Answer:
3-month real rate: 1.56%
30 years real rate: 4.42%
Explanation:
We will calcualte the future value of the bond and adjust by inflation:
[tex]Principal \: (1+ r)^{time} = Amount[/tex]
3.months TB:
Principal 100.00
time 1 quarter
rate 0.01085 (4.34% divide into 4 quarter)
[tex]100 \: (1+ 0.01085)^{1} = Amount[/tex]
Amount 101.09
Adjusted for 2.78 annual inflation
[tex]\frac{Nominal}{(1 + inflation)^{time} } = PV[/tex]
Nominal 101.09
time 1 quarter
Inflation 0.0278/4 = 0,00695
[tex]\frac{101.085}{(1 + 0.00695)^{1} } = PV[/tex]
PV 100.39
100.39 / 100 - 1 = 0.39% quarterly rate:
0.39 x 4 = 1.56% real rate.
Because the time is low and difference in rate is lower there is no subtancial difference between the accurate method and the simplier method : nominal - inflation = 4.34 - 2.78 = 1.56
Now we do the same for the 30 years TB
[tex]Principal \: (1+ r)^{time} = Amount[/tex]
Principal 100.00
time 30.00
rate 0.07330
[tex]100 \: (1+ 0.0733)^{30} = Amount[/tex]
Amount 834.90
[tex]\frac{Maturity}{(1 + rate)^{time} } = PV[/tex]
Maturity 834.90
time 30.00
rate 0.0278
[tex]\frac{834.898884531252}{(1 + 0.0278)^{30} } = PV[/tex]
PV 366.75
now we calculate the rate:
30√366.75/100 - 1 = 0.04427 = 4.42%
