Can you tell em if this is right? If not, can you tell me what words go where?

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.

Yes, that statement is correct. A truth value statement can indeed be written in the form "if P, then Q." This statement is also known as a conditional statement.

Here are the different forms or variations of a conditional statement that you mentioned:

1. Inverse: To write the inverse of a conditional statement, you simply interchange the hypothesis (P) and the conclusion (Q). The inverse of "if P, then Q" would be "if not P, then not Q."

2. Contrapositive: To write the contrapositive of a conditional statement, you need to negate (or take the opposite of) both the hypothesis and the conclusion. The contrapositive of "if P, then Q" would be "if not Q, then not P."

3. Converse: To write the converse of a conditional statement, you interchange the hypothesis and conclusion of the inverse statement. So, the converse of "if P, then Q" would be "if Q, then P."

Remember that the truth value (i.e., whether it is true or false) of a conditional statement, its inverse, contrapositive, or converse can differ. Each statement may have a different truth value.