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<h2>SL Paper 1</h2><div class="question">
<p>What is the value of <strong>x</strong> when 32.2 g of Na<sub>2</sub>SO<sub>4</sub>•<strong>x</strong>H<sub>2</sub>O are heated leaving 14.2 g of anhydrous Na<sub>2</sub>SO<sub>4</sub>? <em>M</em><sub>r</sub>(H<sub>2</sub>O) = 18; <em>M</em><sub>r</sub>(Na<sub>2</sub>SO<sub>4</sub>) = 142.</p>
<p>Na<sub>2</sub>SO<sub>4•</sub><strong>x</strong>H<sub>2</sub>O (s) → Na<sub>2</sub>SO<sub>4</sub> (s) + <strong>x</strong>H<sub>2</sub>O (g)</p>
<p>A. 0.1</p>
<p>B. 1</p>
<p>C. 5</p>
<p>D. 10</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the molecular formula of a hydrocarbon containing 84.6% carbon by mass with a molar mass of 142.3 g mol<sup>−1</sup>?</p>
<p>A. C<sub>20</sub>H<sub>44</sub></p>
<p>B. C<sub>11</sub>H<sub>10</sub></p>
<p>C. C<sub>10</sub>H<sub>22</sub></p>
<p>D. C<sub>5</sub>H<sub>11</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the sum of the integer coefficients when propene undergoes complete combustion?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">__C<sub>3</sub>H<sub>6</sub> (g) + __O<sub>2</sub> (g) → __CO<sub>2</sub> (g) + __H<sub>2</sub>O (l)</span></p>
<p><span style="background-color: #ffffff;">A. 11</span></p>
<p><span style="background-color: #ffffff;">B. 17</span></p>
<p><span style="background-color: #ffffff;">C. 21</span></p>
<p><span style="background-color: #ffffff;">D. 23</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Very well answered. 88 % of the candidates balanced the equation and added up the integer coefficients correctly.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which is correct?</span></p>
<p><span style="background-color: #ffffff;"><br>A. Mixtures are either homogeneous or heterogeneous and their chemical properties are an average of the individual component properties.</span></p>
<p><span style="background-color: #ffffff;">B. Mixtures are never heterogeneous and their chemical properties are an average of the individual component properties.</span></p>
<p><span style="background-color: #ffffff;">C. Mixtures are either homogeneous or heterogeneous and the components retain their individual chemical properties.</span></p>
<p><span style="background-color: #ffffff;">D. Mixtures are never homogeneous and the components retain their individual chemical properties.</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>How many moles of oxygen atoms are there in 0.500 mol of hydrated iron(II) ammonium sulfate, (NH<sub>4</sub>)<sub>2</sub>Fe(SO<sub>4</sub>)<sub>2</sub>•6H<sub>2</sub>O(s)?</p>
<p>A. 4.00</p>
<p>B. 7.00</p>
<p>C. 8.00</p>
<p>D. 14.00</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What is the molar mass, in </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">g</mi><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo> </mo></math><span class="fontstyle0">, of a compound if <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>200</mn><mo> </mo><mi>mol</mi></math> of the compound has a mass of <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>13</mn><mo>.</mo><mn>2</mn><mo> </mo><mi mathvariant="normal">g</mi></math>?</span></p>
<p><span class="fontstyle0">A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>66</mn><mo>.</mo><mn>0</mn></math><br></span></p>
<p><span class="fontstyle0">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>66</mn></math><br></span></p>
<p><span class="fontstyle0">C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>26</mn><mo>.</mo><mn>4</mn></math><br></span></p>
<p><span class="fontstyle0">D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>26</mn></math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>70% of candidates correctly found the molar mass of a substance given the mass of 0.200 mol. Good to see that very few were fooled by the same answer but incorrect significant figures.</p>
</div>
<br><hr><br><div class="question">
<p>What is the sum of the coefficients when the following equation is balanced using the smallest whole numbers?</p>
<p>__C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> (aq) → __C<sub>2</sub>H<sub>5</sub>OH (aq) + __CO<sub>2</sub> (g)</p>
<p>A. 4</p>
<p>B. 5</p>
<p>C. 9</p>
<p>D. 10</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which contains the greatest number of moles of oxygen atoms?</span></p>
<p><span style="background-color: #ffffff;">A. 0.05 mol Mg(NO<sub>3</sub>)<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">B. 0.05 mol C<sub>6</sub>H<sub>4</sub>(NO<sub>2</sub>)<sub>2</sub><br></span></p>
<p><span style="background-color: #ffffff;">C. 0.1 mol H<sub>2</sub>O<br></span></p>
<p><span style="background-color: #ffffff;">D. 0.1 mol NO<sub>2</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>0.20 mol of magnesium is mixed with 0.10 mol of hydrochloric acid.</p>
