Consider f:R→R , f is differentiable at xo , but f' is not continuous at xo fix xo, MVT tells us f(x)-f(xo) ───── = f'(c(x)) , where xo─c(x)─x (i.e. c由x而变动) x - xo Now we let left hand side A(x) , right hand side B(x) we know A(x)=B(x) , for all x€R\{xo} But lim A(x) = f'(xo) x→xo 如果藉此我们说因为左边极限存在 右边也要跟着如此 所以 lim B(x) 应该要 = f'(xo) x→xo 可是 lim B(x) = lim f'(c(x)) = f'(xo) x→xo x→xo 这个等号只成立在f' is continuous at xo --

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