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</div><h2>SL Paper 3</h2><div class="specification">
<p>Rhodium and palladium are often used together in catalytic converters. Rhodium is a good reduction catalyst whereas palladium is a good oxidation catalyst.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>In a catalytic converter, carbon monoxide is converted to carbon dioxide. Outline the process for this conversion referring to the metal used.</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>Nickel is also used as a catalyst. It is processed from an ore until nickel(II) chloride solution is obtained. Identify <strong>one</strong> metal, using sections 24 and 25 of the data booklet, which will not react with water and can be used to extract nickel from the solution.</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>Deduce the redox equation for the reaction of nickel(II) chloride solution with the metal identified in (b)(i).</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>Another method of obtaining nickel is by electrolysis of a nickel(II) chloride solution. Calculate the mass of nickel, in g, obtained by passing a current of 2.50 A through the solution for exactly 1 hour. Charge (<em>Q</em>) = current (<em>I</em>) × time (<em>t</em>).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Water purity is often assessed by reference to its oxygen content.</p>
</div>
<div class="specification">
<p class="p1">The Winkler method uses redox reactions to find the concentration of oxygen in water. \({\text{100 c}}{{\text{m}}^{\text{3}}}\) of water was taken from a river and analysed using this method. The reactions taking place are summarized below.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{Step 1}}}&{{\text{2M}}{{\text{n}}^{2 + }}{\text{(aq)}} + {\text{4O}}{{\text{H}}^ - }{\text{(aq)}} + {{\text{O}}_2}{\text{(aq)}} \to {\text{2Mn}}{{\text{O}}_2}{\text{(s)}} + {\text{2}}{{\text{H}}_2}{\text{O(l)}}} \\ {{\text{Step 2}}}&{{\text{Mn}}{{\text{O}}_2}{\text{(s)}} + {\text{2}}{{\text{I}}^ - }{\text{(aq)}} + {\text{4}}{{\text{H}}^ + }{\text{(aq)}} \to {\text{M}}{{\text{n}}^{2 + }}{\text{(aq)}} + {{\text{I}}_2}{\text{(aq)}} + {\text{2}}{{\text{H}}_2}{\text{O(l)}}} \\ {{\text{Step 3}}}&{{\text{2}}{{\text{S}}_2}{\text{O}}_3^{2 - }{\text{(aq)}} + {{\text{I}}_2}{\text{(aq)}} \to {{\text{S}}_4}{\text{O}}_6^{2 - }{\text{(aq)}} + {\text{2}}{{\text{I}}^ - }{\text{(aq)}}} \end{array}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the meaning of the term <em>biochemical oxygen demand </em>(BOD).</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">State what happened to the \({{\text{O}}_{\text{2}}}\) in step 1 in terms of electrons.</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 class="p1">State the change in oxidation number for manganese in step 2.</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 class="p1">0.0002 moles of \({{\text{I}}^ - }\) were formed in step 3. Calculate the amount, in moles, of oxygen, \({{\text{O}}_{\text{2}}}\), dissolved in water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Rechargeable nickel-cadmium batteries are used in portable electrical equipment and emergency lighting.</p>
<p class="p1">The <strong>discharge </strong>process can be summarized by the equation below.</p>
<p class="p1">\[{\text{2NiO(OH)(s)}} + {\text{Cd(s)}} + {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} \rightleftharpoons {\text{2Ni(OH}}{{\text{)}}_{\text{2}}}{\text{(s)}} + {\text{Cd(OH}}{{\text{)}}_{\text{2}}}{\text{(s)}}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the change in oxidation number of the cadmium and deduce if it is acting as the positive or negative electrode during the discharge process.</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">Identify a physical property of Cd(OH)<sub><span class="s1">2 </span></sub>which allows this process to be reversed and the battery recharged.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The biochemical oxygen demand (BOD) is a measure of water pollution.</p>
</div>
<div class="question">
<p class="p1">State what is meant by the term <em>biochemical oxygen demand </em>(BOD).</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Depressants can have different effects depending on their doses.</p>
</div>
<div class="specification">
