Math, asked by riyanghori3005, 1 year ago

Give the example of complete metric space which is not compact

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Answered by Anonymous

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since compactness implies, in particular, that a Cauchy sequence contains a convergent subsequence, then (in the metric space context) a compact set must be complete. the reverse need not be the case - completeness is a statement about Cauchy sequences, whereas compactness is a statement about all sequences.

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