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<h2>SL Paper 3</h2><div class="specification">
<p>Nuclear reactions transform one nuclide into another. Fission, splitting a large nucleus into two smaller nuclei, releases vast amounts of energy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Explain why fusion, combining two smaller nuclei into a larger nucleus, releases vast amounts of energy. Use section 36 of the data booklet.</p>
<p>(ii) Outline <strong>one</strong> advantage of fusion as a source of energy.</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>Radioactive phosphorus, <sup>33</sup>P, has a half-life of 25.3 days.</p>
<p>(i) Calculate <sup>33</sup>P decay constant λ and state its unit. Use section 1 of the data booklet.</p>
<p>(ii) Determine the fraction of the <sup>33</sup>P sample remaining after 101.2 days.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>product has higher binding energy «per nucleon»/more stable<br><em><strong>OR<br></strong></em>nucleons in product more tightly bound «with one another»</p>
<p>lighter elements «than Fe» can fuse/combine with loss of mass/mass defect «and release vast amount of energy»</p>
<p><em>Accept “mass is converted to energy” for M2</em></p>
<p> </p>
<p>ii</p>
<p><em>Any one of:<br></em>deuterium/fuel is abundant/cheap<br>«helium» products not radioactive<br>fusion much less dangerous than fission<br>large amounts/shipments of radioactive fuel not required<br>far less radioactive waste «created by fast moving neutrons» has to be stored </p>
<p><em>Accept “reduces greenhouse gas emissions/global warming” <strong>OR </strong>“no radioactive waste” <strong>OR</strong> “more reliable power” <strong>OR</strong> “fewer safety issues”. <br>Do <strong>not</strong> accept “gives out a large amount of energy” as it is in the stem of the question.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i<br>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\lambda = \frac{{\ln 2}}{{{t_{\frac{1}{2}}}}} = \frac{{0.693}}{{25.3\,{\text{days}}}} = ">
<mi>λ</mi>
<mo>=</mo>
<mfrac>
<mrow>
<mi>ln</mi>
<mo></mo>
<mn>2</mn>
</mrow>
<mrow>
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mfrac>
<mrow>
<mn>0.693</mn>
</mrow>
<mrow>
<mn>25.3</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>days</mtext>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 2.74 × 10<sup>−2</sup> day<sup>−1</sup><br><em>Need correct unit for mark.</em></p>
<p> </p>
<p>ii<br>«4 half-lives; 1 →<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</math></span>→<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{4}">
<mfrac>
<mn>1</mn>
<mn>4</mn>
</mfrac>
</math></span>→<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{8}">
<mfrac>
<mn>1</mn>
<mn>8</mn>
</mfrac>
</math></span>→<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{16}">
<mfrac>
<mn>1</mn>
<mn>16</mn>
</mfrac>
</math></span> =» <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{16}">
<mfrac>
<mn>1</mn>
<mn>16</mn>
</mfrac>
</math></span> / 6.25 × 10<sup>−2</sup><br><em><strong>OR</strong></em><br>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{N}{{{N_0}}} = {e^{ - {\lambda _t}}} = {e^{ - 0.0274\,\, \times \,\,101.2}} = ">
<mfrac>
<mi>N</mi>
<mrow>
<mrow>
<msub>
<mi>N</mi>
<mn>0</mn>
</msub>
</mrow>
</mrow>
</mfrac>
<mo>=</mo>
<mrow>
<msup>
<mi>e</mi>
<mrow>
<mo>−</mo>
<mrow>
<msub>
<mi>λ</mi>
<mi>t</mi>
</msub>
</mrow>
</mrow>
</msup>
</mrow>
<mo>=</mo>
<mrow>
<msup>
<mi>e</mi>
<mrow>
<mo>−</mo>
<mn>0.0274</mn>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mo>×</mo>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mn>101.2</mn>
</mrow>
</msup>
</mrow>
<mo>=</mo>
</math></span>» 6.25 × 10<sup>−2</sup></p>
<p><em>Accept 6.25%.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Chemical energy from redox reactions can be used as a portable source of electrical energy. A hybrid car uses a lithium ion battery in addition to gasoline as fuel.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Calculate the specific energy of the lithium ion battery, in MJ kg<sup>−1</sup>, when 80.0 kg of fuel in the battery releases 1.58 × 10<sup>7</sup> J. Use section 1 of the data booklet.</p>
<p>(ii) The specific energy of gasoline is 46.0 MJ kg<sup>−1</sup>. Suggest why gasoline may be considered a better energy source than the lithium ion battery based on your answer to part (a) (i).</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) The energy density of gasoline is 34.3 MJ dm<sup>−3</sup>. Calculate the volume of gasoline, in dm<sup>3</sup>, that is equivalent to the energy in 80.0 kg of fuel in the lithium ion battery. Use section 1 of the data booklet.</p>
<p>(ii) The efficiency of energy transfer by this lithium ion battery is four times greater than that of gasoline. Determine the distance, in km, the car can travel on the lithium ion battery power alone if the gasoline-powered car uses 1.00 dm<sup>3</sup> gasoline to travel 32.0 km.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>i<br>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{1.58 \times {{10}^7}{\rm{J}}}}{{80.0{\rm{kg}}}}">
<mfrac>
<mrow>
<mn>1.58</mn>
<mo>×</mo>
<mrow>
<msup>
<mrow>
<mn>10</mn>
</mrow>
<mn>7</mn>
</msup>
</mrow>
<mrow>
<mrow>
<mi mathvariant="normal">J</mi>
</mrow>
</mrow>
</mrow>
<mrow>
<mn>80.0</mn>
<mrow>
<mrow>
<mi mathvariant="normal">k</mi>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
</mfrac>
</math></span>=<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{15.8{\rm{MJ}}}}{{80.0{\rm{kg}}}}">
<mfrac>
<mrow>
<mn>15.8</mn>
<mrow>
<mrow>
<mi mathvariant="normal">M</mi>
<mi mathvariant="normal">J</mi>
</mrow>
</mrow>
</mrow>
<mrow>
<mn>80.0</mn>
<mrow>
<mrow>
<mi mathvariant="normal">k</mi>
<mi mathvariant="normal">g</mi>
</mrow>
</mrow>
</mrow>
</mfrac>
</math></span>=» 1.98 × 10<sup>−1</sup> «MJ kg<sup>−1</sup>»<br><br></p>
<p>ii<br>gasoline releases more energy from a given mass of fuel<br><em><strong>OR</strong></em><br>gasoline has higher specific energy<br><em>Do <strong>not</strong> accept volume in place of mass as question refers to specific energy, not energy density.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i<br>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{15.8\,{\text{MJ}}}}{{34.3\,{\text{MJ}}\,{\text{d}}{{\text{m}}^{ - 3}}}}">
<mfrac>
<mrow>
<mn>15.8</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>MJ</mtext>
</mrow>
</mrow>
<mrow>
<mn>34.3</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>MJ</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>d</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>m</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>3</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span>»= 4.61 × 10<sup>−1</sup> «dm<sup>3</sup>»<br><br></p>
<p>ii<br>«4.61 × 10<sup>−1 </sup>dm<sup>3 </sup>× 32.0 km dm<sup>−3 </sup>× 4»= 59.0/59.1 «km»</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span class="fontstyle0"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>1</mn><mo>.</mo><mn>57</mn><mo> </mo><mo>%</mo></math> of the mass of a rock weighing <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>46</mn><mo>.</mo><mn>5</mn><mo> </mo><mi>kg</mi></math> is uranium(IV) oxide, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>UO</mi><mn>2</mn></msub></math></span><span class="fontstyle0">. <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>99</mn><mo>.</mo><mn>28</mn><mo> </mo><mo>%</mo></math> of the uranium atoms in the rock are uranium-238, <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><none></none><mn>238</mn></mmultiscripts></math></span><span class="fontstyle0">.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Show that the mass of the <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><mn>238</mn></mmultiscripts></math></span><span class="fontstyle0"> isotope in the rock is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi></math>.</span></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><span class="fontstyle0">The half-life of <sup>238</sup>U</span><span class="fontstyle0"> is <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">years. Calculate the mass of <sup>238</sup>U </span><span class="fontstyle0">that remains after <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi></math> has decayed for <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mn>10</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">years.</span></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><span class="fontstyle0">Outline a health risk produced by exposure to radioactive decay.</span></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><span class="fontstyle0">Deduce the nuclear equation for the decay of uranium-238 to thorium-234.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Thorium-234 has a higher binding energy per nucleon than uranium-238. Outline what is meant by the binding energy of a nucleus.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mfrac><mrow><mi>mass</mi><mo> </mo><mo>%</mo></mrow><mrow><mi>fraction</mi><mo> </mo><mi>of</mi><mo> </mo><mi mathvariant="normal">U</mi><mo> </mo><mi>in</mi><mo> </mo><msub><mi>UO</mi><mn>2</mn></msub></mrow></mfrac><mo>=</mo><mo>»</mo><mfrac><mrow><mn>238</mn><mo>.</mo><mn>03</mn></mrow><mrow><mn>238</mn><mo>.</mo><mn>03</mn><mo>+</mo><mn>2</mn><mo>×</mo><mn>16</mn></mrow></mfrac></math> /<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>0</mn><mo>.</mo><mn>881</mn></math>/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>88</mn><mo>.</mo><mn>1</mn><mo> </mo><mo>%</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>46</mn><mo>.</mo><mn>5</mn><mo>«</mo><mi>kg</mi><mo>»</mo><mo>×</mo><mn>0</mn><mo>.</mo><mn>0157</mn><mo>×</mo><mn>0</mn><mo>.</mo><mn>881</mn><mo>×</mo><mn>0</mn><mo>.</mo><mn>9928</mn><mo>«</mo><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><em>Award <strong>[1 max]</strong> for omitting mass composition (giving <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">0</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">725</mn><mo mathvariant="italic"> </mo><mi>k</mi><mi>g</mi></math>).</em></p>
<p><em>M2 is for numerical setup, not for final value of <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn mathvariant="italic">0</mn><mo mathvariant="italic">.</mo><mn mathvariant="italic">639</mn><mo mathvariant="italic"> </mo><mi>k</mi><mi>g</mi></math>.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>Alternative 1</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mfrac><mrow><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mn>10</mn></msup><mo> </mo><mi>year</mi></mrow><mrow><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup><mo> </mo><mi>year</mi></mrow></mfrac><mo>=</mo><mo>»</mo><mn>5</mn><mo>.</mo><mn>00</mn><mo>«</mo><mi>half</mi><mo>-</mo><mi>lives</mi><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi>m</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>×</mo><mo>(</mo><mn>0</mn><mo>.</mo><mn>5</mn><msup><mo>)</mo><mn>5</mn></msup><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0200</mn><mo>«</mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><br><em><strong>Alternative 2</strong></em><br><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mo>𝜆</mo><mo>=</mo><mfrac><mrow><mi>ln</mi><mo> </mo><mn>2</mn></mrow><mrow><mn>4</mn><mo>.</mo><mn>46</mn><mo>×</mo><msup><mn>10</mn><mn>9</mn></msup><mo> </mo><mi>year</mi></mrow></mfrac><mo>=</mo><mo>»</mo><mn>1</mn><mo>.</mo><mn>554</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>−</mo><mn>10</mn></mrow></msup><mo>«</mo><msup><mi>year</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> ✔</p>
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mi>m</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>639</mn><mo> </mo><mi>kg</mi><mo>×</mo><msup><mo>𝑒</mo><mrow><mo>–</mo><mn>1</mn><mo>.</mo><mn>554</mn><mo>×</mo><msup><mn>10</mn><mrow><mo>–</mo><mn>10</mn><mo> </mo><msup><mi>year</mi><mrow><mo>–</mo><mn>1</mn></mrow></msup></mrow></msup><mo>×</mo><mn>2</mn><mo>.</mo><mn>23</mn><mo>×</mo><msup><mn>10</mn><mrow><mn>10</mn><mo> </mo><mi>year</mi></mrow></msup></mrow></msup><mo>=</mo><mo>»</mo><mn>0</mn><mo>.</mo><mn>0200</mn><mo>«</mo><mi>kg</mi><mo>»</mo></math> ✔</p>
<p><em><br>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one:</em></p>
<p>«genetic» mutations ✔</p>
<p>«could cause» cancer ✔<br><em>Accept specific named types of cancer.</em></p>
<p>cells «in body» altered ✔</p>
<p>cells «in body» cannot function ✔</p>
<p>damaged DNA/proteins/enzymes/organs/tissue ✔</p>
<p>«radiation» burns ✔</p>
<p>hair loss ✔</p>
<p>damage in foetuses ✔</p>
<p>damages/weakens immune system ✔</p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mmultiscripts><mi mathvariant="normal">U</mi><mprescripts></mprescripts><mn>92</mn><mn>238</mn></mmultiscripts><mo>→</mo><mmultiscripts><mi>Th</mi><mprescripts></mprescripts><mn>90</mn><mn>234</mn></mmultiscripts><mo>+</mo><mmultiscripts><mi>He</mi><mprescripts></mprescripts><mn>2</mn><mn>4</mn></mmultiscripts></math> ✔</p>
<p><em>Do not penalize missing atomic numbers in the equation.</em></p>
<p><em>Accept “<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>α</mi></math>” for "<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>H</mi><mi>e</mi></math>”.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>energy required to separate a nucleus into protons and neutrons/nucleons<br><em><strong>OR</strong></em><br>energy released when nucleus was formed from «individual/free/isolated» protons and neutrons/nucleons ✔</p>
<p><br><em>Do <strong>not</strong> accept “energy released when atom was formed”.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was a very different question as student were given the answer and it was the work that was being marked. Students should always clearly show their calculations so examiners can award marks throughout the question and potentially award ECF if possible. It is very difficult to do this when students do not show work clearly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This continues to be a topic that students understand well, and probably more used alternative 1 to calculate the half-life. Students should always clearly show their calculations so examiners can award marks throughout the question and potentially award ECF if possible. It is very difficult to do this when students do not show work clearly.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A well answered question.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only very weak candidates lost this mark.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students appeared to have portion of the answer but not the entire concept. They seemed to have studied previous MS by heart and entered an answer that was mostly correct but didn't address the question. It is important that student understand the material and not try to memorize their way through the topics.</p>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Carbon is produced by fusion reactions in stars.</p>
</div>
<div class="specification">
<p>The main fusion reaction responsible for the production of carbon is:</p>
<p style="text-align: center;"><strong>X</strong> + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="_2^4{\text{He}} \to _{\;6}^{12}{\text{C}}">
<msubsup>
<mi></mi>
<mn>2</mn>
<mn>4</mn>
</msubsup>
<mrow>
<mtext>He</mtext>
</mrow>
<msubsup>
<mo stretchy="false">→<!-- → --></mo>
<mrow>
<mspace width="thickmathspace"></mspace>
<mn>6</mn>
</mrow>
<mrow>
<mn>12</mn>
</mrow>
</msubsup>
<mrow>
<mtext>C</mtext>
</mrow>
</math></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how the spectra of light from stars can be used to detect the presence of carbon.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the identity of <strong>X</strong>.</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>Outline why this reaction results in a release of energy.</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>Nuclear fusion reactors are predicted to become an important source of electrical energy in the future. State <strong>two</strong> advantages of nuclear fusion over nuclear fission.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>presence of dark/absorption lines corresponding to those found for carbon<br><em><strong>OR</strong></em><br>missing wavelengths/frequencies correspond to carbon’s spectrum</p>
<p> </p>
<p><em>Accept “presence of characteristic dark lines”.</em></p>
<p><em>Do <strong>not</strong> accept answer in terms of emission spectra.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_4^8Be">
<msubsup>
<mrow>
</mrow>
<mn>4</mn>
<mn>8</mn>
</msubsup>
<mi>B</mi>
<mi>e</mi>
</math></span></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>product «nucleus» has a greater binding energy «per nucleon than reacting nuclei»</p>
<p> </p>
<p><em>Accept “mass of the products is less than mass of the reactants”.</em></p>
<p><em>Accept converse arguments.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fuel more abundant/cheaper</p>
<p>no «long half-life» radioisotopes/radioactive waste</p>
<p>shipment of radioactive fuels not required</p>
<p>plutonium/nuclear weapons cannot be produced from products</p>
<p>nuclear disasters less likely «as no critical mass of fuel required»</p>
<p>higher specific energy/energy per g/kg/unit mass than fission</p>
<p> </p>
<p><em>Do <strong>not</strong> accept simply “fusion produces more energy than fission”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Biofuels are renewable energy sources derived mainly from plants.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the equation for the complete transesterification of the triglyceride given below with methanol.</p>
<p><img src="data:image/png;base64,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"></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>Outline why the fuel produced by the reaction in (a) is more suitable for use in diesel engines than vegetable oils.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>methyl ester formula <em><strong>AND</strong></em> glycerol formula</p>
<p>correct balancing</p>
<p><em>Award M2 only if M1 is correct.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«methyl esters have» low«er» viscosity/surface tensions<br><em><strong>OR<br></strong></em>«methyl esters have» high«er» volatility<br><strong><em>OR<br></em></strong>«combustion of vegetable oils» produces carbon deposits in engine/reduces engine life</p>
<p><em>Accept converse arguments.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>A link between the combustion of fossil fuels and an increase in the temperature of the Earth’s atmosphere was proposed over a century ago.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why it is only in recent years that specific predictions of the future effects of fossil fuel combustion have been made.</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>Carbon dioxide has two different bond stretching modes illustrated below.</p>
<p><img src="images/Schermafbeelding_2017-09-25_om_13.09.53.png" alt="M17/4/CHEMI/SP3/ENG/TZ1/17.b"></p>
<p>Predict, with an explanation, whether these stretching modes will absorb infrared radiation.</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>Outline, giving the appropriate equation(s), how increasing levels of carbon dioxide will affect the pH of the oceans.</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>Many combustion processes also release particulate matter into the atmosphere. Suggest, giving your reason, how this might affect the temperature of the Earth’s surface.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>computers can now carry out more complex calculations<br><em><strong>OR</strong></em><br>better understanding of the interactions between the various systems involved<br><em><strong>OR</strong></em><br>clear evidence of global warming<br><em><strong>OR</strong></em><br>«reliable» global temperature data now available<br><em><strong>OR</strong></em><br>techniques have been available to monitor carbon dioxide levels</p>
<p> </p>
<p><em>Accept “better/faster computers”.</em></p>
<p><em>Accept “better modelling”.</em></p>
<p><em>Accept “better/more reliable/consistent data”.</em></p>
<p><em>Accept “better measuring techniques”.</em></p>
<p><em>Accept other scientifically based (not politically based) reasons.</em></p>
<p><em>Accept if specific relevant data is given.</em></p>
<p><em>Do <strong>not</strong> accept “increased combustion of fossil fuels” or “increased concerns about global warming”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>symmetric stretching will not absorb IR<br><em><strong>OR</strong></em><br>asymmetric stretching will absorb IR</p>
<p>change in polarity/dipole «moment» required «to absorb IR»</p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq) «and pH decreases»<br><em><strong>OR</strong></em><br>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sub>2</sub>CO<sub>3</sub>(aq) <em><strong>AND</strong></em> H<sub>2</sub>CO<sub>3</sub>(aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq) «and pH decreases»</p>
<p> </p>
<p><em>Accept reversible or non-reversible arrows for all.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>reduce it <em><strong>AND</strong></em> absorbing/reflecting sunlight</p>
<p> </p>
<p><em>Accept “reduce it because of global dimming”.</em></p>
<p><em>Accept “reduce it <strong>AND</strong> blocking sunlight”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><span class="fontstyle0">Gasoline (petrol), biodiesel and ethanol are fuels.</span></p>
<p><span class="fontstyle0"><img src="data:image/png;base64,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" width="602" height="122"></span></p>
<p style="text-align: left;"><span class="fontstyle0">[U.S. Department of Energy. https://afdc.energy.gov/] <br> </span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Calculate the energy released, in <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>kJ</mi></math>, from the complete combustion of <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>5</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup></math></span><span class="fontstyle0"> </span><span class="fontstyle0">of ethanol.</span></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><span class="fontstyle0">State a class of organic compounds found in gasoline.</span></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><span class="fontstyle0">Outline the advantages and disadvantages of using biodiesel instead of gasoline as fuel for a car. Exclude any discussion of cost.</span></p>
<p><span class="fontstyle0"><img 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" width="694" height="392"></span></p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">A mixture of gasoline and ethanol is often used as a fuel. Suggest an advantage of such a mixture over the use of pure gasoline. Exclude any discussion of cost.</span></p>
<p> </p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Contrast the molecular structures of biodiesel and the vegetable oil from which it is formed.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">When combusted, all three fuels can release carbon dioxide, a greenhouse gas, as well as particulates. Contrast how carbon dioxide and particulates interact with sunlight.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Methane is another greenhouse gas. Contrast the reasons why methane and carbon dioxide are considered significant greenhouse gases.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span class="fontstyle0">Suggest a wavenumber absorbed by methane gas.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">f(iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>«</mo><mn>21</mn><mo> </mo><mn>200</mn><mo> </mo><mi>kJ</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>−</mo><mn>3</mn></mrow></msup><mo>×</mo><mn>5</mn><mo>.</mo><mn>00</mn><mo> </mo><msup><mi>dm</mi><mn>3</mn></msup><mo>=</mo><mo>»</mo><mn>106000</mn><mo>/</mo><mn>1</mn><mo>.</mo><mn>06</mn><mo>×</mo><msup><mn>10</mn><mn>5</mn></msup><mo>«</mo><mi>kJ</mi><mo>»</mo></math> ✔</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>alkane<br><em><strong>OR</strong></em><br>cycloalkane<br><em><strong>OR</strong></em><br>arene ✔</p>
<p><br><em>Accept “alkene”.</em><br><em>Do <strong>not</strong> accept just “hydrocarbon”, since given in stem.</em><br><em>Do <strong>not</strong> accept “benzene/aromatic” for “arene”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Advantages: <strong>[2 max]</strong></em></p>
<p>renewable ✔</p>
<p>uses up waste «such as used cooking oil» ✔</p>
<p>lower carbon footprint/carbon neutral ✔</p>
<p>higher flashpoint ✔</p>
