Logic parti
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Propositional logic uses propositions that are either true or false as building blocks. Propositions can be combined using logical connectives like negation, conjunction, disjunction, implication, and biconditional. Truth tables define the truth values of compound propositions based on the truth values of the atomic propositions. Logical equivalences allow replacing one proposition with an equivalent proposition to simplify expressions in propositional logic.
![Rules of Replacement
10. Exportation
[ ( P ∧ Q ) ⇒ R ] ≡ [ P ⇒ ( Q ⇒ R ) ]
11. Absurdity
[ ( P ⇒ Q ) ∧ ( P ⇒ ¬ Q )] ≡ ¬ P
12. Contrapositive
( P ⇒ Q ) ≡ (¬ Q ⇒ ¬P )](https://image.slidesharecdn.com/logicparti-130427115214-phpapp01/85/Logic-parti-25-320.jpg)
Logic parti
- 1. LOGIC
- 2. PROPOSITIONAL LOGIC l Proposition l declarative statement that is either true or false, but not both l the following statements are propositions: l The square root of 2 is irrational. l In the year 2010, more Filipinos will go to Canada. l -5 < 75 l the following statements are NOT propositions: l What did you say? l This sentence is false. l x = 6
- 3. PROPOSITIONAL LOGIC l Notation l atomic propositions l capital letters l compound propositions l atomic propositions with logical connectives l defined via truth tables l truth values of propositions l 1 or T (true) l 0 or F (false)
- 4. LOGICAL CONNECTIVES Operator Symbol Usage Negation ¬ not Conjunction ∧ and Disjunction ∨ or Conditional → if, then Biconditional ↔ iff
- 5. NEGATION l turns a false proposition to true and turns a true proposition to false l truth table P ¬ P 1 0 0 1 l example l P: 10 is divisible by 2. l ¬ P: 10 is not divisible by 2.
- 6. CONJUNCTION l truth table P Q P ∧ Q 1 1 1 1 0 0 0 1 0 0 0 0
- 7. CONJUNCTION l examples l 6 < 7 and 7 < 8 l 2*4 = 16 and a quart is larger than a liter. l P: Barrack Obama is the American president. Q: Benigno Aquino III is the Filipino president. R: Corazon Aquino was an American president. P ∧ Q P ∧ R R ∧ Q
- 8. DISJUNCTION l truth table P Q P ∨ Q 1 1 1 1 0 1 0 1 1 0 0 0
- 9. DISJUNCTION l examples l 6 < 7 or Venus is smaller than earth. l 2*4 = 16 or a quart is larger than a liter. l P: Slater Young is a millionaire. Q: Lucio Tan is a billionaire R: Steve Jobs was a billionaire. P ∨ Q P ∨ R R ∨ Q
- 10. CONDITIONAL/IMPLICATION l P is the hypothesis or premise l Q is the conclusion l truth table P Q P → Q 1 1 1 1 0 0 0 1 1 0 0 1
- 11. CONDITIONAL/IMPLICATION l other ways to express P → Q: l If P then Q l P only if Q l P is sufficient for Q l Q if P l Q whenever P l Q is necessary for P
- 12. CONDITIONAL/IMPLICATION l examples: l If triangle ABC is isosceles, then the base angles A and B are equal. l 1+2 = 3 implies that 1 < 0. l If the sun shines tomorrow, I will play basketball. l If you get 100 in the final exam, then you will pass the course. l If 0 = 1, then 3 = 9.
- 13. BICONDITIONAL l logically equivalent to P → Q ∧ Q → P l truth table P Q P ↔ Q 1 1 1 1 0 0 0 1 0 0 0 1
- 14. BICONDITIONAL l examples l A rectangle is a square if and only if its diagonals are perpendicular. l 5 + 6 = 6 if and only if 7 + 1 = 10.
