Theorem
The only open subsets open in a connected set
are the setand the empty set
Proof
Suppose
is both open and closed.
Then
and
are open.
Also
and 
Henceis disconnected - a contradiction. Therefore the only open sets areand
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Theorem
The only open subsets open in a connected setare the setand the empty set
Proof
Supposeis both open and closed.
Thenandare open.
Alsoand
Henceis disconnected - a contradiction. Therefore the only open sets areand