Answer:
Miller-bond:
today: $ 1,167.68
after 1-year: $ 1,157.74
after 3 year: $ 1,136.03
after 7-year: $ 1,084.25
after 11-year: $ 1,018.87
at maturity: $ 1,000.00
Modigliani-bond:
today: $ 847.53
after 1-year: $ 855.49
after 3 year: $ 873.41
after 7-year: $ 918.89
after 11-year: $ 981.14
at maturity: $ 1,000.00
Explanation:
We need to solve for the present value of the coupon payment and maturity of each bonds:
Miller:
[tex]C \times \frac{1-(1+r)^{-time} }{rate} = PV\\[/tex]
C 80.000
time 12
rate 0.06
[tex]80 \times \frac{1-(1+0.06)^{-12} }{0.06} = PV\\[/tex]
PV $670.7075
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 1,000.00
time 12.00
rate 0.06
[tex]\frac{1000}{(1 + 0.06)^{12} } = PV[/tex]
PV 496.97
PV c $670.7075
PV m $496.9694
Total $1,167.6769
In few years ahead we can capitalize the bod and subtract the coupon payment
after a year:
1.167.669 x (1.06) - 80 = $1,157.7375
after three-year:
1,157.74 x 1.06^2 - 80*1.06 - 80 = 1136.033855
If we are far away then, it is better to re do the main formula
after 7-years:
[tex]C \times \frac{1-(1+r)^{-time} }{rate} = PV\\[/tex]
C 80.000
time 5
rate 0.06
[tex]80 \times \frac{1-(1+0.06)^{-5} }{0.06} = PV\\[/tex]
PV $336.9891
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 1,000.00
time 5.00
rate 0.06
[tex]\frac{1000}{(1 + 0.06)^{5} } = PV[/tex]
PV $747.26
PV c $336.9891
PV m $747.2582
Total $1,084.2473
1 year before maturity:
last coupon payment + maturity
1,080 /1.06 = 1.018,8679 = 1,018.87
For the Modigliani bond, we repeat the same procedure.
PV
[tex]C \times \frac{1-(1+r)^{-time} }{rate} = PV\\[/tex]
C 30.000
time 24
rate 0.04
[tex]30 \times \frac{1-(1+0.04)^{-24} }{0.04} = PV\\[/tex]
PV $457.4089
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 1,000.00
time 24.00
rate 0.04
[tex]\frac{1000}{(1 + 0.04)^{24} } = PV[/tex]
PV 390.12
PV c $457.4089
PV m $390.1215
Total $847.5304
And we repeat the procedure for other years
