Theorem
Every convergent sequence
in a metric space
is Cauchy.
Proof
Letbe a convergent sequence in a metric space
so that
or 
as
Then for every
there exists
such that
Hence
Henceis Cauchy.
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Theorem
Every convergent sequencein a metric spaceis Cauchy.
Proof
Letbe a convergent sequence in a metric spaceso thator as
Then for everythere existssuch that
Hence
Henceis Cauchy.