File "SL-paper1.html"
Path: /IB QUESTIONBANKS/5 Fifth Edition - PAPER/HTML/Chemistry/Topic 5/SL-paper1html
File size: 676.82 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>Which change of state is exothermic? </p>
<p>A. CO<sub>2</sub>(s) → CO<sub>2</sub>(g)<br>B. H<sub>2</sub>O(l) → H<sub>2</sub>O(g) <br>C. NH<sub>3</sub>(g) → NH<sub>3</sub>(l) <br>D. Fe(s) → Fe(l)</p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>Which expression gives the mass, in g, of ethanol required to produce 683.5 kJ of heat upon complete combustion?</p>
<p>(<em>M</em><sub>r</sub> for ethanol = 46.0, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H_c^\theta = - 1367{\text{ kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}">
<mi mathvariant="normal">Δ</mi>
<msubsup>
<mi>H</mi>
<mi>c</mi>
<mi>θ</mi>
</msubsup>
<mo>=</mo>
<mo>−</mo>
<mn>1367</mn>
<mrow>
<mtext> kJ</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</math></span>)</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{683.5}}{{1367 \times 46.0}}">
<mfrac>
<mrow>
<mn>683.5</mn>
</mrow>
<mrow>
<mn>1367</mn>
<mo>×</mo>
<mn>46.0</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1367}}{{683.5 \times 46.0}}">
<mfrac>
<mrow>
<mn>1367</mn>
</mrow>
<mrow>
<mn>683.5</mn>
<mo>×</mo>
<mn>46.0</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{683.5 \times 46.0}}{{1367}}">
<mfrac>
<mrow>
<mn>683.5</mn>
<mo>×</mo>
<mn>46.0</mn>
</mrow>
<mrow>
<mn>1367</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1367 \times 46.0}}{{683.5}}">
<mfrac>
<mrow>
<mn>1367</mn>
<mo>×</mo>
<mn>46.0</mn>
</mrow>
<mrow>
<mn>683.5</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct for this reaction?</p>
<p>Fe<sub>2</sub>O<sub>3</sub> (s) + 3CO (g) → 2Fe (s) + 3CO<sub>2</sub> (g) <em>ΔH</em> = −26.6 kJ</p>
<p>A. 13.3 kJ are released for every mole of Fe produced.</p>
<p>B. 26.6 kJ are absorbed for every mole of Fe produced.</p>
<p>C. 53.2 kJ are released for every mole of Fe produced.</p>
<p>D. 26.6 kJ are released for every mole of Fe produced.</p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy change, <strong>in J</strong>, when 5 g of water is heated from 10°C to 18°C?</p>
<p>Specific heat capacity of water: 4.18 kJ kg<sup>−1</sup> K<sup>−1</sup></p>
<p>A. 5 × 4.18 × 8</p>
<p>B. 5 × 10<sup>−3</sup> × 4.18 × 8</p>
<p>C. 5 × 4.18 × (273 + 8)</p>
<p>D. 5 × 10<sup>−3</sup> × 4.18 × (273 + 8)</p>
</div>
<br><hr><br><div class="question">
<p>What can be deduced from this reaction profile?</p>
<p><img src="data:image/png;base64,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"></p>
<p>A. The reactants are less stable than the products and the reaction is exothermic.</p>
<p>B. The reactants are less stable than the products and the reaction is endothermic.</p>
<p>C. The reactants are more stable than the products and the reaction is exothermic.</p>
<p>D. The reactants are more stable than the products and the reaction is endothermic.</p>
</div>
<br><hr><br><div class="question">
<p>Hydrazine reacts with oxygen.</p>
<p>N<sub>2</sub>H<sub>4</sub>(l) + O<sub>2</sub>(g) → N<sub>2</sub>(g) + 2H<sub>2</sub>O(l) Δ<em>H</em><sup>θ</sup> = -623 kJ</p>
<p>What is the standard enthalpy of formation of N<sub>2</sub>H<sub>4</sub>(l) in kJ? The standard enthalpy of formation of H<sub>2</sub>O(l) is -286 kJ.</p>
<p>A. -623 - 286<br>B. -623 + 572<br>C. -572 + 623<br>D. -286 + 623</p>
</div>
<br><hr><br><div class="question">
<p>What is correct about energy changes during bond breaking and bond formation?</p>
<p><img src="data:image/png;base64,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" width="501" height="158"></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which combination will give you the enthalpy change for the hydrogenation of ethene to ethane, </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><msub><mi>H</mi><mn>3</mn></msub></math><span class="fontstyle0">?</span></p>
<p><img style="display: block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfQAAAB0CAYAAABzEcDmAAAgAElEQVR4Ae2dh1tT1//Hf38KwQwIggOcoChWBSduRUEcoNYtbuuWVqtWUat2KO5RFUG/DkRbN66Ktg4EraVuQRmiMpK8fs8NQhJy0QABEjg8Dw83l9wzXud+zvue8zn3fP4P8SMICAKCgCAgCAgCTk/g/5y+BqICgoAgIAgIAoKAIIAQdHETCAKCgCAgCAgC9YCAEPR60IiiCoKAICAICAKCgBB0cQ8IAoKAICAICAL1gIAQ9HrQiKIKgoAgIAgIAoKAEHRxDwgCgoAgIAgIAvWAgBD0etCIogqCgCAgCAgCgoAQdHEPCAKCgCAgCAgC9YCAEPR60IiiCoKAICAICAKCgBB0cQ/UAoF8knft5U5hxVnlxkfiqezG+lSd9ZeKrrLEV4lP1Gnr/4kzgoAgYEkg/zK7996hYnPLJSFCi1vQOh7ImduVRbRv1IwZpwss0xWfHJ6AEHSHbyLnL6D+5T5Ge/ky9+z7CipTxI0l7dA0mcaZj9Zf0T/dRohKTUjsU+t/ijOCgCBgRkDPy30jad52NucqNLfrRPsp8Z52Gmtz0/MsdhDuqkFsf6o3S1ccOgMBIejO0EpOXcZi7v7QDTcXBd5jDpMl10fon7NzkBr3gbHI9SEFZ6LwaeTHsmtFTk1CFF4QqHECxXdZG6RC6dKUrw9nIW9u240PyEO2PpX5fwG/RzVD47uE68Lcary57J2BEHR7ExXpWRLITWJOyCwWhnmhdBtMbIbMHF/BGWY2U9Ju0VWs+xAdD2K64+Y2msM5Bsu0xSdBQBCwIJCXNJvQmQsI91TQeNBW5M1tOi0a+bLkirW1oUtlfTcVjUfHIczNAq1TfBCC7hTN5KyF1PN05xjGbssgJ3EabRQqeqy+Q3G56uhS19FT6UbEgbdYS3YuCZGSvy8GOfd6uaTER0Gg4RLQP2VXZCQ7MnJImtYSlTKINXesrI0HMd1w04zi0FtrayM3nnHuKnqsvY/Mo3fDZeskNReC7iQN5ZTFLExhdegsknKBgutEd2yEynceFz9Y1ib3cCSeLgqUFf664j0tScbfZ5mO+CQINGQChSmrCJ95ihJzW8pXrq74z72ApbnlEh+h/YytKVAqmjI9ydq73pDZOkvdhaA7S0s5YTmzj08n/Ie/Po3IdaRtCMbdpTkTj7w1q00R1xe3w631ApLlZgDvx9BTqUbe32eWjDgUBBo0gWxORIWx9q9PI3JdGht7q1E2G89RC3O7xjI/FX7zL8u6t1LXdsNNNZBtcotZGjRf56i8EHTnaCfnK6XuMVtHf83+F6ZlOfpnuwn3UOAZst20+E3/jB2D1GjD9pElMwOYlzAWT9cK/H3OR0WUWBCoEQK6x1uIHLcXk7npeb4rjCYuWkK3mxa/6Z9Jb4xoGLEvU8a9lceRMVrUvou4KvNwXSMFF4nalYAQdLviFImVEii4Fs3weefILz1h/JvD8Yk+KJU9iLn3aSQhLYhrqqLz8hQr3zoUk/JdABrNaOKyZdTeIm3xQRBoqAQKuL4slAVnLa2NnGNM8Vbg1n0t98vMbTo+ygC+TynvWweKU1jRUYnHqEMIc3POe0kIunO2m2OXWp9JwuQRbEy17jQKkhcS4NqIjguSkbat0Bmn1D0YfyTPuk6GTPaHadAErinpkAxZXFwZQnutBi/fYcRczpYZZVgnI84IAvWZgD4znmnhG3hgZW4FXFngj9q1PYuSjdaGcUpdO47/yZrbPkaolXRfc6/k4frjPbaPbIubixe9Fp7mlWmyrT7jdOq6CUF36uZzzMLr0jcTMSmOTLkOoPgeMd1VKL0ncTwHcuMi8FT2YIPsllXJLGqjxHtqyYI4XfpGQoZu4k72e15dWEyvQb+SIZeHY2IRpRIEaoCAjvRNo5ga91rmnXIovreWXkoFLSceI4dcDks7xHVfT5rMEvai5IX4NWpK1ClpQZyBrH1h9F9zh7wPT9gfHsSquzIX1UCNRJJVJyAEversxJWyBN5zaV4HWnUeQtjQYTK/Q+nr647SpTHhuzK4uvhzO8TFMkSlZvCWJ1adleH1XsaE7+C5EHTZVhAnGwiB9xdZ4N+CwMFytjaMsJBg/N0UKD1C2Z1xlWWf2yFu60DcVQOJfWJpVPr3/7BzZCjb/rM830AIO1U1haA7VXOJwhoJFDxi/4RhRF/MFVPu4pYQBGqSQMEZpjdWoO0Zw1/vajIjkbY9CFQg6AZybu9hYWhX2jTW4K5pRsCAKLZek9lKsOAZyTuXMrZ3e1q6qXBzb0Fg6FxiL734THAAeHdlEUEDY22aMjW8PMCogKmcflODC6OKX3B+7Vh6NNegUnoRMGg2O2++NY0MDW/4bbgGt+DN/CMz81R4eT6+jVow73zFIRGsG+wdVxd1ZcjWDFM+1l8yO2Pg5YERdJ6aRE2iMMvQ4Q4NuSn8PDacJYnPZBbROVhxq2gb0nTnm/3haJXB/PRI9mZjYSslreecr1SFK2NzUsI1bnfCpirVfnX35SKe7BhGnw2PbOyn6q6kZTlX2fbA8GY/I9Uq+m16JLO5TiHJ37RG4zOnLCubDt5dZUmXgWyz1UdoeMnB8ACikt5UatAiK+j6jF2EN/EkeNExHrwpoDD3EaeW9KapR1823zO9z2DIucLyblq8+0Vz9PYL8ov1FOVlcGVLJH6uzRix+5G8qH/8k+gOHYm+aWs0n2IexAThF3XWuGmCTQAr9aUP3FjSAW3AbP6XlkPBh5fc2DiU5upgtjz8tNKkBjqfj38uo1OHZdiMQapTcSrrA9sy86y0fUQD+ylMY/u4MWxKcfyReZVtw9ikNSDolbY5qSA1bHfCphzYgPU8XNebob+k8a4wm1urexO88bFTCHr1bK8mBP0jN5d2pNPSm8aFwLY2enHqOrq3mc65SnT1MoKuI31DT9x9ZnHWfLOgwht826FkQ4KSPuctiROa49Z5BbcstyKStgXj7+87odIMZZ+Vk1PPk9i+eA7ey8vKDLizjzJG24V1Miun5QHpKMj/YNsoLvcoY9RaJieazSkV/81KPwWdVt8reUqzd+ejf8L2PlqG7nlZqScwqa7ZRyLw6hwjs6pVnkR9Ofv+1FR8FKYd5TQBK7httbL387UtKiqisLAysyifT0/2v4aq2kZpavYW9CranFScmrQ7YVOlDe6Yf3OvsT6kFW4ubnSK2MLfZt1jVQv8/n1FIeCqmmK566pte/YXdP2TbfR3H8K+SgmeVK9s/hfhQeDaVNt0DJAR9HKASj/qnxI7QI02It54Rp+xhX4KDaMOyU8JGDKvcujAaR7klFtIUZhCdFsNow+bbV9kyOWvnTMJ8W+KVqmhWZvuRCw+RKrFa5X5nJ7ogff08+W2MiwtYLm/BeeY02kSJ2ydBCh3ufROZnSrmhP0wpvLaKceSbwZBsjnQdxSRnzVAi+1ljaBEaz8aR49Nd1Yd99s6jU/iSnapsw6Z/UkVb4W4rMMgWmTpzB/7jz+vHFD5r/VP1Vl2yjL2s6CLmdzQH5qHNFhnWml1eDZIogxy39mfpAbPdfeLyuJdE/WmN3ZWdCFTZk1m4MepqenM6BvP7Zu2ULm69d2L2X1bc/egl5IylJftCMOY9nVp3J4yXACfTzQureke8QKfpnbDY9yMSvyT03Cq8kMztvY1dss6IaseL72UtFl+S1jI2THjcBN0Zstj8sJ9heaqOj6ItooBrDb7GklJ3EiLZqNYMfdHAr1xeQ/+Z1FX2kIWH7b4skkJ34kau00y5mDivKrsqAbKHybRuLSYDw9Q9lfurLTrp1PETcWtUTVf5fZLIWBzGOT8VX7MX7bDV7kZJKaMJ8eWgVKZTlBJ4eEEY3wmvaH2N+8ovb/zPlXr17h07SZcT/rAP8OxKxZS0ZGxmeuqNy/qmobplzsK+hyNmd4fYyprTT4j93Gny9yyLqfwMIgD5QuqnKCDjVmd8KmTE3egI5it2w12p6mkZKRw8M5kpDAx4/m08FVh1F927OzoBddZ0kLVwbtMpuJNbzm+KTWaH3HsePGC3Iy73PkmyC8XBTWQahy4hnt6sH0P2zjY5ugG3K5vDAAd88Qdv4rjRT1pG8IRKkcw/FKTcPo+WdjEMrmi/izbKpUx50V7dF224jc+h/zptWnraOLix8r/zYbrZp/wfy4SoKu5/ne0QT4tsDDxY1eS//geemSgU+dT8UBRKSgBjYuitM/YlOggpaLbpgeWHTpbOqpodW0U5j2fCji3pogNFaCrictphNK3++5YwMKCcuTJ084eeKE+P3E4Ntl0VYBKgb268+eXbvJyckxv5MqeVxV2zDP5pOgVxisRnI7uNq4KE7e5tJ/7IXWZ1pJ4JxPWRfdXUOPRtaCXmN25+Q2Zd5iXzq+fOmSsL1Ptnfi+HGCe/S0sL+mjT2ZNX0GyZcvYzBUxhdrTt4etlcq6CbXnlyfr7JxUZz+0Ua6u3iz5EaZ4KFL/5FgdQumJ5o5x4vuEROktBZ0fRrrAxT4r/hbZoGeed1Ljm0Q9CL+/W0MbVVtmRj35FOiUifRDaUykmOVEvRiLkS5oey1hdKBr1SM98kL6eCqod2Qb/gp4QoP31bg48yJY5SLK+NP2DD/UCVBNwEqyIhnSisFraPOYOze7TmaKD7PTI2CPlv+K1tkYsjcS7haQ8SBHAufetHVxfiry4/QISduBErFOE7agEKq1flz5xkXOUb8fmIwfFgobkqVRaciGe7gAQOJO3jIdCNU+qiqtmGekT1H6DI292kHPu3Ig5Yxr4uustRXYzVCp6bszsltyrzFvnQcvXSZsD2z/mfIwEFWttfU04s5M2eRlpb2JZwV/N8etlcq6PZZ5V58fjoeLr3ZWiZ4BrL2hqFVj+KQRcD5Iq4t9kNbbsodcjgcrkA19oRNruYvCLqOF4mz6eLemoidqRbTu++OjUGr6MWvFU65F1FQWH46voCk8a4oB+0l0+IhrIjX13YTPSYYP2kTBBcPOg5dRMLDctMMH0/wtULBiLhs6wZ9d5QZ/m3xa1P6642Hiwaf1qWf2+LXfgqHZS61Tkw6Y+DlroEoFWHEvZE+2vG1tYJTTFQoCNnzuky8dQ830kfVmKmJlk5/aWvUHuV96MDHE2NRuQyvRH3ka9kQz+r1eqTReOmT91cdA9iwbr1xFsMePKpmG+Y521PQZWxO94hNvdQ0mZRouepWd591Vj50481WM3YnbMq80RvM8e1bt5Cm2yX7k/5GjBzFsaP/o6DAsu+rCpDq2559Bb0gcTwql8Hse10qeDoebeyNu8dkTllUV0fq2iArHzp85OQYV5RhcdgiXZ8RdEnM5xLY2I8J+9ItDV/Stxe7CVFqGHEwq0yUzBvA8HIPQzXejE8wX/hQzMXp7ih7bzVF2zK/SDouyuHR5T3MDnRD3WEld0wzFZAdR7hLIyYklhP68mlIn6s5QpeSKDwzBTeXYGKlpyt7dj7FF5jlpqDvFlMUpNIR+ugDlvuTF11bQgeZEXr2oVCUrl9j3KVRrv7iXIUENm3caPShL5y/gJSbKRV+r6r/qJptmOdmT0GXsTlDJvtCNWhHHLAMwlEkhdaUGaHXlN0JmzJv9AZxLPnKuwR0IrhnL7bHbiMrK8uu9a6+7dlX0IsvzKCxpCFlu+8ZyNoTilY9koMWEXBKwkhbj9CzORyqQD0u0WJAXRG0CgS9mOcnZtO1cQemxWfIxM2VksshaVIz1J2/57aVvn7k1vJOKNVD2GPx2pqefzd1M/rQzVwKMmUzkPVbKO6aCZwym1LWp67lKxd/frhng+O4EoKuu7uKAJfWLL1hPtVfyN/LO6BsNg9jXINKdT4Gsi6sYpivB1qtL2FrLlt2nPrH/BQk+dCvm/nQ09jYQ0PrqNOYvBg60n/shZuMD/3BmgCU7VdhvvhdBqQ4VY6A9NraubNnkf7W3E8lbEM24ExVBF3Pq2NTCIg4VG6vBjmbk2LT90TrM50zpputxLenlPGh15DdVe4hWdhUzd2vtZdy2oMHPHz4sAYzrK7tVVbQ9bxI/IZenq64txnBtnuWYqh/vJmekg/9umlkqkvbQG91C2aetjA+NvVUyfjQU4npqCBg1afXp79ATkbQDeRdXkqgxouQX9LkN4b5lKgh63fm+mvw6b+UwzefkVdYTMHbNM6sGUZLhTcR+x+bBOvTNcV/LqatSzDbyp5YPpA8rw2Ne37L+f/yKNLr+fjyCmv6eOAdccQiRvbbQ6GoPWdy0WKqooIaVkLQ0T9h/1AP3Lsu5NSjXAo+ZnL3YBRfKZsw4rdPo+jKCLq0wG3QMDbfyeb9qwss7T6YLRY7BBVzc3ErlMGxZjMVBrJOTMVP04Epu1J4mfuGhyej6e/lilLZvVzwkrccDm1EsxkXrGZOKqAhTtcyAVttQz7gTOUFXZexn+mhvelqJehgbXNgyDxBVGs3AibuJuVlLm8enuS74CaoXFT0WvfAglaN2Z2wKQvO4oN9CFTP9iop6Pl/MC9sLbeyC8hJXkL3yCOWD9TFf7K0pYJ+W02zsRgyOTmlDR7+k9hz8yV5bx6SGN2H5goFbt3KBc55G0e4qxezL9gienLvoeufsmOwpsy/WOpnLP2rDdtrQV2fe4/4FeMZ0L4ZHgoFaveWBIXNZ+eV1/Ij+6IUvm2rYtg+k/+Y92nELxlJz9ZeaF1VePp0JXzBfu7mlfodpCzzODHWnZZzL9smYpURdCl5YxmGE9hUjdJFQ+ugSFaffGzKqzKdjzkhw2v2R4xgp8VMBRSlRNNOGcL+Mt+KsRA8ODCfYR2a4aH2oG2Pify4MpIW6v6WDwR5xxnv5s03l21rZPPiiOPaI1BZ2zAFnKmkoBeksmXiXI7djCV8TPkRuuTGkrE56ZZPPcjCIR3x0WjwatmTyetXMbaZhoG/mL/CV4N2J2yq9m7GBpZT1W2vcoKuu7WcIcMmEurngafvaHbcM5tSNjIv4tYyX9yG7LNcN/Y+lUPfhNCpqRtabSt6T1jP6ojmaPv9YrEdet7xcTRuPrdkltiGNpQZodtwVbW+oue/rX3w6LPNbHT65QQNmQcZ4R7Ij3Jx/758eR19o4BH+yYStuQiuebPJlJp9P+xLdiN/rFmT24ypcyLj8TTaypJZfeJgawDw/HsWu5JTuZaccqJCFQ54Ew+N9eMJ/pcNrpn2+QFHRttLjeese5NiEosu9lwPLsTNuVEd7VzFLXKtgfF56bh4b+AC6/f8+b6coKHmO8tUlJ9/X+x9Nf0ZXvZrLQcllwSIrQ0n3LKtJrdkMmhMC3d1qfZ9MqalGodCLq0avYqS9q1Z9kNW0eYxaSu6Ypv1B+W0xlyXBzlnCGXlM3jGLnoFM9N7hOL0n28uoiO7Zbwp4RBn8GWfhqa9F3F5af56PQFZN1L4JuunnRaeMnkVy++T0yX1sz4w+wdRotUxQdnI1CtgDNF14n2a2Q2o9YIvwXJ1rNjFjanJ+PX/mg9+vHDpafk6/QUZN3jyNxAmnZYyOUy156D2Z2wKWe7tR2+vNWyPSnawZUFdJl3pcS1rEtheb/vuG21xOsj1xa1p+PiG8YZX33GrwxUN2bAqks8y9ehL8jifsJcujXuyOJLZcZH8f21BLWKojJhO+pG0KUJ9EvzCRy03eJ99Ipa3/DqIBEBU0jKKj/MreiKuj5fSFrs14z7MQULr4FVsfK4/E0XQraXvI/+If0I343uSXsvDWqFmma+wUxcc5onZWv1DLw6MIrOk09ZrC2wSlaccB4Cdgw4o69whF6Cw8LmPqRzNHo0vX2boHV1xd3Tl77j13LGdLPhWHYnbMp5bmonKak9bO9tHBEdozjxJI+s5GiCRx6S75vzLrGw82B2Gt9H/0D6kWgie/jSXN0IlcqL9r3HE3P6iWnNmuEVh0YGMC1R/i2yigjXmaBXVKB6cf59ElFNXU2jpkYBrLxVwTC9XlRYVKKqBOwRcKY07y8Jeun3nPKvsCmnbDZHLrR9bK+Ifw9MobObAnffSHan2TrrXDNkhKDXDFeRqiAgCAgCgoAgUKsEhKDXKm6RmSAgCAgCgoAgUDMEhKDXDFeRqiAgCAgCgoAgUKsEhKDXKm6RmSAgCAgCgoAgUDMEhKDXDFeRqiAgCAgCgoAgUKsEhKDXKm6RmSAgCAgCgoAgUDMEhKDbwFWKznX82DF0OqsdA2y4WnxFEBAEBAFBoL4TOH/2HN8vX16n1RSCbgP+06eSjPGzO/i1Y+uWLbx7Z9rNx4bLxVcEAUFAEBAE6iEBKYb7/n37COzchR5BQcQdPFSntRSCXgn8t1JSmDRhgjGW9rfLonn29GklrhZfFQQEAUFAEKgPBKQ47jFr1tLapwWjwkdw6eJFh6iWEPQqNIMk5JKg+zRtZhT427duVSEVcYkgIAgIAoKAMxFIS0tjzqzZNPdqwrw5c2o4tnvlyQhBrzyzsiukqXdpCl6aih/Yrz8nT5xAr9eX/V8cCAKCgCAgCDg/gQvnzzMibDhtWrRkfcw63rx545CVEoJuh2aRFstJi+b69+lLx3bt2bY1lvz8fDukLJIQBAQBQUAQqAsCkn/8t/376dY10Ph74LffkM458o8QdDu3zs2bN5n49XjjdPx30dE8f/bMzjmI5AQBQUAQEARqioA0+l63NsboHx85PJyLFy7UVFZ2T1cIut2RliT49MlTopcsxbtJUyZPmMhft2/XUE4iWUFAEBAEBIHqEnj48CFzZ5f4x6W/6enp1U2y1q8Xgl7DyPPy8tjyyy+09/Vl8ICBnEpMFH72GmYukhcEBAFBwFYC0ghcGolLK9alkbm0gt1Zf4Sg11LLSX72Y0f/R7/gYAL8O7Bj2zbev39fS7mLbAQBQUAQEARKCRQWFnLwwAG6BwYR1KWr0Vfu6P7x0rJ/7q8Q9M/RqaH//XnjBuPHjqNFs+bGnYVevHhRQzmJZAUBQUAQEARKCbx9+5YN69YbV6uHh4Vx/tz50n/Vi79C0OuwGf/77z+WLl5s9LNPmzyFO3//XYelqcms80netZc7hRXnkRsfiaeyG+tTZbbXLbrKEl8lPlGnK05A/EcQEARKCORfZvfeO1RsbrkkRGhxC1rHAzlzu7KI9o2aMeO0Y6/orkxzP3r4iG/mzjW+Pz5n5izSHjyozOVO810h6A7QVHm5ufzy08+0a+tLyKBBSFvNGgwGByiZfYqgf7mP0V6+zD1bkYuhiBtL2qFpMo0zH63z1D/dRohKTUis2JnPmo44IwiYE9Dzct9ImredzbkKze060X5KvKedxtrc9DyLHYS7ahDbnzr/nhqXL11i9IiRtPJpQcyaNWRlZprDqnfHQtAdqEmLi4s5euQIfXr1plOHjuzcsYMPHz44UAmrUpRi7v7QDTcXBd5jDpMl10fon7NzkBr3gbHI9SEFZ6LwaeTHsmtFVSmAuEYQaDgEiu+yNkiF0qUpXx/OQt7cthsfkIdsfSrz/wJ+j2qGxncJ153U3IqKiox7qvcM6kbgV53Zv3evw78/bq8bVAi6vUjaOZ3r164xLnIMLZt7s3LF97x8+dLOOdRScrlJzAmZxcIwL5Rug4nNkJnjKzjDzGZK2i26inUfouNBTHfc3EZzOKf+zFrUEn2RTQMjkJc0m9CZCwj3VNB40FbkzW06LRr5suSKtbWhS2V9NxWNR8fhbOaWnZ3Nxg0baNuyFcOHhXLu7Nl6NdNpy60sBN0WSnX4nYyMDBYvXGj0s0dNmcrdu3frsDSVzVrP051jGLstg5zEabRRqOix+g7F5ZLRpa6jp9KNiANvsZbsXBIiJX9fDHLu9XJJiY+CQMMloH/KrshIdmTkkDStJSplEGvuWFkbD2K64aYZxaG31tZGbjzj3FX0WHsfmUdvh2T7+J9/WDDvG6N/fNb0GTxITXXIctZGoYSg1wZlO+SRm5vLz5t/wq9NW0IGDeZ0khP42QtTWB06i6RcoOA60R0bofKdx8VyXoTcw5F4uihQVvjrive0JBl/nx3AiiQEgXpCoDBlFeEzT1Fibkv5ytUV/7kXsDS3XOIjtJ+xNQVKRVOmJ1l71x0N05XkZCJHjaaltw9rVq8m8/VrRytirZdHCHqtI69ehpKf/UhCAsE9e9E5IIBdO3fy8aNjGl/28emE//DXpxG5jrQNwbi7NGfikbdmEIq4vrgdbq0XkCw3A3g/hp5KNfL+PrNkxKEg0KAJZHMiKoy1f30akevS2NhbjbLZeI5amNs1lvmp8Jt/Wda9lbq2G26qgWyTW8ziAHwl//jhuDh6de9Bl4BO7N29p8H4x23BLwTdFkoO+p2rV64yJiLC+IS6euUqXjvSE6ruMVtHf83+F6ZlOfpnuwn3UOAZst20+E3/jB2D1GjD9pElMwOYlzAWT9cK/H0O2i6iWIJAbRPQPd5C5Li9mMxNz/NdYTRx0RK63bT4Tf9MemNEw4h9mTLurTyOjNGi9l3EVZmH69quk3l+0gzl5o2b8GvdhmFDQvj9zJkG5x8351HRsRD0isg40fl/Hz9m4fwFRh/SjKgo7t+7V+elL7gWzfB557CMOZfD8Yk+KJU9iLn3aSQhLYhrqqLz8hQr3zoUk/JdABrNaOKyZdS+zmspCiAIOAKBAq4vC2XBWUtrI+cYU7wVuHVfy/0yc5uOjzKA71PK+9aB4hRWdFTiMeoQjmJu//77L4sWlKwhmj5tGvfu1n3f5ggtXlEZhKBXRMYJz+fk5LBp40Z8W7UmNGQof/z+e908xeozSZg8go2p1p1GQfJCAlwb0XFBMtK2FTrjlLoH44/kWRM3ZLI/TIMmcE1ZhyR9qeDuKoJGJZTzDVpfLs4IAg2BgD4znmnhG3hgZW4FXFngj9q1PYuSjdaGcUpdO47/yZrbPkaolXRfc8/s4VrPq2NTCIg4ZPTN1xbPa1evMjYi0viWz6rvV/Lq1avaytqp8xGC7tTNJ1/4Mj9Tt+507fRVrfuZdOmbiZgUR6Zptt1U0OJ7xHRXofmpkMoAABcbSURBVPSexPEcyI2LwFPZgw2yW1Yls6iNEu+ppQvi9DxPnEsvHxXKkHgh6Caq4qjBEtCRvmkUU+Ney7xTDsX31tJLqaDlxGPkkMthaYe47utJk1nCXpS8EL9GTYk6ZVqTo8vYz/TQ3nStBUGX1gclxMcb1wd91bFkfZDz78NRuzemEPTa5V3rudX+StD3XJrXgVadhxA2dJjM71D6+rqjdGlM+K4Mri7+3A5xsQxRqRm85cmnzqqYf5PP8++jXwkOE4Je6zeTyNDxCLy/yAL/FgQOlrO1YYSFBOPvpkDpEcrujKss+9wOcVsH4q4aSOyTT0/iBalsmTiXYzdjCR9TcyN0yT/+06bNzvUGj+PdCcYSCUF30Iaxd7H+efSo7F3NmVHTSb1/395Z1Fp6hudbhKDXGm2RUcMkkM/NNeOJPpeN7tm2GhH08nts3Llzp2GitmOthaDbEaYzJGW+m5I0gj77xx9142evBiwh6NWAJy4VBGwhUCTt997I7H31RvgtSJZ51c2WxCy/U7oLphRtcuXyFc67C6ZltRzikxB0h2iG2i+EFA847uAhSvc73rfHefY7FoJe+/eLyLHhEpBedavulHtpnIq+vYNL4lRs38779xVFj2m4rKtbcyHo1SVYD643j0i09ocfHD4ikRD0enDTiSo4DYHqCLp5JMkhAweSlHgKvV5utazT4HDoggpBd+jmqd3CmccMnj1jZr2NGVy7VEVugkDDI/DkyROWLl5sjEExddJk/v7rr4YHoQ5qLAS9DqA7epZv375lw7r1tGnRkvDQUM6fPefoRRblEwQEAQcg8OeNG4wfOw7JP77iu+94/vy5A5Sq4RRBCHrDaetK11Tysx88cIDugUEEdenK/n37xL7JlaYoLhAE6jcBnU7HsaP/o39wHwLa+7M9dpvwj9dRkwtBryPwzpbtxQsXGDk8nNY+LYhZs5asrCxnq4IoryAgCNiRQF5eHlt++YX2vr4MHjCQxJMnhX/cjnyrkpQQ9KpQa8DXpKenM3f2bOO+8XNmzUb6LH4EAUGg4RB4+uQp0UuW4tO0GVMmTuKv27cbTuUdvKZC0B28gRy1eG/evGF9zDrjiH1E2HAunD/vqEUV5RIEBAE7EEi5mcLEr8cbhXz5t9/y/NkzO6QqkrAnASHo9qTZANMqKCjgwG+/0a1roPFXOpZ87+JHEBAEnJ+A5B8/fuwY/fv0pWO79mzbGkt+frmobs5fzXpTAyHo9aYp674i0ihdGq1Lq+Ol0bs0ihc/goAg4HwE3r17x9YtW+jg146B/fpz8sQJ4R93gmYUgl7jjWQg5/YeFoZ2pU1jDe6aZgQMiGLrtSzr6EhFr7m+ewlje/vhrVGjbeJLt2Gz+elUOu+qEg783VWWdBnItgwbN3IwvORgeABRSW+oSnalKNPS0pD86829mjBvzhwePnxY+i/xVxAQBByYwLOnT/l2WbRxWn3ShAncSkmp2dIacvhr9wLCu7SkqVqNR1N/Bkdt4XqWdZ9V9PoaexdH0te3KR4qDd5tAxk+azOn099Vqb96d2URQQNjsb17PMCogKmcflOd3rFmcQpBr1m+6DN2Ed7Ek+BFx3jwpoDC3EecWtKbph592XyvyJT7u9tsGtQUj4DJbDv/iDcfiyjIfcathO8Y6qPBf9IRnlrFOzZdbn30kZtLO9Jp6U1j3HHr/8ufKU5dR/c20zmXK///ypyVVsJLK+Jb+bRgVPgILl28WJnLxXcFAUGglgjcvnULScClhW6SoEvCXvM/ejJ2heLduBdL/pfKm4JC8h4lEt3LkyZ9NnHfonvcSEgTNzpPiuXCwzd8LCog71kKR74bQiu1H1OPPDWL4W5DyT/+SXSHjkTflOLE2/pTzIOYIPyiztZqbHhbSyd9Twh6ZWiVfVdHQf4HG24gHekbeuLuM4uzphDDUHiDbzuo8Jt/+VOKuZyf0QqV3zwu5lg//RU+iiXEXUO/nx/akGdJkvon2+jvPoR9L63TK6uG7EE2/4vwIHBtqs15ySZjdlLys0vvsAd27kKPoCAOHTgo/OxmfMShIFAXBKQtWKWpdGlKXZpal6bYpan2av/oCsj/YMPoQ5fOxh5qWs38A8vuMZpOyjYsvPxJ0XPPMbulKx3mXsC6eyzkn62D8VQH8+tDG/I0Vk7Pk9i+eA7eS+W7x6OM0XZhXaqteVWbZqUSEIJeKVyfvlxwjjmdJnGiMg935vnonxI7QI02It54Vv9sB4NcNYT/9rqCqaNCbixui7L5HC6b3/nmaVocF5Ky1BftiMO8NT+fn8rhJcMJ9PFA696S7hEr+GVuNzyCYkjVmb6Yf2oSXk1mcP6D6Zy9jqRd56Td59q2bMWP69cj7UonfgQBQaD2CEiL2qTFbdIiN2mxm7ToTVr8Zq+fgrOz6TrxeKVmBs3z1j/ZymCVhrHx0sOFnuc7BqBWh3LgdQWDk8LrLGujoOWcSxYPBuZpWhwXphDdVsPow5Z9T35qHNFhnWml1eDZIogxy39mfpAbPdeah5rO5/RED7ynn6cGukeLYlblgxD0qlCrpqAbsuL52ktFl+W3jLnnxI/CTdGLLY+t/UalxSu8MJtmLm1ZnmKD4RVdZ0kLVwbteml6QDC85vik1mh9x7HjxgtyMu9z5JsgvFwUuJUTdHLiGe3qwfQ/bHp6KC1ipf4+SE1F2i9e8rPPnzsPKV67+BEEBIGaIyC9ZvZddIl/XHr97ObNmzWSWfUE3UBW/FiaKzux8pY0Cs4hYaQKVc9f+LfC7rGQi7O8ULb5lls2dY+LaKMYwG6z4bnh9TGmttLgP3Ybf77IIet+AguDPFC6qMoJOuTEj0StnWY561ojJCufqBD0yjOD6gi6IZfLCwNw9wxh57/S3acnbV1XlMpIjn9mtkufvp4gFxVfH/vyKyP6Rxvp7uLNkhumaSFd+o8Eq1swPdHMOV50j5ggpbWg69NYH6DAf8Xf2GAfVSFYdk1WZiZShDfJzx4xchTJl0vdEGVfEQeCgCBQDQLSxi+TJ0w0BkqRNoSRNoapyZ/qCLoh9xKLA9Q0HbKdku4xjQ1dFLhFHKPi7lFP+nqpDx3L8S92j3r+2RiEsvki/izrHnWk/9gLrc80ksy7x7tr6NHIWtD1aevo4uLHyr9runesfCsJQa88s2oIehH//jaGtqq2TIx78kks9TxY2wml6msSPzOHo3+wjkAbBb34/HQ8XHqz9b/SR1oDWXvD0KpHccjCCVXEtcV+aMuP0MnhcLgC1dgTtTatJPnZpZjsXTt9ZYzRLsVqLyoyWxVTlXYS1wgCDZSA5B+XtmId1H+AcWtWaYtWaavW2vipsqAX/cuByFa4txnP4SefxFKfyroABe7jTn6mL9KTFtPFRkEv5kKUG8peWzB1j5nsD9OgHXnQ0kdfdJWlvhqrETo5cYxycWX8ic902LUBWiYPIegyUKxOvTvKDP+2+LUp/fXGw0WDT+vSz23xaz+Fw9lWV5qd0PEicTZd3FsTsTPVwteTHTcCN0Vftj8pFWCzyz4dFl6Uptzb8O3NLz8VFiSOR+UymH1lPicdjzb2xt1jMqcs/P46UtcGWfnQ4SMnx7iiDIvjs1WyLma1zxgMBs7+8QdhQ4cZ/ewbN2wgO7u2S1HtaogEBIE6IfD+/XtjcBQpSEq/4GBj0BR7+sflKvXuSBQBZX1jW/yau6FUNzPrL9sSMPkLfYnuBadmdcKz1Sh2pZq7+rI5HK5C1WcbTyvsHgu5NNsLZetovuyRLCBpvCvKQXvJLHXJ6x6xqZeaJpMSLf3+uvuss/KhAx9P8LVCwYg4x+uXhKDL3aFfOlfpKXdJzOcS2NiPCfvSLW8aadL9+U6GKD+/KO7mUl+UzWdzyfxer6CcxRdm0NglmNiyBwQDWXtC0apHcjC79C6WLi7i+uJ2MiP0bA6HKlCPS7R48Kgguxo7nXr/PjOjphv97AvmfcPjf/6psbxEwoKAMxN48eKFMVypFLZUCl8qhTGtq59Kj9B1L0ia24Wmvl+zP91ixFGyKG7nQNw+uyjuJtFtFbScfdGG/qqYi9PdUfbeanpAMGSyL1SDdsQBLLvHayzzkxmhZ8cR7tKICYk2dMa13AhC0KsCvFKCXszzE7Pp2rgD0+IzkJ9EfseFOa1RtZnJOYs7qqRwhQ+3EuKmoe+mT6+tGbK4uDKE9loNXr7DiLmcbVr8JpnA4830lHzo18ucROjSNtBb3YKZp808Ubp0NvVUyfjQU4npqCBg1b0a96Hbgv/169f8sGoVLb19iBw1mivJybZcJr4jCNR7Anf+/pupkyYb/eNLFy/mv//+q/M6V0rQi59xctZXNPWfQkKGfO/Iu/PMa+WK34yzloJrrGkhj7YMorE6mJ8+vbZmyLrA6iG+eKk9aD90DckWfaqefzd1M/rQTUuMdKRt6InWZzpnLLrHHwlWyvjQU9fylYs/P9z78mxpbTeGEPSqELdZ0A3kXV5KoMaLkF/S+OwO5/nSxjJNaBwwlZ2XH5NTUEzR+1fcPb6aMGljmYkJZRvL6NI3EjJ0E3ey3/PqwmJ6DfrVcrej4j9Z2lJBv61PTbvRGTI5OaUNHv6T2HPzJXlvHpIY3YfmCgVu3daTZn5vvo0j3NWL2RfKPy1XBZb9rvn48SN7du2mS0AnenXvweG4OOFntx9ekZKTEJD840mJpxgycCDt2vryy08/k5drtpqrjuths6Abckle0gUPz8FsSfts70j+7R8J8XKny5TtJD/OoaC4iPev7nJi9TBaq/2YklC6sYyO9I2DCdt4h+z3r7i4uAchv2aY+kGg+M/FtHUJZlvZDCYYMk8Q1dqNgIm7SXmZy5uHJ/kuuAkqFxW91j2wIPr2UChqz5lcdKzu0VhGIegWTWXjB1sFXf+UHYM1KF0Usr/asL2WGRa95tquRUT2bEtTpStarzZ0C53DT6ceVrj1q+H1XsaE7+C5hX+piFvLfHEbss/kJ5Jyep/KoW9C6NTUDa22Fb0nrGd1RHO0/X6xeCDIOz6Oxs3nkuyAN6xUDcnP/vuZMwwbEoJf6zZs2riRnJwcS5bikyBQzwh8+PCBndu306lDR/r06s3RI0coLjbNwjlKdW0VdP3TbQxVy/eNShcN4XszLapU9PoquxeNJriNF24KDc1bBxI+ZzOnH1a09auB13sjGLXjuYWgU5TCt21VDNtnue/H+9SDLBzSER+NBq+WPZm8fhVjm2kY+EuGWTnyODHWnZZzL1u5Ts2+VGeHQtDrDL0dMi54xP4Jw4i+mGsx5S6lrP8vlv6azy+0g1wSIrQ0n3LKtILUkMmhMC3d1qc5xHT7lyjdu3uP6dOmGf3sC+cv4N/Hj790ifi/IOBUBF6+fMnK5SuQ/OPjIsdw/do1pyp/XRW24OE+Jg9dyqVc83VDUmn0/Le1Dx6fXWgH5MYz1r0JUWavHxkyDzLCPZAfLaY066qG1vkKQbdm4hRnDLkp/Dw2nCWJzyrYovUj1xa1p+PiG8YnSX3GrwxUN2bAqks8y9ehL8jifsJcujXuyOJLJsdR8f21BLWK4qzjzODZ1B6vXr1i1fcradncmzEREVy9clX2OikinDRlWf2fSgTdKXhG8s6ljO3dnpZuKtzcWxAYOpfYSy9k3TANIQhF8YvzrBsTREu1K26e/oTM3s7Nt6Z2MbzZz0i1in6bHsk8WBaS/E1rND5zKteMdRSs6HOFLH2rQ+47d+7cIWrKVKN/fPHChWRkmI8U5a4Q50oIGMi9+RPjhy8i6VkFMxgfr7KkXXuW3ZCmIfVk/NofrUc/frj0lHydnoKsexyZG0jTDgu5XNY9FpO6piu+UX+IvdzFrWZHAoVpbB83hk0p1iNzi1zyLrGw82B2Gl+4/ED6kWgie/jSXN0IlcqL9r3HE3P6iUlUDK84NDKAaYlZViN+i3Qd+IM0Lblr506+6hhAcM9eJMTHW0xLSu/jSptsVHeq0tagO4acKyzvpsW7XzRHb78gv1hPUV4GV7ZE4ufajBG7H5n4A+9uN4AgFB+uE+2vofOso6TlFPDh5XU2hzRB2/sXHn3qf+0v6HUfrKi82UhivmzxEuNv6f+kc6eTkggZNNj42tfPm38i14H846XldOS/hWnbmBD5I7esRuaWpc67NJ/AQdtL3kf/kM7R6NH09m2C1tUVd09f+o5fy5knJt++4dVBIgKmkJRVfsRvmW5dfhIj9LqkX8W835+aio/C5HvSBKzgdgUPolXMwukvK+0Yhw4eYuwYf9q02dgxSjvRSWsapKnLwkKTsVauwjYG3TG8JXFCc9w6r+CW1R4UBfz9fSdUmqHsK10A4cxBKGwNyCHNZB6JQOs+kaSykQ8U/72CDi4dWfNp5bC9Bd2RghVJ95o0SyRteSzdi1KwovIPokcSEqr90Fm5e7q+fPs9p6c2Q1W2bklJ5+W3KpjFrC91NtVDCLqJhTiqpwTu3r1L1NSSqcu5s2eXLVCUQrpKO9TZ7ad80J2MLfRTaBh1SD6+vCHzKocOnOZBjjTV7NxBKGxdCFUR6+Kby/CtMUF3rGBF0kYv0v4KpYtl58ycZXQVjY2I5NpVeVdRRdzEeUHAnIAQdHMa4rheE3j+/DmjwsNRuzYq60xDQ4YaR0f2qHj5oDslOwD2/mzQHVO+zh2EosqCbijkbdpJontraTZsb9l2nHYdoTtQsCJpO+MpEyeV3X+SqEvT62kP0ky3gjgSBKpIQAh6FcGJy5yLwK2UFHr36GnRkZaOkAYPGFj9ONAyQXfSNwSiVI75bNCdMop65w5CUSVB1z9j/yh//H3cUGp6EP3H87KNl0oE3eRWKm0r878qGxfFOUqwIsnFI7l6zOtQehzg34Hz586X3Q7iQBCoCgEh6FWhJq5xKgLSO+pS/Oc1q1cjvdomjZDCw8KM7/JKe15LIVyluNBVX3wkH3Tnn43djFH0jpn5iisE5+RBKKok6GUwCsiIn4SvSwtmnCnZT8CeI3RHCFYkuXakaIJNPb3o4NfO+HA5fFgokyZMQNrWWHpD49eff0aaRRI/gkBVCQhBryo5cV29IiAtUqpadLeKg+68OzYGraIXv1YY576IgsLSV7WcKwiFXQJymN9BhpfsGahAFXbIeNaegu4IwYqktyqq+2aFOS5xLAjIERCCLkdFnBMEbCLw+aA7hhe7CVFqGHFQ/jVAw8s9DNV4Mz7hdcmiOCcOQlG9EboEu5DfJ6uMQTOkT/YU9PoSrMimW1J8qUETEILeoJtfVL7qBGwJupND0qRmqDt/z22rwEwfubW8E0r1EPaUvrbmxEEobBd0HXdX+qNstZg/zd8aLPyLlf4KWsy9bGySSgl6AwtWVPV7VlxZ3wkIQa/vLSzqVwMEbA+6Y8j6nbn+Gnz6L+XwzWfkFRZT8DaNM2uG0VLhTcT+xxbvyDprEArbBR30T/YSplXTbUEi/+QW8DHzLnFRAbh5DefAp4AZlRH0hhqsqAZubJGkkxMQgu7kDSiKXwcEKhl0R597j/gV4xnQvhkeCgVq95YEhc1n55XXZau6zWvhjEEoKiPoUl3fpx0mOqwzPioFSnULekSsIvGxaU+Aygi6ObuGGKzIvP7iuGETEILesNtf1L4eEGiIQShkm00EK5LFIk42HAJC0BtOW4ua1jsCDTcIRfmmFMGKyhMRnxsiASHoDbHVRZ3rBYGGHITCogFFsCILHOJDwyUgBL3htr2ouVMTaNhBKMybTgQrMqchjhsyASHoDbn1Rd0FAUFAEBAE6g0BIej1pilFRQQBQUAQEAQaMgEh6A259UXdBQFBQBAQBOoNASHo9aYpRUUEAUFAEBAEGjIBIegNufVF3QUBQUAQEATqDQEh6PWmKUVFBAFBQBAQBBoyASHoDbn1Rd0FAUFAEBAE6g2B/wfT7ceAq0CJDQAAAABJRU5ErkJggg==" width="440" height="102"></p>
