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Copyright 2008, Scott Gray1 Propositional Logic 2) The Formal Language
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Copyright 2008, Scott Gray 2 Some Examples of Last Week’s Topics □Some mammals are winged A bat is a mammal ∴ a bat is winged □Which is to say: Some ■ are ● ♦ is ■ ∴ ♦ is ● □ Invalid : substitute dog for bat – a winged bat?
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Copyright 2008, Scott Gray 3 More Examples □No Supreme Court justice is a woman Ruth Ginsberg is a woman ∴ Ruth Ginsberg is not a Supreme Court justice □Some ■ are ● ♦ is ● ∴ ♦ is ■ □ Valid : We went from falsity (premise #1) to truth; however, T, T -> F would be invalid
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Copyright 2008, Scott Gray 4 More Examples, cont. □Some NFL players are major league baseball players Some major league baseball players make millions ∴ some NFL players make millions □Some ■ are ● some ● is ♦ ∴ some ■ is ♦ □ Invalid : can you come up with a counter example?
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Copyright 2008, Scott Gray 5 More Examples, cont. □Some cats are tailless animals Tailless animals are amphibians ∴ some cats are amphibians □It may help to think of this in terms of a Venn diagram: NFLMLB y = has millions $ y y y y y y x = doesn’t have millions $ x x x
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Copyright 2008, Scott Gray 6 More Examples, cont. □Some transfinite sets are non-denumerable sets All non-denumerable sets are demonstrated by the diagonalization principle ∴ some transfinite sets are demonstrated by the diagonalization principle □Can you symbolize this? □Valid or invalid?
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Copyright 2008, Scott Gray 7 More Examples, cont. □Some ■ are ● all ● is ♦ ∴ some ■ is ♦ T N D N T N D
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Copyright 2008, Scott Gray 8 Elements of the Formal Language □Proposition letters: A, B, C,…Z □Connectives: ~ & v → ↔ □Brackets: () □You can say the connectives this way: ~ = tilde & = ampersand v = wedge → = arrow ↔ = double arrow □Your book uses additional brackets ([] & {}), but they are (IMO) unnecessary
![Copyright 2008, Scott Gray 8 Elements of the Formal Language □Proposition letters: A, B, C,…Z □Connectives: ~ & v → ↔ □Brackets: () □You can say the connectives this way: ~ = tilde & = ampersand v = wedge → = arrow ↔ = double arrow □Your book uses additional brackets ([] & {}), but they are (IMO) unnecessary](http://images.slideplayer.com./30/9569797/slides/slide_8.jpg "Copyright 2008, Scott Gray 8 Elements of the Formal Language □Proposition letters: A, B, C,…Z □Connectives: ~ & v → ↔ □Brackets: () □You can say the connectives this way: ~ = tilde & = ampersand v = wedge → = arrow ↔ = double arrow □Your book uses additional brackets ([] & {}), but they are (IMO) unnecessary")
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Copyright 2008, Scott Gray 9 Dictionary □Sometime (usually?) called an interpretation □For instance, the dictionary will tell us that W = John won’t work □When first starting out, you should be explicit in your dictionary
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Copyright 2008, Scott Gray 10 Notes on Connectives □ & – this approximates ( ≈ ) the English “and”; the letters can be flip-flopped (they are commutative) □ v – ≈ “or”; inclusive, meaning “possibly both” (exclusive means “not both”); we will treat this as commutative also □ ~ – ≈ “not” □ → – ≈ “if…then”; no sense of causality, nor A temporal proceeds B ; read “implies”
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Copyright 2008, Scott Gray 11 Translating to Connectives □ A if & only if B == (B → A) & (A → B) ; this is the same as A ↔ B or B ↔ A □ A only if B == A → B □ A if B == B → A □The logical content of “but” is usually “and” □“Neither…nor” == ~(A v B) == (~A & ~B)
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Copyright 2008, Scott Gray 12 Translating to Connectives, cont. □ ~A → ~B == A → B □necessary condition on the right of the → ; sufficient condition on the left □“only if” == necessary, not sufficient
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Copyright 2008, Scott Gray 13 Translating to Connectives, cont. □“Unless” can be used in a weak or strong sense: A unless B == ~B → A A unless B == (A → ~B) & (B → ~A) We will use the weak sense □“Provided” == A provided B == B → A
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Copyright 2008, Scott Gray 14 Additional Descriptions of Connectives □ ~ = negation □ & = conjunction □ v = disjunction □ → = conditional □ ↔ = bi-conditional conjuncts A & B disjuncts A v B antecedent A → B consequent
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Copyright 2008, Scott Gray 15 Truth-Functional Sentence Connectives □Sentence connective = a symbol in a language such that by juxtaposing it in some appropriate way with some appropriate number of sentences of the language a new sentence of language is formed
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Copyright 2008, Scott Gray 16 Truth-Functional Sentence Connectives, cont. □Truth-functional = a sentence connective is truth functional if and only if the value of the sentence it forms depends entirely upon the truth value of the component sentences
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Copyright 2008, Scott Gray 17 Truth-Functional Sentence Connectives, cont. □AND: A & BA B T T F T T F F F T F F F □AND is truth-functional
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Copyright 2008, Scott Gray 18 Truth-Functional Sentence Connectives, cont. □“Because” is not truth functional □Example: “Taft was fat and Taft didn’t exercise” □Both parts are true and the entire statement is true □But: “Taft was fat because Taft didn’t exercise” □Both parts are true, but “because” is not truth functional – we don’t cover this
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Copyright 2008, Scott Gray 19 Assignments □Learn the connectives □Begin to collect translations (we have listed a few in this lesson) □Collect 10 truth-functional sentences and 10 non-truth-functional sentences from your reading □Be able to identify truth-functional and non-truth-functional sentences
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