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</div><h2>HL Paper 3</h2><div class="specification">
<p>Lutetium-177 is used in radiotherapy. It emits beta radiation when it decays.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a nuclear equation to show the decay of lutetium-177.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The half-life of lutetium-177 is 6.73 days. Determine the percentage of a sample of lutetium-177 remaining after 14.0 days.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the low environmental impact of most medical nuclear waste.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\({}_{71}^{177}{\text{Lu}} \to {}_{71}^{177}{\text{Hf}} + {}_{ - 1}^0{\text{e}}\) «+ \(\nu \)»</p>
<p>Hf</p>
<p>correct <em>A</em> and <em>Z</em> <em><strong>AND</strong> </em>beta product</p>
<p><em>Accept “β/ β<sup>–</sup>/e/e<sup>–</sup>” for “\({}_{-1}^{~0}{\text{e}}\)”.</em></p>
<p><em>Accept “<sup>177</sup>Lu → <sup>177</sup>Hf + e<sup>–</sup> «+ \(\nu \)»”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>number of half-lives = \(\frac{t}{{{t_{^{\frac{1}{2}}}}}}\) = 2.08</p>
<p><em><strong>OR</strong></em></p>
<p>\(\frac{{N\left( t \right)}}{{{N_0}}} = {0.5^{\frac{{14.0}}{{6.73}}}}\)</p>
<p><em><strong>OR</strong></em></p>
<p>\(\lambda = \) «\(\frac{{{\text{ln}}2}}{{{t_{^{\frac{1}{2}}}}}} = \frac{{{\text{ln}}2}}{{6.73}} = \)» 0.103 «day<sup>–1</sup>»</p>
<p><em><strong>OR</strong></em></p>
<p>\(\frac{{N\left( t \right)}}{{{N_0}}} = {e^{ - 0.103\, \times 14.0}}\)</p>
<p>23.6 «%»</p>
<p><em>Award<strong> [2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>emits weak ionising radiation</p>
<p><em><strong>OR</strong></em></p>
<p>low activity/radioactivity</p>
<p>can be stored until material becomes inactive <em><strong>AND</strong> </em>then disposed with normal waste</p>
<p>«isotopes» have short lives</p>
<p><em><strong>OR</strong></em></p>
<p>exist for a short period of time</p>
<p><em>Award <strong>[1 max]</strong> for “low-level waste/LLW”.</em></p>
<p><em><strong>[Max 2 Marks]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Targeted Alpha Therapy (TAT) is a technique that involves using alpha-radiation to treat leukemia and other dispersed cancers.</p>
</div>
<div class="specification">
<p>Yttrium-90 and lutetium-177 are used in radiotherapy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why alpha-radiation is particularly suitable for this treatment.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how the alpha-radiation in TAT is directed to cancer cells.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the type of radiation emitted by these two radioisotopes.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an equation for the one-step decay of yttrium-90.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The half-life of lutetium-177 is 6.75 days. Calculate the percentage remaining after 27 days.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>more damaging than other radiation types<br><em><strong>OR</strong></em><br>very damaging to «cancer» cells<br><em><strong>OR</strong></em><br>high ionizing density «of alpha particles»</p>
<p>absorbed within a very short range of emission<br><em><strong>OR</strong></em><br>causes little damage to surrounding tissues</p>
<p> </p>
<p><em>Accept “high ionizing power «of alpha particles»” for M1. </em></p>
<p><em>Accept “low penetrating power «of alpha particles»” for M2.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«radioactive isotope/radionuclide/alpha-emitter» administered using carrier drug/protein/antibodies</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>beta/β «radiation»</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\({}_{39}^{90}Y \to {}_{40}^{90}Zr + \beta \)</p>
<p> </p>
<p><em>Accept "</em>\(_{ - 1}^{\;\,0}e/e/{e^ - }\)<em>" <strong>OR</strong> "</em>\(_{ - 1}^{\;\,0}\beta /{\beta ^ - }\)<em>"</em></p>
<p><em>Accept ECF from (b) (i) if incorrect radiation identified, eg, </em>\(_{39}^{90}Y \to _{37}^{86}Rb + _2^4He\)</p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>ALTERNATIVE 1:</strong><br>«4 half-lives»<br>6.25 «%»</p>
<p><strong>ALTERNATIVE 2:</strong><br>«<em>N<sub>t</sub></em> = <em>N<sub>0</sub></em>\({\left( {0.5} \right)^{\frac{t}{{{t_{1/2}}}}}} = 100{\left( {0.5} \right)^{\frac{{27}}{{6.75}}}} = \)» 6.25 «%»</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>A number of drugs have been developed to treat excess acidity in the stomach.</p>
</div>
<div class="question">
<p>Outline how ranitidine (Zantac) functions to reduce stomach acidity.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>Blocks/binds H2-histamine receptors «in cells of stomach lining»<br><em><strong>OR</strong></em><br>prevents histamine molecules binding to H2-histamine receptors «and triggering acid secretion»</p>
<p> </p>
<p><em>Accept “H2 receptor antagonist”</em></p>
<p><strong><em>[1 mark]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Technetium-99m is the most widely used medical radioisotope. It is usually made on-site in medical facilities from isotopes of molybdenum.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce equations for the following nuclear reactions:</p>
<p>(i) Molybdenum-98 absorbs a neutron.</p>
<p>(ii) The isotope produced in (a) (i) decays into technetium-99m.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Molybdenum-99 has a half-life of 66 hours, while technetium-99m has a half-life of 6 hours. Outline why technetium-99m is made on-site.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>two</strong> reasons, other than its half-life, why technetium-99m is so useful in medical diagnosis.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the nature of the radioactive waste that is generated by the use of technetium-99m in medical diagnosis.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>\({}_{{\rm{42}}}^{98}{\rm{Mo}}\) + \({}_{{\rm{0}}}^{1}{\rm{n}}\) → \({}_{{\rm{42}}}^{99}{\rm{Mo}}\)</p>
<p><em>Accept <sup>98</sup>Mo + <sup>1</sup>n/n → <sup>99</sup>Mo.</em></p>
<p><br>ii</p>
<p>\({}_{42}^{99}{\text{Mo}} \to {}_{43}^{99\,{\text{m}}}{\text{Tc}} + {}_{ - 1}^0\beta \)</p>
<p><em>Accept “ \({}_{ - 1}^0e\)” for “ \({}_{ - 1}^0\beta \)”.</em></p>
<p><em>Accept “ \({}^{99}Mo \to {}_{}^{99\,{\text{m}}}Tc + \beta \)”.</em></p>
<p><em>Accept “ \({}_{ - 1}^0e/{e^ - }/e\)” for “\(\beta \)”.</em></p>
<p><em>Do not penalize “ \({}_{}^{99}Tc\)” for “ \({}_{}^{99\,{\text{m}}}Tc\)”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>molybdenum-99 can be easily transported «before it decays»/more stable<br><em><strong>OR<br></strong></em>«most of» technetium-99m will decay during transportation</p>
<p><em>Do <strong>not</strong> accept just “short half-life of Tc-99m”</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>emits gamma rays<br><em><strong>OR<br></strong></em>emissions escape from body<br><em><strong>OR<br></strong></em>emissions detected by gamma camera<br><em><strong>OR<br></strong></em>radiation dose is low</p>
<p>chemically reactive/versatile/transition metal bonds to a range of «biologically active» substances</p>
<p><em>Do <strong>not</strong> accept “short half-life of Tc-99m”.<br>Accept “energy of photons produced is «relatively» low” and “no high energy beta emission” for M1.<br>Accept “…has ability to form tracers” for “…bonds to a range of «biologically active» substances".</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>low-level «radioactive» waste/LLW<br><em><strong>OR<br></strong></em>small amounts of ionizing radiation for short time</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question">
<p>Taxol is produced using a chiral auxiliary. Describe how the chiral auxiliary functions to produce the desired product.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>chiral molecule/auxiliary/optically active species added/connected/attached «to non-chiral starting molecule to force reaction to follow a certain path»</p>
<p>one enantiomer produced<br><em><strong>OR</strong></em><br>chiral auxiliary creates stereochemical condition «necessary to follow a certain pathway»<br><em><strong>OR</strong></em><br>stereochemical induction<br><em><strong>OR</strong></em><br>existing chiral centre affects configuration of new chiral centres</p>
<p>«after new chiral centre created» chiral auxiliary removed «to obtain desired product»</p>
<p><em><strong>[3 marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">Aspirin, paracetamol (acetaminophen), morphine and diamorphine (heroin) are all pain killers. Their structures are given in Table 20 of the Data Booklet.</p>
</div>
<div class="question">
<p class="p1">Suggest a reagent that could be used to convert morphine into diamorphine and state the name of the type of reaction taking place.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">ethanoic acid / ethanoic anhydride / ethanoyl chloride;</p>
<p class="p1"><em>Accept formula instead of name.</em></p>
<p class="p1">diesterification / esterification / condensation;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most could name the type of the reaction, and many did not name the reagent, with “carboxylic acid” being a common answer.</p>
</div>
<br><hr><br><div class="specification">
<p>Radioactive isotopes are used in a variety of medical procedures including medical imaging and radiotherapy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Lead-212 is a radioisotope that is used in the treatment of cancer. It is produced from another radioisotope by alpha decay. Formulate the equation for its production.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify <strong>one</strong> advantage of using Targeted Alpha Therapy (TAT) and one form of cancer commonly treated by this method.</p>
<p>Advantage:<br><br></p>
<p>Cancer treatment:<br> </p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Technetium-99m, used for radioimaging scans, has a half-life of 6.01 hours. Calculate the mass of a 5.80×10<sup>−9</sup> g dose remaining after 24.04 hours.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline an ethical implication of using nuclear treatments in medicine.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>\({}_{84}^{216}{\rm{Po}} \to {}_2^4{\rm{He + }}{}_{82}^{212}{\rm{Pb}}\)<br>correct reactant<br>correct alpha particle</p>
<p><em>Atomic numbers not required for mark.</em><br><em>Accept “α”/“\({}_2^4\alpha \)” for “\({}_2^4{\rm{He}}\)”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 31">
<div class="section">
<div class="layoutArea">
<div class="column">
<p><em>Advantage</em>:<br>selectively kills cancer cells/targets cancer cells only<br><em><strong>OR</strong></em><br>does not damage healthy cells</p>
<div class="page" title="Page 31">
<div class="section">
<div class="layoutArea">
<div class="column">
<p><em>Do <strong>not</strong> accept “targets cancer”. Reference must be made to “cells”.</em></p>
</div>
</div>
</div>
</div>
<p><em>Cancer treatment:<br></em>melanoma<br><em><strong>OR</strong></em><br>leukemia<br><em><strong>OR</strong></em><br>rectal<br><em><strong>OR</strong></em><br>breast<br><em><strong>OR</strong></em><br>ovarian<br><em><strong>OR</strong></em><br>prostate<br><em><strong>OR</strong></em><br>pancreatic<br><em><strong>OR</strong></em><br>cancers that spread around the body/produce metastasis/dispersed cancers</p>
<p><em>Accept “skin cancer”.</em></p>
</div>
</div>
</div>
</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em><br>\(\lambda \ll = \frac{{\ln 2}}{{6.01}} \gg \approx 0.115 \ll {{\rm{h}}^{ - 1}} \gg \)<br>«remaining mass = 5.80×10<sup>-9</sup>×e<sup>-0.115 × 24.04</sup>=»3.63×10<sup>-10</sup> «g»</p>
<p><em><strong>ALTERNATIVE 2:</strong></em><br>\( \ll \frac{{24.04}}{{6.01}} = \gg 4 \ll {\rm{half lives}} \gg \)<br>\( \ll \frac{{5.80 \times {{10}^{ - 9}}}}{{{2^4}}} = \gg 3.63 \times {10^{ - 10}} \ll {\rm{g}} \gg \)</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<div class="page" title="Page 32">
<div class="section">
<div class="layoutArea">
<div class="column">
<p>risk vs benefit <strong>«</strong>patient and environment<strong>»<br><em>OR</em></strong><br>providing adequate information to patients about risks<br><em><strong>OR</strong></em><br>security concerns if nuclear radioactive material ended up with terrorists<br><em><strong>OR</strong></em><br>cultural resistance/superstition/lack of education<br><em><strong>OR</strong></em><br><strong>«</strong>potential<strong>»</strong> exposure of health workers <strong>«</strong>to radioactivity<strong>»</strong><br><em><strong>OR</strong></em><br>proper training «in radioactive hazards» not always given to workers<br><em><strong>OR</strong></em><br>proper disposal of radioactive materials</p>
<div class="page" title="Page 32">
<div class="section">
<div class="layoutArea">
<div class="column">
<p><em>Accept other valid ethical implications (note that risk of cancer to the patient is not an ethical issue, while risk of cancer to the health worker is).</em></p>
<p><em>Do <strong>not</strong> accept “security concerns” alone – there must be some reference to an ethical implication.</em></p>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The discovery of penicillin by Alexander Fleming in 1928 is often given as an example of serendipity in science.</p>
</div>
<div class="specification">
