Revision as of 10:13, 22 November 2023 by Admin (Created page with "Scott takes out a loan with 29 annual payments of $450 each. With the14th payment, Scott pays an extra $1,400, and then pays the balance in 8 years with revised annual payments. The annual effective interest rate is 11%. Calculate the amount of the revised payment. <ul class="mw-excansopts"><li>$2,359.45</li><li>$356.75</li><li>$288.09</li><li>$154.8</li><li>$255.31</li></ul> {{cite web |url=https://digitalcommons.calpoly.edu/cgi/viewcontent.cgi?article=1008&context=...")
ABy Admin
Nov 22'23
Exercise
Scott takes out a loan with 29 annual payments of $450 each. With the14th payment, Scott pays an extra $1,400, and then pays the balance in 8 years with revised annual payments. The annual effective interest rate is 11%.
Calculate the amount of the revised payment.
- $2,359.45
- $356.75
- $288.09
- $154.8
- $255.31
Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.
ABy Admin
Nov 22'23
Solution: B
First find the amount of the outstanding balance after the 14th payment:
[[math]]
450 a_{\overline{15}|0.11} = 3235.89
[[/math]]
After the extra 1,400 the balance is: 3235.89 – 1400 = 1835.89. Thus the revised payments would be:
[[math]]
1835.89 = x a_{\overline{8}|0.11} \implies x = 356.75
[[/math]]
Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.