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<h2>SL Paper 2</h2><div class="specification">
<p>A student determined the percentage of the active ingredient magnesium hydroxide, Mg(OH)<sub>2</sub>, in a 1.24 g antacid tablet.</p>
<p>The antacid tablet was added to 50.00 cm<sup>3</sup> of 0.100 mol dm<sup>−3</sup> sulfuric acid, which was in excess.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the amount, in mol, of H<sub>2</sub>SO<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>Formulate the equation for the reaction of H<sub>2</sub>SO<sub>4</sub> with Mg(OH)<sub>2</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The excess sulfuric acid required 20.80 cm<sup>3</sup> of 0.1133 mol dm<sup>−3</sup> NaOH for neutralization.</p>
<p>Calculate the amount of excess acid present.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the amount of H<sub>2</sub>SO<sub>4</sub> that reacted with Mg(OH)<sub>2</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the mass of Mg(OH)<sub>2</sub> in the antacid tablet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the percentage by mass of magnesium hydroxide in the 1.24 g antacid tablet to three significant figures.</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>n(H<sub>2</sub>SO<sub>4</sub>) <strong>«</strong>= 0.0500 dm<sup>3</sup> × 0.100 mol dm<sup>–3</sup><strong>» </strong>= 0.00500/5.00 × 10<sup>–3</sup><strong>«</strong>mol<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>H<sub>2</sub>SO<sub>4</sub>(aq) + Mg(OH)<sub>2</sub>(s) → MgSO<sub>4</sub>(aq) + 2H<sub>2</sub>O(l)</p>
<p> </p>
<p><em>Accept an ionic equation.</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><strong>«</strong>n(H<sub>2</sub>SO<sub>4</sub>) =<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> × n(NaOH) = <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> (0.02080 dm<sup>3</sup> × 0.1133 mol dm<sup>–3</sup>)<strong>»</strong></p>
<p>0.001178/1.178 × 10<sup>–3</sup> <strong>«</strong>mol<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>n(H<sub>2</sub>SO<sub>4</sub>) reacted <strong>«</strong>= 0.00500 – 0.001178<strong>» =</strong> 0.00382/3.82 × 10<sup>–3</sup> <strong>«</strong>mol<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>n(Mg(OH)<sub>2</sub>) <strong>«</strong>= n(H<sub>2</sub>SO<sub>4</sub>) =<strong>» =</strong> 0.00382/3.82 × 10<sup>–3</sup> <strong>«</strong>mol<strong>»</strong></p>
<p>m(Mg(OH)<sub>2</sub>) <strong>«</strong>= 0.00382 mol × 58.33 g mol<sup>–1</sup><strong>» =</strong> 0.223 <strong>«</strong>g<strong>»</strong></p>
<p> </p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>% Mg(OH)<sub>2</sub> <strong>«</strong>= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.223{\text{ g}}}}{{1.24{\text{ g}}}}">
<mfrac>
<mrow>
<mn>0.223</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>1.24</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> × 100<strong>» =</strong> 18.0 <strong>«</strong>%<strong>»</strong></p>
<p> </p>
<p><em>Answer must show three significant </em><em>figures.</em></p>
<p><strong><em>[1 mark]</em></strong></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.</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>
<br><hr><br><div class="specification">
<p>Phosphoric acid, H<sub>3</sub>PO<sub>4</sub>, can undergo stepwise neutralization, forming amphiprotic species.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate an equation for the reaction of one mole of phosphoric acid with one mole of sodium hydroxide.</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>Formulate <strong>two</strong> equations to show the amphiprotic nature of H<sub>2</sub>PO<sub>4</sub><sup>−</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the concentration of H<sub>3</sub>PO<sub>4</sub> if 25.00 cm<sup>3</sup> is completely neutralised by the addition of 28.40 cm<sup>3</sup> of 0.5000 mol dm<sup>−3</sup> NaOH.</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>Outline the reason that sodium hydroxide is considered a Brønsted–Lowry base.</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>H<sub>3</sub>PO<sub>4 </sub>(aq) + NaOH (aq) → NaH<sub>2</sub>PO<sub>4 </sub>(aq) + H<sub>2</sub>O (l) ✔</p>
<p><em><br>Accept net ionic equation.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>H<sub>2</sub>PO<sub>4</sub><sup>−</sup> (aq) + H<sup>+</sup> (aq) → H<sub>3</sub>PO<sub>4</sub> (aq) ✔</p>
<p>H<sub>2</sub>PO<sub>4</sub><sup>−</sup> (aq) + OH<sup>−</sup> (aq) → HPO<sub>4</sub><sup>2−</sup> (aq) + H<sub>2</sub>O (l) ✔</p>
<p><em><br>Accept reactions of H<sub>2</sub>PO<sub>4</sub><sup>−</sup> with any acidic, basic or amphiprotic species, such as H<sub>3</sub>O<sup>+</sup>, NH<sub>3</sub> or H<sub>2</sub>O. </em></p>
<p><em>Accept H<sub>2</sub>PO<sub>4</sub><sup>−</sup> (aq) → HPO<sub>4</sub><sup>2−</sup> (aq) + H<sup>+</sup> (aq) for <strong>M2</strong>.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«NaOH <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>28</mn><mo>.</mo><mn>40</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mn>1000</mn></mfrac><mo>×</mo><mn>0</mn><mo>.</mo><mn>5000</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo>=</mo><mn>0</mn><mo>.</mo><mn>01420</mn><mo> </mo><mi>mol</mi></math>»</p>
<p>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>01420</mn><mo> </mo><mi>mol</mi></mrow><mn>3</mn></mfrac><mo>=</mo></math>» 0.004733 «mol» ✔</p>
<p>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>004733</mn><mo> </mo><mi>mol</mi></mrow><mstyle displaystyle="true"><mfrac><mrow><mn>25</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mn>1000</mn></mfrac></mstyle></mfrac><mo>=</mo></math>» 0.1893 «mol dm<sup>−3</sup>» ✔</p>
<p><em><br>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>«OH<sup>−</sup> is a» proton acceptor ✔</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>Iron may be extracted from iron (II) sulfide, FeS.</p>
</div>
<div class="specification">
<p>Iron (II) sulfide, FeS, is ionically bonded.</p>
</div>
<div class="specification">
<p>The first step in the extraction of iron from iron (II) sulfide is to roast it in air to form iron (III) oxide and sulfur dioxide.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why metals, like iron, can conduct electricity.</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>Justify why sulfur is classified as a non-metal by giving <strong>two</strong> of its chemical properties.</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 the bonding in this type of solid.</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>State the full electron configuration of the sulfide ion.</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>Outline, in terms of their electronic structures, why the ionic radius of the sulfide ion is greater than that of the oxide ion.</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>Suggest why chemists find it convenient to classify bonding into ionic, covalent and metallic.</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>Write the equation for this reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the change in the oxidation state of sulfur.</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 this process might raise environmental concerns.</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>Explain why the addition of small amounts of carbon to iron makes the metal harder.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>mobile/delocalized «sea of» electrons</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>forms acidic oxides «rather than basic oxides» ✔</p>
<p>forms covalent/bonds compounds «with other non-metals» ✔</p>
<p>forms anions «rather than cations» ✔</p>
<p>behaves as an oxidizing agent «rather than a reducing agent» ✔</p>
<p><em><br>Award <strong>[1 max]</strong> for 2 correct non-chemical properties such as non-conductor, high ionisation energy, high electronegativity, low electron affinity if no marks for chemical properties are awarded.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrostatic attraction ✔</p>
<p>between oppositely charged ions/between Fe<sup>2+</sup> and S<sup>2−</sup> ✔</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1s<sup>2</sup> 2s<sup>2</sup> 2p<sup>6</sup> 3s<sup>2</sup> 3p<sup>6</sup> ✔</p>
<p><em><br>Do <strong>not</strong> accept “[Ne] 3s<sup>2</sup> 3p<sup>6</sup>”.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«valence» electrons further from nucleus/extra electron shell/ electrons in third/3s/3p level «not second/2s/2p»✔</p>
<p><em><br>Accept 2,8 (for O<sup>2–</sup>) and 2,8,8 (for S<sup>2–</sup>)</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>allows them to explain the properties of different compounds/substances<br><em><strong>OR</strong></em><br>enables them to generalise about substances<br><em><strong>OR</strong></em><br>enables them to make predictions ✔</p>
<p><em><br>Accept other valid answers.</em></p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>4FeS(s) + 7O<sub>2</sub>(g) → 2Fe<sub>2</sub>O<sub>3</sub>(s) + 4SO<sub>2</sub>(g) ✔</p>
<p><em><br>Accept any correct ratio.</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>+6<br><em><strong>OR</strong></em><br>−2 to +4 ✔</p>
<p><em>Accept “6/VI”.</em><br><em>Accept “−II, 4//IV”.</em><br>Do <strong>not</strong> accept 2− to 4+.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>sulfur dioxide/SO<sub>2</sub> causes acid rain ✔</p>
<p><em>Accept sulfur dioxide/SO<sub>2</sub>/dust causes respiratory problems</em><br><em>Do <strong>not</strong> accept just “causes respiratory problems” or “causes acid rain”.</em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>disrupts the regular arrangement «of iron atoms/ions»<br><em><strong>OR</strong></em><br>carbon different size «to iron atoms/ions» ✔</p>
<p>prevents layers/atoms sliding over each other ✔</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">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Urea, (H<sub>2</sub>N)<sub>2</sub>CO, is excreted by mammals and can be used as a fertilizer.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the percentage by mass of nitrogen in urea to two decimal places using section 6 of the data booklet.</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>Suggest how the percentage of nitrogen affects the cost of transport of fertilizers giving a reason.</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>The structural formula of urea is shown.</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_13.51.02.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.b_01"></p>
<p>Predict the electron domain and molecular geometries at the nitrogen and carbon atoms, applying the VSEPR theory.</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_13.52.37.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.b_02"></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>Urea can be made by reacting potassium cyanate, KNCO, with ammonium chloride, NH<sub>4</sub>Cl.</p>
<p> KNCO(aq) + NH<sub>4</sub>Cl(aq) → (H<sub>2</sub>N)<sub>2</sub>CO(aq) + KCl(aq)</p>
<p>Determine the maximum mass of urea that could be formed from 50.0 cm<sup>3</sup> of 0.100 mol dm<sup>−3</sup> potassium cyanate solution.</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>Urea can also be made by the direct combination of ammonia and carbon dioxide gases.</p>
<p> 2NH<sub>3</sub>(g) + CO<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> (H<sub>2</sub>N)<sub>2</sub>CO(g) + H<sub>2</sub>O(g) Δ<em>H </em>< 0</p>
<p>Predict, with a reason, the effect on the equilibrium constant, <em>K</em><sub>c</sub>, when the temperature is increased.</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>Suggest one reason why urea is a solid and ammonia a gas at room temperature.</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>Sketch <strong>two </strong>different hydrogen bonding interactions between ammonia and water.</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>The combustion of urea produces water, carbon dioxide and nitrogen.</p>
<p>Formulate a balanced equation for the reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The mass spectrum of urea is shown below.</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_14.15.23.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.g_01"></p>
<p>Identify the species responsible for the peaks at <em>m</em>/<em>z </em>= 60 and 44.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The IR spectrum of urea is shown below.</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_14.21.30.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.h_01"></p>
<p>Identify the bonds causing the absorptions at 3450 cm<sup>−1</sup> and 1700 cm<sup>−1</sup> using section 26 of the data booklet.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict the number of signals in the <sup>1</sup>H NMR spectrum of urea.</p>
<div class="marks">[1]</div>
<div class="question_part_label">i.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>molar mass of urea <strong>«</strong>= 4 × 1.01 + 2 × 14.01 + 12.01 + 16.00<strong>» =</strong> 60.07 <strong>«</strong>g mol<sup>–1</sup><strong>»</strong></p>
<p><strong>«</strong>% nitrogen = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{2 \times 14.01}}{{60.07}}">
<mfrac>
<mrow>
<mn>2</mn>
<mo>×</mo>
<mn>14.01</mn>
</mrow>
<mrow>
<mn>60.07</mn>
</mrow>
</mfrac>
</math></span> × 100 =<strong>» </strong>46.65 <strong>«</strong>%<strong>»</strong></p>
<p> </p>
<p> </p>
<p>Award <strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for final answer not to </em><em>two decimal places.</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><strong>«</strong>cost<strong>» </strong>increases <strong><em>AND </em></strong>lower N% <strong>«</strong>means higher cost of transportation per unit of nitrogen<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>cost<strong>» </strong>increases <strong><em>AND </em></strong>inefficient/too much/about half mass not nitrogen</p>
<p> </p>
<p><em>Accept other reasonable explanations.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept answers referring to </em><em>safety/explosions.</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><img src="images/Schermafbeelding_2018-08-09_om_13.53.16.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.b/M"></p>
<p> </p>
<p><em>Note: Urea’s structure is more complex </em><em>than that predicted from VSEPR theory.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>n</em>(KNCO) <strong>«</strong>= 0.0500 dm<sup>3</sup> × 0.100 mol dm<sup>–3</sup><strong>» =</strong> 5.00 × 10<sup>–3</sup> <strong>«</strong>mol<strong>»</strong></p>
<p><strong>«</strong>mass of urea = 5.00 × 10<sup>–3</sup> mol × 60.07 g mol<sup>–1</sup><strong>» =</strong> 0.300 <strong>«</strong>g<strong>»</strong></p>
<p> </p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong><em>K</em><sub>c</sub><strong>» </strong>decreases <strong><em>AND </em></strong>reaction is exothermic</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong><em>K</em>c<strong>» </strong>decreases <strong><em>AND</em></strong> Δ<em>H </em>is negative</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong><em>K</em><sub>c</sub><strong>» </strong>decreases <strong><em>AND </em></strong>reverse/endothermic reaction is favoured</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one of:</em></p>
<p>urea has greater molar mass</p>
<p>urea has greater electron density/greater London/dispersion</p>
<p>urea has more hydrogen bonding</p>
<p>urea is more polar/has greater dipole moment</p>
<p> </p>
<p><em>Accept “urea has larger size/greater </em><em>van der Waals forces”.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “urea has greater </em><em>intermolecular forces/IMF”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2018-08-09_om_14.09.21.png" alt="M18/4/CHEMI/SP2/ENG/TZ1/01.e.ii/M"></p>
<p> </p>
<p><em>Award </em><strong><em>[1] </em></strong><em>for each correct interaction.</em></p>
<p><em>If lone pairs are shown on N or O, then </em><em>the lone pair on N or one of the lone </em><em>pairs on O </em><strong><em>MUST </em></strong><em>be involved in the </em><em>H-bond.</em></p>
<p><em>Penalize solid line to represent </em><em>H-bonding only once.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>2(H<sub>2</sub>N)<sub>2</sub>CO(s) + 3O<sub>2</sub>(g) → 4H<sub>2</sub>O(l) + 2CO<sub>2</sub>(g) + 2N<sub>2</sub>(g)</p>
<p>correct coefficients on LHS</p>
<p>correct coefficients on RHS</p>
<p> </p>
<p><em>Accept (H</em><sub><em>2</em></sub><em>N)</em><sub><em>2</em></sub><em>CO(s) +</em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{2}">
<mfrac>
<mn>3</mn>
<mn>2</mn>
</mfrac>
</math></span><em>O</em><sub><em>2</em></sub><em>(g) → </em><em>2H</em><sub><em>2</em></sub><em>O(l) +</em><em> </em><em>CO</em><sub><em>2</em></sub><em>(g) +</em><em> </em><em>N</em><sub><em>2</em></sub><em>(g).</em></p>
<p><em>Accept any correct ratio.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>60:</em> CON<sub>2</sub>H<sub>4</sub><sup>+</sup></p>
<p><em>44:</em> CONH<sub>2</sub><sup>+</sup></p>
<p> </p>
<p><em>Accept “molecular ion”.</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><em>3450 cm</em><sup><em>–</em><em>1</em></sup><em>:</em> N–H</p>
<p><em>1700 cm<sup>–1</sup>:</em> C=O</p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “O</em><em>–</em><em>H” for 3450 cm<sup>–1</sup></em><em>.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">i.</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>
<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">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.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">i.</div>
</div>
<br><hr><br><div class="specification">
<p>Menthol is an organic compound containing carbon, hydrogen and oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Complete combustion of 0.1595 g of menthol produces 0.4490 g of carbon dioxide and 0.1840 g of water. Determine the empirical formula of the compound showing your working.</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>0.150 g sample of menthol, when vaporized, had a volume of 0.0337 dm<sup>3</sup> at 150 °C and 100.2 kPa. Calculate its molar mass showing your working.</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>carbon: «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.4490\,{\text{g}}}}{{44.01\,{\text{g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>0.4490</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mn>44.01</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>» = 0.01020 «mol» / 0.1225 «g»</p>
<p><em><strong>OR</strong></em></p>
<p>hydrogen: «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.1840 \times 2}}{{18.02}}">
<mfrac>
<mrow>
<mn>0.1840</mn>
<mo>×</mo>
<mn>2</mn>
</mrow>
<mrow>
<mn>18.02</mn>
</mrow>
</mfrac>
</math></span>» = 0.02042 «mol» / 0.0206 «g»</p>
<p>oxygen: «0.1595 – (0.1225 + 0.0206)» = 0.0164 «g» / 0.001025 «mol»</p>
<p>empirical formula: C<sub>10</sub>H<sub>20</sub>O</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>temperature = 423 K</p>
<p><em><strong>OR</strong></em></p>
<p>«<em>M</em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{mRT}}{{pV}}">
<mo>=</mo>
<mfrac>
<mrow>
<mi>m</mi>
<mi>R</mi>
<mi>T</mi>
</mrow>
<mrow>
<mi>p</mi>
<mi>V</mi>
</mrow>
</mfrac>
</math></span></p>
<p>«<em>M </em><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{0.150\,{\text{g}} \times 8.31\,{\text{J}} {{\text{ K}}^{ - 1}}\,{\text{mol}}{}^{ - 1} \times 423\,{\text{K}}}}{{100.2\,{\text{kPa}} \times 0.0337\,{\text{d}}{{\text{m}}^3}}} = ">
<mo>=</mo>
<mfrac>
<mrow>
<mn>0.150</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
<mo>×</mo>
<mn>8.31</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>J</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext> K</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
<msup>
<mrow>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
<mo>×</mo>
<mn>423</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>K</mtext>
</mrow>
</mrow>
<mrow>
<mn>100.2</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kPa</mtext>
</mrow>
<mo>×</mo>
<mn>0.0337</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mn>3</mn>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 156 «g mol<sup>–1</sup>»</p>
<p><em>Award <strong>[1]</strong> for correct answer with no working shown.</em></p>
<p><em>Accept “pV = nRT <strong>AND</strong> n = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{m}{M}">
<mfrac>
<mi>m</mi>
<mi>M</mi>
</mfrac>
</math></span>” for M1.</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><span style="background-color: #ffffff;">Automobile air bags inflate by a rapid decomposition reaction. One typical compound used is guanidinium nitrate, C(NH<sub>2</sub>)<sub>3</sub>NO<sub>3</sub>, which decomposes very rapidly to form nitrogen, water vapour and carbon.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Deduce the equation for the decomposition of guanidinium nitrate.</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;">Calculate the total number of moles of gas produced from the decomposition of 10.0 g of guanidinium nitrate.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the pressure, in kPa, of this gas in a 10.0 dm<sup>3</sup> air bag at 127°C, assuming no gas escapes.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest why water vapour deviates significantly from ideal behaviour when the gases are cooled, while nitrogen does not.</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;">Another airbag reactant produces nitrogen gas and sodium.</span></p>
<p><span style="background-color: #ffffff;">Suggest, including an equation, why the products of this reactant present a safety hazard.</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><span style="background-color: #ffffff;">C(NH<sub>2</sub>)<sub>3</sub>NO<sub>3 </sub>(s) → 2N<sub>2 </sub>(g) + 3H<sub>2</sub>O (g) + C (s) ✔</span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">moles of gas = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{10.0{\text{g}}}}{{122.11{\text{g mo}}{{\text{l}}^{ - 1}}}}"><mn>5</mn><mo>×</mo><mfrac><mrow><mn>10.0</mn><mo> </mo><mtext>g</mtext></mrow><mrow><mn>122.11</mn><mo> </mo><mtext>g mo</mtext><msup><mtext>l</mtext><mrow><mo>−</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo></math></span>» 0.409 «mol» ✔</span></p>
<div class="question_part_label">a(ii).</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="p = \frac{{0.409{\text{mol}} \times {\text{8}}{\text{.31 J }}{{\text{K}}^{ - 1}}{\text{mo}}{{\text{l}}^{ - 1}} \times \left( {127 + 273} \right){\text{K}}}}{{{\text{10}}{\text{.0 d}}{{\text{m}}^3}}}"><mi>p</mi><mo>=</mo><mfrac><mrow><mn>0.409</mn><mo> </mo><mtext>mol</mtext><mo>×</mo><mtext>8</mtext><msup><mtext>.31 J K</mtext><mrow><mo>−</mo><mn>1</mn></mrow></msup><mtext>mo</mtext><msup><mtext>l</mtext><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>×</mo><mrow><mo>(</mo><mn>127</mn><mo>+</mo><mn>273</mn><mo>)</mo><mo> </mo></mrow><mtext>K</mtext></mrow><mrow><mtext>10</mtext><mtext>.0 d</mtext><msup><mtext>m</mtext><mn>3</mn></msup></mrow></mfrac></math></span>» = 136 «kPa» ✔</span></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any <strong>two</strong> of:</em><br>nitrogen non-polar/London/dispersion forces <em><strong>AND</strong> </em>water polar/H-bonding ✔<br>water has «much» stronger intermolecular forces ✔<br>water molecules attract/condense/occupy smaller volume «and therefore deviate from ideal behaviour» ✔</span></p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">2Na (s) + 2H<sub>2</sub>O (l) → 2NaOH (aq) + H<sub>2 </sub>(g) ✔</span></p>
<p><span style="background-color: #ffffff;">hydrogen explosive<br><em><strong>OR</strong></em><br>highly exothermic reaction<br><em><strong>OR</strong></em><br>sodium reacts violently with water<br><em><strong>OR</strong></em><br>forms strong alkali ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept the equation of combustion of hydrogen.<br>Do <strong>not</strong> accept just “sodium is reactive/dangerous”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(iv).</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>Propan-2-ol is a useful organic solvent.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the structural formula of propan-2-ol.</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 number of hydrogen atoms in 1.00 g of propan-2-ol.</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>Classify propan-2-ol as a primary, secondary or tertiary alcohol, 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>State a suitable oxidizing agent for the oxidation of propan-2-ol in an acidified aqueous 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 the average oxidation state of carbon in propan-2-ol.</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>Deduce the product of the oxidation of propan-2-ol with the oxidizing agent in (d)(i).</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>CH<sub>3</sub>CH(OH)CH<sub>3</sub></p>
<p> </p>
<p><em>Accept the full or condensed structural formula.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.00\,{\text{g}}}}{{\left( {12.01 \times 3 + 1.01 \times 8 + 16.00} \right)\,{\text{g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}} = ">
<mfrac>
<mrow>
<mn>1.00</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mo>(</mo>
<mrow>
<mn>12.01</mn>
<mo>×</mo>
<mn>3</mn>
<mo>+</mo>
<mn>1.01</mn>
<mo>×</mo>
<mn>8</mn>
<mo>+</mo>
<mn>16.00</mn>
</mrow>
<mo>)</mo>
</mrow>
<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>
<mo>=</mo>
</math></span><strong>»</strong> 0.0166 <strong>«</strong>mol CH<sub>3</sub>CH(OH)CH<sub>3</sub><strong>» </strong>✔</p>
<p><strong>«</strong>0.0166 mol × 6.02 × 10<sup>23</sup> molecules mol<sup>−1</sup> × 8 atoms molecule<sup>−1</sup> =<strong>»</strong> 8.01 × 10<sup>22</sup> <strong>«</strong>atoms of hydrogen<strong>»</strong> ✔ </p>
<p> </p>
<p><em>Accept answers in the range 7.99 × 10<sup>22 </sup>to 8.19 × 10<sup>22</sup>.</em></p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>secondary <em><strong>AND</strong> </em>OH/hydroxyl is attached to a carbon bonded to one hydrogen</p>
<p><em><strong>OR</strong></em></p>
<p>secondary <em><strong>AND</strong></em> OH/hydroxyl is attached to a carbon bonded to two C/R/alkyl/CH<sub>3</sub> «groups» ✔</p>
<p> </p>
<p><em>Accept “secondary <strong>AND</strong> OH is attached to the second carbon in the chain”.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«potassium/sodium» manganate(VII)/permanganate/KMnO<sub>4</sub>/NaMnO<sub>4</sub>/MnO<sub>4</sub><sup>−</sup></p>
<p><em><strong>OR</strong></em></p>
<p>«potassium/sodium» dichromate(VI)/K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>/Na<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>/Cr<sub>2</sub>O<sub>7</sub><sup>2−</sup> ✔</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>−2 ✔</p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>propanone/propan-2-one/CH<sub>3</sub>COCH<sub>3</sub> ✔</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.</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>When heated in air, magnesium ribbon reacts with oxygen to form magnesium oxide.</p>
</div>
<div class="specification">
<p>The reaction in (a)(i) was carried out in a crucible with a lid and the following data was recorded:</p>
<p style="text-align: right;">Mass of crucible and lid = 47.372 ±0.001 g</p>
<p style="text-align: right;">Mass of crucible, lid and magnesium ribbon before heating = 53.726 ±0.001 g</p>
<p style="text-align: right;">Mass of crucible, lid and product after heating = 56.941 ±0.001 g</p>
<p style="text-align: left;"> </p>
</div>
<div class="specification">
<p>When magnesium is burnt in air, some of it reacts with nitrogen to form magnesium nitride according to the equation:</p>
<p style="text-align: center;">3 Mg (s) + N<sub>2 </sub>(g) → Mg<sub>3</sub>N<sub>2 </sub>(s)</p>
</div>
<div class="specification">
<p>The presence of magnesium nitride can be demonstrated by adding water to the product. It is hydrolysed to form magnesium hydroxide and ammonia.</p>
</div>
<div class="specification">
<p>Most nitride ions are <sup>14</sup>N<sup>3–</sup>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Write a balanced equation for the reaction that occurs.</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 the block of the periodic table in which magnesium is located.</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>Identify a metal, in the same period as magnesium, that does <strong>not</strong> form a basic oxide.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the amount of magnesium, in mol, that was used.</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 percentage uncertainty of the mass of product after heating.</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>Assume the reaction in (a)(i) is the only one occurring and it goes to completion, but some product has been lost from the crucible. Deduce the percentage yield of magnesium oxide in the crucible.</p>
<p> </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>Evaluate whether this, rather than the loss of product, could explain the yield found in (b)(iii).</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>Suggest an explanation, other than product being lost from the crucible or reacting with nitrogen, that could explain the yield found in (b)(iii).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate coefficients that balance the equation for the following reaction.</p>
<p style="text-align:center;">__ Mg<sub>3</sub>N<sub>2 </sub>(s) + __ H<sub>2</sub>O (l) → __ Mg(OH)<sub>2 </sub>(s) + __ NH<sub>3 </sub>(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 oxidation state of nitrogen in Mg<sub>3</sub>N<sub>2</sub> and in NH<sub>3</sub>.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAtUAAABsCAYAAACl6U7/AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAjlSURBVHhe7d1/bJT1HQfwD44wMzoENBlh9eYkjFAWVqtlcRh/wBhmKmOYLCRmhGlRo4h22SRBZ8iGJISFTg3GCGpDtui2QDriDM7g2DJQx6yNczWsgWEhS7cZJKwuhDRld+1DKS1SyrdUr329kkuf5/u9e+77XP953+V9z404nhcAAMA5uyD7CwAAnCOhGgAAEgnVAACQSKgGAIBEXV9UzOVKOwYAAIAza24+mG11OuXqH4Vg3fMOAADASafLzOofAACQSKgGAIBEQjUAACQSqgEAIJFQDQAAiYRqAABIJFQDAEAioRoAABIJ1QAAkEioBgCAREI1AAAkEqoBACCRUA0AAImEagAASCRUAwBAIqEaAAASCdUAAJBIqAYAgETFF6rb6qOmvDRyuSkxr3ZPtGfDXdr3RO28Kfn56VFVdyAbPBetUV8zN3+cb0dN/eFs7IS2aKlbGrnydVHflg0BADBsFfEn1R9Gw5bXYm+PVN2+97XY0vBhtjcQdkfNik1R39orvgMAQIeiDdWjy6bFlxpeiZ17j2YjBUdj785Xoqkwl40MiMb1sWLDm9Ga7QIAQHdFG6o/Pft7cdc334stO987WQFpfy92bmmJBQtvicuyoU7HomX3U1E1tVAbyd+m3hFr194RU3NLo66lj/7G+IVRfU9ZNNasjg29aiB9aKmLqvzzldfUh5YIAMDQVbz1j5GTYvbCWdHUrQLSUf1omhlzrp7YOdChPVrrn4rFtz4bsfzlaGzeF3/eVBl7nn05zq4kMjGuu3tFVJc19r8GMmF+bGw+GA3VFTEyGwIAYOgp4k71p2JMxaxY0HSiAnI4Gl78TTQtmBUVF3U/rUPxl82/isbye2L5omlREqNiQuXiWL78umz+LJRcGUtW3xtlaiAAAJxGEYfqvDFfjjkLWjorIEcaYvPTEXfeWh5jsukObc3x1m/3x/gbpscXu852VHzuskkxOtvr2wVRUrEoVlefYw0EAIAhrbhDdYyPijkzo2nLn+LN3a/GlsnfipvLx2ZzA21sVCw5UQN5Ll4/rCUNAECnIg/VF2QVkOfiR2u3xeQFV8eknmc0MhdX3HRZHPr92/GPrjr0sfjX/r0nO9XtLbH78cIXF0sjd+Oq2NFyLJvooasG8lgse+TFbLDgWLTsWBU3Fh6fmxFVj++KFlfgAwAYNoo8VOd1VEAiGhsnx4KZXzjNCY2Pq279TpQ1PBlrNv0tWgtfXNzz61iz5g/ZfOELjtviJy99JX7R+PfYvvDdeOD5dz7iah0naiCV2X7myK544oH/xN2v74vmxvUx7aWnY9spl/oDAGAoK/5Q3VEBmRWjy+fEzEkXZmPdFYLw3VG7+faINXOjLJeLsvvfiWkLrsjm8/eYvDi2blsWFSXH4r8ftEVu3OgzvDAnaiDdGtljro9HGx6L+RNHRXxmTIzL/+kw0JfU6/N4B6KuavqZf+mxz2NkvxaZmxs19R/1lcyBeJ5PyloH63yttbdBWuugnG+etfYwxNbqf9PbkFrrIJ2vtfbW5zGKx4jjedl2/sUtjebmg9neUHY0mmrviNlrJsWmN1bG9WMKEbrwj78plu2sjB9sejSWVk44h3cchRrIunj41cpYtXJ2TBgCb1kAADjV6TLzMIh978eOh67p1pVuj9ambVH7wl+j7M5b4qqOQF1waczf+Hbs335LNC55Mv54pL+l6EKt5Jex8oXPxw8fvEGgBgAYRoZB9Lskrr2vJh698o1YNOPy/DuLXJTNfibitmei9v7KKMmH4SM7HompVXXRkr/3BSVj4+LOB/bDkdhTe09cszai+qe3xZQSiRoAYDgZpvWPHtr/GTtW3hWLat+KGD233/WP9qbamD/74WjI9iOmRXXd5qiuKMn2AQAYKk6XmYVqAADoh2HaqQYAgPNLqAYAgERCNQAAJBKqAQAgkVANAACJhGoAAEgkVAMAQCKhGgAAEgnVAACQSKgGAIBEQjUAACQSqgEAIJFQDQAAiYRqAABIJFQDAEAioRoAABIJ1QAAkEioBgCAREI1AAAkEqoBACCRUA0AAImKLlS31a+L8tyUuLFmd7RmY11a6qIqNzdq6k/MHIi6qulRXlMfbdlIl7b6qCkvPf0cAAD0Q5F+Uv1hNNasjg31h7N9AAD4+BRx/WN31KzYFPWt7dk+AAB8PIo0VE+J71bfHmWN62PFhjd710AGTGd9JFe+Lup1RAAA+AhFGqpHxiXXLYnV1WXnuQZyaczf+HY0N3w/KkZmQwAA0EMR1z/GRcWSFVFd1thnDeRQzby4PFcaue63y+dFzaHsDgAAkKCIQ3VeyZWxZPW9fdZAxldvjX3NB6O5+23f1qgen90BAAASFHeozi+/pGLRyRrI6//OxgEAYPAUeaguGHuyBrLsx/G7bLS/2lt2xeNVMyJXuAb2I9ujxUVFAAA4S0MgVOedqIFku/13NPZuezpemrY+GvdvjYUNP4vnG87fNUUAABhahkao7qqBVGb7/XVhTF5cG9vyjy/535H44NjFMe6zhct9DNQl9dqipW5p5E75tceezuK5On4x8ky/AnkWzzMQxxiQtQ7S+Vprb4Oy1sE6X2vtzVp7+aQco5jOd9itdZDO11p76/MYxWPE8bxsO//ilnZ8iW/YKvxjZyyNnd94ODatuj0qJ4zKJgAAoNPpMvMQ+aR6gEyYHxub98X2m9+NJU/siiPZMAAAnIlQ3eH92PHQ3KiqO5DfHhklYy/qHAYAgLMgVHe4JK6978GY+NTXI5fLxVd/PjE23Pe1GJPNAgDAmehUAwBAP+hUAwDAeSBUAwBAIqEaAAASCdUAAJBIqAYAgERCNQAAJBKqAQAgkVANAACJhGoAAEgkVAMAQCKhGgAAEgnVAACQSKgGAIBEQjUAACQSqgEAIJFQDQAAiYRqAABIJFQDAEAioRoAABIJ1QAAkEioBgCAREI1AAAkEqoBACCRUA0AAIlGHM8rbORypR0DAADAmTU3H8y2OnWFagAA4NyofwAAQCKhGgAAEgnVAACQSKgGAIAkEf8H3yT+4rC3fvMAAAAASUVORK5CYII="></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>Deduce, giving reasons, whether the reaction of magnesium nitride with water is an acid–base reaction, a redox reaction, neither or both.</p>
<p><img src="data:image/png;base64,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"></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>State the number of subatomic particles in this ion.</p>
<p><img src="data:image/png;base64,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"></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>Some nitride ions are <sup>15</sup>N<sup>3–</sup>. State the term that describes the relationship between <sup>14</sup>N<sup>3–</sup> and <sup>15</sup>N<sup>3–</sup>.</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 nitride ion and the magnesium ion are isoelectronic (they have the same electron configuration). Determine, giving a reason, which has the greater ionic radius.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> reasons why atoms are no longer regarded as the indivisible units of matter.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the types of bonding in magnesium, oxygen and magnesium oxide, and how the valence electrons produce these types of bonding.</p>
<p><img 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" width="644" height="367"></p>
<div class="marks">[4]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>2 Mg(s) + O<sub>2</sub>(g) → 2 MgO(s) ✔</p>
<p><em><br>Do not accept equilibrium arrows. Ignore state symbols</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>s ✔</p>
<p><em><br>Do not allow group 2</em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>aluminium/Al ✔</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>⟨</mo><mo>⟨</mo><mfrac><mrow><mn>53</mn><mo>.</mo><mn>726</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>-</mo><mn>47</mn><mo>.</mo><mn>372</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>244</mn><mo>.</mo><mn>31</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mfrac><mrow><mn>6</mn><mo>.</mo><mn>354</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>24</mn><mo>.</mo><mn>31</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>2614</mn><mo> </mo></math> «mol» ✔</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mass of product <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mo>=</mo><mn>56</mn><mo>.</mo><mn>941</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>-</mo><mn>47</mn><mo>.</mo><mn>372</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>»</mo><mo>=</mo><mn>9</mn><mo>.</mo><mn>569</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">g</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mtext>⟨⟨100 × </mtext><mfrac><mrow><mn>2</mn><mo>×</mo><mn>0</mn><mo>.</mo><mn>001</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>9</mn><mo>.</mo><mn>569</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow></mfrac><mtext>=0.0209⟩⟩ = 0.02 «%»</mtext></math> ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer </em></p>
<p><em>Accept 0.021%</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>⟨</mo><mo>⟨</mo><mo> </mo><mn>0</mn><mo>.</mo><mn>2614</mn><mo> </mo><mi>mol</mi><mo> </mo><mo>×</mo><mo> </mo><mo>(</mo><mn>24</mn><mo>.</mo><mn>31</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>+</mo><mn>16</mn><mo>.</mo><mn>00</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>)</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>2614</mn><mo> </mo><mi>mol</mi><mo>×</mo><mn>40</mn><mo>.</mo><mn>31</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>10</mn><mo>.</mo><mn>536</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">g</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⟨</mo><mo>⟨</mo><mn>100</mn><mo>×</mo><mfrac><mrow><mn>9</mn><mo>.</mo><mn>569</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>10</mn><mo>.</mo><mn>536</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow></mfrac><mo>=</mo><mo> </mo><mn>90</mn><mo>.</mo><mn>822</mn><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>91</mn><mo> </mo><mo>«</mo><mo>%</mo><mo>»</mo></math> ✔</p>
