What is the logical value of "if p then q" when p is false and q is true?

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In logical statements, "if p then q" is known as a conditional statement. To understand the truth value of this statement, let's analyze the components.

In this scenario, p is false, and q is true. The truth value of a conditional statement depends on the truth values of both p and q. The rules for determining the truth value of "if p then q" are as follows:

If p is true and q is true, then the statement is true.
If p is true and q is false, then the statement is false.
If p is false and q is true, then the statement is true.
If p is false and q is false, then the statement is true.

Since p is false in this scenario and q is true, according to the third rule, the conditional statement "if p then q" evaluates to true. This reflects the idea that a false premise cannot lead to a false conclusion in the structure of that logical condition.

Thus, the truth value of "if p then q" when p is false and q is true is indeed true.

What is the logical value of "if p then q" when p is false and q is true?

Study for the Geometry Regents Exam. Enhance your skills with flashcards and multiple choice questions, including hints and explanations. Prepare thoroughly for your test!

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