File "markSceme-SL-paper1.html"

Path: /IB QUESTIONBANKS/5 Fifth Edition - PAPER/HTML/Chemistry/Topic 4/markSceme-SL-paper1html
File size: 424.63 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>SL Paper 1</h2><div class="question">
<p><span class="fontstyle0">Which series shows the correct order of metallic bond strength from strongest to weakest?</span></p>
<p>A.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Na</mi><mo>&gt;</mo><mi mathvariant="normal">K</mi><mo>&gt;</mo><mi>Rb</mi><mo>&gt;</mo><mi>Mg</mi></math></p>
<p>B.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Mg</mi><mo>&gt;</mo><mi>Rb</mi><mo>&gt;</mo><mi mathvariant="normal">K</mi><mo>&gt;</mo><mi>Na</mi></math></p>
<p>C.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Rb</mi><mo>&gt;</mo><mi mathvariant="normal">K</mi><mo>&gt;</mo><mi>Na</mi><mo>&gt;</mo><mi>Mg</mi></math></p>
<p>D.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Mg</mi><mo>&gt;</mo><mi>Na</mi><mo>&gt;</mo><mi mathvariant="normal">K</mi><mo>&gt;</mo><mi>Rb</mi></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>A small majority of candidates could identify the relative strength of metallic bonding amongst group 1&nbsp;and 2 metals.</p>
</div>
<br><hr><br><div class="question">
<p>What is the formula of the compound formed from Ca<sup>2+</sup> and PO<sub>4</sub><sup>3−</sup>?</p>
<p>A.&nbsp; CaPO<sub>4</sub></p>
<p>B.&nbsp; Ca<sub>3</sub>(PO<sub>4</sub>)<sub>2</sub></p>
<p>C.&nbsp; Ca<sub>2</sub>(PO<sub>4</sub>)<sub>3</sub></p>
<p>D.&nbsp; Ca(PO<sub>4</sub>)<sub>2</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which compound contains both ionic and covalent bonds?</p>
<p><br>A.  CH<sub>3</sub>COONa</p>
<p>B.  CH<sub>3</sub>COOH</p>
<p>C.  K<sub>2</sub>O</p>
<p>D.  CaCl<sub>2</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the formula of magnesium nitride?</p>
<p>A.     MgN</p>
<p>B.     Mg<sub>2</sub>N<sub>3</sub></p>
<p>C.     Mg<sub>3</sub>N</p>
<p>D.     Mg<sub>3</sub>N<sub>2</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which compound has the shortest C to O bond?</span></p>
<p><span style="background-color: #ffffff;">A.  CH<sub>3</sub>CHO<br></span></p>
<p><span style="background-color: #ffffff;">B.  CO<br></span></p>
<p><span style="background-color: #ffffff;">C.  CO<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">D.  C<sub>2</sub>H<sub>5</sub>OC<sub>2</sub>H<sub>5</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A substance has the following properties:</p>
<p><img src="data:image/png;base64,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"></p>
<p>What is the most probable structure of this substance?</p>
<p>A.     Network covalent</p>
<p>B.     Polar covalent molecule</p>
<p>C.     Ionic lattice</p>
<p>D.     Metallic lattice</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which molecule has the <strong>weakest</strong> nitrogen to nitrogen bond?</p>
<p><br>A.  N<sub>2</sub></p>
<p>B.  N<sub>2</sub>H<sub>2</sub></p>
<p>C.  N<sub>2</sub>H<sub>4</sub></p>
<p>D.  <img src="data:image/png;base64,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" width="149" height="86"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A compound consists of the ions Ca<sup>2+</sup> and PO<sub>4</sub><sup>3–</sup>. What are the name and formula of the compound?</p>
<p> <img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which combination corresponds to a strong metallic bond?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="428" height="204"></span></p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>The concept of charge and ionic radii size on the strength of the bond was answered well, but had the lowest discriminatory index on the paper.</p>
</div>
<br><hr><br><div class="question">
