Studied by 3 people
If two angles are supplementary to the same angle, then they are supplementary to each other
false
If two angle are vertical angles, then they are congruent
true
If two angles are a linear pair of angles then they are congruent
false
If two angles are consecutive angles, then they are supplementary
false
If two parallel lines are cut by a transversal, then alternate interior angles are supplementary
false
If two lines never intersect, they are called parallel
false
If two lines intersect, they must be coplanar
true
If two lines are parallel to the same line, then they are parallel to each other
true
If two lines are perpendicular to the same line, then they are perpendicular to each other
false
If a conditional statement and its inverse are true, then the biconditional is also true
true
The statement "If x^2 =4 then x=2" must be written as a true biconditional statement
false
If two angles are supplementary then one angle is acute and one is obtuse
false
If <A is complementary to <B and <B is complementary to <C, then <A is complementary to <C
false
If <A is supplementary to <B and <B is supplementary to <C, then <A and <C are vertical angles
false
For a statement to be true, it just be true in all cases
true
"The line containing points P and Q" is written in symbolic form as -- over PQ
false
A point is one-dimensional
false
The intersection of three planes is a point
false
Lines AB and BC are coplanar
true
Vertical angles are supplementary
false
A linear pair is made up of adjacent angles
true
Any four points will lie in the same plane
false
Every segment has exactly one bisector
false
Every angle has exactly one bisector
true
If AB +BC = AC then B is between A and C
true
Every angle has a complement
false
If the three angles of one triable are congruent to the three angles of another triangle, then the triangles are congruent
false
An isosceles triangle is an equilateral triangle
false
An equilateral triangle is an isosceles triangle
true
The acute angle of a right triangle are supplementary
false
The base angles of an isosceles triangle are complementary
false
If <B is congruent to <E, <C to <F, and Segment AC to DE, then triangle ABC is congruent to DEF
false
If triangle ABC is congruent to triangle XYZ, then <ABC is congruent to <ZYX
true
If HIJK is congruent to LMNO, then segment HK is congruent to segment OL
true
If triangle AFC is congruent to triangle DFE, then F is the midpoint of segment AD and segment EC
false
Note 
Flashcard (163)