Answer:
Account A = $25,009.49
Account B = $25,898.00
Step-by-step explanation:
To find out how much would need to be deposited in each account to reach the goal of $74,000 in 15 years, we can use the compound interest formula:
[tex]\boxed{\begin{array}{l}\underline{\textsf{Compound Interest Formula}}\\\\A=P\left(1+\dfrac{r}{n}\right)^{nt}\\\\\textsf{where:}\\\phantom{ww}\bullet\;\;\textsf{$A$ is the final amount.}\\\phantom{ww}\bullet\;\;\textsf{$P$ is the principal amount.}\\\phantom{ww}\bullet\;\;\textsf{$r$ is the interest rate (in decimal form).}\\\phantom{ww}\bullet\;\;\textsf{$n$ is the number of times interest is applied per year.}\\\phantom{ww}\bullet\;\;\textsf{$t$ is the time (in years).}\end{array}}[/tex]
Account A has a rate of 7.5% compounded once a year. Therefore:
Substitute these values into the equation and solve for P:
[tex]74000=P\left(1+\dfrac{0.075}{1}\right)^{1\cdot 15}[/tex]
[tex]74000=P\left(1.075\right)^{15}[/tex]
[tex]P=\dfrac{74000}{(1.075)^{15}}[/tex]
[tex]P=25009.485415...[/tex]
[tex]P=\$25009.49[/tex]
Therefore, we would have to deposit $25,009.49 into account A to reach an account balance of $74,000 in 15 years.
Account B has a rate of 7% compounded daily. Therefore:
Substitute these values into the equation and solve for P:
[tex]74000=P\left(1+\dfrac{0.07}{365}\right)^{365\cdot 15}[/tex]
[tex]74000=P\left(1+\dfrac{0.07}{365}\right)^{5475}[/tex]
[tex]P=\dfrac{74000}{\left(1+\dfrac{0.07}{365}\right)^{5475}}[/tex]
[tex]P=25898.000508...[/tex]
[tex]P=\$25898.00[/tex]
Therefore, we would have to deposit $25898.00 into account B to reach an account balance of $74,000 in 15 years.
