Answer:
a. $2953.9
b. $2813.24
Explanation:
To calculate the future value of an annuity paid at the beginning of the period, you have:
[tex]VF = A\left[\frac{(1+i)^{n+1} - (1+i)}{i}\right] = 100\left[\frac{(1.05)^{19} - (1.05)}{0.05}\right] = 2953.9[/tex]
To calculate the future value of an annuity paid at the end of the period, you have:
[tex]VF = A\left[\frac{(1+i)^{n} - 1)}{i}\right] = 100\left[\frac{(1.05)^{18} - 1)}{0.05}\right] = 2813.24[/tex]
Mr. Knox will have $2953.9 at the end of the 18 years, if he pays $100 at the beginning of each year. On teh other hand, Mr Knox will have $2813.24 at the end of the 18 years, if he pays $100 at the end of each year.
