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Let a compact interval $[a,b]\subset \mathbb{R}$. If a function $f:[a,b]\to \mathbb{R}$ is continuous and increasing on $[a,b]$, then what can be said about the derivative $f'$? Is it continuous? If it is, then how do we prove it? I came up with this claim, because I want to prove that if $f$ is continuous and increasing on $[a,b]$, then it its derivative is bounded on $[a,b]$.

This is not a homework. I just wanted to fix it. To be honest, I studied an article on Henstock-Stieltjes integral and the problem that I posted is one of the stated statements in that article.

Thanks in advance...

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    @Yoni Rozenshein Noted. That is why I have deleted my comment. Thanks. :)2012-12-11

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The derivative $f'$ need not be continuous. Let $f$ be a continuous and increasing function on $[0,2]$, $f=x $ when $x\in[0,1]$, and $f=2x-1$ when $x\in (1,2]$.

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    Sorry I made a mistake, uniform continuity and differentiability of $f$ does not imply $f'$ is bound. Consider $y=-\sqrt{1-x^{2}}$ on $[0,1]$, it's a quarter of a circle.2012-12-12