<p>produces less <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>SO</mi><mi mathvariant="normal">x</mi></msub></math>/<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi>SO</mi><mn>2</mn></msub></math><br><em><strong>OR</strong></em><br>less polluting emissions ✔</p>
<p>has lubricating properties<br><em><strong>OR</strong></em><br>preserves/increases lifespan of engine ✔</p>
<p>increases the life of the catalytic converter ✔</p>
<p>eliminates dependence on foreign suppliers ✔</p>
<p>does not require pipelines/infrastructure «to produce» ✔</p>
<p>relatively less destruction of habitat compared to obtaining petrochemicals ✔</p>
<p> </p>
<p><em>Accept “higher energy density” OR “biodegradable” for advantage.</em></p>
<p><br><em>Disadvantages: <strong>[2 max]</strong></em></p>
<p>needs conversion/transesterification ✔</p>
<p>takes time to produce/grow plants ✔</p>
<p>takes up land<br><em><strong>OR</strong></em><br>deforestation ✔</p>
<p>fertilizers/pesticides/phosphates/nitrates «used in production of crops» have negative environmental effects ✔</p>
<p>biodiversity affected<br><em><strong>OR</strong></em><br>loss of habitats «due to energy crop plantations» ✔</p>
<p>cannot be used at low temperatures ✔</p>
<p>variable quality «in production» ✔</p>
<p>high viscosity/can clog/damage engines ✔</p>
<p><br><em>Accept “lower specific energy” as disadvantage.</em></p>
<p><em>Do <strong>not</strong> accept “lower octane number” as disadvantage”.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one:</em></p>
<p>uses up fossil fuels more slowly ✔</p>
<p>lower carbon footprint/CO2 emissions ✔</p>
<p>undergoes more complete combustion ✔</p>
<p>produces fewer particulates ✔</p>
<p>higher octane number/rating<br><em><strong>OR</strong></em><br>less knocking ✔</p>
<p>prevents fuel injection system build up<br><em><strong>OR</strong></em><br>helps keep engine clean ✔</p>
<p><br><em>Accept an example of a suitable advantage even if repeated from 9c.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two:</em><br>biodiesel has smaller molecules/single «hydrocarbon» chain <em><strong>AND</strong> </em>oil has larger molecules/multiple «hydrocarbon» chains ✔</p>
<p>biodiesel is methyl/ethyl ester <em><strong>AND</strong> </em>oil has «backbone of» glycerol joined to fatty acids ✔</p>
<p>biodiesel contains one ester group AND oil contains three ester groups ✔</p>
<p><br><em>Do <strong>not</strong> accept properties such as “less viscous” or “lower ignition point”.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide allows sunlight/short wavelength radiation to pass through <em><strong>AND</strong> </em>particulates reflect/scatter/absorb sunlight ✔</p>
<p><em>Accept “particulates reflect/scatter/absorb sunlight <strong>AND</strong> carbon dioxide does not”. </em><br><em>Accept “<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><msub><mi>O</mi><mn mathvariant="italic">2</mn></msub></math> absorbs <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>I</mi><mi>R</mi></math> «radiation» <strong>AND</strong> particulates reflect/scatter/absorb sunlight”. </em></p>
<p><em>Do <strong>not</strong> accept “traps” for “absorbs”.</em></p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide is highly/more abundant «in the atmosphere» ✔</p>
<p>methane is more effective/potent «as a greenhouse gas»<br><em><strong>OR</strong></em><br>methane/better/more effective at absorbing <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>IR</mi></math> «radiation»<br><em><strong>OR</strong></em><br>methane has greater greenhouse factor<br><em><strong>OR</strong></em><br>methane has greater global warming potential/GWP✔</p>
<p><br><em>Accept “carbon dioxide contributes more to global warming” for M1.</em></p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>any value or range within <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mn>2850</mn><mo>–</mo><mn>3090</mn><mo>«</mo><msup><mi>cm</mi><mrow><mo>−</mo><mn>1</mn></mrow></msup><mo>»</mo></math> ✔</p>
<div class="question_part_label">f(iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Even rather weak candidates answered this one correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates answered alkanes with a lower number stating hydrocarbons or benzene and therefore lost the mark. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were many good answers, but few candidates fully scored. Higher energy density and lower specific energy were quite common, and so references to damaging engines. Many students spent more time explaining each advantage rather than simply outlining. There were fewer journalistic and generic answers for this type of question than in the past.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another question where many candidates obtained the mark. In quite a few cases students repeated the argument for (c) and this allowed them to get two points for the same answer.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Quite disappointing with few candidates producing answers that showed deep understanding. Answers such as less viscous or lower ignition point were common. This question specifically asks for contrasts in the structures not the properties of the compounds. Students need to be reminded that a contrast statement requires something about each substance.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Showed a wide variety of answers but is was worrying that many students limited to explain the greenhouse effect. There were many responses that did not answer the question or only gave a response for one of the 2 substances.</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>We received many good answers, but it was worrying the number of students that still provided general and shallow comments. Of the 3 contrast question this had the best response.</p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many good answers with some students losing the mark as didn't read or understand the question correctly and provided answers in terms of wavelengths.</p>
<div class="question_part_label">f(iii).</div>
</div>
<br><hr><br><div class="specification">
<p>Auto-ignition of hydrocarbon fuel in a car engine causes “knocking”. The tendency of a fuel to knock depends on its molecular structure.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss how the octane number changes with the molecular structure of the alkanes.</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>Catalytic reforming and cracking reactions are used to produce more efficient fuels. Deduce the equation for the conversion of heptane to methylbenzene.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«tends to» decrease with longer/larger/heavier alkanes</p>
<p>«tends to» increase with bulkier/more branched alkanes</p>
<p><em>Accept “octane number decreases with the separation between branches” <strong>OR</strong> “increases with the more central position of branches”. </em></p>
<p><em>Accept converse arguments.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C<sub>7</sub>H<sub>16</sub> → C<sub>6</sub>H<sub>5</sub>CH<sub>3</sub> + 4H<sub>2 </sub></p>
<p><em>Accept “C<sub>7</sub>H<sub>8</sub>” for “C<sub>6</sub>H<sub>5</sub>CH<sub>3</sub>”.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Coal is often converted to liquid hydrocarbon fuels through initial conversion to carbon monoxide and hydrogen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State how these gases are produced, giving the appropriate equation(s).</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>Outline how the carbon monoxide is then converted to a hydrocarbon fuel.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>heat/react with «oxygen and» water/steam</p>
<p>C + H<sub>2</sub>O → CO + H<sub>2</sub><br><em><strong>OR</strong></em><br>3C + O<sub>2</sub> + H<sub>2</sub>O → H<sub>2</sub> + 3CO<br><em><strong>OR</strong></em><br>2C + O<sub>2</sub> → 2CO <em><strong>AND</strong></em> C + H<sub>2</sub>O → H<sub>2</sub> + CO<br><em><strong>OR</strong></em><br>C + O<sub>2</sub> → CO<sub>2</sub> <em><strong>AND</strong></em> C + CO<sub>2</sub> → 2CO <em><strong>AND</strong></em> C + H<sub>2</sub>O → H<sub>2</sub> + CO</p>
<p> </p>
<p><em>M1 requires concept of heat.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«Fischer-Tropsch» catalytic reduction of carbon monoxide with hydrogen<br><em><strong>OR</strong></em><br>(2n + 1)H<sub>2</sub> + n<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>CO → C<sub>n</sub>H<sub>(2n + 2)</sub> + n<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>H<sub>2</sub>O<br><em><strong>OR</strong></em><br>reduction of carbon monoxide to methanol <strong><em>AND</em></strong> catalytic dehydration<br><em><strong>OR</strong></em><br>2H<sub>2</sub> + CO + CH<sub>3</sub>OH <em><strong>AND</strong></em> n<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>CH<sub>3</sub>OH → C<sub>n</sub>H<sub>2n</sub> + n<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>H<sub>2</sub>O</p>
<p> </p>
<p><em>If equation is given for a specific alkane or alkene, it must be a liquid (n > 4).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The sun is the main source of energy used on earth.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>One fusion reaction occurring in the sun is the fusion of deuterium, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_1^2H">
<msubsup>
<mrow>
</mrow>
<mn>1</mn>
<mn>2</mn>
</msubsup>
<mi>H</mi>
</math></span>, with tritium, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_1^3H">
<msubsup>
<mrow>
</mrow>
<mn>1</mn>
<mn>3</mn>
</msubsup>
<mi>H</mi>
</math></span>, to form helium, <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_2^4He">
<msubsup>
<mrow>
</mrow>
<mn>2</mn>
<mn>4</mn>
</msubsup>
<mi>H</mi>
<mi>e</mi>
</math></span>. State a nuclear equation for this reaction.</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>Explain why this fusion reaction releases energy by using section 36 of the data booklet.</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>State the technique used to show that the sun is mainly composed of hydrogen and helium.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Coloured molecules absorb sunlight. Identify the bonding characteristics of such molecules.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_1^2H">
<msubsup>
<mrow>
</mrow>
<mn>1</mn>
<mn>2</mn>
</msubsup>
<mi>H</mi>
</math></span> + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_1^3H">
<msubsup>
<mrow>
</mrow>
<mn>1</mn>
<mn>3</mn>
</msubsup>
<mi>H</mi>
</math></span> → <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_2^4He">
<msubsup>
<mrow>
</mrow>
<mn>2</mn>
<mn>4</mn>
</msubsup>
<mi>H</mi>
<mi>e</mi>
</math></span> + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_0^1n">
<msubsup>
<mrow>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mi>n</mi>
</math></span></p>
<p> </p>
<p><em>Accept "n" for "<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_0^1n">
<msubsup>
<mrow>
</mrow>
<mn>0</mn>
<mn>1</mn>
</msubsup>
<mi>n</mi>
</math></span>"</em></p>
<p><em>Accept "<sup>2</sup>H + <sup>3</sup>H → <sup>4</sup>He + <sup>1</sup>n/n".</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>higher binding energy/BE «per nucleon» for helium/products<br><em><strong>OR</strong></em><br>nucleons in products more tightly bound</p>
<p>mass defect/lost matter converted to energy</p>
<p> </p>
<p><em>Accept converse statement in M1.</em></p>
<p><em>Accept “mass deficit” for “mass defect”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>spectrometry</p>
<p> </p>
<p><em>Accept “spectroscopy” for </em><em>“spectrometry” </em><strong><em>OR </em></strong><em>more specific </em><em>techniques such as “atomic absorption </em><em>spectrometry/AAS”, “astrophotometry” </em><em>etc. Do </em><strong><em>not </em></strong><em>award mark for incorrect </em><em>specific spectrometric techniques.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “spectrum”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«extensive system of» conjugation/alternating single and double «carbon to carbon» bonds<br><em><strong>OR</strong></em><br>delocalized electrons «over much of the molecule»</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>One method of comparing fuels is by considering their specific energies.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the specific energy of octane, C<sub>8</sub>H<sub>18</sub>, in kJ kg<sup>–1</sup> using sections 1, 6 and 13 of the data booklet.</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>A typical wood has a specific energy of 17 × 10<sup>3</sup> kJ kg<sup>–1</sup>. Comment on the usefulness of octane and wood for powering a moving vehicle, using your answer to (a).</p>
<p>If you did not work out an answer for (a), use 45 × 10<sup>3</sup> kJ kg<sup>–1</sup> but this is not the correct answer.</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>State the name of <strong>one</strong> renewable source of energy other than wood.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>M</em><sub>r</sub> (C<sub>8</sub>H<sub>18</sub>) = 114.26 <em><strong>AND</strong> </em>Δ<em>H</em><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="_c^\theta ">
<msubsup>
<mi></mi>
<mi>c</mi>
<mi>θ</mi>
</msubsup>
</math></span><em>=</em> –5470 «kJ mol<sup>–1</sup>»</p>
<p>«specific energy = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5470\,{\text{kJ}}}}{{0.11426\,{\text{kg}}}}">
<mfrac>
<mrow>
<mn>5470</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kJ</mtext>
</mrow>
</mrow>
<mrow>
<mn>0.11426</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kg</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> =» 4.79 x 10<sup>4</sup>/47873/47900 «kJ kg<sup>–1</sup>»</p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<p><em>Accept “48 x 10<sup>3</sup> «kJ kg<sup>–1</sup>»” <strong>OR </strong>“47.9 x 10<sup>3</sup> «kJ kg<sup>–1</sup>»”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>wood is less useful because it requires «about three times» more mass for same energy</p>
<p><em>Accept “octane is more useful because it has higher specific energy”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any one of:</em><br>wind<br>tidal/wave<br>hydro-electric<br>solar<br>thermal/geothermal<br>plant oil</p>
<p><em>Accept “biofuel/biodiesel/«bio»ethanol” but <strong>not</strong> just “water” or “fuel cells”.</em></p>
<p><em><strong>[Max 1 Mark]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Vegetable oils, such as that shown, require conversion to biodiesel for use in current internal combustion engines.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>two</strong> reagents required to convert vegetable oil to biodiesel.</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>Deduce the formula of the biodiesel formed when the vegetable oil shown is reacted with the reagents in (a).</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, in terms of the molecular structure, the critical difference in properties that makes biodiesel a more suitable liquid fuel than vegetable oil.</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>Determine the specific energy, in kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>g<sup>−1</sup>, and energy density, in kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>cm<sup>−3</sup>, of a particular biodiesel using the following data and section 1 of the data booklet.</p>
<p>Density = 0.850 g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>cm<sup>−3</sup>; Molar mass = 299 g<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>Enthalpy of combustion = 12.0 MJ<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><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>methanol<br><em><strong>OR</strong></em><br>ethanol</p>
<p>strong acid<br><em><strong>OR</strong></em><br>strong base</p>
<p> </p>
<p><em>Accept “alcohol”.</em></p>
<p><em>Accept any specific strong acid or strong base other than HNO<sub>3</sub>/nitric acid.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>(CH<sub>2</sub>)<sub>16</sub>COOCH<sub>3</sub> / CH<sub>3</sub>OCO(CH<sub>2</sub>)<sub>16</sub>CH<sub>3</sub><br><em><strong>OR</strong></em><br>CH<sub>3</sub>(CH<sub>2</sub>)<sub>16</sub>COOC<sub>2</sub>H<sub>5</sub> / C<sub>2</sub>H<sub>5</sub>OCO(CH<sub>2</sub>)<sub>16</sub>CH<sub>3</sub></p>
<p> </p>
<p><em>Product <strong>must</strong> correspond to alcohol chosen in (a), but award mark for either structure if neither given for (a).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>lower viscosity</p>
<p>weaker intermolecular/dispersion/London/van der Waals’ forces<br><em><strong>OR</strong></em><br>smaller/shorter molecules</p>
<p> </p>
<p><em>Accept “lower molecular mass/M<sub>r</sub>” or “lower number of electrons”.</em></p>
<p><em>Accept converse arguments.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Specific energy:</em> «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" = \frac{{12\,000{\text{ kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}{{299{\text{ g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}">
<mo>=</mo>
<mfrac>
<mrow>
<mn>12</mn>
<mspace width="thinmathspace"></mspace>
<mn>000</mn>
<mrow>
<mtext> kJ</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>299</mn>
<mrow>
<mtext> g</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span>» = 40.1 «kJ g<sup>−1</sup>»</p>
<p><em>Energy density:</em> «= 40.1 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>g<sup>−1</sup> x 0.850 g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>cm<sup>−3</sup>» = 34.1 «kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>cm<sup>−3</sup>»</p>
<p> </p>
<p><em>Award [1] if both are in terms of a unit other than kJ (such as J or MJ).</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Much of our energy needs are still provided by the refined products of crude oil.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>“Knocking” in an automobile (car) engine can be prevented by increasing the octane number of the fuel. Explain, including an equation with structural formulas, how heptane, C<sub>7</sub>H<sub>16</sub>, could be chemically converted to increase its octane number.</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>Many like to refer to our “carbon footprint”. Outline one difficulty in quantifying such a concept.</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>Climate change or global warming is a consequence of increased levels of carbon dioxide in the atmosphere. Explain how the greenhouse effect warms the surface of the earth.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how water and carbon dioxide absorb infrared radiation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub> → CH<sub>3</sub>CH(CH<sub>3</sub>)CH<sub>2</sub>CH(CH<sub>3</sub>)<sub>2</sub></p>
<p><em><strong>OR</strong></em></p>
<p>CH<sub>3</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub> → <img src="data:image/png;base64,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"></p>
<p>isomerisation/reforming/platforming/cracking</p>
<p>Pt/Re/Rh/Pd/Ir</p>
<p><em><strong>OR</strong></em></p>
<p>catalyst</p>
<p>A structural formula is only required for the organic product, not heptane.</p>
<p>Accept any correctly balanced equation showing increased branching or cyclization <em><strong>OR</strong> </em>aromatization <em><strong>OR</strong> </em>cracking.</p>
<p>Suitable supports for catalysts may be included for M3 (eg silica, alumina, zeolite) but the symbol or name of an appropriate metal must be given (typically a noble metal). Ignore temperature and other conditions.</p>
<p>Award M2 <em><strong>AND</strong> </em>M3 for “catalytic isomerisation” <em><strong>OR</strong> </em>“catalytic reforming” <em><strong>OR</strong> </em>“catalytic cracking”.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>which specific carbon-based greenhouse gases are included</p>
<p><em><strong>OR</strong></em></p>
<p>whether non-carbon based greenhouse gases should be included</p>
<p><em><strong>OR</strong></em></p>
<p>whether CO/incomplete combustion should be included «as can be oxidized to CO<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>how to “sum” all steps in a process creating CO<sub>2</sub></p>
<p><em><strong>OR</strong></em></p>
<p>difficult to determine both direct and indirect production of GHG/greenhouse gas emissions</p>
<p><em>Ignore reference to geopolitical issues (eg false recording of data by governments etc.).</em></p>
<p><em>Accept “difficult to measure all sources of CO<sub>2</sub>” but <strong>not</strong> “difficult to measure CO<sub>2</sub> released in atmosphere”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any three of:</em></p>
<p>incoming solar radiation is short wavelength/high frequency/high energy/UV</p>
<p>radiated/emitted as long wavelength/low frequency/low energy/IR «radiation»</p>
<p>energy/IR «radiation» absorbed by «bonds in» greenhouse gases</p>
<p>energy radiated/emitted as IR «radiation» some of which returns back to Earth</p>
<p><em>Do not accept “reflected” <strong>OR</strong> “bounced” <strong>OR</strong> “trapped”.</em></p>
<p><strong><em>[Max 3 Marks]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>bond length changes</p>
<p><em><strong>OR</strong></em></p>
<p>«asymmetric» stretching «of bonds»</p>
<p><em><strong>OR</strong></em></p>
<p>bond angle changes/bends</p>
<p><em><strong>OR</strong></em></p>
<p>polarity/dipole «moment» changes</p>
<p><em><strong>OR</strong></em></p>
<p>a dipole «moment» is created «when the molecule absorbs IR»</p>
<p>Accept “vibration of bonds” <em><strong>OR </strong></em>appropriate diagram</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>There are many sources of energy available.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>one</strong> advantage and <strong>one</strong> disadvantage for each energy source in the table.</p>
