Difference between revisions of "Complement (set theory)"

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In [[set theory]], the '''complement''' of a [[subset]] of a given [[set (mathematics)|set]] is the "remainder" of the larger set.   
 
In [[set theory]], the '''complement''' of a [[subset]] of a given [[set (mathematics)|set]] is the "remainder" of the larger set.   
  

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In set theory, the complement of a subset of a given set is the "remainder" of the larger set.

Formally, if A is a subset of X then the (relative) complement of A in X is

In some version of set theory it is common to postulate a "universal set" and restrict attention only to sets which are contained in this universe. We may then define the (absolute) complement

The relation of complementation to the other set-theoretic functions is given by De Morgan's laws: