Dusty has the choice of taking out a 25-year loan for $165,000 at 9.1% interest, compounded monthly, or the same loan at 20 years for a higher monthly payment. how much more is the monthly payment for the 20 -year loan than the monthly payment for the 25-year loan?
Accepted Solution
A:
It is $99.04 more per month.
The payment is calculated by P = A/D, where A is the amount of the loan and D is the discount factor.
D = (((1+r)^n)-1)/(r(1+r)^n), where r is the annual interest rate as a decimal divided by 12, and n is the number of months he will be paying.
Since the rate is 9.1%, r = (9.1/100)/12 = 0.091/12 = 0.0076 For the 25 year loan, n = 25*12 = 300:
D = (((1+0.0076)^300)-1)/(0.0076(1+0.0076)^300) = 118.004 P = A/D = 165000/118.004 = 1398.26 per month
For the 20 year loan, n = 20*12 = 240:
D = (((1+0.0076)^240)-1)/(0.0076(1+0.0076)^240) = 110.198 P = A/D = 165000/110.198 = 1497.30 per month
The difference between payments is 1497.30 - 1398.26 = 99.04