ubuntu2004
<exercise checkit-seed="9073" 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>11Suppose the population of a species generally follows the logistical model:12births are linear based on population, and deaths are quadratic based on population.13However, at some point in the model, a natural disaster instantly wipes out14a fraction of the population.15Let z measure the population of this species at a given time.16</li>17<li>18A circuit includes a battery providing constant voltage, a resistor,19and an inductor. Assume some initial current is flowing, and let z20measure the current throughout this circuit at a given time.21</li>22<li>23An object is released from rest from above the ground.24Let z measure its upward velocity at a given time.25Assume quadratic air resistance.26</li>27<li>28A bowl of hot soup sits in a colder room.29Assume the room's temperature is kept constant,30and let z measure the temperature of31the soup over time.32</li>33</ul>34<p>35Then, show that your model is equivalent to one of the following IVP models by36relabeling constants and using algebra as needed. (It's possible that more than37one IVP may be used for a scenario. If so, choose any of them.)38</p>39<ol>40<li>41<m>-Y z = J {z'} + C {z''} \hspace{2em}z(0)= E ,z'(0)=0</m>42</li>43<li>44<m>Y z - C = -L {z'} \hspace{2em}z(0)= Q</m>45</li>46<li>47<m>-J z = -A J + {z'} \hspace{2em}z(0)= D</m>48</li>49<li>50<m>-N z^{2} - W \delta\left(-K + t\right) = -C z + {z'} \hspace{2em}z(0)= M</m>51</li>52<li>53<m>0 = K z^{2} - A L - L {z'} \hspace{2em}z(0)=0</m>54</li>55<li>56<m>-L M + {z'} = {\left(J - L\right)} M \mathrm{u}\left(-Q + t\right) - \frac{M z}{S} \hspace{2em}z(0)= X</m>57</li>58</ol>59</statement>60<answer>61<ul>62<li>63An object is released from rest from above the ground.64Let z measure its upward velocity at a given time.65Assume quadratic air resistance.66<ul><li><m>0 = K z^{2} - A L - L {z'} \hspace{2em}z(0)=0</m></li></ul></li>67<li>68A solution of salt water is pumped into a tank of less salty water,69while mixed water is pumped out at the same rate.70After a certain amount of time, the concentration of salt flowing into the71tank is instantly increased.72Let z measure the mass of salt in the tank at a given time.73<ul><li><m>-L M + {z'} = {\left(J - L\right)} M \mathrm{u}\left(-Q + t\right) - \frac{M z}{S} \hspace{2em}z(0)= X</m></li></ul></li>74<li>75Suppose the population of a species generally follows the logistical model:76births are linear based on population, and deaths are quadratic based on population.77However, at some point in the model, a natural disaster instantly wipes out78a fraction of the population.79Let z measure the population of this species at a given time.80<ul><li><m>-N z^{2} - W \delta\left(-K + t\right) = -C z + {z'} \hspace{2em}z(0)= M</m></li></ul></li>81<li>82A mass is attached to a spring. The mass is stretched outward from the spring's83natural position, then released from rest. Assume the presence of friction.84Let z measure the outward displacement of the mass from its natural position on85the spring.86<ul><li><m>-Y z = J {z'} + C {z''} \hspace{2em}z(0)= E ,z'(0)=0</m></li></ul></li>87<li>88A bowl of hot soup sits in a colder room.89Assume the room's temperature is kept constant,90and let z measure the temperature of91the soup over time.92<ul><li><m>-J z = -A J + {z'} \hspace{2em}z(0)= D</m></li></ul></li>93<li>94A circuit includes a battery providing constant voltage, a resistor,95and an inductor. Assume some initial current is flowing, and let z96measure the current throughout this circuit at a given time.97<ul><li><m>Y z - C = -L {z'} \hspace{2em}z(0)= Q</m></li></ul></li>98</ul>99</answer>100</exercise>101102103104