Using a centered difference with h = 0.1, approximate f'(2) for f(x) = x^2.

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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

Using a centered difference with h = 0.1, approximate f'(2) for f(x) = x^2.

The centered difference method approximates f'(a) by [f(a+h) − f(a−h)] / (2h). With a = 2 and h = 0.1, compute f(2.1) = 4.41 and f(1.9) = 3.61. The difference is 0.80, and 2h = 0.2, so the quotient is 0.80 / 0.2 = 4.0. For f(x) = x^2, the exact derivative is f'(x) = 2x, which at x = 2 is 4.0. The centered difference gives the exact value here because a quadratic has zero third derivative, making the centered difference error term vanish. Thus the approximation is 4.0.

Using a centered difference with h = 0.1, approximate f'(2) for f(x) = x^2.

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

Using a centered difference with h = 0.1, approximate f'(2) for f(x) = x^2.

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