Exercise
Donald takes a loan to be paid with annual payments of 500 at the end of each year for 2n years. The annual effective interest rate is 4.94%. The sum of the interest paid in year 1 plus the interest paid in year n + 1 is equal to 720.
Calculate the amount of interest paid in year 10.
- 338
- 355
- 360
- 367
- 377
References
Hlynka, Myron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.
Solution: E
Both [math]n[/math] and [math]L[/math] are unknown [math]500\left(1-v^{2 n}\right)+500\left(1-v^n\right)=720[/math] (check formulas in the amortization table). So [math]-500 v^{2 n}-500 v^n+280=0[/math]. This is a quadratic in [math]v^n[/math] so from the quadratic formula, [math]v^n=.4[/math] (the other root is negative).
We want the amount of interest paid in year 10 , namely [math]500\left(1-v^{2 n-9}\right)[/math]. Also [math]v^9=\frac{1}{1.0494^9}=.64793[/math]. Hence
References
Hlynka, Myron. "University of Windsor Old Tests 62-392 Theory of Interest". web2.uwindsor.ca. Retrieved November 23, 2023.