Final answer:
We are asked to compute the values of the exponential function A=$8000e^(0.07t) for t=4, 6, and 7. The evaluated values using a calculator are approximately $10,298.44, $13,464.29, and $15,618.91 respectively.
Step-by-step explanation:
The question is asking to evaluate the exponential function A=$8,000e^(0.07t), with the value of 't' being 4, 6, and 7. We can use a calculator to solve this, by plugging in the 't' values into the function.
- When 't' is 4, A = $8000e^(0.07*4), A ≈ $10,298.44
- When 't' is 6, A = $8000e^(0.07*6), A ≈ $13,464.29
- When 't' is 7, A = $8000e^(0.07*7), A ≈ $15,618.91
This concept of exponential growth is frequently used to describe phenomena in fields such as economics and population growth.
Learn more about Exponential Growth