<p> </p>
<p><em>Award «0.2614 mol x 40.31 g mol<sup>–1</sup>»</em></p>
<p><em>Accept alternative methods to arrive at the correct answer.</em></p>
<p><em>Accept final answers in the range 91-92%</em></p>
<p><em><strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>yes<br><em><strong>AND</strong></em><br>«each Mg combines with <math xmlns="http://www.w3.org/1998/Math/MathML"><mstyle displaystyle="false"><mfrac bevelled="true"><mn>2</mn><mn>3</mn></mfrac></mstyle></math> N, so» mass increase would be 14x<math xmlns="http://www.w3.org/1998/Math/MathML"><mstyle displaystyle="false"><mfrac bevelled="true"><mn>2</mn><mn>3</mn></mfrac></mstyle></math> which is less than expected increase of 16x<br><em><strong>OR</strong></em><br>3 mol Mg would form 101g of Mg<sub>3</sub>N<sub>2</sub> but would form 3 x MgO = 121 g of MgO<br><em><strong>OR</strong></em><br>0.2614 mol forms 10.536 g of MgO, but would form 8.796 g of Mg<sub>3</sub>N<sub>2</sub> ✔</p>
<p> </p>
<p><em>Accept Yes <strong>AND</strong> “the mass of N/N<sub>2</sub> that combines with each g/mole of Mg is lower than that of O/O<sub>2</sub>”</em></p>
<p><em>Accept YES<strong> AND</strong> “molar mass of nitrogen less than of oxygen”.</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>incomplete reaction<br><em><strong>OR</strong></em><br>Mg was partially oxidised already<br><em><strong>OR</strong></em><br>impurity present that evaporated/did not react ✔</p>
<p> </p>
<p><em>Accept “crucible weighed before fully cooled”.</em></p>
<p><em>Accept answers relating to a higher atomic mass impurity consuming less O/O<sub>2</sub>.</em></p>
<p><em>Accept “non-stoichiometric compounds formed”.</em></p>
<p><em>Do <strong>not</strong> accept "human error", "wrongly calibrated balance" or other non-chemical reasons.</em></p>
<p><em>If answer to (b)(iii) is >100%, accept appropriate reasons, such as product absorbed moisture before being weighed.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«1» Mg<sub>3</sub>N<sub>2 </sub>(s) + <strong>6</strong> H<sub>2</sub>O (l) → <strong>3</strong> Mg(OH)<sub>2 </sub>(s) + <strong>2</strong> NH<sub>3 </sub>(aq)</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Mg<sub>3</sub>N<sub>2</sub>: -3</em><br><strong><em>AND</em></strong><br><em>NH<sub>3</sub>: -3 ✔</em></p>
<p><em><br>Do not accept 3 or 3-</em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Acid–base:</em><br>yes <strong>AND</strong> N<sup>3-</sup> accepts H<sup>+</sup>/donates electron pair«s»<br><strong><em>OR</em></strong><br>yes <strong>AND</strong> H<sub>2</sub>O loses H<sup>+</sup> «to form OH<sup>-</sup>»/accepts electron pair«s» ✔</p>
<p><em>Redox:</em><br>no <strong>AND</strong> no oxidation states change ✔</p>
<p> </p>
<p><em>Accept “yes <strong>AND</strong> proton transfer takes place”</em></p>
<p><em>Accept reference to the oxidation state of specific elements not changing.</em></p>
<p><em>Accept “not redox as no electrons gained/lost”.</em></p>
<p><em>Award <strong>[1 max]</strong> for Acid–base: yes <strong>AND</strong> Redox: no without correct reasons, if no other mark has been awarded</em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Protons</em>: 7 <em><strong>AND</strong> Neutrons</em>: 7 <em><strong>AND</strong> Electrons</em>: 10 ✔</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration:underline;">isotope</span>«s» ✔</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>nitride <em><strong>AND</strong> </em>smaller nuclear charge/number of protons/atomic number ✔</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em><br><br>subatomic particles «discovered»<br><em><strong>OR</strong></em><br>particles smaller/with masses less than atoms «discovered»<br><em><strong>OR</strong></em><br>«existence of» isotopes «same number of protons, different number of neutrons» ✔</p>
<p><br>charged particles obtained from «neutral» atoms<br><em><strong>OR</strong></em><br>atoms can gain or lose electrons «and become charged» ✔</p>
<p><br>atom «discovered» to have structure ✔</p>
<p><br>fission<br><em><strong>OR</strong></em><br>atoms can be split ✔</p>
<p> </p>
<p><em>Accept atoms can undergo fusion «to produce heavier atoms»</em></p>
<p><em>Accept specific examples of particles.</em></p>
<p><em>Award <strong>[2]</strong> for “atom shown to have a nucleus with electrons around it” as both M1 and M3.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p><em><br>Award <strong>[1]</strong> for all bonding types correct.</em></p>
<p><em>Award <strong>[1]</strong> for <strong>each</strong> correct description.</em></p>
<p><em>Apply ECF for M2 only once.</em></p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was not as well done as one might have expected with the most common errors being O instead of O<sub>2</sub> oxygen and MgO rather than MgO<sub>2</sub>.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students did not know what "block" meant, and often guessed group 2 etc.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students confused "period" and "group" and also many did not read metal, so aluminium was not chosen by the majority.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A number of students were not able to interpret the results and hence find the gain in mass and calculate the moles correctly.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only a handful could work out the correct answer. Most had no real idea and quite a lot of blank responses. There also seems to be significant confusion between "percent uncertainty" and "percent error".</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was not well answered, but definitely better than the previous question with quite a few gaining some credit for correctly determining the theoretical yield.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This proved to be a very difficult question to answer in the quantitative manner required, with hardly any correct responses.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Quite a few students realised that incomplete reaction would lead to this, but only 30% of students gave a correct answer rather than a non-specific guess, such as "misread balance" or "impurities".</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was generally very well done with almost all candidates being able to determine the correct coefficients.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About 40% of students managed to correctly determine both the oxidation states, as -3, with errors being about equally divided between the two compounds.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Probably only about 10% could explain why this was an acid-base reaction. Rather more made valid deductions about redox, based on their answer to the previous question.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates could answer the question about subatomic particles correctly.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Identification of isotopes was answered correctly by most students.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In spite of being given the meaning of "isoelectronic", many candidates talked about the differing number of electrons and only about 30% could correctly analyse the situation in terms of nuclear charge.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question was marked quite leniently so that the majority of candidates gained at least one of the marks by mentioning a subatomic particle. A significant number read "indivisible" as "invisible" however.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About a quarter of the students gained full marks and probably a similar number gained no marks. Metallic bonding was the type that seemed least easily recognised and least easily described. Another common error was to explain ionic bonding in terms of attraction of ions rather than describing electron transfer.</p>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Magnesium is a group 2 metal which exists as a number of isotopes and forms many compounds.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the nuclear symbol notation, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_Z^AX">
<msubsup>
<mrow>
</mrow>
<mi>Z</mi>
<mi>A</mi>
</msubsup>
<mi>X</mi>
</math></span>, for magnesium-26.</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>Mass spectroscopic analysis of a sample of magnesium gave the following results:</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Calculate the relative atomic mass, <em>A</em><sub>r</sub>, of this sample of magnesium to two decimal places.</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>Magnesium burns in air to form a white compound, magnesium oxide. Formulate an equation for the reaction of magnesium oxide 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 trend in acid-base properties of the oxides of period 3, sodium to chlorine.</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>In addition to magnesium oxide, magnesium forms another compound when burned in air. Suggest the formula of this compound</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>Describe the structure and bonding in solid magnesium oxide.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Magnesium chloride can be electrolysed.</p>
<p>Deduce the half-equations for the reactions at each electrode when <strong>molten</strong> magnesium chloride is electrolysed, showing the state symbols of the products. The melting points of magnesium and magnesium chloride are 922 K and 987 K respectively.</p>
<p>Anode (positive electrode):</p>
<p>Cathode (negative electrode):</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{12}^{26}{\rm{Mg}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>12</mn>
</mrow>
<mrow>
<mn>26</mn>
</mrow>
</msubsup>
<mrow>
<mrow>
<mi mathvariant="normal">M</mi>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</math></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Ar =»<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{24 \times 78.60 + 25 \times 10.11 + 26 \times 11.29}}{{100}}">
<mfrac>
<mrow>
<mn>24</mn>
<mo>×</mo>
<mn>78.60</mn>
<mo>+</mo>
<mn>25</mn>
<mo>×</mo>
<mn>10.11</mn>
<mo>+</mo>
<mn>26</mn>
<mo>×</mo>
<mn>11.29</mn>
</mrow>
<mrow>
<mn>100</mn>
</mrow>
</mfrac>
</math></span></p>
<p>«= 24.3269 =» 24.33</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em><br><em>Do <strong>not</strong> accept data booklet value (24.31).</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>MgO(s) + H<sub>2</sub>O(l) → Mg(OH)<sub>2</sub>(s)</p>
<p><em><strong>OR</strong></em></p>
<p>MgO(s) + H<sub>2</sub>O(l) → Mg<sup><sub>2</sub>+</sup>(aq) + 2OH<sup>–</sup>(aq)</p>
<p><em>Accept</em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span>.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>from basic to acidic</p>
<p>through amphoteric</p>
<p><em>Accept “alkali/alkaline” for “basic”. <br>Accept “oxides of Na and Mg: basic <strong>AND</strong> oxide of Al: amphoteric” for M1. <br>Accept “oxides of non-metals/Si to Cl acidic” for M2. <br>Do <strong>not</strong> accept just “become more acidic”</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mg<sub>3</sub>N<sub>2</sub></p>
<p><em>Accept MgO<sub>2</sub>, Mg(OH)<sub>2</sub>, Mg(NOx)<sub>2</sub>, MgCO<sub>3</sub>.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«3-D/giant» regularly repeating arrangement «of ions»<br><em><strong>OR <br></strong></em>lattice «of ions»<br><em>Accept “giant” for M1, unless “giant covalent” stated.</em></p>
<p>electrostatic attraction between oppositely charged ions<br><em><strong>OR<br></strong></em>electrostatic attraction between Mg<sup>2+</sup> and O<sup>2–</sup> ions<br><em>Do <strong>not</strong> accept “ionic” without description.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Anode (positive electrode):<br></em>2Cl<sup>–</sup> → Cl<sub>2</sub>(g) + 2e<sup>–</sup></p>
<p><em>Cathode (negative electrode):<br></em>Mg<sup>2+</sup> + 2e<sup>–</sup> → Mg(l)</p>
<p><em>Penalize missing/incorrect state symbols at Cl<sub>2</sub> and Mg once only.<br>Award <strong>[1 max]</strong> if equations are at wrong electrodes.<br>Accept Mg (g).</em></p>
<p> </p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Biochemical oxygen demand (BOD) can be determined by the Winkler Method.</p>
</div>
<div class="specification">
<p>A 25.00 cm<sup>3</sup> sample of water was treated according to the Winkler Method.</p>
<p style="padding-left: 60px;">Step I: 2Mn<sup>2+ </sup>(aq) + O<sub>2 </sub>(g) + 4OH<sup>− </sup>(aq) → 2MnO<sub>2 </sub>(s) + 2H<sub>2</sub>O (l)</p>
<p style="padding-left: 60px;">Step II: MnO<sub>2 </sub>(s) + 2I<sup>− </sup>(aq) + 4H<sup>+ </sup>(aq) → Mn<sup>2+ </sup>(aq) + I<sub>2 </sub>(aq) + 2H<sub>2</sub>O (l)</p>
<p style="padding-left: 60px;">Step III: 2S<sub>2</sub>O<sub>3</sub><sup>2− </sup>(aq) + I<sub>2 </sub>(aq) → 2I<sup>− </sup>(aq) + S<sub>4</sub>O<sub>6</sub><sup>2− </sup>(aq)</p>
<p>The iodine produced was titrated with 37.50 cm<sup>3</sup> of 5.000 × 10<sup>−4 </sup>mol dm<sup>−3</sup> Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub>.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline what is measured by BOD.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A student dissolved 0.1240 ± 0.0001 g of Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> to make 1000.0 ± 0.4 cm<sup>3</sup> of solution to use in the Winkler Method.</p>
<p>Determine the percentage uncertainty in the molar concentration.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the amount, in moles of Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> used in the titration.</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>Deduce the mole ratio of O<sub>2</sub> consumed in step I to S<sub>2</sub>O<sub>3</sub><sup>2−</sup> used in step III.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the concentration of dissolved oxygen, in mol dm<sup>−3</sup>, in the sample.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The three steps of the Winkler Method are redox reactions.</p>
<p>Deduce the reduction half-equation for step II.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«amount of» oxygen used to decompose the organic matter in water ✔</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" class="wrs_chemistry"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>0001</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>1240</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo><mo>=</mo></math>» 0.08 «%»<br><em><strong>OR</strong></em><br>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>4</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mrow><mn>1000</mn><mo>.</mo><mn>0</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo><mo>=</mo></math>» 0.04 «%» ✔</p>
<p><br>«0.08 % + 0.04 % =» 0.12/0.1 «%» ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept fractional uncertainties for <strong>M1</strong>, i.e., 0.0008 <strong>OR</strong> 0.0004.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>37</mn><mo>.</mo><mn>50</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mn>1000</mn></mfrac></math>× 5.000 × 10<sup>−4</sup> mol dm<sup>−3</sup> =» 1.875 × 10<sup>−5</sup> «mol» ✔</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1:4 ✔</p>
<p><em>Accept “4 mol S<sub>2</sub>O<sub>3</sub><sup>2–</sup> :1 mol O<sub>2</sub>“, but not just 4:1.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn><mo>.</mo><mn>875</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>5</mn></mrow></msup><mo> </mo><mi>mol</mi><mo>×</mo><mfrac><mn>1</mn><mn>4</mn></mfrac><mo>=</mo></math>» 4.688 × 10<sup>−6 </sup>«mol» ✔</p>
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>4</mn><mo>.</mo><mn>688</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>6</mn></mrow></msup><mo> </mo><mi>mol</mi></mrow><mstyle displaystyle="true"><mfrac><mrow><mn>25</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mn>1000</mn></mfrac></mstyle></mfrac><mo>=</mo></math>» 1.875 × 10<sup>−4 </sup>«mol dm<sup>−3</sup>» ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>MnO<sub>2 </sub>(s) + 2e<sup>−</sup> + 4H<sup>+ </sup>(aq) → Mn<sup>2+ </sup>(aq) + 2H<sub>2</sub>O (l) ✔</p>
<div class="question_part_label">c(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iv).</div>
</div>
<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><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>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>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>Sodium thiosulfate solution reacts with dilute hydrochloric acid to form a precipitate of sulfur at room temperature.</p>
<p style="text-align: center;">Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> (aq) + 2HCl (aq) → S (s) + SO<sub>2 </sub>(g) + 2NaCl (aq) + X</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the formula and state symbol of X.</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>Suggest why the experiment should be carried out in a fume hood or in a well-ventilated laboratory.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The precipitate of sulfur makes the mixture cloudy, so a mark underneath the reaction mixture becomes invisible with time.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>10.0 cm<sup>3</sup> of 2.00 mol dm<sup>-3</sup> hydrochloric acid was added to a 50.0 cm<sup>3</sup> solution of sodium thiosulfate at temperature, T1. Students measured the time taken for the mark to be no longer visible to the naked eye. The experiment was repeated at different concentrations of sodium thiosulfate.</p>
<p><img 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" alt></p>
<p>Show that the hydrochloric acid added to the flask in experiment 1 is in excess.</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 best fit line of <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{\rm{t}}}">
<mfrac>
<mn>1</mn>
<mrow>
<mrow>
<mi mathvariant="normal">t</mi>
</mrow>
</mrow>
</mfrac>
</math></span> against concentration of sodium thiosulfate on the axes provided.</p>
<p><img 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" alt></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>A student decided to carry out another experiment using 0.075 mol dm<sup>-3</sup> solution of sodium thiosulfate under the same conditions. Determine the time taken for the mark to be no longer visible.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>An additional experiment was carried out at a higher temperature, T<sub>2</sub>.</p>
<p>(i) On the same axes, sketch Maxwell–Boltzmann energy distribution curves at the two temperatures T<sub>1</sub> and T<sub>2</sub>, where T<sub>2 </sub>> T<sub>1</sub>.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>(ii) Explain why a higher temperature causes the rate of reaction to increase.</p>
<div class="marks">[4]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest one reason why the values of rates of reactions obtained at higher temperatures may be less accurate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>H<sub>2</sub>O <em><strong>AND</strong></em> (l)<br><em>Do <strong>not</strong> accept H<sub>2</sub>O (aq).</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>SO<sub>2</sub> (g) is an irritant/causes breathing problems<br><em><strong>OR<br></strong></em>SO<sub>2</sub> (g) is poisonous/toxic</p>
<p><em>Accept SO<sub>2</sub> (g) is acidic, but do not accept “causes acid rain”.<br>Accept SO<sub>2</sub> (g) is harmful.<br>Accept SO<sub>2</sub> (g) has a foul/pungent smell.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>n(HCl) = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{10.0}}{{1000}}">
<mfrac>
<mrow>
<mn>10.0</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span>dm<sup>3</sup> × 2.00 mol dm<sup>-3</sup> =» 0.0200 / 2.00 × 10<sup>-2</sup>«mol»<br><em><strong>AND</strong></em><br>n(Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub>) = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{50}}{{1000}}">
<mfrac>
<mrow>
<mn>50</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span>dm<sup>3</sup> × 0.150 mol × dm<sup>-3</sup> =» 0.00750 / 7.50 × 10<sup>-3</sup> «mol»</p>
<p>0.0200 «mol» > 0.0150 «mol»<br><em><strong>OR</strong></em><br>2.00 × 10<sup>-2</sup>«mol» > 2 × 7.50 × 10<sup>-3</sup> «mol»<br><em><strong>OR</strong></em><br><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> × 2.00 × 10<sup>-2</sup> «mol» > 7.50 × 10<sup>-3</sup> «mol»</p>
<p><em>Accept answers based on volume of solutions required for complete reaction.</em><br><em>Award <strong>[2]</strong> for second marking point.</em><br><em>Do <strong>not</strong> award M2 unless factor of 2 (or half) is used.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p>five points plotted correctly<br>best fit line drawn with ruler, going through the origin</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p>22.5 × 10<sup>-3</sup> «s<sup>-1</sup>»</p>
<p>«Time = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{22.5 \times {{10}^{ - 3}}}}">
<mfrac>
<mn>1</mn>
<mrow>
<mn>22.5</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 44.4 «s»</p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em><br><em>Accept value based on candidate’s graph.</em><br><em>Award M2 as ECF from M1.</em><br><em>Award <strong>[1 max]</strong> for methods involving taking</em> mean of appropriate pairs of <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{\rm{t}}}">
<mfrac>
<mn>1</mn>
<mrow>
<mrow>
<mi mathvariant="normal">t</mi>
</mrow>
</mrow>
</mfrac>
</math></span><em> values.</em><br><em>Award <strong>[0]</strong> for taking mean of pairs of time values.</em><br><em>Award <strong>[2]</strong> for answers between 42.4 and 46.4 «s».</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i)</p>
<p><img 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" alt></p>
<p>correctly labelled axes<br>peak of T<sub>2</sub> curve lower <em><strong>AND</strong></em> to the right of T<sub>1</sub> curve</p>
<p><em>Accept “probability «density» / number of particles / N / fraction” on y-axis.</em></p>
<p><em>Accept “kinetic E/KE/E<sub>K</sub>” but <strong>not</strong> just “Energy/E” on x-axis.</em></p>
<p> </p>
<p>(ii)</p>
<p>greater proportion of molecules have <em>E </em>≥ <em>E</em><sub>a</sub> or <em>E </em>> <em>E</em><sub>a</sub><br><em><strong>OR</strong></em><br>greater area under curve to the right of the <em>E</em><sub>a</sub></p>
<p>greater frequency of collisions «between molecules»<br><em><strong>OR</strong></em><br>more collisions per unit time/second</p>
<p><img src="data:image/png;base64,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" alt></p>
<p><em>Accept more molecules have energy greater than E<sub>a</sub>.</em><br><em>Do <strong>not</strong> accept just “particles have greater kinetic energy”.</em><br><em>Accept “rate/chance/probability/likelihood/” instead of “frequency”.</em><br><em>Accept suitably shaded/annotated diagram.</em><br><em>Do <strong>not</strong> accept just “more collisions”.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>shorter reaction time so larger «%» error in timing/seeing when mark disappears</p>
<p><em>Accept cooling of reaction mixture during course of reaction.</em></p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>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>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,iVBORw0KGgoAAAANSUhEUgAAAucAAAERCAYAAADYJAlRAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACN7SURBVHhe7d1/dFTV3e/xjyMLuCSkkSKkgGOApkCoPGOAXGxYKvpgUsTcuWArVw0rSGpVuFCUyq9HFotaJZYyBQFpHyt5iLTWKszCC6tAEeoSqvwYsh5LBEckRIHwo0BDQoWGmXvO5EwyDAGDguwk7xdrFmfO7Nn77D3zx2dOvnPmurBFAAAAAK45l/M/AAAAgGuMcA4AAAAYgnAOAAAAGIJwDgAAABjivC+Eut3dnC0AAAAAX4fy8s+crQbCeeyDAAAAAK6e+PxNWQsAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYIgmGs4/lb+gn9zubhe9eXwB1UTbeeYpUOM89SurVHDDEvne+tS5f63VqMI/3ppztnyBKmffNVLhV0Hd2rdgVUFt8C3UWxUtehUAAMCX0LTPnHd4Uv5PPlN5+YW3kkkZauU0u6Iq3lbhmMXadc65j3opXr18Nde+SbA+LP15vsb4dou3CAAAuFyUtQAAAACGaHnhPFShQPEM5URLYPqMlW9DULEFIaGKbSqecV99mUzODBUHKnQ2ME+ezPFap+NaN+G22nKZT+1Sjl7KKch3+uyl3KI9CtnlL5uKNCOnl9NPpgp8fgUqzjqjOCU3+fPkjz2enJnyByudNg2xy2oWqKBPtP0M/X7bfuexqC8YO1J+Yh3zjIXyFWTWt1nwroJ71sfsu08z/Hti1ia+39rx7bUJ2Q+fV9YSLbfJl88f+5z4PuOFVBWMO4ZXfhGZb2y5TPxr1KdggTact26NXH/r+F/xjVWfun6WaFtwlzbU7bPXya9gVWSGlrOqCCyP63e983iVAr57lTnBb237NSEz1Trm9/WpU3ZUUJDtPMe55RYpGO3WFtqjotxe6jNjk3X0dl92+/HyUx4DAEDLEY5x001dnS3TlYdXjr0lfNO//TK841/OrgbFtzsR3jHPG76p9yPh+VsPhc+Fz4QPbfxZOPumgeEfr9xv3bec2hqel/2d8E3ZPwtvPHTGuv+38NKxA621eTC89KN/hsOHVobH3nRLeOzKcru1c7+r1eePw0t3/yN87tDfwjsPnQofWDkh3Nvqd+zSv4VPWc3OHfpz+JlIv/PDO07ZIznHdtN3wtnTV4Y/svbVten9THjjPyJHE+eM0+/w8PSVu61+o8dvjX/TPeF5O+yRom0uMXb0mK1+ntl4wJq3sy6ReThrc+5AeOMzw+vnHTN27XPsfjeH59trEz1ep99/m7cj/C/r36GV42r7zH4mvPKjf1hPiPaZFZ6+8ajVw4XOHVgZ/nHvBtakrl+L8xr1HvtSeKv9GkX77T0hvPKAdb8xaxC7/s/8OXzo3LnwqR3znbW0njd/s7Uvur7fCd+3dLc152ib6OP1/fb+8crwAbvbunmPC688ZB9t/Tr0HrssvPvUP8OHdm4Lv/3yg9a+6NrWOvfR0vB9l1gbAADQ/MTn76Z95vz4PHl7xJyJrLs1/OXIUNCvWb5SeaY8rfEDU+RSa6Xc+Zim5rXWmmkv653KGlVuf0u/Kb1ReVMf050praXEvsp/eavKy5crP62t01MDsnKU0ytJrpS+8rTbrkXT3pSGTdfs0X2VaD3sShmip58bp/TSRZr1RrD2TLMt4QFNnZKrtESX1SZLeaMGSNXva+fHp50GMUL7tO6VP0l5T2mKt5fVb/T4U50GlsotjR47wepn8p1drHVIlmf4/5LH3jciT/n22ri6aLB3iDroA72762jd2NWekcq73X6O3W+Gvj847eLHG5FqreUEedOSrCd00e15I61xyrR6Z3kDXxr9XHvX/VFrFLsmQzR56gNKcFrYbYJv/Eq+0gGaMiVfA+3XyOr3zslPKU9vatqiLaq8jDWIrP/kIUpxuZToydYojzVSQo4ezh9k7bPWd/AwZXeoVsm7H+pIKKg3Zi1SqecJTRn/Pevx2n7t49OauVr0zjGn04Z0UNbwO9Ursa1SPAN0x+1DrXXYrhWb9zvHYs1983qVJNyloRkdInsAAEDL07TD+UW/ELpWkzLsSBarRkd2bVeJFRaH9OsaM/Fk9R5oxdJIwDymj3e+r2rdrLSu8c+/tA593erobIcOl+mD6gSlDeoTCXC1rPD37X7qn1CtYPBQfVlHm2QltYs2aqX2yTc42w048qHeLWmjrIE9ZUVdh3P8jssZu03HJLVztl3tk9XJDpDn9R3D1Uv5q/ao/HdZOrDKL7/frxW+ccqd+RenwcUkqGNS/Yea2nEuIrRfm1dstz7oZKh3UvTgXUrKuEsj6tL5Ue169wNrwfurX/eYD0tJPTUwq4OqVwe058CXXH9XOyV3ahM3fozI+lerw5B+6h7Tb1LvDGVd9ANH1LfU113/2rrShuvJvBtV8tpaldglMc7cE0bcpYyGxgYAAC1CC0oBNTp18oT1/y75vL1jzrKnOjXCsW5Qcvsvf72R0KnjKlcbdUpud/4Ct0tSRyv7VR8+qYudZ76UmoOfyIqucVqpo7uHFatrXa2xI7XWm55VTvoQjZ72lvZZedLV/UG9NHu48/gVEKrWifJq504M59gjQqd18siZBv5qcpsmrDte26Ty6qzBuVMndcT6/7gvVz3qxrVuke8hXK4Oyhh6lxJKX9eb248rtPevWlFyo0YM/W7DH44AAECL0ILCefSs9B2aveHjLzjbHtS+g58725fP1b6D3DqjIydP15dP2E5X6piVKxM6J9edsb4crbr00IAL+q3RsfJPVBtLr97YdrnMi48v0f5hC/Xert9q0givvN4sddUpp8EV4ErQDe4EWQevU7EH7xx7RPTstudZbSiLfw2tW8mTGtjh6qzB9ZGz/gnyzN6gsvhxrdvlXUIy+heBMq1Yv1U7KGkBAACWFhXOO/UdEFfna/tcwaKH5HY/pKKgS9++9X9a8ataxyq/QjjvnKpb7PKJ9z5URd1AIVV9/N/aYZdbpH0rUgd92Tr10WCP9dEhtixDJ7V7W4mzfRXHPn1Shy8oFanSgWD8lWK+AtfNyhoxwJrgJzpQd3WU6LE7d3Wj+g6+RSpZr817Y14j50on9hVQ9t54dde/ZMVftbf+DaRQsEi5dVfpuQxJg5Q/5Q5Vr/ilnnmVkhYAANCiwrk12Z536ZFh31BJ4QtauM2+/N9ZVWwrUmHhdqVP+onuT2unpAH36dH0oyqes0SbIpfdq9SeosfUxz1YMzZFv/B3XNv3Vejk3r2qaOiXZpK+p3HPj5TWPKeZy3ZFgnSoYqNemL5IpenjNOv+tC+38K7uuueRHKn4aT1ZZPdrl5os0ZziMqeB5WqNndhVfdOtYFpXI21fktLnjP3VPszUa6ue9/xAw/QHzSlcFbk8Yd2xOy3q2iT8xXrdirTNfo2sY9m28AUVlqRr0iyv0pKv7vonlCxW4cItkeAfqtiihYWLVXJBv/ZfX45ob/DIJX6MyJpL1lB5qveo9CNKWgAAQFMP5xe9Wot1a+gn+11ueRevkn96itaMHKBUdw9ljlytztNfVdHEgbVnUxMHamLRq/p5//c1OrOH1Ve6hr72TU1ZtlTT7uwodRqkH0/O1hnf/1a/4f+l3VUNRa/W6uL9mVYte0KdXxuhdOt4UjOn6WB2ofxW0M9I/LLL7vS79GGpMNvq1zr+OaeUnXer87jtKo2d2F8/erFQeVokb7pb7tQ7NH13mn66YKI8OqoPyv5+eWeNL8LVJVdzVy1U9uHndLc1Tmrmr3Qu2yvrc0EdVxevFm9cqemdV2uk/RqlDtDINSma7n9JEzOSrRZXc/1/oY3+ieq8ZowyU+1+x2hN54kx/bay3iIPavI9J+TzZmp45EPUxbl63qYRkSvExJe0cJ1zAABaouvs6yk625FQa9fOAkaxf9woc6a0YLVe9t7k7Gwm7HIcb64Kb/m13v/5nZw5BwCghYnP3037zDmamWPaNGOw3H0eU9Ee59c+q/bI/+JvtS5hiIZndq7d12ycVcU7f9RrJel6dKSHYA4AAAjnMElH3f5/F2jBo/9S4dD02vKk9Fwt0UgtW/Uzebu0dto1A/ZfA+yypNHvq/+COfpRpBwHAAC0dJS1AAAAANcIZS0AAACAoQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhmkE4r1LAly23e7z8FTXOvniNaFMTkM/TTe4CvyqcXfFqAvPkcfdTgf9TZ8+FvrjN13e8V2ZOTe14zZoTx3t1j9eoOTW14zVqTi30PXOF5tQy3zNXaE4t9D1zZebU9N4zTcV1YYuzbS1eN5WXf+bcAwAAAHA1xedvyloAAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQzTNcF4TkM/TTW63deszU5sqQ84D9ULBIuXaj7uz5QtUOXu/QIVfBdZzPL6AapxdV921GLOpqApqg2+h3qpgZQAAQMvQ9M+cV7+t9YHjzp2oz7V383qVOPfQFNWo4s/zNca3W+ecPQAAAM1d0w7n3+mr9ISj+qDs7zrv3HlovzavCCo9PdXZAQAAAJivaYfz1Ps0asSNKlnxV+2NSeehvX/ViuAQjfrhd509jqqgNhXNUE6k3MUuiRkrnz+gigurYhxnVRFYrhk5vWrbuzNV4FuvYFXsE+Lb9FLOjOUKVJy9SMnKp/IX9JPbM0+BBqs1KhXcVBTTn3XLmaHiQIXzAcR5fk6+CqJtcosUbGgOkbKQsepTd1wL5SvIPG/sUMU2Fc+4r26sPgULtCFYWftgRMjqZpOKzmszT/4LjmeGXqkby26zRNuCu+LG95+3dhcfu0oB373KnOC3tv2akJlau4aR9bT6Kcivfw3tW/z8Q3tUlNtLfWZsslbT7ivbajdefspjAACA4Zp4WUsX3Tb0LiWUrNfmvZ87+47pnaKXFRzx77qtQytnnyVULv/khzS68O8atb5U5eWfaOtL3bV2wv9R/vxtVoSLZ4XSwBLle+fr8LCl2lr2mcq2Pq8ua8crd/IqHYyEwWib2dqRudhqU67S9f+hbiumyPvo7xS87HqMszrof0a5o9/U9VM3qqzcHvN1Te62XjMeWqx3YmvrS0ulUStUWrZdq2bnqGf8K+nMd8zarnp+gzXfso2aev1a+dYddBpYqrZpfv7Deu7wvXpz6ydWm616qct6jcl9Rv6D1ocLS+jgKk3OfViFh3+o9aXlTpuNmuB9XPMDJyNtIkrf0OsnHtRGew38T+vmdc9q5N1j9Pvrx1r7rLVelicVT9FTbwRrQ/0lx26tjEmrtXWB12ro1YKtZSqZlKHaV7NapZvbRl7Dsq1+/fxhj3Te628ds/3hrORGjRj6XSUp0eprrfV6L5Q3Jeb9AAAAYKAmHs5d+kbGXRqRsF0rNu+vDX2Vf9P6FbKC2S36RqSNLaTKd17WtDXSsOena3SvJGtfa6XcOV7PTUpXqe9XeiNYH+4iQkG9MWuRSj1PaMr47ynFWilXyhBNnvqAtGauFr1zzGp0XNvffF2lCQ9o6uQhVhuXEnvl6eUPP1P5qnylXV/bVaOF9mndK39StWek8m7vEnlxXCkZ+v7gNCuTvq+dH5+ubReRqeE5vZToSpHHk3LBCxna+7ZeWdNaeVMnyJtmzdfVRXdOfkp5CU4Dfa7gG7+Sr3SApkzJ18CU1vVt9KamLdqiSvuDzqK5WqORen72A+qVaC+C1ebpmZqUXirfLH/9GevYNfBka5THGighRw/nD7L2WWs9eJiyO1Sr5N0PdaRRY19CVo5yrNfQlTJAD425Xx7FvP7R7xsk3KWhGR0iewAAAJqKJh7OLUk9NTCrjVPaYoXwwNtaofhgdlaHy/aqWmka1LdTzKST9O1bb1GC9it4IO7c+ZEP9W5JtToM6afudU9wKal3hrJUptU7y1VTU66dq8uktB7qagfXr8rVS/mr9qj8d1k6sMovv9+vFb5xyp35F6dBjA495O54sTPB0S/EejSwd7Kzz5L0XQ0dEa3DP6pd735g9dNf/bq3dfZZIuvZQdWrA/r47N9V9sFRa363qq8doKMSu+vW/jdKwU90IFqm0iZZSe2cNXC1U3KnNlaIzlDvpIbWpRFjX6ICpUNftzo626604Xoy70aVvLZWJfaxRL5vsF0JI+5SRoNjAwAAmKsZpJcb1XfwLVLJdu06ckSB9W9LFwSzGp06YZ/pvkHJ7WMDrUvtkpLVRpU6fPKfzr5aoVMndcT6/7gvVz1i65szx2tdbZN6nZLV/oqs5FlVbHpWOelDNHraW9pnZU1X9wf10uzhzuONFZ1vvLZK6uicOg+d1skjZ6wJzpO3R8z83Ldpwjrn6jehap0or25gfk4/1cd18nT01PllaMzYjdZBGXZpU+nrenP78biSFgAAgKalGYTztuqZNVQelWjblg1OSUt8MGul9jfY51pP6OSp2FOyIZ2uPKkzVuvOyf/D2VfL1T5ZnZQgz+wNkdrv8rhbfQ20ZfsnOnglvmtYuUUvPr5E+4ct1Hu7fqtJI7zyerPUVaecBo11sfl+rspjVti2Rc9ue57VhrIL51de8qQyWifoBrcVwo+c1KnzMrjTT0IHJUfPll+Oxozd6PJwl5IipU1lWrF+q3ZQ0gIAAJqwZhDOrUn0vE0jPEdV/JMpKr6gpMXWWp1Te1pRO2iF3iNObbKtUh/v/EDVullpXROdfY5OfTTY/q5h/JVgIj9u1Eu5RXsUauXWrfemSmdOqrKxZ5Ar92rb5oucHT59UoerE5Q2qE+kxr1WlQ4E9zvbjRX9wBJXrlO1Tzt3HHXuRP/icP6XKaNXOolcAUXfVOotdvnKTu2yrz4TFe3nS5fzNGLsyzkhnzRI+VPuUPWKX+qZVylpAQAATVfzSDCum5U1YkBks+Fg5lLS7QV6fpi0ZtpzWrbH/rqhXUKyUNN9pUqf9BPdnxZT+2xzddc9j+QooWSxChduiVxuMVSxRQsLF6skfZxm3Z9m9dpBA0b+UOnVf9CcuRtrL8lYtUtF9uUK7V8ubdvLCvgJOv6b3+hVe8xQhbYVFWuFc/L6Aold1Tfdyqx19dMVChT7NKe4zHqwWscq4760egmunnfpkWFnVTxngfz25QlDB7XphdnylUYHtwL8PT/QsIS/qLCwSNvs8G0f38IXVFiSrkmzvEpzddTt4yZrmP0lzZl/0J7IMUX7ibZxurssjRnbaWp9RNh38Ij2BmM/VMVzPoxU71HpR5S0AACApquZnF6MnilOvXgwc7nlnbtcy6Z8U68NTZfb3UOZj+9T9oLfq2jiQMWdN7e0VhfvL7TRP1Gd14xRZmo3pWaO0ZrOE+UvekwZkTPGLiVmPKYi/0z13/pEpI07fYRe6/yElq2arDuT+2j0b5ZqclZAM+0xU3P163O3akR63SVTzpfYXz96sVB5WiRvuttqf4em707TTxdMtObWwI8tXYoz36XZBzTtbnvsIZpzLkt5MWO7uni1eONKTe+8WiMze1htBmjkmhRN97+kiRm1XyR1dcnV3FWvakrn1zU0ckyZevzgEC2IafNlfPHYrdRp0IOafM8J+byZGl5U2sDlLuvV/vXEmtsFJS1c5xwAADQd14UtznbkS3l2zS+aK/sHg+7VBM3W1pe9SnH2Ngt2SYw3V4W3/Frv//xOzpwDAIAmIT5/N5Mz5zhfSJWbZqqP/YumRbucM86VCvr/U0vWtdWw4RnqFNnXXJxVxTt/1Gsl6Xp0pIdgDgAAmizCebNk19g/oeULRkmF2UqPXKYwXXcvOadRy5ZrrtfdfF74yE/691Dm6PfVf8Ec/egrlNoAAABca5S1AAAAANcIZS0AAACAoQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhCOcAAACAIQjnAAAAgCEI5wAAAIAhmkE4r1LAly23e7z8FTXOvniNaFMTkM/TTe4CvyqcXfFqAvPkcfdTgf9TZ8+FvrjN13e8V2ZOTe14zZoTx3t1j9eoOTW14zVqTi30PXOF5tQy3zNXaE4t9D1zZebU9N4zTcV1YYuzbS1eN5WXf+bcAwAAAHA1xedvyloAAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQxDOAQAAAEMQzgEAAABDEM4BAAAAQzTNcF4TkM/TTW53/K2XcmYUaVOw0ml4NX0qf0E/uT3zFKhxdl0TNarwj7fmni1foMrZBwAAgKaoaZ85v2ehtpZ/pnLnVrZ1qYYdXqzRuXO1qTLkNAIAAACahmZV1uJKGaT8h3OUUP221geOO3sBAACApqGZ1pzfrLSuic52pYKbijQjp5dT+pKpAp9fgYqzzuNOeUr+PPmLZygnWiKTM1P+2PKYqqA2+MaqT135zHJt++yM8+DFxI9t9ztDxYEKRc7rV/hV4O6nfN9rKp5xn9PG7tuvYFXMmf8Lxl4oX0HmJUpqzqoisDxuzutj+qxSwJdt7R8vf8U1rckBAABAjGYVzkMV76no1feVNXu67k9ra+05q4P+Z5Q7erEOj1qh0kjpy/PqsnaKvPlLFIgNwG//Wkt2D9SLpeVWm/9Svv6gCdHymFC5/JMf0pi1XfX8hlKVl23U1Os3q7i02nlyQ6Jjv6nrp25UWWTs1zW523rNeGix3qkruzmut33LtXvgXOv4PtHWZXlS8XjlPv+OFe0tDY69Vr51ByPPvlBIVYElyvfO1+FhS7W1LDpnq8/Jq3QwMmyiMiatVXn5QnlTWkWeBQAAgGuvaYfzdeOVGT0jbd1SM3+ouetOSJX/UCR3V27RomlvSsOma/bovlYktUtfhujp58YpvXSRZr0RrD2DbUt4QFOn5Cot0WW1yVLeqAFS9fva+fFphfa+rVfWtFbe1AnypiVZnXTRnZOfUl6C89yGhPZp3St/UrVnpPJu7xJZaFdKhr4/OK2u36iEvKc0xdvLOr7WSrn9BxrlSVD16oA+rrG6udyxQ0G9MWuRSj1PaMr47ynFGtie8+SpD0hr5mrRO8echgAAADBN0w7ncV8ILS/doAV5nbVu7k80a1W5ag6X6YPqBKUN6hMJqbVcSvx2P/VPqFYweEh11zdpk6ykdtFGrdQ++QZnu0ZHdm1XiTwa2DvZ2WdJ6qmBWR2cOw1w9VL+qj0q/12WDqzyy+/3a4VvnHJn/sVpUK9NxyS1c7blaqfkTm2cO59r7+b1DYz9XQ0dkerciXPkQ71bUq0OQ/qpe8yck3pnKEtlWr3TWhdnLwAAAMzStMN5vMRe8k6xzyof1Jr/F9ChU8dVrjbqlNzu/Im2S1JHK/9WHz6p+vPXF/O5Du4LOtuxbpC777ec7YacVcWmZ5WTPkSjp72lfSFrsbs/qJdmD3ceb4wanTrR0Jnutkrq2PCp89Cpkzpi/X/cl6seMX9VcGeO17raJgAAADBU8wrntpgz2q72HeTWGR05ebq+fMV2ulLHzkgJnZPrz1hfVFt16Z5m/X9CJ0/FnnM+ofJdh5ztBlRu0YuPL9H+YQv13q7fatIIr7zeLHXVKadBY7RS+xs6Wv/Hj/25Ko81XO/uap+sTkqQZ/aGSJ173V8VnFvJpAyrVwAAAJio+YXzyr3atvl4JHi375yqW+zylfc+VEVdOg+p6uP/1g673CXtW5E69EtrpU59B8ij/QoeiPmRH2ecizp9UocvKKmp0oHgfme7MdqqZ9bQC8eu2qedO446d+J06qPBHqlkxV+1N+YTSShYpFx3L+UW7Tn/gwoAAACM0bzCeeigNs39pYqr79CU/EFKSvqexj0/UlrznGYu2xWpLw9VbNQL0xepNH2cZt2f1qgFcPW8S48MO6vix/9DRXsqY8ZxGjQksav6plsh+bW1KrG/nRqqUKDYpznFZdaD1TpW+Xltuy9QN/acBbWXdrTHfmG2fBe7Uoyru+55JEcJJYtVuHBL5ENJqGKLFhYuVsllzBkAAABfv6ad0+Ku1uJOzdTjB4dq6YaXlB+5lGJrdfH+TKuWPaHOr41QutUmNXOaDmYXyl/0mDISGzl9l1veucu19NF/qXBoujXOEM05l6W89EtcriWxv370YqHytEjedLf1nDs0fXeafrpgojw6qg/K/t64M9jRsbMPaNrdjRnbnvMvtNE/UZ3XjFFmqj3nMVrTeWLMnLnOOQAAgImuC1uc7UjAteuSYTr7h5Pu1QTN1taXvUpx9gIAAKBpic/fVDgYLaTKTTPVx/6Fz6LashzZvzrq/08tWddWw4ZnqFNkHwAAAJoDwrnRXEq6/QktXzBKKsyOlOW43em6e8k5jVq2XHO9bl5AAACAZoSyFgAAAOAaoawFAAAAMBThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwBOEcAAAAMAThHAAAADAE4RwAAAAwRDMI51UK+LLldo+Xv6LG2RevEW1qAvJ5usld4FeFsyteTWCePO5+KvB/6uy50Be3+fqO98rMqakdr1lz4niv7vEaNaemdrxGzamFvmeu0Jxa5nvmCs2phb5nrsycmt57pqm4Lmxxtq3F66by8s+cewAAAACupvj8TVkLAAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYAjCOQAAAGAIwjkAAABgCMI5AAAAYIjrwhZnW253N2cLAAAAwNehvPwzZysunAMAAAC4dihrAQAAAIwg/X9kWgA8z+llAgAAAABJRU5ErkJggg=="></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,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" 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><div class="specification">
<p>Titanium is a transition metal.</p>
</div>
<div class="specification">
<p>TiCl<sub>4</sub> reacts with water and the resulting titanium(IV) oxide can be used as a smoke screen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the bonding in metals.</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>Titanium exists as several isotopes. The mass spectrum of a sample of titanium gave the following data:</p>
<p><img src="data:image/png;base64,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"></p>
<p>Calculate the relative atomic mass of titanium to two decimal places.</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 the number of protons, neutrons and electrons in the <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{22}^{48}{\text{Ti}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>22</mn>
</mrow>
<mrow>
<mn>48</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Ti</mtext>
</mrow>
</math></span> atom.</p>
<p><img 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"></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 full electron configuration of the <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{22}^{48}{\text{Ti}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>22</mn>
</mrow>
<mrow>
<mn>48</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Ti</mtext>
</mrow>
</math></span><sup>2+</sup> ion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why an aluminium-titanium alloy is harder than pure aluminium.</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>State the type of bonding in potassium chloride which melts at 1043 K.</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 chloride of titanium, TiCl<sub>4</sub>, melts at 248 K. Suggest why the melting point is so much lower than that of KCl.</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>Formulate an equation for this reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>one</strong> disadvantage of using this smoke in an enclosed space.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>electrostatic attraction</p>
<p>between «a lattice of» metal/positive ions/cations <em><strong>AND</strong> </em>«a sea of» delocalized electrons</p>
<p> </p>
<p><em>Accept mobile electrons.</em></p>
<p><em>Do <strong>not</strong> accept “metal atoms/nuclei”.</em></p>
<p><strong><em>[2 marks]</em></strong></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="\frac{{(46 \times 7.98) + (47 \times 7.32) + (48 \times 73.99) + (49 \times 5.46) + (50 \times 5.25)}}{{100}}">
<mfrac>
<mrow>
<mo stretchy="false">(</mo>
<mn>46</mn>
<mo>×</mo>
<mn>7.98</mn>
<mo stretchy="false">)</mo>
<mo>+</mo>
<mo stretchy="false">(</mo>
<mn>47</mn>
<mo>×</mo>
<mn>7.32</mn>
<mo stretchy="false">)</mo>
<mo>+</mo>
