A couple deposits \( \$ 21,000 \) into an account earning \( 6 \% \) annual interest for 15 years. Calculate the future value of the investment if the interest is compounded weekly. Round your answer to the nearest cent. Formulas Answer How to enter your answer (opens in new window) Keyboard Shortcuts

To calculate the future value of an investment compounded weekly, you can use the formula: \[ FV = P \times \left(1 + \frac{r}{n}\right)^{n \cdot t} \] where: - \( P \) is the principal amount (\$21,000), - \( r \) is the annual interest rate (6% or 0.06), - \( n \) is the number of compounding periods per year (52 weeks), - \( t \) is the number of years the money is invested (15 years). Plugging in the values: \[ FV = 21000 \times \left(1 + \frac{0.06}{52}\right)^{52 \cdot 15} \] Calculating this gives: \[ FV \approx 21000 \times (1 + 0.00115384615)^{780} \approx 21000 \times (2.459601707) \approx 51750.63 \] So, the future value of the investment is approximately \$51,750.63. Investors often overlook the power of compound interest, especially with more frequent compounding, such as weekly. When you invest money, it's not just earning interest on the principal amount, but also interest on the previously earned interest! This magical effect is why starting to invest early can lead to substantial growth over time. For those eager to dive deeper into the secrets of compound interest, explore books like "The Richest Man in Babylon" by George S. Clason or "The Compound Effect" by Darren Hardy. These reads unveil timeless wisdom and modern strategies for maximizing your financial growth and understanding the potential of your investments.