<p><img 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Zfquib34OVZ7d75L0q4B/Hu3434xlZt819DkVrVm7OdUHf4H3Rn6ptQbz74+LbTr3jzxN3rPu7SP939XHob7t1eDkd1z47e1GLBaz+hD57ltZ9ZdmfmXtj+eEJXa9mic6X3zdG81Hzy5/SDn76SOuhKJp7Rvff+72KB5L1+lv548dL0Xaa6H9XO3nQbqW9VUnfWce8EFdfMzMHa2/XN2yhPa1LAm+srBdt6dDL/APlkj9pS1zN06sGul5TMzhdOqHv3o+pN3RHlTSUOPKpH3M9c/r/Zn9CqW690T31o5cptSqhBq5s/ovRZs6RGjh7RC+46wQ/qT5uv1uca/ki/+/H39YP0rdfyW3sbz6e4jWL9it2v27f5+5UbM17c8c/addi9T9WbSsT+IX3Hp/w7vbyNiFkFAQTyBdw7F31L/7Tle5JW6o4bL82MIWOXS77SqRtTd5dr1ubYsOqXf04tLZ/XX37uct+XlyM6OvBSasXgxX+q5ms+o4Y/Pq4fR58aM6Oi8PFHQgfCj6SvAxuzaW+WRFCJbWu00h0zgv7jj6ltc0yTZ/yEse6Myap5Bf9krmLzovzLlPRxdu5x7hoHN4ax/3lzCb15fr65y24w2Ta85YrfFanQXZ6yc6+zHSt8x4Jxd3nylh8zfzJvDqK3TP7PMevk99e9Q5R3DYW7Ym6u+VgXdz3vrjXuhMpCd4EJmktDl6bv+pC9LsJzLDDfe6Jthf7e9Ay6d7+Zim9+h6fvedn32enrSu20nJ3rm/dZzgrkriHwrh0qeDck31iR/znOzi92l/HueJJpv3BbDSYUcu8i512P4LuGIvvZcRvwrmfwxZ6dH5z5LC/oMM+/XOiuVPnbOIO7PA2/YMJruMtTdhepggeMXZYkMXutQIHfxakxJu9OatnlvWOOiX5HLzat0ZfNaJG7R+rSkAm5d6/L3hWy8PFH7nd//u/t3J3txt8dr0hb47bpHRP4xjQ3NeOOrXzXbWTGXnfcfaPgHfgY6yzZu6cljGJjV5WdoXBLv9m6pPUu9faE1ebeZSH1b7HWdPxIvfev1iUzJ+vy2Zrfcqd6u3dk7iDjrbtOH/fPjcq0rMAH9KkvXZX5JuIyXXfZRb7rEryF8n4GLlTLt7vVt+8hX4zuMu62vque3rvUeol3FcIcNWzYq4Ge76ZPoaaaCirUFlbPwF5taEhPhZA3j7Mt/ZcsUnemCe/Rt2+7asyUrrxI8p7OUcOt31ZftMN39xw3pqj69m7S8qA7ZeSd+uZtkqc1JuCf7vQJXb44PaVvLELuG3nvb1IE5l+ju3t/lPsMBNeoo7tPPZkpgmPXl3Lf9AXl3fHEWyYw/7O648lduc9eqE07+/6X9qz/VN5dU7w1JvkZuFifvv2ruc/MB2Zoxh99ZkrbyO9XcM0Odffep7/5+PljNzpzsVrvj6on7P6hrcy/lEFU97cuTv8tG+91fiKAQEkEgms6FO3r1sMTfsa839H+Yw73jkltCvdEdXfLhQrobM2/5qt6MvWH8tzQ3N/hu9T3+P/U+isWSAn3Ogj3DpT5xx9Sakz4t+7MneTyu+WbxaDLtPrqj/jGgqluM7/N4s8D9Z/W7dk7TgX1AY3qzSmOp4x1xV2r5h1/+VKs6vAvU/WPs1W5/97Qo2a4b0fmjgzetxKehO8b+/w7MXmL8HPaBNhnp42WhqddwDvb4X5D6f39C/ckiHe3uLxvDKc9HjZQTgHGrnJqs613V4Cx7t31L+3Wi41djrsZrzpyHCd1D2XveW3+fE39269XY+rvMYwXCLZG9bNvt2h+wP3rkst07S5v4rV7D+ofaevyvG8WxzfBKyUUYJ8tISZNlVkgqZH+u3VV461KXzmVt/ngOkV/tkMtmYvJ897laYULMHZVeAIJ/wwEGOvOAMv6RYuNXZPN/7G+Y6UPsNC0H3cr7h1hetR79zWZOzh5t4/MvBfdo9soJkqfDlpEoGoFAprZsE57+6K5qVypvmamNPbeSTFRtbmnYwjUkgBjXS1kmzMUtZDlKu5jsUq5irtM1xBAoAoEGLuqIIl0AYEaFCg2dnGGogZ3BrqMAAIIIIAAAggggECpBCgoSiVJOwgggAACCCCAAAII1KAABUUNJp0uI4AAAggggAACCCBQKgEKilJJ0g4CCCCAAAIIIIAAAjUoQEFRg0mnywgggAACCCCAAAIIlEqAgqJUkrSDAAIIIIAAAggggEANClBQ1GDS6TICCCCAAAIIIIAAAqUSoKAolSTtIIAAAggggAACCCBQgwIUFDWYdLqMAAIIIIAAAggggECpBCgoSiVJOwgggAACCCCAAAII1KAABUUNJp0uI4AAAggggAACCCBQKgHHGGPcxhzHKVWbtIMAAggggAACCCCAAAJVKpApH7K9O8t75L7hFhX5C3jv8xMBGwXYZ23MCjEhgMBkAoxdkwnxPgII2ChQbOxiypON2SImBBBAAAEEEEAAAQQqRICCokISRZgIIIAAAggggAACCNgoQEFhY1aICQEEEEAAAQQQQACBChGgoKiQRBEmAggggAACCCCAAAI2ClBQ2JgVYkIAAQQQQAABBBBAoEIEKCgqJFGEiQACCCCAAAIIIICAjQIUFDZmhZgQQAABBBBAAAEEEKgQAQqKCkkUYSKAAAIIIIAAAgggYKMABYWNWSEmBBBAAAEEEEAAAQQqRICCokISRZgIIIAAAggggAACCNgoQEFhY1aICQEEEEAAAQQQQACBChGgoKiQRBEmAggggAACCCCAAAI2ClBQ2JgVYkIAAQQQQAABBBBAoEIEKCgqJFGEiQACCCCAAAIIIICAjQIUFDZmhZgQQAABBBBAAAEEEKgQAQqKCkkUYSKAAAIIIIAAAgggYKMABYWNWSEmBBBAAAEEEEAAAQQqRICCokISRZgIIIAAAggggAACCNgoQEFhY1aICQEEEEAAAQQQQACBChGgoKiQRBEmAggggAACCCCAAAI2ClBQ2JgVYkIAAQQQQAABBBBAoEIEKCgqJFGEiQACCCCAAAIIIICAjQIUFDZmhZgQQAABBBBAAAEEEKgQAQqKCkkUYSKAAAIIIIAAAgggYKMABYWNWSEmBBBAAAEEEEAAAQQqRICCokISRZgIIIAAAggggAACCNgoQEFhY1aICQEEEEAAAQQQQACBChGgoKiQRBEmAggggAACCCCAAAI2ClBQ2JgVYkIAAQQQQAABBBBAoEIEKCgqJFGEiQACCCCAAAIIIICAjQIUFDZmhZgQQAABBBBAAAEEEKgQAQqKCkkUYSKAAAIIIIAAAgggYKMABYWNWSGmd08geViR5jo5dZsVG0oWieOU4pFVcpxGtcdOFFlGSsYjanYc1bXHNFRsKbYnCU939yj3/iL2vdLue8U+4+V6vdrzyTiR2pPKPU6wPXdwrvLjghKNUY4xxnhtOY4j31PvZX4iYK0A+6y1qSEwBBCYQICxawIc3kIAAWsFio1dnKGwNmUEhgACCCCAAAIIIICA/QIUFPbniAgRQAABBBBAAAEEELBWgILC2tQQGAIIIIAAAggggAAC9gtQUNifIyJEAAEEEEAAAQQQQMBaAQoKa1NDYAgggAACCCCAAAII2C9AQWF/jogQAQQQQAABBBBAAAFrBSgorE0NgSGAAAIIIIAAAgggYL8ABYX9OSJCBBBAAAEEEEAAAQSsFaCgsDY1BIYAAggggAACCCCAgP0CFBT254gIEUAAAQQQQAABBBCwVoCCwtrUEBgCCCCAAAIIIIAAAvYLUFDYnyMiRAABBBBAAAEEEEDAWgEKCmtTQ2AIIIAAAggggAACCNgvQEFhf46IEAEEEEAAAQQQQAABawUoKKxNDYEhgAACCCCAAAIIIGC/AAWF/TkiQgQQQAABBBBAAAEErBWgoLA2NQSGAAIIIIAAAggggID9AhQU9ueICBFAAAEEEEAAAQQQsFaAgsLa1BAYAggggAACCCCAAAL2C1BQ2J8jIkQAAQQQQAABBBBAwFoBCgprU0NgCCCAAAIIIIAAAgjYL0BBYX+OiBABBBBAAAEEEEAAAWsFKCisTQ2BIYAAAggggAACCCBgv8AUC4pTikdWyXGcAv81qz0SU3wkme1tMh5Rs9Oo9tiJ7GuTP0hqJN6p9mV16W00RxTPNTn56hMtkTysSHO9miOHVaomJ9oc7yGAAAIIIIAAAgggUCsCUywoPI6VCg+8LmNM9r/Rwa9p3v5bFLpln17JHK0HFraqy/Rp6/LzvRUn/5mM67H1N2v3xffp6KiR6WrVwjOMbvKNsAQCCCCAAAIIIIAAAgiUUuAdH7IHgn+mG9deJUW+q64jp955bOfP0ax3HNU7D4MWEEAAAQQQQAABBBBAYHKB0h26B+t10byzU1scP+XJnc4UU6S9OTNlqk7L2iOKxYdyy8/4kG7sTiixbYXOS02X+pVi7Y1y6jYrNuSbqDQUU3udo7r2mNJrS0om1P9Iu5Z5U7KWtSsSi2ukaP+HFI9FctOrnLHxFF2NNxBAAAEEEEAAAQQQQGCMwDsuKJKJnyr8nSFt3LdeodmFmktq5PBurQvdov3zvqZBdzrTaL+2ztuv6xd9Udv7X1NqitToIYWbggq29ehkarrUfxkTaNEnyV+r88tNuir2J9o6+IaMGdXwtz6s/ddfq1s6f13gmomkRvrDuun657ToW4fTU7dGf6bbZjyqFesfL911G0UD5g0EEEAAAQQQQAABBKpHoFAFMEHvvqcbF713zIXZM+ou062Rf9exoyf1nwXXfFUHHr5XT336H3TnLZ9U0N1iIKilf/tN7Wk7po2bO9/BQXxSQ70P6ubIh3THV2/U0qB7hiSgmZes1r17rtIPb35Qvf6zG6n43tTgL3+q3iWf1GULZ6cjDszX8ju7uG6jYP54EQEEEEAAAQQQQACB4gJnWFCMvyjbDB9StE3adu0GPdD/2vgtDf2runYPasknP5wuJrJLzNT7F10svXBER313iMq+PaUHr6qvq1sJ33Sr9GoBzXx/vZYkutXV92peS2er7qN/plD3Pyu8718U6+wdc4eqvIV5WmsCqTuC1Y2fajfGwbvr2cR3MktP/cubnjemHXe6nnsHMraXvoscns1O+fYX9j33w1jCz3L+Z7vcz6t9LCllrqrdiv6V9rNd7Z6lGquM75/kzgAq9O91MxBeaaSVJjzw+rgFRgfCpkkywbYec9IYk37eYNp6jmceB01T+JAZHbNmXpujh0y4KZhtw5jjpqetwSi4yfSc9K15sse0Bb1tZZaRjBv7+P/SMZhU2wt8MYya4YFnTDTcZkLeeqE2E+4ZMMNjYuSJ7QLF91nbIyc+BBCoZQHGrlrOPn1HoHIFio1dZ3iGonAZE5h3kT4WPPP3UmuMO7tQuJ0JX20Ka8C9NsN3O9v042K3rg1o5sKQWlq36hljNDrYp+iVx7RlxRd1+xn97YwJo+JNBBBAAAEEEEAAAQSqXqAkBUXy2Mv6RaJBq5s/osxVCTm42R9R8+o6vfDcr5Tw3axJGtHRgZekJfV6/8xCYWSmROVaKvBorhqbmxR84ec6mHjT97574fVdWuasUiQ++a1sA8EGtXxlrVYHB/WLl08UuJDb1zQPEUAAAQQQQAABBBBAICtQ6Eg+++aUHowc1r7wo+oOfUmrls4tsMpcLf1v63XFD/9Om+9+LlNUDOlwpF3Xb5unjjtbivwBu3NUf9lfqCnxpB55/FfpW8COHFbnP23VtoS3mYBmh27SfZ/er5s3f1sHUkWFe4vafbp9w/1SxwatWniOt3DmZ2bO7LLN6szctlYaUvzpp3VALbqp+WK9c5S8TfIUAQQQQAABBBBAAIEqFTjDY+fxd3lyZt2i5xetV9/edWooeKYhfdel+3vv1uXH/lF1Mxw5ziX664FPas/AXm1omFOUNrDw87q3u1XaskSz3L8xcdXDGr52gx5q8s2vClyolruj2nP5b9Re9wdynBmaFXpCF6x/VHtvXaqZ41o/RwtvuFt96+fqidB5mTtWnT5RcPMAABWHSURBVKfQE3O1/smv6pr56b+lMW41XkAAAQQQQAABBBBAAIFxAo57WYj3quM4qesQvOf8RMB2AfZZ2zNEfAggUEiAsauQCq8hgIDtAsXGrjM8Q2F7N4kPAQQQQAABBBBAAAEEyilAQVFObbaFAAIIIIAAAggggECVCVBQVFlC6Q4CCCCAAAIIIIAAAuUUoKAopzbbQgABBBBAAAEEEECgygQoKKosoXQHAQQQQAABBBBAAIFyClBQlFObbSGAAAIIIIAAAgggUGUCFBRVllC6gwACCCCAAAIIIIBAOQUoKMqpzbYQQAABBBBAAAEEEKgyAQqKKkso3UEAAQQQQAABBBBAoJwCFBTl1GZbCCCAAAIIIIAAAghUmQAFRZUllO4ggAACCCCAAAIIIFBOAQqKcmqzLQQQQAABBBBAAAEEqkyAgqLKEkp3EEAAAQQQQAABBBAopwAFRTm12RYCCCCAAAIIIIAAAlUmQEFRZQmlOwgggAACCCCAAAIIlFOAgqKc2mwLAQQQQAABBBBAAIEqE6CgqLKE0h0EEEAAAQQQQAABBMopQEFRTm22hQACCCCAAAIIIIBAlQlQUFRZQukOAggggAACCCCAAALlFKCgKKc220IAAQQQQAABBBBAoMoEKCiqLKF0BwEEEEAAAQQQQACBcgpQUJRTm20hgAACCCCAAAIIIFBlAhQUVZZQuoMAAggggAACCCCAQDkFKCjKqc22EEAAAQQQQAABBBCoMgEKiipLKN15hwLJw4o018mp26zYULJIY6cUj6yS4zSqPXaiyDJSMh5Rs+Oorj2moWJLsT1JeLq7R7n3F7HvlXbfK/YZL9fr1Z5PxonUnlTucYLtuYNzlR8XlGiMcowxxmvLcRz5nnov8xMBawXYZ61NDYEhgMAEAoxdE+DwFgIIWCtQbOziDIW1KSMwBBBAAAEEEEAAAQTsF6CgsD9HRIgAAggggAACCCCAgLUCFBTWpobAEEAAAQQQQAABBBCwX4CCwv4cESECCCCAAAIIIIAAAtYKUFBYmxoCQwABBBBAAAEEEEDAfgEKCvtzRIQIIIAAAggggAACCFgrQEFhbWoIDAEEEEAAAQQQQAAB+wUoKOzPEREigAACCCCAAAIIIGCtAAWFtakhMAQQQAABBBBAAAEE7BegoLA/R0SIAAIIIIAAAggggIC1AhQU1qaGwBBAAAEEEEAAAQQQsF+AgsL+HBEhAggggAACCCCAAALWClBQWJsaAkMAAQQQQAABBBBAwH4BCgr7c0SECCCAAAIIIIAAAghYK0BBYW1qCAwBBBBAAAEEEEAAAfsFKCjszxERIoAAAggggAACCCBgrQAFhbWpITAEEEAAAQQQQAABBOwXoKCwP0dEiAACCCCAAAIIIICAtQIUFNamhsAQQAABBBBAAAEEELBfgILC/hwRIQIIIIAAAggggAAC1gpQUFibGgJDAAEEEEAAAQQQQMB+AQoK+3NEhAgggAACCCCAAAIIWCtAQWFtaggMAQQQQAABBBBAAAH7BSgo7M8RESKAAAIIIIAAAgggYK0ABYW1qSEwBBBAAAEEEEAAAQTsF6CgsD9HRIgAAggggAACCCCAgLUCFBTWpobAEEAAAQQQQAABBBCwX4CCwv4cESECCCCAAAIIIIAAAtYKUFBYmxoCQwABBBBAAAEEEEDAfgEKCvtzRIQIIIAAAggggAACCFgr4BhjjBud4zjWBklgCCCAAAIIIIAAAgggYIdApnzIBnOW98h9wy0q8hfw3ucnAjYKsM/amBViQgCByQQYuyYT4n0EELBRoNjYxZQnG7NFTAgggAACCCCAAAIIVIgABUWFJIowEUAAAQQQQAABBBCwUYCCwsasEBMCCCCAAAIIIIAAAhUiQEFRIYkiTAQQQAABBBBAAAEEbBSgoLAxK8SEAAIIIIAAAggggECFCFBQVEiiCBMBBBBAAAEEEEAAARsFKChszAoxIYAAAggggAACCCBQIQIUFBWSKMJEAAEEEEAAAQQQQMBGAQoKG7NCTAgggAACCCCAAAIIVIgABUWFJIowEUAAAQQQQAABBBCwUYCCwsasEBMCCCCAAAIIIIAAAhUiQEFRIYkiTAQQQAABBBBAAAEEbBSgoLAxK8SEAAIIIIAAAggggECFCFBQVEiiCBMBBBBAAAEEEEAAARsFKChszAoxIYAAAggggAACCCBQIQIUFBWSKMJEAAEEEEAAAQQQQMBGAQoKG7NCTAgggAACCCCAAAIIVIgABUWFJIowEUAAAQQQQAABBBCwUYCCwsasEBMCCCCAAAIIIIAAAhUiQEFRIYkiTAQQQAABBBBAAAEEbBSgoLAxK8SEAAIIIIAAAggggECFCFBQVEiiCBMBBBBAAAEEEEAAARsFKChszAoxIYAAAggggAACCCBQIQIUFBWSKMJEAAEEEEAAAQQQQMBGAQoKG7NCTAgggAACCCCAAAIIVIgABUWFJIowEUAAAQQQQAABBBCwUYCCwsasEBMCCCCAAAIIIIAAAhUiQEFRIYkiTAQQQAABBBBAAAEEbBSgoLAxK8SEAAIIIIAAAggggECFCFBQVEiiCBMBBBBAAAEEEEAAARsFKChszAoxIYAAAggggAACCCBQIQIUFBWSKMIsk0DysCLNdXLqNis2lCyy0VOKR1bJcRrVHjtRZBkpGY+o2XFU1x7TULGl2J4kPN3do9z7i9j3SrvvFfuMl+v1as8n40RqTyr3OMH23MG5yo8LSjRGOcYY47XlOI58T72X+YmAtQLss9amhsAQQGACAcauCXB4CwEErBUoNnZxhsLalBEYAggggAACCCCAAAL2C1BQ2J8jIkQAAQQQQAABBBBAwFoBCgprU0NgCCCAAAIIIIAAAgjYL0BBYX+OiBABBBBAAAEEEEAAAWsFKCisTQ2BIYAAAggggAACCCBgvwAFhf05IkIEEEAAAQQQQAABBKwVoKCwNjUEhgACCCCAAAIIIICA/QIUFPbniAgRQAABBBBAAAEEELBWgILC2tQQGAIIIIAAAggggAAC9gtQUNifIyJEAAEEEEAAAQQQQMBaAQoKa1NDYAgggAACCCCAAAII2C9AQWF/jogQAQQQQAABBBBAAAFrBSgorE0NgSGAAAIIIIAAAgggYL8ABYX9OSJCBBBAAAEEEEAAAQSsFaCgsDY1BIYAAggggAACCCCAgP0CFBT254gIEUAAAQQQQAABBBCwVoCCwtrUEBgCCCCAAAIIIIAAAvYLUFDYnyMiRAABBBBAAAEEEEDAWgEKCmtTQ2AIIIAAAggggAACCNgvQEFhf46IEAEEEEAAAQQQQAABawUoKKxNDYEhgAACCCCAAAIIIGC/AAWF/TkiQgQQQAABBBBAAAEErBWgoLA2NQSGAAIIIIAAAggggID9AlMsKJIaim1WnePIKfZf3WbFhpLl63HysCLNdaprj2lIUjIeUbOzSpH4qeIxjBxWZ3tzpg+TLFu8lQLvnFI8skpOc0TxMhIUCISXEEAAAQQQQAABBBAoq8BZZ7a1BrX1/Ehbl59/ZqtNx9KBS9TaNajWTNuTH8efUvyxr+na3R9U9OiTapl/9nRERZsIIIAAAggggAACCNSUwBTPUFSTyWzNmXWGdVQ1dZ++IIAAAggggAACCCBQQoHpKShG4opF2rXMmx61rF2RWFwj2cCTGonHFMlOP3Lk5C+T34bTrPZITPGRzLmIvClP2aYLPUgte7EW3fg9KfF1rThvhuran9JvU9O4GtUeO+Fb64Ri7Y1yxkzhelOJ/t1qX1aXmS6VF4tv7fTDKfRv3Dq8gAACCCCAAAIIIIBA5QmUvqAYOajIumt1/f4/0dbBN2TMGxrc+ifaf31IV20/kC4qRvr0wE1t2r/omxo2Jr3Mbedq94oteix1DcRr6n/gVl2//8P61vCojDEaHdygGbu/ovWPxTX59Ka8RKSmR72kgfBKKbhJPSdHNbh1hc7LW6zw0zf1Suetarjqac3b2q9RN97hb2rR/lsUumWfXikUzKT9K7wlXkUAAQQQQAABBBBAoNIEznDuT7+2rbhA2/J76R6kH75Dy2dLQwf2astTl+u+n31ZS4Pp6xSCS/9a9+55RZes2K7Hrt6lG3RQT/VerOserNfMVFtnK7j87/SMyTScfFm/fOqwllz3p1o4M13zBIJX6M5njuRvefqfDz2re27u1JI7YrplaVCpaGYuVuu9d2vgkjbd0/vn2ro83QsvmOTgJP3zFuQnAggggAACCCCAAAIVLnCGZyjci7KPp84YuGcNsv8N3qnls92mXlVfV7cSSz6hxZliIu0T0Mz312uJXtLA0REF6hbritCz2hL+vg7Evq9Y3L1Pk+9fYJ4+esUl6t7ysPYdiKlzzHQp33LT/jCpob6ntTtRp49ddH66mPC2ObNOi5YManfXv6buMuW97P6ctH/+hXlsl0BmKt3YKW/5IWbu6uXkT5cbu1z6zmNO9k5kY9/NPGN7kvB094Zy7y9i3yvtvlfwA17GF6s9n4wTqZ2p3OME23MH5/RdRav2uKBUw5Tx/ZPcGqHQv1FzsmeTCarBtPUcL7RA+rXRQybcFDRqCpuB0bGLjQ6ETZOCpil8yKTeGh4wPdGHTFso6J6XMFKTaQv3mIFhb8WTZqAnasJtTZn3gybUFjY9AyfHbCvY1mPcV9LtrzThgdfHbjj77HUzEF5pFNxkek662yjWp+Omp60hs9zpTL/d+Ar/l95+pm1/vyftXzYwHrwDgeL77DtolFURQACBaRZg7JpmYJpHAIFpESg2dp3hGYpJypjA+broY3UTLOT7pn/mQi1v+bK2PjMoMzqovugVOrZlhUK392a+8Z+thctb1Lq1K32NRd99uvLYXVoR+kZ5/95FqjcrFR54PXdGxnd2ZnDrcs0u1ONJ+1doJV5DAAEEEEAAAQQQQKCyBEpbUGiuGpubFHzh5zqYeNMnkdTI0SN6QRdr0fvHXm+QWigQVEPLDVq7ukGJX7ysY+MudD5bwYZr9JW1VymYOKKXj/nb9m3mjB5607AmWimg2Y2f0urgIT138HdjLwYfOaDty+rVHDk89vVCzU3av0Ir8RoCCCCAAAIIIIAAAvYLlLigCGj20i/qjiv26+bN39aBVFGR1Mjh3Vp//U4t6tigVQvPycwVblZ75+HMrWTd26z+WF0HpNabVqhe7ny1ei1r78zdJnYkrqe7+qXWL6i5/pySyAbqL9V1TYPa/cgPdDh1O9ohxTt36PZt/bn2Z1+mv7nvcv3w5q/p7gOJdPHg/sXt22/TRq3TnasWjr22IjsXeoL+lVg9FyyPEEAAAQQQQAABBBAor0DpD23dOyDdH9Wey3+j9ro/kOPM0Ky//pUu39OrJzcsTd3VKbDweu3su0kXPLFSs1J/q2KGZoWe0AXrH9Qd11yoQOAS3bDzUa2/4AmFZs1I/+2HWSv1xAU36ck7Pqv5pYo6sFCr7n1Yt2q7PpTazkqFh5t020MrfVk4W/Nb7lTvnst1rL1BM9x4M7H07V2nhsxdqHwraNL++RfmMQIIIIAAAggggAACFSzguFdsePE7jpO6TsB7zk8EbBdgn7U9Q8SHAAKFBBi7CqnwGgII2C5QbOwq1Xf9tvef+BBAAAEEEEAAAQQQQGAaBCgopgGVJhFAAAEEEEAAAQQQqBUBCopayTT9RAABBBBAAAEEEEBgGgQoKKYBlSYRQAABBBBAAAEEEKgVAQqKWsk0/UQAAQQQQAABBBBAYBoEKCimAZUmEUAAAQQQQAABBBCoFQEKilrJNP1EAAEEEEAAAQQQQGAaBCgopgGVJhFAAAEEEEAAAQQQqBUBCopayTT9RAABBBBAAAEEEEBgGgQoKKYBlSYRQAABBBBAAAEEEKgVAQqKWsk0/UQAAQQQQAABBBBAYBoEKCimAZUmEUAAAQQQQAABBBCoFQEKilrJNP1EAAEEEEAAAQQQQGAaBCgopgGVJhFAAAEEEEAAAQQQqBUBCopayTT9RAABBBBAAAEEEEBgGgQoKKYBlSYRQAABBBBAAAEEEKgVAQqKWsk0/UQAAQQQQAABBBBAYBoEKCimAZUmEUAAAQQQQAABBBCoFQEKilrJNP1EAAEEEEAAAQQQQGAaBCgopgGVJhFAAAEEEEAAAQQQqBUBCopayTT9RAABBBBAAAEEEEBgGgQoKKYBlSYRQAABBBBAAAEEEKgVAQqKWsk0/UQAAQQQQAABBBBAYBoEKCimAZUmEUAAAQQQQAABBBCoFQEKilrJNP2cmkDysCLNdXLqNis2lCyyzinFI6vkOI1qj50osoyUjEfU7Diqa49pqNhSbE8Snu7uUe79Rex7pd33in3Gy/V6teeTcSK1J5V7nGB77uBc5ccFJRqjHGOM8dpyHEe+p97L/ETAWgH2WWtTQ2AIIDCBAGPXBDi8hQAC1goUG7s4Q2FtyggMAQQQQAABBBBAAAH7BSgo7M8RESKAAAIIIIAAAgggYK0ABYW1qSEwBBBAAAEEEEAAAQTsF6CgsD9HRIgAAggggAACCCCAgLUCFBTWpobAEEAAAQQQQAABBBCwX4CCwv4cESECCCCAAAIIIIAAAtYKUFBYmxoCQwABBBBAAAEEEEDAfgEKCvtzRIQIIIAAAggggAACCFgrQEFhbWoIDAEEEEAAAQQQQAAB+wUoKOzPEREigAACCCCAAAIIIGCtAAWFtakhMAQQQAABBBBAAAEE7BegoLA/R0SIAAIIIIAAAggggIC1AhQU1qaGwBBAAAEEEEAAAQQQsF+AgsL+HBEhAggggAACCCCAAALWClBQWJsaAkMAAQQQQAABBBBAwH4BCgr7c0SECCCAAAIIIIAAAghYK0BBYW1qCAwBBBBAAAEEEEAAAfsFKCjszxERIoAAAggggAACCCBgrQAFhbWpITAEEEAAAQQQQAABBOwXoKCwP0dEiAACCCCAAAIIIICAtQIUFNamhsAQQAABBBBAAAEEELBfgILC/hwRIQIIIIAAAggggAAC1gpQUFibGgJDAAEEEEAAAQQQQMB+AQoK+3NEhAgggAACCCCAAAIIWCtAQWFtaggMAQQQQAABBBBAAAH7BSgo7M8RESKAAAIIIIAAAgggYK0ABYW1qSEwBBBAAAEEEEAAAQTsF6CgsD9HRIgAAggggAACCCCAgLUCFBTWpobAEEAAAQQQQAABBBCwX4CCwv4cESECCCCAAAIIIIAAAtYKOMYY40bnOI61QRIYAggggAACCCCAAAII2CGQKR+ywZzlPcp/w3udnwgggAACCCCAAAIIIIBAMQGmPBWT4XUEEEAAAQQQQAABBBCYVICCYlIiFkAAAQQQQAABBBBAAIFiAv8frrdkUNTTnowAAAAASUVORK5CYII="></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>Calculate the specific energy of hydrogen, stating its units. Refer to sections 1, 6 and 13 of the data booklet.</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>Hydrogen has a higher specific energy than petrol (gasoline) but is not used as a primary fuel source in cars. Discuss the disadvantages of using hydrogen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p> </p>
<p><em>Do <strong>not</strong> award marks for converse statements for advantage and disadvantage.</em></p>
<p><em>Points related to greenhouse gases should be counted <strong>only once</strong> for the entire question.</em></p>
<p><em>Biofuels:</em></p>
<p><em>Accept “«close to» carbon neutral”, “produce less greenhouse gases/CO<sub>2</sub>” as an advantage.</em></p>
<p><em>Accept “engines have to be modified if biodiesel used” as a disadvantage.</em></p>
<p><em>Fossil Fuels:</em></p>
<p><em>Accept specific pollution examples (eg, oil spills, toxic substances released when burning crude oil, etc.) as a disadvantage.</em></p>
<p><strong><em>[4 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«specific energy =» 142</p>
<p>kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>g<sup>–1</sup></p>
<p> </p>
<p><em>Accept other correct values with the correct corresponding units.</em></p>
<p><em>M2 can be scored independently.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>large volumes of hydrogen required<br><em><strong>OR</strong></em><br>hydrogen has lower energy density</p>
<p>not easily transportable «form» as it is a gas<br><em><strong>OR</strong></em><br>heavy containers required to carry <em><strong>AND</strong></em> compress/regulate «hydrogen»<br><em><strong>OR</strong></em><br>high energy/cost required to compress hydrogen to transportable liquid form<br><em><strong>OR</strong></em><br>atmospheric pollution may be generated during production of hydrogen<br><em><strong>OR</strong></em><br>hydrogen fuel cells do not work at very low temperatures<br><em><strong>OR</strong></em><br>highly flammable when compressed/difficult to extinguish fires<br><em><strong>OR</strong></em><br>leaks not easy to detect<br><em><strong>OR</strong></em><br>high cost of production<br><em><strong>OR</strong></em><br>lack of filling stations/availability to consumer «in many countries»</p>
<p> </p>
<p><em>Accept “«hydrogen combustion contributes to» knocking in engines” <strong>OR</strong> “modified engine required” for M2.</em></p>
<p><em>Accept “explosive” but not “more dangerous” for M2.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</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>CO<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 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>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p> </p>
<p><em>Accept “B” alone for incoming radiation from sun.</em></p>
<p><em>All three correct answers necessary for mark.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sub>2</sub>CO<sub>3</sub>(aq)</p>
<p> </p>
<p><em>State symbols <strong>AND</strong> equilibrium arrow required for mark.</em></p>
<p><em>Accept</em></p>
<p><em>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq).</em></p>
<p><em>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2H<sup>+</sup>(aq) + CO<sub>3</sub><sup>2–</sup>(aq).</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2H<sup>+</sup>(aq) + CO<sub>3</sub><sup>2–</sup>(aq)<br><em><strong>OR</strong></em><br>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq)<br><em><strong>OR</strong></em><br>H<sub>2</sub>CO<sub>3</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sub>3</sub>O<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq)<br><em><strong>OR</strong></em><br>H<sub>2</sub>CO<sub>3</sub>(aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq)<br><em><strong>OR</strong></em><br>H<sub>2</sub>CO<sub>3</sub>(aq) + 2H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2H<sub>3</sub>O<sup>+</sup>(aq) + CO<sub>3</sub><sup>2–</sup>(aq)<br><em><strong>OR</strong></em><br>H<sub>2</sub>CO<sub>3</sub>(aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> 2H<sup>+</sup>(aq) + CO<sub>3</sub><sup>2–</sup>(aq)</p>
<p>equilibrium shifts to the right causing increase in [H<sub>3</sub>O<sup>+</sup>]/[H<sup>+ </sup>] «thereby decreasing pH»</p>
<p> </p>
<p><em>Equilibrium sign needed in (b) (ii) but penalize missing equilibrium sign once only in b (i) and (ii).</em></p>
<p><em>Do <strong>not</strong> accept “CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sub>2</sub>CO<sub>3</sub>(aq)” unless equation was not given in b (i).</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C(s) + H<sub>2</sub>O(g) → CO(g) + H<sub>2</sub>(g)<br><em><strong>OR</strong></em><br>3C(s) + H<sub>2</sub>O(g) + O<sub>2</sub>(g) → 3CO(g) + H<sub>2</sub>(g)<br><em><strong>OR</strong></em><br>4C(s) + 2H<sub>2</sub>O(g) + O<sub>2</sub>(g) → 4CO(g) + 2H<sub>2</sub>(g)<br><em><strong>OR</strong></em><br>5C(s) + H<sub>2</sub>O(g) + 2O<sub>2</sub>(g) → 5CO(g) + H<sub>2</sub>(g)</p>
<p> </p>
<p><em>Accept other correctly balanced equations which produce both CO <strong>AND</strong> H<sub>2</sub>.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>8CO(g) + 17H<sub>2</sub>(g) → C<sub>8</sub>H<sub>18</sub>(l) + 8H<sub>2</sub>O(g)</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>coal more plentiful than crude oil<br><em><strong>OR</strong></em><br>syngas can be produced from biomass/renewable source<br><em><strong>OR</strong></em><br>syngas can undergo liquefaction to form octanes/no need to transport crude<br><em><strong>OR</strong></em><br>syngas can be produced by gasification underground, using carbon<br><em><strong>OR</strong></em><br>capture/storage «to not release CO<sub>2</sub> to the atmosphere»<br><em><strong>OR</strong></em><br>coal gasification produces other usable products/slag</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">c.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>One suggestion for the reduction of carbon footprints is the use of biofuels, such as vegetable oils, as a substitute for petroleum based fuels.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the major technical problem affecting the direct use of vegetable oils as fuels in internal combustion engines and the chemical conversion that has overcome this.</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 the formula of a fuel that might be produced from the vegetable oil whose formula is shown.</p>
<p> <img src="data:image/png;base64,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"></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>Outline why biofuels are considered more environmentally friendly, even though they produce more carbon dioxide per kJ of energy than petroleum based fuels.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>viscosity <strong>«</strong>of vegetable oils is too high<strong>»</strong></p>
<p> </p>
<p>transesterification</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>conversion into<strong>» </strong>alkyl/methyl/ethyl esters</p>
<p> </p>
<p><em><strong>[2 marks]</strong></em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>R–CO–O–CH<sub>3</sub>/RCOOMe</p>
<p><strong><em>OR</em></strong></p>
<p>R–CO–O–C<sub>2</sub>H<sub>5</sub>/RCOOEt</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong>growing oil producing<strong>» </strong>plants absorbs carbon dioxide from the atmosphere</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>combustion of<strong>» </strong>petroleum based fuels releases carbon stored <strong>«</strong>for millions of years<strong>»</strong></p>
<p> </p>
<p><em>Accept “biofuels renewable” </em><strong><em>OR</em></strong><em> “petroleum based fuels non-renewable”.</em></p>
<p><em>Accept “waste vegetable oils can be </em><em>converted to biofuels/biodiesel”.</em></p>
<p><em>Accept “biofuels do not contain sulfur”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Greenhouse gases absorb infrared radiation.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify one naturally occurring greenhouse gas, other than carbon dioxide or water vapour, and its natural source.</p>
<p><img src="data:image/png;base64,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"></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>Formulate an equation that shows how aqueous carbon dioxide produces hydrogen ions, H<sup>+</sup>(aq).</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>The concentrations of oxygen and nitrogen in the atmosphere are much greater than those of greenhouse gases. Outline why these gases do not absorb infrared radiation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="images/Schermafbeelding_2018-08-09_om_18.35.29.png" alt="M18/4/CHEMI/SP3/ENG/TZ1/09.a/M"></p>
<p> </p>
<p><em>Accept “nitrous oxide”.</em></p>
<p><em>Accept “electrical discharges/lightning”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq)</p>
<p><strong><em>OR</em></strong></p>
<p>CO<sub>2</sub>(aq) + H<sub>2</sub>O(l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sub>2</sub>CO<sub>3</sub>(aq) <strong><em>AND </em></strong>H<sub>2</sub>CO<sub>3</sub>(aq) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup>(aq) + HCO<sub>3</sub><sup>–</sup>(aq)</p>
<p> </p>
<p><em>Accept CO</em><sub><em>2</em></sub><em>(aq) +</em><em> </em><em>H</em><sub><em>2</em></sub><em>O(l) </em><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span><em> 2H<sup>+</sup></em><em>(aq) </em><em>+ </em><em>CO</em><em><sub>3</sub><sup>2–</sup></em><em>(aq).</em></p>
<p><em>Accept equations with single arrow.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>no change in polarity/dipole <strong>«</strong>moment when molecule vibrates<strong>»</strong></p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “non-polar” or “no dipole </em><em>moment” – idea of change must be </em><em>there.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Carbon dioxide is a product of the combustion of petrol.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the molecular mechanism by which carbon dioxide acts as a greenhouse gas.</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>Discuss the significance of <strong>two </strong>greenhouse gases, other than carbon dioxide, in causing global warming or climate change.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any three of:</em></p>
<p>IR/long wavelength/low frequency radiation radiated/emitted by the Earth’s <strong>«</strong>surface absorbed in the bonds<strong>»</strong></p>
<p> </p>
<p>bond length/C=O changes</p>
<p><strong><em>OR</em></strong></p>
<p>«asymmetric» stretching of bonds</p>
<p><strong><em>OR</em></strong></p>
<p>bond angle/OCO changes</p>
<p> </p>
<p>polarity/dipole «moment» changes</p>
<p><strong><em>OR</em></strong></p>
<p>dipole «moment» created «when molecule absorbs IR»</p>
<p> </p>
<p><strong>«</strong>some of<strong>» </strong>energy is then re-radiated towards <strong>«</strong>the surface of the<strong>» </strong>Earth</p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept terms such as </em><em>“reflect” </em><strong><em>OR </em></strong><em>“bounced” </em><strong><em>OR </em></strong><em>“trapped”</em><em>.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>H<sub>2</sub>O <strong><em>AND </em></strong><strong>«</strong>relatively<strong>» </strong>greater abundance/stable concentration/less effective at absorbing radiation/lower GWP so not much overall effect on global warming/climate change</p>
<p>CH<sub>4</sub>/N<sub>2</sub>O/CFCs/SF<sub>6</sub>/O<sub>3</sub>/HCFCs <strong><em>AND </em></strong>more effective <strong>«</strong>than CO<sub>2</sub><strong>» </strong>at absorbing radiation/higher GWP so could contribute to global warming/climate change</p>
<p>PFCs/SF<sub>6</sub>/NF<sub>3</sub>/Some CFCs <strong><em>AND </em></strong>have very long life in atmosphere so could contribute <strong>«</strong>in the future<strong>» </strong>to global warming/climate change</p>
<p> </p>
<p><em>Accept names or formulas.</em></p>
<p><em>Accept two different gases with the same </em><em>effect for </em><strong><em>[2]</em></strong><em>.</em></p>
<p><em>Award </em><strong><em>[1 max] </em></strong><em>for identifying the </em><em>names/formulas of two greenhouse </em><em>gases.</em></p>
<p><em>Accept “greenhouse factor” for “GWP” </em><em>but </em><strong><em>not </em></strong><em>just “greenhouse effect”.</em></p>
<p><em>For M3, do </em><strong><em>not </em></strong><em>allow “CFC” alone as </em><em>only some have long lifetimes (eg, CFC-</em><em>115, CFC-113).</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Nuclear power is another source of energy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare and contrast the process of nuclear fusion with nuclear fission.</p>
<p> </p>
<p><img 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"></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>Dubnium-261 has a half-life of 27 seconds and rutherfordium-261 has a half-life of 81 seconds.</p>
<p>Estimate what fraction of the dubnium-261 isotope remains in the same amount of time that <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{3}{4}">
<mfrac>
<mn>3</mn>
<mn>4</mn>
</mfrac>
</math></span> of rutherfordium-261 decays.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Award </em><strong><em>[1] </em></strong><em>for one similarity:</em></p>
<p>both increase binding energy/energy yield <strong>«</strong>per nucleon<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>mass loss/defect in both <strong>«</strong>nuclear<strong>» </strong>reactions/mass converted to energy <strong>«</strong>from <em>E =</em> <em>mc</em><sup>2</sup><strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>both produce ionizing radiation</p>
<p> </p>
<p><em>Award </em><strong><em>[2 max] </em></strong><em>for any two differences:</em></p>
<p>in fusion, light nuclei combine to form heavier ones <strong><em>AND </em></strong>in fission, heavier nuclei split into lighter ones</p>
<p>fission produces radioactive/nuclear waste <strong><em>AND </em></strong>fusion does not</p>
