Direct Proof: Angles, Parallel Lines, and Transversals - Geometric Proofs
Congruence
Having the same measure
Transitive Property
If a = b, and b = c, then a = c *ONLY CONGRUENCY*
Substitution Property of Equality
If a = b, then a may replace b in any equation or expression
Vertical Angles Theorem
If two angles are vertical angles, then they are congruent
Supplementary Angles Axiom (Postulate)
If two angles form a linear pair, then they are supplementary (add up to 180 degrees)
Converse of the Alternate Interior Angle Theorem
If two lines are cut by a transversal, and alternate interior angles are congruent, then the lines are parallel
Converse of the Corresponding Angle Axiom (Postulate)
If two lines are cut by a transversal, and corresponding angles are congruent, then the lines are parallel
Converse of the Same Side Interior Angle Theorem
If two lines are cut by a transversal, and same side interior angles are supplementary angles, then the lines are parallel
Same Side Interior Angle Theorem
If two lines are cut by a transversal, the same side interior angles are supplementary
Alternate Exterior Angles Theorem
If two lines are cut by a transversal, then alternate exterior angles are congruent
Alternate Interior Angle Theorem
If two lines are cut by a transversal, then alternate interior angles are congruent
Corresponding Angles Axiom (Postulate)
If two parallel lines are cut by a transversal, then corresponding angles are congruent
Supplementary Angles
TWO angles whose measures have a sum of 180º
Theorem
A conjecture that is proven
Same Side Interior Angles
A pair of angles on one side of a transversal line, and on the inside of the two lines being intersected
Axiom (Postulate)
An accepted statement of fact
Corresponding Angles
Angles at the same location at each intersection
Vertical Angles
Two non - adjacent angles formed by the intersection of the two lines
Alternate Interior Angles
When two lines are crossed by a transversal, the pairs of angles on opposite sides of the transversal, but inside the two lines
Reflexive Property
a = a
