Apply the formula A=Pert

Question

Apply the formula  A=Pert
 , where  A
  is the amount accrued,  P
  is the principal, r is the rate of interest, and t is the time, in years. Dora invests $5,000 in an account that is compounded continuously at an annual interest rate of 2.5%. In 10 years, how much will Dora’s investment be worth to the nearest dollar? Show the steps that Dora must take to solve this problem.(4 points)

GPT-4o mini · Answer

To calculate the amount $ A $ that Dora's investment will be worth in 10 years using the formula for continuous compound interest, $ A = Pe^{rt} $, follow these steps: 1. **Identify the variables:** - $ P $ (principal) = $5,000 - $ r $ (annual interest rate) = 2.5% = 0.025 (as a decimal) - $ t $ (time in years) = 10 years 2. **Write the formula:** $$ A = Pe^{rt} $$ 3. **Substitute the values into the formula:** $$ A = 5000 \cdot e^{0.025 \cdot 10} $$ 4. **Calculate $ rt $:** $$ rt = 0.025 \cdot 10 = 0.25 $$ 5. **Calculate $ e^{rt} $:** Use a calculator or exponentiation function: $$ e^{0.25} \approx 1.284025 $$ 6. **Calculate $ A $:** $$ A = 5000 \cdot 1.284025 \approx 6420.125 $$ 7. **Round to the nearest dollar:** $$ A \approx 6420 $$ Thus, the amount Dora's investment will be worth in 10 years, rounded to the nearest dollar, is **$6,420**.