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<h2>SL Paper 3</h2><div class="specification">
<p>A student pours a canned carbonated drink into a cylindrical container after shaking the can violently before opening. A large volume of foam is produced that fills the container. The graph shows the variation of foam height with time.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the time taken for the foam to drop to</p>
<p>(i) half its initial height.</p>
<p>(ii) a quarter of its initial height.</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>The change in foam height can be modelled using ideas from other areas of physics. Identify <strong>one</strong> other situation in physics that is modelled in a similar way.</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>i</p>
<p>18 «s»</p>
<p><em>Allow answer in the range of 17 «s» to 19 «s».<br>Ignore wrong unit.</em></p>
<p>ii</p>
<p>36 «s»</p>
<p><em>Allow answer in the range of 35 «s» to 37 «s».</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>radioactive/nuclear decay<br><em><strong>OR<br></strong></em>capacitor discharge<br><em><strong>OR<br></strong></em>cooling</p>
<p><em>Accept any relevant situation, eg: critically damping, approaching terminal velocity</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>