<mo stretchy="false">(</mo>
<mn>48</mn>
<mo>×</mo>
<mn>73.99</mn>
<mo stretchy="false">)</mo>
<mo>+</mo>
<mo stretchy="false">(</mo>
<mn>49</mn>
<mo>×</mo>
<mn>5.46</mn>
<mo stretchy="false">)</mo>
<mo>+</mo>
<mo stretchy="false">(</mo>
<mn>50</mn>
<mo>×</mo>
<mn>5.25</mn>
<mo stretchy="false">)</mo>
</mrow>
<mrow>
<mn>100</mn>
</mrow>
</mfrac>
</math></span></p>
<p>= 47.93</p>
<p> </p>
<p><em>Answer must have two decimal places with a value from 47.90 to 48.00.</em></p>
<p><em>Award [2] for correct final answer.</em></p>
<p><em>Award [0] for 47.87 (data booklet value).</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><em>Protons:</em> 22 <em><strong>AND</strong> Neutrons:</em> 26 <em><strong>AND</strong> Electrons:</em> 22</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p> </p>
<p>1s<sup>2</sup>2s<sup>2</sup>2p<sup>6</sup>3s<sup>2</sup>3p<sup>6</sup>3d<sup>2</sup></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>titanium atoms/ions distort the regular arrangement of atoms/ions<br><strong>OR</strong><br>titanium atoms/ions are a different size to aluminium «atoms/ions» </p>
<p>prevent layers sliding over each other</p>
<p> </p>
<p><em>Accept diagram showing different sizes of atoms/ions.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>ionic<br><em><strong>OR</strong></em><br>«electrostatic» attraction between oppositely charged ions</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«simple» molecular structure<br><em><strong>OR</strong></em><br>weak«er» intermolecular bonds<br><em><strong>OR</strong></em><br>weak«er» bonds between molecules</p>
<p> </p>
<p><em>Accept specific examples of weak bonds such as London/dispersion and van der Waals.</em></p>
<p><em>Do <strong>not</strong> accept “covalent”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>TiCl<sub>4</sub>(l) + 2H<sub>2</sub>O(l) → TiO<sub>2</sub>(s) + 4HCl(aq)</p>
<p>correct products</p>
<p>correct balancing</p>
<p> </p>
<p><em>Accept ionic equation.</em></p>
<p><em>Award M2 if products are HCl and a compound of Ti and O.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>HCl causes breathing/respiratory problems<br><em><strong>OR</strong></em><br>HCl is an irritant<br><em><strong>OR</strong></em><br>HCl is toxic<br><em><strong>OR</strong></em><br>HCl has acidic vapour<br><em><strong>OR</strong></em><br>HCl is corrosive</p>
<p> </p>
<p><em>Accept “TiO<sub>2</sub> causes breathing problems/is an irritant”.</em></p>
<p><em>Accept “harmful” for both HCl and TiO<sub>2</sub>.</em></p>
<p><em>Accept “smoke is asphyxiant”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">f.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</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>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>An acidic sample of a waste solution containing Sn<sup>2+</sup>(aq) reacted completely with K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub> solution to form Sn<sup>4+</sup>(aq).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the oxidation half-equation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the overall redox equation for the reaction between acidic Sn<sup>2+</sup>(aq) and Cr<sub>2</sub>O<sub>7</sub><sup>2–</sup>(aq), using section 24 of the data booklet.</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>Calculate the percentage uncertainty for the mass of K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>(s) from the given data.</p>
<p><img src="data:image/png;base64,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"></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>The sample of K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>(s) in (i) was dissolved in distilled water to form 0.100 dm<sup>3 </sup>solution. Calculate its molar concentration.</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>10.0 cm<sup>3</sup> of the waste sample required 13.24 cm<sup>3</sup> of the K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub> solution. Calculate the molar concentration of Sn<sup>2+</sup>(aq) in the waste sample.</p>
<div class="marks">[2]</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>Sn<sup>2+</sup>(aq) → Sn<sup>4+</sup>(aq) + 2e<sup>–</sup></p>
<p> </p>
<p><em>Accept equilibrium sign.</em></p>
<p><em>Accept Sn<sup>2+</sup>(aq) – 2e<sup>–</sup> → Sn<sup>4+</sup>(aq).</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>Cr<sub>2</sub>O<sub>7</sub><sup>2–</sup>(aq) + 14H<sup>+</sup>(aq) + 3Sn<sup>2+</sup>(aq) → 2Cr<sup>3+</sup>(aq) + 7H<sub>2</sub>O(l) + 3Sn<sup>4+</sup>(aq)</p>
<p> </p>
<p><em>Accept equilibrium sign.</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>«13.239 g ± 0.002 g so percentage uncertainty» 0.02 «%»</p>
<p> </p>
<p><em>Accept answers given to greater precision, such as 0.0151%.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>« [K<sub>2</sub>Cr<sub>2</sub>O<sub>7</sub>] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{13.239{\text{ g}}}}{{294.20{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}} \times 0.100{\text{ d}}{{\text{m}}^3}}}">
<mfrac>
<mrow>
<mn>13.239</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>294.20</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>
<mo>×</mo>
<mn>0.100</mn>
<mrow>
<mtext> d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mn>3</mn>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 0.450 «mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup>»</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>n(Sn<sup>2+</sup>) = «0.450 mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup> x 0.01324 dm<sup>3</sup> x <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3\,mol}}{{1\,mol}}">
<mfrac>
<mrow>
<mn>3</mn>
<mspace width="thinmathspace"></mspace>
<mi>m</mi>
<mi>o</mi>
<mi>l</mi>
</mrow>
<mrow>
<mn>1</mn>
<mspace width="thinmathspace"></mspace>
<mi>m</mi>
<mi>o</mi>
<mi>l</mi>
</mrow>
</mfrac>
</math></span> =» 0.0179 «mol»</p>
<p>«[Sn<sup>2+</sup>] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.0179\,mol}}{{0.0100\,mol}}">
<mfrac>
<mrow>
<mn>0.0179</mn>
<mspace width="thinmathspace"></mspace>
<mi>m</mi>
<mi>o</mi>
<mi>l</mi>
</mrow>
<mrow>
<mn>0.0100</mn>
<mspace width="thinmathspace"></mspace>
<mi>m</mi>
<mi>o</mi>
<mi>l</mi>
</mrow>
</mfrac>
</math></span> =» 1.79 «mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup>»</p>
<p> </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">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.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>
<br><hr><br><div class="specification">
<p>Chlorine undergoes many reactions.</p>
</div>
<div class="specification">
<p><span class="fontstyle0"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2</mn><mo>.</mo><mn>67</mn><mo> </mo><mi mathvariant="normal">g</mi></math> of manganese(IV) oxide was added to </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>200</mn><mo>.</mo><mn>0</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></math> <span class="fontstyle0">of </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mo>.</mo><mn>00</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo> </mo><mi>HCl</mi></math>.</p>
<p style="text-align: center;"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>MnO</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">s</mi><mo>)</mo><mo>+</mo><mn>4</mn><mi>HCl</mi><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo><mo>→</mo><msub><mi>Cl</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><mn>2</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo> </mo><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo><mo>+</mo><msub><mi>MnCl</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo></math></p>
</div>
<div class="specification">
<p>Chlorine gas reacts with water to produce hypochlorous acid and hydrochloric acid.</p>
<p style="text-align: center;"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>Cl</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo> </mo><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo><mo>⇌</mo><mi>HClO</mi><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo><mo>+</mo><mi>HCl</mi><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo></math></p>
</div>
<div class="specification">
<p><span class="fontstyle0"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CCl</mi><mn>2</mn></msub><msub><mi mathvariant="normal">F</mi><mn>2</mn></msub></math> </span><span class="fontstyle0">is a common chlorofluorocarbon, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>CFC</mi></math>.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">State the full electron configuration of the chlorine atom.</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 class="fontstyle0">State, giving a reason, whether the chlorine atom or the chloride ion has a larger radius</span>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Outline why the chlorine atom has a smaller atomic radius than the sulfur atom</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 class="fontstyle0">The mass spectrum of chlorine is shown.</span></p>
<p><span class="fontstyle0"><img style="display: block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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"></span></p>
<p style="text-align: center;"><span class="fontstyle0"><em> NIST Mass Spectrometry Data Center Collection © 2014 copyright by the U.S. Secretary of Commerce on behalf of </em><em>the United States of America. All rights reserved.</em><br> </span></p>
<p><span class="fontstyle0"> Outline the reason for the two peaks at <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>/</mo><mi>z</mi><mo>=</mo><mn>35</mn></math> and <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>37</mn></math>.<br> </span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Explain the presence and relative abundance of the peak at </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>/</mo><mi>z</mi><mo>=</mo><mn>74</mn></math><span class="fontstyle0">.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate the amount, in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>mol</mi></math>, of manganese(IV) oxide added.</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 class="fontstyle0">Determine the limiting reactant, showing your calculations.</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 class="fontstyle0">Determine the excess amount, in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>mol</mi></math>, of the other reactant.</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 class="fontstyle0">Calculate the volume of chlorine, in </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>dm</mi><mn>3</mn></msup></math><span class="fontstyle0">, produced if the reaction is conducted at standard temperature and pressure (STP). Use section 2 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">State the oxidation state of manganese in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnO</mi><mn>2</mn></msub></math></span><span class="fontstyle0"> </span><span class="fontstyle0">and </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnCl</mi><mn>2</mn></msub></math><span class="fontstyle0">.</span></p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAv0AAADFCAYAAADHcE39AAAWfUlEQVR4Ae3di5eXdZ0H8P4URmcGBhoXJMC01YU9KmZ4YcsLtoIXKDddEfOktidRytxNT7YYmIZp2NHazOSYFyTMS162NuxmJt6ooI0wBEQuc3nvGS76G2dkFvV5nuH3vDhnznl+v3l+z+f5vj6fOec9zzy/Hx+IfwQIECBAgAABAgQINLXAB5p6dRZHgAABAgQIECBAgECEfkNAgAABAgQIECBAoMkFhP4mb7DlESBAgAABAgQIEBD6zQABAgQIECBAgACBJhcYEPr/5+c/z39cc40vBmbADJgBM2AGzIAZMANm4ACYgQ0bNgz5K8uA0P+1r16fSy7+bBYvWuSLgRkwA2bADJgBM2AGzIAZGMYzMOvMM/PkE0/sf+hfcOWVuWXJkiFfaAcCBAgQIECAAAECBKoVOGfWWVn54x8PeRIDrvQL/UOa2YEAAQIECBAgQIDAsBAQ+odFG5wEAQIECBAgQIAAgeIEhP7ibB2ZAAECBAgQIECAwLAQEPqHRRucBAECBAgQIECAAIHiBIT+4mwdmQABAgQIECBAgMCwEBD6h0UbnAQBAgQIECBAgACB4gSE/uJsHZkAAQIECBAgQIDAsBAQ+odFG5wEAQIECBAgQIAAgeIEhP7ibB2ZAAECBAgQIECAwLAQEPqHRRucBAECBAgQIECAAIHiBIT+4mwdmQABAgQIECBAgMCwEBD6h0UbnAQBAgQIECBAgACB4gSE/uJsHZkAAQIECBAgQIDAsBAQ+odFG5wEAQIECBAgQIAAgeIEhP7ibB2ZAAECBAgQIECAwLAQEPqHRRucBAECBAgQIECAAIHiBIT+4mwdmQABAgQIECBAgMCwEBD6h0UbnAQBAgQIECBAgACB4gTqEfq7V2fRx9rSOuKgTJz3UF4fxLPnj7dmRntLWltPzs0vdw+yx76f2rn+v3PHlXMy/YixGdM2MuMPn5qZn7sxK1ZvSe++X+q7BAgQIECAAAECBAoVqFXo7zhySiZ/aF5WDEj9PfnDktMzdcpRGfkuQv+WXy7KjL8blaP/9Vt57IVXs23n9mxeuyrLvnx6JrV/JBct+1O6Cm2jgxMgQIAAAQIECBB4Z4Fahf7OTy3IF46ckIsf3NJfpGdNlpxybOYvODej9zf0b3okl048KP9w+WN5bcAl/R156ZbT0tl+Ur75gtjfH90jAgQIECBAgACBsgTqFfrP/2FWfv7wTJy7PI2xv/ulm3LK5Cvz6F3nNYT+rvxs/oSMOX9pHl54fk6YNCYd7WNz9JlX54E1O/b0pyfrvv2JtLf/c/5r/YDEv3ufHT/LFz/ckomX/TTb9tHV7t9el38c0ZZP39t4Zvt4gW8RIECAAAECBAgQ+H8K1Cz035eNKy/JYeMvyvI3s3V3Xlp8co66/NFsXDYw9Le2dOT4y+7J717dlu0bVmXxqZ3pmHZTXunpE34t95zdlrZpN+95PJj6jjz+uUPS+uGr88z+v1VgsAN6jgABAgQIECBAgMB+CdQs9N+f7Zvvz9yx4zNv7y0+3auz+IRJuWTF1rwxWOjvnJeH33jLdNuDF2RM28zc9Wpv0vN8bjimJaNm/6jfXw7e2rtvqyerFx6b1tZP574B7yXov6dHBAgQIECAAAECBIoQqF/o792Ye+YckgkXPpDNSbp/vzAnjr8g92/uHTT0j3rzqv5u/q6nrsiEtk/k9nU9Sc9z+c8pLek474E0/F7wtj715PmvHSP0v03FQwIECBAgQIAAgfIE6hf605u/3jkrnePm5sHNXXnu+o/m0Nl3Z2NvBg39HdNvzdpdt/LsbkrX01dkYtvHs3TXkxtz96y2tJ18a/7UsE//9u3ITy89JK2HfSmr3N7Tn8YjAgQIECBAgACBUgRqGPqTnrW35YyR43LRvU/n+qmdOfu763d9lv5gt/fsO/T3ZN3SUzJqn2/k/UW+dHhLJl76+D7fyFtKtxUhQIAAAQIECBCopUAtQ396XsmS6SMz7rhpmdIxI0v7btXJu7nSn2TLo/n8pIPykUt+suuvBf2naEdeXHJqPth+Ur6x5yM7ezc8lutOPyKHtI/JkWd8NU/2/YnBPwIECBAgQIAAAQIFCtQz9Kc7zy+cllEjWtIx/a1P3tn/K/27O/P6L7+eGYd05Ji5t+XJl1/L9q6d2fqX3+b+6z6Zw9o/krn37P3PubqzetFpOXPRb7Jx61/y+JUfy4xvrsk73hlUYOMdmgABAgQIECBAoD4CNQ39Sdevr83Ug9ty4g2rs/dW+3cb+vvGZef6p/Od+efmpA8fklEtI3PoYVMz67Ibs+KFLbtuHRo4Ur1Zf8fsnPPtdbtCv8/pHyjkGQIECBAgQIAAgfdHoB6h//2xel+Psv2FO3PhGQvy001u73lfYR2MAAECBAgQIEBggIDQP4Ck6Cd6s+kX38hnZs7PQ2u7ii7m+AQIECBAgAABAgQi9Jc8BDuevzXnz/l6nnGFv2R55QgQIECAAAEC9RUQ+kvt/dasuGhc2ka0pHXXV2uOvuaZuN5fahMUI0CAAAECBAjUTkDor13LLZgAAQIECBAgQKBuAkJ/3TpuvQQIECBAgAABArUTEPpr13ILJkCAAAECBAgQqJuA0F+3jlsvAQIECBAgQIBA7QSE/tq13IIJECBAgAABAgTqJiD0163j1kuAAAECBAgQIFA7AaG/di23YAIECBAgQIAAgboJCP1167j1EiBAgAABAgQI1E5A6K9dyy2YAAECBAgQIECgbgJCf906br0ECBAgQIAAAQK1ExD6a9dyCyZAgAABAgQIEKibgNBft45bLwECBAgQIECAQO0EhP7atdyCCRAgQIAAAQIE6iYg9Net49ZLgAABAgQIECBQOwGhv3Ytt2ACBAgQIECAAIG6CQj9deu49RIgQIAAAQIECNROQOivXcstmAABAgQIECBAoG4CQn/dOm69BAgQIECAAAECtRMQ+mvXcgsmQIAAAQIECBCom4DQX7eOWy8BAgQIECBAgEDtBIT+2rXcggkQIECAAAECBOomIPTXrePWS4AAAQIECBAgUDsBob92LbdgAgQIECBAgACBugkI/XXruPUSIECAAAECBAjUTqCGob87z143Oa2t52bZpnfqt334mI2BAn4u/FwMnIrdz5gNs2E2Bgr4uajnz8XASRguz9Qw9A8XeudBgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJCP2V0StMgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJCP2V0StMgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJCP2V0StMgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJCP2V0StMgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJCP2V0StMgAABAgQIECBAoBwBob8cZ1UIECBAgAABAgQIVCYg9FdGrzABAgQIECBAgACBcgSE/nKcVSFAgAABAgQIECBQmYDQXxm9wgQIECBAgAABAgTKERD6y3FWhQABAgQIECBAgEBlAkJ/ZfQKEyBAgAABAgQIEChHQOgvx1kVAgQIECBAgAABApUJ1CP0d6/Ooo+1pXXEQZk476G8Pgh3zx9vzYz2lrS2npybX+4eZI99P7V97RO5/ao5mf734/PB1rZ0fuiYzLr8ljzx5x1vvbDn5dx0fEtGz3skXW89a4sAAQIECBAgQIBAoQK1Cv0dR07J5A/Ny4oBqb8nf1hyeqZOOSoj9zv09+a1J6/OCR1jc8oXl+VXf349XT07s3nNk7ll9uFpHzszd7y4J/gL/YUOs4MTIECAAAECBAgMLlCr0N/5qQX5wpETcvGDW/pr9KzJklOOzfwF52b0fob+3r89kAvHtWXqNavyRv+jJtt/lWunHJQxM+7Iup4kQv/bhTwmQIAAAQIECBAoQaBeof/8H2bl5w/PxLnL0xj7u1+6KadMvjKP3nVeQ+jvys/mT8iY85fm4YXn54RJY9LRPjZHn3l1Hliz95adnqxZclLa2s/K3a/2DtKu3mx46vv5/orn8tp+hf7uPHvd5LS2zsl9jSc6SAVPESBAgAABAgQIEBhKoGah/75sXHlJDht/UZa/Gaa789Lik3PU5Y9m47KBob+1pSPHX3ZPfvfqtmzfsCqLT+1Mx7Sb8kpfiM/G3D2rLW0nfHPP4yG4XekfAsi3CRAgQIAAAQIEihCoWei/P9s335+5Y8dn3t5bfLpXZ/EJk3LJiq15Y7DQ3zkvDzfct7PtwQsypm1m7uq7st+zOouObcmoOT/q95eDd2yU0P+ONL5BgAABAgQIECBQnED9Qn/vxtwz55BMuPCBbE7S/fuFOXH8Bbl/c++goX/Um1f1dzeh66krMqHtE7m97yb9nhez+LiWjJp9r9Bf3Iw6MgECBAgQIECAwHsUqF/oT2/+euesdI6bmwc3d+W56z+aQ2ffnY29GTT0d0y/NWt33cqzW7rr6Ssyse3jWbrryS25b87ItL3tF4N+Pdm5PTv2vt6V/n40HhAgQIAAAQIECJQjUMPQn/SsvS1njByXi+59OtdP7czZ312fvrfhDnZ7z75Df2/+fPtpGdU+Mz/YMPgbef/3O6dnzKHnZdn6vtuBfE5/OWOtCgECBAgQIECAQKNALUN/el7JkukjM+64aZnSMSNLd32e5rsJ/UleW56Lxh6cqf/+TLY1yvZtb1uVr0xpyejTvrPnIzvXZMkJLRl94crs/vyf3mx47Np88ogxGT36iJz51Sd2/cXh7YfxmAABAgQIECBAgMB7Eahn6E93nl84LaNGtKRj+s1vfvLO/l/p76PvzYaVl2ZK+7icetUP8ou1m7Oja3v+9vyKfO2M8Wk79Jx87+W9///utjz22bFpnXhhlq3Zlp6+NxGf+snc+JuN2fqXx7Lg+NOyZM3ee4HeS1u9lgABAgQIECBAgMBbAjUN/UnXr6/N1IPbcuINq9O9x+Pdhf6+F/dk87N35yuf+adMGTsqbSMOTueEY3PWv92Wp9fvfEu7b88NT+WGOcdlUufsLNvU8K3e9fnu7LP2/NXB5/Q3yNgkQIAAAQIECBB4jwL1CP3vEan4l2/Pi3dekDOvejybBntrQPEnoAIBAgQIECBAgEATCwj9VTe3d1NW3Xhezp6/POv23gVU9TmpT4AAAQIECBAg0FQCQn+l7dyR57/1Lznv66uy2RX+SjuhOAECBAgQIECgmQWE/iq7u/WhXDz2oLSOaNn9dfCUfOUZl/urbInaBAgQIECAAIFmFBD6m7Gr1kSAAAECBAgQIECgQUDob8CwSYAAAQIECBAgQKAZBYT+ZuyqNREgQIAAAQIECBBoEBD6GzBsEiBAgAABAgQIEGhGAaG/GbtqTQQIECBAgAABAgQaBIT+BgybBAgQIECAAAECBJpRQOhvxq5aEwECBAgQIECAAIEGAaG/AcMmAQIECBAgQIAAgWYUEPqbsavWRIAAAQIECBAgQKBBQOhvwLBJgAABAgQIECBAoBkFhP5m7Ko1ESBAgAABAgQIEGgQEPobMGwSIECAAAECBAgQaEYBob8Zu2pNBAgQIECAAAECBBoEhP4GDJsECBAgQIAAAQIEmlFA6G/GrloTAQIECBAgQIAAgQYBob8BwyYBAgQIECBAgACBZhQQ+puxq9ZEgAABAgQIECBAoEFA6G/AsEmAAAECBAgQIECgGQWE/mbsqjURIECAAAECBAgQaBAQ+hswbBIgQIAAAQIECBBoRgGhvxm7ak0ECBAgQIAAAQIEGgSE/gYMmwQIECBAgAABAgSaUUDob8auWhMBAgQIECBAgACBBgGhvwHDJgECBAgQIECAAIFmFBD6m7Gr1kSAAAECBAgQIECgQaCGob87z143Oa2t52bZpgaJfpv24dNvIBoemA2z0TAO/TbNhtnoNxAND8yG2WgYh36bZqP5ZqNfg4fVgxqG/mHl72QIECBAgAABAgQIFC4g9BdOrAABAgQIECBAgACBagWE/mr9VSdAgAABAgQIECBQuIDQXzixAgQIECBAgAABAgSqFRD6q/VXnQABAgQIECBAgEDhAkJ/4cQKECBAgAABAgQIEKhWQOiv1l91AgQIECBAgAABAoULCP2FEytAgAABAgQIECBAoFoBob9af9UJECBAgAABAgQIFC4g9BdOrAABAgQIECBAgACBagWE/mr9VSdAgAABAgQIECBQuIDQXzixAgQIECBAgAABAgSqFRD6q/VXnQABAgQIECBAgEDhAkJ/4cQKECBAgAABAgQIEKhWQOiv1l91AgQIECBAgAABAoULCP2FEytAgAABAgQIECBAoFoBob9af9UJECBAgAABAgQIFC4g9BdOrAABAgQIECBAgACBagWE/mr9VSdAgAABAgQIECBQuIDQXzixAgQIECBAgAABAgSqFRD6q/VXnQABAgQIECBAgEDhAkJ/4cQKECBAgAABAgQIEKhWQOiv1l91AgQIECBAgAABAoULCP2FEytAgAABAgQIECBAoFoBob9af9UJECBAgAABAgQIFC4g9BdOrAABAgQIECBAgACBagWE/mr9VSdAgAABAgQIECBQuIDQXzixAgQIECBAgAABAgSqFRD6q/VXnQABAgQIECBAgEDhAu869F9z9ZfzxauuyorlD/liYAbMgBkwA2bADJgBM2AGhvEMnDNzVh75ySND/nLxgbfv8eMVKzLnnHN9MTADZsAMmAEzYAbMgBkwAwfADKxbt+7tkX7A4wGhf8AeniBAgAABAgQIECBA4IAWEPoP6PY5eQIECBAgQIAAAQJDCwj9QxvZgwABAgQIECBAgMABLSD0H9Dtc/IECBAgQIAAAQIEhhYQ+oc2sgcBAgQIECBAgACBA1pA6D+g2+fkCRAgQIAAAQIECAwtIPQPbWQPAgQIECBAgAABAge0gNB/QLfPyRMgQIAAAQIECBAYWkDoH9rIHgQIECBAgAABAgQOaIH/A187rvwfet5DAAAAAElFTkSuQmCC" width="699" height="180"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Deduce, referring to oxidation states, whether </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnO</mi><mn>2</mn></msub></math> <span class="fontstyle0">is an oxidizing or reducing agent.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(vi).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Hypochlorous acid is considered a weak acid. Outline what is meant by the term weak acid.</span></p>
<p> </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 class="fontstyle0">State the formula of the conjugate base of hypochlorous acid.</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 class="fontstyle0">Calculate the concentration of </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi mathvariant="normal">H</mi><mo>+</mo></msup><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo></math><span class="fontstyle0"> in a </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>HClO</mi><mo> </mo><mfenced><mi>aq</mi></mfenced></math><span class="fontstyle0"> solution with a </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>pH</mi><mo>=</mo><mn>3</mn><mo>.</mo><mn>61</mn></math>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">State the type of reaction occurring when ethane reacts with chlorine to produce chloroethane.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Predict, giving a reason, whether ethane or chloroethane is more reactive.</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 class="fontstyle0">Write the equation for the reaction of chloroethane with a dilute aqueous solution of sodium hydroxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Deduce the nucleophile for the reaction in d(iii).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Ethoxyethane (diethyl ether) can be used as a solvent for this conversion. Draw the structural formula of ethoxyethane</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Deduce the number of signals and their chemical shifts in the </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mmultiscripts><mi mathvariant="normal">H</mi><mprescripts></mprescripts><mn>1</mn></mmultiscripts><mo> </mo><mi>NMR</mi></math> <span class="fontstyle0">spectrum of ethoxyethane. Use section 27 of the data booklet.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d(vi).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate the percentage by mass of chlorine in </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CCl</mi><mn>2</mn></msub><msub><mi mathvariant="normal">F</mi><mn>2</mn></msub></math><span class="fontstyle0">.</span></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><span class="fontstyle0">Comment on how international cooperation has contributed to the lowering of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>CFC</mi></math> emissions responsible for ozone depletion.</span></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><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn><msup><mi mathvariant="normal">s</mi><mn>2</mn></msup><mn>2</mn><msup><mi mathvariant="normal">s</mi><mn>2</mn></msup><mn>2</mn><msup><mi mathvariant="normal">p</mi><mn>6</mn></msup><mn>3</mn><msup><mi mathvariant="normal">s</mi><mn>2</mn></msup><mn>3</mn><msup><mi mathvariant="normal">p</mi><mn>5</mn></msup></math> ✔</p>
<p><em>Do <strong>not</strong> accept condensed electron configuration.</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>Cl</mi><mo>-</mo></msup></math> <em><strong>AND</strong> </em>more «electron–electron» repulsion ✔</p>
<p><em><br>Accept <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msup><mi>l</mi><mo mathvariant="italic">-</mo></msup></math> <strong>AND</strong> has an extra electron.</em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Cl</mi></math> has a greater nuclear charge/number of protons/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">Z</mi><mi>eff</mi></msub></math> «causing a stronger pull on the outer electrons» ✔</p>
<p>same number of shells<br><strong><em>OR</em></strong><br>same «outer» energy level<br><em><strong>OR</strong></em><br>similar shielding ✔</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«two major» isotopes «of atomic mass <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>35</mn></math> and <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>37</mn></math>» ✔</p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«diatomic» molecule composed of «two» chlorine-37 atoms ✔</p>
<p>chlorine-37 is the least abundant «isotope»<br><em><strong>OR</strong></em><br>low probability of two <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mmultiscripts><mi>Cl</mi><mprescripts></mprescripts><mn>37</mn></mmultiscripts></math> «isotopes» occurring in a molecule ✔</p>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mfrac><mrow><mn>2</mn><mo>.</mo><mn>67</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>86</mn><mo>.</mo><mn>94</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mo>»</mo><mo> </mo><mn>0</mn><mo>.</mo><mn>0307</mn><mo> </mo><mo>«</mo><mi>mol</mi><mo>»</mo></math> ✔</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msub><mi mathvariant="normal">n</mi><mi>HCl</mi></msub><mo>=</mo><mn>2</mn><mo>.</mo><mn>00</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo>×</mo><mn>0</mn><mo>.</mo><mn>2000</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup><mo>»</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>400</mn><mo> </mo><mi>mol</mi><mo> </mo></math>✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>400</mn></mrow><mn>4</mn></mfrac><mo>=</mo><mo>»</mo><mo> </mo><mn>0</mn><mo>.</mo><mn>100</mn><mo> </mo><mi>mol</mi></math> <em><strong>AND</strong></em> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnO</mi><mn>2</mn></msub></math> is the limiting reactant ✔</p>
<p><em>Accept other valid methods of determining the limiting reactant in M2.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mn>0</mn><mo>.</mo><mn>0307</mn><mo> </mo><mi>mol</mi><mo>×</mo><mn>4</mn><mo>=</mo><mn>0</mn><mo>.</mo><mn>123</mn><mo> </mo><mi>mol</mi><mo>»</mo></math></p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mn>0</mn><mo>.</mo><mn>400</mn><mo> </mo><mi>mol</mi><mo>–</mo><mn>0</mn><mo>.</mo><mn>123</mn><mo> </mo><mi>mol</mi><mo>=</mo><mo>»</mo><mo> </mo><mn>0</mn><mo>.</mo><mn>277</mn><mo> </mo><mo>«</mo><mi>mol</mi><mo>»</mo></math> ✔</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mn>0</mn><mo>.</mo><mn>0307</mn><mo> </mo><mi>mol</mi><mo>×</mo><mn>22</mn><mo>.</mo><mn>7</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>=</mo><mo>»</mo><mo> </mo><mn>0</mn><mo>.</mo><mn>697</mn><mo> </mo><mo>«</mo><msup><mi>dm</mi><mn>3</mn></msup><mo>»</mo></math> ✔</p>
<p><em><br>Accept methods employing <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mi>V</mi><mo>=</mo><mi>n</mi><mi>R</mi><mi>T</mi></math></em>.</p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnO</mi><mn>2</mn></msub><mo>:</mo><mo> </mo><mo>+</mo><mn>4</mn></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>MnCl</mi><mn>2</mn></msub><mo>:</mo><mo> </mo><mo>+</mo><mn>2</mn></math> ✔</p>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>oxidizing agent <em><strong>AND</strong></em> oxidation state of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Mn</mi></math> changes from <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>+</mo><mn>4</mn></math> to <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>+</mo><mn>2</mn></math>/decreases ✔</p>
<div class="question_part_label">b(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>partially dissociates/ionizes «in water» ✔</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>ClO</mi><mo>-</mo></msup></math> ✔</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mo>[</mo><msup><mi mathvariant="normal">H</mi><mo>+</mo></msup><mo>]</mo><mo>=</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>3</mn><mo>.</mo><mn>61</mn></mrow></msup><mo>=</mo><mo>»</mo><mn>2</mn><mo>.</mo><mn>5</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>4</mn></mrow></msup><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>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«free radical» substitution/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">S</mi><mi mathvariant="normal">R</mi></msub></math> ✔</p>
<p><em><br>Do not accept electrophilic or nucleophilic substitution.</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>chloroethane <em><strong>AND</strong></em> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">C</mi><mo>–</mo><mi>Cl</mi></math> bond is weaker/<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>324</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup></math> than <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">C</mi><mo>–</mo><mi mathvariant="normal">H</mi></math> bond/<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>414</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup></math><br><em><strong>OR</strong></em><br>chloroethane <strong><em>AND</em> </strong>contains a polar bond ✔</p>
<p><em><br>Accept “chloroethane <strong>AND</strong> polar”.</em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msub><mi>CH</mi><mn>2</mn></msub><mi>Cl</mi><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo><mo>+</mo><msup><mi>OH</mi><mo>-</mo></msup><mo>(</mo><mi>aq</mi><mo>)</mo><mo>→</mo><msub><mi>CH</mi><mn>3</mn></msub><msub><mi>CH</mi><mn>2</mn></msub><mi>OH</mi><mo>(</mo><mi>aq</mi><mo>)</mo><mo>+</mo><msup><mi>Cl</mi><mo>-</mo></msup><mo>(</mo><mi>aq</mi><mo>)</mo></math><br><em><strong>OR</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msub><mi>CH</mi><mn>2</mn></msub><mi>Cl</mi><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo><mo>+</mo><mi>NaOH</mi><mo>(</mo><mi>aq</mi><mo>)</mo><mo>→</mo><msub><mi>CH</mi><mn>3</mn></msub><msub><mi>CH</mi><mn>2</mn></msub><mi>OH</mi><mo>(</mo><mi>aq</mi><mo>)</mo><mo>+</mo><mi>NaCl</mi><mo>(</mo><mi>aq</mi><mo>)</mo></math> ✔</p>
<p><em>Accept use of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>C</mi><mn mathvariant="italic">2</mn></msub><msub><mi>H</mi><mn mathvariant="italic">5</mn></msub><mi>C</mi><mi>l</mi></math> and <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>C</mi><mn mathvariant="italic">2</mn></msub><msub><mi>H</mi><mn mathvariant="italic">5</mn></msub><mi>O</mi><mi>H</mi><mi mathvariant="normal">/</mi><msub><mi>C</mi><mn mathvariant="italic">2</mn></msub><msub><mi>H</mi><mn mathvariant="italic">6</mn></msub><mi>O</mi></math> in the equation.</em></p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydroxide «ion»/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>OH</mi><mo>-</mo></msup></math> ✔</p>
<p><em><br>Do <strong>not</strong> accept <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>N</mi><mi>a</mi><mi>O</mi><mi>H</mi></math>.</em></p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"> / <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msub><mi>CH</mi><mn>2</mn></msub><msub><mi>OCH</mi><mn>2</mn></msub><msub><mi>CH</mi><mn>3</mn></msub></math> ✔</p>
<p><em>Accept <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo mathvariant="italic">(</mo><mi>C</mi><msub><mi>H</mi><mn mathvariant="italic">3</mn></msub><mi>C</mi><msub><mi>H</mi><mn mathvariant="italic">2</mn></msub><msub><mo mathvariant="italic">)</mo><mn mathvariant="italic">2</mn></msub><mi>O</mi></math>.</em></p>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn></math> «signals» ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>9</mn><mo>–</mo><mn>1</mn><mo>.</mo><mn>0</mn><mo> </mo><mo> </mo><mo>«</mo><mi>ppm</mi><mo>»</mo></math> <em><strong>AND</strong> </em><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>3</mn><mo>.</mo><mn>3</mn><mo>–</mo><mn>3</mn><mo>.</mo><mn>7</mn><mo> </mo><mo>«</mo><mi>ppm</mi><mo>»</mo><mo> </mo></math>✔</p>
<p><em><br>Accept any values in the ranges.</em></p>
<p><em>Award <strong>[1 max]</strong> for two incorrect chemical shifts.</em></p>
<div class="question_part_label">d(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><mi>M</mi><mo>(</mo><msub><mi>CCl</mi><mn>2</mn></msub><msub><mi mathvariant="normal">F</mi><mn>2</mn></msub><mo>)</mo><mo> </mo><mo>=</mo><mo>»</mo><mo> </mo><mn>120</mn><mo>.</mo><mn>91</mn><mo> </mo><mo>«</mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo><mo> </mo></math> ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>2</mn><mo>×</mo><mn>35</mn><mo>.</mo><mn>45</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow><mrow><mn>120</mn><mo>.</mo><mn>91</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo><mo>=</mo><mo>»</mo><mo> </mo><mn>58</mn><mo>.</mo><mn>64</mn><mo> </mo><mo>«</mo><mo>%</mo><mo>»</mo></math> ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any of:</em></p>
<p>research «collaboration» for alternative technologies «to replace <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>CFC</mi></math>s»<br><em><strong>OR</strong></em><br>technologies «developed»/data could be shared<br><em><strong>OR</strong></em><br>political pressure/Montreal Protocol/governments passing legislations ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> accept just “collaboration”.</em></p>
<p><em>Do <strong>not</strong> accept any reference to <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>C</mi><mi>F</mi><mi>C</mi></math> as greenhouse gas or product of fossil fuel combustion.</em></p>
<p><em>Accept reference to specific measures, such as agreement on banning use/manufacture of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>C</mi><mi>F</mi><mi>C</mi></math>s.</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>Most candidates wrote the electron configuration of chlorine correctly.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only half of the candidates deduced that the chloride ion has a larger radius than the chlorine atom with a valid reason. Many candidates struggled with this question and decided that the extra electron in the chloride ion caused a greater attraction between the nucleus and the outer electrons.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only about a third of the candidates identified the extra proton in the chlorine nucleus as the cause of the smaller atomic radius when compared to the sulfur atom, and only the stronger candidates also compared the shielding or the number of shells in the two atoms. Many candidates had a poor understanding of factors affecting atomic radius and could not explain the difference.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About 60% of the candidates recognized that the peaks at m/z 35 and 37 in the mass spectrum of chlorine are due to its isotopes. A few students wrote 'isomers' instead of 'isotopes'.</p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was the lowest scoring question on the paper, that was also left blank by 10% of the candidates. About 20% of the candidates identified the peak at m/z = 74 to be due to a molecule made up of two 37Cl atoms. And only very few candidates commented that the low abundance of the peak was due to the low abundance of the 37Cl isotope. A common incorrect answer was that chlorine has an isotope of mass number 74.</p>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates were able to determine the number of moles of MnO<sub>2</sub> using the mass.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>It was pleasing that the majority of the candidates were able to determine the limiting reactant by using the stoichiometric ratio.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Half of the candidates were able to determine the amount of excess reactant. Some candidates who determined the limiting reactant in the previous part correctly, forgot to use the stoichiometric ratio in this part, and ended up with incorrect answers.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>60% of the candidates determined the volume of chlorine produced correctly. Some candidates made mistakes in the units when using PV = nRT and had a power of 10 error.</p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The majority of candidates were able to determine the oxidation states of Mn in the two compounds correctly.</p>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Less than half of the candidates were awarded the mark. Some did identify MnO2 as the oxidizing agent but did not give the explanation in terms of oxidation state as required in the question. Other candidates did not have an understanding of oxidizing and reducing agents. </p>
<div class="question_part_label">b(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A very well answered question - 80% of candidates understood what is meant by the term weak acid. Incorrect answers included 'acids that have high pH'.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Half of the candidates deduced the formula of the conjugate base of hypochlorous acid. Incorrect answers included H<sub>2</sub>O and HCl.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A well answered question. It was pleasing to see that 70% of the candidates were able to calculate [H<sup>+</sup>] from the given pH.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>More than half of the candidates identified the type of reaction between ethane and chlorine as a substitution reaction. A few candidates lost the marks for writing 'electrophilic substitution' or 'nucleophilic substitutions'.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a challenging question that was answered correctly by only 30% of the candidates. A variety of incorrect answers were seen such as 'chlorine is a halogen and hence it is reactive', and 'ethane is more reactive because it is an alkane'. For students who answered correctly, the polarity was the most frequently given reason.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Half of the candidates wrote the correct equation for the hydrolysis of chloroethane. Incorrect answers often included carbon dioxide and water as the products.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a highly discriminating question. Only 30% of the candidates were able to identify the hydroxide ion as the nucleophile in the hydrolysis of chloroethane. Incorrect answers included NaOH where the ion was not specified. 14% of the candidates left this question blank.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Half of the candidates were able to give the structural formula of ethoxyethane. Incorrect answers included methoxymethane, ketones and esters.</p>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Nearly half of the candidates were able to identify the number of signals obtained in the 1H NMR spectrum of ethoxyethane, obtaining the first mark of this question. Many candidates were awarded the mark as 'error carried forward' from an incorrect structure of ethoxyethane. The second mark for this question required candidates to look up values of chemical shift from the data booklet. Nearly a third of the candidates were able to match the chemical environments of the hydrogen atoms in ethoxyethane to those listed in the data booklet successfully. </p>
