What is the average value of f on [0, π] when f(x) = sin x?

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Study for the AP Calculus BC Test. Discover flashcards and multiple choice questions with hints and explanations to prepare effectively. Ace your exam!

Multiple Choice

What is the average value of f on [0, π] when f(x) = sin x?

Explanation:
The average value of a function on an interval is found by taking the integral over the interval and dividing by its length. For f(x) = sin x on [0, π], this is (1/π) ∫_0^π sin x dx. The integral ∫_0^π sin x dx equals [-cos x]_0^π = (-cos π) - (-cos 0) = 1 - (-1) = 2. Therefore, the average value is 2/π, which is about 0.637 and lies between 0 and 1 as sin x stays between 0 and 1 on that interval. The other numbers would not be possible given the function’s range.

The average value of a function on an interval is found by taking the integral over the interval and dividing by its length. For f(x) = sin x on [0, π], this is (1/π) ∫_0^π sin x dx. The integral ∫_0^π sin x dx equals [-cos x]_0^π = (-cos π) - (-cos 0) = 1 - (-1) = 2. Therefore, the average value is 2/π, which is about 0.637 and lies between 0 and 1 as sin x stays between 0 and 1 on that interval. The other numbers would not be possible given the function’s range.

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