File "markSceme-HL-paper2.html"

Path: /IB QUESTIONBANKS/5 Fifth Edition - PAPER/HTML/Chemistry/Topic 8/markSceme-HL-paper2html
File size: 1.39 MB
MIME-type: text/html
Charset: utf-8

 
Open Back 
<!DOCTYPE html>
<html>


<meta http-equiv="content-type" content="text/html;charset=utf-8">
<head>
<meta charset="utf-8">
<title>IB Questionbank</title>
<link rel="stylesheet" media="all" href="css/application-02ef852527079acf252dc4c9b2922c93db8fde2b6bff7c3c7f657634ae024ff1.css">
<link rel="stylesheet" media="print" href="css/print-6da094505524acaa25ea39a4dd5d6130a436fc43336c0bb89199951b860e98e9.css">
<script src="js/application-9717ccaf4d6f9e8b66ebc0e8784b3061d3f70414d8c920e3eeab2c58fdb8b7c9.js"></script>
<script type="text/javascript" async src="https://cdnjs.cloudflare.com/ajax/libs/mathjax/2.7.5/MathJax.js?config=TeX-MML-AM_CHTML-full"></script>
<!--[if lt IE 9]>
<script src='https://cdnjs.cloudflare.com/ajax/libs/html5shiv/3.7.3/html5shiv.min.js'></script>
<![endif]-->
<meta name="csrf-param" content="authenticity_token">
<meta name="csrf-token" content="iHF+M3VlRFlNEehLVICYgYgqiF8jIFlzjGNjIwqOK9cFH3ZNdavBJrv/YQpz8vcspoICfQcFHW8kSsHnJsBwfg==">
<link href="favicon.ico" rel="shortcut icon">

</head>
<body class="teacher questions-show">
<div class="navbar navbar-fixed-top">
<div class="navbar-inner">
<div class="container">
<div class="brand">
<div class="inner"><a href="http://ibo.org/">ibo.org</a></div>
</div>
<ul class="nav">
<li>
<a href="../../../../../../../index.html">Home</a>
</li>
<!-- - if current_user.is_language_services? && !current_user.is_publishing? -->
<!-- %li= link_to "Language services", tolk_path -->
</ul>
<ul class="nav pull-right">
<li class="dropdown">
<a class="dropdown-toggle" data-toggle="dropdown" href="#">
Help
<b class="caret"></b>
</a>
<ul class="dropdown-menu">
<li><a href="https://questionbank.ibo.org/video_tour?locale=en">Video tour</a></li>
<li><a href="https://questionbank.ibo.org/instructions?locale=en">Detailed instructions</a></li>
<li><a target="_blank" href="https://ibanswers.ibo.org/">IB Answers</a></li>
</ul>
</li>
<li>
<a href="https://06082010.xyz">IB Documents (2) Team</a>
</li></ul>
</div>
</div>
</div>

<div class="page-content container">
<div class="row">
<div class="span24">

<div class="pull-right screen_only"><a class="btn btn-small btn-info" href="https://questionbank.ibo.org/updates?locale=en">Updates to Questionbank</a></div>
<p class="muted language_chooser">
User interface language:
<a href="https://questionbank.ibo.org/en/users/set_user_locale?new_locale=en">English</a>
|
<a href="https://questionbank.ibo.org/en/users/set_user_locale?new_locale=es">Español</a>
</p>
</div>
</div>

<div class="page-header">
<div class="row">
<div class="span16">
<p class="back-to-list">
</p>
</div>
<div class="span8" style="margin: 0 0 -19px 0;">
<img style="width: 100%;" class="qb_logo" src="https://mirror.ibdocs.top/qb.png" alt="Ib qb 46 logo">
</div>
</div>
</div>
<h2>HL Paper 2</h2><div class="specification">
<p>Phosphoric acid, H<sub>3</sub>PO<sub>4</sub> can form three different salts depending on the extent of neutralisation by sodium hydroxide.</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 reasons that sodium hydroxide is considered a Brønsted–Lowry and Lewis base.</p>
<p><img src="data:image/png;base64,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"></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>«<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>NaOH</mi><mo> </mo><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> </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><em>Brønsted–Lowry base:</em><br>proton acceptor</p>
<p><em><strong>AND</strong></em></p>
<p><em>Lewis Base:</em><br>e<sup>–</sup> pair donor/nucleophile ✔</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>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>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) Suggest a suitable indicator for this titration. Use section 22 of the data booklet.</p>
<p>(ii) 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>(iii) Calculate the amount, in mol, of ethanedioic acid in each 25.0 cm<sup>3</sup> sample.</p>
<p>(iv) Determine the percentage purity of the hydrated ethanedioic acid sample.</p>
<div class="marks">[6]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the Lewis (electron dot) structure of the ethanedioate ion, <sup>–</sup>OOCCOO<sup>–</sup>.</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>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">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how ethanedioate ions act as ligands.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i<br>phenolphthalein<br><em><strong>OR</strong></em><br>phenol red</p>
<p> </p>
<p>ii<br>«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> × 0.100 mol dm<sup>-3</sup> =» 1.40 × 10<sup>-3</sup> «mol»</p>
<p><br><br>iii<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> × 1.40 × 10<sup>-3 </sup>=» 7.00 × 10<sup>-4</sup> «mol»</p>
<p> </p>
<p>iv<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> × 5.00 g =» 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»</p>
<p>«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»</p>
<p>«% 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}}^{{\rm{ - 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>
            <mrow>
              <mrow>
                <mo>−</mo>
                <mn>1</mn>
              </mrow>
            </mrow>
          </mrow>
        </msup>
      </mrow>
    </mrow>
  </mfrac>
</math></span> = 0.03966 «mol»</p>
<p>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><img src="data:image/png;base64,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" alt></p>
<p><em>Accept single negative charges on two O atoms singly bonded to C.</em><br><em>Do not accept resonance structures.</em><br><em>Allow any combination of dots/crosses or lines to represent electron pairs.</em></p>
<div class="question_part_label">d.</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</p>
<p><em>Accept delocalized π-bond(s). <br>No ECF from (d). </em></p>
<p> </p>
<p>122 «pm» &lt; C–O &lt; 143 «pm»</p>
<p><em>Accept any answer in range 123 «pm» to 142 «pm». <br>Accept “bond intermediate between single and double bond” or “bond order 1.5”.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>coordinate/dative/covalent bond from O to «transition» metal «ion»<br><em><strong>OR <br></strong></em>acts as a Lewis base/nucleophile</p>
<p>can occupy two positions<br><em><strong>OR <br></strong></em>provide two electron pairs from different «O» atoms<br><em><strong>OR<br></strong></em>form two «coordinate/dative/covalent» bonds «with the metal ion»<br><em><strong>OR <br></strong></em>chelate «metal/ion»</p>
<p> </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">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>Butanoic acid, CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>COOH, is a weak acid and ethylamine, CH<sub>3</sub>CH<sub>2</sub>NH<sub>2</sub>, is a weak base.</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the equation for the reaction of each substance with water.</p>
<p><img src="data:image/png;base64,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"></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>Draw a diagram showing the delocalization of electrons in the conjugate base of butanoic acid.</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 average oxidation state of carbon in butanoic acid.</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>A 0.250 mol dm<sup>−3</sup> aqueous solution of butanoic acid has a concentration of hydrogen ions, [H<sup>+</sup>], of 0.00192 mol dm<sup>−3</sup>. Calculate the concentration of hydroxide ions, [OH<sup>−</sup>], in the solution at 298 K.</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 pH of a 0.250 mol dm<sup>−3</sup> aqueous solution of ethylamine at 298 K, using section 21 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch the pH curve for the titration of 25.0 cm<sup>3</sup> of ethylamine aqueous solution with 50.0 cm<sup>3</sup> of butanoic acid aqueous solution of equal concentration. No calculations are required.</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>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why butanoic acid is a liquid at room temperature while ethylamine is a gas at room temperature.</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>State a suitable reagent for the reduction of butanoic acid.</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>Deduce the product of the complete reduction reaction in (e)(i).</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><em>Butanoic acid:</em><br>CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>COOH (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> CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>COO<sup>−</sup> (aq) + H<sub>3</sub>O<sup>+</sup> (aq) ✔</p>
<p> </p>
<p><em>Ethylamine:</em><br>CH<sub>3</sub>CH<sub>2</sub>NH<sub>2</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> CH<sub>3</sub>CH<sub>2</sub>NH<sub>3</sub><sup>+ </sup>(aq) + OH<sup>−</sup> (aq) ✔</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>Diagram showing:</em><br>dotted line along O–C–O <em><strong>AND</strong> </em>negative charge</p>
<p> </p>
<p><em>Accept correct diagrams with pi clouds.</em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>–1 ✔</p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<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}}}}{{0.00192\,{\text{mol}}\,{\text{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>
      <mspace width="thinmathspace"></mspace>
      <mrow>
        <mtext>mo</mtext>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mtext>l</mtext>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
      <mspace width="thinmathspace"></mspace>
      <mrow>
        <mtext>d</mtext>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mtext>m</mtext>
          </mrow>
          <mrow>
            <mo>−</mo>
            <mn>6</mn>
          </mrow>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mn>0.00192</mn>
      <mspace width="thinmathspace"></mspace>
      <mrow>
        <mtext>mol</mtext>
      </mrow>
      <mspace width="thinmathspace"></mspace>
      <mrow>
        <mtext>d</mtext>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mtext>m</mtext>
          </mrow>
          <mrow>
            <mo>−</mo>
            <mn>3</mn>
          </mrow>
        </msup>
      </mrow>
    </mrow>
  </mfrac>
</math></span>» = 5.21 × 10<sup>–12</sup> «mol dm<sup>–3</sup>» ✔</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«p<em>K</em><sub>b</sub> = 3.35, <em>K</em><sub>b</sub> = 10<sup>–3.35</sup> = 4.5 × 10<sup>–4</sup>»</p>
<p>«C<sub>2</sub>H<sub>5</sub>NH<sub>2</sub> + H<sub>2</sub>O <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> C<sub>2</sub>H<sub>5</sub>NH<sub>3</sub><sup>+</sup> + OH<sup>–</sup>»</p>
<p> </p>
<p><em>K</em><sub>b</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\left[ {{\text{O}}{{\text{H}}^--}} \right]\left[ {{\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{N}}{{\text{H}}_{\text{3}}}^{\text{ + }}} \right]}}{{\left[ {{\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{N}}{{\text{H}}_{\text{2}}}} \right]}}">
  <mfrac>
    <mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
          <mrow>
            <msup>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mo>−</mo>
            </msup>
            <mo>−</mo>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>3</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>2</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>N</mtext>
          </mrow>
          <msup>
            <mrow>
              <msub>
                <mrow>
                  <mtext>H</mtext>
                </mrow>
                <mrow>
                  <mtext>3</mtext>
                </mrow>
              </msub>
            </mrow>
            <mrow>
              <mtext> + </mtext>
            </mrow>
          </msup>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
    <mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>3</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>2</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>N</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>2</mtext>
              </mrow>
            </msub>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
  </mfrac>
</math></span></p>
<p><strong>OR</strong></p>
<p>«<em>K</em><sub>b</sub> =» 4.5 × 10<sup>–4</sup> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\left[ {{\text{O}}{{\text{H}}^-}} \right]\left[ {{\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{N}}{{\text{H}}_{\text{3}}}^{\text{ + }}} \right]}}{{0.250}}">
  <mfrac>
    <mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
          <mrow>
            <msup>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mo>−</mo>
            </msup>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>3</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>C</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mrow>
                <mtext>2</mtext>
              </mrow>
            </msub>
          </mrow>
          <mrow>
            <mtext>N</mtext>
          </mrow>
          <msup>
            <mrow>
              <msub>
                <mrow>
                  <mtext>H</mtext>
                </mrow>
                <mrow>
                  <mtext>3</mtext>
                </mrow>
              </msub>
            </mrow>
            <mrow>
              <mtext> + </mtext>
            </mrow>
          </msup>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
    <mrow>
      <mn>0.250</mn>
    </mrow>
  </mfrac>
</math></span></p>
<p><em><strong>OR</strong></em></p>
<p>«<em>K</em><sub>b</sub> =» 4.5 × 10<sup>–4</sup> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{x^2}}}{{0.250}}">
  <mfrac>
    <mrow>
      <mrow>
        <msup>
          <mi>x</mi>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mn>0.250</mn>
    </mrow>
  </mfrac>
</math></span> ✔</p>
<p><br>« x = [OH<sup>–</sup>] =» 0.011 «mol dm<sup>–3</sup>» ✔</p>
<p> </p>
<p>«pH = –log<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.00 \times {{10}^{ - 14}}}}{{0.011}} = ">
  <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>
    <mrow>
      <mn>0.011</mn>
    </mrow>
  </mfrac>
  <mo>=</mo>
</math></span>» 12.04</p>
<p><em><strong>OR</strong></em></p>
<p>«pH = 14.00 – (–log 0.011)=» 12.04 ✔</p>
<p> </p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>decreasing pH curve ✔</p>
<p>pH close to 7 (6–8) at volume of 25 cm<sup>3</sup> butanoic acid ✔</p>
<p>weak acid/base shape with no flat «strong acid/base» parts on the curve ✔</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em><br>butanoic acid forms more/stronger hydrogen bonds ✔<br>butanoic acid forms stronger London/dispersion forces ✔<br>butanoic acid forms stronger dipole–dipole interaction/force ✔</p>
<p> </p>
<p><em>Accept “butanoic acid forms dimers”</em></p>
<p><em>Accept “butanoic acid has larger M<sub>r</sub>/hydrocarbon chain/number of electrons” for M2.</em></p>
<p><em>Accept “butanoic acid has larger «permanent» dipole/more polar” for M3.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>lithium aluminium hydride/LiAlH<sub>4</sub> ✔</p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>butan-1-ol/1-butanol/CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>OH ✔</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.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>
<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>
<br><hr><br><div class="specification">
<p>Graphing is an important tool in the study of rates of chemical reactions.</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The graph represents the titration of 25.00 cm<sup>3</sup> of 0.100 mol dm<sup>−3</sup> aqueous ethanoic acid with 0.100 mol dm<sup>−3</sup> aqueous sodium hydroxide.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_13.41.48.png" alt="M18/4/CHEMI/HP2/ENG/TZ2/02.d.i_01"></p>
<p>Deduce the <strong>major </strong>species, other than water and sodium ions, present at points A and B during the titration.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAxQAAAEBCAYAAADhB+OQAAAWg0lEQVR4Ae3dT4ic93kH8OeVTZKDK4rJIRpoMMXYvTiURKgQBHUao+kfGgwBqdCKEDngS6BFBy8Y55aLnHtIDxqCjQMybik9FEvYiwMiUOPm0F7kwQQXmjgQkcPaB9ngecuudmz5XQ1+kcbPu/O8H4F49b77m/eZ5/O8MztfZmfVtG3bhj8ECBAgQIAAAQIECBC4A4Ejd3AbNyFAgAABAgQIECBAgMCegEDhQiBAgAABAgQIECBA4I4F7l3esmma5T9tCRAgQIAAAQIECBAgcFuB7icmPgoUu1/YDRXdBbc9i4MECBAgQIAAAQIECIxKYFVW8CNPo7oMNEuAAAECBAgQIEBgvQICxXo9nY0AAQIECBAgQIDAqAQEilGNW7MECBAgQIAAAQIE1isgUKzX09kIECBAgAABAgQIjEpAoBjVuDVLgAABAgQIECBAYL0CAsV6PZ2NAAECBAgQIECAwKgEBIpRjVuzBAgQIECAAAECBNYrIFCs19PZCBAgQIAAAQIECIxKQKAY1bg1S4AAAQIECBAgQGC9AgLFej2djQABAgQIECBAgMCoBASKUY1bswQIECBAgAABAgTWKyBQrNfT2QgQIECAAAECBAiMSkCgGNW4NUuAAAECBAgQIEBgvQICxXo9nY0AAQIECBAgQIDAqAQEilGNW7MECBAgQIAAAQIE1isgUKzX09kIECBAgAABAgQIjEpAoBjVuDVLgAABAgQIECBAYL0CAsV6PZ2NAAECBAgQIECAwKgEBIpRjVuzBAgQIECAAAECBNYrIFCs19PZCBAgQIAAAQIECIxKoFCguBHz2elomiYmW9uxM6oxapYAAQIECBAgQIDAMAJ1AsXi7bh66ddx/kc/iEeefyXe2FkMI6oqAQIECBAgQIAAgREJFAkUi9h57bl45n/+PP7me38XZx55MS68NA+RYkRXslYJECBAgAABAgQGESgSKH4fb1y+EnH2sTj+h38cJ898Na5c+kW81UkUi/ksps0kprNrwsYgl5uiBAgQIECAAAEC1QRqBIqd/47Lz0ecnX4ljsYX4sGTfxmnrrwcV9+68Yl5HXnoXFxufxOXz/1J1Gj8E+3ZIUCAAAECBAgQIJAuUOB19Y2Yv/STeDZOxfT4/XuARx78epw5dTWeufgLH85Ov6QUJECAAAECBAgQGJPA5geKvQ9jX41juz/udHS/nSMPxMkzJ+MdH84e07WsVwIECBAgQIAAgQEEmrZt22Xd3V+5esvu8vCh3u5+LuKvHn4irtz2Xn4tnnr15bjwF1+87VcdJECAAAECBAgQIECgn8CqrLDh71Bcj9cu/jiunLoYb37Y7oWh3UB08+/v4tWnIp698O8x73w4ux+ZVQQIECBAgAABAgQIfJrAZgeKvQ9jvx/nnvxmPHigk/vj+PRUHLvNh7M/DcXXCRAgQIAAAQIECBDoJ3DgZXi/mx2GVYvYeeOVeD7+Nv7+sT+6zW9tOhJHTzwe5x/9ZVy6+rZfE3sYRuY+ECBAgAABAgQIlBPY3ECxmMdLF16Mh88/HieWH8bujue+r8S3zn41rjzzXLy2swj/D0UXyD4BAgQIECBAgACBuxPY+A9l3137bk2AAAECBAgQIECAQB+Boh/K7tO6NQQIECBAgAABAgQIfFYCm/sjT5+ViPMSIECAAAECBAgQINBbQKDoTWUhAQIECBAgQIAAAQJdAYGiK2KfAAECBAgQIECAAIHeAgJFbyoLCRAgQIAAAQIECBDoCggUXRH7BAgQIECAAAECBAj0FhAoelNZSIAAAQIECBAgQIBAV0Cg6IrYJ0CAAAECBAgQIECgt4BA0ZvKQgIECBAgQIAAAQIEugICRVfEPgECBAgQIECAAAECvQUEit5UFhIgQIAAAQIECBAg0BUQKLoi9gkQIECAAAECBAgQ6C0gUPSmspAAAQIECBAgQIAAga6AQNEVsU+AAAECBAgQIECAQG8BgaI3lYUECBAgQIAAAQIECHQFBIquiH0CBAgQIECAAAECBHoLCBS9qSwkQIAAAQIECBAgQKArIFB0RewTIECAAAECBAgQINBbQKDoTWUhAQIECBAgQIAAAQJdAYGiK2KfAAECBAgQIECAAIHeAgJFbyoLCRAgQIAAAQIECBDoCggUXRH7BAgQIECAAAECBAj0FhAoelNZSIAAAQIECBAgQIBAV0Cg6IrYJ0CAAAECBAgQIECgt4BA0ZvKQgIECBAgQIAAAQIEugICRVfEPgECBAgQIECAAAECvQUEit5UFhIgQIAAAQIECBAg0BUQKLoi9gkQIECAAAECBAgQ6C0gUPSmspAAAQIECBAgQIAAga5AqUCxmM9i2jQx2dqOnW6ny/3FtZhNJ9FMno7tncXyaGd7I+az09E0x2Nr+3rnax/vVq8XrCLCtbB7xVe/1vW3O+TD+Nzo2tv7jnMoZ+O50XPj/ush1+fNh+naXoPuu27Ypmnbtl3e56Zp4pbd5WFbAgQIECBAgAABAgRGLrAqK5R6h2LkM9Y+AQIECBAgQIAAgXQBgSKdXEECBAgQIECAAAECdQQEijqz1AkBAgQIECBAgACBdAGBIp1cQQIECBAgQIAAAQJ1BASKOrPUCQECBAgQIECAAIF0AYEinVxBAgQIECBAgAABAnUEBIo6s9QJAQIECBAgQIAAgXQBgSKdXEECBAgQIECAAAECdQQEijqz1AkBAgQIECBAgACBdAGBIp1cQQIECBAgQIAAAQJ1BASKOrPUCQECBAgQIECAAIF0AYEinVxBAgQIECBAgAABAnUEBIo6s9QJAQIECBAgQIAAgXQBgSKdXEECBAgQIECAAAECdQQEijqz1AkBAgQIECBAgACBdAGBIp1cQQIECBAgQIAAAQJ1BASKOrPUCQECBAgQIECAAIF0AYEinVxBAgQIECBAgAABAnUEBIo6s9QJAQIECBAgQIAAgXQBgSKdXEECBAgQIECAAAECdQQEijqz1AkBAgQIECBAgACBdAGBIp1cQQIECBAgQIAAAQJ1BASKOrPUCQECBAgQIECAAIF0AYEinVxBAgQIECBAgAABAnUEBIo6s9QJAQIECBAgQIAAgXQBgSKdXEECBAgQIECAAAECdQQEijqz1AkBAgQIECBAgACBdAGBIp1cQQIECBAgQIAAAQJ1BASKOrPUCQECBAgQIECAAIF0gVKBYjGfxbRpYrK1HTurKBfXYjadRDN5OrZ3FitW3Yj57HQ0zfHY2r6+Yk1E9XrBKiJcC7sPgOrXuv52h3wYnxtde3vfgA7lbDw3em7cf3nk+rz5MF3ba9B91w3bNG3btsv73DRN3LK7PGxLgAABAgQIECBAgMDIBVZlhVLvUIx8xtonQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI7AZgeKxbWYTSfRNM3Bv9/Yitn2PN6rMyudECBAgAABAgQIEDh0ApsdKJacpy7Gmx+20bbLv+/Hby58OX7+D9+Of/zX/43Fcp0tAQIECBAgQIAAAQJrFagRKA6QfC6OnTgT3zn7+Zj986vxlkRxQMgBAgQIECBAgAABAusQKBooPqY59qcPxJf2u1zMZzFtJjGdXfOuxcdE/kWAAAECBAgQIEDgjgXuveNbHuobfhDvvH4pXrj+3fi3H56Mo/v39chD5+Jye+5Q33N3jgABAgQIECBAgMAmCdR4h+LKE/HwPbd+MPvzMfmz78fsV7+O/3v3xibNw30lQIAAAQIECBAgsFECNQLFgQ9lfxjvvvkv8VT8NL795MX4r/d8iGKjrkp3lgABAgQIECBAYGMEagSKA9xH4r6H/jqeOHsy4rUX4sXXf39ghQMECBAgQIAAAQIECNy9QNFAsQvzufjSAw/Gsbs3cgYCBAgQIECAAAECBFYIFA4UH8Rv334r3jl2KqbH71/RvsMECBAgQIAAAQIECNyNQNFAsYj35v8RF5//ZTx6/vE4cbRom3czebclQIAAAQIECBAgsAaBGq+0D/yWp3viD578z3j4ny7Fz86fiPv2ofw/FGu4YpyCAAECBAgQIECAwC0CTdu27XK/aZq4ZXd52JYAAQIECBAgQIAAgZELrMoKNd6hGPlwtU+AAAECBAgQIEBgKAGBYih5dQkQIECAAAECBAgUEBAoCgxRCwQIECBAgAABAgSGEhAohpJXlwABAgQIECBAgEABAYGiwBC1QIAAAQIECBAgQGAoAYFiKHl1CRAgQIAAAQIECBQQECgKDFELBAgQIECAAAECBIYSECiGkleXAAECBAgQIECAQAEBgaLAELVAgAABAgQIECBAYCgBgWIoeXUJECBAgAABAgQIFBAQKAoMUQsECBAgQIAAAQIEhhIQKIaSV5cAAQIECBAgQIBAAQGBosAQtUCAAAECBAgQIEBgKAGBYih5dQkQIECAAAECBAgUEBAoCgxRCwQIECBAgAABAgSGEhAohpJXlwABAgQIECBAgEABAYGiwBC1QIAAAQIECBAgQGAoAYFiKHl1CRAgQIAAAQIECBQQECgKDFELBAgQIECAAAECBIYSECiGkleXAAECBAgQIECAQAEBgaLAELVAgAABAgQIECBAYCgBgWIoeXUJECBAgAABAgQIFBAQKAoMUQsECBAgQIAAAQIEhhIQKIaSV5cAAQIECBAgQIBAAQGBosAQtUCAAAECBAgQIEBgKAGBYih5dQkQIECAAAECBAgUEBAoCgxRCwQIECBAgAABAgSGEhAohpJXlwABAgQIECBAgEABAYGiwBC1QIAAAQIECBAgQGAogVKBYjGfxbRpYrK1HTurRBfXYjadRDN5OrZ3FitW3Yj57HQ0zfHY2r6+Yk1E9XrBKiJcC7sPgOrXuv52h3wYnxtde3vfgA7lbDw3em7cf3nk+rz5MF3ba9B91w3bNG3btsv73DRN3LK7PGxLgAABAgQIECBAgMDIBVZlhVLvUIx8xtonQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuIFCkkytIgAABAgQIECBAoI6AQFFnljohQIAAAQIECBAgkC4gUKSTK0iAAAECBAgQIECgjoBAUWeWOiFAgAABAgQIECCQLiBQpJMrSIAAAQIECBAgQKCOgEBRZ5Y6IUCAAAECBAgQIJAuUCpQLOazmDZNTLa2Y2cV5eJazKaTaCZPx/bOYsWqGzGfnY6mOR5b29dXrImoXi9YRYRrYfcBUP1a19/ukA/jc6Nrb+8b0KGcjedGz437L49cnzcfpmt7DbrvumGbpm3bdnmfm6aJW3aXh20JECBAgAABAgQIEBi5wKqsUOodipHPWPsECBAgQIAAAQIE0gUEinRyBQkQIECAAAECBAjUERAo6sxSJwQIECBAgAABAgTSBQSKdHIFCRAgQIAAAQIECNQRECjqzFInBAgQIECAAAECBNIFBIp0cgUJECBAgAABAgQI1BEQKOrMUicECBAgQIAAAQIE0gUEinRyBQkQIECAAAECBAjUERAo6sxSJwQIECBAgAABAgTSBQSKdHIFCRAgQIAAAQIECNQRECjqzFInBAgQIECAAAECBNIFBIp0cgUJECBAgAABAgQI1BEQKOrMUicECBAgQIAAAQIE0gUEinRyBQkQIECAAAECBAjUERAo6sxSJwQIECBAgAABAgTSBQSKdHIFCRAgQIAAAQIECNQRECjqzFInBAgQIECAAAECBNIFBIp0cgUJECBAgAABAgQI1BEQKOrMUicECBAgQIAAAQIE0gUEinRyBQkQIECAAAECBAjUERAo6sxSJwQIECBAgAABAgTSBQSKdHIFCRAgQIAAAQIECNQRECjqzFInBAgQIECAAAECBNIFBIp0cgUJECBAgAABAgQI1BEQKOrMUicECBAgQIAAAQIE0gUEinRyBQkQIECAAAECBAjUERAo6sxSJwQIECBAgAABAgTSBQSKdHIFCRAgQIAAAQIECNQRECjqzFInBAgQIECAAAECBNIFBIp0cgUJECBAgAABAgQI1BFo2rZtd9tpmqZOVzohQIAAAQIECBAgQOAzEdiPDx+d+97lv7pfWB63JUCAAAECBAgQIECAwCoBP/K0SsZxAgQIECBAgAABAgQ+VUCg+FQiCwgQIECAAAECBAgQWCXw/2rCmen1ok7yAAAAAElFTkSuQmCC"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the pH of 0.100 mol dm<sup>−3</sup> aqueous ethanoic acid.</p>
<p><em>K</em><sub>a</sub> = 1.74 × 10<sup>−5</sup></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>Outline, using an equation, why sodium ethanoate is basic.</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>Predict whether the pH of an aqueous solution of ammonium chloride will be greater than, equal to or less than 7 at 298 K.</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>Formulate the equation for the reaction of nitrogen dioxide, NO<sub>2</sub>, with water to form two acids.</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>Formulate the equation for the reaction of one of the acids produced in (e)(i) with calcium carbonate.</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>A: CH<sub>3</sub>COOH/ethanoic/acetic acid <strong><em>AND </em></strong>CH<sub>3</sub>COO<sup>–</sup>/ethanoate/acetate ions</p>
<p>B: CH<sub>3</sub>COO<sup>–</sup>/ethanoate/acetate ions</p>
<p> </p>
<p><em>Penalize “sodium ethanoate/acetate” </em><em>instead of “ethanoate/acetate ions” only </em><em>once.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{K_{\text{a}}} = 1.74 \times {10^{ - 5}} = \frac{{{{{\text{[}}{{\text{H}}^ + }{\text{]}}}^2}}}{{0.10}}">
  <mrow>
    <msub>
      <mi>K</mi>
      <mrow>
        <mtext>a</mtext>
      </mrow>
    </msub>
  </mrow>
  <mo>=</mo>
  <mn>1.74</mn>
  <mo>×</mo>
  <mrow>
    <msup>
      <mn>10</mn>
      <mrow>
        <mo>−</mo>
        <mn>5</mn>
      </mrow>
    </msup>
  </mrow>
  <mo>=</mo>
  <mfrac>
    <mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mtext>[</mtext>
            </mrow>
            <mrow>
              <msup>
                <mrow>
                  <mtext>H</mtext>
                </mrow>
                <mo>+</mo>
              </msup>
            </mrow>
            <mrow>
              <mtext>]</mtext>
            </mrow>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mn>0.10</mn>
    </mrow>
  </mfrac>
</math></span></p>
<p><strong><em>OR</em></strong></p>
<p>[H<sup>+</sup>] = 1.32 × 10<sup>–3</sup> <strong>«</strong>mol dm<sup>–3</sup><strong>»</strong></p>
<p><strong>«</strong>pH =<strong>» </strong>2.88</p>
<p> </p>
<p><em>Accept </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">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>forms weak acid and strong base, thus basic<strong>»</strong></p>
<p>CH<sub>3</sub>COO<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> CH<sub>3</sub>COOH(aq) + OH<sup>–</sup>(aq)</p>
<p> </p>
<p><em>Accept →</em><em> </em><em>for <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span></em><em>.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>less than 7</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">d.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>2NO<sub>2</sub>(g) + H<sub>2</sub>O(l) → HNO<sub>2</sub>(aq) + HNO<sub>3</sub>(aq)</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>2HNO<sub>2</sub>(aq) + CaCO<sub>3</sub>(s) → Ca(NO<sub>2</sub>)<sub>2</sub>(aq) + CO<sub>2</sub>(g) + H<sub>2</sub>O(l)</p>
<p><strong><em>OR</em></strong></p>
<p>2HNO<sub>3</sub>(aq) + CaCO<sub>3</sub>(s) → Ca(NO<sub>3</sub>)<sub>2</sub>(aq) + CO<sub>2</sub>(g) + H<sub>2</sub>O(l)</p>
<p><em><strong>[1 mark]</strong></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;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>A student titrated two acids, hydrochloric acid, HCl (aq) and ethanoic acid, CH<sub>3</sub>COOH (aq),&nbsp;against 50.0 cm<sup>3</sup> of 0.995 mol dm<sup>–3</sup> sodium hydroxide, NaOH (aq), to determine their&nbsp;concentration. The temperature of the reaction mixture was measured after each acid&nbsp;addition and plotted against the volume of each acid.</p>
<p><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 solutions.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the maximum temperature reached in each experiment by analysing the graph.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why the enthalpy change of neutralization of CH<sub>3</sub>COOH is less negative than that of HCl.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<p>21.4 °C</p>
<p><em>Accept values in the range of 21.2 to 21.6 °C.<br>Accept two different values for the two solutions from within range.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>HCl:</em> 30.4 «°C»</p>
<p><em>Accept range 30.2 to 30.6 °C.</em></p>
<p><br> <em>CH<sub>3</sub>COOH:</em> 29.0 «°C»</p>
<p><em>Accept range 28.8 to 29.2 °C.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>COOH is weak acid/partially ionised</p>
<p>energy used to ionize weak acid «before reaction with NaOH can occur»</p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Sulfur trioxide is produced from sulfur dioxide.</p>
<p style="text-align: center;">2SO<sub>2&thinsp;</sub>(g) + O<sub>2&thinsp;</sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>&#8652;</mo></math> 2SO<sub>3&thinsp;</sub>(g)&nbsp; &nbsp; &nbsp; &nbsp; &nbsp; &Delta;<em>H</em> = &minus;196&thinsp;kJ&thinsp;mol<sup>&minus;1</sup></p>
</div>

<div class="specification">
<p>The reaction between sulfur dioxide and oxygen can be carried out at different temperatures.</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, giving a reason, the effect of a catalyst on a reaction.</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>On the axes, sketch Maxwell–Boltzmann energy distribution curves for the reacting species at two temperatures T<sub>1</sub> <strong>and</strong> T<sub>2</sub>, where T<sub>2</sub> &gt; T<sub>1</sub>.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the effect of increasing temperature on the yield of SO<sub>3</sub>.</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>Draw the Lewis structure of SO<sub>3</sub>.</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 the electron domain geometry of SO<sub>3</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 the product formed from the reaction of SO<sub>3</sub> with water.</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>State the meaning of a strong Brønsted–Lowry acid.</p>