<div class="question_part_label">d(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was the highest scoring question in the paper. The majority of candidates were able to calculate the percentage by mass of chlorine in CCl<sub>2</sub>F<sub>2</sub>. Mistakes included incorrect rounding and arithmetic errors.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This nature of science question was well answered by half of the candidates. Some teachers commented that the wording was rather vague. Incorrect answers were mainly assuming that CFCs were related to the combustion of fuels and greenhouse gas emissions.</p>
<div class="question_part_label">e(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">The biochemical oxygen demand of a water sample can be determined by the following series of reactions. The final step is titration of the sample with sodium thiosulfate solution, Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> (aq).</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">2Mn<sup>2+</sup> (aq) + O<sub>2</sub> (aq) + 4OH<sup>−</sup> (aq) → 2MnO<sub>2</sub> (s) + 2H<sub>2</sub>O (l)</span></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">MnO<sub>2</sub> (s) + 2I<sup>−</sup> (aq) + 4H<sup>+</sup> (aq) → Mn<sup>2+</sup> (aq) + I<sub>2</sub> (aq) + 2H<sub>2</sub>O (l)<br></span></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">2S<sub>2</sub>O<sub>3</sub><sup>2−</sup> (aq) + I<sub>2</sub> (aq) → 2I<sup>−</sup> (aq) + S<sub>4</sub>O<sub>6</sub><sup>2−</sup> (aq)</span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A student analysed two 300.0 cm<sup>3</sup> samples of water taken from the school pond: one immediately (day 0), and the other after leaving it sealed in a dark cupboard for five days (day 5). The following results were obtained for the titration of the samples with 0.0100 mol dm<sup>−3</sup> Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> (aq).</span></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><img style="margin-right: auto; margin-left: auto; display: block;" 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" width="279" height="120"></span></span></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the mole ratio of S<sub>2</sub>O<sub>3</sub><sup>2−</sup> to O<sub>2</sub>, using the balanced equations.</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;">Calculate the number of moles of oxygen in the day 0 sample.</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 day 5 sample contained 5.03 × 10<sup>−5</sup> moles of oxygen.<br></span></p>
<p><span style="background-color: #ffffff;">Determine the 5-day biochemical oxygen demand of the pond, in mg dm<sup>−3</sup> (“parts per million”, ppm).</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;">Calculate the percentage uncertainty of the day 5 titre.</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;">Suggest a modification to the procedure that would make the results more reliable.</span></p>
<div class="marks">[1]</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><span style="background-color: #ffffff;">4 : 1 ✔</span></p>
<div class="question_part_label">a(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="{{\text{n}}_{{{\text{s}}_2}{{\text{o}}_3}^{2 - }}} = «0.0258{\text{ d}}{{\text{m}}^3} \times 0.010{\text{ mol d}}{{\text{m}}^{ - 3}} =» 2.58 \times {10^{ - 4}}{\text{«mol»}}"><msub><mtext>n</mtext><mrow><msub><mtext>s</mtext><mn>2</mn></msub><msup><msub><mtext>o</mtext><mn>3</mn></msub><mrow><mn>2</mn><mo>−</mo></mrow></msup></mrow></msub><mo>=</mo><mo>«</mo><mn>0.0258</mn><mtext> d</mtext><msup><mtext>m</mtext><mn>3</mn></msup><mo>×</mo><mn>0.010</mn><mtext> mol d</mtext><msup><mtext>m</mtext><mrow><mo>−</mo><mn>3</mn></mrow></msup><mo>=</mo><mo>»</mo><mo> </mo><mn>2.58</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>4</mn></mrow></msup><mo> </mo><mtext>«mol»</mtext></math></span> ✔</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{2.58 \times {{10}^{ - 4}}{\text{mol}}}}{4} =» 6.45 \times {10^{ - 5}}{\text{«mol»}}"><mfrac><mrow><mn>2.58</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>4</mn></mrow></msup><mo> </mo><mtext>mol</mtext></mrow><mn>4</mn></mfrac><mo>=</mo><mo>»</mo><mo> </mo><mn>6.45</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>5</mn></mrow></msup><mtext>«mol»</mtext></math></span> ✔</span></span></p>
<p><em><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"> NOTE: Award<strong> [2]</strong> for correct final answer.</span></span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«difference in moles per dm<sup>3</sup> = (6.45 × 10<sup>−5</sup> − 5.03 × 10<sup>−5</sup>) × <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1000}}{{300.0}}"> <mfrac> <mrow> <mn>1000</mn> </mrow> <mrow> <mn>300.0</mn> </mrow> </mfrac> </math></span> =»</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">4.73 × 10<sup>−5</sup> «mol dm<sup>−3</sup>» ✔</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">«convert to mg per dm<sup>3</sup>: 4.73 × 10<sup>−5</sup> mol dm<sup>−3</sup> × 32.00 g mol<sup>−1</sup> × 1000 mg g<sup>–1</sup> = » 1.51 «ppm/mg dm<sup>−3</sup>» ✔</span></span></span></p>
<p><em><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">NOTE: Award <strong>[2]</strong> for correct final answer.</span></span></span></em></p>
<div class="question_part_label">a(iii).</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{{100 \times 0.1{\text{c}}{{\text{m}}^3}}}{{20.1{\text{c}}{{\text{m}}^3}}} =» 0.5 "><mfrac><mrow><mn>100</mn><mo>×</mo><mn>0.1</mn><mo> </mo><mtext>c</mtext><msup><mtext>m</mtext><mn>3</mn></msup></mrow><mrow><mn>20.1</mn><mo> </mo><mtext>c</mtext><msup><mtext>m</mtext><mn>3</mn></msup></mrow></mfrac><mo>=</mo><mo>»</mo><mo> </mo><mn>0.5</mn></math></span> «%»✔</span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">repetition / take several samples «and average» ✔</span></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>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>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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+91yskvT8qJkyeNC8soDxIgARIgARJoFwIVibPFxcfLg7Nh5biduy2Tk9ckez0rc/NzK5hhAgFEU6MXoEWlnK25An3LnlxKp+XEiRMvfCjOWvaWsuEkQAIkQAJVEKhInGGHAEwIgBjy00Fx5qe7wbaQAAmQAAmQAAnUQqBscVZYSiO2tGSFv7qZIM64lEYtjwHzkgAJkAAJkAAJ+IVA2eIM3ZhYEsOPA+9pOfPL48R2kAAJkAAJkAAJ1EqgbHGGir7//ntjobqcviyzMzm5l79nujghjuzPw3sPPZ1t9+ABNj7n3pq1PgzMTwIkQAIkQAIk0HwCFYkzbHKOfTLDkcIm57CiuX1iQyt3CGj0ZVKcNZowyycBEiABEiABEvCKQEXiDOuWYX2zZCIhmBxgPqlkIQwuwpbOvboA1IPFb/3Y3eolA9ZFAiRAAiRAAiQQDAIViTO/XjK6VKMxdmv69f6wXSRAAiRAAiRAAuUTCIw4i0S+beguBOUjZUoSIAESIAESIAESqJ5AVeJsfiEvf5vOSHr8kmAcGo6F/ILZwml+Yb761lSZk2POqgTHbCRAAiRAAiRAAr4jUJE4e/TokaTTaRmMDJrZkVhaIxw+ZS5q5s6MRCNR82nkJuduBCHOsCF7I/fvdKuXYSRAAiRAAiRAAiRQbwIVibOpqSkJRfollUwZIYSB+Ji9qQc2QMdisCMjCQ3yxH0+IcBfOxd4cvGshARIgARIgARIIFAEKhJn2Mgc4uvBgwcGAgbiY8Nz+8jdzslgNOLJnppaLycEKInmu9j0Hvcjn89LbiYnmcyEYM/M4eHhFz6JZMrEI93MfM7ko/Wz+feQLSABEiABEmgugbLF2ZMnT2RoaMh0a2qTC+Ks0K2pYfhxhmCbn/du7BnawUVo9Q5460JMoav72LFj0tnZKf+64y3p6OiQ9Rs3ypo1a8xn3csvy7ZtW+WfXy98tm4puBoPd9369bJ58xaT99d79sjRj47K1wNfSTZ7y9sLYm0kQAIkQAIk0GQCZYsz7K0Zj8bMmmba5oIoiuipcfFjPRAaEHRxenWgHdiQnVYXb4iDN9a7O3r0yLIAg8Da+Oqrsm/PPunp6ZFIJCzTU9OrNgjP1c3rN839O3bsuBw4cED+pWPbinL3Heg069h5PZZx1cYzAQmQAAmQAAk0gEDZ4gx1nx89b7o1Fx8UNj7Hj7SzW/PGtety5oy3OwSoSKQ4a8ATslTk4ycPTTfl5yc+lze3dxhL18YNG6Sru0v+609fybXMpLGWPnz4sKZGPH66KIsLi3Lj5nXzrP3h2B9ky5bXZO3aNfLali3GOnc6fHq5a72mypiZBEiABEiABHxIoCJxhh0CsBI/urFwQBSFQgPLlwXLBsakafxyRIM9i4tPuUNAAxmji7qnq2fZmrVn717DG/ffiwPWNVjqOrsOLLdhx44dS/fcmzZ4cZ2sgwRIgARIgARAoCJxhqU0sEUTBBpE2HhyXE5HwjKRmpRzw3ETjskAc3NzntItrHMWYbdmHanDCnnj5t/lyJEjsnnLFnnllU3Sc6hHkheTUqt1rNpmQqRh8sBf/vIXefPN7Uao7XzrLfm6v99Y7TDekQcJkAAJkAAJtDqBisSZXuzs7KxZcHZ4OGFEGoRaMjkuf5v6m7GmaTqvXIqz+pGGwDl1Kiw7d+02XYl7du+RaDQq9xfv1a+SOpSEPwrXr1+Xzz77TDa+8ops2rRJPu391NOJKHW4DBZBAiRAAiRAAi8QqEqcvVBKkwPQvfbtCLdvqvU2YBLH8d5eY5HC4P5wOFRrkZ7kh5Wvs7Nrud2JxLAn9bISEiABEiABEmgEgcCIMy6lUdvjAeuYsZa99JKcPPG56T6srURvc8OSFomcFizTsWH9Bunu7pZb2dveNoK1kQAJkAAJkEAdCFQszmBdwU4ByeSIJFPJwie95Cafn9ehbWUX8XyHgMdl52HCAoH8fF4+7C0M9oe1DOMJW/3o7ukuWNFeecU8q61+PWw/CZAACZBAexGoSJzlcjkzxgzLZ+BH/HS48FG/utGot0tpcOPz6h7abPbv8otdu4yQeb+np+WsZcWuGlY07Eiwffub8vM3Osyaa82axFCsjQwnARIgARIggWIEyhZnGCh+/vx5s3TGzZs3BBYXiCJ8MOZLXVixHt2vba2rYo0tFo66sek61zkrRmhl+L2FvBzv6zOD6LsOHpRsNrsyQUDOFhcX5fcf/d6Iz91v75F0Ku3ptmIBwcjLIAESIAES8JhA2eIMwgezMv24Er9Zby0Zojgr4+FBtzTGY2FFf8zEbAdBi8ki2B4K15xMJMugxCQkQAIkQAIk0DwCZYszrDE1FB8y4qx5zXWvGeIsFom1hdBwJ1Be6ORkxgz6X7/+ZWM583o9uvJa2ZhU48mk2bcTS24kxyjQGkOZpZIACZAACdSDQNniDJXpArR+s7ZAnGG8m9/aVY8bVK8y8vm8WQ8M1qMvTnxRr2JbqhxYDTEjFVa09FSSXZwtdffYWBIgARJoHwIViTNYWtC1eSWT8ZUQwpgzWs6KP7QQr3v2vC1bXt8sI4mktPNK+nfu5ORfd+yQjevXSyjUGuu4Fb+zjCEBEiABEggigYrEGfbMhDjT2ZpnzsQkfi4u0diSGy248eFznrKCOKPlzB051v6CpWj7v74pd+/OuCdqs9CF+QU5fPSIrHv5Zenp6RbseMGDBEiABEiABPxCoCJxFl/aPxNCqNQHAs7Lo9CtyR0CbOYYI4jJG+jGxAdbHfFYSeDwv39o2Ozfv29lBM9IgARIgARIoIkEKhJnWCsKQkiXzYCLD5bPsMNw7uWBuqMxLqVhMz8TixmL2S9++QvB+nQ8XiSgS4pgR4FvBr55MQFDSIAESIAESKAJBCoSZ01oX1lVckLASkzz8/PLFrOgrmG28oprOzt0+LDh5cdlYmq7MuYmARIgARJoRQJVibNnD59JLpeVycykXLl0xVz3gwcPZHp6WrA6u9cHLGfcW7NAHTNW9767V97c/qZkMpNe34qWrO/e/Xuy59e7jUALR8IteQ1sNAmQAAmQQHAIVCTOMI4J+2oOxs5IKBSWwaFBObX0Y3b79m0zDi0WG5K5hXlPCT2895ATAkRkcnLSLJfxs9d/JrOzdz29B61eGZYa6e7qkfXr10s8PtTql8P2kwAJkAAJtDCBisRZbjq7JMBigjWjsIUTRJoeEG6YKIBZnV4eGOMW4g4BZg0vDP73ekKGl/e60XV1dnbK1i1bzfPd6LpYPgmQAAmQAAm4EahInF3860Wzh+X8kmUMY73C4VMryr12/ZpEB73d+Ny0Ix6WJw+erGhLu5xgKYg9e/cIBraHBkJcXLWGG5+7nRNYHjs6OowlsoaimJUESIAESIAEqiJQtjhDlyaW0sCgaT10IL6ew8WYp1BowFPLAyxnkUj7LqXR23vcjJfC2l08aicAyyMskNh7FBZiHiRAAiRAAiTgJYGKxBl+tCYyE8vtK1jOTi+fqweL1GLGoFdHQSS251IamcyEWUz1wIEDgnFTPGongCVjBv4clnUvvyTdnd0yd2+u9kJZAgmQAAmQAAmUSaAicXZueFhG4iPLMzIL4mxlt+ad7B0ZjEQ87VrDbM123L4pm8vKv/zs5/LBB4c95V3ms9XyyU5HTxsL2nu/fY98W/5u8gJIgARIoHUIlC3OcEkY6I8B/5gYgAPizJ4QgDB0fWKDdC+PguWsvTY+17XMsDWT14v+enlvm1kXuvL7evuMQMNzz4MESIAESIAEvCBQkTjL38ubmYDRaNQINSzdcCp8yoi1q1czEo/GCuLN4xXp222ds6fPfpJjHx0zouHPf/qTF89JW9fxu57fmXXjsI4fDxIgARIgARJoNIGKxJk2BhudhyL9xmrm3GPT62U00KbChID2sZzlZnJGmG3bvt1MwND7QrcxBNRKiUkCsNLyIAESIAESIIFGEqhKnP300yOBQMC6ZhMTE5LJZOS76WkzCQBWHa8P/GC2y96amA3b+d578tZbb1GYefig/fc3A0YQf3j4MLl7yJ1VkQAJkEA7EqhKnPkNVGHMWfBnay4uLkp3T4+ZnXn9+nW/3YZAtwfjzwYG+g377u5uwZZPPEiABEiABEigEQQCI86+HQn+OmdffXXSWG+O9fY24llgmWUQAHt0b/Z/1V9GaiYhARIgARIggcoJBEacRSPBtpzNzOfk5290mK2FsIo9j+YQmJm5Izt27JAtr70u2JmBBwmQAAmQAAnUm0BwxFksuOIseytrRNkbb2wTiDQezSWALs63/+3f5Ne7d3OCQHNvBWsnARIggUASCIw4w6xRDJYP4qFdadg3k4c/CExMpAsTBI6yi9kfd4StIAESIIHgECgqzjD4HIvJZrOFBWdxyQiDAILlwE+Hma0Z0G7NhYUF2bRpk+zavVvu3V/0E/a2b0v3wYNGoIUjL25h1vZwCIAESIAESKBqAkXFGdZ26u//wiyToaVDrGHjcz+Ks6BOCDhy5Ijp0gyqVVCfrVZ0c7mcbHz1Veno6OAG6a14A9lmEiABEvApgZLiDF2Fw8Pn5Wn+qTx++sj4Ic5+/PFHY0GDYCj28fJ6g2o5w4r0W7ZslpNffuklTtZVAYFkLCYbN26Q/fv3CXbQ4EECJEACJEACtRIoKs5QMPbJPB0Jmy2ZBqODxg1HQhKJDC5t4zQoURMeNW4sFjPu0FC81nZVlD+Ii9BiVuDWLVvlzTfflIeLDyviwcTeEhiKx0335sGD3b6zKntLgrWRAAmQAAnUg0BJcQarGLZjCiVDcjZ2VsKhiBFo8MOqFoudNSIN1jQIs0jk2+XzejSu3DIKi9AGa0LA8iSA0EC5GJiuSQTQzf/h0cL6Z1wcuEk3gdWSAAmQQIAIlBRnuM5nz54Za8CTJ0/k4uh5M+YM3Zo4EIYfJog4uPbHS0ZB69aczk7La6+/biYBsKvMyyep+rrwHdjz692y/539XF6jeozMSQIkQAIkICKrijOb0uT1SclOPZ+9acc10w9xFpQJAfiR/9XOX5luspmZmWZiZd0VEkinCstrYCINDxIgARIgARKolkBF4kwrgYUMguju7F2zATo2Qc/n88aCBkub10eQLGex6BkjzD45dsxrjKyvDgSwOC22dxpPpepQGosgARIgARJoRwIVizNsWTM6OlqYHBA+LYORQQmFwhIOnzbjzS6lLpnuTS9hGnEWgB0CHj16JB1vFrZomp276yVC1lUnAvh+YGkNzLJF9zQPEiABEiABEqiUQEXiDGufYSJAKDRgxp5NT00Lut7wmchMmDjET09PVdqOmtJDnKFedAm28pFIpozVJZlOtvJltH3b0fW/bv160z2NZ5MHCZAACZAACVRCoCJxhpmbEEE3b958QQihO3Nx8b6Mnx83lrVKGlFr2iB0a6Kr+O29b0vXwYO14mB+HxD48uRXRmgfP37cTKrxQZPYBBIgARIggRYhULY4g1UqGosZi1kpCxU25oaA8/KAOGvlCQEQZliOZO3adYJB5TxanwCeyW3bt8vGV16R/DwXp239O8orIAESIAHvCJQtzrBsxtDQkFn3bLXmnQqfkpmZ+dWS1S2+1S1nD+7fkx07dkjHP79m9i+tGxgW1FQC2Jd28+bN8tlnnzW1HaycBEiABEigtQiULc7QbRkbGpJEMlFywD/GpUGclbKu1RuREWctPCHg6B/+YLrA4ucu1BsNy2sygfFUUtauXSsnTp4o+b1pcjNZPQmQAAmQgI8IlC3O0GYdc1ZqFho2R8e2T14eEGetOiHghx9+MNs07dy5nYuXevnQeFjXnt17jPjOZCY8rJVVkQAJkAAJtCqBisTZ3N05I4IGB6MyMZGW7PfZ5bXOsG0NRNlgJCI3rt/wlEcrd2se6T1ifrjTaa6L5elD42Flly9dNrM339m7jwLcQ+6sigRIgARalUBF4gwXiWUzsI8mVkGHtQprnNnucDLpefcNxFkrTgjAmCQsWNrZ2dmqzw/bXQYBTGn4U6MAACAASURBVPjo6+0z95q7B5QBjElIgARIoM0JVCzOwAtiCMIinb4sqWRKksmUXL2aMbsF/PTTI8+Rtqrl7Ojvf29+sC+cT3jOjBV6SwBjMPe9vc/cb+4e4C171kYCJEACrUagKnHmt4s04qzFJgRg4sSG9Ruku6dbsDMAj+AT0N0Dfv5GhyzkF4J/wbxCEiABEiCBqggERpy12oQAdA1jXTNMCODRPgSmpqZk7do1EhoItc9F80pJgARIgAQqIhAYcRaNRD1dvqMiyi6Jd/9yt3z8+9+7xDAo6AQ++6xPtrz2ukx5vM1Z0Lny+kiABEggKAQCI85aaUIAdgPARAAurRCUr1Fl14Eube69WRkzpiYBEiCBdiIQGHHWKpazhw8fys5du+W111/nbgDt9E1zXOunvZ8agY49OHmQAAmQAAmQgE0gOOKsRSYE/GXgL+ZH+c9/+rN9H+hvMwJYXuPQ4cOy9qWXJByJcnP0Nrv/vFwSIAESKEWgInGG7hgsCeDl1kylGq9xmK3ZKhMC9u0rrBaPNvNobwL4HmFPVXRx53LZ9obBqycBEiABElgmUJE4Oz963ixAm0qlBLPO/LIcQKusc4btr9a9/LIc7z1OS8nyI9jenuHhc0acdR086Pnize1NnldPAiRAAv4lUJE4SyfTxkIFK5XuCpDJZMxyEM20pkGc+X1CAPgcOHBANr7yCpfP8O/3oSkt+/BorxFo2AKNBwmQAAmQAAlUJM4wTgZC6M6dO5JOT8hgNCrh8Ckj1M6fPy8QatjeCem8PFrBcjZxecL8AH/8+yNeomFdLUAgP5+XXbt/KbCe8SABEiABEiCBisSZG665+TmZykzJaPK8RCIQa6flTOyMoAsveyvryfg0I858PCEAYhVWMyyf8P3fv3fDyLA6ENA/DxgbmZvJSXZ62nS/T/9tSp4++2m5BlgxU+mkxOPnJD4cl9jQkMTiQ8Z/cfT8C7No5xfmBeL6b1N/k6nJKZmenpbs7Vtyd/Zu3Z5vPBfYMeLd/QdeqH+54fSQAAmQAAm0BYGaxZlSepp/Ksl0crm7U7s+4cKa1sgD4gz1NLNrtdT1oX3ozoRA89qqWKpdQYrDvY9EwuY5sJ+9/lBYsK6c89lIJpMSj8YErv3Bzg3OtLnp7HK54Uho2R8Khc0z78YR99lZjls6O6ynp9tYV9F+HiRAAiRAAu1LoGpxhh8fiK7Ll9LG4nB66YdxeHhYpm98J9O563J5/LLgxwzdnw8ePGgYZb93ayYvJs2SCbC48KiewIP7D8ysxv81+b9emIzycPGhYKIKLLaTk5PGunU7d1tgRcPzUcthW+RgLcvNzAvKnp76TvL5/IqiF+YXzDMfiQyayTOYRIM2YQINhgOUOnK5f0hHR4e88ca2F8otlY9xJEACJEACwSJQkTjDjxT2gpy8PvncerA0OQDdQ277RELAwRKQzTZuqQD8+Pp5QsCRI0ekq7MrWE+OR1fz448/ynR22li/bKtVI5+nWi8N3wO0L/ntiETj0eXvCix7zu8IvlP2ARGH7m9az2wq9JMACZBAexEoW5xhzE7mcsZYAzCuDD8eY8mE3M7eKmmZ+PHxY4lGzxhLRqPQ+tlyBsvNpk2bZCh2plGXH9hy52fn5UwsZp41iP90+rJ5jmC9cooav0JAOx/cv2cseLOzsy80M51OGcszrH6wrOJ5+eiDj8zem/DzIAESIAESaD8CZYszoJnIXK54RibG3eRu327oIGcjznw4IeDRo0fS09Ujm7dskfy9ld1f7feoFb/ixcVFM4Afk0ucB4QYtrwK6rGwsGCsbFcmrpgJCvjTgxnQeGZgQbt+42ZQL53XRQIkQAIkUIRAReKsSBlND4Y4w49apQOwG91wWD6w+ntnZ2ejq2rZ8rXbG/cvlUy17HXUs+HXs9NyfGnts0OHe+pZNMsiARIgARJoAQIVibPLExmZSE/IE8c4Gfs6MUAaXVFeCiW/dmt+8803RpxFT5+yEbW1H918uF/Xrk7KyMhZI6pHR0fNciy0Lj5/NGB1PfzvH8q6l16SUChkunHj5+JmWIGZYDA9aSYNtEr37vMro48ESIAESGA1AiXFGQZjz96dkdmZWbOm07n4kJyNnZU7M3cK3VCzcyZc4+GmJy6btc7yee/Gy/ixWxPstnW8afZOfLbaXWijeIj3cCgi8eFh00Xuly3A/HoLeg4dMgIff3gw4xm7CKRSlyQej8vpSMS4mJ0KMceDBEiABEggGARKijPMLIvGns82w7pO6H5S1+nHOT5YK8rLA+Ls28i3nlrrVrs+cECXJtbY4vGcACyqeK68tKw+r731fFhMF8/R1i1bVzQe/NBtjokSeNbIcwUenpAACZBASxMoKc5wZdev3TDrNI0nxyU6WBBf8KNrBa6uLQU/FvNE+N07jV101kncb5YzDGDft2+//Oxf/kWwNU87Huhuy+VyxjqG+8OjegLJRNLM+P3vb755oZBnz569MHMVa75hSY7bt2+bLmR2fb6AjQEkQAIk4GsCq4ozu/UQX7AE+e1ljx9/P1kP0PUEawfWN2vXAyId9wQfWH941Ebg8KEes8tEOaXAohaK9C/zx73gQQIkQAIk0DoEKhJnWOrAj2svGctZJOqbrp3jn31qxFlqvL1mH6Jr7dr1a6ZbOxqNypXLEyXXwGudr0nzW4rv3ebNm2Xnrt3itl6as4X4TuBPAv5Q4V5gv9tMJmPGiDrT8pwESIAESMBfBEqKM1g88NHxLBBnGraa6+VlGnHmk3XOMDAb3Zl79u4N9PpczvuL9chgJVMRgHvCo74EhmJxI/oPHuyuyHoNS/eNGzeMUJuYuFLfRrE0EiABEiCBuhMoKc76+0MSjUSXt5wZHR4VhGG2HQbgw8VH06nbzhMCstez5ge03SYCLC7el0w6Q0tZ3b+izwuEyOrr7TPPF9x6HJic4UdreD2ujWWQAAmQQKsSKCnOMFYFH7WcoZtEw5bdyymz9tmlS5eW4/Aj7eXhJ8vZqXBIXt/2hjx+HGzLkT4TXt5n1lUg8PbefUagjY+P14xkempaTkfCZnkOWMMfPlysuUwWQAIkQAIkUBuBkuKs2qIfP/X2BQ9x5pcJAdgN4NixY9Wia4l8WKsMlkGs7s/DewKZzIQRZzt27KhL5dhYXidvxGJnzX2l+K4LWhZCAiRAAlURaIg4q6olNWQyljMfTAjI5bKy7uWXzfIiNVyOb7OiWw2CDOPKIpGozM29uJG3bxsfsIZFB6Kyfv3LEo6crmj8WTEMWAx4KpOR4eFhCUdCgiEMiwHe07QYB4aTAAmQgB8IlBRnExNpuZwubHaeTl+WifQVSU8k5fKVCcmkJmTi8uVl/+XLlySdyciV9GW5kmm/bs2nTx9JZ2e3bPnn1xq6yXuzHhqMS8KCp4ORQbl69WpdBEGzriUI9cI6ffLLr8wMTnxP67W8DcrBn52bN2/Wrcwg8OY1kAAJkICXBEqKMwzwR3dHf/8XxsU/ag3TbpD+0MBylwjCQm26QwDG66xZs0727z/g5f3zpC4spKs7RWQns57UyUpWJ4Cux46ODtPFmc02/r6gDkz84EECJEACJNBYAiXFGV7G+GCld7i3b2UlN10IW47L3jZxem7S5W43ttWO0v0wIWDoTGGZgz//+U+O1rX+aW7mtpw/P2r2WH367KfWv6AAXQG6mLHgcdfBgw2/qqH40PJSKffutefOFw2HzApIgARIQERKirNWIeSHCQE9h3rMj+RsQFfDr1e3Was8U63Uzg+P9ppnr17LaxS79qf5pxKNxYylPBaJSTKd5NIpxWAxnARIgARqIFBSnOEH+cmTJyuKR1cKwjVOf7SRTsOceVYU0ICTZk8IwHVj9fZ3A9Kl6fX9a8Aj0XZF/mb/vxmBNhSPN/zaYR0//9eLRqTBcje/MN/wOlkBCZAACbQTgZLiDIvJ4oOFKnEksfl5LCLR6BnjIm4wOri0Xc+ZZfdc/JynDJvdrTk+npKNmzbK9ZuTnl53IyrDbEx0X3Fh0kbQbVyZs7N3zfgz/EnI3fZmL1NY0v7+/d8DOQGmcXeKJZMACZDA6gRKijMM8LfFWSqZMutbIWwkMmIGiZ+NnTX/oL+NfVvo7ojFJB6PrV5zHVNAnGHHgmatzXTi5Emz52EdL8nzomD9y05lzT3EMgo8WpPA1i1bBV3szTzwZ65Z38VmXjfrJgESIIF6ESgpzvCCtV+y+AHXMKeLrjANe/L0ab3aV1Y5zbacvfP2Xjl69GhZbfVjItw37P4AMY51rrA/KI/WJBAKh8xae7iX+L4240ilUuY5Qvfn4qK3C1I343pZJwmQAAnUm0BJcVbvyhpVHsQZfowgMrw+UOeadWsknUp7XXVd6sMPOAZ2gx9W/QdLHq1NYM/uPWb8WTKRbMqFoEsc1nU8U1gbD13lzRKKTQHASkmABEigRgJViTP8G8a6XpOTkzIxcVnS6QmzaCVeys14CRvLWZN2CDj68VHZsH6DPGzR1dTVYgZrRzPEbY3PL7O7EEhdGpd169fL7j2/bprYxncSz5aKtPHUeNPa4oKIQSRAAiTgawIViTMIL2x4HokMmn/F2DAZL199AYdCA3Ju+JznXRlGnMWinosLrP+GH8HO33b6+iaXahyENhaZ5REsAtPXp2Xbtp8JxqB9d+t60y4O7wz8kcN4VXxfeJAACZAACaxOoCJxlslkCl0V8ZjpqrCLh0BC91g0EhFszOzlgbqbMSHg7EjCdB993d/v5eWyLhIoiwC6FbFAbU/PobLSMxEJkAAJkIA/CJQtzp49eybnR88bKxk2SS52YN/FM2fOFItuSHizLGefHS8s/nklc6Uh19WIQsEKHx7BJwCraGdXp6x96SUZTzZn/Fkxymgb/uxh0gC704tRYjgJkEC7EihbnAFQNBw11rFSsPCiDYXCL1jWSuWpNQ5ioxkTAnbu2m0sE7W236v8ygmDtHm0BwHsiwvr2Y4dO5bXK/TDleuzqBNRuK6eH+4K20ACJOAXAmWLM4wdweKkE6m0wIpW7EA6jEX7cf6+PC2Rrlj+asLxoo96PCFgOjttfvTC4XA1TfY8D5bHwDIZ+DH8/vvvPa+fFTaHwMDJAfnFr3cZ69n+/fsk76M9MfFH7mrmqnkmo9GoXLt+nVa05jwmrJUESMBnBMoWZ2h3YTJARO7M3HW9DAizK1euyOiot4uYGnHm4YQACJ13390rHT/vkB9//NGVhZ8CwQfCDB/4ebQPAdzvc8Nx6e391PyZ+M27B3wngCDSbt++bTZVj0Sipquzfe4Qr5QESIAEXiRQUpxhpW/7g64HWF4wKzOTzpgtfjQ+n8ubdbLQpQmrkpcHfoC8nBCAWWdr1qyTrs4uLy+zqrrABuuXhUIhCrOqCLZ+JqzBl0gk5MCBA0agYaN0P47zwrOaTI7I7Oxs60PnFZAACZBADQSKijN0XQ5EQ3ImekYikbBxo9HCEhoQaPo5E4tKLBKT0GDIjDVDuBebL9vXjJd61EPL2YXhEfMjd/LLk3YzfOnHWnQQzDdv3vRl+9ioxhMYHx+X5NiYJJIJeXvP/2Ge3W98OsMY1nceJEACJNDuBIqKM4CBxcXtg/00EX525KyMxF5Mgx8BLw+IM4hCr6wBJ74oDLL2esmQapiCDVZo59GeBLC8TV9fn7Gc4TsbjUVk3bo1svGVV1pic3s8v2j35PVJX01oaM+niVdNAiTgFYGS4gxip5oP9tn08jCWMw8nBOz6xS6zuCf/5Xt5l1lXNQT6+/qlq/ugJMYSkkwmZSw5JuH+kGx57XXp7n7fsz801bQdebDkxuhw3Cx8DZdbQVVLkvlIgARaiUBJcVbthXi9lZERZx51axbGm/2TDCf9uxyFVxbEap8P5vOOAIYk/MfHR2VsbMyIM4w9S6YSMtD/jdkgfd++PS1hQZubm1+ekJS6mJKZ2VxTtorz7s6xJhIggXYmULE4wwQAdDFgQgBmb+KDrhO4CEOXJrZz8vKAOPNqQgCuraOjQx5nvd9kfTWmsORNTU1JPOot/9XaxfjmEkgmEuZ7CcsZxBm6CRHW3dNjxp/1HOppGaGDraAwhKE/EjHbQjWXLGsnARIggcYQqEicwWqk+2jqhAB1w+HT5qUJNxYL7g4BvZ98Im/vfUceP11szB2podSbt2+awf+p/2+8hlKYNWgEUpdSRpSZbs2liQHo3hw6E5Pd+/bL+vUvy8Rlb7dcq4Vxfi5vNlV/cP9eLcUwLwmQAAn4lkBF4gzrl0GMXb2SMf9aL6Uvm4VpscRG7vZtmZhIy2A0Inh5enl4OeZs51tvyZcnv/Ty8latSy1mWIgXFkysw8aDBEAA3434uXOmWxNWs+XuzTH4MQ4tIe+9955s2rRJkolky1jQnHcX3wG8hzgO1EmG5yRAAq1IoCJxBqsZukT0QBeDswtTuzo1jRcufoAgGhs91uqHx49NN9BkbtKLyyq7jlwua64fA6Z5kIBNANs3dXd1m/Fm2q1pu/DH43EzexPbPGGvy1Y80G68A0ZGzrZi89lmEiABElhBoGxxhn+ksTPYW/N59wdmUqEbE+JIj4W7C2albz33wjWWMw8mBHx46N9lw/qNJbev8uJ67TpwD2KxocKG9D7amsduI/3NI4Dtm7q63zdWMrWcqQsrGsaIjiUS8lnfZ7Ju/XrZtesXLTmWC98D/DHENlD4w3jt+jVa0Zr32LFmEiCBGgmULc5glcJLL5NOLlcJwYZ/qxiErgeWkAxHQp6uSQRx1ugJAagDlgXsT+inA105uC+Nthr66ZrZlvIJ9PX2mYH/mABgW8wg0PCxw7BzAJ7xX+38Vcs+T7qLCd5LEGs42NVZ/vPClCRAAv4gULY4Q3OxNyO6QPRlh10EYtGY+fetl4PxTrCm4SXp1eGF5exK5qr54cIehX47YDXgQQJuBNCtebCne8WYsxWWs6VxaGb8WSIhBw8eNM/5Bx98sPw9dyvXr2HPIMbyT2Xy2qQMRiISH47Lg/sP/NpctosESIAEXAlUJM6wFRD+keLfNva/gzi7+NeLJuzWzVtGkF2+nJZINOpaWaMCjThr8CK0n39e2BUgkbjQqMtguSRQdwJYhPZg98HnEwEsa5np1lRxlhyTxNkRs0jt0Y+PmjXQTnz+ed3b42WB9+7fM2Po9M+kl3WzLhIgARKohUBF4gwvOXQfYq9GrG2GQ9cdQlcmhJvdnVBLwyrJC3GGehvZtdfV3WUsCl5aBCthwLQk4Ebgiy/6pHNpQoBZ3yyZXO7K1G5Nu2sTY9Cw+fihDz80zzu+VzxIgARIgAS8JVCROEPTIICyuVuSy+ZMSyHYINBSqZSMjCTk0qWU2XLFy8vwolvztddflwP/+y4vL8u1LvC/lL4kVzNXXeMZSAI2Acxe/KT3uCTHCmPMVljLMCFALWeWH2Hnzg3J/9bRYSYJDMWDs6gxJgpgVvPNm7dastvWvrf0kwAJBJdAxeLMjyggzho5IQBWQgyU9sMG4ph8AWsGBDEPEiiHgNkhwOrOVEuZWs7g2n7E44M9OPHcYxYndsTw48LL5Vy/nQbfYXx/8JmcyNhR9JMACZCAbwhUJc5gLcvP5+V27rZ89913MjU9LXfv3m1ot2IpYo20nOFau/bvEVjOHj/FXNTmHXf+Udi6ZizZuouFNo9e+9aculTY8BwCbHkR2iJ+tayZtMmEfN0/YBao3bZtq0xOXg8ERLwvrly9agQaJgzczt4OxHXxIkiABIJDoCJxBqGSzWXNulr453k6jH+gg4KV6XX7JnS5IZ2XhxFnDZoQgC2rYDk4+H6Pl5f0Ql0Y63YmdsbMPnu4+PCFeAaQgBsBPDex2DmzlpmKM3VViKmrFjV1jZBLJeVU6C+ydctWI9Ky2b+7VdOSYQsLC2a5DUxgGomfbdqfy5aEx0aTAAk0lEBF4gxdaf39hYH/WO8ML35shI5Pbjq7PFnAXvesoa1fKhziDGKxERMCEsmU6do5+dVJLy7FtQ69vkgk3JBrdK2UgYEgoDsEFAb6FzY+V/EF154kYPsh4JKpQjz8+H5tfOUV2blrdyC42BeB95gfhizYbaKfBEigvQlUJM502YyZ3IwrNVjMMCFgKObtNkLGctagHQK+PPm5EWfJ5JjrNXsRiGVL0P1SjLsXbWAdrUkAS2m857KUhtNaZqxkyZXiTdOYuHRSTvzxhFlio7OzU+bm5loTSJmt9tr6X2azmIwESKBNCJQtzmCVwgK0+Ldd6oBQCtIOAd3d3UacYWHLZh6NsAo283pYtzcEYDk71NNjrGC2xcxYxizLGc7VcqauplE3OZIwO2RgkkDPoeZ28zeanloV+b1rNGmWTwIk4EagbHH25MkTGRoakrS1fZNbgViYNig7BODf86ZNm+Td/QfcLpVhJOB7AhAXY1hg1mW2pm0ZK2Y5WyHoxrDERtx8H9a+9JIc7T0m9/ILvmdQTQOvZK6YrlzsinL3rntPQTXlMg8JkAAJlEOgbHGGwi6O/rWwwXaJF/LNmzdlKHamnLrrlsZ0azZgQsDNGzdNN87MTLZubS23IAhDWOuePvup3CxMRwKuBLAGoS3EINRwbofZfo13E3TJsTHB0hyHDn8ka9eukbf37vV8XUPXi2xAIIRt+lJaTg2GJTGcMLuiNKAaFkkCJEACLxCoSJxh4CwGBqN70zmAFmICEwEwcxNLa3h56ID5endBhEID0tHR4ekm7soNLEPJkODaeJBALQQwsN9NaDnDtDtTXVjNVljOsB6a2UEgabpJv/iwsGvGFye+qKV5vs+bncya9x7efV5PdvI9HDaQBEigIQRKijMMQodZHy/oc8PD5gPxhZcUtnDC0g7nR4dldHhUBqOFhR1PR8Krjkur95UYy1kDJgT857Fj8pvf/KbezV21vHw+L0OxIYlHY7K4+HjV9ExAAsUI9Pf3y/s9h8RsbF5iwH8xy5ltRbOtbQjH5+Dv3jfWZcxmXlxcLNaMlg/HH9OJiQkzQ73lL4YXQAIk4HsCJcWZLpsBMaafUKTfCLOCQBuw/GGzzAZEWyzm7XYvEGeN2CFg/64Dcryvz9ObCAskLBfgiyVKeJBALQT6j4akq6fL/GFyWsFwrlYypxVNzzVe82q4uojfsWOHmTSDZ5YHCZAACZBA7QRKijOIHuwEgH+NcBfmF4x7L39vOQx+ky6fN3Gw+iDMy6MRljN0kW7eskWGhrxbFgSTKbD330BowLheMmRdwSTw9dcnpLv7fRm7UHpvTRVb6tpWMtuqZvs17alTp0z3PybPhEIhefToUTBhulwVujkxxAN/qniQAAmQQL0IlBRnq1UCAfP48aI8fnxfMJuzWYcRZ3WeEBCLxow14N5974Rm/l7e7LgwkZ7gy75ZD1PA6sVSGl1Y5yw5tmL8mIostYjpuboQXuq3XduvaRAGC9pv3vmN+c589NFHbSPQxpKFBXox/GN+YT5gTw8vhwRIoFkEqhJnsI5hM3B0X0bMGLRvzcsZ/yJ//PFHz68F4gxdKvWcELBt+3bTXePlxWQyGbPYrJd1sq5gE0C3ZmdXd9FuTRVncPWjXZlqGTNuujCpYEXY0hg2DYslY3LgwAEj0GBBa4cD++3CchaLFN6FeAfW8z3UDgx5jSRAAi8SqEicwXQ/nZ2WwcFBI4ai0agRaBBpg5FB0x2HCQKLD7wdGFzvbk28bLHQZnf3wReJNTAEondhLpjrRjUQG4suQaDQrXmwrL01IbJgBVPB5rSSIdwZpueaJxEvWNDQxRkJR9rGgraQX5DR0VHzXsRuIuzmLPFQMooESGBVAhWJs1zu+ZRyCBgdsP7D43kzBg3WNFiwvJ5uDnFWzwkBup/miZPN209z1TvHBCRQBgFYwXqP9b6wlIaKKdtVi5m6iFM/XLWQ2WF2fiyzgbiR5IgZg4Y/OO00SQAWM7z78GeV1rMyHk4mIQESKEqgbHGGwep/TV2UcCgid2eLr5idvpxuymzNaB2X0vifX35tLGfD54aLgmMECbQKgbFUYcHZFUJqFSuZ0yKGvG5ham1TF+kuXLggAwPfyNYtW2XD+g1GoLXTJIFWeS7YThIgAf8SKFucwUyP7Zvw77jUgZcwtm/K570bHFvvCQHdBzuNOMMs1UYeELyow8tJB428HpbtTwK17hCgogyu7bcFmfqNmxwzAg3vit+8W5gk0Pnee23Txel8CmZnZyWdTnNBaScYnpMACRQlUJE4g7k+k84ULQwREHHY+Hxmxrs1uuo9IQDrNmFCQKMPbTde3DxIoBEEHmcfG0s2RJPTcoZz7aJ0iy8Vhrxanls67EpgukKTCenp6TF/dk6c8HbNwEbwrKbM7FRhOAgW9cZwEHZ5VkOReUigvQiULc5g5cEuAVi1vlQXxcydGTkd9nYxSmM5q1O3JixZ2NQ5HA43/EmAKMOYnJlc8W7ihjeCFQSaAJbS6O753QqLl4oq2wpm+yG2ilnJyk1nCzZY0A4ePGh2EjjxxRdtaUGam5uTWGzIfN8vpy8ZBpw0EOivHi+OBGoiULY4Qy0qJrDkg9uBCQL4d4iXv5cHxFm9JgRg6YF169c3vPlqNUsmRxpeFytoXwIFcdZjvpNqJVN3hYBysazZ8Sro4Gp+DdN0ONcwO51JP5JY3kngaO+xtrwhsJjppCn8KcPMdx4kQAIk4EagInGGsVHRpT00o7GYTE5Oyq2bt+T69etm3zms9QOL053cHbe6GhZWL8vZTz89km3btsrOt3Y2rK1a8NXJq2Zv0sVFriyuTOjWn8DIyFnpPfaJWYQWIsq2fBXzazoVWnY6FWJurp3O9pvyxscE+/Lu3LVb1q5dI2disbZdbiKXy5k/seDCgwRIgATcCFQkzlAATPE3/37TbHaOf3/Y6BzuYHTQWNbm52fd6mlomBFnddgh4MbN62ZszJHf/75h7UX3cC6bE6wRh/EnPEig0QQwpTwHLQAAIABJREFU/usFsTQ2trw0hsZBjKkfru0vJtQ0Haxj8BdNZ3YoGJPkyIj83//5/8g//dMa6ezslPm5uUZfvm/Ld+6qwm5O394qNowEPCdQkThzG8iKrkxd78zz1i9VqF2Ebu2rpE3YggVrM4UG+ivJVnFa3V2BL+OK0TFDFQTSqfSyEFOLl4oodTXcdm2/poOrH+3edEvnDDP5l9ZBg1js7CrMiN6ze0/T3x9VIG1Ilvn5GdPVWet7rCGNY6EkQAKeEqhInI0lEsYcv7jo7Q4AqxGpV7fm55+fNOIslRpfrcqq42E5e5p/2paDoquGxoxVE5idmZXBwTMrrGAQTmrxcvO7hak4s61pmg4u4u0426/plsMSCTk3HJeenn+Xl9a9LBBok9euytNnz6q+zlbPiGu3x/TincY/b61+V9l+EqieQNniDCb4ofiQjMRGfDcVvF7dmgd+U9gXMH/vQfVEmZMEfEQAEwIOYuPzpW5Mp6uiyg63hZj61UU69avrzItzO+wFcYa2jCUkmUjIn7/6Sja+8ops3rxZxhMpH5HzvikQY5jVGY/HJRQKL6+NRpHm/b1gjSTQbAJlizM0FC9jjC9r9OKslUKBOPt25NuaRSNWNMfGzTxIICgE+nr7pLunMFtTxZTtomtSLV8aXqq7Emk0XtNrmJYD1/ZrOmcYuvd1y6eOjg6zo0B6ytuZ3n68z/aszv7+kORmcn5sJttEAiTQQAIVibPbd7JmQcuh2JD5V5fJXDUzNTFbUz+Tk9fk5s2bDWzyi0XXw3KGmahr1q6RVKoxC8Ji8D9fsi/eO4Y0lgAsZ11LljMVSera1i3b7xYPYVXMIuYUXZpWy4Gr5atfz9WChlneW1573VjRTp061VgoLVL63bt3zR/i7I1bguEQPEiABNqHQEXibGQkYSxnodCAcWFFgx//7jQMuwMg3MsD4gx11jKQFoOmsb5ZIyY3oFsC67/B4lBLG71kyrqCQcCsc9bVbX7k3SxeKqDcBBbinHk0nR1XKkzj1NXycG78SzsJYJJAZOCkbHz1VTPuE+3mdyUYzyCvggRIoHICFYmzf3z/j2ULmVrKnG7TLGc17hDQ399v1jdrxPiOubuzZr/RHBedrPwJZY6aCPT39RcsZy6LzKr1qphFzI5XceXmOtOVU55bnguJC2adxF/84peydu06OfqHYxwU77j7eD/hnYuhJY14Vzmq4ykJkECTCFQkzprUxlWrrUe3Znd3lxz6H4dWravSBPj3j5lpxXZVqLQ8pieBSggYy1lPj+sYMAgk7WZ0E11qVUM6WLnKEV0oR4WXXbYd5kyz4jyVlOFz5+Tjjw/Lpk2bBBumYzgAhUjhroNDKpmScCQi2AaKIq2SbwPTkkDrEChbnOGl4NcXZK0TAn54/Fj27dwh/ScG6n7npqamTJcr2siDBLwmgI3PI5Hwim5Nu2tRBRhc2w/BhI8zzJnOjnfGoR5nGcXqXlFfslBvX1+f6eLc9uqrks15v7i11/eqkvqm/1Z4r2A4B94x7AKuhB7TkoD/CawqzrCm2d8yf5OLoxfNuKnR4VG5evWqr14GtVrO5vM/ymuvv27+sdfzlqFd+GEcHR31rbCt5/WyLH8SwHgup0jCuVqz1IW4Uj9c26/pKw1T8ab5tA49t92xZGHXguWwREKOfnzMjAV9441tcnaE2x3ZT9js7KzoOODLE2m+Y2w49JNAixMoKc4wOB4vU/w7wwdr79iuX6xBBRFU/YSA7FTW/EOv92zKbDZreMHlQQLNIpBMTZRlOStl6VKR5SbyVgtTaxnKUP9qebS+ZHJE0DW7cf168x0NhUK++mPYrHtq14sN1BPDiYZMZrLroZ8ESMA7AiXFmYqLWDwq8OfzeTP+48LwsGBW5tXMVe9aWqImYzmrYULA8b5e2bB+Q93/eT569IhjQkrcN0Y1ngC+t6GBv5iNz58LnoIlbdlCVaWVTMtDOeqHq+XafjtMrXBOV9PYrrGmJRPyzZ/7BWuh4Xs6ODjYeHAtVAOGm/ht15YWwsemkoAvCZQUZ7FYzFh+nBYyiA5Y0AajUV9clBFnVW58jmvBEhr7D7zji2thI0igngROnjhRdIcAWwQ5LVkaV47o0rS2a/tVhDnDnOLNGY9zDcN6aFiw9uPDH8val16S/fv3yeTkZD1RBaqs/P0FSV9KczJFoO4qL6adCJQUZxBgWJ/L7UD3BOL9MBAV4qzaHQIymQnTXdJ3tM/tMhlGAi1NQGdrJkeW1hVzDPwv1c0I8aTx6jpFHM7LDUN5ttjTMtV9oZyko+ylHQWw48GaNWvMjgJY3PnxU3/t9euHByY/nzfvZ7yjsWdnI9Zv9MN1sg0kEFQCJcUZFpbFPm9uh1k00kfiLFql5SwWi5sXffh02O0yKw5DF8Pd2bu+EK0VN54ZAkcgl8vJqdApGRt3DLa3rFJqnbKFE4SShtuu7dc01YZVVR8mDVy4IL3Hes1+nNiX85uBgboPSQjCgzA3O7e0mfqg+ZN9/fo17jQQhBvLa2gLAiXFGf51RWMxVxDYF89PlrNq23Li5Ekjzuq1bROseGgLJhnwIAE/ELBna0IQFbNUabi6TkuWU0zZ56X8GucsT+tR1xmPfPpxxiEPtnzSHQWiMc7kLPasYS00vJN0M3Va0YqRYjgJ+IdASXGGL3P8XBHL2dIszidPnjT9asyYsyonBPS8/74Zc3Y7d7vm60D3yvWrN4y10Q/dvTVfEAsIBIFUKuVqBVPBo5YvCCH1w7X9SIuPM6yWdCra7HrVr3HaRttFnSZdIiHRaFj2v/MbM1Hg494jZtJSIG5anS8C7yPsLIAuTh4kQAL+J7CKOBsoLs7SSTkd9s+Ys2q6NdEFufOtndLRsb0u3SL4hzoYjchMbsb/d54tbAsCE4m0/PHEiRWiSoWPLbRsvx1vRNDYyi5RjbfjbL+WZadTYadhKrBUdDnzaHpnOhO+tB6ayWvWcBuRj3532Cy3gfXQogNRWXz4oC3ub60XiXcg/0jWSpH5SaD+BEqKM2xoDnO42wdxEEQapxufw9qGWZ5eHtVOCIB5H2NW+nprnwyAFxy6enHtfNl5efdZVykCX3zRJxhAryII4ki7EdWvcRquLsLVr66mtV3br+JLy4Zrh9l+LVNdt3LcwrRMuMhr0qQS5l2EmdeYLHD46OFSWBi3RABrO+Kdxa5OPhIk4C8CJcWZvehsOHzabN4NMQY/4k6FT0k4fMq8FAthAyYs6vESG6Zbs4oJAZlM2rzIp7O1T8nHat1gk7qU8tcdZmvamsDyxucl1iKDuFHLle26Wq0cVjSksfMUE1NuddhCTctwhmm47cIPUQbXpMcyG2MJwdi6U6dOyZ69e8zG6Z98ckzwbuBRnMC9e/dkKDZk3l0TExOC2a88SIAEmk+gpDj74YcZuT+Tl/n5GbOYqu1H3I+zP0o+P2++0HCxjx/+gSGdlwdewBBGlVqsPjzaayxn9WgrNjZHG9C1yYME/EIgFOmXzq7OZcuZLZ6K+W2BpFYtde08mq5UGNK45dU8xeKdZRdL90LZ2Jfz2xE5dPiw+eOFCQMUHKWfRrw3wRHvLyy9gndZpe/S0jUwlgRIoFICJcVZpYUh/bOlTBjL4NVhLGcVTghA+7AlzJ69b9elmQsLC4JtVHiQgJ8IYBHa7u73n1uZXDYzV6uUCiK4xcI03HZtv4ouN9dOZ/uRFuduYauVo23WfTlN+lTS7JP7u57fGQvam9vfNILDT/fFj225MzMjqWTKiLTLExN+bCLbRAJtQ6Du4qwZ5Krp1sSaPxib8sknvc1oMuskAU8IwBLS1X1QxtD15+i+tMWQ7dd0y8LH0ZVpi7diosqtPFto2fHF6ilVtrMNWvZyuUmIvYREYxF59513ZN1L6+TIsSOSvcUlblZ78PL373FS02qQGE8CDSYQGHFW6Q4BGAQLcRYaCDUYMYsngeYR6D8aMhMCIGZUBKmrgkZd7SKEizANd7qaX12Nx7mWoWHqalrb1bTq2vk1neZ3uppHXWc8zk1YutCmPbv3mO/71i1b2c3ZvMeRNZMACZRJIDDirNKlNP7nl1+bl/XY2GiZqNyTLS7er8syHO6lM5QEaiMwM58T7H6xbFGyrGDOMBVE6mp8sXM7XP3quuXVMLi2HyJKz5Ff/aulU0Gm6YvmTY7JueFzy7sKYEYnlhfBvro8yiOAXU/i8XMyNTXFteTKQ8ZUJFATgcCIs0onBGDBSljOstnquznu339sxmdk0pmabgIzk0AjCWDhUbe9NVXcqKvCCq7tR7xaqNziEKbx6mqZtlvM71amlmOXDT/KsMvRME3njFuOTxXaGIk831XgaO+xRmIPVNmYIBCNFpZVQq8DZ8EG6vbyYnxIIDDiLFrhhIAD7xww4mxxsfpNk7O5W2ZJkWvXa1+Kw4fPBpsUEALJ1CXRAfNqZXKzSi0LmSURpGk1XM8hgNTvVk45YXZ+uzytS123dG5hKsqccXY58INDfDguPe91ykvrXpL9+w9ImsvflPWkw9IIy9m5eFzOxM5IOj0hC/mFsvIyEQmQQGUEgiPOKlznbPOWLXL4UPULVeKf5FA8LiPRs/LTT+weqeyxY2qvCCQSw/Lpp8dlDLM0zWr6iWWrGISMLV5skYQ4p9CpJEzFku3a9RWrV8PVdctjx2mbi7XVLa3JMz4uJz8/KTt27JC1L70knZ2dkrl61avb0vL13Lh5w4jcS6lLLX8tvAAS8COBwIizSiYEwCSPLk2s6F/tgX+QhXXNuGhjtQyZr/EEMFuzs6tbklbXpHYZ2sLJ9quggatpNcwtnVvYanlXy6P1uqVzC1utPsTrNaBsfBLJQndt975u8z7AbiGZDJeQqOSp9HLJpEraxbQk0OoEAiPOKpkQgJWwN6zfUPW9e3D/gdnyZHh4WLxbza3q5jJjGxPAtmqHej6QseTzpTRUpNjWJrcwOx6CCOeVhKFMZ3q7nlLxdjqtW8PULVa2Mx7nrmnNrgIJGUtekL6+Pnnzze2yefNmM4N7Zn6GE32q+N5gEe7vpr8zi9g+e6arXlZRELOQQJsTCIw4q2RCwEAoJB0dHVXfeuxHh/qwkjYPEvA7gcTZpf0nl6xHKl7gqt/NGqVhSFOpJUvzwnXLa8drG+z2qN+u2y5H/XZeDVPXrsNuhzOPWtBG4mfNewFW9Z07d3G/ySoebPRG4N2IDxflrgIgs5DAEoHAiLNKJgQcO3ZMOjt/W/VDcPfuXRkZSciDBw+qLoMZScArAslLzy1HtmCxrUm2H2lwXipMBc5q6ewyivmL1afhWpe6KEf96jrDcL5afcpiebLE+JgMRqLS1dMlmzZtMjuIfH7yJJfcqOBBxVjcm9dumvFoEGjopYA1jd2fFUBkUhIQkeCIswomBLz7zrvy6fHPqn4AaK6vGh0zekwAP5ZjoyuFiooeFSfFzm1xo2nqGabCCq5TTFVan30tWp4dhvLt+rR8dU0cujmRbiQhQ7GYmSQAkbbzrZ2SSKa4fESFz+787Lxg6AdE2nhqvMLcTE4C7U0gMOKs3AkB2JgdXZp4YfAggaATwHN+9OOjRphod5+6tniBOEG4HWb7Vdi4hSFO49Utlq5Y3Ui/Wh5n2Xa9bnk1TPNp3epqPNzlsKVJAlo2dhDBorXo6sRm6jwqI4A/B9h4PjuZlR8ez1eWmalJoI0JBEaclTshAC+K17ZskWRyrI1vOy+9XQj09/XLwZ5uV+FjW5Nsi5iKGXXtONsPUaPnmlZdhMOv8eo641UgIV7TOF3Noy7i1a9tcObBuR1m59G8djzCtHvTxMOKhutLJiQcCsnOXbtl3csvC7Z/GowOspuuxi8QRFsta0zWWD2zk4DvCQRGnMFCgC/8ageWwKh2ZwBY3TB+ggcJtAqBL77oKyyl4bBuqUBRV0USzpetSJZFabV0Gm+7KMcu182vYXDV72wDzt3C7PTqt91ifruNtl/TrwjDLNck1oYbkRN9J8y7A++P48ePc8JADV8C/EmORWJmOaNy3ts1VMWsJNCSBAIjzsqdEPBV6Cvzgq10X72HDx+a5TMSiQsteaPZ6PYkgHXOursPmkVoIT5sa5HtV2Fiu6tZm7Q8Zzk4Xy3MLd6uWwWSW7pqwtzyaH3OOK172R1PCma8jo0nJBoOy4Hf/tYsXLt//z45Nzxc1p/C9nz6il81/uRe/OtFM7wkFjsjuVyOHIvjYkwbEgiOOCtzQkBHx3YzwLfSez19a9q8SG7dmK40K9OTQNMIQJx1db+/bJWyhUgxv5voUqFi51ktDPGaXstUV8Nt1/aXSoc4u2zNp2Hqajrb1bTqIm2peKTTtNrtCfeb//5G9u3cbraAwhhWdHVW+oevaQ+FjyqG1WxyclIwLAW9H1cyVyjSfHR/2JTmEQiMOCtnQoDuDHDkyJGKiWPpDLw8uOFvxeiYoYkE+o+GpLunZ0W3oN1tCXHiFCj2uaZV1xYybuk0bLV0znjNB1c/SKPp7DD47S5TTaNtVFfD7XLsMC3HWTbO7XS2X+NMWHpKent7l7s6e4/1ctB7lc/6fH7W3FNsqs6DBEigzZbSuJK5al6kJ7/8sqJ7D0EWiZzmorMVUWNiPxDADgEffPB/lezWhNBYtg6NjRlhssJi1KAwFTrqVtoGZz49VxflOf3OOjReXWc8zl3DkkucsJF6PL7c1Ym9Os/EhjhhoMqH3238mVtYlcUzGwm0DIHAWM7KGXP2zTcDRpydHz5f9g1CVwX+zWG9Hh4k0IoExsYLQkIFiLq26LD9tljTtOq6pXMLc7M2IZ1djvrhIq6ccjSN5tG2arjt2n5nezTOWU4l6bRu4yYSEj4dFoxDw0bqu3+527w3KCxq+8ZgElZsaMh0fbLXojaWzN1aBAIjzsqZrdnbe9yIs0o2Ny5YzSKSTqdb686ytSSwRKAw2/D5LEy3bj+IFHyc4sQOs/12Ottvp9F61EU622+nRVw55WgalKN+t7zlll1uOmd9yKfXYsrAjM6RhJl92P/1wPLaaO/uP2DW+eLDWD0BvHtDobAZVjJ5fZKzZKtHyZwtRCAw4qycdc66Dx6U9RvXy93Zu2XfImw7AoHGwb5lI2NCHxHA85scey661GKkLoSF7bcFj4bbru2309rlII2dzoiXpUH8yKNxdrgzjzMd4u06bH85eZ1ttcvX9hQrx1l30XTo6jw7IsmxCxI+dcpY0XRttE97P+V41Sq/F3iG8c5OjBT27URPBiYRcEuoKoEyW0sQCIw4W21CALoXsJDkzp3b+ZJsiUeTjawHAczWxMr2yZTD0uNiqVJLkLoqaCCEnGEapy7i1a+uii+3vJrG6WpazeuM13ONh+v0axmaVl0NV1fD1dWy7PIQp/G2a/s1/XLY8tpoSfm6f0C2bd9uLPa79+0XrLNIUVH9k4310XD/ODmreobM2RoEAiPOVrOc/fhjXjp+3iGdnd3CvTFb4+FkK2sngB0CsJTG2IXC8hPLAqIMS5YzrVqYIEbUb1uRVKTYYW7pNEzTq6vhtmv70R6c42MLLA3TeHXtvLbfrk/96trp3Mqx06kfruYzYWOFdkIQJxMXZCR+Vv5w9Jhs3LDBdHd+fPgjyWazFGk1PN5um6lT9NYAlFl9RyA44iwWLbo+ztNnP0k+lzcDdaOx8vfU5PYivnte2aAKCSSTCfms77PlrYlURMAt5ncTJaXCEGcLFU3rdO36SuXRsjS9LX7sMLsMhGs+O736NZ/t2n67rc5y3NKtFqbxKBdj/hJjFyR+LiZYbuNffvbzgiXtl7tN91yFt5TJixDA5uoYn4ZhKBRqRSAxuGUIBEacrTYhAP+0se3K4+zqWzzp3YsPxyU3k9NTuiTQkgRgwVEhA+FhW51UiGi87apf8+g58qtfXS1TXQ23XduvZdquHa/l2PEapunsOIRpPFxNo349Rx589NzOo3Eapuk0re3afmc6t3KW70E6KclUQnp6epYnDXx4tJfbwtXhmzWRnjDdnf39IbPsEWZ6crZsHcCyiKYQCIw4W61b81BPj7yy+ZWyIeey0xIOn5aHiw/LzsOEJOBHAuPjqRVWMhUTat2Ba/shPJxhyOMM03QqVOwy1O+syz5Xv7rIA7/mVVfj1dVw27X9dhnq13htq912xNllq19dzWu7dh6to1jZWpfmN5Y0bKh+6pT8ctcu86dxW8ebcvz4MSPSaPWp7lsEbrOzs8Z6Fg6fMkuZqCWtuhKZiwSaRyAw4my1CQEbX31V9uzeUxZp/NuCJQ6WMx4k0OoE0hj7ZFnM1DKkYkJFiNPVeLjOPHacXbaW4YzXc7sc9auraZyulgnX9tvpbL+dBmVrnNajrobDtcPUr66dTst2C0OcWx6EaXqNN665Lwnp6+2TrVu2GpG28ZVXzKSBVn/mmt1+jElLpguzOzG+jwcJtBqBwIizUpazufk58+I7fPhwWfcHm/BCnF3LTJaVnolIwK8EIpGwfHTk965jzlQwwFWrju3afk3jFqbl2HG2X/NqOj2HmEE6FTxueRCmgkbzFUun5bmls+txq88OU7+6dn0Iw7kd5lYfwjS/5tGwFXnHMBt0ROLnhuTokaPy8zc6BMtvdHZ2ysTEBLvlavhiPX66KPm5/AvLIMHCRutkDWCZ1RMCwRFnJSYEpFLjRpz91399XRbUS+mUhLiPZlmsmMjfBDBb82BPt+tsTVskqF8FBc41zOlqGqdrp7P9Kl6c4sSZX8+deTVcXcSrX11nHj1HPPx6bru2X9tYbpjzWpDPzmv7S5a9tA2UKS+VkAvD/68c/6zPLPvzT/+0RrCp+h//+Efh5KT6fc+uXb8uF/960VgoybV+XP1cEsR4Pp83wwZgVS3n02wBHxhxVmpCQCQcMeIsFi+vmzIWiZl/635+2Ng2EiiHwBdf9ElnV/dytxrEigoauLZVSsPdwjTOzlMqnYoXp7taOVqmnc72o7xSZTrjtDyEq98uz/Zr3krSaR646ncr047XdG5hZvmN5Igkvx2R473HBcMxMJEJe3ZijTQOcC/nqS+dBj/MeMfjNwML2oIrJg/wCDYBrNSAe17up9nftcCIs1Ldmsf7+swLbuLy5bKevmRyjAvVlkWKifxOAIvQdve8v7zxuQoDteyokFjtHOnsNOqHa/tRfrEwrVvTqGu3Qf0aV03ZWoad1/Zr2XA1rbpIp364mk/9GqfpNF5dO94uH/GaBq6WZ6dZzgtrGraDSiQkGotJ7ye9smnTJjO785133zGCghaf2r55WG4DY9GGh8+ZH2vsnXzz5s3aCmVu3xKAFezq1atmskgqdUmSyZSgRy0cLmwLlkyOC5YdQhw+mEhCcVaH24kvWqkJAT093eYfaG6aA0PrgJtFtBCB/qMh6e7pMT/0ahFSV4UBRAE+CNcwdTWtHadhKiY0re3afk2nddjnSKflueUpFYZytCxNV6wOO63mcQvTcmzX9tttVb+6djpthzNM6y6WR+ONC4GGpTcSCYlFI/Krnb9aXn4Du51gRjmP2glg1wFY0PCDzKO9COC+w5IGDeG3oy0sZ+++864RZ/fu5f3Gn+0hgYYS+Oqrk9LdfXDFhAAVAGrJgYBQvzNOz+E609hxdhlI50xb7BzhWo6msV3br3W4hTlFkKYp1W5NY7u2360+u63qV9fOq347TsNsd9m/NPYM58thY2NGLMOKNrYUHwr9Rbq7u2XD+g3y2uuvS8+hHrmauSpYaJtH9QSwd7LTGglrS7PHHVV/RcxZDoFoNGrEmfPel5O30WmCI86KTAh48uSJvLm9Q/bs3dtoliyfBHxHIJVOyok/npDEWKELz/7hL+ZXUaKCZ7V0drzmXS1stXit2+lqPhU96mq47Rbzl9tGTadtsMtzC1stHnm0TLvd6lfXlANBtiTO4Np+lHFuOC7/cfSoGYu29qWXZO/ed8yPDMZT8agPAVhTIpHT5s/D1cmr8vAh17ysD1n/lKLijJazBt2Twpco4tpHjH8+WDsIY29WO7ii9GqEGN+KBNA1pmICrluXmh2vIgGuplW30nR2Gc68dj0a5wyzw51tKFW25kMe279aHk3rdO1yNE7bo66Gq6vXUiwe6TSt09U86q6Ix/1El+cIBPeInOg7IWvXrjHjavGuw/3mAPf6fFOns9NG9IZCYdP1iS5Qsq0PWz+Uwm7NBt8FiLNiEwKwzg1mO01Plx6fgZWlh+JDDW4piycB7wmMj4+/YHlxWmOclhk9V4GhLsLVr66mtePsMAgLnDvDNL+6djzC9Fzj1dVwuJrODnOrb7V4tzxatgojZxnaHnW1PVqW03Xmx7mdp1R9rnm1KzQ5JqdOheTDw0fMOml43+3a9Qs5fdqfY2m8/wbUVuPT/FPJ5m7J8PB5I9QwecCPlpbarrI9c6vljN2aDbr/+KIUmxCQTqXNINrVqsZgULwcmz1DY7V2Mp4EKiWg4sHN1TAVIDh3WmvcwjS9ulqOM6/Gq6vp7DLd8jjDkN6ZV8uEa/s1nTNMw9V1xhcrB+k1j5vf2dZS5WhaLc+tDYhDOmdcqbwmbbqQD3t1bly/vmBJe/VVGRk5Kz88Ln9P4Uqfr3ZJj14YWM5wH2g9C8Zd12U1/Ci2gzPmLBJ1FVanIxEz5qzUowRBNjo6aqbalkrHOBJoNQLYIeA/Pj5qfujxA+60wKhIUNeOt/2ad7Uwt3KK5dW06tplO8OM+HBY0+z0tr+c+pC+nDyaRtujroY73VLxzrR6rnnU1XC4CNNzjVdXw42LMYXm/qKrMyFnolH54INDZlsojEnD7M7PPvtM7t2/12qPsO/a6zZJAKINS3O4xfnuAtigZQJqOaM4W0ZSXw/ARotMCOjt7ZX3urpKVogvFhR0nrM5S3JiZOsRwA4B7y3N1tQfercf9xU/9FY3pKbVvCqSbLdYXhVJ6trpbL9bfKkwxNnt0rTqurW1kvpKla112OVpejtIowJdAAAgAElEQVTM9mseuHbbNI3mV9cZjnMNs91ifp3daeKTCfnmT/9lllPB7E7M8sTWUBgGwskD9fs+X8lMmt8gTCCYmLgiGKv2ZPFR/SpgSQ0hoOJscZFLaTQEMMQZxJVblySmnR89eqxkvTBTY2AgDxIIGgF09x9bspzpj7/tql+Fg7oarl1pcDVOwzQNXNuPdJpWXWc8zlcrR8stJ69dj5arYepWUo7mUVfLVFfD4WqYfU0ar9eg55pWXQ23XduvbXYLs8vWeLc2mMkD3+L+jci7+w+Y7k6MS8On2HszaN8Dr64nlUwZpuCK3xT88X/qVeWsp2ICnBBQMbLKMhjLWZFuzV/+8tfy1VdfFS1wYX5OMBMnk8kUTcMIEmhlAqlLz7vGbGuL/qDDdYbjvNIwFRLF8jrr0/RwtS71a5ydR8OQVv3qan47zg6z/fb1an517fzlhNnl2v5i7bbrRnpnHj3XutVFuPrV1bRwbf8L8Us7DozhPicvSP/XA3Log9+ZZTgg0Pbu3SsnTp6Umze4Qn49vuezs3dlYnpCzsWHKX7rAbSBZajl7P79xQbWUl3RgRlz5jYhAIM2t23bWtIqpla32ZnZ6ggyFwn4nEAykRbs2ajWGv3xdgoIjVdX45HeGaZxcG1/sbI1jV2O+uHa8epXV8uEq347r4a5uXaeYvFaj7qrla3laDo91/zqOuOLtUXTqYt06ldXy7TjNAyu7df22Gk1DFY0lGmsacmknDx5cnnXAQg1TCbI57lWWqO+0tq7o26j6mG55RGAhRMf6AC/HYERZ25LaczMZGXz5i1mDy2/gWd7SMALAhhLER8eWmFZwQ+509ritLzouf6owy03TMu38zjz4txZtqaxXduv5TrzarjTRToIEbjFynHmwbndLrf4UuVpXrf6ipWteeBqPjusnDZoPtu1/VrGi2EJiQ5GpPdYr+zevdt0dWIfz8MffSSJZEp++onjpur5PTW9PLGYXPzrRcnlcq5DcepZH8sqTeC55ay0OMN9w3fSyyU3giPOXCYEYHkMzFTK5e6UvkOMJYGAEsCEAOytqcLA+ePsFAQarz/mTlfjbdf22+ltgaFpitXnjNe8Gg7XDlO/unY8wjSf068c7HbaeW2/5tWybNf2a1nOMG2bus54nLuF2W0s1QY7HcrRtNoejbfrsP2a/kLigiRTEOwJiQ/HzUbrb+3YYYTa5s2bzXZR8aG4pz9MAf06yrNnzyQ3k5MrE1dkcGnrIAi16b9NST7P7QW9vu/YFg3fg1Kia25+TrC2HSxsXt6jwIgzgHOaihEGU70fTZZeP4Ssrz0JYGeMzq5O8wIy3VkOy5AdBj9eVOrqj7vT1Xik1bhSYRqnadW18zvD3PLYYepXV/M7XcRrmKZVV8OdrsbbeZ1tdebReM2Lc/Wra4dpejtM0znLxrkzzM6vcZpfXQ23XdtvysBOA1Z3sfGnkkasRSLfLo9Lw3t065atZvcB53u2Pb9ZtV81lt3Abg74ncInyY3Xa4da5xIwNAqTBmDowT3ycoZzYMSZW7fmocMfy8YNG1xvFza6nZqaonBzpcPAoBCAOOvqft9YaPDDa1tO9Idaw8yPtSXeNNx2bT/y63mpvBqnaeHafi3HLczZxmrzupXtFqb1qVtNfXo9Tt7l1Kd5na5bXjvM9mvecsOQXu+RuiYsBfE9YiYQvN/TbTZah0jb9Ytd8qf+frl+/brgPcqjNgKw2mCNtLm5uRUFgS2F8Aoknp9AQC/kF+Tu7F1azqqhD8uY24SAbdu3m8UX3crElwFKGCZmHiQQVAL9R0PS1dP1gnVEf5D1xxiu7dd4tcKoq+FOV+PtMtSvcXYe26/pnGEa7uY6w1bL64zXc22buii3nLJXS6flO11n2Ti360Z6Zx49d+bV8HLz2Pnteu1y7DSmXbCiwUIKC1sqKX29fSsmEOzfv4+r5Tfo5QHu+I3Cmmk4KNQaBLqMYmEx6+8PeWrMCazlDANZ161fL93d77mix0KBePBn5zhL0xUQAwNB4OuvTxjLWXJszPzo29aUYn78WGuc/WNth2s8XHyQzhmm6bWMYvGazo4vFYY4LdPpOsvQdjnD9dyZ31k20mlap+vMa8fb/lLX4pZO22DH2X638laLd8tTKsytDQmMTUskZGgoJn84dkz27N5jFrWFNW3Pnj3yzcCA+bOLcVU8aifwj398L6PDo4JdbrRrDZMIeHhPQC1n9/Le7bARHHHmmBBw4+Z1M97s5Jdfut5JPOwY/MoXiSseBgaEALo1u7FDgDWgXkWF/YNu+0v9aJdKpz/oml9duz74tQzbjzB8NK26mtZ2bb/WsVoY4rVMdTXMzmv7yy27WDqtB66Wa4dpPqeraeFq+tXCVou3y1E/XM1n+xGm4U5X0yEcQu38xfPy1YmT0tn5nmzessW8c/91+5ty4osvTNtLDbQOyFes4ZfxcPGh6fZMpVKiswu9HPvU8AtsgQrmZuckHAlxQkCl9wrdmrCC2WZfiC/8o4uEIy8Up+m5ee0LaBgQMAIYV4m1rCAA7B9lPdcuNT1X1y1tqTgtR11Na7u2H+UjrYZpfZpfXTte02heuKXCNC9c2+/Mo3F2uIatltdug+axy4Ffr8X2a5idxy5Ly3CmQ3q3MLsct3g7TP1wNZ8dpnW/4DrWysNg9sJ6aSinsMsKuj03vvKKeffi/btj507T3oB9rZp2OfjNwnfa/q1rWmPaqOLczLzRGF6K4uBYzhw7BHz1pz+ZF8T4+KUXHiEMZD0Xj78QzgASCCIB/ON2WkBw7gxz/hgb64g1I1PTu6XDj7zGw7X9GmeH2X63+HqFaVtRn/rhav22v1iYhjtduzxtr7p2Wk1