Logical Equivalences

Law Name P  P  T P  P  F Excluded middle law Contradiction law P  F  P P  T  P Identity laws P  T  T P  F  F Domination laws P  P  P P  P  P Idempotent laws (P)  P Double-negation law Logical Equivalences

P  Q  Q P P  Q  Q  P Commutative laws (P  Q)  R  P  (Q  R) (P  Q)  R  P  (Q  R) Associative laws (P  Q)  (P  R)  P  (Q  R) (P  Q)  (P  R)  P  (Q  R) Distributive laws (P  Q)  P  Q (P  Q)  P  Q De Morgan’s laws P  (P  Q)  P P  (P  Q)  P P  Q  P  Q P  Q (P  Q)  (Q  P) Absorption laws Implication law Bi-conditional law

Logical Equivalences

Logical Equivalences

Presentation Transcript

Discussion #10 Logical Equivalences

Standard Logical Equivalences

Propositional Equivalences

Symbolic Equivalences for Open Systems

CCS: Processes and Equivalences

Propositional Equivalences

Propositional Equivalences

Logical Reasoning :: Logical Problems

Propositional Equivalences

Closure Operators, Equivalences and Models

CCS: Processes and Equivalences

Propositional Equivalences

Logical Equivalences

Chapter 24: Some Logical Equivalences

Section 1.2: Propositional Equivalences

Propositional Equivalences

Proofs Using Logical Equivalences

Discussion #16 Validity & Equivalences

Standard Logical Equivalences

Row-equivalences again

Discussion #10 Logical Equivalences

Propositional Equivalences

Logical Equivalences