What does the converse of a statement involve?

The converse of a statement involves reversing the order of its parts. For a given conditional statement in the form "If P, then Q," the converse would be "If Q, then P." This means that the hypothesis and the conclusion of the original statement are swapped. Understanding this concept is essential when studying logical reasoning and the relationships between statements, especially in geometry, where theorems often have converses that can be true or false independently of the original statement.

The other choices do not accurately represent what a converse entails. Negating both parts refers more to the inverse of a statement. Combining with an inverse is not a standard operation in logic. Adding a true conclusion does not transform a statement into its converse; it simply changes the parameters of the original statement without addressing the order of its parts.