<p class="p1">A breathalyser containing crystals of potassium dichromate(VI) can be used by the police to detect whether a driver has consumed alcohol.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the chemical formula for potassium dichromate(VI).</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 the colour change observed during its reaction with ethanol.</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">State the oxidation number of chromium in the product.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the <strong>full </strong>balanced chemical equation for the redox reaction of ethanol with acidified potassium dichromate(VI).</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the name of the organic product formed.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">An intoximeter is used to determine an accurate value for the concentration of ethanol in the breath. Explain <strong>one </strong>technique used for the detection of ethanol in an intoximeter.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Aluminium is chemically reactive so it has to be extracted by the electrolysis of aluminium oxide dissolved in molten cryolite.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_14.43.47.png" alt="N14/4/CHEMI/SP3/ENG/TZ0/08"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce an equation for the discharge of the ions at each electrode.</p>
<p> </p>
<p>Positive electrode (anode):</p>
<p> </p>
<p> </p>
<p>Negative electrode (cathode):</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>(i) Outline why aluminium is alloyed with copper and magnesium when used to construct aircraft bodies.</p>
<p> </p>
<p> </p>
<p>(ii) State <strong>two </strong>properties of aluminium that make it suitable for use in overhead power cables.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Ethanol is a depressant that is widely consumed in many societies. When consumed excessively it has a major impact on families and society as a whole. Other depressants such as diazepam (Valium<sup><span class="s1">®</span></sup>) may be prescribed by a doctor.</p>
</div>
<div class="specification">
<p class="p1">One problem associated with ethanol consumption is an increased risk of traffic accidents. Police in many countries use a breathalyser to test drivers. The breathalyser contains potassium dichromate(VI).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the colour change of potassium dichromate(VI) when it reacts with ethanol.</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">State with a reason whether chromium in potassium dichromate(VI) is oxidised or reduced by ethanol.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Dissolved oxygen is used up when organic matter is decomposed aerobically in water.</p>
</div>
<div class="specification">
<p>The Winkler method, which is based on redox reactions, can be used to determine the concentration of dissolved oxygen in water.</p>
<p>A \({\text{200 c}}{{\text{m}}^{\text{3}}}\) sample of water was taken from a river and analysed using this method.</p>
<p>The redox reactions are shown below.</p>
<p> Step 1 \({\text{2M}}{{\text{n}}^{2 + }}{\text{(aq)}} + {\text{4O}}{{\text{H}}^ - }{\text{(aq)}} + {{\text{O}}_2}{\text{(aq)}} \to {\text{2Mn}}{{\text{O}}_2}{\text{(s)}} + {\text{2}}{{\text{H}}_2}{\text{O(l)}}\)</p>
<p> Step 2 \({\text{Mn}}{{\text{O}}_2}{\text{(s)}} + {\text{2}}{{\text{I}}^ - }{\text{(aq)}} + {\text{4}}{{\text{H}}^ + }{\text{(aq)}} \to {\text{M}}{{\text{n}}^{2 + }}{\text{(aq)}} + {{\text{I}}_2}{\text{(aq)}} + {\text{2}}{{\text{H}}_2}{\text{O(l)}}\)</p>
<p> Step 3 \({\text{2}}{{\text{S}}_2}{\text{O}}_3^{2 - }{\text{(aq)}} + {{\text{I}}_2}{\text{(aq)}} \to {{\text{S}}_4}{\text{O}}_6^{2 - }{\text{(aq)}} + {\text{2}}{{\text{I}}^ - }{\text{(aq)}}\)</p>
</div>
<div class="question">
<p>(i) \(1.50 \times {10^{ - 4}}{\text{ mol}}\) of \({{\text{I}}^ - }{\text{(aq)}}\) was formed in step 3. Determine the amount, in mol, of oxygen, \({{\text{O}}_{\text{2}}}{\text{(aq)}}\), dissolved in the water.</p>
<p> </p>
<p> </p>
<p>(ii) Determine the solubility, in \({\text{g}}\,{\text{d}}{{\text{m}}^{ - 3}}\), of the oxygen in the water.</p>
</div>
<br><hr><br><div class="specification">
<p>In order to provide safe drinking water, a water supply is often treated with disinfectants, which aim to inactivate disease-causing bacteria in the water.</p>
<p>To compare the effectiveness of different disinfectants, a <strong>CT value</strong> is used as a measure of the dosage of disinfectant needed to achieve a certain level of inactivation of specific bacteria.</p>
