Chapter 1.5, Problem 47E

To determine

To find: The time required to double in the value for investment of $\$500$ .

Answer to Problem 47E

The time required to double in the value for investment of $\$500$ is $14.936$ years.

Explanation of Solution

Given information: The amount of investment is $\$500$ and the interest rate is $4.75\%$ compounded annually.

Formula used: The formula to calculate the amount is given by,

  $A=P{\left(1+r\right)}^t$

Calculation:

The double amount on investment of $\$500$ is:

  $\begin{array}{c}A=2\times \$500\\ =\$1000\end{array}$

To find the time, substitute $\$500$ for $P$ , $\$1000$ for $A$ and $0.0475$ for $r$ in the above formula.

  $\begin{array}{c}\$1000=\$500{\left(1+0.0475\right)}^t\\ {\left(1.0475\right)}^t=\frac{\$1000}{\$500}\\ {\left(1.0475\right)}^t=2\end{array}$

Take $\log$ on both sides of the above equation.

  $\begin{array}{c}\log {\left(1.0475\right)}^t=\log 2\\ t\log \left(1.0475\right)=\log 2\\ t=\frac{\log 2}{\log \left(1.0475\right)}\\ \approx 14.936\end{array}$

Therefore, the time required to double in the value for investment of $\$500$ is $14.936$ years.