Question: Almost. a) Correct. An antiderivative of (f(x)) is a function (F(x)) such that (F'(x)=f(x)). b) Your selection looks off. To check your answer, you should

Almost. a) Correct. An antiderivative of $f(x)$ is a function $F(x)$ such that $F'(x)=f(x)$. b) Your selection looks off. To check your answer, you should differentiate $F(x)$ (not $f(x)$) and verify that \[ F'(x) = f(x). \] If it matches, $F$ is indeed an antiderivative (up to an additive constant). for a this is correct?

[ Select ] A function whose integral is f(x) A function whose derivative is f(x) The reciprocal of the integral of f(x) The reciprocal of the derivative of f(x) / A function whose derivative is the same as the derivative of f(x)

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