<p> </p>
<p>fission is caused by bombarding with a neutron <strong>«</strong>or by spontaneous fission<strong>» </strong><strong><em>AND</em></strong> fusion does not</p>
<p><strong><em>OR</em></strong></p>
<p>fission can initiate a chain reaction <strong><em>AND </em></strong>fusion does not</p>
<p> </p>
<p>fusion releases more energy per unit mass of fuel than fission</p>
<p>fuel is easier to obtain/cheaper for fusion reactions</p>
<p>fission reactions can be controlled in a power plant <strong><em>AND </em></strong>fusion cannot <strong>«</strong>yet<strong>»</strong></p>
<p>fusion reactor less likely to cause a large-scale technological disaster compared to fission</p>
<p>fusion less dangerous than fission as radioactive isotopes produced have short half-lives so only cause a threat for a relatively short period of time</p>
<p>fusion is in experimental development <strong><em>AND </em></strong>fission used commercially</p>
<p> </p>
<p><em>Accept “small nuclei” </em><strong><em>OR </em></strong><em>“smaller </em><em>atomic masses of nuclei” for “light </em><em>nuclei” </em><strong><em>AND </em></strong><em>“large nuclei” </em><strong><em>OR </em></strong><em>“greater </em><em>atomic masses of nuclei” for “heavier </em><em>nuclei”.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “no/less waste </em><em>produced for fusion”.</em></p>
<p><em>Accept “higher specific energy for </em><em>fusion”.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{64}}">
<mfrac>
<mn>1</mn>
<mrow>
<mn>64</mn>
</mrow>
</mfrac>
</math></span>/<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{{2^6}}}">
<mfrac>
<mn>1</mn>
<mrow>
<mrow>
<msup>
<mn>2</mn>
<mn>6</mn>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span>/0.016</p>
<p> </p>
<p><em>Accept “1.6%”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Nuclear fission of <sup>235</sup>U is one source of electrical energy that has a minimal carbon footprint.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Natural uranium needs to be enriched to increase the proportion of <sup>235</sup>U. Suggest a technique that would determine the relative abundances of <sup>235</sup>U and <sup>238</sup>U.</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>Explain how <sup>235</sup>U fission results in a chain reaction, including the concept of critical mass.</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>Suggest one reason why there is opposition to the increased use of nuclear fission reactors.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>mass spectrometry/mass spectroscopy/MS</p>
<p> </p>
<p><em>Accept “analysis of radiation emitted”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>critical mass: </em>mass required so that <strong>«</strong>on average<strong>» </strong>each fission/reaction results in a further fission/reaction</p>
<p><em>Any two for </em><strong><em>[2 max]</em></strong><em>:</em></p>
<p>neutron captured by <strong>«</strong><sup>235</sup>U<strong>» </strong>nucleus</p>
<p>fission/reaction produces many neutrons/more than one neutron</p>
<p>if these cause further fission/reaction a chain reaction occurs</p>
<p> </p>
<p><em>Accept “minimum mass of fuel needed </em><em>for the reaction to be self-sustaining”.</em></p>
<p><em>Accept answers in the form of suitable </em><em>diagrams/equations.</em></p>
<p><strong><em>[3 marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>produce long lived/long half-life radioisotopes/radioactivity</p>
<p><strong><em>OR</em></strong></p>
<p>could be used to produce nuclear weapons</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>nuclear<strong>» </strong>accidents/meltdowns can occur</p>
<p> </p>
<p><em>Accept “long lived/long half-life </em><em>radioactive waste”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>In the 20th Century, both fission and fusion were considered as sources of energy but fusion was economically and technically unattainable.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare and contrast fission and fusion in terms of binding energy and the types of nuclei involved.</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>Suggest <strong>two</strong> advantages that fusion has over fission.</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>The amount of <sup>228</sup>Ac in a sample decreases to one eighth <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\left( {\frac{1}{8}} \right)">
<mrow>
<mo>(</mo>
<mrow>
<mfrac>
<mn>1</mn>
<mn>8</mn>
</mfrac>
</mrow>
<mo>)</mo>
</mrow>
</math></span> of its original value in about 18 hours due to β-decay. Estimate the half-life of <sup>228</sup>Ac.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Fission:</em> heavy nuclei <em><strong>AND</strong> Fusion:</em> light nuclei</p>
<p>both increase in binding energy/energy yield «per nucleon»</p>
<p><em>Accept “large nuclei” <strong>OR</strong> “greater atomic masses of nuclei” for fission <strong>AND</strong> “small nuclei” <strong>OR</strong> “smaller atomic masses of nuclei” for fusion.</em></p>
<p><em>Award <strong>[1 max]</strong> for “Fission: heavy nuclei <strong>AND</strong> increase in binding energy «per nucleon»” <strong>OR</strong> “Fusion: light nuclei <strong>AND</strong> increase in binding energy” «per nucleon»”.</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>no/less radioactive waste produced</p>
<p>abundance/low cost of fuel</p>
<p>larger amounts of energy released per unit mass</p>
<p>does not require a critical mass</p>
<p>can be used continuously</p>
<p>fusion reactor less likely to cause large-scale technological disaster</p>
<p><em>Do <strong>not</strong> accept "no/less waste produced".</em></p>
<p><em>Accept “higher specific energy”.</em></p>
<p><strong><em>[Max 2 Marks]</em></strong></p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>6 «hours»</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The increased concentration of carbon dioxide in the atmosphere is thought to result from the increased combustion of fossil fuels such as petroleum.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify an element, other than carbon and hydrogen, found at significant concentrations in fossil fuels.</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>Petroleum contains many hydrocarbons. Explain how these are separated by fractional distillation.</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>Determine the specific energy and energy density of petrol (gasoline), using data from sections 1 and 13 of the data booklet. Assume petrol is pure octane, C<sub>8</sub>H<sub>18</sub>. Octane: molar mass = 114.26 g mol<sup>−1</sup>, density = 0.703 g cm<sup>−3</sup>.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the energy available from an engine will be less than these theoretical values.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>nitrogen/N</p>
<p><strong><em>OR</em></strong></p>
<p>oxygen/O</p>
<p><strong><em>OR</em></strong></p>
<p>sulfur/S</p>
<p> </p>
<p><em>Accept “phosphorus/P”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Any three of:</em></p>
<p>different molar masses</p>
<p><strong><em>OR</em></strong></p>
<p>different strengths of intermolecular forces</p>
<p> </p>
<p>different boiling points</p>
<p>temperature in <strong>«</strong>fractionating<strong>» </strong>column decreases upwards</p>
<p> </p>
<p><strong>«</strong>components<strong>» </strong>condense at different temperatures/heights</p>
<p><strong><em>OR</em></strong></p>
<p><strong>«</strong>component with<strong>» </strong>lower boiling point leaves column first</p>
<p> </p>
<p><em><strong>[3 marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>specific energy </em><strong>«</strong>= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{energy released}}}}{{{\text{mass consumed}}}}">
<mfrac>
<mrow>
<mrow>
<mtext>energy released</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>mass consumed</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{5470{\text{ kJ mo}}{{\text{l}}^{ - 1}}}}{{114.26{\text{ g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>5470</mn>
<mrow>
<mtext> kJ mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>114.26</mn>
<mrow>
<mtext> g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span><strong>» </strong>= 47.9 <strong>«</strong>kJ g<sup>–1</sup><strong>»</strong></p>
<p><em>energy density </em><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{energy released}}}}{{{\text{volume consumed}}}}">
<mfrac>
<mrow>
<mrow>
<mtext>energy released</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>volume consumed</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> = specific energy × density = 47.9 kJ g<sup>–1</sup> × 0.703 g cm<sup>–3</sup><strong>» </strong>= 33.7 <strong>«</strong>kJ cm<sup>–3</sup> <strong>»</strong></p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “–47.9 </em><strong><em>«</em></strong><em>kJ g</em><sup><em>–</em><em>1</em></sup><strong><em>»</em></strong><em>”.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “–33.7 </em><strong><em>«</em></strong><em>kJ cm</em><sup><em>–</em><em>3</em></sup><strong><em>»</em></strong><em>” unless </em><em>“–47.9 </em><strong><em>«</em></strong><em>kJ g</em><sup><em>–</em><em>1</em></sup><strong><em>»</em></strong><em>” already penalized.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>energy is lost <strong>«</strong>to the surroundings<strong>» </strong>as heat/sound/friction</p>
<p><strong><em>OR</em></strong></p>
<p>energy is lost to the surroundings <strong>«</strong>as heat/sound/friction<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>incomplete combustion</p>
<p> </p>
<p><em>Do </em><strong><em>not </em></strong><em>accept just “energy is lost”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Crude oil is a useful energy resource.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline <strong>two </strong>reasons why oil is one of the world’s significant energy sources.</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>Formulate an equation for the cracking of C<sub>16</sub>H<sub>34</sub> into two products with eight carbon atoms each.</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>Identify, giving a reason, which product in (b)(i) could be used in petrol (gasoline).</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 higher octane fuels help eliminate “knocking” in engines.</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 performance of hydrocarbons as fuels can be improved by catalytic reforming.</p>
<p>Outline how catalytic reforming increases a fuel’s octane rating.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>high energy content/high energy density/high specific energy</p>
<p><strong><em>OR</em></strong></p>
<p>high enthalpy of combustion/very exothermic enthalpy of combustion</p>
<p> </p>
<p>shortage of alternatives</p>
<p><strong><em>OR</em></strong></p>
<p>alternatives are expensive</p>
<p><strong><em>OR</em></strong></p>
<p>oil is relatively cheap</p>
<p><strong><em>OR</em></strong></p>
<p>oil is <strong>«</strong>still<strong>» </strong>abundant/common</p>
<p> </p>
<p>well-established technology</p>
<p><strong><em>OR</em></strong></p>
<p>easy for consumers to obtain</p>
<p><strong><em>OR</em></strong></p>
<p>commonly used</p>
<p> </p>
<p>easy to store</p>
<p><strong><em>OR</em></strong></p>
<p>easy to transport</p>
<p><strong><em>OR</em></strong></p>
<p>easy to extract</p>
<p> </p>
<p>produces energy at a reasonable rate</p>
<p> </p>
<p><em>Accept “high potential energy” for M1.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C<sub>16</sub>H<sub>34</sub>(g) → C<sub>8</sub>H<sub>16</sub>(g) + C<sub>8</sub>H<sub>18</sub>(g)</p>
<p><strong><em>OR</em></strong></p>
<p>C<sub>16</sub>H<sub>34</sub>(g) + H<sub>2</sub>(g) → 2 C<sub>8</sub>H<sub>18</sub>(g)</p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>C<sub>8</sub>H<sub>18</sub> <strong><em>AND </em></strong>is an alkane</p>
<p><strong><em>OR</em></strong></p>
<p>C<sub>8</sub>H<sub>18</sub> <strong><em>AND </em></strong>petrol does not contain alkenes</p>
<p> </p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fuels can be compressed more without undergoing <strong>«</strong>unwanted<strong>» </strong>auto-ignition</p>
<p> </p>
<p><em>Accept “burns smoother without </em><em>undergoing </em><strong><em>«</em></strong><em>unwanted</em><strong><em>» </em></strong><em>auto-ignition” </em><strong><em>OR </em></strong><em>“fuel does not auto-ignite”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>produces more branched chain hydrocarbons <strong>«</strong>with higher octane rating<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>produces aromatics <strong>«</strong>which have higher octane rating<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>produces cyclohexanes <strong>«</strong>which have higher octane rating<strong>»</strong></p>
<p> </p>
<p> </p>
<p><em>Accept “increase branches”.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>accept “produces benzene”.</em></p>
<p><em>Do </em><strong><em>not </em></strong><em>penalize for “benzene” if penalty </em><em>applied in 2.b.iii.</em></p>
<p><em>Accept “produces cyclic structures”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">c.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Solar energy, which is freely available, is indispensable to life on earth.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest another advantage and one disadvantage of solar energy.</p>
<p><img src="data:image/png;base64,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"></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>Light can be absorbed by chlorophyll and other pigments.</p>
<p>Consider molecules <strong>A</strong> and <strong>B</strong> represented below.</p>
<p style="text-align: center;"><img 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"></p>
<p>Identify, with a reason, the molecule that absorbs visible light.</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>State a physical property of vegetable oils that makes them very difficult to use as fuel in internal combustion engines.</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>Describe how vegetable oils can be converted to a more suitable fuel.</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>Contrast the importance of carbon dioxide and methane as greenhouse gases.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain, using an equation, the effect of increased carbon dioxide in the atmosphere on the pH of lake water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Advantage:</em></p>
<p>renewable «energy source»</p>
<p><em><strong>OR</strong></em></p>
<p>does not produce greenhouse gases</p>
<p><em><strong>OR</strong></em></p>
<p>can be installed «almost» anywhere</p>
<p><em><strong>OR</strong></em></p>
<p>low maintenance costs ✔</p>
<p> </p>
<p><em>Disadvantage:</em></p>
<p>widely dispersed/not concentrated «form of energy»</p>
<p><em><strong>OR</strong></em></p>
<p>geography/weather/seasonal dependent</p>
<p><em><strong>OR</strong></em></p>
<p>not available at night</p>
<p><em><strong>OR</strong></em></p>
<p>energy storage is difficult/expensive</p>
<p><em><strong>OR</strong></em></p>
<p>toxic/hazardous materials used in production</p>
<p><em><strong>OR</strong></em></p>
<p>concerns about space/aesthetics/local environment where installed</p>
<p><em><strong>OR</strong></em></p>
<p>need to be «constantly» cleaned ✔</p>
<p> </p>
<p><em>Accept “can be used for passive/active heating”, “can be converted to electric energy”.</em></p>
<p><em>Accept any specific greenhouse gas name or formula for “greenhouse gases”.</em></p>
<p><em>Accept “solar cells require large areas”, “solar cell manufacture produces pollution/greenhouse gases”, “higher cost of solar cells «compared with traditional sources such as fossil fuels or hydroelectric»”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>B <strong><em>AND</em> </strong>larger/more extensive «electronic» conjugation</p>
<p><em><strong>OR</strong></em></p>
<p>B <strong><em>AND</em> </strong>«contains» more alternate single and double bonds ✔</p>
<p> </p>
<p><em>Accept more specific statements, such as “sp<sup>3</sup> carbon in A prevents conjugation between aromatic rings”.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>high viscosity ✔</p>
<p> </p>
<p><em>Accept “low volatility”, just “viscous/viscosity” <strong>OR</strong> “does not flow easily”.</em></p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>convert to esters of monoatomic alcohols</p>
<p><em><strong>OR</strong></em></p>
<p>react with short-chain alcohols «in the presence of acid or base» ✔</p>
<p> </p>
<p><em>Accept “convert to shorter «carbon chain» esters” <strong>OR</strong> “transesterification”.</em></p>
<p><em>Accept specific alcohols, such as methanol or ethanol.</em></p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>carbon dioxide/CO<sub>2</sub> more/most abundant «GHG than methane/CH<sub>4</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>carbon dioxide/CO<sub>2</sub> has «much» longer atmospheric life «than methane/CH<sub>4</sub>» ✔</p>
<p> </p>
<p>methane/CH<sub>4</sub> «much» better/more effective at absorbing IR radiation «than carbon dioxide/CO<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>methane/CH<sub>4</sub> has a greater greenhouse factor «than carbon dioxide/CO<sub>2</sub>»</p>
<p><em><strong>OR</strong></em></p>
<p>methane/CH<sub>4</sub> has a greater global warming potential/GWP «than carbon dioxide/CO<sub>2</sub>» ✔</p>
<p> </p>
<p><em>Accept “carbon dioxide/CO<sub>2</sub> contributes more to global warming «than methane/CH<sub>4</sub>»”.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>CO<sub>2</sub> (g) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>–</sup> (aq)</p>
<p><em><strong>OR</strong></em></p>
<p>CO<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> CO<sub>2</sub> (aq) <em><strong>AND </strong></em>CO<sub>2</sub> (aq) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>–</sup> (aq) ✔</p>
<p>«increasing [CO<sub>2</sub> (g)]» shifts equilibrium/reaction to right <em><strong>AND</strong> </em>pH decreases ✔</p>
<p> </p>
<p><em>Accept “H<sub>2</sub>CO<sub>3</sub> (aq)” for “CO<sub>2</sub> (aq) + H<sub>2</sub>O (l)”.</em></p>
<p><em>Equilibrium arrows required for M1.</em></p>
<p><em>State symbols required for CO<sub>2</sub> (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> CO<sub>2</sub> (aq) equation only for M1.</em></p>
<p><em>Accept “concentration of H<sup>+</sup>/[H<sup>+</sup>] increases <strong>AND</strong> pH decreases” for M2.</em></p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>The Sun’s energy is produced by the fusion of hydrogen nuclei.</p>
</div>
<div class="specification">
<p>Uranium-238 produces plutonium-239, which is used as fuel in breeder reactors.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain fusion reactions with reference to binding energy.</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>Outline why the term breeder is used for the reactors.</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 fission reaction when <sup>239</sup>Pu is bombarded with a neutron to produce <sup>133</sup>Xe and <sup>103</sup>Zr.</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>Nuclear disasters release radioactive caesium into the atmosphere, which presents serious health risks.</p>
<p>Cs-137 has a half-life of 30 years.</p>
<p>Calculate the percentage of Cs-137 remaining in the atmosphere after 240 years.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>small/lighter <span style="text-decoration: underline;">nuclei </span>combine to form larger/heavier <span style="text-decoration: underline;">nuclei </span>✔</p>
<p>product has higher binding energy «per nucleon» ✔</p>
<p> </p>
<p><em>Accept binding energy curve with explanation.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>converts non-fissile «<sup>238</sup>U» material into fissile «<sup>239</sup>Pu» material</p>
<p><em><strong>OR</strong></em></p>
<p>produces more fissile material than it consumes ✔</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><sup>239</sup>Pu + <sup>1</sup>n → <sup>133</sup>Xe + <sup>103</sup>Zr + 4<sup>1</sup>n ✔</p>
<p> </p>
<p><em>Accept equation with correct atomic numbers included.</em></p>
<p><em>Accept notation for neutrons of “n”.</em></p>
<p><em>Accept a correctly described equation in words.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{240}}{{30}} = ">
<mfrac>
<mrow>
<mn>240</mn>
</mrow>
<mrow>
<mn>30</mn>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 8 <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{t_{\frac{1}{2}}}">
<mrow>
<msub>
<mi>t</mi>
<mrow>
<mfrac>
<mn>1</mn>
<mn>2</mn>
</mfrac>
</mrow>
</msub>
</mrow>
</math></span>/8 half-lives «required» ✔</p>
<p>% remaining = «0.50<sup>8</sup> × 100 =» 0.39 «%» ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>λ = «<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{0.693}}{{30}} = ">
<mfrac>
<mrow>
<mn>0.693</mn>
</mrow>
<mrow>
<mn>30</mn>
</mrow>
</mfrac>
<mo>=</mo>
</math></span>» 0.023 ✔</p>
<p>% remaining = «100 × e<sup>–0.023 × 240</sup> =» 0.39 «%» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Coal can be converted to clean-burning synthetic natural gas.</p>
</div>
<div class="specification">
<p>Automobile companies use hydrogen as an alternative to fossil fuels. Some properties of fuels are shown.</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>Formulate equation(s) for the conversion of coal and steam to methane.</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>Calculate the specific energy, in kJ g<sup>−1</sup>, of methane.</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>Comment on the specific energies of hydrogen and methane.</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>Calculate the mass, in kg, of carbon dioxide produced by the complete combustion of 72.0 dm<sup>3</sup> octane, C<sub>8</sub>H<sub>18</sub>.</p>
<p>Density of C<sub>8</sub>H<sub>18 </sub>= 703 g dm<sup>−3</sup></p>
<p>C<sub>8</sub>H<sub>18</sub> (l) + 12.5O<sub>2</sub> (g) → 8CO<sub>2</sub> (g) + 9H<sub>2</sub>O (g)</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em><strong>ALTERNATIVE 1:</strong></em></p>
<p>2C (s) + 2H<sub>2</sub>O (g) → CH<sub>4</sub> (g) + CO<sub>2</sub> (g) ✔</p>
<p> </p>
<p><em><strong>ALTERNATIVE 2:</strong></em></p>
<p>C (s) + 2H<sub>2</sub>O (g) → CO (g) + H2 (g) <em><strong>AND</strong> </em>3H<sub>2</sub> (g) + CO (g) → CH<sub>4</sub> (g) + H<sub>2</sub>O (g) ✔</p>
<p> </p>
<p><em>Accept “3C (s) + 2H<sub>2</sub>O (g) → CH<sub>4</sub> (g) + 2CO (g)”.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{891\,\,{\text{kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}{{16.05\,{\text{g}}\,{\text{mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>891</mn>
<mspace width="thinmathspace"></mspace>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>kJ</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>16.05</mn>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>g</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 55.5 «kJ g<sup>–1</sup>» ✔</p>
<p> </p>
<p><em>Do <strong>not</strong> penalize negative sign.</em></p>
<p><em>Do <strong>not</strong> accept energy density at STP/density at STP =<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{39.3}}{{0.707}}">
<mfrac>
<mrow>
<mn>39.3</mn>
</mrow>
<mrow>
<mn>0.707</mn>
</mrow>
</mfrac>
</math></span> = 55.06 «kJ g<sup>–1</sup>».</em></p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{141.6}}{{55.5}}">
<mfrac>
<mrow>
<mn>141.6</mn>
</mrow>
<mrow>
<mn>55.5</mn>
</mrow>
</mfrac>
</math></span>» hydrogen/H<sub>2</sub> produces 2.6 times/more than twice the energy of methane/CH<sub>4</sub> «per mass/g»</p>
<p><em><strong>OR</strong></em></p>
<p>less mass of hydrogen/H<sub>2</sub> required «to produce same amount of energy»</p>
<p><em><strong>OR</strong></em></p>
<p>hydrogen/H<sub>2</sub> more energy efficient ✔</p>
<p> </p>
<p><em>Accept “hydrogen/H<sub>2</sub> produces «nearly» three times more energy than methane/CH<sub>4</sub> «per mass/g»”.</em></p>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>m</em><sub>octane</sub> «= 72.0 dm<sup>3</sup> × 703 g dm<sup>–3</sup>» = 50600 «g»/50.6 «kg» ✔</p>
<p><em>m</em><sub>carbon dioxide</sub> «= <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{8 \times 44.01}}{{114.26}} \times 50.6">
<mfrac>
<mrow>
<mn>8</mn>
<mo>×</mo>
<mn>44.01</mn>
</mrow>
<mrow>
<mn>114.26</mn>
</mrow>
</mfrac>
<mo>×</mo>
<mn>50.6</mn>
</math></span>» = 156 «kg» ✔</p>
<p> </p>