<div class="marks">[2]</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>increases rate <em><strong>AND</strong> </em>lower <em>E</em><sub>a</sub> ✔</p>
<p>provides alternative pathway «with lower <em>E</em><sub>a</sub>»<br><em><strong>OR</strong></em><br>more/larger fraction of molecules have the «lower» <em>E</em><sub>a</sub> ✔</p>
<p> </p>
<p><em>Accept description of how catalyst lowers E<sub>a</sub> for M2 (e.g. “reactants adsorb on surface «of catalyst»”, “reactant bonds weaken «when adsorbed»”, “helps favorable orientation of molecules”).</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUEAAADjCAYAAAAbraZgAAAgAElEQVR4nO3df1iT59k38G8q1UbRVgRb06BWXdTWCsqP0aGC1qG0XeGJtZ3Uxr4z2M5G9uBbkKF9rG2hFHzHBqnrgz8eTX10Vs2wRcHMuaSQlTIUYlklWbUqEaZCsEiJtcj9/mFDUSCSkOS+7+T8HEeOHoVwXyeKJ9fP8xIwDMOAEEJ81D1sB0AIIWyiJEgI8WkeS4JWqxUCgQBms9lTTRJCyF15JAlarVakpKQAAKRSKSVCQghnuD0J2hJgSEgIACA/P58SISGEMwTuXh1WKpUAAIVCAYFAAIZhoNfrkZeXh+LiYnc2TQghd+X2JHhbYz8kQUII4QpaHSaE+DRKgoQQn0ZJkBDi0ygJEkJ8GiVBQohPoyRICPFplAQJIT6NkiAhxKdREiSE+DRKgoQQn0ZJkBDi0ygJEkJ8GiVBQohPoyRICPFplAQJIT6NkiAhxKdREiSE+DRKgoQQn0ZJkBDi0ygJEkJ8GiVBQohPoyRICPFplAQJIT6NkiAhxKdREuSCzhPYPEUAgaD3a8rmE+hkOz5CvJiAYRjGY40JBPBgc7zUeWIzpr0A7Kt/HWF+bEdDiPejniAhxKdREiSE+DRKgoQQn0ZJkBDi0ygJEkJ8Gq0/eoDZbMb58+dx6dIlAIC/vz8mTpwIiUQywCd8h6bjH+L4mGV4MWSE+wIlxAdRT9BNTCYTlEolIiMjoVAooNPpbvtcXl4eBAIBsrOzYTKZuj/nF/Y6vvqq5/aYFnyWtQIvvl2Kpk7aXkSIq9E+QRezWCzIycmBVqtFRkYGYmNjERAQ0O97tVotcnJyEBsbi5SUFIjF4jve1YXvrl+H5UgO/ndCOl4P83f/N0GID6GeoAtpNBqMGTMGUVFR0Ol0kEql/SZAAAgICIBUKoVOp0NUVBSCg4Oh0WjueNc9GHbfUPcGTogPozlBF7BarcjPz0dVVRUaGhr66M3ZJxQKIZVK0dDQAIVCAZPJBIVC4aZoCSE90XB4kKxWK1JSUjB69Ghs2rQJQqHQJc8DgIKCgu7nMde/RYffcIzwEww6ZkLIjygJDoItYYWEhLi059ZfIiSEuB7NCTrJXQkQuDU8LigoAABs377dpc8mhNyOkqCTNm7ciNGjR7tt7s6WCA0GA9RqtVvaIITQwohTVCoVWltbu3tr7iIUCrFx40ZIpVJMmjQJoaGhbm2PEF9Ec4IOqq2txapVq6BWqx1eBR5smzqdjuYHCXExGg47wGKxYNWqVSgqKvJYAgSA0NBQxMbGorS01GNtEuIrqCfogPT0dDzwwAPIzMz0eNsmkwnLly+n3iAhLkY9wQHS6/XQarVITU1lpX2JRILY2FicPHmSlfYJ8VaUBAfAarUiNTUVRUVFrPbC5HI58vLyWGufEG9ESXAA9u/fj9jYWNZXZ22lt/R6PatxEOJNBjwnyFxvwul/XoFw8nQ88sC9zjXGwzlBi8WCMWPGoKWlxW4xBE/R6/XIy8tDcXEx26EQ4hXs9AQZdDYdx+ak1/HR+TM4vPYXeCw8BDOlefj0iu/chLtnzx4UFhZyIgECQHR0NADqDRLiKnaS4Deo3vEOto+Nwqzmv6Lwjw/hD7UmHAgpQdYnX6HLczGyxmKxYM2aNUhKSmI7lNukpaXh0KFDbIdBiFewkwSvodHUhsh5szDsq8/x9xnRiPxJEO4PHIIzlm99IglqtVpO9QJtoqOjodVqb6tITQhxjp0kOAYzYqbiLzuy8PYHOjy+Yh5EX/4Jf9x1D5J+OtEnztvl5OQgLi6O7TD6lJGRgQMHDrAdBiG8ZycJDodElgf1slmY+stC7Hw1HMJrAkzL2YL0OWM8FyFL9Ho9YmNjHbgMybPi4+NRXFwMi8XCdiiE8Jr9LTJ+YzBhqghDv/4Y736gh8VvJMaJRuM+H6jruXPnTiQkJLAdRr+EQiFkMhn27NnDdiiE8JqdJHgTrZ8V4MWX9uGspR47v7iM636N+LP0NWwxtHkuQhaYTCYYDIbulViuSkpKwpo1a2C1WtkOhRDespMEm1G1788YlfkW0hdPBTAUY5/4FV6XX8ZO3de46bEQPU+j0SAjI4PtMO4qICAAWVlZVFiBkEFw7MQIcwMd177HiKFD3BQO+6xWK9asWYPY2Fi2QxmQ5557DiqViu0wCOEtO0kwEJEv/Afasv8LuWVG4IIWuzf+J9YcDocibhK8NQ2WlpYiKyuLc9ti+kNH6QgZHDtJcAhGP5GCfX96EZMDpkE2/ltcFMxHfsm7eH7ScM9F6GEqlQrPPfcc22E4hDZPE+K8u2z3G4agkASsCeHuKqkr1dbWAgBnt8X0Z/bs2UhNTYXZbPZosVdCvEEfPcFGlLw6HQKBoJ/XdLxa0uj5SD3gyJEjWL16NdthOEwoFEKhUFBRBUKc0EcVme/QbDqN89duAkwrvjxwAP+atRwJky9jf5IcdSt24L1X4vFY4DDHG+NwFRlbtZiOjg5eVm7me/yEsKWPnuAwBEpCERY2E6J/H8HbB64icMpjCAubg6UZL+Pb/7cLf734necjdTOtVousrCzeJpCAgACkpaWhvLyc7VAI4RU7CyNXcKLkUzy68R2sCRsNCMYi7Fcb8JbCO/cJqlQqPPXUU2yHMShJSUnYsmUL22EQwit2kuBQDL9/KC5fakX3eQSmHVfMVgT5D4M3nZyzVWNhu3L0YIWGhqKxsRFms5ntUAjhDTuVpRlcN+3Br595B+cXPIf4KcNwpepjbGtORPG+dMwLcryODFfnBJVKJUQiEaRSKduhDJpKpcKFCxfw/PPPd3/s3LlzaG9v7/7/SZMmYfjwH7c5BQYG8mZfJCGudpfy+jfRfuEEtMc+R72lE/7jHsMTcTEICXJ8UQTgZhK0Wq0YPnw4Z8rnO8tqteLkyZPIzs6GTqe7bZV7/PjxEIlE3f9fWVl529dqtVr84x//QEJCAiQSCWbMmIHJkydjwoQJtOWGeD2fv3dYr9fj0KFDyM3NZTsUp1itVpSWliInJwexsbFISEjAzp078fLLLztcAMJsNqOjowN1dXWor6/v3nIjk8kwa9YszJ49m7cLR4T0i+nlIvPJK3OYVz4xMrV/WMwAuOM1jXnlk4u9v2wA+myOZXK5nKmoqGA7DKdUVFQwCQkJTFpaGmM0Grs/fvToUSYrK8slbTQ0NDBHjx5l5HI5ExERwRQWFjItLS0ueTYhXNDPPkEjLAFTILKehfHyHdthmBtA4EyETRzhcMLlWk/QYrFg8eLFqKqqYjsUh5jNZhQUFMBkMiE3N7fXCRfbEN/VewYtFgtKSkqgVCohk8mQlJTE6ykEQoB+9wnOhCSQwZk/pyNZ74fQsDCEhYUhLGwa/P7+Fl44UA9vuG+upKQEMpmM7TAcolarERwcjKioKBQXF/d5xE8oFCIrKwsnT550adsBAQGQyWTQ6XQYNWoUFi9eDI1G49AzOk9sxpQ+TyLNx+YT7Xd/ACGu1rtz+D1zuSyd+UmvYbDtNZFJVJmYm050O/tsjkUJCQlMQ0MD22EMSENDAyOXyxm5XD6gmCsqKlw2JLYXk2043tHR4eBXX2Oq82KZyXnVzPduiY6QgemjJ+iHoCfTUFL9MZYDAN5AZXU1qm2v2r/hf5ZNcbAQIffYiiXwYfVTr9dDKpUiPj4eW7duHVDMs2fPxvr16916B4lYLMbevXsxfvx4LFu2jPYnEl7qe7OfXyAkYT/Dqjfm4+Kon2PSY7MQdB/f097tKioqeDEUViqVUKlU2L17t0PVbWxD4urqarfemGcr3iCRSBAcHIyKigrOX0tASE92MtsIPDhxLP6RNg9jhUO8qooMH6pHW61WJCcnw2AwoKyszKnyXjExMdi/f78boustLi4ORqMRqampVOma8IqdYx/3QvTzDdBWp93x8SEYOYHfV26ePHkSaWlpnF3ZNJvN2LRpE0JCQqBQKJx+TnR0NFJTU2GxWDzyvUokEqjVamzatAltbW2Dip0QT7FbWdo/eMYPq8I9X6GQOFFGi0sOHTrE2es0zWYzpFIp5s6d65IkIpPJUF1d7YLIBkYsFqOgoAAGgwHJycl0Ex7hPPsTfZ0WmMqPQK1Wd78OfvgBdlQ2eyg817NYLMjLy8Ps2bPZDqUXWwLMz8932XzlnDlzPF5ZRigUoqCgAI888ghSUlIGnAi7mvR4/9VoBDzzBg5++Q24s6OUeLX+F46vM2dUyxn/yfOYp2N/wsD239EyZnv9NaeWou025yGuPE3hSg0NDUxERIRbTq9ERESwthWosLCQkcvlA9hCY2VMfypgDpy1Ml1X/8qskx9kGj0SIfF1dnqCl1F77As8uXE7it9fizk3F2HDJyVQxV3GuTtPkfDI/v37OVc3sGcP0B0rqwqFAsePH3f5cwfadkhIyAB6hPfhJy+swZJHBPh3ZRW+nfco+D3zTPjCbj3BEaOHg/m+EwgS47Hmr3C+NRCPhl/Hns/P8fLEiMVigcFg4FTdQHcnQABYsGABlEqlW549EANOhMw3MH2Ug7yLT+Hd5dMw1HMhEh9213uHr73+G7xnDML8Z2vxwdvr8V5RM+ZNCuLlvcNcOyZntVqxadMmyGQyt+6tE4vFEIlE3RvE2XD3RPgdvv4oDU/lnoW/RYMPdp/AVY9HSXzRXUppfYfmL7/A5bEhkDD/RIn6U1x6cB6kz4QgyM/x2tJsF1BITEzEm2++yYmeoNVqRUpKyqC3wQyURqOByWRifdtKcnIyHnnkEWRmZt7xGQad7RZcuXYDACAQjsaDD9znVRXMCTfZXx1mOmG1mHAkLwUrXy+EtvkBSEImIdCJBMg225EuLiRAANi+fTsAeCwphYeHY82aNaxvWSkoKMDXX3/dx/BcAD//MRg3bhzGjRuHhygBEg+xkwS/R9PhN/Dky/tw8eEn8GzCz/E48zeseyoDH53t8FyELnL8+HHOlM9Xq9UwGAwoKCjwWJu22+hcXVnGUbbtMwaDgU6WEG7of+H4AnNQFsIkqP7FdHV/rIX59I2fMbP+UMt0OrEUbbc5N+NKxZiKigrWtqxUVFQwaWlpHm+3L+7cEkSII+z0BO/H5LApuPzPr/DvzlvzeMz1K7jQMAJRkwJ4VUXGdpsc2xVjzGYzUlNTUVRUxEoss2fPhlardWtlmYESi8VQq9WYM2dO998PIWywu0VGOHokLr8XD0nUL/DSihfxiznzsXznOZxWZeLlFf8Ha/aZeHH/sEajYX0obFsJzsjIYG1eUigUQiaToaSkhJX27yQWi1FRUYHly5dTGS7CGjurw51oNhzHp2f6q/Z7D+6bHI34kKABT2CztTocGRkJtVrNak8wOzsbAPpYFfUsk8mE9PT07kuUuECtVqO0tBQFBQV0kRPxODtVZPwQGBIHaYjngnGH2tpaiEQiVhOgRqNBVVUV9u7dy1oMNraSXLW1tZxZKZdKpWhsbMTGjRt5e+sf4S8+Te05paKigtWhsNlsxqJFi6BUKjnTy1m9ejWOHDnCdhi3WblyJVpbW2nFmHhc7+Fw1wUc/+NfgGeXIRJf4ywm4PFgf5fs2WJjOMzmUNhqtWLZsmVYvXq1W6s7O4qrF87bbv9z5xFCQu7UuyfYdQUn8/8bRw310G9dhYStelxsakJT9+syrl7vYiFUx7E9FN6+fTskEgmnEiBwa4GksLAQWq2W7VBuExAQgN27dyM1NZUWSojn9N418w1T+8ckZnK/t81NZmQHLzi1H6fP5tyosLCQ2bVrl0fbtKmpqWEiIiKcuIXNM4xGI5OQkMB2GH06evQok5CQwNk/O+Jd+lkd7kR7cwOq/vsVrMU6HP7Voz26jEMgHB2IB5y4eMnTw2G2hsK2YV1RURFnFh/6wqWz1HdSKpW4cOECLZQQt+snk/nBP/ARLFj/CUqfvIy9v38LGRkb8N4HH+PktWG4nwc3z7E5FM7JyYFMJuNkcumJiwskNraFErVazXYoxMvZyWY30fpZAV6U/enHs8P3VmJTwm95cXaYrVVhW7WWlStXerxtR82dO9ftdxM7SygUYuPGjcjJyWG1BBjxAf2PlC8yn7wSxjy7/TTzfffH+HN2mI3zuS0tLUxERARjNBo92u5gsDlvOhC2s9YtLS1sh0K8lN3b5u697x5Yb3T+eOENcwMd177HiKHcLqlqMplYGQrn5OR0X0TOF4mJiaxWnb6b6OhoKBQKrFu3ju1QiJeykwTHImb1b/Dw75Zi0atvIG/zO0h/4VksMyQia8k0TleWrqys9PhQ2DYMXrp0qUfbHSyxWIyQkBDo9Xq2Q+mXrRo4baQm7nCXytI30f51JTR/O4mzlk74j3sMT8TFICTIuXuHPbU6bOvdeKonaFsN3r17N696gTZ6vR55eXmcOk98J76suBP+uUsSdHFjHkiCZrMZCoXCo/+gs7OzMWrUKNZL1w9GYmIicnNzOZ3Ea2trsWrVKpSVlXHqpAvhN+7vdXGQpytI19bWori4mBerwfbIZDIcOHCA7TDsCg0NpflB4nJelwTVajVmzpzpkbasVitWrVqFoqIizhRHcFZ8fDyKi4s5uV2mJ5ofJK5mfzjc2Yqz1f/AqcZ2/Hha+F4EzVqAuY+McLwxNw+HbXf4VlVVua2NnlQqFerq6rzmVINtlZjrw3qaHySuZCcJdsC0IxlhvzEiJvExjOnuMw7H4/K38PrcIMcbc3MSVKvVaGxs9Mg/YpPJhOXLl3vV/JTFYsGYMWPQ0dHB+Z6tbX6Q7WK5hP/sJMEGqFf8AqqFB/Dnl6bwopRWcnIyXnvtNY/0DpKTkxEfH8962X5XUyqVEIlEvPi+qCI1cQW7+wTDE2LR8U8jGnhQOstiscBgMHgkAWo0Gly5coUXicJRcXFxyMnJYf1+4oGQSqUYPXp09x3OhDjDThLsRKvZiL+89wwmCIdAIBD88JqOV0saPRfhAFVXVyMxMdHt7VitVmzYsMFr5gHvJJFIEBsbi9LSUrZDGZBNmzZBpVJxerM34TY7w+GbaG84DePl7+74+BCMnDAdkkDHN0y7czicnp6OhIQEt1ckViqVaGtrY/3CJHfi4mVM9pjNZgQHB6OhoYHmB4nDvGKztK1cvLsn9L1xMaQ/nvql4ip6vR6pqanQ6XQ0P0gccpck+B2aKtX43z9/ii/+fQOjJ0bi5y/+Ek9J7ndqocRdSVCv10On07m9d+atiyF94VtvELjVSzcYDNi6dSvboRAe8Yp6gjqdDuHh4W5tQ6/Xe+1iSF8kEgkkEgmv5tpsW6O4XBWHcFD/Vbb4U0/Q3fXmOjo6mIiICKampsZtbXARl+8h6Y/t7+ro0aNsh0J4gvf1BGtraxESEuLWObrS0lLExsb63OkEPvYGhUIh1Go1NmzYAJPJxHY4hAfszAkyuG7ag18/8w7OL3gO8VOG4UrVx9jWnIjifemYF+TneGNumBNUKpUYNWpU95lSV7OdovDVlUfbYhDfFhxsCyV0ooTcDe/rCbq7diBfztO6U3p6OqKiong3H6pWq6FSqbB3715eJXDiYb1HyBeZT16Zw7zyiZGp/cPiPu4dnsa88slFp8befTY3CA0NDW6dszIajZy+O9hT+PznUFhYyMjlcl7GTjyjj57gd2g2GWEJmAKR9WzvzdLMDSBwJsImsl9FRqVSoa2tzW29NL72gNyBz38WycnJCAkJ8enePOlfHwsjwxAomQlJIIMzf05Hst4PoWFhCAsLQ1jYNPj9/S28cKAenZ6PtZfy8nLMmTPHLc+ura2FyWRCfHy8W57PNxkZGViyZAnn6w32paCgAAaDgWoQkr717hx+z1wuS2d+0msYbHtNZBJVJuamE93OPptzUktLi1uv8ExISGAqKirc9nw+KiwsZAoLC9kOwykNDQ1MREQE/Z2SXvpeGOlshslQj5qP1uMd/Brbn//Jj7fL+Y3B5Mcm4AE/x8+MuHI47M5TIny4eIgNVqsVMTExvL1QylZ0Nz8/nzfHAYn79b1P0C8QkrA5eCHnE3y82B/fjZ2BsNkitP1diy+tQ+HvRAJ0NZ1Oh5iYGJc/12q1IjU1FW+++abLn813QqEQGRkZ2LZtG9uhOEUsFqOoqAipqakwm81sh0M4ws5m6e/RdPhNLErejZrLHQCGYNSIi9jx1GvYYmjzWID9Wb9+PaZPn+7y5/rqxuiBkkqlMJlMvNpA3VNoaCjy8/MhlUopEZJb+h8p3zo2l6D6F9PV/TFuHJurqalh5HK5S57Vk+3IldFodPmzvQmft8zYHD161O3HLQk/2OkJDsXw+4fi8qVWdNcYZtpxxWxFkP8wl5Tbd1ZFRYVbVm1tvUA+znd5kkQiQWJiIvbv3892KE6Li4uDTCbDunXreFFFm7gPL4/NueOUCN8n/T3NduMb34+l2cpv0T0lvuvux+YunID22Oeo58ixOXddq+nujdfeyHbREd/r91Ei9G32L1/v/AaN55tx44GHMWnSBIwVtuOrsv/BjspmD4XX25dffunyYgkWiwUrVqxAUlKSS5/r7WynR9RqNcuRDI5CoUBISAhSUlJoaOyD7PQEv8PZD+UI2XQBMcFNONwwDk8HN+Gw4Qls/+x9/Gqqv+ONuaAn6I5rNalIgvO85X4Pq9WKlJQUAKAeoY8Z0L3DB8KOYf7TFuR98Rz+Jf8N/vXabrw1d4zjjQ0yCbrjLhFbqayWlhavvzfEXbxlWEyJ0DfZXR0eMXo4mO87gSAxHmv+CudbA/Fo+HXs+fwcK2eHT548ibS0NJf+cO7ZsweFhYWUAAfBW4bFQqEQBQUFAEBDYx9i98rN1s9+hyVPH8OTH7+FKX/8NT4Y8VMEaSvgn3MY26XjHd4mM9ieoFKphEQiQVxcnNPP6MnWs6Re4OB5y7AYoB6hr7HTE/wWFwwm3K9YiYRps7Hk9zvwm7DpeDL3Q7z3bDAr+wRVKhUeffRRlz2vtLSUeoEuIhaLcfToUSgUCt73oKhH6FvsHptrazyDb0aNw4P+Q+AXFIrEV1LwSmIoglg4O2w2myESiVzWy7BarcjJyXFZr5Lc2oAskUiwfft2tkMZNKFQiK1bt9KqsQ+wkwRH4MGJY/GPtHkYKxwCgUDww2s6Xi1p9FyEP6iqqsLChQtd9jw6HeIemzZtgkql4u3Z4jvR9hnvZ3dOsL3hdO/K0hiCkROmQxLo+IbpwcwJunJrDJ0OcS/b5Ux8P03Sk1KpxLFjx9x6nw1hRx9J8Ft8Xf4pzOJ5mPuI4yX07TbmZBJ09dYYjUaDY8eOITc3d9DPIn3TaDTYsmWLV11ypFKpoFQqvSq5kz6HwxbUbHsD22osAG6itfz3+NXmcrR6PLQfuXprzJYtWyCXy13yLNK3uLg4LFy4sHuV1RvIZLLuMly1tbVsh0NcxP6xOTC4fqUe//PFFVz3TDx9qqmpcdl8oF6v775UnLjXypUrAfx4IscbREdHIz8/H6tWrfKaeU9fd5ckyA2u3BqTl5dHvUAPsW01OXbsGO83UvcUHR0NtVqN1NRUr0rwvqqfJNgF69XLaGr6Ny5f/RawXsXlpiY0NTWhqekyrl7v8liArtwaY/vNTb1AzxEKhVAqlcjJyfGqnpNYLEZZWRkMBgOys7Np5ZjPetdZvcAclE3u56Y5MMBkRnbwglMVXPts7i4OHjzoshvO6AY59njrbW8dHR1MVlYWI5fLmYaGBrbDIU7oozLqWMxbfwDVKTf7SZtDMHLCWPdk5D5UVla6pMSVrRdCt4yxQywWQ61We91tb0KhEJmZmd3fW1FREd1PwzeezLiONtfR0cEAcMldFtQL5Iaamhqv7BEyzI/f265du9gOhTiA0wsjRqMRcrl80Ftj9Ho9goKCvKb3wWehoaHdiwreNEcI3PreysrKUF5ejuTkZFgsFrZDIgPA6SToqguV8vLykJaW5oKIiCvYhsapqaletWoMAAEBAdi6dSvmzp2LxYsX035CHuB0Ejx27BgiIyMH9QzaF8hNtkRoO4XhbaurMpkMu3fvxqpVq2j1mOM4mwQtFgsaGxsHtTXGarUiNTWV9gVylFgsxt69e2EwGLyyQIFEIoFOpwMAxMTEUK+QozibBKurq5GYmDioZ1ClGO7rWbJq2bJlMJvNbIfkUrbV46Kiou5eIc0Vcgunk2BMTIzTX2+rF0i9QH5QKBRYvXq1157LDQ0NhU6ng1gs7r6vmXADZ5NgcXExpk+f7vTXUy+Qf+Li4rp7TBqNhu1wXE4oFEImk0GtVqOyshKJiYlet0LOR3e5fN3FjQ2wlJbJZEJ6ejqKi4udasdWL5BKHvGT2WyGQqHAwoULsXLlSq8pxXWn2tpavPnmmwCAtLQ02sLFEk4mQZVKBQBOX7JO9wjzn9VqxcaNG9Ha2or33nvPq++B0ev1yMvLAwCsXr0ac+fO9drEz0WcTIKDqSJN9wh7F6VSCZVK5RNVwGtra7Fnzx5otVrIZDIkJibSSMYDOJcEB1tFOjs7G2Kx2OleJOEevV6P1NRUvPPOOz5xMZbFYkFJSQmUSiVEIhFWr16N8PBw+qXuJpxLgrbfhs6UvrfdbaHT6Wg44WVs84SRkZFITU31mb/f2tpaHDlyBOvXr0dWVhZiYmIwe/Zsn/n+PYFzq8MVFRWIiopy6mu3bduGjIwM+gHxQraN1VevXkVKSorX7SfsT2hoKDIzM9HR0YGYmBjs3LkTMTExUCqVXrmViA2cS4LOHpXT6/UwmUyQSqVuiIpwgVAoRG5uLuLj4yGVSn1qe4lQKER0dDS2bt2KsrIySCQSvP/++4iMjKSEOEicGg5bLBYsXrwYVVVVDj87MTGRthn4ENvUR2Jiok8Nj+9ksVhQXV2N/fv3w2AwIDExkYbMDuJUT/D06dNOHZVTq9WQSCSUAH1Iz3O5y5Ytg8lkYjkidgQEBCAuLq67hxgeHo5Dhw5h+PDhSE9Ph0ajoWN6d8GpnmB2djbCw8MdWgGki9SJRqPBhg0bkP3yy7wAAAr3SURBVJGRQdMhP7BarTh58iRqamqgUqkgEokglUoxc+ZMqnx9B04lwcjISJSVlTm0FYA2RhPg1urxpk2bAAAbN26k/XV3MJlMqKysRHl5ObZt24a0tDQsXLgQjz76qM//WXEmCdq2QDhyVM42L+Ro4iTeS61WY8mSJTh48CD1CvvRs5d47NgxNDY2IjExEeHh4T6ZFDmTBDUaDUwmk0M9uvT0dERFRdEPO7kN9QodY1tcqa6u7u6E+FJS5EwSTE9PR0JCwoAXN2znLZ0tskC8n1qtRk5ODhQKBZYuXUqrpQNkNptx/vz57p7ioUOHkJaWhqioKMyYMQPBwcFe9WfJmSQoEAgGfN6XFkPIQFksFuTk5ECr1XrVVZ+eZLFYcOHCBZw6dQp1dXXIy8tDQkICFi5cCIlEgokTJ/L63yEnkqDJZEJeXh62bt06oOcolUq0tbUhMzPT1SESL2UrWyWRSJCSkuL1Qzx3M5lMOHfuHEwmEwwGA7Zt2wa5XI6QkBCIRCJe9Rg5kQTVajXa29sHVPSAFkOIs6xWK0pLS5GTkwOZTIakpCT6GXKhnonxwoULyMvLQ0REBGJjYyGXyznbW+REEkxPT0dSUtKA9i8lJydj6dKlPlFNhLiHxWLBnj17oFKpkJGRgfj4eF70WPjIbDajubkZ48eP5+wvHNaToCOls9RqNUpLSwc8bCbEHovFgg8++ADFxcWUDH0Y68fmjEYj5HL5XX/4bBPcGzdu9FBkxNsFBAQgMzMTu3fvRmVlZfeVDN529Sexj/UkeOrUKcydO/eu77NtdaAJbeJqEokEubm5vZIhnbn1DawnwfLycsycOdPue2wbqZcuXeqhqIgvsiXDsrIyNDY2YsyYMVAqlT5Tu9BXsTonaJsPHEh5LdoTSDzNYrFAq9UiJycHsbGxDm3mJ/zBahIcSCn99PR0zJgxg+4MIayxnbXduXMnDAYDFAoFnnnmGc6udhLHsDocPnXqlN1S+jQMJlzQs6qzWq1GW1sbFi9ejOTkZOj1elpI4TlWk2B5eTlmzJjR5+csFgs2bNiA3Nxc2rZAOEMsFkOhUECn0+Hll1+GTqfD8OHDkZ2dTQmRp1gbDt9tPpCGwYQvepa437ZtG90KxzOs9QSNRiPS0tL6/JxarUZraysNgwkv9Cxx39LSgvDwcOzcubO7h0gl7rmNtZ6gSqWCv79/r1qAZrMZwcHBaGhooD2BhNdsCyo6nQ7FxcW3lbifOnUq9RI5grUkmJycjLS0tNu2vVitVixbtgyrV6+ms8HE65hMJtTV1aG0tLS7xL231ujjE1aSYH/zgdnZ2QBAJbKI17NarTAajTh16lT3vR9yuRxz587F5MmTMX36dNqC4yGsJMG+9gdqNBps2bIFe/fupd+IxOdYrVY0NDSgrq4OlZWV0Gq1AIDY2FhERUVh0qRJnK7EwmesJME75wNpHpCQ3iwWC06fPo1Lly71SowzZszAQw89hIkTJ9JQepBYSYI95wNpHpCQgbNYLGhubkZdXR0aGxt7FS8dP348RCIRJk2ahOHDh9NR0wHweBLs6Oi4bT4wOTkZISEhdG8wIYPQMzm2t7ejrq4Ora2t2LZtGwB0b0ezndCyHVIIDAz0+SG2x5NgTU1N93ygUqmEwWBAQUEBdecJcRNbgrxy5QouXbrUnSQBIC8vr/t9tkRp600CwIMPPoigoKDu93hjz9LjSXDXrl3w9/eHv78/LYQQwhG2RAkA586dQ3t7OwCgvr4eV69eBXBri8+hQ4e6v8Y2BO+pZwLtKTY2lrM9Tj9PN1heXo4nn3wSGzZsgFqtpgRICAcEBAR0J6mB9vZ6Jk6bngmULzzeEwRu/QZRq9W0EkwI6ZPVakVLS4tHcgQrZ4fz8/MpARJC+mU0GiGVSj1S1dvjSfDtt9+m6ryEELtCQ0ORn5/vkUTIynCYEEIc4c6DFB5dGGlpaYFQKKTFEELIgOj1eqSmprq1DY/2BAkhZKBsCdDdi6iUBAkhnFNbW4tVq1Z5ZBcJJUFCCOd4cosMJUFCiE9j9bY5QghhGyVBQohPoyRICPFplAQJIT6NkiAhxKdREiSE+DRKgnzReQKbp8zH5hO2Wm1tqN+xEqL5mVCbvoB6RThWqBucePANNFW9j1fzT6ATDYN4DiH85PGiqsQV2lC/IxULPhyP3Xt+iwXjhgK7qiF16lk30PjpARxDFIBgSJ1+DiH8RD1BvrlpxvHMpVigm41iWwLs2YNrUmOFYBH+77oXIRIIIBCtxI76Nth6fCtEAggEAgjmZ0JtakPniQ/wQpoWZ9LCMW3zPuzr7gl2od2kxrr5IggEIszP/Auaum4PpatJj/wVj996nmAR1qnr0Y5ONKlfhWC+Aut++JxoxS7Ut3cBXU2oyl9xKy6BCPPXqWFq77oVs+g/sOLFxyEQPI8d9WdwPHPRD3EqsG5FNFaoTTDteB6idcfRBgC4fsf/E+IcSoK80oDD65bjyXcbEZ/wDMLHDe3nfY1onvpbmJhWVK+9hJXvHsPFiyXYkHQSMce/AcN8B/OaNijWHMDZWa9iX14sJudVo/71n+Fe2yO6TPhoTTqqni7GtW92I3Lnb/F7bY9S6l3nUbxhA2pj9uIaw+Cm+RU0K/4LH5mu3/q80Yqpv9WDufY51l7YjHc1Z3GxOAtJtQtw/NpNMDc/w5rmbKz5yIQuAGj6Cn5LSnCT2Y1FX+Zj+WeLUX3te1z7YwT+/ZdLAISYsuiXiD94DNVtXUDXOVTsu4iXFs3EKHf9cROfQEmQV87AOF4OzcH/wFnFW9hZ318fKBoJ8dPgD3+IJokB3MQ1YzVKz+zAyun3QyAYBvGS99GkqULdpc6+H9HeCOMXwXh6/qPwH7UA7zVW470FgT0+fwafl2qhWvk4RgoEGCJegh1NJ6Gru3Lr8z9/GvHTRgH+4zBp/DAA38D4eSXOqF7G9JFDIBgyEUt2nIBG9yUu/RDz0088jHvQBuPnNXj8pXjM8veD/7SnseKlYADAPQ/Pw4tLTuB/jzWg86u/Y98XMVgUzs3Lewh/UBLklVisTVmOn0vXYvPaS1j56+040d519y+zidsO400GDGN7fQDpuMFMCy/FdqO1x/O+wi5psJ33D0Pc9tO4yfSIYZcU4wbcXgDCF4Wh9L8P4WNdGb54aSHCR9GPMBkc+gnipQcQ9up/IQ/v4/Xsv/aaq+ttCEZODUf8F/uwU3sRXbaV5UU7YPrhazuufIOOnl/iL8LUxxtw+G9for29CpvnT8GiHfXobsp/Mn4afxYf7ixHU1cX2ut3YYXoeeywDYd7uR9TfzoLX3y4D9qmG0B7HXasCL/9mQCAUT+8rxQ17Z1orz+MXR/aVqvvwajIRKy9kYMlq87SUJi4BCVBvvKPxNrduZi0cy02FJ/Bzbu8/Z6Hn8E7xc/i4nIxhgjux/QPH4Sy8DlI7hmOqfOfxdTcJzFt3WF0z/rdI8HzhbmIPJyIkSN/it+NfwN/eF7y4w/MPROQ+M4f8OzFtRANGYKR0/fgIeVbeF5yXz8RDMPDietR/OxZLBcNg2BkHD58KBOFPZ8JABiKhxN/i91PlCF85L0Y+WsNMLVHJXL/mXj2pTnAuDgaChOXoFJahNO6mv6CDUlv4uYbh27NSXbVY0f8M9j3QglKfzWNfouTQaOfIcIxt2/lGSJai4vP5uI/YwNvbaUZMh0rb7yG7F49SEKcQz1BQohPo1+mhBCfRkmQEOLTKAkSQnza/wf3kcwaxJXOeAAAAABJRU5ErkJggg==" width="344" height="243"></p>
<p>both axes correctly labelled ✔</p>
<p>peak of T<sub>2</sub> curve lower <em><strong>AND</strong> </em>to the right of T<sub>1</sub> curve ✔</p>
<p>lines begin at origin <em><strong>AND</strong> </em>correct shape of curves <em><strong>AND</strong> </em>T<sub>2</sub> must finish above T<sub>1</sub> ✔</p>
<p> </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 not just “Energy/E” on x-axis.</em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>decrease <em><strong>AND</strong> </em>equilibrium shifts left / favours reverse reaction ✔</p>
<p>«forward reaction is» exothermic / ΔH is negative ✔</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="133" height="112">✔</p>
<p> </p>
<p><em>Note:</em></p>
<p><img src="data:image/png;base64,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" width="489" height="244"></p>
<p><em>Accept any of the above structures as formal charge is not being assessed.</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>three electron domains «attached to the central atom» ✔</p>
<p>repel/as far away as possible /120° «apart» ✔</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>sulfuric acid/H<sub>2</sub>SO<sub>4</sub> ✔</p>
<p><em><br>Accept “disulfuric acid/H<sub>2</sub>S<sub>2</sub>O<sub>7</sub>”.</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fully ionizes/dissociates ✔</p>
<p>proton/H<sup>+</sup> «donor »✔</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;">
<p>Overall well answered though some answers were directed to explain the specific example rather than the simple and standard definition of the effect of a catalyst.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few got the 3 marks for this standard question (average mark 1.7), the most common error being incomplete/incorrect labelling of axes, curves beginning above 0 on y-axis or inverted curves.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates got one mark at least, sometimes failing to state the effect on the production of SO<sub>3</sub> though they knew this quite obviously. This failure to read the question properly also resulted in an incorrect prediction based exclusively on kinetics instead of using the information provided to guide their answers.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Drawing the Lewis structure of SO<sub>3</sub> proved to be challenging, with lots of incorrect shapes, lone pair on S, etc.; accepting all resonant structures allowed many candidates to get the mark which was fair considering no formal charge estimation was required.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most were focussed on the shape itself instead of explaining what led them to suggest that shape; number of electron domains allowed most candidates to get one mark and eventually a mention of bond angles resulted in only 35% getting both marks. In general, students were not able to provide clear explanations for the shape (not a language issue) but rather were happy to state the molecular geometry which they knew, but wasn't what was actually required for the mark.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>6(d)(i)-(ii): These simple questions could be expected to be answered by all HL candidates. However 20% of the candidates suggested hydroxides or hydrogen as products of an aqueous dissolution of sulphur oxide. In the case of the definition of a strong Brønsted-Lowry acid, only 50% got both marks, often failing to define "strong" but in other cases defining them as bases even.</p>
<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>Soluble acids and bases ionize in water.</p>
</div>

<div class="specification">
<p>A solution containing 0.510 g of an unknown monoprotic acid, HA, was titrated with&nbsp;0.100 mol dm<sup>–3</sup> NaOH(aq). 25.0 cm<sup>3</sup> was required to reach the equivalence point.</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The following curve was obtained using a pH probe.</p>
<p><img src="data:image/png;base64,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"></p>
<p>State, giving a reason, the strength of the acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a technique other than a pH titration that can be used to detect the equivalence point.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the p<em>K</em><sub>a</sub> for this acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.vi.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The p<em>K</em><sub>a</sub> of an anthocyanin is 4.35. Determine the pH of a 1.60 × 10<sup>–3</sup> mol dm<sup>–3</sup> solution to two decimal places.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>weak <em><strong>AND</strong></em> pH at equivalence greater than 7<br><em><strong>OR</strong></em><br>weak acid <em><strong>AND</strong></em> forms a buffer region</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>calorimetry<br><em><strong>OR</strong></em><br>measurement of heat/temperature<br><em><strong>OR</strong></em><br>conductivity measurement</p>
<p> </p>
<p><em>Accept “indicator” but not “universal indicator”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«p<em>K</em><sub>a</sub> = pH at half-equivalence =» 5.0</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.vi.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>K</em><sub>a</sub> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{10^{ - 4.35}}/4.46683 \times {10^{ - 5}}">
  <mrow>
    <msup>
      <mn>10</mn>
      <mrow>
        <mo>−</mo>
        <mn>4.35</mn>
      </mrow>
    </msup>
  </mrow>
  <mrow>
    <mo>/</mo>
  </mrow>
  <mn>4.46683</mn>
  <mo>×</mo>
  <mrow>
    <msup>
      <mn>10</mn>
      <mrow>
        <mo>−</mo>
        <mn>5</mn>
      </mrow>
    </msup>
  </mrow>
</math></span></p>
<p>[H<sub>3</sub>O<sup>+</sup>] = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\sqrt {4.46683 \times {{10}^{ - 5}} \times 1.60 \times {{10}^{ - 3}}} \,\,\,/\,\,\sqrt {7.1469 \times {{10}^{ - 8}}} \,\,/\,\,2.6734 \times {10^{ - 4}}">
  <msqrt>
    <mn>4.46683</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>5</mn>
        </mrow>
      </msup>
    </mrow>
    <mo>×</mo>
    <mn>1.60</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>3</mn>
        </mrow>
      </msup>
    </mrow>
  </msqrt>
  <mspace width="thinmathspace"></mspace>
  <mspace width="thinmathspace"></mspace>
  <mspace width="thinmathspace"></mspace>
  <mrow>
    <mo>/</mo>
  </mrow>
  <mspace width="thinmathspace"></mspace>
  <mspace width="thinmathspace"></mspace>
  <msqrt>
    <mn>7.1469</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>8</mn>
        </mrow>
      </msup>
    </mrow>
  </msqrt>
  <mspace width="thinmathspace"></mspace>
  <mspace width="thinmathspace"></mspace>
  <mrow>
    <mo>/</mo>
  </mrow>
  <mspace width="thinmathspace"></mspace>
  <mspace width="thinmathspace"></mspace>
  <mn>2.6734</mn>
  <mo>×</mo>
  <mrow>
    <msup>
      <mn>10</mn>
      <mrow>
        <mo>−</mo>
        <mn>4</mn>
      </mrow>
    </msup>
  </mrow>
</math></span> «mol dm<sup>–3</sup>»</p>
<p>pH = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" - \log \sqrt {7.1469 \times {{10}^{ - 8}}}  = ">
  <mo>−</mo>
  <mi>log</mi>
  <mo>⁡</mo>
  <msqrt>
    <mn>7.1469</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>8</mn>
        </mrow>
      </msup>
    </mrow>
  </msqrt>
  <mo>=</mo>
</math></span>» 3.57</p>
<p> </p>
<p><em>Award <strong>[3]</strong> for correct final answer to two decimal places.</em></p>
<p><em>If quadratic equation used, then: [H<sub>3</sub>O<sup>+</sup>] = 2.459 × 10<sup>–4</sup> «mol dm<sup>–3</sup>» and pH = 3.61</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.vi.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>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 &plusmn;0.001&thinsp;g</p>
<p style="text-align: right;">Mass of crucible, lid and magnesium ribbon before heating = 53.726 &plusmn;0.001&thinsp;g</p>
<p style="text-align: right;">Mass of crucible, lid and product after heating = 56.941 &plusmn;0.001&thinsp;g</p>
<p style="text-align: left;">&nbsp;</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&thinsp;Mg&thinsp;(s) + N<sub>2&thinsp;</sub>(g) &rarr; Mg<sub>3</sub>N<sub>2&thinsp;</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&ndash;</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>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(ii).</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:left;"><img src="data:image/png;base64,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"></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>Ammonia is added to water that contains a few drops of an indicator. Identify an indicator that would change colour. Use sections 21 and 22 of the data booklet.</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>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,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"></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>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(iv).</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, giving a reason, whether magnesium or nitrogen would have the greater sixth ionization energy.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>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 src="data:image/png;base64,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"></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> </p>
<p><em>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>aluminium/Al ✔</p>
<div class="question_part_label">a(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><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><mo>«</mo><mi>mol</mi><mo>»</mo><mo>✔</mo></math></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><em><br>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 90.5-91.5%</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 &gt;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>phenol red ✔</p>
<p><em><br>Accept bromothymol blue or phenolphthalein.</em></p>
<div class="question_part_label">d(ii).</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(iii).</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(iv).</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>nitrogen <em><strong>AND</strong> </em>electron lost from first «energy» level/s sub-level/s-orbital <em><strong>AND</strong> </em>magnesium from p sub-level/p-orbital/second «energy» level<br><em><strong>OR</strong></em><br>nitrogen <em><strong>AND</strong> </em>electron lost from lower level «than magnesium» ✔</p>
<p> </p>
<p><em>Accept “nitrogen <strong>AND</strong> electron lost closer to the nucleus «than magnesium»”.</em></p>
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>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 src="data:image/png;base64,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"></p>
<p> </p>
<p><em>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>Done very well. However, it was disappointing to see the formula of oxygen molecule as O and the oxide as Mg<sub>2</sub>O and MgO<sub>2</sub> at HL level.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Average performance; the question asked to identify a metal; however, answers included S, Si, P and even noble gases besides Be and Na. The only choice of aluminium; however, since its oxide is amphoteric, it could not be the answer in the minds of some.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very good performance; some calculated the mass of oxygen instead of magnesium for the calculation of the amount, in mol, of magnesium. Others calculated the mass, but not the amount in mol as required.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance; instead of calculating percentage uncertainty, some calculated percentage difference.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Satisfactory performance; however, a good number could not answer the question correctly on determining the percentage yield.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Poorly done. The question asked to evaluate and explain but instead many answers simply agreed with the information provided instead of assessing its strength and limitation.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance; explaining the yield found was often a challenge by not recognizing that incomplete reaction or Mg partially oxidized or impurities present that evaporated or did not react would explain the yield.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="text-align:left;">Calculating coefficients that balance the given equation was done very well.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well done; some chose bromocresol green or methyl red as the indicator that would change colour, instead of phenol red, bromothymol blue or phenolphthalein.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; however, surprising number of candidates could not determine one or both oxidation states correctly or wrote it as 3 or 3−, instead of −3.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Average performance; choosing the given reaction as an acid-base or redox reaction was not done well. Often answers were contradictory and the reasoning incorrect.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Stating the number of subatomic particles in a <sup>14</sup>N<sup>3-</sup> was done very well. However, some answers showed a lack of understanding of how to calculate the number of relevant subatomic particles given formula of an ion with charge and mass number.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Exceptionally well done; A few candidates referred to isomers, rather than isotopes.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was reference to nitrogen and magnesium, rather than nitride and magnesium ions. Also, instead identifying smaller nuclear charge in nitride ion, some referred to core electrons, Z<sub>eff</sub>, increased electron-electron repulsion or shielding.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Common error in suggesting nitrogen would have the greater sixth ionization energy was that for nitrogen, electron is lost from first energy level without making reference to magnesium losing it from second energy level.</p>