<p style="text-align:center;"><math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>Mg (s)</mtext><mo>+</mo><mtext>2HCl</mtext><mo> </mo><mtext>(aq)</mtext><mo>→</mo><msub><mtext>MgCl</mtext><mtext>2</mtext></msub><mo> </mo><mtext>(aq)</mtext><mo>+</mo><msub><mtext>H</mtext><mtext>2</mtext></msub><mo> </mo><mtext>(g)</mtext></math></p>
<p>Which is correct?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the sum of the coefficients when the equation is balanced with the smallest whole numbers?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">__BaCl<sub>2</sub> (aq) + __Fe<sub>2</sub>(SO<sub>4</sub>)<sub>3</sub> (aq) → __FeCl<sub>3</sub> (aq) + __BaSO<sub>4</sub> (s)</span></p>
<p><span style="background-color: #ffffff;">A. 4</span></p>
<p><span style="background-color: #ffffff;">B. 6</span></p>
<p><span style="background-color: #ffffff;">C. 8</span></p>
<p><span style="background-color: #ffffff;">D. 9</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question was well answered while one teacher commented that using 1 as a coefficient in a “sum the coefficients” question seemed tricky.</p>
</div>
<br><hr><br><div class="question">
<p>Which statements about mixtures are correct?</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\begin{array}{*{20}{l}} {{\text{I.}}}&{{\text{The components may be elements or compounds.}}} \\ {{\text{II.}}}&{{\text{All components must be in the same phase.}}} \\ {{\text{III.}}}&{{\text{The components retain their individual properties.}}} \end{array}">
<mtable columnalign="left" rowspacing="4pt" columnspacing="1em">
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>I.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>The components may be elements or compounds.</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>II.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>All components must be in the same phase.</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>III.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>The components retain their individual properties.</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
</mtable>
</math></span></p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the sum of the coefficients when the equation is balanced with whole numbers?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">__MnO<sub>2</sub> (s) + __HCl (aq) → __MnCl<sub>2</sub> (aq) + __H<sub>2</sub>O (l) + __Cl<sub>2</sub> (g)<br></span></p>
<p><span style="background-color: #ffffff;">A. 6<br></span></p>
<p><span style="background-color: #ffffff;">B. 7<br></span></p>
<p><span style="background-color: #ffffff;">C. 8<br></span></p>
<p><span style="background-color: #ffffff;">D. 9</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which statement describes all homogeneous mixtures?</p>
<p><br>A. Any sample has the same ratio of the components.</p>
<p>B. The components are covalently bonded together.</p>
<p>C. The components cannot be easily separated.</p>
<p>D. The mixture needs a specific ratio of components to form.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the number of hydrogen atoms in 2.00 moles of Ca(HCO<sub>3</sub>)<sub>2</sub>?</p>
<p style="text-align:center;">Avogadro’s constant, <em>L</em> or <em>N<sub>A</sub></em>: 6.02 × 10<sup>23</sup> mol<sup>−1</sup></p>
<p>A. 2.00</p>
<p>B. 4.00</p>
<p>C. 1.20 × 10<sup>24</sup></p>
<p>D. 2.41 × 10<sup>24</sup></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>8.8 g of an oxide of nitrogen contains 3.2 g of oxygen. What is the empirical formula of the compound?</p>
<p>A. N<sub>2</sub>O<sub>5</sub></p>
<p>B. N<sub>2</sub>O</p>
<p>C. NO<sub>2</sub></p>
<p>D. NO</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which is a homogeneous mixture?</p>
<p>A. Oil and water</p>
<p>B. Sand and water</p>
<p>C. Ethanol and water</p>
<p>D. Chalk and sand</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the maximum volume, in dm<sup>3</sup>, of CO<sub>2</sub>(g) produced when 1.00 g of CaCO<sub>3</sub>(s) reacts with 20.0 cm<sup>3</sup> of 2.00 mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup> HCl(aq)?</p>
<p>CaCO<sub>3</sub>(s) + 2HCl(aq) → CaCl<sub>2</sub>(aq) + H<sub>2</sub>O(l) + CO<sub>2</sub>(g)</p>
<p>Molar volume of gas = 22.7 dm<sup>3</sup><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>–1</sup>; <em>M</em><sub>r</sub>(CaCO<sub>3</sub>) = 100.00</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2} \times \frac{{20.0 \times 2.0}}{{1000}} \times 22.7">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
<mo>×</mo>
<mfrac>
<mrow>
<mn>20.0</mn>
<mo>×</mo>
<mn>2.0</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>22.7</mn>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{20.0 \times 2.0}}{{1000}} \times 22.7">
