5 Written Questions
5 Matching Questions
- The Midpoint Theorem
- The Ruler Postulate
- The Angle Addition Postulate
- If a=b+c and c>0...
- a The points of a line can be placed in correspondence with the real numbers in such a way that (1) to every point of hte line there corresponds exactly one real number: (2) to every real number there corresponds exaclty one point of the line; and (3) the distance between any two points is the absolute value of the difference of the corresponding numbers
- b then a>b
- c If D is in the interior of angle BAC, then measurement of angle BAC = measurement of angle BAD + measurement of angle DAC
- d Every segment has exactly one midpont
- e two angles with the same measure
5 Multiple Choice Questions
- Complements of congruent angles are congruent.
- their intersection contains only one point
- unproved statements
- all elements that belong to one or both sets (of two sets)
- Let AB be a ray on the edge of the half-plane H. For every number r between 0 and 180 there is exaclty one ray AP, with P in H, such that the measure of angle PAB=r
5 True/False Questions
If two angles are complementary... → then both are acute.
Congruence between angles is... → congruent
The Line Postulate → For every two points there is exactly one line that contains both points
The Flat Plane Postulate → If two points of a line lie in a plane, then the line lies in the same plane.
The Line Postulate → Any three points lie in at least one plane, and any three noncollinear points lie in exactly one plane.