File "markSceme-SL-paper1.html"

Path: /IB QUESTIONBANKS/5 Fifth Edition - PAPER/HTML/Biology/Topic 2/markSceme-SL-paper1html
File size: 100.64 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 molecule diagram corresponds to the name?</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 curve shows the concentration of product during the course of an enzyme-catalysed reaction?</p>
<p style="text-align:center;"><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">
<p>Some centres commented that answer B could be considered a correct answer. The question is asking about the course of the reaction which makes A the best answer. Over 70 % of candidates answered correctly.</p>
</div>
<br><hr><br><div class="question">
<p>The apparatus shown was used to investigate the effect of varying carbon dioxide concentration on the rate of photosynthesis. Carbon dioxide concentrations were varied by adding different amounts of sodium hydrogen carbonate (NaHCO<sub>3</sub>) to water.</p>
<p style="text-align:center;"><img src="data:image/png;base64,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"></p>
<p style="text-align:left;"> </p>
<p style="text-align:left;">What is the dependent variable in this investigation?</p>
<p style="text-align:left;">A. Temperature</p>
<p style="text-align:left;">B. Light intensity</p>
<p style="text-align:left;">C. Amount of NaHCO<sub>3</sub> added</p>
<p style="text-align:left;">D. Volume of oxygen produced</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 property of water accounts for its moderating effects on the Earth’s atmosphere?</p>
<p>A. Cohesive</p>
<p>B. Thermal</p>
<p>C. Transparency</p>
<p>D. Adhesive</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>The diagram shows a molecular structure.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Which type of molecule is shown?</p>
<p>A. Amino acid<br>B. Lipid<br>C. Carbohydrate<br>D. Nucleotide</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>In which processes are macromolecules broken down into monomers?</p>
<p>A. Anabolism and catabolism</p>
<p>B. Catabolism and hydrolysis</p>
<p>C. Hydrolysis and reduction</p>
