2. Triangles Triangles Triangles Let’s Discover: Triangle Cut-Apart

3. What do you know about triangles?

4. Characteristics of triangle “angles”: The sum of the angles in any size triangle is equal to 180 0. 90 55 35 90 + 35 + 55 = 180

5. Example 1: 80 45x

6. Example 2:

7. Now try these:

11. In triangle ABC, m ∠ CAB = 57 and m ∠ ABC = 104. Find m ∠ ACB.

12. If you have angles 30 and 80 degrees, what is the measure of the third angle?

14. Angles Angles Angles Brainpop Video “Types of Triangles”

15. Characteristics of triangle “sides”: The sum of the two smaller sides must be greater than the length of the third side.

16. Example 1: Can the following lengths make a triangle? 4 cm, 8 cm, 14 cm 4 + 8 = 12 12 ‹ 14 so no these sides cannot make a triangle.

17. Can the following lengths make a triangle? 5 in, 10 in, 13 in Example 2: 5 + 10 = 15 15 › 13 so these sides do make a triangle.

18. Does the following lengths form a triangle? a.7 ft, 19 ft, 15 ft b.24 mm, 20 mm, 30 mm c.15 in, 25 in, 45 in d.4 cm, 12 cm, 18 cm e.1 yd, 10 yd, 20 yd

19. Exit Card: 3-2-1

20. http://www.youtube.com/watch?v=GO20ZgUzlc0

21. Adjacent, Vertical, Supplementary, and Complementary Angles

22. Adjacent angles are “side by side” and share a common ray. 45º 15º

23. These are examples of adjacent angles. 55º 35º 50º130º 80º 45º 85º 20º

24. These angles are NOT adjacent. 45º55º 50º 100º 35º

25. When 2 lines intersect, they make vertical angles. 75º 105º

26. Vertical angles are opposite one another. 75º 105º

27. Vertical angles are opposite one another. 75º 105º

28. Vertical angles are congruent (equal). 30º150º 30º

29. Supplementary angles add up to 180º. 60º120º 40º 140º Adjacent and Supplementary Angles Supplementary Angles but not Adjacent

30. Complementary angles add up to 90º. 60º 30º 40º 50º Adjacent and Complementary Angles Complementary Angles but not Adjacent

31. Practice Time!

32. Directions: Identify each pair of angles as vertical, supplementary, complementary, or none of the above.

33. #1 60º 120º

34. #1 60º 120º Supplementary Angles

35. #2 60º 30º

36. #2 60º 30º Complementary Angles

37. #3 75º

38. #3 75º Vertical Angles

39. #4 60º 40º

40. #4 60º 40º None of the above

41. #5 60º

42. #5 60º Vertical Angles

43. #6 45º135º

44. #6 45º135º Supplementary Angles

45. #7 65º 25º

46. #7 65º 25º Complementary Angles

47. #8 50º 90º

48. #8 50º 90º None of the above

49. Directions: Determine the missing angle.

50. #1 45º?º?º

51. #1 45º135º

52. #2 65º ?º?º

53. #2 65º 25º

54. #3 35º ?º?º

55. #3 35º

56. #4 50º ?º?º

57. #4 50º 130º

58. #5 140º ?º?º

59. #5 140º

60. #6 40º ?º?º

61. #6 40º 50º

63. Circle Review:  A circle is the set of points that are all an equal distance from a point called the center.  The diameter is twice the radius. d = 2r  The radius is half of the diameter. r = d/2.  Pi (π) is approximately 3.14  Circumference of a circle can be found using C = πd or C = 2πr  Area of a circle can be found using the formula A = πr 2

65. Mr. Smith has a garden that is in the shape of a circle. There is a path 5 feet in length that goes from the center of the garden to the edge of the garden. If Mr. Smith wants to add a path across the garden, how long will it be? Radius (r) Diameter (d)

66. The diameter is twice the radius. d = 2r The radius is half of the diameter. r = d/2

67. Since d = 2r d = 2(5ft) d = 10ft

68. Find the radius of a circle that has a diameter of 7 inches. r = d/2 r = 7/2 r =3.5 inches

69. A circle has a radius of 12 meters. What is the diameter of the circle?

70. Find the radius of a circle with a diameter of 15 centimeters. A circle has a diameter of 12 feet. What is the length of the radius?

