1. 1.4 ANGLES

2. The two rays are called the sides of the angle. The common endpoint of the two rays is called the vertex of the angle An angle is a geometric figure that consists of two rays that share a common endpoint.

3. B A C L ABC or L CBA OR L B Angle (ABC) Every angle is named by three letters. The middle letter is the name of the vertex. Another way to name an angle is by the angle’s vertex. Look at the top of p.17 for other ways we can name angles Naming an Angle

4. B A C D This confusing… Can we use just the vertex to name these angles?

5. B A C D 2 1 How many angles are there? 3

6. Angle Measurements We measure the size of an angle using degrees. We measure the size of an angle using a protractor HOW DO WE USE A PROTRACTOR?

7. This angle measures 90 degrees. It is a right angle. You use a protractor to measure angles. Right Angle A right angle is an angle measuring exactly 90 degrees.

8. This angle is less than 90 degrees. It is called an acute angle. Acute Angle An acute angle is an angle measuring between 0 and 90 degrees. “Ohhhh look at the a cute little angle that is…..”

9. Obtuse Angle This angle is greater than 90 degrees. It is called an obtuse angle. An obtuse angle is an angle measuring between 90 and 180 degrees.

10. Straight Angle A straight angle is 180 degrees. A straight angle Is a straight _____?

11. GAME TIME! The object of the game is to be the first to raise your hand and correctly name what type of angle you see. The correct answer will be on the following slide!! Good luck!

13. Acute Angle

15. Obtuse Angle

17. Right Angle

19. Straight Angle

20. GREAT JOB!!

21. Protractor Postulate (pg.18) Read it on your own It basically tells us that we can use our protractor to line up and measure the degrees of angles (just as we lined up the ruler to measure length) It also discusses absolute value, just like with the number line

22. Angle Addition Postulate If point B lies in the interior of  AOC, –then m  AOB + m  BOC = m  AOC. –What is the interior of an angle? If  AOC is a straight angle and B is any point not on AC, then m  AOB + m  BOC = 180. Why does it add up to 180?

23. Congruent Angles Angles that have equal measure

24. Adjacent Angles Two angles in a plane that have.. 1. a common vertex 2.and a common side but no common interior points. Common Vertex Common Side No Common interior Points

25. Duplex Common Roof Common Wall No Common Things

26. DuplexAdjacent Angles Common RoofCommon Vertex Common WallCommon Side No Common things inside my house No Common Interior Points

27. Remote time

28. T – Adjacent F – Not adjacent 1 2

29. 1 2

30. 1 2

31. 1 2

32. 1 2

33. Bisector of a segment A line, segment, ray or plane that intersects the segment at its midpoint. A B P 3 3 Something that is going to cut directly through the midpoint

34. Bisector of an Angle The ray that divides the angle into two congruent adjacent angles (pg 19) Name the two congruent angles B A X C BX bisects L ABC

35. Assumptions There are certain things that you can conclude from a diagram and others that you can’t.

36. Group Problem A E D C B

37. What can you Assume? A E D C B Be Careful

38. What you can Assume? 1.All points shown are coplanar 2.AB, BD, and BE intersect at B. 3.A, B, C are collinear 4.B is between A and C 5.  ABC is a straight angle 6.D is in the interior of  ABE 7.  ABD and  DBE are adjacent angles. A E D C B

39. What you can’t Assume? AB  BC  ABD   DBE  CBE is a right angle A E D C B

40. A E D C B Marks are used to indicate conclusions about size in a diagram. Tick marks – indicate congruent segments Arc marks – indicate congruent angles Indicates a 90 degree angle

41. Lessons Learned… 1.Don’t Assume ! 2.Follow this rule: You can draw conclusions about position, but not about size. 3.Use markings to help you find out information about the diagram

42. Practice on the White Boards A B ED C 23 4 567891

43. Name the vertex of  3 A B ED C 23 4 567891

44. Name the right angle A B ED C 23 4 567891

45. State another name for  1 A B ED C 23 4 567891

46. State another name for  6 A B ED C 23 4 567891

47. State another name for  3 A B ED C 23 4 567891

48. State another name for  4 A B ED C 23 4 567891

49. State another name for  7 A B ED C 23 4 567891

50. State another name for  2 A B ED C 23 4 567891

51. State another name for  5 A B ED C 23 4 567891

52. State another name for  9 A B ED C 23 4 567891