5EyKuHef86U9/Kl//+tfrXCj77LNPdXqa94/jmvcP4pjWZ0ccF9/j2L/85S/l5ptvrvNPXHbZZXXSKfflIMS14ti4hjTPYC8trol47yOZ1vyK/zW1tGXGu16Ct3nMMcfUYVCGMrzvfe+rBlEaD/jd7353rQjoEanWbtIC3++77746r7iauyERkG6ilEcffbQuKBKCIF2brt7Zxkc6/s9//nOdNZCHy/AqlLwB93Ftx3kmBZfhvPPOO+s5lIffQhFEwVDjNvUq4ZQmGuGe3/zmN+t5n/vc5+qsafC7a9p0BHFfz/Dcc8+V2267rf7PqEW7h3Yk9zc7WTyX3xRS5xsC5f+6xu9///tyxBFHlLXXXrvOoWDedYrC748//njtwOa5PJ934/27/jPPPFPuuuuuWoOnLP3WrkKfJO2CPNjIylFHHVUWWWSROsaZcaIbjj766CrfyyyzTJUj8ihSyEiSt1tvvbVWEJR/MhHyTRc89dRTNY2+oBecL23MmDFV7v1Gh9ARIW9kkPw433GuxzEhO+5Dbukjz0RumzJFP9mc57qu6bk87wknnFDldJdddqlyHEaTTmSQ6bnQBY6nN/zm/Ija6T0u3SRSTX3m/3kv9JX706EqS4cffnjVvwsvvHDVVTHLo/P9P9fz3zynd0PneT/0Rjw7/Mdu0B3eRdDOZ05PvgUFc6eddqqGiKerUClAu+++ey2An/70p+uwKYLAuzd06tvf/na55ppr6rHLL798+fKXv1wF4Qc/+EH5yU9+Ugu0whi//fKXvyw///nPqzHl1frtyCOPrPdRwL/0pS/V3pY//vGP6/myyHbwwQeX5ZZbrhxyyCHld7/7XVUGSy21VNl3332rcoGC4Trubdyl7zqHfeMb3yi33357rQ0TANfYeuut6+8Uw+WXX157eVIEW265Zb2uZ1Ih8Pyec9NNN61CpEYfcyJ49q9+9at1qtWLL764VoY8lxq34SDuKTLiGSm+0047rVYwCKg01/DfDD/7whe+UJdSdQ14x4z8oYceWmeCCsWSJCMFskOGyMnHP/7x6rWbKwHKuOgf2fzMZz5TyzFHQFnfYostqoya+IdeEenaa6+9aoX2sMMOq7KrIkD2rFVgkiXySe4ZaLJiRULXYCQZQMeQ2+985ztVx9AvKsfkzWyMfmdkHW8KVXpmhRVWGJAr6WZeY9BBhr/4xS/W/7j99tvXij6duOGGG9ZzHE9WednklI404yldw2i7t0jGJz/5yVoRofuE/J0377zzVj3CgNOfF1xwQdUD/tvOO+9cbrjhhjqszP9UQVIZ8n7s3XPs2LH1+ksuuWTViyakMpGMvOBoeB+u63+6rmNHOt5z4H/Y2kFqzRa8aAVYbZcAqhUq+GqOhJPgEiCG8KMf/Wg1wsJJhJgA8FylmdSAkWYYBUsI5FVXXVWNmto0AWQc1TbV9gmHMPrSSy9dw36O+dGPflQrG7xvQurZ/vjHP9aQN0WicBMS1wwoDAseEBCKhIElUK4hRE4JuNeyyy47YOBBCIXyd9xxxyo4xx13XFU4vBNpFAwFQZmpCH3ta1+rFYW4n/fiXoyx/+OePHr3Wmyxxcrqq69eDfi1115ba/4qSiosFJKKEyE9++yzqxdA4FdaaaX6Phxz4YUX1mdMkpEGGWJE7BkS0S0VW3JK/pX59773vdUo0Q3KOoNp+CWdQoYZUuX/Zz/7Wa0882Kl0w9km94Q4WJMV1555XLggQdWOaEnOCTkhGdPllSMzzvvvGooyeNHPvKR+nzSb7rppvKVr3ylns+48/j9ZoPfXYv3TIZFInjTKvKGinJSyHLoDecJqet7wLDTG+SaLnC+mdvMhGohJ3pjiSWWqM+sck+/miWSnqNf6RhGmdx7d/Sge7kvz50T5R3SRxwhht51RDmvuOKKegzdst5669X/QN+qKHhWWz+TRr4FoSUCo+AwpDzYH/7wh2Xdddct22yzTRW2BRZYoHzwgx+sNW0Fy29qrGrjBFjbszZ9xynohObDH/5wNeiMImVgTCSBVbMl2DxonrCCzJgKjRHEP/zhD7XSINxNAHR6edvb3laFSQFXiWDoEYWZUiAgnoWRJPDC4oSR8KgZE8io0DjP3vOqTPD0CTyPnPKhtITj3M95atSEVs2ZwVZhURmieHguKkO8FjX7RRddtE5RSkFQCp5BJcH/pKBUNlRGzNdMKD2T/6kCpWlEuudIkpEK+eFx0x1nnXVWLfd0h8q4qY55vgwqj56u4BGTKWWczqAb3v/+91eDqSKgMs5YiXyRJzLD+6U/yAP5ZcQYSnLHyfj73/9eKwFkiz5QyRcNMLHKBz7wgaqrhMcZX86L65Mvusjzuz5d5l6e33kiAO4DkUXHk+fQF/C/N9lkk6rLXMs1yLnIIJ3hfPpsxRVXrJHP6667rh5D73lfPH56zv90jIqNSo93wAtXQYrQu2nTNePtueeeVUe4Hp3sXdJB9Oxmm21WKwb0Ch1D38az9itp5FtgZBhyRpj3q+aoRr7//vtXAfCbwhk1WQWexyvNZ0ZYgWOk1YAJAYS+hKIIE6QrfK7nWoylNimofRNUEQChLrVdbWEElyFWY7dn/FVCGFvPYnMtm2eNtnJtdZ6NAuAZCK1BmmPhuQiTa/jdfyAkBMueQiLgDD0vg9fh2eM/urZ3EP9Xuvs7JiINETJzX5sauTTPSAkRSM/jvHifUSnyXEkyElE2yYuNEaYzeJMicfr1KOd+I1/KNJlg9KMTmbLuGOlkL9qq/Ua3RKc9cuAaYNTJhkgBY0rvaH4zYkaUTeWeB+3+nsU1efDuGZ1fzzjjjPpcIWN0AO/d/Xz3TO4X7d2eL57LRlYdR+al+0+uoVLOeOtzozKhwqACz9v3TJ6dvPvfruk+Ie/u73tU7F3Xb6EDPJvfHUtvxHtDPHfoMp9toeP6lTTyE0CB1qbDI1UrFOJWKBWqKGwKGcHRKU9onrDpfMMbVwNVK2W0heQIiUKuMCqIhAquoZASTB758ccfX405b5nACINr6xbGjrC16zG0mga0nbmm9LgmgVhooYVq7VaEQDrvgKH3HxT4EFD/w3+KNBsoFkpDRYeC0HYm7E5BeBbhOPfmrUijmNzTnsLx/igSXoN72NzD5jdKwb1EKTwfj8T7EeInnP6T54r3HM+XJCONKN9RXnnrvEyerUqxyq4yHnLmGHJIvsIDZwzJgvKv/V3IX2TPb6KCvF4OAqLCTMeQvc9//vM1BK4SLhxOTnjq2tvpBc1nwuLasjkeHITTTjutOgFklKzRaZ6PDHuW6CcgmumZORT0EeI/uI+97yoKoDfmmmuugaZHTkpEHzkkdKKKj7465Nw19V2i0zQXup5KgL5ADHVcV7rv/i/jH7rUe3G89+Y5Qgf6L86N5+t33ZFGvgUFg0EMY25rIp2Rir2QFiMtxKVXrcKo3Y3QETBer84jwuXh5UaN07WF4XXYIQSuoZ1JgacchLmcu/fee1cBFXYX6tNm7VhGVOheSFDBDtTotYG7lpA4YSb0BFuhpzCaBd+5KgcqLT4LlQmZCf996lOfqv0NKCG/Cy/au7Y2eWF7yoigMfrS/B+KJ3rTM/6E231tlAFB1wxiz6ug+EQtCKf/HsJp875a8yFJRgJRRpVPchHfm+lkykb+7YWedUIT/dKcR8Y4C+RAyJn80SVkUHibd+s64dFCqFrEj36hb8idTrHkSzicLOlkyyEgYyoPdAwnQlOa43bccccBp8OzbrzxxrWvESPrHOF+kQBy7P6ePzzukM/4T76reNBV2v/pRfpAc597uLbmCPpMZ0FGmt5QGeLUqKy4p/9DF4hkcproCJUBzpDn8DwcDc/u3Ykyeg8qP6EnPE948j5L62eyd30LjIxCqsAw3mGYA2F1NUi1W8eAESNMCrrau0qC2qmObASWcRXCUwFQk1ZoFb4QHpsaNOPOKDKY7ut4PUUVZIWegZeu7Vu6gq32rfYc3kLgXNfjdWsTd03wEgi4ykEIK7R1uQ9lEIqE0nANx/MS/F/3dByP3bMSJs/jfVBy0hn++N+u5X16Z7wcbXSiJK4l+uG3EGrKjGC7r+8UinuJhMTwmSQZSZAf5ZL80QFklDw2IWc8czJGXp2jbEsT7SPT0lVuOQO8btFDsnXqqadWz1rHV7rJtR0HsuieZIZ8hIzTL6J49JI0su4ZHef6ZJK8hv7xW/wPxpeM6sjmmehA6dLseeWe3fH+l7C865BhOsd/8T89l8qMjsP0oWfX9Ee2Yxlhcq3vkOf1G13luVR43IsucU0evGM9j3t7FnqDXqJTvA/P69md79r0lmdybvy3kY7nDPwHWztIIz8BogB7Na0vu/V1+S0KUTOThMtjSAzB9F0tVCcVguA6cX1758e143vzuvEMcT80z4nrxD7SEOlxndZj4nMTx1IGfovzKRVC1iSuG89iaz5XEMfZt57T/C3wuXmNuG6SjCSa5bdZnpt7FYCoOKN5fHMvnXHiAavkOkcHWB6uaF1ECuIaQVwj7tN8FsT94nPQ+uxN4rjmNeB7nBf4HPduOhvxn2xxXugUafG7ffO57RH/IY5vXgfx3T6+OzfSnB/PE8eMVOJ/Nf9Tu555PCMfLzeZciJj1EB58+eff379LCyvpygD38zIJEmSpoLXTGaYLk9eO7Zmv/De0VDZSY8QeapCwpmS9+0ijXyb8Tq9R5nEuPN8ZVrUYH0XuuqG2mWSJJ0hdASdEN6ozffwcpufk95CXkfeRr6zEe0gw/UdJDJPRrYrA5Mk6Q1CP0yMSTkmSZqkkU+SJEmSHiXdySRJkiTpUdLIJ0mSJEmPkkY+SZIkSXqUNPJJkiRJ0qOkkU+SJEmSHiWNfJIkSZL0JKX8f9I7Zstk22NQAAAAAElFTkSuQmCC"></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">e(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was a challenging question that asked about the difference between the bonding of carbon atoms in C<sub>60</sub> and diamond. 20% of the candidates gained the mark. The majority of the candidates did not have a specific enough answer for C<sub>60</sub> and mentioned the pentagons and hexagons but not the number of bonds or the geometry or the bond order or the electron delocalisation. Diamond was better known to candidates as expected.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About two-thirds of the candidates scored one of the two marks and stronger candidates scored both. The most common answers were the same general formula/C<sub>n</sub>H<sub>2n+2</sub>, the difference between the compounds was CH<sub>2</sub> and similar chemical properties. The same functional group was not accepted since alkanes do not have a functional group. Some candidates only stated that they are saturated hydrocarbons not gaining any marks.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About half of the candidates gave the bromine water test with the correct results. Iodine and KMnO4 were rarely seen in the scripts. There were candidates who used the term “clear” to mean “colourless” which was not accepted. Some candidates referred to the presence of UV light in a correct way and others in an incorrect way which was not penalized in this case. 10% of the candidates left the question blank. The most common incorrect answer was in terms of the IR absorptions. Other candidates referred to enthalpies of combustion and formation.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A well answered question. 70% of the candidates gave the correct structural formula for but-2-ene. Mistakes included too many hydrogens in the structure and an incorrect position of the C=C. Candidates should be reminded that the full structural formula requires all covalent bonds to be shown.