<mfrac>
<mrow>
<mn>20.0</mn>
<mo>×</mo>
<mn>2.0</mn>
</mrow>
<mrow>
<mn>1000</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>22.7</mn>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.0}}{{100.00}} \times 22.7">
<mfrac>
<mrow>
<mn>1.0</mn>
</mrow>
<mrow>
<mn>100.00</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>22.7</mn>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.0}}{{100.00}} \times 2 \times 22.7">
<mfrac>
<mrow>
<mn>1.0</mn>
</mrow>
<mrow>
<mn>100.00</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>2</mn>
<mo>×</mo>
<mn>22.7</mn>
</math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>0.2 mol of sodium hydrogencarbonate is decomposed by heating until constant mass.</p>
<p style="text-align:center;">2 NaHCO<sub>3 </sub>(s) → Na<sub>2</sub>CO<sub>3</sub> (s) + H<sub>2</sub>O (g) + CO<sub>2</sub> (g)</p>
<p>How many moles of gas are produced?</p>
<p>A. 0.1</p>
<p>B. 0.2</p>
<p>C. 0.3</p>
<p>D. 0.4</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the percentage yield when 7 g of ethene produces 6 g of ethanol?</p>
<p><em>M</em><sub>r</sub>(ethene) = 28 and <em>M</em><sub>r</sub>(ethanol) = 46</p>
<p style="text-align: center;">C<sub>2</sub>H<sub>4</sub>(g) + H<sub>2</sub>O(g) → C<sub>2</sub>H<sub>5</sub>OH(g)</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{6 \times 7 \times 100}}{{28 \times 46}}">
<mfrac>
<mrow>
<mn>6</mn>
<mo>×</mo>
<mn>7</mn>
<mo>×</mo>
<mn>100</mn>
</mrow>
<mrow>
<mn>28</mn>
<mo>×</mo>
<mn>46</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{6 \times 46 \times 100}}{{7 \times 28}}">
<mfrac>
<mrow>
<mn>6</mn>
<mo>×</mo>
<mn>46</mn>
<mo>×</mo>
<mn>100</mn>
</mrow>
<mrow>
<mn>7</mn>
<mo>×</mo>
<mn>28</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{6 \times 28}}{{7 \times 46 \times 100}}">
<mfrac>
<mrow>
<mn>6</mn>
<mo>×</mo>
<mn>28</mn>
</mrow>
<mrow>
<mn>7</mn>
<mo>×</mo>
<mn>46</mn>
<mo>×</mo>
<mn>100</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{6 \times 28 \times 100}}{{7 \times 46}}">
<mfrac>
<mrow>
<mn>6</mn>
<mo>×</mo>
<mn>28</mn>
<mo>×</mo>
<mn>100</mn>
</mrow>
<mrow>
<mn>7</mn>
<mo>×</mo>
<mn>46</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which factors affect the molar volume of an ideal gas?</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\begin{array}{*{20}{l}} {{\text{I.}}}&{{\text{Pressure}}} \\ {{\text{II.}}}&{{\text{Temperature}}} \\ {{\text{III.}}}&{{\text{Empirical formula}}} \end{array}">
<mtable columnalign="left" rowspacing="4pt" columnspacing="1em">
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>I.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>Pressure</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>II.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>Temperature</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
<mtr>
<mtd>
<mrow>
<mrow>
<mtext>III.</mtext>
</mrow>
</mrow>
</mtd>
<mtd>
<mrow>
<mrow>
<mtext>Empirical formula</mtext>
</mrow>
</mrow>
</mtd>
</mtr>
</mtable>
</math></span></p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which volume of ethane gas, in </span><math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>cm</mi><mn>3</mn></msup></math><span class="fontstyle0">, will produce </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>40</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></math> <span class="fontstyle0">of carbon dioxide gas when mixed with </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>140</mn><mo> </mo><msup><mi>cm</mi><mn>3</mn></msup></math> <span class="fontstyle0">of oxygen gas, assuming the reaction goes to completion?</span></p>
<p style="text-align: center;"><span class="fontstyle0"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>6</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><mn>7</mn><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>→</mo><mn>4</mn><msub><mi>CO</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><mn>6</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced></math></span></p>
<p><span class="fontstyle0">A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>10</mn></math><br></span></p>
<p><span class="fontstyle0">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>20</mn></math><br></span></p>
<p><span class="fontstyle0">C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>40</mn></math><br></span></p>
<p><span class="fontstyle0">D. </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>80</mn></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>More than 65% of candidates were able to apply coefficient ratios in a stoichiometry question involving only gaseous reactants and products.</p>
</div>
<br><hr><br><div class="question">
<p>Which contains the most atoms of oxygen?</p>
<p>A. 64 g of O<sub>2 </sub></p>
