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Understanding Analysis

Exercise 4.3.5

Show using Definition 4.3.1 that if $c$ is an isolated point of $A \subseteq R$ , then $f : A \to R$ is continuous at $c$

Answers

Since $c$ is isolated, we can set $δ$ small enough that the only $x \in A$ satisfying $| x - c | < δ$ is $x = c$ . Then clearly $| f (x) - f (c) | < 𝜖$ since $f (x) = f (c)$ for all $| x - c | < δ$ .

ulissemini

2022-01-27 00:00

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