Conditional Statement - A conditional statement is a statement in the form of "if p, then q," where p is the antecedent and q is the consequent. It is a statement that asserts that if the antecedent is true, then the consequent must also be true.
Converse Condition - The converse of a conditional statement is the inverse of the order of the antecedent and the consequent. For example, the converse of the statement "if p, then q" is "if q, then p."
Inverse Condition - The inverse of a conditional statement is the negation of both the antecedent and the consequent. For example, the inverse of the statement "if p, then q" is "if not p, then not q."
Contrapositive Condition - The contrapositive of a conditional statement is the inverse of the statement and then the converse of that statement. For example, the contrapositive of the statement "if p, then q" is "if not q, then not p."
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Conditional Statement - A conditional statement is a statement in the form of "if p, then q," where p is the antecedent and q is the consequent. It is a statement that asserts that if the antecedent is true, then the consequent must also be true.
Converse Condition - The converse of a conditional statement is the inverse of the order of the antecedent and the consequent. For example, the converse of the statement "if p, then q" is "if q, then p."
Inverse Condition - The inverse of a conditional statement is the negation of both the antecedent and the consequent. For example, the inverse of the statement "if p, then q" is "if not p, then not q."
Contrapositive Condition - The contrapositive of a conditional statement is the inverse of the statement and then the converse of that statement. For example, the contrapositive of the statement "if p, then q" is "if not q, then not p."