Binary Operator
An operator defined on a set S which takes two elements from S as inputs and returns a single element of S. Binary operators are called compositions by Rosenfeld (1968). Sets possessing a binary multiplication operation include the group, groupoid, monoid, quasigroup, and semigroup. Sets possessing both a binary multiplication and a binary addition operation include the division algebra, field, ring, ringoid, semiring, and unit ring.
See also
AND, Binary Operation, Boolean Algebra, Connective, Division Algebra, Field, Group, Groupoid, Monoid, NOT, Operator, OR, Quasigroup, Ring, Ringoid, Semigroup, Semiring, Set Closure, Unit Ring, XNOR, XORExplore with Wolfram|Alpha
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References
Rosenfeld, A. An Introduction to Algebraic Structures. New York: Holden-Day, 1968.Referenced on Wolfram|Alpha
Binary OperatorCite this as:
Weisstein, Eric W. "Binary Operator." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/BinaryOperator.html