Hugh akston took out a 30 year mortgage with an ear of 5.9%. if hugh borrowed $300,000 to buy his home, then his monthly payment will be closest to:

The formula of the present value of an annuity ordinary is
Pv=pmt [(1-(1+r/k)^(-kn))÷(r/k)]
Pv present value 300000
PMT monthly payment?
R interest rate 0.059
K compounded monthly 12 because the payments are monthly
N time 30 years
Solve the formula for PMT
PMT=pv÷ [(1-(1+r/k)^(-kn))÷(r/k)]
PMT=300,000÷((1−(1+0.059÷12)^(
−12×30))÷(0.059÷12))
=1,779.41

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mtzion mtzion · Answer 2 · 2019-12-10T09:05:47+01:00

Answer:

Monthly payment = $1,779.41

Explanation:

A mortgage is a a form of loan that is secured on a specified property that the debtor with predetermined periodic payments over a fixed period of time.

Here is the formula for calculating Hugh's monthly repayment

[tex]\\P[\frac{r(1+r)^n}{((1+r)^n)-1)}][/tex]

Explanation of the terms below

P = Loan amount.

M = Monthly mortgage payment.

r = Interest rate. Which has to be recalculated to monthly. Therefore monthly rate[5.9% expresssed in percentage] = [tex]\frac{0.059}{12}[/tex] = 0.004917
n = number of payments. This is the loan term. Therefore our N = 30 years by 12 months = 360.

Fitting into the formular:

[tex]\\300000 * \frac{0.004917(1+0.004917)^'360'}{(1+0.004917)^'360'}-1[/tex]

Which is = $1779.41 monthly

Hugh akston took out a 30 year mortgage with an ear of​ 5.9%. if hugh borrowed​ $300,000 to buy his​ home, then his monthly payment will be closest​ to:

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Hugh akston took out a 30 year mortgage with an ear of 5.9%. if hugh borrowed $300,000 to buy his home, then his monthly payment will be closest to: