File "markSceme-HL-paper3.html"

Path: /IB QUESTIONBANKS/5 Fifth Edition - PAPER/HTML/Chemistry/Topic 5/markSceme-HL-paper3html
File size: 150.93 KB
MIME-type: text/html
Charset: utf-8

<!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 3</h2><div class="specification">
<p><span style="background-color: #ffffff;">Powdered zinc was reacted with 25.00 cm<sup>3</sup> of 1.000 mol dm<sup>−3</sup> copper(II) sulfate solution in an insulated beaker. Temperature was plotted against time.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="531" height="452"></span></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Estimate the time at which the powdered zinc was placed in the beaker.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State what point <strong>Y</strong> on the graph represents.</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 maximum temperature used to calculate the enthalpy of reaction was chosen at a point on the extrapolated (dotted) line.</span></p>
<p><span style="background-color: #ffffff;">State the maximum temperature which should be used and outline <strong>one</strong> assumption made in choosing this temperature on the extrapolated line.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Maximum temperature:</span></p>
<p>Assumption:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">To determine the enthalpy of reaction the experiment was carried out five times. The same volume and concentration of copper(II) sulfate was used but the mass of zinc was different each time. Suggest, with a reason, if zinc or copper(II) sulfate should be in excess for each trial.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The formula <em>q = mcΔT</em> was used to calculate the energy released. The values used in the calculation were <em>m</em> = 25.00 g, <em>c</em> = 4.18 J g<sup>−1</sup> K<sup>−1</sup>.</span></p>
<p><span style="background-color: #ffffff;">State an assumption made when using these values for <em>m</em> and <em>c</em>.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="697" height="255"></span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Predict, giving a reason, how the final enthalpy of reaction calculated from this experiment would compare with the theoretical value.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">100 «s»     <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept 90 to 100 s.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">highest recorded temperature<br><em><strong>OR</strong></em><br>when rate of heat production equals rate of heat loss    <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;"><em>Maximum temperature:</em><br>73 «°C»     <strong>[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;"><em>Assumption</em>:<br></span><span style="background-color: #ffffff;">«temperature reached if» reaction instantaneous<br></span><span style="background-color: #ffffff;"><em><strong>OR<br></strong></em></span><span style="background-color: #ffffff;">«temperature reached if reaction occurred» without heat loss      <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept “rate of heat loss is constant” <strong>OR</strong> “rate of temperature decrease is constant”.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>copper(II) sulfate <em><strong>AND</strong> </em>mass/amount of zinc is independent variable/being changed<br><em><strong>OR</strong></em><br>copper(II) sulfate <em><strong>AND</strong> </em>with zinc in excess there is no independent variable «as amount of copper(II) sulfate is fixed»   <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">copper(II) sulfate <em><strong>AND</strong> </em>having excess zinc will not yield different results in each trial    <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">zinc <em><strong>AND</strong> </em>results can be used to see if amount of zinc affects temperature rise «so this can be allowed for» <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><span style="background-color: #ffffff;">zinc <em><strong>AND</strong> </em>reduces variables/keeps the amount reacting constant <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">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="584" height="322"></p>
<p> </p>
<p><em><strong>Note:</strong> <span style="background-color: #ffffff;">Accept “copper(II) sulfate/zinc sulfate” for “solution”.</span></em></p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">lower/less exothermic/less negative <em><strong>AND</strong> </em>heat loss/some heat not accounted for<br><em><strong>OR</strong></em><br>lower/less exothermic/less negative <em><strong>AND</strong> </em>mass of reaction mixture greater than 25.00 g<br><em><strong>OR</strong></em><br>greater/more exothermic/more negative <em><strong>AND</strong> </em>specific heat of solution less than water   <strong> [✔]</strong></span></p>
<div class="question_part_label">b(iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Nearly everyone correctly estimated 100s as the time when powdered zinc was added to the beaker.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most scored the mark in for stating that point Y either indicated the maximum temperature or the end of the reaction.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Stating the maximum temperature that should be used in calculations was less well answered, with answers between 63 and 65, or 78 commonly given instead of the correct answer of 73°C. Most candidates managed to score the second mark for stating “no heat loss”.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates struggled to explain their choice of which reagent should be in excess. This question proved quite difficult with many candidates seeming to confuse independent and dependent variables.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Explaining the assumptions made when using values for m and c was challenging in. Many referred to the accuracy of the data when using m = 25.00g or said that no mass was lost during the reaction. Most knew that the value of c used was for water and suggested that the water was pure, but did not say that the specific heat of solution was assumed to be the same as that of water.</p>
