example

Nathaly deposited $\text{\$12,500}$ in her bank account where it will earn \text{4%} interest. How much interest will Nathaly earn in $5$ years? Solution We are asked to find the Interest, $I$. Organize the given information in a list. \begin{array}{ccc}\hfill I& =& ?\hfill \\ \hfill P& =& \text{$12,500}\hfill \\ \hfill r& =& \text{4%}\hfill \\ \hfill t& =& \text{5 years}\hfill \end{array}

Write the formula.	$I=Prt$
Substitute the given information.	$I=\left(12,500\right)\left(0.04\right)\left(5\right)$
Simplify.	$I=2,500$
Check your answer. Is $\text{\$2,500}$ a reasonable interest on $\text{\$12,500}$ over $5$ years?
At 4\text{%} interest per year, in $5$ years the interest would be 20\text{%} of the principal. Is 20\text{%} of $\text{\$12,500}$ equal to $\text{\$2,500}$? Yes.
Write a complete sentence that answers the question.	The interest is $\text{\$2,500}$.

example

Loren lent his brother $\text{\$3,000}$ to help him buy a car. In $\text{4 years}$ his brother paid him back the $\text{\$3,000}$ plus $\text{\$660}$ in interest. What was the rate of interest?

Answer: Solution We are asked to find the rate of interest, $r$. Organize the given information. \begin{array}{ccc}\hfill I& =& 660\hfill \\ \hfill P& =& \text{$3,000}\hfill \\ \hfill r& =& ?\hfill \\ \hfill t& =& \text{4 years}\hfill \end{array}

Write the formula.	$I=Prt$
Substitute the given information.	$660=\left(3,000\right)r\left(4\right)$
Multiply.	$660=\left(12,000\right)r$
Divide.	$\frac{660}{12,000}=\frac{\left(12,000\right)r}{12,000}$
Simplify.	$0.055=r$
Change to percent form.	\text{5.5%}=r
Check your answer. Is 5.5\text{%} a reasonable interest rate to pay your brother?
$I=Prt$
$660\stackrel{?}{=}\left(3,000\right)\left(0.055\right)\left(4\right)$
$660=660\quad\checkmark$
Write a complete sentence that answers the question.	The rate of interest was 5.5\text{%}.

example

Eduardo noticed that his new car loan papers stated that with an interest rate of \text{7.5%}, he would pay $\text{\$6,596.25}$ in interest over $5$ years. How much did he borrow to pay for his car?

Answer: Solution We are asked to find the principal, $P$. Organize the given information. \begin{array}{ccc}\hfill I& =& 6,596.25\hfill \\ \hfill P& =& ?\hfill \\ \hfill r& =& \text{7.5%}\hfill \\ \hfill t& =& \text{5 years}\hfill \end{array}

Write the formula.	$I=Prt$
Substitute the given information.	$6,596.25=P\left(0.075\right)\left(5\right)$
Multiply.	$6,596.25=0.375P$
Divide.	$\frac{6,596.25}{0.375}=\frac{0.375P}{0.375}$
Simplify.	$17,590=P$
Check your answer. Is $\text{\$17,590}$ a reasonable amount to borrow to buy a car?
$I=Prt$
$6,596.25\stackrel{?}{=}\left(17,590\right)\left(0.075\right)\left(5\right)$
$6,596.25=6,596.25\quad\checkmark$
Write a complete sentence that answers the question.	The amount borrowed was $\text{\$17,590}$.

example

Caroline got $\text{\$900}$ as graduation gifts and invested it in a $\text{10-month}$ certificate of deposit that earned \text{2.1%} interest. How much interest did this investment earn?

Answer: Solution We are asked to find the interest, $I$. Organize the given information. \begin{array}{ccc}\hfill I& =& ?\hfill \\ \hfill P& =& \text{\$900}\hfill \\ \hfill r& =& \text{2.1%}\hfill \\ \hfill t& =& \text{10 months}\hfill \end{array}

Write the formula.	$I=Prt$
Substitute the given information, converting 10 months to $\frac{10}{12}$ of a year.	I=$900\left(0.021\right)\left(\frac{10}{12}\right)
Multiply.	$I=15.75$
Check your answer. Is $\text{\$15.75}$ a reasonable amount of interest?
If Caroline had invested the $\text{\$900}$ for a full year at 2\text{%} interest, the amount of interest would have been $\text{\$18}$. Yes, $\text{\$15.75}$ is reasonable.
Write a complete sentence that answers the question.	The interest earned was $\text{\$15.75}$.