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17 November, 07:15

How much must be deposited at the beginning of each year in an account that pays 4%, compounded annually, so that the account will contain $36,000 at the end of 9 years? (Round your answer to the nearest cent.)

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  1. 17 November, 07:43
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    Annual deposit = $3,270.91

    Explanation:

    Giving the following information:

    Deposit = beginning of the year

    Interest rate = 4% compounded annually

    Final value = $36,000

    Number of years = 9

    To calculate the annual deposit, we need to use the following formula:

    FV = {A*[ (1+i) ^n-1]}/i + {[A * (1+i) ^n]-A}

    A = annual deposit

    Isolating A:

    A = { (FV*i) / {[ (1+i) ^n] - 1]} / (1+i)

    A = { (36,000*0.04) / [ (1.04^9) - 1]} / 1.04

    A = $3,270.91
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