2. Essential Questions
How do you identify and use perpendicular lines?
How do you identify and use angle relationships?
Where you’ll see this:
Health, physics, paper folding, navigation
4. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays:
3. Angle:
4. Vertex:
5. Degrees:
6. Complementary Angles:
7. Supplementary Angles:
5. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle:
4. Vertex:
5. Degrees:
6. Complementary Angles:
7. Supplementary Angles:
6. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle: A figure made up of two rays that share an endpoint
4. Vertex:
5. Degrees:
6. Complementary Angles:
7. Supplementary Angles:
7. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle: A figure made up of two rays that share an endpoint
4. Vertex: The point that is shared by the rays of an angle
5. Degrees:
6. Complementary Angles:
7. Supplementary Angles:
8. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle: A figure made up of two rays that share an endpoint
4. Vertex: The point that is shared by the rays of an angle
5. Degrees: The size measurement of an angle
6. Complementary Angles:
7. Supplementary Angles:
9. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle: A figure made up of two rays that share an endpoint
4. Vertex: The point that is shared by the rays of an angle
5. Degrees: The size measurement of an angle
6. Complementary Angles: Two angles that add up to 90 degrees
7. Supplementary Angles:
10. Vocabulary
1. Ray: Part of a line that begins at an endpoint and goes on forever in
one direction
2. Opposite Rays: Two rays that together form a straight line
3. Angle: A figure made up of two rays that share an endpoint
4. Vertex: The point that is shared by the rays of an angle
5. Degrees: The size measurement of an angle
6. Complementary Angles: Two angles that add up to 90 degrees
7. Supplementary Angles: Two angles that add up to 180 degrees
12. Vocabulary
8. Adjacent Angles: Two angles that share a side and vertex but no other
points
9. Congruent Angles:
10. Perpendicular Lines:
11. Vertical Angles:
12. Bisector of an Angle:
13. Vocabulary
8. Adjacent Angles: Two angles that share a side and vertex but no other
points
9. Congruent Angles: Two or more angles with the same measure
10. Perpendicular Lines:
11. Vertical Angles:
12. Bisector of an Angle:
14. Vocabulary
8. Adjacent Angles: Two angles that share a side and vertex but no other
points
9. Congruent Angles: Two or more angles with the same measure
10. Perpendicular Lines: Lines that intersect at a 90 degree angle
11. Vertical Angles:
12. Bisector of an Angle:
15. Vocabulary
8. Adjacent Angles: Two angles that share a side and vertex but no other
points
9. Congruent Angles: Two or more angles with the same measure
10. Perpendicular Lines: Lines that intersect at a 90 degree angle
11. Vertical Angles: When two lines/segments intersect, the two angles that
are not adjacent to each other; they are congruent
12. Bisector of an Angle:
16. Vocabulary
8. Adjacent Angles: Two angles that share a side and vertex but no other
points
9. Congruent Angles: Two or more angles with the same measure
10. Perpendicular Lines: Lines that intersect at a 90 degree angle
11. Vertical Angles: When two lines/segments intersect, the two angles that
are not adjacent to each other; they are congruent
12. Bisector of an Angle: A ray that divides an angle into two equal angles
17. Ray
Part of a line that begins at an endpoint and goes on forever in one
direction
18. Ray
Part of a line that begins at an endpoint and goes on forever in one
direction
A B
38. Perpendicular Lines
Lines that intersect at a 90 degree angle
g
r
h s
perpendicular
39. Perpendicular Lines
Lines that intersect at a 90 degree angle
g
r
h s
perpendicular
NOT perpendicular
40. Vertical Angles
When two lines/segments intersect, the two angles that are not
adjacent to each other; they are congruent
41. Vertical Angles
When two lines/segments intersect, the two angles that are not
adjacent to each other; they are congruent
B
A
E
C
D
42. Vertical Angles
When two lines/segments intersect, the two angles that are not
adjacent to each other; they are congruent
B
A
E
C
D
43. Vertical Angles
When two lines/segments intersect, the two angles that are not
adjacent to each other; they are congruent
B
A
E
C
D
44. Bisector of an Angle
A ray that divides an angle into two equal angles
45. Bisector of an Angle
A ray that divides an angle into two equal angles
N
A
D
46. Bisector of an Angle
A ray that divides an angle into two equal angles
N
E
A
D
47. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
48. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle:
49. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: Larger angle:
50. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle:
51. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
52. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
53. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
2x + 40 =180
54. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
2x + 40 =180
−40 −40
55. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
2x + 40 =180
−40 −40
2x =140
56. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
2x + 40 =180
−40 −40
2x =140
2 2
57. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180
2x + 40 =180
−40 −40
2x =140
2 2
x = 70
58. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180 70 + 40
2x + 40 =180
−40 −40
2x =140
2 2
x = 70
59. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180 70 + 40 =110
2x + 40 =180
−40 −40
2x =140
2 2
x = 70
60. Example 1
The larger of the two supplementary angles measures 40° more than
the smaller. Find the measure of each angle.
Smaller angle: x Larger angle: x + 40
x + x + 40 =180 70 + 40 =110
2x + 40 =180
−40 −40
2x =140 The angles are 70° and 110°
2 2
x = 70
61. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
62. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B
m∠AQE = 4 0°
E
F
Q
C
D
63. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40°
m∠AQE = 4 0°
E
F
Q
C
D
64. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0°
E
F
Q
C
D
65. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0°
E
F
Q
C
D
66. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40°
E
F
Q
C
D
67. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
F
Q
C
D
68. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
F
Q
C
D
69. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40°
F
Q
C
D
70. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40° (vertical angles)
F
Q
C
D
71. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40° (vertical angles)
F
Q
C
D
72. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40° (vertical angles)
F
Q
m∠BQD = m∠BQF + m∠FQD
C
D
73. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40° (vertical angles)
F
Q
m∠BQD = m∠BQF + m∠FQD
C
= 40° + 40° = 80°
D
74. Example 2
Draw the figure where AD and CB intersect at Q. EF bisects ∠AQC.
m∠AQE = 40°. Find m∠BQD.
A
B m∠FQD = 40° (vertical angles)
m∠AQE = 4 0° m∠EQC = 40° (angle bisector)
E
m∠BQF = 40° (vertical angles)
F
Q
m∠BQD = m∠BQF + m∠FQD
C
= 40° + 40° = 80°
D
m∠BQD = 80°
75. Example 3
If m∠A = 20°, m∠B = 60°, and m∠C = 100°, are angles A, B, and C
supplementary angles? Explain.
76. Example 3
If m∠A = 20°, m∠B = 60°, and m∠C = 100°, are angles A, B, and C
supplementary angles? Explain.
20° + 60° +100° =180°?
77. Example 3
If m∠A = 20°, m∠B = 60°, and m∠C = 100°, are angles A, B, and C
supplementary angles? Explain.
20° + 60° +100° =180°?
Yes. Since the sum of the three angles is 180°, they are supplementary.
79. Example 4
Are angles 1 and 2 adjacent? Explain.
1 2
These are not adjacent. In order to be adjacent, the two angles must
share both the vertex and a side.
81. Example 5
Are ∠AEB and∠CED vertical angles? Explain.
B
A
E C
D
There are no vertical angles here, as none of the angles are formed by
segments intersecting any any place other than the endpoints
