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Separated sets
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==Relation to topologically distinguishable points== {{main|Topological distinguishability}} Given a topological space ''X'', two points ''x'' and ''y'' are ''topologically distinguishable'' if there exists an [[open set]] that one point belongs to but the other point does not. If ''x'' and ''y'' are topologically distinguishable, then the [[singleton set]]s {''x''} and {''y''} must be disjoint. On the other hand, if the singletons {''x''} and {''y''} are separated, then the points ''x'' and ''y'' must be topologically distinguishable. Thus for singletons, topological distinguishability is a condition in between disjointness and separatedness.
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