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</div><h2>SL Paper 3</h2><div class="specification">
<p>Students were asked to investigate how a change in concentration of hydrochloric acid, HCl, affects the initial rate of its reaction with marble chips, CaCO<sub>3</sub>.</p>
<p>They decided to measure how long the reaction took to complete when similar chips were added to 50.0 cm<sup>3</sup> of 1.00 mol dm<sup>−3</sup> acid and 50.0 cm<sup>3</sup> of 2.00 mol dm<sup>−3</sup> acid.</p>
<p>Two methods were proposed:</p>
<p>(1) using small chips, keeping the acid in excess, and recording the time taken for the solid to disappear</p>
<p>(2) using large chips, keeping the marble in excess, and recording the time taken for bubbles to stop forming.</p>
</div>
<div class="specification">
<p>A group recorded the following results with 1.00 mol dm<sup>−3</sup> hydrochloric acid:</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-09_om_15.47.04.png" alt="M18/4/CHEMI/SP3/ENG/TZ1/02.d"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Annotate the balanced equation below with state symbols.</p>
<p>CaCO<sub>3</sub>(__) + 2HCl(__) → CaCl<sub>2</sub>(__) + CO<sub>2</sub>(__) + H<sub>2</sub>O(__)</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>Neither method actually gives the initial rate. Outline a method that would allow the initial rate to be determined.</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>Deduce, giving a reason, which of the two methods would be least affected by the chips not having exactly the same mass when used with the different concentrations of acid.</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>State a factor, that has a significant effect on reaction rate, which could vary between marble chips of exactly the same mass.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Justify why it is inappropriate to record the uncertainty of the mean as ±0.01 s.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>If doubling the concentration doubles the reaction rate, suggest the mean time you would expect for the reaction with 2.00 mol dm<sup>−3</sup> hydrochloric acid.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Another student, working alone, always dropped the marble chips into the acid and then picked up the stopwatch to start it. State, giving a reason, whether this introduced a random or systematic error.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Penicillins and aspirin are important medicines.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how penicillin combats bacterial infections.</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>State how penicillins may be modified to increase their effectiveness.</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>State the type of reaction used to synthesize aspirin from salicylic acid.</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>Explain why aspirin is <strong>not </strong>stored in a hot, humid location.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Fuel cells and rechargeable batteries are both convenient ways of providing portable electric power.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Compare fuel cells and rechargeable batteries giving <strong>one </strong>similarity and <strong>one </strong>difference.</p>
<p class="p1">Similarity:</p>
<p class="p1">Difference:</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">One common type of rechargeable cell is the nickel–cadmium (NiCad) battery. For each terminal of this battery state the initial and final oxidation number of the element when the cell is delivering a current. Hence deduce which electrode is acting as the anode and which the cathode.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-31_om_15.34.41.png" alt="M12/4/CHEMI/SP3/ENG/TZ1/C2.b"></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 class="p1">A common type of fuel cell uses hydrogen and oxygen with an acidic electrolyte. State the half-equations for the reactions at the two electrodes.</p>
<p class="p1">Positive electrode:</p>
<p class="p1">Negative electrode:</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">The electrodes of fuel cells and rechargeable batteries have a feature in common with heterogeneous catalysts. Identify this feature and state why it is important for them to work efficiently.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Antacids react with hydrochloric acid in the stomach to relieve indigestion. A student investigated different brands of antacid to see which caused the largest increase in pH in a given time. She added the antacids to hydrochloric acid, and recorded the change in pH over five minutes.</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an equation for the reaction of magnesium hydroxide with hydrochloric acid.</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>Suggest two variables, besides the time of reaction, which the student should have controlled in the experiment to ensure a fair comparison of the antacids.</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>Calculate the uncertainty in the change in pH.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The student concluded that antacid <strong>B</strong> was the most effective, followed by <strong>A</strong> then <strong>C</strong> and finally <strong>D</strong>. Discuss two arguments that reduce the validity of the conclusion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Palmitic acid has a molar mass of 256.5 g mol<sup>−1</sup>.</p>
<p style="text-align: left;"><img 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"></p>
</div>
<div class="specification">
<p>The apparatus in the diagram measures the surface pressure created by palmitic acid molecules on the surface of water. This pressure is caused by palmitic acid molecules colliding with the fixed barrier. The pressure increases as the area, <strong>A</strong>, available to the palmitic acid is reduced by the movable barrier.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-09_om_15.37.49.png" alt="M18/4/CHEMI/SP3/ENG/TZ1/01.b_01"></p>
<p>When a drop of a solution of palmitic acid in a volatile solvent is placed between the barriers, the solvent evaporates leaving a surface layer. The graph of pressure against area was obtained as the area <strong>A </strong>was reduced.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-09_om_15.39.43.png" alt="M18/4/CHEMI/SP3/ENG/TZ1/01.b_02"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Part of this molecule is hydrophilic (bonds readily to water) and part hydrophobic (does not bond readily to water). Draw a circle around all of the hydrophilic part of the molecule.</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>When a small amount of palmitic acid is placed in water it disperses to form a layer on the surface that is only one molecule thick. Explain, in terms of intermolecular forces, why this occurs.</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>Suggest why there is a small increase in the surface pressure as the area is reduced to about 240 cm<sup>2</sup>, but a much faster increase when it is further reduced.</p>
<p><img 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"></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>The solution of palmitic acid had a concentration of 0.0034 mol dm<sup>−3</sup>. Calculate the number of molecules of palmitic acid present in the 0.050 cm<sup>3</sup> drop, using section 2 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Assuming the sudden change in gradient occurs at 240 cm<sup>2</sup>, calculate the area, in cm<sup>2</sup>, that a single molecule of palmitic acid occupies on surface of the water.</p>
<p>If you did not obtain an answer for (b)(ii) use a value of 8.2 × 10<sup>16</sup>, but this is not the correct answer.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br>