**Converse**,

**Contrapositive**, and

**Inverse**. The

**converse**of the conditional

**statement**is “If Q then P.” The

**contrapositive**of the conditional

**statement**is “If not Q then not P.” The

**inverse**of the conditional

**statement**is “If not P then not Q.”

[su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”][su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”]

Click to see full answer.

[su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”][su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”]

[su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”][su_posts posts_per_page=”1″ tax_term=”2703″ order=”desc” orderby=”rand”] Consequently, how do you write converse inverse and contrapositive of a statement?

To form the **converse** of the conditional **statement**, interchange the hypothesis and the conclusion. The **converse** of “If it rains, then they cancel school” is “If they cancel school, then it rains.” To form the **inverse** of the conditional **statement**, take the negation of both the hypothesis and the conclusion.

Furthermore, what is the inverse of a statement? **Inverse** of a Conditional. Negating both the hypothesis and conclusion of a conditional **statement**. For example, the **inverse** of “If it is raining then the grass is wet” is “If it is not raining then the grass is not wet”. Note: As in the example, a proposition may be true but its **inverse** may be false.

Hereof, what is a converse statement example?

Switching the hypothesis and conclusion of a conditional **statement**. For **example**, the **converse** of “If it is raining then the grass is wet” is “If the grass is wet then it is raining.” Note: As in the **example**, a proposition may be true but have a false **converse**.

What is the Contrapositive of P → Q?

The contrapositive of a **conditional statement** of the form “If p then q” is “If ~q then ~p”. Symbolically, the contrapositive of p q is ~q ~p. A **conditional statement** is logically equivalent to its contrapositive.