Ethel and Jack each separately apply for and receive a loan worth $7,725 apiece. Ethel has a relatively average credit rating, so her loan has an APR of 9.14%, compounded monthly. Jack's credit rating is excellent, so his loan has an APR of 6.88%, compounded monthly. If they both pay off their respective loans by making six years of identical monthly payments, how much more will Ethel pay than Jack?

Question

Mathematics

Callie Finley

23 April, 10:56

Ethel and Jack each separately apply for and receive a loan worth $7,725 apiece. Ethel has a relatively average credit rating, so her loan has an APR of 9.14%, compounded monthly. Jack's credit rating is excellent, so his loan has an APR of 6.88%, compounded monthly. If they both pay off their respective loans by making six years of identical monthly payments, how much more will Ethel pay than Jack?

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Answers (1)

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Corbin Delgado · Answer 1

For Ethel:

P = 7725

r = 0.0914

n = 6

Converting nominal interest rate to effective annual interest rate

i = (1 + 0.0914/12) ^12 - 1 = 0.0953

Solving for the yearly payments:

A = 7725 [0.0953 (1 + 0.0953) ^6] / [ (1 + 0.0953) ^6 - 1]

A = $1,749.50

For Jack:

P = 7725

r = 0.0688

n = 6

Converting nominal interest rate to effective annual interest rate

i = (1 + 0.0688/12) ^12 - 1 = 0.0710

Solving for the yearly payments:

A = 7725 [0.0710 (1 + 0.0710) ^6] / [ (1 + 0.0710) ^6 - 1]

A = $1,625.74

Ethyl will pay

$1,749.50 - $1,625.74 = $123.76 more than Jack