Friday

August 1, 2014

August 1, 2014

Posted by **Joel** on Tuesday, October 9, 2012 at 12:17pm.

A truth value statement can be written in the form “if P, then Q.” This “if, then” statement can be true or false. The “if” part is called the hypothesis, and the “then” part is called the conclusion. To write the inverse of a conditional statement, interchange the hypothesis and the conclusion. To write the contrapositive of a conditional statement, negate the hypothesis and conclusion. To write the converse of a conditional statement, interchange the hypothesis and conclusion of the inverse.

**Related Questions**

Philosophy - Provide a premise that would permit the value-expressing conclusion...

Geometry - Tell whether each statement is true or false. Then write the converse...

geometry - let p represent a true statement, while q and r represent false ...

Geometry - Let p represent a true statement, while q and r represent false ...

geometry - Let p represent a true statement, while q and r represent false ...

Math-geometry - Let p represent a true statement, while q and r represent false ...

Geometry - How can I tell if a triangle is a 30, 60 90 triangle or a 45 45 90? ...

Math! Please Check My Awnser! - Hello! I need some help with math! I have tried ...

geometry - Refer to the following statement: Two lines are perpendicular if and ...

logic - Since the boolean interpretatrion doesn't acknowledge any relationship ...