XKgz5VkvnbKtdnp3fLme1PCjDWU65YVo2hB2WJMBSHBiXdu58XPr6+qTLsqb9/I0OOXb8mJw7c84MsA7i96xZ1/Tw4aLpBTo/OmqEG7rguAF7fe/G3PysRGMxjjmrFCssYc6Nzw8fPmzE2e3c7ReKw48Vt2t6AQsDAkoA+/2Z9XxGEpLAD6gluNzERKkwzWv/oNv+UnltAbFaHrd6tGy7HBUIq4UVq0/rKVaOXaddBvx2HpxrfKk8bnHFytHy7LLh1zaXG+9Mr+dar12O3T47nR1utwfhms4up1B2QrBlVDQakQ8+OGSW5Vi/caNs2FjYfP0vf/mLmfHJrs/aXjwYmoP7cH74vBEQ6Po8Ezsj6fSEzM7O0spWG96m5Q6M5ezbyLcrHsLOzk7Z9uqrruuSwDRJs3DTnjlW7CEBdIFgL0Xdrgc/mvpjav+wIsyta8sOQ3pnnmJhxcrTuuHafrscO6+zPmce+9zZ1lLl2PU569BytGyNd5an6dTVdOpquJYD1/bb6dSvrjOvhtuu+t3K1DiUo351tWx1Ndx2bb9buzUecSXLWdouSsuIRMKyZ+/e5W5PM5lg716zjpSHX4vAVYV7gBUIcOD3LTGcMN1w8XgscNfaLhcUGHGGMWa24Nq9+5eyY8dOefCg9LYM7XKjeZ3tSQA7BLzXfXBZFOiPKlxYOvCjqRYP+N3inWF2Xtuv5ajrVp6m1zS2a/s1HdxS5Wg6t7wI07x2PMJwbodpOVqfM07LURfx6tfyNK9dll2O7de8zjA9t8ssFqbh6paTx26jWxu07Vqm09U6nOE4fyHMdHU6Zgmb+zkmI8Mj8skf/mBmfOpEgo6ODun99FOzGvvMzEx7fmGrvOqJzITZDsrOjh4lWM6cB7o9Ecc16pxk/HUeGHFmTwiASNuxY4ccOHBghWDzF3q2hgQaT+CLL/qku6vbCAm1cKhr/1CrHz++bvH6Q27Hl5vOzqt+rc/parztaj3qOvPgvJwwu8xieZBG0znrs+Pg13i4Wr+G6bnt2v5S6ex6SqXT8rS9Tlfj1XXG2+daj7qax+kiXsPs/AjTcNu1/ZreWHGtyQRnY2elt/eYbHz11WWLGiYV9Pb2cg21Cl4R5Y4zgyEDv5e4lxTBFQD2OGkgxBk2d7bF2aP7D82G5//58X96jJPVkYC/CExk0vLll1+asT/4oXRaN/QH0w5HmKslZGmtNM2jrp1X61gt7P9v73tAo7zSvUspIkUuspRiF9u7bpESipRQpGSLLO1+K8VPgkgJJZTcYvvV7YYiJZSwBAklW6y3uf2CDBJkCINEGb2JmmbnC4MMIUgo2RKtWTdIKCJSpARRUW/dIuX5+J3Jb3zm5LyTyf/JO8/A8Dzn+XfO+3sn7/vk/NX6UBwtA6/tNe+//KN0vhzluWR+G1AXry+qXu0zly3rpw8p5ZpqPmSn9ax3qWW8ZsSdT2y2l7Tgm5k5mH5o0P0+sZjgPw9/IY2NDVL7Sq2sf/ppl6z94Y9/kKPd3TI6OraiE7Ir6y956Vrz/fdTMpYdk950PklDsoY52NgJ3z6Vg0AskrP81hipQi8Zxtxx4Hn/qVNFSGMDv5GRnK1kKULFCnFHIJM97xYE8KU96yWpXrZ8AdPWp4UXqxrWg4wxQWlTSkYbTTWv2xFqg47t61mOikdf6MmD0p7+pJSTalvKQKN4xgH169M+vp3WaZ52vmw+sdkWxtC+jE8bvxzygQxfHYd29KeOcm2vZehZw8rP3uPHpb29Xfbs3SPP/uoZeeqpJ+RXv3pGcCrB5x2fu2E8jJKU22MU579znHQz320esJAACRnmqmUyg/KPy/+YBRGw1dOFZhmYYNkQiE1yhi5a/ojwY8NEU7/LFrst9ycf2y0bqhbYEKggBHLo8Zk54JovXL4oSSn3KfWgmvftOBymh71KyXx/lllHKA51sNWxKQ9RLYviWTdpKLaW+XZRcbUcPvTTlDxsWQd56kA1r+OC98uIQ3sdU9tRT0o7Uso11Txi0ZbU17NMPSnloFEyZzOzrxp4/H6xh5q/mABTV77o7Jr1rK+gP78VaQruBxcELFWF6PQA7nYG9VIhOr84sUnO9LDm+VzWdYlrKJC4YYkxTpe3w0U0MsbHGQHs6ffV/+0qvKz1i1H3VmgeNij7MspJ+bL37SjXlPEoQ5k8KGMwNinlmmqeMSAjT6rtNF9u7Cg7xgf140b50M73pVxTzdMeMr8+2rFOn9IHch0nZEdZuXasW1PNM95cslB9+joL/MweaoMDZ6U/fUra2g66I6M2bXpG1q1f5/4ZxxFSRxIJtz3H9PR0nP+sZ10bhoSvXLkyS74YwYMHDySdPu2OjsrPUTslY2Njbpd8doQsJr75lkYgFsnZvXuPiuacYQwdK3/0Z/LipDt+wU4F0KgYH3cEcHxT/d6GWT1neHnii5cfX5DkdZk9G6TQkSdlHE3JMybKlPl8qD7K6KPrjZKxPfQF1Tz1oIyhZdqW+pAMOupBGUPL4Ec5qa9HuVwZ4/n2SxGbMVGHvl7GJqUdqObpE5L5MaN8Ycd6SLWMvOsBzmUkk823AbZfHvrSLf7SJxNs3Voj7ze3VM1+lnivPZp+tOSPMwxrIjZWgyaTJySR6HLvWpwOYZ/lRSAWydmtW7eKNqHF6QBvvfVWAblHv/zLZf996b6CzBhDoBoQ+KL1kLw9j7M19QsWvR54KZYjgw17SXwf6qgH1XxIvxwyv11oQ0jGukkX0taQD+KF6tMy+mkZ2wEZ9aS0Y1lTzTNGubKots4Vh+0hLbe+kJ1ug693uqH88VHY6BZJ25m+Pvn4k4/dnLStv90q6zdscD1qdXV1bu4a5lVh6M82vV34kw9bc4xcuCATkxNFQbAtB+a8GbZFsCyqEIvkDGPj+oQAnA6AZdj83Lh+XRLJpOuSpcyoIVANCLiDzxsbg6s1/RceX6ikvh7lcmVRMUJyLSMP6tdHXVQbqA8lEFE+fgJQyg461jGXnY47Hx/ELSe2bzeXz3K0ATF1veT9ulimPey0jPcrJKOOsUkp92khdmZA0qle6TrylbzzbqPbWunpDfnVn7/evFkaGt6Wrs5O+Xb8kpurvNaH6dD+1UyMrkxecT1qyWSPO0pqeDhXOJ3AFmws7E0Tm+RMnxCA1TyHOjsLiGBCI8bMb1ybKsiMMQSqAYHO5oTs3VsvGW9BAF5qeBlyCIlln8KmlJ3/QmU5FIcy2viUek01X6qt2o5xfRnlpL4e5XJk9PcpfX05y9T7lNdF6utZpp6UclLKQ/VRR1tNNU9fUM3ThjKWNdU87UJxaAcd2+XztKGeZVI/PuxCOi3DdBcMdW6vq3MrP7FoDF/sr4Z91sbGx9bsIwHXv9QLAuYLBoY/sSUH2oL3bSLR7ejkVP7kgvnGq3b7WCRn/j5n6NJO9aQK9/bW7VuuG/Zf/7KlAAVQjKkKBDq7OmRvwztFPWd8sbEXAlTzeKGxTFvQkEzbQk97zWuZttcxQ7Eho1zH0zLGK0fGduh6tQyxWNbxNM/6aKt1mqeeFDpfzzLrJKVcU837bdBlbad5HZs8KezAa3u2m5Q61sWypprXselDqu0oAy3VhpAPZdqXMk3BZ9xvOn8wOxYV9PT0SGtrq9TX73bzkzEEin3Vnt/0vOtVwz/3o2Nj7oSZtdDzMzDQLxMTxUONq/WAe/jontz98a5bmIF7OjFRvFABvXz8rlYb10K9sUjO8vucPT5bc+OGDTKQya4F/K2NhsCyIsBhTazm4gvT742AnF++6EA1T9+QDDrGJIUdeVLfl3JSX49yKZnfZrbRlzOG1lPGukkhJ6/tNa99yZNqO8YhpY1PtQ91voxyn9KOcpQpA2XdpLTzKfSUaX/KSP04ug7aaKp52IZi+7JQHX4clmlLCjl46v3YLFPvaC4jqe5u2de0T35X+zvXm8ZeNS4s6O8v3jNzWf9oFxAcE/QxQrRWPuhZ4zYd892fba1c42LbGZvkjHPOpian3ETQsbFvFouN+RsCax6B0dER+aqzSwawFUGJ3hHd04AXFsrlyopedDMLCFxvhVpMwFhsA8uaaj7UBr5YQ3Z+G2jD+nw945MyNin9SX07yHVs345l2tHfp9qOuigZ26brpSzKhzFJQ3bQ6ZiwCdn5MtatfTUfFSdUH2Wa6vo0D5tyY9OWlG3242WwuGBwQAZO9bstl9raW2XPnt2CURj8s//UuvWyecuL0ri3QY4cOSK5bE5wRuVqzvPSDyckOku9lYaOv9Q85qSdTJ90w57Y4iplpxTMgjgWyRkON+9N5g8+7x845bqnr9n8slk32wTViUA2O3vIKvRy44vLp7ClzH+pMQ70Wqd5/WJErwZ9KCfVPro+8roOLaO/T3U8zdMuJINuvrFD8fzYOmY5Om3P+D4tFUdfRyk76Hw9y2gDeVK2i2VNNR+y0/GoJ9W+vE5fRltSX4/yXLKyfDOPf+9I2NLptCSOJuTjj5qlvr5eXti82fWuYRj0pZdell31O92B7ZjTFjpofCWeOkjOKmVYs9zrxQkF2P4DSS7my53P5uT777+f5Y4969b6go1ZF1WGIBbJGYY1E5mEu4EYxsF+N9M385sQTk1O2HlsZfwQzCS+CGQGcoVhHv3SxotKDwfxxUXq21KuKXnGIfV9UfZl9CXVeh2HPKm2oy+o5v36Qj4hGWKwHh2PMlL4kg/Z6diwY1nzWsZ6QzIdn3a+jH6aar6UvW+nbUvpeP36mjQfFYcxoWcMykhDvrQlpa1PqWcMX88y7UC1jDxp5kR/fp/A3Ex7ZyjObt62rbZoGBTDoTjFAMN2mBy/Uvtq4lpXe0HAcjxBMeTJvdWw1xpO/bl/8/ZyVFVxMWOTnKHn7P7/3JWWfa3u0PMHD352yRq6TrHM1z6GQDUikM1k5fPPO4rO1sRLx+9lmKvHgT58YWkKX74IQRlL876MZe0bJdOxdTu0veZpo2Wap55xtU7ztAOlLSnswPv2Wk9/befzfmzEY2yt8+uhHeuYS087HZNtKdfXt+O1lorD+rSv5tmucmSsp5TPYuoL+TpZNr/XH9rorhlTBPoHZHBoUPpOn5ZUb1IOHz4szc375a3f75CNGze6hA1bd2CBwe/f+IO0HTwofX19y7a9BHqWfnkQvwVv2D8Np5wAd2zTgaS352SPnPtbZtZea3F7vscmOcNNww8UZ61t2fK8u0/4ryWZTBV60eJ28+x6DIG5ECicEOAlGO4l48nYk6B1mufLKyTzfWnrU/pqOX21DHa01ZRy+lDn+6Lsy2hL6uvL8WH92pdt0TLYUQ5KHesm1XJfRh0p9Zrq2KzP16NMGWNpqvlSdtCxDvqEZNSBar5UbNrBJsqOclL6+JR6v63aTvO0B6UPqbbTvPPB9jQz538WfHMjrpctkewU9KxhgQHmrHGBAShk0GEo0j//ea6/52rW4/0OvEayObep/GhudNah93jnx2UINDbJGcb779yZdt3Mda+/7n7D6FZG0rYWlkJX8x+dXfvyIcDVmm4X9ZkeM7xk2FOBl4rm+QIKybQf9aCap79PaeNeaqp+yEMy1qX98MJEmTJNNc9r0jK/PYxPWk4bdDzNM4YvY8xy2xMVh3F1PNoyNsrUU0c/TTVfrh3jwlfz9A/JqFtIfSHf+cbRbZqvr7aP4kNthMzJM4OODgyedQnYyZMn5fPDHdLU1OR60XC0ILbuwJmgOBu09pVaaWxqlK++/ErGvhkr7LQ/n/cWEpJ7Dx4s34OkwiLjen18MHcNeUA6fdKdoY0eN0x5CtlW2OUEmxOL5AwLAtBDhvFp/GeCPwLcuGSyW4ayQ8ELN6EhUA0IYO7lyd5eN6zJFxbpXC+ekB1ePpSDMgb5chMoxqE/qOYLL7rB/IsOOtar+blkoXogC9UXJWMMTdkGUMajnjK2jdj4+ig7yjXVPOvTMvC6Hup0G+hXjow2jAMaxfO6SKPsGJM0yo7t9OPBDz7anzx1jElfHSvkS3tSHY++lGl/1qfr0TLnO5Okwe9xfCRw/e6oKRzS3t7aJu/te69w5BR72La8sEX++Ic/uqTt845DbmuoUosN1uKCgKV+/uKdf+PaDTeNCR0zOLS9u/uoS9jWYh4Qi+Qsv89Z0o1B48d94MABmbo2JZ2dCZkct92Jl/qPwOKtLQQw7wwvDg7V8GWjZf5LBmVfpv3A6zJi+/asj5R67UcZKW21jY6t5fQB1by20b5+7JBPSIZ49CWFHXnW5/tSD0qd5rWMdVDGmJrqeJRTBj/ypDoW7UGpLyWjr6ZRvB9H20FHPev19SjPJdN6HYc8qbbTdbMNpL4dy9TTF1THJg9Kn1IyxqOtpo7PzZxdi8PccxmXSOAUg9rttbLpueeKhkPxbttWWyttLW2SyeWHRO/fv+8eRmjD1IS96/wn883pacHw5+RYMTYY/sSJEFhEUalDobFJztCdOZjJuh8zuofHx8bdkOYPN3/w75eVDYGqQiB7Plt4kfA/eFK8PEI8ZJRrSl6/ZCjji0iXyZP6NpBrGXnSkB9lmmoebWMZcTSv2+3XATvaktLGp9CHZKyb/pqSpx/KlPmUNqDUlZLBRuvZDspYph1jktKOlHbEC2Xa+ryOTXtfVq5vlJ2WR7WRdfpU+1JXjoy2pOX4wAZftNG3n0vm6sE8Nvx+MwOSOt4jia6EtB9sk33735ddb+2SX2/a5N5xTz75lNuVoKamxp1y0NDQIJ91tLv91ypl77VKf8ieO3fO5QjIHXpPnnT3bGRkxI3AVULbY5Gc8fgmbGaH/y5SqaQDGP+JxGVyYCX8WKwNaw8B/A10tHW4B4/+bx8vArwstEzzWh+ygwxf2NHWp6XiaVvYMRZ5Ut+OZepJKfepr+e1+PWxDKp5xPNjaj14v465fKAP+TCuXx/L9AH1ZSyTMpZPqQdlPMqiroUxtB15TTXv+/g61k3q61kO6X3ZXO2Gnu0hZXxSyhmblHpS2pFqOWWg8KeONEpGe+0PH+eHnrXMzL3C38nMNh6tbW1u8Ru28sD8NQ6HkmI7D/TAoU6cHIDeIfvMRgBTodCzBowxPx1f3IdK+MQiOcOwZiqdko6Oz9yP9HwuVwnYWhsMgVVHAAsCcLZmqRMC+N8+Xgb6v33NU1euzL1YInoPGIuULyXEJk+q64OMZepJKdcxfJ71kWq9lpEn1bEpA2XdpLRj2afU63q1jLFDMr8+2rAOljXVvO+vy9qu3Hjap1S7y7XT7UEb6BdqT0i2FG0IxUU7QvL51sfr43WBan5WvMxsPf6GB7FBLo5i68dK0QG3PUfqeFI6v+iST//S6uaoYeuOX89slPvUunVutei/b85v6YGFB591dDi/y5cuuxMO1uqE+aV8uGK+GnDASNv0D9OC80H1B/cn3ZeW3PlhGR0bWZG9U2OTnPUn++WDDz9wyVmpiZMacOMNgbgj0NXR5Q5yHpw5vsl/SeDFw5eE5qNeHvTXlP6aah62jMc6ovS0JV0qu3Lj6OtiW30Z20YKO/Kki6nP99Xt0Loonm0A9X21D+0o8+2jfOnH6yZlHNCQjH7ajjLWrSntGAuUMlDN+3F8nR/D12t/X6fr1Tzt/Nj6GmhPW59qX+0HO99Wy/jPlvMZHHRz1U4eP+kSNxzsji90x451y6H2DjnQ8ok0Nja6hQc41QAbtaOXDaccYPXo6zt2uMTuQEuLHDmScAsQLl0en7UiMu7Py6jru379ulycmBAMeyJJW4ktUGKTnOGEgIb6BveDQ0+afQwBQ0Dc5OGGxkb3sgy9CPRQC3jYkOqXhfalvpSMvrDhFzL6Uk+qY2l7zZfjG1UH69FU87p+1kPq22lbX+f7wLaUTF8f4zImfVlmHNr5vlqufciT+nEo9ynsQrJQPbSjjnVQrqnmaQ9KH1LKaB9qj/aHHW19ypikvl77Iibj+naUaxstoz3rIaXcp77vgvQzQ3L96VN5DGc2zXWxOSTqsMn/fWNOG4ZH06leaWhski01NbLxuedk/fon3PuTQ6Mueduwwe3L9sWhDsldvOiSEhsiXZk3SyySM26lUVf3mmzdWiPfX/te7t6+tTIIWi2GQAUjwGFN7HPmvwj0f8isjOUAACAASURBVOaaxwtC/5fu6xBnLpnW4wXFeGwDyuRJtQ/bAEpe10sfUu1brp32YR1R7WI9pNo3JNN6HZu8pvQHpd9cMu0PH/qB0teXsUw9qfbRMtYBme/Lsqaa13HIk9IuquzLYU8f0JCebY2yow+ptgv5UgZaykfrYYe45cSmra4n5Mu6SWFDnhSyVG9KsJ8a47k2ZPJ/xxgGxXAo24qTDXDA++DQgGSGBt0QaV/6tCSPHZNDhw5J66etsr+5Wfbs3SO1tTXulAMmbDj1AIfB126vcwsRmvbtk7b2djl58rSMjo7I9K38sYkV/EhcM02LRXKGnjK8ANA9ixMCcML9xOTEmrkJ1lBDYLkQcJvQ7q13E175MCflw5pln1LvU/yt+TL6luop0D6apy9lKJcbB7b80ke3jzLEJs/6dD2UsQ0+pS+p1odkWr/Q2Lp9jBeSQUc9aKg9fhui4kTZMT5ja3/6aBntdHu0jD4hGXWsk+UQpT8pfXxKPamv17HBh+xK+Wid5hk3SsZ6aKfr1jztouKcSJ6Q3t5ThcQtyg4x9dfZneh3w6GYFI9zRF3PGobqM+p3lRkQPEv2Ne1zG71vee452bBx9kIEJHHohcOChC8Pfel66LAgAcOA1uM2v6d8bJIzrLLAmWZ79+6VY91JuXb92vyQMGtDIIYIdLZ1CoY13X/SJSb8z6XHQ5w2eLiTB9U8dNpW66J42ms9ZaCM6VPa01brqaMMZfK0p42m2g721NGXlHJtr2Wa1/XRn1T7axl9QjLqdB2a1z7kSX07lLUsFDskW4hPKE6oXSG7paovFBsyyknRrhA2bC/pfNpFH5/6MaiHnDxoqD1ONjToVhmmZ7aDYDzti+tCGUke9Y6quaiujN42b/Nc1u18h/B7GZD+dL/0pI5Jd6JbPv/8c/nzx81uztrunfVSW7fNnW/9uLft31zvG7b9wNw2bPuB+eGHDh92c+VwKgL2JbVPMQKxSc462tvdkmJMekwlU24VSvGlWskQqD4E0Kt8ui9d1LPChzYexprni4m06CFeYqgzZMeXASltQvWFZEvRBtYJqnnG9tsWZad90dZy7BibdC4fjYGuj20NyXRsn4+qj3ag+Pp2uh3Uk/ptoG2UnvbEbL52sGcdjAVKGanWaR+tJ0/KOFG+obbSR9eh/XVs+pNqu/nIGJM0Kg5OyOk//d+ut4s29CGlXFPN6+sCz3b6VCdv1LlpE26uW/7IKpT7zvS5U3qO/NeX0t7eJs0ffyzvNDa50S1MQXqpZqtbmIAVpUjkQLGPG4ZMcToCkrgPm5vls8863H5vp/vOuH3c/vHPf6zIasnVflvEJjnDrsm4wdjbJdWbXG1crX5DoGIQyGVz7oXGhzQpHqzgWfYp9T7lEAsp9ORJo+LqOsjTx68H5XJliMU4jAtKnnG0HWWaap6+Og7r8O1CtloGe99nsTLER3sYl20jpZzUbw/L1PuUelDN0471kFKuqeYZw5dRHqKh2CGZ9qWeFDrypGgDeVK/XSj7MtqSan1IxnZpu1Iy6KL0lGtKewxHumFJ5a/tWH9IxnZDR56UfpqSZ90oU+bozKkHaA/i8JsfLs3v1UZfLEzAnDiMfB040Crb6+rcsOhTT+UXJ5CyF86nb+54073zsZEs9izD0Cm/a32P09gkZ3/+8M+y/ul10rJ/n3z9t8rYRK5i3s7WkKpGAOfK8eGp/1OO4mELndZTxjiawk4/9Onn+1AOqnn6QkYelDaa9339Ovx2Uc9Ymmq+XDu2D77kSf14lINC5+t9Ge0hp0+pdvFaGZf+pJRrqvlyYrMO2s43Nv11veR1LMpIqSOlHDQkY/t8O5bpQ6rjaBnjkNKfFLbkQTUf5bMYO7aNFLHIk6JeJDiOlphWoPXw9dulr4WxtWxB1xe1KGEGO+zXxl63wcxZyZzNryQ9c7rPbSZ/pCshHR3t0traIh/9qVkaG/9Ddu/ZJa+/9rps27bN7eemN+EFjz3eMP/8tddel507d870wO2XtrY2+aKzU44lk26fNyxgwFw4JHWV+IlFcobjKjDXbN36pwXDm5f/cbkSsbY2GQIrjgCOf/nww/0lXyJ86PKBzAc3H+b6hbCYhzXjsT5S1ruY2OX4sp7Q9bEtuo2+ndaF6qOeOr8+yjXVPNswl4xxtZ3mS8VhG0npx5iklGuqefpr6utRDsm0j66PPCj9KEOZPPW08am2Q12+HmVfpn20LopnXK1njCgZ9aC00TxklJNqH9bpU2ebHpD+s/leVD8OYzAmaSgObX1KHz+2juF8ZuawaTvG0rICP5O8MQ6HTN0+brx3gwP54dqZo63ym/HmE9IMfhfouRsckJ6epHR2dUl720Fpbjkg+957X/bs3Sv1bzbI71/fIa+8us3NfcOh8tjnTSd1Tz75hJNhJSrmxdXX17sD6ffv3y84jaHryy7Xu4ceOpxV/OjRT8v+LI9FcoZ5NVilCbAnL07akU3L/rOxCtYKAlhhVb+3wb3YMLyAhyAflqD+8IWWad63YxwdS9tT79NQnJDMj6vjkIcN7bQsKh7lvg99QcnDRtuTJ6WdpprX/vCBjnqto0xTzZdqa6k40PHrx2NMX48yr8/nGYN6lrUdZZpq3q9P6zQPO5R9GesmnrpuP7bW+XFCsWmjY7MdpLTxqW4XbUNU2zGGXx/8aEcbTTUPW9aDYcF0Oh30ZTwdm36Mx7K2hY56Tcn78Ur5Qkc/2rGsKXk/tt8+2oHqeI7HUGlh1Sn2dsNq1Jlk7sTjYdZTvafkRO8JtxckRt4wXx0Hzm8MHIflD6c+fPRo2V8BsUnOarbVyG9/+5tlB8wqMATWEgKYf/mn5ma3wgoPMvzHygcdeMo0r/XkSbVdyJcyUPqQal/Naz15UNpoHjLKNdU82wAZ40XpaUsaspvrWqj3fVk3qdaHZLoN1IPST/MhGfX0ZbtItQ9lrNOntPUpY2s5ZaRaB55yUq1nvXPJ5tIjDmP5NMqX7QGljeYh03LEjfLxdeW2QdtpXtfNNpDOamMGqzVTku5NF9qnbRmXMk2j+JAPr137aBl5Um0XijeXnj6gjEkKX8d7q02pd744Agt7umFLEPS+IQ6GfwfPzhwuj1MUZhYwcB+4oYzzQZzjx1NuaLWzs0vaPzsora2t8tHHzdLU+B8r8gqITXKGvVWwysM+hoAhUIxAFsMB6j9y/Z+mfpiR13rypKEHpY7NGLTTOspIaUtKuaaaj7Kj3Kf09eUsU6+p5mkHGsVre/LatpQsSke5T3kPSLVe8yE926Tt/OvSOs3TF5SxyWs7zdOHMtpTDlquTMcgD6p5xvNlIbuFyhib7WaZmJBS7lP4aRl5xvP1Wl4qNuJA72zQa+TVwzLr01TzsKNtqfpgA7321Txj6HiU+XaUk1Lv+1KvKdtICh15tk/HI+9T32dW3TjLFNiwNy63MnPaY5Gc3Zq+5YY09+zeXfxWspIhYAhINnu+6EHKB5z+z1XzWk8eFDbaDg+5hcqWKk6pNuiHMOrzr4V63RbNl4o9l91c+oXE1u2nP+li6kOMUrF1HfwdRPnoOGzTXDLG13a+jLE0pb2WaZ4xtAw+KGtZyC4km8sn1J6QLBRby7QPedKoNrhTACJ6wnVs8oxH6mMCOeuiDakv98u+HfWgUTzbBUp/yuDDBIoy2ul4lGkKPeP5tpjf5stg68uwr5uL6Xrd8vxKvFZikZzhJHmMCWPynn0MAUPgMQLTN6flZPq/ix44+mEV4vUDSvN8aM1H5j8oUUYcxvIp26Pr0PxCfFmnT/26GTvUhpBvyI4yxCJPGiWbK7avR5kxSecTOyoeYlCneV/Gsk9L+Wid5hkjJIPOvz7fjnpS6MmTliNjXPiQB/V5xiSlXpcp8yltSKEnD0r7UpjQxqfwOXs2f9g5dL6eZV1PyI51g+LL9tE/5EMdbUkpJ6WclHJNNa/bQh+fanvN09eXwb8cGf1JfZ/HT9jl42KRnGF3YSRnjU2Ny4eURTYE1iACWBDQNHPwOf/7JMWDRz/sKCf19SxDT540Sob4fjxdJ/1JaavjaZ52fgzKfcp4vpxl6kkhJ09KW59SD0odZToO20obn9Inyo5ynzKOL9dlxialj6aa176ap40fBza+jLagmme8kEzHYTzI6EO970tbUujJk/o+KC9EthAf3f5SfFRbKY/yZZuSyROFBQGU0ZeUclAt07yuB3bah7qQDDrGIQ3Z+TLaRsWmHFTXgTjwZTzqtT101JP6PpRrqnkdj20FXYlPLJKzkeFhl5y1fPrpSmBmdRgCawYBJGd7G95x/y3qBw0eQPq/Qc1TF5LxweXrEDskoz1jkvq2LPtxKNdU86XiaTvN0wdUYwKbcu1CvpRFxQnFXkqZjx3bo+lc9REP2JEn1b6aD+lRJ2y0XUimfcmTal/Nl4qzEN9QvJBsrjaEfBYjC9WHeLxGUNhgeA6n4vT2nnQ6J1O9oGyD76vLrIsx6UM5KHVaRjsdi+2jnS5TBqp5xoGM9qTaDrKQL/19qn01T7uFylbiBRCL5Ax7j6DnrCuRWAnMrA5DYM0g0NmckL2Ne93qJP7nx4ceKHk8rMhrGvKhjFTH8Xk/Lnwoi/KnXreDMlDNl6rPt2N9pNQjhm6XXy/tfMo4pFqvecbzZWw79aE41IFST6rjaZ5xKdO+WsbYlGmqeT8edL6eZcb0fVAOtZv29NdU89p/Pj6MwbpJKfcp9aE6fFuW6UNKuaaaD8UOyXwf2vgUdthKoz99askwDl1LSIa26PaAj7JDO3lN2gcy7UOelDHpq+OEZLDnl3q/Ppap11TzjEMKHdq1Ep+KTs6+Gf1GMrn8SwPgDGUzMpQZmiVLHEnIH3fukmPdRyWXywl2RM8MZSTbl5VMdtD5QP515py7adls1v23ARn+60DspZQhFmIiNutYThliY7mwrmM5ZRoz1rucMo3jUt+rUDyN40rcv1AdC7l/6b60O3sOv/3+TL/7O2ja96E0Nr7rfoeoZym+I7mRBceh73BuODJGSBeSha6FdqSwieK1P9ulZT6v40CnfXxdlK/20TbaX/Paxvil+f3GDcfh8zl3gDgSh7hdW6Vez/T09LLnZxWdnJV79diEFr1na/0srXKv1+wMgXIRwLDmwbaD5ZqbnSFgCKxBBPBP8sTExBpsuTU5CoHYJGfo1rXkLOo2m7xaEUByhuNH7GMIGALxRQAjABctOYvVDY5Fcnb37m3pTVrPWax+mXYxS4JAV0eX29l6SYJZEEPAEKhIBJCcWc9ZRd6aBTcqFskZhjVP9J+wnrMF/wzMMa4IoOesvaMjrpdn12UIGAIibo7z5OSkYREjBGKTnOFsMRvWjNEv0y5lSRD44ot2+UvrX5YklgUxBAyBykTAes4q874splWxSM7u3bvnlhJbcraYn4L5xhGBzrZOaWtvj+Ol2TUZAobADAKWnMXvpxCL5AzDmrYgIH4/TruixSOQSHbKgZaWxQeyCIaAIVCxCLgFARcvVmz7rGHzRyA2yZltpTH/m28e8Uego71d2my1ZvxvtF1hVSNgPWfxu/2xSc6s5yx+P067osUjYAsCFo+hRTAEKh0BJGe2IKDS79L82heL5Oyn2w+kO91tCwLmd+/NugoQsAUBVXCT7RKrHgHrOYvfTyAWydmjR49kcnxSQO1jCBgCjxEYHR+Xb0ZHHwuMMwQMgdghcOPaDflxBY4Uih1wFXxBsUjOKhhfa5ohYAgYAoaAIWAIGALzQsCSs3nBZcaGgCFgCBgChoAhYAgsLwKWnC0vvhbdEDAEDAFDwBAwBAyBeSFgydm84DJjQ8AQMAQMAUPAEDAElhcBS86WF1+LbggYAoaAIWAIGAKGwLwQsORsXnCZsSFgCBgChoAhYAgYAsuLgCVny4uvRTcEDAFDwBAwBAwBQ2BeCFhyNi+4zNgQMAQMAUPAEDAEDIHlRcCSs+XF16IbAoaAIWAIGAKGgCEwLwQsOZsXXGZsCBgChoAhYAgYAobA8iJgydny4mvRDQFDwBAwBAwBQ8AQmBcClpzNCy4zNgQMAUPAEDAEDAFDYHkRsORsefG16GsMgZs3bwq+Dx8+XGMtt+YaAoaAIWAIxAUBS87iciftOhaEAJKwqatT0rTvXdm6das88+wzsvGZZ2TLluel4e0GGR8fl0ePHi0oNp3gP3VtSv75z39SNG/67bffyiu1r0qiKzFv39VwGDhzVmq318lnn31WdvW5bE5q67a56yzQ116Vbdu2Sa2iwKG1rU1+/vnnsmOboSEQBwRGR7+Rc31pSc98+2aoL+vr65M796fjcMlVew2WnFXtrbcLv3X7ljQ2Ncq/bfg3+e2LW6W1tVWOJBLy1Vdd0rS/UZ599ll54oknpPGdxkWB1fGfn8v6DRsk2Z1ccJzR3KhryxdftC84xko6pnpSrr379+8vu9q2gwedz6uvvioHDhwo+c0MZMqOa4aGQFwQSJ9OSyLRLblcTkZGRgXJWv6b5yG7cGFU8M/cYv+pjAtma/U6LDlbq3fO2r1oBNo7Olwy8Pym591Qph8QPTlIzvAdHR3x1WWXm/c3uxjd3Qvv9RobzydnbS1tZde7moa9vb3umueTnDU0NDifrs7O1Wy61W0IVCwCyWRS8L19+7ZroyVgFXurFt0wS84WDaEFWIsITE/fl5oXX3DJwFAm3AuDB18y1e1smt7bF3mZ129cd8OW6IkLfZCgIMEr1XP24N4DFwPz3UIP3JHhYRejo33les7u3btX8rr8awUOaD8+C+k5e3bTJneNI6OjfmgrGwJVjwASsu7uY4J/fH755ZeqxyPuAFhyFvc7bNcXRKClpSWfdDU2yqM5HnR/+/pvcu3ataI4ZzGn6pVXXAz2roG++mqtJBKJQoK1708fyPp165zd+qefdvPZeo/3uliYh/bxnz8W9NzpGBhm/ejD/UWLEi5cKE7Obty4Jv/+mxelre0vRe1CYeTCqKvnjT+84drx6aefuvLGDRvy9JlnZOPGjQVZTc3Lhf/E//Wvn+RU/4DU1dUVtQnz8Vo/bZWffvqpqL4fp3+U/717V7HtS1tl3wf7nKzcnjPgCwww/Is22McQMASKEbh8+bJ0dx+Vy+OXixVWiiUClpzF8rbaRc2FAJOhTC7cazaXP5IILBzo7+8vJFEtB/IJH2JPjk+6EAP9/W5iPGT1e+uls/OvbpEBFiL8rvZ3LiHZUlMjf7/4d2ePeEzW9BAmh1jhz8+Ouh2yc/uuQv2UdxzKD9fua87P98pmB6SzrVP++tc2V39nc0K6ur50E+3Rrjff3EFXSafThSTpXF+fk4+OjsrG555zcgyp8INrwJw9xNi1a5frNUOShQn8kOFbbnLG62tsXNz8PrbNqCEQNwTwd4j5ZvapDgQsOauO+2xXqRDA8ACTB87dUOqSLIYc6+v3Ov9s9nyRLXp8tr+63ekOHT5c0IWGNQczGWf36vbthV4rOoyMjDgdEqKfH+V7kfyeM9ii9w+9bDenb9DVUSRKuL50b7pIrgu96ZPOBonU5NUpp3r48La8vO0V13s1NFSctE7fnJb6PXvk5W3bCsngxYsXXf2ftHyiQ8uPN390Cyzmk5wljyVde9BD927ju9L0/vuCRO3dpnelsbHB8ZA1vfeeYLjVPoZAtSHwdeacG9bEYoBS30vfXKo2aGJ5vZacxfK22kWVQgDzopiclbKL0qHHCA/H0IeJWLuaG0aZP+cMyQ226gh90D4kZ0wesSABMt2bRtn7zS2FEGgbr42+BeUMc+fOHdfrhx46PVybmUkYo3qv2Lt1InnCRUIvHuoKLZb4c3N+nl25PWfYGoPtLkWRvOEa7WMIVBsC6NXmggBN0Zumy+hhs8/aR8CSs7V/D+0K5okAel6YAHAC+zxDOHPEGR+fkMHTJ6UrkZA/H2iWTb/e7GKXk5yxTiRRoxdG5Vh3t9u/a+/b+Z65DRufKSRnFy5ccHH1ggDM//rVr37lerqmp3904TKZQWfX2vI4YWM9oBNXJt1+bk+tWydn+/u1ytUNXJoa3xesmPyyq6uI/uVgPoHa15RfHLHjjTfkySeflB9uzt5PCVuSIFZzc3NRHVGFtxvell9v3izZTFaG0TOQzQkWQeCL5I+yb78diwphckMgtgjgH6pUKiVD2SG5ce2Gm0JAimcYvj/c+MHR23fDC5NiC05ML8ySs5jeWLus0gjUvbnTJQ9fdHaVNhSR4eFhGR65UOixQc/N/g8+ECQ4SECefXaTm2e1Z89ueaW21slCydnRo4/ni2B4FFtrvFTzkrNHrK2/3ermkH20//84GXrO7t7NL5kPDWui4c0ffeRsGRvDfi9s3ixYjep/Jicn5cUXtzj7z9qLN4dFe5r2feh06J16rW67vPba626+3O+3v+ooynWv1rrhVMSu2VYj69Y/LbdvzX4ZzHe15gu/+Y28+cZOv8lWNgQMARHB3y56x658N2F4VAkClpxVyY22yyxGIHOi3yUitbU1haSr2OJxaVf9TjdJ/86d/IpNTuTfu7e+aFgQHuhVQsIWSs70sCZ28IYdvhgeRMKHBIlDdpAjObt3L5+cjYzk91zTCwJQX3omDibm44M5ZGiv/8HKUMRD3NCwJer+6/v5Hrv+ZL5HDbJSH+Dw1FNPuP/WfTtcK+oqd1gTtth41j6GgCEwGwEsXMLw5WJ6+mdHNUklI2DJWSXfHWvbsiFw//59ebmmxiUQZwcGgvUgORnIZN2k97fqdzmbqamrbhhx85YXZ20rAYMdO3a4mHMlZ/v25ZO4/+qa3XP37fglF+OZOYY1UR+3oNhWs00mJi663rzD3iauuI6397ztYu7avbuQAPoXnepLy5NPPuUWPIQSsyuTV93QJ1eWtncccjGHhy/4oeRAywGnK2dYs/OLLmf7VdeXs+KYwBCodgTwt5hKpuRo91FbDFNFPwZLzqroZtulFiPQ1p6fQ4VtMUL/kXICPHp10NOFz8T4hEsk0EPlJzDonYItvqHkTJ8QwN3wdW8aW4ejoxBj/fqNhTlnnPyvFwTQHj1hsOcqTQyB6A9364dN1CIB2nMbDySl/ocLGyYv5uODYjuRA4F5ZdxOo5yeM/Reom3A2z6GgCFQjAD+Zjs7E25Ys1hjpTgjYMlZnO+uXVtJBG79OC3YCwybxG79983S2NQkB9s/k7aDbbK3Ya+bbI+kAWdrckduLALYXlcnTz75hGBfMyRtp/vOCI6CernmZUGPGnz0EB3O7ISs7vUdzu6b0VE5mjjqZFtfetEdZj4w9LU717O+vl5+vWmTbNjwtOuhu/H9dXcNoQUBvDgklthSA3VgUr3/4Wa5DY0Nbr7YgZYWOdDysXxy4BPJ8y2CzWTxOZbsdvVu2fSMHP6q0/UcYv4YkknMi/v4gw8K4ZGcHvy0xbUVOPb2ph0e77zbJOvW5+fjzZWc3Zr+0dWHtmMhBBLNxnfflX3781tpYA5dQ1ODNL3b5LbUOHrs8by9QkOMMQRijMDVqaszqzGPldxCg9tr/PBj/m85xpBUxaVZclYVt9kushQCWCn5zjvvuPlamAy/5YUtbgJ803tNMjKQFv+gFMwLa2trc3uCoaeppqZGdu58U46nemRsbMxt6vqnDz8qVHnt+2uCpOull7bKli3Py5EjR5wu2d8rO//wlls9iTrr6l6TlpZWuXHjunzySYtgk9nx8W+d7aUrl1051XuqEFczu3fvdsnZp5/OXqVZX79Hfr9jh2sXYmLTWVDIQPHF3mT8YHuPjz7a764P7UW7YXPoy8OzeguBzaEvu+TN2hqHG/DbW79benp6XD3/dbj0UOU/p6aK2sK2kbKNpKnuFJtp1BCoCgSuXLki2Obm63NfO3quLz1Dz8m5zBk5c66voO/LpOXu7btVgUvcL9KSs7jfYbu+eSGAJev4cmJ+KWfYwBbz18r5hGKj94nycmJE2SCZQe9TaDgyymcuOa/vzv3ZW2WEfO/P4BHSLYcMQ70Yyt303HOuRxA42scQMAQeIzA2PiZY4JNKp2Tymq30fIxM5XOWnFX+PbIWGgIlEUBPF4Y10YsXdfh6yQBrUJnNZtzWI9jPrePQIXlh8wtuIYOdHrAGb6Y1eckR+OXBLzIwMiDn+s4JNrseGx2TVOp4cG7tklduAZcEAUvOlgRGC2IIrDwCWF7fObPZK3rN9G7/K9+ala0RL5y+dH6RBmrGAgx9osLKtsZqMwQqC4GHj+4JFuzoBUD9/adcolZZLbXWRCFgyVkUMiY3BCocgYZ33nFDmUjMPv6k+HzLCm/6opuHIdf/TqcFPWfvvtckv3nhBTe8OT1d3hDsohtgAQyBCkcAidnExITgOKdsNutOGJi4aEObFX7bCs2z5KwAhTGGwNpCAEOYePByo9q11fqFtxbz9LDZb13d6zKQ7ZPJ8atuzpnrOQucVrDwmszTEFibCCAx604mZGR01A1l3nvwQNLpk+6kgbV5RdXXakvOqu+e2xUbAmsaAfSa4XQCnoqArUQw326LOih+TV+gNd4QWCQC+JvA3mg3rk25SJjygBMGqmnqwyIhXHV3S85W/RZYAwwBQ2C+CORyWbf1yLZttfK/3nhTWv/yqdsK5fqN/BFb841n9oZAnBBA7/JoblROp0/LwEC//O3/ZWV4ZFhGRkfidJmxvhZLzmJ9e+3iDIH4IsCtPkD5wUvJPoaAIZBHAAsD9Ef/rWi58ZWHgCVnlXdPrEWGgCFgCBgChoAhUMUIWHJWxTffLt0QMAQMAUPAEDAEKg8BS84q755YiwwBQ8AQMAQMAUOgihGw5KyKb75duiFgCBgChoAhYAhUHgKWnFXePbEWGQKGgCFgCBgChkAVI2DJWRXffLt0Q8AQMAQMAUPAEKg8BCw5q7x7Yi0yBAwBQ8AQMAQMgSpGwJKzKr75dumGgCFgCBgChoAhUHkIWHJWeffEWmQIGAKGgCFgCBgC/tg6awAACNtJREFUVYyAJWdVfPPt0g0BQ8AQMAQMAUOg8hCw5Kzy7om1yBAwBAwBQ8AQMASqGAFLzqr45tulGwKGgCFgCBgChkDlIWDJWeXdE2uRIWAIGAKGgCFgCFQxApacVfHNt0s3BAwBQ8AQMAQMgcpDwJKzyrsn1iJDwBAwBAwBQ8AQqGIELDmr4ptvl24IGAKGgCFgCBgClYeAJWeVd0+sRYaAIWAIGAKGgCFQxQhYclbFN98u3RAwBAwBQ8AQMAQqDwFLzirvnliLDAFDwBAwBAwBQ6CKEbDkrIpvvl26IbDaCExNTUkul5NsNuu+mUzG0ZDs5s2bq91cq98QMAQMgRVBwJKzFYHZKjEEDIEQApOTk5JMJsv6Xrt2LRTCZIaAIWAIxA4BS85id0vtggyBtYPAd999J93JhGS/zgp6xkp9Hz58uHYuzFpqCBgChsAiELDkbBHgmashYAgsDoGLFy+6XrORkdziApm3IWAIGAIxQsCSsxjdTLsUQ2CtITAxMeGSs+HhC2U3/dGjRzJ1bUquXr0q6E27d++efPPNqORyI/Lt+Ldy+/Zt+eWXX4rioQxbzHEbHR2VkZFhGR8fdzLfFr13GG7FB0OpsEU7f/rpJyeDPWxyuayLhXhow40bN5zfrdu3pNDGK5OujqLGiDgZ6kAc+xgChoAh4CNgyZmPiJUNAUNgxRD4rpCcld9zhsSnv7/fJXVIjFKplAwMDMq5vrR0d+fnryHx0p9Lly5Jb2+vJJPHJJvJyvnzw5JOn3QxciM5l0zRHr15ie6jcvHiqCSTKTk5Yzd9a9qZjFz4Rrq7j0p+8cJ5R3tSKenrO+PiIQHEZ2x8LB8/l5uVLF6e0V2duspqjRoChoAhUEDAkrMCFMYYAobASiPAnjOszkTP1p2HN+X+w9uOv3//vuB7586dot4nnZx1diZcLxrb/XiBQXfBB3HziVlSpm/mEyzYQ44kL5HoltHcKEMIh1qxUGFq4nEPGgzQFsjRXv35++iIkzufmeQM8bnYAbz+MLlEL599DAFDwBDwEbDkzEfEyoaAIbBiCCA5w4IAJDHoAUMSdTyVcj1W6I1KpXok1ZuSocxQoU06OUPPmf4wEUMsJkSX/3FZjiWTwSFE2PT19bn6mSiNjY5Jd/cxJ0Nd/Pzy4JdC7xuHOKlDubu72/lMXX3cGzaYyeRlMwkb7H+8+aOToUfukTf8ynhGDQFDoLoRsOSsuu+/Xb0hsKoIsJeqO5l0vVjoUQp9dU8VEir2PN28Wby9BnWp5OPkLJPJSrovHXmdiO16vK7lhyPRJiSMmVymyAfzwzqTSTeMWaSYKQxk+iWqJ0+3H0OuqG8sOxYKYzJDwBAwBMSSM/sRGAKGwKohgK00kKhcOD+/BQFIzpCAYZhRf9irhl63hw/vOdXX585IT0/KJVVnzp1xiRro6b4+J0uljruhzasziwDcnLNEtxve1LG/v3HdtTWbfdyLp/VIwDBEOvV9PsmD7u7tu9KdSLp5a7T9+sw56UomZOr7xz1s1Bk1BAwBQwAIWHJmvwNDwBBYNQQ45wxbaRSvr4xu0s8//+x6znpSPXLnTvFqRyZnGNa8dy8/z2tg4KycTp92Ky5RH79XvptwqyuvTFxyMqyyxMf1nLkFAReLGvHDTHI2lMkWyVkYHhrO98CpIUys7MS1IQGdnp52Q6sYYkVP3s9qyJQxjBoChoAhAAQsObPfgSFgCKwaAhzW1MN+5TSGPWfXrhX3nMGXQ54PH+Yn2yN2qWFNvz62CVR/MCctkeyMjNXbh7lySbddh/ZD7x561LBYAUOlsPFja3vjDQFDwBCw5Mx+A4aAIbBqCLDnbL77nA2c6pfu48fk/o37RW1Hzxl0x3qS8uDBz0737fi4m+CP5Mjf0wwG2BIDyRsm6uODxAkLAvwECrFhl0z2CHvZnIOI3L57yw2zIgkLbY9x7tw5GcoOuQUFPcmU3L//eNUoYxg1BAwBQ4AIWHJGJIwaAobAiiOABAg9SejdwhYa6GW6jy01ZrbP4JwybqmBBmLSfybT7xKdqAUBvcleYc8ZkirUgS82iuXHxcllXK8WettQxgdtSiS6ZiVn9EMChoQObUNsUOydxjq4zxntQbkIADbwtY8hYAgYAqUQsOSsFDqmMwQMgWVF4OJEfuXisWS320ID22agZwlbamDeGL7JREqOHU+6HjE0BnO1kEzl55wVD2siWXJDnmorDfhMXp50SVhPKp8cnc+eL2xCiwn63EYDtvmeM2xCWzysSSCu/vOqS8TQRvSkgfb0Hpe+vtNOHkrOMN8MG9cisbt0+RJDGTUEDAFDIIiAJWdBWExoCBgCK4EAdt3HcKP7Xs7TK5NX8hP1Zyj1OLKJH/CQs7eLclDqkKjpD8oYcvz76N9l9JsLMj7+nZug79tho1rE1hvWIg6GRGn74N4DN7cMdqgP8pHzwy75un7juq7W8T/f/dklmEjkcNSTfQwBQ8AQKIWAJWel0DGdIWAIGAIzCKB3LT8sORDEBL1o2OdM98LREHukYUsNf+806o0aAoaAIaARsORMo2G8IWAIGAIRCKB3DD1fWCzwww+P567BHAek87xNusMevWRI1nLDOTneg+097Lgm4mPUEDAEohGw5CwaG9MYAoaAIVCEACb/o/cMc8dAsTIUFF8kbnqYlbZ5+y7xj5oqCmwFQ8AQMAQUApacKTCMNQQMAUNgLgR+uHlDsOEshjHxxerLkQsXZPrW3SLXh4/uSeZvg85mODci/nmcRcZWMAQMAUNAIWDJmQLDWEPAEDAEDAFDwBAwBFYbAUvOVvsOWP2GgCFgCBgChoAhYAgoBCw5U2AYawgYAoaAIWAIGAKGwGojYMnZat8Bq98QMAQMAUPAEDAEDAGFgCVnCgxjDQFDwBAwBAwBQ8AQWG0ELDlb7Ttg9RsChoAhYAgYAoaAIaAQsORMgWGsIWAIGAKGgCFgCBgCq42AJWerfQesfkPAEDAEDAFDwBAwBBQClpwpMIw1BAwBQ8AQMAQMAUNgtRH4/9P/TzqTK36jAAAAAElFTkSuQmCC" width="430" height="342"></p>
<p>curve higher <em><strong>AND</strong> </em>to left of T<sub>1</sub> ✔</p>
<p>new/catalysed <em>E</em><sub>a</sub> marked <em><strong>AND</strong> </em>to the left of E<sub>a</sub> of curve T<sub>1</sub> ✔</p>
<p><em>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><span style="background-color: #ffffff;">The thermal decomposition of dinitrogen monoxide occurs according to the equation:</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2N<sub>2</sub>O (g) → 2N<sub>2</sub> (g) + O<sub>2</sub> (g)</span></p>
<p><span style="background-color: #ffffff;">The reaction can be followed by measuring the change in total pressure, at constant temperature, with time.</span></p>
<p><span style="background-color: #ffffff;">The x-axis and y-axis are shown with arbitrary units.</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right: auto; margin-left: auto; display: block;" 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" width="704" height="342"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why, as the reaction proceeds, the pressure increases by the amount shown.</span></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><span style="background-color: #ffffff;">Outline, in terms of collision theory, how a decrease in pressure would affect the rate of reaction.</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;">The experiment is repeated using the same amount of dinitrogen monoxide in the same apparatus, but at a lower temperature.</span></p>
<p><span style="background-color: #ffffff;">Sketch, on the axes in question 2, the graph that you would expect.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The experiment gave an error in the rate because the pressure gauge was inaccurate. Outline whether repeating the experiment, using the same apparatus, and averaging the results would reduce the error.</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;">The graph below shows the Maxwell–Boltzmann distribution of molecular energies at a particular temperature.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="400" height="259"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">The rate at which dinitrogen monoxide decomposes is significantly increased by a metal oxide catalyst.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Annotate and use the graph to outline why a catalyst has this effect.</span></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">increase in the amount/number of moles/molecules «of gas» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">from 2 to 3/by 50 % <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;">«rate of reaction decreases»<br>concentration/number of molecules in a given volume decreases<br><em><strong>OR</strong></em><br>more space between molecules <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">collision rate/frequency decreases<br><em><strong>OR</strong></em><br>fewer collisions per second/unit time <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Do <strong>not</strong> accept just “larger space/volume” for M1.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="538" height="253"></p>
<p><span style="background-color: #ffffff;">smaller initial gradient <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">initial pressure is lower <em><strong>AND</strong> </em>final pressure of gas lower «by similar factor» <strong>[✔]</strong></span></p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">no <em><strong>AND</strong> </em>it is a systematic error/not a random error<br><em><strong>OR</strong></em><br>no <em><strong>AND</strong></em> «a similar magnitude» error would occur every time <strong>[✔]</strong></span></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="426" height="278"></p>
<p><span style="background-color: #ffffff;">catalysed and uncatalysed Ea marked on graph AND with the catalysed being at lower energy <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«for catalysed reaction» greater proportion of/more molecules have E ≥ E<sub>a</sub> / E > E<sub>a</sub><br><em><strong>OR</strong></em><br>«for catalysed reaction» greater area under curve to the right of the E<sub>a</sub> <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “more molecules have the activation energy”.</span></em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>About a quarter of the candidates gave the full answer. Some only gained the first marking point (M1) by recognizing the increase in the number of moles of gas. Some candidates wrote vague answers that did not receive credit such as “pressure increases as more gaseous products form” without explicitly recognizing that the reactants have fewer moles of gas than the products. Some candidates mistook it for a system at equilibrium when the pressure stops changing (although a straight arrow is shown in the equation). A teacher commented that the wording of the question was rather vague “not clear if question is asking about stoichiometry (<em>i.e.</em> how 200 & 300 connect to coefficients) or rates (<em>i.e.</em> explain graph shape)”. We did not see a discussion of the slope of the graph with time and most candidates understood the question as it was intended.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>More than half of the candidates obtained the mark allocated for “less frequent collisions” at lower pressure, but only strong candidates explained that this was due to the lower concentration or increased spacing between molecules. Some candidates talked about a decrease in kinetic energy and they did not show a good understanding of collision theory. Some candidates lost M1 for stating “fewer collisions” without reference to time or probability.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a challenging question. Candidates usually obtained only one of the two marks allocated for the answer. Most of them scored the mark for a lower initial slope at low temperature, while others scored a mark for sketching their curve below the original curve as all pressures (initial and final) will be lower at the lower temperature. A teacher commented that the wording was unclear “sketch on the axes in question 2”, and it would have been better to label the graph instead.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered by nearly 70 % of the candidates reflecting a good understanding of the impact of systematic errors. Some students did not gain the mark because of an incomplete answer. The question raised much debate among teachers. They worried if the error was clearly a systematic one. However, a high proportion of candidates had very clear and definite answers. In Spanish and French, the wording was a bit ambiguous which caused the markscheme in these languages to be more opened.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question discriminated very well between high-scoring and low-scoring candidates. About half of the candidates annotated the Maxwell-Boltzmann distribution to show the effect of the catalyst. Some left it blank and some sketched a new distribution that would be obtained at a higher temperature instead. The majority of candidates knew that the catalyst provided an alternative route with lower <em>E</em><sub>a</sub> but only stronger candidates related it to the annotation of the graph and used the accurate language needed to score M2. A common mistake was stating that molecules have higher kinetic energy when a catalyst is added.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>This reaction is used in the manufacture of sulfuric acid.</p>
<p style="text-align: center;">2SO<sub>2</sub> (g) + O<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌<!-- ⇌ --></mo>
</math></span> 2SO<sub>3</sub> (g) <em>K</em><sub>c</sub> = 280 at 1000 K</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State why this equilibrium reaction is considered homogeneous.</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>0.200 mol sulfur dioxide, 0.300 mol oxygen and 0.500 mol sulfur trioxide were mixed in a 1.00 dm<sup>3</sup> flask at 1000 K.</p>
<p>Predict the direction of the reaction showing your working.</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>all «species» are in same phase ✔</p>
<p> </p>
<p><em>Accept “all species are in same state”.</em></p>
<p><em>Accept “all species are gases”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«reaction quotient/<em>Q</em> =» <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{{\left[ {{\text{S}}{{\text{O}}_3}} \right]}^2}}}{{{{\left[ {{\text{S}}{{\text{O}}_2}} \right]}^2}\left[ {{{\text{O}}_2}} \right]}}{\text{/}}\frac{{{{0.500}^2}}}{{{{0.200}^2} \times 0.300}}{\text{/}}20.8">
<mfrac>
<mrow>
<mrow>
<msup>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>S</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>3</mn>
</msub>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mn>2</mn>
</msup>
</mrow>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<mtext>S</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
<mn>2</mn>
</msup>
</mrow>
<mrow>
<mo>[</mo>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
</mrow>
<mo>]</mo>
</mrow>
</mrow>
</mfrac>
<mrow>
<mtext>/</mtext>
</mrow>
<mfrac>
<mrow>
<mrow>
<msup>
<mrow>
<mn>0.500</mn>
</mrow>
<mn>2</mn>
</msup>
</mrow>
</mrow>
<mrow>
<mrow>
<msup>
<mrow>
<mn>0.200</mn>
</mrow>
<mn>2</mn>
</msup>
</mrow>
<mo>×</mo>
<mn>0.300</mn>
</mrow>
</mfrac>
<mrow>
<mtext>/</mtext>
</mrow>
<mn>20.8</mn>
</math></span> ✔</p>
<p> </p>
<p>reaction quotient/<em>Q</em>/20.8/answer < <em>K</em><sub>c</sub>/280</p>
<p><em><strong>OR</strong></em></p>
<p>mixture needs more product for the number to equal Kc ✔</p>
<p> </p>
<p>reaction proceeds to the right/products ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> award M3 without valid reasoning.</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>Limestone can be converted into a variety of useful commercial products through the lime cycle. Limestone contains high percentages of calcium carbonate, CaCO<sub>3</sub>.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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" width="538" height="218"></p>
</div>
<div class="specification">
