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Define (a special case of) entailment by completing the following: φ, ψ ⇒ χ if and only if ... . (Your answer need not replicate the wording of the text's definitions, but it should define entailment in terms of truth values and possible worlds.) [answer] |
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Suppose you know that φ ⇔ ψ and that χ ⇔ ψ. Can you conclude that φ ⇔ χ ? Explain why or why not by considering possibilities of truth and falsity. [answer] |
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Provide an example of a true sentence that has a false implicature. (Be sure to state both the sentence and its implicature and to explain why one is true and the other false and also why one implicates the other.) [answer] |
4. |
Analyze the sentence below in as much detail as possible, presenting the result in both symbolic and English notation. Be sure that the unanalyzed components of your answer are complete and independent sentences; also try to respect any grouping in the English.
Ann and Bill helped to plan the campaign, but Carol directed it and reported its results
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5. |
Use the basic system of derivations (i.e., no replacement rules) to establish the following:
A ∧ B, C ∧ D ⇒ (A ∧ C) ∧ B
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6. |
Use the basic system of derivations (i.e., no replacement rules) to show that the entailment below fails; provide a table in which you calculate the truth values of the premises and conclusion on an extensional interpretation (i.e., an assignment of truth values) which makes the premises true and conclusion false:
(A ∧ B) ∧ C ⇒ A ∧ (D ∧ C)
[answer]
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1. | φ, ψ ⇒ χ if and only if there is no possible world in which χ is false while φ and ψ are both true. |
2. | Yes. In any possible world, each of φ and χ must have the same truth value as ψ, so they must have the same truth value as each other. |
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