<p>A. <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mo>∆</mo><msub><mi>H</mi><mn>2</mn></msub><mo>+</mo><mo>∆</mo><msub><mi>H</mi><mn>1</mn></msub><mo>-</mo><mo>∆</mo><msub><mi>H</mi><mn>4</mn></msub></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><msub><mi>H</mi><mn>2</mn></msub><mo mathvariant="italic">-</mo><mo>∆</mo><msub><mi>H</mi><mn>1</mn></msub><mo>+</mo><mo>∆</mo><msub><mi>H</mi><mn>4</mn></msub></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><msub><mi>H</mi><mn>2</mn></msub><mo>+</mo><mo>∆</mo><msub><mi>H</mi><mn>1</mn></msub><mo>-</mo><mo>∆</mo><msub><mi>H</mi><mn>4</mn></msub></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>-</mo><mo>∆</mo><msub><mi>H</mi><mn>2</mn></msub><mo mathvariant="italic">-</mo><mo>∆</mo><msub><mi>H</mi><mn>1</mn></msub><mo>+</mo><mo>∆</mo><msub><mi>H</mi><mn>4</mn></msub></math></p>
</div>
<br><hr><br><div class="question">
<p>What can be deduced from the facts that ozone absorbs UV radiation in the region of 340 nm and molecular oxygen in the region of 242 nm?</p>
<p>A. The bond between atoms in molecular oxygen is a double bond.</p>
<p>B. The bonds in ozone are delocalized.</p>
<p>C. The bonds between atoms in ozone are stronger than those in molecular oxygen.</p>
<p>D. The bonds between atoms in molecular oxygen need more energy to break.</p>
</div>
<br><hr><br><div class="question">
<p>Consider the following reaction:</p>
<p style="text-align: left;padding-left:90px;">N<sub>2</sub> (g) + 3H<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2NH<sub>3</sub> (g)</p>
<p> <img src="data:image/png;base64,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"></p>
<p>Which calculation gives Δ<em>H</em><sup>Θ</sup>, in kJ, for the forward reaction?</p>
<p>A. 2<em>z</em> − <em>y</em> − 3<em>x</em></p>
<p>B. <em>y</em> + 3<em>x</em> − 2<em>z</em></p>
<p>C. <em>y</em> + 3<em>x</em> − 6<em>z</em></p>
<p>D. 6<em>z</em> − <em>y</em> − 3<em>x</em></p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>5.35g of solid ammonium chloride, NH<sub>4</sub>Cl(s), was added to water to form 25.0g of solution. The maximum decrease in temperature was 14 K. What is the enthalpy change, in kJmol<sup>-1</sup>, for this reaction? (Molar mass of NH<sub>4</sub>Cl = 53.5gmol<sup>-1</sup>; the specific heat capacity of the solution is 4.18 Jg<sup>-1</sup>K<sup>-1</sup>)</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H = + \frac{{25.0 \times 4.18 \times \left( {14 + 273} \right)}}{{0.1 \times 1000}}">
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mo>+</mo>
<mfrac>
<mrow>
<mn>25.0</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mrow>
<mo>(</mo>
<mrow>
<mn>14</mn>
<mo>+</mo>
<mn>273</mn>
</mrow>
<mo>)</mo>
</mrow>
</mrow>
<mrow>
<mn>0.1</mn>
<mo>×</mo>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H = - \frac{{25.0 \times 4.18 \times 14}}{{0.1 \times 1000}}">
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mo>−</mo>
<mfrac>
<mrow>
<mn>25.0</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mn>14</mn>
</mrow>
<mrow>
<mn>0.1</mn>
<mo>×</mo>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H = + \frac{{25.0 \times 4.18 \times 14}}{{0.1 \times 1000}}">
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mo>+</mo>
<mfrac>
<mrow>
<mn>25.0</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mn>14</mn>
</mrow>
<mrow>
<mn>0.1</mn>
<mo>×</mo>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\Delta H = + \frac{{25.0 \times 4.18 \times 14}}{{1000}}">
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mo>+</mo>
<mfrac>
<mrow>
<mn>25.0</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mn>14</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<br><hr><br><div class="question">
<p>Which equation represents the standard enthalpy of formation of lithium oxide?</p>
<p><br>A. 4Li (s) + O<sub>2 </sub>(g) → 2Li<sub>2</sub>O (s)</p>
<p>B. 2Li (s) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>O<sub>2 </sub>(g) → Li<sub>2</sub>O (s)</p>
<p>C. Li (s) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>4</mn></mfrac></math>O<sub>2 </sub>(g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>Li<sub>2</sub>O (s)</p>
<p>D. Li (g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>4</mn></mfrac></math>O<sub>2 </sub>(g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>Li<sub>2</sub>O (g)</p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy of combustion of a fuel was determined using the calorimeter shown. The final result was lower than the literature value.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="408" height="457"></p>
<p>Which factors could have contributed to this error?</p>
<p style="padding-left:60px;">I. Not all heat from the combustion was transferred to the calorimeter.<br>II. Incomplete combustion occurred.<br>III. The temperature probe touched the bottom of the calorimeter.</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Questions 13 and 14 are about an experiment to measure the enthalpy of combustion, Δ<em>H</em><sub>c</sub>, of ethanol, using the apparatus and setup shown.</span></p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question">
<p><span style="background-color: #ffffff;">Which quantity is likely to be the most inaccurate due to the sources of error in this experiment?</span></p>
<p><span style="background-color: #ffffff;">A. Mass of ethanol burnt<br></span></p>
<p><span style="background-color: #ffffff;">B. Molecular mass of ethanol<br></span></p>
<p><span style="background-color: #ffffff;">C. Mass of water<br></span></p>
<p><span style="background-color: #ffffff;">D. Temperature change</span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Methane undergoes incomplete combustion.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2CH<sub>4</sub> (g) + 3O<sub>2</sub> (g) → 2CO (g) + 4H<sub>2</sub>O (g)</span></p>
<p><span style="background-color: #ffffff;">What is the enthalpy change, in kJ, using the bond enthalpy data given below?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="266" height="167"></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. [2(1077) + 4(463)] − [2(414) + 3(498)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. [2(414) + 3(498)] − [2(1077) + 4(463)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. [8(414) + 3(498)] − [2(1077) + 8(463)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. [2(1077) + 8(463)] − [8(414) + 3(498)]</span></span></p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy change of the following reaction?</p>
<p style="text-align:center;">CH<sub>2</sub>CHCH<sub>2</sub>CH<sub>3</sub> + HBr → CH<sub>3</sub>CHBrCH<sub>2</sub>CH<sub>3</sub></p>
<p style="text-align:center;"><img src="data:image/png;base64,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"></p>
