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</div><h2>SL Paper 3</h2><div class="specification">
<p>A student wished to determine the concentration of a solution of sodium hydroxide by titrating it against a 0.100moldm<sup>−3</sup> aqueous solution of hydrochloric acid.</p>
<p>4.00g of sodium hydroxide pellets were used to make 1.00dm<sup>3</sup> aqueous solution.</p>
<p>20.0cm<sup>3</sup> samples of the sodium hydroxide solution were titrated using bromothymol blue as the indicator.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, giving your reasons, how you would carefully prepare the 1.00dm<sup>3</sup> aqueous solution from the 4.00g sodium hydroxide pellets.</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) State the colour change of the indicator that the student would see during his titration using section 22 of the data booklet.</p>
<p>(ii) The student added the acid too quickly. Outline, giving your reason, how this could have affected the calculated concentration.</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>Suggest why, despite preparing the solution and performing the titrations very carefully, widely different results were obtained.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Nitrogen dioxide and sulfur dioxide are two air pollutants.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Nitrogen dioxide is formed in a two-stage process. Describe <strong>one </strong>anthropogenic (man-made) source of nitrogen dioxide and state the <strong>two </strong>chemical equations for its formation.</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">Both of these air pollutants also contribute to acid deposition. State <strong>one </strong>chemical equation for <strong>each </strong>gas to describe how each forms an acidic solution.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Acid deposition is a major environmental concern. Although it is usually associated with human activities, natural sources can also contribute to this phenomenon.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>one </strong>natural origin of acid deposition.</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 class="p1">State equations which represent chemical transformations of elemental sulfur into sulfurous acid, H<sub><span class="s1">2</span></sub>SO<sub><span class="s1">3</span></sub>.</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">Discuss the possible ways of decreasing acid deposition and its adverse effects on the environment.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">One major environmental problem that affects many countries is acid rain.</p>
</div>
<div class="specification">
<p class="p1">Nitrogen monoxide pollution is a major contributor of acid rain.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain, writing an appropriate equation, why, even in an unpolluted environment, rainwater is still slightly acidic.</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">(i) Outline the major source of this gas, including an equation.</p>
<p class="p1">(ii) Describe, including an equation, a chemical method used to control the emission of this pollutant.</p>
<p class="p1">(iii) Identify a compound, to which nitrogen monoxide is eventually converted, that is responsible for acidity in lakes and rivers.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Acid deposition is a consequence of industrial processes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what is meant by the term acid deposition.</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>Industrial processes, such as the burning of coal, generate non-metallic oxides of carbon and nitrogen into the atmosphere. State balanced equations for the reactions by which these oxides are produced and then removed from the atmosphere.</p>
<p> </p>
<p>Oxide of carbon:</p>
<p>Produced:</p>
<p>Removed:</p>
<p>Oxide of nitrogen:</p>
<p>Produced:</p>
<p>Removed:</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>All shellfish have a calcium carbonate shell. Discuss, including a balanced equation, the long-term effect of acid deposition on these organisms.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>Balanced equation:</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The two major acids that cause acid rain originate from different sources.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State an equation that shows why rain water is naturally acidic.</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 class="p1">Outline the process responsible for the production of each acid and state an equation to show its formation.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Acid rain has caused damage to limestone buildings and marble statues. State an equation to represent the reaction of acid rain with limestone or marble.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Acid deposition can have a significant impact on aquatic environments such as lakes or wetlands.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State what is meant by the term <em>acid deposition</em>.</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">Identify <strong>one </strong>oxide which causes acid deposit</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">One effect of acid deposition is to decrease the pH of lake water. Suggest how this effect could be reversed.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The exhaust gases of automobiles contribute significantly to air pollution in cities.</p>
