Answer:
X = 74.18
Step-by-step explanation:
Given that:
A perpetuity-immediate pays 100 per year and the annual effective rate of interest is 8%.
The PV of Perpetuity = [tex]\frac{100}{0.8}[/tex] = 1250
As this will be equivalent to the PV of the geometrically increase in annuity-immediate. Thus, the npv at time point S will be:
[tex]1250 = X[v+(1.05)v^2+(1.05^2)v^3+...(1.025^{24})v^{25}][/tex]
where
i = annual payment = 5% = 0.05
v = 1/1+ annual effective rate
= 1/1+8%
= 1/1+0.08
= 1/1.08
Our equation can be re-written as:
[tex]PV_5=\frac{X}{1.08}(\frac{1-(\frac{1.05}{1.08})^{25} }{1- \frac{1.05}{1.08} } )[/tex]
[tex]PV_5 = 16.35 X[/tex]
To determine the value of X, we equate the above value with 1250.
So, 16.35X = 1250
X = [tex]\frac{1250}{16.35}[/tex]
X = 74.18