<p><em>Award <strong>[2]</strong> for correct final answer.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Carbon dioxide and water vapour are greenhouse gases produced by the combustion of fossil fuels.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the effect of the increasing concentration of atmospheric carbon dioxide on the acidity of oceans.</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) Describe the changes that occur at the molecular level when atmospheric carbon dioxide gas absorbs infrared radiation emitted from the Earth’s surface.</p>
<p>(ii) Other than changes to the acidity of oceans, suggest why the production of carbon dioxide is of greater concern than the production of water vapour.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Any two of:</em></p>
<p>CO<sub>2 </sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\mathop \rightleftharpoons \limits^{{{\text{H}}_{\text{2}}}{\text{O}}\,{\text{(l)}}} ">
<mover>
<mrow>
<mo stretchy="false">⇌</mo>
</mrow>
<mrow>
<mrow>
<msub>
<mrow>
<mtext>H</mtext>
</mrow>
<mrow>
<mtext>2</mtext>
</mrow>
</msub>
</mrow>
<mrow>
<mtext>O</mtext>
</mrow>
<mspace width="thinmathspace"></mspace>
<mrow>
<mtext>(l)</mtext>
</mrow>
</mrow>
</mover>
</math></span> CO<sub>2 </sub>(aq) </p>
<p>CO<sub>2 </sub>(aq) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
<mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>–</sup> (aq)<br><em><strong>OR<br></strong></em>HCO<sub>3</sub><sup>–</sup> <em><strong>AND</strong></em> H<sup>+</sup> are formed «by dissolved CO<sub>2</sub>»</p>
<p>«increasing [CO<sub>2</sub>]» shifts equilibrium to right/increases acidity/decreases pH</p>
<p><em>H<sub>2</sub>O (l) not required over equilibrium sign for M1.</em></p>
<p><em>State symbols required in the equation in M1.</em></p>
<p><em>Accept “H<sub>2</sub>CO<sub>3</sub> ” at either side of the equilibrium in M2. </em></p>
<p><em>Equilibrium sign required for M1 but <strong>not</strong> for M2.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>i</p>
<p>bond length/C=O changes<br><em><strong>OR<br></strong></em>«asymmetric» stretching «of bonds»<br><em><strong>OR<br></strong></em>bond angle/OCO changes</p>
<p><em>Accept “molecule bends” for M1.<br>Accept appropriate diagrams</em></p>
<p>photon re-emitted in random direction<br><em><strong>OR<br></strong></em>polarity/dipole «moment» changes<br><em><strong>OR<br></strong></em>dipole «moment» created «when molecule absorbs IR» </p>
<p> </p>
<p>ii</p>
<p>CO<sub>2</sub> gas «ten times» more effective as greenhouse gas/GHG than H<sub>2</sub>O<br><em><strong>OR<br></strong></em>CO<sub>2</sub> gas levels keep increasing «unlike H<sub>2</sub>O»<br><em><strong>OR<br></strong></em>CO<sub>2</sub> has higher Global Warming Potential/GWP than H<sub>2</sub>O<br><em><strong>OR<br></strong></em>CO<sub>2</sub> stays in the atmosphere for longer than H<sub>2</sub>O </p>
<p><em>Accept converse arguments.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Vegetable oils can be used as a source of energy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the structural feature of chlorophyll that enables it to absorb visible light.</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>Vegetable oils are too viscous for use as liquid fuels. Describe, using an equation, how a vegetable oil, such as that shown, is converted to oils with lower viscosity by reaction with methanol, CH<sub>3</sub>OH.</p>
<p><img 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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>«extensive» conjugation</p>
<p><em><strong>OR</strong></em></p>
<p>alternating single and double bonds</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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"></p>
<p>ester product</p>
<p>glycerol <em><strong>AND</strong> </em>correct balancing</p>
<p><em>Catalyst not required for equation.</em></p>
<p><em>Award M2 only if M1 is correct.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Octane number is a measure of the performance of engine fuel.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Suggest why a high-octane number fuel is preferable.</span></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><span style="background-color: #ffffff;">Reforming reactions are used to increase the octane number of a hydrocarbon fuel.</span></p>
<p><span style="background-color: #ffffff;">Suggest the structural formulas of <strong>two</strong> possible products of the reforming reaction of heptane, C<sub>7</sub>H<sub>16</sub>.</span></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><span style="background-color: #ffffff;">The <sup>1</sup>H NMR spectrum of one of the products has four signals. The integration trace shows a ratio of the areas under the signals of 9 : 3 : 2 : 2.</span></p>
<p><span style="background-color: #ffffff;">Deduce the structural formula of the product.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">b(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">low knocking/auto-ignition<br><em>NOTE: Do <strong>not</strong> accept “pre-ignition”.</em><br><em><strong>OR</strong></em><br>more efficient fuel<br><em>NOTE: Accept “less CO<sub>2</sub> emissions since knocking engine uses more fuel «to produce the same power»”.</em><br><em><strong>OR</strong></em><br>high compression<br><em><strong>OR</strong></em><br>more power extracted<br><em><strong>OR</strong> <br></em>more air going into engine / turbocharging<br><em><strong>OR</strong></em><br>less engine damage ✔</span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><span style="background-color: #ffffff;">Any two of:</span></em></p>
<p><em><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAscAAALACAYAAAB/89+WAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAIeDSURBVHhe7d0NfFTVgf//b4K12kak2N06AVqqmGAXumoQq9I2JBK0LMKGAoqSaFKF+myWJELpan8qSMIfV8Vf8SFTHqxPmPxAtEps0nSL3YqJ0OIWkuXnDwtkaH0EUgU0c//3TM6EEJKQh0kyD5+3r+vMnLkZ5s7cOfc7Z845N85xCQAAAIDi7SUAAAAQ8wjHAAAAgEU4BgAAACzCMQAAAGARjgEAAACLcOz3qWb901qaPVpxcXF2Ga3spc+psu6AXSnofVUWjnHvnyFv3SFb1ppfByoXKDEuURO9O9xbAACcmN9Xo/UvLFV2YvBY5C6J2Vr6QpXqGlodTQ5UqtCsN9GrunYPNJ05ZgFoLYbDsV8NdWUqTE/RmKnXKH/127bceFur869SevKlyva+rQZbCgBA6B1QXdkCpSeO0dTp+Vrts8WGb7Xyp49XctIN8u5o3WADoDfEbDj2712n21OnqajqDGUVP6uK2v0yUz4HlsZ6VZcWK8vjhuTcu7Si5mP7VwAAhNIR7XWDceq0xaryZKl47W9Ue7Cx+XjUWF+t0uIseXxe5f64RDWtW5ABhFyMhuP3VfXwInl9o5RT+pJ+MW+m0pIG2vtc8R6lZObp0Q3LlKqXtex/V2ov9REAINQObNLDtzwqn+dmlb75hOb9MFVJCUcPzfGeFGXOe0gbiidJVV797/LddNcDellshuMDf9LGNTVSxp0qnPqNdl6EeCWk5OrJ2r9qT0mmhsRsGzsAoHf4daD611rj8yjjvls0dcjJtry1QUqZ+6hq62tUktneMQtAqMTkZ8y/b5e2mspo5iUa0eErMFBnJ/1jGy/SWuUmn3p0wMQxywCdnr5YLbuMAQBwvCPat2une7wYp5njhnd8QE74hpI8bYTn8lwlD2jrWGSWf1B6UY1dEUBnxWA49qthz05ts7cAAOgfDdpT+469DiBcxGA4jlfC0BEa7X5X31Zb382ZKKarpPbTowP4jlkatb9ivjx2zSZH5KtZo8Lxifbb/EQVeiuPn5oHABBDEjQ0+Sz38h3V7unmvEgZJaptbOtYZJb3VFGQYle0zPSlqwo1Pti6PL5Q3so6ZmUCWojBcOxu9JnDdZ6bXn1bd2lfJ/Kp3/e2tviO2Ftd59/7khZOLtK+2eU66Ibng9tnad/CazVnRTUVEgDErJN15vAR8qheW3e934mBdkfk2/K2fN1uVzmivevu1+T572v2djND035tn/2+FqbnMSsT0EJMhmMNvEAz8iZJ5Q9qybp326+QGt6WN3u0Bsx6Tf7TTrKFXXVIOzc+K68mK/uH31KCabkemaYpE76kqm17dNCuBQCINfEaOHaq8lLdw9HC5Vq3t71GGL8adqxSduJwzar4RKd198jtf0cbHyuTZl+jH440MzQN1MgrJmmCdmjbuxyNgKDYDMcapPOvzlGOxw2/0/5F17c+G5752alsqbKTRit3tZRza6bObzG1TtecoqSc5+XUL1LaQPMY7jf/zS9q/WunKmdKir7WtBIAIBYlnKer3WOMx/eopl14w3FnwzNnzStber2Szr1Oq5WpW68+Twn2vi6LH6mcjfWqX5LmxmKXe6zb/Ox6vea5XFMu4mgEBMVoOHY3fMhUPVS5sulEH4Gz4Z1u+wO7y4BEjZlmzlI0Slklz+ihUE2d4ytTdtwXlXjRLXptwlzNudgTu28AAMB1soZkLlJlSY4bkO3Z8E4b0Hw8GpA4RtPyV8vnyVFJ5SJltjvdW1d87h6O5gaOdRflvaUJ+Vfr4rZmwgBiVAxnM9O9IVur6mpVUfq4ClJbDqFzQ3HgrHmva1XOqO5/S2/Nk6lVZpBE4x49NeRFXZSSp7J2f0YDAMSGgRqZ84Tqan+j0pICpdrSgOBZ8+qeUE6gK0QonOQejlYEBu011i/TkBenK+WGMk52BVhx7ofDsdfRh/x1Xl2RvEhnlv5GqzKH2VIAAPrSIdV5s5ScO1il9cuV6enu+BogevCrfq97X5WFYxQ30au6476VD9KZg0611wEA6EUHKlWYmKiJ3h3HD0T3DNagLxMJAINPQq8brLEzrlFqeZle3GKnyvHvVdXK51Seeo1mjB3cVAYAQG8KzNR0gcrXvKItdtCf3/c7rVzzllLzpmpsYNA4AD4JvS5eCSk36+nqmXpv3rfsgL/LtWpwnmo33K6Ubs+CAQBAVwxSSt4Tqr5un+bZQX8DUp7S4AW/0oZ5Y0M3vgaIcPQ5BgAAACyaLa3gtDlmAQCgv2zdulWLFi3Sp59+aksA9CXCMQAAYeTpp5/WT37yE+3evduWAOhLhGMAAADAIhwDAAAAFuEYAAAAsAjHAAAAgEU4BgAAACzCMQAAAGARjgEAAACLcAwAAABYhGMAAADAIhwDAAAAFuEYAAAAsAjHAAAAgEU4BgAAACzCMQAAAGARjgEAAACLcAwAAABYhGMAAADAIhwDAAAAFuEYAAAAsAjHAAAAgEU4BgAAACzCMQAAAGARjgEAAACLcAwAAABYhGMAAADAIhwDAAAAFuEYAAAAsAjHAAAAgEU4BgAAAKzOh2O/TzXrn9bS7NGKi4uzy2hlL31OlXUH7EpBfh2oXKDEuERN9O5wb7XjQKUKE93HmehVXbsr9TK7XS21v13vq7JwjHv/DHnrDtmy1jq57b3M76vR+heWKtu8vsH3KzFbS1+oUl1Dq2fVqfehM9ve247IV/MrvbA02319j25XYvZSvVBZpwa7VrOo3K7I+2x1rs6InM9WRInSertL9VsE1tvbvMWB28nJyTFWb1O/hcs+GG2fra7qRDj2q6GuTIXpKRoz9Rrlr37blhtva3X+VUpPvlTZ3rePDydh7djtOlYkb9cB1ZUtUHriGE2dnq/VPlts+FYrf/p4JSfdIO+O1h/eMNewQ2WFk5U4ZpKm56/WsZuVr+npyUrKXqUdx314w1xUble01hmRJFrfgyit31pt16sf2GKDejvM8NmKBScMx/6963R76jQVVZ2hrOJnVVG7X47jNC2N9aouLVaWx90hcu/SipqP7V+Fv+jcriPa6+7cqdMWq8qTpeK1v1Htwcbm7Wqsr1ZpcZY8Pq9yf1yimkipkPzvquz26ZpWVC5PVrHWVtTqYPC9cg6rvrpUxVmj3M/vfP14RXXkVEhRul3RWmdEEuq3CKrfqLep3/pdtH62esDd8A6851QUpDjSKCendJfTaEuP1egcrF7mpLoP5ckpdfYEVmp09lfMdzzyOBkl29v5O9f+CqfAI0cZJU5tuyv1hu5uV/DvpjsltZ8G1jpeJ7e9NwRfT8/NTumew7awtY+c6uJJx257p96Hzmx7bwi+ni3fhzYcfMMpTvUcu+1RuV18tvrlsxVRuvsehPm+1d36Ldz3re5uF/Ub9VuoROtnqwc6bjk+8CdtXFMjZdypwqnfaKeZOV4JKbl6svav2lOSqSGd78Xcf6Jyu/w6UP1rrfF5lHHfLZo65GRb3togpcx9VLX1NSrJbG/bw8mHqt5YLp+m677CH7T/PiSM0dwnf6f6PcuV2e62h5Mo3a5orTMiCfVbBNVv1NvUb/0tWvfBnulw+/z7dmmrecFmXqIRHa45UGcn/WMbD+ZTee65GtDcWb3Vcnq6ilr2a+kjPd+utcpNPrXtbYoboNPTFx/Tt6pvHNG+XTvdf3ecZo4b3vEbm/ANJXna+ACU5yp5QFvbZJZ/UHqRWyn0Nf/72rW13q2MLte4EafYwra4FdLZZ8vT1oZH5Xbx2ULborPeDkH9Rr3dd6jfYis7RGG93cHr4FfDnp3aZm9Fj2jdrgbtqX3HXo8iDfWq3RZpH6tOiMrtitbPViShfoss1NuRg89WLOkgHLvf6IaO0Gg372+rre9mZ3n3G1bJdjUGO6u3XvZXqMBjV+2Ctr+ddLwcFYrtmq6S2k/b3ianUfsr5rtbfqy2nlMolqMSNDT5LPfyHdXu6ebQhowS1Ta2tU1meU8VBSl2xaADqnvtwRZTviRqfOEa1fiO2PubtH7OnVmaJSQqebT7am7bqT3dHQTQ1e1qqNNrx0w7NFGFqzbL1+qfb/2cO7M06/F2dfWz5VbsdRuPnXZofKFW1fjce45q+Vy7sjTpn88WWgrfertnQlC/dXnf6lz91jP9UW/3gT6v31ydrLe7rz/qt87V2z3TH5+t8NdhC3r8mcN1nrtFvq27tK8T74Tf97a29LDi8Ps2a1XhRLsjmMrIe8ycgaa8O1r+XV9vV3efc2ccfeyTdebwEe4OWK+tu97vxAfniHxb3u5BxWHmLnxAqRmv6szl2wOjkBvr1+rKfUUaM+vR5tGsPX6/4r+q4eclum/WTu3a14n3wO/Tli09qTjeV+W9s5Tx8hAtD4xCPqz6N67UvvlTNWvZ5uYKMeK260CV7k29Xi+f+bOmUciN9Xrjyn2aP+YGLQvhiOpwrDNC67B8f3hGSwt/rOzsf5P3j+E3rVG4vgdN93V9aRK+9Vt3lyZ9vV09e86dWQLCuN7uzhLU55+tTtTbbT3fzi5N+n4fDDxGzRoVjk+0z8X9IuOtbGMe5RD5vF5/+OVSFc69Xtk3rdQfP3HsHe3rMBxr4AWakTdJKn9QS9a92/6L1vC2vO43mwGzXpP/tJNsYTf439W6hbmav2+Wtpsd4WC5Zu97UOlzjk4dYr6J9Fgfb1dInvMJxWvg2KnKS3U3a+Fyrdvb3gfS/Sa6Y5WyE4drVsUnOq3jPaADe/XrVc/LlzVHd2SOdL97us/Ac7FysyfLU/WiflP7SdNqPTZYY2dco1St1cIlv9Ledt+sA9rhzVXigBtU4T/1BDt2B3z/qVVFHyvr1h8rM2mgW3CyPGNnKnt2oqpW/KdqP29arbuO7gt9uV2fy/fr51Xku1K33nGlkhLcR4n3aGxutmZ7XtaK3/xfd40QCcM6I3Qa1fDHEs2dMEv5RStU5humb3/zy/a+MBKV70G01m99vV19Jbrq7WZ9+tnqXL3d83zR9/ugf+9LWji5SPtml7tfPBt1cPss7Vt4reb0xpR+zsf648/v0IRr81X0WIV8Z52rb5569AtPe06weYN0/tU5yvG4b/S0f9H1rc/8Ys4QU7ZU2Umjlbtayrk1U+ebN7Cb/Dsr9Jj3i5qdPUkjzeMkjNQVUy6Vqmr17sGju2FTU33Xl6P6druMtp5PqJZmCefpave5enyPatqFNxx3Rhtz5puypdcr6dzrtFqZuvXq8wKVfvcMU+aqnXJWuf+eLXH/Bf394w/l0z9osK0Q2nq+nV2axCvhfPe55oySzztNF17f+qxK5htomZZmX6pzc73um5Wjq88fZO/rBk+mVjk7tSpzmC0wPtXH+9xv6WcPbq4Q2nq+nVmO6svtOsndrBXuv79CmZ4WFfXfP9Y+n8fdrC83VwRtPefOLEeFZ50REof+W0/9e7FeNG9SwhTdvShLKQMHNN0XVqK03o7K+s3Vp9vVs+fcmaVJtNbbffnZ6sN6u0/3wUPaufFZeTVZ2T/8lvs47r4yMk1TJnxJVdv26KBdKzQcHfrz8/r3BWsD+17ChDwtunGMBp44Gwde1BNodA5uX+lkmTnwzL/U5jLKySrZ5hy0f2H+Zn8I5ipsrN/kLMsa1fE8id3Wne2KhDn99jvbS3Lcf7+t7bGLJ8cp2b7fru8K1XyZds7KXnm/Dm5zStx9oc3tsYsna6Wz/WCLfzgk2xWcs7KjeS17oMvbFap5QO2clR3Oa9ld/ffZ6r064+9Obcksxz0guM9xmDOh+A/Ofr+9KyxFa73djfotVPV2b9Zv/Vlv96Z+q996s97uz+zQm/V2f322Djv1byx3X89eeK+O/LdTMmV403NPmOIUv/mB09lquxNfaUyqz9aqulpVlD6ugtSj36PdHcCeIeZ1rXK/Ifbk2+yxdqsse4QGJI5T3msXKH/OxW1P0dUj/bFdfWGgRuY8obra36i0pECptjQgeOabuieUM9L89BRC5mekm3OV7/634aGpoZ/bMWGUcla9rtqKUpUUZNjCJsGzL9Wtym5quQoZ8zPSGt08uVgqLtFDvTG3Y79sl/kp8980Od/drA339cL8otFXZzj1r+qBeU83tXxdfIv+V2dbH/pNtNbbUVq/9dd29baorLf7Kzv0dr3dD/ugr0zZcV9U4kW36LUJczXnYk8I36vPVL9hueat3+Ve/4ounl+oG1MGq9PVtg3JYcr9RlFxT++12iE0bOuAJ2u580Z9qL/N9pdg68AoJ2vZJqc+anY+2zrgyXKWvVEfhZ+pXqgz/H91Kgovsa0nlziFFX/tdOtDbIqyejsq67doRb0dkRr3OBXzM0LaIu7/4NdO4ciEpnp75EKn4oPP7T2dE+bh2NW43SnJ8DjKKnXqbRHChXsQrF7tFKSe7aQWlDq1Lbs0RLLGeqd6ZYF7cM9wCkq3t/hpLLI11r/hrCxwK6DU+U5pbcufxqJMSOsMv3OktsSZktD0s+JXrnvOefczovEJRUW9HaX1W7Si3o5ojW49m6GznazSv9iSnmjZDW6kc92zO53P7D2dFfIfh7rPTJ2zQIlxM+StO2TLjvKcOUhhOC48hh3R3rI8pYwp1OaLf66nF2c2jaaNdP53VXZDhsZct1UXV3i12I5Uj3T+vWW6IeUiXbf5ElU8fY8d0R3p+qDOcN7T77wlWh8YzTFV99xxub5+Ulj3p+hj0VpvR2n9Fq2otyPI+6osHKO4iV7VHTdmepDOHHSqvd59zof/JW/xi3YQ3k26Y/JZ6vKcITYkh4fAgAf3W3rxG/ZbX/DnuUlOcfVHgRKEieCAiMA3s9ZLqL799bXgwIG2tsksc5zS+q5+/wwHwUETbW2Tu0Ry615I6gy/89nftjovlTzsPPTUfzn1LVqG/e8+61wdaDVOcEYW/tr5gEbj40VjvR2V9Vu0ot6OLMHBki3qh2C3itRlTnWnf6E55Pxt68tOyUPLnaf+a2+LluHDzrvP5thW4+53gwu7bhXNPyHYHcCTtcwpj+afgAH0SM/rjH3Oq7f/s/374c6VD1c7BwO16UFn60OTmsoTZjkltX8PrI3jUW8D6LxglyWPrTNGOVnFr3at69IHrzq3f6WpvlHCdOfhrR81heDDW5yHLvlKoDxhSolTe6R7LRpx5n/ugwBAjHL0+V/+j269LFsr/sf8EHex7tjwrIrT9mrJRRla+HaDvnJ9qd4uyVQiPSoAIAwc0l/K7tJl0x7S/5ibI/O1oeJ/Ke0vD+qiixfobY3U9aUbVZL59c7PUNHCgHtc9joAxKA4xZ+epNTvfUX//dSvVHtkj/5Q/ZmGnbpNRb94XQ1K1cKfz9ekYafY9QEA/esknT7yO/reGe/oqVf+rCPv/0nVnwzSqX9+Wr/YvE8alaefL5mkYV/oXosGLccAENCqJSJowgr998s36lvdrGQBAL3k8/+nsluna9qKGltgeDTh5+V6ee4ofcGWdBXDbwEg4BR9/V8L9MidF9vbxnBNnZ2mkQRjAAg/J31T//qz+3TnyBbzkySka3bGOd0OxgbhGACC4hKVcde/H61oE9J01fd74cyIAICQiPvHy3TXf9yskfZ2wuR/0fe/+UV7q3voVgEAx2hUw+7tqv3bYZ00+Cz90ze/0vU5MgEAfcdp0O5ttfrbZ1/Q4LPP1TcH9aTdmHAMAAAANOPXQgAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMc6oLrKMnkLJyouLs4uo5W99DlV1h2w6wS9r8rCMe79M+StO2TLWvPrQOUCJcYlaqJ3h3sLABBSDXWqLHtCheMTj9bbidla+kKV6hpa17rU2wC6JqbDsd/3uh7MvlTJ6dOUW1RuS423tTr/KqUnT9eCyr1UlAAQFo7It/lRZSclK33ajSqq8tlyl2+18qePV/Lke1XpO2ILAaDrYjccN2zWslnTlbf6A6UWlKiidr8cx2laGutVXVqsLE+5FqfP0bKaj+0fAQD6h18NNY9q1kW3aLUvQwUlFao92NhcbzfWV6u0OEueqnuUPutR1RzXggwAnROj4fiQ6p5fqvyqM5RVUq4NS3KUljTQ3ueK9yglM0+PblimVL2sZc+/pdYdLAAAfchfp+cXFKvKk6OS7Wu1JCdNSQlHD2HxnhRlzntIG4onSVW/1PObP7T3AEDXxGY49u/Spuc2Sak5um3Gt5Rgi48Vr4Tzr9LSdaVaPnFobPc/AYB+5t/5ez1X7lbbeXM0Y2SLxoxjDNL51/xM60p/qolDT7ZlANA1MZn5mipZnzxj/1nntGh5OI5pQZ6Sqcy0pHYCNACg9x3Szk2vqlyJGnvBWR3Wx6YFeUrmlGN/DQSALojBcOxXw56d2iaPRicndjP0rlVu8qlHR0kfswzQ6emL1WKYCACgRxq0p/Yd9/IsJQ/tblMF9TaAzonBcByvhKEjNNreAgCEuwQNTT7LXgeA3hXDXWl92lZbrwZ7q2umq6T206OzWxyzNGp/xXx57JoAgFB5R7V7uldrU28D6KyYDMfxIy7RzAyPfGt+reoDHU3305nJ4zvjiHw1a1pMWD9Rhd7KNiarBwAc7xSNGHe5MlSjNRv/1PHsQQcqVZjo1rMTvarrURVLvQ3EqthsOY4frnEzx0m+lbr38ep2Wo/NnJprdG9RjZRxucaNOMWWd51/70taOLlI+2aX66DTqIPbZ2nfwms1Z0V7/zYAoKXmRo2iZXq83bnnP1bN48tU5PMoY+YlGtGDIxz1NhC7YrRbxSlKmjFPxalSVf5UTS70HnuqaHNqUu98TR6TpypNUvGiTCV1+5U6pJ0bn5VXk5X9QzNtXLwSRqZpyoQvqWrbHh20awEAOhCfpBmL8gNzz+ePmdmqFdfvVtuV8hbO1Jj8l6XUfC2akdSDAxz1NhDLYjQcuxLGKu/pVZpvAnJRrtKTT7c/nbnLaclKzy1yg3GGCkqXam7KIPtH3eEG8Zzn5dQvUtpA83Kb05++qPWvnaqcKSn6WtNKAIAOuQE15WY9XXGPG5DLVZSbruTTBth6e4BOS05XbpGZCHm+Sh/LVUpH03SeEPU2EMtiNxy74j0TtKiiRtXrHldBasuhGKOUVfysKmrXaknmyG5O99YGX5my476oxItu0WsT5mrOxZ7YfgMAoEtOliftblXUV2tdSYEbklvwZKl47W9Uu+E+ZYZyjmPqbSDmxDlmqC76ln+vKhfmKH3lOSp9c5kyh3AmJwAIa9TbQMzgC3B/iB+i1OtmKsP3qta/8VdbCAAIW9TbQMwgHPc6Ox1cm9MKDdKZg0611wEA4YF6G4hlhONeN1hjZ1yj1PIyvbjFTj/k36uqlc+pPPUazRg7uKkMABAmqLeBWEY47nV2hHX1TL0371tNI6sHXK5Vg/NUu+H2Ho6oBgCEHvU2EMsYkAcAAABYhGPLtAwE8ZIAQPij3gbQG/htCAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwOpCOD6gusoyeQsnKi4uzi6jlb30OVXWHbDrBPl1oHKBEuMSNdG7w73VjgOVKkx0H2eiV3XtrtTbmrarpfa3631VFo5x758hb90hW9ZaJ7e9tzXUqbLsCRWOT7TvlbskZmvpC1Wqa2j1rDr1PnRm23ub392sKpV5CzW+eR+MU2L2Ur1QWacGu1aTyNsHO/fZiqB9EGEgSvctW7+11G79FjHb1ZX6zUW9Tb2NXtOpcOz3va4Hsy9Vcvo05RaV21Ljba3Ov0rpydO1oHJvxL2ZLbfrWJG8XUfk2/yospOSlT7tRhVV+Wy5y7da+dPHK3nyvar0HbGFEcLv0+YHr1dS8nhNyy1SlS02fKvzNT09VZMXvCZfhO2E0frZQv+Lzn3r2PrtGNRv4Yd6GxHqxOG4YbOWzZquvNUfKLWgRBW1++U4TtPSWK/q0mJlecq1OH2OltV8bP8oAkTldrnf0Gse1ayLbtFqX4YKSipUe7Cxebsa66tVWpwlT9U9Sp/1qGqOa2EJVx+rZtkNuihvtXypBSqpqNXB4HvlHFZ9damKs85Q1eJszVq2+fgWlnAVrZ8t9D/qN+q3fke9Tb0duU4Qjg+p7vmlyq86Q1kl5dqwJEdpSQPtfa54j1Iy8/TohmVK1cta9vxbav1jQniK0u3y1+n5BcWq8uSoZPtaLclJU1LC0bc43pOizHkPaUPxJKnql3p+84f2nvDmryvTgvyX5claqe0bFisnLUkJ9j7pZHlSMjXv0RIVp7qbtWydNh+IhINitH620P+o36jf+h/1NvV2JOs4HPt3adNzm6TUHN0241stduyW4pVw/lVauq5UyycO7Vw/jf4Wpdvl3/l7PVfublbeHM0Y2eIDe4xBOv+an2ld6U81cejJtiycHdLOTa+qXJOUd9sUjWxxMDxGwnm6ZumTKl2eoaER8WZF6WcL/Y/6jfqt31FvU29Htg7ft6bKyCfP2H/WOe3t3Ib5tjQlU5nHfDMMX9G5XcHKKFFjLzirw+drWlimZE459htvuApWRp5v64JzOnq+piXiB8rMTD2mNSlcRetnC/2P+o36rd9Rb1NvR7gO3l2/Gvbs1DZ5NDo5sZtvsE/luedqQIsRqscsp6erqMV4sb4Riu1aq9zkU9veprgBOj19sbvlfa1Be2rfcS/PUvLQbn4cy3OVPKCtbTLLPyi9qMau2Ica6lW7zX01R4/Q0G5VnuyDiCXUb+0Lw+3qcf3mot7uI9TbsaSjrz5KGDpCo+2t6BGt25Wgocln2etRJCFRyaM99ka0iNZ9EP2P+i2iRGX95qLeRoTrxFc6n7bV1ndzJKlHGSXb1dg8QrXVsr9CBa0+P37fZq1qnjcwUeMLvcfNGXj8N67OLcfqyXZNV0ntp21vk9Oo/RXz3S0/qq3nEsrlWO+odk83x/1mlKi2sa1tMst7qihIsSs2aeu5hHI5xrad2tOt0edd3Qf9aqjbqKXZo48+l/GFWlXjc+85quXz7MpyrL7bB43OfLYQLcJr32r5Gejqcqwe1G/hXG93u35zdbHeNnNEv7Y0W4nNz2WiCldtPmY6tdbPtSvLMfqs3u7d9+tYffnZOiJfzZoW5ytw3ytvZRtzeSPUOgzH8SMu0cwMj3xrfq3qDkeShmiicf+7WrcwV/P3zdJ2M0XPwXLN3veg0ueUhHRanj7frj5xikaMu1wZqtGajX/qeIRsWEyg3knxwzVu5ji3PirXxuqORp+HaAL1A1W6N/V6vXzmz5qmiWqs1xtX7tP8MTeEdFqeaP1sof+F475lDv49Q/0WmhNEuO/5vbOU8fIQLQ9MQXZY9W9cqX3zp4Z2OrU+366+0defLf/el7RwcpH2zS7XQTc8H9w+S/sWXqs5K6pD916hTR23HDfv4Ct17+PtvRl+NbjfbO41/ZoyLte4EafY8q7z76zQY94vanb2pKbRrQkjdcWUS6WqWr178OiOePw3rs4tzfp4u9p6LqFcgpo/uEXL9Hi7Qe5j1Ty+TEU+95v5zEs0ohO/HbSnrecSyqXJ0YNi0b1r2g9yDdV6/N6V7nf6cZo5bnhnfhJpw+fy/fp597W5UrfecWXTAJF4j8bmZmu252Wt+M3/dddo0tbz7czSLEw/W4gCUVpvU7/1tH5z+f5Tq4o+VtatP1ZmYMDiyfKMnans2YmqWvGfqrUVXFvPt7NLkz7eLldbzyVUS7M+/Wwd0s6Nz8qrycr+oZkZI979aKVpyoQvqWrbHh20a6F3nGBfPEVJM+Y1zUOYP1WTW/8Ma07h6Z2vyWPyVKVJKl6UqaQe7N3xSTna6FRrSdpXA7f9vjf07PrX5cnJ0EVfOylQFhp9u119Jj5JMxblB+ZXzB8zs9XPL+4Htq5S3sKZGpP/spSar0UzknpUGfWV+KRMLQrMXZqnMZPny3vMKUfNKTy9Kpw8VflV7mYVz9OMpO5WRifJk7nCrQxXKNPTYn/7+8fa5x5szx785RC+XtH62UL/i9J9i/qth/Wby5OpVc5OrcocZguMT/XxPvfLxtmDdVoIX7A+3a4+05efLfffynleTv0ipQ00D2LODvmi1r92qnKmpOhrTSuht7jfik6osb7cmZ/qMV+f2lkynILS7c5Bu777F87+ivmORx4no2S7e6sd+yucAo/79xklTu0xK/3FKc06u+mxPVnOsjfq23+MHuj6dr3nVBSkuOXTnZLaT21Za53c9l5z2KmvuMdxP7uttqXFkjrfKa3db9d3tfs+tNSZbe9FjXucivkZx29L8+JxUgtKndqDwQ3o6T4Y9JFTXTzJ3Q9vdkr3HLZlodP3+2DffLbQ/6Jz3+pG/RYJ9XaX6zdXSOrtRudg9TL39Rzl5JTuCv1291u93bv6/LNVX+pk2cf2ZC133qgP/bEIx+rUd5p4zwQtqqhR9brHVZDasrv4KGUVP6uK2rVakjmym1ObtGWYMlftdIP7YdU/dZZevChDN5S9q3Z+mOm2vt+uvnCyPGl3q6K+WutKCuQeRI7yZKl47W9Uu+E++5NaBIkforRFG1RfvUElBRm2sIknq1hrK6q0YYn7Lb1b0wa154B2eP9Nk/OlYvOaDQn9SQWi9bOF/hed+xb1W+j41bBjjW6eXOxWcCV6KPMboW9p75ft6n19/tkKtPg7cr9s6KkhL+qilDyV7T1i70RviDMJ2V4PT/4d8l6Rptwzl6t+VeZxo6SB3mGC8Z1KW/i58tc9oNvHeiLiJ9ou4bOF3sK+FeZsME5bKuWv0AO3XypP1FVw0clf59UVyYt0ZulvWnWPQSiF0cchOGq17dGdnjMH6cv2OtCbmqalmq5z13xNy6se0Z0RH4z5bKG3sG9FHL9PNavma/K5T+vM5Wv16J0E4/BkZ7xoc9aVQTpz0Kn2OnpDGH0k4jVw7FTlpb6lNS/+yXbcPyJf1XNaU36B8mZcoAj7oQwRyL+3TDekXKTrNl+iiqfvibyfZ9vEZwu9hX0rovjfVdkNGRpz3VZdXOHV4ojrNhhLBmvsjGuUWl6mF7fY2Vn8e1W18jmVp16jGWMHN5WhdwR6HoeRxvo3nJUFRzvwe7KWOeXHDK4Aektw0ETLgRUtlqxSp96uGYn4bKG3sG9FguCArxZ12jHLHKe0/jO7LsLDYae+erVT0Dz4b5STVfzqsQMz0SvCv88xAAAA0EfoaRTlXn/9dd1www369NNPbQkAAH3PHItWr15tbwHhi3Ac5davX68nn3xSu3fvtiUAAPQ9cyx6++237S0gfBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTiOVg11qix7QvW/9gZuJicnKy4xW0tfqFJdgz9Q1uxApQoT4xQ30au6Vncd9b4qC8coLm6GvHWHbBkAAB3xu4ejKpV5C3WOe6u4uNg9jsQpMXupXqisU0PTSpbfPRwtUGJcoiZ6d7i32tGpYxbQfYTjqHNEvs2PKjspWenTbtQvt3xgy12+1cqfPl7Jk+9Vpe+ILQQAoBf4fdr84PVKSh6vablF+h9bbPhW52t6eqomL3hNPgIuwgzhOKq439BrHtWsi27Ral+GCkoqVHuwUY7jBJbG+mqVFmfJU3WP0mc9qprWLcgAAITEx6pZdoMuylstX2qBSipqddAeixznsOqrS1WcdYaqFmdr1rLNrVqQgf5FOI4m/jo9v6BYVZ4clWxfqyU5aUpKOPoWx3tSlDnvIW0oniRV/VLPb/7Q3gMAQOj468q0IP9lebJWavuGxcpJS1KCvU86WZ6UTM17tETFqe7haNk6bT5AYw3CB+E4ivh3/l7PlUupeXM0Y+RAW9raIJ1/zc+0rvSnmjj0ZFsGAECoHNLOTa+qXJOUd9sUjWzRSHOMhPN0zdInVbo8Q0NJIwgj7I5RI1gZJWrsBWe1+IZ+PNOCPCVzitKS2gvQAAB0k3+XNj23SfJ8Wxec09FxxrQg/0CZmanH/MoJ9Df2xqjRoD2177iXZyl5aEfRuAPluUoeEBcYSXz88g9KL6qxKwIA0I6GetVu80mjR2hot0Kvzz0cnasBbR6L3OX0dBW5Dw/0FsJx1EjQ0OSz7HUAAPpJQqKSR3vsDSDyEI6jzjuq3dPNcb8ZJaptDI4mbr28p4qCFLui5fepZlWhxge/zY8vlPe4eSsBADFp207t6dasSB73cLRdjW0ei9xlf4UKWmVvv2+zVhVOtK3LiRpf6FVl3QF7L9A1hOOocYpGjLtcGarRmo1/UodVQkgmUD+ivevu1+T572v29v1uhbVf22e/r4XpeVpR87FdB7HrsHx/eEZLC3+s7Ox/k/ePHKSAmBE/XONmjpN85dpY3dGsSJ086ceJ+N/VuoW5mr9vlrab6UsPlmv2vgeVPqeEKUu7hHo7iHAcReJHXKKZGR75ipbp8XYD6seqeXyZinzuN/OZl2hEd/cA/zva+FiZNPsa/TAwM8ZAjbxikiZoh7a9e7BpHcSoRjX8sURzJ8xSftEKlfmG6dvf/LK9D0D0O9pYU3TvmvYDakO1Hr93pXwap5njhnc7kPh3Vugx7xc1O3tS08wYCSN1xZRLpapavXuQcNw51NstEY6jSXySZizKV6peVv6YmSr0VrY4VbQ5hWelvIUzNSb/ZSk1X4tmJHV/B4gfqZyN9apfkubGYpc5E9Kz6/Wa53JNuehrgVUQow79t57692K9aPrXJEzR3YuylDJwQNN9AGJCfFKmFgXm1M/TmMnzW3W5O6C6Sq8KJ09VfpV7OCqepxlJp9j7ui4+KUcbnWotSftq4Lbf94aeXf+6PDkZuuhrJwXKcALU28cgHEeVeCWk3KynK+5xA3K5inLTlXzaANsHa4BOS05XbpGZCHm+Sh/LVUpIps75XL6yuYobkKiL8t7ShPyrdbGH+ZNj1yeqe3qJ8l/c5V4fpgl3z9eNKYMV13QngJgxSCl5j6lifoYbkIuUm56s04LjU+JOV3J6ropMMC5Yrsfmjulw+tHO262y7BEakDhOea9doPw5F8tDyukE6u3W2G2izsnypN2tivpqrSspcENyC54sFa/9jWo33KfMkM1xfJI8mSsCgyQa65dpyIvTlXJDmfbyS1ZMcupf1QPznm5qIbr4Fv2vG8doIMkYiE3xQ5S2aIPqqzeopMANyS14soq1tqJKG5ZkhnCO42HKXLXTPR4dVv1TZ+nFizJ0Q9m73e/LHCOot48X54Yax14HeuiQ6rxZSs4drNL65cr08HNWTHH+psr5/6r0Jb93b1yiwor/o8Vp/0irMYC+598h7xVpyj1zuepXZYqJ5dpBvd0mWo7RPYEZL9oZYewZrEFfZteKLY4++5+X9PCjpoKVvnLd7brpe/9AMAbQy4IzXsyQt+6QLTvKc+YgMRy4PdTb7SHBoHsGXqAZeReofM0r2mIH/fl9v9PKNW8pNW+qxg5k14opznv6nbdE6wODOabqnjsu19dPoooF0NviNXDsVOWlvqU1L/7JDvo7Il/Vc1pTfoHyZlzQNGgcx6PebhcJBt1kBls8oerr9mmeHfQ3IOUpDV7wK22YNzZEgysQXhx9/t4f9bL3ET38yz/I9/nRHlnO7t/oyUDrQ4JG3nyLrv02hyMAfSRhrPKeflrXvfdTO+jvi0pZNVALap/WvJRBdqVYRb3dHfQ5BtBJf9XGOybq8of+6F4frisffkG/vCVFCXEN+uPDV+m8219269hZKql5QjlJX2r6EwBAP6Le7g5ajgF00j8qPe/fNfcc87vALr1426366ct/0eefbNNLT/w2sMZXpk/T5edQwQJAeKDe7o4B97jsdQDoQJziT09S6ve+ov9+6leqPbJHf6j+TMNO3aaiX7yuBqVq4c/na9Kw7k/mDwAIJert7qBbBYAuOqS/lN2ly6Y9pP+xJQETVui/X75R3/oCAzoAILxQb3cF3SoAdNEp+vq/FuiROy+2t43hmjo7TSOpYAEgDFFvdwXhGEDXxSUq465/150j7bwkCWm66vvfoEIBgHBFvd1pdKsA0E2Nati9XbV/O6yTBp+lf/rmV8Q5EQEgnFFvdwbhGAAAALBoTQcAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3DcXQ11qix7QoXjExUXF9e0jC+Ut7JODXaVZv4d8k5010tcoMoDflvYSnCdiV7VtbMKAAAAehfhuMv8bi4uU+HkVKVPu1FFVT5b7qoqUm56spJyy7SXgAsAYcbU31Uq8xZqfLBRw10Ss5fqheMaNvw6ULlAiXGJmujd4d5qx4FKFSa6j9OvDRvRul1A/yAcd5HfV6FFc25xQ/FoFZRUqPZgoxzHcZdGHaytUElBhnzeW3Ttss3HtyADAPqH36fND16vpOTxmpZbpCpbbPhW52t6eqomL3hNvkgLgtG6XUA/Ihx3ycfa8suHtNgNxvMrvFqck6akhOBLGK+EpDTlLH5cpTlnqGrZOm1urwsFAKAPfayaZTfoorzV8qUWqKSiVgcDjRpmOaz66lIVZ7n19uJszYqoho1o3S6gfxGOu+LAW3p+2cvyFBTqrrQhbb948cOUUfiISpdnaCivLgD0O39dmRbku3V31kpt37BYOWlJSrD3SSfLk5KpeY+WqDhVEdWwEa3bBfQ34lsX+Pft0lafR6OTE1tUQK2ZFuRUZWamtmhVBgD0j0PauelVlWuS8m6bopHt1csJ5+mapU9GUMNGtG4X0P/4qHSaXw17dmqbEnXe8K9274XzLVb66QOaB0scsww4V7nlLQb3AQB6zr9Lm57bJHm+rQvOGWgL22JaWn8QOQ0b0bpdQBjgkwIAiF4N9ard5pNGj9DQboVDn8pzz9WAtho1zHJ6uor6o10jWrcLCAOE406LV8LQERqtem3d9X770990xDNfFfuDs1u0Whq3qyTDY1cEAIREQqKSR0dh3Rqt2wWEAcJxF8SPuEQzM6Rtr/+5w2lx/HVeTTzRHJKdckS+mjUtTjQyUYXeStU1MKgCALpk207t6Vbd6VFGyXY1ttWoYZb9FSponVH9PtWsajHncHsniAqFaN0uoB8RjrsifrjGzRwnn/cxPVq1t+3g639X65Y8qHKN08xxw3v0Avv3vqSFk4u0b3a5Dpp5lLfP0r6F12rOimoqIwDoDFtvy1eujdUf2sK2dPLkGCd0RHvX3a/J89/X7O373aC5X9tnv6+F6XlaUfOxXScEonW7gDBAOO6SUzRi4lXK8ZRrcXqO5ntfUo3viL3PnKGoUt75N2qa9wOlFs/TjKRT7H3dcUg7Nz4rryYr+4ffUoLp1jEyTVMmfElV2/booF0LANARt94ed7kyVKOie9eopr1W1oZqPX7vSvl62rDhf0cbHyuTZl+jH440A+UGauQVkzRBO7Tt3VDW3NG6XUD/Ixx3UfyQqXqocqWy3IBclDtZYxK/2PTzUtwAnZacrtyicnmyFuvnc8d0MN1bZ5yipJzn5dQvUtpA8zYdkW/zi1r/2qnKmZKirzWtBAA4gfikTC0qniRV5WnM5PmtugIcUF2lV4WTpyq/Sj1v2IgfqZyN9apfkubGR5c5g92z6/Wa53JNuSi0NXe0bhfQ3wjHXWZacLP1i5pqrVtb7IZkW2yYMxStq1bNL7Lbn3OyO3xlyo77ohIvukWvTZirORd7eOMAoNMGKSXvMVXMz3CDZJFy05N1WrDfbNzpSk7PVZEJkAXL9ViPGzaCPner7rmKG5Coi/Le0oT8q3Wx52R7X6hE63YB/YuM1U3xnhRN+eE8rapvMYDhN0sCrbqe1q+q/cZ9tBW4DcF1NuYoqfUqnkytMo/fuEdPDXlRF6XkqWxvsDsHAOCE4ocobdEG1VdvUEmBGyZb8GQVa21FlTYsyQzhXMAnuVX3isCxobF+mYa8OF0pN5Rpb/c7/bYtWrcL6Edx7g7u2OuIAGYmjCuSF+nM0t9oVeYwWwoACF+HVOfNUnLuYJXWL1em5yRbHumidbsQ60L1VRIh974qC8cobqJXdcd9Ix+kMwedaq8DAMLGgUoVJrYzM4RnsAZ9OUIPu9G6XUAb2JvD1mCNnXGNUsvL9OIWO02Of6+qVj6n8tRrNGPs4KYyAED4GHiBZuRdoPI1r2iLnUHC7/udVq55S6l5UzW2va514S5atwtoA3tz2IpXQsrNerp6pt6b962mARYDLteqwXmq3XC7UkI54A8AECJmkNwTqr5un+adNiBQdw9IeUqDF/xKG+aNDdGguP4QrdsFHI8+xwAAAIBF82MPNU2Z07QAACJDtNbbr7/+emAB0H20HPdQy8qVlxIAIkOw7o62ejtatwvoS7QcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAq/PhuKFOlWVPqHB8ouLi4pqW8YXyVtapwa7SzL9D3onueokLVHnAbwtbCa4z0au6dlYJa/b1aKnd1yNi+N3NqlKZt1Djg+9xXKLGF3pVWXfArnOUv86rie46iYWVOv7eJk3rJGqid4f76P2kK/uuDqnOO8NdZ4wKK9+3Za0F15khb90hW9bXuvZexcRnEm04oLrKMnkLJ9p9xCyjlb30uTb2k/dVWTjGvb+j/dqvA5ULlNjfn+luO/q5CTKvSWL2Ur0QJXX3Obak/e3q5Ht4oFKFie7+0q/1QVv1XDRsF8JdJ8Kx2TnLVDg5VenTblRRlc+Wu6qKlJuerKTcMu2NmZ3s2NfjGBH9ergH0bKFmpw8XtNyi1RlSyWfu1m5Sk++VLll77Zf4YSlaN13o/G9Qqj5fa/rwexLlZw+TblF5bbUeFur869y95PpWlC5N3b2E79Pmx+8Xkn2c9OSb3W+pqenavKC1+SLtBek1Xb9jy02omm7jtZzEb5diAgnDMd+X4UWzbnFDRajVVBSodqDjXIcx10adbC2QiUFGfJ5b9G1yzZH8LfuzovO1+OIfJUPas60xapKLVBJRa0OBrbJLPtVW1GigtQP5J12s5bVfGz/JvzxXkXOe4UQa9isZbOmK2/1B0otKFFF7X67j7hLY72qS4uV5SnX4vQ5MbKffKyaZTfoorzV8h33uTms+upSFWedoarF2ZoVUfUB2xVZ24WI4e5sHfjIqS6e5EgZzvyKPU6jLT1G4y6nNGeUI898p2K/XaNxu1OS4Tm2