Suppose that you decide to borrow ​$16 comma 000

a) To calculate the monthly payment for each loan, we can use the PMT formula mentioned above.

For Loan A, the interest rate is 5.9% and the loan period is three years (36 months). Plugging these values into the formula, we have:

PMT = $16,000 * (0.059/12) / (1 - (1 + 0.059/12)^-36)

Calculating this expression, we find that the monthly payment for Loan A is approximately $486.46.

For Loan B, the interest rate is 5.8% and the loan period is five years (60 months). Plugging these values into the formula, we have:

PMT = $16,000 * (0.058/12) / (1 - (1 + 0.058/12)^-60)

Calculating this expression, we find that the monthly payment for Loan B is approximately $308.95.

b) To determine the total amount paid over the duration of the loan, we need to multiply the monthly payment by the total number of months.

For Loan A, the total amount paid over three years is $486.46 * 36 = $17,511.36.

For Loan B, the total amount paid over five years is $308.95 * 60 = $18,537.

c) To decide which loan option is better, we need to consider both the monthly payment and the total amount paid.

In terms of the monthly payment, Loan B has a lower monthly payment of $308.95 compared to Loan A's $486.46. This may be more affordable for some borrowers.

However, when considering the total amount paid, Loan A actually ends up being cheaper at $17,511.36 compared to Loan B's $18,537. This is because Loan A has a shorter loan period and therefore less interest built up over time.

Ultimately, the decision between Loan A and Loan B depends on the individual's financial situation and priorities. If the borrower wants to minimize the total amount paid, Loan A may be the better option. If having a lower monthly payment is more important, Loan B may be preferable.