Points, Lines, Angles, & Triangle Relationships
Angle Addition Postulate
40 degrees + 83 degrees = 123 degrees.
Angle on a Point
Three or more angles with a common point whose angles sum equals 360 degrees.
Linear Pair
Two angles sharing one ray and is made of opposite direction rays.
Vertical Angles
Two non-adjacent angles whose sides form two pair of opposite rays.
Angles on a Line
Two or more angles with a common point whose sums equals 180 degrees
Undefined Terms
Point, Line, Ray, Plane, and Circle
Isosceles Triangle
A triangle whose base angles are congruent.
Equilateral Triangle
A triangle whose three angles are congruent.
Alternate Exterior Angles are Congruent.
Angle m is congruent to angle t.
Corresponding Angles are Congruent.
Angle n is congruent to angle r.
Same Side Interior Angles are Supplementary
Angle o + Angle q = 180 degrees
Alternate Interior Angle are Congruent.
Angle o is congruent to angle r
Angle Addition Postulate
If D is a point in the interior of Angle CAB, then the measure of Angle CAD + measure of Angle DAB = measure of Angle CAB
Interior Angle Sum of a Triangle
The sum of the three interior angles of any triangle must equal 180 degrees.
If parallel lines are cut by a transversal, then exterior angles on the same side are supplementary.
angle 1 + angle 4 = 180 degrees
If parallel lines are cut by a transversal, then alternate exterior angles are equal in measure.
angle 1 = angle 2