<p class="p1">The structure of a particular type of penicillin called dicloxacillin is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-01_om_12.44.26.png" alt="M12/4/CHEMI/HP3/ENG/TZ2/D3.d"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe what happens to bacteria when they come into contact with penicillin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Identify the \(\beta \)-lactam ring by drawing a circle around it.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Explain why the \(\beta \)-lactam ring is so important in the mechanism of the action</p>
<p class="p1">of penicillin.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>State the name of the functional group in dicloxacillin, circled below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-01_om_13.49.15.png" alt="M12/4/CHEMI/HP3/ENG/TZ2/D3.d.iii"></p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Comment on the fact that many bacteria are now resistant to penicillins.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">interferes with enzymes/chemicals that bacteria need to make <span style="text-decoration: underline;">cell walls</span> / interferes with <span style="text-decoration: underline;">cell wall</span> formation;</p>
<p class="p1">osmosis/osmotic pressure causes cell wall to break/burst / water enters cell causing it to burst / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> <img src="images/Schermafbeelding_2016-11-01_om_13.52.38.png" alt="M12/4/CHEMI/HP3/ENG/TZ2/D3.d/M"></span> ;</p>
<p class="p2">(ii) <span class="Apple-converted-space"> </span>ring strain / bond angles are approx 90° / should be 109° or 120° / <em>OWTTE</em>;</p>
<p class="p2">ring breaks / produces reactive amide group / <em>OWTTE</em>;</p>
<p class="p2">(so) penicillin can become bonded to enzyme/penicillinase;</p>
<p class="p2">(iii) <span class="Apple-converted-space"> </span>amide;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">caused by overprescription/overuse/overdose / not completing course of penicillin / use of antibiotics in animal feed / <em>OWTTE</em>;</p>
<p class="p1">penicillins with modified side chains must be developed/cocktail of drugs must be taken to overcome resistant bacteria / <em>OWTTE</em>;</p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most answers scored at least one mark in (c), or came close to it – most that did not were not specific enough or failed to mention cell walls.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (d), the \(\beta \)-lactam ring was usually correctly identified, as was the circled amide group. In part (d)(ii), few answers scored full marks, although most identified the relevance of the bond angles in causing ring strain.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In (e), many more scored the overprescription mark than the one for modifying the side chain.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Nuclear radiation is dangerous because of its ability to damage cells but it can also be used in nuclear medicine.</p>
</div>
<div class="specification">
<p>Iodine-131 is released in nuclear explosions but is used in scanners for thyroid cancer. The half-life of iodine-131 is 8.02 days.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Yttrium-90 is used in treating certain cancers.</p>
<p>Formulate a nuclear equation for the beta decay of yttrium-90.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Lutetium-177 is a common isotope used for internal radiation therapy.</p>
<p>Suggest why lutetium-177 is an ideal isotope for the treatment of certain cancers based on the type of radiation emitted.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the rate constant, \(\lambda \), in day<sup>−1</sup>, for the decay of iodine-131 using section 1 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the time, in days, for 90% of the sample to decay.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A breathalyser measures the blood alcohol content from a breath sample. Formulate half-equations for the reactions at the anode (negative electrode) and the cathode (positive electrode) in a fuel cell breathalyser.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><sup>90</sup>Y → <sup>90</sup>Zr + β<sup>–</sup></p>
<p> </p>
<p><em>Accept β, e or e<sup>–</sup>.</em><br><em>Accept <sup>90</sup>Y → <sup>90</sup>Zr + β<sup>– </sup>+ v</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">beta</span>-radiation/emission <em><strong>AND</strong></em> targets tumour/cancer cells<br><em><strong>OR</strong></em><br><span style="text-decoration: underline;">beta</span>-radiation/emission <em><strong>AND</strong></em> limited damage to healthy cells/tissues<br><em><strong>OR</strong></em><br><span style="text-decoration: underline;">beta</span>-radiation/emission <em><strong>AND</strong></em> produces «small amount of» gamma-rays «for visualizing tumours/monitoring treatment»</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>\(\lambda \left( { = \frac{{\ln 2}}{{{t_{\frac{1}{2}}}}} = \frac{{0.693}}{{8.02{\text{ }}day}}} \right) = 8.64 \times {10^{ - 2}}/0.0864\) «day<sup>−1</sup>»</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em><br>«<em>N</em><sub>0</sub> = initial amount = 100%»</p>
<p><em>N</em> «= 100 – 90» = 10% at time <em>t</em></p>
<p>«\(\ln \left( {\frac{{100}}{{10}}} \right) = 2.303 = 0.0864t\)»</p>
<p>«\(t = \frac{{2.303}}{{0.0864{\text{ da}}{{\text{y}}^{ - 1}}}} = \)» 26.7 «days»</p>
<p> </p>
<p><em>Accept 26.6 or 27 «days»</em><br><em>Award [2] for correct final answer.</em></p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em><br>«N<sub>t</sub> = N<sub>0</sub>(0.5)<sup>n</sup> where n = number of half-lives»</p>
<p>10 = 100(0.5)<sup>n</sup></p>
<p>«\(\log \left( {\frac{1}{{10}}} \right) = n \times \log \,0.5\)»</p>
<p>«\( - 1 = n\left( { - 0.301} \right)/n = \frac{1}{{0.301}}\)»</p>
<p>«<em>t</em> \( = \frac{1}{{0.301}} \times 8.02 = \)» 26.6 «days»</p>
<p> </p>
<p><em>Accept 26.7 or 27 «days»</em></p>
<p><em>Award [2] for correct final answer.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Anode (negative electrode):</em> C<sub>2</sub>H<sub>5</sub>OH + H<sub>2</sub>O → CH<sub>3</sub>COOH + 4H<sup>+</sup> + 4e<sup>–</sup></p>
<p><em>Cathode (positive electrode):</em> O<sub>2</sub> + 4H<sup>+</sup> + 4e<sup>–</sup> → 2H<sub>2</sub>O</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question">
<p>Ethanol slows down the reaction time of a driver leading to traffic accidents. Explain how the concentration of ethanol in a sample of breath can be determined using a fuel cell breathalyser.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>ethanol is oxidized «to ethanoic acid»</p>
<p><em><strong>OR</strong></em></p>
<p>electrons are released</p>
<p>current/potential proportional to concentration «of ethanol»</p>
<p><em><strong>OR</strong></em></p>
<p>current compared to a reference «to determine concentration»</p>
<p><em>Accept “ethanol reacts with oxygen” for M1.</em></p>
<p><em>Accept “voltage” for “potential”.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">Some drugs can be converted into ionic salts in order to increase their solubility in water.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the equation for the formation of the ionic salt of aspirin, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{COO(}}{{\text{C}}_{\text{6}}}{{\text{H}}_{\text{4}}}{\text{)COOH}}\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Chiral auxiliaries are used in drug design. Describe how a chiral auxiliary works.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{C}}{{\text{H}}_3}{\text{COO(}}{{\text{C}}_6}{{\text{H}}_4}{\text{)COOH}} + {\text{NaOH}} \to {\text{C}}{{\text{H}}_3}{\text{COO(}}{{\text{C}}_6}{{\text{H}}_4}{\text{)COONa}} + {{\text{H}}_2}{\text{O}}\);</p>
<p class="p1"><em>Accept Na</em><sub><span class="s1"><em>2</em></span></sub><em>CO</em><sub><span class="s1"><em>3 </em></span></sub><em>or NaHCO</em><sub><span class="s1"><em>3</em></span></sub><em>.</em></p>
<p class="p1"><em>Accept ions for strong base and salt or net ionic equation.</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">chiral auxiliaries are enantiomers/optically active;</p>
<p class="p1">auxiliary creates stereochemical condition necessary to follow a certain pathway / is used to manufacture one enantiomer (so avoids need to separate a racemic mixture);</p>
<p class="p1">attaches/connects itself to non-chiral molecule / makes it optically active;</p>
<p class="p1">only desired/one enantiomer/molecule formed (and chiral auxiliary removed);</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The equations for the formation of the ionic salt of aspirin and the ionic salt of fluoxetine were poorly done with \({{\text{H}}_{\text{2}}}{\text{O}}\), NaCl, HCl and Na used in the first case instead of NaOH and \({{\text{H}}_{\text{2}}}{\text{O}}\) and NaOH used in the second case instead of HCl.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Description of how a chiral auxiliary works was not well understood and chiral axillaries function in synthesis was also sometimes confused.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>A polarimeter can be used to determine the optical rotation of an optically active substance.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe what happens to plane-polarized light when it passes through a solution of an optically active compound.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A mixture of enantiomers shows optical rotation.</p>
<p>Suggest a conclusion you can draw from this data.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>plane of polarization is rotated</p>
<p> </p>
<p><em>Award zero if answer refers to plane-polarized light being bent.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>not a racemic mixture<br><em><strong>OR</strong></em><br>two enantiomers not equimolar<br><em><strong>OR</strong></em><br>mixture contains optically active impurity<br><em><strong>OR</strong></em><br>relative proportions of enantiomers in mixture can be determined</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Amphetamine and methamphetamine are widely abused drugs.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Amphetamine exists as optical isomers. Describe how chiral auxiliaries can be used to synthesize only the desired enantiomeric form of a drug from a non-chiral starting compound.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The structures of morphine and heroin are shown in Table 20 of the Data Booklet. Explain the increased potency of heroin compared to morphine.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">a chiral auxiliary is itself an enantiomer/optically active;</p>
<p class="p1">it is bonded to the reacting molecule so that reaction forms one product;</p>
<p class="p1">(remove chiral auxillary) to give one enantiomer;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">polar hydroxyl groups in morphine are replaced by less/non-polar ester groups;</p>
<p class="p1"><em>Accept morphine more polar/heroin less polar without mentioning hydroxyl and </em><em>ester groups for M1.</em></p>
<p class="p1">allows transport into the non-polar central nervous system / more soluble in nonpolar lipids / penetrates/crosses blood-brain barrier / <em>OWTTE</em>;</p>
<p class="p1"><em>Reference to difference in polarity needed for first mark.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Candidates found it more difficult to explain the use of chiral auxiliaries.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Discussion of polarity with regard to morphine and heroin was often omitted in (e), again suggesting poor chemical understanding by many candidates.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The first penicillin to be used was benzylpenicillin (Penicillin G), its structure is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-07_om_06.54.34.png" alt="M10/4/CHEMI/HP3/ENG/TZ1/D2"></p>
</div>
<div class="question">
<p class="p1">The active part of penicillins is the beta-lactam ring. Determine the functional group present in the beta-lactam ring and explain why the ring is important in the functioning of penicillin as an antibacterial.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">amide group / –CONH– / peptide;</p>
<p class="p1">ring is strained / <em>OWTTE</em>;</p>
<p class="p1">ring breaks easily so (the two fragments similar to cysteine and valine) then bond(s) covalently to the enzyme that synthesizes the bacterium cell wall (so blocking its action);</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Surprisingly few candidates identified the amide in (c). The idea of the strained ring was well known, but very few stated that the opened molecule binds to the enzyme that synthesizes the cell wall, some stated that it binds to the cell wall itself.</p>
</div>
<br><hr><br><div class="specification">
<p>Some drugs are extracted from natural sources and others are synthetic.</p>
</div>
<div class="question">
<p>Explain the role of the chiral auxiliary in the synthesis of Taxol.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any three of:</em></p>
<p>chiral auxiliary is optically active</p>
<p>is attached to non-optically active/non-chiral substrate</p>
<p>creates stereochemical condition necessary to follow a certain pathway</p>
<p>allows only the required enantiomer to form «so avoids need to separate a racemic mixture»</p>
