How to Write a Converse Statement?
To write a converse statement, you simply switch the hypothesis and conclusion of a conditional statement while maintaining the same meaning. For example, if the original statement is “If it is raining (hypothesis), then the ground is wet (conclusion),” the converse statement would be “If the ground is wet (hypothesis), then it is raining (conclusion).” Remember, the converse statement may not always be true, even if the original statement is.
Converse Statement
Converse Statement is a type of conditional statement where the hypothesis (or antecedent) and conclusion (or consequence) are reversed relative to a given conditional statement.
For instance, consider the statement: “If a triangle ABC is an equilateral triangle, then all its interior angles are equal.” The converse of this statement would be: “If all the interior angles of triangle ABC are equal, then it is an equilateral triangle”
In this article, we will discuss all the things related to the Converse statement in detail.
Table of Content
- What is a Converse Statement?
- How to Write a Converse Statement?
- Examples of Converse Statements
- Truth Value of a Converse Statement
- Truth Table for Converse Statement
- Other Types of Statements