Answer:
$391,400
Step-by-step explanation:
we can use the future value formula for an annuity due:
future value of an annuity due = (1 + r) x payment x {[(1 + r)ⁿ - 1] / r}
- payment = $60,000
- r = 9%
- n = 5
FV = (1 + 9%) x $60,000 x {[(1 + 9%)⁵ - 1] / 9%} = 1.09 x $60,000 x {[1.09⁵ - 1] / 9%} = $65,400 x 5.9847 = $391,400
In an annuity due, the first payment is done immediately and not at the end of the period like a normal annuity.