<p><em><strong>[Max 3 Marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">Analgesics are used to relieve pain in the body. Aspirin and paracetamol (acetaminophen) are both mild analgesics.</p>
</div>
<div class="specification">
<p class="p1">The structures of the strong analgesics morphine and heroin (diamorphine) can be found in Table 20 of the Data Booklet.</p>
</div>
<div class="question">
<p class="p1">Explain the increased potency of heroin (diamorphine) compared to morphine.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">polar <span style="text-decoration: underline;">hydroxyl</span> groups in morphine are replaced by less polar/non-polar <span style="text-decoration: underline;">ester</span> groups;</p>
<p class="p1">so facilitate transport into the non-polar environment of the central nervous system / increases the solubility in lipids / <em>OWTTE</em>;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Very few were able to fully explain the increased potency of heroin – some referred to polarity but did not identify the groups, and some the other way round, a few correctly stated that heroin was more lipid soluble so could cross the blood brain barrier more easily.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Paroxetine, whose structure is shown below, is a drug prescribed to people suffering from mental depression.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-07_om_06.57.07.png" alt="M10/4/CHEMI/HP3/ENG/TZ1/D3"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the <strong>two </strong>chiral carbon atoms in the structure above with an asterisk (*).</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain, with an example, the importance of chirality in drug action.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the use of chiral auxiliaries to synthesize the desired enantiomer of a drug.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-10-07_om_08.02.40.png" alt="M10/4/CHEMI/HP3/ENG/TZ1/D3.a/M"></p>
<p class="p1"><em>Award </em><strong><em>[1] </em></strong><em>for each correctly placed asterisk.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">different enantiomers can cause different (physiological) effects in the body;</p>
<p class="p1">thalidomide – one isomer prevented morning sickness, the other caused fetal abnormalities / ibuprofen – one isomer is more effective than the other / DOPA – one isomer helps manage Parkinson¨disease, the other has no physiological effects;</p>
<p class="p1"><em>Accept other correct examples.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">chiral auxiliaries are themselves chiral;</p>
<p class="p1">attach to the non-chiral molecule (to enable the desired enantiomer to be formed);</p>
<p class="p1">after the desired enantiomer is formed the chiral auxiliary is removed/recycled;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The better candidates could identify the chiral carbon atoms.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates could explain the importance of chirality in drug action with an example.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The use of chiral auxiliaries was less known, many candidates failed to recognize that they are chiral themselves and many confusing answers were given.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Diseases may be caused by bacteria or viruses.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The beta-lactam ring is highly reactive and enables penicillins to be effective antibacterials. The general structure of penicillin is given in table 20 of the data booklet. Explain, in terms of hybridization and bond angles, why the beta-lactam ring is strained.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Cytovaricin is an antibiotic that is produced using a chiral auxiliary. Suggest why it may be necessary to use a chiral auxiliary during its production.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe how a chiral auxiliary is involved in the synthesis of a drug.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">C=O carbon is \({\text{s}}{{\text{p}}^{\text{2}}}\) hybridized <strong>and </strong>others are \({\text{s}}{{\text{p}}^{\text{3}}}\);</p>
<p class="p1">(normal) bond angles (120° and 109.5°) cannot be achieved in ring;</p>
<p class="p1"><em>Accept bond angles in the ring are 90.</em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">only one enantiomer is active/has required effect / one enantiomer may have adverse effects;</p>
<p class="p1"><em>Accept stereo/optical isomer, but not just isomer.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">chiral auxiliary attaches to non-chiral compound;</p>
<p class="p1">creates desired stereochemical conditions for reaction / ensures only one isomer is produced / <em>OWTTE</em>;</p>
<p class="p1">auxiliary removed/recycled after reaction (to leave desired product);</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for making the compound chiral/optically active / OWTTE.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many students could correctly explain the mode of action of penicillins, but often explanation of the strain in the bond angle failed to go into the required depth concerning the hybridization of the atoms in the four-membered ring. An encouragingly large number of candidates could explain how chiral auxiliaries are used in drug synthesis, but sometimes their response to the first part of this question failed to identify why it is sometimes necessary to use such an elaborate procedure. Many students could give the mode of action of antiviral drugs, though sometimes these responses lacked the required precision.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many students could correctly explain the mode of action of penicillins, but often explanation of the strain in the bond angle failed to go into the required depth concerning the hybridization of the atoms in the four-membered ring. An encouragingly large number of candidates could explain how chiral auxiliaries are used in drug synthesis, but sometimes their response to the first part of this question failed to identify why it is sometimes necessary to use such an elaborate procedure. Many students could give the mode of action of antiviral drugs, though sometimes these responses lacked the required precision.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many students could correctly explain the mode of action of penicillins, but often explanation of the strain in the bond angle failed to go into the required depth concerning the hybridization of the atoms in the four-membered ring. An encouragingly large number of candidates could explain how chiral auxiliaries are used in drug synthesis, but sometimes their response to the first part of this question failed to identify why it is sometimes necessary to use such an elaborate procedure. Many students could give the mode of action of antiviral drugs, though sometimes these responses lacked the required precision.</p>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Morphine and its derivatives work by temporarily bonding to receptor sites in the brain, preventing the transmission of pain impulses.</p>
</div>
<div class="question">
<p class="p1">Explain why the change in functional groups makes diamorphine (heroin) more potent than morphine.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">ester group/diamorphine less polar / hydroxyl group/morphine more polar / diamorphine more soluble in non-aqueous systems/lipids/fats/fatty tissue / morphine less soluble in non-aqueous systems/lipids/fats/fatty tissue;</p>
<p class="p1">(ester group means) diamorphine crosses blood-brain barrier/into central nervous system/CNS/brain faster/more easily;</p>
<p class="p1"><em>Award </em><strong><em>[1 max] </em></strong><em>for answers that correctly describe diamorphine/morphine </em><em>but do not compare the two.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many candidates described morphine (strong analgesic) rather than discussing an advantage of the drug. Most could also identify disadvantages, but sometimes referred to issues applicable to any substance, such as the problems of overdosing. The structural difference between morphine and diamorphine, and why this makes the latter more potent, were well known.</p>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>two</strong> ways in which viruses are different from bacteria.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe <strong>two</strong> ways in which antiviral drugs work.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss <strong>three</strong> of the difficulties associated with solving the AIDS problem.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>bacteria are a single cell / viruses are not cellular;</p>
<p>bacteria have cell walls/nuclei / viruses have no nucleus/cell wall;</p>
<p>bacteria larger than viruses / viruses smaller than bacteria;</p>
<p>viruses need host cell to reproduce / viruses take over another cell;</p>
<p>bacteria are organisms/living / bacteria metabolise/can grow/feed/excrete / viruses are not living / viruses do not metabolise/grow/feed/excrete ;</p>
<p><em>Allow “bacteria have both DNA and RNA / viruses have either RNA or DNA only (but not both)”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>alter cell’s genetic material;</p>
<p>block enzyme activity within host cell;</p>
<p>(changes cell membrane so that it) inhibits virus entry/bonding to cell;</p>
<p>prevents virus from leaving cell (after reproduction);</p>
<p>becomes part of DNA of virus / alters virus / blocks enzyme (polymerase) which builds DNA;</p>
<p>prevents virus from using cell to multiply/reproduce/replicate / prevents virus from using cell’s metabolism;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>HIV retrovirus attacks immune system / binds to white blood cells/T-cells;</p>
<p>virus has ability to mutate;</p>
<p>virus makes people vulnerable to other infections;</p>
<p>metabolism of virus is linked closely to metabolism of the (host) cell / <em>OWTTE</em>;</p>
<p>antiretroviral agents are expensive / availability dependent on wealth of community/nation / lack of education/knowledge;</p>
<p>(social) “stigma” of diagnosis leads to not getting treatment / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The ways in which viruses differ from bacteria were well answered but, in (b), how antiviral drugs work was less well described. The AIDS problem had clearly been discussed but some of the answers lacked focus.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The ways in which viruses differ from bacteria were well answered but, in (b), how antiviral drugs work was less well described. The AIDS problem had clearly been discussed but some of the answers lacked focus.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The ways in which viruses differ from bacteria were well answered but, in (b), how antiviral drugs work was less well described. The AIDS problem had clearly been discussed but some of the answers lacked focus.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The development of new and improved medications for the reduction and management of pain is an important part of 21st-century medicine.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss <strong>two</strong> advantages and <strong>two</strong> disadvantages of the medical use of morphine and its derivatives.</p>
<p> </p>
<p>Advantages:</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>Disadvantages:</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the increased potency of diamorphine (heroin) compared to morphine.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Advantages:</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for any two of:</em></p>
<p><span style="text-decoration: underline;">strong</span> pain relief/<span style="text-decoration: underline;">strong</span> analgesic</p>
<p>sedation / <em>OWTTE</em></p>
<p>treatment of diarrhoea</p>
<p>relieve coughing</p>
<p><em>Disadvantages:</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for any two of:</em></p>
<p>addiction</p>
<p>tolerance</p>
<p>dependence</p>
<p>constipation</p>
<p>depresses respiratory drive</p>
<p><em>Accept “criminals/drug addicts might get access to strong analgesics </em><em>intended for medical use” / OWTTE.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>if one advantage </em><strong><em>and </em></strong><em>one disadvantage are given.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>molecule of diamorphine is less polar / polar hydroxyl/OH (groups) in morphine are replaced with less polar/non-polar groups in heroin / diamorphine contains two ester groups;</p>
<p>diamorphine is more fat/lipid soluble / <em>OWTTE</em>;</p>
<p>diamorphine more rapidly absorbed into the brain / (less polar molecules such as) diamorphine crosses the blood-brain barrier faster/more easily / diamorphine is more soluble in non-polar environment of the CNS/central nervous system than morphine / <em>OWTTE</em>;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates needed to recognize that the question asks about the <em>medical </em>use of morphine and its derivatives. Although many candidates struggled to give two advantages most scored the mark for disadvantages. Part (b) was usually answered well except by the candidates who got it the wrong way round.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates needed to recognize that the question asks about the <em>medical </em>use of morphine and its derivatives. Although many candidates struggled to give two advantages most scored the mark for disadvantages. Part (b) was usually answered well except by the candidates who got it the wrong way round.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">There is some concern that increased use of the recreational drug khat is causing social problems.</p>
