How to determine the converse inverse and contrapositive from a statement

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👉 Learn how to find the inverse, the converse, and the contrapositive of a statement. The contrapositive of a statement is the switching of the hypothesis and the conclusion of a conditional statement and negating both. If the hypothesis of a statement is represented by p and the conclusion is represented by q, then the conditional statement is represented by "if p, then q" and the contrapositive is represented by "if not q, then not p".

The inverse of a statement is the negation of the hypothesis and the conclusion of a conditional statement. If the hypothesis of a statement is represented by p and the conclusion is represented by q, then the conditional statement is represented by "if p, then q" and the inverse is represented by "if not p, then not q".

The converse of a statement is the switching of the hypothesis and the conclusion of a conditional statement. If the hypothesis of a statement is represented by p and the conclusion is represented by q, then the conditional statement is represented by "if p, then q" and the converse is represented by "if q, then p".

Organized Videos:
✅Conditional Statements
✅Logically Equivalent Statements
✅Negation of a Statement
✅Contrapositive of a Statement
✅Inverse of a Statement
✅Write the Statement in If Then Form
✅Converse, Inverse, Contrapositive Conditional Statements
✅Converse of a Statement
✅Determine the Truth of a Statement
✅Label the parts of a Statement

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