i = .09/12 = .0075
n = 12(7) = 84
let the payment be P
50000 = P(1 - 1.0075^-84)/.0075
P = 804.45
balance after 1 year
= 50000(1.0075)^12 - 804.45(1.0075^12 - 1)/.0075
= 44628.62
do the same steps for the last part of your question.
What is the monthly payment for this loan?
Show the formula that you used and the values used for each variable to calculate the monthly payment.
What is the unpaid balance of the loan at the end of the 1st year?
Show the formula that you used and the values used for each variable to calculate the unpaid balance at the end of the 1st year.
What is the unpaid balance at the end of the 6th year? Show the formula that you used and the values used for each variable to calculate the unpaid balance at the end of the 6th year.
n = 12(7) = 84
let the payment be P
50000 = P(1 - 1.0075^-84)/.0075
P = 804.45
balance after 1 year
= 50000(1.0075)^12 - 804.45(1.0075^12 - 1)/.0075
= 44628.62
do the same steps for the last part of your question.
Thank you so much..
Amount of single lump sum of money
= Principal (1 + i)^n
the present value of an annuity
PV = P( 1 - (1+i)^-n)/i
and the amount of an annuity
amount = P( (1+i)^n - 1)/i
where P is the annuity payment, i is the interest rate of each period expressed as a decimal and n is the number of periods
I showed all the steps necessary, I am sure you can insert any intermediate arithmetic answers if you need them
= 50000(1.0075)^72 - 804.45(1.0075^72 - 1)/.0075 = $9,198.86
Total repayment+ $67,574.13 based on $50,000 at 9% for 7 years.
Is this correct? Thanks for your help
= 50000(1.0075)^72-804.45(1.0075^72 - 6)/.0075= 9198.86
check it
M = P * (r * (1 + r)^n) / ((1 + r)^n - 1)
Where:
- M is the monthly payment
- P is the principal amount (loan amount)
- r is the monthly interest rate (annual interest rate divided by 12)
- n is the total number of payments (7 years * 12 months per year)
For the loan amount of $50,000 and an interest rate of 9% that compounds monthly for 7 years, let's calculate the monthly payment:
P = $50,000
r = 9% / 100 / 12 = 0.0075 (monthly interest rate)
n = 7 * 12 = 84 (total number of payments)
M = $50,000 * (0.0075 * (1 + 0.0075)^84) / ((1 + 0.0075)^84 - 1)
Using a calculator or spreadsheet, you can compute this expression to find the monthly payment.
To calculate the unpaid balance at the end of the 1st year, you need to calculate the remaining balance after making 12 monthly payments. You can use the formula:
B = P * ((1 + r)^n - (1 + r)^p) / ((1 + r)^n - 1)
Where:
- B is the remaining balance
- P is the principal amount (loan amount)
- r is the monthly interest rate (annual interest rate divided by 12)
- n is the total number of payments (7 years * 12 months per year)
- p is the number of payments made (1 year * 12 months per year = 12)
Plug in the values:
B = $50,000 * ((1 + 0.0075)^84 - (1 + 0.0075)^12) / ((1 + 0.0075)^84 - 1)
Compute this expression to find the unpaid balance at the end of the 1st year.
Similarly, to calculate the unpaid balance at the end of the 6th year, you need to calculate the remaining balance after making 72 monthly payments (6 years * 12 months per year). Use the same formula as above, but substitute n with 72 and p with 72.
B = $50,000 * ((1 + 0.0075)^84 - (1 + 0.0075)^72) / ((1 + 0.0075)^84 - 1)
Compute this expression to find the unpaid balance at the end of the 6th year.