Unit: Triangles

1. Unit: Triangles

2. 3-4 Parallel lines and Triangle Sum Theorem Objective: To classify triangle and find the measure of their angles To use exterior angle Theorem

3. Classifying Triangle Classify by angles: Classify by sides:

4. Theorems Triangle-Angle Sum Theorem: Sum of the angles is 180. Exterior Angle Theorem: sum of the remote interior angles equals the exterior angle C + B = BAD 1 2 Remote interior angles Exterior angle

5. Example 1Using the Exterior Angle Theorem 63+56 = 119 X = 119

6. Example 2: Exterior angle & Sum of the angle of a triangle 90-55 = 35 86-55 = 31 180-(86+35) = 59

7. TRY Find the measure of each angle. 62-25 = 37 180-(56+62) =62 180 – 62 = 118 OR 56 + 62 = 118

8. Example 3 Classify the triangles. • By its sides 18cm, 20 cm, 18cm isosceles b) By its angles 91,20 ,69 obtuse

9. Try Classify the triangle. The measure of each angle is 60. Equilateral and equiangular

10. Closure • What is the sum of the interior angles of a triangle? 180 2) What is the relationship of the exterior-angle and the two remote interior angles? Sum of the remote interior angles = exterior angle.

11. 3-5 Polygon Angle Sum Objective: To classify polygons To find the sums of the measures of the interior and exterior angles of a polygon

12. Vocabulary • Polygon • closed figure with the at least three segments. • Concave Convex • Equilateral polygon • All sides congruent • Equiangular polygon • All angles congruent • Regular polygon • Equilateral and equiangular polygon convex convex concave concave convex

14. Polygon Names

15. Polygons Polygon Angle Sum Theorem 180(n-2) Polygon Exterior Angle Theorem: Sum of all exterior angles is 360 degrees.

16. Example 1 Pentagon • Name the polygon by its sides • Concave or convex. • Name the polygon by its vertices. • Find the measure of the missing angle Convex QRSTU (5-2)180 = 540 130+54+97+130 = 411 540 – 411 = 129

17. Example 2 Find the measure of an interior and an exterior angle of the regular polygon.. (7-2)180/7 = 128 4/7 360/7 = 51 3/7

18. Determine the number of Sides • If the sum of the interior angles of a regular polygon is 1440 degrees. 1440 = 180(n-2) 8 = n-2 10 = n it is a decagon • Find the measure of an exterior angle 360/10 = 36 degrees

19. Closure • What is the formula to find the sum of the interior angles of a polygon? (n-2)180 • What is the name of the polygon with 6 sides? hexagon • How do you find the measure of an exterior angle? Divide the 360 by the number of sides.

20. 4-5 Isosceles and Equilateral Triangles Objective: To use and apply properties of isosceles and equilateral triangles

21. Isosceles Triangle Key Concepts • Isosceles Triangle Theorem • Converse of the Isosceles Triangle • Theorem

22. Isosceles Triangle Key Concepts • If a segment, ray or line bisects the vertex angle, then it is the perpendicular bisector of the base.

23. Equilateral Triangle Key Concepts • If a triangle is equilateral, then it is equiangular. • If the triangle is equiangular, then it is equilateral.

24. What did you learn today? • What is still confusing?

25. 5-1 Midsegments Objective: To use properties of midsegments to solve problems

26. Key Concept Midsegments – DE = ½AB and DE || AB

27. Try 1 Find the perimeter of ∆ABC. 16+12+14 = 42

28. Try 2: • If mADE = 57, what is the mABC? 57° b) If DE = 2x and BC = 3x +8, what is length of DE? 4x = 3x+8 x = 8 DE = 2(8) = 16

29. What have you learned today? What is still confusing?

30. 7-1 Ratios and Proportions Objective: To write ratios and solve proportions.

31. VOCBULARY • RATIO- COMPARISON OF TWO QUANTITIES. • PROPORTION- TWO RATIOS ARE EQUAL. • EXTENDED PROPORTION – THREE OR MORE EQUILVANT RATIOS.

32. PROPERTIES OF RATIOS a c is equivalent to: 1) ad = bc b d 2) b d 3) a b a c c d 4) a + b c + d b c

33. Example 1 • 5 20 x 3 b) 18 6 n + 6 n • 15 = 20x • ¾ = x • 18n = 6n +36 • 12n = 36 • n = 3

34. Example 2 • 1 7/8 16 x • X = 16 (7/8) • X = 14 ft The picture above has scale 1in = 16ft to the actual water fall If the width of the picture is 7/8 inches, what is the size of the actual width of the part of the waterfall shown.

35. 7-2 Similar Polygons Objective: to identify and apply similar polygons

36. Vocabulary • Similiar polygons- (1) corresponding angles are congruent and (2) corresponding sides are proportional. ( ~) • Similarity ratio – ratio of lengths of corresponding sides

37. Example 1 • Find the value of x, y, and the measure of angle P. • <P = 86 • 4/6 = 7/Y X/9 = 4/6 • 4Y = 42 6X = 36 • Y = 10.5 X = 6

38. Example 2 Find PT and PR 4 = X 11 X+12 11X = 4X + 48 7X = 48 X = 6 PT = 6 PR = 18

39. Example 3 Hakan is standing next to a building whose shadow is 15 feet long. If Hakan is 6 feet tall and is casting a shadow 2.5 feet long, how high is the building? X = 15 6 2.5    2.5X = 80 X =

40. TRY • A vertical flagpole casts a shadow 12 feet long at the same time that a nearby vertical post 8 feet casts a shadow 3 feet long.  Find the height of the flagpole.  Explain your answer. 

41. 5-2 Bisectors in Triangles objective: To use properties of perpendicular bisectors and angle bisectors

42. Key Concept Perpendicular bisectors – forms right angles at the base(side) and bisects the base(side). Angle Bisectors– bisects the angle and equidistant to the side.

43. Try 1 WY is the  bisector of XZ 4 7.5 9 Isosceles triangle

44. Try 2 6y = 8y -7 7 = 2y y = 7/2 21 21 Right Triangle

45. What have you learned today? What is still confusing?

46. 5-3 Concurrent Lines, Medians, and Altitudes Objective: • To identify properties of perpendicular bisectors and angle bisectors • To Identify properties of medians and altitudes

47. Key Concept Perpendicular Bisectors Altitudes circumscribe Medians Angle Bisectors inscribe

48. Key Concepts Medians – AD = AG + GD AG = 2GD E F D

49. Try • Give the coordinates of the point of concurrency of the incenter and circumcenter. • Angle bisectors ( 2.5,-1) • Perpendicular bisectors • (4,0)

50. Try • Give the coordinates of the center of the circle. • (0,0) perpendicular bisectors.