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18 October, 16:09

Matt is saving to buy a new motorcycle. If he deposits $65 at the end of each month in an account that pays an annual interest rate of 6.5 %, how much will he have in 24 months? Assume that the compounding is being done monthly.

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  1. 18 October, 16:40
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    Since, he is making a deposit periodically (monthly), this is an annuity question.

    The future value of an annuity is given by FV = P ((1 + r/t) ^nt - 1) / (r/t)

    where:

    P is the periodic payment = $65.

    r is the annual interest rate = 6.5% = 0.065.

    t is the number of payments in one year = 12

    n is the number of years = 2 years

    Therefore, FV = 65 ((1 + 0.065 / 12) ^ (2 x 12) - 1) / (0.065 / 12)

    = 65 ((1 + 0.005417) ^24 - 1) / 0.005417

    = 65 ((1.005417) ^24 - 1) / 0.005417

    = 65 (1.1384 - 1) / 0.005417

    = 65 (0.1384) / 0.005417

    = 8.9979 / 0.005417

    = 1,661.15

    Therefore, at the end of 24 months, Matt will have $1,661.15
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