Proof That a Continuous Image of a Sequentially Compact Set is Sequentially Compact
Theorem
A continuous image of a sequentially compact set is sequentially compact.
Proof
Let
be a continuous function and let
be a sequentially compact subset of
Let
be a sequence in
then there exists a sequence
insuch that
Since A is sequentially compactcontains a subsequence
which converges to a point
Then
converges to
hence
is sequentially compact.