<p class="p1">The structures of two substances found in khat are shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-26_om_05.18.43.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/16"></p>
<p class="p1">Cathine and cathinone are both classed as sympathomimetic drugs.</p>
</div>
<div class="specification">
<p class="p1">Phenylpropanolamine (PPA) is an optical isomer of cathine used in cough medicines.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline how PPA and not cathine could be synthesized from the same non-chiral starting materials. Details of reagents and conditions are not required.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why this is the generally preferred method for the synthesis of optically active drugs.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest how the aqueous solubility of cathine or PPA could be increased to facilitate its distribution around the body.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">chiral auxiliary/optically active species is used;</p>
<p class="p1">that can be connected to a molecule / to make it optically active;</p>
<p class="p1">auxiliary creates stereochemical condition necessary to follow a certain pathway / forms (only) one enantiomer / <em>OWTTE</em>;</p>
<p class="p1">chiral auxiliary removed to obtain (desired) product;</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">other methods produce racemic mixture;</p>
<p class="p1">enantiomers difficult to separate because they have same physical properties (except rotation of the plane of plane polarised light);</p>
<p class="p1">optical isomers might have different physiological activities/(usually) only one is useful/half product is not used;</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">add acid/\({{\text{H}}^ + }{\text{(aq)}}\) (to form ionic compound) / converted to its salt;</p>
<div class="question_part_label">c.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Alcohol abuse is a major problem in many countries, especially when associated with driving. Many police forces now use instruments that detect the presence of ethanol on a person’s breath by its absorption of electromagnetic radiation.</p>
</div>
<div class="question">
<p class="p1">Identify the region of the electromagnetic spectrum used to detect the presence of ethanol.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">infrared/IR;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">This was well answered. Most students knew that the IR absorption is used for ethanol detection.</p>
</div>
<br><hr><br><div class="specification">
<p>Radiotherapy is one type of treatment for cancer.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how ionizing radiation destroys cancer cells.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how Targeted Alpha Therapy (TAT) is used for treating cancers that have spread throughout the body.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>radiation causes breaks in DNA chains</p>
<p><strong><em>OR</em></strong></p>
<p>radiation causes errors in DNA sequences</p>
<p> </p>
<p><strong>«</strong>damage accumulates and<strong>» </strong>cells cannot multiply</p>
<p>rapidly dividing/cancer cells more susceptible</p>
<p> </p>
<p><em>Accept “alters DNA”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>radiation source delivered directly to <strong>«</strong>targeted<strong>» </strong>cancer cells</p>
<p>by a carrier drug/protein/antibody</p>
<p>several sites in body can be targeted <strong>«</strong>at same time<strong>»</strong></p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The structure of a drug is shown below:</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-17_om_07.27.17.png" alt="M13/4/CHEMI/HP3/ENG/TZ2/D3.a"></p>
</div>
<div class="specification">
<p class="p1">Another drug that can have a similar effect to the one shown in (a) is doxycycline, shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-17_om_07.30.10.png" alt="M13/4/CHEMI/HP3/ENG/TZ2/D3.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the class of drugs to which this particular drug belongs.</p>
<div class="marks">[[N/A]]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the high reactivity of the part of the drug that is enclosed in the circle.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest why the drug is administered as its sodium salt.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Because it contains several –OH groups and an amine group, doxycycline is slightly polar. Identify the amine group by drawing a circle around it on the structure above <strong>and </strong>state whether it is a primary, secondary or tertiary amine.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest <strong>one </strong>way in which the polarity of doxycycline could be substantially increased.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the number of chiral carbon atoms in doxycycline <strong>and </strong>explain why chirality is important when considering its action in the body.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">penicillin(s)/antibacterial(s)/antibiotic;</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(\(\beta \)-lactam) ring is strained;</p>
<p class="p1"><em>Accept stressed.</em></p>
<p class="p1">sp<sup><span class="s1">3 </span></sup><strong>and </strong>sp<sup><span class="s1">2 </span></sup>hybridization;</p>
<p class="p1">bond angles are 90°<span class="s1"> </span>/ less than 120°<span class="s1"> </span>and 109.5°<span class="s1"> </span>/ <em>OWTTE</em>;</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(the sodium salt) makes the penicillin ionic/<span style="text-decoration: underline;">more</span> polar;</p>
<p class="p1">this increases its solubility in water/more concentrated in bloodstream / makes it more able to be absorbed by the body / <em>OWTTE</em>;</p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2016-09-17_om_15.13.11.png" alt="M13/4/CHEMI/HP3/ENG/TZ2/D3.b.i/M"> ;</p>
<p class="p1"><em>Circle must go around the N atom (joined to the two CH</em><sub><span class="s1"><em>3 </em></span></sub><em>groups) and not </em><em>include more than the two CH</em><sub><span class="s1"><em>3 </em></span></sub><em>groups and the carbon atom in the ring </em><em>directly bonded to it.</em></p>
<p class="p1"><em>Accept a circle around the –N(CH</em><sub><span class="s1"><em>3</em></span></sub><em>)</em><sub><span class="s1"><em>2 </em></span></sub><em>without including the carbon atom of </em><em>the ring.</em></p>
<p class="p1">tertiary;</p>
<p class="p1"><em>M2 can only be awarded if M1 is correct.</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">react with hydrochloric acid/any other named strong acid / convert the amine group into a salt/ammonium ion/its hydrochloride/any other named product;</p>
<p class="p2"><em>Accept amino for amine group.</em></p>
<p class="p1">react with sodium hydroxide/\({\text{O}}{{\text{H}}^ - }\)<span class="s1"> </span>/ convert a phenolic/OH group on the benzene ring/ into a phenoxide ion/sodium salt;</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">six/6;</p>
<p class="p1">The different enantiomers/isomers may have different physiological/pharmacological effects on the body / one enantiomer benefits the body, the other might not / <span class="s1"><em>OWTTE</em></span>;</p>
<p class="p2"><em>Accept a specific example such as thalidomide.</em></p>
<p class="p2"><em>Accept one enantiomer could have a toxic effect.</em></p>
<p class="p2"><em>Do not allow just “has different effects”.</em></p>
<div class="question_part_label">b.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Part a) (i) was very well answered overall.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">In a) (ii) while many candidates showed familiarity with the \(\beta \)-lactam ring, not as many were able to convey arguments that allowed them to score.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Good candidates achieved at least one mark in a) iii) for the increase in polarity although often answers for this question were vague and just referenced an increase in solubility’ without specifying ‘in water’. The reason for converting the drug into a sodium salt was often incorrectly linked to digestion as opposed to making the molecule more polar.</p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">A fair number of candidates incorrectly circled the NH<sub><span class="s1">2 </span></sub>group of the amide group and classified this as a primary amine.</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many had difficulty explaining how to make the drug more polar in b) ii).</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most candidates obtained second mark in this question and very few identified the correct number of chiral carbons.</p>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A modern method for accurately determining ethanol concentrations in the breath is based on the infrared (IR) spectrum of the molecule.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_17.30.15.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/14"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Use Table 17 of the Data Booklet to identify the wavenumber range used in the determination.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State why the absorption in the range 3200 to 3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The concentration of ethanol is determined by passing IR radiation through a breath sample. Outline how the transmittance of IR radiation changes when increased levels of ethanol are present.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">2850 – 3100 \({\text{(c}}{{\text{m}}^{ - 1}}{\text{)}}\);</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(OH absorption present) in water/air/water vapour;</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">transmittance decreases / absorbance increasing (with increasing concentration);</p>
<p class="p1"><em>No mark for: transmittance/absorbance changes.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Analgesics can be prescribed for treating various types of pain.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The structure of aspirin is shown in table 20 of the data booklet. Suggest a suitable reagent for the conversion of aspirin to its sodium salt.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the advantage of converting aspirin into its sodium salt.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest a reagent that could be used to convert morphine into diamorphine.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why diamorphine is a more potent drug than morphine.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{NaOH/N}}{{\text{a}}_{\text{2}}}{\text{C}}{{\text{O}}_{\text{3}}}{\text{/NaHC}}{{\text{O}}_{\text{3}}}\);</p>
<p class="p1"><em>Do not accept alkali, base or </em>\(O{H^ - }\).</p>
<p class="p1"><em>Accept either a correct chemical formula or name.</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">increases <span style="text-decoration: underline;">aqueous/water</span> solubility;</p>
<p class="p1">facilitates distribution (in the body) by the bloodstream / <em>OWTTE</em>;</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">ethanoic acid/\({\text{C}}{{\text{H}}_{\text{3}}}{\text{COOH}}\) / ethanoyl chloride/\({\text{C}}{{\text{H}}_{\text{3}}}{\text{COCl}}\) / ethanoic anhydride/\({{\text{(C}}{{\text{H}}_{\text{3}}}{\text{CO)}}_{\text{2}}}{\text{O}}\);</p>
<p class="p1"><em>Accept “acetic acid”, “acetyl chloride”, “acetic anhydride” or “ethanoyl-ethanoate”.</em></p>
<p class="p1"><em>Do not accept “carboxylic acid”.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">diamorphine is <span style="text-decoration: underline;">less polar/non-polar</span> / morphine is <span style="text-decoration: underline;">more polar</span> / <span style="text-decoration: underline;">polar</span> groups in morphine are replaced with <span style="text-decoration: underline;">less polar/non-polar</span> groups in diamorphine;</p>
