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5 June, 19:07

A 12-year, 5 percent coupon bond pays interest annually. The bond has a face value of $1,000. What is the percentage change in the price of this bond if the market yield rises to 6 percent from the current level of 5.5 percent?

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  1. 5 June, 19:18
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    Percentage change in price = 1.54%

    Explanation:

    The price of a bond is the present value (PV) of its interest payments and redemption value.

    Note that interest payment = Coupon (%) * Face value

    The coupon rate is 12% in this question

    The redemption value is the amount payable upon maturity of the bond. Here, it is the face value.

    So we discount these cash flows - interest payments and face value

    Price of the bond at a yield of 6%

    Interest rate payment = 6% * 1000 = 60

    PV of interest payments = (1 - (1+r) ^ (-n)) / r

    r = yield, n = number of years

    PV of interest:

    60 * (1 - (1+0.06) ^ (-12)) / 0.06

    = 60 * 8.3838

    =$530.30

    PV of redemption value = 1000 * (1+0.06) ^ (-12)

    = 496.96

    Price of Bond = 530.30 + 496.96 = $1027.26

    Price of bond when yield is 5.5%

    = 60 * (1 - (1+0.055) ^ (-12)) / 0.055

    = 60 * 8.6185

    =$517.11

    PV of redemption value = 1000 * (1+0.055) ^ (-12)

    = 525.98

    Price of Bond = 517.11 + 525,98 = $1043.09

    Percentage change in price =

    = ((1043.09-1027.26) / 1027.26) * 100

    = 1.54%
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