<p>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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LxOLvhGkUwtqvDpxQSf2oBFqQ/j0lyUtLivGDBPtY1zHY/+xM/7wR7y8YURdnGd8fg4fEchlXCCLVxvLa4le3OvIa/RDQKCf/fT+3fe8LoOf4uNc4RXd2y6wOM+cGo1F/naXNOGcmMJ9pgzxu18pY+poy+4zjvnpa4JvRsixNjiJWKEXeaCo68V6OOxaizM09cA9+tzqj5L544H/Gi/qTlmXHs6In5tDxMgDSLnQWA0Ak78Ef4gIPjHpX/5lz/u+h8q8ZSE/5eHiwrG88nJF1gsxq2mggB7rV2/ixX6T9l337pRQ6xLmi/qvuB6nL7ges7EUY9usxTnVgIE34jHhUrjxTk2G7W4ta/jUcptb9cQv7YIkKKR89Mi4MRfO1H9Cwe6SMw9x78fQsNThY6despQQcA4LM615gs7+s8VIH0K9tdENb9+fUqA0H8qL+TiffhU3RvXlgJEDDA/HnfPGxPlRASIaOYYBHaOAAp3ZMOTS+t/o5xzb2SctK2v4PxVEfvkGATWRsDrME9AayMce7tEwIm/yyA3DCoCtCHYcfWEgNdhBOgJmpycGQEn/plz7cktAtSDUvqsjYDXYQRobYRjb5cIOPF3GeSGQUWANgQ7rp4Q8DqMAD1Bk5MzI+DEP3OuPblFgHpQSp+1EfA6jACtjXDs7RIBJ/4ug9wwqAjQhmDH1RMCXocRoCdocnJmBJz4Z861J7cIUA9K6bM2Al6HEaC1EY69XSLgxN9lkAkqCJwcAa/DCNDJJzzpvUbAiR9cgkAQ2B4Br8MI0PZzEI8PQMCJ/4AQ4jIIXB4Br8MI0OUpcQ0AnPjXyDpZBoF9IeB1GAHa1/wkmkEIOPEHuYnZIBAEGgh4HUaAGmDl1nkQcOKfJ7NkEgSOg4DXYQToOHOXSO9AwIl/h6kMDQJBYCECXocRoIVAZtixEHDiHyv6RBsEzoGA12EE6BzzmiwmEHDiT3TP7SAQBAYg4HUYARoAckzuDwEn/v4iTERB4PwIeB2+JUC4mU8wCAfCgXAgHBjJAUrtWwKEi3CaFgTOhkB4fbYZTT5HRMDrMAJ0xFlMzLMRcOLPNpABQSAI3I2A12EE6G5IY+AICDjxjxBzYgwCZ0PA6zACdLYZTj5FBJz4xU65GASCwFAEvA4jQEPhjvG9IODE30tciSMIXAkBr8MI0JVm/8K5OvEvDEVSDwIPQ8DrMAL0sKmI4y0RcOJv6Tu+gkAQeI2A12EEKMy4BAJO/EsknSSDwM4Q8DqMAO1sghLOGASc+GO8xGoQCAItBLwOI0AttHLvNAg48U+TWBIJAgdCwOswAnSgyUuoyxFw4i+3lJFBIAgsRcDrMAK0FMmMOxQCTvxDBZ9gg8BJEPA6jACdZGKTRhsBJ367d+4GgSAwAgGvwwjQCJRjc3cIOPF3F2ACCgIXQMDrMAJ0gUlPivkr7+FAENgDAhGgPcxCYtgcASf+5gHEYRAIAu/8dz95AgopLoFABOgS05wkd46A12EEaOcTlvDWQcCJv47VWAkCQWAOAl6HDxGgzz77+e3jj3/yzn///fz5d2+ffPLTOfnc3ffly5evfMI3wNEPYvz881/M9oH8kIfawvn773/n1fUvvvjVbJtzByAG+FwDT2D07Nk3b8DoqA1YpAWBIPBYBLwONxUgLOZYhBHE1AcL6Oj20Uc/mowDcX7wwfdvWISnGoSlJGSlXD/88Ae3Fy9eTJlcdJ+CAax74u5xQkFdQ9B6/K3dB3OQ1o/AnPkGj9EfmxTlOuqrp47RB/WgY1ub0U8//dlbfXVc7Rw1nPZ4BDA/2jYTICcNCOsLMK6pQOH7iIZFWYUC5ER82iAmKlBTiznEVcmPsf705IWGgh3xNMS4PSfNb8k558bnbYmtrcc48bf2fyR/4CS5PFWD4DT71o4Ql1ojV2tjwTnnm68ltbF6vRVDLbZcXx8BzIm2TQRISYqF3wmlAeFcxWHEAq325xRYjcRasCiYqZgVj1KBOR5zvlMIYXftxsI/4m7Sib82NmexB/7ok0yrPpT3qCnwmg339KkGr7O9kU+YG/TVdQF+KSBL+cY6Ry2s9SbAc8j3eQh4HW4iQCAAHIPYPUQAEVkES8lXg0VJ3youHa8/r/KnGvQj0RGzFpHa8HMVIewC12rAC1gjzxGNc1nCYYS/tWw68deyeyY7WhvAC59WjZBrrQVeRchrg1yqbexUhHzsFO5as1Mbwilbub8eAl6HwwVISd0is6fIR/Pa4owFUAnKgsER5KuRjqSHWPQ2kB92MdYXXhWSOfnBNwsYtucWWCl2xAZbU0KPOVHfzA3xT20QiHlt0SjFtYdryDGtjAB4o3zghgqY1TgNnuB+qw+86VOS2tLrXlMaJTeiOlbvl85ZB4it9ORVGpNr2yCAOdE2XIB0BzS1uGlgrXO1ySIoHf0pQEm/FjE1lrn5qXitEQ9FuyUOutCUMEPB18Qbc6IYriGarXle854Tf03bR7elPOCGj9dqC79ytyUgwKZkC3Z5vYUf66vFaR/PTSaOc2vSbeX7ughgzrUNFyDuYLCrWqMpcUuLNq6R2PCtTceigNZo9+bHWNfAh7HUFg19GuVCQwxwj+NRuK3GfjU/rbGPuufEf1Qce/QLbLDA68aDvLx3jvn2APbUFut0ivcYg7HgXE9TjvsGtGd8+oxFAHOpbagA6WP6nB2MBujnXPx8AdV+fBJAsrpLJ+lxXYtNx845XyM/vu7oLbBafPpkUsuNTz+1otfirdmA/yW70lrcW1134m/l9wh+SnMNvPBR0ViSCwXEa44cAidbTTnZ8zSjTz8tu7n3GAS8DocKkO5+WoKxNhRKen09UBOmpf7XyI+i4BMzNybm3BIy+pp6wpny3eNrysbW9+/Fd+t4H+0PeOGDuV7aIBgUBBcacnFqY6oCpJvJUkzaF+dp+0PA6/A0AgTCoVhUZJDsVQSIedeebkBFCgdwwcKA71NFXaKwvv9fMr5kc/Q1J/5of0e3D7zwuUeA+JQDO/6URQGa2piqqExxjWJ37wbr6HO35/i9DocKEIAgkad2OnNAw84KhcHXcfRROqoA6QLsBTHHP/vqK7ipQuIYP671Co4F7TtN9Yd46c+xAja9PxcDphyv+KqvvZ0j3rR+BDi/SwVIa61kg3ydqpteAVJOlvz1Z56eIxHwOhwuQNyVtHbmcxKGcJSEB9dAPH5YQLpAKpl7F9up2BjL0vzuHc/4egsa/YER54U46RE4tRp2ouyv+LbGPPoe4k3rR4Dzu2QxxxiOL/2iEKIgX6c2plqzrScg/fkuNlpp+0TA63C4APHVEBzPIQb6YnHGeBULXThB9JJNLQBdIHXhrBVGbdpgE77dp75mKMVSs4frumubG4/bZUFP7Sh1HPBAPpoDFw5crzXFUfGt9d/DdSf+HmK6JwbO05Lj1AYDcdFuiwel+NGfY1tcJOfA21ZTAWrVFzdyU4LW8pV74xEAN7QNFyBdZOeQWYlHAcKR5G4Vke6GfIHkQg3CtgitIOGcwudPOkvzg00V59buzmMpfWdeUwVdGstrwJSFjGOtac6Ob23Mo6878R8dz979s87m1CxFBWOnNlSsUa8nx4WC1uIj3oosidd95ft4BLwOhwsQUuLiDRL1LrQcgyObilLLDsciWV8g1cZUkZT8loSPiz/89f5sScW0tFNUcUKRUoQZkx/Zv1bQEFsWaStvLgxOFPWnsbfmQcc8+ryVz6Nj26N/cqVHgMB5rbmeMT3CAlymeI0+tIWYj8LHPc75FjF5HW4iQLpjxgI5RRJd0HXB14XPhYXgKRmRbKmf2p8qFo1dxZD+cEQ++uRQ8qn9NY+SKGMnCV/EiaLQEjfm3dopMm/Yrj39cRfbstPjS/Pdw7kTfw8x7TkG4IVPT32Q++g/tVFizvrU0uI1ha21aSJna/VJnzk+HgGvw00ECGlz0VJiO/HQh4RDPycdFk2SHf10oYctEpE+cCwVBBZ29YOF2QsNtrn7gh34pSCUphH9GRv6Y6zGhzGIRWNEf8cAPjDe40Ffx0PjgB2Mw8dtsh/iYR9sBDQ+YKv5un/awJE54HiUhrzT+hEgT1o8UM6Bn8qnHk/gIPzUeATfjKPGafhhLdfs9MSSPtsg4HW4mQAhPSzAukiTXKWjPvkoNPoKrTQOpNY+tQLCgsuFtGRHr0GgWuLD+NCHTxk6vnQO3z02aXtKgNCP2NZyRh8t6lJcuAYharUeP63xj7iHvNL6ESA3alxC/XDhR9+54oNItE69HvjUD9uoqVpDHFOx1sbm+vYIYK60bSpAdAxSlxZ/iAfugVStBrL7eJBURYtC0CIvfMAWfHJRJZlxRBGUnqBasbVsomDhq7WbK9lGDohvSrD4BANsWg05a4EzZ4yfyld3vVPz1Iph63tO/K39H80fOQG+lhqus0/vsVSLrNOaDdRMi/fKR63/Usy59ngEMM/aHiJAGkDO6whokbdev9GCFuMocaBwTYkcY9rL0Ym/l7j2GgcFoSZA3OywX8+xJEDIH8LhQsTN2hQ+2EzRN87T9o0A5kpbBEjR2Ok5doAoyFoBa9gs5NrCoX2XnPNJ8WjF7sRfknvGBIEgcB8CXocRoPvw3Gw0n4ZaryMQDHeEEKy1G9/Z9wjh2r7vtefEv9dexgeBIDAfAa/DCNB8DB8yAj+bweT1PHnw9cja78QhaohhSgQfAtCEUyf+RPfcDgJBYAACXocRoAEg32OSTzD+ywB4AsLrr56f7UAg0HfNpyA+/Yx6tXcPZj1jnfg9Y9InCASBdRHwOowArYvvKtbw24D6mos/A5qz+POJac6YWvAQPQga4jpqc+IfNY/EHQSOjIDXYQRoh7OJBV9/zRxPMmsIyQ5T3SwkJ/5mjuMoCASBJwS8DiNAT9Dk5MwIOPHPnGtyCwJ7RcDrMAK015lKXKsi4MRf1XiMBYEg0IWA12EEqAu2dDo6Ak78o+eT+IPAERHwOowAHXEWE/NsBJz4sw1kQBAIAncj4HUYAbob0hg4AgJO/CPEnBiDwNkQ8DqMAJ1thpNPEQEnfrFTLgaBIDAUAa/DCNBQuGN8Lwg48fcSV+IIAldCwOswAnSl2b9wrk78C0OR1IPAwxDwOowAPWwq4nhLBJz4W/qOryAQBF4j4HUYAQozLoGAE/8SSSfJILAzBLwOI0A7m6CEMwYBJ/4YL7EaBIJACwGvwwhQC63cOw0CTvzTJJZEgsCBEPA6fEuAcDOfYBAOhAPhQDgwkgPUzLcECBfhNC0InA2B8PpsM5p8joiA12EE6IizmJhnI+DEn20gA4JAELgbAa/DCNDdkMbAERBw4h8h5sQYBM6GgNdhBOhsM5x8igg48YudcjEIBIGhCHgdRoCGwh3je0HAib+XuBJHELgSAl6HEaArzf6Fc3XiXxiKpB4EHoaA12EE6GFTEcdbIuDE39J3fAWBIPAaAa/DCFCYcQkEnPiXSDpJBoGdIeB1GAHa2QQlnDEIOPHHeInVIBAEWgh4HUaAWmjl3mkQcOKfJrEkEgQOhIDXYQToQJOXUJcj4MRfbikjg0AQWIqA12EEaCmSGXcoBJz4hwo+wQaBkyDgdRgBOsnEJo02Ak78du/cDQJBYAQCXocRoBEox+buEHDi7y7ABBQELoCA12EE6AKTnhTzV97DgSCwBwQiQHuYhcSwOQJO/M0DiMMgEATe+e9+8gQUUlwCgQjQJaY5Se4cAa/DCNDOJyzhrYOAE38dq7ESBILAHAS8Dh8iQJ999vPbxx//5J3//vv58+/ePvnkp3Pyubvvy5cvX/n84IPvvxPPRx/9aJV4kC+AXyM32IAt2EzrR8CJ3z8yPYNAEFgLAa/DTQXo889/cXv//e+8s9AjKP9sscByMXff/v3Zs2/ePv30Z4vmAAKH8cgb5/c22ICttezdG89RxmNO08YhgNrGhk1rBxvKnrpBH98AwhZsthpqQf3VzlEraftAwOtwMwECyZQgWPxfvHjxFiq4BrKwH76Pakp4+HRfIDeuQTwYD4piblSJArkAABRvSURBVGNR9hRir21iuSSeXh9n6+fEP1t+j8yn9DaDNYMjaq3UUGNahzqG5y2Of/HFr55qk/1LxwhQCf3HXMP8aNtEgPgKCs6xK3Lh0YBwjj4kEki2dvvwwx882UfxtJoXiQtVayx2cMhjRAFQqKd2ia34rnTPiX+l3EfminpgrXptcPOF+6U6q9Uhak7Hul3mQ9/YJKYdAwGvw00EiIsliAJyTTUIFJ88arunKRu1+yqGpaKojVNRnBJQ2uDubs2nH9rmU9Da+ND+2Y5O/LPl94h8UAc18WE8KiRa+/r0UhMYjq2tGxQwHNOOgYDX4XAB4kIJxzWilaAj+XAsNez8uQNiEfAIYak9OVFIaqQu+cI1Ps3ARy0mHcv+LT8o4FIOsD/1MzAUM0W6lqvGc/VzzFvaugiQuy2Oq9Aop1GjmBOMrTXdLJY4zlqes67UfOX6Ngh4HQ4XIO5S4Fh3QPekqzZht/bxJw8thjlPP4yVhO/JhQJa251RoGqx4/qU0BGHqX6M/8pH4Jm2LgKshyW11BNJS4CwlrB2SuLUYz99tkfA63C4AHGXDrKu0bjrQiIl4nNnhfu+u9KxuhvrjWvOeOZd253xtSSOECM2PBVRWJCDiyj74ch4PE/tk/PXCDjxg8t9CKgALKmlHu+sA9SIN4oTuI/64YYP84wPxo6Ky2PJ934EvA6HCpCSFIRYo3Fhb+36lYz68xoVpyW7JpIeINaEBTnqk1bJjz791IqEAtXCbcrPGnifxYYT/yx5PSoP5TBrDDXB+gTe2HS2NlC12GGbPz+FHXz3xs0X7rc+rXXCbeb7eAQwV9qGChCISXJsSQQlp5K3JkwKSOtci64lQPRfezJRO0sKVGNkwbfi0f5XPXfiXxWHtfLWzRg2Qtwwsd712NpEaTzop+MgQqUNHMZo31I/1ANro/SmRP3mfDsEvA5PI0BYyEE6FRkk+wgBYgy11454MmRxIEb0XypEfA8PG2l1BJz49Z6504MA+ApM8aH4+CYI39mnRwRgB8JCTmMs6qT0loD1U6sx5KAiqetAT37pMwYBzKm2oQIERyRg7y5Ig6udYwHXHQ59lI5KPH0Fx9cGNR+l60poLzbtz9cHONaaFrDGjTGwjRx7Wo+vHjtn7wOM09ZDwPlbEgl4035zag7816ecmv2pjChUPQI4ZSv370fA63C4AHF31NqpzEkLj+QklS7cuIaFmx/eUwHCPV5fQuje8RSFqacSxManJcalR9iZKlqOR9+0OgLANW09BFRYpjaXrFfUz9zGpyGsI0saRWyt9WdJDBnzBgGvw+ECxAUSjnt39QgXfUFcjFexoKDBHghdsqlCoQKkP7RfsiOisEzlwn6IvbehoBE3ixU+8EG+pRxpl/hGgIhI+Qgs014joPVBnvUeKQSoSY6BvVZbUg+0p7HWfh7EvqUj64Nxl/rk2nYIeB0OFyAIQC9RFQbdYVGAlPS4X2v6qk0FCP1ZDFjoWwu7257zCxX0sVQU4Is7N2DXKvB7fXmeZ/3uxD9rnlvlpZu5Vi0inns4quuH13JPrhGgHpS26+N1OFyAkBqfWrDoT71SIhQcozsXFaWWHY5Fsk5aJfTUqwPGgiNfBcBmyzf6kvS1x34VyJoI4jp84dMSIMYFn2l1BIBj2noIKD+n3iaUOEpRqtUII9V6ZS3rNW5O2d+P9DOn1t1Gvq+HgNfhJgKkhAHhphZwkgbB6u5Kn4BIRodGH9kxvtRPBWCKmCg0jWeq2BAPY4DglpriURMX3WHW+sA2X9m1+pRiuNo1J/7V8h+RL+tCN4nuB/VT4qjWIPrUGmsJ88d+OOI7Pq16rPmu+cr18Qh4HW4iQEhLiYQg8N3f6eKaPr04uZRQ6KfiAlv62ooEre2QtC9swbc2+MI1Fg/s9T5lqHh4jvTB4oVdzxMxEwf4Ryyl1uOnNO6K14Bz2roI6BsJrx96wnVg7zzGJhTX8amN1Xr32uNbBrdLvzjWfGufnG+LgNfhZgKENLGw6oJOApaO+uSjECnpS+PwhKV9auSGTe1XssVriLkWj8am58yz5h8FSJGhHz/CRk3A4EsLTH3n/F0EgG3a+gjoRs65Tn4Ce7+HSPQpyO9jreCrO9SJb8JQP6wxbOa0TtBXbdc2oeujEYtTCHgdbipADA5kU+Jy4QXhcM/JxnE84snHx4OEKhJ8wsBxqtXiwS7LC2PKFu9zh4Y4Ww32WWjEgU9kUzgQA3+Cavm76j0n/lVxGJE3a4389WOLn6wTH8PvqI3aK3usAxQh9vejrgkjco/NeQhgfrQ9RIA0gLOe6+uxKSFZggFssth097fE1hXGOPGvkPOWOeIpgxsi8hLf9TV5LZ7SWIhaz+YPdYB+LkS4VhOuWhy5Ph4Br8MI0EDMuTPsKaS5YcAmJrPnCW+u7TP2d+KfMcfkFAT2joDXYQRo4Ixh9wfA8Upt7cafH/XsMNf2fUR7Tvwj5pCYg8DREfA6jAANnlG+417zXTRsYSJhO60PASd+36j0CgJBYE0EvA4jQGuiW7DF39ZZ8ykItvDOe8TPlgopnOKSE/8USSWJIHAwBLwOI0AbTCB+yArg1/hZEH/2k18tnTdxTvx5o9M7CASBNRDwOowArYFqbOweASf+7gNOgEHghAh4HUaATjjJSeldBJz47/bIlSAQBEYj4HUYARqNeOzvAgEn/i6CShBB4GIIeB1GgC5GgKum68S/Kg7JOwg8EgGvwwjQI2cjvjdDwIm/meM4CgJB4AkBr8MI0BM0OTkzAk78M+ea3ILAXhHwOowA7XWmEteqCDjxVzUeY0EgCHQh4HUYAeqCLZ2OjoAT/+j5JP4gcEQEvA4jQEecxcQ8GwEn/mwDGRAEgsDdCHgdRoDuhjQGjoCAE/8IMSfGIHA2BLwOI0Bnm+HkU0TAiV/slItBIAgMRcDrMAI0FO4Y3wsCTvy9xJU4gsCVEPA6jABdafYvnKsT/8JQJPUg8DAEvA7fEiDczCcYhAPhQDgQDozkABXwLQHCRThNCwJnQyC8PtuMJp8jIuB1GAE64iwm5tkIOPFnG8iAIBAE7kbA6zACdDekMXAEBJz4R4g5MQaBsyHgdRgBOtsMJ58iAk78YqdcDAJBYCgCXocRoKFwx/heEHDi7yWuxBEEroSA12EE6Eqzf+FcnfgXhiKpB4GHIeB1GAF62FTE8ZYIOPG39B1fQSAIvEbA6zACFGZcAgEn/iWSTpJBYGcIeB1GgHY2QQlnDAJO/DFeYjUIBIEWAl6HEaAWWrl3GgSc+KdJLIkEgQMh4HUYATrQ5CXU5Qg48ZdbysggEASWIuB1GAFaimTGHQoBJ/6hgk+wQeAkCHgdRoBOMrFJo42AE7/dO3eDQBAYgYDXYQRoBMqxuTsEnPi7CzABBYELIOB1GAG6wKQnxfyV93AgCOwBgQjQHmYhMWyOgBN/8wDiMAgEgXf+u588AYUUl0AgAnSJaU6SO0fA6/AhAvTZZz+/ffzxT97531efP//u7ZNPfjobQtjDOCSnn/ff/86r61988avZNpcMQPzPnn3z9vLlyyXD3xnDnJBf2n0IOPHvs5bRQSAILEHA63BTAfr881/cIAoqErXznkUXwoJFv2ZDr3/44Q9uL168WIJZ1xiKxRIBrTmAkAEvfNYStZqvs18HF9LGIIC6Iv9Zc9z89XhEraM+ORZHfMd6MdXu9d2yX9oka4w8//TTn7XM5J4gAMy0bSZAmCROGI4grAsCrqlAtRZzkFPtffTRj94hrBMbTycjnoaQB2JB7Gs34ob80pYjgPlJWx8B1JjWoZ9P1ZwLj4/H/Vq713fNLq9PxcZYI0BEbPoIzLRtIkBKFDyxuPBoQDjXp5qSYOAaJx+LfqmP2lT/6D/lX8f2nH/wwfdfxTOKiBTlnh1hT7xX7OPEvyIGa+esdYiaVX6i5sjb2mtpfcLABkuf8nV8afN1r+8eLBA3eNPaCPfYSZ83CHgdbiJAU0R8E97rMwgEJx+LuzcKFPr0iomKUInQ7qP3O5/EkOOoxqegEhajfJ7NrhP/bPk9Ih8+IYD7Kh6MBbUJ3EuLuAoIhKjUdLyKG/re47vky69pfDhPWwcBr8PhAsTFs0TCVkoQCYxxsVAhmbsz4ZMK7PYKVytG3KPNqVhwn8IJ/xBPjqGNmsCguCnIKYapGSnfB+Zp6yEATgJTfMjjknVy3l+l6dNPSbxoi0Kj4+/1TdutI9cZ1F3aegh4HQ4XIBIIjltE603xHnskFWKp7bp640A/3aHVhAE5U2Dg1z8oUBZpTYDgi3m7IM+J98p9gXva9giQ2yogiII1gfutBnHD3C0Rgprvlj/eo0B63Lyf4zIEvA6HCxB37lNE603nXnsUgDXi6SkOCgf8qnhAsFiEjKklQD2+ejG8Yj8n/hUx2DpncJzc9p+PkvstziNefYMy561Fy3cPDhQv1B0+/DEC8sEahGtrbKh7YjlTH6/DoQKkj8pr7CTWsEdiLdlROREoLrXc+PMhgF574mI86NMqRi0onKfNQ8CJP290es9FgBumGq97BUjt+M+BajHpmFZN1cbjOje6iL/2QZ/UYgvFd+95HQ4VIH1Fpbv/d8Pqu7KGPRLfgeiL4O1eJCkIX2p8jG+JnQrLVLFM+SvFkGuvEVhjvoNlGwHlMhfte2oD3rRe8Qq91ub4rtngdbflOeA+N5+oyTlPZvRx1aPXYQRoIRNUDGuFwaeb2hMSXVNYpgSI9tYQc/q+ytGJf5W8t8wTr8vAZW68KELgv7+u0rcD/nqOMevPbGGr1g/95/im/dpRn6BqtY2xrMepuq35ueJ1r8OhAgSAlYT3Aq6v4JYuwiQNCuWepgVUezXA3H0H5X65y5sicm8/t5/v+WvYj+AAFm9urlB33vgUgTrxGqEIsF7RpyUGbnvKt/df8p0xIjYX2CX2rjAGWGkbLkD84V2JgBpI73mL0D027h1PHypAtUdwgI2PFxdt8NgrLBBd2JsSKtrN8Q0CTvw3d3I2EgEIAevAn2CwaJP77KNHrBn6Oqy20avF3/JdGzPnusY2Rxzn+DhbX6/D4QLERROO5+wS0BdigfE6ubprmmMPE6miUfulgN4JV1sRoF7UHtfPif+4SB7vWXfuuuD3nC/5B9fc9NVeRSMefdKBD27atM6w4M9tU77n2tP++hrexVX75fwNAl6HwwVICURSvQmnfoYJZUGoAC21B08qhjXRqEf09h2NA+elxqe/WuFxDPtNPdlwtzjVj3ZzfIOAE//NnZyNRuAe3qpYLonzHt9T/iJAUwi9e9/rcLgAIQQusNiN9C78HIOjN5IKyfTuivRxHEJ0b1PyqUCqXQoe8q41fYyfEhbuEteIvxbPWa878c+a51Z56Qasxn/Gwnqd4jf765FvPPQV/mjfjFd9akw81zh61yGOverR63ATAdKJwqROiRAJgGBLj7YYz0drHGG/1VR8aiLov7nTs8gzhtqTneZd68MCQ65TBTrlr4XB1e858a+Ox7354/U3MMWn9Tqbr9K9nz7ZtF6llzh/r++p3HUtaMXGHBBjWh8CXoebCBBC42SRtPjuuwZc45OPE9bTw+JOcqIvBMOFCMKjCzz6u0/YRR/45T0c8X1KEGgbx1rjUxBjZD+IKMcTk5Y/xMR+jJO2cpxGANilrYsAuY26qi3UWve68VQ+o0+p8TV8yf49vku+9BriZK3VYkO+XKtqfdRmzl8j4HW4mQDBPQRBRYOTXDqWnnx8EkEUfVoq2eE1LPZaALRFsjmJ8B1jS2M4ln2QU6u1YsQ93sex1np91cZf/TrmMm1dBFAbrGdwVzdGWKD1ScLrC5HoBkzvw66OLb3iu9f3FBLqX2PDOMTD1+FTr+mm/FztvtfhpgJEsDGhSj6KBCYT92q7KY73I558MI7FQHvYoeC6FoaPrX0HyWCnRH6OQRHQ15QPxEHSYgxixTW0HgEiXiiMtPkIAPO09REA773uWBM8kufuHXWuNcH+eqyNha17fMMu/dQ2u6w59vMjYp+7VjkGV/sODLU9RIA0gL2ek6AQmVYjSe8RBhYhXiuUGkhO8k8JXWl8ruUfoo7kAPiJenEhwrUevqIfX2eR56innrFLfbO+4a8mQMAMG1DWOGPDhrE1ZiTWR7cNDLVFgBQNOUdBgHhTjb9ogOLzxicb2Ko1FBALF0VRaiwW2EtbhoATf5mVjAoCQeAeBLwOI0AFNPEkAtGAOPQ0Co3vivQ9sv+CBO1SXDAxtT7cHdbu01aOdQSc+PWeuRMEgsAoBLwOI0CGNAQBTyQ9j/8cyp8F+ZMOn44AOu7pz5MgbipQtactiBrG117PMYYc2wg48du9czcIBIERCHgdRoAEZQqCCoXcbp5yrD8F6RMOwC998ARVe9qCcEEQa/ebQeXmEwJO/KcbOQkCQWAzBLwOI0C326vFHSIw98nHZw2/TFASCzxNlYQITz0tseOYVh+PId/LCDjxy71yNQgEgZEIeB1GgOT/9cjPWEZS77G2nfiPjSbeg8A1EfA6vLwA4ekCoNQ+eApJOz4CTvzjZ5QMgsDxEPA6vLwAHW8KE/ESBJz4S2xkTBAIAvch4HUYAboPz4w+CAJO/IOEnTCDwKkQ8DqMAJ1qepNMDQEnfq1frgeBIDAOAa/DCNA4rGN5Rwg48XcUWkIJApdBwOswAnSZqb92ok78a6OR7IPAYxDwOowAPWYe4nVjBJz4G7uPuyAQBG7v/lHgCFBocQkEIkCXmOYkuXMEvA4jQDufsIS3DgJO/HWsxkoQCAJzEPA6jADNQS99D4uAE/+wiSTwIHBgBLwOI0AHnsyE3o+AE79/ZHoGgSCwFgJehxGgtZCNnV0j4MTfdbAJLgicFAGvw7cECDfzCQbhQDgQDoQDIzlAfX1LgHgxxyAQBIJAEAgCoxGIAI1GOPaDQBAIAkGgiEAEqAhLLgaBIBAEgsBoBCJAoxGO/SAQBIJAECgiEAEqwpKLQSAIBIEgMBqB/w9rfRt6CMx5jQAAAABJRU5ErkJggg==" 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>Iron (II) sulfide reacts with hydrochloric acid to form hydrogen sulfide, H<sub>2</sub>S.</p>
</div>
<div class="specification">
<p>In aqueous solution, hydrogen sulfide acts as an acid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the Lewis (electron dot) structure of hydrogen sulfide.</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>Predict the shape of the hydrogen sulfide molecule.</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>State the formula of its conjugate base.</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>Saturated aqueous hydrogen sulfide has a concentration of 0.10 mol dm<sup>−3</sup> and a pH of 4.0. Demonstrate whether it is a strong or weak acid.</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 hydroxide ion concentration in saturated aqueous hydrogen sulfide.</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>A gaseous sample of nitrogen, contaminated only with hydrogen sulfide, was reacted with excess sodium hydroxide solution at constant temperature. The volume of the gas changed from 550 cm<sup>3</sup> to 525 cm<sup>3</sup>.</p>
<p>Determine the mole percentage of hydrogen sulfide in the sample, stating one assumption you made.</p>
<p><img 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" width="705" height="303"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="83" height="55"> <em><strong>OR <img src="data:image/png;base64,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" width="125" height="50">✔</strong></em></p>
<p><em>Accept any combination of lines, dots or crosses to represent electrons.</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bent/non-linear/angular/v-shaped✔</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>HS<sup>−</sup> ✔</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>weak <em><strong>AND</strong> </em>strong acid of this concentration/[H<sup>+</sup>] = 0.1 mol dm<sup>−3</sup> would have pH = 1<br><em><strong>OR</strong></em><br>weak <em><strong>AND</strong> </em>[H<sup>+</sup>] = 10<sup>−4</sup> < 0.1 «therefore only fraction of acid dissociated» ✔</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>10<sup>−10</sup> «mol dm<sup>−3</sup>» ✔</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Mole percentage H<sub>2</sub>S:</em><br>volume of H<sub>2</sub>S = «550 − 525 = » 25 «cm<sup>3</sup>» ✔<br>mol % H<sub>2</sub>S = «<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>25</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow><mrow><mn>550</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></mrow></mfrac><mo>×</mo><mn>100</mn></math> = » 4.5 «%» ✔</p>
<p><em>Award [2] for correct final answer of 4.5 «%»</em></p>
<p> </p>
<p><em>Assumption:</em><br>«both» gases behave as ideal gases ✔<br><br><em>Accept “volume of gas <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">α</mi></math> mol of gas”.</em><br><em>Accept “reaction goes to completion”.</em><br><em>Accept “nitrogen is insoluble/does not </em><em>react with NaOH/only H<sub>2</sub>S reacts with </em><em>NaOH”.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(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>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Benzoic acid, C<sub>6</sub>H<sub>5</sub>COOH, is another derivative of benzene.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Draw the structure of the conjugate base of benzoic acid showing <strong>all</strong> the atoms and <strong>all</strong> the bonds.</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;">The pH of an aqueous solution of benzoic acid at 298 K is 2.95. Determine the concentration of hydroxide ions in the solution, using section 2 of the data booklet.</span></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><span style="background-color: #ffffff;">Formulate the equation for the complete combustion of benzoic acid in oxygen using only integer coefficients.</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;">Suggest how benzoic acid, <em>M<sub>r</sub></em> = 122.13, forms an apparent dimer, <em>M<sub>r</sub></em> = 244.26, when dissolved in a non-polar solvent such as hexane.</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><img src="data:image/png;base64,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"> <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<p> </p>
<p><em><strong>Note:</strong> <span style="background-color: #ffffff;">Accept Kekulé structures.</span></em></p>
<p><em><span style="background-color: #ffffff;">Negative sign must be shown in correct position- on the O or delocalised over the carboxylate.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1:</strong></em><br>[H<sup>+</sup>] «= 10<sup>−2.95</sup>» = 1.122 × 10<sup>−3</sup> «mol dm<sup>−3</sup>» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«[OH<sup>−</sup>] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.00 \times {{10}^{ - 14}}{\text{ mo}}{{\text{l}}^2}{\text{ d}}{{\text{m}}^{ - 6}}}}{{1.22 \times {{10}^{ - 3}}{\text{ mol d}}{{\text{m}}^{ - 3}}}}">
<mfrac>
<mrow>
<mn>1.00</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>14</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext> mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mn>2</mn>
</msup>
</mrow>
<mrow>
<mtext> d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>6</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>1.22</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext> mol d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 8.91 × 10<sup>−12</sup> «mol dm<sup>−3</sup>» <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2:</strong></em><br>pOH = «14 − 2.95 =» 11.05 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«[OH<sup>−</sup>] = 10<sup>−11.05</sup> =» 8.91 × 10<sup>−12</sup> «moldm<sup>−3</sup>» <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>
<p><em><span style="background-color: #ffffff;">Accept other methods.</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;">2C<sub>6</sub>H<sub>5</sub>COOH(s) + 15O<sub>2</sub> (g) → 14CO<sub>2</sub> (g) + 6H<sub>2</sub>O(l)</span></p>
<p><span style="background-color: #ffffff;">correct products <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">correct balancing <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>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«intermolecular» hydrogen bonding <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept diagram showing hydrogen bonding.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most failed to score a mark for the conjugate base of benzoic acid as either they didn’t show all bonds and atoms in the ring and/or they did not put the minus sign in the correct place. Some didn't read the question carefully so gave the structure of the acid form.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students could correctly calculate the hydroxide concentration, but some weaker students calculated hydrogen ion concentration only.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students earned at least one mark for writing the correct products of the combustion of benzoic acid but the balancing appeared to be difficult for some.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very few students answered this question correctly, thinking benzoic would bond with the hexane even though it was a non-polar solvent. It was very rare for a student to realize there was intermolecular hydrogen bonding.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>A 4.406 g sample of a compound containing only C, H and O was burnt in excess oxygen. 8.802 g of CO<sub>2</sub> and 3.604 g of H<sub>2</sub>O were produced.</p>
</div>
<div class="specification">
<p>The following spectrums show the Infrared spectra of propan-1-ol, propanal and propanoic acid.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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"></p>
<p style="text-align: center;"><em>NIST Mass Spectrometry Data Center Collection © 2021 copyright by the U.S. Secretary of Commerce on behalf of </em><em>the United States of America. All rights reserved. Available at: https://webbook.nist.gov/cgi/cbook.cgi?ID=C71238&Units=SI&Type=IRSPEC&Index=3#IR-SPEC [Accessed 6 May 2020]. Source adapted.</em></p>
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"></p>
<p style="text-align: center;"><em>NIST Mass Spectrometry Data Center Collection © 2021 copyright by the U.S. Secretary of Commerce on behalf of </em><em>the United States of America. Available at: https://webbook.nist.gov/cgi/cbook.cgi?ID=C79094&Units=SI&Mask=80#IR-Spec [Accessed 6 May 2020]. Source adapted.</em></p>
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"></p>
<p style="text-align: center;"><em>NIST Mass Spectrometry Data Center Collection © 2021 copyright by the U.S. Secretary of Commerce on behalf of the United States of America. Available at: https://webbook.nist.gov/cgi/cbook.cgi?Name=propanal&Units=SI&cIR=on&cTZ=on#IRSpec [Accessed 6 May 2020]. Source adapted.</em></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the empirical formula of the compound using section 6 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the molecular formula of this compound if its molar mass is 88.12 g mol<sup>−1</sup>. If you did not obtain an answer in (a) use CS, but this is not the correct answer.</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 each compound from the spectra given, use absorptions from the range of 1700 cm<sup>−1</sup> to 3500 cm<sup>−1</sup>. Explain the reason for your choice, referring to section 26 of the data booklet.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>8</mn><mo>.</mo><mn>802</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>44</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo></math>» 0.2000 «mol of C/CO<sub>2</sub>»</p>
<p><em><strong>AND</strong></em> «<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>3</mn><mo>.</mo><mn>604</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>18</mn><mo>.</mo><mn>02</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo></math>» 0.2000 «mol of H<sub>2</sub>O»/0.4000 «mol of H»</p>
<p><em><strong>OR</strong></em></p>
<p><em><strong> </strong></em>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>8</mn><mo>.</mo><mn>802</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>44</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>×</mo><mn>12</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math>» 2.402 «g of C»</p>
<p><em><strong>OR</strong></em></p>
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>3</mn><mo>.</mo><mn>604</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>18</mn><mo>.</mo><mn>02</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>×</mo><mn>2</mn><mo>×</mo><mn>1</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo>=</mo></math>» 0.404 «g of H» ✔</p>
<p> </p>
<p>«4.406 g − 2.806 g» = 1.600 «g of O» ✔</p>
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>2</mn><mo>.</mo><mn>402</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>12</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mn>0</mn><mo>.</mo><mn>2000</mn><mo> </mo><mi>mol</mi><mo> </mo><mi mathvariant="normal">C</mi><mo>;</mo><mo> </mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>404</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>1</mn><mo>.</mo><mn>01</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mn>0</mn><mo>.</mo><mn>400</mn><mo> </mo><mi>mol</mi><mo> </mo><mi mathvariant="normal">H</mi><mo>;</mo><mo> </mo><mfrac><mrow><mn>1</mn><mo>.</mo><mn>600</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>16</mn><mo>.</mo><mn>00</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mn>0</mn><mo>.</mo><mn>1000</mn><mo> </mo><mi>mol</mi><mo> </mo><mi mathvariant="normal">O</mi></math>»</p>
<p>C<sub>2</sub>H<sub>4</sub>O ✔</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>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>88</mn><mo>.</mo><mn>12</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow><mrow><mn>44</mn><mo>.</mo><mn>06</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac><mo>=</mo><mn>2</mn></math>» C<sub>4</sub>H<sub>8</sub>O<sub>2</sub> ✔</p>
<p> </p>
<p><em>C<sub>2</sub>S<sub>2</sub> if CS used.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"><img 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"></p>
<p> </p>
<p><em>Award <strong>[1 max]</strong> for correctly identifying all 3 compounds without valid reasons given.</em></p>
<p><em>Accept specific values of wavenumbers within each range.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</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>Soluble acids and bases ionize in water.</p>
</div>
<div class="specification">
<p>Sodium hypochlorite ionizes in water.</p>
<p style="text-align: center;">OCl<sup>–</sup>(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> OH<sup>–</sup>(aq) + HOCl(aq)</p>
</div>
<div class="specification">
<p>A solution containing 0.510 g of an unknown monoprotic acid, HA, was titrated with 0.100 mol dm<sup>–3</sup> NaOH(aq). 25.0 cm<sup>3</sup> was required to reach the equivalence point.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the amphiprotic species.</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>Identify one conjugate acid-base pair in the reaction.</p>
<p><img src="data:image/png;base64,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"></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>Calculate the amount, in mol, of NaOH(aq) used.</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>Calculate the molar mass of the acid.</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 [H<sup>+</sup>] in the NaOH solution.</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>water/H<sub>2</sub>O</p>
<p><em>Accept “hydroxide ion/OH<sup>–</sup>”.</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 src="data:image/png;base64,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"></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>«0.100 mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup> x 0.0250 dm<sup>3</sup>» = 0.00250 «mol»</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>M</em> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.510{\text{ g}}}}{{0.00250{\text{ mol}}}}">
<mfrac>
<mrow>
<mn>0.510</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.00250</mn>
<mrow>
<mtext> mol</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> =» 204 «g<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><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«1.00 x 10<sup>–14</sup> = [H<sup>+</sup>] x 0.100»</p>
<p>1.00 x 10<sup>–13</sup> «mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup>»</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.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>
<br><hr><br><div class="specification">
<p>The concentration of a solution of a weak acid, such as ethanedioic acid, can be determined<br>by titration with a standard solution of sodium hydroxide, NaOH (aq).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between a weak acid and a strong acid.</p>
<p>Weak acid:</p>
<p>Strong acid:</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>Suggest why it is more convenient to express acidity using the pH scale instead of using the concentration of hydrogen ions.</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>5.00 g of an impure sample of hydrated ethanedioic acid, (COOH)<sub>2</sub>•2H<sub>2</sub>O, was dissolved in water to make 1.00 dm<sup>3</sup> of solution. 25.0 cm<sup>3</sup> samples of this solution were titrated against a 0.100 mol dm<sup>-3</sup> solution of sodium hydroxide using a suitable indicator.</p>
<p>(COOH)<sub>2</sub> (aq) + 2NaOH (aq) → (COONa)<sub>2</sub> (aq) + 2H<sub>2</sub>O (l)</p>
<p>The mean value of the titre was 14.0 cm<sup>3</sup>.</p>
<p>(i) Calculate the amount, in mol, of NaOH in 14.0 cm<sup>3</sup> of 0.100 mol dm<sup>-3</sup> solution.</p>
<p>(ii) Calculate the amount, in mol, of ethanedioic acid in each 25.0 cm<sup>3</sup> sample.</p>
<p>(iii) Determine the percentage purity of the hydrated ethanedioic acid sample.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The Lewis (electron dot) structure of the ethanedioate ion is shown below.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Outline why all the C–O bond lengths in the ethanedioate ion are the same length and suggest a value for them. Use section 10 of the data booklet.</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><em>Weak acid:</em> partially dissociated/ionized «in solution/water»<br><em><strong>AND<br></strong>Strong acid:</em> «assumed to be almost» completely/100% dissociated/ionized «in solution/water»</p>
<p><em>Accept answers relating to pH, conductivity, reactivity if solutions of equal concentrations stated.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«log scale» reduces a wide range of numbers to a small range<br><em><strong>OR<br></strong></em>simple/easy to use<br><em><strong>OR<br></strong></em>converts exponential expressions into linear scale/simple numbers</p>
<p><em>Do <strong>not</strong> accept “easy for calculations”</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>«n(NaOH) = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{{14.0}}{{1000}}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mrow>
<mn>14.0</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span> dm<sup>-3</sup> x 0.100 mol dm<sup>-3</sup> =» 1.40 x 10<sup>-3</sup> «mol»</p>
<p> </p>
<p>ii</p>
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2} \times 1.40 \times {10^{ - 3}} = ">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
<mo>×</mo>
<mn>1.40</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
<mo>=</mo>
</math></span> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="7.00 \times {10^{ - 4}}">
<mn>7.00</mn>
<mo>×</mo>
<mrow>
<msup>
<mn>10</mn>
<mrow>
<mo>−</mo>
<mn>4</mn>
</mrow>
</msup>
</mrow>
</math></span> «mol»</p>
<p> </p>
<p>iii<br><em><strong>ALTERNATIVE 1:</strong></em><br>«mass of pure hydrated ethanedioic acid in each titration = 7.00 × 10<sup>-4</sup> mol × 126.08 g mol<sup>-1</sup> =» 0.0883 / 8.83 × 10<sup>-2</sup> «g»</p>
<p>mass of sample in each titration = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{25}}{{1000}}">
<mfrac>
<mrow>
<mn>25</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span>×5.00g=»0.125«g»</p>
<p>«% purity = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.0883{\rm{g}}}}{{0.125{\rm{g}}}}">
<mfrac>
<mrow>
<mn>0.0883</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
<mrow>
<mn>0.125</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
</mfrac>
</math></span> × 100 =» 70.6 «%»</p>
<p><em><strong>ALTERNATIVE 2:</strong></em><br>«mol of pure hydrated ethanedioic acid in 1 dm<sup>3</sup> solution = 7.00 × 10<sup>-4</sup> × <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1000}}{{25}}">
<mfrac>
<mrow>
<mn>1000</mn>
</mrow>
<mrow>
<mn>25</mn>
</mrow>
</mfrac>
</math></span> =» 2.80×10<sup>-2</sup> «mol» <br>«mass of pure hydrated ethanedioic acid in sample = 2.80 × 10<sup>-2</sup> mol × 126.08 g mol<sup>-1</sup> =» 3.53 «g»<br>«% purity = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3.53{\rm{g}}}}{{5.00{\rm{g}}}}">
<mfrac>
<mrow>
<mn>3.53</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
<mrow>
<mn>5.00</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
</mfrac>
</math></span> × 100 =» 70.6 «%»</p>
<p><em><strong>ALTERNATIVE 3:</strong></em><br>mol of hydrated ethanedioic acid (assuming sample to be pure) = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5.00{\rm{g}}}}{{126.08{\rm{gmo}}{{\rm{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5.00</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
<mrow>
<mn>126.08</mn>
<mrow>
<mrow>
<mi mathvariant="normal">g</mi>
<mi mathvariant="normal">m</mi>
<mi mathvariant="normal">o</mi>
</mrow>
</mrow>
<mrow>
<msup>
<mrow>
<mrow>
<mi mathvariant="normal">l</mi>
</mrow>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> = 0.03966 «mol»<br>actual amount of hydrated ethanedioic acid = «7.00 × 10<sup>-4</sup> × <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1000}}{{25}}">
<mfrac>
<mrow>
<mn>1000</mn>
</mrow>
<mrow>
<mn>25</mn>
</mrow>
</mfrac>
</math></span> =» 2.80 × 10<sup>-2</sup> «mol»</p>
<p>«% purity = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{2.80 \times {{10}^{ - 2}}}}{{0.03966}}">
<mfrac>
<mrow>
<mn>2.80</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>2</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>0.03966</mn>
</mrow>
</mfrac>
</math></span> × 100 =» 70.6 «%»</p>
<p><em>Award suitable part marks for alternative methods.</em><br><em>Award <strong>[3]</strong> for correct final answer.</em><br><em>Award <strong>[2 max]</strong> for 50.4 % if anhydrous ethanedioic acid assumed.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrons delocalized «across the O–C–O system»<br><em><strong>OR<br></strong></em>resonance occurs<br><em>Accept delocalized π-bond(s).</em></p>
<p>122 «pm» < C–O < 143 «pm»</p>
<p><em>Accept any answer in the range 123 «pm» to 142 «pm». Accept “bond intermediate between single and double bond” or “bond order 1.5”.</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;">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><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><span style="background-color: #ffffff;">This question is about peroxides.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Hydrogen peroxide decomposes to water and oxygen when a catalyst such as potassium iodide, KI, is added.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2H<sub>2</sub>O<sub>2</sub> (aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\xrightarrow{{{\text{KI (aq)}}}}">
<mover>
<mo>→</mo>
<mpadded width="+0.611em" lspace="0.278em" voffset=".15em">
<mrow>
<mrow>
<mtext>KI (aq)</mtext>
</mrow>
</mrow>
</mpadded>
</mover>
</math></span> O<sub>2</sub> (g) + 2H<sub>2</sub>O (l)</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest why many chemicals, including hydrogen peroxide, are kept in brown bottles instead of clear colourless bottles.</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;">In a laboratory experiment solutions of potassium iodide and hydrogen peroxide were mixed and the volume of oxygen generated was recorded. The volume was adjusted to 0 at t = 0.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="268" height="159"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">The data for the first trial is given below.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="260" height="143"></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Plot a graph on the axes below and from it determine the average rate of formation of oxygen gas in cm<sup>3</sup> O<sub>2</sub> (g) s<sup>−1</sup>.</span></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><img 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" width="371" height="601"></span></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Average rate of reaction:</span></span></span></span></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Additional experiments were carried out at an elevated temperature. On the axes below, sketch Maxwell–Boltzmann energy distribution curves at two temperatures T<sub>1</sub> and T<sub>2</sub>, where T<sub>2</sub> > T<sub>1</sub>.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAhIAAAFaCAYAAABL3rQjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACAMSURBVHhe7d0LWFR14v/xD3hJajRlxQJBTQ3UInUVf5W6oZZ2sTJr0/8v79qqu6L++oU8atampZu6tpGVbsGal1prJW9ZeQEqzTLRvO0qCmWKqJgQkpIC85sZDua19Dvjf88O71cPD57vnJlBnwd4d873fE+A00UAAAAGAq3PAAAAl42QAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxmwfEidOnNCYMWO0f/9+awQAANiFrUPCHREjR47UtGnTNGLECM82AACwD9uGREVEvPHGG57tJUuWeLaJCQAA7MO2IfHMM894ImLIkCGe7ZdfftmzTUwAAGAftgyJmTNnek5nuCMiMTHRMzZ48GDPNjEBAIB92C4k3BERFxd3OiKCgoI84+7P7u2KmEhKSvKMAwCAfx9b3UZ87ty56t+/v2JiYpSSkqLw8HDPeEBAgCq+zDPnTrhPd7gnYQIAgH8PWx2RaNKkyXkRca6KIxPu/Vq3bm2NAgCAfwdbHZG4mDOPSAAAAPuw7VUbAADA/ggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgzEchUabi3O1a988jcrr+K8n9WIkD26tmzXbq/fwSZRaVWvsBAAB/4oOQKFX++j/r3sho3f/XDOU792np+GEaNSdPbe8I0san+ujB59J11GntDgAA/Ib3IVG2W+/98UWlhQ7RlD6tdM3u1Zr9t53SgxOUvGyJ5j/XVjtf+YfSD5ZYTwAAAP7C+5D4bo82fJarRv0Ha0Db2jrwRapWqo463N1aDQIcatg8SiraqewDxdYTAACAv/A+JEpO6kSR9WcVKDNju+tzS93dKlxVVKJjBUdd2zVUvWqAZw8AAOA/vA+JepG6rUMdfbNksRavStFbc7dIN3dVl1uCVJC5QkmzVkvNblXrG4KsJwAAAH8R4HSx/myoRHmfTFWv+8YrzXNkorUG/n2hZj9yXK/FdNCo3R319OK/akKXcFX17H/5AgIC5PWXCQAAfM4HIeF2SgXZm/TF1iOq3vjXui06VDUCCrR1eboKIn+j2yODjSPCjZAAAMCefBQSVxYhAQCAPfksJJzFOdq0ZpXSPvlC2w5HaciMx3X9Z4u0LfxuPdCyHkckAADwQz5YkMoVEfnr9eded6pt94GKnzpLc+fsVF5xgbJXzdDDHQZo0pr9YhUJAAD8j/ch4TystBeeVHzqTZr2yQ59PDXWeuA6dUn4kxKaf66Jo+dp43GOKAAA4G+8D4lj2/XR3M9Up88A9evQQNecsVxE1dBYDRp2p7T9C331zQlrFAAA+AvvQ+KHAh3MlYKbhCr4vDWnqqpm7WDX5+9VdKKsfAgAAPgN70Pi2lBF3uzQoU17dODcsxfOI9r66QbJ0UyNw2pYgwAAwF94HxJXR6vHH+6T3n5Bz/z1U33z/UnX4A/K3/uVPnp5nOL+sls39r1Xt13vzXUbAADAjnxz+WfJfq2Z9Dv1mPiBTt92w8OhG3s9rzdf/r1uCzEPCS7/BADAnny3IJXzuHK3bdD6jduUffRHV0OEKuqmGHW87UbV9vKGXYQEAAD2ZBQSpZkLNfr5FSq0tn9RYGsNmRGnjnWqWAOXh5AAAMCezEJiS6JiWo3SZmv7FznitCz7RXUPISQAAPAnvju1cQUREgAA2JP3V21UcBbryDcHVVTx+754rzLW/lO5xawfAQCAv/JJSDiLtmre7+/SDbcnasOx8nAozf5AozvepMh7J2tN7o+eMQAA4F+8Dwn3vTaeG65+s47pvhEd1ah6+RUagQ26avKbCYr5coJ6DF+gzFOcmgAAwN94P0eiMFUJzbro9bsXaXtST4WddaVnkbYk9larUVcraddcDYo0W92SORIAANiT90ckKu610aKh6p23XEQN1QsPd33O09Fj3EgcAAB/431IBDdQdEuHslZuPP/0BffaAADAr/ng8s/jykx+XG0Gp6n5gNF6ok9H3Vi7upzHc5SxPFnTpq5RtYTFWjelywXuDnppOLUBAIA9+WYdiZIcffKXBA2JX6Dd1lC5CMWOnqZXJj2iFg6zxajcCAkAAOzJhwtSlak4N1Nb/pWlnIIfFXhNPd3QOEpRTUNUw7tbbRASAADYFCtbAgAAY0YhUX7TrnQ1HDJRT96er4Wjp2hF4c+sYMlNuwAA8EtmIeG5addrardsjWbdk6fEmA4atbnIevQCuGkXAAB+yftTG848bflgnb6u2VJ3d7xBZ1/k6VTx159q0cpDavZoT7XhiAQAAH7F+3UkSr/VqpEP6aE3NivfGvpJifI2zFGfYa8qLfuENQYAAPyFWUg4c7R8eLTnSEFAtbaKz3KNzX1YYe7tsz6qq0Hvv0mOcF1Xp1r5cwEAgN8wPLXh1KnsJXp60ns6UPKddix+XxnXxeq37RsoyNrjtKD6ant/Pw28t5kcLEgFAIBf8X6OROkWz2TL8e3eVvas7gqxhn2JkAAAwJ68nyMRcLV+1foRje4Yrmr8rgcAoFLxPiQObdPK5Dma/02xgrxcwRIAAPxn8T4k6kbr3oGtdWTDl9qcVywOSgAAUHl4P0ei7FutmTRGw/+4ULsVqjb3ddJNv6pqPWhhZUsAAPySzyZbsrIlAACVj/ch8f8BIQEAgD35KCScKinKUeauQzp3/Urn8UPa9VW+mvTprVs5tQEAgF/xQUiUKv/zlzWgzwQtzbrI6Q1ObQAA4Je8v2qjbLfee2aqlh66Rf2eekpDYyNc4dBJQyeO09BON7p2iFXCP+J1t2FEAAAA+/I+JL7bow2f5apOn7GaNvEpJQz6jVRUV+16TdBrS99W4gP7lLLkK+VxQAEAAL/jfUiUnNSJIim4SaiCA6qrXqOmilC2du0vUoDjZnV/5Fbtfm2hVn/zo/UEAADgL7wPiVohahghHc3K1VFngIKua6DmOqxdOQVyul6+avXqrp1ydOjoqfL9AQCA3/A+JK5pobsGdFD+/ClKmLlO39Vvrt/cnK81C9/R8vWr9d57ayVHY0WEuIMCAAD4E59c/unMW6sZcSP0ZP5I7frgMdVMm6bHekxQmucijgh1ev4tLRrbQXW4jTgAAH7FdwtSlRRqf26Jro8IVlWdUkH2Jn2x9aAU2krt2zWUw4sbehESAADYk+8WpCrYrc8+StXaTVu06+BxBdZprHa3dVKXbrcpsnY1az8zhAQAAPbkg5BwRUTuak16bLAmpu2zxn7i6DRJixfEq0voVdbI5SMkAACwJ+8nWzr3aen4kZr45U1K+PsX2nvslOuXfplOHTugHasT1XP/C+oxfIEyTxECAAD4G++PSOQt17DG92vpkA+1fUY3BZ81F+IH/XNWP900vFSv7XhLw1pcbY1fHo5IAABgT94fkahSTTWqSVVrXq2rzptQWV0161zr+vyjTnJEAgAAv+N9SNRpo15P3qf8v8/Twh3f66dccKokf5PeeytNjgceUpcos6MRAADAvrw/tVH2rVJfnKJJf5yl9KIb1WloL93T9FqpMFMfvPW20rLqKHboIN3X1GE9oboi7uqnXi1rW9u/jFMbAADYk/chUZKh6c3aKj7L2v5FTdRvUZre7Blhbf8yQgIAAHvyweWfJSo6ckTHLnkORBUF1amr2jUu/awKIQEAgD35ICSuPEICAAB78n6yJQAAqLQICQAAYIyQAAAAxoxCwvldpr7YuF37ikqtEQAAUBkZhESpjqyfqTtj4rRw1wnXZqYWxg3UwOmfKt/aAwAAVA4GIeFUycmTKnJlQ9aebOXmfq0dy+dozobd+jY317V9gY+DBSrmogsAAPyO0eWfZd8u0uN3DlDy7iJr5JcM1aIDM9UztKq1fXm4/BMAAHsyXEeiVEWZK7Vg6Q4dK9uv9D+9pPcb99OE3tGqZe1xtka6a1hPtXSYze0kJAAAsCfvF6Qq3aLEmA4a3+5tZc/qrhBr2JcICQAA7MlnK1s6i7K19v0PtXp9hr7JL1FgnUZqdct/Kfb+LmoZcpW1lxlCAgAAe/JJSDjz0vVsr356Nm2fNXKGG4dq7vLp6htZcffPy0dIAABgT94vSOU8rLQ/j3dFRISGJa1V9tETKnOW6dSxA9q+YrIeODJbvx/zjjIv+aZeAADgP4X3RyQKU5XQrItef3CZdr7aXfUCrHGPIm1J7K1Wo65W0q65GhRZwxq/PByRAADAnrw/IvFDgQ7mSsFNQhV8VkS41VC98HDX5zwdPVZSPgQAAPyG9yER3EDRLR3KWvGZdpy76pTzkDJWfy45mqlxmNnRCAAAYF8+mGx5XFnzRiim37uq2ytBEwbcoeYhQSr5fq82L52tMS+tV3jCYq2b0uUCRywuDac2AACwJ99c/lmSo0/+kqAh8Qu02xoqF6HY0dP0yqRH1MJRxRq7fIQEAAD25LN1JFw1oaJ9mdqx+2vlFPyowGvq6YbGUYpqGqIahkciKhASAADYkw9D4sohJAAAsCfvJ1sCAIBKi5AAAADGCAkAAGCMkAAAAMZ8NNnSqZKig8rOOqALL2BZSw1bNlXdqmaXbzDZEgAAe/JBSJSqaMd8xT00QnN2F1lj5xqqRQdmqmdoVWv78hASAADYk/chcfIrJXbqrFFbm6tfwgDd2+JXqmY9dFpgPbW+u71uMFxQgpAAAMCevA+J3BT1D3tYq0Z/qO0zuhkvg/1zCAkAAOzJ+8mW19TW9aFS1ZpX66orEBEAAMC+vA+JWu3U7+leyn93iVZ9+4M4bgAAQOXh/amN0kwtHDZM499IU5ZC1ea+TrrpV+dMqgxsrSEz4tSxjtmNuzi1AQCAPfkgJLYoMaaDRm2+2BUbLo44Lct+Ud1DCAkAAPyJDy7/vPIICQAA7MlnIeEsytba9z/U6vUZ+ia/RIF1GqnVLf+l2Pu7qGXIVdZeZggJAADsySch4cxL17O9+unZtH3WyBluHKq5y6erb6TDGrh8hAQAAPbk/VUbzsNK+/N4V0REaFjSWmUfPaEyZ5lOHTug7Ssm64Ejs/X7Me8o8xQhAACAv/H+iERhqhKaddHrDy7Tzle7q95Za0kUaUtib7UadbWSds3VoMga1vjl4YgEAAD25P0RiR8KdDBXCm4SeoFVLWuoXni463Oejl74bl4AAOA/mPchEdxA0S0dylrxmXYUn3PUwHlIGas/lxzN1DjM7GgEAACwLx9MtjyurHkjFNPvXdXtlaAJA+5Q85AglXy/V5uXztaYl9YrPGGx1k3pYnwfDk5tAABgT765/LMkR5/8JUFD4hdotzVULkKxo6fplUmPqIXDbDEqN0ICAAB78tk6Eq6aUNG+TO3Y/bVyCn5U4DX1dEPjKEU1DZHh3cNPIyQAALAnH4bElUNIAABgT0YhUZq5UKOfT1fDIRP15O35Wjh6ilYUllmPXgA37QIAwC+ZhcSWRMW0ek3tlq3RrHvyuGkXAACVFKc2AACAMR8skZ2nLSsWa/GnX6vYGvqJU8Vff6IFs99VRn6pNQYAAPyF9yFR+q1WjXxID72xWfnW0E9KlLdhjvoMe1Vp2SesMQAA4C/MQsKZo+XDoz2nHAKqtVV8lmts7sMKc2+f9VFdDXr/TXKE67o61cqfCwAA/IbhHAmnTmUv0dOT3tOBku+0Y/H7yrguVr9t30BB1h6nBdVX2/v7aeC9zeRgZUsAAPyK95MtS7d4rtoYH/OGPh97hxo2vL48GIr3KmPjDwpr20yhNbw7g0JIAABgT97PkajSUnGfrNOrgTN16+2J2nCsfD2J0uwPNLrjTYq8d7LW5P7oGQMAAP7FB1dtHFbac8PVb9Yx3TeioxpVLz9/Edigqya/maCYLyeox/AFyjzFEQUAAPyN96c2ClOV0KyLXr97kbYn9VTYWfMgirQlsbdajbpaSbvmalCk2a3EObUBAIA9eX9E4ocCHcyVgls0VL3zJlPWUL3wcNfnPB09VlI+BAAA/Ib3IRHcQNEtHcpaufH80xfOI9r66QbJ0UyNw8yORgAAAPvywRLZx5WZ/LjaDE5T8wGj9USfjrqxdnU5j+coY3mypk1do2oJi7VuShcFc/knAAB+xTf32ijJ0Sd/SdCQ+AXabQ2Vi1Ds6Gl6ZdIjauEwu2GXGyEBAIA9+SYkPMpUnJupLf/KUk7Bjwq8pp5uaBylqKYhqmF4JKICIQEAgD35KCScKinKUeauQzr3jhrO44e066t8NenTW7fW4TbiAAD4Ex+ERKnyP39ZA/pM0NKsImvsHI44Lct+Ud1DCAkAAPyJ91dtlO3We89M1dJDt6jfU09paGyEKxw6aejEcRra6UbXDrFK+Ee87jaMCAAAYF/eh8R3e7Ths1zV6TNW0yY+pYRBv5GK6qpdrwl6benbSnxgn1KWfKU8DigAAOB3vA+JkpM6USQFNwlVcEB11WvUVBHK1q79RQpw3Kzuj9yq3a8t1OpvuN8GAAD+xvuQqBWihhHS0axcHXUGKOi6Bmquw9qVUyCn6+WrVq/u2ilHh46eKt8fAAD4De9D4poWumtAB+XPn6KEmev0Xf3m+s3N+Vqz8B0tX79a7723VnI0VkSIOygAAIA/8cnln868tZoRN0JP5o/Urg8eU820aXqsxwSleS7iiFCn59/SorEdVIeVLQEA8Cu+W5CqpFD7c0t0fUSwquqUCrI36YutB6XQVmrfrqEcXixKRUgAAGBP3odE2W4teHyydnYepf/971aq7eUqlhdCSAAAYE/ez5E4tE0rk+do/jfFCroCEQEAAOzL+5CoG617B7bWkQ1fanNesThuAABA5eGDUxvfas2kMRr+x4XarVC1ua+TbvpVVetBS2BrDZkRp47cawMAAL/ifUiUblFiTAeN2nyR+2y4ca8NAAD8ku+u2riCCAkAAOzJaI5E2b5UvTI9UQu3FFgjAACgMjILicOb9GJ8olZkHbNGXIq2aOH06Xol9VuVWUMAAMC/eX/VRoVjWVoRH68XN+UREgAAVBK+CwkAAFDpEBIAAMAYIQEAAIx5ERKlOlFwWLm5ueUfhwt0wj1aeEQHK8YqPg4WqJirNwEA8DtG60iUZExXs7bxyrK2f9lQLTowUz1Dz1nx8hKxjgQAAPZkFBKlmQs1+vkVKrS2fxFLZAMA4JdY2RIAABhjsiUAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADBGSAAAAGOEBAAAMEZIAAAAY4QEAAAwRkgAAFBJ7N+/Xz169PB89hVCAgCASmLv3r1asmSJIiIitG7dOmvUO4QEAACVRPv27bV27VrPnzt06OCTmCAkAACoRHwdE4QEAACVjDsmNm/erJiYGE9MpKSkWI9cPkICAIBKqFWrVp6AcMfEww8/rJkzZ1qPXJ4Ap4v1Z9sKCAiw/gQAAK4Ed1B8+OGHCg4OtkYuzX9ESAAAAN9zH4WIi4vzRIT76ER4eLj1yKXj1AYAAJWQLyLCjZAAAKASOXHixOmIePDBB72KCDdObQAAUEm4I2LkyJF64403NGTIECUmJiooKMh61AxHJAAAqCSSkpJ8GhFuHJEAAKCScB+RcMfE4MGDfRIRboQEAAAwxqkNAABgjJAAAADGCAkAAGCMkAAAAMYICQAAYIyQAAAAxggJAABgjJAAAADGCAnADsp2KrlbmAK6JSuzzBo7rVA7kwcrLCBa/ZO3q0jFykx+VAFh45RaeN7OXipU5qpEjXtzp8pf+Uq+FwB/QEgAtuaOiP9R58H71XfRu3pl0M1yqIYiB70j54HJ6lzLx9/ChRuV1P9Pyii1tq/kewHwC/xkAGzrp4gYsCZZU3o2c0UEANgLIQHY0tkR8Vzn+md8s55zuqEwVQlhYer2+ipteDNBnQICFOD6COv/olZlFlrPKVeWu0FvJnTzPB4QEKZOCclKrdjH/TrNumhqbq5WDm6uKp7XP36BUxsnlZsxTwmdwspfJ6y/pq/KVJH16MX87HurzPX24xQW8KheT00/Y79o9Z/+kTKLzjytcs77B3RTQnLqGfscUWpCWwV0StDr0/u7XtP9NVZ8/e5TNy+qf5j7ee5/o+n6R7L736ytElJzlJMyQmEXOo3j+Td273PEGgBQgZAAbOfnIuJiXL/8fzddi2oO1DKnU87S/Zpf/0N1HZqkDOsXbFlOih5vM1ip1z+tA6WufZw79VrUOvWJHaeUnJNSrc56YecajQkNVdekf6n0gqczTrp+2T6hNm3nS3GpOuYs1bHUztrW/2GNStlrzas43y++92nv6neTVqrm4Hdd+zhdX8MM1X//Dxo6a6MVKtb7379a17+QoVL33/XYnxX18SjFjlqsnDO/gPQVWhscr0znjzqQPlTtapW4njtOsf23647U712vX6rMsSFa9tRUpXuecJXq39lTfbVMC1bvO+Pv4oqcjas1T13VrW2wNQagAiEB2MphbU1yR0SyKw0uT+iYBI2vOP0RGKq2d7ZRaPp6bTng/kV9ROmJk5Uc/T8aP6q9Qj3f+bXUbNALmt/3c41IXOvKl0tQlq2PZqdIp98rUI5m96l/36uUPHuN9lywJC7nvdtozIQn1DOylmcrMLS17mxXW+mrtuuA+7UL1ypxRIqinxurUe1Cy3+AOW7WoJdfUt8PJisx/YwjBqH3q/8jLVxfY3WFRjaUw/Pcj3XPzKc1oJn79d1fe1+9PH+sQsuf4fqyfq1Hn2h4zt/lqDZ+tFLqe6faMk8EOA/fFYCdrByr3/5uvwas/ETvDjqgKX2maPFZ/8d+qVy/JMObKlrZ2rXf9f/yhVv10bwMhbZqpOvP+q53KDyqsXLnrdbGS7gqo2zPZ1ro+p0aHRV2xnyNuur8wkY5PxqkyAv9RPHqvcv30bY92l9UUn5kIDdMrRrVPfuHlyNMUdEHNO+jrRcJIuuoQm5ztb/5ujOeW/HvVKG2Wj/QU11Xfqi1e4rLhzxfv6sjut3iyh8A57rQtz2Af5uuGus+nXFXR/V8bobGRqVoxLi3tfOsOQLmcqd20bWeeQUVH0GKGvyu9eiV5bv3ztDULiFnvI7ro0pzDV55ucdwLiywaRcNHfQvPZX0mStKrACJekyPtuO0BnAhhARgJ117aUBs+ZyIwNAuGjc9XlFzx2r46TkC3rDmPrjnFZz7ccUv7/Tle/9WSbtOnP86ro8DL3T2/qhBYITufOx+yXOk5Ig2fvSxovveo9YOflwCF8J3BmBbgXK0Gajp036t9PjBPzuZ8RfVukXd+oZp27p/KvesFylQxvTuF1kI63yBTW9Xr67Stl0Hzggb6yqSgEeVnGmdDjiTj97b/e9Rq+2d6hv6L63bfujsf4uiDZreqam6JVcspHWuiudap3pOK1PR/j3aZm2Vc+3broeeiFqpBQvf1fvz6qtXh0b8sAQugu8NwNZqq82wPympn5Q8YprhfAm3uoodOU73fPCMxr20zvqFXqjMlKl6Ml6aNrln+fwGz1yDq90PSseLdN4ZlcDGuidhqKKmvqA/peZ4fmmX5X6qOfM2KXbak3o0skb5fme5xPe+FLU6aOTMO/TBiKf10obc8mgo2qmUSRMUrz9o8qORF/+h5nnurZo3aYZSPJeduiIic7GenzTn/Imtjlv0QN/GSv7dCM2Ivlsdml7o7wXAjZAA7M5xswZMflaD9Ioe7vPK6cs5L1dg/R56Kf0l3XFwosKquOcWXKvYJcGK2/i6nmhT29rJHQp9ddK9jsQ1g/ROxYTD06ortPNYvbWxj0onxahKQICqhE1X6YC39NYT7c6YgHm2S3rvS1Jd9XtOVvr8O3QwoY3n/QNq/lZLQoZq41t/UJufPf1gPXdciJbEXuv6Gqoo8vm96hw3Ul2tPX5SQ0279dYg96WwvW5XU35SAhcV4HSfWASASqosM1n3xO5Rws7nzpqrUT6+SUO/nKGe9atbowDORWcDqBw8q1NW3PisXFnuOr30/Ks6+UQPtTtzwmdZjtLnpLjG+6krEQH8LEICQOVQq4NGL3tW0R//P9W0Lhut0uavKn1w9hmnZayJo1ViNKl0kGYPa3vR0zUAynFqAwAAGOOIBAAAMEZIAAAAY4QEAAAwRkgAAABjhAQAADAk/R/eetNfdKwesgAAAABJRU5ErkJggg==" width="393" height="257"></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;">Apart from a greater frequency of collisions, explain, by annotating your graphs in (b)(ii), why an increased temperature causes the rate of reaction to increase.