| A | B |
|---|
| A conclusion one reaches using inductive reasoning | conjecture |
| A true statement that combines a true conditional and a true converse statment | biconditional |
| This part of a conditional statement comes after the "if" in "if-then" form | hypothesis |
| An example that shows why a conjecture is wrong | counterexample |
| When you change the truth value of a given conditional statement you get a _____ | negation |
| A conditional statment that exchanges the hypothesis and the conclusion | converse |
| A logically constructed argument that shows why a conjecture is true | proof |
| also known as an "if-then" statement | conditional |
| A statement that negates both the hypothesis and the conclusion of a given conditional statement | inverse |
