44 of 9% compounded monthly. He agreed to pay the loan in 60 equal monthly installments....
A loan of $ 8500 is to be repaid in 25 equal monthly installments with the first one paid seven months after the loan is made. The nominal annual interest rate is 8 % compounded bimonthly. Determine the amount of the monthly payment.
Bob Pearson borrowed $24000 from a bank at an interest rate of 9% compounded monthly. The loan will be repaid in 72 equal monthly installments over 6 years. What is his monthly payment amount? Immediately after his 20th payment, Bob desires to pay off the remainder of the loan in a single payment. What is this remaining balance? Monthly Payment =$ Single payment for remaining Balance after 20th payment = $ Last saved at 10:20:17
Bob Pearson borrowed $20000 from a bank at an interest rate of 11% compounded monthly. The loan will be repaid in 72 equal monthly installments over 6 years. What is his monthly payment amount? Immediately after his 20th payment, Bob desires to pay off the remainder of the loan in a single payment. What is this remaining balance? Monthly Payment =$ Single payment for remaining Balance after 20th payment = $
Mary Smith took a car loan of $26,000 to pay back in 60 monthly installments at an interest rate of 12%. Compute the loan balance immediately after the 40th payment. The answer choices are : $11,567 $9,463 $10,437 $13,000 I would rather you show me exactly how to solve this problem rather than just give an answer?
(1 point) Recall that the formula for a simple interest amortized loan, with initial loan value Vo, monthly payments of size m, with interest compounded n times per year for t years at annual interest rate r is rtn.t rt Ben buys his $230,000 home and, after the $40,000 down payment, finances the remainder with a simple interest amortized loan. Ben can pay at most $1,200 per month for the loan, on which the lender has set an annual rate...
Vanna has just financed the purchase of a home for $200 000. She agreed to repay the loan by making equal monthly blended payments of $3000 each at 4%/a, compounded monthly. a. Create an amortization table using a Microsoft Excel spreadsheet. In your answer include all the formulas used.b.How long will it take to repay the loan?c. How much will be the final payment?d. Determine how much interest she will pay for her loan.e. Use Microsoft Excel to graph the amortization...
On January 1, LaQuita bought an used car for $7,200 and agreed to pay for it as follows: 1/3 down payment, the balance to be paid in 36 equal monthly payments, the first payment due February 1, an annual interest rate of 9% compounded monthly. a. What is the amount of LaQuita's monthly payment b. During the summer LaQuita made enough money to pay off the entire balance due on the car as of October 1 (October 1 payment plus...
Q1 Mr. Smith borrowed $189,500 at 3.75% per year compounded monthly. Loan is for 20 years. Compute the monthly payment. Q2 For the same loan in Q1, compute how many months it will take to pay the loan off, if Mr. Smith pays $100 extra to the monthly amount you computed earlier Q3. For the same loan and payment you computed in Q1, compute the amount Mr. Smith owes to the bank immediately after the 89th monthly payment. Q4. Follow...
Q1 Mr. Smith borrowed $189,500 at 3.75% per year compounded monthly. Loan is for 20 years. Compute the monthly payment. Q2 For the same loan in Q1, compute how many months it will take to pay the loan off, if Mr. Smith pays $100 extra to the monthly amount you computed earlier
Consider a 15-year home mortgage loan with a fixed APR of 4.8%. Which of the following statements is NOT correct? Select one: O a. If you want to entirely pay off the loan at the end of year 10, the required lump sum payment is equal to the present value of 60 monthly payments O b. The monthly interest amount is calculated by 4.8% times the loan balance at the beginning of the month O c. The scheduled monthly loan...