</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;">MnO<sub>2</sub> is another possible catalyst for the reaction. State the IUPAC name for MnO<sub>2</sub>.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Comment on why peracetic acid, CH<sub>3</sub>COOOH, is always sold in solution with ethanoic acid and hydrogen peroxide.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">H<sub>2</sub>O<sub>2</sub> (aq) + CH<sub>3</sub>COOH (aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> CH<sub>3</sub>COOOH (aq) + H<sub>2</sub>O (l)</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Sodium percarbonate, 2Na<sub>2</sub>CO<sub>3</sub>•3H<sub>2</sub>O<sub>2</sub>, is an adduct of sodium carbonate and hydrogen peroxide and is used as a cleaning agent.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><em>M</em><sub>r</sub> (2Na<sub>2</sub>CO<sub>3</sub>•3H<sub>2</sub>O<sub>2</sub>) = 314.04</span></p>
<p><span style="background-color: #ffffff;">Calculate the percentage by mass of hydrogen peroxide in sodium percarbonate, giving your answer to two decimal places.</span></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><span style="background-color: #ffffff;">decomposes in light <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “sensitive to light”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="381" height="612"></p>
<p><span style="background-color: #ffffff;">points correctly plotted <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">best fit line <em><strong>AND</strong> </em>extended through (to) the origin <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Average rate of reaction:</em><br>«slope (gradient) of line =» 0.022 «cm<sup>3</sup> O<sub>2</sub> (g) s<sup>−1</sup>» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept range 0.020–0.024cm<sup>3</sup> O<sub>2</sub> (g) s<sup>−1</sup>.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="394" height="247"></p>
<p><span style="background-color: #ffffff;">peak of T<sub>2</sub> to right of <em><strong>AND</strong> </em>lower than T<sub>1</sub> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">lines begin at origin <em><strong>AND</strong> </em>T<sub>2</sub> must finish above T<sub>1</sub> <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>E<sub>a</sub></em> marked on graph <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">explanation in terms of more “particles” with <em>E ≥ E<sub>a</sub></em><br><em><strong>OR</strong></em><br>greater area under curve to the right of <em>E<sub>a</sub></em> in T<sub>2</sub> <strong>[✔]</strong></span></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">manganese(IV) oxide<br><em><strong>OR</strong></em><br>manganese dioxide <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “manganese(IV) dioxide”.</span></em></p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">move «position of» equilibrium to right/products <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept “reactants are always present as the reaction is in equilibrium”.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">M (H<sub>2</sub>O<sub>2</sub>) «= 2 × 1.01 + 2 × 16.00» = 34.02 «g» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«% H<sub>2</sub>O<sub>2</sub> = 3 × <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{34.02}}{{314.04}}">
<mfrac>
<mrow>
<mn>34.02</mn>
</mrow>
<mrow>
<mn>314.04</mn>
</mrow>
</mfrac>
</math></span> × 100 =» 32.50 «%» <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">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The explanation that the brown bottle prevented light causing a decomposition of the chemical was well answered but some incorrectly suggested it helped to stop mixing up of chemicals <em>e.g.</em> acid/water/peroxide.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The graphing was disappointing with a surprising number of students missing at least one mark for failing to draw a straight line or for failing to draw the line passing through the origin. Also some were unable to calculate the gradient.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The drawing of the two curves at T1 and T2 was generally poorly done.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Explaining why temperature increase caused an increase in reaction rate was generally incorrectly answered with most students failing to mention “activation energy” in their answer or failing to annotate the graph.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many could correctly name manganese(IV)oxide, but there were answers of magnesium(IV) oxide or manganese(II) oxide.</p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Suggesting why peractic acid was sold in solution was very poorly answered and only a few students mentioned equilibrium and, if they did, they thought it would move to the left to restore equilibrium.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Calculating the % by mass was generally well answered although some candidates started by using rounded values of atomic masses which made their final answer unprecise.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>There are many oxides of silver with the formula Ag<sub>x</sub>O<sub>y</sub>. All of them decompose into their elements when heated strongly.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>After heating 3.760 g of a silver oxide 3.275 g of silver remained. Determine the empirical formula of Ag<sub>x</sub>O<sub>y</sub>.</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>Suggest why the final mass of solid obtained by heating 3.760 g of Ag<sub>x</sub>O<sub>y</sub> may be greater than 3.275 g giving one design improvement for your proposed suggestion. Ignore any possible errors in the weighing procedure.</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>Naturally occurring silver is composed of two stable isotopes, <sup>107</sup>Ag and <sup>109</sup>Ag.</p>
<p>The relative atomic mass of silver is 107.87. Show that isotope <sup>107</sup>Ag is more abundant.</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>Some oxides of period 3, such as Na<sub>2</sub>O and P<sub>4</sub>O<sub>10</sub>, react with water. A spatula measure of each oxide was added to a separate 100 cm<sup>3</sup> flask containing distilled water and a few drops of bromothymol blue indicator.</p>
<p>The indicator is listed in section 22 of the data booklet.</p>
<p>Deduce the colour of the resulting solution and the chemical formula of the product formed after reaction with water for each oxide.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the electrical conductivity of molten Na<sub>2</sub>O and P<sub>4</sub>O<sub>10</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>Outline the model of electron configuration deduced from the hydrogen line emission spectrum (Bohr’s model).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>n(Ag) = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3.275{\text{ g}}}}{{107.87{\text{ g}}\,{\text{mol}}}} = ">
<mfrac>
<mrow>
<mn>3.275</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>107.87</mn>
<mrow>
<mtext> g</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mol</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 0.03036 «mol»</p>
<p><em><strong>AND</strong></em></p>
<p>n(O) = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3.760{\text{ g}} - 3.275{\text{ g}}}}{{16.00{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}} = \frac{{0.485}}{{16.00}} = ">
<mfrac>
<mrow>
<mn>3.760</mn>
<mrow>
<mtext> g</mtext>
</mrow>
<mo>−</mo>
<mn>3.275</mn>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>16.00</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>
<mfrac>
<mrow>
<mn>0.485</mn>
</mrow>
<mrow>
<mn>16.00</mn>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 0.03031 «mol»</p>
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.03036}}{{0.03031}} \approx 1">
<mfrac>
<mrow>
<mn>0.03036</mn>
</mrow>
<mrow>
<mn>0.03031</mn>
</mrow>
</mfrac>
<mo>≈</mo>
<mn>1</mn>
</math></span> / ratio of Ag to O approximately 1 : 1, so»</p>
<p>AgO</p>
<p> </p>
<p><em>Accept other valid methods for M1.</em></p>
<p><em>Award <strong>[1 max]</strong> for correct empirical formula if method not shown.</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>temperature too low<br><em><strong>OR</strong></em><br>heating time too short<br><em><strong>OR</strong></em><br>oxide not decomposed completely</p>
<p>heat sample to constant mass «for three or more trials»</p>
<p> </p>
<p><em>Accept “not heated strongly enough”.</em></p>
<p><em>If M1 as per markscheme, M2 can only be awarded for constant mass technique.</em></p>
<p><em>Accept "soot deposition" (M1) and any suitable way to reduce it (for M2).</em></p>
<p><em>Accept "absorbs moisture from atmosphere" (M1) and "cool in dessicator" (M2).</em></p>
<p><em>Award <strong>[1 max]</strong> for reference to impurity <strong>AND</strong> design improvement.</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>A<sub>r</sub> closer to 107/less than 108 «so more <sup>107</sup>Ag»<br><em><strong>OR</strong></em><br>A<sub>r</sub> less than the average of (107 + 109) «so more <sup>107</sup>Ag»</p>
<p> </p>
<p><em>Accept calculations that gives greater than 50% <sup>107</sup>Ag.</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><img 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"></p>
<p> </p>
<p><em>Do not accept name for the products.</em></p>
<p><em>Accept “Na<sup>+</sup> + OH<sup>–</sup>” for NaOH.</em></p>
<p><em>Ignore coefficients in front of formula.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«molten» Na<sub>2</sub>O has mobile ions/charged particles <em><strong>AND</strong> </em>conducts electricity</p>
<p>«molten» P<sub>4</sub>O<sub>10</sub> does not have mobile ions/charged particles <em><strong>AND</strong> </em>does not conduct electricity/is poor conductor of electricity</p>
<p> </p>
<p><em>Do <strong>not</strong> award marks without concept of mobile charges being present.</em></p>
<p><em>Award <strong>[1 max]</strong> if type of bonding or electrical conductivity correctly identified in each compound.</em></p>
<p><em>Do <strong>not</strong> accept answers based on electrons.</em></p>
<p><em>Award <strong>[1 max]</strong> if reference made to solution.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>electrons in discrete/specific/certain/different shells/energy levels</p>
<p>energy levels converge/get closer together at higher energies<br><em><strong>OR</strong></em><br>energy levels converge with distance from the nucleus</p>
<p> </p>
<p><em>Accept appropriate diagram for M1, M2 or both.</em></p>
<p><em>Do not give marks for answers that refer to the lines in the spectrum.</em></p>
<p><em><strong>[2 marks]</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.</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.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Carbonated water is produced when carbon dioxide is dissolved in water under pressure.</span></p>
<p><span style="background-color: #ffffff;">The following equilibria are established.</span></p>
<p><img src="data:image/png;base64,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" width="517" height="87"></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Carbon dioxide acts as a weak acid.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Soda water has sodium hydrogencarbonate, NaHCO<sub>3</sub>, dissolved in the carbonated water.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Distinguish between a weak and strong acid.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Weak acid: </span></p>
<p><span style="background-color: #ffffff;">Strong acid:</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;">The hydrogencarbonate ion, produced in Equilibrium (2), can also act as an acid.</span></p>
<p><span style="background-color: #ffffff;">State the formula of its conjugate base.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">When a bottle of carbonated water is opened, these equilibria are disturbed.</span></p>
<p><span style="background-color: #ffffff;">State, giving a reason, how a decrease in pressure affects the position of Equilibrium (1).</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Predict, referring to Equilibrium (2), how the added sodium hydrogencarbonate affects the pH.(Assume pressure and temperature remain constant.)</span></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><span style="background-color: #ffffff;">100.0 cm<sup>3</sup> of soda water contains 3.0 × 10<sup>−2</sup> g NaHCO<sub>3</sub>.</span></p>
<p><span style="background-color: #ffffff;">Calculate the concentration of NaHCO<sub>3</sub> in mol dm<sup>−3</sup>.</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;">Identify the type of bonding in sodium hydrogencarbonate.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Between sodium and hydrogencarbonate:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Between hydrogen and oxygen in hydrogencarbonate:</span></span></p>
<div class="marks">[2]</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><span style="background-color: #ffffff;"><em>Weak acid</em>: partially dissociated/ionized «in solution/water»<br><em><strong>AND</strong></em><br><em>Strong acid</em>: «assumed to be almost» completely/100 % dissociated/ionized «in solution/water» <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">CO<sub>3</sub><sup>2–</sup> <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;">shifts to left/reactants <em><strong>AND</strong> </em>to increase amount/number of moles/molecules of gas/CO<sub>2</sub> (g) <strong>[✔]</strong></span></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«additional HCO<sub>3</sub><sup>–</sup>» shifts position of equilibrium to left <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">pH increases <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong></span></em><span style="background-color: #ffffff;"><strong> <em> </em></strong><em>Do <strong>not</strong> award M2 without any justification in terms of equilibrium shift in M1.</em></span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«molar mass of NaHCO<sub>3</sub> =» 84.01 «g mol<sup>–1</sup>» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«concentration = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3.0 \times {{10}^{ - 2}}{\text{ g}}}}{{84.01{\text{ g mo}}{{\text{l}}^{ - 1}}}} \times \frac{1}{{0.100{\text{ d}}{{\text{m}}^3}}} = ">
<mfrac>
<mrow>
<mn>3.0</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mrow>
<mo>−</mo>
<mn>2</mn>
</mrow>
</msup>
</mrow>
<mrow>
<mtext> g</mtext>
</mrow>
</mrow>
<mrow>
<mn>84.01</mn>
<mrow>
<mtext> g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>×</mo>
<mfrac>
<mn>1</mn>
<mrow>
<mn>0.100</mn>
<mrow>
<mtext> d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mn>3</mn>
</msup>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 3.6 × 10<sup>–3</sup> «mol dm<sup>–3</sup>» <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(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Between sodium and hydrogencarbonate:</em><br>ionic <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Between hydrogen and oxygen in hydrogencarbonate:</em><br>«polar» covalent <strong>[✔]</strong></span></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;">
<p>It was rather disappointing that less than 70 % of the candidates could distinguish between weak and strong acids. Many candidates referred to pH differences.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A poorly answered question, though it discriminated very well between high-scoring and low-scoring candidates. Less than 40 % of the candidates were able to deduce the formula of the conjugate base of HCO<sub>3</sub><sup>-</sup>. Wrong answers included water, the hydroxide ion and carbon dioxide.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a relatively challenging question. Only about a quarter of the candidates explained how a decrease in pressure affected the equilibrium. Some candidates stated there was no shift in the equilibrium as the number of moles is the same on both sides of the equation, not acknowledging that only gaseous substances need to be considered when deciding the direction of shift in equilibrium due to a change in pressure. Some candidates wrote that the equilibrium shifts right because the gas escapes.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was one of the most challenging questions on the paper that required application of Le Chatelier’s Principle in an unfamiliar situation. Most candidates did not refer to equilibrium (2), as directed by the question, and hence could not gain any marks. Some candidates stated that NaHCO<sub>3</sub> was an acid and decreased pH. Some answers had contradictions that showed poor understanding of the pH concept.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very well answered. Most candidates calculated the molar concentration correctly.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates identified the bonding between sodium and hydrogencarbonate as ionic. A much smaller proportion of candidates identified the bonding between hydrogen and oxygen in hydrogencarbonate as covalent. The most common mistake was “hydrogen bonding”.</p>
<div class="question_part_label">b(iii).</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>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 src="data:image/png;base64,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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>Vanadium, another transition metal, has a number of different oxidation states.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the oxidation state of vanadium in each of the following species.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate an equation for the reaction between VO<sup>2+</sup>(aq) and V<sup>2+</sup>(aq) in acidic solution to form V<sup>3+</sup>(aq).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>V<sub>2</sub>O<sub>5</sub>: +5</p>
<p>VO<sup>2+</sup>: +4</p>
<p> </p>
<p><em>Do <strong>not</strong> penalize incorrect notation twice.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>VO<sup>2+</sup>(aq) + V<sup>2+</sup>(aq) + 2H<sup>+</sup>(aq) → 2V<sup>3+</sup>(aq) + H<sub>2</sub>O(l)</p>
<p> </p>
<p><em>Accept equilibrium sign.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>This question is about carbon and chlorine compounds.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Ethane, C<sub>2</sub>H<sub>6</sub>, reacts with chlorine in sunlight. State the type of this reaction and the name of the mechanism by which it occurs.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate equations for the two propagation steps and one termination step in the formation of chloroethane from ethane.</p>
<p><img 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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One possible product, <strong>X</strong>, of the reaction of ethane with chlorine has the following composition by mass:</p>
<p>carbon: 24.27%, hydrogen: 4.08%, chlorine: 71.65%</p>
<p>Determine the empirical formula of the product.</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>The mass and <sup>1</sup>H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectra of product <strong>X</strong> are shown below. Deduce, giving your reasons, its structural formula and hence the name of the compound.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAf8AAALLCAYAAAD38ouYAAAgAElEQVR4AezdCVhU5f4H8O+MQ1qy2IIFYZEbCqllmsvFBDWwbDOXlNS8ehWTck3MssQyTVvMXXGpzNSkNPOPuS9pLtGiKCBuYbF0w6uxmJrDnP9zZoEzw8wAw8xwDvPleXjmbO973vfzOzO/M2cblSAIAvhHAQpQgAIUoIDHCKg9pqfsKAUoQAEKUIACegEmf24IFKAABShAAQ8TKJ/8dbuxqocXVCoVVIGvYXGBzgpJIU4va1rBMlaKecqkon3Y+tLTGHvqmqf0mP2kAAUoQAEFCZRP/qbGd45AeP7/IenoJdOUslddCr5bcRmdOtUtm8Yho4AWhUdm4D+L6kJLEwpQgAIUoIAMBWwnf+8ueGL0BRzclYo8i4brTm/E9E4fYHxnJn8LGo5SgAIUoAAFZC9gO/mjER55rD0wdyc2mR36L8SZvUfQ9In2uN2ye7o0HF3THy8EqgynBFSBaDhhBRanFZQtWbQPOxZEIlI8raD/j0bkgh3YV2Q6vZCHU1vjEN/FeOrBWh1ltRmHKihTsBjxXl4IXLITh2aFIVC/XrFtnyIp+x+z2nQ567BqXKDt9otL69KQsqSsD15DPsT8dLGPWhTu7IkWUbuRhyQsbnkzvOL3oMC4/oYTPsTsgd76ur3iP0PSK37lT60ULMbkQJW+XB50KNzZA4Gq3ui/Zk1pWZUqGpFLjuD3v/Zh+1um/rRC2KyDSDMxmk7fRK/CPtM0s55yhAIUoAAFPFXATvKvA98Oz2I8TiMtT5IgxUP+M3ugXwfL1J+NH9/tifAdXdEz5TrEOwiFkm1Yp34TcS+tQlKxmIGy8eOCweiVMhRTC0v0y5Rk90LHdU8hZv1paKFF8dGJGPH0NVxZdtG8jglf2UhilSuj8tcib/QEjMAy7CwRIBR+hsW6Keg/eJGxbYAuOwEjghPwwZ0bcFJcRvgJ3zVbgLEPTEGCaSdBl4KN/+6Ahzd0Qtf0vyAIuTjR6VNMbCMuo4Pvo9twakd3BKAfRmdcxY053eAHQFx//vo0/PZGDoSSU9g5IKz8zpPNrfBrJK1Mx9U3cyAIxcjZrgFGd8I9oR/j0x678JtwA0Vp3fDQm8MR89UFw+kGdXcM23UDwvZhiLATZZur5AwKUIACFKi9AuJ9/mZ/JbuEld01AqJWCntL/hB2jb9NCEjMEG4YFyrJGC0EvbxL+J9wVtg90VdAwBRh0V8lgvDXImGSppUQsT3fvLqM0UIU+gmjM64KQskuYUVkXbP6zBYWCoTMpU2M6zafY3usEmX+WiTEB0DQDPtKOF4iqcmszcb+6PstWcbYT82k3UKuIAhi/6PwkHk/9fVojP26IRTs6C4EmPosVmVav7EOQ+0WfqZVmi1bYqzL3vqMBY1xM7XTVB1fKUABClCAApYCFXwn9Ef7xx5E/heHcFB/6Nh0yL8NbrPcH/IbjTk3UrG300l8nZCAhIQErF8Qie4tF2OHaVl1CNr08EfetI8x47uvkfB1BvJN8/SvtyDwgYcRsWMxpm/Yh68T/k9yOsBsQclI5coI+Rr4dwxFqLTHPiFo0TVDf11DQcF2bF9bCE2bYIRIl4E/gpr5Q7tmFzYV/I2z+7djBxoj9B7vsjbo+34DuSNaQFM2lUMUoAAFKEABWQqYpbnyLVTD9+FnMX5/MpJOXwN0KdiztD9Gdy6X+gHk4dSSNgj0jUTv/VeR36gRTv1vIhYdjkUUziP9t2IAQWj32g9IX3wz7t44GtN7h6Kh2Tl9Dbw7rMaWkyMQmz8d86Y/iUjfOlBFTkbc1lMWOwqm1jpSxlTW8Ko9noVs43lx7XvdjdcEmK5J8EPIqHPmBdw+ZrGz4fb1c4UUoAAFKFCbBCpI/gD8ohH98j5sOpAF7elvsGLU0+jtXb6Y7tQMjB2tg/+GLNzYOxuLhg9HQkJPBBWdxQkzsQC0fCYBIz7KNZy//n4kJuaNQ9yjs43PFNDAOywWA17ei72CgJLfN2BD5P9hU69B6L/jollNZSOOlJGUbhOMIDUgHh0ISMzADfF6Bcv/3JkY7ceb98rUOEQBClCAAkoVKJ/Fy/XkXuOh/+1ISs5Ex8hgK4e2S1D8eyZOoCXCW90pmX8dRZcLy9VYNqE+AjtPxYvDOiIg76z5hYXGhdRB/dBvbBwGaY4j88LFSt07b1lG/FKvv+DuTK750YOiTJza3xLhPVrDzy8aPcfegvwj6Ug3HgUwNCEbP85sBJX+qnlfNO0aLTmSYWyk2ZX1lSDVFzOcTjDWwBcKUIACFKCA2wQqkak0hkP/B1dj7KHn0K95PSuNq6NfZpBmE5JWfme83ewKcr9/Ca+NSyl7ToBuN1Z2q4eG4pX7plv7ivZjR3I68ocNQGxzGJ4cGPkaEjJMtwfmIfPbjTiMERj5WGPJjoWpGcanDdopY+qk9r3ZiFlvPH1QvBUrRsVj7pAEzOtxB4AmiBg3HkNWT8HA2aZb5vKQuX4oJr3eBv3eelZ/1by6eSziJ+Zi36xFWJwj3gVxBbm7PsRnu6ONy6jh3SgErfTNK0FhfiHM9iVMzYZxRyJvCxatSzPslBTtxpfTZmCO5YMVSstwgAIUoAAFKFB9AVNetF+TeOh/dBY0PTsh3FYJvxcw7ruXMfRIL9xfRzxf3hGP7u6BZ7+Yikka462C6u749+rPsKjBm4gRz+WL99v7jsO02+Zh7fQn0FpdD81HbMaR4Wfxa/cGpffa3781Gt33T8XUoJustNO3UmX0F/yN743Y033QRlyvz2TMbZmEnR89g9bGPqmDpmLesbEY99/+xj4EQlx31+8TsbZDA8O61a3Rfc5O/NB/H5KC6kKl8sbds+5H68Nlyxh2EA5icUtv+A36EhnWsz/ULaZi/pZWaPdWazQU2/TUDhzouwSJ3Z1w2aDZ0QgrbJxEAQpQgAIeK6ASL/+v9b0XH7Jzx1isWXwCv/GK/FofbnaQAhSgAAXsC9j6Hm+/FOdSgAIUoAAFKKBYASZ/xYaODacABShAAQo4JuAZh/0ds2EpClCAAhSgQK0U4Df/WhlWdooCFKAABShgW4DJ37YN51CAAhSgAAVqpQCTf60MKztFAQpQgAIUsC3A5G/bhnMoQAEKUIACtVKAyb9WhpWdogAFKEABCtgWYPK3bVNjc8QnH/KPAhSgAAUo4CoBJn9XybJeClCAAhSggEwFmPxlGhg2iwIUoAAFKOAqASZ/V8myXgpQgAIUoIBMBZj8ZRoYNosCFKAABSjgKgEmf1fJsl4KUIACFKCATAWY/GUaGDaLAhSgAAUo4CoBJn9XybJeClCAAhSggEwFPDz5a1F8NAZdvKZgcYHOPES6NKQsiUSkSgXxvnuVKhqRCzYhKfsfyXJXkHt4AuK7eBmXCUTDCUsx4/tcaCVLcZACFKAABSggJwEPTv5aFKe9hoQJyTjob/lQnSvI+fLf6Ly2PVofzsENQUBJ9kA8eWgwYuYfRJ4xgrrs9/DGI6lIiTmAkyUChJKd+MZ/AaZHLECi5c6EnKLOtlCAAhSggEcLeGby13+r74kOXz2G54b4l98AdEewbWkq/IcMwwcdA6EBoL57KMZNewFd5+7EJn1iL8TZ5DVY1S0G02I7IkyUVIeh4+T5WPJAIpKOXipfL6dQgAIUoAAFZCDggcm/EJnL+6DX+XhsmNoJftaCUJSJzAPNEXLvHfrEb1pEHRCGtkg2JvZ8ZJ/Jh6ZNMEKkiupgNO6qxcFdqaVHCEzl+UoBClCAAhSQg4A0bcmhPW5owy0IDN+OtPeiEKaWnr8vW7UuLw3HtTeVTTAbykDmhYvQ6bKQdexvsznSEe3xLGRaXEYgnc9hClDAvgB/48K+D+dSoDoCHpj8NfAJuxdWDvYbHbUo/j0TJypSFY8OpDt+WZ/hIkLTxYTmrxWtmvMpQAEKUIAC1REQT2fzrwYEBEGwuVZ+47FJwxkUoAAFKOAEAQ/85l+RmgbejULQqqLFfEIQEsp9p4qYOJ8CFKAABeQnwORvJSbihX1tNNavBwBa6i8EVKuDEfzALVZKGyaVuxDQ5pKcQQEKUIACFHCvAJO/NW/xW32X0/oL+6Rn9Q0XArZA6D3eAPwR1Mwf5S7s02Xh15+vw79ZoJ3rCqytlNMoQAEKUIAC7hFg8rfmrO6InqNaI3/0exibXqBfQpfzCT6a/in2TBqFqS3qAfBF016DMGzPbMQlnkC+uJQuDUdmj8GoA+MxtX9zs9sEra2G0yhAAQpQgAI1IcDkb1W9Pu5+bA6SPzyP9LAG+kf31gn6ACtbfoy1Y8IRYCyjDorFpM090OvztmgoPgK4zv3okjEUr+9/GSP9SGuVlhMpQAEKUKDGBVSCvcvOa7x5ntkA8Wp/hsUzY89elwnwfVBmwSEKOFuAX0+dLcr6KEABClCAAjIXYPKXeYDYPApQgAIUoICzBZj8nS3K+ihAAQpQgAIyF2Dyl3mA2DwKUIACFKCAswWY/J0tyvooQAEKUIACMhdg8pd5gNg8ClCAAhSggLMFmPydLcr6KEABClCAAjIXYPKXeYDYPApQgAIUoICzBZj8nS3K+ihAAQpQgAIyF2Dyl3mA2DwKUIACFKCAswWY/J0tyvooQAEKUIACMhdg8pd5gNg8ClCAAhSggLMFmPydLcr6KEABClCAAjIXYPKXeYDYPApQgAIUoICzBZj8nS3K+ihAAQpQgAIyF2Dyl3mA2DwKUIACFKCAswWY/J0tyvooQAEKUIACMhfQyLx9HtE8lUrlEf1kJylAAQpQQB4CTP4yiIMgCGat4M6AGQdHKEABClDAyQI87O9kUFZHAQpQgAIUkLsAk7/cI8T2UYACFKAABZwswOTvZFBWRwEKUIACFJC7AJO/3CPE9lGAAhSgAAWcLMDk72RQVkcBClCAAhSQuwCTv9wjxPZRgAIUoAAFnCzA5O9kUFZHAQpQgAIUkLsAk7/cI8T2UYACFKAABZwswOTvZFBWRwEKUIACFJC7AJO/3CPE9lGAAhSgAAWcLMDk72RQVkcBClCAAhSQuwCTv9wjxPZRgAIUoAAFnCzA5O9kUFZHAQpQgAIUkLsAk7/cI8T2UYACFKAABZwswOTvZFBWRwEKUIACFJC7AJO/3CPE9lGAAhSgAAWcLMDk72RQVkcBClCAAhSQuwCTv80IXUHu4QmI7+IFlUoFlSoakUuOIE0nLWC5TCAaTliKGd/nQitdjMMUoAAFKEABGQkw+VsNhhbFR0fguUeu4ZZ1VyAIAoSSGXj5UDQi5xxFvrGMLvs9vPFIKlJiDuBkibjMTnzjvwDTIxYgscBsL8HqWjiRAhSgAAUoUBMCTP5W1S/gh6RkHBnfF7FBNxmWUD+IHkPa4/IbXyNJn9gLcTZ5DVZ1i8G02I4IEyXVYeg4eT6WPJCIpKOXrNbMiRSgAAUoQIGaFmDyr2IE/LXnkJb3D4B8ZJ/Jh6ZNMEKkiupgNO6qxcFdqcirYt1cnAIUoAAFKOAOAWnacsf6FLKOe/Fwv17oOPdLLMsWEz0AXTpSvs2EdtZEJLSoB+iykHXsb5v90R7PQiaP/Nv04QwKUIACFKg5AU3NrVrOa9bAu8NSrFzYFiGN6mK6qalRK7H3/Q7wF8eLMpGZrgXammbylQIUoAAFKKAMAX7ztxqnbPw4Mwxh37+BXYUlhgv+hFxkPDMPPYd8it1F1f9Kb7iDQLyLoPy/1SZxIgUoQAEKUMBJAkz+1iALvsGGabcifFAvdPcxEQWgRUwsxnzxAWYcvgT4hCAk1PEDJ/o7CMS7CKz8W2sSp1GAAhSgAAWcJWDKbM6qrxbUo0XhDxuxRmu8yl/aI58QtOiaob+Y75I6GMEP3CKdazZc7kJAs7kcoQAFKEABCtScAJN/OXsNfB9+FoM0xgv9pPOLMnFqf0uE92iN2+CPoGb+KHdhny4Lv/58Hf7NAg3XBkjLc5gCFKAABSggAwEmf2tB8OuNYfO9kLl1ExanFRiXyMOptcswt+NQjO58GwBfNO01CMP2zEZc4gnDg390aTgyewxGHRiPqf2bw/GTAtYaxWkUoAAFKEAB5wgw+Vt1DECLF/8Pe6KOIWvUHcaL8qLQJ/9d7Nw6Dv28DWzqoFhM2twDvT5vi4bihXt17keXjKF4ff/LGOlHWqu0nEgBClCAAjUuoBLEK874JysB8Q4AhkVWIWFjakCA74MaQOcqPUaAX089JtTsKAUoQAEKUMAgwOTPLYECFKAABSjgYQJM/h4WcHaXAhSgAAUowOTPbYACFKAABSjgYQJM/h4WcHaXAhSgAAUowOTPbYACFKAABSjgYQJM/h4WcHaXAhSgAAUooMDkfw2X86+CDyfgxksBClCAAhRwTEB5yV+7BcsbNcY9se9jypaf8HPhDcd6zlIUoAAFKEABDxVQXvJX34uWw9WomzgJ7z7VDg+1fQIPTV6Cd3efRraWxwM8dDtmtylAAQpQoAoCCn28rxbX/nsQKds+xtdJm5GYXIBiAKq2z6Fr72cw7JlIPB12J3xVVZCQ0aJ8rKmMgsGm1JgA3wc1Rs8Ve4CAQpO/NDLXUHR+C3Z9vQZbv9yBFYevAfBG3X/F4OnYIYh/piMe8qkjLSD7YX7oyT5EbKAbBPg+cAMyV+GxAso77G8WKgHawnScTvsZZ89m4JcTYuIXjwA8iIdzl2PDkHC0f3omFuUYppsV5QgFKEABClDAQwUU+c1fuHoGpw4nYVfyp/g08TR+Eo/5e3dG6MuDMbh7Nwzq2gx3a88g7esXMWzgLzi/8ADy4sLgpZAg8xuPQgLFZrpUgO8Dl/Kycg8X0Ciu/yWbMb9zb4w7Jl7c1wwNX5iJyX2i0L9ra7T1laR3TXOEdX4YjXEe+d5eUOjpf8WFhw2mAAUoQAH5Cyjvm3/J/2Fxu804/GJ/DH46HI/eebPtxK7Nx/nL3rjP384yMowRv/HIMChsktsF+D5wOzlX6EECyjvnrw7Bwy81QrN77kOHcolfh6tnVuCjEcuRdKkE0PijscISvwdte+wqBShAAQrUkIDykn/JMeybNQ3T1qUiuxzadeT/MB/jV6xF0pmr5eZyAgUoQAEKUIACgDLO+Qup2BLbGU8tv1IWs3N9cP/qslGzIe9BCLpdcv7fbCZHKEABClCAAp4toJBz/gJunHkbY4d8gezbC5G7Pxs/3RmBJsF1UDcvzzyCTSLx0JA4vN+nJRoq5Co/8dym5Z8g8GmFliYc9ywBnvP3rHizt+4VUEjyl6CUbMa8dr0xvsM3yFz6BJpJZtWWQX7o1ZZIsh/VEeD7oDp6LEsB+wLKS/72+1Mr5vJDr1aEkZ2opgDfB9UEZHEK2BFQxDn/kowpGNg3A1iYiA2PpOHz58ZgZobOdrd8B2NC8iQMv01Zj/W13SHOoQAFKEABCjhPQBHJH9eycTY9Eyr9z/cW4uK5NKSn2zkn7p2LfK3zkFgTBShAAQpQoDYJ8LC/DKPJw50yDAqb5HYBvg/cTs4VepCA8u7z1wdHi6vZW/HJT/nQQYA2OxEfDbwdanV7NJ+6CXuLSjwohOwqBShAAQpQoGoCCkz+/+DywYHo1bIXhq/+Gf8TfsLm18Zh/PrbcU/HLOjeGYJeb+/Dhao5cGkKUIACFKCAxwgoL/nrDmBTwtfYG/AfDBvYBr6ZHyPxs6vA029g3feZ+Gzazbi65Et8nHPDY4LIjlKAAhSgAAWqIqC85H8xBT8c1eKmIcPxYUdf5Bzegx24Fbc/2hbtVfURHNoIKD6F9OzrVXHgshSgAAUoQAGPEVBe8tdew9ViQ3y88BvO/CQ+4b8N/tXmbmhwHUWXCwDUQ92byj81z2Oiyo5SgAIUoAAF7Ago41Y/aQfu7IBO/1Jj9Tdf45M2+Ti8thi4Pwr92t6My+mzsGL5r0CLwYhocrO0FIcpQAEKUIACFDAKKPBWv2v4c88ADHh6M/bqjwA8iFZr1uOnARlY3K43xp3tiZ5fLcOmqEaop9Aw8xYnhQaOzXaqAN8HTuVkZRQwE1Bg8hfbfxWXMzfh2y+uoCD6McQ8HAQ/VTZ+WvoxfukSh8Fht6GuWTeVNcIPPWXFi611jQDfB65xZa0UEAUUmvwFaIvSkf5jBjIvWnnSX90WaPvY/Wjipczz/vzQ45uTAgDfB9wKKOA6AeWd88cNFKW+gjF9FuCTs1YSv94qFtNyFiIhUIHdc12sWTMFKEABClBAL6C87PhPMj4etRCf/NEJoVNi8FSADnX/9z/zcPp0RvSt/FEfcxSOUYACFKAABQwCykv+F4/hp8M6aMa+ieR3ohGszCP73P4oQAEKUIACNSagvPv86zfEXQGAyucW+DDx19iGwxVTgAIUoIByBZSX/P36YvCUZtBu2IxFWVdg66y/M0Kiy1mHVeMC9RceqVSBaDjhUyRl/yOp+gpyD09AfBcvyTJLMeP7XPAXhSVMHKQABShAAVkJKC/5l6Qh9XABGp/+ANPua4YGkX0QFhZm/t/pXay8VL1f9tNlJ2B4kx34aWQGBEGAUPgZFuumoP/wNdinM8RQl/0e3ngkFSkxB3CyRIBQshPf+C/A9IgFSCwwLiSrcLMxFKAABShAASXe6leyGfPEh/kcs/Od3/tlzDo3F682dPSiv3PY80pbRKs34bc53RBg2lIKFiP+jqVISd6DvVE34fSytgjZ+Br2fjsMEabdKN1urOjQH5+/k4m9UXeYSlbplbc4VYmLC9dSAb4Pamlg2S1ZCCjvgr86T2PsLzqMdSVfwXZsm3cvwpNblyV+cX1+ozHnxmjjms8h+0w+NG2CEWJK/OIcdTAad9Xi4K5U5EVJdhxc2V7WTQEKUIACFKiCgDRtVaFY7V5Ul5eG49oWCPX9DTsWRCJSpYJK1Qphb32LfUWmY/5ZyDr2t00I7fEsZPLIv00fzqAABShAgZoTUGzyF66m4si6MZg2tB3C9Of4i3Fq7TgkpPyBa9Xy1KL490ycwHkkPTURc1qswU7xnL+wA1/5v4qeYzYhVUzqRZnITOdlfdWiZmEKUIACFKgRAUUmf+HSarz/bEd0ilmAtz79CelHsvD7tcu4cGglpncbht47fq/mDoAYi1xo3lmCbY+KPxUs/gWgRUwsxqyZjrG7LlY7WOL5TFv/1a6cFVCAAhSgAAXsCCgv+QuZ2DNzPOIPPo7+e05g/0x/Y/fuQrcpCYgP2Y5tE9fgy7/tXBBoB6RsViBC7r3DmPiNU31CENLlNDIvXIROHA51/JIJ/R0E+iMK4lEF8/+yNnCIAhSgAAUo4HwB5SX/wt3YsfYS1M8PxdsR9+CW0gf9qOB19wgMH3EfcPIo9p276qCWBr4PP4tBGun9/FaqUgcj+IFbrMwwTCp3IaDNJTmDAhSgAAUo4F4B5SX/K3/ijzzAq/FdaKy6bqFVFz63+gEoQOHf1bjazqc9OsacN1yxL12DeJ7/QCTCW98FNfwR1Mwf5S7s02Xh15+vw79ZIEzHJKRVcJgCFKAABShQ0wLKS/5+TdAsTIV/fjmL40I9C7/zSD1wBvBugdCguhbzqjCqfhBRo59C+HsfYuzRvwwFdWk4sngR5g/6D6a2bwDAF017DcKwPbMRl3gC+eJS4jKzx2DUgfGY2r+5+SmDKqyei1KAAhSgAAVcKaC85F8/Gs/ENkX99XMwdMF3yCoQn+R3BX+e+xHfzn4OLy8UUC/mcfQN9KqGmwbeHVZjS1p3PPRRkOHCvDoDMPzG+9g2vzdaG9XUQbGYtLkHen3eFg3FC/jq3I8uGUPx+v6XMdJPebTVAGNRClCAAhRQkIBKEK82U9rfjWPY9cYT6D07B8VmbfdGvb4zkLgwDoPvdPxiPLMqa2CETzarAXSuUnYCfB/ILiRsUC0SUF7yF87gx1XrsDXwCQy47Qcc3XUIW45fgyo0Em0efgQv3HsISR8Bd88ehn63Ofp435qNMD/0atafa5eHAN8H8ogDW1E7BZSX/LVJeL9Ff0z611c4+emzCDOLy1X89nkH3DvodvQ7sgUbOnibzVXKCD/0lBIpttOVAnwfuFKXdXu6gDKOjQup2BLbGU8tv1IWr3N9cP/qslGzIe9BCLq9Ouf8zWrjCAUoQAEKUKBWCSjkm7+AG2fextghXyD79kLk7s/GT3dGoElwHdTNyzMPSJNIPDQkDu/3aYmGpc8AMF9E7mP8xiP3CLF97hDg+8AdylyHpwooJPlLwmP8Sd/xHb5B5tIn0Ewyq7YM8kOvtkSS/aiOAN8H1dFjWQrYF1Be8rffn1oxlx96tSKM7EQ1Bfg+qCYgi1PAjoAyzvmX64AAbVE60n/MQOZFK3cq1m2Bto/djyZeCj3uX66/nEABClCAAhRwnoACk/8NFKW+gjF9FuCTs1YSv94mFtNyFiIhUIHdc15sWRMFKEABClDAqoDysuM/yfh41EJ88kcnhE6JwVMBOtT93//MO+fTGdG3KvMef/OOcIwCFKAABSjgfAHlJf+Lx/DTYR00Y99E8jvRCOaRfedvFayRAhSgAAVqtYDyHkBfvyHuCgBUPrfAh4m/Vm+c7BwFKEABCrhGQHnJ368vBk9pBu2GzViUdQW2zvq7hou1UoACFKAABZQvoLxb/Ur2Yu3gAXhz3Z84hwD4RnRC0J+nzCPhOxgTkidhOJ/tb+7CMQooSIC3+ikoWGyq4gSUd84fhcjPyMc5PXUeCvdtRLolu3cu8rWWEzlOAQpQgAIUoIAooLxv/h4QN37j8YAgs4sVCvB9UCERF6CAwwKK+OZfkjEFA/tmAAsTseGRNHz+3BjMzNDZ7rTCD/vb7hjnUIACFKAABaovoIjkj2vZOJueCVXhDQCFuHguDenpdi7142H/6m8ZrIECFKAABWqtAA/7yzC0PNwpw6CwSW4X4PvA7eRcoQcJKO9WPw8KDrtKAQpQgAIUcIUAk78rVFknBShAAQpQQMYCyjjnL2NAZzRNPLzJPwpQgAIUoIC7BJj83SVtZz2CYH7xIj5WO/AAACAASURBVHcG7GBxFgUoQAEKVFuAh/2rTcgKKEABClCAAsoSUGzyF66m4si6MZg2tB3COr2LlZeKcWrtOCSk/IFryooBW0sBClCAAhRwq4AiD/sLl1bj/edHIX7bVSNWO/x+7TIuHFqJ6bGncfSrZdgU1Qj13ErJlVGAAhSgAAWUIaC8b/5CJvbMHI/4g4+j/54T2D/T3yh9F7pNSUB8yHZsm7gGX/5tfh5dGeFgKylAAQpQgAKuF1Be8i/cjR1rL0H9/FC8HXEPbim9UF4Fr7tHYPiI+4CTR7HvnOmogOsRuQYKUIACFKCAkgSUl/yv/Ik/8gCvxnehseq6hXVd+NzqB6AAhX/befa/RSmOUoACFKAABTxJQHnJ368JmoWp8M8vZ3FcsDyrfx6pB84A3i0QGlTXk+LIvlKAAhSgAAUqLaC85F8/Gs/ENkX99XMwdMF3yCooAXAFf577Ed/Ofg4vLxRQL+Zx9A30qjQCF6QABShAAQp4koAyf9jnxjHseuMJ9J6dg2KzaHmjXt8ZSFwYh8F3KvJGBn1v+IMmZkHliIcK8H3goYFnt90ioMzkL9IIl5Dzwwbs2XUIW45fgyo0Em0ejsCQqBYI0pReBegWRGevhB96zhZlfUoU4PtAiVFjm5UioLzkL/yK4xuL4P34/Whys/LOWlRmw+CHXmWUuExtF+D7oLZHmP2rSQHlZc+SH7Fzchs0bfUY2k1bjcVHsvCnlvf01+RGxHVTgAIUoICyBBT4zf8Mfv7kdSxdvgXLDxse5KtqOwCPPtcXgx8Px1Nhd8JX2Uf9wW88ynoTsbWuEeD7wDWurJUCooDykr8pbkIB8tM2Y/fXHyNpw0FsPKEF4I26UcPRr/8AvDqkA8K8lLkXwA89U5D56skCfB94cvTZd1cLKDf5S2W0ecj6YTm++OgjzEi6jGLEYlrOQiQEKvOKf37oSYPLYU8V4PvAUyPPfrtDQJnZsVRGi2v/PYiUbR/j66TNSEwuQDEC4DewHR70Ud7lDKXd4gAFKEABClDAhQKKzJDC1ZP4ecsUvD+yCe6/KxKPDF2Nuf/tjci5G7HhXAb+u/Y/eNqpyf8KcjY8DC+vKVhcIH1s8BXkHp6A+C5e+vP0KlUgGk5Yihnf50I8CcE/ClCAAhSggBwFlPfNv2Qz5nfujXHHBMC7PZpMmIxZj/fAoK7NXHZ/vy77Pbw5LgVa/x5mMRSnv/FIKs7PP4CT+zsiDGk4Mrs/ukRcwG0X38FoP0XuW5n1kSMUoAAFKFD7BJSX/FEHXhiOwauHYFSvjuh8m4sf41u8FasmLMBPDX2BP6UbQCHOJq/Bqm6vYW9sR4Tp83wYOk6ejyUb++PzoxMxOuoOaQEOU4ACFKAABWQhoLyvpnWewOhflmP14C6uT/zIxo/zY/Giz0eYHetvEbB8ZJ/Jh6ZNMEKkiupgNO6qxcFdqcizKMFRClCAAhSggBwEFPHNvyRjCgb2zQAWJmLDI2n4/LkxmJkhPfduQek7GBOSJ2H4bXUsZlRlVIvio/EYP+1JvP7rU7gvebp5YV0Wso79DbQ1n2wa0x7PQqYOCJDuGJhm8pUCFKAABShQgwKKSP64lo2z6ZlQFd4AUIiL59KQnm7nqX7euciv7hV3xUlY+GQeAg4uRkKQCqctg1SUicx0rc3kb7k4xysnwNu