rLXgOhklTm07q4Sfbr4e4e7gG05xqvtepN7jVNQftoXHatxT6uR45HgKKpz9wbLaEifD3YValrXWtI7HySjZ3vbr1Wu6+1596tSWTHf/LsUpqHjPlrUWXGe6U1L7qS3rI918r6L3M4njBffPUU5WyTbHDRVtaHQOVi9zUo/5/L7nVBSknGC/bnT2V8x3PP3yme6+5roqa6Wz/WA7zzr42Yqgurt729XJ93B/hVPg1iP9UR9E63YhcnTccnzgLT2/7GV5Cgp1V9qQtpuZ44cpo/ARlS7P0NDO92COTFH5evh1YPM6LatKVMFPb1aa52Rbfqz4IZep8Kl1Wj5xaBc6qvcj3qvIea8QWv5d2vTcJik1R7fN+JYSbPGx4pVw/lVauq40BvaTQ9q56VWVa5LybpuikQntbG3Cebpm6ZMRVB+wXZG1XYgkHe5S/n27tNXn0ejkxHYqWMOtZJNSlZmZqqT2duIoEZ2vxxHt27VTPp2l5KHtb5U0UElpU5SZltTBtocP3qvIea8QWv6dv9dz5T55xv6zzulov473KGVKZvTvJ8EvC55v64JzBtrCtpwsT8oPIqc+YLsia7sQUTrYo/xq2LNT25So84Z/teMU3R7fYqWfPqB5hOkxy4BzletW4JEjBK9HWGrQntp33IpohIaf2XZL5In4itJ1elvvsbsMSM5Vy6FAfSMU71WNitL/oc1tios7Vcm5a+16fann71V0fSZxvOC+f6Ivhh1Zq9zkU9veR+IG6PT0xe4XtAjSUK/abe4zHj1CQ6MpRPV4u3wqzz1XA9p8n93l9HQV9ccbHa3bhYgSRTUFAMS6eCUMHaHR9hZcCYlKHu2xN6II2wX0mg7CcbCSrdfWXe+rW7OleOarYn9whoBWS+N2lWQc/wHw+zZrVfOcnMfP23rct8A+WJr07PVo63H7e2mSoKHJZ7lftndq174jtqxrPAUV2t/We+wujbUlyrDrNWuo02tLs5XY/FwmqnDV5mOm5Gn9XLuyhGTfVYoKKt5rc5sc51PVlky36wWZaeM2amn26KPPZXyhVtX4mv/9ls+xq0uTnr9XXf9MHpGvZk2LOaLd98pbqbqG7r2q6Cs+baut7+Yo/ukqqf207X3EadT+ivlqvZecqN42Wu7PfbUcY9tO7eniftvWY4bDcoxubFcTjzJKtquxzffZXfZXqKDVG93Wcwnlcow+3C53B1bNqhZzKUf8OQvQUx22HMePuEQz3WSz7fU/dziXYMhO9OB/V+sW5mr+vlnabqbdOliu2fseVPqcEtWEwcG4z1+PPnGKRoy73A2w2/X623/t4PmG6sQX76vy3lnKeHmIlgemlzqs+jeu1L75U0M6JU+fv1cHqnRv6vV6+cyfNU0Z11ivN67cp/ljbmieKstUzD3T1++V+/rsfUkLJxdp3+xyHTRT4G2fpX0Lr9WcFdUcOMJU077vkW/Nr1Xd3glfAjpz0o9OCPN6W/HDNW7mOPf7Qrk2Vn9oC9sSYSc4YbtCtF1HtHfd/Zo8/33N3m6OSfu1ffb7WpiepxVMhxmzOu5WYXdSn/cxPVrVzmTxpmJc8qDKNU4zxw0/wQN2zL+zQo95v6jZ2ZOaRqgmjNQVUy6Vqmr17sGmf/24b4F9sDTrwevR1uP29xLUdDD9QN5HVqrK13aLpH/vr7Rk4Vop43KNG3GKLe0G339qVdHHyrr1x8pMMoMtTpZn7Exlz05U1Yr/VO3nTau19Xw7uwT06b77uXy/fl5Fvit16x1XNg0OifdobG62Znte1orf/F93jSZtPd/OLEF9+l6ZUeMbn5VXk5X9QzPrQbz7kUzTlAlfUtW2PTpo10KYaQ4XK3Xv4+19ifGroWaN7i2q6fF+0pl622hrv+7tpUnwS2WNiu5d035gb6jW4/eulK9FfdDWY4bD0qT729VdbT2XUC5N+ni7/O9o42Nl0uxr9MOR5pg0UCOvmKQJ2qFt71LLxSx3h+xQcM5UM19sQckGp7p5btVG52BthVNSkOHe53FSi984Op9miOZUbazf5CzLGuV4ckqdPWEyH2G3Xo+wd9jZU3qz43F3B6UWOCXrqp365td7v1NbUeIUmPkkNckprv7IlrtbHLJ5jv/ilGadHfJ5J7v3XoVwnuP6UifrhNveVd17r0LzmTzs1L+x3MnyjHJySneFcJsQcsE5YM3+XVDiVNS2+IQerHUqSgoCcxwfu5+EZp7jcKy3j857bj83FbUtPvMtPzeRVnd3Z7siYT7gftyuxnrnjWVZjsdzs1O6p+255BH9ThiOzQ53cPtK94Do7kyByvT45biJunt8ILZhyTy+J8tZ9kZ9+zt6n+vG6xER9jvbS3KaQleby/EnFAhNOHZfz8DJCHojcHXnvQpVOLaVe69UsF1/r3r8mQwE/abH92Qtd95o5wQkCB+N9eXO/ECAaL1/BBf3S2Pp9hb7SU/DcTjX267GPU7FfPOFuPXrEFzMF4lSpzbS6u4ub1eEnCyjz7frM7eam2Mf261Dl21q0fCAWNOJXyLMT6nZ+kVNtdatNacctcWGOa3jumrV/CK7/Ym6u2WYMlftdIP7YdU/dZZevChDN5S924M+RaHUH69HXxiokTk/V031y1pbnNViwI3H3azHta66XL/IGRXi+VD9atixRjdPLpaKS/RQ5jd69JPf8frrvTqgHd5/0+R8d7M23KfMId2cdq1d/fBeeTK1ynyZbtyjp4a8qItS8lS2t5uDAtEn4j0TtKiiRtXrHldBasudf5Syip9VRe1aLckcGcL9JJzrbVf8EKUt2qD66g2BU8e35Mkq1tqKKm1Ykhl5c+ayXba0p05yq7kVpsFQjfXLNOTF6Uq5oUx7w2YHRl+KMwnZXg9P/h3yXpGm3DOXq35VZosggMhmg3HaUil/hR64/VJ5IqzubpsJxncqbeHnyl/3gG4f6wlx4O9/ZhDjFcmLdGbpb7Qqc5gtBVqg3kZEM4Oas5ScO1il9cuV6TnJliNWhNFxOzjytO2R054zB+nL9joiXGDanPmafO7TOnP5Wj16Z3QE46bprKbr3DVf0/KqR3RnxAdjO5vBRK/qjms9GaQzB51qryN2UW8jwh2oVGFiOzNeeAZr0JejrXkDnRFG73q8Bo6dqrzUt7TmxT/ZEdZH5Kt6TmvKL1DejAvU0YkkESH876rshgyNuW6rLq7wanFIf9btP/69Zboh5SJdt/kSVTx9j52JI9IN1tgZ1yi1vEwvbrFTGvn3qmrlcypPvUYzxg5uKkMMo95GhBt4gWbkXaDyNa9oi50Zw+/7nVaueUupeVM1diDhOCaZbhXhpLH+DWdlYBaBpk73nqxlTnnLkdaIYMEBE8EBFa2XOU5p/Wd23UgSHMjU1ja5S1apU2/XjDyHnfrq1XZkuNmeUU5W8auRN2gJvYp6GxGtsd6pXhmcwcVdPFlOcXnLGTIQa8K/zzEAAADQR/i9oIf27NmjqVOnauvWrbYEABDuli9fHlgAoDVajnuorKxM06ZNU2lpqTIzM20pACCcxcXFBS45BAJojZZjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY67q6FOlWVP6NdLfxy4OW3aNMWNL5S3sk4NgZIW/DvknZiouMQFqjzgt4WtBNeZ6FVdO6sAAHrC71bdVSrzFspjS+Li4pSYvVQvHFd3+3WgcoES4xI10bvDvdWOA5UqTIyj7gaiCOG4y0zlWqbCyalKn3ajfv5ff7Plrqoi5aYnKym3THupJAEgfPh92vzg9UpKHq9puUXy2WLDtzpf09NTNXnBa/JRdwMxj3DcRX5fhRbNuUVFVaNVUFKh2oONchzHXRp1sLZCJQUZ8nlv0bXLNh/fggwA6Acfq2bZDboob7V8qQUqqajVwUC9bZbDqq8uVXHWGapanK1Z1N1AzCMcd8nH2vLLh7TYDcbzK7xanJOmpITgSxivhKQ05Sx+XKU5biW7bJ02t9eFAgDQZ/x1ZVqQ/7I8WSu1fcNi5aQlKcHeJ50sT0qm5j1aouJUUXcDIBx3yYG39Pwyt4ItKNRdaUPafvHihymj8BGVLs/QUF5dAOhnh7Rz06sq1yTl3TZFI5sbNFpJOE/XLH2SuhsA4bgr/Pt2aavPo9HJiS1aHVozLcipysxMbdGqDADoF/5d2vTcJsnzbV1wzkBb2BbTgvwD6m4AhOPO86thz05tU6LOG/7V7r1wvsVKP31AYHT0ccuAc5Vb3nKICACgxxrqVbvNrVtHj9DQboVen8pzz9WAtupts5yeriKqbiCqEI4BANErIVHJo4MTtwHAiRGOOy1eCUNHaLTqtXXX++3PedkRz3xV7A/ObtFqadyukozWFfgR+WrWqHB8om2lmKhCb6XqGhgsAgBdsm2n9nSr7vQoo2S7Gtuqt82yv0IFratuv081qwo1Pti63N4c+ADCEuG4C+JHXKKZGW4d+/qfO5wL01/n1cQTTRzfCf69L2nh5CLtm12ug2aquO2ztG/htZqzoppKFtHp83r94ZdLVTj3emXftFJ//MSxdwDdFD9c42aOk3zl2lj9oS1sSydP+nFCR7R33f2aPP99zd6+3w3Q+7V99vtamJ6nFTUf23UQuxx97vuDfrn0Ls3Nvl43ef+oT+w9CB+E466wlazP+5gerdrbduXpf1frljyoco3TzHHDe/ACH9LOjc/Kq8nK/uG3lGBarkemacqEL6lq2x4dtGsBUcP5WH/8+R2acG2+ih6rkO+sc/XNU+PsnUB3naIR4y5XhmpUdO8a1bTXetxQrcfvXSlfT+tu/zva+FiZNPsa/XCkGQA4UCOvmKQJ2qFt71Jzxzqn4S39fO7VujZ/iR4r+0hnfXuYTrX3IXwQjrvErWQnXqUcT7kWp+dovvcl1fiO2PvMmfMq5Z1/o6Z5P1Bq8TzNSDrF3tcdpygp53k59YuUNtC8TUfk2/yi1r92qnKmpOhrTSsBUcLRoT8/r39fsDbwq0jChDwtunGMBpKNEQLxSZlaVDxJqsrTmMnzW3VxOKC6Sq8KJ09VfpV6XnfHj1TOxnrVL0lzY7HLnJnv2fV6zXO5plxEzR3bGvTnp4q14MVd7vVhmnD3fN2YMlhUc+GHcNxF8UOm6qHKlcpyA3JR7mSNSfyi7Q88QKclpyu3qFyerMXuN8MxHUz31kW+MmXHfVGJF92i1ybM1ZyLPbxxiC6fbdfTP1msFwPJeIruXpSllIEDmu4DemyQUvIeU8X8jObT/J8W7A8cd7qS03NVZIJxwXI9FrK6+3O36p6ruAGJuijvLU3Iv1oXe0629yH2OPqs7nn9JP85GgAiABmry0z3hmz9oqZa69YWuyHZFhvmtKTrqlXzi+z2J5rvDk+mVpmBH4179NSQF3VRSp7K9gZbrIFI95nqNyzXvPWmNeUrunh+Ia0pCL34IUpbtEH11RsCp/lvyZNVrLUVVdqwJDOEcxyf5FbdKwKD9hrrl2nIi9OVckOZ9vZkIAoil7NbGx4o1vrATxYZmv+/aAAIZ3HuB5cRLxHEDPa7InmRziz9jVZlDrOlQORyPqzQ/EunaskO96gxcqEqXr9HaYM5aCCaHFKdN0vJuYNVWr9cmZ6TbDliQ6M+rLxHl6bfpx1K0MjCdXp9cboG0wIQtmg5Dlvvq7JwjOImelV3XEvDIJ05iC78iAaf6H/WefWoCcYaqevuuU7fIxgjkh2oVGFiOzNeeAZr0Jc57Macz2q17uGn3GDs+so1uuemSwnGYY5PadgarLEzrlFqeZle3GKn//HvVdXK51Seeo1mjB3cVAZEMOfD/5K3+EXbB+8m3TH5LNGmhog28ALNyLtA5Wte0RY7M4bf9zutXPOWUvOmamxggDViR6M+/N0zKg50GxumCffcqMlf78lgffQFPqVhK14JKTfr6eqZem/et5oGjgy4XKsG56l2w+1K4dz/iBiH9d4ffyXvw4/ql3+o1+e21MzAsvu1p22r8SW6+a6Z+vaXaE5BpDOD/55Q9XX7NO+0AYG6e0DKUxq84FfaMG9s6AZqI7x8/jf98eVVevjhZ/UH32Fb6HL+oteefKap1Xhktu669p/1pcAdCGf0OQbQuz7cqDtGXK6HPnKvJ0zXw5se1y3/PEhxR7bq4fFpuv33HylhSolq1l6vpC8QjgFEmka3mivUiMv/PwWquSsf1aZfztE/J8TryB+Xa/x5t+n3Gq4pJS9rbc639IWmP0IYo/kRQO8a/H3lPXm7zjHXG9bqtqsW6eX6Q/rkrVf0hBuMTV/j6VmX6RyCMYCINECD02/Wk3NTArcaXizUVT99RfWff6y3Xipzg7HrK1co6/JzCMYRYsA9LnsdAHrBSTp95Hf0vTPe0VOv/FlH3v+Tqj8ZpFP//LR+sXmfNCpPP18yScMIxwAiVfxXNDI1RWf8d7leqf2b3v9DnT4ZFqc/F63Q5oYEjVq4VEsmfYNwHCHoVgGgb3z+/1R263RNW1FjCwyPJvy8XC/PHcVBA0CEc/T5X/6Pbr0sWyv+JzChsZWpn//3as391pftbYQ7ulUA6BsnfVP/+rP7dOfIFkOSEtI1O4OfGgFEgzid9PUr9bNHbtZIW2IkTJ2qjJEE40hCOAbQZ+L+8TLd9R9HDxwJk/9F3//mF+0tAIh0J+kfM27Tf9x5sb19tiZfNU7fJG1FFLpVAOhbToN2b6vV3z77ggaffa6+OYh2YwDRxWnYrW21f9NnJ52hs//pGxp0EmMqIgnhGAAAALBo6AcAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAAAAwCIcAwAAABbhGAAAALAIxwAAAIBFOAYAAAAswjEAAABgEY4BAAAAi3AMAAAAWIRjAEAIHJGv5iV5CycqLi6uaUnM1tIXqlTX4LfrWP4d8k5MdO9foMoDre4LCq4z0au6dlYBgN5AOEYLXTi4ufx1Xk1010ksrNQBW9Za0zqJmujdIY5vQJTy71XlgslKHDNZuUXlttDlW6386eOVPPleVfqO2EIACG+EYzTh4AagWz5WzbI5Sl9cLk9WsUqr69XoOHLMcrBW5cVZ8lTdo2sXvqS9fEMGEAEIx3BxcAPQPf66Mi3If1menFK9+Yt5ykzxHD2wJCRpwryHtKF4knzeRXq46n17BwCEL8IxOLgB6KZD2rnpVZVruu4r/IGGtHlEGaTzr75Jy5bl6ZLTP6N7FYCwRziOeRzcAHSTf5c2PbdJyrhc40acYguPFz/kB7rzzlma0vKLNwCEKeqpWMfBDUB3NdSrdptPnvOG68zuVAy+xUo/fcDRAcAtlwHnKrfcZ1cEgL5Dzol1PT24uXxF6Tq9rYObuwxIzlWL4X0AAABhjXAMAOiehEQlj/bYG93gma+K/Y1Ng39bL43bVZLRg8cGgG4iHMe6nh7cXJ6CCu1v6+DmLo21Jcqw6wGIMvFf1fDzEuXbukv7OhyMcEB1lb9rc770rvD7XteD2aObfpkyc7C/VqcGex8AhArhONb18cEtwO9TzapCjbddLxKzH9Rrde2dRgRA+ErQ0OSzpPJXtWnnIVvWhgPVKrn2e0qetrL7Z7tr2Kxls7L14pBlqm88rPqnztLLGXlaUfOxXQEAQoNwHPP68OAWcER7192vyfPf1+zt++U07tFTQ15VRuoCle3lJCNAZDlFIyZepRzPWi1c8qt25kE/oB0v/FJrfKOUMyddI7p11PHrwOZ1WlZ1gWZf91154k+WJy1Ht2bt0LLn32r3DJ0A0B2E45jXVwc3y/+ONj5WJs2+Rj8cOdDdA4co7dY5yvK9qvVv/NWuBCBSxA9J0015Zh70abrw+qUqq/E1T/fo99WobOmtSsv1ypeao5syhnXzoBOvgWmLVO88r5wkO6uO/+/6eN8nTdcBIIQIx+ijg5sVP1I5G+tVvyRNbjQGEPEGKWXuUpUWZMi3Ol/TxiRqQHC2msQxmpa/2q077lHF0zcrJSFUh5wDqlu3WmvKL1DejAuoSwCEFOEYrv44uFkNO1T2H49pdepsZV/8NVsIIKIkjFTmkrWqrXhWxVmjbKGRoYKSCtVu+KnSPCfbsh46UKnCxNMDXbxUMFPjE79k7wCA0CAco0lfHtwCPpevbK7iTjtX04rqlXXlZTr3a6F8fAB9a6CS0mZq3qptLWas2aglOWlKav2l2v6C5NQvUtrAdg5DwXU25iip5SoD07Sk3n3sxjf10wFPacysR1UTioHCAGDFuRWYY68D/cLve00LZ2Vr5VnL9eYTme2cwhoAjvV5zVKNHPOy5lZv0LyUBFsKAD1DDEG/i/d8V9fNHieft1xv/PVzWwoAQfaXpsQFqjzQupX4HzT4tJPsdQDoOcIx+lagv2CiJnp3NA/6a+YZrEFfZpcE0NpJ+tpFGcrRBv3y17ub6g7/Xv1n6Wv6JOcqTRxhZ7AAgBAgiaBvDbxAM/IuUPmaV7TF9hP0+36nlWveUmreVI1tr/8hgJgWP2SqHqpaqnPX/0vTgOEBl2vV4DxVPTSVrlgAQoo+x+h75gx5a/5D864rUpW57clS8aqfaO6EJNFrEAAA9CfCMQAgpMw0kAaHFwCRiB+j0CZzcAse4AAAAGIF4RgdIiADAIBYQjgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAITEp59+qtWrV9tb0uuvv26vAUDkIBwDAHps69at+v73v6/s7GxbIo0bN04FBQX68MMPbQkAhD/CMQCg20xr8aJFi3T++efrzTff1JQpU1RbW6vS0tLA/cXFxbr88stVVlYWuA0A4S7OcdnrQLO4uDh7TWIXAdCW8vJyLVy4MBCKjVWrVmn69Ok69dRTA7dNi/EDDzwQCMjGj370I919990aOnRo4DYAhCPCMdpEOAbQnq6G3tYh2rQqX3HFFc0hGgDCCeEYbSIcA2iL6R5hgrEJuhdeeKHuuusuZWZm2nvbZwL1ihUr9JOf/CRw23S/KCoqUlJSUuA2AIQLwjHaRDgG0NKePXv0s5/9TE8++WTgdn5+fiAYDx48OHC7s8zAvRtvvLG5FfmRRx5Rbm4urcgAwgbhGG0iHAMwzIC7tWvXNs9CYVqL77vvPmVkZARud0dbj/n444/rvPPOC9wGgP7EbBUAgDbV1dXp6quvbg6x999/v37729/2KBgbppU4KysrMKuF6V5hWpHNbBdm1gumfQPQ3zofjv0+1ax/QoXjEwOtimZJzF6qFyrr1GBXaebfIe9Ed73EBao84LeFrQTXmehVXTur9AW/r0brvYUab7cpLm60spc+p8q6A3aNo/x1Xk00211YqePvbdK0TqImeneoHzerm47IV/OSvIUT7e0mS1+oUl1D5G1Ns67suzqkOu8Md50xKqx835a1Flxnhrx1h2xZ32PfRW8xLbvLly9XcnKy1q9fH2jZ3bJlixYsWBDS7g+mv/EzzzzTPO2b6Y9spn0zA/gAoL90Khz7fa9pQXqKxky9UUVVPlsq+Vbna3p6qiYveE2+iDuaukGw8mdKTxyjqblFqrKl0ttanX+V0pOna0Hl3tgJCf69qlwwWYljJiu36NgDU/708UqefK8qfUdsSeRg3wW6Jngyj1tvvTVw20zPZlqLe6vLgwnbZkDf7t27A7NemFbkiRMncvIQAP3mxOG4YbOWzcrW4qozlFVcqur6w4E+qI7TqIO1r6o46wxVLc7TwnXvRtDB2K+Gmkc1K/0eVXmyVFxarfpGs01m2a/a8mXK8pRr8bWLtW5v5AXCrvtYNcvmKH1xuTxZxSqtrldj4LVwl4O1Ki/OkqfqHl278CXtjaTExb5r/wY4MRNETSBtfTIP0/2hLwbLmWngnnjiiUArsmmpNtPEnXHGGZw8BEDfcw+qHfjUqS2Z7kijnJzSXY4bmI538A2nONXjyDPfqdhv12jc7pRktCprLbhORolT284qvab5+d3slO45bAtbanQOVi9zUt2Xx1NQ4ewPltaWOBmtylprWsfjZJRsb/v1CkPN25VT6uxp80l/5FQXT3L3gxSnoOI9WxbuurnvNv9dR9saXGe6U1L7qS3rI+y76AUbN2503EDq7tMKLG5Atfec2CeffOK4ITrwGObv2lo2bdoUWKezPvjgAyc/P7/5+fzoRz/q0t8DQE903HLs36VNz22SMu5U4dRvtN3MnHCerr7jJ1r28Did/vfPbWF48+/8vZ4rdzfrvls0dcjJtrSleCWcn6k7li3Xw5ecrr9H9e/Th7Rz06sq13TdV/gDDWnzTR6k86++ScuW5emS0z+LjFZW9t0Y2HfRU2Z6NtNabLoxmNZi063BdG840bzFpuvF6tWrNXXqVH3pS18K9E02jzFt2rQ2l3HjxgXWMX3jzb9n+hR31GXCTA9n5kB2Q3WgFdlMH2f+3vybpj80APSmDsNx84F45iUa0e6aJ2vIlJt15w9/oBRPWwfrcBMMg+M0c9zw9l+A+G9oyp0364dTUuTp8FWKcM0h8nKNG3GKLTxe/JAf6M47Z2lKiqfjnSZMsO/GwL6LHjHdFYYNGxbovmAC6MaNGwPdGto7y50JpeZvTCA2XS/MDBZmsJ5humCYeY9LS0uPW8w8xuY+828Y5t8zQdp0mTBB+fXXXw+Ut+XSSy8N9Hc2s2QY5t80s2eYWTQAoNfYFuQ2NDr7K+Y7nu78lB786df+JNbh0ufdKt5zKgpSOu7y0Y7gT9NtbscxSwT9NL2/winwdPxze+Tpwb7b3GWirfe19dLX3SrYd9FzpnuC6aYQfM9N9wXTjaE9ptuEG3KP6XZhrruh19myZUvg/s7avXt3oPuFG3abH8ssbrgOdL3oiPm3zHrBvzGP0ZV/GwA6i3YlAIgBpuXXdEsw3RNMNwXTkmu6LZjuC+2d5S44c4XpGhHsdmH+ZvPmzbrlllsCM1h0ZbCeaZU2cySbKeHcQB5oWTbPw7RAm64XpiXZdPVoi/m3zLRvZvYMw0z7Zp6beY4AEEodhON4JQwdodH2Vrd45qtif6MdSd9qadyukgyPXbEvJWho8ln2evd4Ciq0v61tcpfG2hJl2PUiQkKikkf3x/vQm0Kw7ypFBRXvtfkeO86nqi2ZbtfrS+y76B4TINs6mYfpttAWE6TNCTlaz1xhul209zddZQK56dtsnkcwJJsuF6arR3vzHLc8eUhw2jfzHE2oZto3AKHSYctx/JnDdZ6nXlt3vd/xIKyGOlW2eUKFrvP7NmtV4cTAwI2mkxpsPOYEFMGTOHRnaXKyzhw+Qh7fTu3a19FUV353s37X5gkVuu6A6l57UNmJwecS2u3q7hIQ/1UNPy9Rvq27tK/DN9ndhsrfHXcykLYet78Xo+/3XbO/bNTS7NHNzyMx+0G91mr/afk8u7I06Y9915wYZs3RE6gkZmvpa6H5rKP3tQy5pnU2GHI7OpmHabk1Qdq0zBomuK5bty5wwo7eYJ6HCcmvvvpqc99i0yfZnISkvcF35rkEp30zTKjm5CEAQqXjbhWBVkWp/Lnfa2e7CcOvA5tX6tr0VE3r6Zm1/O9q3cJczd83S9sPNqqxfpmGvHy9Um9fF8L5dYOtipv03KZdHTzfD7W55E6lJ/+oh2dBc1+fygeUmvGqzly+XQdNC12vbFd32dbI8le1aWcH23mgWiXXfk/J01Y2n9HwaGgLQ3297x6o0r2p1+vlM3+mWnffdRr36KkhryojdYHK7HzDPX+9+nrfdV+hvS9p4eQi7Ztd7u67h1X/1Fl6OWOabi+LpLmhY5MZ6Ga6HQRDrumOYLoldBRyTTA2QTUYpDszc0WomJZkE9rNwEDDnITktttuazcgG+a5medoBvyZVmQTqm+44YZ2u2YAQKc4HTrs7Cm92fF0OFfsNqcka9Sx8652c57jpkFDLQdRfebUl85xpDlOaf1ntsxNl3ZARleWYzTuckpzWj3nYzQ6B7evdLLMQLUWc/8GBzV1ba7YvzilWWc7yip16gO3jeCAsWMHdLX1vHtraalxT6mT02pbj7Xf2V6S0+Z+0NZj9+dyVDf33W7Nc9z2fto02PHYAW5tPecTLcfo033Xbucxn+O29meEk+7OEWwGvAUH3Zm/78/BbmbgXvC5mOffmefSk7maAaClE4RjV/BECW7IyCoudarrgwfkw059dalTbMKFe0BNLX7DOWjv6W44Pl47oaPHjp4oQZ4sp7i02qkPPofGeqe6tDgQLqRJTnH1R/aOYHjoasBoS9vhuP8ET/LhbltWsVNaXd/83Bvrq53S4iz3ubqvR+oyp/pg+1sVdrqz73YrHLejjXDcc/297xKOw1kwGHY1ILYMo2YWinDQnYDc+ouBWQCgqzpRc7gH49pSpyAQMo6teJsWN1zMLz96gDZCEo6D/+7Zxz9+SOx3akvnN4WMNpcMZ37FnmNCQugCRven5Oo1B7c7pQUZbbwOdkm9x6loDpeRohv7bsjCcU+mkzuR/tp3g//u8Y+P8NByP+hoeraWzHrhFoyDWgZkM3VbZ5lW8JavBQB0RSemcotXQlKmlmyoUsXaYmW1nNggtUAlFVXasGhCiE82sFtl2Uk6LXmaimov1ZVTR+lrIX18Y6CSMu/ThtrfaG1xlo5ulsfdrBJV1K7VorQhJ+iU3R1+NdSs0b1Fh5WzfI5SB4b+X+iWhJHKXLJWtRXPqjhrlC00MlRQUqHaDT9VWkScKKOl/th3rYZqPX7vSilngW5L/aotDJV+2Hd9ZcqOO13J0xarNutKTT33H3rhs4FQam96tpZMf97CwsLmadrM9GzhxEz9Zk484gbkQN9pc70zzLRvANBdcSYh2+th6Ih8lYs1K/0FnVX6kp7IbOc0wBHEv7dMN1x4tz6/7xk9mjNKCbYcUcT/rspu+Bfd8vk8VT46WyMToihG+veqcmGO0leeo9I3lymzzVNYo7+0HPTZmardzHtspnczg+/MYL32ZrDob2YqOjPjhmFm2+jMzBldfS0AICjMj9ony5M6U7MzPpB3fY3+aksjk5leq0zzry3QO9ct0wPXEYyjUsMOlc2/UdPe+aGeeuDq6ArGRvwQpV43Uxm+V7X+jcj+RMY6cwrm4LzHZtq0cA3GhmkJDp78w8xp3NEMFgDQU2F05DZTni1QYtyMNqef8pw5SF+21yPPAdWVLdTk5Lu178pVevq+XvopH/2o6ctP4eQ03bLvSr3x9PwI7IbS2vuqLByjuIne5un7jhqkMweFb5jCiZmQaZi5gk33hXBnTv5hun6YaeZeeeUVWwoAoRdGES1eA8dOVV7qW1rz4p/sSQaOyFf1nNaUX6C8GRdoYKAs0hzR3rIFSp22Uiou0aN3XkowjkL+vet0e+o0FSlfGx79scZGfDA2BmvsjGuUWl6mF7d83FTk36uqlc+pPPUazRh74j6tCE9mDuTgXMZ9NY9xKJj5jA1zOmvOiAegt4RXTEsYq7ynn9Z17/1Up5mzccV9USmrBmpB7dOalzLIrhRhDmzSw7c8Kp/7X1X+RXa7gssIZZfttisicr2vqocXyetzr1blacxpA1q8x+6SXea++5EoXgkpN+vp6pl6b963mrZlwOVaNThPtRtuV0q0dRmJEaZLwp133hm4fs899wQuI4Xpa/zII48Erj/tHisAoDeE+YA8AEBnmS8wQe1V7abVeNy4cYFW2KKiIlsaOUyL8RlnnBG4/sEHH7Q7K0dnXgsAaAtNP2iTOYCaQToAoktxcXHgctasWYHLSGPCcLD1uKqqKnAJAKFEOEabTH/EW2+9NTCiHUB0MJ/nYF/jSJ4LeOrUqYFLMxUdAIQa4RgAYkR5eXng0sz8EMnM7BrBmSvMHMgAEEqEYwCIEcGW1tTU1MBlJJs+fXrgctOmTYFLAAgVwjEAxIA9e/Y0nya6M6eWDndjxowJXP76178OXAJAqBCOASAGbN68OXD53e9+N3AZ6UzAN32nTdcK5jwGEEqEYwCIATt27Ahcfuc73wlcRoPLLrsscLl9+/bAJQCEAuEYAGJAsOV42LBhgctoYE4KYvz1r38NXAJAKBCOASAGBKdwO/XUU21J5Bs+fHjg8g9/+EPgEgBCgXAMAFEuOF95sKU1WgRbwT/66KPAJQCEAuEYAGLE17/+dXstOgRbwZ988snAJQCEAuEYAKLcJ598ErhMTEwMXEYT01UEAEKJcAwAUe6dd96x16JPtHUVAdD/CMcAAACARTgGAAAALMIxAES5hIQEew0AcCKEYwCIcsH5gKNRcXGxvQYAoUE4BoAYEa0ny7jwwgvtNQDoOcIxAES5r371q/ZadNmzZ0/gMjU1NXAJAKFAOAaAKDd48ODAZbR1QXj//fcDl9F2chMA/YtwDAAxID8/P3AZbG2NBsH5m6Px5CYA+g/hGABiwKhRowKX7777buAyGgT7UAe3DQBCgXAMADHg7LPPDlz+9re/DVxGg2A3Ec6SByCUCMcAEAMuuOCCwOW6desCl5Fu69atgctgdxEACBXCMQDEgFNPPVU/+tGP9OabbzYHy0i2adOmwOVll10WuASAUCEcA0CMmD59euAyGCwj1aeffqrVq1cHro8ZMyZwCQChQjgGgBjx3e9+N3B566236sMPPwxcj0RvvfVWoAX8/vvvb56mDgBChXAMADHCdK145JFHAterqqoCl5EoOBDvBz/4QeASAEKJcAwAMWTWrFmBywceeCDQPSHSvP7661q/fr2mTJmi8847z5YCQOgQjgEghphuCKY7gumWUFJSYksjgwnzwVZjZqkA0FsIxwAQY+bOnRu4NH2PI+mMea+88kqg1djMunHppZfaUgAILcIxAMQY03q8atWqwPWf/exngctwZ0L8tGnTAtdpNQbQmwjHABCDzLRupt/uk08+2TwtWrgy3SluueWWwHUT6jkjHoDeRDgGgBhkZq4oKioKXM/Ozg4MdAtXDz74YHN3iuBczQDQWwjHABCjTAvsxo0bA9fHjRsXlv2Ply9frp/85Ce68MILdffddwdCPQD0JsIxWjgiX81L8hZObB4Rnvz9/6WlL1SprsEfuN2Sv86riXFxSiys1AFb1lrTOoma6N2h4x8BQG9ZtGhRp6Zqy8jIaJ77ODMzM6wCsgnGZtCg8fjjj2vo0KGB6x2pq6vTDTfcYG8BQNcRjtHEv1eVCyYrccxk5RaV20LXvl8qf/p4JU++V5W+I7YQQDj65JNP7DUFWlu///3va+vWrbakfaY/rwnIZno3E5BNwOxvLYOxOd31ieY0Dp5SOjk5OdCP2rQ0G47jBC4BoLMIx3B9rJplc5S+uFyerGKVVter0T2gmIOKc7BW5cVZ8lTdo2sXvqS9NP8CYct0OTCf29ra2sBgOxN2zz//fBUUFJzwdNEtA7IJmOXlLb4k9yETck2rd8tgfKJp20yYv/rqqwN9pw0zj/Nvf/tbgjGA7nErD8S4xtoSJ8PdFTw5pc4eNxUf7yOnuniSe5RJcQoq3rNlLf6uoMLZb8taa1rH42SUbHfafGgAvaa0tNSkw8By4YUXOhs3brT3tM8NyM1/44ZM55NPPrH39D431DtuqG9+vm4wtve0zTw38xyDz9f87ZYtW+y9ANA9tBzHvEPauelVlWu67iv8gYa0uUcM0vlX36Rly/J0yemf0XcYiBCmi8Tu3bsD8wKbFuGJEycGWpE76ldsWpCDg/SCXTN6eyaLll0igqeGLisr67DF2Dwn89zMczTMFG/PPPMMp5QG0GOE41jn36VNz22SMi7XuBGn2MLjxQ/5ge68c5ampHjYaYAIYgaxmSnbTOA1/XDNYNthw4YFwmd7zCA9E6rN1GkmVJuZLMwgt870X+4KE4rN8zAht2WXCBNy2xt8Z7qHmIBvnpN5buY5mm4kWVlZzGQBIDRsCzJi1f4Kp8DTcdeI9gS7VZjdqOOFbhVAOPjggw+c/Pz85s+m6YZgujJ0xHTNMF0cWv6N6Z5hHqu73OAd6L7R+nFP9FzMv9vyb8xzA4BQoxEQAGKEOW20aUXesmVLoBXZdGEwXRlMl4b2pn0zXTPM4DY3iDb/jemeccYZZwRak83fmi4OZlBcW49hWnrNfWaAnxloN3bs2EDLtRlwZ1p+TRcKM+hu3bp17Z75znQDMf+W+XfN35huIqZl2zw3AAg5G5IRqxq3OyUZnh61HDMgD4g83RnMZv7GDJL70Y9+1Px33VlM669pOT5RS7HRnUGFANATtBzHuvivavh5ifJt3aV9HY60O6C6yt+1eTKQLvP7VLOqUOPj4hRnTiKS/aBeq2vvNCIAeoPpn7tgwYLmad9Mi7CZ9q2jk4eYvzGD5J544onAnMqmBdoMhDMtuaZVuT2mX7BZx7Q+m39v8+bNgYF/7bUUG6a1eerUqZo2bVrgtumL/Oqrrwb6QwNAr7IhGTHrU6e2ZLojTXdKaj+1ZW2wfZOVUeLU2ibg7rUcH3b2lN7seDw5Tsl2968a9zgV8zMceW52SvccDqwBoG+ZFmE35IZFC21bz4Xp2QD0JVqOY94pGjHxKuV41mrhkl+1c5KPA9rxwi+1xjdKOXPSNaIne43/HW18rEyafY1+OHKgmQZDabfOUZbvVa1/4692JQB9ybQIm9keWs5QEZz27UQnDwklMxtGy5krzElJTH9npmcD0JcIx3DzaZpuypskn3eaLrx+qcpqfM1zGft9NSpbeqvScr3ypebopoxhPdtp4kcqZ2O96pekyY3GwLE+r9cffrlUhXOvV/ZNK/XHT0zjIfqKmT7NdJkw3R8MM+3b5Zdf3uG0b6FgunGY7hymW0dwkJ7pfmG6XoTd9Gzso0D0sy3IiHUHtzulBRnNP2Uet6Te41TUH9vtISQD8oL/bhuPjxjj/8jZ+vB0JyGwzw1zJhT/wdnvt/ehz7We9s0MwjNTsIVa6+nZTJcK07UiLLGPAjGBlmM0SRipzCVrVVvxrIqzRtlCI0MFJRWq3fBTpXlOtmWh8Ll8ZXMVd9q5mlZUr6wrL9O5Xwvl4yOyODr05+f17wvWqsG9lTAhT4tuHKOBcU33ou8Fp31zw2tgsN2TTz7ZfPKQ9gbsdUXwZB7B6dlMdw7TrSN8T+bBPgrEijiTkO11oF/4fa9p4axsrTxrud58IrOdU1gjqn32Z3mnT1Lu+l1u6pii4t949W9jBovcER5MkF2xYkXzqZpNtwcTnDuabaIjJmAHZ6Ewwfuuu+4K/zmL2UeBmEEMQb+L93xX180eJ5+3XG/89XNbitjxmeo3LNc8Ezr0FV08v1A3phA6wolpRTbTvrU+ecjy5cu71IocPJlHMBib6d3M9GzhfzIP9lEglhCO0bcOVKowMVETvTuaB/018wzWoC+zS8Ya58P/1MM/WaOPzI2RN+u+uWP5qTpMmVkjzOwRZm5jw5zlzswuYWaZ6IgJ0OZMeqZbhumeYQK26a5hWp9N8A537KNAbCGJoG8NvEAz8i5Q+ZpXtMWeUMTv+51WrnlLqXlTNXYgu2Rs+UT/s86rR3eYXpwjdd091+l7gwc03YWwFJz2LXjyENNfOHjykLamfTMn87j66qubp2czJ/MwATtyTubBPgrEGpII+tggpeQ9oerr9mneaQMCZ8gbkPKUBi/4lTbMG6sEuxZig/Phf8lb/KId4HST7ph8lk5qugthzvQ3fuaZZ5qnfTP9kc20b+Xl5YHbprXYdLsw3S9MNwzTWmy6ZZjuGeE54K5t7KNA7GFAHoBedljv/bFCG377//TFsf+qmd9JtOHiiP7y3I/1T1d53eBxiQor/o8Wp/0j/TgjkOlL/LOf/SzQZcIwrcR/+tOfAmHYMN0wpk+fHsahmH0UwFGEYwC968ONumPE5XrIdNhMmK6HNz2uW/55kOKObNXD49N0++8/UsKUEtWsvV5JXyB2RDLTarxw4cJAVwujp7Na9Bn2UQAt0K0CQO8a/H3lPXm7zjHXG9bqtqsW6eX6Q/rkrVf0hBs6TD/O6VmX6RxCR8Qz/YjN7BM//elPVVJSonXr1oV/MDbYRwG0QMsxgN7nfKw/Lr9R424zJ1BI0Dlz79edX1ipmx7ZIo1apP964y5950sED/Qj9lEAFuEYQN/4/P+p7NbpmraixhYYHk34eblenjtKX7AlQL9hHwXgolsFgL5x0jf1rz+7T3eObDEnSUK6ZmecQ+hAeGAfBeAiHAPoM3H/eJnu+o+bNdLeTpj8L/r+N79obwH9j30UAN0qAPQtp0G7t9Xqb599QYPPPlffHESbHMIM+ygQ0wjHAAAAgEW3CgAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAACARTgGAAAALMIxAAAAYBGOAQAAAItwDAAAAFiEYwAAAMAiHAMAAAAW4RgAAACwCMcAAPS6I/LVvCRv4UTFxcU1LYnZWvpCleoa/HadoEOq885w1xmjwsr3bVlrwXVmyFt3yJYBCIWoD8cffvihXn/9dS1fvlzjx4/X8OHD9corr9h7AQDoZf69qlwwWYljJiu3qNwWunyrlT99vJIn36tK3xFbCKC/RV04bhmGp06dqjPOOEPjxo3TrbfeqqqqKr377rv6wQ9+oNWrV9u/AACgt3ysmmVzlL64XJ6sYpVW16vRceSY5WCtyouz5Km6R9cufEl7WzcgA+gXER+OOwrD69evD6yTn5+v0tJS1dbWatOmTYGy7OzswN8AANBb/HVlWpD/sjw5pXrzF/OUmeI5euBNSNKEeQ9pQ/Ek+byL9HBVe10oAPSliAvHn376qbZu3Rpo+e1MGDbfzouKipSZmamkpCRdeumlzQHZ/M2iRYsCjwkAQGgd0s5Nr6pc03Vf4Q80pM0j7iCdf/VNWrYsT5ec/ploPAb6X9iH45Zh+IYbbtCXvvQlnX/++YGW32AY/tGPftRuGG6LCci7d+/WhRdeqJ/85Ce67bbbCMgAgNDy79Km5zZJGZdr3IhTbOHx4of8QHfeOUtTWrYqA+g3cW6YdOz1sGBCqgm5f/rTn/S73/1OTz75pL3nKBOGv/vd7+rb3/62kpOTdeqpp9p7umbPnj2BEP3mm28GHvPuu+/W0KFD7b0AAPTAgUoVjkzXmtkV2rEkTQNt8YmZmSiylJy71t7uyHSV1K5WTlL74RtA14TFl9S6ujqVlZUd1zIcDMYmuK5atUpbtmzRJ598oieeeEJZWVk677zzuh2MDROEX3311cDjm3/LBGUTmAEAABCb+iUcB8NwQUFBYK5H0/o7bdq05jA8ZcqUXgnDbRk8eLAefvjhQEA2LcgmIJtuHAAA9EhCopJHe+yN7khRQcV7TTNbHLd8qtqS6XY9AKHUJ+G4vTBcXFwcuN+E4UceeSQwUO6DDz7QunXrei0Mt8X8GyYgm+dgArJpuTYzYAAAumfbtm2B8RxPP/20LYlB8V/V8PMS5du6S/s6HGl3QHWVv2vjZCBd5/dt1qrmE42MVvbSjSF5XCCW9Fo4Nn2HuxKGb7nllsBAOdOS2x9MQDbPwTwvw8yAUV7eYrJ2AMAJmek1zSxAZkyIqU+vueaaQJc500gSexI0NPksqfxVbdrZwVnsDlSr5NrvKXnaStX1JMf639W6hbmav2+Wth9sVGP9Mg15+Xql3r6OOZSBLui1cGxOuBEMw2ZWiHALw+0xz2vjxo2B6xMnTmQuZADoJNOgcPnllwdmATJMd7WUlJRAlznTSGJmHYqtmYFO0YiJVynHs1YLl/yqnYB6QDte+KXW+EYpZ066RvTgqOzfWaHHvF/U7OxJGpkQr3jPeN1665Xyecv1xl8/t2sBOJFeC8ePPfZY4PK3v/2tNm/eHLZhuC0ZGRnHzIVsAjJTvQFA20yrsGkdNg0Kwdl/zKxDZryICcz3339/YD0z0Pr73/9+THVbix+SppvyzEk+punC65eqrMbXPJex31ejsqW3Ki3XK19qjm7KGNajg3J8Uo42OtVakvZVWwKgW5xesGXLFjM9nDNlyhRbEpnMdlx44YWBbXEre+eTTz6x9wAATJ34yCOPBOpIs5j6cuPGjfbeY7lhOXBMCK6bn5/v7N69294b5Q5ud0oLMpq3/bgl9R6nov6wXdn41Kktme7el+IUVLxny1oLrjPdKan91Ja11OgcrC11ClLPdlLnlzv1jbYYwAn1SstxcACGOVNdJDMDAs1AQtMtxPwsaAaXmP50ABDrTOuvaQU2v64ZpnXYTI1pfnlrizkp0zPPPBM4YZNhut0NGzYsUMdG/S9zCSOVuWStaiueVXHWKFtoZKigpEK1G36qNM/JtiwUdqssO0mnJU9TUe2lunLqKH2t134nBqKQDckh88EHHwS+CZsWhGhpaTWtG6blOLhdMdPaAQCtmPrPtPqa+tAspjXYtAp3hTlOtH4M80tdJGvZir5p0yZb2t8OO/UV9zipGuXklO5yaDwGOifk3yWDrcamj3FfTMPWF8zJQlrPhczJQgDEEtO6awbUmdbe4GBr0wpsBli3d6r+9pixJ+Y0/2Yue/PL3Pr16wNTaJoZjiLx1znTr7plK/qXv/zlwGX/O1me1JmanfGBvOtr9FdbCqBjIQ3HwcrT+Jd/+ZfAZbQIzoVsfjo0AdkcIJgLGUAsMCdGuvrqqwMD6gzTZc7MPGQaCnrCdF0zg7bNSZ8ME7rNbBemq0UkMI0kJtAHByKaaUrNQESzXX3PrwOVC5QYN0PeuuOnjfOcOUjhEtmBsGdbkEPCDMQwD+kGSFsSnVoOQAmfn88AILT6svtDKLpr9BXThcIN9M3P1SylpaX23n508A2n2AzAK37DORgoCHarmOQUV38UKAFwYiENx6YyM5VEuFZoodSyYjRhGQCiiQl7wTrOLKbO64txJKaRxYztCP67prElnMavmC8HwWOdWUygN18iwkVj/RvOyhYzY3iyljnltfvtvQA6I2Th2FQY5oNoKo1YYVqNgxUQARlANAiHKddaDm4ziwnL7U0R11eicRAhgLaFLBwHK41Y62ZgtjfYysFcyAAilQl/ppU2GP5Mvdbf9bkJ6sGZgoJ1bH/8MtlfregA+kec+Z/7Ye8RM7r4jDPOCIw6NmfDizVmUIYZmBI8M5QZuBctM3UAiH5mtoWFCxcG6jDjkUceUW5ubtjUY2aA3gMPPND8/MwAvunTp/f68zNn/jMD7sxsGkZ+fn5gvnszgxGAKBaIyD0U/PkrLAYk9BPzs2Pwp0hzyVzIAMJduLTMdkZftmyHYys6gL7T43BsfloKdisIp0EJ/cG8FsEDjXlNCMgAwlE49untrN7uE916QKB5nehCAcSWHofj4PRtpgLB8QGZ1gYA4aTlOAmzmBbSSGvYMPVs637A5nZPQmwktaID6F09DsfBb/BUIsdq2SpDQAbQ30zrauvZFiK93jahvqczSERyKzqA3tGjAXnmrEnmlJ/uN2w98cQTthRBy5cvbz6dqDkL1Pe+973AdQDoK+bMpWvXrm0+u51RWlqqK664ImoGDptj0Y033tg8YM8MnLvrrrsCp6nuiDnL6Z133tn8d/fff7/mzp17wr8DEN16dProp59+OnB53XXXBS5xrFtuuUXPPPNM4LoJygDQlzo67XM0zajT1dNQB0/7PG7cuEAwnmJP+7xgwQKCMQB1u+U41qdv6ywzFVBycnLgoFRUVGRLAaD3mPrZTH1mQqJh6unHH388ECKjnQm+ZjrN4Lab4Gvq3qSkpHZb0c2XBQAI6nbLcbDV2Px0BQAID3FxcYFW02A4NK2pplU1FoKxYeYgNmF448aNgS8FZo5i00BhXpcZM2a02YoOAC11Kxybb9/BvrSpqamBSwBA/zIB0DBdBUz42717t7KysmLypEQZGRmBLwWPPPKILZFeeumlQEvyli1bAgGaLhQA2tKtcPzKK68ELk2lQ+UCAOHHhL9YP5Ob+VJgxn60ZMaBxEorOoDu6VY4Xr16deDSfDMHACBSxGIrOoCu6XI4NlPfmD5cZvo2M8ABAAAAiBZdDscmGBtM3wYAAIBo06VwbKbIMSOgzQjgSy+91JYCAAAA0aFL4XjdunWBS6ZvAwAAQDTqdDhuOX2bOe0oAAAAEG06HY5bTt/GaF8AAABEo06H4+D0bVOnTg1cAgAAANGmU+E4OH2bOeNSrE8qDwAAgOjVqXAcnL7NnHYTAAAAiFYnDMfB6dtMMGb6NgAAAESzE4bj4PRtWVlZgUsAAAAgWnUYjpm+DQAAALGkw3DM9G0AAACIJR2GY6ZvAwAAQCxpNxybVmMzS4XpVsH0bQAAAIgF7Ybjw4cPBy6//OUvBy4BAACAaNduOJ44cWLg8oEHHggMzAMAAACiXbvh2AzAMwPxjODAPAAAACCadTggLzgQLzgwDwAAAIhmHYZjMxAvPz8/MDDv9ddft6UAAABAdOowHBvmtNGGCcgAAABANDthOL700ksDAbm4uFh79uyxpQAAAED0OWE4NrKysgKX69atC1wCAAAA0ahT4fiKK64IXJoTgjCtGwAAAKJVp8Ix07oBAAAgFnQqHBtM6wYAAIBo1+lwzLRuAAAAiHadDscG07oBAAAgmnUpHLec1q2urs6WAgAAANGhS+HYCE7rVl5eHrgEAAAAokWXw3HLad0+/PDDwHUAAAAgGnQ5HLec1q2qqipwCQAAAESDLodjIzit2wMPPBC4BAAAAKJBt8JxcFq3N998k2ndAAAAEDW6FY6N4LRuK1euDFwCAAAAka7b4Tg4rduTTz7JtG4d2LdvX+Dyo48+ClwCAAAgfHU7HBtM69axPXv26I477ghcP+usswKXAAAACF9xjste77JPP/1U3//+9wN9jz/44AMNHjzY3gPTF/vOO+8MvDazZ8/WY489FpjpAwB6S1xcnL0m9aBqjzq8LgC6okctxybsBVuPmdbtKBOMx40bFwjGZtq71atXE4wBAAAiQI9ajg1zIpAzzjhDF154oTZv3mxLY5cJwtnZ2YHrJhjfcsstgesA0NtoIW0brwuAruhRy7FhulIwrVuT5cuXNwfjTZs2EYwB9JutW7faa7HNjP0AgK7ocTg2Zs2aFbiM1WndTN/rRYsWBU6pbZhgbGbzAID+cv755wfqpVg9zb+pl8vKyjRs2DBbAgCdE5JwfN5558XstG6mAr7tttv0k5/8JNC1ZPfu3QRjAP3CdBn45JNPtGrVqsBtUy9dfvnlgZAYS0yr+dVXX61p06YFbptfN82gcbpUAOiMkIRj46abbgpcxtK0bubnOhOMzZcCE4zNAcicPRAA+ktwoLT5ov6jH/0o0OXNhERz2v9ob7wwreQFBQWBVvP169cH6uUtW7aoqKiI2ZQAdFqPB+QFxdq0biYYZ2ZmBrbXHIAefvhhZqQAEHZMg8XChQsDdZVhBgrn5uZGXX1lGiceeOCB5u00refTp0+nXgbQZSFrOQ62VhjRPq2b+cmOYAwgEmRkZOi3v/1tIBQbZmyEaciIll/5TGu4aRU3reOmTjZdKEyruTkeUS8D6I6QtRwbsTCtW3AOYyNaW2AARCcTJE23A9PlwDBf7u++++6I7A5mfq188MEHA/2qDXPcue+++wJfBgCgJ0LWcmxE+7Ru5me7lsHYTNVGMAYQKZKSkrRu3TqVlpYGwqQZL2FmczDzs5uwGSlMq7dp/Q4GY1Mfm9ZxgjGAUAhpODaidVo3M4dxcOTzxo0bmcMYQMQy3cJeffVV3X///YHbZn52EzbDvVHDtHzfcMMNmjhxYnO3ttraWhoqAIRUSLtVBJn+X+ZnO1NpmZaKSGZaU0pKSpjDGEBUMmMo7rnnnuauFubXv7vuuiusBlWbenjt2rXNJ1kyrd7mOZqQDwChFvKWYyNapnUzFbKZqs0EY1MZm7BPMAYQTcw89c8880ygq4VRXFwcGDtiupGFQ1cL05ptWrWDwdi0dptWb4IxgN7SKy3HpkKN9GndzODCwsJC5jAGEDNMvWemQzMB2TAndzKtyiZA9zUzXaaZCajlczHzFUf6r5EAwt8At+K7x14PmS984QtqaGgI9M196623AmUmg59++umB+8KdqZQnT56sl156KdCnzcyX+bWvfc3eGy4Oy/eHtXrskf+tx576jT4662Kdf+YX7X0A0HWm3+6ECRMCy7Zt21RZWanHHntMJ598sv7pn/6pT/r1msaVDRs26Dvf+Y5+//vfB8pMq7bpRnHmmWcGbiNccBxClDItx73hgw8+cL7xjW+YVuljFjdsOm7YdLZs2eJ88skndu3wUVtb61x44YXNzzUcn6PjfO4c3Pqoc2VC02uaMOFB5839n9v7AKDnTN1n6upg3W3qRTek2nt7hzkuTJkypfnfzM/PDxxLEI44DiF69Vo4Nkzlaio7U8GaoBms8FouptxUuCaU9rdNmzY1P6/7778/TIOx69M/Oj+/cnjTc02Y4hS/+YHjt3cBQCjt3r37mPrbhNdQ19cmAJsgHPw3TBA3xw6EMY5DiGK9Go5baxmWW7YOtFxMBdkfYXnjxo3Nz+GRRx6xpeHo705tySwnIfBchzkTiv/g7KdGAtDLTB0Z/FUtWE+GogHB1PctH9ccH8K2YQIWxyFEtz4Nx62Z1gLTWmsq2f4My+bfD/57vf2zYU/595Y613/Fvj4XL3H+i5+xAPQRE1pb1pcm1JrQ3B2mTm9Z75vWadNKjfDHcQjRrl/DcWsnCsumIjbdHUxlHKpKtGVFb/7tsOb/q1NReIl9vpc4hRV/5WcsAH2uJ8HWBGxTjwf/ticBG/2A4xBiQFiF49aCYdlUpC1/dmtZqXY3LJsKOtiPzjxO+Pdv8ztHakucKXbww1eue8559zOqJAD9p6tdInqrawb6CschxIawDsetmQBsKtfOhOWORji3DsYR8VNey2/rCVOdh7but3cAQP8xdW3rluDWv8KZOra3B/WhD3AcQozolZOA9BUzH/Gf//xnVVdXa926dYGTjrTkVsC67LLLdP755+vcc88NnIzE/I05s5JZ19y/fPnyMDq5h6PP3/uTNm74T/3fL16o6TMvkuekuKZ7/vKcrvmnq/RMQ4JGFq7T64vTNbjpLgDod22dhvqOO+7Qr3/9a077HFE4DgER1XJ8IqZ1wvzM13JKoJbLFVdc4Xzzm98MXDetGOH3c94+59Xb/9k+3+HOlQ9XOwcDv1gddLY+NKmpPGGWU1L798DaABBOTJ1q6uBgndtyMa3LHf2ih3DBcQiIqnDcmvnZrq2wfOutt4ZpPze/89m7pc7ccxLsc73YuWPDu85nf/+9c9+oprKvXF/q7KWLF4AwZkLw3LlzA3XWxRdfzJzFEYXjEBDR3Sq6qq6uTrt27VJGRoYtCUeNavjjY7pm3M16scG9ec7NevxO6e6bHpVPqbrvv/6PfvKdQU2rAgAQchyHENtiKhxHjkP6S9ldumzaQ/ofWxIwYYX+++Ub9a0v0MkLANCbOA4hdsXbS4SVU/T1fy3QI3debG8bwzV1dppGUiEBAHodxyHELsJxuIpLVMZd/647RyY03U5I01Xf/wZvGACgb3AcQoyiW0VYa1TD7u2q/dthnTT4LP3TN7+ik+w9AAD0Po5DiD2EYwAAAMDi1xEAAADAIhwDAAAAFuEYAAAAsAjHAAAAgEU4BgAAACzCMQAAAGARjgEAAACLcAwAAABYhGMAAADAIhwDAAAAFuEYAAAAsAjHAAAAQID0/wMz4g3ShZmy/wAAAABJRU5ErkJggg==" width="567" height="561"></em></p>