<p>Which compound has the shortest C–N bond?</p>
<p>A. CH<sub>3</sub>NH<sub>2</sub></p>
<p>B. (CH<sub>3</sub>)<sub>3</sub>CNH<sub>2</sub></p>
<p>C. CH<sub>3</sub>CN</p>
<p>D. CH<sub>3</sub>CHNH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The following compounds have similar relative molecular masses. What is the order of increasing boiling point?</p>
<p><br>A.  CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH &lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>COOH</p>
<p>B.  CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH &lt; CH<sub>3</sub>COOH</p>
<p>C.  CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>COOH &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH</p>
<p>D.  CH<sub>3</sub>COOH &lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which combination causes the strength of metallic bonding to increase?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="395" height="230"></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>A question about factors affecting the strength of metallic bonding answered correctly by 68&thinsp;% of candidates. The distractors were almost equally chosen by the rest of the candidates.</p>
</div>
<br><hr><br><div class="question">
<p>Which combination would create the strongest ionic bond?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which metal has the strongest metallic bond?</p>
<p>A.     Li</p>
<p>B.     Na</p>
<p>C.     K</p>
<p>D.     Rb</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which is correct for all solid ionic compounds?</span></p>
<p><span style="background-color: #ffffff;">A.  High volatility<br></span></p>
<p><span style="background-color: #ffffff;">B.  Poor electrical conductivity<br></span></p>
<p><span style="background-color: #ffffff;">C.  Low melting point<br></span></p>
<p><span style="background-color: #ffffff;">D.  Good solubility in water</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which alcohol is <strong>least</strong> soluble in water?</p>
<p><br>A.  CH<sub>3</sub>OH</p>
<p>B.  CH<sub>3</sub>CH<sub>2</sub>OH</p>
<p>C.  CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH</p>
<p>D.  CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>OH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What are the predicted electron domain geometries around the carbon and both nitrogen atoms in urea, (NH<sub>2</sub>)<sub>2</sub>CO, applying VSEPR theory?</p>
<p><img src="images/Schermafbeelding_2018-08-10_om_07.00.48.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/11"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which bonds cause the boiling point of water to be significantly greater than that of hydrogen sulfide?</p>
<p>A.     London (dispersion)</p>
<p>B.     Covalent</p>
<p>C.     Ionic</p>
<p>D.     Hydrogen</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which molecule is most polar?</p>
<p>A.  CF<sub>4</sub></p>
<p>B.  CCl<sub>4</sub></p>
<p>C.  CHF<sub>3</sub></p>
<p>D.  CClF<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Question 11 was identified in the G2s as a tricky question, because students could have difficulty resolving the conflict between the greater polarity of the C-Cl bond compared with the C-H bond, and their contrast with the polarity of the C-F bond.) However, 56% of student did identify the correct answer of C.</p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which molecule is most polar?</span></p>
<p>A.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CHF</mi><mn>3</mn></msub></math></p>
<p>B.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CF</mi><mn>4</mn></msub></math></p>
<p>C.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CClF</mi><mn>3</mn></msub></math></p>
