Download - Sec. 3-3 Parallel and Perpendicular Lines Objective: To relate Parallel & Perpendicular Lines
Sec. 3-3Sec. 3-3Parallel and Perpendicular Parallel and Perpendicular
LinesLines
Objective: Objective: To relate Parallel & Perpendicular Lines.To relate Parallel & Perpendicular Lines.
Th(3-9) If two lines are // to the Th(3-9) If two lines are // to the same line, then they are // to same line, then they are // to each other.each other.
kk
mm
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11 22
33 44
55 66
77 88
99 1010
1111 1212
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Th(3-9) If two lines are // to the Th(3-9) If two lines are // to the same line, then they are // to same line, then they are // to each other.each other.
kk
mm
nn
55 66
77 88
99 1010
1111 1212
tt
Th(3-10) In a plane, if 2 Th(3-10) In a plane, if 2 lines are perpendicular to lines are perpendicular to the same line, then they are the same line, then they are // to each other.// to each other.
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Th(3-11) In a plane, if a line Th(3-11) In a plane, if a line is perpendicular to one of is perpendicular to one of two parallel lines, then it is two parallel lines, then it is parallel to the other.parallel to the other.
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Corresponding Angles are Corresponding Angles are
They are = 90They are = 90
Alt. Int. Alt. Int. s are s are
They are = 90They are = 90
Same-sided int. Same-sided int. s are Supplementarys are Supplementary
They are both = 90They are both = 90
Example 1: Solve for x and then solve for each angle such that n // m.
14 + 3x
5x - 66
n
m
14 + 3x = 5x -66
-3x -3x
14 = 2x – 66
+66 +66
80 = 2x
2 2
40 = x
14 + 3x
14 + 3(40) =
134
5x – 66
5(40) – 66
134
Example 2: Find the mExample 2: Find the m11
62
7x - 8
7x – 8 + 62 = 180
7x + 54 = 180
7x = 126
x = 18
1
7x – 8
7(18) – 8
118