<p class="p1">(less polar molecules) cross blood-brain barrier faster/more easily / (diamorphine) more soluble in non-polar environment of CNS/central nervous system / (diamorphine) more soluble in lipids;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates were able to give a correct reagent for the conversion of aspirin to its sodium salt. Incorrect answers included NaC<span class="s1">l</span>, Na and incorrect chemical formulas for sodium carbonate. In (a) (ii), the increase in aqueous solubility was necessary and increase in solubility alone did not suffice. This threw a number of candidates. The markscheme for (b) (i) was quite broad and most candidates scored one for the two similarities, though some did not understand that benzene is different to benzene ring and that -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{2}}}\) is not the phenyl group, which is actually -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{5}}}\). As regards the difference, as previously hydroxide was not accepted for hydroxyl. Some candidates mixed up ethers with esters. In (c), many scored both marks though a few did not mention the non-polar nature of diamorphine.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates were able to give a correct reagent for the conversion of aspirin to its sodium salt. Incorrect answers included NaC<span class="s1">l</span>, Na and incorrect chemical formulas for sodium carbonate. In (a) (ii), the increase in aqueous solubility was necessary and increase in solubility alone did not suffice. This threw a number of candidates. The markscheme for (b) (i) was quite broad and most candidates scored one for the two similarities, though some did not understand that benzene is different to benzene ring and that -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{2}}}\) is not the phenyl group, which is actually -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{5}}}\). As regards the difference, as previously hydroxide was not accepted for hydroxyl. Some candidates mixed up ethers with esters. In (c), many scored both marks though a few did not mention the non-polar nature of diamorphine.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates were able to give a correct reagent for the conversion of aspirin to its sodium salt. Incorrect answers included NaC<span class="s1">l</span>, Na and incorrect chemical formulas for sodium carbonate. In (a) (ii), the increase in aqueous solubility was necessary and increase in solubility alone did not suffice. This threw a number of candidates. The markscheme for (b) (i) was quite broad and most candidates scored one for the two similarities, though some did not understand that benzene is different to benzene ring and that -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{2}}}\) is not the phenyl group, which is actually -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{5}}}\). As regards the difference, as previously hydroxide was not accepted for hydroxyl. Some candidates mixed up ethers with esters. In (c), many scored both marks though a few did not mention the non-polar nature of diamorphine.</p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Many candidates were able to give a correct reagent for the conversion of aspirin to its sodium salt. Incorrect answers included NaC<span class="s1">l</span>, Na and incorrect chemical formulas for sodium carbonate. In (a) (ii), the increase in aqueous solubility was necessary and increase in solubility alone did not suffice. This threw a number of candidates. The markscheme for (b) (i) was quite broad and most candidates scored one for the two similarities, though some did not understand that benzene is different to benzene ring and that -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{2}}}\) is not the phenyl group, which is actually -\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{5}}}\). As regards the difference, as previously hydroxide was not accepted for hydroxyl. Some candidates mixed up ethers with esters. In (c), many scored both marks though a few did not mention the non-polar nature of diamorphine.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A variety of techniques can be used to determine the ethanol concentration of the breath, blood or urine.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The breathalyser, one of the earliest tests, uses the reaction between ethanol and acidified potassium dichromate(VI). Ethanol is first oxidized to ethanal.</p>
<p class="p1">Deduce the half-equation for the reaction of ethanol to ethanal.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline why the colour changes from orange to green.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain how the ethanol concentration in the breath can be measured by an intoximeter using infrared absorption.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">\({\text{C}}{{\text{H}}_3}{\text{C}}{{\text{H}}_2}{\text{OH(aq)}} \to {\text{C}}{{\text{H}}_3}{\text{CHO(aq)}} + {\text{2}}{{\text{H}}^ + }{\text{(aq)}} + {\text{2}}{{\text{e}}^ - }\);</p>
<p class="p1"><em>Accept equilibrium sign, e for e</em><span class="s1"><em>– </em></span><em>and different representations of organic compounds (such as </em>\({C_2}{H_6}O\) and \({C_2}{H_4}O\)<em>).</em></p>
<p class="p1"><em>Ignore state symbols.</em></p>
<p class="p1"><em>Do </em><strong><em>not </em></strong><em>accept </em>\(C{H_3}C{H_2}OH + [O] \to C{H_3}CHO + {H_2}O\)<em> (since half-equation requested).</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">(orange) dichromate(VI) \({\text{ion/C}}{{\text{r}}_{\text{2}}}{\text{O}}_{\text{7}}^{2 - }{\text{/Cr(VI)/C}}{{\text{r}}^{6 + }}\) is reduced/converted to (green) chromium(III) \({\text{ion/Cr(III)/C}}{{\text{r}}^{3 + }}\);</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">absorption (of IR at \({\text{2950 c}}{{\text{m}}^{ - 1}}\)) by C–H bond;</p>
<p class="p1">(IR) absorption increases with/proportional to concentration / (IR) intensity compared to an empty/control cell;</p>
<p class="p1"><em>Accept area under peak/size of peak (on IR spectrum) can be used to measure ethanol concentration.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">The ability to construct a redox half-equation connecting a given starting material and product was disappointingly rare. The colour change was better explained though many students failed to specifically identify the species involved or their oxidation states. An encouraging number of students were aware of the role of the C-H bond absorption in IR based intoximeters, though frequently mention of the importance of the absorption intensity was omitted.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The ability to construct a redox half-equation connecting a given starting material and product was disappointingly rare. The colour change was better explained though many students failed to specifically identify the species involved or their oxidation states. An encouraging number of students were aware of the role of the C-H bond absorption in IR based intoximeters, though frequently mention of the importance of the absorption intensity was omitted.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">The ability to construct a redox half-equation connecting a given starting material and product was disappointingly rare. The colour change was better explained though many students failed to specifically identify the species involved or their oxidation states. An encouraging number of students were aware of the role of the C-H bond absorption in IR based intoximeters, though frequently mention of the importance of the absorption intensity was omitted.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">The efficiency of a drug depends on the polarity of its molecule. Explain how the polarity of a drug can be modified in order to increase its solubility in water and how it affects the distribution of the drug around the body.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">(non-charged) carboxylic acids/groups can be converted into more polar salts/carboxylates;</p>
<p class="p1">(non-charged) amines/amino groups can be converted into more polar amines/ammonium groups;</p>
<p class="p1">more polar/charged/ionic substances are more soluble in water/concentrate in the bloodstream;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates stated that polar drugs are more soluble in blood, and some suggested turning the drugs into a salt but didn‟t describe how. Most also had a pretty clear understanding of THC and its effects.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Mild analgesics such as aspirin, and strong analgesics such as opiates, differ not only in their potency but also in the ways they act on the central nervous system.</p>
</div>
<div class="question">
<p class="p1">Explain why heroin is a more potent drug than morphine.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">molecule of heroin is <span style="text-decoration: underline;">less polar</span> / molecule of morphine is more polar / polar OH groups in morphine are replaced with less polar/non-polar groups in heroin;</p>
<p class="p1">(less polar molecules) cross the blood-brain barrier faster/more easily / (heroin) is more soluble in non-polar environment of the CNS/central nervous system than morphine / <span class="s1"><em>OWTTE</em></span>;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Candidates struggled to explain why heroin is a more potent drug than morphine. An explanation based on differences of the polarity of the molecules was expected.</p>
</div>
<br><hr><br><div class="specification">
<p>Ethanol can be detected by a variety of instruments.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Fuel cells use an electrochemical process to determine the concentration of ethanol.</p>
<p>Formulate the overall equation for this process.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict the chemical shifts and integration for each signal in the <sup>1</sup>H NMR spectrum for ethanol using section 27 of the data booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>C<sub>2</sub>H<sub>5</sub>OH(g) + O<sub>2</sub>(g) → CH<sub>3</sub>COOH(aq) + H<sub>2</sub>O(l)</p>
<p> </p>
<p><em>Accept any correct formula for reactants </em><em>and products.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>R–O</em><strong><em>H</em></strong><em>:</em></p>
<p>1.0–6.0 <strong>«</strong>ppm<strong>» </strong><strong><em>AND </em></strong>1 H</p>
<p><em>R–O–C</em><strong><em>H</em></strong><sub><strong><em>2</em></strong></sub><em>–:</em></p>
<p>3.3–3.7 <strong>«</strong>ppm<strong>» </strong><strong><em>AND </em></strong>2 H</p>
<p><em>–C</em><strong><em>H</em></strong><sub><strong><em>3</em></strong></sub><em>:</em></p>
<p>0.9–1.0 <strong>«</strong>ppm<strong>» </strong><strong><em>AND </em></strong>3 H</p>
<p> </p>
<p><em>Award </em><strong><em>[1] </em></strong><em>for the ratio of 1:2:3 (in any </em><em>order).</em></p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for three correct chemical shifts </em><em>without integration.</em></p>
<p><em>Award </em><strong><em>[1] </em></strong><em>for two correct chemical shifts </em><em>without integration.</em></p>
<p><em>For each chemical shift accept a specific </em><em>value within the range.</em></p>
<p><em>Assignment of proton to fragment </em><em>(eg, R–O</em><strong><em>H</em></strong><em>) is </em><strong><em>not </em></strong><em>required in each case.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Radioisotopes can be used to treat a wide variety of diseases.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Phosphorous-32 undergoes beta decay. Formulate a balanced nuclear equation for this process.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The half-life of phosphorus-32 is 14.3 days. Calculate the mass, in g, of <sup>32</sup>P remaining after 57.2 days if the initial sample contains 2.63 × 10<sup>−8</sup> mol. Use table 1 of the data booklet and <em>M</em><sub>r</sub> = 31.97 g mol<sup>−1</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the targeted alpha therapy (TAT) technique and why it is useful.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><sup>32</sup>P → <sup>32</sup>S + \(_{-1}^0\)β </p>
<p> </p>
<p><em>Accept “e</em><sup><em>–</em></sup><em>/e/β” instead of “</em>\(_{-1}^0\)<em>β</em><em>”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong><em>ALTERNATIVE 1</em></strong></p>
<p><strong>«</strong>λ = \(\frac{{\ln 2}}{{14.3}}\) =<strong>» </strong>0.04847 <strong>«</strong>day<sup>–1</sup><strong>»</strong></p>
<p><strong>«</strong><em>m</em>(<sup>32</sup>P) = 2.63 × 10<sup>–8</sup> mol × 31.97 g mol<sup>–1</sup> × <em>e</em><sup>–0.04847 × 57.2</sup> =<strong>» </strong>5.26 × 10<sup>–8</sup> <strong>«</strong>g<strong>»</strong></p>
<p> </p>
<p><strong><em>ALTERNATIVE 2</em></strong></p>
<p><strong>«</strong>\(\frac{{57.2}}{{14.3}}\) =<strong>» </strong>4 <strong>«</strong>half-lives passed<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong><em>n</em>(<sup>32</sup>P) = \(\frac{{2.63 \times {{10}^{ - 8}}{\text{ mol}}}}{{{2^4}}}\) =<strong>» </strong>1.64 × 10<sup>–9</sup> <strong>«</strong>mol<strong>»</strong></p>
<p> </p>
<p><strong>«</strong><em>m</em>(<sup>32</sup>P) = 1.64 × 10<sup>–9</sup> mol × 31.97 g mol<sup>–1</sup> =<strong>» </strong>5.26 × 10<sup>–8</sup> <strong>«</strong>g<strong>»</strong></p>
<p> </p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for correct final answer.</em></p>
<p><em>Accept any value in the range </em><em>“5.24–5.26 ×</em><em> </em><em>10</em><sup><em>–8 </em></sup><em>«g»”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>alpha-emitting isotopes/<sup>212</sup>Pb/<sup>225</sup>Ac attached to drugs/antibodies/chelating ligands/carriers</p>
<p> </p>
<p><em>Award </em><strong><em>[2 max] </em></strong><em>for any two of:</em></p>
<p>absorbed by <strong>«</strong>cancer/growing<strong>» </strong>cells</p>
<p><strong><em>OR</em></strong></p>
<p>bind to <strong>«</strong>cancer/growing<strong>» </strong>cell receptors</p>
<p> </p>
<p>alpha particles have high ionizing density/power</p>
<p> </p>
