Answer:
Option D $26149 is correct.
Step-by-step explanation:
It is given, at the age of 25, Jill had $20,000 and he invested it in an account earning at a rate of 5% compounded annually.
We have to find how much Jill will earn at a age of 50.
We will use compound interest formula. The formula is,
A = P ( 1+r)[tex]^{t}[/tex]
Where, A = last amount, P = principal amount, r = rate of interest, t = number of years.
P = 20000, r = 5% = [tex]\frac{5}{100}[/tex] = 0.05,
t = (50-25) = 25
By substituting the values in the formula we will get,
A = 20000 (1 + 0.05)[tex]^{25}[/tex]
A = 20000 (1.05)[tex]^{25}[/tex]
A = 20000 (3.38635494)
A = 67727.10 ( Approximately taken upto two decimal place)
So we have got Jill will get at the age of 50 is $ 67727.10.
Now given, Bill had $20000 at the age of 35. He also invested it in an account which earns at a rate of 5% compounded annually.
Similarly we have to find the amount he will get at the age of 50.
So, P = $20000, r = 0.05, t = (50 - 35) = 15 years.
A = 20000 (1 + 0.05)[tex]^{15}[/tex]
A = 20000 ( 1.05)[tex]^{15}[/tex]
A = 20000 (2.078928)
A = 41578.56
So we have got at the age of 50 Bill will get $ 41578.56.
At the age of 50, Jill have more money than Bill. The amount of money that Jill have more = $(67727.10 - 41578.56) = $26148.54 rounded to $26149.
So we have got the answer.
Option D is correct here.