<div class="question_part_label">e(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance; some teachers were concerned about the expected answers. However, generally, students were able to suggest two reasons why matter is divisible.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>One teacher commented that not asking to describe bonding in terms of electrostatic attractions as in earlier papers would have been confusing and some did answer in terms of electrostatic forces of attractions involved. However, the question was clear in its expectation that the answer had to be in terms of how the valence electrons produce the three types of bonds and the overall performance was good. Some had difficulty identifying the bond type for Mg, O<sub>2</sub> and MgO.</p>
<div class="question_part_label">g.</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. The following equilibria are established.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Equilibrium (1) &nbsp;CO<sub>2</sub> (g)&nbsp;<img src="images/5.PNG" alt width="64" height="25"> CO<sub>2</sub> (aq)</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Equilibrium (2) &nbsp;CO<sub>2</sub> (aq) + H<sub>2</sub>O (l) <img src="data:image/png;base64,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" width="49" height="14"> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>−</sup> (aq)</span></span></span></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><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">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">At 298 K the concentration of aqueous carbon dioxide in carbonated water is 0.200 mol dm<sup>−3</sup> and the pK<sub>a</sub> for Equilibrium (2) is 6.36.</span></p>
<p><span style="background-color: #ffffff;">Calculate the pH of carbonated water.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Identify the type of bonding in sodium hydrogencarbonate.</span></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;"><span style="background-color: #ffffff;">Between hydrogen and oxygen in hydrogencarbonate:</span></span></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;">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">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">100.0cm<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">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The uncertainty of the 100.0cm<sup>3</sup> volumetric flask used to make the solution was ±0.6cm<sup>3</sup>.</span></p>
<p><span style="background-color: #ffffff;">Calculate the maximum percentage uncertainty in the mass of NaHCO<sub>3</sub> so that the concentration of the solution is correct to ±1.0 %.</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 style="background-color: #ffffff;">The reaction of the hydroxide ion with carbon dioxide and with the hydrogencarbonate ion can be represented by Equations 3 and 4.</span></p>
<p><span style="background-color: #ffffff;">Equation (3)     OH<sup>−</sup> (aq) + CO<sub>2</sub> (g) → HCO<sub>3</sub><sup>−</sup> (aq)<br>Equation (4)     OH<sup>−</sup> (aq) + HCO</span><sub>3</sub><sup>−</sup><span style="background-color: #ffffff;"> (aq) → H<sub>2</sub>O (l) + CO<sub>3</sub><sup>2−</sup> (aq)<br></span></p>
<p><span style="background-color: #ffffff;">Discuss how these equations show the difference between a Lewis base and a Brønsted–Lowry base.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Equation (3):</span></p>
<p><span style="background-color: #ffffff;">Equation (4):</span></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><span style="background-color: #ffffff;">Aqueous sodium hydrogencarbonate has a pH of approximately 7 at 298 K.</span></p>
<p><span style="background-color: #ffffff;">Sketch a graph of pH against volume when 25.0cm<sup>3</sup> of 0.100 mol dm<sup>−3</sup> NaOH (aq) is gradually added to 10.0cm<sup>3</sup> of 0.0500 mol dm<sup>−3</sup> NaHCO<sub>3</sub> (aq).</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="569" height="344"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Weak acid:</em> partially dissociated/ionized «in aqueous solution/water»<br><em><strong>AND</strong></em><br><em>Strong acid</em>: «assumed to be almost» completely/100 % dissociated/ionized «in aqueous 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>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “shifts to left/reactants <strong>AND</strong> to increase pressure”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«K<sub>a</sub> =» 10<sup>–6.36</sup>/4.37 × 10<sup>–7</sup> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{{[{{\text{H}}^ + }]}^2}}}{{[{\text{C}}{{\text{O}}_2}]}}">
  <mfrac>
    <mrow>
      <mrow>
        <msup>
          <mrow>
            <mo stretchy="false">[</mo>
            <mrow>
              <msup>
                <mrow>
                  <mtext>H</mtext>
                </mrow>
                <mo>+</mo>
              </msup>
            </mrow>
            <mo stretchy="false">]</mo>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mo stretchy="false">[</mo>
      <mrow>
        <mtext>C</mtext>
      </mrow>
      <mrow>
        <msub>
          <mrow>
            <mtext>O</mtext>
          </mrow>
          <mn>2</mn>
        </msub>
      </mrow>
      <mo stretchy="false">]</mo>
    </mrow>
  </mfrac>
</math></span><br><em><strong>OR</strong></em><br>«K<sub>a</sub> =» 10<sup>–6.36</sup>/4.37 × 10<sup>–7</sup> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{{[{{\text{H}}^ + }]}^2}}}{{0.200}}">
  <mfrac>
    <mrow>
      <mrow>
        <msup>
          <mrow>
            <mo stretchy="false">[</mo>
            <mrow>
              <msup>
                <mrow>
                  <mtext>H</mtext>
                </mrow>
                <mo>+</mo>
              </msup>
            </mrow>
            <mo stretchy="false">]</mo>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mn>0.200</mn>
    </mrow>
  </mfrac>
</math></span>  <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">[H<sup>+</sup>] « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\sqrt {0.200 \times 4.37 \times {{10}^{ - 7}}} ">
  <msqrt>
    <mn>0.200</mn>
    <mo>×</mo>
    <mn>4.37</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>7</mn>
        </mrow>
      </msup>
    </mrow>
  </msqrt>
</math></span>  » = 2.95 × 10<sup>–4</sup> «mol dm<sup>–3</sup>» <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">    </span><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>«pH =» 3.53 <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><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Award <strong>[3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">c.</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><br></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">d(i).</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 style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Do <strong>not</strong> award M2 without any justification in terms of equilibrium shift in M1.</span></em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«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>
</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">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«1.0 – 0.6 = ± » 0.4 «%»    <strong>[✔]</strong></span></p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Equation (3):</em><br>OH<sup>-</sup> donates an electron pair <em><strong>AND</strong> </em>acts as a Lewis base     <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Equation (4):</em><br>OH<sup>-</sup> accepts a proton/H<sup>+</sup>/hydrogen ion <em><strong>AND</strong> </em>acts as a Brønsted–Lowry base <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><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">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABNEAAAL6CAYAAAAYF8CxAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAP+lSURBVHhe7N0JfJT1tf/xkwwhkzHLJCQkKAZSqYhWQdHaTVERW3evXNFiW7tQrUu1tlatrd0Xt1qrVau1i12vtnq9teq/4q69vagoYBWwYCAiJJmQnWRCSPLn/PI8McQEAnNinmf4vF8vXs/v+WXAdZKZM+f3PRk9WwnSxvLFK+Sy710mR3zwKLnyisu8XQAAAAAAAKSCIloaSSQ2yn/OnStvVa1199/54bVy9vx5bg0AAAAAAIBdl+ldkQbu/fN9fQU09d0ffN91pgEAAAAAACA1FNHShBbLbr71Z95dr65NLfLr3/3CuwMAAAAAAMCuooiWJr598/WuaDbQ/Q/cLw89/Kh3BwAAAAAAgF1BES0N3HrbnbL46SfceuqMA6SkaJzMnHWMu1fXXfNDbwUAAAAAAIBdQREt5PQY56/u/LlbF8QL5Te/uFvG5ubKpMK4LDj/QrevOWnnffECtwYAAAAAAMDOo4gWcjf95mZpamxw68+e+wUpKRknrc3NUjRhgnzus59xnWnqqSee41gnAAAAAADALqKIFmILH1vkimNqr/JJMu+MuW7t04La/Hmfku72VpeXdtudN3tfAQAAAAAAwM6giBZSqxPL5crLznfFMS2SXfGTm1zRbKCz58+TOfPOcOuVS151+WkAAAAAAADYORTRQuqOH9zVd4zzK9/6gZwwc4Zbq9z8fKnfsMG7E/n+N78nkT3y3Pon1/3I5agBAAAAAABg+CiihZAe4/yfhQvdep+p+73jGKefiebTDrVvfv0brmNNffvm6yWR2OjWAAAAAAAA2DGKaCF05y3XuGOc6txzPz3oMc769g5v1UuPdR72sVPcevHTT8ijCx93awAAAAAAAOwYRbSQuebaG+TlpUvceuasY2Tu3DPdeqCinGxv9bZvX/xVbyVy43XXeCsAAAAAAADsCEW0ENFjnL/+7W/duqRonPzshuvceqCBmWi+aTP3k0sv/5pba57amed8zq0BAAAAAACwfRTRQqKtrU3u+t2dfcc4v/H9Hw56jFMNzETr78ILzpWpMw5w6xf+31/lD3+8160BAAAAAAAwNIpoIfHkU8+5opfSY5zvP2ymWw9lYCZaf1+66Go3rTMzJ1fu/PltDBkAAAAAAADYAYpoIXHbnTe7opcWv67+xPwhu9B8g2Wi+eYce7icOmeOW79VtVbqqhJuDQAAAAAAgMFRRAuJC8692BXQbrz+BnnfnNne7uCGykTr7xuXXOWOdeqv4vISbxcAAAAAAACDyejZylsjTcyccYic8fH5cuUVl3k7AAAAAAAASAWdaGlobGbmdjPRAAAAAAAAsHMooqWhzd3d281EAwAAAAAAwM6hiJaGhpOJBgAAAAAAgOGjiJaGWpubpWjCBO8OAAAAAAAAqaKIlqbIRAMAAAAAALBDES1NkYkGAAAAAABghyJaGiITDQAAAAAAwBZFtDREJhoAAAAAAIAtimhpaGxmJploAAAAAAAAhtK+iJZIbJTli1fI6sRybyc1/p+lf25Qbe7uJhMNAAAAAADAUNoX0X75q1/LyXOPl48edoK3s+sW/u+Tctqn5rk/6xOf+IS3GzxkogEAAAAAANhK6yLaQw8/KnfdfqtbR/bIc9ddpZ1nN3znOuna1OLux+RE3DWIyEQDAAAAAACwlbZFNC2gffmrl3l30lf82lXa0bZ65QrvLvjIRAMAAAAAALCTlkW0W2+70xXQ+hfOUulE+8NP/tTX0eaL9WR5q2AiEw0AAAAAAMBOWhXR9MjliaedJD+57kfv6Dzb1U40HSRw493Xe3dva8vo9FbBQyYaAAAAAACArbQpol1z7Q3ysTlzZOWSV929dp5devnX3Frtaifat2++XpoaG9zvP/200/v+nCB3opGJBgAAAAAAYCttimh63FKLXWqv8kly4/U3yIUXnOvu1a50oumx0MVPP+HWp86ZI7OO+6hbqyB3oo3NzCQTDQAAAAAAwFBaHecsiBe67rOnn3lKTjzhOG+3V3d7q7caHh1MoMdC1dQZB8h1N/1Yxo4tkM663mOSQe5E29zdTSYaAAAAAACAobQpomnx7Pe//OM23Wf99eTGvdWOabbabXfe7NZamPvSRVe7tcoq7j0mSSYaAAAAAADA7iNtimhaPJs2cz/v7p3GRnO81Y5d/4Mf9mWrffbcL8icYw93682bm0LRiUYmGgAAAAAAgK20Os65PcPNRPvDH++V+x+4361nzjpmm842Pc4Zhk40RSYaAAAAAACAnd2miCZdPd5iaAsfWyQ3XneNW+twgl/ffotb94m1haITTZGJBgAAAAAAYGf3KaJFMrzF4JorN8pf/uduN+FThxBcfuVVEovFvK962mJkogEAAAAAAOyGMnq28tZpacrkCneN7JEnK19d5taDufW2O/umcZ7+6QVy3be/7tb96cTOS8471xXkDp4+Q/78P//tfcXO8sUrZF1Dk3c3fBN6WmVDRq50FmbL1Z/7rJzx8fly5RWXeV8FkCp9bhaXl0hJyThvB0CqVjVWS+fqxu1mmgLYOTogq64qwfMKMKTPq9baFqk4YLK3AyBVYf15tdsU0dSqNZXealt6jPP8BWe59dQZB8hvfnH3oG+U9XEXXfJ5l6+mj7vnLw9I7pgx3ldt3PirW+SOH/9CsrvqpSNStM01KzpeOpO177jXa2vnFsnNGiMt696S7tyYy3M75aMf9f5UAKlqbGyU7rK4FCW9DQApa09WS0cyKvH48CdoA9g+fV61x8v4eQUYq0nWSGm01LsDkKr6qLifVR+Yc6DsUzLN2w2+3eY4p3aiDeWmn33PW4m01rfKf86dK7OOPOodv6687Py+AQUrF/9LTjzm2L6vWTmw/P1y8YUXyXkXf9NdT/34Fe565rlXyOmf+kzv/icu3OZer/oYnSR6zlXfcP+scRnr/Ylb1XS5b/p9tt7r/7D6Iqv/vV779rbaWN/trjyOx6nd/nFNPZJZ3di37z9OaYFNDfzz/Hu98vv4fT5+X+9VaQHN13+fNWvWu7bW56I+r/TnVf+v+89D3fMfP/C5qfpeL/I4HucWPE6fU7rWa3bSy5ze+vW+37OV/xgf99xzP7x7/Vmlrxv3SBS6+7CgE22rM079D3l56RLvbtcM9WePhg8ecqgcceQsue6mH3s7AFKlR74nT54sJ55wnLcDIFU6EVtfPPWfhA0gNXpyorZ2rZw9f563AyBVC//3Saldk+B5BRjSuJwnFj0jH51/ikyJl3m7wbfbdKLpsIChBHlIwK7Y3N0tRRN6ByAAsNGVbPBWAKxwjBOw1dbW5qbJAzDW1jtwzj3HAJjQLPjsaFIKOrO8nXDYbYpoPblDv1B/6IG/uU6yHf26/a7/6jsWqplo/b8WNPXtHd4KgIVINFxtxgCA3Y9Olt/cmF4fDgNBsHlz7+A3fY4BsFFcnCNtbePd0I4w2W2KaGOjOd4qBbE26azb0LvsCXa1tCjHO7MPAEBA+flpAOyMjYfrE30gDMaOLZBodg+daICxWKxWcscPnV8fRLtNEc0fCJCStphkFfcekwz6EdAtfIMHAAScHufUNn4AduhEA0ZArE2SHRneDQAL0a6xbhgOnWhB1ZX6/ARt4+1qbnbroHeijaHVGDDVmOSINGBNO9G0jR8AgCDT4rR2onGcE7DjZ6LRiRZUkdQ/OdA23kh+vlsHvRONTDTAVjzKEWnAmnaiRTJ7P5wCACCo9H2gdqIlEhu9HQCp8jPRmrLC1UGd9kW0mbOOkdknH+9+pWpiYYEcdcxH3J95wuEne7vBRCYaACDotBON45wAgMCLtblOtJKScd4GgFRt6OruzURb722ERNoX0e65+5dyxy23uV+pmjZzP/fn6J954dfO83aDJzc/X+o39A5AAAAgqPLjGtLMcU7AknbMADDWFqMTDTBWXr/RvQ7cVNLg7YTD7nOcczfS2twsRRN6ByAAsNGVDNc3dyAMmhszOM4JGHKTA2MMlwKsaTZ2NBqlEw0wVFU0znWi5Uu4PlCliJamyEQDbEWihd4KgBWmcwK2NPSc6ZyAPdfh2dNOJxpgaEIk03WiMZ0TgUAmGmCL6ZyAPaZzAgDCQDvRFJ1ogJ2sREK2xBJM58ToIxMNsMd0TsAe0zkBAGHAdE7AXqRoL8lOhu89FkW0NEQmGgAgDJjOCdgbG8/yVgCsaCeafvBDJxpgp1KSoXwdSBEtTZGJBgAIOn1DwnFOwBaZaIA9LU7rBz90ogF2yERDoJCJBtiqTnTw6T5gTN+QcJwTABB0WpyOZvfQiQYYqqtrd9M5yUTDqCMTDbBXVpLNp/uAMaZzAgDCgEw0wN6EnlZpj5fRiYbRRyYaYK8r2eCtAFhhOicwMrRjBoAdPxMtu9XbAJCyqqJxktNYTScagoFMNMBWJFrorQBYYTonYM/vmAFgx89Ey6/gOCdghUw0BAqZaACAoGM6J2Crra3NdcwAsOVnogGwk5VISMaemdI9vt3bCQeKaGmITDQAQBjkx3s4zgkYisViDMEBRgCZaIA9Pc6ZWd0oeyTCdeKHIloaIhMNsNfSwpEzwFpzYwbHOQFjDMEB7GmHp37wQyYaYKe8fqN0l8W9u/CgiJamyEQDbOXl5XsrAFaYzgkACAPtRNMPfjL3LvB2AKQqUrSX60TbVBKuAW4U0dIUmWgAgKBjOicAIAz8TrRNST74Aaysa+idestxTow6MtEAAGHAdE7AnnbMALDld6LlJDjtA1gpLs5xH6jSiYZRRyYaYI9MNMAe0zkBWzqdU2JbfwGw5T2v8ivGuSuA1G3o6navA/MlXKcSKKKlKTLRAFtkogH2tBON45yAHZ3OyWABYAS0xSSa3SOrGqu9DQCpmhDJdK8DW2tbvJ1woIiWpshEAwAEnXaicZwTABB0mommxjdkuSuA1GUlErIllpDc8XneTjhQREtDZKIBAMKA6ZwAgDDQTLRkRwbHOQFDVUXjpDRaSicaRh+ZaIC9rmS4Ai+BMGA6JzAy9NgZADv+dM7myo3eDoBUlddvlPro1kV7uLI8KaKlKTLRAFuRaLhGLwNhwHROYGRoxwwAO/50zsy9mX4LWNFOtMzqRsmdVOrthANFtDRFJhpgqzrRIWPj5GAAlpjOCQAIA78TbVOSn1mAFe1E6y6LS1ciXANxKKKlITLRAHtlJdlMPAOM6RsSjnMCtrRjBoAtvxMtJ8FpH8BKpGgv14m2qSRcsTkU0dIQmWgAgDDQNyQc5wRs+VMEARiK9WY2MVgAsLOuocmdSMiXcH2gShEtTZGJBgAIOqZzAvaIHgDs6WkEHdixqrHa2wGQqomFBe5EAtM5EQhkogG2WlrolgGsMZ0TsNXW1kb0ADBSMnJkSrzMuwGQqkpJSixWK7nj87ydcKCIlobIRAPs5eXleysAVpjOCdiKxWLeCoAlzURLJpPSXLnR2wGQKh0s0B4vk7qqhLcTDhTR0hCZaACAMGA6JzAy9NgZAEOxNve8IhMNsFNVNE5yGquluLzE2wkHimhpikw0AEDQaScaxzkBW65jpiPDuwNgQY9J6/MqkaATDbAyIZJJJhqCg0w0wFZXMlyjl4Ew0E40jnMCdlwmGtM5AXNanNZOtJISOtEAK3V17aHMRMvo2cpbI03MOvIoOfyQmXLdTT/2dgCk6tbb7pTJkyfLiScc5+0ASNVDDz8qG6pXyILPXuztAEjVwv99UmrXJOTs+fO8HQCp8p9Xx82ZTSENo0Yz+Z6rf1MqJCpd9W+545C61oB+zRfrLOk9FhntGivrGprc9Ms3aqrch5Y7S3/PrgxW29LWJm/WV2/9m+0Ryfe6ovuvBzho2gz56PxTQjW0gyJaGpo54xA54+Pz5corLvN2AKTq6u/cIkfOeZ/M+dDR3g6AVP3hj/fKxvpuufiis7wdAKnS4rS++aGIBtjR55UOFph7+ineDsJOj+YuWbpqWN27a9askbWvrxSJF4k01rv88b5BfgP21jY0SmP1ehmTE5Et7V3bvVavWS9Njbt22mVLRreM6Xn7YOGO7oOoNG+CXPC1L8mH9n2fVBy6v7cbfBTR0pAW0WafNleu+/bXezcApIxONMCevinRF6YXXnCutwMgVRTRAHsLH1sktbVrQ9eJ5me46fRDDW/3r5pB1T2+XfZIFMpL7dWui0m7mvS6ISNXOguz+9ZqR4Um/Z7Tnqx2+VbjijLdOida5vY1/1Svrgi1HU0NbdIom6W7sd7dt2V0Sm5B6Tb3SgtP29PauUW6NoUrY2skdbe3SlbxBOmpqZGM0lK3N5x1btYYd83KHiudHZuHvR6bmSljc3MltyhXWutb3VWLhj6/iOivTzjuFJl3xtxQPa8ooqUhOtEAexTRAHvaiaYvtDnOCdihiAbY0+dVtzTIrGnHbndCp9/dtF2xNqldVC01BXWSLz2u8DRYPqgWnZq62qUgkiObxmTJHls6t7nf0tEs696sco8d2OHUf08LGdvT2rz9I3talOqs2yA9uXEZG81xBarIHnnbXNOd/nNqUSk3P9/9+9reVYtGWvzb+m/LFQX9qxq4F8/PloqJ73FfG468vHwpn1wgmVLo7QyPZvppYTSroUMm9LS6gqmuVf+C6cDHTOsZK92TMmRzVYZk7ROXztW9x0LHlve4PTXYftHUiZK5g0GH2Vv/t1y0epWsrVokp558NkU0jC4y0QB7FNEAew8+fI9UvtHDcU7AkN8xQxENOmhiuDZtavdW745mqXVdUJtKGoa85st4aV1bI11TiiT5wquydCcmYy59fpG7+kWn7V3XvF4pyfbt//NrgWRXj92FiX8EsP9RQO1k0gKaymhtdGu9Zo7dQySS0dfptDnZ7va3t94eLVJNmX5wX+dZZrzIrft3pOnewftPc1/fngMPPEjGxrO2Pglirmg56HWrGdOnkHE3iv618HF5smWjnDT1/VJxwGRvN/gooqUhOtEAe9dce4P7gUwRDbCjnWjaMcNxTsCGFk2efOo5OtECYvniFd7qnTT0W9/Mb27sPaI2kA5d0Q4lnVzXkYxKdjS5zb0Gfmv+kuYwaZB3c0ZE8nt6j0jpWjOatEDUu7H17Z6Geg9xra/a0HdUrn8nkxrqXq91NTWuS8k/ApbdVS8dkaId3qvd/biddjb5/160eNT/36N/Xzau999VNCfHFfn843H+vV7jZXu6xwzW7eSvCwp7C0ZDKSifLPFotnR157uOOP//Nb87rrssLu+J9hbRurLHSqRj8zuumWP2kf2KOvq6llT/DiU9QkqxCgM9vHiJrF/6DJ1oGH1kogH26EQD7OnxGKZzAraYzrljlS++Jq/VruvrVNG8J13rv7c336ySWFaXtHX2KxzptLk1G/oKE/1VV652XUpD0WKIXzwaeNUjcn53Tv+18rt3MnNypSsyRiKbO13XTxi4v9+uLd7dO+/fDQXxQne0bjj2m94baL69jjUNi9ejdzpJUGnByS9o9l+rD33oA246YjKyedCr0mNv2mnXl1Hmddzlrpe+brxIydb/P4egR+E6ckX22CNHttS0y5jSHLfvr/1rLLb9Ahowml5eskyefe41OfnoD9CJhtFFJxpgjyIaYI/pnIC90chE0w64wY4DaoFA9c/P0UJCXV27FBfnbHP1u7K0mOV3Z73yyrJ3FLT86Xf9M4U0F6q+qlo2d3e7UGv/Wq+dMgHueOrLk+rqkUh+viukadHMv1falRTtikpdd6tbK71PRpJuPZThFpCUdjhN3Lvcrf3C0XDWB1RM2vofd5LrWNJupczqxr5upqGuSoPmx4/f+ns9ff8PeIa6n3Ps4d7Ou0+PSTc3rZG5c8/0dgCkyj/OecIRB8o+JTs+phsUFNHSEJlogD2KaIA9fbPPdE7A1nCLaFr4Wru8yhW1fFqo0Dy1/jZWV25TxFKV697oXfjHArfSI4HKPxaoBgs0r95Y/45jfkEqdGkH02DKJu8psZ4s98+nV59mNE0q7D3q5nct+euKie9xQeCD0aLSXhO2/rvLyJFoNOr+myktMCkNAtdwb3864sDC0num57tOpu3h+JwdsgYBe3qcs3LR8zL3qFOkbP8ybzf4KKKlITrRAHs333it7LPfwRTRAENM5wR2jb6h1yOIPi1G6yQ/zceqfG2169BqrF7fl13lHrPurbTIofKP6Wn3lP/Ppv+cB0yeKhIvcllg/nXSvlPdB2ADaYFKu5q0kMhxNwyHFqeT7Q0y55DtT+cEMHyaG/mPpY+SiYbRRyYaYI9ONMCevilZ/UY9xzkRKglvQqBmGPkh2hoS73cNtWe0S0ZHjWRKb0eTdhjVJGuktKlY2gsSUpfY7I4k+rRjyQ929zudqtes977a692cCtg/8Fz5Rwi1cKXZX3pMcmxurgs194t0etW/d+3K6k87tPILCvpC7/U6aXxJX7dVNLtHkh0Z7n7PPctcXlSlJKVCerOlps3cz12B0UYnGmDPP8557KSDQvX9niJaGqITDbB39XdukSPnvE/mfOhobwdAqpjOidGin3676YhbafFraWJj33E6pV1d/tE8va55vXKbri6djOcbGCqvQfJd/t67GATvd2jp30/Lurfk4BNPejs3zJvQp51q/e29d3lfQcunXVqdhdlSXr/RFQUnFhb07nu5Zjpxr6DznYHnHB1EOtOBHc0baslEAww98uhqeWvdQ3SiYfSRiQbYoxMNsKedaEznhNJjdf2nyunUOV+z1LpJdTqxzp9mpwWdzLU98r+v/8sdCc6Jlrmpitrh5Re/Fr202PsTegtdI93NtSWjW8b0ZEp3e6v05MbdNEUNh9eCmh8S33/t006vKdMPlu7G+r5OroP3n7ZNoP6BBx7kilsavq/TJGdMnzLkGw4XgN5cI3NPP8XbAZAqvxPtuDmzKRgDRvQDrUeWLpT/OPxkpnNidNGJBtijiAbYYzpnetIXxb51HRv6Ji1qp5cWvDqSvUf1/Awvv/Dla2zucHlevrqaGtfdVZyZKzUtbx+DtKRHGJUeY8ybuFffZEPN3dJw/P0qpvV1dGmQvh8er/SfYWxJtjuuWVNQJ6XRUskrHS+Rjt7Afi1+TYnnSTIj0xX/tBA4km/COXYG2NMPfbqlQU4+gU40wIoOFli/9Bk60TD6yEQD7FFEA+zpmxKmcwabFsTeqKlyhaC1VYtcnpfSwtfaht7jj61NNS7DSwtd/tTF/jrrNkhW8YTeI44jfLxxr/JJ3kqkrGIfl8nld6ZpyHx2NCltbeOl4j0ZMqV0uvfIXoU5cWndUwY9qrjHHjkugF7z0IL+Ql+PndWuSVBEAwzRiQbYe3nJMnntyVflQ8d9kE40jC460QB711x7gztOQxENsMN0ztT5IfdKjzn6NJzdz7TSI4B+N9jqFS/3HRF8+bXlfZlZVa8slc3d3S40PrH191nSLi+dCqlX7SZLRpKu4FaUPdb9Nf2uL592f03cu7wvj+ygaTO8r4jL7xo/flJfZtfko2dJ7pje4Hv00uK0dv1RRAPs6PNK8ToQsEMnGgKDTDTAHp1ogL0HH75HKt/o4ThnP61btsiaJ5+WzpISWb++ui/sXq8tLb1h9ZXr3nBHHrUAVt9Y7aY5Kj12uLm11a3rvaOESgtYFrQI1n9S4/jCQvfXzi0odR1fvkml+4oU9HacadFLJzBGc3onVWpHW3FxjtTVtbtcLx+dHXboRAPs0YkG2CMTDYFBJxpgjyIaYG93mc6p3WLPv9Abcq+DFF5fttat9ThkdeVqiebkyOqVb+eIvVv06KN2fenEyenT9u/djBfJvuV5Mn7SQS7T6z2l5aEaOw860YCR4GeizZp2rORXUEQDLIS1OE0RLQ2RiQbYo4gG2NM3JUGczln54mvSPSlDNldlyLqGJre3eXPvNdneINU1vWvtDNNsMFVZ+YbrytKClAbhK4tpkH7gvd8Bpsctx+bmuuKXivVkuYmOfuB9xcT3uP3ikrFuYqV2gU3NL5aqonFSIVEKYrsBimiAPf/N/qnzTucIOWDE70Q7fvqcUL0+oYiWhuhEA+zdfOO1ss9+B1NEAwy929M59U2Q0oKYDjRQy5YvcdlbfleYFqc0JF+PK7Y2N0tnslayouNdhpcei+xub5XMnN4C1q7yw+9d9lfB3n3THnXKo9L8Rd+krIjLNdMjkNGusZK1T1wiq+old1Kp+zrHijAQRTTAHsekAXt0oiEwyEQD7NGJBtjTN/s7ms7Z1tYmW2rapaNf3aor0SmbShpcp5j6d2O11K5dJh3JqKx9faULo1/3ZpXLCNNCWCodYV2RMRLp2uKKZzphcnOyXcZGc7yvivTU1EhGaalMeW+5ywZTB+8/TfK68yS7tEMmlR/u9jT/i4IX3g3+mxLe7AN2/OI0mWiAHe1E+8fSR+XD04+jEw2ji040wN7V37lFjpzzPpnzoaO9HQCp0uK0Hok86ZCDZU2kRTKSsb4OsYaaamluanIFMQ3R726sl+ZkUpLt7VK9sd49JpXA/MzWNlf8KhtX5DrCtOC23/T9RZq3vizyjkXqUc3p7z/cdcuNK8p0Iflq//ET3VW7wXgzhaChEw2wp51ozRtqZe7cM70dAKliOicCg0w0wB6daMDOaa7cKItWrxKJtckzC/8lJXlt8o+lr7uv6bHJDa8td0Ws/p1dutaur1QUb/0zs7OjbnJkUfkEd0xy0r5TXQFs/PhJMrGwoPdx5SXu2l92qxAYjdDj2BlgL6zHzoAg0060JxY9Ix+df4pMiZd5u8FHES0N0YkG2KOIht2NHqPctKndreuqEu7aP2Rfp5S9+sqb7v7l15a7TrE31q51GWJtySy3v1O6eiSSn++OR+ZN3MttaS6Z0umVY3IicsDkqa4z7cgPHuU6bfbdd7pM6GmV6GEHhOrFFzCS6EQD7OnzSgfL0IkG2NHi9NqqRXLSB+ZJ2f4U0TCKyEQD7FFEQzpanVgubyxtdkUxfdP95ptV7ghjU0ObNMpmaW3qnTK5cUOduza0tkln3YadDtbXCZM6XVK7xLQYNnHv8r4w/3h+thz5niMkPrX3k/2M0vHuqpMktVtsjz1yJBaLuT0AO0YRDbCnb/abm2vkyCM+TCcaYIRONAQGnWiAvWuuvcFNzKOIhjBJJDbK8y8sdm+olz6/yHVxrVj6mssUSyVPbCCdNqm5YtopJvEimfX+w2Ts2IIdhunrm/0N1StkwWcv9nYApIoiGmCPTjTAHp1oCAwy0QB7dKJhNOnRyuY1zW4ipd85pscpq9b0Hq+0mEjpd4vpEUr/+KROm9ROMe0aK5owQfbeu1yi2T2y/+Tp7vekOknpwYfvkco3euTii87ydgCkiumcgD0y0QB7Ly9ZJs8+95qceOZ02adkmrcbfBTR0hCdaIA9imh4N2ix7B//+4p7ob6xulJWrm+QLYkmWVG5XDa3tkpP1hjp7NgsrZ1bdrqTrCBe6ApkZRX7uMLYQXtOl/ikQhe4r11jxcU5Eu0a6x6rxyjfjZD9P/zxXnflzT5gQ7+HPPnUc3SiAca0E00/vDr5BDrRACtaRFv80lNM5wyimq1vPDLbO3b5P4z/+7tzsqU0d+dyYEYDmWiAPYpo2FV6pNLXLLWyuSrDBfRroaz/Ecu3qtZ6j9qx7vZWySqe4N310kD+g088yRXIKia+x3WNaYEsyP/P6puSNWvWyIUXnOvtAEgV0zkBe3SiAfYeXrxEVv1zhZx89Aek4oDJ3m7wpX0RTb/h3fW7O92bijtuuc3b3T4tmi37v1dl8eJnpXLdG1vf9fS4gOVJhXF3nGXmzCNkzrGHe48OHjrRAHs333it7LPfwRTR8A5aJNPplaubVkhGMuaKQso/YtnY3CGN1eulOZGQ+o7Nw+4g8zvHNGvMD+LXvLFJ40tccUx/TcqKSOmMGaF9Qa+daNoxQxENsEMmGmDP70SbNe3YEe/SBnYX/1r4uDz65mvyyZPn04kWJCeedpKsXPKqW69aU+mu26MFtG9+7XJZeO+fh5w+ph0Ac+adIT/+yc2SO2aMtxscZKIB9uhE271pu/mbG+tlzdJF0tYZkZdfW+4mV1avWe+OViqdWqndYTtzzFJzyMrGFcl+0/fv6x47ZOpB7mt6pNIXlk7onUUnGmCPIhpgz+9EO3Xe6YF8/weEkU7nfGTpQpn/gTMYLBAE2hnwjcu+IY8//f96N7p6ZNWbvd0BQ9H/iF+49At9R2r8kOWyyXvKlvYu10VQ3dQkka7eN0z7TN1Pfv/73weuakonGmDv6u/cIkfOeZ/M+dDR3g7CxD9SqR1jSo9TOrE22dzY6Qo5LS3NrvvY7xyrq6nZ6ewx/bmh9GfH2MxMGZub29tJVrC3FBTGZPr7D+/LIAtyR/O7hUw0wJ4W0ZgiCNjyO9Hef+SJafmhFjAawnpMOi2LaK6A9t2r5fEHH/F2eu2oE+3yL31F7n/gfrfWcf2XX3mVzJx8UF9VVP/c519YLNdd88O+QtvMWcfIz264LlD/0clEA+zRiRZ8rVu2yJonn5a1nV2uC+PNN6ukfsMGWdvQ2Pv1phr3gYhOraxfXSkZpaU7Hc7f/8MVnVypx/zVvgdNkpxoWV+BTM2YPsVdw3rU8t1w3/1/lerqajrRAEP+mxKK04Ad/3l18gdnc5wTMOJ3oh0/fU7KE9/fTWlXRNP/EJ/43Px3jPbXNz4rX13m3b3TqsZq+diMD7q1Pva+m34i75sz290PpH+N0z41z7350sya3//yj4H6j04nGmCPItro0ElzsVhsm/XqxHJZ8cKb8sory1znmIbyV2+s3+mC2GD0+//kiXvJ5LLJrnNs0r5T3X/395SWh+qHe1i4TrSaLjn70o97OwBSwXROYGQwsAOwRyfaKNPC1v889jf59W9/2/dGSrvJ+k87214n2h9+8if51k+vcuvZJx+/wyEE533xgr5Ot+/88NpAfUMlEw2wRxFt5OiHGJFV9VuvW793x9rci1R9A6hee+MNqf33SmlOJt3xyoEfkAzF7xjTI5VF5b3dxBrOr0c1D95/muTl5Uv55ALJlEJXIBtb3iP7lExzj8O7R4/HrKxeKV/+7Be9HQCpIhMNsOcfk54+e5ZMiYcnuwkIMq3h/GPpo/Lh6cfRiTYatHDU/82VFsK+/83vyQcPO9Td76gTrf8Agp/edscO3yhfc+0Nctftt7r1gvMvDFTXF51ogD19zh944EEU0VKgPyg1i2xt1SKpS2x2XWTr3qyS1vpW2dy69Vd3t8sg04D+oQa7DKQfluxXMU0kP0MOmjbDFTr1OOWEnlaJFO3VF86f3br1IRy/CBwy0QB7dMwA9lwRLZmUuaef4u0ASNXDi5fI+qXPyKknn00n2miYMrnCXbVYdvGFF8knj5/r3jD5+2p7nWj65u6JRc/IsuVL5EufvniHldD++WlBK6KRiQbYoxNtaAND+9+oqeo7arn6jXWyacN6SdT3PmY49Pu4T7vJcvPzpaxiH9dBptMrx4+fRCh/mrjvvnukuqaJTDTAEJ1ogD0y0QB7fg3mo/NPCVWHZ9oU0bRwdPyJJ8kZnz1xmyM5/Ytr2+tE2xn6hvHjn/6MrHn1FXc/nM61dxOdaIA9imhv0x94WijTiZZrX1/pgvv9aZbDPW6peZIazh/ryZKi8glSEMlx+WMazK+/JmVFpHTGDEL505x2otVHRb54Om/2ASsU0QB72uHZvKGWqbeAIS1O6wmVkz4wr2+YYxikTRFNC1uDvdkabifaztAXJ5dccJ5bB3WwAJlogK3duYimP+CWL3tKnn36/2TZqtVubzgh/nrUMrcoVw6YPLUvoP/9h830viqSU1gg3W828YnubozpnIA9v2OGIhpgxy9Ohy0AHQiyl5csk2efe01OPHN6qLKJ06aINhS/iNbd3ipv1PQeNUqFvjC56JLP972BPP200wN3bJJONMDezTdeK/vsd3BaFtH845hLlq5ywf6vL/m3O9quUy/7D2fpT7+nZhVPkMLcmPswIV62Z99xy0OmHsQkSwyLHudsaKqRBZ+92NsBkAqmcwIjQ98DNjetoRMNMPSvhY/Lo2++Jp88eT6ZaEHiF9G6ImOkcvW/3XpX6TfP73/3ir43lfrG8Z6nHg7c+V0y0QB76daJpkcyX1uzVP696k15+bXlwzqOOXXGAW7CZcXE97ghCxrgP7GwgIIZdpl2or21vk0uvugsbwdAqjjOCdjzB3bQiQbY0fcjj61dJmfsd2SojnNmete0Nzaa4612jXZqXHnZ+X0FtMzWNnn6xecDGYDX2twsRRMmeHcALFQnOmRsPMu7Cw/tStBf+j1M86fOPOdzctB+E+XkucfLFV+50k0ZXvz0E7J65YptCmiaIzlz1jFy6eVfkwfve8Qdh3/ogb/JHbfc5rpctZio4f4U0JAKnXQWi9V6dwCsRLPT+jNy4F23ubFTotEoBTTAkE7tz2ms9u7CY7cpog0nv2co+onex+bM6XuDqR1oP7rzF5I7Zoy7D6L69g5vBcBCWUm2ewEVdKsTy933LC2YXXPtDfKZ878oR3zoI/LBww6Vb111hSuYtSXfLgbq97N9pu7nCmafPuczblDKwr885Aax3HP3L11WFYUyjBQdItHWNt67A2BBu4STHRneHQAL7nmVTPZFYABIXXFxjnsduKlkeIPJgmK3Oc4pXT2y6s01veudoG9Ev/uD7/cV4fQN5/d++Ss5YeYMd29N/3rP/POp3pvmrf9p8vu9CBp4P4SnnnhOTp0zR7769au8na2/VWplj0ShtO4pEllVL7mTSqUpq5M1a9bDXN/75/ukrKxMjjziw9KV6HTf7Ac+p+qqElJcXtL3fPMfM5LXzVUZblLmK68sk2e3fu+oXrNeWju3DPnBgXaYHTRlH5n5oQ9vcyRzbHmP5MvIFTOG++87d724fy79e2mtbZHc8XnenzA4/Xfd/+/bvx/4Z6n+fy2f/98qUtJbWNzRvf/fWLWuren7s3Z23f/P2Z3Xjy583B07m3fG3G2eV1y5ct316wtrnpbmld1y3CeO2+Z7mP/c48qV6zuv/s9o/+o/d/R5pa8jnn9hcd9ggcEew5Ur1+Ff9Tmlz583ljbL668vda8DyUQLkF2dzqmfMuiLe+3c8GkBbaQncWru0s23/kx6amoko7RUijNzpa67dYf3uVljpGXdW1IyYR+padngsotOOO4UaUx2SDya7f3pAHZVV7JBItFC727XDfWcHO5+S0uzu1aue2NYwf/6vaFs8p4uy+ygPadv/UY2vO6E/v+8O/pnH+qx+veeJ20S6YgP+687lL4/a+uf3X8tTVt/hG39s92/p46xvX8db28bA/YG/nvd3v3Ar8GW1XMLwNv4vgXYG87Pq6Gee+z3Yr8X+2/Ljiblw9OPC9XJl92miKbdF3o8aTi0gHb9D34o9z9wv7cjcvD0GfLdb/5oxP/j+i3C2jHRubrRdYdk1uZI115RibyVlO7x7e5euzO0S0Pbit2nJ1vX+hj9PZ/43HyZfdTR8plPft79WapSklIhUUlGNku0a2zfff+vsWbNeuh15aLn3dEznTw52OP851b/vcEe5xt47xtqf3XTCnnmr8/KopcWS/XG+nd0mun3uCnvLZcDJk+VSftOdX+v48dPcl1mO+L/vQ/n+8OESGbfY/qvB3u8r//ewL/GcO8Hs72/1nD/nMH+jMH4v3/gn6uG+msOtT/wz+r/Z6jdaf+llcvcJ/sVh7+/73H+1/r/XvbYY2/bve2tdWjM+owMOXbSQX3Pu/5f7/9cZM2ade96R88R/XmliopnStn4TW5vqOegGnjvY78X+7129309TfNGslHOOiJcAzvoRBuEBm9rbpBv9snHuzDtsJg54xA54+PzXfg3ABujNZ1TC+u//NWv5de//e2ghTM9uq0Fcy2mZ7eK5FcQeIvwuO++e6S6psll7wGwwXROwJ4+r7qlQWYfdbLEYjFvF8Cu0sFnTz+3Qd5a91DoOtF2m8EC+mZzR/TN6nlfvGCbAtqC8y+U67/8Pe8OAN4dOvL5Rz+5Xj5y1NFugqYW0LoiY2Sv8kmusH/7Xf/lumuvu+nH7oeOfnpDAQ2hk5Ha5GwA7xTGSdJA0HVlj5XmxgwKaIARfS5pV6fSZoAwYTpnPxoc/viDj7i1Ft2+88NrXTdX2N6Y5ubnS/2GDd4dgLC58Ve3yBcu/YL88qe39X3v0umZ3//eD+Qv993nOmPnHHu42wfCLBqNuiwMAHbCMEkaCJucnt4PfbR7BoCNrERC2uNlLpoqTHabIpqGbG+PdqFpoL/vq19Z0NcG37plS983zIFXP8MsSFqbm6VowgTvDoAFDZMdaasTy+XE006S2757Y9/AAO08e/C+R+Seu3/pvieFKS8A2BE9cqajzQEACLRYm0Sze+hEAwxVFY2TnMbqHU7jD5rdpojWkxv3VoPTQQJ+x4d2of35nkfcm1n9deZ/niZnbH3zquuB109//hy55tob3O8Lkvr2Dm8FwMJITg/Uovwf/nivzJtztqxc8qrb0+LZpZd/TZ5+5qlQZQQAO0MHYMRitd4dAAsc5wTsaYdnsiMjkA0UQFjpkDL9MJVOtIAaGx06d0W/Gf75wb96d71HP1evXOHezA7n18uvLfd+Z3AU5Qw+QhZAsKxqrJZvX3W1fOuqK6Spsbfb7fTTTnfHNglbR7qjEw2wx3FOwJ4Wp7UTjRMBgB09zrkllqATLWi0q2xHQwXqqhKuyOY/dmd/xfODV7Dawnl9IPC0gH/91d+V+x+4390XxAvl2ht/6oYF8CINuwPtRNMXTwAABFpbjE40wFikaC937UqE68OfjJ6tvHVa0nHEY8cWyISeVnnfnNne7rb0m+GSfy9zn9xNyorI2s4u93s2b256x31Z9iap79nTrZXuTywsCNRxq5kzDpEzPj7fDUUAYEMnZR40dbqceMJx3k5qdPrmZd+7zHWzqqkzDpAvXXQ1AwOwW9FjzO3Jalnw2Yu9HQCp0te+2uXpZ/sCSJ0+r5LtDTJ37pneDoBUPbx4iTSsfF0+MOdA2adkmrcbfGlfRNsdzTryKDn8kJmumwWAjVtvu1MmT55sUkTTI5xfO+d8eXnpEnc/e9bH5I67b3drYHdy3/1/leTaTXL2pR/3dgCkauFji6S2di1FNMCQ/7w6bs5sTgsARv618HF5+t+r5YRZx0nFAZO93eDbbTLRdidM5wSCSztfv37J1/sKaDNnHSPfv+H7bg3sdnrapaagzrsBkCo3PT5GpAdgzpvOSQENsKPTOTXag0w0BALTOYHg0QLaN757tSx++gl3rx1oP7vhOl6QYfeVkSOlTcXeDYBUxWIxBgsAI4FMNMBchUSlJlnjMurDhCJammI6J2CruaM3BzEVf/rdXfL4g4+4tXag6RFOCmjYrdGJBgAIAc3DphMNsLWuoUlKo6VSXF7i7YQDRbQ0lJufL/UbNnh3ACzkZxd4q12jwZl3//Yety4uLZWrPzHfrYHdWkaOZMVLvRsAFsbGs7wVACs6TI5ONMCWDmikEw2BQCYaECyaUXPtpV+SpsYGd/+9H/x0yGnBwO4kmUxKTmO1dwfAAsc5AXvaiZYfpxMNsFQpScmXHjrREAxkogHB8evf/F7eqlrr1gvOv1DmHHu4WwO7u2g0Km1t4707AACCSTvRmhvpRAMsaSZaRzLq3YUHRbQ0RSYaYKsr2dtFtrOWL14hv7v7V269V/kk+dxnP+PWALbqaZdYrNa7AQAgmPxOtOxWbwNAyjQTLTua9O7CgyJaGiITDbAXiRZ6q53zyNKFUldT49bzzprPMQCgv4wcOtEAY2SiAfb8TrT8Cl7HAVaKi3tfB7bWtng74UARLQ2RiQbYa0zu2hHpv9/zsLsWxAvlwgvOdWsAvTQTjU40wE5zJUfNgJHQkUmDAjAStsQSkjs+z7sLB4poaYpMNMBWPLrzR6QXPrZIVq9c4dZfvvxKdwXwtng8TicaYEi7ZBgsANjL7u5tUCATDbBTV9cupdFSaV3be2onLCiipSky0YDRpRM5b/rZ99xau9DOnj/PrQG8rbGxUSKZzd4dAAABFWuTaDbTOQFLepyzJlkjuZNKvZ1woIiWhshEA0bfU8tfl+X/XOTWs4862l0BbEs70cIYKAsEGZlowAhoi0myg+mcgKVo11h37UqEq4OaIloaIhMNsNfSMvxuGe1Ce+p3v5PMnFyJ7JEnc06iCw0YjHaicZwTsMVxTsCeTuekEw2wpdM59TjnppIGbyccKKKlKTLRAFt5efneasc2bWqXRS8tdusp7y2XGdOnuDWAbWknGsc5AQBBp9M56UQDbOlxTv1AdY9EobcTDhTR0hSZaMDoeXTh4/JW1Vq3/o9TjuNTS2AI+sKJ45wAgKDTTrT8OJ1ogKUNXd3udWCkJFwxBBTR0hCZaMDo+uO9v3VXPcq54LMXuzWAd9I3JBznBAAEnXaiNTfSiQZYKq/fKDnRMqmrSng74UARLQ2RiQbY60oO76z+wscWycolr7r1xZ+40F0BDE7fkHCcE7Cn2U0A7LhMtGiUTjTAUFXRODeds7i8xNsJB4poaYpMNMBWJDq8s/p/+Z+73VW70D624Ei3BjA4zUQDYMvPbgJgxz2vkkk60QBDFRJ1V6ZzIhDIRANsNSZ3XJhevniF/HPhX936qGM+IiWtHFMDtkcz0eIded4dAAvaMQPAFplogD1/OieZaBh1ZKIB9uLRHRemX1q5TFo6c9z6yA8eJfkVvNACtkc70WoK6rw7AACCiUw0wN7EwgJ3nJNMNIw6MtGA0fHXv/9dIl1bpCBeKMfNme3tAhiKm86ZpHMaABBsfidadqu3ASBlficamWgIBDLRgHdXc+VGWfLiC2596BEfoN0fGAbtRNPR5gDsjI2H61gMEAZ+J1rm3gXeDoBUaSdae7KaTjQEA5logK2Wlu1PELz3yT9I16YWt/7Spy92VwDbp51obW1kBwJW9AMdAPb8TrRNST74AaxUSu/ziU40jDoy0QB7eXn53mpwv/vN/e66V/kkmTZzP7cGsH3aiRbJ3H6BGsDwaRbn5sZwTTkDwsDvRMtJcNoHsKLTOTuSUWnKYjonRhmZaMC7a+Fji+StqrVuPe+s+e4KYMdcJhrHOQEAAdeRucF98FNbSJEasKKZaPo6MHe9txESFNHSFJlowLtn8eJn3TWyR54cc/iRbg1gx/QNCcc5AVvaMQPAVnb3BPfBz5R4mbcDIFXFxTnudeCmkgZvJxwooqUpMtEAW13Jwb+566jzZ//5lFtPeW+57FUUrjP9wGjSNyQc5wTstLW1uewmALb0eRXN7iF3EDCUlUjIllhC8iVcH6hSREtDZKIB9iLRQm+1LZ0mU72mtwf5gMlTXR4NgOHRTjQAdmKxGNM5gRHgd3iOKc1xVwCpixTtJVnxUulKkImGUUYmGmCvMTn4EelHli6UpsbeLrU5