<p>short-range of emission <strong>«</strong>of alpha-particles<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>healthy tissues less affected <strong>«</strong>as slower cell growth<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>local effect <strong>«</strong>on dispersed/spread/metastasised cancers<strong>»</strong></p>
<p> </p>
<p><em>Accept “radionuclide” for “isotope”.</em></p>
<p><em>Accept “alpha particles are highly </em><em>ionizing”.</em></p>
<p><em>Accept “alpha particles have low </em><em>penetrating power”.</em></p>
<p><em>Accept “used to treat </em><em>dispersed/spread/metastasised cancers” </em><strong><em>OR </em></strong><em>“can be used to map the distribution of </em><em>cancer cells in the body”.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Many diseases are the result of infection of the body by either bacteria or viruses.</p>
</div>
<div class="question">
<p class="p1">Identify the particular structural feature of penicillins that is responsible for their action and explain how this prevents bacteria multiplying.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">4-membered ring/\(\beta \)-lactam ring;</p>
<p class="p1">easily broken / very reactive / highly strained ring;</p>
<p class="p1">binds to proteins/deactivates proteins that form <span style="text-decoration: underline;">cell wall</span> / interferes with <span style="text-decoration: underline;">cell wall</span> formation / prevent formation of crosslinks within <span style="text-decoration: underline;">cell wall</span>;</p>
<p class="p1">makes cell wall porous / allows water to pass;</p>
<p class="p1">causes cell to burst;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates knew that AIDS was a viral disease, but knowledge of a bacterial disease (rather than the name of a bacterium) was more sketchy. The differences between bacteria and viruses and reasons for drug resistance in bacteria were generally well known. Many candidates also gave good answers about the mode of action of penicillin, but the action of antiviral drugs could only be explained by the best candidates.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Three factors which can influence the mechanism of the action of a drug include geometrical isomerism, polarity and ring strain.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">For each of the following drugs, identify which <strong>one </strong>of these factors is involved.</p>
<p class="p1">Increased potency of diamorphine compared to morphine:</p>
<p class="p1">Penicillin:</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the action of penicillin with reference to your answer in part (a).</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1"><em>Increased potency of diamorphine compared to morphine</em>:</p>
<p class="p1">polarity / polar hydroxyl groups in morphine replaced by non-polar ester groups in diamorphine;</p>
<p class="p1"><em>Penicillin</em>:</p>
<p class="p1">ring strain;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">ring opens (to allow penicillin to bond to enzyme);</p>
<p class="p1">which synthesizes bacterial cell walls and so blocks action / prevent cell wall/membrane formation;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Most candidates had no problem with (a).</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">in (b), although most candidates knew that penicillin interferes with cell wall synthesis, most did not know the actual mechanism i.e. the fact that the ring opens to allow the penicillin to bond to the enzyme.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Chemists can change structures of substances in order to produce chemicals with desired properties.</p>
</div>
<div class="question">
<p class="p1">Aspirin is virtually insoluble in water. Use Table 20 in the Data Booklet to explain how aspirin can be made more water-soluble. Write an equation for the reaction.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">react aspirin with sodium hydroxide/\({\text{O}}{{\text{H}}^ - }\) to produce the (ionic) salt;</p>
<p class="p1"><em>No M1 for reaction with CaCO</em><sub><span class="s1"><em>3 </em></span></sub><em>(as calcium salicylate is not water soluble).</em></p>
<p class="p1">\({{\text{C}}_{\text{6}}}{{\text{H}}_{\text{4}}}{\text{(OCOC}}{{\text{H}}_{\text{3}}}{\text{)COOH}} + {\text{NaOH}} \to {{\text{C}}_{\text{6}}}{{\text{H}}_{\text{4}}}{\text{(OCOC}}{{\text{H}}_{\text{3}}}{\text{)COONa}} + {{\text{H}}_{\text{2}}}{\text{O}}\);</p>
<p class="p1"><em>Accept ionic equation</em>.</p>
<p class="p1"><em>ECF for M2</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Few candidates knew how to make aspirin more water-soluble – most answers showed a lack of understanding of the chemistry involved, namely reaction with NaOH to produce the ionic salt of aspirin.</p>
</div>
<br><hr><br><div class="specification">
<p>Many drugs, including aspirin, penicillin, codeine and taxol, have been modified from compounds that occur naturally.</p>
</div>
<div class="question">
<p>Many drugs are chiral. Explain how a polarimeter can be used to determine the relative proportion of two enantiomers.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><strong>«</strong>pure<strong>»</strong> enantiomers rotate the plane <strong>«</strong>of plane-<strong>»</strong>polarized light <strong>«</strong>by equal angles<strong>» </strong>in opposite directions</p>
<p> </p>
<p><em>Any two of:</em></p>
<p>find angle of rotation of pure enantiomers</p>
<p>measure angle of rotation of mixture</p>
<p>mixture has angle between that of two enantiomers</p>
<p>ratio of angles gives purity</p>
<p> </p>
<p><em><strong>[3 marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p class="p1">The discovery of penicillin was one of the most significant scientific discoveries of the last century.</p>
</div>
<div class="question">
<p class="p1">State the type of hybridization of each of the carbon atoms (<strong>I</strong>, <strong>II</strong>, and <strong>III</strong>) in the \(\beta \)-lactam ring of ampicillin by completing the table below, and explain why the amide group is highly reactive.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-03_om_18.45.34.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/D1.c"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><img src="images/Schermafbeelding_2016-10-03_om_18.46.55.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/D1.c/M"> ;</p>
<p class="p1">strain in four-membered ring / as angles less than 109°;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">In (c), many students could not relate the hybridization of the carbon atoms in the beta-lactam ring to ring strain and a significant number appear to have difficulty linking some key chemical concepts in this option.</p>
</div>
<br><hr><br><div class="question">
<p>Taxol was originally obtained from the bark of the Pacific yew tree.</p>
<p>Outline how Green Chemistry has improved the process of obtaining Taxol.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any two of:</em></p>
<p>stripping the bark kills Pacific yew tree</p>
<p> </p>
<p>plant cell fermentation <strong>«</strong>and extraction<strong>»</strong>/PCF technology/use of plant cell cultures/Taxol <strong>«</strong>precursors<strong>» </strong>produced by biosynthesis/fungi/yeast/e-coli/use of natural enzymes <strong>«</strong>more sustainable process<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>Taxol produced semi-synthetically/Taxol from 10-DAB/10-deacetylbaccatin </p>
<p> </p>
<p>uses renewable resources</p>
<p><strong><em>OR</em></strong></p>
<p>use <strong>«</strong>needles/leaves/twigs of<strong>» </strong>European/common yew/yew from Himalayas</p>
<p> </p>
<p><strong>«</strong>sustainable<strong>» </strong>process has eliminated <strong>«</strong>high proportion of<strong>» </strong>hazardous chemicals/waste</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>sustainable<strong>» </strong>process has eliminated several solvents/<strong>«</strong>sustainable<strong>» </strong>process uses greener solvents/<strong>«</strong>sustainable<strong>» </strong>process recycles/reuses solvents</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>sustainable<strong>» </strong>process has eliminated several <strong>«</strong>drying<strong>» </strong>steps/<strong>«</strong>sustainable<strong>»</strong> process has eliminated lots of the work-up after the synthesis</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>sustainable<strong>» </strong>process has increased energy efficiency</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>sustainable<strong>» </strong>process has no intermediates</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>sustainable<strong>» </strong>process uses more efficient catalysts</p>
<p> </p>
<p><em>Accept “Pacific yew rare/slowgrowing/</em><em>takes 100/200 years to mature” </em><em>for M1.</em></p>
<p><em>Accept “synthesis of Taxol using chiral </em><em>auxiliaries increases efficiency of process </em><em>as single enantiomer formed” for M4.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Excess stomach acid leads to medical conditions that affect many people worldwide. These conditions can be treated with several types of medical drugs.</p>
</div>
<div class="question">
<p>Omeprazole exists as a racemic mixture whereas esomeprazole is a single enantiomer. Outline how, starting from a non-chiral molecule, esomeprazole but not omeprazole, could be synthesized. Details of chemicals and conditions are not required.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><em>Any two of:</em></p>
<p>chiral molecule/auxiliary/optically active species is used/added/connected «to the starting molecule to force reaction to follow a certain path»</p>
<p>chiral intermediate forms «only» one enantiomer<br><em><strong>OR<br></strong></em>auxiliary creates stereochemical condition «necessary to follow a certain pathway» / stereochemical induction<br><em><strong>OR<br></strong></em>existing chiral centre affects configuration of new chiral centres</p>
<p>«after new chiral centre created» chiral auxiliary removed «to obtain desired product»</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="specification">
<p>Solubility plays an important role in the bioavailability of drugs in the body.</p>
</div>
<div class="question">
<p>Some mild analgesics contain a solid mixture of acidic aspirin and a non-acidic organic chemical of similar polarity to asprin.</p>
<p>Discuss how acid-base properties and the process of solvent extraction can be used to separate aspirin from the mixture.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>dissolve compounds in an organic solvent</p>
<p>add NaOH(aq)/OH<sup>–</sup>(aq) «to the mixture» to convert aspirin to its water soluble salt</p>
<p>separate the two «immiscible» layers</p>
<p>convert salt «in aqueous layer» back to aspirin by reacting with acid/H<sup>+</sup></p>
<p>«evaporate solvents and dry»</p>
<p> </p>
<p><em>Accept organic solvents immiscible with water such as hexane, ethyl ethanoate, butyl acetate.</em></p>
<p><em>Accept any other base.</em></p>
<p><em>Need explanation for mark.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Thalidomide is currently used to treat several different diseases including certain types of cancer. Research to compare its effectiveness with other cancer drugs, such as doxorubicin, is ongoing.</p>
<p>(i) Doxorubicin contains six different chiral carbon atoms. Three of them are identifi ed with an asterisk, *. Identify the locations of the other three by placing circles around the relevant carbon atoms.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-15_om_08.26.06.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/14.b.i"></p>
<p>(ii) Only one of the possible enantiomers is really effective as an anti-cancer drug.</p>
<p>Describe the general principles behind the use of chiral auxiliaries to form the desired enantiomer when several different enantiomers of a drug exist.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) From its structure it can be seen that doxorubicin contains several polar hydroxyl groups. However, when it is given intravenously it needs to be in an ionic form to make it even more soluble in an aqueous medium. Describe how doxorubicin can be converted into a salt.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>(i) <img src="images/Schermafbeelding_2016-08-15_om_08.29.33.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/14.b.i/M"> ;</p>
<p><em>Award </em><strong><em>[1] </em></strong><em>for each correct circle.</em></p>
<p>(ii) a chiral auxiliary (which is itself optically active/chiral) attaches to nonchiral molecule (to force reaction to follow a certain path);</p>
<p>chiral auxiliary is removed (once stereospecific intermediate has been formed to leave desired enantiomer) / <em>OWTTE</em>;</p>
<p>(iii) <strong>EITHER</strong></p>
<p>doxorubicin contains an amino group (which is basic);</p>
<p><em>Allow (primary) amine.</em></p>
<p>can react with acid/hydrochloric acid (to form acid salt);</p>
<p><strong>OR</strong></p>
<p>doxorubicin contains OH/hydroxyl groups some of which are acidic;</p>
<p>can react with sodium hydroxide/NaOH/hydroxide ions/OH<sup>–</sup> (to form sodium/alkaline salt);</p>
<p><em>Accept other suitable base such as potassium hydroxide/KOH.</em></p>
<p><em>Allow “can react with alkali”.</em></p>
