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

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

(a) “I will play ice hockey tomorrow only if it ices today.”

(b) “If I do not play ice hockey tomorrow, then it will not have iced today.”

(c) “If it does not ice today, then I will not play ice hockey tomorrow.”

(d) “I will not play ice hockey tomorrow only if it ices today.”

This question was posed to me in an online quiz.

The origin of the question is Logics in division The Foundation: Logics and Proofs of Discrete Mathematics

1 Answer

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Correct answer is (a) “I will play ice hockey tomorrow only if it ices today.”

Best explanation: If p, then q has converse q → p.

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