Comprehensive Test Friday Homework Due Friday!!!
I can show and/or explain how the angle-sum and exterior-angle theorems of a triangle are true. I can identify angle pairs created by parallel lines cut by a transversal and explain which angle pairs are congruent or supplementary and why
Ready to play?
The is… Transformation
The is… Reflection
The is… Rotation
The is… Congruent
Alternate Interior Angles The is… Alternate Interior Angles
The is… Translation
The is… Similar
Same – Side Interior Angles The is… Same – Side Interior Angles
The is… Corresponding Angles
The is… Ordered Pairs
The is… X-axis
The is… Transversal
<1 and <4, <2 and <3, <5 and <8, <6 and <7 all share which angle relationship? I can show and/or explain how the angle-sum and exterior-angle theorems of a triangle are true. I can identify angle pairs created by parallel lines cut by a transversal and explain which angle pairs are congruent or supplementary and why
The sum of these angles are an example of ……. I can show and/or explain how the angle-sum and exterior-angle theorems of a triangle are true. I can identify angle pairs created by parallel lines cut by a transversal and explain which angle pairs are congruent or supplementary and why
<1 and <7, & <2 and <8 all share which angle relationship? I can show and/or explain how the angle-sum and exterior-angle theorems of a triangle are true. I can identify angle pairs created by parallel lines cut by a transversal and explain which angle pairs are congruent or supplementary and why
A transformation in which every point of the pre-image moves in the same direction by the same amount to form the image
<1 and <5, <3 and <7, <2 and <6, <4 and <8 all share which angle relationship?
Lines that meet or cross at right angle
Sides that have the same relative positions in geometric figures.
<1 and <8 & <2 and <7, all share which angle relationship?
<3 and <5, & <4 and <6 all share which angle relationship?
The sum of these angles are an example of …….
Two lines that never meet/touch
a similarity transformation in which a figure is enlarged or reduced using a scale factor ≠ 0, without altering the center.
The ratio of any two corresponding lengths of the sides of two similar figures.
Some Adjacent angles or supplementary angles are called…………..
Orientation remains the same. Figure is moved to another location Orientation remains the same. Figure is moved to another location. Creates congruent figure.
Orientation is reversed. Size remains the same. Angles remain the same Orientation is reversed. Size remains the same. Angles remain the same. Creates a congruent figure.
I can show and/or explain how the angle-sum and exterior-angle theorems of a triangle are true. I can identify angle pairs created by parallel lines cut by a transversal and explain which angle pairs are congruent or supplementary and why. http://tinyurl.com/Arelation