<item ident="F4-0849" title="F4 | Implicit solutions for exact IVPs | ver. 0849">
  <itemmetadata>
    <qtimetadata>
      <qtimetadatafield>
        <fieldlabel>question_type</fieldlabel>
        <fieldentry>essay_question</fieldentry>
      </qtimetadatafield>
    </qtimetadata>
  </itemmetadata>
  <presentation>
    <material>
      <mattextxml>
        <div class="exercise-statement">
          <p>
            <strong>F4.</strong>
          </p>
          <p> Determine which of the following ODEs is exact. </p>
          <p style="text-align:center;">
            <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t" alt="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t" title="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t" data-latex="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t"/>
          </p>
          <p style="text-align:center;">
            <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" alt="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" title="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" data-latex="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y"/>
          </p>
          <p> Then find an implicit solution for this exact ODE satisfying the initial value <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y( -1 )= 1" alt="y( -1 )= 1" title="y( -1 )= 1" data-latex="y( -1 )= 1"/>. </p>
        </div>
      </mattextxml>
      <mattext texttype="text/html">&lt;div class="exercise-statement"&gt;
  &lt;p&gt;
    &lt;strong&gt;F4.&lt;/strong&gt;
  &lt;/p&gt;
  &lt;p&gt; Determine which of the following ODEs is exact. &lt;/p&gt;
  &lt;p style="text-align:center;"&gt;
    &lt;img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16%20%5C,%20y%5E%7B3%7D%20%7By'%7D%20+%202%20%5C,%20t%20y%20%7By'%7D%20-%208%20%5C,%20t%20y%20-%205%20%5C,%20t%20%7By'%7D%20=%2010%20%5C,%20t%20y%5E%7B2%7D%20+%2010%20%5C,%20t" alt="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t" title="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t" data-latex="16 \, y^{3} {y'} + 2 \, t y {y'} - 8 \, t y - 5 \, t {y'} = 10 \, t y^{2} + 10 \, t"&gt;
  &lt;/p&gt;
  &lt;p style="text-align:center;"&gt;
    &lt;img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16%20%5C,%20y%5E%7B3%7D%20%7By'%7D%20-%204%20%5C,%20t%5E%7B2%7D%20%7By'%7D%20-%2010%20%5C,%20t%20=%208%20%5C,%20t%20y" alt="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" title="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" data-latex="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y"&gt;
  &lt;/p&gt;
  &lt;p&gt; Then find an implicit solution for this exact ODE satisfying the initial value &lt;img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y(%20-1%20)=%201" alt="y( -1 )= 1" title="y( -1 )= 1" data-latex="y( -1 )= 1"&gt;. &lt;/p&gt;
&lt;/div&gt;

</mattext>
    </material>
    <response_str ident="response1" rcardinality="Single">
      <render_fib>
        <response_label ident="answer1" rshuffle="No"/>
      </render_fib>
    </response_str>
  </presentation>
  <itemfeedback ident="general_fb">
    <flow_mat>
      <material>
        <mattextxml>
          <div class="exercise-answer">
            <h4>Partial Answer:</h4>
            <p>The following ODE is exact.</p>
            <p style="text-align:center;">
              <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" alt="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" title="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" data-latex="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y"/>
            </p>
            <p> Its implicit solution satisfying the initial value is: </p>
            <p style="text-align:center;">
              <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)" alt="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)" title="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)" data-latex="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)"/>
            </p>
          </div>
        </mattextxml>
        <mattext texttype="text/html">&lt;div class="exercise-answer"&gt;
  &lt;h4&gt;Partial Answer:&lt;/h4&gt;
  &lt;p&gt;The following ODE is exact.&lt;/p&gt;
  &lt;p style="text-align:center;"&gt;
    &lt;img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?16%20%5C,%20y%5E%7B3%7D%20%7By'%7D%20-%204%20%5C,%20t%5E%7B2%7D%20%7By'%7D%20-%2010%20%5C,%20t%20=%208%20%5C,%20t%20y" alt="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" title="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y" data-latex="16 \, y^{3} {y'} - 4 \, t^{2} {y'} - 10 \, t = 8 \, t y"&gt;
  &lt;/p&gt;
  &lt;p&gt; Its implicit solution satisfying the initial value is: &lt;/p&gt;
  &lt;p style="text-align:center;"&gt;
    &lt;img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?4%20%5C,%20y%5E%7B4%7D%20-%204%20%5C,%20t%5E%7B2%7D%20y%20-%205%20%5C,%20t%5E%7B2%7D%20=%20%5Cleft(-5%5Cright)" alt="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)" title="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)" data-latex="4 \, y^{4} - 4 \, t^{2} y - 5 \, t^{2} = \left(-5\right)"&gt;
  &lt;/p&gt;
&lt;/div&gt;

</mattext>
      </material>
    </flow_mat>
  </itemfeedback>
</item>