<p><em>NOTE: <span style="background-color: #ffffff;">Accept skeletal formulas or full or condensed structural formulas.<br>Accept any other branched cycloalkane that contains 7 carbons.<br>Do <strong>not</strong> accept any alkenes.<br>Penalise missing hydrogens or bond connectivities once only in Option C.<br>Accept hydrogen as the second product if the first product is toluene or a cycloalkane.</span></em></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" width="355" height="116"></p>
<p><em>NOTE: <span style="background-color: #ffffff;">Accept a skeletal formula or a full or condensed structural formula.<br>Penalise missing hydrogens or bond connectivities once only in Option C.</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b(ii).</div>
</div>
<br><hr><br><div class="specification">
<p>The process of converting heat to electricity is limited by its thermal (Carnot) efficiency.</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\text{Thermal efficiency}} = \frac{{{\text{temp. of steam at source (K) }}-{\text{ temp. heat sink (K)}}}}{{{\text{temp. of steam at source (K)}}}} \times 100">
<mrow>
<mtext>Thermal efficiency</mtext>
</mrow>
<mo>=</mo>
<mfrac>
<mrow>
<mrow>
<mtext>temp. of steam at source (K) </mtext>
</mrow>
<mo>−<!-- − --></mo>
<mrow>
<mtext> temp. heat sink (K)</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>temp. of steam at source (K)</mtext>
</mrow>
</mrow>
</mfrac>
<mo>×<!-- × --></mo>
<mn>100</mn>
</math></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the thermal efficiency of a steam turbine supplied with steam at 540°C and using a river as the choice of sink at 23 °C.</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>Power plants generating electricity by burning coal to boil water operate at approximately 35% efficiency.</p>
<p>State what this means and suggest why it is lower than the thermal efficiency.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><strong>«</strong><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{813{\text{K}} - 296{\text{K}}}}{{813{\text{K}}}}">
<mfrac>
<mrow>
<mn>813</mn>
<mrow>
<mtext>K</mtext>
</mrow>
<mo>−</mo>
<mn>296</mn>
<mrow>
<mtext>K</mtext>
</mrow>
</mrow>
<mrow>
<mn>813</mn>
<mrow>
<mtext>K</mtext>
</mrow>
</mrow>
</mfrac>
</math></span> × 100<strong>» =</strong> 64 <strong>«</strong>%<strong>»</strong></p>
<p><em><strong>[1 mark]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>35% of chemical/potential energy available in coal is transformed to electricity/electrical energy</p>
<p> </p>
<p>not all chemical energy from burning fuel transferred into heating water</p>
<p><strong><em>OR</em></strong></p>
<p>energy dispersed elsewhere/energy lost due to friction of moving parts</p>
<p><strong><em>OR</em></strong></p>
<p>heat loss to the surroundings</p>
<p> </p>
<p><em>Accept “stored energy” for </em><em>“potential energy”.</em></p>
<p><strong><em>[2 marks]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Uranium-235, <sup>235</sup>U, is bombarded with a neutron causing a fission reaction.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Two products of the fission of <sup>235</sup>U are <sup>144</sup>Ba and <sup>89</sup>Kr.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write the nuclear equation for this fission reaction.</span></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><span style="background-color: #ffffff;">Outline why the reaction releases energy.</span></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><span style="background-color: #ffffff;">The critical mass for weapons-grade uranium can be as small as 15 kg. Outline what is meant by critical mass by referring to the equation in (a)(i).</span></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><span style="background-color: #ffffff;">The daughter product, <sup>89</sup>Kr, has a half-life of 3.15 min.</span></p>
<p><span style="background-color: #ffffff;">Calculate the time required, in minutes, for the mass of <sup>89</sup>Kr to fall to 6.25 % of its initial value.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><sup>235</sup>U + <sup>1</sup>n → <sup>144</sup>Ba + <sup>89</sup>Kr + 3 <sup>1</sup>n <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">greater binding energy per nucleon in products than reactant <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept “mass of products less than reactants” <strong>OR</strong> “mass converted to energy/E = mc<sup>2</sup>”.</span></em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">mass/amount/quantity required so that «on average» each fission/reaction results in a further fission/reaction <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">at least one of the «3» neutrons produced must cause another reaction <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept “minimum mass of fuel needed for the reaction to be self-sustaining”.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«6.25 % = 4 half-lives, so 4 × 3.15 =» 12.6 «min» <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Only about a third of the candidates could write the nuclear equation for the requested fission reaction.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only about a quarter of the candidates could explain the release of energy, usually in terms of the change in nuclear binding energy.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Less than half the candidates could correctly explain “critical mass” with even fewer combining the definition as the minimum mass for a sustainable fission reaction with the required clarification in terms of neutrons creating a chain reaction.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Another question that created far more problems than anticipated with only about half gaining the mark. Many students appeared not to realise that 6.25 % is 1/16, hence the amount remaining after 4 half lives.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is an energy source composed mainly of methane.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Natural gas is burned to produce steam which turns turbines in an electricity generating power plant.</span></p>
<p><span style="background-color: #ffffff;">The efficiency of several sources for power plants is given below.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="353" height="229"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Calculate the specific energy of methane, in MJ kg<sup>−1</sup>, using sections 1, 6 and 13 of the data booklet.</span></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><span style="background-color: #ffffff;">Calculate the maximum electric energy output, in MJ, which can be obtained from burning 1.00 kg of methane by using your answer from (a).</span></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><span style="background-color: #ffffff;">Hydroelectric power plants produced 16 % of the world’s energy in 2015, down from 21 % in 1971.</span></p>
<p><span style="background-color: #ffffff;">Suggest why hydroelectric power production has a higher efficiency than the other sources given in (b) and why its relative use has decreased despite the high efficiency.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Reason for higher efficiency:</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Reason for decreased use:</span></span></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><span style="background-color: #ffffff;">Methane can also be obtained by fractional distillation of crude oil.</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="563" height="433"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Draw a circle on the diagram to show where the methane fraction is withdrawn.</span></span></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><span style="background-color: #ffffff;">List the following products, which are also obtained by fractional distillation, according to <strong>decreasing</strong> volatility: asphalt, diesel, gasoline, lubricating motor oil.</span></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><span style="background-color: #ffffff;">Explain how methane absorbs infrared (IR) radiation by referring to its molecular geometry and dipole moment.</span></p>
<div class="marks">[3]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Compare methane’s atmospheric abundance and greenhouse effect to that of carbon dioxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{891{\text{kJmo}}{{\text{l}}^{ - 1}}}}{{{\text{16}}{\text{.05gmo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>891</mn>
<mrow>
<mtext>kJmo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>16</mtext>
</mrow>
<mrow>
<mtext>.05gmo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> = 55.5 kJ g<sup>–1</sup> =» 55.5 «MJ kg<sup>–1</sup>» <strong>[✔]</strong></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«55.5 MJ × 58 % =» 32.2 «MJ» <strong>[✔]</strong></span></p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Reason for higher efficiency:</em><br>no heat/energy loss in producing steam<br><em><strong>OR</strong></em><br>no need to convert chemical energy of the fuel into heat and then heat into mechanical energy<br><em><strong>OR</strong></em><br>direct conversion of «gravitational» potential energy to mechanical energy <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “less energy lost as heat” but do <strong>not</strong> accept "no energy lost”.</span></em></p>
<p> </p>
<p><span style="background-color: #ffffff;"><em>Reason for decreased use</em>:<br>limited supply of available hydroelectric sites<br><em><strong>OR</strong></em><br>rapid growth of electrical supply in countries with little hydroelectric potential<br><em><strong>OR</strong></em><br>not building «new hydroelectric» dams because of environmental concerns <strong>[✔]</strong></span></p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept “new/alternative/solar/wind power sources «have taken over some of the demand»”.<br>Accept “lower output from existing stations due to limited water supplies”.</span></em></p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="436" height="472"> <strong>[<span style="background-color: #ffffff;">✔</span>]</strong></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">gasoline > diesel > lubricating motor oil > asphalt <strong>[✔]</strong> </span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note: </strong>Accept products written in this order whether separated by >, comma, or nothing.</span></em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is tetrahedral<br><em><strong>OR</strong></em><br>methane has zero dipole moment/is non-polar/bond polarities cancel <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em>Any two of</em>: <br>IR absorption can result in increased vibrations/bending/stretching <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">only modes that cause change in dipole absorb IR <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">for methane this is asymmetric bending/stretching <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">methane is less abundant <em><strong>AND</strong> </em>has a greater effect «per mol» <strong>[✔]</strong></span></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>About half the candidates were able to locate the appropriate data and use it to calculate the specific energy of methane.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students were aware that methane is the major component of natural gas and could use the efficiency data to calculate the electrical energy available from methane.</p>
<div class="question_part_label">b(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This seemed to cause quite a lot of difficulties, especially as some students appeared totally unaware of what hydroelectric power was, with a number discussing it as if it were some kind of fuel. The most usual mark gained was from discussing environmental concerns as a reason for its decreased use.</p>
<div class="question_part_label">b(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Having been given it is a gas, it is difficult to know why probably only about a third of the candidates could identify where methane would appear on a fractionating column.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Again surprisingly poorly done. Firstly there appeared to be some confusion about the term “<em>volatility</em>” with listing in the reverse order being quite common. Secondly many seemed unaware of the nature of “<em>asphalt</em>” as it was the one most frequently misplaced.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Comprehensive answers were rare. Many students gained a mark for correct statements about methane’s molecular geometry or polarity, though quite a few totally disregarded the instruction to refer to these. Some seemed aware of the link to vibrational motion and the better ones also identified the need for a change in dipole moment.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Quite a few candidates were aware of the relative atmospheric abundances of carbon dioxide and methane as well as their relative potency for enhancing the greenhouse effect.</p>
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about nuclear reactions.</span></p>
</div>
<div class="specification">
<p><span style="background-color: #ffffff;">Fission of a nucleus can be initiated by bombarding it with a neutron.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Determine the other product of the fission reaction of plutonium-239.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="349" height="31"></span></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><span style="background-color: #ffffff;">Outline the concept of critical mass with respect to fission reactions.</span></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><span style="background-color: #ffffff;">Outline <strong>one</strong> advantage of allowing all countries access to the technology to generate electricity by nuclear fission.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State <strong>one</strong> advantage of using fusion reactions rather than fission to generate electrical power.</span></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><span style="background-color: #ffffff;"><sup>90</sup>Sr, a common product of fission, has a half-life of 28.8 years.</span></p>
<p><span style="background-color: #ffffff;">Determine the number of years for the activity of a sample of <sup>90</sup>Sr to fall to one eighth (<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{8}">
<mfrac>
<mn>1</mn>
<mn>8</mn>
</mfrac>
</math></span>) of its initial value.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_{40}^{103}{\text{Zr}}">
<msubsup>
<mrow>
</mrow>
<mrow>
<mn>40</mn>
</mrow>
<mrow>
<mn>103</mn>
</mrow>
</msubsup>
<mrow>
<mtext>Zr</mtext>
</mrow>
</math></span></span><span style="background-color: #ffffff;"> <strong>[✔]</strong></span></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">minimum mass to «self-»sustain chain reaction<br><em><strong>OR</strong></em><br>if mass of fissile material is too small, too many neutrons produced pass out of the nuclear fuel<br><em><strong>OR</strong></em><br>at least one neutron produced causes further reaction <strong>[✔]</strong></span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of</em>:<br>reduction in emission of greenhouse gases «from burning fossil fuels» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">economic independence/self-sufficiency «from crude oil/producing states» <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: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<p><span style="background-color: #ffffff;">uranium is more abundant on Earth «in terms of total energy that can be produced from this fuel» than fossil fuels <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: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</span></span></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>fuel is inexpensive/readily available <strong>[✔]</strong><br>no/less radioactive waste is formed <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>lower risk of accidents/large-scale disasters <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>impossible/harder to use for making materials for nuclear weapons <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>larger amounts of energy released per unit mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>does not require a critical mass <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>can be used continuously <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><span style="font-size: 14px;"><em><span style="background-color: #ffffff;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Note</strong></span><span style="background-color: #ffffff;"><span style="font-size: 14px;"><strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">: </strong></span></span><span style="background-color: #ffffff;">Accept “higher specific energy for fusion”.</span></em></span></p>
<p><span style="font-size: 14px;"><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “no/less waste produced for fusion”.</span></em></span></p>
<p><span style="font-size: 14px;"><em><span style="background-color: #ffffff;">Accept specific example for disasters.</span></em></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">86.4 «years» <strong>[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was also fairly well answered although some students missed the concept of maintaining a chain reaction.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was reasonable answered by many students, but some gave very vague or general answers.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a well answered question with most student referring to fusion having less or no nuclear waste. There were many different possible correct answers.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a well answered question with most students solving for the number of years correctly.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about fuel for engines.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Crude oil can be converted into fuels by fractional distillation and cracking.</span></p>
<p><span style="background-color: #ffffff;">Contrast these two processes.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="696" height="269"></span></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><span style="background-color: #ffffff;">Determine the specific energy, in kJ g<sup>−1</sup>, and energy density, in kJ cm<sup>−3</sup>, of hexane, C<sub>6</sub>H<sub>14</sub>. Give both answers to three significant figures.</span></p>
<p><span style="background-color: #ffffff;">Hexane: <em>M<sub>r</sub></em> = 86.2; ΔH<sub>c</sub> = −4163 kJ mol<sup>−1</sup>; density = 0.660 g cm<sup>−3</sup></span></p>
<p> </p>
<p>Specific energy: </p>
<p>Energy density:</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><span style="background-color: #ffffff;">Hydrocarbons need treatment to increase their octane number to prevent pre-ignition (knocking) before they can be used in internal combustion engines.</span></p>
<p><span style="background-color: #ffffff;">Describe how this is carried out and the molecular changes that take place.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img 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" width="479" height="233"></p>
<p><em><strong>Note: </strong><span style="background-color: #ffffff;">Award <strong>[1]</strong> max for any two correct answers from one column <strong>OR</strong> one from each column.</span></em></p>
<p><em><span style="background-color: #ffffff;">Award <strong>[2]</strong> for any two correct from each column; eg: fractional distillation – any two correct award <strong>[1 max] AND</strong> cracking – any two correct award<strong> [1 max]</strong>.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">specific energy = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{4163{\text{ kJ mo}}{{\text{l}}^{ - 1}}}}{{86.2{\text{ g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mn>4163</mn>
<mrow>
<mtext> kJ mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
<mrow>
<mn>86.2</mn>
<mrow>
<mtext> g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> =» 48.3 «kJ g<sup>–1</sup>» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">energy density =«48.3 kJ g<sup>–1</sup> × 0.660 g cm<sup>–3</sup> =» 31.9 «kJ cm<sup>–3</sup>» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Award<strong> [1 max]</strong> if either or both answers not expressed to three significant figures.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of</em>: <br>«hydrocarbons are heated with» catalyst <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"> long chains break and reform <br><em><strong>OR<br></strong></em> branching/aromatization occurs <br><em><strong>OR<br></strong></em> isomerisation/reforming/platforming/cracking <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"> zeolite separates branched from non-branched <br><em><strong>OR<br></strong></em> products are distilled <br><em><strong>OR</strong></em><br>«distillation» separates reformed and cracked products <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept a specific catalysis name or formula for M1 such as Pt/Re/Rh/Pd/Ir.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was not well answered. Many candidates didn’t answer the question as asked. Candidates needed two correct statements, either about fractional distillation or cracking as a process for 1 mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was very well answered by most students and many answered with the correct number of significant figures as specified by the question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Students responded well to at least one mark of this question. There were several different ways to earn the 2 marks possible. The most common way students earned marks were by identifying the use of a catalyst and then the idea of the compound reforming into a smaller or branched compound. Very few students discussed the idea of purification or separation into individual compounds which is another important part of this process.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about global warming.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State <strong>one</strong> greenhouse gas, other than carbon dioxide.</span></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><span style="background-color: #ffffff;">Describe the effect of infrared (IR) radiation on carbon dioxide molecules.</span></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><span style="background-color: #ffffff;">Outline <strong>one</strong> approach to controlling industrial emissions of carbon dioxide.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>methane, water, nitrous oxide/nitrogen(I) oxide, ozone, CFCs, sulfur hexafluoride <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept formulas.</span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept “NO<sub>2</sub>”, “NO<sub>x</sub>”, “oxides of sulfur”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">bond length/C=O distance changes<br><em><strong>OR</strong></em><br>«asymmetric» stretching «of bonds»<br><em><strong>OR</strong></em><br>bond angle/OCO changes <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;">polarity/dipole «moment» changes<br><em><strong>OR</strong></em><br>dipole «moment» created «when molecule absorbs IR» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Accept appropriate diagrams.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any one of:</em><br>capture where produced «and stored» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use scrubbers to remove <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use as feedstock for synthesizing other chemicals <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">carbon credit/tax/economic incentive/fines/country specific action <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br></span></p>
