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<exercise checkit-seed="0008" checkit-slug="AA4" checkit-title="Existence/uniqueness IVP Theorems">
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  <statement>
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      <p>
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          Explain how to use an appropriate Existence and Uniqueness Theorem to determine
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          the largest possible domain guaranteed for a unique solution to each IVP.
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      </p>
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      <ol>
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              <li>
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                  <m>
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                      {\left(t + 5\right)} {y''} e^{t} + {\left(t - 1\right)} {\left(t - 5\right)} + y e^{\left(-t\right)} + {y'} = 0;\qquad
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                      y(-7)=-4
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                      ,y'(-7)=0
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                  </m>
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              </li>
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              <li>
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                  <m>
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                      0 = {\left({y'} - 4\right)}^{5} + {\left(3 \, {y} + t + 13\right)}^{4};\qquad
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                      {y}(-4)=-2
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                  </m>
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              </li>
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      </ol>
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  </statement>
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  <answer>
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      <ol>
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              <li>
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                      By the Linear ODE Existence and Uniqueness Theorem, the IVP has
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                      a unique solution defined on the interval <m>(-\infty,-5)</m>.
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              </li>
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              <li>
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                      By the First Order ODE Existence and Uniqueness Theorem, the IVP has
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                      a unique solution defined nearby the initial value.
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              </li>
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      </ol>
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  </answer>
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</exercise>
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