it should actually be quite easy but i have difficulties to prove this fact: if $f: \mathbb{R} \to \mathbb{R}$ is continuous everewhere and is differentiable everywhere except for $x_0$ and if $\lim_{x\to x_0}f^{'}(x)$ exists, then $f^{'}(x_0)$ exists. Could someone help please? Thanks.
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1It follows from L'Hospital's rule, alternatively look at this. – leoli1 Jan 31 '21 at 12:29
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thanks a lot!!! – Logic_Problem_42 Jan 31 '21 at 12:34