</div>
<div class="question">
<p class="p1">Outline how the pollutant gases nitrogen(II) oxide, NO, nitrogen(IV) oxide, \({\text{N}}{{\text{O}}_2}\)<span class="s1"> </span>and carbon monoxide, CO, are formed as a result of the action of the internal combustion engine.</p>
<p class="p1">NO:</p>
<p class="p1">\({\text{N}}{{\text{O}}_2}\):</p>
<p class="p1">CO:</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The normal pH of rainwater is 5.6, but in some parts of the world rainwater has been recorded with a pH of several units lower than this. This is associated with harmful effects on living and non-living things.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The decrease in the pH of rainwater is mainly caused by oxides of non-metals, principally nitrogen and sulfur. State chemical equations that show how the primary pollutant nitrogen(II) oxide can produce <strong>two </strong>different acids containing nitrogen.</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, including an equation, the effect of the acid rain produced in (a) on certain stone buildings.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The cumene process is used for the production of both propanone and phenol. The overall reaction is shown in the equation below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_17.08.44.png" alt="N14/4/CHEMI/SP3/ENG/TZ0/26"></p>
<p>This process is important in the polymer industry. Propanone can be converted into methyl methacrylate, the monomer used to make Perspex<sup>®</sup>, and phenol is used in phenol-methanal resins, which are important thermosetting plastics.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State and explain how the presence of a halogen substituent might affect the acidity of carboxylic acids.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Propanone could also be formed from propene by reaction with steam over an acidic catalyst, followed by oxidation of the product.</p>
<p>The reaction of propene with water can yield two possible products. Explain, in terms of the stability of the intermediate carbocations, why one is formed in much greater quantities than the other.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Nitrogen monoxide gas, NO, is emitted by cars and leads to acid deposition.</p>
</div>
<div class="question">
<p class="p1">Discuss the damage to the environment caused by acid deposition.</p>
</div>
<br><hr><br><div class="specification">
<p>A class was determining the concentration of aqueous sodium hydroxide by titrating it with hydrochloric acid, whilst monitoring the pH of the solution. The sodium hydroxide solution was added into a glass beaker from a measuring cylinder and the hydrochloric acid added using a burette. One group of students accidentally used a temperature probe rather than a pH probe. Their results are given below.</p>
<p>Volume of aqueous NaOH = 25.0 ± 0.5 cm<sup>3</sup></p>
<p>Concentration of HCl = 1.00 ± 0.01 mol dm<sup>−3</sup></p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce why more heat was produced in mixture <strong>B</strong> than in mixture <strong>A</strong>.</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 why the temperature is higher in mixture <strong>C</strong> than in mixture <strong>D</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</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 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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>The combustion of fossil fuels produces large amounts of CO<sub>2</sub>, a greenhouse gas.</p>
<p>The diagram below illustrates a range of wavelengths in the electromagnetic spectrum.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="specification">
<p>Synthesis gas, or syngas, mainly composed of CO(g) and H<sub>2</sub>(g), is an alternative form of fuel. It can be produced by coal or biomass gasification, passing steam over the source material in a low oxygen environment.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify which region, <strong>A</strong> or <strong>B</strong>, corresponds to each type of radiation by completing the table.</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>Oceans can act as a carbon sink, removing some CO<sub>2</sub>(g) from the atmosphere.</p>
<p style="text-align: center;">CO<sub>2</sub>(g) \( \rightleftharpoons \) CO<sub>2</sub>(aq)</p>
<p>Aqueous carbon dioxide, CO<sub>2</sub>(aq), quickly reacts with ocean water in a new equilibrium reaction. Construct the equilibrium equation for this reaction including state symbols.</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>Describe how large amounts of CO<sub>2</sub> could reduce the pH of the ocean using an equation to support your answer.</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>Suggest an equation for the production of syngas from coal.</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>The Fischer-Tropsch process, an indirect coal liquefaction method, converts CO(g) and H<sub>2</sub>(g) to larger molecular weight hydrocarbons and steam.</p>
<p>Deduce the equation for the production of octane by this process.</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>Suggest a reason why syngas may be considered a viable alternative to crude oil.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br>