<p>D. Reduction and anabolism</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>The diagram shows the structure of palmitic acid.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAjwAAABzCAYAAACcntgKAAAR6klEQVR4Ae3dX4xU1R3A8UPTRwUSMXara0IMccE2wPqH6JLwryBpWcMToKu1YbWyC6KVpO62pgpFlz5QLcpCWjExBVMfrMhiA2tUiIBZEYTUwFYgVhZYTX1Q1/dpfgfP7vy5d9zZuWfOzP19T7LMzL0z957f55x774+Ze88dl8lkMoaCAAIIIIAAAgikWOAHKY6N0BBAAAEEEEAAAStAwkNHQAABBBBAAIHUC5DwpL6JCRABBBBAAAEESHjoAwgggAACCCCQegESntQ3MQEigAACCCCAAAkPfQABBBBAAAEEUi9AwpP6JiZABBBAAAEEECDhoQ8ggAACCCCAQOoFSHhS38QEiAACCCCAAAIkPPQBBBBAAAEEEEi9AAlP6puYABFAAAEEEECAhIc+gAACCCCAAAKpFyDhSX0TEyACCCCAAAIIkPDQBxBAAAEEEEAg9QIkPKlvYgJEAAEEEEAAARIe+gACCFSlwPXXX2cWLVoYWbfBwUEj89tWrYqcX85EWaYsW9YRVaROMj/psmvXTrvcvT09kYvetKnLzj9+/Hjk/HImYp2r58ta2k6sZflRRdpe5ktfoCQvkIqEJ9SOImTn1bZTDmkd6mCQvbmHqkOofpYdO88RQACBJARSkfAkAcEyEEAAAQQQQCC9AiQ86W1bIkMAAQQQQACB7wRIeOgKCCCAAAIIIJB6gR+mPkICRACBmhXo7z9tT+IMEcCsWbeGWK1pX91m/yq9cqwrJ97dvdXIH6WyAqlKeELtKEJ2Xm075VDWIQ8GbpcQsg6h+llDw1TT2/uWIxh+lCuofNepr++oqaurG16neyJXaUlb+CrdW7eZJc3NBYuXK3t8HiSxHiH3bd3evtp0dHSOrPC7Z3KVlhzHKH4EUpXwhNpRhOy82nbKoaxDHgzcph+yDqH6mYudRwQQQKBcAc7hKVeQzyOAAAIIIIBA1QuQ8FR9E1FBBBBAAAEEqldAxklzY3bJmGHyt2L58qobQJGEp3r7EDVDAAEEEECgqgXkfKelS++ydXz77XfN+fMX7N+MmTNMZ2eHTXy+/fbbqoiBhKcqmoFKIIAAAgggUFsCcpK1nEgv51Zu277dTJkyZTgAOSm7q2uTOfL+YfP0xo3D00M+SdVJyyEhWTcCCCQrIP9TjCty9VSx+XGfG8102XEXK1FXjRV7/2jntbTca+QvrsgBJOrKnrj3lzK9mCXWpUgWf29jY2PRfitX50VdoVd8qeHmbnl+i135mjUPR1ZC+vPLL79sdr2y06xsbc1JiCI/4HniuEwmk/G8DhaPAAIIIIAAAikSOHPmjFmwYJ654/Ym849XX42NbNu2btPV9Yz9tqdYQh+7gARn8JNWgpgsCgEE/Am4kyH9rSF6yaHWK7WRdYcooWLWtl7XxqHauZy+deniRfvxyZMnF11M/XX1dv7AwEDR91ViZioTnlAbjTRYqHVrW69G6+wdgsb2zo6f5wggEFZgaGjIVmDCxAlhK1LC2lOZ8JQQP29FAAEEEEAAgRIFbmxosJ848dGJop8cuHD5m536+svf9BR9s+eZJDyegVk8AggggAACaROQK7Jk9He5CqvYZecHDxy0od9226zgBCQ8wZuACiCAAAIIIFD9AocPHcpJbtY+vNZWOu6y8127dtqEqOWee4NfoSUVJeGp/j5GDRFAAAEEEAgqsH/fPnP3PSvMyRMjP2HJJfQy1o5cdi4jLcuVW67IgIQy8KBcxfX7J55wk4M+kvAE5WflCCCAAAIIVLeAJDsP/voB87e/vmiaZs/Oqaxcar579x47TS5TdxdUyLk9kgzJJetXXHFFzmdCvWDgwVDyrBcBBBBAAIEqF8hOdu5cvDiytjKg4vcN2Bn5wQpP5BueCoOzOgQQQAABBGpB4PuSnZde2pFzTk+1x0TCU+0tRP0QQAABBBCosMD3JTsb1q83W7b8xXzxxRcVrtnYV0fCM3Y7PokAAggggEDqBEaT7Pzz9dfMa6+9bm644YaaiZ+Ep2aaiooigAACCCDgVyCtyY6okfD47TssHQEEEEAAgZoQcMnOA60PmqgTlOVnrFr8Zsfhk/A4CR4RQAABBBBQKiCDCsql55Ls/OHJJwsUaj3ZkYC4LL2gWZmAAAIIIICALoEf1dWZxx5bZx599DcFgach2ZGgxmUymUxBdExAAAEEEEAAAfUCaUl2pCH5SUt9dwYAAQQQQACBQoE0JTsSXaIJj9xLQ4aVHhwcLJQzxixatNDOj5yZwES5j4fcv8MNbS2Psk65gZnPIneKlfU2Ns7MWbdMK3YX2STqtLenx97DJDvmFcuXG5nus2i0ln4kttnWnR0dOfeP8Wkuyw5Vh1D9TGPMobYtrK+z2zbHjMt7seeee7amT1C+HEXev/KTVlJl1UMPZerrr81cunQpcpELF/7Mzo+cWebEnj177LKXL1uW+eSTT4aX1tX1jJ0udfNRZF0zZ87ISGxSB1d27vz78PQ4D/fesT662DoefzwzNDRkFyPrcu0gdfBRtFmLrfQr6dvZpseOHRueLs99lpB1CNXPNMYcatvCmmNG/v7t7NmzGflLUzFJBuMOtHEHeF8JjyQd0lhyUIoqboednZBEva/UabKTkJgk4YmK2e28ZP1JFznwSszd3VsjF+2so+oV+YFRTtRoLQmlWB94990CJfGVeeLts4SqQ6h+JpbaYg61bWFduOVyzCg0ScOUVFyl9dKOHfZ7q7a2trzvry6/vP/+X0VOL3fiG2/sNv39p01n5+9MXV1dweKWNDebgQsDZvz48QXzyp2wefNmu4j77vtl5KI2bfqT6e3dn/hPatqs5eeFXa/sNHfc3mTmzJ1bYC3tLncEHhgYsNY+7gocsg6h+pnGmENtW1gXbNaGY0ahSRqmBE145FyIcsr58xfsx/f37rePN99yS+Ti5KDU0dGZMy+JdX/874/tMqdNnZaz7OwXbW3t2S/tb8Q5E0p8ITHLDurLL/9nD8JxB1i5e638uZJEvLIsbdYffNBnCefMneMoCx5bWu7NmVaudfbCpL1D1GGs/UzqLjcUHGu5+eZbzPTp02sq5nLbO/R+rJb6V61b19IxY6zbcDV/zkvCM2vWrRWNWQ7+kyZdbeIO/r4q89VXX9lF//jaa32tInK5Q0NDdvrkyZMj5/ucqM3aWfr4ls4te7SPla7DWPvZkcNHYkOaMGGCueknN8XOz59RKzHn13ssr0NtW66uWDsJf48ajxn+NEtfspeEp6/vaORPPHL2u/wE5Ir7n417XcnHUOvWtl5pU20xh4o3e/sJWYcXv/uJObs+lXgeKuZQ62XbqkSvGllHqHYOtd6RyNPzLNHL0kOxyLc78r8j35eA58c3ceJEO+nSxYv5s7y+vvLKK+3yP/30U6/riVq4Nmtn8M0337inwR4rXYeQ/cwha4o51LaFtRPw/6jxmOFfdfRrSEXCs2zZMhvxsQ8/jI1cxhFJejyepqYmu75Tp0/FrlfOt0l6PJ4pU6aYhoap5sj7h4smeRJv0uPxaLOeP3+BbduDBw7GtrEbh0na2kcJVYeQ/UxjzKG2Layjt1rtx4xKf4EQ3QoJT03yUrNQl6W7S4PjLkt3l4dnj6GSVNzFLkt3Y/T4GAPIxRR3Wbq7rDLp8WE0WjvLqMvS3fglMjSBPPdVQtUhVD8TR20xh9y2sM7dcl2/13zMePbZP2fmz5+XOfTee7k4NfwqFePwiL/roJL0ZB/k3VgecclQuW3nkhpJfLI3Djd+SdwYPeWuVz7vdlISo+wspcijxFpsjJ5y163N2iU1+abSz9x4R1HJULnO2Z8PWYdQ/UxjzKG2LaxHBg7lmHF5zyN9YseOFzPTp/8007pyZSoGIUxNwiNNJAcg9y2THJzcgHDZiUj2QSSp55JkuIOCW688yjTpND6LxOYSHLdueS07Tp9Fo7V8myYJrHOWR9k5StJbqRKqDqH6mbhqiznUtoU1x4yo/djnn3+eWf/UU3a/J4++j2lRdUhqGndLT/gnQhaHAAIIIIBA2gROnjxp/rhhgzl77oxZu/YRs3Jla82FSMJTc01GhRFAAAEEEAgjsH/fPvN4x2/NVVdNMhvWbzBNs2eHqcgY1pqKq7Ty45bROMsdkTN/maN9HWrd2tYr7aExZtcPNcauNWbX5pV81GYdKt6Q+7Gx9qc7Fy82hw4dMS0tLebue1aYB1pbzblz58a6uIp+LpUJT0UFWRkCCCCAAAKKBOSuBvKT1tGjx2zU8+bNKbiljAyLsmL58uH/mEpS2bZqlTl+/HiBlMyTgYmjyuDgoF2GfLbcQsJTriCfRwABBBBAQKHANddcY2Rk9Z6eN43cB0+KjN8jiU5nZ4eZMXOGOXWq3462L3dgkLJ06V12bDr7osL/eLm1RIVjYHUIIIAAAgggEEhAbvjrygsvPG8Hxe3eus0saW52k