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<h2>HL Paper 3</h2><div class="specification">
<p>Alloys containing at least 60 % copper reduce the presence of bacteria on their surface.The percentage of copper in brass, an alloy of copper and zinc, can be determined by UV-vis spectrometry.</p>
<p>A sample of brass is dissolved in concentrated nitric acid and then made up to 250.0 cm<sup>3</sup>&nbsp;with water before analysis.</p>
<p style="text-align: center;">Cu (s) + 4HNO<sub>3</sub>&nbsp;(aq) → Cu(NO<sub>3</sub>)<sub>2</sub>&nbsp;(aq) + 2NO<sub>2</sub>&nbsp;(g) + 2H<sub>2</sub>O (l)</p>
<p style="text-align: center;">3Zn (s) + 8HNO<sub>3</sub>&nbsp;(aq) → 3Zn(NO<sub>3</sub>)<sub>2</sub>&nbsp;(aq) + 2NO (g) + 4H<sub>2</sub>O (l)</p>
<p>The concentration of copper(II) ions in the resulting solution is then determined from a calibration curve, which is plotted by measuring the light absorbance of standard solutions.</p>
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"></p>
<p style="text-align: left;">You may find the following chart and diagram helpful.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
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<p style="text-align: center;"><img 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"></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the initial reaction should be carried out under a fume hood.</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>Deduce the equation for the relationship between absorbance and concentration.</p>
<p><img 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"></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>Copper(II) ion solutions are blue. Suggest, giving your reason, a suitable wavelength of light for the analysis.</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 how a solution of 0.0100 mol dm<sup>−3</sup> is obtained from a standard 1.000 mol dm<sup>−3</sup> copper(II) sulfate solution, including <strong>two</strong> essential pieces of glassware you would need.</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>The original piece of brass weighed 0.200 g. The absorbance was 0.32.</p>
<p>Calculate, showing your working, the percentage of copper by mass in the brass.</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the appropriate number of significant figures for your answer in (e)(i).</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Comment on the suitability of using brass of this composition for door handles in hospitals.</p>
<p>If you did not obtain an answer to (e)(i), use 70 % but this is not the correct answer.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest another property of brass that makes it suitable for door handles.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Titration is another method for analysing the solution obtained from adding brass to nitric acid.</p>
<p>Copper(II) ions are reduced to copper(I) iodide by the addition of potassium iodide solution, releasing iodine that can be titrated with sodium thiosulfate solution, Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub> (aq). Copper(I) iodide is a white solid.</p>
<p style="text-align: center;">4I<sup>−</sup> (aq) + 2Cu<sup>2+</sup> (aq) → 2CuI (s) + I<sub>2</sub> (aq)</p>
<p style="text-align: center;">I<sub>2</sub> (aq) + 2S<sub>2</sub>O<sub>3</sub><sup>2−</sup> (aq) → 2I<sup>−</sup> (aq) + S<sub>4</sub>O<sub>6</sub><sup>2−</sup> (aq)</p>
<p>Suggest why the end point of the titration is difficult to determine, even with the addition of starch to turn the remaining free iodine black.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>NO<sub>2</sub>/NO/NO<sub>x</sub>/HNO<sub>3</sub>/gas is poisonous/toxic/irritant ✔</p>
<p> </p>
<p><em>Accept formula or name.</em></p>
<p><em>Accept “HNO<sub>3</sub> is corrosive” <strong>OR</strong> “poisonous/toxic gases produced”.</em></p>
<p><em>Accept “reaction is harmful/hazardous”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Slope (gradient):</em></p>
<p>40 ✔</p>
<p> </p>
<p><em>Equation:</em></p>
<p>absorbance = 40 × concentration</p>
<p><em><strong>OR</strong></em></p>
<p><em>y</em> = 40<em>x</em> ✔</p>
<p> </p>
<p><em>Accept any correct relationship for slope such as <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.00}}{{0.025}}">
  <mfrac>
    <mrow>
      <mn>1.00</mn>
    </mrow>
    <mrow>
      <mn>0.025</mn>
    </mrow>
  </mfrac>
</math></span>.</em></p>
<p><em>Award <strong>[2]</strong> if equation in M2 is correct.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>orange is opposite blue «in the colour wheel»</p>
<p><em><strong>OR</strong></em></p>
<p>the complementary colour «blue» is seen/transmitted ✔</p>
<p> </p>
<p>585–647 «nm would be absorbed» ✔</p>
<p> </p>
<p><em>Accept any value or range within 550–680 «nm» for M2.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>dilute 1.00 cm<sup>3</sup> «of the standard solution with water» to 100 cm<sup>3</sup></p>
