What does limit does not exist mean?

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What does limit does not exist mean?

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Answer 1 · 2018-04-13T17:41:15

For the definition, please see below.

Explanation:

$lim_(xrarra)f(x)$ does not exist
The idea is that there is no number that $f(x)$ gets arbitrarily close to for $x$ sufficiently close to $a$ .

For a function $f$ defined in some open interval that contains $a$ , except possibly at $a$ ,

$lim_(xrarra)f(x)$ does not exist if and only if

there is no number $L$ such that for every $epsilon > 0$ , there is a $delta > 0$ with: for all $x$ , if $0 < abs(x-a) < delta$ , then $abs(f(x)-L) < epsilon$

equivalently

for every $L$ there is some $epsilon > 0$ such that for every $delta > 0$ there is some $x$ with $0 < abs(x-a) < delta$ , and $abs(f(x)-L) >= epsilon$

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What does limit does not exist mean?

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