<item ident="N2-2998" title="N2 | Euler's method for approximating IVP solutions | ver. 2998">
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<p>
<strong>N2.</strong>
</p>
<p> Use Euler's method with <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?h= 0.10" alt="h= 0.10" title="h= 0.10" data-latex="h= 0.10"/> to approximate <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x( 1.2 )" alt="x( 1.2 )" title="x( 1.2 )" data-latex="x( 1.2 )"/> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y( 1.2 )" alt="y( 1.2 )" title="y( 1.2 )" data-latex="y( 1.2 )"/> given the following system of IVPs. </p>
<p style="text-align:center;">
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2" alt="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2" title="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2" data-latex="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2"/>
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<p style="text-align:center;">
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1" alt="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1" title="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1" data-latex="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1"/>
</p>
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<mattext texttype="text/html"><div class="exercise-statement">
<p>
<strong>N2.</strong>
</p>
<p> Use Euler's method with <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?h=%200.10" alt="h= 0.10" title="h= 0.10" data-latex="h= 0.10"> to approximate <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x(%201.2%20)" alt="x( 1.2 )" title="x( 1.2 )" data-latex="x( 1.2 )"> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y(%201.2%20)" alt="y( 1.2 )" title="y( 1.2 )" data-latex="y( 1.2 )"> given the following system of IVPs. </p>
<p style="text-align:center;">
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x'=%20-2%20%5C,%20x%5E%7B2%7D%20y%5E%7B2%7D%20-%20t%20y%5E%7B2%7D%20+%203%20%5Chspace%7B2em%7D%20x(%201%20)=%202" alt="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2" title="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2" data-latex="x'= -2 \, x^{2} y^{2} - t y^{2} + 3 \hspace{2em} x( 1 )= 2">
</p>
<p style="text-align:center;">
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y'=%20t%5E%7B2%7D%20x%20-%202%20%5C,%20t%5E%7B2%7D%20y%20-%201%20%5Chspace%7B2em%7D%20y(%201%20)=%201" alt="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1" title="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1" data-latex="y'= t^{2} x - 2 \, t^{2} y - 1 \hspace{2em} y( 1 )= 1">
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<h4>Partial Answer:</h4>
<ul>
<li><img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x( 1.1 )\approx 1.40" alt="x( 1.1 )\approx 1.40" title="x( 1.1 )\approx 1.40" data-latex="x( 1.1 )\approx 1.40"/> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y( 1.1 )\approx 0.900" alt="y( 1.1 )\approx 0.900" title="y( 1.1 )\approx 0.900" data-latex="y( 1.1 )\approx 0.900"/></li>
<li><img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x( 1.2 )\approx 1.29" alt="x( 1.2 )\approx 1.29" title="x( 1.2 )\approx 1.29" data-latex="x( 1.2 )\approx 1.29"/> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y( 1.2 )\approx 0.752" alt="y( 1.2 )\approx 0.752" title="y( 1.2 )\approx 0.752" data-latex="y( 1.2 )\approx 0.752"/></li>
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<mattext texttype="text/html"><div class="exercise-answer">
<h4>Partial Answer:</h4>
<ul>
<li>
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x(%201.1%20)%5Capprox%201.40" alt="x( 1.1 )\approx 1.40" title="x( 1.1 )\approx 1.40" data-latex="x( 1.1 )\approx 1.40"> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y(%201.1%20)%5Capprox%200.900" alt="y( 1.1 )\approx 0.900" title="y( 1.1 )\approx 0.900" data-latex="y( 1.1 )\approx 0.900">
</li>
<li>
<img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?x(%201.2%20)%5Capprox%201.29" alt="x( 1.2 )\approx 1.29" title="x( 1.2 )\approx 1.29" data-latex="x( 1.2 )\approx 1.29"> and <img style="border:1px #ddd solid;padding:5px;border-radius:5px;" src="https://latex.codecogs.com/svg.latex?y(%201.2%20)%5Capprox%200.752" alt="y( 1.2 )\approx 0.752" title="y( 1.2 )\approx 0.752" data-latex="y( 1.2 )\approx 0.752">
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