Investment Future Value Calculation Using Compound Interest

1. How long does it take for each investment to be worth more than $7500? 2. What are the values of each investment after 3 years, 7 years, and 10 years?

Investment 1: 6.1% compounded quarterly Investment 2: 6.1% compounded monthly

Calculating the Time for Each Investment to Reach $7500

To track the future values of the two investments, we can use a spreadsheet or a financial program on a calculator or computer. Let's start by calculating how long it takes for each investment to be worth more than $7500. Investment 1: 6.1% compounded quarterly Investment 2: 6.1% compounded monthly To determine the time it takes for each investment to reach $7500, we can use the formula for compound interest: A = P(1 + r/n)^(nt) Where: A = the future value of the investment P = the principal amount (initial investment) r = the annual interest rate (in decimal form) n = the number of times interest is compounded per year t = the number of years For Investment 1 (6.1% compounded quarterly), we have: P = $5000 r = 6.1% = 0.061 (in decimal form) n = 4 (compounded quarterly) Let's solve for t: $7500 = $5000(1 + 0.061/4)^(4t) To find the time it takes for Investment 1 to be worth more than $7500, we need to solve this equation. However, since it involves an exponential term, we can use trial and error or a financial program to find the answer. For Investment 2 (6.1% compounded monthly), we have: P = $5000 r = 6.1% = 0.061 (in decimal form) n = 12 (compounded monthly) Similarly, let's solve for t: $7500 = $5000(1 + 0.061/12)^(12t) Again, we can use trial and error or a financial program to find the time it takes for Investment 2 to be worth more than $7500.
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