Identity element: Difference between revisions

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In [[algebra]], an '''identity element''' or '''neutral element''' with respect to a [[binary operation]] is an element which leaves the other operand unchanged, generalising the concept of [[zero]] with respect to [[addition]] or [[one]] with respect to [[multiplication]].
In [[algebra]], an '''identity element''' or '''neutral element''' with respect to a [[binary operation]] is an element which leaves the other operand unchanged, generalising the concept of [[zero]] with respect to [[addition]] or [[one]] with respect to [[multiplication]].


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==Examples==
==Examples==
* Existence of an identity element is one of the properties of a [[group (mathematics)|group]] or [[monoid]].
* Existence of an identity element is one of the properties of a [[group (mathematics)|group]] or [[monoid]].
* An [[identity matrix]] is the identity element for [[matrix multiplication]].
* An [[identity matrix]] is the identity element for [[matrix multiplication]]; a [[zero matrix]] is the identity element for [[matrix addition]].
* The [[empty set]] is the identity element for set [[union]].


==See also==
==See also==
* [[Identity (mathematics)]]
* [[Identity (mathematics)]][[Category:Suggestion Bot Tag]]

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In algebra, an identity element or neutral element with respect to a binary operation is an element which leaves the other operand unchanged, generalising the concept of zero with respect to addition or one with respect to multiplication.

Formally, let be a binary operation on a set X. An element I of X is an identity for if

holds for all x in X. An identity element, if it exists, is unique.

Examples

See also