Respuesta :
Answer:
$20,229.5
Explanation:
Given:
Amount to be received = $5,000
Time period, n = 5 years
nominal discount rate = 10.725%
inflation rate = 3 percent
Now,
Using the Fischer's relation, we have
1 + Nominal rate = ( 1 + Real rate ) × ( 1 + Inflation )
on substituting the values, we get
( 1 + 10.725% ) = ( 1 + Real rate ) × ( 1 + 3% )
or
1.10725 = ( 1 + Real rate ) × 1.03
or
( 1 + Real rate ) = 1.075
or
Real rate = 1.075 - 1 = 0.075 or 7.5%
Thus,
Present Value of an ordinary annuity that makes $5000 every year payment for 5 years will be calculates as:
Present value = Monthly payment × [tex][\frac{(1-(1+r^{-n})}{r}][/tex]
or
Present value =[tex]5000\times[\frac{1 - (1 + 0.075)^{-5}}{0.075}][/tex]
or
Present value = 5000 × 4.0459
or
Present value = $20,229.5