<p>B. 1.2 × 10<sup>24</sup> molecules of O<sub>2 </sub></p>
<p>C. 64 g of C<sub>3</sub>H<sub>5</sub>O<sub>3 </sub></p>
<p>D. 1.2 × 10<sup>24</sup> molecules of C<sub>3</sub>H<sub>5</sub>O<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which molecule has the same empirical formula as molecular formula?</p>
<p>A. CH<sub>3</sub>COOH</p>
<p>B. C<sub>2</sub>H<sub>5</sub>OH</p>
<p>C. C<sub>2</sub>H<sub>4</sub></p>
<p>D. C<sub>4</sub>H<sub>10</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which sample contains the fewest moles of HCl?</p>
<p><em>N</em><sub>A</sub> = 6.02 × 10<sup>23 </sup>mol<sup>–1</sup>.</p>
<p>Molar volume of an ideal gas at STP = 22.7 dm<sup>3 </sup>mol<sup>–1</sup>.</p>
<p><br>A. 10.0 cm<sup>3</sup> of 0.1 mol dm<sup>–3</sup> HCl (aq)</p>
<p>B. 6.02 × 10<sup>24</sup> molecules of HCl (g)</p>
<p>C. 0.365 g of HCl (g)</p>
<p>D. 2.27 dm<sup>3</sup> of HCl (g) at STP</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which equation represents the deposition of iodine?</p>
<p>A. I<sub>2 </sub>(g) → I<sub>2 </sub>(l)</p>
<p>B. I<sub>2 </sub>(g) → I<sub>2 </sub>(s)</p>
<p>C. I<sub>2 </sub>(l) → I<sub>2 </sub>(g)</p>
<p>D. I<sub>2 </sub>(s) → I<sub>2 </sub>(g)</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>58% of the candidates identified the equation that represented the deposition of iodine. The most commonly chosen distractor was the condensation of gaseous iodine. Sublimation was also quite commonly chosen.</p>
</div>
<br><hr><br><div class="question">
<p>What is the volume, in cm<sup>3</sup>, of the final solution if 100 cm<sup>3</sup> of a solution containing 1.42 g of sodium sulfate, Na<sub>2</sub>SO<sub>4</sub>, is diluted to the concentration of 0.020 mol dm<sup>–3</sup>?</p>
<p><em>M</em><sub>r</sub>(Na<sub>2</sub>SO<sub>4</sub>) = 142</p>
<p>A. 50</p>
<p>B. 400</p>
<p>C. 500</p>
<p>D. 600</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the sum of the coefficients when the equation is balanced with whole numbers?</p>
<p style="text-align:center;">__Sn(OH)<sub>4 </sub>(aq) + __NaOH (aq) → __Na<sub>2</sub>SnO<sub>3 </sub>(aq) + __H<sub>2</sub>O (l)</p>
<p>A. 4</p>
<p>B. 5</p>
<p>C. 6</p>
<p>D. 7</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>5.0 cm<sup>3</sup> of 2.00 mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup> sodium carbonate solution, Na<sub>2</sub>CO<sub>3</sub>(aq), was added to a volumetric flask and the volume was made up to 500 cm<sup>3</sup> with water. What is the concentration, in mol<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>dm<sup>–3</sup>, of the solution?</p>
<p>A. 0.0050</p>
<p>B. 0.0040</p>
<p>C. 0.020</p>
<p>D. 0.010</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which amount, in mol, of sodium chloride is needed to make 250 cm<sup>3</sup> of 0.10 mol dm<sup>−3</sup> solution?</p>
<p>A. 4.0 × 10<sup>−4</sup></p>
<p>B. 0.025</p>
<p>C. 0.40</p>
<p>D. 25</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which diagram represents a heterogeneous mixture?</span></p>
<p><span style="background-color: #ffffff;"><img style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;" 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" width="189" height="504"></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>A few G2 forms suggested that candidates could have chosen A or B. However, homogeneous and heterogeneous mixtures are usually represented in such a way while only option A shows a clear separation in the mixture. We will avoid schematic diagrams in the future for this type of questions.</p>
</div>
<br><hr><br><div class="question">
<p>16 g of bromine react with 5.2 g of metal, M, to form MBr<sub>2</sub>. What is the relative atomic mass of the metal M? (<em>A</em><sub>r </sub>: Br = 80)</p>
<p> </p>
<p>A. 13</p>
<p>B. 26</p>
<p>C. 52</p>
<p>D. 104</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the number of atoms of oxygen in 2.0 mol of hydrated sodium carbonate, Na<sub>2</sub>CO<sub>3</sub>•10H<sub>2</sub>O? Avogadro’s constant, <em>L </em>or <em>N</em><sub><em>A</em></sub>: 6.02 × 10<sup>23</sup> mol<sup>–1</sup></p>
<p>A. 6</p>
<p>B. 26</p>
<p>C. 3.6 × 10<sup>24</sup></p>
<p>D. 1.6 × 10<sup>25</sup></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which of these molecular formulae are also empirical formulae?</span></p>
<ol style="list-style-type: upper-roman;">
<li> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>6</mn></msub><mi mathvariant="normal">O</mi></math>
</li>
<li> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">C</mi><mn>2</mn></msub><msub><mi mathvariant="normal">H</mi><mn>4</mn></msub><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math>
</li>
<li> <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">C</mi><mn>5</mn></msub><msub><mi mathvariant="normal">H</mi><mn>12</mn></msub></math>
