Primary
Consensus Theorem ○◂|Definition|1st|20251119205401-00-⌔
Consensus theorem
In Boolean algebra, the consensus theorem or rule of consensus1 is the identity:
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The consensus or resolvent of the terms and is . It is the conjunction of all the unique literals of the terms, excluding the literal that appears unnegated in one term and negated in the other. If includes a term that is negated in (or vice versa), the consensus term is false; in other words, there is no consensus term.
The conjunctive dual of this equation is:
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Printed 2026-06-28.
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Link to original Footnotes
Frank Markham Brown, Boolean Reasoning: The Logic of Boolean Equations, 2nd edition 2003, p. 44 ↩
Secondary
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