J81zVwDDQyYaYI/BAoA97URLdmS4QjUAG5qJltNY7d2FB0W0NEUmGmArHh38iPTKp19z1+72Vvnwhw50awDDkx/vIRMNABB42ommxzk1xgOADTLREChkogHvjqde/Ie7/ufHP8Wnk8BOam7MIBMNGAH6Zh+AHe1EG5sjklPI4A7ASl1d+9b3T7VkomH0kYkGvDseevhR6drU4taf+eTn3RXA8GkmGsc5AXt67AyAHe1E0w9+2hsY3AFYmdDTKu3xMmmt7X0/FRYU0dIQmWiAvZaWd3bL/Paee9y1IF4o02bu59YAhk8z0TjOCQAIOu1E0wiC7FZvA0DKqorGuUy03PF53k44UERLU2SiAbby8vK9VS8dcb7kxRfc+tAjPuCuAHaOdqJxnBOw5U8RBGDH70TL3JvnF2App6lE6qoS3l04UERLU2SiASPrmcpn+45yHvnBo9wVwM5hOidgTztmANjyO9E2JfmZBViZEMmUmoI6KS4v8XbCgSJaGiITDRh5axfVSFdkjMSinTJ+/CRvF8DO0E40jnMCAILO70TLSXDaB7AS7Ror2cnwNf9QREtDZKIB9rqS245efmbF8xLp2iKF46fIQR84wNsFsDO0E43jnIA9pnMCtjoyN7gPfjjOCdhZ19AUyhMJFNHSFJlogK1ItNBbiSQSG6W6crVb7zd9fynNzXVrADtH35AAsMd0TsBWdvcE98EP0zkBO52F2ZITLSMTDcFAJhpgqzH5dmH6hao35a2qtW5NHhqw68hEAwCEgWaiaYdnSck4bwdAqsrrN0p9VKQwJ1wfqlJES0NkogH24tG3C9OVi573ViKzZxzprQDsLA1pJhMNsMV0TsCePq+0w1NPIwCwESnaSzKrG2VTybaxOUFHES0NkYkGjKyHH/2ru5YUjZOy/cvcGsDO05BmMtEAO21tbUznBEaAP52TTjTAjp+Jli/h+kCVIlqaIhMNGDkrl7zqrkccOctdAewazUTjOCdgJxaLeSsAlvzpnHSiAXYm9LRKe7xMWmtbvJ1woIiWpshEA2z50zkXPrbIXdVRn/yktwKwKzQTjeOcgD2mcwK2/E607FZvA0DKqorGSU5jteRkRL2dcKCIlobIRAPs+dM5Fy9+1l0zW9vksPK93RrArtFONI5zArb87CYAdvxOtMy9yRwErFRIVDqSUWnd09sICYpoaYhMNMCeP53zySced9f3fuQwcjGAFDGdE7BHJhpgz+9E25TkZxZgxc9Ey13vbYQERbQ0RSYaYEunc+ob/rqaGnc/ecr73BXArtNONI5zAgCCzu9Ey0nwHguwMrGwgE40BAeZaIC9N9+sktbOLW69/3ve464Adp0WpjnOCQAIuo7MDe6DH45zAnb8TrSCzixvJxwooqUhMtGAkVG57g3p2tQikT3yZPLkyd4ugF2lb0gA2BobD9ebESAMsrsnuA9+2re+6Qdgo7g4x51IYDonRh2ZaIA9nc5ZX9VbnO6pqZH3HzbTrQHsOjLRAFvNlRu9FQBLmommU2/JwwXsbOjqllisVnLH53k74UARLU2RiQbY0umctQ0Nbj1h/2m8iAIMaEgzmWiAnfyKcbK5sdO7A2DFn3qbSFCoBqyU12+UnGiZ1FUlvJ1woIiWpshEA2xVJzqkemO9Wx9+zBx3BZAaDWkmEw0AEHT+dE4+RAXsVBWNk5pkjRSXl3g74UARLQ2RiQbYK8lrc3loavq+73VXAKnRTDSOcwK2tGMGgC1/OiedaICdCom6a1ciXB3UFNHSEJlogL1XK9d6K5Gz58/zVgBSoZloHOcE7LS1tbmOGQC2/E607FZvA0DKdDpnabRUIiVM50QAkIkG2Fr3ZpW7FsQL3RVA6rQTjeOcgJ1YLMZ0TmAE+J1omXvT6QlYmVhY4I5zkomGQCATDbD12isr3fXQIz7grgBSx3ROwB6DBQB7fifapiQ/swArficamWgYdWSiAbY0/yLStcWtD9pzursCSJ12onGcEwAQdH4nWk6C0z6AFe1Ea09W04mG0UcmGmDr+RcWeyuRfQ+b4a0ApEo70TjOCdiLZvd4KwAWOjI3uA9+OM4J2NFONEUnGgKBTDTAziuvLHPXyB55Ulyc49YAUqdvSADYS3ZkeCsAFrK7J7gPftq9N/0AUqedaB3JqDRlMZ0TAUAmGmCnct0b7lo2rkjy9yKwGbBCJhoAIAw0E007PEtKxnk7AFJVKUn3OjB3vbcREmlfRNMso+WLV7hfu2JVY3Xf79c/KwzIRAPsNFdulPqq3udTWcU+UtJKfhNgRUOayUQDbGl2EwBb+rzSDs+wvB8EwqC8fqN7HbippMHbCYe0L6I9uvBxOe1T89yvnaHfIM/74gVyzhGny4knHCEnzDtZPnLU0TLryKPkoYcf9R4VTGSiAXYSubVS29D7jT2eny35FXwCCVjRkGYy0QBb2jEDwJY/nZNONMBOVdE4icVqJV/C9YFqWhfRtHvsxuuuka5NLe7XcGmRTAtmjz/4iNS0bJDMnFw3mU//jLeq1solF5wnZ57zuUB/EkEmGmBjc1WGK0yrggh5aIAlzUTjOCcAIOj86Zx0ogF2JkQyXSdaa+3wazVBkLZFNC2gfeaCT0tTY28HiQaCD8cf/nivfPmrl/UV3WbOOkYuvfxr8p0fXiuzTz6+789Z/PQTcsGCBYH9RkomGmDjjZqqvu8jk/ad6q4AbGgmGsc5AXtM5wRs+Z1o2a3eBoCU1dW1u0603PHDq9UERVoW0VYnlssnPjdf6mpqvB0ZVieaFsS++4Pv9z1Wi2f33P1LufCCc+Xs+fPkjltuk+eeelIK4oXu6y8vXSK//NWv3TpIyEQD7OibfB+TBAFb+pziOCdgj+mcgC2/Ey1zbzIHAStM5wyAylfXyA9uvEVOOOrMvs4RX3f79j820PDwP/3urr4CmnadafFsID0Hf80Nt0tma5u7f+yZZwLXjUYmGmDnmX8+5a1E8krpmAEsMZ0TABAGfifapiQ/swArTOccZQsfWyQXff0i+fXNN/YVwk4/7XR3VT252+8g0bDwfyx93a31yOYpx5/m1oOZc+zhcvTH57r1Gy/+U55/YbFbBwmZaIANfzKndqBGOja7NQAb2onGcU7AFtM5AXt+J1pOgvdYgBWmc46y8xecJSuXvOrWWgRbcP6Fct1NP3b3amx0+4Hg2k225MUX3Do3a4y8/7CZbj2UionvcVcdOrBkxUq3DhIy0QAbb6xd665Tph/srgDsaCcaxzkBO21tbUznBEZAR+YG98EPxzkBO0znDIKuHncM82c//YVcecVl3mavHWWi1VUl+h5TXFq6w/HF+x96qLcSWfL0E94qGMhEA2xocd0/Gh7PpzANWCNnELAVi8W8FQBL2d0T3Ac/7Q0UqQErTOccZTpF88EH/p8L/9fjlgPtaDrna2uWeiuRyftWeKuhvTde5q1EahuC1X5IJhpgY8nSVd5K5KBpM7wVACtkogEjg+mcgC3t8NTn1Y4aLQAMH9M5R5lO0Zw2cz/v7p121IlWXfP2pwoFke0f/VTF5SXeauvv3VjvrYKDTDQgdYsXP+uuOyrCA9g1GtJMJhpgS7ObmM4J2PKfV0EbKAeE2YSeVmmPl9GJFlQ7ms659vW3c80m7TvVWw2t/6cQOyrQjQYy0YDUvfzacnedPHEvdwVgS0OayUQDbJGJBtjzp3PSiQbY0Uy0nMZqOtGCakfTOdMJmWiAjapXeo95x8v2dFcAtjQTjeOcAICg86dz0okG2NHpnDnRMpdPHya7TRFtR9M5N43J8lbhRyYakDp9kVTfsdmtJxUSfg6MBM1E4zgnACDo/E607O0fbgKwE7QTbWN99zZRWWGw2xTRdnTkco8tnd4qPZCJBqSm/yci+x40yVsBsKSdaBznBGyNjafPB8NAUPidaJl7F3g7AFKl0zn1dWCz1Ho74ZDRs5W3TktTJnuTNrt6ZNWba3rXg7jm2hvkrttvdetLz7tSLvzaeW69Pf6f3RUZI5Wr/+3Wqbr1tjvlV3f+3B3J1I6y7V1V/7Xvraq1MnvWx+TIjx7t7QDYWUufXyT3P3C/y1P8z/O/JJPG935Com/6AdjQTjTF8wqww/MKsLe951V7stodSeuPPfYUe4Pv+dzXmkrkuE8cF6q8wd2niLbVqjWV3uqd/vDHe+VbV13h1rNPPl7uuOU2tx7K8sUr5OS5x7t1SdE4+edLL7p1qh56+FH56yMPeHfbGpOdL1s6dvyJ/VNPPCdHHfMR+c9Tz5GOzA2SkYx5XwEwHF3ZY+W5Bx+UPz/4V3d/2Ve+6q76wmn8+EmENgNG1qzp/XBr8uTJ7gogdfpmX9+YTCgbemo9gJ2zveeVvm6MeBEgPvbYU+wNvqd0v7OpWdY2rpXjp8+RaTPD8zNrtymiRfbIk5WvLnPrwaxqrJaPzfigW0+dcYA89MDf3HooCx9bJOcvOMutZ846Ru65+5duPVKaKzdKfsW21dmBe/79zBmHyOyjjpbrbvqx9xUAO8vvTi2IF8pf/nC/PPz0o+6N/oknHOc9AkCq9IMjLaRdeMG53g6AVOnzSt/wnz1/nrcDIFV/ffwpaamp5XkFGNKaSm3tWjluzuxQdaKRieYZ35DlCm2qes36HU5eef313ql96t0IHR9YQFMD9/rfM1gASI0/4TYre2zoxi4DYZFMMpkTsKbZTQBs5fTkSDS7R2pamSwAWJlYWOA+9AlbJtpuU0TzC2RDqS3slIOm7OPWrZ1bZMnSVW49lGcWLfJWIrOO+6i3ApAOtIi+tqE3+2LchGL3yUhLC+HngDUtopHbBNjRUwkSa/PuAFjxozxyEgxvA6ysa2iS7GhS8iVck9rpRPNMiZfJEbM+4Nb62MWLn3XrwWgeWnXlarcuLi2V95SWu3VQ6KABv4sGwK5pbapx19yCUnfNy9t2gAeA1EWj0b6wZgCp01MJmxvTa+I8EATa4ZnsyBj0dBCAXVNcnCNtbeOltXb7tZqg2W2KaDphb0emHXRUX8far66/Xu67vzdUvD8toH375uvdBEx15Ac/HLgQPJ3YyXFOIDV6rFu9G8e1gd2VdqLpJ5AAAASZdqLlxznOCVja0NUtsVht6KJzdpsiWk/ujt8Izzn2cLnwc2e7dXduTK748iVyxqn/IQ8+fI8LvdOg8c9c8GlZ/PQT7jEaOH7ut3un9gXJ2MxMqW+n1RiwMGnfqd4KgDU9yqmfQAKwQyYaYE8nCW5u5zgnYKlCotKRjNKJFlRjozneavsu/vIVMvvk46UrMsbdv7x0iVx6wZVuEqdO6qur6T3itVf5JHnyvxe6Y6BBs7m7W4pysr07ADurriohTY0Nbq0TOQGMDD3KGckkbxCw0tbW1pfdBMCODhbgOCdgy89EoxMtYKbOOMD9mvLe4eeW3XHLbfL97/3AFdO028ynRz21ePbpcz4jP//JzwP7TZRMNCA1+g3dxyf6wMjRTjSOcwJ2YrGYjI1neXcALOl0zlWN1d4dgFTpdE7tRGvKCleWZ9oX0f70k7vloQf+5q474+z581wx7eHnnpF/vvCi+/XcU0/K0888Jd/4zjcDl4PWH5loQGpeqXreW/Ue8wYwMrQTjeOcgC0GCwD2/A7PIJ5CAsKqUnqzcXN7o6hDI+2LaH632K52jZXm5kpJybi+X2FAJhqQms1e3sVwBpIA2HXaicZxTgBA0PnTOZsrN3o7AFJVXr/RfZi6qaQ3RicsdptMtN0JmWhAairXveGue089wF0BjAztROM4JwAg8GJt7kImGmCnqmicm86ZL+E6lUARLQ2RiQakZsXS19y1rGIfdwUwMpjOCdgjyxOwp8ekyUQDbE2IZLrXgUznxKgjEw1IzebW3mOckwrj7gpgZDCdE7DFdE5gZPjF6fENDO4ArGQlEpKxZ6Z0j2/3dsKBIloaIhMNSE2ivjfvYtK+U90VwMjQTjQAdpjOCYwMLU5rJhrHOQE7epwzs7pR9kgUejvhQBEtDZGJBtjo/wa/KxmuwEsgDMhEA+wxnROwp51oepwTgB0dLNBdFpdISbg+/KGIlobIRAN23fLFK7yVSF7p21lNkWi4PiEBwoBMNABAKMTaXCdaIsF0TsCKdqLlNFZLXVXC2wkHimhpiEw0YNeta3g7S+bAgrff3DcmOSINWCMTDRgZdMwAtvzBAiUlHOcErFRIVDqSUSkuL/F2woEiWhoiEw3YdcnNa7yVSNeUIm8lEo9yRBqwpp1oHOcEbOmxM+2YAWDHf17RiQaAIloaIhMN2HVVa3o70QrihVLQSTgzMJK0E43jnIAdpnMCI0OfV/rBD51ogB09ARTGD1MpoqUhMtGAXdfS0nu0rLVzi7SurXFrACND35BwnBOwo9M5AYwM/eCHTjTAzoSeVmmPl5GJhtFHJhqw6yrXveGuU95bLhWH7u/WqjrRIWPjdKYBlpjOCYwMMtEAW/50TjrRADs6WKBobReZaBh9ZKIBu64gkuOurfWt23zaWFaS7UJlAdjJj/dwnBMwRiYaMDLIRANsTYhkSmN2izRLrbcTDhTR0hCZaMCuW/TSYnctq9hnm08bu5IN3gqAlebGDI5zAsbIRAPs6fNKP/jJbvU2AKRsQ1e3O5GQL+H6QJUiWhoiEw3YdblFue4az8+W5sq3P22MRAu9FQArmokGAEDQaYenfvCTX8FxTsCKdqLpiYTW2hZvJxwooqUhMtGAXaMt+tVr1nt3wgslYIRpJlq8I8+7AwAgmPxOtJpWWtEAK1mJhGyJJSR3fLheC1JES0NkogG7Tjs5lZ+NBmDkaCdaTUGddwfAAkNwAHt+J1pOgvdYgJVI0V7u2pUIV+40RbQ0RCYasGt0vLJ2cqqB3ZwtLeQ2Ada0E21MW7gmMgFB1j+GAIAdvxMtc+8CbwdAqtY1NElptFQiJeH68IciWhoiEw3YNcnIZm8lkpfX25HmG3gPIHXaiRaLhWsiExBkGkPAJGnAnt+J1r71TT8AGxMLC6QmWeMaGcKEIloaIhMN2DV1de3SmayVrsgY6eqmaAaMNO1E60hGvTsAAILJ70TrP7kdQGoqRSdz9khxebhOJVBES0NkogG7Rl8gdUSKJNK1RcYV8e0RGGlM5wTsaccMAFt+J5oOoQJgo0Ki7sNUMtEw6shEA3Zd16YWieyR9443913JBm8FwIqbzkkhDTClHwgBsOV3omUznBMwo5lo2dEkmWgYfWSiAbtG39CrzroN7/gkPxIt9FYALPnPOwAAgsrvRGOwAGBHM9G0E60pi040jDIy0YBd47+ZzyqeIFPieW7ta0xyRBqwRhcaACAM/E60TcmktwMgVZqJpp1oueu9jZCgiJaGyEQDdk3/I5vdkzK8Va94lCPSAIDgGxsP17EYIAz8TrScBO+xACvl9RulrW28bCoJV2wORbQ0RCYasGtWru/9Bt5TUyP7lExzawAjh6OcgL3NjeE6FgOEgd+Jll/BdE7ASlXROInFaiVfxns74UARLQ2RiQbsmi0dze6aUVrqrgBGFsc5AQBhwHROwN6ESKbrRGutbfF2woEiWhoiEw3YNeverHLXow79sLsCGFl0ogEAwsDvRMspZLAAYKWurt11ouWO3zaLOugooqUhMtGAXVNfVe2uBYUxdwUwsrQTTQNlAdgZOF0aQOr8TrT2hiZvB0CqmM6JwCATDdg19R2b3XXSvlPdtb+Wlt6jngDsaCeatvEDsNHW1uY6ZgDY0ueV++Cn1dsAkDKmcyIwyEQDdk3Xpt7z+JMnT3bX/vLy8r0VACv6hiSSSYEasBKL0UkNjASdeqsf/IwpzfF2AKSK6ZwIDDLRgJ330MOPeiuRqR86yFsBGEn6hoTjnIC9aHaPtwJgQafe6vOKQjVgh+mcCAwy0YCdt2bNGm8lMiVe5q0AjCQNaeY4J2BLs5uSHRneHQAL/vOK6ZyAHaZzIjDIRAN23rLlS9y1IF7oru/QxKf6gDUNaeY4J2CLTDTAnj+ds6RknLcDIFVZiYRsiSWYzonRRyYasPNWLH3NXQ894gPu+g4FfKoPWNNMNAAAgs6fzkknGmAnUrSXu3YlmM6JUUYmGrBzmis3yltVa91676LBj3I2d/DJPmBNM9HiHeH69BEAsPthOidgT6dzljYVS6Qky9sJB4poaYhMNGDnPFf/prcSOfjwwTvR8rMLvBUAK/qGpKagzrsDYEGnCAKw5TLR2huktjBcHTNAkGkmWmN2izRLrbcTDhTR0hCZaMDOWb/0GXeN7JHnXiQBeHdoJ9qYthLvDkCqtLMagD0/a5DhU4CdDV3dbko70zkx6shEA3ZO9dpGd83NGiMTCymiAe8W7UTT0eYAbORXjJPNjXTKANaYzgnYYzonAoNMNGD49MXQK2t689DKJu8pxeWDd8W0tDBBELCmnWgdyah3BwBAMDGdE7DHdE4EBplowM6prlztrhP3Lh/yxVFeXr63AmCF6ZyAPWIJAHtM5wTsVRWNk9JoqdRVJbydcKCIlobIRAOGb8nSVVK9sd6tD9pzursCeHcwnROw52c3AbDDdE7AXnn9RqmPypAngYKKIloaIhMNGL7mpjXStan3HP6+s/Z1VwDvDqZzAgDCgOmcgD3tRMtprKYTDaOPTDRg+B596mlvJTLnQ0d7q3fqSjZ4KwBWtBMtO0nnNAAg2JjOCdirkKjLxqUTDaOOTDRg+F589v/cdeasY9x1KJFoobcCYMUdjYkmvTsAFsbGs7wVACt+1mBzJZlogJWu+re8VbhQREtDZKIBw7N88QppauztMPvUmWe661AakxSmAWvaiaajzQHY2dzIcTPAmt+Jll/BdE7Aih7n1A9UOc6JUUcmGjA8//PY39x1S0a3HDFtplsPJR6lMA1Y0xdOkcxm7w4AgGBymWgdTOcELOlxTv1AleOcGHVkogHD8+c//dFdDz/yWD5ZBEaBy0TjOCcAIOhibe5SUsLrRcDKuoYm6YiG77QPRbQ0RCYasGMLH1skrZ1b3Prg/ae5K4B3l3aicZwTsOVnNwEw1BZzFzrRADvFxTlSGi2V1rU13k44UERLQ2SiATu2fNlT0rWpRSJ75MnMI7Z/lFO1tHDkDLCmnWgc5wTstLW19WU3AbCjz6v8eA+daIChurp2aU9WS+6kUm8nHCiipSEy0YAd+8fS1921KHusTBm742/ceXn53gqAFe1EA2AnFuvtlgFgSzs8mxvJRAMsTSwskI5kVJqywjUQhyJaGiITDdg+ncq55MUX3PqII2dJxaH7uzWAdxeZaMDIiGb3eCsAFuhEA+xVStK9Dsxd722EBEW0NEQmGrB9C5/+H3eUUx31yU+6K4B3H5logD1/iiAAO3SiAfbK6ze614GbShq8nXCgiJaGyEQDhqYvfn5y611uPXXGAXLCzBluvSNdyXB9cwfCgEw0wB6ZaIA9fV5phyedaICdqqJxEovVSr6E6wNVimhpiEw0YGj3/vk+iXRtke72Vrng3Iu93R2LRAu9FQAr2onGcU4AQND5HZ50ogF2JkQyXSdaa23vCaGwoIiWhshEAwanWWi/u/tXbv2eQz8ohx75IbcejupEh4yNZ3l3ACxoJxrHOQEAQaedaPrBD51ogB2dzqmdaLnj87ydcKCIlobIRAMG98SiZ6Supsat/+MjJ0ppbq5bD0dZSbZsbgzX5Bgg6PQNCcc5AVt84APY0+eVfvBDJxpgZ0JPq7THy+hEw+gjEw14J33Rc/OtP3PrvconyUfPP9Wth4tMNMAe0zkBW82VvMEHRoJ+kEomGmBLM9FyGqvpRMPoIxMNeKdPf/6cvomcl195lUyJl7n1cJGJBtjLj/dwnBMwlF8xjq5pYASQiQbYIxMNgUEmGvA2fbFzzbU3yMolr7r70087XU484Ti3BjC6mhszOM4JAAg8N50zGqUTDTBEJlqa+sMf73VvwPXXrbfd6YLJg45MNOBtS5aukl//9rdurcc4v/r1q9wawOjTTDQAtrRjBoAt14mWTNKJBhgiEy2NaKHsvC9eIFMmV8i3rrpC7rr9VvfrJ9f9SE6ee7ycec7nZOFji7xHBw+ZaECvl5csk/POPskd44zskeeOce7qJ4gtLXTLANY0Ey3eEa5PH4Gg044ZALb0eaURBHSiAXbIREsTWhz7wqVfkMcffMTbESmIF7pfvsVPPyEXnnWK61ILIjLRgN7n8pcuvlgyc3JFunrkh9/9ekrHOPPy8r0VACvaiVZTUOfdAQAQTNqJphEEdKIBdshESwP6TfGbl18ob1WtdfdaOLvlzsdk8ZKX3K9/vvCiTJ1xgPtad27MdakF8XgnmWjY3WkH2pWXnd/3XL70a1fJ3LlnujWA4NBOtDFtJd4dAADB5DLRmM4JmMpKJGRLLEEnWpg988xjkqjv/XRBs5Oe/d/n5Pjj9nH3Sr9pPvTA32T2ycd7OyI3/eZmWdVY7d0FA5lo2F21tbW5DtGzzv6ENDU2uD0dJDDvjLluDSBYtBNNA2UB2Bkbz/JWAKwwnROwFynay127EuGaKk0RzVPT2iqLnn3euxOZd9b8rS/sY97dtv7z1HNcvpJa83qlFHQG68UKmWjYXX37qqtdh6ifgfadH14r1930Y5NPDclEA+xpJ1pHMurdAbCwuTFcb0aAMCATDbBXKUkpbSqWSEm4PvyhiOYpzc2Vpq52t96S0b3diWEzpk+RsnFFbl1XUyN1VQm3Dgoy0bC70fyzWUceJfc/cL+7L82bIF/9ygI5e/48d2+BTDTAHtM5AQBhQCYaYK9Coi4bt1nCdSqBIpqnuXKjFERy3HpMz/b/tWjRTHPHlBasisuDledCJhp2F/4k3a9cNLcv/0xzC7/9k5/Igs9e7O4BBBfTOQEAYaCdaPrBT3artwEgZesamiRferb+Gu/thANFNE9+xTjZ+8jDvTuRv/79797qnV5auawvbym3KNddg4RMNKQ7zT675tob5LRPzXOTdNuSvS3AC86/0OUWzjn27ecygOBiOidgTztmANhymWjtDVJbyHFpwEpxcQ7TOcPupPL3uYECavHTT7g36f2nb2r7roaWf/cH33f33e2tcsG5FwfubDyZaEhH+vzTY5vf/9Z35QOH7Ct33X6ryz6Trh45ePoMN0n3yisu8x5tj0w0wJ52omUn+XkFWNEPmbRjBoAt/3k1JV7mrgBSt6Gr2w2YYjpniFUcur/8/Cc/d8fBlL5J/8wFn5YTTztJzjj1P+QTn/jENqHl3/vJrXLiCce5xwYJmWhIJ3rU+sZf3SIXLFggF13yefnN3b/u6zzT5+pP77hTfnT37dtM0h0JZKIB9tzRmGjSuwOQqqGGYgFIDdM5AXvl9RslJ1oWuIz5HaGINsC0mfvJb35xt8ycdYy718EBK5e8Ki8vXSKrV/Z2pRXEC+VnP/2FaWi5JTLREHb6AmV1YrnrBj3omEPktu/e6J6DrvNsK+0Yvf2u/3JHN7WQzaeCQDhpJ5q28QOwFc3u8VYALDCdE7BXVTROapI1gcuY3xGKaP3UtLbKXb+6WT42Z447zqn0zboeFdOimn/UU/PQtCNGj5UF8dMIMtEQVnp8Wo9Mf+Oyb8gJR53pukH9QR/6/Dv9tNNd8ezpZ54i9wxIA9qJFsnkqDRgye+YAWCH6ZyAPZ3OqboS4coapIjWz19++0f5wQ9ucUUyPa75nUt+KL+673a57a675Bffvk7+ct998tPb7nBf044YPVb27Wuvd8fNgoRMNITNw4uXyOVf+oqcefax8o2rvy6PP/3/+rrOtICtzzt9/l13049HrXhGJhpgz2WicZwTMEUmGmDP70RjOidgR6dzlkZLJVLSG9UTFhk9W3nr3Zp2oc074SR5q2qtu//OD68d8rimdst84nPzXbFNhwvc8us/mGWj6RG2N5YO/WZ9S3ex7J2xRjZk5EpnYbY7R6zriYUF7n9Cverf2+yjjpavfv0q73dtX7PUurGy/pU99t6Nvc1VGfJGTZX89p57+jo/fVqonnHoYfKpM8+U9x820+31/3O2Z7iP0088+n/D3tH9vX++TyZPntz396MG/rW455774d+rRxc+7gpp886Y6+300uffppIG93jWrFlvf61a19ZI7qRSt37+hcWyoXqFnHry2e6+v/6P0+fkHolC97Ou//OTx/AYHvPOx+jzSn9eHX7CkVLQ+fbrw4GPZ82a9fbX/nNKLVm6Sl6pel6Onz7HxWqFBUU0j079O3/BWW69z9T95O9/f8Sth6JdM/c/cL9b6xEz7ZCxoBlQeoQtVRq4fsJxp4g09UhztFnyswtcJ42Gow+86mMaszdLvGNs31UKMqQ60SFlJdlv/xnJrY/tt9+VbJBES2y7j+H38nv7P6Yls8UNvXh1zUppXF0vNS3bDsDQI5v7Td9f9i4qk8JSL+ds6+/vym7s+/P0z26RmMSjvetItHCb/5f172Oo/9cHXps7mrZ5bgx6v/Xv2/39b91X/tf0r+U/X/r/Oxj41xjs30n/P8P/vf514J/JPffpdp8nbW9/f+hn4HPH8Z8j3vPPf86zzz773v7Wtf6MdPtbDfr82frcG/jn+D9H1Tt+JnmP6/9n8Rgeszs/xn+ODfo6dyv/9aP/df++Mdnhnmfss8/+2/sDn3d6IkE/9AlV3qAW0dDT89VLvtyzz6TJ7peud+TRhf/X9/gjj5jl7aau6Y26ntra3l+bNm3qu+r+vxs29F39xwz8pQ6ZfnDfP4M+VvlfG3j1/zylf52Bv/TrauBjlP81Ndifwe/l9yr/67//wz3uueI/b/r/+tE112/z/2T/q//7fdUtLdtch/p/e+B1qL/voR7n/7P4j/vZD3/e87eH/u7WujfU4/w/x//r6Nd13dLZ6e7VwL8H/zrwz+KeexX2e736a/9569PvCz+79Y5tnn/Kv/f/LH3O6O/1fz/77LPfS9f680V/+c8b/Vmlzy3lP9b/ml79n0f+nv75auCfq3gMj1Hp+piBP7f8ff9xevWfLw8+/t/ueeV/TfV/nPL/PNV/j3322X/7NWD/Pa2p9H8dGBZ0onn6d5ZdevnX5MILznXroeiRzpPnHu/W2j2jQedBMXPGIXLGx+fLlVdc5u0A7z4NXtXW91deWSa/uv566c59e+y+Htc8aMo+ctqZHw/slNuBbr7xWtlnv4PNjm4DEDdIRIXl+wAQBg89/Kg7dsbzCrDz18efks6mZpl7+ineDoBU/Wvh4/Jky0Y5Y78jpWx/7xRSCDBYwFM0YYK3Eln7+kpvNTTNHwsypnNitGiBWY8lf/rz58iXv3qZO57sF9AK4oWy4PwL5YHf3is/uvv2UL3A94/KALCj0zn1zT4AOzpFEICtnJ4cSSaTTOcEDEWK9pLM6kaX8RkmFNE8Bx54kLcSWfTSYm81tBdfecZbibzv/R/wVsHBdE68m/QFxctLlsl5X7zAdWhq4Wzlklf7JmxqRt8tdz4mi5e85DokNThySjw8nzYoPdcPwBYFNMAe0zkBe/q8imb3hCu3CQg4bUzSTLT+wwbCgCKaRyfu6bFMVfXWW31HTAajnTb/778f8u5ETjjmGG8VDLn5+S68HRhJbW1tbiCH33V2xmmnyuMPvj2QY/IBB8qnz/mMPHjfI/LQA3+T44/bx/tKOGkwJgBb2okGAEDQaYdnsiODTjTA0MTCgq3vKcdLa21v40VYUETz6KcK886a79aRri1y43XXuOLAQFo0+MKlX5C3qta6+5mzjglcRlJrc/M2x1MBS/ri4dbb7pTjP3aCXHTJ5/u6zpRmnem0Wi2c/ek3v5ZvfOeboRpXDODdpZ1o+gkkAABBpp1o+XE60QBLlZKUWKxWcsfneTvhQBGtHx0moAUA1dTY4IoDUw84SM4853PumNpHP3q8nL/grL4CmnauXfPFr7g1kM60cKZBxfo8+MhRR8tPrvuRex7ocU0tnOlzQQdyPPfUk3LdTT92hTNeZADYEe1E008gAdghEw2wp8+r5kY60QBL5fUbpT1eJnVVCW8nHCiiDfDNG651xQANQFdaJFj89BPumNrqlSvcnt9t85f77pOKQ/d3e0C60RcJeqxZC2f/OXeuXHLBee554Oec7TN1P7n44i/Ijdff4KbTahE6nQtnXclwBV4CYaCdaJHMZu8OQKo0aoFMNMCey0SLRvmQGDBUVTROchqrpbi8xNsJB4poA+SOGeOKARqA/tPb7pDZJx/vQtG100aPbmqB7eGn7nHdNkH9JkomGlKhR5a1cHb4+/aTb111hSuc+d2XSp8Telzz739/RC7+8hWBO848UpjOCdgjEw2wFYvFZGw8y7sDYMVlojGdEzA1IZJJJlq60eLAHbfc5kLRtdPmnrt/6Qps+5RM8x4RTGSiYbj0hYAWze677x5XOJs54xB3ZFkLZ5k5ue4x2pWpBeTv/PBaeenJF91zYnfMOWM6J2CPTDTA3ubGTm8FwAqZaIC9rERCtsQSZKJh9NGJhu3x880u/9JX3FTNKy87X674ypWucKZZgEqPLGvHmXZj/v6Xf3QF5LPnz5P8it33hQPTOQF7ZKIBAMKATDTAXqRoL8lOhu89FkW0NEQnGnz6g15/LV+8wk3U1OEYHzzsUJdvdv8D97upmlo406JZd3ur6zjTwtnKV5e5jjPtxmS6JoCRQiYaACAMtBNNP/jJbvU2AKRMp3OG8UQCRbQ0Vd/O0bPdkQYK6/FMHQhwzbU3yDe+e7WcfNKJcvLc491ETX84htJjmpr39+lzPiPf/Po3ZNG/VriOs90l4wzA6CMTDbDHdE7AnmYN6gc/Y0pzvB0AqdLpnGSiITCKcjh6trvQLrO7fnWzyzQ74kMfkQvPOkW+cfXX5a7bb3VHNOtqarxHihuQoZNlb7/rv+TehX+QX/3+v+Qb3/mmO6pJxsP2MZ0TsEcmGmCL6ZzAyNCswWh2jxveAcCGTueMxWrJRMPoIxMt/TRXbpTVieWuYKadZjffeK2cec7nZOoBB7kus2u++5O+TLPu3JiMjea4I5olW78xabaZDgX45wsvugEZOll2zrGHuwEZpbm9wwOwY0znBOxpSDOZaIAdpnMCI8NN5+wgEw2wpJ1o7fGy0HWiZfRs5a2RJnTC4hkfny9XXnGZt4Ow0R/QS5aukrVVi+T1qhZZW/mGNFavd11lfvj/QNpltt/0/WV88TR5/2HjZUrpdPLMDF39nVvkyDnvkzkfOtrbAZAqPXqu3Wg6+RqADR0epM8r7TIHYEOfV4rYE8DOw4uXyPqlz8hJH5gnZfuXebvBRydamiITLVy0aOZPzJx15FEu/P/8BWe5DrP7f3OXLH76CZdn1r+Applm/gTNl57s7TLTYQDf+9YX5eQTzqSAZqysJNu18gOwQyYaACAM/Ew0OtEAOxUSlY5kVFr39DZCgiJamiITLVj8CZl6FPPBh+9xkzI1w+zE005ynYP9J2a+VbXW+13SdyRTBwDo5MwF51/oimZ6NHPxkpf6JmjmV5BnBiB89A1JvCNcORhAGGh2EwA7fiYaGcKAnXUNvVNvI6vqvZ1w4DhnGtJOpsMPmemyrzA6tGj2/AuLZfWKl+XVyrWy7s0qaa1vldbm5iGPYyrtLiubvKcc8cGj5IAD95bo2MkysbBAistL+KE9yrTwOXnyZNr4AUPagbuyeqV8+bNf9HYApEo/sKutXctxTsCQ/7w6bs5sXpMDRl5eskz+93//Tz46/xSZEg/PcU6KaGmITLSRpZOvNm1q9+5E6qoS8kZNlTz96N/l1TUrZdW/q6Rr09DhiNpd1tXcLJH8fJny3nL54PT3S8XU/XixG3DXXHuDHHjgQRTRAENkogG29DXKk089RyYaYEw/9EkmkzL39FO8HQCp0uK0ZoCfevLZoSpOU0RLQ1pEm33aXLnu21/v3cAuW9VYLZ2rG12RTF+QrqmukaaqNdLU1S4rlr62w84yLZiVjSuSsop9JJ6fLQdNmyHlkwsI/Q8hOtEAe/qmZM2aNRTRAEP6vKKIBtiiEw2wp3FHL61cJodMPShU740poqUhOtF2jX8EU9/QLVu+xB3BbFxdL3XdrdJZt0Eyc3K9Rw7OL5jpUdrp7z/cfTOI9nRL7qRSftimAYpogD3tRJOaLjn70o97OwBSRRENsKfPq25pcMO7ANjQ4vQrVc/LJ0+eTycaRheZaIPTIpkevUxGNktdXbt7wlYvWyNrGxplyYsvbPcIptIiWW7WGLfOzc+X/abvLxUT3+OO+L2ntJzOsjRHEQ2wp29KyEQDbJGJBtijEw2wp51ojyxdKPM/cIaU7U8mGkYRnWi9NKjwtddWyJtvVknlujf6wv0baldJWzLLe9Q7+cWyKdMPlkmFcZm071Q3NWT8+EkyoadVJh89S3LH9BbTsPu4+cZrZZ/9DqaIBhgiEw2wRSYaMDL0Qx8y0QBbYS1OU0RLQ7trJpo+CRcvflae/edTsnLJq97u9g08gsmnSxgKnWiAPX1TQiYaYGvh/z4ptWsSFNEAQ3SiAfb8TrTjp88hEw2jK5070fSJtq6hSZqb1si/V70pL7+2XKorV8tbVWu9R7xTQbzQHb/sH+6/99R95b3xMo5gYtiu/s4t8oHDplJEAwxpJ1p7sloWfPZibwdAqshEA+yRiQbYoxMNgZFOmWiaY/bowsdl6fOL5NU1K3d8HLOrR6bOfJ8cMHmq7HvQJJlUfrhMLCyQwpx4qM5ZI3joRAPs6ZuS1W/Uy8UXneXtAEgVRTTAHp1ogD1tkPnH0kflw9OPC38nmn4y/Mw/n5KCSI40dbXLmOx82dLR3Hfv29X7L336YjqARlAYO9G0WKY0+P+1NUvl0aeelhef/T9pamxw+wN1RcbI2GiOZHfVy7TDPypHHn64HHP4kfx/hRFDEQ2wRyYaYE+LaMn2Bpk7l44ZwIo+r9QR02ZKfgVFNMDCw4uXyPqlz8ipJ58d/k60y7/0Fbn/gfu9O3s/ve0O3oiOoLBkomnl+aWVy6Ry5Qp5s75aVix9Tda+WSljejK9R7xNj2Rq0L8exxxfPM0dq2MiJt5NFNEAe/qmhEw0wJbfMUMnGmDHzxr8j9NOklgs5u0CSIXWA55Y9Ix8dP4pMiUenlNj76xWvAvGji3wVhgpRTnZ3io4tNvsvvvukfO+eIEr9J32qXnyrauukN/c/Wt5/MFHXK6ZX0ArzZsgM2cdI1d+81J58L5H5P8tXCg/u+E6ueOW2+R73/qiK2RQQMO7qSs5eFckgF2nXWjZ0aR3ByBVOp1z8+Ym7w6Alc2NnRLN7qGABhjSrHN9HZi73tsIiSGPc/7vSy9tc4TTP9Kp/L2nnnhOuja1uByq2aed4L428OjnYEdBOc45soKQiaYFMz2a+UZNlbzyyrIhJ2bqdMzcrDEu+H+/imkyddb+oZvOgd0DnWiAPTLRAHtkogH2yEQD7L28ZJk8+9xrcuKZ02WfkmnebvClNFhAu4k0s0qP2i1e8pK3i9E2WploqxPL5f8WvtI3BKB6zfpBM838o5kfnr6vjCurkOlbfxBNPnqW5I4Z4z0CCB6dznnknPfJnA8d7e0ASBWZaIA9imiAPT8TjQ9TATv/Wvi4PPrma/LJk+eHqjg9Ksc5MfLq2zu81cjSjjN9E/TRjx4vHz3sBHc8U/P0tOusfwGtuLRULr38a+5ophZc77n7l3Lxl69wL/DeN2c2BTQEXllJtmvlB2AnHo97KwBWiE0B7I2NZ7nitD8MDUDqIkV7SVa8VLoS4XqPRREtTY1EJpr+0NBW5gcfvkcuvOxKd2z0g4cd6gpnq1eu8B7V22k2dcYBcvppp8u1N/5U/vnCi/J/i/7PdRpwTBNhRSYaYI9MNMAWmWjAyPAz0TjKCdjRTLScxmrvLjwooqUhzRer37DBu0udFs6uufYG+fTnz5ErLztfLr3gSvn7X+5xgwB8e5VPkgXnXyg3/vLX8vtf/lEeeuBvLpNt7umn8MMGaSESLfRWAKzkx3u2vukf790BSJWGnmvHDABb2uGZ7MigEw0wVFyc414HbioJV7MCRbQ01NrcLEUTJnh3O2dVY7X74aDnky//9g9cvtr5C86Su26/te+Ipg4D0F/ababTM7XT7OlnnnIZbKfMPopuM6Snpl2OjwQwhObGDIlk9g4tAmCD6AHAnnZ4RqNRmgMAQ3V17RKL1Uq+hOsDVYpoaWpnM9GWL17hss3u/Pb18p9z58ppn18g9//mrr5cM79opkc0v/n1b8jTf37UdZst+OzF/DDB7qEgw1sAsEImGgAgDFwnWjJJJxpgaEJPq7THy6S1tsXbCQeKaGlqOJlo2nXmDwU47VPz+oYC9D+mqYWz7/zwWlc0+80v7nZHNHUYQNn+Zd4jgN1DcwcZM4A1zUSLd+R5dwCsaHYTADvaiaYRBDQPAHaqisa5TLTc8eF6LUgRLQ0NlYnWumWLO6aphbMzz/mcnPjh4/qGAnRtanHdZv5QAC2c6TFN7Tbzi2b80MDuLD+baWeANe1Eqymo8+4AWPCzmwDY0eeVRhDQiQbYymkqkbqqhHcXDhTR0tDATDQ9qqmDAc78z9PknK9+1RXOFj/9hCucKR0KoMc0b7z+Bnnojw/3Fc4omgEARpKbzpm0nyYN7K6YzgmMDDLRAHsTIpnuw9Ti8hJvJxwooqUxnap54mknyclzj99mMIDSrjMtnD143yNuKIAe0zzxhOM4pgkAeNeQiQbY0umcAOyRiQbYi3aNDeWHqRTR0ox2nbV2bnFFM52qqYUz1RUZ0zcY4Ke33SErX13mCmdM0gSGp6WFCYKANZeJRiENABBwZKIB9tY1NEl2NOndhUdGz1beuo9W2JcsXeXWOjFhQ0aubOkulr0z1ri1mlhYIJ/43HzX2RSLdsqPf3af2x+OGdOn8A1ohGj3mRbPfJpxNvuoo2XOSfP49w6k4Nbb7pTJkye7jk0ANjSjUwtpF15wrrcDIFX6WrC2dq2L5gBgw39eHTdnNu+nACMPL14iDStfl0OmHhSq5p5Bi2iXf+krbkrjSLn9rv+SOcce7t3B2kH7TZS995sh533xMjll9lHeLoBUUEQD7D308KOyZs0aimiAEc1Ee/Kp51xxmiIaYEd/Xqkjps2U/AqKaIAFHXr4ZMtGOWO/I0MVKzUqxzkJPB1ZsYKJ8sHp76eABgAItG7pzekEYEMz0cbGs7w7AFZcJlp7g9QWdno7AFIVKdpLMqsbZVNJuF4PDlpE2zRmZH/46jchjJzOjs0yhmBZwFRXkjf7gLXmxgzp6s737gBY2NzIm3zAmt8EMiXOEDbAip+Jli/jvZ1wGLSIdusN18iqNZUj9oujnCOvvr3DWwGwEIkWeisAVnSoQCSToR0AgGDzm0CaK5nOCVjR/P32eJm01rZ4O+HAdM40VZQTvlGxQJBVJyhMA9Y0twmAvWj2OyKPAaTA70QjDw2wU1U0TnIaqyUnI+rthANFtDSUm58v9Rs2eHcALJSVUJgGrGknWhhHmwNB5rKbOjK8OwAW/OdVIkEnGmClQqLSkYxK657eRkiYFdH0G4qO/tVfLy9ZxjeYUdTa3CxFEyZ4dwAABJN2orW1hSsHAwgync7JAC9gBMTa3KWkhE40wIqfiZa73tsIiZSKaFoou+baG2TWkUfJx+bMkYsu+bx85aK5ctbZn3D3uq9fp6D27iMTDQAQdGSiAbZ0OieAEdDW+9zifS1gZ2Jhwe7TiabfPG697U754GGHyl233ypvVa2VpsYG6drUIm3JLHfVe93Xr3/kqKPlvvvuIYjxXUQmGmCL6ZyAPTLRAABhoB2e+fEeOtEAQ34nWkFnlrcTDrtURPvGd6+Wn1z3I++uV2neBJk644C+XyVFb3+D0aLaFV+5Ur7/0x9SvX8XkIkG2GM6J2CPTDTAnj9FEIAdfV41N5KJBlgqLs5xsR5pP51Tj2c+/uAj3p3I7JOPlwfve0QeeOJB+c0v7pY//eRu+dXv/0v++ve/yz9feFFOP+1075Ei9z9wvzz/wmLvDiOFTDTAnk7nHBsP16ckQNCRiQbYIhMNGBl0ogH2NnR1SyxWK7nj87ydcNipIppW3h956G9uHdkjT75zyQ/ljltuk2kz93PfUPSXjv0tzc3tu7/uph/LT2+7wz1effOqK6ngj7CxmZlkogHGdDrn5sZO7w6ABX1DQiYaYEcz0fjAB7BHJxpgr7x+o+REy6SuKuHthMNOFdG0i0xzztSpc+bI2Zd+3K135MQTjpMbr7/BrTUrjW60kbW5u5tMNMAYmWiAPX1D0tWd790BsMAHPoA97USLZtOJBliqKhonNckaKS4v8XbCYaeKaH4AsHaVzTlpnlsPlxbS9iqf5NZ/feQBd8XIIBMNsEcmGmBPM9G0jR8AgCDTTrRkB51ogKUKibprVyJcH/7s0mCBzroN8p7pO//JcW5Rrrs2NnPUcCSRiQaMgKYebwHACplowMjQjhkAdrQTTT/4oRMNsKPTOUujpRIpSePpnPqNoysyRjJzcmXFC296u8O3pb3LXeP5HDUcaWSiAcYKMrwFACtkogH2/I4ZAHY0a1A/+KETDbAzsbDAHedM60y095SWS2lxb/Vdj2Q2Vw7/m8jCxxbJ6pUr3PqU409zV4wcMtEAW80dTDsDrJGJBthiOicwMjRrkEw0wJbfiZbWmWg6hfOT53zWrR9/8BH5/k9/OKxq/EMPPyoXXfJ5t5464wA5YtpMt8bIIBMNsJefXeCtAFghEw2wpdM5AdgjEw2wp51o7cnq9O5EUxdecK4sOP9Ct77/gfvlY3PmyK233enuB3p5yTI574sXyCUXnCddm1oks7VNbrj6BsmvoII/kshEAwCEgR6N6Uj2hsoCABBUbjpnNEonGmBIO9FUWneiLV+8Qk487SR55KG/uWw01dTYID+57kcyZXKFTD3gIJk54xD3S+/POO1U17Hm6yzIl89c8Gn5wOEf6Htc/19nnvM5qvtGyEQDAASddqIBsKUdMwBsuU60ZJL3qoAh7UTTD1ObstJ4OmelJKV6zXp5q2qtRLq2eLtv024zLarpr8Ho76mrqXG//Mf1/9XdWO89EqkiEw2w1dJC+DlgTTvRyEQD7JCJBowMfV7pMBw60QA7Wl/KjiYld723ERI7VUSrkKiMzdz+b+lub3VX7VTz18q/9zvY/K9F9shzV9WWEa4KZFCRiQbYy8vjjT5gjUw0wJZmoukUQQC2tBNNh+HQiQbYKa/fKG1t42VTyeBNWEGV0bOVt94h/XRr7fIqGVveI5m1OdI9vt1dtbXV39N11j5x6Vzd6H5P/7U+ZnNVxjZ7Pv3aHolCKdu/zNvBrtKjsWd8fL5cecVl3g6AVGn24+TJk+XEE47zdgCk6g9/vNd1o2neKgAbOtBLn1dnz5/n7QBIlT6vku0NMnfumd4OgFQ9vHiJrF/6jJx68tmh6vLcqU40/XRLJ3TuUzJNKg6Y3Hftv6frKfEydx241scM3Ov/NQpoNrRbkEw0AEDQkYkGAAgDpnMC9iZEMl0nWmtti7cTDjtVREM4bO7uJhMNMNaVDFebMRAG2i0DwF40e9gHTQAMA5logL26unYX65E7/u2IrzCgiJaGyEQD7EWihd4KgBXtRNNAWQB2/I4ZAHbIRAPs7RbTOREOrc3NUjRhgncHwEJ1giPSgDXtRNM2fgA2mM4JjAx9XrkPft6emwcgRbvFdM7diX7KoAGSl3/pKzLryKNcWL/+OvG0k+Saa29wIXjNlcH8JIJONMBeWQlHpAFr+oYkktns3QFIleYXA7DnOjzbG6S2MFwdM0CQhXU6J0W0QSxfvEIuuuxyueSC8+T+B+6Xt6rWSlNjg/u1csmrctftt8rVn/us/Oa/7/J+R7DQiQYACAMy0QAAYeB3eOqAPAA2qorGuUy0fAnXqQSKaAO0btkiZ559rCx++gl33xUZIwdPnyELzr9QTj/tdIns0Rt6pwW1m2/+udx6253uPmiYzgkACDoy0QB72jEDwBbTOQF7TOdMA/pN8TNzz5C2ZJa7nzrjAHn43gflz//z33LlFZfJdTf9WJ576kmZffLx7uvq3v/6o+tcCxqmcwK2mM4J2CMTDbBFJhowMpjOCdjLSiRkSyzBdM4we/6FxfLiv/7l1nuVT5Lf/OJumTZzP3fv02+c3//m91yBTelRz9fWLHXroCATDbDHdE7AHplogC3NRBsb7/0wGIAdpnMC9iJFe7lrV4LpnKGk3xD/es9/S6RrizvCee4XLhjykwbdP2DyVPc4Pd7571Vvel8JBjLRAHs6nZM3JoAtMtEAe5sbCT4HrPmdaEznBOzodM7SpmKJlITrPRZFNE9TVqe8uHSRWxfl5cnsGUe69VC+fO5X5fvf+4HceP0NcuqxJ3m7wUEmGmBLp3PyxgSwRSYaACAM/E60zL3JHASsaCZaY3aLNEuttxMOFNE8nasb3bAANWX6wVK2//Ynr+jXz54/T0484bh3HPkMAjLRAFtkogH2yEQDRkY0u8dbAbDgd6JtSvLBD2BlQ1e3+zCV6Zwh9cSiZ7yVyMH7T/NWIgsfWyR/+OO9cvmXviLf/9Z33Vr3gnwenkw0wB6ZaIA9fUNCJhpgy58iCMCO34mWk+C0D2CF6Zwht/b1ld5K5IAD93YTN88853Ny0SWfl29ddYXc/8D98pu7f+3WX7lornzju1dLTWswD8WTiQaMgCY+1Qes6RuSru587w5AqpjOCYwMvxMtv4LpnICVurp2icVqmc4ZVq+uebuIlimF8oVLvyCLn35Cuja9syralsySxx98RE74yJGB7UgjEw0wVsCn+oA1zUTTF08AbOh0TgD2mM4J2CsuzpGcaJnUVSW8nXCgiOZprX+7q+ybV10pb1WtlYJ4oZx+2uny09vucL8uvfxrMnPWMW4ip9IMtQsWLAjkN1My0QBbzR18sg9Y00y0jmTUuwMAIJj8TrScQgYLAFa0E609WS3F5SXeTjhQRBuEFsemzjhAfv/LP8p1N/3YDQ/QXxdecK7cc/cv5ZsLvtZXSHt56RJ55tl/uHVQkIkG2MvP5kUTYE070QDY0o4ZALb8TrT2Bj5UBaxMLCxwH6Y2ZXV6O+FAEW0Q2oF2w9U3DDl18z/OO1VOnTPHuxN59Mn/561Sp11tqfxSAzPR/H2uXLnu+rW/5srh/R6uXLlu/6qdaPGO3g+lNMup/y99nnHPPffDu++/35H59gepeq+G83zkypXrtlf/eab8rMGSknHD/v1cuXId+qrPrXUNTW46Z+56txUaGT1beevd2omnnSQrl7zq1tqF9tADf3ProeiEzvMXnOXW2pW28tVlbp0qnf75wD1/kraMTon1ZG1zzS0oldammm3uuxvr3e/LjBe5r+meZrnpsdNPnXlm7xuUQT7pTyaTEo32HqFJtjdINKd38iD77LP/zn21Zs0ad508ebJ73Nhou8tP9Pm/t1sa3D733HM/9L1vZfVKyU5mS1lpQd/zrf9jWLNmvfNrfe2nv8onF7j7oZ5/A3/Occ8994Pf63NHu9D891X931v5zy//8dxzz/3b90qfN3oUerCfR/q1jfXdcuKZ02Wfkmnu8WFAEc1z+Ze+4iZwKs0+06ObOzJlcoW3Elm1ptJbpUaLaHf+/DbJLcqVLe1d3u7Qku3t7rGa6RbNyXF7/17yohz2sVNk3qmnuv9RAaROv8krfeEUze6RZAeDBoCU1XRJY3aLK6LxnAJs9P95BcCGvtGPZDbzvAKM6c+seWfMdV2eYUERzXPNtTfIXbff6tajWUSzMHPGIXLGx+fLlVdc5u0ASNWtt93putA0HxGAjYceftR1o335s1/0dgCkSk9L1NaulbPnz/N2AKRq4f8+KbVrEjyvAEMPL14i65c+Ix+eftyQUVpBRCaaZ+bMI7yVyNrXV3qroflneZU/ZAAAAAyffvo4pi1cE5mAoPOzmwAYaou5kwgA7FRIVHKiZUznDKsPf+jAvmLY4089uU2RbDBL/v12BtqU95Z7q2BgOicAIAz0WEwsVuvdAbDAdE5gBMTaXOzAjt4jAtg5NckaqatKeHfhQBGtn6OO+Yi7tnZukUcXPu7Wg9Fvnn/505+9O5H/OCVYx7sGTucEACCItBOtrW28dwfAAp1ogL3NjZ0uED1MuU1A0Ol0ztJoKZ1oYRWLxeSU409z3Whdm1rkxuuukeWLV3hf3dYzz/5DHn/gYbcuLi2V2Yef4tZBMTYzU+rbO7w7AACCSTvRtsTC9ekjEHR0ogH23POqp12aK+lEA6xMLCygEy3sNDD81Dlz3LqpsUFOnnu8GzigAa0vL1nmrud98QK54suXiER6p4h98pzPSsUBk906KDZ3d0tRTrZ3B8BCdaJDxsazvDsAFnQEemlTsXcHwAKdaIA9fV6Nzdn65nlvitSAFTrR0sR1N/1YFpx/YV8+mk7sPPe8T8iZx86R8xecJY8/+Ijb168Pd4rnu41MNMBeWUm2a+UHYCeaUyg1BXXeHQALfOAD2NNOtObGDGnf+qYfgA3tRGtPVtOJlg6uvOIyue+mn8jkAw5095GuLbI5L+rWauqMA+SB394byAKaIhMNABAGmolGJxpgiw98AHvaiaYRBGSiAXYqJemudKKliffNmS2PPfRX+ecLL8pPb7tDfvCD691V7x964G8ybeZ+3iODh0w0AEAY6BsSOtEAAEGnHZ76wQ/TOQE7FRKVjmRUmrLC9eEPRbQd0E8bNCvt7Pnz3DUMnz6QiQbY60o2eCsAVuhEAwCEgZvOmd1DJxpgSDPRsqNJyV3vbYQERbQ0RCYaYC8SLfRWAKzQiQbYYzonYE+fV8mODDrRAEOaiaadaK17ehshQREtDZGJBthrTHJEGrBGJxpgj+mcgD0y0QB7fidaQWe4BuJQREtDZKIB9uJRjkgD1uhEA+wxnROwp51oZKIBtoqLc6Stbby01rZ4O+FAES0NkYkGAAgDOtEAe0znBOxpJ1p+vEeyW70NACZisVrJHZ/n3YUDRbQ0RCYaACAM6EQDAISBdqI1N2ZIfgXHOQErWYmEtMfLpK4q4e2EA0W0NEQmGmCvOtHBERnAmHai5UuPdwcAQEDF2rwFACtVReMkp7FaistLvJ1woIiWhshEA+yVlWRzRAYwpp1omoUBwA7TOQF7/mtAMtEAOxMimWSiIRjIRAMAhIF2okUym707AKlqa2tjOicwAvQ0QjS7h+mcgKG6unYy0RAMZKIBAMJAO9E6onROA1ZisRjRA8BIaItJsiODTjTA0ISeVpeJRicaRh2ZaIC9rmSDtwJghemcgD2iBwB72uFJJxpgy89EoxMNo45MNMBeJFrorQBYYTonACAMNGuQTjTAVoVEyURDMJCJBtjT6ZwAbNGJBgAIA+1E0w9+6EQD7KxraCITDcFAJhpgT6dzArBFJxpgj+mcgD3NGtQPfuhEA+wUF+dITrRM6qoS3k44UERLQ2SiAQDCgE40wJZO55TY1l8ATGnWIJlogC2dztmerJbi8hJvJxwooqUhMtEAAGFAJxpgS6dzMlgAsEcmGmBvYmGBdCSj0pQVrp9bFNHSEJlogD2mcwL2tBMtX3q8OwAAgsnPRMtu9TYApKxSkpIdTUruem8jJCiipSEy0QB7TOcE7OkbEp3KBABAkPmZaGNKc7wdAKkqr9/oXgduKglXswJFtDREJhpgrzHJEWnAmr4hiWQ2e3cArGh2EwA7fiaaHpkGYKOqaJybzpkv4fpAlSJaGiITDbAXj3JEGrCmnWgAbPnZTQDskIkG2JsQyXSdaK21Ld5OOFBES0NkogEAwkA70TQLA4ANnc6p2U0AbPmZaEznBOzodE7tRMsdn+fthANFtDREJhoAIAzIRANs6VEzzW4CYMvPRKMTDbDDdE4EBplogD2mcwL2yEQD7Gl2EwBbfiYanWiAHaZzIjDIRAPsMZ0TsEcmGgAgDMhEA+wxnROBQSYaYK860cERGcAYmWgAgDDwM9GyW70NACljOicCg0w0wF5ZSTZHZABjZKIB9rRjBoAtPxNtTGmOtwMgVUznRGCQiQYACAMy0QBbTOcERoafiabDOwDYyEokZEsswXROjD4y0QAAYaCdaB1Rfl4BVpjOCYwMMtEAe5Givdy1K8F0TowyMtEAey0tdMsA1rQTrbSp2LsDYIHoAcCen4nGdE7Ajk7n1NeBkZJwffhDES0NkYkG2MvLy/dWAKzoG5KagjrvDgCAYPIz0ehEA+xoJlpjdos0S623Ew4U0dIQmWgAgDDQNyT50uPdAbCi2U0A7PiZaHSiAXY2dHW7Ke1M58SoIxMNABAGTOcE7PnZTQDskIkG2GM6JwKDTDTAXleywVsBsKKdaLFYuFr4gSBjOicwMvR5FY1G6UQDDDGdE4FBJhpgLxIt9FYArOTHe+hEAwzpdE4A9rQTTXra6UQDDFUVjZPSaKnUVSW8nXCgiJaGyEQD7FUnOlyoLAA7zY0ZEslk8i0AINj8Dk860QA75fUbpT4qUlxe4u2EA0W0NEQmGmCvrCTbhcoCsKOZaABsuY4ZAKbIRAPsaSdaTmM1nWgYfWSiAQDCQDPR4h3hysEAgo5MNMCePq/0g5/sVm8DQMoqJCodySidaBh9ZKIBAMJA35DUFNR5dwAsED0A2NPnlX7wM6Y0x9sBkKpkZLO3CheKaGmITDTAXksLuU2ANX1DUtpU7N0BSFVzJUfNgJGgkR7R7B6GdwCG6uraJTua9O7CgyJaGiITDbCXl5fvrQBYoRMNsJVfMY78TmAEkIkG2JvQ0yrt8TJprW3xdsKBIloaIhMNABAG2omWLz3eHQAAweRnojGdE7DjDxbIyYh6O+FAES0NkYkGAAgDfUPS1jbeuwNggUw0wJ6fiUYnGmDHHyzQuqe3ERIU0dIQmWiAva5kg7cCYEXfkEQyyRsELHGcE7DnZ6LRiQbYWdfQ5DLRctd7GyFBES0NkYkG2ItEC70VACvaiQYAQNCRiQbYm1hYQCcagoFMNMBedaKDIzKAMe1EC+NUJiDotGMGgB3NRItGo3SiAYb8TrSCznC9x6KIlobIRAPslZVkc0QGMEYmGjAytGMGgB3tRJOedjrRAEPFxTnudSDTOTHqyEQDAIQBmWgAgDDQTjRFJxpgZ0NXt8RitZI7Ps/bCQeKaGmITDQAQBiQiQbYcx0zAEyRiQbYK6/fKDnRMqmrSng74UARLQ2RiQbYa2mhWwawRiYaYKutra2vYwaAHX1e6Qc/2a3eBoCUVRWNk5pkjRSXl3g74UARLQ2RiQbYy8vL91YArJCJBtiKxWLeCoAlHS6lH/yMKc3xdgCkqkKi7tqVCFfuNEW0NEQmGgAgDMhEA0YG0zkBWzpcSp9XFKoBOzqdszRaKpESpnNilJGJBgAIAzLRAHt+dhMAO2SiAfYmFha445xkomHUkYkG2OtKNngrAFbIRANskYkGjAw/E43pnIAdvxONTDSMOjLRAHuRaKG3AmCFTDTAFkfNgJHhZ6LRiQbY0U609mQ1nWgYfWSiAfaqEx3uBRQAO2SiASODTDTAlp+JRicaYEc70RSdaBh1ZKIB9spKst0LKAB2yEQD7JGJBtgjEw2wV1yc404kNGUxnROjjEw0AEAYkIkG2CITDRgZ+ryKRqN0ogGGNnR1SyxWK7nrvY2QoIiWhshEAwCEAZlogC0y0YCRoZ1o0tNOJxpgqEKi0pGMyqaScA1wo4iWhshEA+y1tJDbBFgjEw0YGWSiAbb8Dk860QA7mommJxLyJVwfqFJES0NkogH28vLyvRUAK2SiAfbIRAPskYkG2PMz0VprW7ydcKCIthP0m+ZDDz8qf/jjve4aVGSiAQDCgEw0wBaZaMDI0OdVfrxHslu9DQAmXCba+DzvLhwoou2E519YLJdccJ5866or5LY7bw7sJxFkogEAwoBMNMAWmWjAyNBOtObGDMmv4DgnYCUrkZD2eJnUVSW8nXCgiDZMyxevkOuu+aF3t/VFSk9WYM/Ek4kG2OtKhivwEggDMtGAkUEmGmDL70SraaUVDbBSVTROchqrpbi8xNsJB4pow3TTb26Wt6rWencibRmd3ip4yEQD7EWihd4KgBUy0QB7ZKIB9vxOtJwE77EAKxMimWSipatrrr1BHn/wEe+ul3aiBRWZaIC96q0vmsbGg/u8B8KITDTAFplowMjwO9E4zgnYqatrJxMtHS18bJH86vrr3Tqyx9v/cYPciUYmGmCvrCRbNjcG93kPhBGZaIAtMtGAkeF3ojGdE7AzsbBAOpJRacoK13ssimg7cNPPvifduTFXQPvMpz61TSEtqMhEAwCEAZlowMggEw2w5Xei5Wx90w/AxrqGJnciIXe9txESFNG24/IvfUVWLnnVrS++8CI58MCD3DroyEQDAIQBmWiAPTLRAHt+J1r71jf9AGwUF+e4EwmbSsI1wI0i2iBat2yRP/zxXrn/gfvd/cxZx8iFF5zr1l3NvZ+Yk4kG7F5aWuiWAayRiQbYIhMNGBn6vNIPfrIZzgmY0ky0fAlXtAdFtEG8uXSV3PLTG926uLRUvn3xV91aP4GI5Oe7NZlowO4lL6/3uQ/ADplogC0y0YCR4To82xuktpB8XMDKhq5u9zqQ6Zwhp5/g3fSbm6Wupsbdf/GSL8u0mfu5