Q. Which of the following satisfies commutative law?

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Q. If the truth value of A v B is true, then truth value of ~A ∧ B can be ___________

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Q. If P is always against the testimony of Q, then the compound statement P→(P v ~Q) is a __________

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Q. A compound proposition that is always ___________ is called a tautology.

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Q. A compound proposition that is always ___________ is called a contradiction.

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Q. If A is any statement, then which of the following is a tautology?

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Q. If A is any statement, then which of the following is not a contradiction?

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Q. A compound proposition that is neither a tautology nor a contradiction is called a ___________

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Q. ¬ (A ∨ q) ∧ (A ∧ q) is a ___________

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Q. (A ∨ ¬A) ∨ (q ∨ T) is a __________

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Q. A ∧ ¬(A ∨ (A ∧ T)) is always __________

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Q. (A ∨ F) ∨ (A ∨ T) is always _________

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Q. A → (A ∨ q) is a __________

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Q. The contrapositive of p → q is the proposition of ____________

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Q. The inverse of p → q is the proposition of ____________

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Q. The converse of p → q is the proposition of _______________

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Q. What is the contrapositive of the conditional statement? “The home team misses whenever it is drizzling?”

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Q. What is the converse of the conditional statement “If it ices today, I will play ice hockey tomorrow.”

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Q. What are the contrapositive of the conditional statement “I come to class whenever there is going to be a test.”

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Q. What are the inverse of the conditional statement “ A positive integer is a composite only if it has divisors other than 1 and itself.”

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