$\"\"$

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Let the function $\"\"$ has two limit values $\"\"$ and $\"\"$ at $\"\"$ .

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Such that $\"\"$ and $\"\"$ .

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then for given $\"\"$ , there exist $\"\"$ and $\"\"$ such that

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$\"\"$ whenever $\"\"$

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and $\"\"$ whenever $\"\"$ .

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Now let $\"\"$ be the minimum values of $\"\"$ and $\"\"$ then

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$\"\"$

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$\"\"$ .

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Here $\"\"$ is a constant and $\"\"$ is negligible small.

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So $\"\"$ can be neglected.

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$\"\"$

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Therefore limit of the function $\"\"$ exist at $\"\"$ is unique.

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$\"\"$

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Limit of the function $\"\"$ exist at $\"\"$ is unique.

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