Is the derivative of a monotonically increasing function positve? [duplicate]

Solution 1:

A function strictly increasing need not have a (strictly) positive derivative at all points. For instance $f(x)=x^3$ is monotonically (strictly) increasing on the interval $(-1,1)$, but the derivative is not always positive on that interval: Namely: $f'(0)=0$.

Show function $F: [0,1] \rightarrow \int_x^{x^3}f(t)dt$ is differentiable given continous function f

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