<p>D.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CCl</mi><mn>4</mn></msub></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>63% of the candidates could identify CHF<sub>3</sub> as more polar than CClF<sub>3</sub>. A surprising number selected either&nbsp;CCl<sub>4</sub> or CF<sub>4</sub> as the most polar.</p>
</div>
<br><hr><br><div class="question">
<p>Which combination describes the sulfate(IV) ion, SO<sub>3</sub><sup>2–</sup> (also known as sulfite ion)?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the formula of ammonium phosphate?</p>
<p>A.     (NH<sub>3</sub>)<sub>3</sub>PO<sub>4</sub></p>
<p>B.     (NH<sub>4</sub>)<sub>3</sub>PO<sub>4</sub></p>
<p>C.     (NH<sub>4</sub>)<sub>2</sub>PO<sub>4</sub></p>
<p>D.     (NH<sub>3</sub>)<sub>2</sub>PO<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What are the strongest intermolecular forces between molecules of propanone, CH<sub>3</sub>COCH<sub>3</sub>, in the liquid phase?</p>
<p>A.     London (dispersion) forces</p>
<p>B.     Covalent bonding</p>
<p>C.     Hydrogen bonding</p>
<p>D.     Dipole–dipole forces</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which describes an ionic compound?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="441" height="218"></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Fairly well answered with the most widely held misconception being that ionic compounds conduct electricity in the solid state.</p>
</div>
<br><hr><br><div class="question">
<p>What is the main interaction between liquid CH<sub>4</sub> molecules?</p>
<p>A.  London (dispersion) forces</p>
<p>B.  Dipole–dipole forces</p>
<p>C.  Hydrogen bonding</p>
<p>D.  Covalent bonding</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>56% of the candidates were able to identify London (dispersion) forces as the main interaction between liquid CH<sub>4</sub> molecules. Covalent bonding was the most commonly chosen distractor. Good performance on this question correlated well with candidates who scored well overall.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the order of increasing boiling point?</span></p>
<p><span style="background-color: #ffffff;">A. <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH(OH)CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">COCH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CO</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H</span></span></p>
<p><span style="background-color: #ffffff;">B. <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">COCH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH(OH)CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CO</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H</span></span></p>
<p><span style="background-color: #ffffff;">C. <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CO</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H</span> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">COCH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH(OH)CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub></span></p>
<p><span style="background-color: #ffffff;">D. <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">COCH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CO</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">2</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">H</span> &lt; <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;">CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">CH(OH)CH</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Ranking compounds in order of increasing boiling point proved challenging. There existed a number of misconceptions based on the incorrect answers chosen being close to evenly distributed.</p>
</div>
<br><hr><br><div class="question">
