Geometry Review: Vocabulary, Angles, Lines, Theorems

1. Chapter 3 Review 3.1: Vocabulary and Notation 3.2: Angles Formed by Parallel Lines and Transversals 3.3: Proving Lines are Parallel 3.4: Theorems about Perpendicular Lines

2. 2 1 > 4 3 7 8 > 6 5 Name a pair of vertical angles. 6 and 8 5 and 7 2 and 3 1 and 4

3. 2 1 > 4 3 7 8 > 6 5 Name a pair of alternate interior angles. 3 and 7 4 and 8

4. 2 1 > 4 3 7 8 > 6 5 Name a pair of alternate exterior angles. 2 and 5 1 and 6

5. 2 1 > 4 3 7 8 > 6 5 Name a linear pair of angles. 1 and 3 7 and 8 7 and 6 1 and 2 2 and 4 3 and 4 5 and 6 5 and 8

6. r 2 1 > 4 3 m 7 8 > 6 5 n Name a pair of parallel lines.How do you know they are parallel?Name the transversal. m || n arrows r

7. 2 1 > 4 3 7 8 > 6 5 Name a pair of corresponding angles. 2 and 7 1 and 8 3 and 5 4 and 6

8. x y Describe the relationship between the lines using both words and math notation. Perpendicular; x  y

9. > x > y Describe the relationship between the lines using both words and math notation. Parallel; x || y

10. R T Q U V S P W Name a pair of perpendicular segments.

11. R T Q U V S P W Name a pair of skew segments. Examples:

12. R T Q U V S P W Name a pair of parallel segments.

13. R T Q U V S P W Name a pair of parallel planes.

14. r 2 1 > 4 3 m 7 8 > 6 5 n Write an equation that describes the relationship between the given angles. State the theorem or postulate that justifies your equation. Same-side interior angle theorem

15. r 2 1 > 4 3 m 7 8 > 6 5 n Write an equation that describes the relationship between the given angles. State the theorem or postulate that justifies your equation. Corresponding Angles Postulate

16. r 2 1 > 4 3 m 7 8 > 6 5 n Write an equation that describes the relationship between the given angles. State the theorem or postulate that justifies your equation. Linear Pair Theorem

17. r 2 1 > 4 3 m 7 8 > 6 5 n Write an equation that describes the relationship between the given angles. State the theorem or postulate that justifies your equation. Alternate Interior Angles Theorem

18. r 2 1 > 4 3 m 7 8 > 6 5 n Write an equation that describes the relationship between the given angles. State the theorem or postulate that justifies your equation. Alternate Exterior Angles Theorem

19. r 2 1 4 3 m 7 8 6 5 n If 4  6, why is ? Converse of the Corresponding Angles Theorem

20. r 2 1 4 3 m 7 8 6 5 n If 3  7, why is ? Converse of the alternate interior angles theorem

21. r 2 1 4 3 m 7 8 6 5 n If 2  5, why is ? Converse of the alternate exterior angles theorem

22. r 2 1 4 3 m 7 8 6 5 n If 4 and 7 are supplementary, why is ? Converse of the same-side interior angles theorem

23. r 2 1 4 3 m 7 8 6 5 n Find the value of x that would guarantee m || n.

24. r 2 1 4 3 m 7 8 6 5 n Find the value of x that would guarantee m || n.

25. x 10 What do you know about x? Why? x>10: The shortest distance between a point not on a line and the line is the segment perpendicular to the segment.

26. 14 What do you know about x? Why?

27. Is this a perpendicular bisector? Why or why not? No. We don’t know that the segment has been bisected or the angles formed are right angles– no markings!

28. Is this a perpendicular bisector? Why or why not? No. You can’t bisect a line– only a segment.

29. Is this a perpendicular bisector? Why or why not? Yes. The SEGMENT has been cut in half and the figures intersect at 90°.

30. 1 h 2 3 p 1  3 Vertical angles theorem Transitive Property of 