To derive the explicit formula for the number of cars washed by Matt in any given week \( n \), we start with the information provided:
- In the first week (\( n = 1 \)), Matt washes \( A_1 = 6 \) cars.
- Each subsequent week, he washes 3 more cars than the previous week.
So, for any week \( n \), the number of cars washed can be represented as:
- First week: \( A_1 = 6 \)
- Second week: \( A_2 = 6 + 3 \times 1 = 9 \)
- Third week: \( A_3 = 6 + 3 \times 2 = 12 \)
- Fourth week: \( A_4 = 6 + 3 \times 3 = 15 \)
From this pattern, we can create a general formula. The number of cars washed in week \( n \) can be expressed as:
\[ A_n = 6 + 3(n - 1) \]
Thus, we can see that:
- When \( n = 1 \), \( A_1 = 6 + 3(1 - 1) = 6 \)
- When \( n = 2 \), \( A_2 = 6 + 3(2 - 1) = 9 \)
- When \( n = 3 \), \( A_3 = 6 + 3(3 - 1) = 12 \)
- When \( n = 4 \), \( A_4 = 6 + 3(4 - 1) = 15 \)
Now, comparing the choices given:
- \( A_n = 6 + 3n \)
- \( A_n = 3 + 6(n - 1) \)
- \( A_n = 6(3n - 1) \)
- \( A_n = 6 + 3(n - 1) \)
The correct explicit formula for the number of cars washed in week \( n \) is:
\[ A_n = 6 + 3(n - 1) \]
So the answer is \( A_n = 6 + 3(n - 1) \).
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