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<exercise checkit-seed="9895" checkit-slug="Zfinal" checkit-title="Zfinal">
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  <statement>
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    <p>
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For each of the following scenarios, provide a reasonable IVP model.
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Let <m>t</m> represent time, let <m>z</m> represent the value given in the scenario,
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and use uppercase letters for positive constants.
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Then label each term and initial value of each IVP to describe what it
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represents from the scenario.
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        </p>
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    <ul>
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      <li>
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            A solution of salt water is pumped into a tank of less salty water,
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            while mixed water is pumped out at the same rate.
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            After a certain amount of time, the concentration of salt flowing into the
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            tank is instantly increased.
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            Let z measure the mass of salt in the tank at a given time.
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            </li>
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      <li>
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            Suppose the population of a species follows the logistical model:
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            births are linear based on population, and deaths are quadratic based on population.
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            Let z measure the population of this species at a given time.
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            </li>
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      <li>
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            A bowl of hot soup sits in a colder room.
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            Assume the room's temperature is kept constant,
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            and let z measure the temperature of
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            the soup over time.
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            </li>
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      <li>
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            A mass is attached to a spring. The mass is compressed inward from the spring's
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            natural position, then released from rest. After some time, a hammer instantly
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            strikes the mass inward. Assume the presence of friction.
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            Let z measure the outward displacement of the mass from its natural position on
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            the spring.
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            </li>
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    </ul>
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    <p>
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Then, show that your model is equivalent to one of the following IVP models by
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relabeling constants and using algebra as needed. (It's possible that more than
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one IVP may be used for a scenario. If so, choose any of them.)
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        </p>
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    <ol>
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      <li>
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        <m>0 = W z^{2} + P {z'} \hspace{2em}z(0)= R</m>
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      </li>
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      <li>
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        <m>0 = -C z - A {z'} + W \hspace{2em}z(0)= P</m>
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      </li>
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      <li>
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        <m>-{z'} = -{\left(B - W\right)} V \mathrm{u}\left(-X + t\right) - V W + \frac{V z}{C} \hspace{2em}z(0)= S</m>
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      </li>
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      <li>
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        <m>0 = -D z - P {z'} - L {z''} - E \delta\left(-K + t\right) \hspace{2em}z(0)=- W ,z'(0)=0</m>
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      </li>
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      <li>
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        <m>L z = J L - {z'} \hspace{2em}z(0)= W</m>
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      </li>
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      <li>
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        <m>{z'} = -A z^{2} + B z \hspace{2em}z(0)= P</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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    <ul>
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      <li>
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            An object is fired horizontally in the air.
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            Let z measure its horizontal velocity at a given time.
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            Assume quadratic air resistance.
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            <ul><li><m>0 = W z^{2} + P {z'} \hspace{2em}z(0)= R</m></li></ul></li>
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      <li>
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            A solution of salt water is pumped into a tank of less salty water,
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            while mixed water is pumped out at the same rate.
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            After a certain amount of time, the concentration of salt flowing into the
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            tank is instantly increased.
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            Let z measure the mass of salt in the tank at a given time.
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            <ul><li><m>-{z'} = -{\left(B - W\right)} V \mathrm{u}\left(-X + t\right) - V W + \frac{V z}{C} \hspace{2em}z(0)= S</m></li></ul></li>
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      <li>
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            Suppose the population of a species follows the logistical model:
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            births are linear based on population, and deaths are quadratic based on population.
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            Let z measure the population of this species at a given time.
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            <ul><li><m>{z'} = -A z^{2} + B z \hspace{2em}z(0)= P</m></li></ul></li>
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      <li>
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            A mass is attached to a spring. The mass is compressed inward from the spring's
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            natural position, then released from rest. After some time, a hammer instantly
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            strikes the mass inward. Assume the presence of friction.
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            Let z measure the outward displacement of the mass from its natural position on
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            the spring.
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            <ul><li><m>0 = -D z - P {z'} - L {z''} - E \delta\left(-K + t\right) \hspace{2em}z(0)=- W ,z'(0)=0</m></li></ul></li>
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      <li>
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            A bowl of hot soup sits in a colder room.
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            Assume the room's temperature is kept constant,
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            and let z measure the temperature of
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            the soup over time.
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            <ul><li><m>L z = J L - {z'} \hspace{2em}z(0)= W</m></li></ul></li>
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      <li>
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            A circuit includes a battery providing constant voltage, a resistor,
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            and an inductor. Assume some initial current is flowing, and let z
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            measure the current throughout this circuit at a given time.
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            <ul><li><m>0 = -C z - A {z'} + W \hspace{2em}z(0)= P</m></li></ul></li>
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    </ul>
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  </answer>
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</exercise>
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