![]() However, if statement B is true, then statement A may not be true. For example, if statement A is true, then statement B must also be true. For example, if statement A is true, then statement B must also be true.Īn indirect converse statement is one in which the truth of the statement is dependent on the truth of the other statement, but the statements are not logically equivalent. ![]() A direct converse statement is one in which the truth of the statement is dependent on the truth of the other statement. ![]() There are two types of converse statements in logic: direct and indirect. This means that the two statements are logically equivalent and that they are interchangeable. The converse of this statement is if statement B is true, then statement A must also be true. The converse of a conditional statement is the inverse of the statement, which is statement B.įor example, if statement A is true, then statement B must also be true. This is known as a conditional statement. In logic, a conditional statement is one in which the truth of the statement is dependent on the truth of the other statement. Conditional Statements and Converse Statements If statement B is true, then statement A must also be true. In logic, converse statements are used to determine if two statements are logically equivalent. The relationship between these two statements is known as the converse relationship. The converse of A is B, and the converse of B is A. In logic, a converse statement is one in which the truth of the statement is dependent on the truth of the other statement. You Can Read: What Do Podiatrists Say About Skechers? Converse Statements in Logic
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