Theorem
A closed subspace
of a completer metric space
is complete.
Proof
Suppose
is a Cauchy sequence in
is also a Cauchy sequence in
Since
is complete
But
Henceconverges inandis complete.
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Theorem
A closed subspaceof a completer metric spaceis complete.
Proof
Supposeis a Cauchy sequence in is also a Cauchy sequence in
Sinceis complete
But
Henceconverges inandis complete.