In: Finance
A man buys a car for $40,000. If the interest rate on the loan is 12%, compounded monthly, and if he wants to make monthly payments of $600 for 60 months, how much must he put down? (Round your answer to the nearest cent.)
Compute the monthly interest rate, using the equation as shown below:
Monthly rate = Annual rate/ 12 months
= 12%/ 12 months
= 1%
Hence, the monthly rate is 1%.
Compute the present value annuity factor (PVIFA), using the equation as shown below:
PVIFA = {1 – (1 + Rate)^-Number of periods}/ Rate
= {1 – (1 + 0.01)^-60}/ 1%
= 44.9550383968
Hence, the present value annuity factor is 44.9550383968.
Compute the present value of the loan, using the equation as shown below:
Present value = Monthly loan payment*PVIFA
= $600*44.9550383968
= $26,973.02
Hence, the present value of loan is $26,973.02.
Compute the down payment amount, using the equation as shown below:
Down payment = Car price – Present value of loan
= $40,000 – $26,973.02
= $13,026.98
Hence, the down payment amount is $13,026.98.