a. Complete an amortization schedule for a $28,000 loan to be
repaid in equal installments at the end of each of the next three
years. The interest rate is 12% compounded annually. Round all
answers to the nearest cent.
|
Beginning |
|
|
Repayment |
Ending |
Year |
Balance |
Payment |
Interest |
of Principal |
Balance |
1 |
$ |
$ |
$ |
$ |
$ |
2 |
$ |
$ |
$ |
$ |
$ |
3 |
$ |
$ |
$ |
$ |
$ |
b. What percentage of the payment represents interest and what
percentage represents principal for each of the three years? Round
all answers to two decimal places.
|
% Interest |
% Principal |
Year 1: |
% |
% |
Year 2: |
% |
% |
Year 3: |
% |
% |
c. Why do these percentages change over time?
- These percentages change over time because even though the
total payment is constant the amount of interest paid each year is
declining as the remaining or outstanding balance declines.
- These percentages change over time because even though the
total payment is constant the amount of interest paid each year is
increasing as the remaining or outstanding balance declines.
- These percentages change over time because even though the
total payment is constant the amount of interest paid each year is
declining as the remaining or outstanding balance increases.
- These percentages change over time because even though the
total payment is constant the amount of interest paid each year is
increasing as the remaining or outstanding balance increases.
- These percentages do not change over time; interest and
principal are each a constant percentage of the total payment.
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