tcTapLOutzgV5E40MtEAAGFAJhowMshEA2z5HZ5T4mXuCiB15fUbZUsswXTOsPv1b34vjz/4iFufftrpcvb8eW7ttMUkq7i3OBXkTjQy0QAAYUAmGmCPTDTAnj6vVHMl0zkBK5Givdy1K8F0ztB66OFH5eZbf+bWmoN23U0/dmuffgJBJhqwe+pKhivwEggDMtEAW2SiASNDn1djc7a+ed6b6ZyAFZ3OWRotlUhJcGsrg6GI5tFPFW6782bp2tQikT3y5FNnnul95W1kogG7r0i00FsBsEImGmCLTDRgZOj7QKZzArYmFhZITbJG6qoS3k44ZPRs5a13a5d/6St90zgvvfxrfdM4+9NOtS9/9TJXaDt4+gz58//8t/cVOwsfWyTJzWvcN+mBotGoJJNJ96ZDP70f7Kr07/HUOXPkqE9+0p0zrioaJ1kNHTKhp1U2ZOS6x/jYY0+xt/29zsJsqVz0vHuOjR8/aZt9fY75v0/HNNfVtbu1Pmbgc4/H83gev+3jF7/0lHQko7LvvtPf8fv9xynuued+x/f+c0hfR9ZU18heE0+UvTPWuK/1/z3+mj322Nv+nv4c059bem1fs1KSVd1SeOQ097MNwM7zf075rwnXdnbJyuqV8smT50tJyTjvUcFHEW2r++67R674ypVuPXvWx+SOu29364H6F9GmzjhA7vnLA5I7Zoz3VRtXf+cW+dOveyeDpkL//k447hTvrldHtEOyk73HPPX4TLNkDHrP43gcj9v2ccOlRz53pmONx28fj9++sD9+R/o/J1mzZr399XD4j+fKleuOrwP5P+P6/6zT14v6QRBXrlx3fPUN9npx3hlzKaKFzYmnnSQrl7zq1gXx7b8BaGp8Oxep/2MXL3nJW6Vm+eIV8tLKZd7drvnuD77vOtG+cclV0tH7ocqgunOyJXMYAwh43OB43ODS9XF/+t1dstfkaXLkER/2dgCk6tGFj7tOan3xBMDG8y8slg3VK+TUk8/2dt5psJ+F7LGn2BucPq/059Vxc2Z7OwBStWTpKllbtcj9vKKIFjL9i2i7atWaSm81+mbOOETO+Ph8ufKKy7wdAKm69bY7ZfLkyXLiCcd5OwBSpR3ea9asGTRCAcCu+evjT0lLTe22E+YBpESfV52NNTJ99iyZEi/zdgGk4uUly+TZ516Tk4/+gFQcMNnbDT4GC2yVW1DqhgkM/JXZ2vaOdX/+1wbuA0g/jckdf0oJYOfop/oAbEU6NnsrAFZyenIk2ZFBAQ0wpPlosVit5I4PVz2FItpW99z9S1n56rJ3/Hq9rmab9c9++ou+gpkOFuj/2KCpH0ZbMoDhi0eHnzsDYHh0WIdmZQCwo1MEARiLtUk0u0eaKzd6GwBSpYMGcqJloZvOSRFtZ2z95tlZt8G7CbaiHN7wAwCCTTvR2trGe3cAUtXW1uZerwKwtbmx03Wi5VeEJ7cJCLoNXd3SnqyW4vISbyccKKLtjLaYZBVP6F1mdLprEOXm50v9hnAU+wAAu6/8eI9EMpu9OwCpisVi7s0+AFva4amdaKsaq70dAKmqkKib3Nla2+LthANFtJ2weXOTdDX3vtiP9WS5axC1bv17LJrQW+wDACComhsz3JFOAACCTN8HSkYOmWiAoXUNTS7Wg0y0NKafQETy8906yJ1oikw0AEDQaQGN4QKArbHx4H7QC4SVyxrsaScTDTA0sbDAdaI1ZYWrg5oi2k6YEs+Tz3zqU7Lg/Atl/rxPebvBRCYaYKulhSNngDUKaIA9jnMC9lwn2lZkogF2KiXZ24m23tsICYpoO6Hi0P3lyisuc7/Onj/P2w0eMtEAe3l5vV2oAOxwlBMAEAbaiaaDBRIJOtEAK+X1G92AqU0lDd5OOFBES0NkogEAwkA70fQTSAAAAs2beltSQicaYKWqaJzEYrWSL+Ga1E4RLU2RiQYACDrtRNNPIAHYcdlNAGy1xZjOCRibEMl0rwOZzolAIBMNsFWd6CCsGTCmnWiRTPIGASttbW192U0A7PjPq/ENvBYErGQlEpKxZ6Z0j2/3dsKBIloaIhMNsFdWkk1YM2CMTDTAViwW4wMfYAT4mWgMFgDsRIr2kszqRtkjUejthANFtDREJhpgrysZrsBLIAzIRAPs8YEPYE870fLjPdJcyWABwIo/nTNSEq4PfyiipSky0QBbkWi4PiEBwoBMNABAWGRKodQWUqQGrOh0zvZ4mdRVJbydcKCIlqbIRAMABB2ZaACAMNBj0voza8rWN/wAbOh0zpzGaikuL/F2woEiWhoiEw0AEAbaicZxTsAW0zkBe3pMWqdzcpwTsKOdaEznRCCQiQbYYzonYE8/1ec4J2CH6ZzAyGCwAGBPO9FisVrJHZ/n7YQDRbQ0RSYaYIvpnIA97UTjOCdgh+mcwMjQ4rR2oq1qrPZ2AKTKz0SjEw2BQCYaYIvpnIA9pnMC9vjAB7DnH5MmEw2wo51oRWu7pHt8u7cTDhTR0hCZaIA9pnMC9vLjPRznBAAEX6zNHeckEw2wMyGSKY3ZLdKTFa73WRTR0hCZaIC9xiRHpAFrzY0ZHOcEAASeP1iATDTATl1duzuRUNCZFaoCNUW0NEUmGmArHuWINGCN6ZyAPaZzAvb8wQKJBJ1ogJXi4py+EwlhKlBTREtTZKIBAIKO6ZyALaZzAiMk1uY60UpK6EQDLIXxRAJFtDREJhoAIAyYzgnYYjonMELaYnSiASOkWWq9VThQREtDZKIB9lpaeKMPWGM6J2CP6ZyAPe3wpBMNsKWZaPqBar6E61QCRbQ0RSYaYCsvL99bAbCiL5w4zgkACDoy0QB7EwsLpCZZI3VVCW8nHCiipSky0QAAQaedaBznBAAEnXai5cfpRAMsVUpS8qVHistLvJ1woIiWhshEAwCEAdM5AXtM5wTs6fOquZFONMBShUSlIxmVrkS4YggooqUhMtEAe2SiAfaYzgnYYjonMDJcJlo0SicaYGhdQ5P7MDVSEq6BOBTR0hSZaIAtMtEAe0znBGwxnRMYGS4TLZmkEw0wpJlo2onWlEUnGgKATDQAQNAxnROwx3ROwB6ZaIA9zUTT14G5672NkKCIlobIRAMAhIG+IeE4JwAg6MhEA+yV1290rwM3lTR4O+FAES0NkYkG2CMTDbCnb0g4zgkACDq/Ey271dsAkLKqonESi9VKvoTrA1WKaGmKTDTAFplogD2mcwL2mM4J2PM70TL35vkFWJkQyXSdaK21Ld5OOFBES1NkogEAgo7pnIAtpnMCI8PvRNuU5IMfwEpWIiFbYgnJHZ/n7YQDRbQ0RCYaACAMmM4J2GI6JzAy/E60nASnfQArkaK93LUrwXROjDIy0QB7ZKIB9pjOCdhjOicwAmJt7pJfwXROwIpO5yxtKpZISbg+/KGIlqbIRANskYkG2NNONI5zAgCCTovT0eweWdVY7e0ASJVmojVmt0iz1Ho74UARLU2RiQYACDrtROM4JwAgFDJyZEq8zLsBkKoNXd3uRALTOTHqyEQDAIQB0zkBe0znBOzp8yqZTEpz5UZvB0CqmM6JwCATDbBHJhpgj+mcgC2mcwIjJNbmjnOSiQbYYTonAoVMNMAWmWiAPaZzAraYzgmMDM1ES3ZkSCJBJxpgpaponJRGS6WuKuHthANFtDRFJhoAIOiYzgnYYzonYE+Pc2onWkkJnWiAlfL6jVIfFSkuL/F2woEiWhoiEw0AEAb58R6OcwIAgi/WRicaYEw70XIaq+lEw+gjEw2wRyYaYK+5MYPjnACAwNMOz2g0SicaYEg70drjZXSiIRjIRANskYkG2GM6J2CP6ZyAPX86J51ogJ1I0V7Ss75bWtfWeDvhQBEtTZGJBgAIOqZzAraYzgmMDH1eaQRBdqu3ASBllZKUWKxWcieVejvhQBEtDZGJBgAIA6ZzAraYzgmMDO1E0wiC/AqOcwJW9DhnRzIqTVnhGohDES0NkYkG2CMTDbDHdE7AHtM5AXt+J1pNK61ogBUdLOA+UF1V7+2EA0W0NEUmGmCLTDTAnr5w4jgnACDo/E60nATvsQAr2ommH6h2TSnydsKBIlqaIhMNABB0+sKJ45wAgKDryNzgPvjJ3JvBHYAVOtEQGGSiAQDCQF84cZwTsMV0TsBedvcE98FPewODOwArdKIhMMhEA+yRiQbY0xdOHOcE7DCdExgZfiZaSQmDBQArdKIhUMhEA2yRiQbYcy+cOM4JmGE6JzAy/Ey0RGKjtwMgVXSiIVDIRAMABJ2+cOI4J2CL6ZyAPe1Ei2bTiQZYohMNgUEmGgAgDPRoDMc5AQBBp51oyQ460QBLEyKZdKIhGMhEA+yRiQbY06MxHOcEAARerM1d6EQD7NTVtbsTCQWd4YohoIiWpshEA2yRiQbYYzonYI/pnMAIaIu545x0ogF2JhYWSE60TOqqEt5OOFBES1NkogEAgo7pnIAtpnMCI8N/XtGJBthZ19AkNckaKS4v8XbCgSJaGiITDQAQBkznBGwxnRMYGWSiAfa0E011JcI1EIciWhoiEw2wRyYaYI/pnIA9pnMC9rQTTYfhZLd6GwBSpp1opdFSiZSQiYYAIBMNsEUmGmBPO9E4zgkACDrtRNNhOJl7kzkIWNFOND3OSSYaAoFMNABA0GknGsc5AQBB53eibUrSPQ1Y0U60fOkhEw2jj0w0AEAYMJ0TsMd0TsCe34mWk+C0D2BFO9E6klHvLjwooqUhMtEAe2SiAfaYzgnYYjonMEJibe6SX8F0TsBKpSRD+WEqRbQ0RSYaYItMNMAe0zkBW0znBEaGDuyIZvfIqsZqbwdAqsrrN0pOtIxMNAQDmWgAgKBjOidgj+mcwAjJyJEp8TLvBkCqqorGudeCZKJh1JGJBgAIAw1p5jgnACDoNBMtmUxKc+VGbwdAqiqkNw+tKStcH/5QRBvCwscWyTXX3iDnffEC+ehHj5cTTztJzjznc3LzjdfKI4+udpkTQUUmGmCPTDTAnoY0c5wTABB4sTZ3nJNMNMCOTufUEwkFneGKIaCINkAisdEVz85fcJbcdfut8viDj8jqlStk5ZJXZfHTT8jNN/9cvnjusXLzLbe5xwYVmWiALTLRAHtM5wTsMZ0TsKfHpJMdGYF+/weETWdhNploYbd88Qr59OfPccUz317lk2TmrGPcL1379DEXLFjgfk8QkYkGAAg6pnMCtpjOCYwMLU5rJ1pJCZ1ogBUdLFAfFSnMiXs74UARzdO6ZYv8+ne/cB1nqqRonNx+13/JX+67T359+y3yi29f59a6F4v2ntl9eekSuek3NwfuEwky0QAAYcB0TsAW0zmBERJroxMNMBYp2ksyqxtlU0mDtxMOFNE8by5dJf+zcKFbR/bIk+9ed6vMOfZw92mDviDR8++61r0f/+w+9xj14rP/F7j2QzLRAHtkogH2mM4J2GM6J2BPn1fRaJRONMCQn4mWL+E6lUARzfOPpY9K16YWtz7qmI+4YtlQ9Gv6GNXU2CAvrVzm1kFCJhpgi0w0wJ52onGcEwAQdP50TjrRADvFxTnudWBrbW8dJiwoonkWPr3UW4kcd9QsbzW0ionv8VYib75Z5a2Cg0w0AEDQaScaxzkBAEGnWYP58R7JbvU2AKRsQ1e3xGK1kju+95RfWFBE83zqzDNlwfkXyuyTj5f9J0/3docW5MwxMtEAAGHAdE7AHtM5AXv6vGpuzJDMvXl+AVZ0sADTOUPsxBOOkyuvuEzuuOU2mTZzP293cNrG++qald6dyIEHHuStgoFMNMAemWiAPaZzAraYzgmMDL8TbVOSD34AK1VF46QmWSPF5SXeTjhQRNsFz7+wuG+KZ0G8MJCf+JGJBtgiEw2wx3ROwBbTOYGR4Xei5SR4jwVYqZCou3YlwjUQhyLaTlr42CL55lVXencis486ertDCEYLmWgAgKBjOidgj+mcwAiItblLfgXTOQErOp2zNFoqkZJwffhDEW0nLF+8Qr55+YVuIqeK7JEnX/36VW4dJGSiAQDCQI/GcJwTABB4bTGJZvfIqsZqbwNAqiYWFrjjnGSipSktoH3pqkslUd871jgW7ZQHfnuvlJQE79MIMtEAe2SiAfb0aAzHOQEAQednDY5v4Lg0YMXvRCMTLQ099PCj8tnPf0JWr1zh7rUD7Ypv3rjDAQSjiUw0wBaZaIA9pnMC9pjOCdjT51WyI4PjnIAh7URrT1aHrhMto2crb41BaAHty1+9TLo2tbj7LRnd8shf/j5iBTT96z396N+9O0+8SKSxfpu1dpq5I5sD7vX669/+VmYcepgcefg7s9oakx0Sj3p5aU090pi9+e37raoTHVJWwr2Pe+773w/UlWyQSLSQNWvWO7n2DfYcG/T3bP151ZXdyD77/7+9+wCPqkr7AP4mAVIIIQRCUUoQFkSliYoNUBGQKsoHKKh0UTqIyFpYRUVBFEWxgqCLqAiu2AUbuq5rQQFXEZSliEsJnQAJIcmX/5l7Zs5M5s5MkhuYGf6/58mTM5PJlDu3nfe+5z28P4T73X83mPexzTbbzrQPSZLqR7HNNtvFa5vbUUxGfbmuTfuwHOFnh0E0G5mZe+S1Lz+RWbeOlNjEZHXf6XXryd1TppfZRAIHN+2Rl378RBZMfVjVNTNhiKa+T7f9/a4QG6uGnLZqd4Xc1LevejwRld7mzZvV74yMDPVby87OloQE18wybLPNduht2L7jV8nJTiiyXRFRyWHCDvzweMU22860wW67IqKSwzaFTLRLmncM61F+vhhE8wMBtEcenCZvvvWmdY8rgPbsrGfL/MvFa/tLZ6xQt0CObY0J2C7fIFVyN+6XG4b0k97X95PJd0xU9xNR6c1+bLo0OLOldO3S0bqHiErrlUWLZc/efBkz6jrrHiIqLYxqQMekf78+1j1EVFrcroic98HyjfLntvfk6u79IyoTjTXR/Lh76j1eATRkda384vMTEh3FyoPX8f1pkN4kaLthak31Gzg7J5GzdNoxETkHNdE4sQAREYU7XWsQCQ9E5Iw6MZvlaGpNydrlKp0VKRhEM2CnOHz0CPnknQ+se0SG3jpSnpo5w7oVOTg7JxERhTtc1UcgjYiIKJzlxG5Xx6tIypYhCndb06pK4v4dkly9knVPZGAQzbDsnVe8Amj3TZuuhkRG2s4S9dGYiUZEROEO9WYQSCMi5+TFV7BaROSU+Pxa6njFTDQi59SKi5UjR6ozEy1Sbfp5szwze4Fq58WVkzFjbpGOHdqrHWUoP+EEEwwwE43IWZjZloichcLNROSsuJxjVouInHLs2AH1m5loRM7ZvfuoJCXtYiZapHr93SVyYP8+1Y47livvffS5DBw2IKSfeS/OV/8XTvYeZYefyEmYkpmInMWhnETO07WbiMg5ervamZWlfhNR6dUqyGJNtEg295k5VqtQXIxsXP+rrF/9c0g/P/6yzvrH8JGWyA4/ERGFN9ZEI3KezpghIgclHZGE+AKpkZxs3UFEpcWaaBFs3apfJa5iJb8/NSrVUr9js474vY2f1JTwClixJhoREUUC1kQjIqKIcCRJsnNiwq6MD1Ekqy8JEVkTLaagkNU+ZWFnuHrN7yqdMC7tdNm274Bq/1GQIQVVD0ndvXtUlBRfMv4GtatUdj+u4mkNpP7ZGer+cNCqxbnS+/p+alIEInLGw9NnStOmzaRrl47WPURUWq8sWix79ubLmFHXWfcQUWm99/5yFZzu36+PdQ8RlRa2q+yj+6RXr77WPURUWis+/ka2bP1Gru7eP6LqDTITrRC+sA5XtpZzOrSXJq3OdLc7d2wgXVq1UG381n/Dj/m4cAqgATPRiJxXqVKK1SIip2AoZ1zsQesWETmhQmp5q0VETkFNNGaiETmrWrVESUyoKbu3Zlr3RAYG0aIQZ+ckIqJIgGyZ+ATO0EnkpGP7c60WETkFtQZTUgsknvMKEDkGs3Mezd4h1eqmW/dEBgbRohRn5yQionCHDglqYRAREYUzZKId3B8jsXU4+y2RU1AiKyc7QQ6Uj6yLPwyiRSnOzknkrEOHOOSMyGnokHA4JxERhTudiXY4m9nTRE7ZJNlqRELy/6w7IgSDaFGINdGInMeaaETOQ000InIWMmaIyFk6Ey0xk6N9iJyCCRwxIuFw+j7rnsjAIFoUYk00IiKKBKiJll+TgTQipxw5ckRlzBCRs3Jit6sLPxzOSeScrWlVJSlpl6RIZJX2YBAtSrEmGhERhbuEhASJ3bHfukVEpZWUlMTZOYnKQHx+LXXh5+g+BqmJnFJfElQmWtauQ9Y9kYFBtCjFmmhEzmJNNKIyUHCUs3MSOYyzcxI5DxmeCfEFkp5e1bqHiEpr274DKhMtuXol657IwCBaFGJNNCLnsSYaURmISeTsnEREFPZQEy07J0YyM/dY9xBRaVWr5joPPCi7rHsiA4NoUYg10YiIKBJkZ2erK5BEREThTM/OyUw0Iudsz8tnTTQKH6yJRkRE4Q410ZiJRuQszs5J5Dw9O+fOrCzrHiIqLdREy8lOYE00Cg+siUbkLNZEI3IeM9GInMXZOYnKhq6JlpjJRAUip6AmGmrjsiYanXSsiUbkPNZEI3JeamoqM9GIHMTZOYnKhq6JllKfwzmJnFKrIEuOptZkJhqdfKyJRkREkWD//v0SF8ssTyIncXZOIufpmmgczknknK1pVSVx/w5molF4YE00IiIKd8hEIyIiCne6JhqHcxI5BzXRMCKBmWgUFlgTjchZrIlG5DxkoqEWBhERUTjLid2uLvzE1uHEHUROQU001MZlJhqddKyJRuQ81kQjch5rohE5j7NzEjkvPr+WuvBztLDTT0TOyK0SL4kJNWX31kzrnsjAIFoUYk00IiKKBKyJRuQszs5JVDb07Jzp6ZxYgMgpdffukb0JItXqplv3RAYG0aIUa6IREVG4Y000Imdxdk6isqFn58zM3GPdQ0SlpScWYCYahQXWRCNyFmuiETkPmWhE5CzOzknkPD07JzPRiJyDTLSjqTWZiUYnH2uiETmPNdGInMdMNCIiigR6dk5mohE5Jy7tdCn4X75kbdlp3RMZGESLQqyJRkREkQCZaAykERFRuNOZaPFZ1h1EVGqbJNs1O2e9GtY9kYFBtCjFmmhERBQJOKSTyFmcnZPIeToTLbYOty8ip2A4Z052ghwoH1llCBhEi1KsiUbkLNZEI3Ies9CInMXZOYnKhs5EO5ydbd1DRKWFiQVwLhj3+17rnsjAIFoUYk00IuexJhoREYU7zs5JVDZ0JlpiJkf7EDkFmWgYkZDXMM26JzIwiBaFWBONiIgiAYdyEjmPs3MSOS8ndrvKmOFwTiLnMBONwgprohERUbjjcE4iIooE8fm11IWfo/s4XJrIKcxEo7DCmmhEzmJNNCLnMRONiIgiAWqiJcQXSHp6VeseIiotZqJR2GBNNCLnsSYakfOYiUbkPM7OSeQ8bFfZOTGSmbnHuoeISouZaBQ2WBONiIgiAU6c8msykEbkFM7OSVQ29OyczEQjcg4z0SissCYaERGFOwyNid3BIZ1ETuHsnERlQ8/OyUw0IufUiotlJhqFD9ZEI3IWa6IRlYGYRIlPyLZuEJETODsnkfN0Jlp8lnUHEZXa7t1H1Xlg5dzIuvjDIFoUYk00IuexJhpR2ThypLrVIiIiCk86Ey22DmsOEjmldpXKkphQU3ZvzbTuiQwMokUh1kQjIqJIkJ2dLUlJu6xbRERE4Ulnoh0uPG4RkTO27TsgO7N3SrW66dY9kYFBtCjFmmhERBTuEhISmIlG5DDOzknkPJ2JlpjJPhaRU5CJBnmZkVWGgEG0KMWaaETOYk00IucxE43IWZydk6hs5MRuV7MIcjgnkXM2SbakSIHEpbMmGp1krIlG5DzWRCNyHjokzEQjcg5n5yQqG/H5tdQsgkf3MUhN5BTMzonzwKxdh6x7IgODaFGINdGIiCgSoEMSF8ssTyIncXZOIuchwzMhvkDS06ta9xBRaZXPzJTjSZmSXL2SdU9kYBAtSrEmGhERhTtkohEREYU71ETLzomRzMw91j1EVFpxaaer36yJRmGBNdGInMWaaETOQyZafAJnOiMiovCmZ+dkJhqRc1ATrcaBanI4fZ91T2RgEC0KsSYakfNYE43IeayJRuQ8zs5J5Dw9Oycz0YicU18SZGfl3ZIikXUuyCBaFGJNNCIiigSsiUbkLM7OSVQ2dCZafJZ1BxGV2rZ9hduVFFi3IgeDaFGKNdGIiCjcsSYakbM4OydR2dCZaLF1mOlJ5JRq1RI5OyeFD9ZEI3IWa6IROQ+ZaETkLM7OSeQ8nYl2OJt1PImclJS0i7Nz0snHmmhEzmNNNCLnMRONiIgigc5ES8zkaB8ip5TPzJSjqTVl99ZM657IwCBaFGJNNCIiigScnZOIiCJBTux2deGHwzmJnLM1raok7t8h1eqmW/dEBgbRohRrohERUbjj7JxEzuPsnETOi8+vpS78HN3HiTuInFIrLpY10Sh8sCYakbNYE43IeZydk8hZnJ2TqGxgu0qIL5D09KrWPURUWrt3H2VNNAoPrIlG5DzWRCNyHmuiETmLs3MSlQ1keGbnxEhm5h7rHiIqrdpVKktOdoIcKB9ZE+IwiBaFWBONiIgiAWfnJHIeZ+ckcp6enZOZaETO2STZqjZu8v+sOyIEg2hRijXRiIgo3DETjYiIIoGenZOZaETOqbt3j6qJdjh9n3VPZGAQLUqxJhqRs1gTjch5nJ2TiIgigc5Ei8+y7iCiUsPsnKiJliKRNckUg2hRiDXRiJzHmmhEzuPsnETO4+ycRM7TmWixdbh9ETmFs3NS2GBNNCIiigScnZPIWZydk6hs6Ey0w9nMniZySvnMTIk5LVbyqx+17okMDKJFKdZEIyKicMeaaETO4uycRGVDZ6IlZrKPReQUDOeM3bFfKmZWse6JDAyiRSnWRCNyFmuiETmPs3MSOY+zcxI5Lyd2u7rww+GcRM7BxAL5NSPvgiqDaFGINdGInMeaaETOYyYaERFFgvj8WurCz9F9HC5N5JS4tNNVJhpn56STjjXRiIgoEnB2TiIiigSoiZYQXyDp6VWte4iotLbtO6DOAzk7J4UF1kQjIqJwx9k5iZzH2TmJnIftKjsnRjIz91j3EFFp1a5SWY6m1uTsnBQeWBONyFmsiUbkPM7OSeQszs5JVDb07JzMRCNyDjLREvfvkOTqlax7IgODaEEc3LRH3l+1WlZ8/I2sW/WrdW94Y000IuexJhqR81gTjchZnJ2TqGzo2TmZiUbknGrVEtWIhN1bM617IgODaH5g54iAWdee3eTcy8+TMb2ukVuHXifde3WWxmc3k7kvzg7rHShrohERUSTg7JxEzuPsnETO05lo8VnWHURUatvz8iUpaZdUq5tu3RMZGETzY/EbS6XnTX1k/eqfrXs88g4fkoenzpKBwwaEdWYaa6IREVG4YyYaERFFAp2JFluHNQeJnFJfEuSgxEheZmRd/GEQzcfsx6bLrBkPqWAZXNvzWnlm7mvyxlvLZPykv0pcRdd4XQTYbhjSL2wz0lgTjchZrIlG5DzOzklERJFAZ6IdzuYxi8gpqIlWI6GGHE7fZ90TGRhEMyCzbM68V1Q7/2iW3Ddtusx4/FHpcGVradmimYwccbP88/PPpHGLs9VjDuzfJ488OE21wwlrohE5jzXRiJzH2TmJnMfZOYmcpzPREjM52ofIKaiJhguqFTOrWPeUnffeXy59BwyRVxYtLnUiFINohmUfv+vOQPu/W8dJ/359VNuEGVlm3jNTKqe6vuhvflgVdtlorIlGRESRgLNzEjmLs3MSlY2c2O3qwg+HcxI5Z/fuo2pEQlx62U+IM+PhabJq5afytzvvkFETJ6mJI3HMLAkG0Qxffv25+o0hm+0uOF+1/WnS6kw5r82Fqv3n1i3y7XerVDucsCYaERGFO9ZEI3IWZ+ckKhvx+bXUhZ+j+xikJnIKMtESE2qekNk5754y3V2aC8E0TBw5f8FCdbu4GESzIJvs99+2qnZafAW54PxWqm2n2WnNrZbITz+ttVrhgzXRiJzFmmhEzuPsnETO4+ycRM5DhmdCfIEalUREzkAm2tHsHSdkdk6U6Fr6+Cxp1e4KVboLUAu/a89uaqhncTCIZkH0Uw/lTKtbM+gOstH5LayWJ4MtXLAmGpHzWBONyHnMRCMiokiAmmjZOTFhO6kcUSSqXaWy5GQnyIHyJ+bizzkd2svsOU/I44vecJfnwoSRE26fKMNHj1A18kPBIJrlh/WebLLadepaLXv4wrUdm/9ntcIDa6IREVEk4OycREQUCfTsnMxEI3LOJslW54HJJzCcUiM5WXq0v0w++8cKad+9s7oPyVSfvPOBDB52g7z9SfAEKQbRLHt2bLJaInXSalote6iLpmXlHrda4YM10YiIKNxxdk4i53F2TiLn6dk5mYlG5Jy6e/eo88DD6fuse06clPpV5bknn5bpjz0hjVucre7LLHw/4/r1VllpmHjADoNolvX/83xxVWoED6KZ9DDQcMKaaETOYk00Iudxdk4iZ3F2TqKyoTPR4l2llIjIAVvTqkpS0i5JkZN3QbXXtT1kwQsvyfjhk+V4TL7EJiarrLTJE2+VVxYtth7ljUE0S8Xj0VOElTXRiJzHmmhEzmNNNCJncXZOorKhM9Fi6zDTk8gpteJiVSZa1q6Tm5SEYdoj/zpcnnnuU3dW2oH9++Rvd94hfQcMKZKVxiCa5XC56DnhYE00IiKKBJydk8h5nJ2TyHk6E+1wNut4EjkFs3MiEy25eiXrnpOrc8cGKivtvrHTJCnBdSxdtfJTlZX28PSZ7uHcDKJZoikTDVgTjYiIwh0z0YiIKBLoTLTETPaxiJxyomfnDAWy0vqPv15WfP+rtGzeQt2HrLS5z8yRqzp0UIG0mIJC6i+nOEQWsWBg6K0jZfIdE1XbDhbeReefp9pxFSvJ+p89s3uWBt7HG68usm6VzL7tf0j5arUkuXw56x4iKi09gQi3KyLncLsich63KyLnYbsq2LlT0hrUl9ycY9a9RFQaudm7JCcuTarFJsvu/KywPG4hgGbCcE8G0SxL33xb7pgwVrUx1Slmaghk3apfpXsv15SolVOryKrVP6h2aWG87apVX1q3/CuoUCAVC/Il81CSpFc6IockSeJyc1TNpv3ZOfLFR+9LRqP6cnb9euoxFRNyJKl8nhzJjbOeQXibt3m7mLdfXfiG1G3aXBqd0UJtd3r709sYYNuMORaj2sDbvM3b9rexXX258t+ya98+6dy1mzqGcQIPotLb9MtG2XbgD2lz0WVFjmdEVHw4Pn3xzTeSdWCn2q7yysdLbEy21zGNiEKD80Edy9jw39VquOS1Pa9V5ahOxDELr6H7cYdjYiUlO0UOJhxU70ndjq+szkex3a9dt1pNMmBCwhWDaBYzswzRxffeele17bz76VsybvB41W7V7gp5/aV5qh0OWrU4V3pf3y9oNh0Rha5hRv2QAuxEFLquPbvJ779tdSybm4hETc2/9qtv5esfvrfuIaLSmjTuNvnht9/k1QXz1XAvIiq9OU8/L7PnPCVPPfGCdLiytXXvyYfY0LwX57tHKgJGH065627p368Pa6KZkFEGOzb/z100zs6WX3dZLZGWZzWxWuGDNdGIysBBXnMgIqLwVjkuUSokJ1u3iMgpucyWJop6ryxaLAOHDXAH0BA8QyLFhy+9pgJowCCa4Yx69dRvjHn/9rtVqm0HKb1a06bNrFb4SEuMt1pE5JgUpu0TOS3vIDslRE46kHdUjmVlWbeIyAnYrpLTkiWemxaRY/KyXfXGahWEx4aFTO6/3XmHrF/9s7qNJCtkyWEkUv3zzlL3AYNoFqTlXtbJVeMs7/AhWbn8I9X2B3XLfl/zo2qfXreeXHB+K9UmoijHTDQiRyUVlJe4lBTrFhE5gZloRM7DdpW1N0tyuGkROSYuwTUScHvMyduwMALxvfeXS+Ozm7nrnyH7DHXaUPfe3zBTBtEMV7Ru6x7S+cY7b6uZMn0hgDbzkXvdszSgGDLHxROdIpiJRuSoIzHhM6U5UbRgJhqR8w6XK89MNCKH6Uy0kwWTRY6aOEnGjhiuEqkA9fGRfTbj8UfVbX8YRDM0aXWmTJg0WbXj8o6rcbAo0o+Cd4hOjpw4WYb37yYb1/+qHoOA25DBg1Q7nCSnpMje7dutW0TkGGaiETmOwzmJnFUuPoWZaEQOq3g8V44fzZNdVXjxh8gpOhPtZEDts+69OqvZQbUxY25RE0wGm+SAQTQfKBaHaUuRwgfIOJs14yEVnfxoyesSm+g6KcGMnEjvC8cstKzCDgmmiCUihzETjchxHM5J5KzjOQeZiUbkMGR4QvV95dVvIiq9k1ETDclRfQcMUbXPNMR23ln6gYyZ4LkvEAbR/Jh8x0RZ+vgsNQ4WNc80BNaQ3nfftOny1MwZ1r3hibNzEpUBZqIROSp12xGrRUROYU00IudhuwJmohE550TXRJs07jaZcPtEd/ZZbNYRd2wHoxJDxSCajXM6tFfjYFd+8bn8vnmT+ln/81qV3odstXCug1YhNpazcxKVBWaiETlqZw129ImcxppoRM7DdlUuMY6ZaEQOOnToxJX0wMybb771prv2WfvunWXD7p0liu0wiBaFcPWRNdGIygAz0YgcFV8+32oRkVNYE43IeZydk8h5lSqlSMHOnSJJJ25kAkYaIvvs0VmzrXuKj0G0KMSaaERlhJloREQU5lgTjch5nJ2TyHkHcw5ITI0aIkeSrHvKziMT7pevv/telixdqrLPksuVs/5SfAyiRSnWRCMqA8xEI3JUUkF5zs5J5DDWRCNyHmbnZCYakbNS4iu7MtFOgJT6VdWwTSfKcjGIFqVYE42oDDATjchRR2JyOTsnkYMObtrjnkWQiJyD7YqZaETO2p+dozLRcqtEVuyCQbQohIkFmIlGVAaYiUbkqONH86wWETkBV9pRE42InIUMTxyzODsnkXNSE+JVJlr5nH3WPZGBQbQodCw/n5loRGWBmWhEjsJMZycqjZ/oVIGaaETkLM7OSeQ8nYl2ImqiOYlBtCiUnJLC2TmJygIz0Ygcp06eiMgxyJghImdxdk4i5+lMtEjDIFoUKl8pReo1amzdIiInxFWsJJWrRNZVEqJwl1y5hqTFV7BuEZFTULuJiByUmiY16zdgTTQiB2VkZMjl1/eSM5pHVhmCmIJCVpuiRGbmHvXbiZkniMhl3apfpVrddG5XRA7C8SovM1dqnlXTuoeISovngUTOw3Z1UHZJg/Qm1j1EdKpiEI2IiIiIiIiIiCgIDuckIiIiIiIiIiIKgkE0IiIiIiIiIiKiIBhEIyIiIiIiIiIiCoJBNCIiIiIiIiIioiAYRCMiIiIiIiIiIgqCQTQiIiIiIiIiIqIgGEQjIiIiIiIiIiIKgkE0IiIiIiIiIiKiIBhEIyIiIiIiIiIiCoJBNCIiIiIiIiIioiAYRCMiIiIiIiIiIgqCQTQiIiIiIiIiIqIgGEQjIiIiIiIiIiIKgkE0IiIiIiIiIiKiIBhEIyIiIiIiIiIiCoJBNCIiIiIiIiIioiAYRCMiIiIiIiIiIgqCQTQiIiIiIiIiIqIgGEQjIiIiIiIiIiIKIqagkNWmCJeZuUdWr/ldJOmIHNufK2fUqCtNWp1p/ZWIiOjEwnHp2+9WSYUKleWSi5tKUlKS9Zfg8L+7t2bKxgO/Snx+LXVfi+YNJT29qmoTnarc53uFuE0Qldy6Vb/Ktn0HvPpO1eqml2ib0s+VE7tdHbO4bdKpysntKlwxiBYl5jz9vCx+bZFs/2WdxNSooe5LLl9OamacJuNG3SMdrmyt7iOi4LDzv2FIP+tWcBMmTZb+/fpYt4hIw7Fp9pynpOFf6srsFx6RBulNrL8Ehm3w8QWz5fsv/y1Zucete13Htd7X95Mhgwexc0KnrFcWLZapDz4gafEV5MUXFoZ0wXT46BFqewpFw+Yt5d4xt/NCLEUtfYxZ8+0PsnfjJnffKT5vr5RPqF6s4wye697Zj8jva36UQ9v+9OqHtb/scrn9rjt5vKJTgt6ufl3zi1dMAopz/vbw9JnyxquLrFvBPTzzmRMe62AQLYLpq/QT758o61f/bN0rcjwmX2KPHJHYxGTrHpGht45kp4MoROj4z5rxkHUruPumTWcQjcjHio+/kZHX9ZD85CRp0PhMWbhwYdBjEI5ry1d8In+78w7rHpf8o1lex7TKqVVk4bxF7OTTKUdf5Dmwf58kJeTKm//+Xhqm1rT+au+SphfLzkPbrVuBhbq9EkUaHGMWv7G0yDleXlw5iTuWKxIXY90jcnrdevLsrGdtjzM6I3R4/27u4xP6YPFJlSXv8CF1G3i8omhnt13FVawkubu3e52/Ybu6e8p026AXnuv/evWSP7duse4J7o23lknLFs2sWycGa6JFMJzc4MqHDqBhpUSw7MEHH5Fx9zwp7bt3LjwquGKkc5+Zo1ZuIgrui2++sVqh2b9/v9UiIlBXI5+6XwXQIPvoUcnLLOygBIGhn8iwAQTOcBy7b+w0uX/WHHV8w3EOEEAYd+d49TpEp4ofV69V6z3Wf8iJS5PcjcGPP+iUhBpAA2yvRNHIt6Pfqt0VMn7SX+WB+x+U+6bPkGsHDnUfZ9CJR8AaF4T8wfFq1Nhh7gABjle3336XTLnrbhkz5hav49WgEQN5vKKohYufGHUACEg3bnG2OmfDtoDzt2t7Xuu1XU2eeKuj28Pu3Sf+mMVMtAiGdH59tR4r5ry3XytyNRKPufueuyQu77i6ErJq9Q/WX4jITuOzm7mvIj4z9zV1tQSdEASu7X4Tkct77y+XkSOHSbkCz3U6HKOWLF0adFtp1eJcd4Bg0JgJcteE0aqtYXsbMXSo/Lhmtbo9ZOwI+ev421WbKJqhI4+Oh94+AOd1i1e8EnSYtJldjc7Ne2+9G/CYVrFiYrHqFxJFAjOLEyZPGS9DB49RbdPOrCwZfMN17iQFBNrmP/Ok1zaB50JAe+N6VyBg7GPTZUDL9pJS3/sY13fAEFm18lPVRpDtuSefVm2iaIFjxkXnn2fdco1+m3zHROuWBx5nZpjhvHDlF5+rtgnnkBNun6j6YTorGuyOV/pvJxoz0SLUwU173FfrAWmR/tL5McSsd/ceqo2DBsYYE5E97JDNNHydbqx30Ha/iU516FTMLuxI4OTHDKCFCh193blBR983gAbY3qZOeUhlqcGCuX93n0QRRSO9XSHjxQygAeoFHtvqGX5mZ+06V9AZurTurn4HOqYxgEbR6If1a93bEAJj3fsMVm1fNZKTZeY9M1WQGtZ985FsWbdVtTVMeLN+wy+q3bJ5C78BNHhq5gx3Bs7nn/7TNquNKFLNe3G+1XJtC/4CaIBjC4Jmerva8scm2+0BQ0AhteZpEl94uhfoeKXbJxqDaBFq5bqP3R19HAgCFdNDQUutOEX6iE5Fy955xWq5OvJEFBiCWMh6vmX8LTJ79rPuYxNOplAPAxISE9XvQDA5jrbghZesVlGoK9P5xiGqjdfCkBqiaITtavSUSV7bFbJZalRyzVaLIugJCQmqHch/PvcE0ep35ERTdGp6/llPFthNffuqYJkdHGcwwQYcyk10zTRo+OD9f7svFvXse73fABqgg9+5azfVxja8YcMa1SaKFh+8967VEnWRM5jz2lyofmP72bWraN2zld9+5x4i3fKsJrbb1snGIFqE+nL5t1ZLpEenTlbLP+zAdTAAV2B4FYTI3oa1nh36Rc0vsFpEZAfHmEWLX3an6KMexvRHH1YnU5iNCVBj6aDsUm1/kG1zfN8x1cZVymBXFkddP9BqiTz9/GyrRRRd0Onf/PNPqo2ANGo3YThYdly2ug810bKzXW07CHKb9dC6tGphtYhOLVv//NOdxdy1S0f1O5BUqaB+oyTOsWPeQbR/f7zcaolc2KGp1fKvadNm7gtKyApl9jRFC70uY0INnLtVq5uubgdSv/YZVktkz45NVstjy6b/Wi2RCunxViv8MIgWgbKOH5efN6+3bok0DyGN8eyMxlZLeBWEKIBNxs67ZWvX1RIcJBB8XvGvz9RvngAReejtAdkxKB77/uJ3pFevvrJJPJ17ZKKlSHXrVlG/bF4jf2b9qdrnNQ+eKYMsAZy0wf6Ne+X3/TtUmyjaoPON7eqpJ16QkSNutu71CNZpMTM1UV9GQ+AaxzTUn0GbKNpt2vibfPLpd/LE089Z99jDcW3bgT+sW4Wd+QqVrZbrb3pYKLbPYDUJ65WPs1oiv675RQ1PI4oGuOCJIZofLPlI7p/3YtALoPDl1546aFVr1rdaHjs2bVS/sW01retKZjD7Yf9Z8YmKhZxsDKJFoKP7Dsjxo3mqjRVsa1rwFbZeI08QbcsGTwCOiDywk961z1NzBidNqCOIbE/Uoxk1bKz6fVWHDup+HTwgOpXhpGnEzWPkrgVPy4zHH3VP49+kwHUVH5CJlrXLU2vQV3ZOjKeOWkrwGk9QtbLr2Lc7PyukGQqJIs2NA6+V115ZqLYru7Idu7dmWi3/Nm/ebLVEMhrVVx0RFDu/ulM7dUxDDUMUW+/asxtHKlDUq392RkhZaKvX/C6//+aqg4YMm9pVPEE0/E2rWTXNatmr0aKFOyt7367fJcd+FClRRMJ5XyhZzug3rV/1H+uWSPXqrnqBJj2qQddFGz7gVmnfprm7H9Zr3HjpesWVqo7uycQgWgTCCZOefjwtvoKcX7eOagdSp3EjqyVyII9TlxP5gxOjHXv2qjYC1Nhhz31mjmTudU02oH9wBRL3Y5YZXME/cuSI+h+iUxU6Jb4nUOtiXMMzITktWZKru4az+LN/vycIZqb6B1Iz4zSrJUXq1RBFA8wc2LJFM+tWUeiYB8tEMycV+P7Lf8utQ69TswXmJyd5HdMwEyH+hkkMeIGITmVY/x9/6n61bQBqOOmLQ2DWcTqz+VlWyx4uNCWnpKg26qvlJ4bvEDWisoLtCv0miXNdKEWpKd+LQ+aFHNRFQz/sk5UfypHs8u7jFX4QaMOM08NHjzhpxysG0SJQhboFknXwoKudnBz0KiQkFniKOm/7w3uGGSJyMWte6B11bNYRNXkHhtOgoLOeZQmwEx887Ab56l+umjVE5FFfPAXPs/ZmBcxEO3TIdUyDSpVcnY1gkgrKq9+4Wulbr4boVIDZOQOdA2Im9/0Hc6xbrrq4gGGdOJ7hx5wABDCJAWZbYyCNTkXYZu6eeo8KKmv/d/UAq+Vi1nGqk1bTaoUG9dUKtnI8J51acDx55MFp7iwzHHMwA66vVau+tFou6Ieh39W+3VWuY1bhbz27J3zyzgcycNiAk3K8YhAtAm34sYJUiPV8daEU8TMlV65htYjIhGEv2GFr2GFv2L1TXn9pnhpO88iE+9XYf9TT0J0OZKktWWY/kyDRqSo7zpOJBoEy0fZu9xQ+D1VsqmsYTUFyqlRIdQXUiE4FudmuSTqQiYYLq3Yyk3e568sA6hY+M/c1+eijD9QEBfh5Y9k/5Lt3P1MXizRkWodygZYo2tz+2D2qY67dN216kWyZI7meGmcHDxT/Ak5cOo9XdGp5ZM6z8uZbb1q3RMaMHOWV3amZ9dIAk+l88OH78txLz7iOWYW/P1yxQgYOGGQ9QlTAGxd+TjQG0SJQo5bH5Fi+q6AyBJrxTKtWzZOJlr/fNVyNiLxlZGSoqxxIMUbmGXbYJj3NMoauTbnrbtUGnHDxqj2Rt4Q8T020YNJq1bJaodPHspis/XJsf65qE50KkirXVr+RiXZsq30NweTEOtL63FYqQIaMs3tnzfJbWw3HthfuneGeyR0eXzDbahFFP5TmQK1bM4CG88D+/fpYt2xYF3OKI5R+G1E0QN9o0rjb5M0Fc617XAkK/ibJgTYXXaaOVTgWIYCGxyUlJVl/dcHw6LvvmyJDbx1p3SPyxquLTvgEOQyiRaCjq/9ntVwCzXim7d7tqYOmr94TkTcEx3CV47233lWZZ4HgxMrscCx+Y6nVIiIwM9EwO2cge496hpwVl8pEM2ZOI4pmO7OyJO6I6/S9WmxywEy0GsnJ6liGbOqXXn3FdnICQCBt3KTbrFsin3/6T6tFFN0wu/PE+yeqDEwNHfTb77rTumUvrQT1zULptxFFOhyrRk2c5JWBhu3qgSn3W7eKmnzHRJUd/eqsl2wDbdqQwYPcJXZwQWlbTvFHNJQGg2gRSM3yYhWohOKm3KemsKAlkRO6dOxhtUTeX/621SIiMDPRMBnOgfL22WL1qnvKEpj10UJRISFwgI4omiAwlh2XrdqYmTZQJprJ92q+Px0uvtxquWrR/GfFJ9YtouiEGmgj+w7yqoE2ZswtqjOPjBd/6tSpa7WKX4rgeEx+wPqgRNEAGWh9unRTk9hoGIIZaLsy6ZE/geB59MQeOF5tWP2bap8oDKJFIHRE9FV9PZNgMBs2rLFaIpXj2OEgcgKGfxKRf5vE1dEHHLMq54ZWBybUTsl/t3hmSGuYal9vjSja4Ko7xOftlfINUlXbKebkOdtjkq0WUfR57/3lcvk1HWTjetcwMNS6xRCyMRPuULftVK/u2UZ++C14xx0BBT0hXNXKVaX+2Tx3pOiF7apHp05ekwhguxo+yjP80iknM6bBIFoEaphaU1Jruqb2R+TV7KjY2bJhvdUSqd3wfKtFRKVhDiE7fjTPahERmLNzIhMta8tO61ZRCEjryTq27NuvfgejAwlQ/zzX1UiiUwEmFICcuDTJ3bhfZdM4JdjQa6JogI7+hNsnumesxfHnqReekBs791K3AzGHRf+xebPVsmeOGMJIItbQpWi1dOnrMuXOyWrSNcBkNtOm3qWGZoaSgVZcJamn6xQG0SJUvSqeK4/71m+wWvbWrPvFaom0uZSdDSJ/UPzyyq49pFOnziEVqFy31jOLTI/LelotIgLfmmh5De3rcZ5RwzM8ZutPnsxpOys+/sY9k26L83hhiE5NCKYhE81u6AsCBX0HDJGLzj1PFU0Phc7KgUA11IgiEeo0vbJosYwdMdx9DEH25VsvL1bDmUMZRgaVU6uo3yqZ4XtPH8ufXzavkb2HXK+F4WdlEUwgOplwIQfb1R23TXYHprGNYDKbXr36qtvB4Lxu+OgRqg+G38EgGP3jL+tUG0HwEz06iEG0CNWuYyerJfL2Rx9ZLf+wkpmpyi1bNFNtIvKGDJjNP/+ktpdPv/nCutc/HDA++uJL65ZI/Y7sbBCZfGuiBRrOianOM2qfrtq4ghksiL3i3cVWq7Cj36651SI6tSAbE5lodpAtjZo02KY+eO/doBkw6MRo5sQ5RNHi+y/+JVMffMC6JWrm2mdnPauOQcXR/jJP/cB/bfiP1fJv9X92SVyeK3O6fu0z1G+iaLLxwJ/y2IyHrVuu7WrhvEXFuhBzRvMUNTsu+mCY2CbY8QrB6B2bNqp2wc6dJ3yCKQbRIhRmEdRDX3CCFKjDcffUe6yWyMgh/a0WEflqeVYTqyWydt1qq+XfynUfuwvR4ipml1YtVJuIXJCJlpsd+lT+Nw0YZLVEzZRmB8c7PdsTjoNDB49RbaJTgTl0Ex2HanU9k3L4QqckPc2V9YIauqt/W6va/qDD8vyTnk7QiJu5XVF0wTo+4+Fp7gy09u2uUjPXFjeABmYyw6LFL1st/97/x3z1OzbriFx9ZTfVJoomQwcOdGeg4QLMUzNnFHu7apDexF2TE9vovBdd242dOU8/76671rJrtxOeOR13byGrTREmMTFX/rny36r98ccfSr0GzaXBGbXVbThy5Ig8/8J8eX3xEinIPaY6G7NmzZaKFYPP0ER0KqqamCbvL39fcrKzZdOG3+VIznFp3LhxkW0GQ2QeuO8hOXL4sNqu7vzrBDnrrHOsvxIR7P9zn7z/yadqO0mpnCp9+vYNePxp1vRseWnBy2r727Mj0+/2hwAaAmz4O1yDE6erPJ0ZomgXXyVJnn/2ObWdxFZJkx5XdJX006pZf/WWVjFddu8/KD98/506D/z2s3+qc8VaNdOkfHlPZiiCC889NUc+/OhDdRudoJG3jOD5IkWVt5a9K2+/uUS1EdDqM+xa2b79gPz228agP3kHc722syqpqfLP775Sx6Jdmfvkf5u2SItW5xU5Xo366x2yab1ryNm5HTrJjTcPkAqxzGGh6IFSAV//0zV6B32iUbeOlj179/ndjnx/fLer2nWayHtvu7ZRHLeqVj9NkupUlbQEzyQ3OF4teGmhzJrxkLqN13z24cdtj4NlJaagkNWmCIOrkcPuneSePjYpIVcu6tBDzm7cVuTYFjXUbP2q/xSuXTGSfzRL7p81R/r366MeS0RFIfA8f4Fnxwy4KtK5sKNeqVKKuv3+8rfl99+2uq9kXtvzWrntgfukRjJnMSMyvb9qtdwzZLC6OontaMnSpUFrwSBAPXpQf4lNdG1P6My3uegytf0hO/T7L//tdbVzwQsvsb4MnVJwnGpz8aVqO0DNmdc/f19NOGUHHfkbhvRzbzf6XLFZE1f2NCae+uLrr2T3TtfEH+iQLH18lpzTob26TRQN0PG+9LLL3edueXHlpEJCYmEn/qDkHzssBcmp6nbu7u3uNh6L7QH33fa3B1VxdBOOV6itppnni77bVajHQKJIguPLoBED3es56G0m0Dalf1/doYPMePxR6z9dUJ/aHG2AureXNG8kcQlV5NChg/Ll15+7RwLh75i4INS6a05iEC3CYeUdd+d4r0Kw/gy9daRMvsN+eAwReWB2mTunPOg+2fIHJ2C9u/cosvMnIhez816cDgRS9Gc++oi7how/OHFa+cZyqXmWffCAKFq1anGu2q6wHaAgeijDZjDBgL7oaqdajRoy/+kFJRreRhTOfANexWXXj0IxddRYC3S+iOPfi0ufUcPViKIJtivMchto/Q+kfffO8tyTT1u3PMxAmh0c/26/behJK+nBIFoUyDp+XJ569HE1Q8Xva3503Zd7XBVpzmhUX3p07qlqqBFR6FBgGcXLf968XnZs/p/apjATGjoZzZucJR269eHMZUQBbMxcJ49Nf0l2Z2aqeoNDBg8K+So8tr8ly16SbX9sVZmf1WKTJS8pX+qdebZ6rjGjR0hSEoea0alJzVx2sPD0PSVGHphyf0jbFTJxli9cLm+v/lgVY0aNNNRUq1W4PdWs30Datm4tfXr3YqYMRSV09l9+/XXrVnCpUkH2i2eG6Zv69rXtS9mdL9bMOE1lUqMOGgPTFI1W/OszmfvcQuuWPb09+f7u0amT7Sg5bLNvf/CWbN6wSTat+kFiCvtferu6qPkF0qtHn5O6XTGIFkUwvDMnufC37JKKmVUkLr08T4aISgkdD8jaslOS69VQbW5XRKHD8LPjO49KSv3ibzd6+9u9NdNdQJ3bH5FruyppIBnbVV5mrmSdJu5Zc7ldUbTTx6JyNRLVtoN+kz4u6bb5GC3U4xe2K/NcEbhd0akA242mtxdzm9L3l3S7OlA+132syk+MD4sSOgyiERERERERERFRmSnNBaBwwiAaERERERERERFREJxjl4iIiIiIiIiIKAgG0YiIiIiIiIiIiIJgEI2IiIiIiIiIiCgIBtGIiIiIiIiIiIiCYBCNiIiIiIiIiIgoCAbRiIiIiIiIiIiIgmAQjYiIiIiIiIiIKAgG0YiIiIiIiIiIiIJgEI2IiIiIiIiIiCgIBtGIiIiIiIiIiIiCYBCNiIiIiIiIiIgoCAbRiIiIiIiIiIiIgmAQjYiIiIiIiIiIKAgG0YiIiIiIiIiIiIKIKShktYmIiIiIvGRm7pHVa36XXbu2yB9/bJU6depK9er1pMOVra1HEBFRWdH74A0b1sihQwfVPvjcxs2kSaszrUcQ0YnEIBoRnVDvvb9c9u/fr9ql6YStW/Wr/LB+rWqnpqbKBee3kvT0qup2aeBEZfmKT1Qbz9u1S0fVppNvxcffyIp3F8uWfa71JzUlXpo1aSF9evcq0Xd/5MgR+epfP6nAADi5HoXilUWLS/ya5voPJT2Zxvr+7XervLbJFs0bnrBlEE6wful1oawCROZrRFIH6J77npRlr06XI9nlrXtEKqdWkcE33yIjR9xs3RP9fly9Vn755VfV9reO6ONbQnyBnJXR/JTq4GJ/pnXs0D4i9iG++79Ied+hML+P/v36WK3iC+fv9eCmPTLs3kmqfVPfvlF9vjZp3G2ybMUKyTt8yLpHJD2tqvQeNUAmDB5t3UNEJwyCaEREJ0qfmwYXNKiXoX66XN3Vurd4du3aXXD72Anu58FzOmX5in+7n7dtm3bWvXSyvTDviYJGZzV1fzf6B+vQgf/uth4VuoWvvO73+fDz0MOPqHWsLD015zn1WngPxfHL9+sKOna8qsh7xg+2g+K8b3xOf8sA9y1Z8pr1qFMHlodeBmiXBXO/hXUgErz73kfu9QRtMLcf7DNPFYHWEWx72B/hb1g2p9JygXObt3R/duynIgG+s0h836HQ6yl+SkNv56V9nrKA/RHeV/3q1dz7pmiE/S0+51+qVnfvV3D8yDijYUGD2vWiar0lihSsiUZEJ9TQGz1ZC+tX/6wyaooLV0I/+fwz65ZIj06drBZFI6wjjzw61+sKbFzFSuqndp26Uq5GonVvaIaPHiF/u/MO9/Pp59LmPjNHBg4bUKJ1MxhkvyEbafacp9Tt5PLlVDZEML/v3yFznn5euvfqLBvXe96X+b5XrfxULr3scpUNE+g58bm69uymPqe/ZYD77rhtsvQdMKRMlkEk2Lt9u9UqOwdzDlit8PbTT2vVOnHftOnuTA9ktlzdoYNqr1r1pfp9qjleuC2b8hPjrZZI7u6yX3/CVaR99uSUFKtF/uAYFa6wb4IqterIGTXqqna0yTp+XNZ8+41qz3r57+7sV2QAd+xSuA+Oi5FPv/lC3UdEJw6DaER0QuEE4PS69axbIss+ftdqhQ7DCw7s36faGFKEIQYUveb//QV3sCf/aJbqzL/18mJZ+vgsmXzLJElKSlJ/CwUCQ5+884FqI2g0ecp4eeqJF9RzjX1susRmuTrGCPDeMv6WkAJcxbFl3VaZMmmk+/NAKMNj1nyyUmY9NE218b4HDhgkz8x9TV57ZaH63bJ5C/U3PO+E2yfK7q2Z6rYvfJ6J909Unw+wLT7x9HPuZTB+0l/dwTQE5bDsT0VptWpZrbJTsXwdqxXerr6ymzz+4qyiQ8JS06zGqamcz34n9miOCupjiFWTi1pL7SqVrb+cWspXK/ttpyzE5+2V8g1SrVuRD+dG2L+b51slcWjbn1YrvOBY9uMv61S7YfOWUTt0OrlcORl04zC1D7YbroqyEER0YjGIRkQn3KTJd1otkUXzHy92oOL5Z5+2WiLntbnQ0Rod1aoVL6uJyt6BvKNWS6T/iCmqM48T5nM6tJf6Z2dYfwkOGVoIDAGCZQjEDR08RgV28Vyjr+0jG3bvlMYtzlaP+XPrFln8xlJ1Jbi0dAYaMsky93qv76Gs/88/v0BdcYYxI0fJ3fdNUe+7ZYtm6vcby/4h1/a8Vv0dgbR7Zz+i2r5Q/8cMoC1ZulSdmOtlgKvbWC46kPbmW2+ektloZZaJZgaejrlqo4U7bGvdruhp3XKtr1iXv/l0hQpqI8h2Ktp7NMdqueA49NyTT8vXP3wv77317ilVDy0a5MSlSe5GV220aLBq9Q+y8ovP1U9pVKp9utUKP7+v+VH9bnlWE/U7Wpn7YJyPYB+M85nvv/y3OlajviYRnVgMohHRCYdC6rhKCodyE+XrtT+pdijQeUNwQ5s8YJTVcsbu3Z6ADYWH/Qc9ndULz29stYoHJ51vf/CWdUvkoedfsO3kjht1jzuI9P7ytyX/j9INu0MQ6t4775Fhw/wXdw4WBMbJsh7CiQCfXSH32++60511gGChv+DXlDsnWy2Ru6dM9/vaWC7Tpt5l3RLbgFw0K7NMtP17rYZITEZ9qxU5kAX8f716ya1Dr5Mde/bKk/NfOWWDRWnG8E2KTHmZuVbLJaEg32qRlpVb+otIZQEXhPSIhFMpkP/S8y+qffDYEcMlIS9BZZEzYE904jGIRkQnHDru7S+7XLXj8o7LP995R82yFIoly16yWiKt2l0h9c87y7rlDGaiRScMb/x1zS+qjUDTWfUaqbY/yMpq+BdXfRVkbWUm71Ltkpj74mzpeVMfldFVzipD2r57Z/ewUQiWifb087OtlivAZwfb1c23jLBuuYbBmhBU050OLAN8Tju9evUNGpCLZiciEy12veu7iCQYNtT63FZq36uHDr/7qSc4Taeu8vEV1O9IqokWl+6ZbRayY9gt8hWuNdF0PTRc8DqVgkh5+SlqH4wLajsPbZfbRvVSF5eJ6MSKwewCVpuI6IRBRsPd99ylgmg4GcDwl2DQkUedKp2JhlpQvoEABCRwhRJZR0h110EDwOt06dhDrmjd1vakCycjyLIABBF8h0JgmvEt+1xDPp6aOSNgFhHqb2mvvzTParng87/90UeqjYkRMEQRGUcvv/66rP7+O3fNLLznfn1uku4XtZeU+lVVgfn1/1qrHvfdh29LbGKyehzea5/r+kmf3r0Cvicsn9VrfpcV7y5WkzOYywfP0blrN2nVqo1ccnHTYtUasxP0+2jdXa7o2K7I96Gyt2Y/IqlSQb7+5h05ku3q7OB/kivXUO1LmjeSMRPuUO1g8L0O799NLS8EAHy/D1/4nhH4gvvGTpP+469X7eLAZx8xdKj8uGa1uo1aSaMmTlI1/DABAL5jZGRi2I0dPMdF55+n2ugsrP/Z1XGwszFznXQ6v4tqN2h8pnz0kav+Gzw8faaaTADGjLkl6LLDBAy6ftz0Rx9WgbVg8L0heIdtpF6VVFXLBVD78K03l8junTvVbXxuBNLxd/3d43/xuDdeXeReT/CZL7viUvm/qwcEDPoB/v+H9Wtl0eKX5ffftrq3ITxHi/POl5v69pWzqte2Dbyby2forSNl8h0TVTtU+K4w/BfZi3rILGSc3VQG9b9Bfe+PPDjNvV6NmDJBJgwerdqa3mekpsSroYFYb7GtLluxwv159HY6ZPAgta3rbRoXGMxtDMu49/X9VJaGuX1h3/PHH1tVG8FCnXWH4Yk6u0rf7/u/JgSIH546S61nCxcuDLjf8cfu+wJs520uuky9PupUNUytaf3FGz47YB+DfeKP770r+cmu/Ra+dwTD+7XrLxfe0EIapAce8oXnWr7ikyLvR+9bcdx464t3ZN4TrnICvusI/n/ei/NVnSZ8f+MGjvFadvgu5/79edUOtu/SxwLQxwcNr3P31HtUhi5e54Ep96uLBEvfXiz/WPaW1/dvbmMYBvb156vkmy8/8nqc3sZ8329xtWpxrnpOPN/7n78u67fmyOd//7vXccbcnls3aKiOaRo+F7YPfXy9d8ztQd8P9lE6UxmTFvnuI/ztUwDHgKHDb5Da8bXc5xRYXotXvOK1nuA7w3aF18D+o175OLl/4SJ3WQCsG7hw4fv94PtAsXfffQFeAyUoenTuqTLyfbcZ8/WgT4+Otvtdc30DDGkc0WeQe5kGOv8A/T6xTn/4j/e8MvyxfPB52zRpJZdf08G97H7fvEn99qWfC8v6g8JtcMsfm9wXjczPbFfTqyT0+oYyBjMef9S6t/j0fgjnYxgeaq6rzRo2kJ59r1f7bn/fld6e27Zurc699LnOJ2+9X/gErvIL6hyucB/UetDlaj+GZaX3V+a5XqjncKZ77ntSXp3/mPq+5j/zpCPnbEQUGgbRiOik2JmVJT3bXuauD+UvIOYLHYvRg/qrQAhOOFDPyTzZQABhxsTZ8vn3X3l1yHxVq1FDRo+d4PfE6MfVa6V3z6tVG6/hG0RrV/ie9cnmO0s/CHiS3/jsZu734XvyiZkWZ814SLVxEogO6/yXX7Z93/pE8YG/TZUFL77oPkHzFShAhJO3556aI39fsiTg8tGd7+IGEXzh9dDZ+/zTfwZ9vf5jBnkFFHCCqoOZdnByGkrwFRA4wIycgEwwBCgCefuTz2XCkEGqXZzXMWEdHzNyrDpRHjj0xsL1vbtaX7Bcrurg6pjgs3+4YoXtSbO5HHyDYv4go7P7gF7uTuHcBQtU3TRAp0p3/h6bN196tL9Mte2YyyzUjgo+G4aa4PXRCcGwUNRzM2cUNentGEGgB6be4dWRMyEAOXXGHL/7CNSb++pfP8njT93v1WH1BxMwDJryN+nSyjURg8kMol07cKjMuNczpDUYdMTMCRv8wbaJoIcOTGISB9+huQ2tIZ5Ydo89MlMNvzU7/yY8HwL56JAFehzW35n3zHTvq8zgaDCYxKPIhAKGi849T/bmHFNDioLtv02hLC9ISsiVO6Y85r6I4AvrGwLTer22g/UMtTjtOvGh7KuwHDFxgF52vtsEnkMHzfH9+S6TFf/6TG7tN1i1A+2nwff44LvtmQGrKXfdreqE2m07eN9vFG7L2EYwqYlvTUYt0DYWigtbX+gOkiPA6Bu4MuF9Y5/41/G3W/e4mBcvgu2nN/28Wdpfcb77QtKKJe95BciRIfnAXx92vydfqOfXoU9vlaGs91eoB2ke03HOMXZ44TZaeLzF9/DND6uKLGff94n/mfHwNNvvA/Da51/VQ56440GpeZZ3gNhcBtiHL5y3yO95BvbP94wf6f78vtuq3peAv+AXtkHzoqQ/mMDGPF+wC6LhvTz5xGO2yxqwfHExI5TgaDB476gvCrOX/sPv/jwUOL6Gctzw3YeCWjdGDFdtbM8IpGHWbX/7j+Mx+TL0piEyZuBIWfCPuTJn3iu2+xmsTwiMhxpIw3Z35MA2ef2Vj0u9XIkodMxbJqKTokZysrRp28665T1M0w6u8OkTxtZXdChykjFm2O3yycoP3ScnOLHBiSVmH8RJPU7iACd6Ux98QLb9WXTWqeLURKtWN91q+RdoWMuhQwetlsiXX6xUnXe8b5ys4cQVJ1KmxcuWqM7vgpfmqxN6dArR0ceJvf5cgM7k0jfftm55oIN37/RH1P/r5YPX0ssHv/GcgI4P3g86ciWFYA6CKehw2n0fGl7vuUdfUCelGma2Q9AI79H8fOjo4T78DZkqodKZN1C/9hlWy15igWdYb9beLKtVPImZOSo7Atlj6CzqE1xcsTfrzAQ6Wd61y9PByagZfBKFnMLNIyHR896353lq/Gz9aY3VErmoWVOrFRpzcodADor30Nc7pzyoAmj4DrGu4kevZ4AOHIIg6NzrzhzWfWwD+J41dPz1VX9fmPF01Nhh7o6Qfi2sZ8igM7clBDimjx9n3bJXnHpX6NCNu3O8pyOWV6BeH4FKc7vCtmkGr+ITsq1WUdhmxt90o9o20JHG85n7MMDzIfMNHTkdUNHLGP+j4X0h20RDhx+d4VB+0CnHvgOdTX/S6vrPEAsGWaa+3xcupPjuq5GBin31n3uLzjaL94UsTTOAhu8az4EfPKeGdQtDT/19DjzPwGEDvPZV7dtd5X4evR7i/Zrfn7+6eUdiPDW2ahV47zeO7feuvxWqQPX5cIxRy6fw85nfv7mN4X0/Nn2m2kZ0AA3LCcsZ+1ENfwvlOGwnN+eY1RJ1/MA6ieCB3p6x/9ewnJHR5/t96MxVwLLGd2Nn5vxn3ecDeG4zgIZjybjB491BHSwbBK3xfeI3tg/8L15D73cKCh/rb3bOuJQU9fuNd952PxbLV29jyKrTdGBFPw6PwXLG62JfoNclvDbW27HT7yryGVHbEsc5wDJ8fIFnOL+GfQ4ucOjPj2UcKNjt6/1Vq1UQSr9Pf8sHzPMFO/pii17W+F/9XPjMev+L58FnxraPCx+lsWLlMvUby6mkATRcMJ088Vb3fgiBTWw7eN/4Uetr4b4c8JhAtUFxoezR++5SnxHrBr5zfG69H0NWHpblk/9YJLNnP6seh+Wkt1f9OMA6iYtKpkD74Pj4BDUpRjTNLEsUEZCJRkR0Muzatbsg44yGBQ3qZagf3LZz4L+7Cxqd1dT92OVffWr9xeWhhx9x/w2Pe/e9j6y/eOD5b77pFq/H/fL9OuuvLj/8uMb997Zt2ln3euA+/Xff//Vlvl9fT815zv03/OCxS5Yus/7qgvdrvp5+3MJXXrce4YLH/V+Pnu7HdLm6q/UXDyyP+tWrqb+f27xlwZIlr1l/8Ybnxt/1c/lbjsH8tm+71/dx8TkXFXnPcCg3t+D2sRPcj8Pr+lsHzO+sJO8HzNfx91780Y/HMncSPqNexnafWTPXE3yGUPS5abB6PL5vvbwOHz7sXpf8rff+LF/xb/c6jOcM9D41PMZ3ncX79v1f8/vQPzePurXI416Y94TXY3zfN/YLWN/139H299nwWcz35e/zmOtsqMsapj02w/1/7bt09/v6vts7fnCfL/PvWPa+j8F7Nrd1/OB7xnv3ZS5jfPaS0ssXy9CE99Kgdj21DoeyPml4rH5fdv+L5za/V9/Ph79jfdF/x+fzfX+Ax+ntAT94Ttxnwv4AnwN/v7BlK7/Pg8dgP6afBz++72nHoUPu7wbfie/z4Lb+X7ynQIJt93r/gR+sJ3gMtnGTuXz0j7/nMl+rNPs63+3e3/b80/KPvd67v/djfu/+thHA85rPYy5r3+8c78MXHuO7fPztF7H/1PtA/PiuH/g8+jPif83H2u0z8Zzme/e37eIx+u/4wXLQz4Xf5jKy27bN/zdhn+m7fHzfJ47h5v5D//jCstCfGb/9fRbAcurY8Sr38zzx6MPWX0pGf358Dt/1PlTm94/n++9/Nll/8TA/H37M9dH3O8J36nsOh3XC/K7xg+fzPQfB8jf362hr5rHbd/3EbZxD4+94Dny3RHRiMBONiE4aZOBccGlb65bIsndesVpFPb3YO4Oqw8WuiQkAV2X1MCxY+vgsv8N28HoPzHzAfTUYz+dbfP1EZaLlZXsPc8HQn17X9rBuueD9okaGadr9DxS54ozHTZ3iGvoDe7fuKHJ1G8O99FXrvz36mG2dFTz31GkPW7dE1e0IlA3gT+7G/WooD+AK653T7/V7lTy5XDl11V1/Hyoj7SnP96jtF0+GQ0npOjslodc7pxQnE83MWAyUkaKZV/jLV/M8fvvhLZJ10PVcKBQdbN1Vko641+H8/XsDvk8Nn82Eq/kYiub7v7jPvPqOx/kbwjJ08Bg1/FpD7RrT3M8WuTMJcGV/wQsv+R3SgiFqCx572v2ayIjAMEg7oSxrwLaxYO7frVsij48b6/f1b+zcy52RoaFAdCBXd+hQZLgnls/A4bdat1wwJM3f0Gtk9eTFuYqC64yTkrimh2tfimxBnQ2B38ggRFYs6m4VZxgR6iZpdv+Lzzn4Js9n13WfNGRqYOgl4Ht/fPZsv8MQ8TwYPqYza7CumN87vr+3Xn9VfQ4sK3wmf8+D/VevIHURY4/muDPRzG1PO3bMM8svaj2Gyndd9J2EBzXGsD351kPC9mTCfnbKzOnWLQ+smxr2df9Z8Yl1q3j0/gWQyYeMR9/t+ZwO7WXCJM8MwWvWuSZ7MaEGqIaaYv7gO8TxApD5Y35nWDdQLxSQaTf1oRmqbcL7wv1mJp5dAX1z/3/3A9O8XgufR39G1KTTj8Xnx3Bd388PODcxlwHKOPh+p3gMsrk0DBPU2Umog2bu856d9axqh+qb7WvdywfLzt9+F7W7cGw2swf9Qb1G/ZlHDulvWwICy+nxabOsWyIvvfy6KndQEjjfQ81CwBDKktQBw/5LZ5XimDBv2lypf3bRTG9812NGemaAX/ya67zGH5w3+Z7DYd9265iB1i0XPJ+/czhzv/7dWk+dVHw+1MAEDL9FFiHgMyADGnWFe/XsrJ7D35B3IiobDKIR0UmF4rXaR8s+sz2x0kEZGHzjjVbLBQV8NZz04YTNDk40UNtCw1BKM0hUnNk5fQMGvvx1pLS4BM9wKwxJ8Ndxg4yMDHfHHyfMl5x5gWr7QlBEdxSP5ed7vTcMMdEdDiyfYLWwUPBYB7YwTGHnatdJW6j+u3Or+/VQmBfPZwffhznjJOqv+CpOh9OOE8/hFHxXZoetuEHKQHDCjbpbYHb+UqS6VIh1HfLNAF5AR5Lc6zCCA6G8T9/gnLl9+0J9HA1FsX07clrbiy6xWiL793sHQ79Z6Vk30TG1ew7AcK9BN3k66CuXuyb28CfU2TnRmdfLOdC+B50b3/pOcbGeoIMvbPOXdu9u3fLme4EABbv9QQeuQkLpZxvuc3l/FQDEcD/U50OtJfxGIBL7CXS2i6NSJU/wEBMm2K1XnXp0UXUnMazUt37Yhg1r3MsdRct13T9/sBwG33yLdct7ttv4wsPN2t83qnZapUqqTqadG7v38xom6QvPlVTgPdujqUKq52/FuTDguy76dpTb2gxrx7Zgvt9ObduoCxe+8Hx6fw//jY2zWiXXtpPnIpevixud4z6m4TiBWqYmfAf6WLZj8/9U0MSXue1ipkLTqlVfui8YXX5Fe1U6wh/cf9MAV91LsNsv6veK34GOZV+v+dZqiXTrG/gYiyCK/m6wHuNigC8E0HUQSz3m788XuWCI9bo4AWzYsPo39/JBcMZun4n7MamFHWy3qBEH+L46tHPVkrWD94mhi4DvfcnL9gGpQH7ZskFd3MH3gfOjkkDwT8MxwbcunQnfA7YPfBdYXv72V/guz6jhmtHbFy4EaXjPmKDEH3O/ridl0DCJDOp54mLImF7XuPfBv63+Xr2vwWNusx5JRCcKg2hEdFKpGaqs+h//3bJF9q7fptom1NzQQRmcrPlmUa1d5+lIBzrp09DR1yewCDh9t/UP1QYnM9GOZds/l5lh1OwS/4ExX2fUqydZp1k3/NCdgOSUFK/3ZnY4AgU1NJw8o4A24OT9j4Linajqqeeh1cWXBAxsAAKIsVmuDCq8nm+nyYlMNCeewynFyUQrLmQ06JnddOcP8JpY18Eu46KIpCOSZ2WXIDiQWKWyagdi1kTD61eoEPx/oGlT+yDI4XL+AxPozGA2NcBroXMeTKs2nk7wz5vXF8kA0ULNREOdRi2UfY8ZrAhUEw1CrVsXqGPvBB0ARH0jdIIRUMNv3MaEG8Vdf81OJLZ31E7EpA4I9psdVAR87AIE5j7fLohkwox32rqvPbWFvtn4u3oP0LB5y4CfBX+rWb+Bdaso1CMMtSZaaTLRTFjvq1e3D+yZMpr7v1Djy6wHWRLB3lNyPU9mKeo5IcDvC98F4Lj/y2ZPLUfADNU6eIPXatfRe7v78mvPZECYaToQvE8dsIvP2+u3rpTOxsVMr3bwnvZv3KvaeL4mF3vqvdrBrJ7a+h+9A4kaampicg1A9ljPmzwZTAiemFmEofriG8/6H2i/C1g+WMb+4JiiM1zxfYUSzDNr3pnbcHF8s/YnFQTEcayk+z7MGKv1HtzVatnDfg6BfGTa+dtHYL9Qr4n9+qHhPYfyOF94zflL3yiyD37kmXnqffkLjhNR2WIQjYhOKpwc6AkGcMJsZpVpXxgnxWZGAZhBA0hNDV5c1ewM7dv+h+TtXK/aECwTLTnNc1U7WCZaoCwQMxujcpz94xCE0IGM2NQ0Oa2C/RAwHRzBsBrzvZlDGZGF0fvqa9RMjfhtts3fa7/yXFVft+19qxUac+hVHSsYF0xLa7gC+A7ZcyQTzcrOCgcIcKLDppW2yLKpXI1E92dF5y/7qCv4jNdEcBWKk4mmi2ojOHB0n2c4mh2zQ4z1sTiZnXYqHvdfkN3MkKxZNc2rc26ndnwtd6cZE0ZkJntPhKCFmomGmf20QFlM2tkZja2WSE52gtXyz19nzZ9QH1dayJ7BsEEE1PDb3xDtUKCzjcLbGjriyK5BQfYLLrxQ7YNw4cQuQw3M/VMoQSQsI/29owOuh6Uia0m7pHkjq2UPGZPa3qOe4w4gyGxmom2P8c6AMgPKxcpE83kdE4rhYxKWUIQaHDOHnZZUsPdkHquydnkyZgHflRmQXv75SqvlgnIBOniTFl+hSCBl/ar/WC3XBZpAWjRv6N4vojg7ntuXzsZNrlxDZRv6g//beci1z8DzVc61z0jUzP3F91/+22p5w/vH7LSA9VYHfHHhcf4zT5Zo+N6OTa7MSwxfrlc+cNYhXt88VpmQca7hYobvOUTXnt28buMHM/Jq5r6zOH5e/bX6HSzobcfcryBAmJxYx7pVOqEOKy3J8FNAoEzvgx+dNVv99h0+SkQnDoNoRHTStTZm6TSvkgKykvQJJk54GjVqrtrariq5ql4T4O/BTgrBzD4pSE4t3BG6OlcQLBPNnKkxWCaaDn75syPT0zEKlGmADo0OZMDxnfbvzy4TTZ80A2qpYIZCDMXCb7Nt/tazuEF8dskDUKEENSFQkMuJLLJAgUp/zBNt3fl2CgKc6LBpgU6qzWBrKIEdrB97t7oeh85fSmVXFmHFiolyrJg1aLDu6SwMZCbadSBNZocYw0cT8uwDoHq7xaxoeYWdYTt2M4NuLexIHtrmmmHXDG4Xh78sGAg1E82sA1VcgWqiITgSzcaMHqEyKXy3LdT3wT4Is/1detnlakZic9ZeTWdVQqhBJB0sAf0/5jZlDrEPhe8MrggyB8xEK2lNND8zxep9faXapwc9DmmhLqdQs0cDSSjwfD++sP8zj1XJ1YtmOp3buJk7A8o3wGTWMcUFuCKBlLgYqxFcXmaue79YLTZZKtR1zcZo0vtACCVohX1RKMGdUPangMCJmcEKqN1X0mCM3mfhIl/C+d7P6495rDJt3+HJGMcFUN9zCJxrmLf1fVpJ9p07ftkhP6/5SbVDyar3x2v9K1/OdrhvcQQ6fwl0MaCkmHlGdPIxiEZEJx2upunhlTjRMk86fOtrXXKx9xAnFMA1+V799wcnwvqkB502k5M10czgl6+a6Z6TrkCZBggu6JN4BB2QaWTHvLpvDqszAwy6tgd+UGMjlHbNGiXvVPnWsCoJs8NZ0uer18iTAfTHH54r6HbMKebNzrcTVFaY9V1BoJNss+ZLKJMjIKisO/Lma6DDlVbXta0gmyHYuqvp2jkQUgfS6BCbgQ5/kFmpfhe+RlyOfaA0UAAUQQQwg9vBmN+n3XIItE2air1uWJ8ZAtVEizEmU4hGWB+RSbFw3iKZ/tgTaniSWb8LsJ6i+PeE2ycKhnuazOWeHVf8IPsmCTyUtiTyE+PdmWjYZxfJRHOoJhq49/W5x0PelrcFyCQ1M+hKmolW3gqEqwzYGPvuhbn/swukIFtR10zE8R+ZiRrq6Gl2dQNDhfIIFawgyu78LDm2tWgAzqxtarevNgOZoe6LQs0iw4VEPVRUM7Pzi0tvO9i+/GXe+TKPI6bEBM+5F4LhoZ5P6DZqGRbXqs1rVb0wXHgp6VBOfFeOX6Q4WDT4qpUkW46Iwh+DaEQUFsxZKBe/sdRqeReB7tn3+iJXX3FSqzvjaqhDUvChcfgfna3jW+/DzERLSAwcUAuWAWBewQ7EX6aBhuCCPonXn9OOOyun8CTZLsMGkyqghgZ+3lj2j5DadjN52inJ8MttRmDLN3vN7HCGmtnmywxGbdr2X6tlb9cuz2yGvoWrS8u8Eg6BTrLNYsVmRqGdmNx97g4XMsEwXEnTde7AHIpjx6xt1+w07wxQO2aHXneqg8GwokDZL3Y10epL4OGQ/iB4sm+XJ0Bqtw0H2iZNxRnerVjZd8HYdVyjDYIluIiCIaIrv/hcVix5Tw31NDPUsF/HcE9/BeYh1DqWO/Z4lr1ed8zg+pYNnmH9JeE7O2duFe91qCxqomE98Zc95U+gC0RmBl1JM9FyrUA4Pnug94QLPGYmmh3UA9OemumaYRPBNHWcL4Rjt79JcsxjeqALFOA77NLf+9avh+8MGb3+hBrINOlZFsFuOeD9Y0ZGPVRUQ3DZX4ZmKPR5DZZToMCqlpAXfD+LgFio5xO67TvRSigwWzicf1WPEgensP7pixTmcbhUUuyzH+3qbhJRZGMQjYjCAmZA0ie/Lz7/rCrUu+n7X9zp//ibv5pDOJGqV8UTWMHMU8HgRBiTGAA6Iaed5rmianY0so8W7ZyF2mnGyS+GioYi1PpLcPiw/w4j6vG4s3IOetdEu6i5Z+KCZR+/a7UCw7JHpzVYJ8SfZq1dRaFhzbfew3Pt6CnrwXeWq5IE5XxhmK9evxCwC/a5zCv95nBjJ5iZGBDovSDIoN836gAFq5+GTArd4ULmmdnRMAuwB5qZUjNr22U0r2+1AsNn0500dKpDyRJCNmig7Be7mmgoAq47nwiQhNKRLdi5Sw7lut4f6iLaTZYQ6jZp1jh764t3rJY9TGYQCsc6d2EKMzKaQQQNM6iiePeq1T/IM3Nf8wqmmcP4zMA2ZuoMBvsyHQxBFosugm6WBwjluzED8L7riJmJBuX3eWczFqcmmhnQC7QuYj3xlz3lT6jBxpJmopkCvSdc4MHQSc1uu0U9Lv39o7wAvsO3P/Lst8yZdk3mBACYPTeQ73/c7xVU9/e+9f430HeGfZF+rzj+2gV8Tb+v9HyWM5ufZbW8zV34orv+G55//KS/qjaghqCu7VccGY1c+3JsD1u2Bv5/fA5k6Pljno+hvlmowSJs9xiWWRIYqQBtW4c2SYY/DdKbqBqagGUQync15+nn1dDySeNu8/t4sy6vr5LUrSOi8McgGhGFjcuuuFT9xvCN9f9aK88snKduA06Y7a48mtkEn3/0gdWy99W/fnIPEUUnvGULzwxVxamJFiib54svvyoyVNRkzs4ZrP6SmdFmdyUc9XjMq/tmhk3L1p5hE/NffjnoyS6COpOffFRuGNJPFXj219kNxMz6Qsd0Z5BaXLiirju46CjoDq7mRE001H7RJ847Nv8vaABUFz1GB6ptm0tU2yl4bTNIEuyKut4u4B9vBQ6CmkHSNj6zFrZv4ZkV0RwSZWf1999ZrdBngMRn08FnZKKFWhMtELuaaBjKrScIwfrjb1ISXwge6u0SwXe72jKh1kTr0M1TXH/JS69aLf+wXpnB4kCzc0ZzTTQUGL/piiEyrnDfEqgDiyDKhEmTrVvew5nrtPV0ojHLX7DgsrldIItFQ3kAPfshMjgDvR/8zSyG7ruOmJloEKgmWtaBnQH3w2ZAL1gmWrCMaC3UUgVO1EQLBPsIMzAT6P33vt6ToY7v0JyNt2/7Lqrtq0tHz/drzp7rz5/b3pMj2a7AZyg10ezqkFXfV17Nng04twgl0/ell11ZVdDx8quslgcCZAvm/t26JdJ/zCB1sRFDIbXnn3w46AUhX+bFlA1rPRnX/ny1xnNs9kcHDnER45vt3hMC+TP7sekyvvBcrmu/LuI7RDsYPaQX3327v9jPkhsKMwhvBuftLJz7vMr+e+Odt/1m7wWqiYYLwkQUfRhEI6Kw0aNzT/dVX3R29TT2MGTwIKtVVJ/evdz/hyK2Zv0UXzjhnDLJMzNcZ2NWSAjW0TCvGNudoKNztPyzD61b/oVaMB4dGj2cE0GHQBML6OwmXAk3C7x37dLRfbKLE+IHXnpWte3g6j0CKOgMoK5VcYfNnXl+HXd9I2QSfvy2/eye6vu409NR9p19FZyoiYaAiz5xxucKlJG3fMUn8sd6VwakrsvjJHTUzEy0YAGAB6bcb7VEHpth32lCJx9BUs13m6l5Vk13BwzrAa6u28EVd915QgH4UIfOmJloECgTzayJFkigmmhmcelZMx4KGgR58603rVveATBfoWaimdkyWK8CLdNHHpzm1SENNDtnNNdEa5pRT2VL5icnec3W549Zv9DMOL68kme2zRWL35DPPv+navuD7/2NVxdZt7yHCSIoclEHV9AF72n+O55SAr4wa7DOCvInWE00Mxt2z/bdsvGAa/i9CfuCD5Zv9CrAHiwTLdAFAVP5TPvHOVETLVTYR5jHKrN+p69Wrdq4l9my119zX3xAthmyFv25onVb9/9gUoJA2VofLfvMakmpaqIh2+iyTp2tWyIzHp4WMLiF/YS+kIf36jvLIv538sRb3fsL1BKbMHi0at875nb3uo/znXkvzlftUGE22xqVXJ8JF1Pslg/OY1astM/yxDGh/WWXqzbe59znFqq2HWSfzZ79rHosPnvTpp6Ll6HQWe24GBbKhAiB3Hzv7VZL1DEh0HEDy0dPtJRWqZK0buApkeAWoCaab91eIooODKIRUdholdFMTVkPOLnb+qerk4Gi04E68fjbyCH9rVuiZnbz15nFydDAYQPcJ0QI9PgGGoLVRGt7Rhur5apLgtcxT5bxGrc/do98/ql9pw7ysl0n0BAo0wAdGn0lHEGHQEMDzEw03xnPpk572N2xWPLM4zLp3geLnOTjpBkBSBTy1ifvyATwzQwLJj2ruleNu6kPPqCuQPu+HpYVZhnTnQl8H4MG3qDaJidqosGgG4dZLVE1lnAl3Pc94fMjUIXADmp19bn6ar/rHv5XD++w64TYQUctN9vTcbTLbtDw+jr4hWV199R7ipz04z2Mu3O8+3tDXSl/7xsBBL0ePDHlHnnyTe+AM5YHvisdbEJnzexwBIMOsc5Ew3DOlNO9aw6ZdCZasJpodplogAAxOpga6ge9+2nR4Da+1543eYJm2KcgAGYn1Ew0QLaUXqYYiu4bxMcyxXpiBvAg0OycZpA12vTq0Ud954BgEbYlf9kayFB9vnBdBDze3H4zLm8nF17ZUbWxrSIQj+XuG5DGc2Cd0PsYbEe+33vXnn3c39+yN14vsk/HfvGxF59U+7FAgtVES2xxmlRJdm3ru3fulGfnPeu1HeM15z77pIy88UI5HuOZlMPfuqj3H1hPQq2JtjXN/tjhRE00U6DZOX1rotnV7wTUdNQZxDhu6/1bl9b2EwrgeGVmtSNby3cfjeWOjEgEoTRkf2JYpi8zEy3QechVvdu4g1sItuLY5vu6+I6xfs2e85R1j8iUoZ4hmoDHYB+v19n0wu/t6blzVRvw+cyLTc8WrjPFqY+G9f+S9hepNpbnzEfu9bt8cB6jh0/awTaptx08dviAW/0eD/H++t5ynXXLtR1i3x0qLBN9URUXMksbmML/4+KQhmPn2594T9aA18Q+Zdgwz3ED51F+z8EC1EQjoujEIBoRhQ1kymDKesDJnR52ZQ4/sDNmwh2qY6whK6VVi3NVoAOdNJwwD+/fzavG2uOzZxc5KQ5WE63/+OvdJ8qA17mqQ4fCjlg3adf2Mhk1dpgKrmEm0UDiEjzPESzrJZQr4WBe3ffNTsAJq64hg07nmwvmSutzznQvnwf+NlU69eqkApC6o4Kg1pjCvxcXTjIx7KR9O9cQFTwfrkBjOSGYgB/9feiTdHwfkybf6Teg5ERNNEDn44mnn7NuuQJp+j1hGeD7w+fXnZfe3XsUyRDQPnjvXfU9IzBiTkIQCmRi5MR5JokI9J1qA8aMltgsV4AAr9u1S5si6/bG9a4OOWZgtTmD9K4AAAokSURBVMvcRAfq6sLPDMgEeqJwu8Hn1t9L925d1XelobNWnA6Lb4f4v2vsZ6DUmWjBaqIFykQDdDB15iM6r+MGjFOfCcsGn0l/r3q9btD4zKBFrUPNRIP+/fq4lynWHbyWWqb3PqheH+uYDqDpDicEmp3THO4bbbAdjr5rjHXLtR3eeEU39/qMH+xPUfNJZykOv3m4VzAfw3DnzHzYvS/Wy73NxZe6v3c8x6jRI93ZY9h+zCw0DcXpdSAD64jep+M58Fy9b7lBnp76mOuYZHx/vuKzvDO6fGuioRZT24s8Q8OxHSOw26lTZ/VeL73scrXt4TO3bnul9ajCddFnptis48clqXJtV7twPQm1Jlpd6+JRMCXNRAt1dk7sI/SxKicnW/Iy/dc8BByfO1zuGb4I+A4atWtk3fLvkQn3u/cJCJRh/9j76mvU94n1DMsdxx48lw7oIvvT32yV5vE30BBcfL+YbVYPT8fz43wA361eJ7FeYf3S+yIEk1oPcmVzacgEx7oBCKZOnTGnyHmKOr5a5zuYrRJB5EDZVL4wMy6OE4DjBpaPfp8jJ06Wvv2vVO8h0PoO2CafesIzHPKTlR96fWacV6A9elB/93aIoCCy6YpDlUAoPK+BZk08F01K4/a77nSvI1gGE4YMUu9Vb/f/16uX2qdg+QKWt13gL1BNNCKKTgyiEVFY8R1ihROucxuHlvaPE2dcXdQnfuhY4UQQnTSc0OrsIpw84sTPrIWmhVJ8+eGZz6j3peF1EJzDSSJOjvH8U6c8FPAEdEem56SrOFkvdjXRQHe8MSujvzozKNhtznyH5aGXz4KX5rsz9PC+sRwxW16wLKlAnnvpGbl24FCv7wPBBPzo7wP092F7gupATTQNr2EuA/2esAz0Sb7+/Oho2NEn9CXhG+AMlN2gdWnVQma9/Hf3Sb/53RVZlnfPCPic6DygQ6C/F3xu/b0gQwawfFDEGp214jA/GzrVZzS3z7bS0OnMCzCTp93snBo+67OznlWfXX2muBj1mbBs8Jl8v9eFCwMPO4LibJOAdQXLVA+TUst0wVz1+ljH8Nr4uw62walaEw2GXt7Pa9+AfY9en/FjXuzAdzbqtnHqti9MQGCuy1jW+nvHcyBAi78hWPHVul9ssw9xcWTElAl+9ws6OI2LAub35yuncBMMVBMNsO2519NCOF7g+fFe0cbrj31sunRo55nwwHem2MPZ2RJ3xHX6jmBUoJpipkCZaKaSZqKFOjunCohYx6r4+ASJSw+8fbdu08lquSAzrXWtwOcEuJCD45fO4MX+EcE0fJ9Yz7CsEVTFhaW6p7sm5LHL/tQBL1zMKVcjcEBfBZXeX6EC9YD/xXer10msV4DvGes1Zqk0L1IgEIZMcG3oTUNs11kM89fHAzxvKLW9TO+99a5apxGow/LR7/OjJa+rOnFYR8eMHOW+eGMH7w8Xp/R7MT8zzivQxvPrc68Xpk/3CoiHAkOp8RnxHBiu6wR93MA6ordHvFe93evjhv6uzLIKvgLVRAvlIhkRRZ64ewtZbSKik67BGbXlSM5xOff8CySjdh3p0buvXNEptNkR46skSYerOsmZjc+VWqfXkJjCE6PYgsITxJhYqVa9hnS4vL0MHnazjB01Rpo2/Yv1X95SKiXKvszdcsnlV8i5rc7zW1Ad7/GS89pKzYy6kluugnqNhMKTuyYXXCQDBvSUyROnSL2GdeVw1mHJOKe5NMnIUO/LhCQ7vEd8xgsuvkQa2RTKzTuYK4mF76nZ2edI8+YZ0vScc6V8+aKdjrxdRyWxSiU5Lb26tO3QSc4++yypWLFoAOzSSy+Wtue3U++9YlolOZadq5ZPSlJFqdP4DLnmmj4ydNRg6dXz//z+f3FdcsF5he+5dZHvo3a9DLmg8PsYNepGue2G2+SsVv6/D4jNz5aU0zLUcrzi4isk/bRq1l9KBsvgjIYtpFGthrIvb58kVEhS7ynjzAbS7sI2MvzWETIySAbe8fwYOadZc/X9dbmiS7HeEx6LdQPr+NlNm6r3EwqsI5ddcJk0POcsOXS8cDka6/YFbS+WgQOHyW3jJsjpf3F1Zuzge+3epavaTtIL15mjhR3/mIJYqVjYodXrwE0DR8h1fa+2/iN0B5KOS0JBBbVszmxyllzU8lLb9ejY0Ry1/Bqcf7G0b36B/TIs/KxJ5StI69YXSvNzL1Hbny/8b8f2naRhg79ISmKSJMTHy9GcHO/1evAo6dXb//BcOHAwS5LSa6r1LNA2aQfLtG6jcyQ+Nl/yE2LlePZx93czZsQYmTB2jEi5VPV37F+aNLm4yGfZtvkPaXLhJdL6yg7S9iL74ab6cf72LSa9nmE5B3rciab21Ze1Vetgg4xqcjwhRY4fOijlC9fBhIREOaf1xdK1Sxf1nd0yYrC6MGCnXZMLpUnLplK7sBN/+PgRv9vzsEEDggarL2rZ2rVvrFJH7Rfw/WH9wX79luG3yLBbh0rFyrUkPi3V7zqi1vP8cpJWKUUuvvRSad65laRV9A5w4TH9r+snaVWqqscdPFL4fguPHVhH2111tdw7ZLB079Zd9hT2u+1eJ7lCBdmRfUTOqFVLzrvoYjm3ZUvbbezI0WNy2l/OVM/Tu3s328fJ9hhpeO6Zaj1pV7jsS7KPxT4Rr3Xxea0CbvdSPkaSC48FOFZd0u5y22OVhm1kzgsvSkGuK0g3aMD10raLfTDT1KnFpXJW61aSG5unjnVY1lUKX7fDNb1l9IS7ZMBNfdzL6LzC5XjpZZd4vRccfytWTVXLpXW7S6XJmY38Hn9Nfzmtplx1VWdp1ORsKagQU7gulpP8vDy1Lzitfm256aahMu66vtJ/ZNH6n9+u/kFOq1VTvR6278F9bpQq1f2XMMD7rF2nifs8AoH/xo0bu99/KPuI7td0kzOaFq4/sXFqXdTHE5wrjR77V3UMOFguQc4o/CyBngfrZ7fC9bZu/QZqvdb7P2zLejscMXqM3Dp+fOFzFS+ABl9++ZWs+/lnqd+4voyd4MliLS2s572vuVrOKHzfOMbgfeNYmJScLHX+kuHaf4y6Q+2DfNdRrBs5SYlqubS+8FJp1tR/nTb837b9h9XjLu94VcBJekLdrxPRyRdTUMhqExERERERhQVkZ3Xv5SnV8PvmTVaLiIjo5OBwTiIiIiIiCjvmTMoYuktERHSyMYhGRERERERhZWPmOjWJC6Bu1egevVSbiIjoZOJwTiIiIiIiOuleWbRYqlevp2YJffr52arYO6AA/Lx5z6mZWYmIiE4mBtGIiIiIiOika3ZmbTU7pK9n5r5mO1MlERHRicThnEREREREdNI1ae09KyGGcTKARkRE4YSZaEREREREdNJhNk5MJrB3+3ap16ix9OndS9LTq1p/JSIiOvkYRCMiIiIiIiIiIgqCwzmJiIiIiIiIiIiCYBCNiIiIiIiIiIgoCAbRiIiIiIiIiIiIAhL5f8my/egxr14GAAAAAElFTkSuQmCC" width="579" height="358"></p>
<p><span style="background-color: #ffffff;">S-shaped curve from ~7 to between 12 and 14     <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">equivalence point at 5 cm<sup>3</sup>     <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept starting point &gt;6~7.</span></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;">
<p>As expected, many candidates were able to distinguish between strong and weak acids; some candidates referred to “dissolve” rather than dissociate.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>More than half the candidates were able to deduce that carbonate was the conjugate base but a significant proportion of those that did, wrote the carbonate ion with an incorrect charge.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students gave generic responses referring to a correct shift without conveying the idea of compensation or restoration of pressure or moles of gas. This generic reply reflects the difficulty in applying a theoretical concept to the practical situation described in the question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates calculated the pH of the aqueous CO<sub>2</sub>. Some candidates attempted to use the Henderson-Hasselback equation and others used the quadratic expression to calculate [H<sup>+</sup>] (these two options were very common in the Spanish scripts) getting incorrect solutions. These answers usually ended in pH of approx. 1 which candidates should realize cannot be correct for soda water.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was an easy question, especially the identification of the type of bond between H and O, yet some candidates interpreted that the question referred to intermolecular bonding.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A significant number of candidates omitted the “equilibrium” involved in the dissolution of a weak base.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This is another stoichiometry question that most candidates were able to solve well, with occasional errors when calculating <em>M</em><sub>r</sub> of hydrogen carbonate.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mixed responses, more attention should be given to this simple calculation which is straightforward and should be easy as required for IA reports.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a good way to test this topic because answers showed that, while candidates usually knew the topic in theory, they could not apply this to identify the Lewis and Bronsted-Lowry bases in the context of a reaction that was given to them. In some cases, they failed to specify the base, OH<sup>-</sup> or also lost marks referring just to electrons, an electron or H instead of hydrogen ions or H<sup>+</sup> for example.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students that got 1mark for this titration curve was for the general shape, because few realized they had the data to calculate the equivalence point. There were also some difficulties in establishing the starting point even if it was specified in the stem.</p>
<div class="question_part_label">f.</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;">Identify the wavenumber of one peak in the IR spectrum of benzoic acid, using section 26 of the data booklet.</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;">Identify the spectroscopic technique that is used to measure the bond lengths in solid benzoic acid.</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;">Outline <strong>one</strong> piece of physical evidence for the structure of the benzene ring.</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;">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">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why both C to O bonds in the conjugate base are the same length and suggest a value for them. Use section 10 of the data booklet.</span></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><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">f(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">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The combustion reaction in (f)(ii) can also be classed as redox. Identify the atom that is oxidized and the atom that is reduced.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</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">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the reagent used to convert benzoic acid to phenylmethanol (benzyl alcohol), C<sub>6</sub>H<sub>5</sub>CH<sub>2</sub>OH.</span></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><span style="background-color: #ffffff;">Any wavenumber in the following ranges:<br>2500−3000 «cm<sup>−1</sup>» </span><strong>[✔]</strong><span style="background-color: #ffffff;"><br>1700−1750 «cm<sup>−1</sup>» </span><strong>[✔]</strong><span style="background-color: #ffffff;"><br>2850−3090 «cm<sup>−1</sup>» </span><strong>[✔]</strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">X-ray «crystallography/spectroscopy» <strong>[✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em></span></p>
<p><span style="background-color: #ffffff;">«regular» hexagon</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">all «H–C–C/C-C-C» angles equal/120º <strong>[✔]</strong><br>all C–C bond lengths equal/intermediate between double and single</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">bond order 1.5 <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/2d.PNG" alt width="482" height="158">      <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<p> </p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Accept Kekulé structures.<br>Negative sign must be shown in correct position.</span></em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">electrons delocalized «across the O–C–O system»</span></p>
<p><span style="background-color: #ffffff;"><em><strong>OR</strong></em></span></p>
<p><span style="background-color: #ffffff;">resonance occurs <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">122 «pm» &lt; C–O &lt; 143 «pm» <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="background-color: #ffffff;"><em><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 “delocalized π-bond”.</em><br><em>Accept “bond intermediate between single and double bond” or “bond order 1.5” for M1.</em><br><em>Accept any answer in range 123 to 142 pm</em>.</span></p>
<div class="question_part_label">e.</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;"><br>«[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 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="background-color: #ffffff;"><em><strong>ALTERNATIVE 2:</strong></em><br>pOH = «14 − 2.95 =» 11.05 <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>«[OH<sup>−</sup>] = 10<sup>−11.05</sup> =» 8.91 × 10<sup>−12</sup> «mol dm<sup>−3</sup>» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Award <strong>[2]</strong> for correct final answer.<br>Accept other methods.</span></em></p>
<div class="question_part_label">f(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)<br>correct products    </span><strong>[✔]</strong><span style="background-color: #ffffff;"><br>correct balancing    </span><strong>[✔]</strong></p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Oxidized</em>:</span></p>
<p><span style="background-color: #ffffff;">C/carbon «in C<sub>6</sub>H<sub>5</sub>COOH»</span></p>
<p><span style="background-color: #ffffff;"><em><strong>AND</strong></em></span></p>
<p><span style="background-color: #ffffff;"><em>Reduced</em>:</span></p>
<p><span style="background-color: #ffffff;">O/oxygen «in O<sub>2</sub>»      <strong>[✔]</strong></span></p>
<div class="question_part_label">g.</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">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">lithium aluminium hydride/LiAlH<sub>4</sub>    <strong>[✔]</strong></span></p>
<div class="question_part_label">i.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates could identify a wavenumber or range of wavenumbers in the IR spectrum of benzoic acid.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Less than half the candidates identified x-ray crystallography as a technique used to measure bond lengths. There were many stating IR spectroscopy and quite a few random guesses.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Again less than half the candidates could accurately give a physical piece of evidence for the structure of benzene. Many missed the mark by not being specific, stating ‘all bonds in benzene with same length’ rather than ‘all C-C bonds in benzene have the same length’.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very poorly answered with only 1 in 5 getting this question correct. Many did not show <strong>all</strong> the bonds and <strong>all</strong> the atoms or either forgot or misplaced the negative sign on the conjugate base.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was a challenge. Candidates were not able to explain the intermediate bond length and the majority suggested the value of either the bond length of C to O single bond or double bond.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally well done with a few calculating the pOH rather than the concentration of hydroxide ion asked for.</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most earned at least one mark by correctly stating the products of the reaction.</p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another question where not reading correctly was a concern. Instead of identifying the atom that is oxidized and the atom that is reduced, answers included formulas of molecules or the atoms were reversed for the redox processes.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The other question where only 10 % of the candidates earned a mark. Few identified hydrogen bonding as the reason for carboxylic acids forming dimers. There were many G2 forms stating that the use of the word “dimer” is not in the syllabus, however the candidates were given that a dimer has double the molar mass and the majority seemed to understand that the two molecules joined together somehow but could not identify hydrogen bonding as the cause.</p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very few candidates answered this part correctly and scored the mark. Common answers were H<sub>2</sub>SO<sub>4</sub>, HCl &amp; Sn, H<sub>2</sub>O<sub>2</sub>. In general, strongest candidates gained the mark.</p>
<div class="question_part_label">i.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">A molecule of citric acid, C<sub>6</sub>H<sub>8</sub>O<sub>7</sub>, is shown.</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="215" height="123"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">The equation for the first dissociation of citric acid in water is</span></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C<sub>6</sub>H<sub>8</sub>O<sub>7</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> C<sub>6</sub>H<sub>7</sub>O<sub>7</sub><sup>−</sup> (aq) + H<sub>3</sub>O<sup>+</sup> (aq)</span></span></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Identify a conjugate acid–base pair in the equation.</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 value of <em>K</em><sub>a</sub> at 298 K for the first dissociation is 5.01 × 10<sup>−4</sup>.</span></p>
<p><span style="background-color: #ffffff;">State, giving a reason, the strength of citric acid.</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;">The dissociation of citric acid is an endothermic process. State the effect on the hydrogen ion concentration, [H<sup>+</sup>], and on K<sub>a</sub>, of increasing the temperature.</span></p>
<p><img src="data:image/png;base64,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"></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 standard Gibbs free energy change, <math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta {G^\theta }"><mi mathvariant="normal">Δ</mi><msup><mi>G</mi><mtext>θ</mtext></msup></math>, in kJ mol<sup>−1</sup>, for the first dissociation of citric acid at 298 K, using section 1 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Comment on the spontaneity of the reaction at 298 K.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline <strong>two</strong> laboratory methods of distinguishing between solutions of citric acid and hydrochloric acid of equal concentration, stating the expected observations.</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<sub>6</sub>H<sub>8</sub>O<sub>7</sub> <em><strong>AND</strong> </em>C<sub>6</sub>H<sub>7</sub>O<sub>7</sub><sup>−</sup><br><em><strong>OR</strong></em><br>H<sub>2</sub>O <em><strong>AND</strong> </em>H<sub>3</sub>O<sup>+</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;">weak acid <em><strong>AND</strong> </em>partially dissociated<br><em><strong>OR</strong></em><br>weak acid <em><strong>AND</strong> </em>equilibrium lies to left<br><em><strong>OR</strong></em><br>weak acid <em><strong>AND</strong> K</em><sub>a</sub> &lt; 1 ✔</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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"></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<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;">«</span><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta {G^\theta }"><mi mathvariant="normal">Δ</mi><msup><mi>G</mi><mtext>θ</mtext></msup></math></span> = −<em>RT</em> ln <em>K</em> = −8.31 J K<sup>–1</sup> mol<sup>–1</sup> × 298 K × ln(5.01 × 10<sup>–4</sup>) ÷ 1000 =» 18.8 «kJ mol<sup>–1</sup>» ✔</span></p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">non-spontaneous <em><strong>AND</strong></em> <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta {G^\theta }"><mi mathvariant="normal">Δ</mi><msup><mi>G</mi><mtext>θ</mtext></msup></math></span> positive ✔</span></p>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em><br></span></p>
<p><span style="background-color: #ffffff;">«electrical» conductivity <em><strong>AND</strong> </em>HCl greater ✔<br></span></p>
<p><span style="background-color: #ffffff;">pH <em><strong>AND</strong> </em>citric acid higher ✔<br></span></p>
