ubuntu2004
<exercise checkit-seed="9007" checkit-slug="Zfinal" checkit-title="Zfinal">1<statement>2<p>3For each of the following scenarios, provide a reasonable IVP model.4Let <m>t</m> represent time, let <m>z</m> represent the value given in the scenario,5and use uppercase letters for positive constants.6Then label each term and initial value of each IVP to describe what it7represents from the scenario.8</p>9<ul>10<li>11An object is released from rest from above the ground.12Let z measure its upward velocity at a given time.13Assume quadratic air resistance.14</li>15<li>16Suppose the population of a species generally follows the logistical model:17births are linear based on population, and deaths are quadratic based on population.18However, at some point in the model, a natural disaster instantly wipes out19a fraction of the population.20Let z measure the population of this species at a given time.21</li>22<li>23A solution of salt water is pumped into a tank of initially fresh water,24while mixed water is pumped out at the same rate.25Let z measure the mass of salt in the tank at a given time.26</li>27<li>28A circuit includes a battery providing constant voltage, a resistor,29and an inductor. Assume some initial current is flowing, and let z30measure the current throughout this circuit at a given time.31</li>32</ul>33<p>34Then, show that your model is equivalent to one of the following IVP models by35relabeling constants and using algebra as needed. (It's possible that more than36one IVP may be used for a scenario. If so, choose any of them.)37</p>38<ol>39<li>40<m>\frac{B z}{E} = B N - {z'} \hspace{2em}z(0)=0</m>41</li>42<li>43<m>M z + C {z'} = P \hspace{2em}z(0)= V</m>44</li>45<li>46<m>-J z = L {z'} + A {z''} \hspace{2em}z(0)= B ,z'(0)=0</m>47</li>48<li>49<m>M S - S z - {z'} = 0 \hspace{2em}z(0)= B</m>50</li>51<li>52<m>-Q \delta\left(-E + t\right) - {z'} = B z^{2} - Y z \hspace{2em}z(0)= J</m>53</li>54<li>55<m>K z^{2} - J L - J {z'} = 0 \hspace{2em}z(0)=0</m>56</li>57</ol>58</statement>59<answer>60<ul>61<li>62An object is released from rest from above the ground.63Let z measure its upward velocity at a given time.64Assume quadratic air resistance.65<ul><li><m>K z^{2} - J L - J {z'} = 0 \hspace{2em}z(0)=0</m></li></ul></li>66<li>67A solution of salt water is pumped into a tank of initially fresh water,68while mixed water is pumped out at the same rate.69Let z measure the mass of salt in the tank at a given time.70<ul><li><m>\frac{B z}{E} = B N - {z'} \hspace{2em}z(0)=0</m></li></ul></li>71<li>72Suppose the population of a species generally follows the logistical model:73births are linear based on population, and deaths are quadratic based on population.74However, at some point in the model, a natural disaster instantly wipes out75a fraction of the population.76Let z measure the population of this species at a given time.77<ul><li><m>-Q \delta\left(-E + t\right) - {z'} = B z^{2} - Y z \hspace{2em}z(0)= J</m></li></ul></li>78<li>79A mass is attached to a spring. The mass is stretched outward from the spring's80natural position, then released from rest. Assume the presence of friction.81Let z measure the outward displacement of the mass from its natural position on82the spring.83<ul><li><m>-J z = L {z'} + A {z''} \hspace{2em}z(0)= B ,z'(0)=0</m></li></ul></li>84<li>85A bowl of hot soup sits in a colder room.86Assume the room's temperature is kept constant,87and let z measure the temperature of88the soup over time.89<ul><li><m>M S - S z - {z'} = 0 \hspace{2em}z(0)= B</m></li></ul></li>90<li>91A circuit includes a battery providing constant voltage, a resistor,92and an inductor. Assume some initial current is flowing, and let z93measure the current throughout this circuit at a given time.94<ul><li><m>M z + C {z'} = P \hspace{2em}z(0)= V</m></li></ul></li>95</ul>96</answer>97</exercise>9899100101