<p>Which substance has a giant covalent structure?</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>How many bonding electrons are there in the urea molecule?</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHsAAABbCAYAAABTa/pJAAAHb0lEQVR4Ae2df2gbZRjHv6ljbG7TMqgutTBoaqdQ/7GdQycumywKUxwV8S9TVydOVhmIi1ZkCg79I2Ww1en+WEo3nWyTlAoOpCNsylDapQxZoaSustEucbTuh+nqNpY88iZNuKaX5Jq8l+XunoNwd+/73HPv+/289yR3ed97bURE4MUSClRYopZcyYQCDNtCDYFhM2wLKWChqua+siM9aLHZYGvpQURNlJn8uo5B3FXLn5U2hp6WOthsT+CtnkuIz8oTOzP5dR0YzO9sztGckF+B3LDzH1+AxRC62rzovXyngGP5kGIUuAewAUT2o23XT7g89/Iupi58bB4FSg/bsQPe3ZsQ6foUu3rVwnmeEnN2wQqUHjZqsH77Lnid/3A4LxhbYQdqg334VVSLH2qZn+pXcVh53ngEg4c+xPqUXXULOk6OYEppI7aXNmFbx044OZxnKqPrvjbYbj/CRBBPVmd9wn6408W7hZHuHWhqn8QbwzdAdBvh72pxwvU+DgxeT1slNyqwtHELOrwczjOE0XVXG2xNRViE+tbjoLAPrY89AGAh7M+9hE2OEzhwalTl1qwSjds4nGuSVpKRRNjZSmSHY/kSqJ5oVjg/ihG+v84mopT0BVK8qDqJY+qPX3FiuhnvvVCLClxRsUqF8wCadn6CdmHhUDHjJCkKqF5wMjzHIwF88cER1H61E5sfWZjDZSqc23PYcJYMBfSBPTWE7o/a8fumr7G3eaV6CFeWPhXOlWm8LV8B0XlB3hKjaMhPHqeDnO19FI4V53l6epo6OztJrHkpXgFxKyVpiVE0uIecsEsBLQolQAOgrVu3MnAJlCTCnqCApzEBRwCa9XH7KVxAYcUVLUAz8ALEUzlEImwV7xKSGLgEEWdc6HjrJef3xeLFi7Fv376Es4MHDybWYl+k8zI/BcoetqgOA58f1GzWhoDNwLPhm1+6YWAz8PmBVbM2FGwGroZQe5rhYDNw7XAzLQ0Jm4FnYtS2b1jYDFwbYKWVoWEzcCXK/NuGh83A80NOWZgCNgNP4cy9Ng1sBp4btMg1FWwGnhu46WAz8OzATQmbgasDNy3sTODq1bdYqry/xsvXk+gAoezHFgsHqdfnIaeyR43TQ77eYNH95nRTIRamYO8R8robFL2AGsjtPUqB0A1Np9Wnd2mZXTDi//BkZ4c7iAzsx5bGJrz7ywp8HBLDlAgUCyP4JvDt5iY0vt1TfkOJp4bQtcWFps2HMLHBh3BMDMOKIRrai3UTXXh+1Vq0dA3NHVOXyUFTkzCJUWzcT612EJx7KBjN7Pp6m8b928kOO7l8w5TKndWXThkJdN5OSx67SP5WcTVvIm/wWjo5vZEvP22YHKin2DXz5n8U8r1GQCN5AhPqFY2GKOD3U28wnIatbli61FjIRy6A7J4AZQvWKRu4fBRKtVKVIloijCeiWfwizhw7A6AJax6vzAxwyf2l9djQ3IxXGu35Bzaoe5CcegsXzvyMPjiwcc2jEMMl1ZaKumfwussO9A1g6Er2AXMWgn0TV0cjgKMOK6uMchNyF9GrEwAqsaIyRwfLiiWoXHE/gBD+Ct9Saw+JNOvAziqBETKWoerBRUUX1DqwFzyE2rUOYPQCLk1kD3VFKyrVwQIsW16VeG3Y+UvXsnuO38T1v6cBrEJtdfZGYR3YqELDuicBBNE/nPkmiJSOcUyNnEbPj4OIzLzJac6rRVKvENF5nSzRItQ9+yJcGMXJ/j/xb6qYGev4hd9wrC8CuJ5Cw8M5vqJUfrSZNinfrVc48FlyrJq3n6LlokK+W6t8+Yp6lP3wH0VZJWzepiRQkN29h/pST57E06nu5BM1u7ubhufcg0s4dTEuoufJl3hy5iJPd//MUz4xYjZAPo+LgAZy+87nbaCmhz02Nkbnzp1TSC1EOkU/eN1kVz4YKffHpXSDQoGjRT0utQkVMr4CTLM7Pj6O5uZmnD17FqFQCPX19aapWyEVMe0PNCXozs5Oy4NONA5FfDPNpgjdq1evTvw7JAb085JUwHTf2Qw6e9M2FWwGnR20yDENbAadG7RpYDPo/KBNAZtBawNteNgMWjtoQ8Nm0PMDbVjYDHr+oA0Jm0EXBtpwsBl04aANBZtBFwfaMLAZdPGgDQGbQcsBXfawGbQ80GUNm0HLBS28lW3nhcnJyUQPE9HxoK2trZCOGXxMhgJl3S1J9DapqanJKDLvFqpAWcMutFJ8nLoCucM4T5aurppBU3PD1qVSPFm6LrJqcHoPYPNk6Rq46GJSetg8WbouILU4LT1snixdCxddbLTB5snSdRG/1E61webJ0kvNRZfzaYOt6dQ8Wbomme6hkUTY2WrBk6VnU6bU6TmG6RdbFJ4svVgFZR+v25XNk6XLRlW8P31g82TpxZPRwYPkP0LEC2h68fk7Hgw8/Q2+370Rdn2akw5SmN+lRBRxTA3uxcur2hh0mbYbibCvYuD4EZxGBKe/dKH6PhvSr5Vq6UGkTAWwUrEkh3ErSWe8ukq8so1XeauVmGFbiDjDZtgWUsBCVeUr20Kw/wfdcHqZPTut1gAAAABJRU5ErkJggg=="></p>
<p>A.     8</p>
<p>B.     16</p>
<p>C.     20</p>
<p>D.     24</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which two atoms form the most polar bond?</p>
<p>A.     C and F</p>
<p>B.     C and Cl</p>
<p>C.     Si and F</p>
<p>D.     Si and Cl</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which of the following does <strong>not</strong> react with dilute HCl(aq)?</p>
<p><img src="data:image/png;base64,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"></p>
<p>A.     Na<sub>2</sub>CO<sub>3</sub></p>
<p>B.     Cu</p>
<p>C.     Zn</p>
<p>D.     CuO</p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which compound has hydrogen bonds between its molecules?</span></p>
<p><span style="background-color: #ffffff;">A. CH<sub>4</sub></span></p>
<p><span style="background-color: #ffffff;">B. CH<sub>4</sub>O</span></p>
<p><span style="background-color: #ffffff;">C. CH<sub>3</sub>Cl</span></p>