</li>
</ol>
<p>A. I and II only</p>
<p><span class="fontstyle0">B. I and III only<br></span></p>
<p><span class="fontstyle0">C. II and III only<br></span></p>
<p><span class="fontstyle0">D. I, II and III</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>One of the best answered questions on paper 1. Very few of the candidates struggled with distinguishing molecular and empirical formula.</p>
</div>
<br><hr><br><div class="question">
<p>How many grams of sodium azide, NaN<sub>3</sub>, are needed to produce 68.1 dm<sup>3</sup> of N<sub>2</sub> (g) at STP?</p>
<p>Molar volume at STP = 22.7 dm<sup>3</sup> mol<sup>–1</sup>; <em>M</em><sub>r</sub>(NaN<sub>3</sub>) = 65.0</p>
<p>2NaN<sub>3</sub> (s) → 3N<sub>2</sub> (g) + 2Na (s)</p>
<p>A. 32.5</p>
<p>B. 65.0</p>
<p>C. 130.0</p>
<p>D. 195.0</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which graph would<strong> not</strong> show a linear relationship for a fixed mass of an ideal gas with all other variables constant?</span></p>
<p><span style="background-color: #ffffff;">A. P against V</span></p>
<p><span style="background-color: #ffffff;">B. P against <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{\text{V}}}">
<mfrac>
<mn>1</mn>
<mrow>
<mtext>V</mtext>
</mrow>
</mfrac>
</math></span></span></p>
<p><span style="background-color: #ffffff;">C. P against T</span></p>
<p><span style="background-color: #ffffff;">D. V against T</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>The idea of <em>P</em> vs 1/V as being non-linear was the most common mistake, with just over 50 % of candidates earning this mark.</p>
</div>
<br><hr><br><div class="question">
<p>30 g of an organic compound produces 44 g CO<sub>2</sub> and 18 g H<sub>2</sub>O as the only combustion products. Which of the following is the empirical formula for this compound?</p>
<p style="text-align:center;"><em>M</em><sub>r</sub> CO<sub>2</sub> = 44 <em>M</em><sub>r</sub> H<sub>2</sub>O = 18</p>
<p>A. CH<sub>2</sub></p>
<p>B. CH<sub>3</sub></p>
<p>C. CHO</p>
<p>D. CH<sub>2</sub>O</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>63% of the candidates determined the empirical formula of the organic compound correctly using the masses of the sample and the combustion products.</p>
</div>
<br><hr><br><div class="question">
<p>What is the sum of the coefficients when the equation is balanced with the lowest whole number ratio?</p>
<p style="text-align: center;">__Na<sub>2</sub>S<sub>2</sub>O<sub>3</sub>(aq) + __HCl(aq) → __S(s) + __SO<sub>2</sub>(g) + __NaCl(aq) + __H<sub>2</sub>O(l)</p>
<p>A. 6</p>
<p>B. 7</p>
<p>C. 8</p>
<p>D. 9</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the concentration, in mol dm<sup>−3</sup>, of 20.0 g of NaOH (<em>M</em><sub>r</sub> = 40.0) in 500.0 cm<sup>3</sup>?</span></p>
<p><span style="background-color: #ffffff;">A. 0.250</span></p>
<p><span style="background-color: #ffffff;">B. 0.500</span></p>
<p><span style="background-color: #ffffff;">C. 1.00</span></p>
<p><span style="background-color: #ffffff;">D. 4.00</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>75 % of the candidates were able to calculate the molar concentration of the NaOH solution. The question had a good discrimination index.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the volume of gas when the pressure on 100 cm<sup>3</sup> of gas is changed from 400 kPa to 200 kPa at constant temperature?</span></p>
<p><span style="background-color: #ffffff;">A. 50.0 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">cm</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sup></span></p>
<p><span style="background-color: #ffffff;">B. 100 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">cm</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sup></span></p>
<p><span style="background-color: #ffffff;">C. 200 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">cm</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sup></span></p>
<p><span style="background-color: #ffffff;">D. 800 <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">cm</span><sup style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">3</sup></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>80 % of the candidates were able to deduce the new volume of a sample of gas after the pressure was halved. The most commonly chosen distractor (A) was the value that assumed a direct proportionality between volume and pressure.</p>
</div>
<br><hr><br><div class="question">
<p>Which compound has the greatest percentage by mass of nitrogen atoms?</p>
<p>A. N<sub>2</sub>H<sub>4</sub></p>
<p>B. NH<sub>3</sub></p>
<p>C. N<sub>2</sub>O<sub>4</sub></p>
