# Commutative property

In mathematics, the **commutative property** states that a binary operation on a set **A** is said to be commutative if for all in **A** we have . An example of a commutative operation is addition in the set of real numbers. When a group's operation is commutative, it is said to be abelian. If , then the operation is said to be **anticommutative**.

In layman's terms, an equation demonstrates commutativity when the constants or variables can be moved around an operation without changing the answer (e.g. 1 + 2 = 2 + 1 or 2 * 3 = 3 * 2). It is as if the numbers are "commuting" from one place to another. Thus, using real numbers, both multiplication and addition are commutative, and subtraction and division are not. For vectors, the dot product is commutative, while the cross product is anticommutative.

The commutative property does not imply the associative property, nor vice versa. For example, matrix multiplication is associative but not commutative. Also, define the function on integers by . Although, is commutative, it is not associative (as but .