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Review: Angles on a Line
Use the diagram at
the right to find the (x+8)°
values of x, y and
m∠4 1 2 3(2x-8)°
y° 6 5 4
(4x-24)°
Review: Angles on a Line
(Solution)
m∠1 + m∠2 + m∠3 = 180°
90 + (x + 8) + (2x - 8) = 180
3x + 90 = 180 (x+8)°
3x = 90
x = 30 1 2 (2x-8)°
3
m∠6 = m∠3 (By vertical angles) 6 4
y = 2x – 8 y° 5
y = 2(30) – 8 (4x-24)°
y = 52
m∠4 + m∠5 + m∠6 = 180°
m∠4 + (4x - 24) + y = 180
m∠4 + 4(30) – 24 + 52 = 180
m∠4 + 148 = 180
m∠4 = 32°
The Auxiliary Line
Auxiliary Line (Helping Line): an extra line
needed to complete a proof/problem in
plane geometry.
1
1
2
2
Recall: Through any point there
is exactly one line that will be
parallel to an already existing
line!
Example #1: Auxiliary Line
These two angles are 144°
consecutive interior
m∠1 = 36°+56° angles so they sum to 36°
m∠1 = 92° 180° 1
56°
These two angles are
alternate interior angles
so they are the same
56°
Example #2: Auxiliary Line
Both of the angle
measures are found using
consecutive interior
angles theorem 1
18° 82°
m∠1 = 18°+82° 162°
m∠1 = 100° 98°
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