A vehicle is purchased for $18,000, with a down payment of $6,098. The balance in financed for three years at an annual rate of 7%. Find the monthly car payment.

$367.50

$834.12

$188.29

$555.79

The Present value of an annuity is given by PV = P(1 - (1 + r/t)^-nt)/(r/t)
where: P is the monthly payment, r is the annual rate = 7% = 0.07, t is the number of periods in one year = 12 and n is the number of years = 3.

18,000 - 6,098 = P(1 - (1 + 0.07/12)^-(3 x 12)) / (0.07/12)
11,902 = P(1 - (1 + 0.07/12)^-36) / (0.07/12)
P = 0.07(11,902) / 12(1 - (1 + 0.07/12)^-36) = 367.50

Therefore, monthly payment = $367.50

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A vehicle is purchased for $18,000, with a down payment of $6,098. The balance in financed for three years at an annual rate of 7%. Find the monthly car payment. $367.50 $834.12 $188.29 $555.79

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A vehicle is purchased for $18,000, with a down payment of $6,098. The balance in financed for three years at an annual rate of 7%. Find the monthly car payment.

$367.50

$834.12

$188.29

$555.79