To solve this, we are going to use the loan payment formula: [tex] P= \frac{ \frac{r}{n}(PV)}{1-(1+ \frac{r}{n})^{-nt} } [/tex]
where
[tex]P[/tex] is the payment
[tex]PV[/tex] is the present debt
[tex]r[/tex] is the interest rate in decimal form
[tex]n[/tex] is the number of payments per year
[tex]t[/tex] is the time in years
For Bank P
We know from our problem that the the principal of the loan will be $19,450, so [tex] PV=19450 [/tex]. We also know that Bank P offers a nine-year loan with an interest rate of 5.8%, compounded monthly , so [tex] t=9 [/tex] and [tex] r=\frac{5.8}{100} =0.058 [/tex]. Since Dahlia will make monthly payments, and a there are 12 months in a year, [tex] n=12 [/tex]. Lets replace the values in our formula:
[tex] P= \frac{ \frac{r}{n}(PV)}{1-(1+ \frac{r}{n})^{-nt} } [/tex]
[tex] P= \frac{ \frac{0.058}{12}(19450)}{1-(1+ \frac{0.058}{12})^{-(12)(9)} } [/tex]
[tex] P=231.59 [/tex]
Now we know that the monthly payment of Dahlia is $231.59. Since we know that she is going to make 12 monthly payments for 9 years, we can calculate the future value of the loan multiplying the amount of the monthly payments ($231.59) by the number of monthly payments (12) by the number of years (9):
[tex] FV=(231.59)(12)(9) [/tex]
[tex] FV=25011.72 [/tex]
Now we know that she is is going to pay $25,011.72 for her loan. Finally, to calculate the total finance charge, we are going to subtract the original loan ( $19,450) from the future value of the loan ($25,011.72), and then, we are going to add the service charge ($925.00):
[tex] FinanceCharge=(25011.72-19450)+925 [/tex]
[tex] FinanceCharge=6486.72 [/tex]
The total finance charge of bank P is $6,486.72
For Bank Q
We are going to repeat the same procedure as before.
[tex] P=19450 [/tex], [tex] r=\frac{5.5}{100} =0.055 [/tex], [tex] n=12 [/tex], and [tex] t=12 [/tex]. Lets replace the values in our formula:
[tex] P= \frac{ \frac{0.055}{12}(19450)}{1-(1+ \frac{0.055}{12})^{-(12)(10)} } [/tex]
[tex] P=211.08 [/tex]
Now that we have our monthly payment, we can calculate the future value of the loan multiplying the amount of the monthly payments ($211.08) by the number of monthly payments (12) by the number of years (10):
[tex] FV=(211.08)(12)(10) [/tex]
[tex] FV=25329.6 [/tex]
Just like before, to calculate the total finance charge, we are going to subtract the original loan ( $19,450) from the future value of the loan ($25,329.6), and then we are going to add the service charge ($690.85):
[tex] FinanceCharge=(25329.6-19450)+690.85 [/tex]
[tex] FinanceCharge=6570.45 [/tex]
The total finance charge of bank Q is $6570.45
Notice that the finance charge of ban Q is greater than the finance charge of bank P, so we are going to subtract the finance charge of bank Q from the finance charge of bank P:
[tex] 6570.45-6486.72=83.73 [/tex]
We can conclude that Loan Q’s finance charge will be $83.73 greater than Loan P’s. Therefore, the correct answer is a.