<div class="question_part_label">b(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most scored a mark for predicting how the calculated enthalpy value would compare with the theoretical value.</p>
<div class="question_part_label">b(iv).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Red supergiant stars contain carbon-12 formed by the fusion of helium-4 nuclei with beryllium-8 nuclei.</span></p>
<p><span style="background-color: #ffffff;">Mass of a helium-4 nucleus = 4.002602 amu<br>Mass of a beryllium-8 nucleus = 8.005305 amu<br>Mass of a carbon-12 nucleus = 12.000000 amu</span></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the nuclear equation for the fusion reaction.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Explain why fusion is an exothermic process.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the heat energy released, in J, by the fusion reaction producing one atom of carbon-12. Use section 2 of the data booklet and <em>E = mc<sup>2</sup></em>.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Beryllium-8 is a radioactive isotope with a half-life of 6.70 × 10<sup>−17</sup> s.</span></p>
<p><span style="background-color: #ffffff;">Calculate the mass of beryllium-8 remaining after 2.01 × 10<sup>−16</sup> s from a sample initially containing 4.00 g of beryllium-8.</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;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_2^4{\text{He  +  }}{}_4^8{\text{Be}} \to {}_6^{12}{\text{C}}"> <msubsup> <mrow> </mrow> <mn>2</mn> <mn>4</mn> </msubsup> <mrow> <mtext>He  + </mtext> </mrow> <msubsup> <mrow> </mrow> <mn>4</mn> <mn>8</mn> </msubsup> <mrow> <mtext>Be</mtext> </mrow> <mo stretchy="false">→</mo> <msubsup> <mrow> </mrow> <mn>6</mn> <mrow> <mn>12</mn> </mrow> </msubsup> <mrow> <mtext>C</mtext> </mrow> </math></span>✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Do <strong>not</strong> penalize missing atomic numbers.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>binding energy per nucleon is larger in carbon-12/product «than beryllium-8 and helium-4/reactants» ✔<br></span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">difference in «total» binding energy is released «during fusion» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br>mass of carbon-12/product «nucleus» is less than «the sum of» the masses of helium-4 and beryllium-8 «nuclei»/reactants<br><em><strong>OR</strong></em><br>two smaller nuclei form a lager nucleus ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">mass lost/difference is converted to energy «and released»<br><em><strong>OR</strong></em><br><em>E = mc<sup>2</sup></em> ✔</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;">Δ<em>m</em> = «12.000000 amu − (4.002602 amu + 8.005305 amu) =» −0.007907 «amu» ✔<br>«0.007907 amu × 1.66 × 10<sup>−27</sup> kg amu<sup>−1</sup> =» 1.31 × 10<sup>−29</sup> «kg» ✔<br>«<em>E = mc<sup>2</sup></em> = 1.31 × 10<sup>−29</sup> kg × (3.00 × 108 m s<sup>−1</sup>)<sup>2</sup> =» 1.18 × 10<sup>−12</sup> «J» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><em><span style="background-color: #ffffff;"> NOTE: Accept “0.007907 «amu»”.<br>Award<strong> [2 max]</strong> for “7.12 x 10<sup>14</sup> «J»”.<br>Award<strong> [3]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>3 half-lives ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="m = 4.00{\left( {\frac{1}{2}} \right)^{\frac{{2.01 \times {{10}^{ - 16}}}}{{6.70 \times {{10}^{ - 17}}}}}}"> <mi>m</mi> <mo>=</mo> <mn>4.00</mn> <mrow> <msup> <mrow> <mo>(</mo> <mrow> <mfrac> <mn>1</mn> <mn>2</mn> </mfrac> </mrow> <mo>)</mo> </mrow> <mrow> <mfrac> <mrow> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </mrow> </msup> </mrow> </math></span> ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 3</strong></em><br><em>λ</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\ln 2}}{{6.70 \times {{10}^{ - 17}}}}"> <mfrac> <mrow> <mi>ln</mi> <mo>⁡</mo> <mn>2</mn> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </math></span> »= 1.03 × 10<sup>16</sup> «s<sup>−1</sup>» ✔<br><em>m</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="4.00{\text{ }}{{\text{e}}^{ - 1.03 \times {{10}^{16}} \times 2.01 \times {{10}^{ - 16}}}}{\text{ =  }}"> <mn>4.00</mn> <mrow> <mtext> </mtext> </mrow> <mrow> <msup> <mrow> <mtext>e</mtext> </mrow> <mrow> <mo>−</mo> <mn>1.03</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mn>16</mn> </mrow> </msup> </mrow> <mo>×</mo> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> </msup> </mrow> <mrow> <mtext> = </mtext> </mrow> </math></span> » 0.500 «g» ✔</span></p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"> </p>
<p style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;"><em><span style="background-color: #ffffff;"> NOTE: Award<strong> [2]</strong> for correct final answer.</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">b.</div>
</div>
<br><hr><br>