Question

To calculate the value of the car after five years, we can use the formula for the value of a car that depreciates by a certain percentage each year. Here, the formula is:

\[ V = P(1 - r)^t \]

where:
- \( V \) is the value of the car after time \( t \),
- \( P \) is the initial value of the car,
- \( r \) is the rate of depreciation (as a decimal),
- \( t \) is the number of years.

In this case:
- \( P = 24,500 \),
- \( r = 0.15 \) (15% as a decimal),
- \( t = 5 \).

Now, substituting the values into the formula:

\[ V = 24,500(1 - 0.15)^5 \]
\[ V = 24,500(0.85)^5 \]

Calculating \( (0.85)^5 \):

\[ (0.85)^5 \approx 0.4437 \]

Now, substituting this back into the earlier equation:

\[ V \approx 24,500 \times 0.4437 \]
\[ V \approx 10,870.78 \]

So, the value of the car after five years is approximately **$10,870.78**.

The correct response is:
**$10,870.78**.