Answer:
The amount Chris pay for his bond = $109.44
Explanation:
Given that:
Chris purchased a 10 year 100 par value bond where 6% coupons are paid semiannually. Cheryl purchased a 100 par value bond where 6% coupons are paid semiannually.
The Price of the Cheryl's bond is 6% given that it is purchased at at par value where 6% coupons are paid.
Suppose The yield for Chris’s bond is 80% of the yield for Cheryl’s bond.
Then:
Price of the Cheryl's bond = Present Value of the coupon in perpetuity
∴
[tex]100=\dfrac{3}{Yield}[/tex]
Yield=[tex]\dfrac{100}{3}[/tex]
Yield =0.03
Yield = 3%
The Yield of Chris = 0.8 × 3
The Yield of Chris = 2.4% semiannual
However;
Present Value of the coupons is: [tex]PV= \dfrac{A*[ (1+r)^n -1]}{[(1+r)^n * r] }[/tex]
[tex]PV= \dfrac{3*[ (1+0.024)^{20} -1]}{[(1+0.024)^{20} *0.024 ] }[/tex]
[tex]PV= \dfrac{3*[ (1.024)^{20} -1]}{[(1.024)^{20} *0.024 ] }[/tex]
[tex]PV= \dfrac{3*[1.606938044 -1]}{[1.606938044 *0.024 ] }[/tex]
[tex]PV= \dfrac{3*[0.606938044]}{[0.03856651306 ] }[/tex]
[tex]PV= \dfrac{1.820814132}{0.03856651306 }[/tex]
PV = 47.21
The PV of the face value = [tex]\dfrac{100}{(1+r)^n}[/tex]
The PV of the face value = [tex]\dfrac{100}{(1+0.024)^{20}}[/tex]
The PV of the face value = [tex]\dfrac{100}{(1.024)^{20}}[/tex]
The PV of the face value = [tex]\dfrac{100}{1.606938044}[/tex]
The PV of the face value = 62.230
Finally:
The amount Chris pay for his bond = PV of the coupons + PV of the face value
The amount Chris pay for his bond = 47.21 + 62.230
The amount Chris pay for his bond = $109.44
