Answer:
$1,448.66
Step-by-step explanation:
The future value of an annuity with yearly deposits 'P' at an interest rate of 'r' invested for 'n' years is determined by:
[tex]FV = P[\frac{(1+r)^n-1}{r}][/tex]
For P = $100, r = 0.08 and n = 10 years:
[tex]FV = 100[\frac{(1+0.08)^{10}-1}{0.08}]\\FV=\$1,448.66[/tex]
The amount at the end of the ten years is $1,448.66