<p><span style="background-color: #ffffff;">titrate with strong base <em><strong>AND</strong> </em>pH at equivalence higher for citric acid ✔<br></span></p>
<p><span style="background-color: #ffffff;">add reactive metal/carbonate/hydrogen carbonate <em><strong>AND</strong> </em>stronger effervescence/faster reaction with HCl ✔<br></span></p>
<p><span style="background-color: #ffffff;">titration <em><strong>AND</strong> </em>volume of alkali for complete neutralisation greater for citric acid ✔<br></span></p>
<p><span style="background-color: #ffffff;">titrate with strong base <em><strong>AND</strong> </em>more than one equivalence point for complete neutralisation of citric acid ✔<br></span></p>
<p><span style="background-color: #ffffff;">titrate with strong base <em><strong>AND</strong> </em>buffer zone with citric acid ✔<br></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;">NOTE: Accept “add universal indicator </span></em><span style="background-color: #ffffff;"><strong>AND</strong></span> <em><span style="background-color: #ffffff;">HCl more red/pink” for M2. </span></em></p>
<p><em><span style="background-color: #ffffff;">Accept any acid reaction </span></em><span style="background-color: #ffffff;"><strong>AND</strong></span> <em><span style="background-color: #ffffff;">HCl greater rise in temperature. </span></em></p>
<p><em><span style="background-color: #ffffff;">Accept specific examples throughout. </span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “smell” or “taste”.</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">a(v).</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 class="fontstyle0">A student performs a titration to determine the concentration of ethanoic acid, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi></math></span><span class="fontstyle0">, in vinegar using potassium hydroxide.</span> </p>
</div>

<div class="specification">
<p><span class="fontstyle0">The pH curve for the reaction is given.</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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" width="446" height="312"></span></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Write a balanced equation for the reaction.</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 class="fontstyle0">Identify the </span><span class="fontstyle2"><strong>major</strong> </span><span class="fontstyle0">species, other than water and potassium ions, at these points.</span></p>
<p><span class="fontstyle0"><img src="data:image/png;base64,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" width="651" height="162"></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 class="fontstyle0">State a suitable indicator for this titration. Use section 22 of the data booklet</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Suggest, giving a reason, which point on the curve is considered a buffer region.</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">State the </span><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>K</mi><mi mathvariant="normal">a</mi></msub></math> <span class="fontstyle0">expression for ethanoic acid.</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 class="fontstyle0">Calculate the </span><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>K</mi><mi mathvariant="normal">b</mi></msub></math> <span class="fontstyle0">of the conjugate base of ethanoic acid using sections 2 and 21 of the data booklet.</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 class="fontstyle0">In a titration, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>25</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">of vinegar required <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>20</mn><mo>.</mo><mn>75</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></math> </span><span class="fontstyle0">of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>1</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></math></span><span class="fontstyle0"> </span><span class="fontstyle0">potassium hydroxide to reach the end-point.</span></p>
<p><span class="fontstyle0">Calculate the concentration of ethanoic acid in the vinegar.</span></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><span class="fontstyle0">Potassium hydroxide solutions can react with carbon dioxide from the air. The solution was made one day prior to using it in the titration.</span></p>
<p><span class="fontstyle0"> State the type of error that would result from the student’s approach.<br> </span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Potassium hydroxide solutions can react with carbon dioxide from the air. The solution was made one day prior to using it in the titration.</span></p>
<p><span class="fontstyle0">Predict, giving a reason, the effect of this error on the calculated concentration of ethanoic acid in 5(e).</span></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">f(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi><mo>(</mo><mi>aq</mi><mo>)</mo><mo>+</mo><mi>KOH</mi><mo>(</mo><mi>aq</mi><mo>)</mo><mo>→</mo><msub><mi>CH</mi><mn>3</mn></msub><mi>COOK</mi><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo><mo>+</mo><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo></math> ✔</p>
<p><em>Accept the ionic equation.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>B: <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi><mo> </mo></math> <em><strong>AND</strong> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msup><mi>COO</mi><mo>−</mo></msup></math></em> ✔</p>
<p>C: <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msup><mi>COO</mi><mo>−</mo></msup></math> ✔</p>
<p><em>Accept names.</em></p>
<p><em>Accept <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msub><mi>H</mi><mn mathvariant="italic">3</mn></msub><mi>C</mi><mi>O</mi><mi>O</mi><mi>K</mi></math> for <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msub><mi>H</mi><mn mathvariant="italic">3</mn></msub><mi>C</mi><mi>O</mi><msup><mi>O</mi><mo mathvariant="italic">−</mo></msup></math></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>phenolphthalein ✔</p>
<p><em>Accept “phenol red” or “bromothymol </em><em>blue”.</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>B <em><strong>AND</strong></em> the region where small additions «of the base/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>KOH</mi></math> » result in little or no<br>change in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>pH</mi></math><br><em><strong>OR</strong></em><br>B <em><strong>AND</strong></em> the flattest region of the curve «at intermediate <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>pH</mi></math>/before equivalence<br>point »<br><em><strong>OR</strong></em><br>B <em><strong>AND</strong></em> half the volume needed to reach equivalence point<br><em><strong>OR</strong></em><br>B <em><strong>AND</strong></em> similar amounts of weak acid/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi></math>/ethanoic acid <em><strong>AND</strong> </em>conjugate base/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><msup><mi>COO</mi><mo>−</mo></msup></math>/ethanoate ✔</p>
<div class="question_part_label">b(iii).</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="normal">a</mi></msub><mo>=</mo><mfrac><mrow><mfenced open="[" close="]"><mrow><msub><mi>CH</mi><mn>3</mn></msub><msup><mi>COO</mi><mo>-</mo></msup></mrow></mfenced><mfenced open="[" close="]"><mrow><msub><mi mathvariant="normal">H</mi><mn>3</mn></msub><msup><mi mathvariant="normal">O</mi><mo>+</mo></msup></mrow></mfenced></mrow><mfenced open="[" close="]"><mrow><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi></mrow></mfenced></mfrac></math></p>
<p>Accept <math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>H</mi><mo>+</mo></msup></math> instead of <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>H</mi><mn>3</mn></msub><msup><mi>O</mi><mo>+</mo></msup></math>.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msub><mi>K</mi><mi mathvariant="normal">a</mi></msub><mo>=</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>4</mn><mo>.</mo><mn>76</mn></mrow></msup><mo>=</mo><mn>1</mn><mo>.</mo><mn>7</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>5</mn></mrow></msup><mo>»</mo></math><br><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>«</mo><msub><mi>K</mi><mi mathvariant="normal">w</mi></msub><mo>=</mo><msub><mi>K</mi><mi mathvariant="normal">a</mi></msub><mo>·</mo><msub><mi>K</mi><mi mathvariant="normal">b</mi></msub><mo>=</mo><mn>1</mn><mo>.</mo><mn>0</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>14</mn></mrow></msup><mo>=</mo><mn>1</mn><mo>.</mo><mn>7</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>5</mn></mrow></msup><mo>×</mo><msub><mi>K</mi><mi mathvariant="normal">b</mi></msub><mo>»</mo></math><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><msub><mi mathvariant="normal">K</mi><mi mathvariant="normal">b</mi></msub><mo>=</mo><mo>»</mo><mn>5</mn><mo>.</mo><mn>8</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>10</mn></mrow></msup></math> ✔</p>
<p><em>Accept answers between <math xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">5</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">7</mn><mo mathvariant="italic">−</mo><mn mathvariant="italic">5</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">9</mn><mo mathvariant="italic">×</mo><msup><mn mathvariant="italic">10</mn><mrow><mo mathvariant="italic">−</mo><mn mathvariant="italic">10</mn></mrow></msup></math></em>.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi mathvariant="normal">n</mi><mo>(</mo><mi>KOH</mi><mo>)</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>02075</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup><mo>×</mo><mn>1</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><mo>»</mo><mn>0</mn><mo>.</mo><mn>0208</mn><mo> </mo><mo>«</mo><mi>mol</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi mathvariant="normal">n</mi><mo>(</mo><mi>KOH</mi><mo>)</mo><mo>=</mo><mi mathvariant="normal">n</mi><mo>(</mo><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi><mo>)</mo><mo>»</mo></math><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mo>[</mo><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi><mo>]</mo><mo>=</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>0208</mn><mo> </mo><mi>mol</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>02500</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup></mrow></mfrac><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>830</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><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>systematic «error» ✔</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfenced open="[" close="]"><mrow><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi></mrow></mfenced></math> would be higher ✔</p>
<p>actual <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfenced open="[" close="]"><mi>KOH</mi></mfenced></math> is lower «than the value in calculation»<br><em><strong>OR</strong></em><br>larger volume of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>KOH</mi></math> «solution» needed to neutralize the acid ✔</p>
<p><em>Accept <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>K</mi><mi>O</mi><mi>H</mi></math> partially neutralised by <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msub><mi>O</mi><mn>2</mn></msub></math> from air.</em></p>
<div class="question_part_label">f(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates could write a balanced neutralization equation.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Identifying species present at various points along a pH titration curve was one of the most poorly&nbsp;answered questions in the exam. Very few candidates realized there were two major species at point B&nbsp;even when they were able in general to realize that B was a buffer zone.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Almost all candidates could identify a suitable indicator to use in a titration of a weak acid with a&nbsp;strong base.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students could identify a buffer zone region in a titration but very few (50%) could coherently&nbsp;explain why.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Poorly answered with only 50% correctly writing a K<sub>a</sub> expression. The major error was in candidates&nbsp;trying to calculate a K<sub>a</sub> rather than write an expression for it.</p>
<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;">
<p>Like with other calculations in this exam, the majority of candidates could correctly determine a&nbsp;concentration from titration data.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>80% of candidates could identify the method used as a systematic error, with some stating human or&nbsp;random error.</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates identified that the systematic error would result in the concentration of the alkali&nbsp;being lowered but then failed to propagate this through to the effect on the concentration of the acid.</p>
<div class="question_part_label">f(ii).</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>&nbsp;</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>&nbsp;</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"> <br>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,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" 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">Explain the mechanism of the reaction between chloroethane and aqueous sodium hydroxide, <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>NaOH</mi><mo> </mo><mo>(</mo><mi>aq</mi><mo>)</mo></math>, using curly arrows to represent the movement of electron pairs.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(iii).</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.<br>Draw the structural formula of ethoxyethane</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">Deduce the number of signals and chemical shifts with splitting patterns in the <sup>1</sup>H NMR</span><span class="fontstyle0"> spectrum of ethoxyethane. Use section 27 of the data booklet.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(v).</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>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>CFC</mi></math>s produce chlorine radicals. Write two successive propagation steps to show how chlorine radicals catalyse the depletion of ozone.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">e(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><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><br>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><mmultiscripts><mrow></mrow><mprescripts></mprescripts><mn>37</mn></mmultiscripts></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><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><br>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 xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><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><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><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> C–Cl bond is weaker/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>324</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup></math> than C–H 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><img src="data:image/png;base64,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" width="529" height="155"></p>
<p>curly arrow going from lone pair/negative charge on <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">O</mi></math> in <sup>−</sup>OH to <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">C</mi></math> ✔</p>
<p>curly arrow showing <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Cl</mi></math> leaving ✔</p>
<p>representation of transition state showing negative charge, square brackets and partial bonds ✔</p>
<p> </p>
<p><em>Accept <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>O</mi><msup><mi>H</mi><mo mathvariant="italic">-</mo></msup></math> with or without the lone pair.</em></p>
<p><em>Do <strong>not</strong> accept curly arrows originating on <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>H</mi></math> in <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>O</mi><msup><mi>H</mi><mo>-</mo></msup></math>.</em></p>
<p><em>Accept curly arrows in the transition state.</em></p>
<p><em>Do <strong>not</strong> penalize if <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>H</mi><mi>O</mi></math> and <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><mi>l</mi></math> are not at 180°.</em></p>
<p><em>Do <strong>not</strong> award M3 if <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>O</mi><mi>H</mi><mo>-</mo><mi>C</mi></math> bond is represented.</em> </p>
<div class="question_part_label">d(iii).</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><br>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(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>2 «signals» ✔</p>
<p>0.9−1.0 <em><strong>AND</strong> </em>triplet ✔</p>
<p>3.3−3.7<em><strong> AND</strong></em> quartet ✔</p>
<p><em>Accept any values in the ranges.</em></p>
<p><em>Award <strong>[1]</strong> for two correct chemical shifts or two correct splitting patterns.</em></p>
<div class="question_part_label">d(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><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>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub><mo>+</mo><mi>Cl</mi><mo>·</mo><mo>→</mo><mi mathvariant="normal">O</mi><mn>2</mn><mo>+</mo><mi>ClO</mi><mo>·</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>ClO</mi><mo>·</mo><mo>+</mo><mi mathvariant="normal">O</mi><mo>·</mo><mo>→</mo><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo>+</mo><mi>Cl</mi><mo>·</mo></math><br><em><strong>OR</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>ClO</mi><mo>·</mo><mo>+</mo><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub><mo>→</mo><mi>Cl</mi><mo>·</mo><mo>+</mo><mn>2</mn><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math> ✔</p>
<p><em>Penalize missing/incorrect radical dot (∙) once only.</em></p>
<div class="question_part_label">e(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Well answered question with 90% of candidates correctly identifying the complete electron&nbsp;configuration for chlorine.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates could correctly explain the relative sizes of chlorine atom and chloride ion.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Fairly well answered though some candidates missed M2 for not recognizing the same number of&nbsp;shells affected.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>More than 80% could identify that the two peaks in the MS of chlorine are due to different isotopes.</p>
<div class="question_part_label">a(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Not well answered. Some candidates were able to identify m/z 74 being due to the m/z of two Cl-37&nbsp;atoms, however fewer candidates were able to explain the relative abundance of the isotope.</p>
<div class="question_part_label">a(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Stoichiometric calculations were generally well done and over 90% could calculate mol from a given&nbsp;mass.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>90% of candidates earned full marks on this 2-mark question involving finding a limiting reactant.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Surprisingly, quite a number of candidates struggled with the quantity of excess reactant despite&nbsp;correctly identifying limiting reactant previously.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates could find the volume of gas produced in a reaction under standard conditions.</p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>More than 90% could identify the oxidation number of manganese in both MnO<sub>2</sub> and MnCl<sub>2</sub>.</p>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates stated that MnO<sub>2</sub> is an oxidizing agent in the reaction but many did not get the&nbsp;mark because there was no reference to oxidation states.</p>
<div class="question_part_label">b(vi).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another well answered 1-mark question where candidates correctly identified a weak acid as an acid&nbsp;which partially dissociates in water.&nbsp;</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Roughly ⅓ of the candidates failed to identify the conjugate base, perhaps distracted by the fact it&nbsp;was not contained in the equation given.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Vast majority of candidates could calculate the concentration of H<sup>+</sup> (aq) in a HClO (aq) solution with&nbsp;a pH =3.61.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many identified the reaction of chlorine with ethane as free-radical substitution, or just substitution,&nbsp;with some erroneously stating nucleophilic or electrophilic substitution.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The underlying reasons for the relative reactivity of ethane and chloroethane were not very well&nbsp;known with a few giving erroneous reasons and some stating ethane more reactive.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few earned full marks for the curly arrow mechanism of the reaction between sodium hydroxide&nbsp;and chloroethane. Mistakes being careless curly arrow drawing, inappropriate –OH notation, curly arrows&nbsp;from the hydrogen or from the carbon to the C–Cl bond, or a method that missed the transition state.</p>
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Approximately 60% could draw ethoxyethane however many demonstrated little knowledge of&nbsp;structure of an ether molecule.</p>
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A poorly answered question with some getting full marks on this 1HNMR spectrum of ethoxyethane&nbsp;question. Very few could identify all 3 of number of signals, chemical shift, and splitting pattern.</p>
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another good example of candidates being well rehearsed in calculations with 90% earning 2/2 on&nbsp;this question of calculation percentage by mass composition.&nbsp;</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Somewhat disappointing answers on this question about how international cooperation has&nbsp;contributed to the lowering of CFC emissions. Many gave vague answers and some referred to carbon&nbsp;emissions and global warming.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few could construct the propagation equations showing how CFCs affect ozone, and many lost marks by failing to identify ClO· as a radical.</p>
<div class="question_part_label">e(iii).</div>
</div>
<br><hr><br><div class="specification">
<p>Limestone can be converted into a variety of useful commercial products through the lime cycle. Limestone contains high percentages of calcium carbonate, CaCO<sub>3</sub>.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" width="538" height="218"></p>
</div>

<div class="specification">
<p>Thermodynamic data for the decomposition of calcium carbonate is given.</p>
<p><img src="data:image/png;base64,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"></p>
</div>

<div class="specification">
<p>The second step of the lime cycle produces calcium hydroxide, Ca(OH)<sub>2</sub>.</p>
</div>

<div class="specification">
<p>Calcium hydroxide reacts with carbon dioxide to reform calcium carbonate.</p>
<p style="text-align: center;">Ca(OH)<sub>2 </sub>(aq) + CO<sub>2 </sub>(g) → CaCO<sub>3</sub> (s) + H<sub>2</sub>O (l)</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calcium carbonate is heated to produce calcium oxide, CaO.</p>
<p style="text-align:center;">CaCO<sub>3 </sub>(s) → CaO (s) + CO<sub>2 </sub>(g)</p>
<p>Calculate the volume of carbon dioxide produced at STP when 555 g of calcium carbonate decomposes. Use sections 2 and 6 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the enthalpy change of reaction, <em>ΔH</em>, in kJ, for the decomposition of calcium carbonate.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the change in entropy, Δ<em>S</em>, in J K<sup>−1</sup>, for the decomposition of calcium carbonate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the temperature, in K, at which the decomposition of calcium carbonate becomes spontaneous, using b(i), b(ii) and section 1 of the data booklet.</p>
<p>(If you do not have answers for b(i) and b(ii), use Δ<em>H</em> = 190 kJ and Δ<em>S</em> = 180 J K<sup>−1</sup>, but these are not the correct answers.)</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch an energy profile for the decomposition of calcium carbonate based on your answer to b(i), labelling the axes and activation energy, <em>E</em><sub>a</sub>.</p>
<p style="text-align:center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUkAAAFCCAYAAAB8TS9rAAAMe0lEQVR4Ae3aQWqVBxSGYXei4EKkmyjdQlyCXYFdgFmMc8eOHTt1muktf+EWKSa5CXyhefNcECW5HHOe8/NypX118iJAgACBWwVe3fod3yBAgACBk0h6CAgQIHCHgEjegeNbBAgQEEnPAAECBO4QeFQkb25uTscvLwIECNQFHhzJI45vX785vb+6Esr602E/AgQe9h9ujkAecTwi+dfHj0LpASJAIC/woE+S5zAekTwH8/rTdR7JggQIvFyBiyN5xPD8T+wjksdLKF/ug2NzAi9F4KJI/hzIA+YcyePPQvlSHhV7EniZAvdG8sePH/9+gjwT/RzJ42vHe/74/fd/fj+/x+8ECBAoCNwbyV8t+d9I/uo9vkaAAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgRmAiI5ozWYAIGCgEgWrmgHAgTuFPj8+fPp+tP1ne+57ZsieZuMrxMgkBH4/v376f3V1aNCKZKZx8AiBAjcJXBzc/OoUIrkXaq+R4BASuAcyj8/fDgdf77kJZKXKHkPAQIZgSOORySPf35fEspHR/Lt6zcnvxh4BjwDz/kZ+Pr1673xf1Qk753qDQQIEPifCnz79u3027t3py9fvlz0E4rkRUzeRIBAQeAI4/HJ99JAHjuLZOHydiBA4F6BI4zHJ8jjk+RDXiL5EC3vJUDgWQqcA3n8/5IPfYnkQ8W8nwCBZydwxPExgTwWFclnd24/MAECTykgkk+p7e8iQODZCYjkszuZH5gAgacUEMmn1PZ3ESDw7AT+Blr8tweMCM54AAAAAElFTkSuQmCC"></p>
<div class="marks">[3]</div>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State how adding a catalyst to the reaction would impact the enthalpy change of reaction, Δ<em>H</em>, and the activation energy, <em>E</em><sub>a</sub>.</p>
<p><img src="data:image/png;base64,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" width="679" height="174"></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Write the equation for the reaction of Ca(OH)<sub>2 </sub>(aq) with hydrochloric acid, HCl (aq).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the volume, in dm<sup>3</sup>, of 0.015 mol dm<sup>−3</sup> calcium hydroxide solution needed to neutralize 35.0 cm<sup>3</sup> of 0.025 mol dm<sup>−3</sup> HCl (aq).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Saturated calcium hydroxide solution is used to test for carbon dioxide. Calculate the pH of a 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> solution of calcium hydroxide, a strong base.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the mass, in g, of CaCO<sub>3 </sub>(s) produced by reacting 2.41 dm<sup>3</sup> of 2.33 × 10<sup>−2</sup> mol dm<sup>−3</sup> of Ca(OH)<sub>2</sub> (aq) with 0.750 dm<sup>3</sup> of CO<sub>2</sub> (g) at STP.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>2.85 g of CaCO<sub>3</sub> was collected in the experiment in d(i). Calculate the percentage yield of CaCO<sub>3</sub>.</p>
<p>(If you did not obtain an answer to d(i), use 4.00 g, but this is not the correct value.)</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how <strong>one</strong> calcium compound in the lime cycle can reduce a problem caused by acid deposition.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>CaCO3</sub> =&nbsp;<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>555</mn><mo> </mo><mi mathvariant="normal">g</mi></mrow><mrow><mn>11</mn><mo>.</mo><mn>09</mn><mo> </mo><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac></math>=» 5.55 «mol» ✓</p>
<p>«<em>V</em> = 5.55 mol × 22.7 dm<sup>3</sup> mol<sup>−1</sup> =» 126 «dm<sup>3</sup>» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept method using pV = nRT to obtain the volume with p as either 100 kPa (126 dm<sup>3</sup>) or 101.3 kPa (125 dm<sup>3</sup>).</em></p>
<p><em>Do not penalize use of 22.4 dm<sup>3</sup> mol<sup>–1</sup> to obtain the volume (124 dm<sup>3</sup>).</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>ΔH</em> =» (−635 «kJ» – 393.5 «kJ») – (−1207 «kJ») ✓</p>
<p>«<em>ΔH</em> = + » 179 «kJ» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award<strong> [1 max]</strong> for −179 kJ.</em></p>
<p><em>Ignore an extra step to determine total enthalpy change in kJ: 179 kJ mol<sup>-1</sup> x 5.55 mol = 993 kJ.</em></p>
