Product term: Difference between revisions

In Boolean logic, a product term is a conjunction of literals, where each literal is either a variable or its negation.

Examples of product terms include:

${\displaystyle A\wedge B}$

${\displaystyle A\wedge (\mathrm{\neg }B)\wedge (\mathrm{\neg }C)}$

${\displaystyle \mathrm{\neg }A}$

The terminology comes from the similarity of AND to multiplication as in the ring structure of Boolean rings.

For a boolean function of ${\displaystyle n}$ variables ${\displaystyle x_1,\dots ,x_n}$, a product term in which each of the ${\displaystyle n}$ variables appears once (in either its complemented or uncomplemented form) is called a minterm. Thus, a minterm is a logical expression of n variables that employs only the complement operator and the conjunction operator.

• Fredrick J. Hill, and Gerald R. Peterson, 1974, Introduction to Switching Theory and Logical Design, Second Edition, John Wiley & Sons, NY, Template:Isbn