Revision as of 00:01, 19 November 2023 by Admin (Created page with "'''Solution: E''' The present value of the payments (4000 at month 36 plus the payments of X) must match the present value of the present value of the amounts borrowed (4000 at month 0 plus the payments of 800). The quarterly interest rate is 0.264/4 and all payment times should be in quarters of a year. On that time scale, the 4000 at month 36 is at time 12. The payments of 4000 are at times 1/6, 3/6, 5/6, ..., 71/6 and there are 36 such payments. One way to write the...")
Exercise
ABy Admin
Nov 19'23
Answer
Solution: E
The present value of the payments (4000 at month 36 plus the payments of X) must match the present value of the present value of the amounts borrowed (4000 at month 0 plus the payments of 800).
The quarterly interest rate is 0.264/4 and all payment times should be in quarters of a year. On that time scale, the 4000 at month 36 is at time 12. The payments of 4000 are at times 1/6, 3/6, 5/6, ..., 71/6 and there are 36 such payments. One way to write the present value of these payments is
[[math]]
\frac{4000}{\left(1\!\!+\!\frac{0.264}{4}\right)^{12}} + \sum_{n=1}^{36}\frac{X}{\left(1\!+\!\frac{0.264}{4}\right)^{\frac{n-0.5}{3}}}.
[[/math]]
The payments of 800 are at times 1, 3, 5, 7, 9, and 11, in quarters. One way to write the present value of these payments plus the initial debt of 4000 is
[[math]]
4000+\sum_{n=1}^{6}{\frac{800}{\left(1+{\frac{0.264}{12}}\right)^{2n-1}}}.
[[/math]]
These are the two sides of equation in answer choice E.