11-1 Tangent Lines Objective: To use the relationship between a radius and a tangent.
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Transcript of 11-1 Tangent Lines Objective: To use the relationship between a radius and a tangent.
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11-1Tangent Lines
Objective: To use the relationship between a radius and a tangent.
![Page 2: 11-1 Tangent Lines Objective: To use the relationship between a radius and a tangent.](https://reader036.fdocuments.in/reader036/viewer/2022082506/56649e995503460f94b9be1c/html5/thumbnails/2.jpg)
Vocabulary
Tangent to a circle
Point of tangency
A line in the same plane of a circle that intersects the circle in exactly one point.
The point where a circle and a tangent intersect.
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Theorem 11-1
If a line is tangent to a circle, then the line is perpendicular to the radius drawn to the point of tangency.
P
O
A
B
OPAB
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#1 Finding Angle Measures
is tangent to . Find the value of x.
D
O
xo
ED O
E
38o
90ODE
3890180x
128180x
52x
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#2 Finding Angle Measures
117° x°
and are tangent to . Find the value of x.ML OMN
Since and are tangent to
ML MNO
L and are right angles.
N
LMNO is a quadrilateral whose angle measures have a sum of 360°.
3601179090 x360297 x
63x
L
M
N
O
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Theorem 11-2
If a line in the plane of a circle is perpendicular to a radius at its endpoint on the circle, then the line is tangent to the circle.
P
O
A
B. o tangent tis OAB
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#3 Finding a Tangent
If NL = 4, LM = 7, and NM = 8, is tangent to a at L?
MLN
N L
M
4
78
222 874
644916
6465 NO
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#4 Finding a Tangent
7
24
25
N
ML
If NL = 7, LM = 24, and NM = 25, is tangent to a at L?
MLN
222 25247 62557649
625625 Yes