71. How do you find the circumference of a circle?

72. Pi, represented by the symbol π, is a constant ratio that relates circumference and diameter. Pi is approximated as 3.14 To find the circumference, we use one of the formulas: C = π d or C = 2πr

73. What is the circumference of a circle that has a radius of 8 centimeters? Do not approximate pi. C = 2πr C = (2) π (8 cm) C = 16 π cm

74. A circle has a radius of 6 inches. What is the circumference of the circle? Do not approximate pi.

75. A circle has a diameter of 8 meters. What is the circumference of the circle? Use 3.14 for pi. A circle has a radius of 7 feet. Find the circumference of the circle. Do not approximate pi.

76. How do you find the area of a circle?

77. Area of a circle can be found by using the formula A = πr 2

78. A pizza has a radius of 9 inches. What is the area of the pizza? r = 9 inches

79. A = π(9in.) 2 A = 3.14(81in. 2 ) A = 254.34in. 2

80. Find the area of a circle with a diameter of 10 meters. Do not approximate pi. A = π(5m) 2 A = 25 π m 2

81. What is the area of a circle that has a radius of 6 cm? Use 3.14 for pi.

82. Susan drew a circle with a radius of 4 inches and Ellen drew a circle with a radius of 8 inches. Ellen said “since the radius of my circle with twice the radius of your circle, the area of my circle is twice the area of your circle.” Is Ellen’s statement correct? If not, explain what Ellen could say instead.

83. A circle is inside of a square, as shown below. The edges of the square each touch a point on the circle. If the square has an area of 16 square meters, what is the area of the circle?

84. A circular pizza can feed 4 people if it has an area of at least 200 square inches. A pizza from Joe’s Pizza has a radius of 9 inches. Is it enough to feed a family of 4?

85. How do you find the area of the circle if you only know the circumference?

86. Area of a Circle = πr 2 Circumference of a Circle= πd or 2πr

87. A playground in the shape of a circle has a circumference of 18π yards. What is the area of the playground? C = 18π yds. C = πd D = 18 yds 18 yds

88. Area = π (9 yds) 2 Diameter = 18 yards Radius = 9 yards Area = 81 π yds 2 18 yds 9 yds

89. A circle has an approximate circumference of 37.68 cm. If 3.14 was used for pi, what is the area of the circle? C = πd 37.68cm = 3.14d 37.68cm = 3.14d 3.14 3.14 d = 12 cm

90. d = 12 cm r = 6 cm A = 3.14(6cm) 2 A = 3.14(36cm 2 ) A = 113.04 cm 2 A circle has an approximate circumference of 37.68 cm. If 3.14 was used for pi, what is the area of the circle?

91. The circumference of a circle is 10 π. What is the area of the circle?

92. The circumference of a circle is 12.56 ft ². If 3.14 was used to approximate pi, what is the area of the circle? A circle has a circumference of 9 π meters. Find the area of the circle.

93. How can you find the circumference of a circle if you only know the area?

94. Area of a Circle = πr 2 Circumference of a Circle= πd or 2πr

95. The reverse of squaring a number is finding the square root. 3 2 = 9

96. Bill has a circular garden that he wants to put a fence around. He knows that the area of a garden is 16π yds 2. How much fencing does Bill need to go around the circumference of the garden? A = 16π yds 2 A = πr 2 C = 2πr r 2 = 16 yds 2 r = 4 yds 4 yds C = 2π(4 yds) C = 8π yds

97. A circle has an area of 25π cm 2. What is the circumference of the circle?

98. The area of a circle is 16 π meters 2. Stephanie concluded that the circumference of the circle would be 16 π. She stated “the radius would be 8 meters since the square root of 16 is 8.” What mistake did Stephanie make. Write an explanation describing how to fix her mistake.

99. A circle inside of a square touches the square at each edge as shown below. If the circle has an area of 25 π feet 2, find the area of the square.

100. Find the circumference of the circle that has an area of 81π m 2. A circle has an area of 113.04 cm 2. What is the circumference of the circle?