Commutative operation
In mathematics, especially abstract algebra, a binary operation * on a set S is commutative if x * y = y * x for all x and y in S. If x * y = y * x for a particular choice of elements x and y, then x and y are said to commute.
The most well known examples of commutative binary operations are addition and multiplication of real numbers; for example:
- 4 + 5 = 5 + 4 (since both expressions evaluate to 9)
- 2 × 3 = 3 × 2 (since both expressions evaluate to 6)
Among commonly known binary operations that are not commutative are subtraction, division, exponentiation, and functional composition.
Further examples of commutative binary operations include addition and multiplication of complex numbers, addition of vectors, and intersection and union of sets.
Important non-commutative operations are the multiplication of matrices and the composition of functions.
An abelian group is a group whose operation is commutative.
A ring is called commutative if its multiplication is commutative, since the addition is commutative in any ring.
See also: Associativity, Distributive property, commutant
Referenced By
Commute | List of abstract algebra topics
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