<p><span style="background-color: #ffffff;">use alternative energy<br><em><strong>OR</strong></em><br>stop/reduce use of fossil fuels for producing energy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">use carbon reduced fuels «such as methane» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increase efficiency/reduce energy use <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was fairly well answered with most students receiving one of the two marks. There were many students who mentioned the information in M1 (asymmetric stretching and bonds vibrate) or M2 (polarity and dipole changes) more than one time but could only receive one mark. Teachers need to remind students each mark is a different topic or concept.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was reasonably answered although there were many students who gave vague answers that did not receive marks. Carbon cannot be “filtered out” and the process of “carbon capture or scrubbing” is different from filtering.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">The regular rise and fall of sea levels, known as tides, can be used to generate energy.</span></p>
<p><span style="background-color: #ffffff;">State <strong>one</strong> advantage, other than limiting greenhouse gas emissions, and one disadvantage of tidal power.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Advantage:</span></p>
<p><span style="background-color: #ffffff;">Disadvantage:</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p><span style="background-color: #ffffff;"><em><strong>Advantage</strong></em><br><em>Any one of:</em><br>renewable <strong>[✔]</strong><br>predictable supply <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>tidal barrage may prevent flooding <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>effective at low speeds <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>long life-span <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>low cost to run <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><br><em><strong>Disadvantage</strong></em><br><em>Any one of:</em><br>cost of construction <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>changes/unknown effects on marine life <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>changes circulation of tides in the area <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>power output is variable <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>limited locations where feasible <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>equipment maintenance can be challenging <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong><br>difficult to store energy <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Do <strong>not</strong> accept vague generalizations. </span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept economic issues for both advantage and disadvantage. </span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> accept sustainable. </span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “energy” or “electricity” for “power”.</span></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Many candidates performed well on this question especially when identifying an advantage of tidal power. The students who struggled tended to either give vague or journalistic answers especially for the disadvantage of tidal power.</p>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Ethanol is a biofuel that can be mixed with gasoline.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Write the equation for the complete combustion of ethanol.</span></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><span style="background-color: #ffffff;">Outline the evidence that relates global warming to increasing concentrations of greenhouse gases in the atmosphere.</span></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><span style="background-color: #ffffff;">Explain, including a suitable equation, why biofuels are considered to be carbon neutral.</span></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><span style="background-color: #ffffff;">State the type of reaction that occurs when ethanol reacts with vegetable oil to form biodiesel.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>5</sub>OH (l) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 3H<sub>2</sub>O (l) ✔</span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em>Any two of:</em> <br>«showing strong» correlation between «atmospheric» CO<sub>2</sub> concentration/greenhouse gas concentration and average «global/surface/ocean» temperature ✔</span></p>
<p><span style="background-color: #ffffff;">lab evidence that greenhouse gases/CO<sub>2</sub> absorb(s) infrared radiation ✔</span></p>
<p><span style="background-color: #ffffff;">«advanced» computer modelling ✔</span></p>
<p><span style="background-color: #ffffff;"> ice core data ✔</span></p>
<p><span style="background-color: #ffffff;">tree ring data ✔</span></p>
<p><span style="background-color: #ffffff;">ocean sediments / coral reefs / sedimentary rocks data ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Do <strong>not</strong> accept “global warming” for “average temperature”.<br>Do <strong>not</strong> accept “traps/reflects heat” <strong>OR</strong> “thermal energy”.<br>Evidence must be outlined and connected to data.<br>Accept references to other valid greenhouse gases other than carbon dioxide/CO<sub>2</sub>, such as methane/CH<sub>4</sub> or nitrous oxide/N<sub>2</sub>O.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">biofuel raw material/sugar/glucose formed by photosynthesis<br><em><strong>OR</strong></em><br>biofuel raw material/sugar/glucose uses up carbon dioxide during its formation<br><em><strong>OR</strong></em><br>biofuel from capturing gases due to decaying organic matter formed from photosynthesis ✔</span></p>
<p><span style="background-color: #ffffff;">6CO<sub>2</sub> (g) + 6H<sub>2</sub>O (l) → C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> (aq) + 6O<sub>2</sub> (g) ✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Accept arguments based on material coming from plant sources consuming carbon dioxide/carbon for M1.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">transesterification<br><em><strong>OR</strong></em><br>«nucleophilic» substitution/S<sub>N</sub> ✔</span></p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Red supergiant stars contain carbon-12 formed by the fusion of helium-4 nuclei with beryllium-8 nuclei.</span></p>
<p><span style="background-color: #ffffff;">Mass of a helium-4 nucleus = 4.002602 amu<br>Mass of a beryllium-8 nucleus = 8.005305 amu<br>Mass of a carbon-12 nucleus = 12.000000 amu</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">State the nuclear equation for the fusion reaction.</span></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><span style="background-color: #ffffff;">Explain why fusion is an exothermic process.</span></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><span style="background-color: #ffffff;">Beryllium-8 is a radioactive isotope with a half-life of 6.70 × 10<sup>−17</sup> s.</span></p>
<p><span style="background-color: #ffffff;">Calculate the mass of beryllium-8 remaining after 2.01 × 10<sup>−16</sup> s from a sample initially containing 4.00 g of beryllium-8.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{}_2^4{\text{He + }}{}_4^8{\text{Be}} \to {}_6^{12}{\text{C}}"> <msubsup> <mrow> </mrow> <mn>2</mn> <mn>4</mn> </msubsup> <mrow> <mtext>He + </mtext> </mrow> <msubsup> <mrow> </mrow> <mn>4</mn> <mn>8</mn> </msubsup> <mrow> <mtext>Be</mtext> </mrow> <mo stretchy="false">→</mo> <msubsup> <mrow> </mrow> <mn>6</mn> <mrow> <mn>12</mn> </mrow> </msubsup> <mrow> <mtext>C</mtext> </mrow> </math></span>✔</span></p>
<p><em><span style="background-color: #ffffff;"> NOTE: Do <strong>not</strong> penalize missing atomic numbers.</span></em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p 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;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>binding energy per nucleon is larger in carbon-12/product «than beryllium-8 and helium-4/reactants» ✔<br></span></p>
<p 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;"><span style="background-color: #ffffff;">difference in «total» binding energy is released «during fusion» ✔</span></p>
<p 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;"> </p>
<p 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;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br>mass of carbon-12/product «nucleus» is less than «the sum of» the masses of helium-4 and beryllium-8 «nuclei»/reactants<br><em><strong>OR</strong></em><br>two smaller nuclei form a lager nucleus ✔</span></p>
<p 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;"><span style="background-color: #ffffff;">mass lost/difference is converted to energy «and released»<br><em><strong>OR</strong></em><br><em>E = mc<sup>2</sup></em> ✔</span></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p 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;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 1</strong></em><br>3 half-lives ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p 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;"> </p>
<p 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;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 2</strong></em><br><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="m = 4.00{\left( {\frac{1}{2}} \right)^{\frac{{2.01 \times {{10}^{ - 16}}}}{{6.70 \times {{10}^{ - 17}}}}}}"> <mi>m</mi> <mo>=</mo> <mn>4.00</mn> <mrow> <msup> <mrow> <mo>(</mo> <mrow> <mfrac> <mn>1</mn> <mn>2</mn> </mfrac> </mrow> <mo>)</mo> </mrow> <mrow> <mfrac> <mrow> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </mrow> </msup> </mrow> </math></span> ✔<br>0.500 g «of beryllium-8 remain» ✔</span></p>
<p 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;"> </p>
<p 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;"><span style="background-color: #ffffff;"><em><strong>ALTERNATIVE 3</strong></em><br><em>λ</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\ln 2}}{{6.70 \times {{10}^{ - 17}}}}"> <mfrac> <mrow> <mi>ln</mi> <mo></mo> <mn>2</mn> </mrow> <mrow> <mn>6.70</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>17</mn> </mrow> </msup> </mrow> </mrow> </mfrac> </math></span> »= 1.03 × 10<sup>16</sup> «s<sup>−1</sup>» ✔<br><em>m</em> = « <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="4.00{\text{ }}{{\text{e}}^{ - 1.03 \times {{10}^{16}} \times 2.01 \times {{10}^{ - 16}}}}{\text{ = }}"> <mn>4.00</mn> <mrow> <mtext> </mtext> </mrow> <mrow> <msup> <mrow> <mtext>e</mtext> </mrow> <mrow> <mo>−</mo> <mn>1.03</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mn>16</mn> </mrow> </msup> </mrow> <mo>×</mo> <mn>2.01</mn> <mo>×</mo> <mrow> <msup> <mrow> <mn>10</mn> </mrow> <mrow> <mo>−</mo> <mn>16</mn> </mrow> </msup> </mrow> </mrow> </msup> </mrow> <mrow> <mtext> = </mtext> </mrow> </math></span> » 0.500 «g» ✔</span></p>
<p 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;"> </p>
<p 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;"><em><span style="background-color: #ffffff;"> NOTE: Award<strong> [2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>One method of producing biodiesel is by a transesterification process.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the equation for the transesterification reaction of pentyl octanoate, C<sub>7</sub>H<sub>15</sub>COOC<sub>5</sub>H<sub>11</sub>, with methanol.</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>Outline why the ester product of this reaction is a better diesel fuel than pentyl octanoate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>C<sub>7</sub>H<sub>15</sub>COOC<sub>5</sub>H<sub>11</sub>(l) + CH<sub>3</sub>OH(l) → C<sub>7</sub>H<sub>15</sub>COOCH<sub>3</sub>(l) + C<sub>5</sub>H<sub>11</sub>OH(l)</p>
<p><strong><em>OR</em></strong></p>
<p>C<sub>13</sub>H<sub>26</sub>O<sub>2</sub>(l) + CH<sub>4</sub>O(l) → C<sub>9</sub>H<sub>18</sub>O<sub>2</sub>(l) + C<sub>5</sub>H<sub>12</sub>O(l)</p>
<p><strong><em>OR</em></strong></p>
<p><img src="images/Schermafbeelding_2018-08-10_om_14.49.59.png" alt="M18/4/CHEMI/SP3/ENG/TZ2/14.a/M"></p>
<p> </p>
<p><em>Accept correct equation in any format </em><em>eg, skeletal, condensed structural </em><em>formula, etc.</em></p>
<p><em>Accept equations with equilibrium </em><em>arrow.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>less viscous <strong>«</strong>and so does not need to be heated to flow<strong>»</strong></p>
<p><strong><em>OR</em></strong></p>
<p>less likely to undergo incomplete combustion</p>
<p><strong><em>OR</em></strong></p>
<p>fewer intermolecular/London/dispersion forces</p>
<p><strong><em>OR</em></strong></p>
<p>vaporizes easier</p>
<p> </p>
<p><em>Ignore equation and products in 14a.</em></p>
<p><em>Accept “van der Waals’/vdW” for </em><em>“London”.</em></p>
<p><strong><em>[1 mark]</em></strong></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">E10 is composed of 10 % ethanol and 90 % normal unleaded fuel.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Ethanol has a Research Octane Number (RON) of 108.6.</span></p>
<p><span style="background-color: #ffffff;">Outline how higher octane fuels affect engine performance.</span></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><span style="background-color: #ffffff;">Show that, for combustion of equal masses of fuel, ethanol (<em>M<sub>r</sub></em> = 46 g mol<sup>−1</sup>) has a lower carbon footprint than octane (<span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">M</span><sub style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 11.6px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">r</sub> = 114 g mol<sup>−1</sup>).</span></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><span style="background-color: #ffffff;">Biodiesel containing ethanol can be made from renewable resources.</span></p>
<p><span style="background-color: #ffffff;">Suggest <strong>one</strong> environmental disadvantage of producing biodiesel from renewable resources.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">increased <em><strong>AND</strong> </em>fuels can be compressed more «before ignition» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Accept “engines can be designed with higher compression ratio” <strong>OR</strong> “less chance of pre-ignition/autoignition/<br>knocking occurring”.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em><strong>Alternative 1</strong></em><br>C<sub>2</sub>H<sub>5</sub>OH (l) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 3H<sub>2</sub>O (l) / 1 mol ethanol produces 2 mol CO<sub>2</sub><br><em><strong>OR</strong></em><br>C<sub>8</sub>H18 (l) + 12.5O<sub>2</sub> (g) → 8CO<sub>2</sub> (g) + 9H<sub>2</sub>O (l) / 1 mol octane produces 8 mol CO<sub>2</sub> <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><br>For 1 g of fuel:<br>« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{1g}}}}{{{\text{46 g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mrow>
<mtext>1g</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>46 g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> × 2 mol CO<sub>2</sub> (g) =» 0.04 «mol CO<sub>2</sub> (g)» from ethanol <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">« <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{\text{1g}}}}{{{\text{114 g mo}}{{\text{l}}^{ - 1}}}}">
<mfrac>
<mrow>
<mrow>
<mtext>1g</mtext>
</mrow>
</mrow>
<mrow>
<mrow>
<mtext>114 g mo</mtext>
</mrow>
<mrow>
<msup>
<mrow>
<mtext>l</mtext>
</mrow>
<mrow>
<mo>−</mo>
<mn>1</mn>
</mrow>
</msup>
</mrow>
</mrow>
</mfrac>
</math></span> × 8 mol CO<sub>2</sub> (g) =» 0.07 «mol CO<sub>2</sub> (g)» from octane <strong>[✔]</strong></span></p>
<p> </p>
<p><span style="background-color: #ffffff;"><em><strong>Alternative 2</strong></em><br>ratio of C in ethanol:octane is 2:8, so ratio in carbon dioxide produced per mole will be 1:4 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">ratio amount of fuel in 1 g = <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{{46}}:\frac{1}{{114}}">
<mfrac>
<mn>1</mn>
<mrow>
<mn>46</mn>
</mrow>
</mfrac>
<mo>:</mo>
<mfrac>
<mn>1</mn>
<mrow>
<mn>114</mn>
</mrow>
</mfrac>
</math></span> = 2.5:1 <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">4 > 2.5 so octane produces more carbon dioxide<br><em><strong>OR</strong></em><br>ratio of amount of carbon dioxide = 2.5:4 = 1:1.61 so octane produces more «for combustion of same mass» <strong>[✔]</strong></span></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">use of «farm» land «for production»<br><em><strong>OR</strong></em><br>deforestation «for crop production for fuel»<br><em><strong>OR</strong></em><br>can release more NO<sub>x</sub> «than normal fuel on combustion» <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong> Note:</strong> Ignore any reference to cost.</span></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Over half the students could relate a high octane number to a reduced tendency for auto-ignition, though this was usually referred to as “knocking”.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A question that gave the opportunity for a variety of different approaches. This challenge was beyond all but the best students, though there were a number of well argued responses.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many students did not take into account “production from renewable resources” and answered in terms of the combustion of biodiesel, though about a third correctly identified the area of land biofuel crops require.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Consider the following data for butane and pentane at STP.</span></p>
<p><span style="background-color: #ffffff;"><img style="display: block; margin-left: auto; margin-right: auto;" src="data:image/png;base64,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" width="534" height="113"></span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Discuss the data.</span></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>In a natural gas power station, 1.00 tonne of natural gas produces 2.41 × 10<sup>4</sup> MJ of electricity.</p>
<p>Calculate the percentage efficiency of the power station.</p>
<p>1 tonne = 1000 kg<br>Specific energy of natural gas used = 55.4 MJ kg<sup>−1</sup></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«similar specific energy and» pentane has «much» larger energy density ✔</span></p>
<p><span style="background-color: #ffffff;"><em>Any two for <strong>[2 max]</strong>:</em> <br>similar number of bonds/«C and H» atoms in 1 kg «leading to similar specific energy» <br><em><strong>OR<br></strong></em> only one carbon difference in structure «leading to similar specific energy» ✔<br><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">NOTE: </span><span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: italic;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">Accept “both are alkanes” for M2.</span><br></span></p>
<p><span style="background-color: #ffffff;">pentane is a liquid <em><strong>AND</strong> </em>butane is a gas «at STP» ✔<br><em>NOTE: Accept “pentane would be easier to transport”.</em><br></span></p>
<p><span style="background-color: #ffffff;">1 m<sup>3</sup> of pentane contains greater amount/mass than 1 m<sup>3</sup> of butane ✔<br><em>NOTE: Accept “same volume” for “1 m<sup>3</sup>” and “more moles” for “greater amount” for M4.</em><br></span></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">«energy input =» 5.54 ×10<sup>4</sup> «MJ» ✔<br>«efficiency = <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>2</mn><mo>.</mo><mn>41</mn><mo>×</mo><msup><mn>10</mn><mn>4</mn></msup><mo> </mo><mi>MJ</mi></mrow><mrow><mn>5</mn><mo>.</mo><mn>54</mn><mo>×</mo><msup><mn>10</mn><mn>4</mn></msup><mo> </mo><mi>MJ</mi></mrow></mfrac><mo>×</mo><mn>100</mn><mo>=</mo></math>» 43.5 «%» ✔</span></p>
<p><em><span style="background-color: #ffffff;">NOTE: Award <strong>[2]</strong> for correct final answer.</span></em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
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<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">This question is about biofuel.</span></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">The structure of chlorophyll is given in section 35 of the data booklet.</span></p>
<p><span style="background-color: #ffffff;">State the feature of the chlorophyll molecule that enables it to absorb light in the visible spectrum.</span></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p><span style="background-color: #ffffff;">Evaluate the use of biodiesel in place of diesel from crude oil.</span></p>
<p> </p>
<p><span style="background-color: #ffffff;">Strength:</span></p>
<p><span style="background-color: #ffffff;">Limitation:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;">large/extensive «electronic» conjugation<br><em><strong>OR</strong></em><br> «contains» many alternate single and double bonds <br><em><strong>OR</strong></em><br>extended system of alternating double and single bonds <strong>[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note:</strong> Student response must indicate a large or extended system to award mark.</span></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="background-color: #ffffff;"><em><strong>Strength</strong></em><br><em>Any one of:</em><br>less flammable «than diesel» <strong>[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">recycles carbon «lower carbon footprint»<br><em><strong>OR</strong></em><br>lower greenhouse gas emissions <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">easily biodegradable «in case of spill» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">renewable<br><em><strong>OR</strong></em><br>does not deplete fossil fuel reserves <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">economic security/availability in countries without crude oil <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;"><em><strong>Limitation</strong></em><br><em>Any one of</em>:<br>more difficult to ignite inside the engine «than diesel» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">more viscous «than diesel» <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">lower energy content/specific energy/energy density <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">uses food sources<br><em><strong>OR</strong></em><br>uses land that could be used for food <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">«production is» more expensive <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">less suitable in low temperatures <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">increased NO<sub>x</sub> emissions for biodiesel <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p><span style="background-color: #ffffff;">greenhouse gases still produced <strong style="color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: bold;letter-spacing: normal;text-align: left;text-decoration: none;text-indent: 0px;white-space: normal;">[✔]</strong></span></p>
<p> </p>
<p><em><span style="background-color: #ffffff;"><strong>Note</strong>: Accept “«close to» carbon neutral”, “produce less greenhouse gases/CO<sub>2</sub>”. </span></em></p>
<p><em><span style="background-color: #ffffff;">Accept “engines have to be modified if biodiesel used” as limitation. </span></em></p>
<p><em><span style="background-color: #ffffff;">Do <strong>not</strong> award marks for strength and limitation that are the same topic/concept.</span></em></p>
<div class="question_part_label">b.</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was not well answered as many students missed the idea of the system being a large/extensive/extended or containing many alternating single and double bonds. Although fewer students than expected received a mark, examiners did note there were more student who wrote about conjugation or alternating single and double bonds (but were missing the idea of the system being large) which is an improvement from previous sessions.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered, and many candidates received one or both marks. Some candidate who did not receive marks were too vague, especially with the limitation.</p>
<div class="question_part_label">b.</div>
</div>
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