Geometry Lombard Gº 12/10/12 HS Page 2

Yash Berwala, Susy Bermudez, Nick Stathos

General form of a conditional statement: If [hypothesis], then [conclusion] --
if A then B.

Converse: If B then A – flip conditional statement so that conclusion becomes the hypotheses and hypothesis becomes the conclusion.

Inverse: if not A, then not B – add “not” to the original conditional statement.

Contrapositive: if not B, then not A (it’s the inverse of the converse – add “not” to the converse)

Example:

Conditional statement / Converse / Inverse / Contrapositive
1.  If 3x-4 = 11 then x = 5 / If x=5, then 3x-4 = 11 / If 3x-4≠ 11, then x ≠ 5 / If x≠5 then 3x-4≠11
2.  If mÐA = 84° then ÐA is not obtuse. / If ÐA is not obtuse, then mÐA = 84°. / If mÐA ≠ 84°, then ÐA is obtuse. / If ÐA is obtuse, then mÐA ≠ 84°.
“Not” in the given conditional statement is cancelled by another “not”: not not obtuse is obtuse. Like when two negatives is a positive.
3.  If alternate interior angles are not congruent, then the lines are not parallel. / If lines are not parallel, then alternative interior angles are not congruent. / If alternate interior angles are congruent, then the lines are parallel. / If lines are parallel, then alternate congruent angles are congruent.
Not not parallel is parallel

Indirect Proofs using

v  “Indirect” means not direct, not the shortest path from one point to another.

v  To prove something indirectly:

Ø  Prove the contrapositive. A contrapositive is always true (or false) if the original conditional statement is true (or false).

Ø  Contrapositive and conditional statement always have the same “truth value”.

v  Steps for indirect proof

1.  Assume temporarily that the conclusion – what is to be proved - is false (not true).

2.  Reason logically – with facts, theorems, postulates, etc -- until a contradiction of known information is reached.

3.  State that the temporary assumption in the step 1 was false, so that the original conclusion must be true by indirect proof.