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3 May, 19:29

Suppose you are going to receive $14,000 per year for five years. The appropriate interest rate is 7 percent. a-1. What is the present value of the payments if they are in the form of an ordinary annuity? (Do not round intermediate calculations and round your answer to 2 decimal places, e. g., 32.16.) a-2. What is the present value of the payments if the payments are an annuity due? (Do not round intermediate calculations and round your answer to 2 decimal places, e. g., 32.16.) b-1. Suppose you plan to invest the payments for five years. What is the future value if the payments are an ordinary annuity? (Do not round intermediate calculations and round your answer to 2 decimal places, e. g., 32.16.) b-2. What is the future value if the payments are an annuity due? (Do not round intermediate calculations and round your answer to 2 decimal places, e. g., 32.16.) c-1. Which has the higher present value, the ordinary annuity or annuity due? c-2. Which has the higher future value?

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  1. 3 May, 19:55
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    a1) $57,402.76

    a2) $61,420.96

    b1) $80,510.34

    b2) $86,146.07

    c1) Annuity Due

    c2) Annuity Due

    Explanation:

    Suppose you are going to receive $14,000 per year for five years. The appropriate interest rate is 7 percent. a-1. What is the present value of the payments if they are in the form of an ordinary annuity?

    An ordinary annuity is such that is paid at the end of every year

    PV of an Annuity = C x [ (1 - (1+i) - n) / i ]

    Where,

    C is the cash flow per period = $14,000

    i is the rate of interest = 7%

    n is the frequency of payments = 5 years

    14,000 x [ (1 - (1+0.7) ^-5) / 0.7] = $57,402.76

    a-2. What is the present value of the payments if the payments are an annuity due?

    An annuity due is such that is paid at the start of every period

    we will use the same formula but the number of years will be 4, signifying the beginning of the 4 years, and then we will add 14,000 to the answer because that amount will be received now.

    PV of an Annuity = C x [ (1 - (1+i) - n) / i ]

    Where,

    C is the cash flow per period = $14,000

    i is the rate of interest = 7%

    n is the frequency of payments = 4 years

    14,000 x [ (1 - (1+0.7) ^-4) / 0.7] = $47,420.96

    To this amount we add $14,000 = $61,420.96

    b-1. Suppose you plan to invest the payments for five years. What is the future value if the payments are an ordinary annuity?

    FV = C * (1+r) ^ n - 1) / r

    where:

    C=Dollar amount of each annuity payment

    r=Interest rate (also known as discount rate)

    n=Number of periods in which payments will be made

    FV = 14,000 x ((1+0.07) ^5 - 1) / 0.07 = $80,510.34

    b-2. What is the future value if the payments are an annuity due?

    FV = C * ((1+r) ^ n) - 1) / r x (1+r)

    FV = 14,000 x ((1+0.07) ^5 - 1) / 0.07 x (1.07) = $86,146.07

    c-1. Which has the higher present value, the ordinary annuity or annuity due?

    Annuity Due

    c-2. Which has the higher future value?

    Annuity Due
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