+3tprZt3246OzpMd/dWU19fb/JvvDz8Zk9P+IbHEyyLRQABBBBAQJOA/PwkycwdtzflJDvZBmsfecS+3Lx5c/bkijwn4akIMytBAAEEEEAg3QLvvPO2DXDO3DmxgdbV1dmESO5/6et2PHEr5yetOBmmI4AAAggggMCoBdzNfsePH1/0M3Juj9wL8j/9/Ubu2Selv/+096urSXiKNgszEUAAAQQQQGA0Al9//bV924TxE0bz9pz3yA2xe3vfypkmL+Rnslmzbi2YPpYJ/KQ1FjU+gwACCCCAAAI5AnIispSBCwM50/NfnPjohJ10Y0ND/iyvr0l4vPKycAQQQAABBHQIzJ+/wAZ68MDB2IDlsnX5OWvSpKuHf86KfXPCM0h4EgZlcQgggAACCGgUkBOS29tX24RGBh6MKk9v3Ggnr1u3Lmq212mcw+OVl4UjgAACCCCgR6Cjo9N89t/P7MCDAwMDZs2ah42MzCzn4mxYv968+a+9Nimq9Bg80gIkPHr6IZEigAACCCDgXUAGGJRveHr29Jhp00bO0/nFz5eY3bv3mMbGRu91iFoBCU+UCtMQQAABBBBAYMwC8g3OaL/FOX/+Qux65GeyYvNjPxgxY1wmk8lETGcSAggggAACCCCQGgFOWk5NUxIIAggggAACCMQJpCLhkd8K5fbye3t6IuPctKnLzo+6LX3kB0Y5UZYn65XlRxWpj8yPO1s96jOjnda2apVdtpwIFlUWLVpo50fNK2eaRmtpQ/GMKuIv86U9fJZQdQjVz8RSW8yhti2sC7fcNB4zCqPUNyUVCY++ZiNiBBBAAAEEEChFgISnFC3eiwACCCCAAAI1KUDCU5PNRqURQAABBBBAoBQBEp5StHgvAggggAACCNSkQKrG4Wlf3Wbkr9Klu3urkb8QJam7yJZad23W/f2nvZwEXop7yDqE6mcaYw61bWFdytZY3ntDHjPKq3ltfzpVCU/31m1mSXNzQYvIGfc+ExK5d4gMp51f5Cot3wlYX99RIwMz5Re5qkh2YL6KNuuGhqmmt/etAk65SqtSyUDIOoTqZxpjDrVtYT2yeaf5mDESpb5n/KSlr82JGAEEEEAAAXUCJDzqmpyAEUAAAQQQ0CdAwqOvzYkYAQQQQAABdQIkPOqanIARQAABBBDQJ0DCo6/NiRgBBBBAAAF1AtwtXV2TEzACCCCAAAL6BPiGR1+bEzECCCCAAALqBEh41DU5ASOAAAIIIKBPgIRHX5sTMQIIIIAAAuoESHjUNTkBI4AAAgggoE+AhEdfmxMxAggggAAC6gRIeNQ1OQEjgAACCCCgT4CER1+bEzECCCCAAALqBEh41DU5ASOAAAIIIKBPgIRHX5sTMQIIIIAAAuoESHjUNTkBI4AAAgggoE+AhEdfmxMxAggggAAC6gRIeNQ1OQEjgAACCCCgT4CER1+bEzECCCCAAALqBEh41DU5ASOAAAIIIKBPgIRHX5sTMQIIIIAAAuoESHjUNTkBI4AAAgggoE+AhEdfmxMxAggggAAC6gRIeNQ1OQEjgAACCCCgT4CER1+bEzECCCCAAALqBEh41DU5ASOAAAIIIKBPgIRHX5sTMQIIIIAAAuoESHjUNTkBI4AAAgggoE+AhEdfmxMxAggggAAC6gRIeNQ1OQEjgAACCCCgT4CER1+bEzECCCCAAALqBP4PdS86ZzKiGhcAAAAASUVORK5CYII="></p>
<p>What type of fatty acid is palmitic acid?</p>
<p>A. It is monounsaturated.</p>
<p>B. It is polyunsaturated.</p>
<p>C. It is saturated.</p>
<p>D. It is a trans-fatty acid.</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 are necessary to make DNA replication semi-conservative?</p>
<p>I. Separation of the strands by RNA polymerase</p>
<p>II. Complementary base pairing</p>
<p>III. Use of a pre-existing strand as a template</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>
<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>