<p>A. –119.6 kJ</p>
<p>B. +119.6 kJ</p>
<p>C. –119.8 kJ</p>
<p>D. +119.8 kJ</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the enthalpy change of reaction for the following equation?</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="363" height="160"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. <em>x + y + z</em></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. <em>−x − y + z </em></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. <em>x − y − z</em></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. <em>x − y + z</em></span></span></p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Consider the following equations.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2Al (s) + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{2}">
<mfrac>
<mn>3</mn>
<mn>2</mn>
</mfrac>
</math></span>O<sub>2</sub> (g) → Al<sub>2</sub>O<sub>3</sub> (s) Δ<em>H</em><sup>Ɵ</sup> = −1670 kJ<br>Mn (s) + O<sub>2</sub> (g) → MnO<sub>2</sub> (s) Δ<em>H</em><sup>Ɵ</sup> = −520 kJ</span></p>
<p><span style="background-color: #ffffff;">What is the standard enthalpy change, in kJ, of the reaction below?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">4Al (s) + 3MnO<sub>2</sub> (s) → 2Al<sub>2</sub>O<sub>3</sub> (s) + 3Mn (s)</span></p>
<p><span style="background-color: #ffffff;">A. −1670 + 520</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: center;text-decoration: none;text-indent: 0px;white-space: normal;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{2}">
<mfrac>
<mn>3</mn>
<mn>2</mn>
</mfrac>
</math></span></span>(−1670) + 3(520)</span></p>
<p><span style="background-color: #ffffff;">C. 2(−1670) + 3(−520)</span></p>
<p><span style="background-color: #ffffff;">D. 2(−1670) + 3(520)</span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">When equal masses of X and Y absorb the same amount of energy, their temperatures rise by 5 °C and 10 °C respectively. Which is correct?</span></p>
<p><span style="background-color: #ffffff;">A. The specific heat capacity of X is twice that of Y.</span></p>
<p><span style="background-color: #ffffff;">B. The specific heat capacity of X is half that of Y.</span></p>
<p><span style="background-color: #ffffff;">C. The specific heat capacity of X is one fifth that of Y.</span></p>
<p><span style="background-color: #ffffff;">D. The specific heat capacity of X is the same as Y.</span></p>
</div>
<br><hr><br><div class="question">
<p>Consider the following reactions:</p>
<p style="padding-left:90px;">Fe<sub>2</sub>O<sub>3</sub> (s) + CO (g) → 2FeO (s) + CO<sub>2</sub> (g) Δ<em>H</em><sup>Θ</sup> = −3 kJ</p>
<p style="padding-left:90px;">Fe (s) + CO<sub>2</sub> (g) → FeO (s) + CO (g) Δ<em>H</em><sup>Θ</sup> = +11 kJ</p>
<p>What is the Δ<em>H</em><sup>Θ</sup> value, in kJ, for the following reaction?</p>
<p style="padding-left:120px;">Fe<sub>2</sub>O<sub>3</sub> (s) + 3CO (g) → 2Fe (s) + 3CO<sub>2</sub> (g)</p>
<p> </p>
<p>A. −25</p>
<p>B. −14</p>
<p>C. +8</p>
<p>D. +19</p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct about identical pieces of magnesium added to two solutions, X and Y, containing hydrochloric acid at the same temperature?</p>
<p style="text-align:center;"><img src="data:image/png;base64,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"><br><br></p>
<p>A. Solution X will reach a higher maximum temperature.</p>
<p>B. Solution Y will reach a higher maximum temperature.</p>
<p>C. Solutions X and Y will have the same temperature rise.</p>
<p>D. It is not possible to predict whether X or Y will have the higher maximum temperature because we cannot identify the limiting reactant.</p>
</div>
<br><hr><br><div class="question">
<p>Which describes the reaction shown in the potential energy profile?</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-10_om_07.10.46.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/13"></p>
<p>A. The reaction is endothermic and the products have greater enthalpy than the reactants.</p>
<p>B. The reaction is endothermic and the reactants have greater enthalpy than the products.</p>
<p>C. The reaction is exothermic and the products have greater enthalpy than the reactants.</p>
<p>D. The reaction is exothermic and the reactants have greater enthalpy than the products.</p>
</div>
<br><hr><br><div class="question">
<p>What is the heat change, in kJ, when 100.0 g of aluminium is heated from 19.0 °C to 32.0 °C?</p>
<p>Specific heat capacity of aluminium: 0.90 J g<sup>−1 </sup>K<sup>−1</sup></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>90</mn><mo>×</mo><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>13</mn><mo>.</mo><mn>0</mn></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>90</mn><mo>×</mo><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>286</mn></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>90</mn><mo>×</mo><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>13</mn><mo>.</mo><mn>0</mn></mrow><mn>1000</mn></mfrac></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>90</mn><mo>×</mo><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>286</mn></mrow><mn>1000</mn></mfrac></math></p>
</div>
<br><hr><br><div class="question">
<p>In which order does the oxygen–oxygen bond enthalpy increase?</p>
<p>A. H<sub>2</sub>O<sub>2</sub> < O<sub>2</sub> < O<sub>3</sub></p>
<p>B. H<sub>2</sub>O<sub>2</sub> < O<sub>3</sub> < O<sub>2</sub></p>
<p>C. O<sub>2</sub> < O<sub>3</sub> < H<sub>2</sub>O<sub>2</sub></p>
<p>D. O<sub>3</sub> < H<sub>2</sub>O<sub>2</sub> < O<sub>2</sub></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">A student obtained the following data to calculate </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi></math>, </span><span class="fontstyle0">using </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi><mo>=</mo><mi>m</mi><mi>c</mi><mi mathvariant="normal">Δ</mi><mi>T</mi></math>.</p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>m</mi><mo>=</mo><mn>20</mn><mo>.</mo><mn>2</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>±</mo><mn>0</mn><mo>.</mo><mn>2</mn><mo> </mo><mi mathvariant="normal">g</mi></math></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><mi>T</mi><mo>=</mo><mn>10</mn><mo>°</mo><mi mathvariant="normal">C</mi><mo>±</mo><mn>1</mn><mo>°</mo><mi mathvariant="normal">C</mi></math></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>c</mi><mo>=</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">g</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></p>
<p><span class="fontstyle0">What is the percentage uncertainty in the calculated value of </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi></math></span><span class="fontstyle0">?<br></span></p>
<p><span class="fontstyle0">A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>2</mn></math><br></span></p>
<p><span class="fontstyle0">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn><mo>.</mo><mn>2</mn></math><br></span></p>
<p><span class="fontstyle0">C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>11</mn></math><br></span></p>
<p><span class="fontstyle0">D. </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>14</mn></math></p>
</div>
<br><hr><br><div class="question">
<p>Which combustion reaction releases the <strong>least</strong> energy per mole of C<sub>3</sub>H<sub>8</sub>?</p>
