Answer:
$2954.22
Step-by-step explanation:
We are given a present value of $360000 which needs to be paid in the future for the mortgage of a house therefore we are further told that $60000 of down payment has been made so now we are required to pay $300000 as monthly installments for the next 15 years so this is a present value annuity problem as we will have future regular periodic payments that for a house mortgage so firstly to interpret this information properly we will use the present value annuity to find the monthly payments which the formula is as follows:
Pv = Cx[(1 -(1+i)^-n)/i]
where C is the periodic payment we are looking for.
Pv is the present value for the home which is $300000 as a down payment of $60000 was made.
i is the interest rate which is 8.5%/12 as we are told it is compounded monthly.
n is the number of periods the in which the mortgage payments are made which is 15 years X 12 months =180 payments.
now we will substitute in the above mentioned formula :
$300000 = Cx[(1-(1+8.5%/12)^-180)/(8.5%/12)] now we will divide both sides with what multiplies C in brackets to solve for C
$300000/[(1-(1+8.5%/12)^-180)/(8.5%/12)] = C
$2954.218674 = C now we round off to two decimal places
C= $2954.22 which will be the monthly payment for this mortgage for 15 years every month.