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| | 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: |
| | |
| | :<math>A \wedge B</math> |
| | :<math>A \wedge (\neg B) \wedge (\neg C)</math> |
| | :<math>\neg A</math> |
| | |
| | The terminology comes from the similarity of AND |
| | to multiplication as in the ring structure of [[Boolean ring]]s. |
| | |
| | [[Category:Boolean algebra]] |
| | |
| | {{mathlogic-stub}} |
| | {{logic-stub}} |
Revision as of 18:38, 1 January 2014
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:
The terminology comes from the similarity of AND
to multiplication as in the ring structure of Boolean rings.
Template:Mathlogic-stub
Template:Logic-stub