<p>D. NaNO<sub>3</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The two containers shown are connected by a valve. What is the total pressure after the valve is opened and the two gas samples are allowed to mix at constant temperature?</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="576" height="193"></p>
<p><br>A. 1.5 × 10<sup>5 </sup>Pa</p>
<p>B. 2.3 × 10<sup>5 </sup>Pa</p>
<p>C. 2.5 × 10<sup>5 </sup>Pa</p>
<p>D. 5.0 × 10<sup>5 </sup>Pa</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the empirical formula of a hydrocarbon with 75 % carbon and 25 % hydrogen by mass?</span></p>
<p><span style="background-color: #ffffff;">A. C<sub>3</sub>H</span></p>
<p><span style="background-color: #ffffff;">B. CH<sub>2</sub></span></p>
<p><span style="background-color: #ffffff;">C. C<sub>2</sub>H<sub>6</sub></span></p>
<p><span style="background-color: #ffffff;">D. CH<sub>4</sub></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Well answered and straight forward.</p>
</div>
<br><hr><br><div class="question">
<p>What is the sum of the coefficients when the equation is balanced with whole numbers?</p>
<p><sub>—</sub>C<sub>8</sub>H<sub>18</sub>(g) + <sub>—</sub>O<sub>2</sub>(g) → <sub>—</sub>CO(g) + <sub>—</sub>H<sub>2</sub>O(l)</p>
<p>A. 26.5</p>
<p>B. 30</p>
<p>C. 53</p>
<p>D. 61</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the molecular formula of a compound with an empirical formula of CHO<sub>2</sub> and a relative molecular mass of 90?</p>
<p>A. CHO<sub>2</sub></p>
<p>B. C<sub>2</sub>H<sub>2</sub>O<sub>4</sub></p>
<p>C. C<sub>3</sub>H<sub>6</sub>O<sub>3</sub></p>
<p>D. C<sub>4</sub>H<sub>10</sub>O<sub>2</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which volume, in cm<sup>3</sup>, of 0.20 mol dm<sup>-3</sup> NaOH (aq) is needed to neutralize 0.050 mol of H<sub>2</sub>S(g)? </p>
<p>H<sub>2</sub>S(g) + 2NaOH(aq) → Na<sub>2</sub>S(aq) + 2H<sub>2</sub>O(l) </p>
<p>A. 0.25 <br>B. 0.50 <br>C. 250 <br>D. 500</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">How many moles of magnesium hydroxide are produced with 0.50 mol of ammonia?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">Mg<sub>3</sub>N<sub>2</sub> (s) + 6H<sub>2</sub>O (l) → 3Mg(OH)<sub>2</sub> (aq) + 2NH<sub>3</sub> (aq)</span></p>
<p><span style="background-color: #ffffff;">A. 0.25</span></p>
<p><span style="background-color: #ffffff;">B. 0.33</span></p>
<p><span style="background-color: #ffffff;">C. 0.75</span></p>
<p><span style="background-color: #ffffff;">D. 1.5</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This was one of the easier questions on the paper. 79 % of the candidates were able to deduce the amount of a product given the amount of another product and the balanced equation.</p>
</div>
<br><hr><br><div class="question">
<p>What is the expression for the volume of hydrogen gas, in dm<sup>3</sup>, produced at STP when 0.30 g of magnesium reacts with excess hydrochloric acid solution?</p>
<p>Mg(s) + 2HCl(aq) → MgCl<sub>2</sub>(aq) + H<sub>2</sub>(g)</p>
<p>Molar volume of an ideal gas at STP = 22.7 dm<sup>3</sup><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup></p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.30 \times 2 \times 22.7}}{{24.31}}">
<mfrac>
<mrow>
<mn>0.30</mn>
<mo>×</mo>
<mn>2</mn>
<mo>×</mo>
<mn>22.7</mn>
</mrow>
<mrow>
<mn>24.31</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.30 \times 22.7}}{{24.31}}">
<mfrac>
<mrow>
<mn>0.30</mn>
<mo>×</mo>
<mn>22.7</mn>
</mrow>
<mrow>
<mn>24.31</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.30 \times 24.31}}{{22.7}}">
<mfrac>
<mrow>
<mn>0.30</mn>
<mo>×</mo>
<mn>24.31</mn>
</mrow>
<mrow>
<mn>22.7</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.30 \times 22.7}}{{24.31 \times 2}}">
<mfrac>
<mrow>
<mn>0.30</mn>
<mo>×</mo>
<mn>22.7</mn>
</mrow>
<mrow>
<mn>24.31</mn>
<mo>×</mo>
<mn>2</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What volume of oxygen, in dm<sup>3</sup> at STP, is needed when 5.8 g of butane undergoes complete combustion?</p>
<p style="text-align:center;"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><msub><mi mathvariant="normal">C</mi><mn>4</mn></msub><msub><mi mathvariant="normal">H</mi><mn>10</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><mn>13</mn><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>→</mo><mn>8</mn><msub><mi>CO</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><mn>10</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo> </mo><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo></math></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2</mn><mo>×</mo><mfrac><mrow><mn>5</mn><mo>.</mo><mn>8</mn></mrow><mrow><mn>12</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>4</mn><mo>+</mo><mn>1</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>10</mn></mrow></mfrac><mo>×</mo><mn>13</mn><mo>×</mo><mn>22</mn><mo>.