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Half of the candidates wrote the correct equation for the reaction of but-2-ene with hydrogen bromide. Incorrect answers included hydrogen as a product. As expected, the question correlated well with highly achieving candidates.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well answered. 60% of candidates identified the type of reaction between but-2-ene and HBr, some of them including the term “electrophilic”. ECF was generously awarded when substitution was stated based on the equation where H<sub>2</sub> was produced in part (ii). Candidates lost the mark if they only stated “hydrobromination” without mentioning addition. Some candidates lost the mark for stating “nucleophilic” or “free radical” addition.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The comparison of the <sup>1</sup>H NMR spectra of the two organic compounds was more challenging and 10% of the candidates left this question blank. The average mark was 0.7 out of 2 marks. Mistakes included non-specific answers that just stated “more signals” or “higher chemical shift”, and stating 3 signals in 2-bromobutane instead of 4 signals. Standard level candidates were expected to use the number of signals and the ratio of the areas under the signals to answer the question since they do not cover chemical shift, however, many of them did use the <sup>1</sup>H NMR section in the data booklet to obtain correct answers in terms of chemical shift.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was the best answered question on the paper. Candidates identified the bonds and used bond enthalpies to calculate the enthalpy of reaction accurately. The most common mistakes were reversing the signs of bonds broken and bonds formed, assuming two Cl-Cl bonds were broken and using an incorrect value of bond enthalpy for one of the bonds.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority of candidates drew the enthalpy level diagram and labelled it correctly based on their answer to part (i). Some candidates reversed the products and reactants. A few candidates did not add any labels which prevented the awarding of the second mark. With 2 marks allocated to the question the second mark was awarded for correct labeling of either ΔH or E<sub>a</sub>.</p>
<div class="question_part_label">e(ii).</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 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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>Write the equation and name the organic product when ethanol reacts with methanoic acid.</p>
<p><img src="data:image/png;base64,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"></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>Oxidation of ethanol with potassium dichromate, K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>, can form two different organic products. Determine the names of the organic products and the methods used to isolate them.</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>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;" 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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.</p>
<p><img src="data:image/png;base64,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"></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>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>
