Final answer:
To determine the amount invested in a CD with an annual simple interest rate of 5.25% that has earned $567 over 6 years, we use the simple interest formula. After calculations, we find that $1,800 was the initial investment.
Step-by-step explanation:
To find out how much was invested in a certificate of deposit (CD) with a simple interest rate of 5.25% when $567 in interest is earned over 6 years, we need to use the formula for simple interest: Interest (I) = Principal (P) × Rate (R) × Time (T). In this scenario, we are given the interest earned (I = $567), the annual simple interest rate (R = 5.25%), and time (T = 6 years).
Now we rearrange the formula to solve for Principal (P):
P = I / (R × T)
First, convert the interest rate from a percentage to a decimal:
R = 5.25% = 0.0525
And then plug the values into the formula:
P = $567 / (0.0525 × 6)
P = $567 / 0.315
P = $1,800
Therefore, $1,800 was invested in the certificate of deposit.