Respuesta :
Answer:
present value of bond = $1042.96
Explanation:
given data
spot rates for six months = 1%
spot rates for one and = 1.1%
spot rates for one and half years = 1.3%
price = $1000
coupon bond = 4.25%
time = 6 month
solution
we get here first price on bond paid that is
coupon paid = $1000 × 4.25 × 0.5 = $21.25
we get here present value of 6 month and 1 year and 1 and half year
present value = [tex]\frac{coupon\ payment }{(1+\frac{spot \ rate}{2})^t}[/tex] ..............1
present value of 6 month = [tex]\frac{21.25}{(1+\frac{0.1}{2})^1}[/tex] = 20.23
present value of 1 year = [tex]\frac{21.25}{(1+\frac{0.011}{2})^2}[/tex] = 21.01
present value of 1 year and half year = [tex]\frac{21.25}{(1+\frac{0.013}{2})^2}[/tex] = 20.97
and
now we get present value of par value in 1 and half year
present value of par value in 1 and half year = [tex]\frac{par\ value}{(1+\frac{spot rate}{2})^3}[/tex]
present value of par value in 1 and half year = [tex]\frac{1000}{(1+\frac{0.013}{2})^3}[/tex]
present value of par value in 1 and half year = 980.75
so
present value of bond will be as
present value of bond = 20.23 + 21.01 + 20.97 + 980.75
present value of bond = $1042.96
The price of this bond is $1,042.51
Coupon rate = 4.25%
Par value= $1000 Coupon payment (semi-annually)
Par value=(4.25%/2)×$1,000
Par value= 2.125%* $1000
Par value= $21.25
Bond A:
Semi-annual zero-coupon bond with face value of $21.25
Price = $21.25/ (1+0.01/2)^1
Price = $21.25/1.005
Price=$21.14
Bond B:
Semi-annual zero-coupon bond with face value of $21.25
Price = $21.25/ (1+0.011/2)^2
Price = $21.25/(1.0055)^2
Price = $21.25/1.011
Price=$20.14
Bond C:
Semi-annual zero-coupon bond with face value of $1,021.25
Price = ($1,000+$21.25)/ (1+0.013/2)^3
Price = $1,021.25/(1.0065)^3
Price = $1,021.25/1.02
Price=$1,001.23
Hence:
Bond price=$21.14+$20.14+$1,001.23
Bond price=$1,042.51
Inconclusion The price of this bond is $1,042.51.
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