<p><em><strong>OR</strong></em></p>
<p>dilute sample of standard solution «with water» 100 times ✔</p>
<p> </p>
<p>«graduated/volumetric» pipette/pipet ✔</p>
<p>volumetric flask ✔</p>
<p> </p>
<p><em>Accept any 1 : 100 ratio for M1.</em></p>
<p><em>Accept “mix 1 cm<sup>3</sup> of the standard solution with 99 cm<sup>3</sup> of water” for M1.</em></p>
<p><em>Do <strong>not</strong> accept “add 100 cm<sup>3</sup> of water to 1.00 cm<sup>3</sup> of standard solution” for M1.</em></p>
<p><em>Accept “burette/buret” for M2.</em></p>
<p><em>Accept “graduated/measuring flask” for M3 but <strong>not </strong>“graduated/measuring cylinder” or “conical/Erlenmeyer flask”.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>concentration of copper = 0.0080 «mol dm<sup>–3</sup>» ✔</p>
<p> </p>
<p>mass of copper in 250.0 cm<sup>3</sup> = «0.0080 mol dm<sup>–3</sup> × 0.2500 dm<sup>3</sup> × 63.55 g mol<sup>–1</sup> =» 0.127 «g»</p>
<p><em><strong>OR</strong></em></p>
<p>mass of brass in 1 dm<sup>3</sup> = «4 × 0.200 g =» 0.800 g <em><strong>AND </strong></em>[Cu2+] = «0.0080 mol dm<sup>–3</sup> × 63.55 g mol<sup>–1</sup> =» 0.5084 g dm<sup>–3</sup> ✔</p>
<p> </p>
<p>«% copper in this sample of brass <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{0.127}}{{0.200}} \times 100 = ">
  <mo>=</mo>
  <mfrac>
    <mrow>
      <mn>0.127</mn>
    </mrow>
    <mrow>
      <mn>0.200</mn>
    </mrow>
  </mfrac>
  <mo>×</mo>
  <mn>100</mn>
  <mo>=</mo>
</math></span>» 64 «%»</p>
<p><em><strong>OR</strong></em></p>
<p>«% copper in this sample of brass <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{0.5084}}{{0.800}} \times 100 = ">
  <mo>=</mo>
  <mfrac>
    <mrow>
      <mn>0.5084</mn>
    </mrow>
    <mrow>
      <mn>0.800</mn>
    </mrow>
  </mfrac>
  <mo>×</mo>
  <mn>100</mn>
  <mo>=</mo>
</math></span>» 64 «%» ✔</p>
<p> </p>
<p><em>Accept any value in range 0.0075–0.0085 «mol dm<sup>–3</sup>» for M1.</em></p>
<p><em>Accept annotation on graph for M1.</em></p>
<p><em>Award <strong>[3]</strong> for correct final answer.</em></p>
<p><em>Accept “65 «%»”.</em></p>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>two ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> apply ECF from 1(e)(i).</em></p>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«since it is greater than 60%» it will reduce the presence of bacteria «on door handles» ✔</p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>resistant to corrosion/oxidation/rusting</p>
<p><em><strong>OR</strong></em></p>
<p>low friction surface «so ideal for connected moving components» ✔</p>
<p> </p>
<p><em>Accept “hard/durable”, “«high tensile» strength”, “unreactive”, “malleable” or any reference to the appearance/colour of brass (eg “gold-like”, “looks nice” etc.).</em></p>
<p><em>Do <strong>not</strong> accept irrelevant properties, such as “high melting/boiling point”, “non-magnetic”, “good heat/electrical conductor”, “low volatility”, etc.</em></p>
<p><em>Do <strong>not</strong> accept “ductile”.</em></p>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>precipitate/copper(I) iodide/CuI makes colour change difficult to see</p>
<p><em><strong>OR</strong></em></p>
<p>release of I<sub>2</sub>/iodine from starch-I<sub>2</sub> complex is slow so titration must be done slowly ✔</p>
<div class="question_part_label">g.</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>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>EDTA is produced by reacting ethane-1,2-diamine with chloroethanoic acid, ClCH<sub>2</sub>COOH.</p>
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"></p>
</div>

<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the other product formed.</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 why EDTA, a chelating agent, is more effective in removing heavy metal ions&nbsp;from solution than monodentate ligands.</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>HCl/hydrogen chloride</p>
<p>&nbsp;</p>
<p><em>Accept “hydrochloric acid”.</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>forms four/six/several/multiple coordinate/coordination bonds «to a central metal&nbsp;ion»<br><em><strong>OR</strong></em><br>is a polydentate/tetradentate/hexadentate ligand</p>
<p>forms more stable complex/stronger bonds with central metal ion<br><em><strong>OR</strong></em><br>increases entropy/<em>S</em> by releasing smaller «monodentate ligand» molecules&nbsp;previously complexed</p>
<p>complex ions are much larger «and can be removed easily due to large size of&nbsp;chelate complexes»<br><em><strong>OR</strong></em><br>heavy metal ions trapped inside the ligand/become «biologically» inactive/nontoxic/harmless</p>
<p>&nbsp;</p>
<p><em>Accept “dative «covalent»” for&nbsp;“coordinate/coordination”.</em></p>
<p><em>Do <strong>not</strong> accept just “chelates”.</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>
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