Oppenheimer Bank is offering a 30-year mortgage with an APR of 4.91% based on mo
ID: 2820596 • Letter: O
Question
Oppenheimer Bank is offering a 30-year mortgage with an APR of 4.91% based on monthly compounding. With this mortgage your monthly payments would be $1,968 per month. In addition, Oppenheimer Bank offers you the following deal: Instead of making the monthly payment of $1,968 every month, you can make half the payment every two weeks (so that you will make 52/2- 26 payments per year). With this plan, how long will it take to pay off the mortgage if the EAR of the loan is unchanged? The number of payments will be, which is approximately years. (Round to two decimal places and enter the years rounded to the nearest whole number.)Explanation / Answer
First calculate the loan amount:
Using financial calculator BA II Plus - Input details:
#
I/Y = Rate = 4.91/12 =
0.409167
PMT =
-$1,968.00
N = Number of years remaining x frequency =
360
FV = Future Value =
$0.00
CPT > PV = Present value of loan =
$370,388
Now, we can calculate the period:
Using financial calculator BA II Plus - Input details:
#
FV = Future Value =
$0.00
PV = Present Value of loan =
-$370,388.00
I/Y = Rate / Payment frequency in a year = 4.91/26 =
0.1888461538
PMT = Payment = 1968/2 =
$984.00
CPT > N = Total number of payments =
658
Convert in years = N / Payment frequency in a year = 658/26 = Years =
25
The number of payments will be 658, which is approximately 25 years
Using financial calculator BA II Plus - Input details:
#
I/Y = Rate = 4.91/12 =
0.409167
PMT =
-$1,968.00
N = Number of years remaining x frequency =
360
FV = Future Value =
$0.00
CPT > PV = Present value of loan =
$370,388
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