Antiderivative exists but not integrable In the sense of Riemann, could

Maliyah Robles

Maliyah Robles

Answered question

2022-07-05

Antiderivative exists but not integrable
In the sense of Riemann, could an integral (if there exists could you give the less pathological counter-example possible) have an antiderivative but not be integrable on a compact subset?

Answer & Explanation

Kayley Jackson

Kayley Jackson

Beginner2022-07-06Added 16 answers

Explanation:
It is possible. Let f ( x ) = x 1.2 sin ( 1 x ) when x ( 0 , 1 ] and f ( 0 ) = 0. It is a differentiable function (check it) in the interval [0,1] and its derivative equals to f ( x ) = 1.2 x 0.2 sin ( 1 x ) 1 x 0.8 cos ( 1 x ) when x 0 and f ( 0 ) = 0. So obviously f′ has an antiderivative in [0,1], but it isn't even bounded, hence not Riemann integrable.

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