<p><em>Award <strong>[2]</strong> for an answer in the range 990 - 993« kJ».</em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Δ<em>S</em> = (40 J K<sup>−1</sup> + 214 J K<sup>−1</sup>) − (93 J K<sup>−1</sup>) =» 161 «J K<sup>−1</sup>» ✓</p>
<p><em><br>Ignore an extra step to determine total entropy change in JK<sup>–1</sup>: 161 J mol<sup>–1</sup>K<sup>–1</sup> x 5.55 mol = 894 «J mol<sup>–1</sup>K<sup>–1</sup>»</em></p>
<p><em>Award <strong>[1]</strong> for 894 «J mol<sup>–1</sup>K<sup>–1</sup>».</em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«spontaneous» if Δ<em>G</em> = Δ<em>H</em> − <em>T</em>Δ<em>S</em> &lt; 0<br><em><strong>OR</strong></em><br>Δ<em>H</em> &lt; <em>T</em>Δ<em>S</em> ✓</p>
<p>«<em>T</em> &gt;<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mrow><mn>179</mn><mo> </mo><mi>kJ</mi></mrow><mrow><mn>0</mn><mo>.</mo><mn>16</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></mrow></mfrac></math>=» 1112 «K» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept “1056 K” if both of the incorrect values are used to solve the problem.</em></p>
<p><em>Do <strong>not</strong> award M2 for any negative T value.</em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>endothermic sketch ✓</p>
<p>x-axis labelled “extent of reaction/progress of reaction/reaction coordinate/reaction pathway” <em><strong>AND</strong> </em>y-axis labelled “potential energy/energy/enthalpy✓</p>
<p>activation energy/<em>E</em><sub>a</sub> ✓</p>
<p><img src="data:image/png;base64,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"></p>
<p><em><br>Do <strong>not</strong> accept “time” for x-axis.</em></p>
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Δ<em>H</em> same <em><strong>AND</strong> </em>lower <em>E</em><sub>a</sub> ✓</p>
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Ca(OH)<sub>2 </sub>(aq) + 2HCl (aq) → 2H<sub>2</sub>O (l) + CaCl<sub>2 </sub>(aq) ✓</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>HCl</sub> = 0.0350 dm<sup>3</sup> × 0.025 mol dm<sup>−3</sup> =» 0.00088 «mol»</p>
<p><em><strong>OR</strong></em><br><em>n</em><sub>Ca(OH)2</sub> =&nbsp;<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math> <em>n</em><sub>HCl</sub>/0.00044 «mol» ✓</p>
<p><br>«<em>V</em> =&nbsp;<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mstyle displaystyle="true"><mfrac><mn>1</mn><mn>2</mn></mfrac><mo>×</mo><mn>0</mn><mo>.</mo><mn>00088</mn><mo> </mo><mi>mol</mi></mstyle><mrow><mn>0</mn><mo>.</mo><mn>015</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup></mrow></mfrac></math> =» 0.029 «dm<sup>3</sup>» ✓</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1 max]</strong> for 0.058 «dm<sup>3</sup>».</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>Alternative 1:</strong></em></p>
<p>[OH<sup>−</sup>] = « 2 × 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> =» 0.0466 «mol dm<sup>−3</sup>» ✓</p>
<p>«[H<sup>+</sup>] =&nbsp;<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>1</mn><mo>.</mo><mn>00</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>14</mn></mrow></msup></mrow><mrow><mn>0</mn><mo>.</mo><mn>0466</mn></mrow></mfrac></math> = 2.15 × 10<sup>−13 </sup>mol dm<sup>−3</sup>»</p>
<p>pH = « −log (2.15 × 10−13) =» 12.668 ✓</p>
<p>&nbsp;</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>&nbsp;</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Award <strong>[1 max]</strong> for pH =12.367.</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<em>n</em><sub>Ca(OH)2</sub> = 2.41 dm<sup>3</sup> × 2.33 × 10<sup>−2 </sup>mol dm<sup>−3</sup> =» 0.0562 «mol» <em><strong>AND</strong></em></p>
<p>«<em>n</em><sub>CO2</sub> =<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>750</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup></mrow><mrow><mn>22</mn><mo>.</mo><mn>7</mn><mo> </mo><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup></mrow></mfrac></math>=» 0.0330 «mol» ✓</p>
<p>«CO<sub>2</sub> is the limiting reactant»</p>
<p>«<em>m</em><sub>CaCO3</sub> = 0.0330 mol × 100.09 g mol<sup>−1</sup> =» 3.30 «g» ✓</p>
<p>&nbsp;</p>
<p><em>Only award ECF for M2 if limiting reagent is used.</em></p>
<p><em>Accept answers in the range 3.30 - 3.35 «g».</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>2</mn><mo>.</mo><mn>85</mn></mrow><mrow><mn>3</mn><mo>.</mo><mn>30</mn></mrow></mfrac></math> ×&nbsp;100 =» 86.4 «%» ✓</p>
<p>&nbsp;</p>
<p><em>Accept answers in the range 86.1-86.4 «%».</em></p>
<p><em>Accept “71.3 %” for using the incorrect given value of 4.00 g.</em></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«add» Ca(OH)<sub>2</sub>/CaCO<sub>3</sub>/CaO <em><strong>AND</strong> </em>to «acidic» water/river/lake/soil<br><em><strong>OR</strong></em><br>«use» Ca(OH)<sub>2</sub>/CaCO<sub>3</sub>/CaO in scrubbers «to prevent release of acidic pollution» ✓</p>
<p>&nbsp;</p>
<p><em>Accept any correct name for any of the calcium compounds listed.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Limescale, CaCO<sub>3</sub>(s), can be removed from water kettles by using vinegar, a dilute solution of ethanoic acid, CH<sub>3</sub>COOH(aq).</p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict, giving a reason, a difference between the reactions of the same concentrations of hydrochloric acid and ethanoic acid with samples of calcium carbonate.</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>Dissolved carbon dioxide causes unpolluted rain to have a pH of approximately 5, but other dissolved gases can result in a much lower pH. State one environmental effect of acid rain.</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>Write an equation to show ammonia, NH<sub>3</sub>, acting as a Brønsted–Lowry base and a different equation to show it acting as a Lewis base.</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">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the pH of 0.010 mol dm<sup>−3</sup> 2,2-dimethylpropanoic acid solution.</p>
<p><em>K</em><sub>a</sub> (2,2-dimethylpropanoic acid) = 9.333 × 10<sup>−6</sup></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>Explain, using appropriate equations, how a suitably concentrated solution formed by the partial neutralization of 2,2-dimethylpropanoic acid with sodium hydroxide acts as a buffer solution.</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>slower rate with ethanoic acid</p>
<p><strong><em>OR</em></strong></p>
<p>smaller temperature rise with ethanoic acid</p>
<p> </p>
<p>[H<sup>+</sup>] lower</p>
<p><strong><em>OR</em></strong></p>
<p>ethanoic acid is weak</p>
<p><strong><em>OR</em></strong></p>
<p>ethanoic acid is partially dissociated</p>
<p> </p>
<p><em>Accept experimental observations such </em><em>as “slower bubbling” or “feels less </em><em>warm”.</em></p>
<p> </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><em>Any one of:</em></p>
<p>corrosion of materials/metals/carbonate materials</p>
<p>destruction of plant/aquatic life</p>
<p><strong>«</strong>indirect<strong>» </strong>effect on human health</p>
<p> </p>
<p><em>Accept “lowering pH of </em><em>oceans/lakes/waterways”.</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><em>Brønsted–Lowry base:</em></p>
<p>NH<sub>3</sub> + H<sup>+</sup> → NH<sub>4</sub><sup>+</sup></p>
<p><em>Lewis base:</em></p>
<p>NH<sub>3</sub> + BF<sub>3</sub> → H<sub>3</sub>NBF<sub>3</sub></p>
<p> </p>
<p><em>Accept “AlCl</em><sub><em>3 </em></sub><em>as an example of Lewis </em><em>acid”.</em></p>
<p><em>Accept other valid equations such as </em><em>Cu</em><sup><em>2+</em></sup><em> +</em><em> </em><em>4NH</em><sub><em>3 </em></sub><em>→ </em><em>[Cu(NH</em><sub><em>3</em></sub><em>)</em><sub><em>4</em></sub><em>]</em><sup><em>2</em><em>+</em></sup><em>.</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>[H<sup>+</sup>] <strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \sqrt {{{\text{K}}_{\text{a}}} \times \left[ {{{\text{C}}_5}{{\text{H}}_{10}}{{\text{O}}_2}} \right]}  = \sqrt {9.333 \times {{10}^{ - 6}} \times 0.010} {\text{ }}">
  <mo>=</mo>
  <msqrt>
    <mrow>
      <msub>
        <mrow>
          <mtext>K</mtext>
        </mrow>
        <mrow>
          <mtext>a</mtext>
        </mrow>
      </msub>
    </mrow>
    <mo>×</mo>
    <mrow>
      <mo>[</mo>
      <mrow>
        <mrow>
          <msub>
            <mrow>
              <mtext>C</mtext>
            </mrow>
            <mn>5</mn>
          </msub>
        </mrow>
        <mrow>
          <msub>
            <mrow>
              <mtext>H</mtext>
            </mrow>
            <mrow>
              <mn>10</mn>
            </mrow>
          </msub>
        </mrow>
        <mrow>
          <msub>
            <mrow>
              <mtext>O</mtext>
            </mrow>
            <mn>2</mn>
          </msub>
        </mrow>
      </mrow>
      <mo>]</mo>
    </mrow>
  </msqrt>
  <mo>=</mo>
  <msqrt>
    <mn>9.333</mn>
    <mo>×</mo>
    <mrow>
      <msup>
        <mrow>
          <mn>10</mn>
        </mrow>
        <mrow>
          <mo>−</mo>
          <mn>6</mn>
        </mrow>
      </msup>
    </mrow>
    <mo>×</mo>
    <mn>0.010</mn>
  </msqrt>
  <mrow>
    <mtext> </mtext>
  </mrow>
</math></span><strong>» </strong>= 3.055 × 10<sup>–4</sup> <strong>«</strong>mol dm<sup>–3</sup><strong>»</strong></p>
<p><strong>«</strong>pH =<strong>» </strong>3.51</p>
<p> </p>
<p><em>Accept “pH =</em><em> </em><em>3.52”.</em></p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Accept other calculation methods.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(CH<sub>3</sub>)<sub>3</sub>CCOOH(aq) + OH<sup>–</sup>(aq) → (CH<sub>3</sub>)<sub>3</sub>CCOO<sup>–</sup>(aq) + H<sub>2</sub>O(l)</p>
<p><strong><em>OR</em></strong></p>
<p>(CH<sub>3</sub>)<sub>3</sub>CCOOH(aq) + OH<sup>–</sup>(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>)<sub>3</sub>CCOO<sup>–</sup>(aq) + H<sub>2</sub>O(l) <strong><em>AND </em></strong>addition of alkali causes equilibrium to move to right</p>
<p> </p>
<p>(CH<sub>3</sub>)<sub>3</sub>CCOO<sup>–</sup>(aq) + H<sup>+</sup>(aq) → (CH<sub>3</sub>)<sub>3</sub>CCOOH(aq)</p>
<p><strong><em>OR</em></strong></p>
<p>(CH<sub>3</sub>)<sub>3</sub>CCOO<sup>–</sup>(aq) + H<sup>+</sup>(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>)<sub>3</sub>CCOOH(aq) <strong><em>AND </em></strong>addition of acid causes equilibrium to move to right</p>
<p> </p>
<p><em>Accept “HA” for the acid.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for correct explanations </em><em>of buffering with addition of acid </em><strong><em>AND</em></strong><em> base </em><strong><em>without </em></strong><em>equilibrium equations.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Both vinegar (a dilute aqueous solution of ethanoic acid) and bleach are used as cleaning agents.</span></p>
</div>

<div class="specification">
<p><span style="background-color: #ffffff;">Bleach reacts with ammonia, also used as a cleaning agent, to produce the poisonous compound chloramine, NH<sub>2</sub>Cl.</span></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Outline why ethanoic acid is classified as a weak acid.</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;">A solution of bleach can be made by reacting chlorine gas with a sodium hydroxide solution.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">Cl<sub>2</sub> (g) + 2NaOH (aq) ⇌ NaOCl (aq) + NaCl (aq) + H<sub>2</sub>O (l)</span></p>
<p><span style="background-color: #ffffff;">Suggest, with reference to Le Châtelier’s principle, why it is dangerous to mix vinegar </span><span style="background-color: #ffffff;">and bleach together as cleaners.</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;">Draw a Lewis (electron dot) structure of chloramine.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the hybridization of the nitrogen atom in chloramine.</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;">Deduce the molecular geometry of chloramine and estimate its H–N–H bond angle.</span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Molecular geometry:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">H–N–H bond angle:</span></span></span></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><span style="background-color: #ffffff;">State the type of bond formed when chloramine is protonated.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Sketch a graph of pH against volume of hydrochloric acid added to ammonia solution, showing how you would determine the pK<sub>a</sub> of the ammonium ion.</span></p>
<p><img src="images/5di.PNG" alt width="478" height="387"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest a suitable indicator for the titration, using section 22 of the data booklet.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain, using <strong>two</strong> equations, how an equimolar solution of ammonia and ammonium ions acts as a buffer solution when small amounts of acid or base are added.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">partial dissociation «in aqueous solution»    <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;">ethanoic acid/vinegar reacts with NaOH    <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">moves equilibrium to left/reactant side    <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">releases Cl<sub>2</sub> (g)/chlorine <span style="text-decoration: underline;">gas</span><br><em><strong>OR</strong></em><br>Cl<sub>2</sub> (g)/chlorine <span style="text-decoration: underline;">gas</span> is toxic    <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “ethanoic acid produces H<sup>+</sup> ions”</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “ethanoic acid/vinegar reacts with NaOCl”.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “2CH<sub>3</sub>COOH + NaOCl + NaCl → 2CH<sub>3</sub>COONa + Cl<sub>2</sub> + H<sub>2</sub>O” as it does not refer to equilibrium.</span></em></p>
<p><em><span style="background-color: #ffffff;">Accept suitable molecular or ionic equations for M1 and M3.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/5ci.PNG" alt width="133" height="101">     <strong>[<span style="background-color: #ffffff;">✔]</span></strong></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept any combination of dots/crosses or lines to represent electron pairs.</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;">sp<sup>3</sup>    <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;"><em>Molecular geometry</em>:<br>«trigonal» pyramidal   <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em>H–N–H bond angle</em>:<br>107°    <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept angles in the range of 100–109.</span></em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>covalent/dative/coordinate    <strong>[✔]</strong></p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/5di_m.PNG" alt width="424" height="298"></p>
<p><span style="background-color: #ffffff;">correct shape of graph <em><strong>AND</strong> </em>vertical drop at Vn    <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">pK<sub>a</sub> = pH at <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{Vn}}}}{2}">
  <mfrac>
    <mrow>
      <mrow>
        <mtext>Vn</mtext>
      </mrow>
    </mrow>
    <mn>2</mn>
  </mfrac>
</math></span>/half neutralization/half equivalence    <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="font-size: 14px;"><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></span></span><span style="background-color: #ffffff;">M1: must show buffer region at pH &gt; 7 and equivalence point at pH &lt; 7. Graph must start below pH = 14.</span></em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methyl orange<br><em><strong>OR</strong></em><br>bromophenol blue<br><em><strong>OR</strong></em><br>bromocresol green<br><em><strong>OR</strong></em><br>methyl red    <strong>[✔]</strong></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">NH<sub>3</sub> (aq) + H<sup>+</sup> (aq) → NH<sub>4</sub> + (aq)    <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">NH<sub>4</sub> + (aq) + OH<sup>−</sup> (aq) → NH<sub>3</sub> (aq) + H<sub>2</sub>O(l)    <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note: </strong>Accept reaction arrows or equilibrium signs in both equations.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[1 max]</strong>, based on two correct reverse equations but not clearly showing reacting with acid or base but rather dissociation.</span></em></p>
<div class="question_part_label">d(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Majority of candidates understood weak acids do not fully dissociate.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The average score was 1 out 3. Many could not suggest why it is dangerous to mix chlorine with vinegar. Most students gained at least one mark for stating that “chlorine gas will be produced” but couldn’t link it to equilibrium ideas.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly drew the Lewis structure of chloramine. Some left off lone pair electrons.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mostly correct with a surprising number stating sp or sp<sup>2</sup> hybridization.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally well done with some candidates misinterpreting the bond angle from the stated geometry.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>“Ionic bond”, “hydrogen bond” and “intermolecular forces” were some common answers.</p>
<div class="question_part_label">c(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Quite poorly done with many candidates not indicating a vertical drop but rather a weak acid/weak base curve. Some did not have the correct location for the equivalence point.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally well done although a number of candidates chose bromothymol blue as a suitable indicator for weak base with a strong acid.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Nearly 30 % of candidates did not attempt to answer this question about buffer equations. It was also poorly answered because equations were not used to explain buffer action or the dissociation equations for the base and acid were given rather than their reactions with H<sup>+</sup> or OH<sup>-</sup> .</p>
<div class="question_part_label">d(iii).</div>
</div>
<br><hr><br><div class="specification">
<p>Ammonia is soluble in water and forms an alkaline solution:</p>
<p style="text-align: center;">NH<sub>3&thinsp;</sub>(g) + H<sub>2</sub>O&thinsp;(l) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>&#8652;</mo></math> NH<sub>4</sub><sup>+&thinsp;</sup>(aq) + HO<sup>&ndash;&thinsp;</sup>(aq)</p>
</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">a.</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">b.</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">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the concentration, in mol dm<sup>–3</sup>, of ammonia molecules in the solution with pH = 9.3. Use section 21 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>An aqueous solution containing high concentrations of both NH<sub>3</sub> and NH<sub>4</sub><sup>+</sup> acts as an acid-base buffer solution as a result of the equilibrium:</p>
<p style="text-align:center;">NH<sub>3</sub> (aq) + H<sup>+</sup> (aq) <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>⇌</mo></math> NH<sub>4</sub><sup>+</sup> (aq)</p>
<p>Referring to this equilibrium, outline why adding a small volume of strong acid would leave the pH of the buffer solution almost unchanged.</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>Magnesium salts form slightly acidic solutions owing to equilibria such as:</p>
<p style="text-align:center;">Mg<sup>2+ </sup>(aq) + H<sub>2</sub>O (l) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> Mg(OH)<sup>+ </sup>(aq) + H<sup>+ </sup>(aq)</p>
<p>Comment on the role of Mg<sup>2+</sup> in forming the Mg(OH)<sup>+</sup> ion, in acid-base terms.</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>Mg(OH)<sup>+</sup> is a complex ion, but Mg is not regarded as a transition metal. Contrast Mg with manganese, Mn, in terms of one characteristic chemical property of transition metals, other than complex ion formation.</p>
<p><img src="data:image/png;base64,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"></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="text-decoration:underline;">conjugate</span> «acid and base» ✔</p>
<div class="question_part_label">a.</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 xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><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">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>[</mo><msup><mi>OH</mi><mo>−</mo></msup><mo>]</mo><mo> </mo><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><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">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>K</mi><mi>b</mi></msub><mo>=</mo><mfrac><mrow><mfenced open="[" close="]"><mrow><mi>N</mi><msubsup><mi>H</mi><mn>4</mn><mo>+</mo></msubsup></mrow></mfenced><mfenced open="[" close="]"><mrow><mi>O</mi><msup><mi>H</mi><mo>-</mo></msup></mrow></mfenced></mrow><mfenced open="[" close="]"><mrow><mi>N</mi><msub><mi>H</mi><mn>3</mn></msub></mrow></mfenced></mfrac><mo>/</mo><mfrac><mrow><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>7</mn></mrow></msup><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>7</mn></mrow></msup></mrow><mfenced open="[" close="]"><mrow><mi>N</mi><msub><mi>H</mi><mn>3</mn></msub></mrow></mfenced></mfrac><mo>⟨</mo><mo>⟨</mo><mo>=</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>75</mn></mrow></msup><mo>⟩</mo><mo>⟩</mo></math> ✔</p>
<p><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mfenced open="[" close="]"><msub><mi>NH</mi><mn>3</mn></msub></mfenced><mo>=</mo><mo>⟨</mo><mo>⟨</mo><mo>=</mo><mfrac><msup><mn>10</mn><mrow><mo>-</mo><mn>9</mn><mo>.</mo><mn>4</mn></mrow></msup><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>75</mn></mrow></msup></mfrac><mo>=</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>4</mn><mo>.</mo><mn>65</mn></mrow></msup><mo>⟩</mo><mo>⟩</mo><mo>=</mo><mn>2</mn><mo>.</mo><mn>24</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>-</mo><mn>5</mn></mrow></msup><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>Accept other methods of carrying out the calculation.</em></p>
<p><em>Award <strong>[2]</strong> for correct answer.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>equilibrium shifts to right/H<sup>+</sup> reacts with NH<sub>3</sub> ✔</p>
<p>«as large excess» ratio [NH<sub>3</sub>]:[NH<sub>4</sub><sup>+</sup>] «and hence pH» almost unchanged ✔</p>
<p> </p>
<p><em>Accept “strong acid/H<sup>+</sup> converted to a weak acid/NH<sub>4</sub><sup>+</sup> «and hence pH almost unchanged».</em></p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Lewis acid ✔</p>
<p>accepts «a lone» electron pair «from the hydroxide ion» ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> accept electron acceptor without mention of electron pair.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1</strong></em></p>
<p><em>Property</em>: variable oxidation state ✔</p>
<p><em>Comparison</em>: Mn compounds can exist in different valencies/oxidation states <em><strong>AND</strong> </em>Mg has a valency/oxidation state of +2 in all its compounds ✔</p>
<p><em><br>Accept valency.</em><br><em>Accept for second statement “Mg «always» has the same oxidation state”.</em></p>
<p> </p>
<p><em><strong>ALTERNATIVE 2</strong></em></p>
<p><em>Property</em>: coloured ions/compounds/complexes ✔</p>
<p><em>Comparison</em>: Mn ions/compounds/complexes coloured <em><strong>AND</strong> </em>Mg ions/compounds white/«as solids»/colourless «in aqueous solution» ✔</p>
<p><em><br>Accept Mn forms coloured ions/compounds/complexes and Mg does not.</em></p>
<p> </p>
<p><em><strong>ALTERNATIVE 3</strong></em></p>
<p><em>Property:</em> catalytic activity ✔</p>
<p><em>Comparison:</em> «many» Mn compounds act as catalysts <em><strong>AND</strong> </em>Mg compounds do not «generally» catalyse reactions ✔<br><br><em><br>For any property accept a correct specific example, for example manganate(VII) is purple.</em><br><em>Do <strong>not</strong> accept differences in atomic structure, such as partially filled d sub-levels, but award ECF for a correct discussion.</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>Well done; However, instead of identifying the conjugate acid-base relationship, some simply identified these as Brønsted–Lowry base and acid.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Good performance. Some teachers suggested the question had an error in units, but this was not the case. The question had to be solved, first by using the data provided for application of gas law to determine the number of moles of gas. Next, given volume of solution, <em>V</em> = 2.00 dm<sup>3</sup>, determine its concentration.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Concentration of [OH<sup>˗</sup>] was asked for but some calculated [H<sub>3</sub>O<sup>+</sup>] instead. On the whole, question was done well.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance. Since a mark was given for the <em>K</em><sub>b</sub> expression, that mark could also be scored for the Henderson Hasselbalch (HH) equation, provided it is specific to the equilibrium reaction. Unfortunately, there was poor understanding of the application of the equation in most cases. Students should be strongly encouraged to use the HH equation only when a buffer is involved. Appropriate <em>K</em><sub>a</sub> or <em>K</em><sub>b</sub> expressions should be used when buffer solutions are not involved.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance. One mark was scored for suggesting equilibrium shifts to right or H<sup>+</sup> reacts with NH<sub>3</sub>. However, some made reference to ammonia being a strong base or no reference to the strong acid, H<sup>+</sup> being converted to a weak acid, NH<sub>4</sub><sup>+</sup>.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Mediocre performance; although some Mg<sup>2+</sup> was identified as a Lewis acid, the reasoning given was that it accepts an electron, rather than an electron pair or references were made to Bronsted-Lowry theory.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>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>Sketch the first eight successive ionisation energies of sulfur.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="480" height="394"></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>Describe the bonding in this type of solid.</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>State a technique that could be used to determine the crystal structure of the solid compound.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the full electron configuration of the sulfide ion.</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>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">d(iv).</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">d(v).</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">e(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">e(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">e(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">f.</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><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="465" height="378"></p>
<p>two regions of small increases <em><strong>AND</strong> </em>a large increase between them✔</p>
<p>large increase from 6th to 7th ✔</p>
<p><em><br>Accept line/curve showing these trends.</em></p>
<div class="question_part_label">c.</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">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>X-ray crystallography ✔</p>
<div class="question_part_label">d(ii).</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">d(iii).</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">d(iv).</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">d(v).</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">e(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">e(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">e(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">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(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(iv).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d(v).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<br><hr><br>