</mo><mn>7</mn></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>5</mn><mo>.</mo><mn>8</mn></mrow><mrow><mn>12</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>4</mn><mo>+</mo><mn>1</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>10</mn></mrow></mfrac><mo>×</mo><mfrac><mn>13</mn><mn>2</mn></mfrac><mo>×</mo><mn>22</mn><mo>.</mo><mn>7</mn></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>5</mn><mo>.</mo><mn>8</mn></mrow><mrow><mn>12</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>4</mn><mo>+</mo><mn>1</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>10</mn></mrow></mfrac><mo>×</mo><mfrac><mn>2</mn><mn>13</mn></mfrac><mo>×</mo><mn>22</mn><mo>.</mo><mn>7</mn></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>5</mn><mo>.</mo><mn>8</mn></mrow><mrow><mn>12</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>4</mn><mo>+</mo><mn>1</mn><mo>.</mo><mn>01</mn><mo>×</mo><mn>10</mn></mrow></mfrac><mo>×</mo><mfrac><mn>13</mn><mn>2</mn></mfrac><mo>×</mo><mfrac><mrow><mn>22</mn><mo>.</mo><mn>7</mn></mrow><mn>1000</mn></mfrac></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the concentration of chloride ions, in mol dm<sup>−3</sup>, in a solution formed by mixing 200 cm<sup>3</sup> of 1 mol dm<sup>−3</sup> HCl with 200 cm<sup>3</sup> of 5 mol dm<sup>−3</sup> NaCl?</p>
<p>A. 1</p>
<p>B. 2</p>
<p>C. 3</p>
<p>D. 6</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>52% of the candidates calculated the concentration of chloride ions in the titration. The distractors were chosen almost equally.</p>
</div>
<br><hr><br><div class="question">
<p>What is the resulting concentration, in mol dm<sup>−3</sup>, when 1.0 cm<sup>3</sup> of 0.500 mol dm<sup>−3</sup> nitric acid solution is diluted to 50.0 cm<sup>3</sup> with water?</p>
<p>A. 0.002</p>
<p>B. 0.01</p>
<p>C. 0.04</p>
<p>D. 0.1</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The volume of a sample of gas measured at 27 °C is 10.0 dm<sup>3</sup>. What is the temperature when the volume is reduced to 9.0 dm<sup>3</sup> at the same pressure?</p>
<p> </p>
<p>A. −3.0 °C</p>
<p>B. 24.3 °C</p>
<p>C. 29.7 °C</p>
<p>D. 57.0 °C</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the coefficient of <math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>HCl</mtext></math> (aq) when the equation is balanced using the smallest possible whole numbers?</p>
<p style="text-align:center;"><math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>__CuO (s)+ __HCl</mtext><mo> </mo><msub><mtext>(aq) → __CuCl</mtext><mtext>2</mtext></msub><mo> </mo><msub><mtext>(aq) + __H</mtext><mtext>2</mtext></msub><mtext>O</mtext><mo> </mo><mtext>(l)</mtext></math></p>
<p style="text-align:left;">A. 1</p>
<p style="text-align:left;">B. 2</p>
<p style="text-align:left;">C. 3</p>
<p style="text-align:left;">D. 4</p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>How many moles of FeS<sub>2</sub> are required to produce 32 g of SO<sub>2</sub>? (<em>A</em><sub>r</sub>: S = 32, O = 16)</p>
<p style="text-align: center;">4FeS<sub>2</sub> (s) + 11O<sub>2</sub> (g) → 2Fe<sub>2</sub>O<sub>3</sub> (s) + 8SO<sub>2</sub> (g)</p>
<p> </p>
<p>A. 0.25</p>
<p>B. 0.50</p>
<p>C. 1.0</p>
<p>D. 2.0</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>An antacid tablet containing 0.50 g of NaHCO<sub>3</sub> (<em>M</em><sub>r</sub> = 84) is dissolved in water to give a volume of 250 cm<sup>3</sup>. What is the concentration, in mol dm<sup>−3</sup>, of HCO<sub>3</sub><sup>−</sup> in this solution?</p>
<p> </p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.250 \times 84}}{{0.50}}">
<mfrac>
<mrow>
<mn>0.250</mn>
<mo>×</mo>
<mn>84</mn>
</mrow>
<mrow>
<mn>0.50</mn>
</mrow>
</mfrac>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.50}}{{84 \times 0.250}}">
<mfrac>
<mrow>
<mn>0.50</mn>
</mrow>
<mrow>
<mn>84</mn>
<mo>×</mo>
<mn>0.250</mn>
</mrow>
</mfrac>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{250 \times 84}}{{0.50}}">
<mfrac>
<mrow>
<mn>250</mn>
<mo>×</mo>
<mn>84</mn>
</mrow>
<mrow>
<mn>0.50</mn>
</mrow>
</mfrac>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.50}}{{84 \times 250}}">
<mfrac>
<mrow>
<mn>0.50</mn>
</mrow>
<mrow>
<mn>84</mn>
<mo>×</mo>
<mn>250</mn>
</mrow>
</mfrac>
</math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which combination is correct?</p>
<p><br><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which electron transition emits energy of the longest wavelength?</p>
