A conditional statement is also called an if/then statement. The "if" is the hypothesis, and the "then" is the conclusion. When the "if" condition is met, then the conditional statement is true. If the conditional statement is not met, then the conditional statement is not true. What is conditional converse? Both concepts converse and the inverse are interlinked processes. They help in creating conditional statements. With true conditional converse, you don't generate another true statement automatically. Either you make a correct statement or create nonsense by forming them. If you have polygon in square shape then, you can take it as a quadrilateral. This statement is correct. But it is not more than nonsense in the context of converse. You can say, Polygon is a quadrilateral; then, you can say it a square. This statement is also incorrect as a variety of quadrilaterals are not always squares. In geometry, there is a possibility of postulates, and theorems convert into the conditional converse. Let's consider and understand the sentences below; You can't let the parallel lines intersect. (It's a postulate sentence) If a pair of lines are parallel, then you can make it the lines that can never be met. (conditional statements) Lines are said to be parallel when you can never let them meet. (Conditional Converse statement) If you want to generate a conditional converse sentence, you will need to transform the hypothesis and exchange the conclusion of a conditional statement. You will have to verify if the true conditional converse statement is correct or not.
In these worksheets, students will learn how to write these types of statements and their converses (opposites). You will identify the hypothesis and conclusion of the conditional statement. This set of worksheets contains a lesson, step-by-step solutions to sample problems, and both simple and more complex problems. It also includes ample worksheets for students to practice independently. Worksheets are provided at both the basic and intermediate skills levels. When finished with this set of worksheets, students will be able to write conditional statements and their hypotheses and identify the hypothesis. These worksheets explain how to write conditionals and their converses. Sample problems are solved and practice problems are provided.