<p><span style="background-color: #ffffff;">D. CH<sub>2</sub>O</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>72&thinsp;% of the candidates identified CH<sub>4</sub>O as having hydrogen bonds between its molecules. The most commonly chosen distractor was CH<sub>2</sub>O, the only other option containing oxygen.</p>
</div>
<br><hr><br><div class="question">
<p>How many lone pairs and bonding pairs of electrons surround the central chlorine atom in ClF<sub>2</sub><sup>+</sup>?</p>
<p> </p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The compounds shown below have similar relative molecular masses. What is the correct order of increasing boiling point?</p>
<p>A.     CH<sub>3</sub>COOH &lt; (CH<sub>3</sub>)<sub>2</sub>CO &lt; (CH<sub>3</sub>)<sub>2</sub>CHOH</p>
<p>B.     CH<sub>3</sub>COOH &lt; (CH<sub>3</sub>)<sub>2</sub>CHOH &lt; (CH<sub>3</sub>)<sub>2</sub>CO</p>
<p>C.     (CH<sub>3</sub>)<sub>2</sub>CO &lt; CH<sub>3</sub>COOH &lt; (CH<sub>3</sub>)<sub>2</sub>CHOH</p>
<p>D.     (CH<sub>3</sub>)<sub>2</sub>CO &lt; (CH<sub>3</sub>)<sub>2</sub>CHOH &lt; CH<sub>3</sub>COOH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What are the approximate bond angles and structure of crystalline SiO<sub>2</sub>?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the structure and bonding in SiO<sub>2 </sub>(s)?</span></p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which series is in order of increasing boiling point?</p>
<p>A.  CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub>OH    CH<sub>3</sub>COCH<sub>3</sub>         CH<sub>3</sub>CH<sub>2</sub>CH<sub>3</sub></p>
<p>B.  CH<sub>3</sub>CH<sub>2</sub>CH<sub>3</sub>         CH<sub>3</sub>COCH<sub>3</sub>          CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub>OH</p>
<p>C.  CH<sub>3</sub>COCH<sub>3</sub>          CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub>OH    CH<sub>3</sub>CH<sub>2</sub>CH<sub>3</sub></p>
<p>D.  CH<sub>3</sub>CH<sub>2</sub>CH<sub>3</sub>         CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub>OH    CH<sub>3</sub>COCH<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the order of increasing boiling point?</p>
<p>A.     C<sub>4</sub>H<sub>10</sub> &lt; CH<sub>3</sub>COOH &lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH</p>
<p>B.     C<sub>4</sub>H<sub>10</sub> &lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH &lt; CH<sub>3</sub>COOH</p>
<p>C.     CH<sub>3</sub>COOH &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH&lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; C<sub>4</sub>H<sub>10</sub></p>
<p>D.     C<sub>4</sub>H<sub>10</sub> &lt; CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>OH &lt; CH<sub>3</sub>CH<sub>2</sub>CHO &lt; CH<sub>3</sub>COOH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which molecule is polar?</p>
<p>A.   BeCl<sub>2</sub></p>
<p>B.   BCl<sub>3</sub></p>
<p>C.   NCl<sub>3</sub></p>
<p>D.   CCl<sub>4</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which combination correctly describes the geometry of the carbonate ion, </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><msub><mi>CO</mi><mn>3</mn></msub><mrow><mn>2</mn><mo>-</mo></mrow></msup></math><span class="fontstyle0">?</span></p>
<p><img src="data:image/png;base64,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" width="626" height="176"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Identifying correct electron domain and molecular geometries around a central atom was somewhat&nbsp;challenging and answered slighter better by higher scoring candidates.</p>
</div>
<br><hr><br><div class="question">
<p>Between which pair of molecules can hydrogen bonding occur? </p>
<p>A. CH<sub>4</sub> and H<sub>2</sub>O<br>B. CH<sub>3</sub>OCH<sub>3</sub> and CF<sub>4 <br></sub>C. CH<sub>4</sub> and HF <br>D. CH<sub>3</sub>OH and H<sub>2</sub>O</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which pair of molecules has the same bond angles? </p>
<p>A. PCl<sub>3</sub> and BCl<sub>3</sub> </p>
<p>B. SO<sub>2</sub> and CO<sub>2</sub> </p>
<p>C. H<sub>2</sub>O and NH<sub>3</sub> </p>
<p>D. CCl<sub>4</sub> and SiH<sub>4</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which correctly states the strongest intermolecular forces in the compounds below?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which statement best describes the <strong>intramolecular</strong> bonding in HCN (l)?</p>
<p>A. Electrostatic attractions between H<sup>+</sup> and CN<sup>−</sup> ions</p>
<p>B. Hydrogen bonding</p>
<p>C. Van der Waals forces and hydrogen bonding</p>
<p>D. Electrostatic attractions between pairs of electrons and positively charged nuclei</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>The majority of the candidates thought the bonding in HCN is ionic (electrostatic attraction between H<sup>+</sup> and CN<sup>-</sup> ions) rather than covalent. The description of covalent bonding was the second most commonly chosen response.</p>
</div>
<br><hr><br><div class="question">
<p>Which form of carbon is the poorest electrical conductor?</p>
<p>A.     Graphite</p>
<p>B.     Graphene</p>
<p>C.     Diamond</p>
<p>D.     Carbon nanotube</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the molecular geometry and bond angle in the molecular ion NO<sub>3</sub><sup>−</sup>?</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_11.54.44.png" alt="M18/4/CHEMI/SPM/ENG/TZ1/11"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which compound has the highest boiling point?</p>
<p> </p>
<p>A.   CH<sub>3</sub>CHO</p>
<p>B.   CH<sub>3</sub>CH<sub>2</sub>F</p>
<p>C.   CH<sub>3</sub>OCH<sub>3</sub></p>
<p>D.   CH<sub>3</sub>CH<sub>2</sub>NH<sub>2</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">How does a lithium atom form the most stable ion?</span></p>
<p><span style="background-color: #ffffff;">A. The atom gains a proton to form a positive ion.</span></p>
<p><span style="background-color: #ffffff;">B. The atom loses a proton to form a negative ion.</span></p>
<p><span style="background-color: #ffffff;">C. The atom loses an electron to form a positive ion.</span></p>
<p><span style="background-color: #ffffff;">D. The atom gains an electron to form a negative ion.</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>One of the most straight-forward questions on the paper about how lithium forms its most stable ion. It was answered correctly by 87&thinsp;% of the candidates.</p>
</div>
<br><hr><br><div class="question">
<p>The electronegativity values of four elements are given.</p>
<p><img src="data:image/png;base64,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"></p>
<p>What is the order of <strong>increasing</strong> polarity of the <strong>bonds</strong> in the following compounds?</p>
<p>A. CO &lt; OF<sub>2</sub> &lt; NO &lt; CF<sub>4</sub></p>
<p>B. CF<sub>4</sub> &lt; CO &lt; OF<sub>2</sub> &lt; NO</p>
<p>C. NO &lt; OF<sub>2</sub> &lt; CO &lt; CF<sub>4</sub></p>
<p>D. CF<sub>4</sub> &lt; NO &lt; OF<sub>2</sub> &lt; CO</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which substance is most likely to be ionic?</p>
<p><img src="data:image/png;base64,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" width="716" height="175"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which is the correct order based on <strong>increasing</strong> strength?</p>
<p>A.  covalent bonds &lt; hydrogen bonds &lt; dipole–dipole forces &lt; dispersion forces</p>
<p>B.  dipole–dipole forces &lt; dispersion forces &lt; hydrogen bonds &lt; covalent bonds</p>