<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>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).</p>
<p style="text-align:left;"><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">e(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" 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>Bonds formed:</em><br>8(C=O) + 8(O–H) / 8(804) + 8(463) / 10 136 «kJ» ✓</p>
<p><em>Enthalpy change:</em><br>«Bonds broken – Bonds formed = 7606 kJ – 10 136 kJ =» –2530 «kJ» ✓</p>
<p><em><br>Award<strong> [2 max]</strong> for «+» 2530 «kJ».</em></p>
<p><em>Award<strong> [3]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Equation:</em><br>CH<sub>3</sub>CH<sub>2</sub>OH + HCOOH <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> HCOOCH<sub>2</sub>CH<sub>3</sub> + H<sub>2</sub>O ✓</p>
<p><em>Product name:</em><br>ethyl methanoate ✓</p>
<p><em>Accept equation without equilibrium arrows.</em></p>
<p><em>Accept equation with molecular formulas (C<sub>2</sub>H<sub>6</sub>O + CH<sub>2</sub>O<sub>2</sub> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> C<sub>3</sub>H<sub>6</sub>O<sub>2</sub> + H<sub>2</sub>O) only if product name is correct.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ethanal <em><strong>AND</strong> </em>distillation ✓</p>
<p>ethanoic acid <em><strong>AND</strong> </em>reflux «followed by distillation» ✓</p>
<p> </p>
<p><em>Award <strong>[1 max]</strong> for both products <strong>OR</strong> both methods.</em></p>
<div class="question_part_label">d.</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">e(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">e(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><em><br>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">e(iii).</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(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>
<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>Explain the polarity of PCl<sub>3</sub>.</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>Calculate the standard enthalpy change (<em>ΔH</em><sup>⦵</sup>) for the forward reaction in kJ mol<sup>−1</sup>.</p>
<p style="text-align:center;"><em>ΔH</em><sup>⦵</sup><sub>f</sub> PCl<sub>3 </sub>(g) = −306.4 kJ mol<sup>−1</sup></p>
<p style="text-align:center;"><em>ΔH</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>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(ii).</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(iii).</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><br>Accept any diagram with each P joined to the other three. <br></em></p>
<p><em>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> </p>
<p><em>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>polar <em><strong>AND</strong> </em>unsymmetrical distribution of charge<br><em><strong>OR</strong></em><br>polar <em><strong>AND</strong> </em>dipoles do not cancel<br><em><strong>OR</strong></em><br>«polar as» dipoles «add to» give a «partial» positive «charge» at P and a «partial» negative «charge» at the opposite/Cl side of the molecule ✔</p>
<p><em>Accept “polar <strong>AND</strong> unsymmetrical molecule”.</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>«<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(ii).</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(iii).</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>
<br><hr><br>