Answer :
Answer:
a) Calculate the payments on the original loan
monthly payment = principal / annuity factor
principal = $500,000
PV annuity factor, 300 periods, 0.52% = 151.59095
monthly payment = $500,000 / 151.59095 = $3,298.349934 ≈ $3,298.35
b) Calculate the current loan balance of the original loan
I prepared an amortization schedule on an excel spreadsheet. The balance after the 120th payment is $384,681.
c) Calculate the loan balance of the original loan 5 years from now.
the balance after the 180th payment = $293,760
d) Using the current, lower interest rate, calculate the present value of the remaining original loan payments
we can use the present value of an ordinary annuity formula to determine the present value of the remaining 60 payments (of $3,298.35 each) and the present value of $293,760.
PV of loan payments = $3,298.35 x 52.0404 (PV annuity factor, 0.479%, 60 periods) = $171,647.45
PV of principal = $293,760 / (1 + 5.75%)⁵ = $222,121.59
total = $393,769.04
e) Assume you refinance, taking out a new loan at the lower rate with an initial balance equal to the current balance of the original loan (i.e. the new loan amount is your answer from part b). Calculate the payments on this new loan.
monthly payment = principal / annuity factor
- principal = $384,681
- PV annuity factor, 240 periods, 0.479% = 142.43323
monthly payment = $384,681 / 142.43323 = $2,700.78
f) Calculate the loan balance of the new loan 5 years from now.
I prepared a second amortization schedule (modified amortization schedule). The principal balance after the 60th payment is $325,235