<p>C.  dispersion forces &lt; dipole–dipole forces &lt; hydrogen bonds &lt; covalent bonds</p>
<p>D.  dispersion forces &lt; dipole–dipole forces &lt; covalent bonds &lt; hydrogen bonds</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which compound contains both ionic and covalent bonds?</p>
<p>A.&nbsp; <math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>MgO</mtext></math></p>
<p>B.&nbsp; <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>CH</mtext><mtext>2</mtext></msub><msub><mtext>Cl</mtext><mtext>2</mtext></msub></math></p>
<p>C.&nbsp; <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>CH</mtext><mtext>3</mtext></msub><mtext>COOH</mtext></math></p>
<p>D.&nbsp; <math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>NaOH</mtext></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The Lewis structure of methylamine is shown.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="200" height="144"></p>
<p>What is the molecular geometry around N?</p>
<p>A.  Square planar</p>
<p>B.  Tetrahedral</p>
<p>C.  Trigonal planar</p>
<p>D.  Trigonal pyramidal</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which molecule contains an incomplete octet of electrons?</span></p>
<p><span style="background-color: #ffffff;">A. NF<sub>3</sub></span></p>
<p><span style="background-color: #ffffff;">B. BF<sub>3</sub></span></p>
<p><span style="background-color: #ffffff;">C. BrF</span></p>
<p><span style="background-color: #ffffff;">D. SF<sub>2</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>66&thinsp;% of the candidates identified BF<sub>3</sub> as having an incomplete octet of electrons. The distractors NF<sub>3</sub> and BrF were chosen in equal numbers, and the distractor SF<sub>2</sub> was chosen by the least number of candidates.</p>
</div>
<br><hr><br><div class="question">
<p>What is the explanation for the high melting point of sodium chloride?</p>
<p>A.  The covalent bond between sodium and chlorine atoms is strong.</p>
<p>B.  Electrostatic attraction between sodium and chloride ions is strong.</p>
<p>C.  Intermolecular forces in sodium chloride are strong.</p>
<p>D.  Delocalized electrons cause strong bonding in sodium chloride.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which formula is correct?</span></p>
<p>A.  <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>NH</mi><mn>4</mn></msub><msub><mi>PO</mi><mn>4</mn></msub></math></p>
<p>B.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mfenced><msub><mi>NH</mi><mn>4</mn></msub></mfenced><mn>2</mn></msub><msub><mi>PO</mi><mn>4</mn></msub></math></p>
<p>C.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mfenced><msub><mi>NH</mi><mn>4</mn></msub></mfenced><mn>3</mn></msub><msub><mi>PO</mi><mn>4</mn></msub></math></p>
<p>D.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mfenced><msub><mi>NH</mi><mn>4</mn></msub></mfenced><mn>3</mn></msub><msub><mfenced><msub><mi>PO</mi><mn>4</mn></msub></mfenced><mn>2</mn></msub></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>64% of candidates picked the correct formula for ammonium phosphate with (NH<sub>4</sub>)<sub>2</sub>PO<sub>4</sub> being the&nbsp;incorrect answer chosen most frequently. NH<sub>4</sub>PO<sub>4</sub> or (NH<sub>4</sub>)<sub>3</sub>(PO<sub>4</sub>)<sub>2</sub> was rarely selected.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which describes a resonance structure?</span></p>
<p><span style="background-color: #ffffff;">A.  Double bond can be drawn in alternative positions.<br></span></p>
<p><span style="background-color: #ffffff;">B.  Bonds vibrate by absorbing IR radiation.<br></span></p>
<p><span style="background-color: #ffffff;">C.  A double and a single bond in the molecule<br></span></p>