<p style="text-align:center;">Approximate bond enthalpy / kJ mol<sup>−1</sup><br>O=O 500<br>C=O 800<br> C≡O 1000</p>
<p><br>A. C<sub>3</sub>H<sub>8 </sub>(g) + 5O<sub>2 </sub>(g) → 3CO<sub>2 </sub>(g) + 4H<sub>2</sub>O (g)</p>
<p>B. C<sub>3</sub>H<sub>8 </sub>(g) + <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mfrac><mn>9</mn><mn>2</mn></mfrac></math>O<sub>2 </sub>(g) → 2CO<sub>2 </sub>(g) + CO (g) + 4H<sub>2</sub>O (g)</p>
<p>C. C<sub>3</sub>H<sub>8 </sub>(g) + 4O<sub>2 </sub>(g) → CO<sub>2 </sub>(g) + 2CO (g) + 4H<sub>2</sub>O (g)</p>
<p>D. C<sub>3</sub>H<sub>8 </sub>(g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>7</mn><mn>2</mn></mfrac></math>O<sub>2 </sub>(g) → 3CO (g) + 4H<sub>2</sub>O (g)</p>
<p> </p>
<p style="text-align:center;"><em>Chemistry: Atoms First 2e, https://openstax.org/books/chemistry-atoms-first-2e/pages/9-4-strengths-of-ionic-andcovalent-bonds © 1999–2021, Rice University. Except where otherwise noted, textbooks on this site are licensed under a Creative Commons Attribution 4.0 International License. </em><br><em>(CC BY 4.0) https://creativecommons.org/licenses/ by/4.0/.</em></p>
</div>
<br><hr><br><div class="question">
<p>Which statement describes an endothermic reaction?</p>
<p><br>A. The bonds broken are stronger than the bonds formed.</p>
<p>B. The enthalpy of the reactants is higher than the enthalpy of the products.</p>
<p>C. The temperature of the surroundings increases.</p>
<p>D. The products are more stable than the reactants.</p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy changes for two reactions are given.</p>
<p>Br<sub>2</sub> (l) + F<sub>2</sub> (g) → 2BrF (g) <em>ΔH</em> = <em>x</em> kJ<br>Br<sub>2</sub> (l) + 3F<sub>2</sub> (g) → 2BrF<sub>3</sub> (g) <em>ΔH</em> = <em>y</em> kJ</p>
<p>What is the enthalpy change for the following reaction?</p>
<p>BrF (g) + F<sub>2</sub> (g) → BrF<sub>3</sub> (g)</p>
<p>A. <em>x</em> – <em>y</em></p>
<p>B. –<em>x</em> + <em>y</em></p>
<p>C. <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>(–<em>x</em> + <em>y</em>)</p>
<p>D. <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>(<em>x</em> – <em>y</em>)</p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which equation shows the enthalpy of formation, </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><msub><mi>H</mi><mi mathvariant="normal">f</mi></msub></math><span class="fontstyle0">, of ethanol?</span></p>
<p>A. <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mi mathvariant="normal">C</mi><mo> </mo><mfenced><mi mathvariant="normal">s</mi></mfenced><mo>+</mo><mn>3</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>5</mn></msub><mi>OH</mi><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced></math></p>
<p>B. <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>4</mn><mi mathvariant="normal">C</mi><mo> </mo><mfenced><mi mathvariant="normal">s</mi></mfenced><mo>+</mo><mn>6</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><mn>2</mn><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>5</mn></msub><mi>OH</mi><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced></math></p>
<p>C. <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mi mathvariant="normal">C</mi><mo> </mo><mfenced><mi mathvariant="normal">s</mi></mfenced><mo>+</mo><mn>3</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><mfrac><mn>1</mn><mn>2</mn></mfrac><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>5</mn></msub><mi>OH</mi><mo> </mo><mfenced><mi mathvariant="normal">l</mi></mfenced></math></p>
<p>D. <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>4</mn><mi mathvariant="normal">C</mi><mo> </mo><mfenced><mi mathvariant="normal">s</mi></mfenced><mo>+</mo><mn>6</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><mn>2</mn><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>5</mn></msub><mi>OH</mi><mo> </mo><mfenced><mi mathvariant="normal">l</mi></mfenced></math></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the enthalpy change of the reaction?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">C<sub>6</sub>H<sub>14</sub> (l) → C<sub>2</sub>H<sub>4</sub> (g) + C<sub>4</sub>H<sub>10</sub> (g)</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="321" height="151"></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. + 1411 + 2878 + 4163<br></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. + 1411 − 2878 − 4163<br></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. + 1411 + 2878 − 4163<br></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. − 1411 − 2878 + 4163</span></span></p>
</div>
<br><hr><br><div class="question">
<p>When sodium carbonate powder is added to ethanoic acid, the beaker becomes cooler.</p>
<p>Possible enthalpy diagrams are shown.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="637" height="286"></p>
<p>Which correctly describes the reaction?</p>
<p><img src="data:image/png;base64,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" width="380" height="171"></p>
</div>
<br><hr><br><div class="question">
<p>The C=N bond has a bond length of 130 pm and an average bond enthalpy of 615kJmol<sup>-1</sup>. Which values would be most likely for the C-N bond?</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<br><hr><br><div class="question">
<p>Which is correct when Ba(OH)<sub>2</sub> reacts with NH<sub>4</sub>Cl?</p>
<p>Ba(OH)<sub>2</sub> (s) + 2NH<sub>4</sub>Cl (s) → BaCl<sub>2</sub> (aq) + 2NH<sub>3</sub> (g) + 2H<sub>2</sub>O (l) Δ<em>H</em><sup>Θ</sup> = +164 kJ mol<sup>−1</sup></p>
<p> </p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p>In which reaction do the reactants have a lower potential energy than the products? </p>
<p>A. CH<sub>4</sub>(g) + 2O<sub>2</sub>(g) → CO<sub>2</sub>(g) + 2H<sub>2</sub>O(g)<br>B. HBr(g) → H(g) + Br(g) <br>C. Na<sup>+</sup>(g) + Cl<sup>-</sup>(g) → NaCl(s) <br>D. NaOH(aq) + HCl(aq) → NaCl(aq) + H<sub>2</sub>O(l)</p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy change, in kJ, of the following reaction?</p>
<p>3H<sub>2</sub> (g) + N<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2NH<sub>3</sub> (g)</p>
<p><img src="data:image/png;base64,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"></p>
<p>A. (6 × 391) − [(3 × 436) + 945]</p>
<p>B. (3 × 391) − (436 + 945)</p>
<p>C. −[(3 × 436) + 945] + (3 × 391)</p>
<p>D. −(6 × 391) + [(3 × 436) + 945]</p>
</div>
<br><hr><br><div class="question">
<p>Which is the enthalpy change of reaction, Δ<em>H</em>?</p>
<p style="text-align:center;"><img src="data:image/png;base64,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" width="512" height="414"></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which equation represents the N–H bond enthalpy in NH<sub>3</sub>?</span></p>
<p>A. NH<sub>3</sub> (g) → N (g) + 3H (g)</p>
<p><span style="background-color: #ffffff;">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>3</mn></mfrac></math>NH<sub>3</sub> (g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>3</mn></mfrac></math>N (g) + H (g)<br></span></p>
<p><span style="background-color: #ffffff;">C. NH<sub>3</sub> (g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>N<sub>2</sub> (g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>2</mn></mfrac></math>H<sub>2</sub> (g)<br></span></p>
<p><span style="background-color: #ffffff;">D. NH<sub>3</sub> (g) → •NH<sub>2</sub> (g) + •H (g)</span></p>
</div>
<br><hr><br><div class="question">
