Question 22 The amount of money in a CD account grows according to the equation \( A(t)=5000(1.1)^{t} \), where \( A(t) \) represents the amount after \( t \) years. Which of the following amount is possible after 10 years? \( \$ 13,968.71 \) \( \$ 11,893.35 \) \( \$ 10,000 \) \( \$ 12,968.71 \)

If you plug in \( t = 10 \) into the equation \( A(t) = 5000(1.1)^{t} \), you’ll find that \( A(10) = 5000(1.1)^{10} \approx 5000 \times 2.5937 \approx 12,968.71 \). This means after 10 years, your account balance could be around \$12,968.71! In the world of finance, knowing how compound interest works can be a game changer. Always consider the time factor and the interest rate; a small increase in either can yield significant gains over a period. And remember, if you miscalculate the time or the interest, you might miss out on those sweet extra dollars!