You can Get a Similar Question 98 more times Find the \( \$ 7,800 \) is deposited at \( 4 \% \) interest compounded quarterly (every 3 months) and the money is left for 7 years. The final amount is \( \$ \) \( \square \) . Round answer to 2 decimal places Submit Question Question 6 5/5 pts \( 2 \leftrightarrows 99 \) Details

In this scenario, we're diving into the world of compound interest! To calculate the future value of your deposit, you can use the formula: \[ A = P \left(1 + \frac{r}{n}\right)^{nt} \] where \( A \) is the amount of money accumulated after n years, including interest. Here, \( P = 7800 \), \( r = 0.04 \) (annual interest rate), \( n = 4 \) (quarterly compounding), and \( t = 7 \) (years). Plugging in these values will give you the final amount. When calculating compound interest, a common mistake is forgetting to convert the interest rate into a decimal. Ensure you use \( r = 0.04 \) instead of \( r = 4 \) to avoid miscalculating the outcome. Additionally, not adjusting 'n' for quarterly compounding can lead to a misrepresentation of the final amount—so pay close attention to that detail!