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</div><h2>HL Paper 1</h2><div class="question">
<p>Which technique is used to determine the bond lengths and bond angles of a molecule?</p>
<p>A. X-ray crystallography</p>
<p>B. Infrared (IR) spectroscopy</p>
<p>C. Mass spectroscopy</p>
<p>D. <sup>1</sup>H NMR spectroscopy</p>
</div>
<br><hr><br><div class="question">
<p class="p1">A student heated a solid in a crucible. The student measured the mass of the solid and crucible before and after heating and recorded the results.</p>
<p class="p2">\[\begin{array}{*{20}{l}} {{\text{Mass of crucible and solid before heating}}}&{ = 101.692{\text{ g}}} \\ {{\text{Mass of crucible and solid after heating}}}&{ = 89.312{\text{ g}}} \end{array}\]</p>
<p class="p1">What value should the student record for the mass lost in grams?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>12.4</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>12.38</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>12.380</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>12.3800</p>
</div>
<br><hr><br><div class="question">
<p>The molar mass of a gas, determined experimentally, is 32 g mol<sup>−1</sup>. Its literature molar mass is 40 g mol<sup>−1</sup>.</p>
<p>What is the percentage error?</p>
<p>A. 80%</p>
<p>B. 25%</p>
<p>C. 20%</p>
<p>D. 8%</p>
</div>
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<div class="column">A measuring cylinder was used to obtain a known volume of a liquid. The volume was read from the top of the meniscus and the liquid completely emptied into a flask. The exact same process was then repeated. Which statement is correct about the overall described procedure and the volumes measured?</div>
<div class="column"> </div>
<div class="column">A. There is a systematic error and the volumes measured are accurate.<br>B. There is a random error and the volumes measured are accurate.<br>C. There is a random error and the volumes measured are inaccurate.<br>D. There is a systematic error and the volumes measured are inaccurate.</div>
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<br><hr><br><div class="question">
<p>The graph shows values of Δ<em>G</em> for a reaction at different temperatures.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p>Which statement is correct?</p>
<p>A. The standard entropy change of the reaction is negative.</p>
<p>B. The standard enthalpy change of the reaction is positive.</p>
<p>C. At higher temperatures, the reaction becomes less spontaneous.</p>
<p>D. The standard enthalpy change of the reaction is negative.</p>
</div>
<br><hr><br><div class="question">
<p>A student measured the mass and volume of a piece of silver and recorded the following values.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-24_om_15.49.26.png" alt="N13/4/CHEMI/HPM/ENG/TZ0/40"></p>
<p>Which value, in \({\text{g}}\,{\text{c}}{{\text{m}}^{ - 3}}\), for the density of silver should the student report in her laboratory notebook?</p>
<p>A. 10.49</p>
<p>B. 10.4900</p>
<p>C. 10.5</p>
<p>D. 10.500</p>
</div>
<br><hr><br>