Answer:
The amount that he will receive every year for 10 years is b. $3,803.97
Explanation:
Hi, first we need to find out how much money he has from the previous investment, for that, we need to use the following equation.
[tex]FutureValue=\frac{A((1+r)^{n}-1) }{r }[/tex]
Where:
A= Annuity or periodic payment made (in our case, $308/quarter)
r = effective rate (in our case 1.5% / 4 = 0.375% effective quarterly)
n = Number of periodic payments (in our case, 20*4= 80 payments)
So, everything should look like this:
[tex]FutureValue=\frac{308((1+0.00375)^{80}-1) }{0.00375 }=28,672.88[/tex]
Now, the money we count with is $28,672.88, and taking into account that the rate will change to 5.5% compounded annually (which is the same as effective annually), we need to find the annual salary that Terry can withdraw from his account so it will last for exactly 10 years. For that, we need to use the following formula and solve for "A"
[tex]PresentValue=\frac{A((1+r)^{n}-1) }{r(1+r)^{n} }[/tex]
In this case, r would be 0.055, n=10 and the present value is $28,672.88. Everything should look like this.
[tex]28,672.88=\frac{A((1+0.055)^{10}-1) }{0.055(1+0.055)^{10} }[/tex]
[tex]28,672.88=A(7.537625829)[/tex]
[tex]A=3,803.97[/tex]
So, the account, determine the amount that he will receive every year for 10 years is $3,803.97
Best of luck
