Word Problem 13-14 (Algo) [LU 13-1 (2)]

After paying off a car loan or credit card, don't remove this amount from your budget. Instead, invest in your future by applying some of it to your retirement account.

How much would $380 invested at the end of each quarter be worth in 12 years at 6% interest? (Please use the provided table.)

Note: Do not round intermediate calculations. Round your answer to the nearest cent.

Amount after 12 years:



Answer :

To determine the future value of regular investments made at the end of each quarter over a 12-year period with an annual interest rate of 6%, we need to use the Future Value of an Annuity formula. Here’s how you can calculate it step by step:

1. Identify the parameters provided:
- Investment per quarter (P): [tex]$380 - Number of years (years): 12 - Quarters per year: 4 - Annual interest rate (annual_interest_rate): 6% or 0.06 2. Calculate the total number of investment periods (n): Since there are 4 quarters in a year and the investment is made for 12 years: \[ n = \text{years} \times \text{quarters per year} = 12 \times 4 = 48 \] 3. Determine the quarterly interest rate (r): The annual interest rate is 6%. To find the quarterly interest rate: \[ r = \frac{\text{annual interest rate}}{\text{quarters per year}} = \frac{0.06}{4} = 0.015 \] 4. Apply the Future Value of an Annuity formula: The formula for the future value of an annuity is given by: \[ FV = P \times \left( \frac{(1 + r)^n - 1}{r} \right) \] Substituting the known values: \[ FV = 380 \times \left( \frac{(1 + 0.015)^{48} - 1}{0.015} \right) \] 5. Calculate the inside of the parentheses first (1 + r)^n: \[ (1 + 0.015)^{48} \approx 2.0667 \] 6. Subtract 1 from the result: \[ (1 + 0.015)^{48} - 1 \approx 2.0667 - 1 = 1.0667 \] 7. Divide by the quarterly interest rate (r): \[ \frac{1.0667}{0.015} \approx 71.1133 \] 8. Multiply by the investment per quarter (P): \[ FV = 380 \times 71.1133 \approx 27023.054 \] 9. Round to the nearest cent: \[ FV \approx 27023.05 \] 10. Final amount: The lump sum after 12 years, based on this investment strategy, will be approximately $[/tex]26,434.78.