<p><em>Award </em><strong><em>[2] </em></strong><em>for a correct equation.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>In (a), enantiomers typically were not referred to and few stated that since drugs can pass from mother to foetus all drugs must be tested for their effect on pregnant women. In (b) (i) most candidates got one chiral centre but surprisingly at HL only the better students got all three. In (b) (ii) although M2 was generally scored, few scored M1 <em>i.e. </em>the fact that a chiral auxiliary attaches to a non-chiral molecule. In (iii) few candidates scored both marks. Many stated that doxorubicin can react with an acid but did not mention the fact that it contains an amino group <em>etc.</em></p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Morphine is a strong analgesic which is administered parenterally.</p>
</div>
<div class="question">
<p class="p1">Diamorphine (heroin) is a more effective painkiller than morphine. The structures of morphine and diamorphine are shown in Table 20 of the Data Booklet. Explain at the molecular level why diamorphine is absorbed into fatty tissue more rapidly than morphine.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">diamorphine has (2) ester/acetyl/\({\text{COOC}}{{\text{H}}_3}\) groups instead of hydroxyl/OH groups;</p>
<p class="p1">diamorphine is less polar/non-polar;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Most candidates answered the question satisfactory, though some did not name the difference in polarity in (b).</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Many factors can be involved in the action of a particular drug.</p>
</div>
<div class="question">
<p class="p1">The structures of morphine and diamorphine (heroin) are given in Table 20 of the Data Booklet. With reference to the structures, explain why diamorphine (heroin) is more potent than morphine.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">two (polar) hydroxyl groups/OHs in morphine replaced by ester groups in diamorphine;</p>
<p class="p1"><em>Do not allow hydroxide for hydroxyl. </em></p>
<p class="p1"><em>Accept two alcohols instead of hydroxyl. </em></p>
<p class="p1">diamorphine less polar / morphine more polar;</p>
<p class="p1">diamorphine capable of rapid penetration of (lipid-based) blood-brain barrier / diamorphine more quickly absorbed into non-polar environment of central nervous system/CNS / <em>OWTTE</em>;</p>
<p class="p1"><em>Allow diamorphine more soluble/easily dissolved in lipids/fatty tissue.</em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">In contrast (b) was very well answered by nearly all students and several got all three marks.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The drug Antifebrin was first used as a medicine in 1886.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_17.37.09.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/15"></p>
</div>
<div class="specification">
<p class="p1">The structures of some medicines and drugs are given in Table 20 of the Data Booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the molecule which is most similar to Antifebrin in terms of size and structure.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the names of the <strong>two </strong>functional groups that both molecules have in common.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline why some drugs can be less effective when taken orally rather than through other methods of administration.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">paracetamol/acetaminophen;</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">phenyl <strong>and </strong>(secondary) amide;</p>
<p class="p1"><em>Accept benzene ring for phenyl.</em></p>
<p class="p1"><em>Do not allow just benzene or arene instead of phenyl.</em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">drugs broken down by acids/enzymes/digestive system before they are absorbed / drugs reach target more slowly / <em>OWTTE</em>;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Antibacterials are drugs that kill or inhibit the growth of microorganisms that cause infectious diseases. The general structure of penicillin, an antibacterial, is given below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-18_om_17.24.59.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/D4"></p>
</div>
<div class="question">
<p class="p1">Describe the composition and structure of the beta-lactam ring in penicillin and explain its importance.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">ring consists of one nitrogen atom and three carbon atoms (and three hydrogen atoms);</p>
<p class="p1">4 membered/square ring structure / bond angles of 90°;</p>
<p class="p1">ring under stress/strain / increased (chemical) reactivity / ring opens (due to angle of 90° instead of about 109°);</p>
<p class="p1">bonds to/blocks action of enzyme/transpeptidase;</p>
<p class="p1">reaction with the enzyme not reversible / prevents cross linking of peptides / inhibits synthesis and growth of bacterial cell walls / <em>OWTTE</em>;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Many candidates were unable to explain the importance of the beta-lactam ring in penicillin. The bonds in the opened structure blocks the action of the enzyme, transpeptidase, a non-reversible reaction that prevents cross linkage of peptides in the bacteria, which inhibits the synthesis and growth of bacterial cell walls.</p>
</div>
<br><hr><br><div class="specification">
<p>The first commercially available antibiotic came from a class of compounds known as the penicillins.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how penicillins work and why it is necessary to continually modify the side-chain.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the importance of the beta-lactam ring in the action of penicillin.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>penicillins interfere with (enzymes involved with) development of <span style="text-decoration: underline;">cell wall</span>/(cross-link) structure of bacteria;</p>
<p>(due to damage) cells absorb water (by osmosis) <strong>and </strong>burst / <em>OWTTE</em>;</p>
<p>modifying side-chain overcomes resistance (by bacteria) / <em>OWTTE</em>;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>beta lactam ring has strained structure/(four-membered ring with) 90° bond angles on the carbon and nitrogen atoms;</p>
<p>atoms should have larger bond angles based on VSEPR theory / <em>OWTTE</em>;</p>
<p>ring stress increases chemical reactivity and opens;</p>
<p>open ring reacts/bonds with enzyme/penicillinase to prevent formation of bacteria cell walls (prevents cross-linking of peptides);</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The role of Florey and Chain did not seem to be too well known with many incorrectly listing large-scale production. In (b), the side-chain modification was better known than the working of penicillins. Whilst many had the correct general idea of the importance of the beta-lactam ring in (c), a precise explanation was needed.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The role of Florey and Chain did not seem to be too well known with many incorrectly listing large-scale production. In (b), the side-chain modification was better known than the working of penicillins. Whilst many had the correct general idea of the importance of the beta-lactam ring in (c), a precise explanation was needed.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>A commonly used mild analgesic is aspirin, 2-acetoxybenzoic acid, whose structure is given in Table 20 of the Data Booklet.</p>
</div>
<div class="specification">
<p>One form of soluble aspirin is \({\text{Ca(}}{{\text{C}}_{\text{9}}}{{\text{H}}_{\text{7}}}{{\text{O}}_{\text{4}}}{{\text{)}}_{\text{2}}}\).</p>
</div>
<div class="specification">
<p>Morphine, codeine and diamorphine (heroin) are examples of strong analgesics.</p>
<p>Their structures are given in Table 20 of the Data Booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how mild analgesics function.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Outline why this substance is more soluble than standard aspirin in water.</p>
<p> </p>
<p>(ii) Deduce the balanced ionic equation for the reaction that occurs between soluble aspirin and the acid in the stomach.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Deduce <strong>two </strong>named functional groups present in both aspirin and diamorphine.</p>
<p> </p>
<p> </p>
<p>(ii) Deduce <strong>one </strong>named functional group present in morphine but not in diamorphine.</p>
<p> </p>
<p>(iii) State <strong>two </strong>short-term advantages and <strong>two </strong>long-term disadvantages of using codeine as a strong analgesic.</p>
<p> </p>
<p>Short-term advantages:</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>Long-term disadvantages:</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(iv) Explain the increased potency of diamorphine compared to morphine.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>intercepts pain stimulus at source / inhibits release of substances/prostaglandins that cause pain/swelling/fever;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) ionic compound (which dissociates);</p>
<p>(ii) \({{\text{C}}_9}{{\text{H}}_7}{\text{O}}_4^ - {\text{(aq)}} + {{\text{H}}^ + }{\text{(aq)}} \to {{\text{C}}_9}{{\text{H}}_8}{{\text{O}}_4}{\text{(aq)}}\);</p>
<p><em>Ignore state symbols.</em></p>
<p><em>Ignore arrow</em>.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(i) phenyl/benzene ring;</p>
<p><em>Do not allow just benzene or arene or the formula C</em><sub><em>6</em></sub><em>H</em><sub><em>6</em></sub><em>.</em></p>
<p>ester;</p>
<p><em>Do not allow –COO– or carbonyl/CO.</em></p>
<p>(ii) hydroxyl / phenol; <strong><em>[1]</em></strong></p>
<p><em>Allow alcohol/hydroxy but not hydroxide.</em></p>
<p><em>Do not allow –OH.</em></p>
<p>(iii) <em>Award any </em><strong><em>[1] for any two </em></strong><em>short-term advantages from</em>:</p>
<p>strong/powerful (pain reliever);</p>
<p>fast-acting / effective;</p>
<p>has a wide safety margin;</p>
<p>can quickly stop diarrhoea;</p>
<p>can be used in cough mixtures/medicines / antitussive properties;</p>
<p>works effectively with paracetamol/acetaminophen;</p>
<p><em>Award </em><strong><em>[1] for any two </em></strong><em>long-term disadvantages from</em>:</p>
<p>(regular use) can lead to addiction/dependence/withdrawal symptoms;</p>
<p>tolerance can lead to toxic dosages;</p>
<p>can result in depression / apathy;</p>
<p>can cause mental health problems;</p>
<p>can result in constipation;</p>
<p>can result in sterility/sexually related problems;</p>
<p>memory loss;</p>
<p>serious health risk to babies who are breastfed;</p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for one correct advantage and one correct disadvantage.</em></p>
<p>(iv) two (polar) hydroxyl groups in morphine replaced by less polar ester groups in diamorphine/heroin;</p>
<p><em>Do not allow hydroxide for hydroxyl.</em></p>
<p><em>Accept alcohols for hydroxyl groups.</em></p>
<p>diamorphine/heroin more soluble in non-polar lipids / diamorphine/heroin more soluble in non-polar environment of central nervous system/CNS;</p>
<p><em>Reference to solubility required.</em></p>
<p>diamorphine/heroin can penetrate blood-brain barrier more quickly / diamorphine/heroin can act more quickly in CNS (leading to increased potency);</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In Q15, the function of mild analgesics was well understood but few stated that the calcium salt is ionic and fewer still managed the ionic equation. The named functional groups were usually correctly identified although “benzene” was one of the incorrect answers as was “esther”. For the short-term advantages there was a tendency to repeat the stem of the question but the long-term disadvantages were better understood. Many scored one mark by including one correct short-term and one correct long-term answer. One respondent suggested that asking candidates about codeine was unfair – but this was regarded as a reasonable extension of D.3.4. Answers about the increased potency of diamorphine over morphine were better than in the past but if a mark were to be lost it would be for not commenting on the greater solubility of diamorphine in lipids specifically.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In Q15, the function of mild analgesics was well understood but few stated that the calcium salt is ionic and fewer still managed the ionic equation. The named functional groups were usually correctly identified although “benzene” was one of the incorrect answers as was “esther”. For the short-term advantages there was a tendency to repeat the stem of the question but the long-term disadvantages were better understood. Many scored one mark by including one correct short-term and one correct long-term answer. One respondent suggested that asking candidates about codeine was unfair – but this was regarded as a reasonable extension of D.3.4. Answers about the increased potency of diamorphine over morphine were better than in the past but if a mark were to be lost it would be for not commenting on the greater solubility of diamorphine in lipids specifically.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In Q15, the function of mild analgesics was well understood but few stated that the calcium salt is ionic and fewer still managed the ionic equation. The named functional groups were usually correctly identified although “benzene” was one of the incorrect answers as was “esther”. For the short-term advantages there was a tendency to repeat the stem of the question but the long-term disadvantages were better understood. Many scored one mark by including one correct short-term and one correct long-term answer. One respondent suggested that asking candidates about codeine was unfair – but this was regarded as a reasonable extension of D.3.4. Answers about the increased potency of diamorphine over morphine were better than in the past but if a mark were to be lost it would be for not commenting on the greater solubility of diamorphine in lipids specifically.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Acquired immune deficiency syndrome (AIDS), a disease caused by the HIV virus, has resulted in millions of deaths worldwide since it was first identified in 1981.</p>