<p>Two 100 cm<sup>3</sup> aqueous solutions, one containing 0.010 mol NaOH and the other 0.010 mol HCl, are at the same temperature.</p>
<p>When the two solutions are mixed the temperature rises by <em>y °</em>C.</p>
<p>Assume the density of the final solution is 1.00 g cm<sup>−3</sup>.</p>
<p>Specific heat capacity of water = 4.18 J g<sup>−1</sup> K<sup>−1</sup></p>
<p>What is the enthalpy change of neutralization in kJ mol<sup>−1</sup>?</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{200 \times 4.18 \times y}}{{1000 \times 0.020}}">
<mfrac>
<mrow>
<mn>200</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mi>y</mi>
</mrow>
<mrow>
<mn>1000</mn>
<mo>×</mo>
<mn>0.020</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{200 \times 4.18 \times y}}{{1000 \times 0.010}}">
<mfrac>
<mrow>
<mn>200</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mi>y</mi>
</mrow>
<mrow>
<mn>1000</mn>
<mo>×</mo>
<mn>0.010</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{100 \times 4.18 \times y}}{{1000 \times 0.010}}">
<mfrac>
<mrow>
<mn>100</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mi>y</mi>
</mrow>
<mrow>
<mn>1000</mn>
<mo>×</mo>
<mn>0.010</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{200 \times 4.18 \times (y + 273)}}{{1000 \times 0.010}}">
<mfrac>
<mrow>
<mn>200</mn>
<mo>×</mo>
<mn>4.18</mn>
<mo>×</mo>
<mo stretchy="false">(</mo>
<mi>y</mi>
<mo>+</mo>
<mn>273</mn>
<mo stretchy="false">)</mo>
</mrow>
<mrow>
<mn>1000</mn>
<mo>×</mo>
<mn>0.010</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<br><hr><br><div class="question">
<p>The energy from burning 0.250 g of ethanol causes the temperature of 150 cm<sup>3</sup> of water to rise by 10.5 °C. What is the enthalpy of combustion of ethanol, in kJ mol<sup>–1</sup>?</p>
<p>Specific heat capacity of water: 4.18 J g<sup>–1 </sup>K<sup>–1</sup>.<br><br></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>150</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mn>10</mn><mo>.</mo><mn>5</mn></mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>250</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle></mfrac></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>150</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mn>10</mn><mo>.</mo><mn>5</mn></mrow><mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>250</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle><mo>×</mo><mn>1000</mn></mrow></mfrac></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>150</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mfenced><mrow><mn>273</mn><mo>+</mo><mn>10</mn><mo>.</mo><mn>5</mn></mrow></mfenced></mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>250</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle></mfrac></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>150</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mfenced><mrow><mn>273</mn><mo>+</mo><mn>10</mn><mo>.</mo><mn>5</mn></mrow></mfenced></mrow><mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>250</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle><mo>×</mo><mn>1000</mn></mrow></mfrac></math></p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>Which describes an exothermic reaction?</p>
<p><img src="data:image/png;base64,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" width="421" height="182"></p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy of combustion of butane in <strong>kJ mol</strong><sup>−<strong>1</strong></sup>?</p>
<p>2C<sub>4</sub>H<sub>10</sub>(g) + 13O<sub>2</sub>(g) → 8CO<sub>2</sub>(g) + 10H<sub>2</sub>O(l)</p>
<p style="text-align: center;"><span class="mjpage mjpage__block"><math xmlns="http://www.w3.org/1998/Math/MathML" display="block" alttext="\begin{array}{*{20}{l}} {{\text{C(s)}} + {{\text{O}}_2}{\text{(g)}} \to {\text{C}}{{\text{O}}_2}{\text{(g)}}}&{\Delta H = x{\text{ kJ}}} \\ {{{\text{H}}_2}{\text{(g)}} + \frac{{\text{1}}}{2}{{\text{O}}_2}{\text{(g)}} \to {{\text{H}}_2}{\text{O(l)}}}&{\Delta H = y{\text{ kJ}}} \\ {4{\text{C(s)}} + {\text{5}}{{\text{H}}_2}{\text{(g)}} \to {{\text{C}}_4}{{\text{H}}_{{\text{10}}}}{\text{(g)}}}&{\Delta H = z{\text{ kJ}}} \end{array}">
<mtable columnalign="left" rowspacing="4pt" columnspacing="1em">
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>C(s)</mtext>
</mrow>
<mo>+</mo>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<mtext>C</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mi>x</mi>
<mrow>
<mtext> kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo>+</mo>
<mfrac>
<mrow>
<mtext>1</mtext>
</mrow>
<mn>2</mn>
</mfrac>
<mrow>
<msub>
<mrow>
<mtext>O</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>O(l)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mi>y</mi>
<mrow>
<mtext> kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mn>4</mn>
<mrow>
<mtext>C(s)</mtext>
</mrow>
<mo>+</mo>
<mrow>
<mtext>5</mtext>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mn>2</mn>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
<mo stretchy="false">→</mo>
<mrow>
<msub>
<mrow>
<mtext>C</mtext>
</mrow>
<mn>4</mn>
</msub>
</mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mrow>
<mtext>10</mtext>
</mrow>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>(g)</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mi mathvariant="normal">Δ</mi>
<mi>H</mi>
<mo>=</mo>
<mi>z</mi>
<mrow>
<mtext> kJ</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
</mtable>
</math></span></p>
<p>A. 4<em>x </em>+ 5<em>y </em>− <em>z </em></p>
<p>B. 4<em>x </em>+ 5<em>y </em>+ <em>z </em></p>
<p>C. 8<em>x </em>+ 10<em>y </em>− 2<em>z </em></p>
<p>D. 8<em>x </em>+ 5<em>y </em>+ 2<em>z</em></p>
</div>
<br><hr><br><div class="question">
<p>Why is the value of the enthalpy change of this reaction calculated from bond enthalpy data less accurate than that calculated from standard enthalpies of formation?</p>
<p>2C<sub>2</sub>H<sub>6</sub>(g) + 7O<sub>2</sub>(g) → 4CO<sub>2</sub>(g) + 6H<sub>2</sub>O(g)</p>
<p>A. All the reactants and products are gases.</p>
<p>B. Bond enthalpy data are average values for many compounds.</p>
<p>C. Elements do not have standard enthalpy of formation.</p>
<p>D. Standard enthalpies of formation are per mole.</p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy change of combustion of urea, (NH<sub>2</sub>)<sub>2</sub>CO, in kJ mol<sup>−1</sup>?</p>
<p style="text-align: center;">2(NH<sub>2</sub>)<sub>2</sub>CO(s) + 3O<sub>2</sub>(g) → 2CO<sub>2</sub>(g) + 2N<sub>2</sub>(g) + 4H<sub>2</sub>O(l)</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-10_om_07.13.07.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/14"></p>
<p>A. 2 × (−333) −2 × (−394) −4 × (−286)</p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</math></span>[2 × (−394) + 4 × (−286) −2 × (−333)]</p>
<p>C. 2 × (−394) + 4 × (−286) −2 × (−333)</p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</math></span>[2 × (−333) −2 × (−394) −4 × (−286)]</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which is correct for the reaction?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2Al (s) + 6HCl (aq) → 2AlCl<sub>3</sub> (aq) + 3H<sub>2</sub> (g) Δ<em>H</em> = −1049 kJ</span></p>
<p><span style="background-color: #ffffff;">A. Reactants are less stable than products and the reaction is endothermic.</span></p>
<p><span style="background-color: #ffffff;">B. Reactants are more stable than products and the reaction is endothermic.</span></p>