<p><img src="images/Schermafbeelding_2018-08-10_om_06.16.15.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/06"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What is the number of carbon atoms in <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>12</mn><mo> </mo><mi mathvariant="normal">g</mi></math> of ethanoic acid <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>CH</mi><mn>3</mn></msub><mi>COOH</mi></math></span><span class="fontstyle0">, </span><math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>M</mi><mi mathvariant="normal">r</mi></msub><mo>=</mo><mn>60</mn></math><span class="fontstyle0">?</span></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>20</mn></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mo>.</mo><mn>0</mn></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn><mo>.</mo><mn>2</mn><mo>×</mo><msup><mn>10</mn><mn>23</mn></msup></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mo>.</mo><mn>4</mn><mo>×</mo><msup><mn>10</mn><mn>23</mn></msup></math></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Approximately 57% of candidates could correctly apply Avogadro's number in calculating number of carbon atoms in 12 g of ethanoic acid. Many candidates did not identify that there were 2 carbon atoms per molecule.</p>
</div>
<br><hr><br><div class="question">
<p>How many atoms of nitrogen are there in 0.50 mol of (NH<sub>4</sub>)<sub>2</sub>CO<sub>3</sub>?</p>
<p>A. 1</p>
<p>B. 2</p>
<p>C. 3.01 × 10<sup>23</sup></p>
<p>D. 6.02 × 10<sup>23</sup></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is the percentage yield when 2.0 g of ethene, C<sub>2</sub>H<sub>4</sub>, is formed from 5.0 g of ethanol, C<sub>2</sub>H<sub>5</sub>OH?<br> <em>M</em><sub>r</sub>(ethene) = 28; <em>M</em><sub>r</sub>(ethanol) = 46</p>
<p>A. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{2.0}}{{28}} \times \frac{{5.0}}{{46}} \times 100">
<mfrac>
<mrow>
<mn>2.0</mn>
</mrow>
<mrow>
<mn>28</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mfrac>
<mrow>
<mn>5.0</mn>
</mrow>
<mrow>
<mn>46</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
</math></span></p>
<p>B. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\frac{{2.0}}{{28}}}}{{\frac{{5.0}}{{46}}}} \times 100">
<mfrac>
<mrow>
<mfrac>
<mrow>
<mn>2.0</mn>
</mrow>
<mrow>
<mn>28</mn>
</mrow>
</mfrac>
</mrow>
<mrow>
<mfrac>
<mrow>
<mn>5.0</mn>
</mrow>
<mrow>
<mn>46</mn>
</mrow>
</mfrac>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
</math></span></p>
<p>C. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{28}}{{2.0}} \times \frac{{5.0}}{{46}} \times 100">
<mfrac>
<mrow>
<mn>28</mn>
</mrow>
<mrow>
<mn>2.0</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mfrac>
<mrow>
<mn>5.0</mn>
</mrow>
<mrow>
<mn>46</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
</math></span></p>
<p>D. <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\frac{{28}}{{2.0}}}}{{\frac{{5.0}}{{46}}}} \times 100">
<mfrac>
<mrow>
<mfrac>
<mrow>
<mn>28</mn>
</mrow>
<mrow>
<mn>2.0</mn>
</mrow>
</mfrac>
</mrow>
<mrow>
<mfrac>
<mrow>
<mn>5.0</mn>
</mrow>
<mrow>
<mn>46</mn>
</mrow>
</mfrac>
</mrow>
</mfrac>
<mo>×</mo>
<mn>100</mn>
</math></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The complete combustion of 15.0cm<sup>3</sup> of a gaseous hydrocarbon <strong>X </strong>produces 60.0 cm<sup>3</sup> of carbon dioxide gas and 75.0 cm<sup>3</sup> of water vapour. What is the molecular formula of <strong>X</strong>? (All volumes are measured at the same temperature and pressure.) </p>
<p>A. C<sub>4</sub>H<sub>6 <br></sub>B. C<sub>4</sub>H<sub>8 <br></sub>C. C<sub>4</sub>H<sub>10</sub> <br>D. C<sub>6</sub>H<sub>10</sub> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>5.0mol of Fe<sub>2</sub>O<sub>3</sub>(s) and 6.0mol of CO(g) react according to the equation below. What is the limiting reactant and how many moles of the excess reactant remain unreacted?</p>
<p>Fe<sub>2</sub>O<sub>3</sub>(s) + 3CO(g) → 2Fe(s) + 3CO<sub>2</sub>(g)</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">0.10 mol of hydrochloric acid is mixed with 0.10 mol of calcium carbonate.</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2HCl (aq) + CaCO<sub>3</sub> (s) → CaCl<sub>2</sub> (aq) + H<sub>2</sub>O (l) + CO<sub>2</sub> (g)</span></p>
<p><span style="background-color: #ffffff;">Which is correct?</span></p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which graph shows the relationship between the volume and pressure of a fixed mass of an ideal gas?</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-09_om_11.36.39.png" alt="M18/4/CHEMI/SPM/ENG/TZ1/03"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which graph represents the relationship between the amount of gas, n, and the absolute temperature, T, with all other variables in the ideal gas equation, <em>PV = nRT</em>, held constant?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>56% of the candidates selected the correct graph representing the relationship between the amount of gas and its absolute temperature. The most commonly chosen distractor gave a directly proportional relationship.</p>
</div>
<br><hr><br>