Use LEFT and RIGHT arrow keys to navigate between flashcards;
Use UP and DOWN arrow keys to flip the card;
H to show hint;
A reads text to speech;
11 Cards in this Set
- Front
- Back
|
ruler postulate |
the points on a line can be paired with real numbers in such way that any two points can have coordinates 0 and 1 |
|
|
segments addition postulate |
if B is between A and C then AB + BC + AC |
|
|
angle addition postulate |
if point b lies in the interior of <AOC then mAOB + BOC = mAOC |
|
|
midpoint theorem |
If M is the midpoint of AB, then AM= 1/2AB |
|
|
angle bisector theorem |
if ray BM is the bisector of <ABC, then m<ABM = 1/2m<ABC |
|
|
congruent segments definition |
two segments are congruent if if they are equal in length |
|
|
midpoint definition |
the midpoint of a segment is the point that splits the segment into two congruent segments |
|
|
bisector of a segment definition |
a ray, line, segment, or plane that intersects the segment at its midpoint |
|
|
congruent angle definition |
congruent angles are angles with the same angle measure |
|
|
adjacent angles definition |
adjacent angles are two angles that share a ray and a vertex |
|
|
bisector of an angle |
a ray that splits an angle into two congruent adjacent angles |