- 15. OTHER CONCEPTS l contrapositive l ¬ Q → ¬ P contrapositive of P → Q l ¬ Q → ¬ P is equivalent to P → Q l inverse l ¬ P → ¬ Q is the inverse of P → Q l P → Q is not equivalent to its inverse l converse l Q → P is the converse of P → Q
- 16. OTHER CONCEPTS l types of propositional forms l tautology – a proposition that is always true under all possible combinations of truth values for all component propositions l contradiction – a proposition that is always false under all possible combinations of truth values for all component propositions l contingency – a proposition that is neither a tautology nor a contradiction
- 17. SAMPLE TRUTH TABLES P Q P ∧ Q (P ∧ Q) → P 1 1 1 1 1 0 0 1 0 1 0 1 0 0 0 1 (P ∧ Q) → P
- 18. SAMPLE TRUTH TABLES P ¬ P P ∧ ¬ P 1 0 0 0 1 0 P ∧ ¬ P
- 19. SAMPLE TRUTH TABLES P Q P ∨ Q (P ∨ Q )→ P 1 1 1 1 1 0 1 1 0 1 1 0 0 0 0 1 (P ∨ Q) → P
- 20. SAMPLE TRUTH TABLES P Q P ↔ Q P ∧ Q ¬ P ∧¬ Q (P ∧ Q) ∨ (¬ P ∧¬ Q) 1 1 1 1 0 1 1 0 0 0 0 0 0 1 0 0 0 0 0 0 1 0 1 1 Show that (P ↔ Q) ↔(( P ∧ Q) ∨ (¬ P ∧¬ Q))
- 21. Equivalent Propositions (Logical Equivalence) l When are two propositions equivalent? Suppose P and Q are compound propostions, P and Q are equivalent if the truth value of P is always equal to the truth value of Q for all the permutation of truth values to the component propositions
- 22. Equivalent Propositions (Logical Equivalence) l Suppose P is equivalent to Q. P may be used to replace Q or vice versa. l The Rules of Replacement are equivalent propositions(Logically equivalent propositions) l The Rules of Replacement are used to simplify a proposition (Deriving a proposition equivalent to a given proposition)
- 23. Rules of Replacement 1. Idempotence P ≡ ( P ∨ P ) , P ≡ ( P ∧ P ) 2. Commutativity ( P ∨ Q ) ≡ ( Q ∨ P ), ( P ∧ Q ) ≡ ( Q ∧ P ) 3. Associativity, ( P ∨ Q ) ∨ R ≡ P ∨ ( Q ∨ R ), ( P ∧ Q ) ∧ R ≡ P ∧ ( Q ∧ R ) 4. De Morgan’s Laws ¬ ( P ∨ Q ) ≡ ¬P ∧ ¬Q, ¬ ( P ∧ Q ) ≡ ¬P ∨ ¬Q
- 24. Rules of Replacement 5. Distributivity of ∧ over ∨ P ∧ ( Q ∨ R ) ≡ ( P ∧ Q ) ∨ ( P ∧ R ) 6. Distributivity of ∨ over ∧ P ∨ ( Q ∧ R ) ≡ ( P ∨ Q ) ∧ ( P ∨ R ) 7. Double Negation ¬ (¬ P) ≡ P 8. Material Implication ( P ⇒ Q ) ≡ (¬ P ∨ Q ) 9. Material Equivalence ( P ⇔ Q ) ≡ ( P ⇒ Q ) ∧ ( Q⇒P )
- 25. Rules of Replacement 10. Exportation [ ( P ∧ Q ) ⇒ R ] ≡ [ P ⇒ ( Q ⇒ R ) ] 11. Absurdity [ ( P ⇒ Q ) ∧ ( P ⇒ ¬ Q )] ≡ ¬ P 12. Contrapositive ( P ⇒ Q ) ≡ (¬ Q ⇒ ¬P )
- 26. Rules of Replacement 13. Identities P ∨ 1 ≡ 1 P ∧ 1 ≡ P P ∨ 0 ≡ P P ∧ 0 ≡ 0 P ∨ ¬P ≡ 1 P ∧ ¬P ≡ 0 ¬0 ≡ 1 ¬1 ≡ 0