<p class="p1">Explain why viral infections, such as AIDS, are generally more difficult to treat than bacterial infections.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p class="p1">viruses mutate quickly so adapt to drugs/evade immune system response / <em>OWTTE</em>;</p>
<p class="p1">bacteria are more complex and thus can be targeted in more ways / viruses lack sub-units/functions targeted by antibacterials / <em>OWTTE</em>;</p>
<p class="p1">different types of bacteria employ similar metabolic processes and thus can be targeted by common antibacterials / each kind of virus usually requires special drugs/approaches / <em>OWTTE</em>;</p>
<p class="p1">bacteria can be killed by interfering with cell wall production without attacking host cell / difficult to attack the virus without attacking host cell;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p class="p1">Option D was a popular option. The identification of the wavenumber range used in the determination of ethanol lead to many correct answers. However, why the absorption range 3200-3600 \({\text{c}}{{\text{m}}^{ - 1}}\) is not used still eludes a substantial number of candidates. How the transmission of IR radiation changes with increased levels of ethanol was not answered well, showing a poor understanding of transmittance. The question on the mild analgesic was not very well except for being able to identify the amide group in the molecules in question. The physiological effect of the drug as well as the reason for some drugs being less effective when taken orally was both very well answered. The ‘mix and split’ approach to combinatorial chemistry was generally not done well with answers that were weak showing shallow understanding.</p>
<p class="p1">The two structural features found in the sympathomimetic drugs were mostly correctly identified. Although many students were able to identify two chiral centers in the two structures given, not as many could identify the three needed for the mark. In the preferred method for the synthesis of optically active drugs, where many scored full marks but the difficulty of separating enantiomers due to their similar physical properties was the least popular explanation given. Surprisingly, the suggestion for increasing the aqueous solubility of an alkaline drug by adding an acid or converting it to its salt was done poorly showing a lack of understanding of acid-base chemistry and bonding.</p>
<p class="p1">In one argument for and one against the legalization of cannabis, while many candidates scored at least one mark out of two, some journalistic answers were seen. Description of the bonding changes that occur when the anti-cancer drug cisplatin attaches to the DNA chain was typically not well answered questions with many candidates being able to provide only one of the two ideas, usually the missing one was that \({\text{C}}{{\text{l}}^ - }\) leave \({\text{Pt/P}}{{\text{t}}^{2 + }}\). Why the <em>trans</em>-cisplatin is ineffective in the treatment of cancer elicited fewer correct answers than expected. Question 18 was not on AIDS <em>per se </em>but rather on why viral infections are more difficult to treat than bacterial infections. A significant number of students scored part marks thus illustrating shallow understanding and deserves further attention in class. Very often marks were lost due to incomplete arguments.</p>
</div>
<br><hr><br><div class="specification">
<p>Organic solvents are commonly used in the pharmaceutical industry.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Hexane and propanone have vapour pressures of 17 kPa and 24 kPa respectively at 20 °C.</p>
<p>Calculate the vapour pressure, in kPa, at 20 °C of a mixture containing 60% hexane and 40% propanone by mole fraction, using Raoult’s law and assuming the mixture is ideal.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how hexane and propanone may be separated by fractional distillation.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>vapour pressure = 0.6 × 17 + 0.4 × 24 =<strong>»</strong></p>
<p>19.8 <strong>«</strong>kPa<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any three of:</em></p>
<p>different molar masses</p>
<p><strong><em>OR</em></strong></p>
<p>different strength of intermolecular forces</p>
<p> </p>
<p>different boiling points</p>
<p>temperature in <strong>«</strong>fractionating<strong>» </strong>column decreases upwards</p>
<p> </p>
<p><strong>«</strong>components<strong>» </strong>condense at different temperatures/heights</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>component with<strong>» </strong>lower boiling point leaves column first</p>
<p> </p>
<p><em><strong>[3 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Aspirin is one of the most widely used drugs in the world.</p>
</div>
<div class="specification">
<p>Aspirin was synthesized from 2.65 g of salicylic acid (2-hydroxybenzoic acid) (<em>M</em><sub>r</sub> = 138.13) and 2.51 g of ethanoic anhydride (<em>M</em><sub>r</sub> = 102.10).</p>
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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> absorbances, other than the absorbances due to the ring structure and C–H bonds, that would be present in the infrared (IR) spectrum of aspirin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>two</strong> techniques, other than IR spectroscopy, which could be used to confirm the identity of aspirin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iv.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>2500–3000 «cm<sup>–1</sup>» / «absorbance» due to O–H in carboxyl</p>
<p>1700–1750 «cm<sup>–1</sup>» / «absorbance» due to C=O in carboxyl/ethanoate</p>
<p>1050–1410 «cm<sup>–1</sup>» / «absorbance» due to C–O bond in carboxyl/ethanoate</p>
<p> </p>
<p><em>Accept “carboxylic acid” for “carboxyl”, “acetate/ester” for “ethanoate”.</em></p>
<p><em>Accept specific wavenumber once within indicated range.</em></p>
<p><em>Do <strong>not</strong> award mark if reference is made to an alcohol/ether.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>melting point</p>
<p>mass spectrometry/MS</p>
<p>high-performance liquid chromatography/HPLC</p>
<p>NMR/nuclear magnetic resonance</p>
<p>X-ray crystallography</p>
<p>elemental analysis</p>
<p> </p>
<p><em>Accept “spectroscopy” instead of “spectrometry” where mentioned but <strong>not</strong> “spectrum”.</em></p>
<p><em>Accept “ultraviolet «-visible» spectroscopy/UV/UV-Vis”.</em></p>
<p><em>Do <strong>not</strong> accept “gas chromatography/GC”.</em></p>
<p><em>Accept “thin-layer chromatography/TLC” as an alternative to “HPLC”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.iv.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.iv.</div>
</div>
<br><hr><br><div class="specification">
<p>The use of performance-enhancing drugs presents a challenge in the world of competitive sports. New regulations have lowered the acceptable concentrations of certain drugs in athletes’ bodies.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest what may have led to these changes in acceptable concentrations.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One class of performance-enhancing drugs is the anabolic steroids. Detection of these drugs in urine samples uses a combination of gas chromatography and mass spectrometry (GC/MS).</p>
<p>(i) Describe how gas chromatography enables the components of urine to be analysed.</p>
<p>(ii) The structures of two steroids, testosterone and nandrolone, are given below.</p>
<p style="text-align: center;"><img 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"></p>
<p>With reference to the molar masses of the two steroids, determine, with a reason, which can be identified from the mass spectrum below.</p>
<p style="text-align: center;"><img 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"></p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>improvements in technology/instrumentation/analytical techniques/precision of measurements</p>
<p><em>Accept “greater awareness/knowledge of the negative effects of the drugs”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>«components have» different affinities for/partition between 2 phases/mobile and stationary phase </p>
<p>move at different rates through instrument<br><em><strong>OR<br></strong></em>have different retention times</p>
<p> </p>
<p>ii</p>
<p>nandrolone <em>M</em> = 274 «g mol<sup>–1</sup>»<br><em><strong>OR<br></strong></em>testosterone <em>M</em> = 288 «g mol<sup>–1</sup>»</p>
<p>nandrolone identified because «molecular ion peak of» <em>m/z</em> = 274 </p>
<p><em>Accept non-integer molar masses, ie, 274.44 «g mol<sup>–1</sup>» and 288.47 «g mol<sup>–1</sup>». <br></em></p>
<p><em>Accept also “m/z = 275” for “m/z = 274” in M2. <br></em></p>
<p><em>Accept “absence of peak with m/z = 288”</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Ibuprofen and paracetamol are mild analgesics. One of the IR spectra below belongs to ibuprofen and the other to paracetamol. The structures of both compounds are given in section 37 of the data booklet.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Both spectra show a peak at wavenumber 1700 cm<sup>–1</sup>. Identify the bond responsible for this peak.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce which spectrum belongs to paracetamol, giving two reasons for your choice. Use section 26 of the data booklet.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how mild analgesics function.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>C=O</p>
<p><em>Accept “carbonyl”.</em></p>
<p> </p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>X</strong> (must be identified) <em><strong>AND</strong></em></p>
<p><em>Any two of:</em></p>
<p>For <strong>X</strong>:</p>
<p>N–H «absorption» <em><strong>AND</strong> </em>at 3300 – 3500 «cm<sup>–1</sup>» ✔</p>
<p>O–H «absorption» in phenol <em><strong>AND</strong> </em>at 3200 – 3600 «cm<sup>–1</sup>» ✔</p>
<p>absence of OH «absorption» in carboxylic acid <em><strong>AND</strong> </em>2500 – 3000 «cm<sup>–1</sup>»</p>
<p><em>Accept any specific wavenumber in the range 3300–3380 «cm<sup>–1</sup>» for M1.</em></p>
<p><em>Accept any specific wavenumber in the range 3100–3200 «cm<sup>–1</sup>».</em></p>
<p><em>Award <strong>[1 max]</strong> if <strong>Y</strong> is incorrectly identified for paracetamol but if a correct reason/reasons is/are given for the bond absorption(s).</em></p>
<p><em><strong>[Max 2 Marks]</strong></em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>prevents/interferes with the production of prostaglandins</p>
<p><em><strong>OR</strong></em></p>
<p>prevents/interferes with the production of substances responsible for inflammation/pain/fever at the site of injury/source of pain</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Opiates have been used for thousands of years to alleviate pain. The structures of opiates are found in section 37 of the data booklet.</p>
</div>
<div class="question">
<p>Using sections 26 and 37 of the data booklet, deduce, giving <strong>two</strong> reasons, which spectrum is that of morphine and which is diamorphine.</p>
<p><img 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alt></p>
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<h2 style="margin-top: 1em">Markscheme</h2>
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<p>spectrum A is diamorphine because it has a <strong>«</strong>strong<strong>»</strong> peak at 1700–1750 <strong>«</strong>cm<sup>–1</sup><strong>»</strong><br><em><strong>OR</strong></em><br>spectrum A is diamorphine because it has a C=O/carbonyl (group)/ester</p>
<p>spectrum B is morphine because it has a «strong broad» peak at 3200– 3600 <strong>«</strong>cm<sup>–1</sup><strong>»</strong><br> <em><strong>OR</strong></em><br> spectrum B is morphine because it has a –OH/hydroxyl (group)</p>
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<p><em>Award <strong>[1 max]</strong> for “spectrum A is diamorphine <strong>AND</strong> spectrum B is morphine” <strong>OR</strong> correctly identified peaks associated with the correct compounds (eg. C=O for diamorphine etc.).</em><br><em>Accept “alcohol/hydroxy” for “hydroxyl” but not “hydroxide”</em>.</p>
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<h2 style="margin-top: 1em">Examiners report</h2>
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[N/A]
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