7KufEpShAAQpUR0ARyb/Og5/hZ1OuF/7Gv15KwPS7YzC2Z1P4mfVeh6tnVmHZHAF3V6dnuhRsfHEUPpywA2kdGuh3OMxWwxEKUIACFKCAggWUd1C65Bj2zZqGaetSkV0O/jryf5iP8SvWIunM1XJzKzfhCnK+jMNzWdOw6KX2sDzTX1qHTwhCQh3fwxC/4dr6L10HByhAAQpQgAIuEFBG8hdSsWWktyFZevXHpHMAVvfB/eUS6C24d9AJwDsIQbc7eBeA7gi2J/4C7cGJ6O9Tx5ig/RAy6hyQNwtxDYIQuPwUdOpgBD9wi82QlLsQ0GJJQRBg699iUY5SgAIUoAAFnCrg+FdXpzajgspUrdBzUjxePPEFsm8vRO7+bPx0ZwSaBNdB3TyLa+qbROKhIXF4tUndCiq1MVvdHcN23cAws9mFOL2sLUKm98eijBnG+/cLEdTMH9qNFhf26bLw68/X4T8w0PZRA7O6OUIBClCAAhRwr4Aykj9U8Gr2JhYffhMo2Yx57Xrj5w4T8e3SJ9DMvV6Stfmiaa9BGPbSbMQltse+Ua3grxMf8jMGow6Mx7xNzaEQXEmfOEgBClCAAp4goLz8VOdpjP1Fh7EyiI46KBaTNudj1ay2aPii4fYCzeA5eH3/8xjJp/vJIEJsAgUoQAEKWBNQ6K/6CdAWHsfP+87gwnXzbt11cxaOb7gZDT56EYOqdZ+/eb3uHPPk2908ue/u3MaUsC5uC0qIEtuoVAHlffPHP7h88N94Ycg6bPnVdP+fBb/3y5j1vsU0jlKAAhSgAAUooBdQxtX+0mDpDmBTwgZsye+E0LFjMeJfXoB3JNpOGIn/dKoHIAKR61/BuIbVebqfdIUcpgAFKEABCtQuAeUl/4sp+OGoFurnp2DT3Nl4dXgToPgOdBwxD4nbP8NHjx/G4W+O46yNgwK1K3zsDQUoQAEKUKDqAspL/tpruFoMeDW+C/eqbsKd992HRjiP9N+KofLpiSf73odriV9g1XmLiwGqbsMSFKAABShAgVopoLzk79cI9zYCbpz/AxcEFW6+6z60xJ/4NfcvCKgDzU3iw31ykH1R/B0A/lGAAhSgAAUoYCmgvORfvxt6DLodus9noc/7B5Ef1BFdwrLxW9IXmLV7LTZ9fQbwbowmd91k2VeOU4ACFKAABSgAQJG3+gn//RgfvDgGk67Mw95vY9B8Z38M6rsFe4vFmDZCw4S1SHkzHPeolBljT77FyZP7rsyt1XWt5rbgOlvWTAFFJn992LR5SE+tg8ZtG6IeruJy5iZ8+8Uf+O+/nsGgbo3hr9DEL/bNkz/0PLnv/DgyF+C2YO7BMQo4U0ARyb8kYwoG9v0GaZXtue9gTEiehOF8yE9lxWSzHD/wZROKGm8It4UaDwEbUIsFlPGQn2vZOJuejvTKBsI7F/mGp+1WtgSXowAFKEABCniMgCK++XtMNIwd9eRvPJ7cd0/bzivqL7eFioQ4nwKOCyjvan/H+8qSFKBALREQdwz4RwEKOC6g2OQvXE3FkXVjMG1oO4R1ehcrLxXj1NpxSEj5A9cc92BJClCAAhSgQK0XUMY5f4swCJdW4/3nRyF+21XjnHb4/dplXDi0EtNjT+PoV8uwKaoRxCf9848CFKAABShAAXMB5X3zFzKxZ+Z4xB98HP33nMD+mf7GHt2FblMSEB+yHdsmrsGXf/Ph/uah5hgFKEABClDAIKC85F+4GzvWXoL6+aF4O+Ie3FJ66k8Fr7tHYPiI+4CTR7HvnOmoAENNAQpQgAIUoIBUQHnJ/8qf+CPP8MM+jVWWP95TFz63+gEoQOHfOmk/OUwBClCAAhSggFFAecnfrwmahanwzy9ncVywPKt/HqkHxGf7t0BoUF0GmQIUoAAFKEABKwLKS/71o/FMbFPUXz8HQxd8h6yCEgBX8Oe5H/Ht7Ofw8kIB9WIeR99A8df9+EcBClCAAhSggKWAMh/yc+MYdr3xBHrPzoH+t3xKe+WNen1nIHFhHAbfqZwbGazdsywInnnBIh/sUroxe/yAvW3B3jyPhyMABSohoMzkL3ZMuIScHzZgz65D2HL8GlShkWjzcASGRLVAkKb0KsBKEMhvEU/+YPPkvstvS6zZFtnbFuzNq9lWc+0UUIaAcpO/Ld+i7/HthMPImz0ew/jDPraUZDudH+qyDY3bG2ZvW7A3z+0N5QopoEAB5Zzzv3EC38+PRp/WXlD5PIymE1dhTY7kWX7C//Db7hGI7RKBx1ecxW/XPPOwuQK3QTaZAhSgAAXcLKCME+PCORx+53H0nJ5tPMefgnMfpmBI6hX4bH4JT5Vsw/rJwzByyR8o9g5H2w8HoZ9/HTdTcnUUoAAFKEABZQgo45t/fhI+/SAbV578ACt+vwLdjV9xYnFrNNi1ErPWrsY7vZ5GzJJiaPu+h/ePbsah8eEI81L2eX9lbD5sJQUoQAEKKFFAEef8tUf7o0XHI9B+vAfnhzaFfo+lYDEmt4zDnDwA3j0RmTgHn/S7H/co/GI/cSPy5POZntx3JX6AuLLN9rYFe/Nc2SbWTYHaIqCMw/567ZtQv35dQ+IXx+v7w/8WMfH3w+D9ifi0bQPwu35t2SzZDwpQgAIUcKWAMg772xPo1QfjHmTit0fEeRSgAAUoQAGpgPKTf10v1OVXfmlMOUwBClCAAhSwK6Cgw/4luH7pv0hLK9R3qIFPNgrFJ/te/QvnsrOBgoKyjta7C40a3w5f7hSUmXCIAhSgAAUoYBRQ0AV/SThX6bDFYlrOQiQEKmjfRtI3T76YyZP7LtkEOFjBha/cTriJUKB6AorIjirfJmgbGopK/06fbzAa1ePX/uptGixNAQpQgAK1VUAR3/xrK76tfnnytxpP7rut7cFTp9vbFuzN81Qv9psCVRFQ/gV/Vektl6UABShAAQpQoOy2eVpQgAIUoAAFKOAZAvzm7xlxZi8pQAEKUIACpQJM/qUUHKAABShAAQp4hgCTv2fEmb2kAAUoQAEKlAow+ZdSWAwU7cOOBZGIVKn0P7SjUrVC2FvfYl+RTrLgFeQenoD4Ll7GZQLRcMJSzPg+F1rJUhykAAUoQAEKyEmAyd9aNHQp2PjSE+iV0hcjs69DEASUZE/E8Ix+eHTc10g15n9d9nt445FUpMQcwMkSAULJTnzjvwDTIxYgsUC6k2BtJZxGAQpQgAIUqBkB3udvxV13Kg6PtTyKf7Zvw96oO0qXMJ9+E04va4uQja9h77fDEGHajdLtxooO/fH5O5lmZUsrqcSAJ9/D7Ml9r8Sm4VGL2NsW7M3zKCR2lgIOCijiCX8O9s3hYuoWi7BdsFU8F5kXLkIHL2SfyYemTTBCTIlfLKIORuOuWhzclYq8qG4IsFUNp1OAAhSgAAVqSECatmqoCUpbbTh6dwmGWpeFrGN/22y89ngWMnnk36YPZ1CAAhSgQM0JMPlX1l6Xgq9nfYo9wwYgtnk9oCgTmem8rK+yfFyOAhSgAAXkI8DD/pWKRR5OLfsPnjv/CuatfwKtuctUKTUuRAEKUIAC8hRg8q8wLnk4taQnWo1ph5HHx2P03TcZSviEICTUcT7xgiX+UYACFKAABWpCgN9h7anr0nBkVg9j4v8Qi0L9ypZWByP4gVvKxi2Gyl0IaDFfvH3Q1r/FohylAAUoQAEKOFWAyd8Gpy5nPqZ0fQCddjyN11MtEr++jD+Cmvmj3IV9uiz8+vN1+DcLhL+NujmZAhSgAAUoUJMCTP7W9IvX4YMBE/HuuVhM+ywBCS0l3/hLl/dF016DMGzPbMQlnkC+OF08UjB7DEYdGI+p/ZvD8ZMCpSvhAAUoQAEKUMDpAkz+5UgLcfrzNxB/UAvkLcL0RnWNj+41PeZXBa/4PcgTb+kPisWkzT3Q6/O2aCg+BrjO/eiSMRSv738ZI/1IW46WEyhAAQpQQBYCfMKfLMJg3ghPfnqZJ/fdfCvgmL1twd48ylGAAhUL8OtpxUZcggIUoAAFKFCrBJj8a1U42RkKUIACFKBAxQJM/hUbcQkKUIACFKBArRJg8q9V4WRnKEABClCAAhULMPlXbMQlKEABClCAArVKgMm/VoWTnaEABShAAQpULMDkX7ERl6AABShAAQrUKgEm/1oVTnaGAhSgAAUoULEAk3/FRlyCAhSgAAUoUKsEmPxrVTjZGQpQgAIUoEDFAkz+FRtxCQpQgAIUoECtEmDyr1XhZGcoQAFPExB/54B/FKiqAJN/VcW4PAUoQAEKUEDhAkz+Cg8gm08BClCAAhSoqgCTf1XFuDwFKEABClBA4QJM/goPIJtPAQpQgAIUqKoAk39Vxbg8BShAAQpQQOECTP4KDyCbTwEKUIACFKiqAJN/VcW4PAUoQAEKUEDhAhqFt79WNJ/36daKMLITFKAABRQjwOQvg1AJgmDWCu4MmHFwhAIUoAAFnCzAw/5OBmV1FKAABShAAbkLMPnLPUJsHwUoQAEHBXgU0UE4DyjG5O8BQWYXKSBXASYnuUaG7artAkz+tT3C7B8FKEABClDAQoDJ3wKEo+4T4Lc+91lzTRRQmgA/H1wbMSZ/1/qydgpQgAIUoIDsBJj8ZRcSNogCFKAABSjgWgEmf9f6snYKUIACFKCA7ASY/GUXEjaIAhSgAAUo4FoBJn/X+rJ2ClCgCgK8yKsKWFyUAtUQYPKvBh6LUoACFKAABZQowOSvxKixzRSgAAVqoUBVjvxUZdlaSFXtLjH5V5uQFVCAAhSgAAWUJcDkr6x4sbUU8FgBftPz2NCz4y4QYPJ3ASqrpAAFKEABCshZgMlfztFh2yhAAQpQgAIuEGDydwEqq6QABShAAecK8LSPcz2Z/J3rydoUKMAPFfcFjdbus+aaKGBPgMnfng7nOV2AH/5OJ2WFFKAABaoswORfZTJpgSvIPTwB8V28ICY1lSoQDScsxYzvc6GVLsZhxQgoYedECW1UTMDZUAp4qACTfzUCr8t+D288koqUmAM4WSJAKNmJb/wXYHrEAiQW6KpRM4tSgAIUcK0AdyJd6yv32pn8HY5QIc4mr8GqbjGYFtsRYaKkOgwdJ8/HkgcSkXT0ksM1s6C8BOT+ISltn3RYXoqubY0n9duT+urarcaza2fydzj++cg+kw9Nm2CESBXVwWjcVYuDu1KR53Dd7i8oxw8Utqn624EcDOXQhupLKqMGpVkrrb3K2Aoq10pp2qpcCS5lENBlIevY3zY1tMezkMkj/zZ9OIMCFKAABWpOQFNzq1b4mosykZmuBdo61o+K9ngrmu/YWu2Xctc6peuRDptaJ50mHTbNd8WrdD3SYdO6pNOkw6b57n61bIN0XDoststy3N1ttWyDZXvsjTs6ryb66M51OsvFsh539sG0Lss2SMelw+LyFY2b6lTKqyAINdZUJv8aorcXdHEDl863N16VeWJXpcvbGrZcznJcWs5ynuW4vWUt51WlrKuWrUqbLJetyri9Ze3Ns+y35bi9svbmVaee6pS11yZH51m2x3K8KvXaK2uvHstyluP2ytqbZ1mP5bi9svbmVaUey2Utx+2tx968qtTjqmUt21eV9VgrK5aX6x8P+zsaGZ8QhIRy38lRPpajAAUoQIGaE2Dyd9ReHYzgB26xWbrchYA2l+QMClCAAhSggHsFmPwd9vZHUDN/lLuwT5eFX3++Dv9mgfB3uG4WpAAFKEABCrhOgMnfYVtfNO01CMP2zEZc4gnki/Xo0nBk9hiMOjAeU/s3h7NOCkjP/4urkY5Lhy3nWeuadHlbwxXVIy1nbVnpfOmwZXuszZNOkw5bW4+0voqWlc6XDkvrsLUO6fK2hi3rsVaXvbLSeZZ1Wc6zN245T1qX5Tx745bz7NVj2VfLspbj9uqSLisdtlyHtA5r8+yVtZwnrcvaPOk0W8PSOkzD0mUt22hvnqm86bWiZaXzpcOm8qZXy3n2xi3nmeowvVrOl45Lh8XlLcdNdVibJ11WOmxt2crWY1nWsl579VRU1l5d0nrlOMzkX42oqINiMWlzD/T6vC0aio/3rXM/umQMxev7X8ZIP9JWg5ZFKUABClDAhQIqQcm7Li6Eqcmq5XjVKNtU8RZBIxpVLFDxEtyOKjYSl5Cbk9zaU5Eik39FQpxPAQpQgAIUqGUCPDZdywLK7lCAAhSgAAUqEmDyr0iI8ylAAQpQgAK1TIDJv6YDWrwO74bcjsgdFy1acgW5hycgvouX/tyWShWIhhOWYsb3udBaLFn9US2K0xZj+bhA47pUUAW+gP7JmYa7GEwr0KUhZUkkIsWLG/X/0YhcsAlJ2f+YlnDiqxbF6XMxe6C3cV2tEPbWt9hXZP6DCbqcdVglbXfkZMR9dgRp5os5sV2mqq4gZ8PD8PKagsVmP9/szrgBulNxiC6NhykuKqiiV2GfycCtcTPc9WK2nUROxtgj5tute+KmReHOHgi05mOc5hW/x/gDXO6Nm3hnUEVG5ZZRufj9ZvYZUJPvt2z8OLMRymJjes8BldpuLG2d4qZF8dEYdCn3fje1zc58l7THtN5qvIoX/PGvhgSKkoUVLwULnfGQELE936wRJb9PE4ZpugsRiw8LJ0sEQSg5KRyeGSpoNK8Ki/4SJzjvz7Cu5kLozAOGdQnFQs7BocJgTXOh9YYs4YZ+VcVC9hftBU34JGHM4Rz9tJLsj4UPBtQXNJN2C7nOa46+ptL+r8sQ/hSnFO4SksYGCIj4UNhQZOx/yQ/CV4N8Bf/xnwgbfr8uCKXtblXO08nNE/TtC4CAgClm8ShttxviJgg3hIId3QVN95XCXpubhHvjJpT8IHw5wF8IXZJqiJuQK5xa112IQD9hdMZVQxhqMG6GBvwupLwTZLYtuTduhvVrhn0lHDdtyvr3e0+h35HLxk3VvXEr7b/p/Sa+l7Y/Lvj7z3Hz+y1XyFgcIXR/WFP+c6VS240r3G4IRScnCRM7+5Z7vxuCZW++K9pj3ESq+SLeg8k/twsUCzmHxgsjQ2cL3x+OFaLKJf8CIXNpEwFRFh/qJbuE5e1uc3JiM67LIokJgsX0kl3Cisi6QkBihnFnwIBWkjFa6O70HZKzwu6JvuXe/OK6pFaGcUlS0TfJ0G5X7JCUbiZFycLyfrcJbdpYfhi4M25ia6w7lbZTHHBr3Iw7I+W2B/N21ljc9DA3hKIjA4UI9JIkWjfH7a9FwiSN5Q6quZF742ZYt7XPG+l73tVxK8leKywb3F7od2ifsLJ7+eRfqfU7e3svOSn8sLi7EDp9j/CD+Jls+TlZ4Xx3fm6avfMrHOFh/2ocNXG0qO5UPKKfro82O8ahY4M6VqrJR/aZfJR7RLA6GI27anFwV6rxUKWVolWe5IvmsWch5M7EaGvPJsg7i7S8fwDxVwwPNEfIvXeYPbxIHRCGtkhG0tFLVV6z7QJN0O39AtyY0w0BNhfSovj3TOzRNEFYwE2SpW7BXY2Dgbk7scnscLxkkWoNZuPH+bF40ecjzI61fIajO+MmHl6vxNMk3Rq3C/hxewow/lH0NtuWpPGsqbgZg16chCWvJOHgpAmY16GBcaKb42Zn+yt9Yqg742b8eXJrnzf3ta2LvC8P4aBO59r3m243VrafhQ2DN2F9B2snNiu53TjVrRCZy/ug1/l4bJjaCX7l4lbRfLj5c7NcA+1OYPK3y+OamerAMVh/bjpG3y1NWpJ1Gd+Mkilmg6UfEGZTXTQS1RP9mteDLi8Nx7U22osMZF646IJrEcr6pMv5BB9N/xR7hr2GeT3uAPA3/jifBa2/qmwhyZC/9pxhp0UyrfqD4nm9eIyf9iRen/4U7rN897g7bvoPuntxa/ZKDA80nu8Xr9VYc7T0mge3xq10Z+RmXN4aV3q9iteQDzE/vcDIXxNxM0X+CnK2zsVrR0bg9THhZTuW7o6b31PoP/0yDn7xHVKN12XocpLx7eq26PfWs4hQo8bfbyYx/euJs0gvuuba95u6NTrv/B67Hr0blm8rQ1sqt904d3u/BYHh25H2XhTC1Naua6povsziaBZU2HC2WIijThbwDUGYj/VNXL8m8UM93drer5PbYac6XfaHmP1SHbT+T3eEqw173SfsLO+yWbrdWNXDC3WC/o2J+/ug3/BOCNXTGb6tuWy91iouTsLCJ/MQcHAmEoKs7HS4OW6GD7pgBISPw8pcQf8YVSFzCPr/0BeRc44iH4Zva26Lm35npATX3x+KHnuewQv7b0AQbuDyqxfwQ9tXkaC/MLQG4maKpe4Itif+Aozvi9ggyY6sm+MGBKHdq59g2YXn0KaOYaetTtC7+PydJVirPxrh5vebrR8pM9spKtQfjTRROv/VH2FhPnaqrcx2U6I/OuG87V0Dn7B77fxGS0Xz3RxHO3rWZtnJQNYW5zSPECjeilWT5mLLuAVY2+des8P8bu+/ujuG7RKTSDFyPrmIvH9F4aGkCzBdyO629uhSsPHFUfhwwrtYVHq42G1rt7oidYtF2C5s139bKv0dCZ+uiHoyBJopHyDh1FWr5Vw5UeWvxaXgyVg751GE6T9dNPAOHYNhL63FO/MPwpknh6raD93pjfhidzR692lb9q2/qpU4Y/nidZjd9ll80Pdn/CkYd9qKVuCtbY+gzVLxd0Lc/bHcBBHjxmPI3JkYvDPHcARPl4ajs+Kx8qLtXy51BgXrqDkBd29lNddTJa3ZJwQhoaUf5+5tefFWrBjRHy96zce6N3uUfYA3CkEr97bEYm31ERg1H29M/A2pK3bjO93d+l9VtFjIRaNXkPNlHJ7LmoZFL7W3/U2gJuNW2nMNvPWxOo/0364ah0tnumWg3LljlP0CZqpb4ybtbiHO7t+OHVHPYnR707l+43y3xk2LwsMrMTVtNOIGhpVtS95R6D+qNU6/vBZJBXB73NRBUzHveC88uioEXuJtkN1XY233DVjxoj/QqilCfRq48f0mjZtp2LANmcasv9Zxu5v1dpimmt6LpnF5vTL5yysehtbYOgxnbGv5D1fndEI8r/6hPvEvwrZFg9FdcmpCvLCvjcbaeS9x3S3LXQjonBbZqEV/DrKO/sI+Tb5gdaH8chcCWl2schONh4u1Byeiv08d43MH/BAy6hyQNwtxDYIQuPwUdDUUN3udcGvc/KIRHeNrrzkAbnJf3KQt0aXgYNKF8hfRisu4NW6GiyLLX6tiSBTdtDv1F8+6NW56J/EIzXhMXldsOH20dzbmdQTySi88rqG4lcbQcCFvRe9397uVNtDqgNzaI20kk79UQzbDZd+UMqXHt0svqAos+8bglDZfQe6OXuge9BreG9g/2wAAIABJREFUDfgUOy0Sv34V4rejLqfLXdhnOO/cAqH3eDulJfpKjOf5rT3kQ5yvGdQDvf289Hv53cpd2Ge8MKhbM4RKdl6q1bjSUw/GQ7T6Q7UFyFzaBAiYgkV/ZSN3RAuoJd9wXR+3Qpxe1hSqwNcsHjJkOM+4R/Mo+nW4DXBn3HAXQh4OsXKnRT5+z7wM/8gwhKnV7oubJOiGQ/5tEN6jtZVD/u58v92LdtHtUT6J1WTcDNtSufebLgvn92uMZjUTt7IQmnaOLC/ktXi/u3V7L2udzSG5tUfa0ApvBuQCLhUw3Ltq6yE/zcseluKyh/yY7nuGIH3oSPlOGx9WoRkmjE77Sz/bdQ/5MbQpXLIu/QN8tj8umE0TH/oxpL6gGfyJsKtQfFqK6eFElvdQl+9N9adYPAfBWKHhYSnuiJsgCEVrhXfb+JZtI2IbxGcQPOtf/uFMEkvXxc3Qptmd6gr+s44YH/JjiMnzdUcJ0/QPYhKfPeDuuBmePxAgfdCQxQbg3rglC0u7NxEi5m8X9uq3W2PcBviauekfquWmuBk+h6KE7juyDc/x0N+/HiEE9EsqfRCR2+JWssvqff6VW7+rPqesv9/LNiNb813VnrI1OzrEh/w4KuekcraSvyDkChnJo4VJ4RrxuLb+XzN4jjDte8PT9Zy0ev1DYMQHapjWUf5VsmNSuFfYPj9CiDC2B7hfCJ2+wfh0Pae1yFhRsZDz/TTh3QH1jW0LEPzHLxcWnTTseBgWEp+stUhIFJ/8Z2pTwBCh32dHjE8qdHabpPXZerO7KW7GppT8vkHYMD1UCDD1PyJeGJ1sfCqiqblujZv4NMa9wjZJmzSDPxDmGXcYDU1yd9wqTv5ue7/Ziom43f7fKeMOk3Eht8bN8OCxss+bqLKni5raLLgpbraSf2XX7xI3W+93E46d+S5pj2m9jr/yJ32lh0E4TAEKUIACFPAAAZ7z94Ags4sUoAAFKEABqQCTv1SDwxSgAAUoQAEPEGDy94Ags4sUoAAFKEABqQCTv1SDwxSgAAUoQAEPEGDy94Ags4sUoAAFKEABqQCTv1SDwxSgQA0KiL+aGIMuXlMsHlxUg03iqilQSwVq6AHytVST3aIABRwX0O3HF1M24tziYxjpx+8ljkOyJAUqFmDyr9iIS1CAAi4X0KJw9yyMujETawc2r9lfknR5X7kCCtS8AHevaz4GbAEFaoWA7lQcolX9EZd+DkdmhSFQ/HW4wBcQcygPOl0aUpZEIlKcpopG5PpTyJf2ujgJSyalIHTMM3j0cJShrH5Zw+/dq/TDgfofUNJKy3GYAhRwSIDJ3yE2FqIABcwFDD9McwLnsSkxGT88fQi5wu9IeWkP1r3+Drp3X4bkiK+xVyhG9heXcXDwp0gqMP1q1RXkbJ2LqXfMxbw+jdHg0V3INf3OvfhatBZzwjVARCymPt6YRwXM4TlGAYcEeNjfITYWogAFzAUMP1WbF5GADTNeQj9v8XuFCr631wUyga4/vI+EoJsAaOFzqy/8Tb/G6FcPKPgU856/hvDkpxBh+XVEl4rdCRMRf24IRu8ah9F3i3XwjwIUqK4Ak391BVmeAhQAjD83HRDzGHrrEz8AXQoOJl2AZtCziNUnfhHKuJMQNRf9mtcDUIjT6z/E3CFz8FOPOywk83Bq2WAM/qAVuu94C/NC/Szmc5QCFHBUwHI/29F6WI4CFPBgAd3pjdiw936E3HtH2WH5okyc2g/4NwuEv8lGl4WsY39D0yYYIWpAl/0hZr/UDL1HdkNrs0+jK8jd8R+8OFqHW5e8j3WP3l1Wr6kuvlKAAg4L8Ju/w3QsSAEKGAQM5/v3aB7FvA63laLo8tJwXNsbvbsElyZucSfhi91tEB7fGgHIxo+rV2L1+E/xW4cGpeXEUwPF6a/h1V47kPZKMvaObFW28yBZioMUoIDjAmb72o5Xw5IUoIDnChgO5Wu7NUOoj+kjpRBn92/HjoCmCAswnac3XRTYGKH3eEN3ahZef70TRg7rjAAJni57Bsb2mI91A1dg3Zs9EGaqUrIMBylAgeoJ8Jt/9fxYmgIUMJ3vH9gZ4aWJOh/ZZ/KhGdQDvUsf2PM3/jifhbyoGPRrXoC9r6zHL7O2Yk0L8dy/8a94HT4Y+A5WIQ7TZg5E99KdCdMCfKUABZwhUPpWdUZlrIMCFPA8Aavn+wu2Y9u8vy3O9xsvAGzTCM1SxiNhwXMYPehBySH9Qpz+/A3EH9QCeYswvVFdGO7vF+/15z3+nrdlsceuFFAJgiC4cgWsmwIUoAAFKEABeQnwm7+84sHWUIACFKAABVwuwOTvcmKugAIUoAAFKCAvASZ/ecWDraEABShAAQq4XIDJ3+XEXAEFKEABClBAXgJM/vKKB1tDAQpQgAIUcLkAk7/LibkCClCAAhSggLwEmPzlFQ+2hgIUoAAFKOByASZ/lxNzBRSgAAUoQAF5CTD5yysebA0FKEABClDA5QJM/i4n5gooQAEKUIAC8hJg8pdXPNgaClCAAhSggMsFmPxdTswVUIACFKAABeQlwOQvr3iwNRSgAAUoQAGXCzD5u5yYK6AABShAAQrIS4DJX17xYGsoQAEKUIACLhdg8nc5MVdAAQpQgAIUkJcAk7+84sHWUIACFKAABVwuwOTvcmKugAIUoAAFKCAvASZ/ecWDraEABShAAQq4XIDJ3+XEXAEFKEABClBAXgJM/vKKB1tDAQpQgAIUcLkAk7/LibkCClCAAhSggLwEbCT/K8jd0QsN+3yFNHm1l62hAAUoQAEKUKCaAuWTvy4NKUuewPPRW5Hvrapm9SxOAQpQgAIUoIDcBMonfwDXC97Gp4f6oW6JYGyvFoU7eyBQ1Q6ROy5a6YNpfn/EnbpmZb446Rz2vOIHleoJ9D/6l5VljPOjV2GfTpxdiNPLmkKlUkFlc72A7lQcos2WMbVFLGftvxXC3voW+4r0K7HSDjlOysOp5MHosSQDWjk2j22iAAUoQAFFCZRP/uowhL8ajsDyc5zUsWQkvfoxkoorm3wfQqdOJ3FwVyryyrWgEGf278aPzW9DQLl5DyFiez4EQZD830BReh/02vkUHh33NVIr24Rydbt5QsEmrHpmPdI1PBLjZnmujgIUoECtFHBZirep1TkC4QfjEbcwBfk2F5LOaISuPVoDc3diU4FFttal4LsZj2P+m62lBewMa+DdciqmvtkV/qvWY9lpW0cp7FTBWRSgAAUoQAGFC7g/+Xv3xdTVD0Iz5W3EWT38bynqhcLo8RiPZCQdvWQ2U3d6I97q3ROPNKxjNr1yI+eR/luxjUW1KE5bjOXjAstOHURORtzWU8YdFtMpikXYduDfeCHQeHohcjLGHsk1PzSvv4YiEpGmUxBm9ZhWfwW5hycgvouXYX2BL6B/cqZhXQWLMbllHN7TapE3siW8Al/D4oI/DKdQIidj0VthCBTrDnwNn12Yj8mBKnjF75EcJTGdBjGdsjG1/V189k2MRduzUZA+F7MHepe2I+ZQXml/DKdYAhG4/FTpNFMP+EoBClCAAsoRcH/yx82o2281Fg7ZV/nD/7f/C9Ev5yDzwkVJ0inEmb1H0PSJB+BXJe+/8cf5LOShMULv8bZesjgJi56fgo9abMef+tMGxciZchLpvd5EgvSahh0v4cnl7dAz5ToEIRenYn9CaqeRiDHt1OhSsPHfHdD5cF+MzBaXuYGiRddQ9PTT6JF0wdiXK8jZEIl2ndOQEncCfwolKNrVAPWeecqwjN9ozM5YhEkaDQISM3AjdyZG+10xtHvfVixuuB7HhWv4be0Q9G6gsd4fa1N3zMfEfX3w78wSCCXHseuhzzC/UyPc8e5NuOf9S/r+ZLxxDEld38aM7H/0NahbLMJ2IRe5I1qgCmuytnZOowAFKECBGhSwmfw1HTbg2po+CDNr3E/YF+1f9m3Y9G1W5QW/qN2Sb5tmhcqPqFvgmXdewbBKH/6/He0fexD5XxzCQdORf/GQ/8we6NfhtvL125xyBbnfj8U7089BM2wAYpvXs7qkLvsg9hyPRkREM/jrl6iPwKhk7BU2YFELSZmAOLw+cwQG3n0TgACEDFiGNyYewKavfkYedCjcPQUvrX4cI18bblxGA+/QD7BwayOkxyxFongaQ3cE2xN/Qf6kyVg7oAX8oYZ36BgMHfsHUlfsLuuvtZYGPIm4gWHwR100imgBG7sy1koCAUORMK03InzUgDoU7aNDEYB+krYGoHlkOLppf8D+9ELrdXAqBShAAQooUsBm8rfeG2sX0YkX1N1AwY7uVi66s16LOFUdNAlvfV7Zw/914Pvwsxi/PxlJxvP0hkP+UejtZ6sL1nZUvHF3Px2uzjmCY8ufRWsbRdVB4egRvgmJq7Zg31fvYnFagfWOtGqLiEAx8Zv+/BHUzB/aNbuwqeBP/Lg9BXkBTREWIF1GA+9GIeim3ak/jSH244vd/vBvFmjc0RDraoJu7xdA2D4METbaaFojXylAAQpQgAJVFajB1FIfd/ddJDn8f4v9tvtFI/rlfdh0IEv8To2zO9PR6fmHEADToQDL4tIdFfEq/2mY1Kku/Ad0Q7+IBxFmr+feAzFp605sbrEbWz96A3H3N4BKFY3IBTsqd4tg3lmk5RkOlSNvFuIa1DE7WlKn5WLssGyuu8dbNUWo+K2ffxSgAAUo4HECNfvpr24vOfx/FNbu/i+LyL2lh/5TtCnY/UkMRrdvUDbb7pB4lX8C3t3wKp5cPxQxr63D7oru8/eJwOPDlmLOgRsQSk7iyGd+uGdWNB59ex/MLzu0smLpt/2oldhbIr3d0DT8I/ZG3WGlMCdRgAIUoAAFXCtQs8nf7PD/DLx/6Lqd3mpKD/1v+XwNVvynC8Kr2HrxVMPbnzyO8M+mYOCiyt5qKDYyDB0GzcILMb7QHs9Cqs54dv3EWaSb7UTkI/tMPjSDeqC3X0O0i24PzZ4fsS/XeBRA3zstio/GIFJleCCSuvmzeK57PvLP5EpufTQ94MjeQ5OsUPmEICSUl+JZkeEkClCAAhSQCFQxfUpKOm3QdPj/FA4ftpf8AegP/R9A4iQdOkYGO3DFuXjh3jK8904d5Nu51dBwS1s0Itebbu3TojjjM2zdBbT+T3c8ojbeIpj3CRKmbzKeCsjDqSXPInre83h9TDgCoIZv91n4ImY13nltOdbliDsAYj0z8Nb4jUibNREJ4sWD6o7oGR+F8PdmY/DOHP0dALqcT/Dxp9nwNy0jJvUuhtsZ1YX5KLR1pkPdHuH97oV2zeeYkS5ep2BY34y39lf+YkynxZUVUYACFKCAXAVkkPzFb9bGw//lH9Nn4SYe+m+Ny627op+NK/UtClgZDUK7MXMwJ3w7kl6dh8X6pGy+mLrFHHz8fSf03NwODfV3NHjBp/uv+O2VHVjb516UokUMxqQ2X+DjEPGcfiBaHX4BHxyfhYQg4wV+6vZ4duH/Ibn9l0gMqguVylBP1uj92BvfQXInwQZ8figMbd8KhpdKhTpByTgyeF/ZMuqOeOzV7ggZ2RJ1/OIw5bSXeYNLx3zRPGYFto06gk1h4nUK96Dx8vvw9OuDEFW6jOMDvM/fcTuWpAAFKCAnAZUgPv+Wf1UUEB+U0xbdT8zF3m95RX4V8bg4BShAAQrUsEDpl9gabgdXTwEKUIACFKCAmwSY/N0EzdVQgAIUoAAF5CLAw/5yiQTbQQEKUIACFHCTAL/5uwmaq6EABShAAQrIRYDJXy6RYDsoQAEKUIACbhJg8ncTNFdDAQpQgAIUkIsAk79cIsF2UIACFJCpgEqlkmnL2CxHBZj8HZVjOQpQgAIUoIBCBZj8FRo4NpsCFKAABSjgqACTv6NyLEcBClCAAhRQqACTv0IDx2ZTgAIUoAAFHBVg8ndUjuUoQAEKUIACChVg8ldo4NhsClCAAhSggKMCTP6OyrEcBShAAQpQQKECTP4KDRybTQEKUIACFHBUgMnfUTmWowAFKEABCihUgMlfoYFjsylAAQpQgAKOCjD5OyrHchSgAAUoQAGFCjD5KzRwbDYFKEABClDAUQEmf0flWI4CFKAABSigUAEmf4UGjs2mAAUoQAEKOCrA5O+oHMtRgAIUoAAFFCrA5K/QwLHZFKAABShAAUcFmPwdlWM5ClCAAhSggEIFmPwVGjg2mwIUoAAFKOCoAJO/o3IsRwEKUIACFFCoAJO/QgPHZlOAAhSgAAUcFWDyd1SO5ShAAQpQgAIKFWDyV2jg2GwKUIACFKCAowJM/o7KsRwFKEABClBAoQJM/goNHJtNAQpQgAIUcFSAyd9ROZajAAUoQAEKKFSAyV+hgWOzKUABClCAAo4KMPk7KsdyFKAABShAAYUKMPkrNHBsNgUoQAEKUMBRASZ/R+VYjgIUoAAFKKBQASZ/hQaOzaYABShAAQo4KsDk76gcy1GAAhSgAAUUKsDkr9DAsdkUoAAFKEABRwWY/B2VYzkKUIACFKCAQgWY/BUaODabAhSgAAUo4KgAk7+jcixHAQpQgAIUUKgAk79CA8dmU4ACFKAABRwVYPJ3VI7lKEABClCAAgoVYPJXaODYbApQgAIUoICjAkz+jsqxHAUoQAEKUEChAkz+Cg0cm00BClCAAhRwVIDJ31E5lqMABShAAQooVIDJX6GBY7MpQAEKUIACjgow+Tsqx3IUoAAFKEABhQow+Ss0cGw2BShAAQpQwFEBJn9H5ViOAhSgAAUooFABJn+FBo7NpgAFKEABCjgqwOTvqBzLUYACFKAABRQqwOSv0MCx2RSgAAUoQAFHBZj8HZVjOQpQgAIUoIBCBZj8FRo4NpsCFKAABSjgqACTv6NyLEcBClCAAhRQqACTv0IDx2ZTgAIUcLeASqVy9yq5PhcJMPm7CJbVUoACFKAABeQqwOQv18iwXRSgAAUoQAEXCTD5uwiW1VKAAhSgAAXkKsDkL9fIsF0UoAAFKEABFwkw+bsIltVSgAIUoAAF5CrA5C/XyLBdFKAABShAARcJMPm7CJbVUoACFKAABeQqwOT//+3dCXhU5dn/8d+EoVhlqzXaBFBaUJCwVaWKxZdQEHzVf0VpoqKAVQELFVEExbrEpaLggktCUaGoFDURxQVaNgkVFURbQUIIIkXI8r7GV0MSrTTL87/OLJnJZBImy0nOJF+ui2vOzJzzPPfzuU/mPnO2cWpmiAsBBBBAAAGbBCj+NsHSLAIIIIAAAk4VoPg7NTPEhQACCCCAgE0CFH+bYGkWAQQQQAABpwpQ/J2aGeJCAAEEEEDAJgGKv02wNIsAAggggIBTBSj+Ts0McSGAAAIIIGCTAMXfJliaRQABBBBAwKkCFH+nZoa4EEAAAQQQsEmA4m8TLM0igAACCCDgVAGKv1MzQ1wIIIAAAgjYJEDxtwmWZhFAAAEEEHCqAMXfqZkhLgQQQAABBGwSoPjbBEuzCCCAAAIIOFWA4u/UzBAXAggggAACNgm4bWqXZhFAAAEEokCgqKhIq1atUmZmpg4cOOCJeOHChRo8eHAURE+IDRVwGWNMQxdmOQQQQACB6BVYtmyZZs6c6Sn0Y8eOrSr4VuHv2rVr1cBcLpesUuF/rHqDiagVoPhHbeoIHAEEEGi4wCeffKLExETPt37rsa5//qLvf6xrXt6LDgGO+UdHnogSAQQQaFIBa1f/Nddc49kAaNKGaSwqBCj+UZEmgkQAAQSaXiB4137Tt06LThag+Ds5O8SGAAIIIICADQIUfxtQaRIBBBBAAAEnC1D8nZwdYkMAAQQQQMAGAYq/Dag0iQACCCCAgJMFKP5Ozg6xIYAAAgggYIMAxd8GVJpEAAEEEEDAyQIUfydnh9gQQAABBBCwQYDibwMqTSKAAAIIIOBkAYq/k7NDbAgggAACCNggQPG3AZUmEUAAAQQQcLIAxd/J2SE2BBBAAAEEbBCg+NuASpMIIIAAAgg4WYDi7+TsEBsCCCCAAAI2CFD8bUClSQQQQAABBJwsQPF3cnaIDQEEEEAAARsEKP42oNIkAggggAACThag+Ds5O8SGAAIIIICADQIUfxtQaRIBBBBAAAEnC1D8nZwdYkMAAQQQQMAGAYq/Dag0iQACCCCAgJMFKP5Ozg6xIYAAAgggYIMAxd8GVJpEAAEEEEDAyQIUfydnh9gQQAABBBCwQYDibwMqTSKAAAIIIOBkAYq/k7NDbAgggAACCNggQPG3AZUmEUAAAQQQcLIAxd/J2SE2BBBAAAEEbBCg+NuASpMIIIAAAgg4WYDi7+TsEBsCCCCAAAI2CFD8bUClSQQQQAABBJwsQPF3cnaIDQEEEEAAARsEKP42oNIkAggggAACThag+Ds5O8SGAAIIIICADQIUfxtQaRIBBBBAAAEnC1D8nZwdYkMAAQQQQMAGAYq/Dag0iQACCCCAgJMFKP5Ozg6xIYAAAgggYIMAxd8GVJpEAAEEEEDAyQJuJwdHbAggELnAgQMHtGrVKmVmZqqoqKhqQes5/xBAAIFgAYp/sAbTCESpwLJlyzRz5kyNHTvW879nz57q2rWrBg8eHKUjImwEELBTgOJvpy5tI9BMAlbht771JyYmNlOPdIMAAtEswDH/aM4esSPgEzh8+DCFn7UBAQQiFqD4R0zFjAgggAACCLQOAYp/68gjo0AAAQQQQCBiAYp/xFTMiAACCCCAQOsQoPi3jjwyCgQQQAABBCIWoPhHTMWMCCCAAAIItA4Bin/ryCOjQAABBBBAIGIBin/EVMyIAAIIIIBA6xCg+LeOPDIKBBBAAAEEIhag+EdMxYwIIIAAAgi0DgGKf+vII6NAAAEEEEAgYgGKf8RUzIgAAggggEDrEKD4t448MgoEEEAAAQQiFqD4R0zFjAgggAACCLQOAYp/68gjo0AAAQQQQCBiAYp/xFTMiAACCLQegaKiotYzGEZSbwF3vZdgAQQQcJRASkqKhg8f7qiYCMbZApmZmVq2bJmsR/61TQGKf9vMO6OOUgH/h/Unn3yiAwcOaNWqVZ6R+B+jdFiEbaOA9Q3fv7741xnrceHChRo8eLCNPdO0kwVcxhjj5ACJDQEEAgKJiYmeJz179pT13/rwHjt2bGAGphAIEbAK/8yZM9W1a1fP+tKQdcblcskqFf7HkC54GoUCFP8oTBohI4AAAs0p4C/6/sfm7Ju+7BHghD97XGkVAQQQQAABxwpQ/B2bGgJDAAEEEEDAHgGKvz2utIoAAggggIBjBSj+jk0NgSGAAAIIIGCPAMXfHldaRQABBBBAwLECFH/HpobAEEAAAQQQsEeA4m+PK60igAACCCDgWAGKv2NTQ2AIIIAAAgjYI0Dxt8eVVhFAAAEEEHCsAMXfsakhMAQQQAABBOwRoPjb40qrCCCAAAIIOFaA4u/Y1BAYAggggAAC9ghQ/O1xpVUEEEAAAQQcK0Dxd2xqCAwBBBBAAAF7BCj+9rjSKgIIIIAAAo4VoPg7NjUEhgACCCCAgD0CFH97XGkVAQQQQAABxwpQ/B2bGgJDAAEEEEDAHgGKvz2utIpAswm4XK5m64uOEECgdQhQ/FtHHhkFAggggAACEQtQ/COmYkYEEEAAAQRahwDFv3XkkVEggAACCCAQsQDFP2IqZkTA2QIc+3d2fogOAScJUPydlA1iQQABBBBAoBkEKP7NgEwXCCCAAAIIOEmA4u+kbBALAggggAACzSBA8W8GZLpAAAEEEEDASQIUfydlg1gQQAABBBBoBgGKfzMg0wUCCCCAAAJOEqD4OykbxIIAAggggEAzCFD8mwGZLhBAAAEEEHCSAMXfSdkgFgQQQAABBJpBgOLfDMh0gQACCCCAgJMEKP5OygaxIIAAAggg0AwCFP9mQKYLBBBAAAEEnCRA8XdSNogFAQQQQACBZhCg+DcDMl0ggAACCCDgJAGKv5OyQSwIIIAAAgg0gwDFvxmQ6QIBBBBAAAEnCVD8nZQNYkEAAQQQQKAZBCj+zYBMFwgggAACCDhJgOLvpGwQCwIIIIAAAs0gQPFvBmS6QMBuAZfLZXcXtI8AAq1IgOLfipLJUBBAAAEEEIhEgOIfiRLzIIAAAggg0IoEKP6tKJkMBQEEEEAAgUgEKP6RKDEPAggggAACrUiA4t+KkslQEEAAAQQQiESA4h+JEvMggAACCCDQigQo/q0omQwFAQQQQACBSAQo/pEoMQ8CCCCAAAKtSIDi34qSyVAQQAABBBCIRIDiH4kS8yCAAAIIINCKBCj+rSiZDAUBBBBAAIFIBCj+kSgxDwIIIIAAAq1IgOLfipLJUBBAAAEEEIhEgOIfiRLzIIAAAggg0IoEKP6tKJkMBQEEEEAAgUgEKP6RKDEPAggggAACrUiA4t+KkslQEEAAAQQQiESA4h+JEvMggAACCCDQigQo/q0omQwFAQQQQACBSAQo/pEoMQ8CCCCAAAKtSIDi34qSyVAQQAABBBCIRIDiH4kS8yCAAAIIINCKBNytaCwMBYE2JeByudrUeBksAgg0nQDf/JvOkpYQQAABBBCICgGKf1SkiSARQAABBBBoOgGKf9NZ0hICLS7AoYAWTwEBIBAVAhT/qEgTQSKAAAIIINB0AhT/prOkJQQQQAABBKJCgOIfFWkiSAQQQAABBJpOgOLfdJa0hAACCCCAQFQIUPyjIk0EiQACCCCAQNMJUPybzpKWEEAAAQQQiAoBin9UpIkgEUAAAQQQaDoBin/TWdISAggggAACUSFA8Y+KNBEkAggggAACTSdA8W86S1pCAAEEEEAgKgQo/lGRJoJEAAEEEECg6QQo/k1nSUsIIIAAAghEhQDFPyrSRJAIIIAAAgg0nQDFv+ksaQkBBBBAAIGoEKD4R0WaCBIBBBBAAIGmE6D4N50lLSGAAAIIIBAVAu6oiNKhQbpcLodGRlhtSWDy5MlKSkpSWlqaVq1aJdbLtpR9+8dqrV/r1q1TXl6enn76aZ1zzjnatm2b/R0bV7JOAAAgAElEQVTTQ8QCxpiI5/XP6DINWcq/NI8IIIAAAgggEHUC7PaPupQRMAIIIIAAAo0ToPg3zo+lEUAAAQQQiDoBin/UpYyAEUAAAQQQaJwAxb9xfiyNAAIIIIBA1AlQ/KMuZQSMAAIIIIBA4wQo/o3zY2kEEEAAAQSiToDiH3UpI2AEEEAAAQQaJ0Dxb5wfSyOAAAIIIBB1AhT/qEsZASOAAAIIINA4AYp/4/xYGgEEEEAAgagToPhHXcoIGAEEEEAAgcYJUPwb58fSCCCAAAIIRJ0AxT/qUkbACCCAAAIINE6A4t84P5ZGAAEEEEAg6gQo/lGXMgJGAAEEEECgcQIU/8b5sTQCCCCAAAJRJ0Dxj7qUETACCCCAAAKNE6D4N86PpRFAAAEEEIg6AYp/1KWMgBFAAAEEEGicAMW/cX4sjQACCCCAQNQJUPyjLmUEjAACCCCAQOMEKP6N82NpBBBAAAEEok6A4h91KSNgBBBAAAEEGifgbtzibXtpl8vVtgEYPQIIIIBAiwsYY+odA8W/3mTVF2gIevUWAs+sjYmmaq8p2/JH2NRtOrk9J8dm5YP4/Gtlwx6d7Ofk2Fj3Gra+BS/V1PkNbrs+0+z2r48W8yKAAAIIINAKBCj+rSCJDAEBBBBAAIH6CFD866PFvAgggAACCLQCAYp/K0giQ0AAAQQQQKA+AhT/+mjZPG9TnexnV5jE13BZ7BpuZy2JX8P9sGu4XTSsew0dHcW/oXIshwACCCCAQJQKuIzTNwujFJawEUAAAQQQcKoA3/ydmhniQgABBBBAwCYBir9NsDSLAAIIIICAUwUo/hFlplyl28brvPZzlXa4svoSlVnavmiERrhcnruuuVxjNOKp15WR+5/q8zXLswLtWTNdc85r740lfpKSV+eosFn6jryTyryXtHRmvM8rXife8nwLefliPpym2+L9+QvzGH9HzbxHPtwmm9NxbjVGVqy9i3v78hrsGK/4Z/eovMb8LfRC5Xa9Nqmj2s95RwUtFELYbksytfa+BMX7PkvaT3xMT+4+HHbWZn2xJFPrngr+jBughPv+qsySkM/CZg2qrs5y9dGDPZyVX0fVCa8dxb+udcjzXrlKs+5Qyi2rtSU29F7+3yrv1d/q3BVDNPCDPJUZo4rcK/X/3p+g8U9uaeYPlm+Vl36JBszrrGOf+cpzdrTJnaWpG0cp4aFtztkAKH1JCy66QU/88gOPlzGf6Z/npGr8lU8ro7SFPky6TNPD+cZrZvyPZSrZeqUSdZGSXp+jaV1a9k+lMjdF1/Vap4+nZHvjLH5RaZVzlXzdcmW2EFvNP51CHcr5RnHPZPty67fMV/7kvnLGvcStv9np+v0L39YMvyVfsTZIpl2iCUX3aUVxhYzJ164L1+j1hKuUvK2o5SKz4vr9xbpo+280JfeIZ92ryJ2l67KTdP7MVdrpmHXPT1SgPYsm6PY3/sf/ggMenVQngjisE/74V4tAxS7zYdpI0+/ed8yHf+plFDfXpBZVBGau2GCeG9HBxD2TbcoCr5qK7GlmpPv26vMGvW/LZFGqme12h41ltJLMtOx/29Jt/RotM4fXjTTuUBtP7ANM4trC+jVn59wlK8zDQzuY2HlbzZd29hNR2/vMxlmdjXv2RpMfPL/T3JwWT7CVZ7rMlGTNMFd1OMMM+4W7pmeN+ZvrhVr+Lio2mCUjWzZO67NstM6s8bdZ2+vNJRaun4rcFWbxhCEm6f3MFnerFp+T6kRQYC37dSZoI8R5k8XKeXacLto/R+l3DlWXcAGW5Cjn3dPU55QTqn2riYlL0BlarYxtX4dbypbXKguytKN8UNhYBrlf1+vvHnDObtewAtnK+eIrh8SYq4+enKPbDtyilN8NUWzYeJvxxcNr9bcnTtGwUQMVF9xtl2maX7ZTm0afEPxqi01718G+6ndyxxaLoc6OSzOUOn6ZPv3z3ZrYqc45m/lNtzqfv0FlZfNafA9T6MBj+qZqrfmolnUs3zl/s5UbtWTIPKVPeF0vn+2YA0xeTgfVieD8UvyDNapNH6v4YWuVtWC0EmLCH7/3ftj9oNpSgSfOKWau2HIVfpbvgF3/bnUeep0eSEjT4nWHfIX+W+VvW61lP3pQT1x5WrWNqIBl805V5j6nRfccq4FPTNWUFt7db428qqh2Phh07NVpx13LVXooR++4j9EJL50ZdNx6gVLez3fARp13g+7OM/+sN5I6ql3zrlL1760yS1sfnqGpmyfrDzOGVd/oq39rNi0xTJee19MRf7OKGahz17+nDed3k9OKmlPrhNOcbFpJG9KsW50STqnjW5/3w+7ThjRtwzLW3oZB7pobKdaK94mTzmrqeKVmv3y1fpLcU+09JzZ1VLcxxynp7zcqqaMTVsdi7Vu9XEtjx2nq6B4O+GDzr2f7lfHrWZrfd7nWe85LWKeVsbfrghmvO+S463f6n/0HVD6sl06a8k/le2Is0zdzv1Xx2Ks0viWPW8s6YXeOLlw4QyueGKueTljNav0M8J002a6/ht4Ro9PuG6+k+Nq+YNTaiL1vVG7XqnnP651rr9DU046xt6+IW49VQoKjduf4Ivf//UY8kGab0dF/Bs2m0Bo66jJJN/3lGG25/2ml5Xk3AirzlumRO9/Ud79wxqlW8nwIj9fwAd+rd1aR7wS7MpVkxenw4N9puhPObK7crndfyVXsjEuU5IBv/YFVM1/uPy7S387v5tsgiVPf8VM1Y/m9umnDV4HZWmyqs06buk9m0z2a1s1frNzqePoEXTzxH8q4+7UWOzGxMvcB3TTsGyW+NdkhG5h1Jcnn6Dl5eLJ+vWaEBk9+zSEbeFbcBdqz+Hpdvv9WPXHfxRpIBakrmY5+j9Q1OD1udezRRwMavHxTL3icuiW/oV237dW2IR3kcsXrJ4+69NPHXtQ1x7VT7KnxdezFaOpYamvvC32YsVpbb75Kd/bzn0XhVsd+M3Tt71/TM8s+buYrJGrGWbn3NaVv+rWSxg5ygFdwfPE1zudQpz7qc95e5xx3DQ63ajpW3U+NlT7dp90tcWmY9S117uN66/4UpZ7dtSqqaJiI6TZNc+8ertilL2vx3u8dELJ1Jv0FGjDjLE1ZfHPQRp4DQnNsCE6rEwEoin/Aot5Tte1q9zZ0es0P63r3UN8F4tTn4hV63nPZWr6+fGySkrrsDntSYn1bbpL5D6/V2hXFYZryFojy5Rv0euh9FMLMbd9Lxdq3ea3WxfVWQpz/26t9vUXWsludf3GZrg5zSCey5dv2XJV7l2nx8mIVzj1HJ/rvxdFulK7bWK7yBSMV70rW9D1OKKx15Wm/dh8srWsG+9+zzkGYN8pb+Hc8ptSqjXf7u472HpxXJ7yiFP/GrFm1fPOqOkGrOc96rtyo54b8WCPWVd8FbMXyD+ta9bOPb8xIm2bZLmM0ZnznMG0VKvezQrmvHqVLW3JXe+V2bcn4ouXjCBXqNETnjN+vLRt2Vt8z4jmLeISGDfxJy5+bULlRS0e1D3NjlZbNrfdsdf/9BnyPFRu0ZKRb7tkblW/Sldq3pY9b+47z13IzqUL3+S3691uZ96TmDh+soesu0R92UvhD/zyP+txJdSI42KDL/pisVeCwyQl3nb8pNbmvDDFu97VmWlaRZ+mK3D+bR684rgWuIfbFmJhiUnOP+GJZYZ6b3ssMTD9Q7T4EtQ7T9je811lfEneTmbY623f9vPe1Ce4LTNLWb2yPoM4OarlXQp3LNMubZaZk65UmURcFjCp2mQ8e7Gc6XPOq2RF064lmCSdsJ94YhwX9LRjjv67+BnPPIe86GXbR5n7RAdfP1xhyyQrz0KDOpt+inVX3lajIfcLMCXmtxnJ2v1Cywswf5jaKm+6sHNY1bsfl10l1IgDHN//gLaF6Tx+nbv89X6sf26/dCV09tzVt1/1RLTn9z1rR7JfndNZpk9/Qh8mZyuhuHfN3qd3Vn2jn1X/Xx0mntPw3Q4+tdXz/US1ff5oGr/uVbzdse/3ooVN01o6XlR5lx2Trvbo0eAG3Op79gt7KGqkzF3b33j633RW6ruwR/e3JSx1y0pUV47N6ZXMPnXx/N98tfk/Wz54boHM/fkgp3Z1yGKXBSbB3QesqmLefU8qXV2iQ7/BEu6vzVPrgNmXeMKCFzj8p1t6/3KU5W8qlglTd28P7uWJ9tvj/O+4WyfZmqYGtO6lOBIbAT/oGLJhCAAEEEECgTQjwzb9NpJlBIoAAAgggEBCg+AcsmEIAAQQQQKBNCFD820SaGSQCCCCAAAIBAYp/wIIpBBBAAAEE2oQAxb9NpJlBIoAAAgggEBCg+AcsmEKg6QRKMrX2+WRNig+6LGriAt31RnbQryvWfXOXpgumjpZqvTlPHctE8Fblnuka06i750Vm4+3nrKCbWxUo5+VRGuG5HC1e8c/u1uHdj+u2UUsj+m0Bq734+GcjmjcCBmZBwLECFH/HpobAolOgXKXZKZoz5gJN2HGRLv7wiO8HjPK1K/mf+uI3A5Xw0LagDYAWHmXMSF27oUxl83/l0J+Nrdsn9PfmK/c8oBlX/q++Tj+gMpOv/Mkd9PHSFM2P6Dd8y1V68HO1u/c8DeOTsW543o16AVbxqE8hA3CUQGmGFk35ox4/fYU2PDJJSVU3t7F+d+EFpW1JUsLc6UoOuQ2zo8YQ9cF00PFdjmvAja2+0IcvFerXTvmN+qjPAwNwsgDF38nZIbYoEyhX8QdL9PiWSzVl9oVh7rznVschf9AD949VUrf2QWPLU2bGFYFDBPGTlLw6p/regcosbV80wrc72yXXiNs0fc2ewDyH0zSnfXvFz0vXX+9LULxvt/eJtzyvjNwvlfP2+Kr2209M1Uu+n31WuN3+IX21n/iYnqz2c8vfKv/9FD18ZceqO73ViCdodOEny1WalaZnZ8YfpY26bQK7/XO1d3FvtTs9Tev0sTLHxMoVf6muSh6okY8WS+uu04h2wYcHwkR1eK3e3HCDksL+Rn25iteP8vwQ0A1r3tRjVWMfoxGLtiqr0teePw+L1uv9eaF58P7UtvS53rm1i1xjHtKLbwbyYhnetDXXc5iiyjZ+ksa/X6DyMOHyEgKNEaD4N0aPZRGoJvCFPlq7XQV1/SpgTIJ+eeedmpbg/0lj6yfS1ytz9+X6bU6FjClV3rKvVHjxLE3fVuRtvXK7Xvvt2Tr3g99oSq51GKFMJanfq+SSSzQq44uqwuCKLVfBHUs0/7SV2uH5Pfjbdd3265XcY6Qu+3Sa5uQamZLVWlR2mybe/Xb434j39fWL9KEavrtIxuTr06HPa9aguUrJtYpXuUq3Tdblw/drx42fqcxYP5ZTqry5u7T7olsDMVdzCfOkNEOpV83Vwr5r9WW1Nu5WSvCv7B3NpqrpY3Ta1H2qyJ6m0TpTiWsLZfJf11/Sd2rjrM7S6CXaVPGRNo0+oWqJ6hPlKt72pl6/+2i7/DO0+PqV+sgz9jKV7B6qIS8masT8wKEcTx6m3aLJWqz1FUam+EWlVc5V8oRUZZT6txIkrXtSszLHefNesUMbznxRTw7toRMe+oFOfuRrj332XZ8oY/j9esBjXz1iniHQKIHAbf6ZQgCBRgn4flBEo5eYTRH92E4tPxhVscE8N6KDiXsm25SZMnN43UgTpyQzLfvfQeF5X3e7bzepRRXGFKWaOXEK+UGpfWbjrM6mejwhfYb8CEpF9jQzWmeaxLWFgb6CfvCownjbdM/eaPIDcxhTLWZjvO2ExhxY4GjvGxMSp3/RsP0E4q0ZfzgDf2PBj/vMhhu7Vx938NtVeegf8kNZteTh2pXVf3DJYzjA174vpri53tx5+gmf55rjqRYUTxBosADf/Bu16cTCCNgj4IqpUOFn+SpWbXsT3OrYo49+Vb5eGdu+bqIg/q19m9dqnX6mfsE/R91lmuaXlSl/cl/FqJd+9chhlc0/XUWvPaCUlBQtXXqD5gy/QNdvivxno2O6D9OoYa/rmaVvKXPlQ0rLOhzxGPw2hREvEcGMlQe0//XxEfx07ukaNuCkoPMJaubBFLoVe04/9Qv+dO3UR32HZ3t+lrmpshXBqJgFgVoFglfPWmfiDQQQiEAgpqd6Dj5W+nSfdpcE7d6NYNGjzlIwT9O7tgscH7d+tdFzfDuwpKfonBpv8y/Alat0902aFB+vfuPe1eYfn6qDBxPUM+1tLRlZ6NlgiagoW79it2a93ui7UWsW3qXp/a1fxRyjEU+tU2ZT2wWIap2q3Pua7rt0tC7t0tCPxHzlfPGVjpb18h0HtLOyozeOAb3Vr1ND+6t1KLyBQEQCrHkRMTETApEInKKzxgxRXME+ZRX4T+6quVxlboYeeM263t9d883aXvEcs7aOr4f+r+s4dm2NNeL1ys1Kn5GmFf+9Ujsq1mrTjVcpJeVGTTv5c+XsrudpaZ0SdeG1f9L8d8tkKnZp64tddPK8MTr//kwVKPiEyEbEG9Gixfps01b1vnhQIy53jFefU07Q0T5Q3YN6amBMaURRMRMCdgocbV21s2/aRqCVCbjVeeh1utnanb1gTZgT6rzfmq/56Z3KqDhWP646Va92hiP6qWeDwv3OR8rMD96gsE68G68RjbqRTmi/P1Tv4WM0Wvu1+2BQgfJdEeAas1RZh3O0Z7Nq7NauLPlSX4U2V5/nMQk6++p5mjS+s6xvxzmVrvos3bh5K7fr7w+OimCXv9VNiI11AuShHL3jPr9qeeuEP+uQTbU9ICWW2+kaNmqgIj840rhhsTQCdQlQ/OvS4T0E6ivQMUm/WzxNV75wuUbdal1m5y/YBcp5e6KmDUrT32Y+pRXjTjnqt0Rv1zHqPHKeXhn/gv54x7O+S/SsGwk9oPtufk1Z82Yppe8x9Y2y1vljTpuqObPylTkvVWmeywG/Vf6Gx/TixjFKuu8yJfxojC646VgVrHhFz/guF6zMW6aFsx/R0oJam63xhvcSvTEa8bL/ckVrTC9qzQZp4PUj9V8xfrcai9bzhVh1PzXWt8z3KiwMs3eiJEefKtJd8B8rc95jSsm2zlGwNuZm6fcXHlK/FTdoStAhg/IFD2u8f2yla/TcDXP0+MQUPTGqtqsN6jksZkegkQIU/0YCsjgC1QXc6tjvCS371wql/nSZ0np08B2nj1f/9J/rlFd3KmvBaCXU5y8vZogue/ptrR7yqp7pbrXXXp1G/ksHpm3WpjlnN+0x/piBGjl/vT5MzlSGp6+O6javvwZ+8IxWnN1VUi8l3vwnLRm0WNM977vUYW6hvrlipVZal9RF+C+m73z9+b2huuCNs3Si554E3jEdvHVdPTaMIumss3pfPEO3fzdVI9r9TINW7QvZ3xLpJX7+vkYr8bKe+uF93bx5GFWk71e9qQ1Jp1QdxPGce3HzpZq6d5wGWWPrdJsePz1D6xeODXPvB3+7PCLQvAIu6zqB5u2S3hBAAIFoE7Bu8nOB+o4+Xpdmv6DU2va2WDf5OeEmLU/7VAcn963aIIi20RJv6xeoz/eP1q/BCBFAAAEEEGgDAhT/NpBkhogAAggggECwALv9gzWYRgABBBBAoA0I8M2/DSSZISKAAAIIIBAsQPEP1mAaAQQQQACBNiBA8W8DSWaICCCAAAIIBAtQ/IM1mEYAAQQQQKANCFD820CSGSICCCCAAALBAhT/YA2mEUAAAQQQaAMCFP82kGSGiAACCCCAQLAAxT9Yg2kEEEAAAQTagADFvw0kmSEigAACCCAQLEDxD9ZgGgEEEEAAgTYgQPFvA0lmiAgggAACCAQLUPyDNZhGAAEEEECgDQhQ/NtAkhkiAggggAACwQIU/2ANphFAAAEEEGgDAhT/NpBkhogAAggggECwAMU/WINpBBBAAAEE2oAAxb8NJJkhIoAAAgggECxA8Q/WYBoBBBBAAIE2IEDxbwNJZogIIIAAAggEC1D8gzWYRgABBBBAoA0IUPzbQJIZIgIIIIAAAsECFP9gDaYRQAABBBBoAwIU/zaQZIaIAAIIIIBAsADFP1iDaQRaVKBAOzN2q9AfQ8kWZew87H/Go+0C5Sr55E1lllTa3hMdINDSAhT/ls4A/QcJHFFB+plyuVxyuXorIeOQpALtWTNdc85r73vdpfYTFyjl/XyVBy3p/MlCffTQiXL1fkQZYQO33h+kQW/v0ZfWYMozND92lFJyihs+tMNpmtN+nKbv+d7bRujziFoOjrv0KGOIqMFaZrKrH986Vat7IJzybeP185+vaYbi/w+tvPoYHTP/Ix0JdB9myjuf9+/hBqXkh11xwizHSwgcXYDif3Qj5mhugV4LlF62T1lJxysv/RINuKREuQ8fVJkxMiZfuy5cq82/nKLx24qaO7Io6q9cxR++pseHX6Sk046xtiZCnkfRUBoVagfFJX8ss+9WJbkb1VATLnyGxi3/Xt/POUsd6mzVmu+w8l85o865eBOBhghQ/BuixjLNJJCjrW/uVPn4sfrDuXHyfnbHqU/yXE0YuVavr/yHCjyRFCjn7fGaFG/tMXDJFT9JyatzvLvPyzP0SG9XtW9Z5duS1ds1QsnbSuWfHjfuRO+yY5Yqs+yQti8aoRGePRDWnoZUvZT3H++YK7O0dV6C4qvee0xP7vbvmvd9U5v0mrJqE/ruU+2637/8ACXc91dllhTpo4cSNGRuofTCOPW32m6frNuOHNHu5JM9sX/viXmMxt15ni+ueJ14y8rAt9T8FE2q2ltidf6dCvbnKvbyczXM81ceeP5fyqo2vmpeKldpdkpgT8uIe/Xyju9CRlOu8l2P6+ErO8rlGqMRi7Yqy7On/Fvlf3BLYFmXf3zhdqM3pp+QcMLsHXKNuE03bc1Xhap/86/Me0lLZ8YH7UXy5s9aD/qek6HPtVj3djvfs26E9qKSjXq1all/LrzrkbVxVbrbb2Kth3WNPfDNv7w8Qwu6tdeJtwSb36GUbP86VSMKXkCgaQQM/xBwjMD3Jv+VM4x6LTDpZVZQh03On3oZxU00SW/vMV+GjbPU5L4yxMRptBm5LtdUmFKTt/ZCk6j+ZmD6AVNRlm4W9JLp8PB2871v+bKtSaaXEk3S1hLjnZZxX7vS7Kj4xny86TNz0NPeRSZp6zfGlKww84e5jUYvMZsq/s9s/2N3o8QUk5p7xBiTb7LTBhq3+3fmnkPW87r+fWm2z4s1Un/T78F3za6KClOy9UqTqDNN4tpCY4zv/YkrzS6rmbJ083CHDqZf+kFPo/44/X1X5D5hbh/m9sUdpt+KDebZs473tW2MqXr+v+bwupEmTr7x+cYQpyQzLfvfxhSlmtlut4m9da3ZVXHEZylfTkp8Y4gLed9n7V923lbzpakwJVkzzAS328Q9k2086QwO0z9vA/oJbasie5oZ7cu/9Z7fxpuzsqB16n/NxlmdjRIfM+klFcaUrDbPXnGcL7fGty5MNffkhfZgBb7Pt6w391V9+NajikP3mGur3AIxeNer4IFb0x+bV6/q4Fkny3zrp/zrb8UOs2FWnFHcdN865fubUG1xhbbNcwQiE1BkszEXAs0hEFr8jTHFG0zGTXFGkvd/4hwz7bkXTOquIm9AFRvMkpFu45690eRXhej7oB69xOw4Eknx9xdgb5G02pO/CFe1aXyFcUCgoFrvlaWb+fG1FLjgZf3FPW6uSS2q8L4TtGFS5n/f32/Y4h8UpynzFXFf0a7WlzFWQRzpvr2qr8DzI95iWFVcghf0+QfH6C96ng0yX/EP9/7oJWb3wXvMRN9GV7jyGeipcf1s8vEF2gud8m1IeWIOLv77PUU3fEE+SvHPs8YWzt/aiPzSt5EalNs681Oz+Fdbf30bRtZGU7mh+Idml+dNI8Bu/6bZgUIrdgl0GqnfLMyXqdil9568Ry9d9qF2Xz9R0/sna9T6PFVWfq3/y5ZiT41XbFUM3XX6L3pLn3+tnHB7nKvm8090UmwX67i4pMqv9fWBcnVIOFm9/W/7Hsv3ZOq18k+VOSa2arextXt+Tn65vv6mVBUh84d9euzxij2uoX92Z2l4/66+Zt3q2KOPBqhQhYdDTwQr1r7Na7X55vN1aRerr+DnP9BJv5yk23st1r09OsjaPT59SYYycq3DGsXK239IGtBb/Tr5Y/RZBg/m/LM03NOu9WKsup8a67HeddK1mjjr/7QzuafaW4cDnvqLHngv3ImZjeunMFxOSzK1KiVFjz56l56dOch7CCU4Zs90Nw2dOFLDlo7ToHbWYZM/KeWp932HLGrMXO2F8kO79Z5+pn4nd/S97lbnhGE63/OsXMXfFIe4+d8Pl59qTasyt4NOG3Kq4vwvd+qjvsPlWadCM+ufhUcEGivg/wtvbDssj4C9AjEJOvfGFF1x4yZtqvhQKye+p42/e0krm/3TMVFJW0usPWbV/h/95C17eaq3XqhDWUc0bNRAX0Gp/jym2wzNe7dIee/O14vX/EuldyUrucdlSt7muyqgemORP4s5WSMfyVfFoXQ99/QgXfD+VN017CzFP7QtcPli5K1FPGdlboqu6zNCSfuPU5G6Ki/xVW2YF9gUDDT0A8WPXq1Nng3JKXqy61N6ZsYv1X/k48ooDbdFEViSKQRamwDFv7VltDWNx3NpWnvFP7un+mV9MQM19KI+3pHG9NaPT5cKP8sPKjC5yv5wn9TrePWpsYaX67virxV6ClsVW8zxOr6nW0eyDmpf1YveCXffRF3m3qItO3OrxxMyn31PP9LmXf4rHMpVeihHn6qP+vXw7bXwd3x4rdYu+kXgW2roc898xyl+2GxdPSldzx9M14Jeq/Xm5jyd+LMe0qf7tLvqWnefpb9t63H9R9p82F8sC5X7WaH0y5+pn+9s+pjuSbpu+nzd9tK/tH1euQqfe1eZ1TbSOqtbE/TjDalY+1Yv19JjF2jF0tm6f9YspYw9Sa6v6riIzr8heXeWDm5NUq/MN5WRVesa4ekmpkusemm/dh8s9UmUqzhri9Z7nrsUGVUAAARySURBVLnV+UedQ9z878cqtkvdlxnEdD+ivds/8528KqkkR3s2n6hePz3pKFcD+ELhAYEGCNT4aGxAGyyCgD0CXX6t5Ht/ooJ75mm8/+x9z9no8/T4wizFXn+eEn/QT2Om/FyxCx7WBOswgL5V/roZuv/RkzXw+pHq/4MzdMbYzjry19VakvcfVeYt13NLtwY+aEMjjznH017cC0t1r3UpYeVObbw1Xq74O5Smy33xLNBNnjP8v1X+e7/VxPYDNWLdV6EtNez5/xTJv1vb9eMKfVP0bdCGxsfasvwVz5UHlXlpmnffZhXOTtbU+ODiEnpJX+jzYu1d3Fuu+Os03TOGcpXu3aKdXwzQ0MG9dfKY6zS7cIFSHtigrMr/KP+9B/T8ipB7DRS8pdSXslSoIz7rU5V41X/p9D3TNcY6y/1Pn3o3xEq365Md38l92RkaFhyiOiiuEf0khJP9LluZe60z5AuU8/JU3f9oSMzWMpX/1NJR7dV+4vPa6Nm4KdC+f+ToC/c5Sux7rK/Vr1VYXG1LxfN6TN9bdNusz5Q5L1VpNdajH6r3RVfr2io3qSo/116hqZ5LLcMFHXitfPnzmvV+gSqt9e3+B7QgdpKmj+4WmIEpBJpaoGlOHaAVBJpCIMwJfxW7zNYXk8zEON8Jf9aJf9bZ/y9uNbuqTvzKN3veujIwT8jVARW5fzaPWmd1+5adtizJjK92tr/3zP+qEVTsMh+mJZrEqpMM55p7dvtOMCzeZP52bz8T53+vWl/eE7nCnizoP6Gv6koG78mCgSsRyj1nx3vHaZ3Z/ZXnSgJPPxNXmi88Vyj0N/2mjPPF1d/0u3eN2VTsQ/CckNbL9Ev/0Gy4+figM+z3hTy3TqIMGYNGm8S0D3yeZaYk6zHzkN8rcbqZZU0Hn/CXeIt50H8SZrXxh+RBcSb25mUm3XMlRKhNY/oJOQmu2kmhVp+LzEueHFknQ5YEne1vXYEQNDYrh4lzzIwP8rxXI/jP/pfluN+7XPBZ9tX6GW0u+8Mwk+hbj4wJGY91VUfY/FhXb4Q54W/CzeZm66oSybgnPGqeyPKtb5zwV/VnyUTTCris5pp6g4L2EGiYgHVN9rmKv+NKpe9x0k1ZGjaaplzKex16oc7Y+pbSz/afdNaUPdBWfQW8OZHGZL+g1L4hh17qaqxyo5aOvkDTRn+g0lv+pYV9k3XnlO06HPamP76/icuH6J68p5VSbS9PXZ3wHgJ1C7Dbv24f3kUAAQQk3/knJ/pPXixdo2UL1+jz0Rf47qBYD6SgY/rVjobUowlmRaCxAhT/xgqyfNMLfD5bye399/Zv+uZpEYF6C3SZpJl/v1HXrB6mE607MHa6XnfEpSp9ydVKjPhTtFzF60cpvut0LRg2RdPPPekoYVh3Auyi+Mv/cZT5eBuB+guw27/+ZiyBAAIIIIBAVAtEvM0a1aMkeAQQQAABBBCoEqD4V1EwgQACCCCAQNsQoPi3jTwzSgQQQAABBKoEKP5VFEwggAACCCDQNgT+P5/ZlMUMA4iHAAAAAElFTkSuQmCC"></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>Chloroethene, C<sub>2</sub>H<sub>3</sub>Cl, can undergo polymerization. Draw a section of the polymer with three repeating units.</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>substitution <em><strong>AND</strong> </em>«free-»radical<br><em><strong>OR</strong></em><br>substitution <em><strong>AND</strong> </em>chain</p>
<p> </p>
<p><em>Award [1] for “«free-»radical substitution” or “S<sub>R</sub>” written anywhere in the answer.</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><em>Two propagation steps:</em><br>C<sub>2</sub>H<sub>6</sub> + •Cl → C<sub>2</sub>H<sub>5</sub>• + HCl</p>
<p>C<sub>2</sub>H<sub>5</sub>• + Cl<sub>2</sub> → C<sub>2</sub>H<sub>5</sub>Cl + •Cl</p>
<p><em>One termination step:</em><br>C<sub>2</sub>H<sub>5</sub>• + C<sub>2</sub>H<sub>5</sub>• → C<sub>4</sub>H<sub>10</sub><br><em><strong>OR</strong></em><br>C<sub>2</sub>H<sub>5</sub>• + •Cl → C<sub>2</sub>H<sub>5</sub>Cl<br><em><strong>OR</strong></em><br>•Cl + •Cl → Cl<sub>2</sub></p>
<p> </p>
<p><em>Accept radical without • if consistent throughout.</em></p>
<p><em>Allow ECF from incorrect radicals produced in propagation step for M3.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{C}} = \frac{{24.27}}{{12.01}}">
<mrow>
<mtext>C</mtext>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mn>24.27</mn>
</mrow>
<mrow>
<mn>12.01</mn>
</mrow>
</mfrac>
</math></span> = 2.021 <em><strong>AND</strong></em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{H}} = \frac{{4.08}}{{1.01}}">
<mrow>
<mtext>H</mtext>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mn>4.08</mn>
</mrow>
<mrow>
<mn>1.01</mn>
</mrow>
</mfrac>
</math></span> = 4.04 <em><strong>AND</strong></em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{Cl}} = \frac{{71.65}}{{35.45}} = 2.021">
<mrow>
<mtext>Cl</mtext>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mn>71.65</mn>
</mrow>
<mrow>
<mn>35.45</mn>
</mrow>
</mfrac>
<mo>=</mo>
<mn>2.021</mn>
</math></span></p>
<p>«hence» CH<sub>2</sub>Cl</p>
<p> </p>
<p><em>Accept <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{24.27}}{{12.01}}">
<mfrac>
<mrow>
<mn>24.27</mn>
</mrow>
<mrow>
<mn>12.01</mn>
</mrow>
</mfrac>
</math></span> : <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{4.08}}{{1.01}}">
<mfrac>
<mrow>
<mn>4.08</mn>
</mrow>
<mrow>
<mn>1.01</mn>
</mrow>
</mfrac>
</math></span> : <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{71.65}}{{35.45}}.">
<mfrac>
<mrow>
<mn>71.65</mn>
</mrow>
<mrow>
<mn>35.45</mn>
</mrow>
</mfrac>
<mo>.</mo>
</math></span></em></p>
<p><em>Do <strong>not</strong> accept C<sub>2</sub>H<sub>4</sub>Cl<sub>2</sub>. </em></p>
<p><em>Award [2] for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>molecular ion peak(s) «about» <em>m/z</em> 100 <em><strong>AND</strong> </em>«so» C<sub>2</sub>H<sub>4</sub>Cl<sub>2</sub> «isotopes of Cl»</p>
<p>two signals «in <sup>1</sup>H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectrum» <em><strong>AND</strong> </em>«so» CH<sub>3</sub>CHCl<sub>2</sub><br><em><strong>OR</strong></em><br>«signals in» 3:1 ratio «in <sup>1</sup>H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectrum» <em><strong>AND</strong> </em>«so» CH<sub>3</sub>CHCl<sub>2</sub><br><em><strong>OR</strong></em><br>one doublet and one quartet «in 1H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectrum» <em><strong>AND</strong> </em>«so» CH<sub>3</sub>CHCl<sub>2</sub></p>
<p>1,1-dichloroethane</p>
<p> </p>
<p><em>Accept “peaks” for “signals”.</em></p>
<p><em>Allow ECF for a correct name for M3 if an incorrect chlorohydrocarbon is identified</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">c.ii.</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>Continuation bonds must be shown.</em></p>
<p><em>Ignore square brackets and “n”.</em></p>
<p><em>Accept <img src="images/Schermafbeelding_2017-09-25_om_08.18.53.png" alt="M17/4/CHEMI/SP2/ENG/TZ1/05.d/M"> .</em></p>
<p><em>Accept other versions of the polymer, such as head to head and head to tail.</em></p>
<p><em>Accept condensed structure provided all C to C bonds are shown (as single).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
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[N/A]
<div class="question_part_label">c.i.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
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<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
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