Final answer:
The initial investment was $4550, the interest rate is 6.5% per year, and the investment will reach approximately $9301 in the year 2010.
Step-by-step explanation:
The exponential growth model provided for the value of the investment is A=4550e^0.065t, where A is the amount after t years, 4550 is the initial investment, and 0.065 is the interest rate.
Part A: Initial Investment
To find the initial investment, we look at the value of the investment at t=0.
Plugging in t=0 into the model gives us
A=4550e^0, which simplifies to
A=4550 as e^0 is 1. Therefore, the initial investment was $4550.
Part B: Interest Rate
The interest rate given in the model is the exponent's coefficient, which is 0.065, or 6.5% per year.
Part C: Future Value of the Investment
To find in which year the account will be worth approximately $9301, we need to solve for t in the equation 4550e^0.065t = 9301. By taking natural logs on both sides and solving for t, we find that t is approximately 10 years. Hence, the investment will be worth approximately $9301 in the year 2010.