Chapter 2, Problem 60RE

a.

To determine

To find the annual amount (in dollars) deposited using the given function $D\left(t\right)=3500+15t^2$for $t=0\text{ and t=15}\text{.}$

Answer to Problem 60RE

The annual amount (in dollars) deposited using the given function $D\left(t\right)=3500+15t^2$for $t=0\text{ and t=15}$is $D\left(0\right)=3500and\text{ D}\left(15\right)=6875.$

Explanation of Solution

Given information: Consider the function, $D\left(t\right)=3500+15t^2$

Calculation: Substitute $t=0\text{ and t=15}$,

  $\begin{array}{l}D\left(0\right)=3500+15{\left(0\right)}^2\\ =3500\\ \text{Now},D\left(15\right)=3500+15{\left(15\right)}^2\\ =3500+15\left(225\right)\\ =3500+3375\\ =6875\end{array}$

  $D\left(15\right)\text{ is }\boxed{\text{6875}}$

In $\boxed{1995}$ Ella has deposited $\boxed{3500}$ dollars and in $\boxed{2010}$ she got back $\boxed{6875}$ dollars.

is what the value of represents.

b.

To determine

To determine the year will she deposit $\$17,000$ to be modeled by the function $D\left(t\right)=3500+15t^2$

Answer to Problem 60RE

The year that she will deposit $\$17,000$ to be modeled by the given function = $30$ years.

Explanation of Solution

Given information: Consider the function, $D\left(t\right)=3500+15t^2$

Calculation:

The given function,

  $\begin{array}{l}D\left(t\right)=17000\\ 17000=3500+15{\left(t\right)}^2\text{or,}\\ 15{\left(t\right)}^2=17000-3500\\ 15{\left(t\right)}^2=13500\\ {\left(t\right)}^2=\frac{13500}{15}\\ {\left(t\right)}^2=900\\ t=30\end{array}$

Hence after $30$ years Ella will get $\$17,000$ .

c.

To determine

To find the average rate of change of $D$ between $t=0\text{ and t=15}$ for the function $D\left(t\right)=3500+15t^2$ .

Answer to Problem 60RE

The average rate of change of $D$ between $t=0\text{ and t=15}$ is $225 per year., and this represents the average annual increase.

Explanation of Solution

Given information: Consider the function, $D\left(t\right)=3500+15t^2$

Calculation:

Since in Ella deposited $\$3500$ (when $t=0$ ) and she got back $\$6875$ $ 6875 (when $t=15$ ).

So, the difference in $15$ years is calculated as,

  $6875-3500=3375$

Now the average rate of change of $D$ between

  $\begin{array}{l}t=0\\ t=15\\ \frac{3375}{15}=225\end{array}$

Hence, $\$225$ per year is the average rate of change and this represents average annual increase.