1. Bellwork – 1/20/17

2. Quiz 2 Transformation rules Vector component form Lines of symmetry
Sequence of transformations
Corresponding parts of congruent figures are congruent

3. 4.1 Angles formed by Intersecting Lines
1/20/17
Geometry
4.1 Angles formed by Intersecting Lines

4. When two lines intersect, the angles that are opposite each other are vertical angles. Recall that a linear pair is a pair of adjacent angles whose non-common sides are opposite rays. So, when two lines intersect, the angles that are on the same side of a line form a linear pair.
You have written proofs in two-column and paragraph proof formats. Another type of proof is called a flow proof. A flow proof uses boxes and arrows to show the structure of the proof. The steps in a flow proof move from left to right or from top to bottom, shown by the arrows connecting each box. The justification for each step is written below the box.

8. 1/20/17
CW 3
Packet Due Friday 1/20/17

9. Bellwork – 1/23/17

10. 4.2 Transversals and Parallel Lines
1/23/17
Geometry
4.2 Transversals and Parallel Lines

11. A transversal is a line that intersects two coplanar lines at two different points. In the figure, line t is a transversal. The table summarizes the names of angle pairs formed by a transversal.

16. Packet Due Wednesday 1/25/17
1/23/17
CW 4
Packet Due Wednesday 1/25/17

17. 4.3 Proving Lines are Parallel
1/23/17
Geometry
4.3 Proving Lines are Parallel

18. You form the converse of and if-then statement "if p, then q" by swapping p and q. The converses of the postulate and theorems you have learned about lines cut by a transversal are true statements

21. 1/23/17
Geometry
4.4 Perpendicular Lines

23. 4.5 Equations of Parallel & Perpendicular Lines
1/23/17
Geometry
4.5 Equations of Parallel & Perpendicular Lines

28. The contents in this PowerPoint were taken from Houghton Mifflin Harcourt Geometry.