Answer :
Answer:
- b. $128.097.02
Explanation:
A constant annual investment of $5,900 for certain period is an annuity.
The equation for the future value (FV) of an annuity starting today, over t years, at an interest rate r is:
[tex]FV=\dfrac{(1+r)^t-1}{r}\times (1+r)}\times Annuity[/tex]
Substitute:
[tex]FV=\dfrac{(1+0.062)^{12}-1}{0.062}\times (1+0.062)}\times \$ 5,900=\$ 106,946.23[/tex]
The $106,946.23 will be kept 4 more years at the same interest rate. The future value is calculated using the formula:
[tex]FV=(1+r)^t\times Investment[/tex]
Substitute
[tex]FV=(1+0.062)^4\times \$ 106,946.23=\$ 128,097.02[/tex]