<p><span style="background-color: #ffffff;">D.  A Lewis structure</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the type of bonding in a compound that has high boiling and melting points, poor electrical conductivity, and low solubility in water?</p>
<p>A.  Ionic</p>
<p>B.  Molecular covalent</p>
<p>C.  Metallic</p>
<p>D.  Giant covalent</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>58% of the candidates identified giant covalent bonding as the bonding in compounds with high melting and boiling points, poor electrical conductivity and low solubility in water. The most commonly selected distractor was ionic bonding. The question discriminated well between high-scoring and low-scoring candidates.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which species does <strong>not</strong> have resonance structures?</span></p>
<p><span style="background-color: #ffffff;">A. C<sub>6</sub>H<sub>6</sub> </span></p>
<p><span style="background-color: #ffffff;">B. NH<sub>4</sub><sup>+</sup></span></p>
<p><span style="background-color: #ffffff;">C. CO<sub>3</sub><sup>2−</sup></span></p>
<p><span style="background-color: #ffffff;">D. O<sub>3</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Identifying resonance structure had one of the highest discriminatory indices. Only the higher achieving candidates had much success with this.</p>
</div>
<br><hr><br><div class="question">
<p>Which species has the same molecular geometry as SO<sub>3</sub><sup>2−</sup>?</p>
<p> </p>
<p>A.   BF<sub>3</sub></p>
<p>B.   SO<sub>3</sub></p>
<p>C.   PF<sub>3</sub></p>
<p>D.   CO<sub>3</sub><sup>2−</sup></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which species has the longest carbon to oxygen bond length?</p>
<p>A.     CO</p>
<p>B.     CH<sub>3</sub>OH</p>
<p>C.     CH<sub>3</sub>CO<sub>2</sub><sup>−</sup></p>
<p>D.     H<sub>2</sub>CO </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which compound has the shortest C to N bond?</p>
<p>A.&nbsp; HCN</p>
<p>B.&nbsp; CH<sub>3</sub>CH<sub>2</sub>NH<sub>2</sub></p>
<p>C.&nbsp; CH<sub>3</sub>CHNH</p>
<p>D.&nbsp; (CH<sub>3</sub>)<sub>2</sub>NH</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Along which series is the bond angle increasing?</p>
<p>A.  NH<sub>3</sub>  H<sub>2</sub>O  CH<sub>4</sub></p>
<p>B.  CH<sub>4</sub>  NH<sub>3</sub>  H<sub>2</sub>O</p>
<p>C.  H<sub>2</sub>O  NH<sub>3</sub>  CH<sub>4</sub></p>
<p>D.  H<sub>2</sub>O  CH<sub>4</sub>  NH<sub>3</sub></p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which compound has the greatest volatility under the same conditions?</p>
<p>A.  SO<sub>2</sub></p>
<p>B.  SiO<sub>2</sub></p>
<p>C.  SnO<sub>2</sub></p>
<p>D.  SrO</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>For which species can resonance structures be drawn?</p>
<p>A.  HCOOH</p>
<p>B.  HCOO<sup>–</sup></p>
<p>C.  CH<sub>3</sub>OH</p>
<p>D.  H<sub>2</sub>CO<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which of the following series shows increasing hydrogen bonding with water?</p>
<p>A. Propane &lt; propanal &lt; propanol &lt; propanoic acid</p>
<p>B. Propane &lt; propanol &lt; propanal &lt; propanoic acid</p>
<p>C. Propanal &lt; propane &lt; propanoic acid &lt; propanol</p>
<p>D. Propanoic acid &lt; propanol &lt; propanal &lt; propane</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the name of the compound with formula Ti<sub>3</sub>(PO<sub>4</sub>)<sub>2</sub>?</p>
<p>A. Titanium phosphate</p>
<p>B. Titanium(II) phosphate</p>
<p>C. Titanium(III) phosphate</p>
<p>D. Titanium(IV) phosphate</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>71% of candidates were able to name Ti<sub>3</sub>(PO<sub>4</sub>)<sub>2</sub> correctly. The most commonly chosen distractor was titanium(III) phosphate.</p>
</div>
<br><hr><br>