Suppose Felix receives a $21,000.00 loan to be repaid in equal installments at the end of each of the next 3 years. The interest rate is 5% compounded annually. Use the formula for the present value of an ordinany annuity to find this payment amount: PVAN=PMTt(1+a1T21)PMTPVAN(1a+nN1)1 In this case, PVAN equals I equals and N equals Using the formula for the present value of an ordinary annuity, the annuat payment amount for this loan is Because this payment is fixed over time, enter this annual payment amount in the "Payment" columin of the following table for all three years. Each payment consists of two parts-interest and repayment of principal. You can calculate the interest in year 1 by multiplving the loan balance. at the beginning of the year (PVAN) by the interest rate (1). The repayment of principal is equal to the payment (PMI) minus the interest charge for the year: The interest paid in year 1 is Enter the values for interest and repayment of principal for wear 1 in the following table. Because the balance at the end of the fint vear is equal to the beginning amount minus the repayment of principat, the ending balance for year 1 . This is the beginning amount for year 2 . Enter the values for interest and repayment of principal for year 1 in the following table. Because the balance at the end of the first year is equal to the beginning amount minus the repayment of principal, the ending balance for year 1 is . This is the beginning amount for year 2 . Enter the ending balance for year 1 and the beginning amount for year 2 in the following table. Using the same process as you did for year 2 , complete the following amortization table by filling in the remaining values for vears 2 and 3. Complete the following table by determining the percentage of each payment that represents interest and the percentage that rapresents principal for each of the three years