<p style="text-align: center;">CT value (mg min dm<sup>−3</sup>) = C (mg dm<sup>−3</sup>) concentration of disinfectant × T (min) contact time with water</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">The table below compares the CT values of different disinfectants necessary to achieve 99% inactivation of two types of bacteria, listed as <strong>A</strong> and <strong>B</strong>.</p>
<p style="text-align: center;"><img 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"></p>
<p>(i) Deduce the oxidation state of chlorine in the following disinfectants.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(ii) From the data on CT values, justify the statement that bacterium <strong>B</strong> is generally more resistant to disinfection than bacterium <strong>A</strong>.</p>
<p>(iii) CT values can be used to determine whether a particular treatment process is adequate. Calculate the CT value, in mg min dm<sup>−3</sup>, when 1.50 × 10<sup>−5</sup> g dm<sup>−3</sup> of chlorine dioxide is added to a water supply with a contact time of 9.82 minutes.</p>
<p>(iv) From your answer to (a) (iii) and the data in the table, comment on whether this treatment will be sufficient to inactivate 99% of bacterium <strong>A</strong>.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>CT values are influenced by temperature and by pH. The table below shows the CT values for chlorine needed to achieve 99% inactivation of a specific bacterium at stated values of pH and temperature.</p>
<p style="text-align: center;"><img 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"></p>
<p>(i) With reference to the temperature data in the table, suggest why it may be more difficult to treat water effectively with chlorine in cold climates.</p>
<p>(ii) Sketch a graph on the axes below to show how the CT value (at any temperature) varies with pH.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(iii) Comment on the relative CT values at pH 6.0 and pH 9.0 at each temperature.</p>
<p>(iv) Chlorine reacts with water as follows:</p>
<p style="text-align: center;">Cl<sub>2</sub> (g) + H<sub>2</sub>O (l) \( \rightleftharpoons \) HOCl (aq) + HCl (aq)</p>
<p style="text-align: center;">HOCl (aq) \( \rightleftharpoons \) OCl<sup>−</sup> (aq) + H<sup>+</sup> (aq)</p>
<p style="text-align: left;">Predict how the concentrations of each of the species HOCl (aq) and OCl<sup>−</sup> (aq) will change if the pH of the disinfected water increases.</p>
<p style="text-align: left;"><img src="data:image/png;base64,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"></p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Despite widespread improvements in the provision of safe drinking water, the sale of bottled water has increased dramatically in recent years. State one problem caused by this trend.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>A student set up a simple voltaic cell consisting of a copper electrode and a zinc electrode dipped in sodium chloride solution.</p>
<p style="text-align: center;"><img 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"></p>
<p>The student gradually increased the distance, <em>d</em>, between the electrodes to study the effect on the initial current, <em>I</em>, passing through the light bulb.</p>
<p>The student hypothesized that the initial current would be inversely proportional to the distance between the electrodes.</p>
</div>
<div class="specification">
<p>The following data was collected over five trials.</p>
<p><img 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"></p>
<p>The data did not support the student’s hypothesis. He investigated other possible relationships by plotting a graph of the average current against the distance between the electrodes. He obtained the following best-fit line with a correlation coefficient (r) of −0.9999.</p>
<p><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a graph that would support the student’s hypothesis.</p>
<p><img src="data:image/png;base64,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"></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 what the correlation coefficient of −0.9999 indicates.</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 the equation of the straight line obtained using the data.</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>Outline how current flows in the sodium chloride solution.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br>