Chapter 5.4, Problem 14E

a.

To determine

Find the velocity.

Answer to Problem 14E

The velocity is $96$ ft/sec

Explanation of Solution

Calculation: given equation is $s=-16t^2+96t+112$

The first derivative, which is equal to the velocity function .then substitute 0

  $\begin{array}{l}s=-16t^2+96t+112\\ s^{\prime }\left(t\right)=v\left(t\right)\\ v\left(t\right)=-32t+96\\ v\left(0\right)=96\end{array}$

Thus, the velocity is $96$ ft/sec

b.

To determine

Find the maximum height when it occurs.

Answer to Problem 14E

The maximum height is $256$ feet.

Explanation of Solution

Calculation: given the equation is $-16t^2+96t+112$

Set the velocity function equal to $0$ and solve for $t$

  $\begin{array}{l}v\left(t\right)=-32t+96\\ 0=-32t+96\\ -96=-32t\\ t=3\\ \text{plug }3\text{ back into the originals}\left(t\right)\text{ function}.\\ s\left(3\right)=-16{\left(3\right)}^2+96\left(3\right)+112\\ s\left(3\right)=256\end{array}$

Thus, the maximum height is $256$ feet.

c.

To determine

Find the velocity when $s=0$

Answer to Problem 14E

The velocity is $-128$ ft/sec

Explanation of Solution

Calculation: given the equation is $-16t^2+96t+112$

Set the velocity function equal to $0$ and solve for $t$

  $\begin{array}{l}0=-16t^2+96t+112\\ 0=t^2-6t-7\\ 0=\left(t-7\right)\left(t+1\right)\\ t=7,t=-1\\ s=-16t^2+96t+112\\ v=s^{\prime }=-32t+96\\ v\left(7\right)=-32\left(7\right)+96\\ =-224+96\\ =-128\end{array}$

Thus, the velocity is $-128$ ft/sec