EDB β€” 1CZ

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Exercises

  1. [1CZ]Suppose that a given function \(f : (a, b) → R\) is differentiable at every point of \((a, b)\) except \(x_ 0\), and that the limit \(\lim _{t→ x_ 0} f (t)\) exists and is finite. Show that f is also differentiable in \(x_ 0\) and that \(f (x_ 0 ) = \lim _{t→ x_ 0} f (t)\).

    [ [1D0]]

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