Points, Lines and Angles
Parallel Lines
Classifying Triangles
Parallel Lines and Triangles
Triangle Inequality Theorem
100

Perpendicular bisectors form

Right Angles 

100

What is the name of the "Z shape" angles?

Alternate interior angles 

100

What type of triangle has a right angle? 

Right triangle

100

Angles whose measure is less than 90 degrees

Acute angles 

100

The number of degrees in a triangle 

180

200

A straight path that extends forever in both directions

Line

200

Vertical angles are 

Congruent 

200

What type of triangle has 2 congruent sides and 2 congruent angles?

Isosceles triangle 

200

In triangle ABC, AB ≅ BC. Based on this statement, is m<A ≅  m<C? 

Yes

200

Can you form a triangle with sides of length 2cm, 3cm, and 6cm and why?

No because 3+2 = 5 < 6. 

300

A straight path between two endpoints. It is written with TWO LETTERS (endpoints) 

Line Segment 

300

Corresponding angles are

Congruent 

300

What type of triangle has all equal sides and all equal angles?

Equilateral triangle 

300

In triangle DEF, if m<D = m<E = m<F. What triangle can DEF be classified as?

Equilateral 

300

What does the Triangle Inequality Theorem state?

The sum of two sides of a triangle must be greater than the third side (remaining side).

400

What we use to label congruent angles or segments on a diagram

Tick marks 

400

Same side interior angles are

Supplementary (Sum to 180)

400

Triangle ABC with AB ≅ AC is drawn. If m<A = 40 degrees, determine the m<B.

70 degrees 

400

Angles that do NOT prove parallel lines (name two) 

Supplementary angles and vertical angles 

400

A triangle has side lengths 2 and 3. Which of the following could be a possible length of the third side?

a) 4   b) 6   c) 7  d) 8

4

500

Side AG bisects <BAD. If m<DAG is 32 degrees, what is m<BAG?

32 degrees

500

Angle A and Angle B are complementary angles. If m<A = 3x, what expression represents the number of degrees in angle B?

90-3x

500

In triangle ABC, side BC is extended through C to point D.

If BC ≅ AC and m<ACD = 136 degrees, what is m<A?

68 degrees

500

In triangle ABC, m<A = 8x+10, m<B = 4x+20, and m<C = 3x. Find x. 

x = 10 

500

Given a triangle with side lengths x+2, 2x, and 5, find the range of values that could create a triangle that exists. 

1 < x < 7

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