<p><span style="background-color: #ffffff;">C. Reactants are more stable than products and the reaction is exothermic.</span></p>
<p><span style="background-color: #ffffff;">D. Reactants are less stable than products and the reaction is exothermic.</span></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What is the <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">H</mi><mo>-</mo><mi mathvariant="normal">H</mi></math> bond enthalpy, in </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math><span class="fontstyle0">, in the </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub></math> <span class="fontstyle0">molecule?</span></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><mn>2</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mfenced><mi mathvariant="normal">g</mi></mfenced></math></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><msub><mi>H</mi><mi mathvariant="normal">f</mi></msub><mfenced><mrow><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi></mrow></mfenced><mo>=</mo><mi>x</mi><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></p>
<p><img style="display: block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="274" height="94"></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>-</mo><mi>y</mi><mo>+</mo><mn>4</mn><mi>z</mi></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac><mfenced><mrow><mi>x</mi><mo>-</mo><mi>y</mi><mo>+</mo><mn>4</mn><mi>z</mi></mrow></mfenced></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>-</mo><mi>y</mi><mo>+</mo><mn>2</mn><mi>z</mi></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac><mfenced><mrow><mi>x</mi><mo>-</mo><mi>y</mi><mo>+</mo><mn>2</mn><mi>z</mi></mrow></mfenced></math></p>
</div>
<br><hr><br><div class="question">
<p>Which expression gives the enthalpy change, Δ<em>H</em>, for the thermal decomposition of calcium carbonate?</p>
<p><img src="data:image/png;base64,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"></p>
<p>A. Δ<em>H</em> = Δ<em>H</em><sub>1</sub> − Δ<em>H</em><sub>2</sub></p>
<p>B. Δ<em>H</em> = 2Δ<em>H</em><sub>1</sub> − Δ<em>H</em><sub>2</sub></p>
<p>C. Δ<em>H</em> = Δ<em>H</em><sub>1</sub> − 2Δ<em>H</em><sub>2</sub></p>
<p>D. Δ<em>H</em> = Δ<em>H</em><sub>1</sub> + Δ<em>H</em><sub>2</sub></p>
</div>
<br><hr><br><div class="question">
<p>What is the enthalpy change of the reaction, in kJ?</p>
<p style="text-align:center;">2C (graphite) + O<sub>2 </sub>(g) → 2CO (g)</p>
<p style="text-align:center;"><img src="data:image/png;base64,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" width="409" height="117"></p>
<p>A. −394 − 283</p>
<p>B. 2(−394) + 2(−283)</p>
<p>C. −394 + 283</p>
<p>D. 2(−394) + 2(283)</p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>Which combination of ΔH<sub>1</sub>, ΔH<sub>2</sub>, and ΔH<sub>3</sub> would give the enthalpy of the reaction?</p>
<p style="text-align:center;">CS<sub>2 </sub>(l) + 3O<sub>2 </sub>(g) → CO<sub>2 </sub>(g) + 2SO<sub>2 </sub>(g)</p>
<p style="text-align:center;">ΔH<sub>1</sub> C (s) + O<sub>2 </sub>(g) → CO<sub>2 </sub>(g)<br>ΔH<sub>2</sub> S (s) + O<sub>2 </sub>(g) → SO<sub>2 </sub>(g)<br>ΔH<sub>3</sub> C (s) + 2S (s) → CS<sub>2 </sub>(l)</p>
<p>A. ΔH = ΔH<sub>1</sub> + ΔH<sub>2</sub> + ΔH<sub>3</sub></p>
<p>B. ΔH = ΔH<sub>1</sub> + ΔH<sub>2</sub> − ΔH<sub>3</sub></p>
<p>C. ΔH = ΔH<sub>1</sub> + 2(ΔH<sub>2</sub>) + ΔH<sub>3</sub></p>
<p>D. ΔH = ΔH<sub>1</sub> + 2(ΔH<sub>2</sub>) − ΔH<sub>3</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct?</p>
<p>A. In an exothermic reaction, the products have more energy than the reactants.</p>
<p>B. In an exothermic reversible reaction, the activation energy of the forward reaction is greater than that of the reverse reaction.</p>
<p>C. In an endothermic reaction, the products are more stable than the reactants.</p>
<p>D. In an endothermic reversible reaction, the activation energy of the forward reaction is greater than that of the reverse reaction.</p>
</div>
<br><hr><br><div class="question">
<p>What is the correct interpretation of the following potential energy profile?</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="328" height="317"></p>
<p style="text-align:left;"><br>A. Endothermic reaction; products more stable than reactants.</p>
<p style="text-align:left;">B. Exothermic reaction; products more stable than reactants.</p>
<p style="text-align:left;">C. Endothermic reaction; products less stable than reactants.</p>
<p style="text-align:left;">D. Exothermic reaction; products less stable than reactants.</p>
<p> </p>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Questions 13 and 14 are about an experiment to measure the enthalpy of combustion, Δ<em>H</em><sub>c</sub>, of ethanol, using the apparatus and setup shown.</span></p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question">
<p><span style="background-color: #ffffff;">What is the enthalpy of combustion, Δ<em>H</em><sub>c</sub>, of ethanol in kJ mol<sup>−1</sup>?<br>Maximum temperature of water: 30.0°C<br>Initial temperature of water: 20.0°C<br>Mass of water in beaker: 100.0 g<br>Loss in mass of ethanol: 0.230 g<br><em>M</em><sub>r</sub> (ethanol): 46.08<br>Specific heat capacity of water: 4.18 J g<sup>−1</sup> K<sup>−1</sup><br><em>q = mc</em>Δ<em>T</em></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mrow><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mo>(</mo><mn>10</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>273</mn><mo>)</mo></mrow><mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>230</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle><mo>×</mo><mn>1000</mn></mrow></mfrac></math></span></p>
<p><span style="background-color: #ffffff;">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mrow><mn>0</mn><mo>.</mo><mn>0230</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mn>10</mn><mo>.</mo><mn>0</mn></mrow><mrow><mstyle displaystyle="true"><mfrac><mrow><mn>100</mn><mo>.</mo><mn>0</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle><mo>×</mo><mn>1000</mn></mrow></mfrac></math></span></p>
<p><span style="background-color: #ffffff;">C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mrow><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mn>10</mn><mo>.</mo><mn>0</mn></mrow><mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>230</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle><mo>×</mo><mn>1000</mn></mrow></mfrac></math></span></p>
<p><span style="background-color: #ffffff;">D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mrow><mn>100</mn><mo>.</mo><mn>0</mn><mo>×</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo>×</mo><mn>10</mn><mo>.</mo><mn>0</mn></mrow><mstyle displaystyle="true"><mfrac><mrow><mn>0</mn><mo>.</mo><mn>230</mn></mrow><mrow><mn>46</mn><mo>.</mo><mn>08</mn></mrow></mfrac></mstyle></mfrac></math></span></p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy of combustion of ethanol is determined by heating a known mass of tap water in a glass beaker with a flame of burning ethanol.</p>
<p>Which will lead to the greatest error in the final result?</p>
<p>A. Assuming the density of tap water is 1.0 g cm<sup>−3</sup></p>
<p>B. Assuming all the energy from the combustion will heat the water</p>
<p>C. Assuming the specific heat capacity of the tap water is 4.18 J g<sup>−1</sup> K<sup>−1</sup></p>
<p>D. Assuming the specific heat capacity of the beaker is negligible</p>
</div>
<br><hr><br>