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Exercises

  1. [15M]Let \(f:(0,1]→ℝ\) be a continuous function. Prove that it is uniformly continuous, if and only if the limit \(\lim _{xβ†’ 0+}f(x)\) exists and is finite.

    Solution 1

    [15N]

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Authors: "Mennucci , Andrea C. G." .
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