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Geometry
Inscribed Angles
April 19, 2023
Goals
Know what an inscribed angle is. Find the measure of an inscribed
angle. Solve problems using inscribed angle
theorems.
April 19, 2023
Inscribed Angle
The vertex is on the circle and the sides contain chords of the circle.
A
C
B ABC is an inscribed angle.
AC is the intercepted arc.
April 19, 2023
Inscribed Angle
A
C
B
How does mABC compare to mAC?
April 19, 2023
Draw circle O, and points A & B on the circle. Draw diameter BR.
OB
A
R
April 19, 2023
Draw radius OA and chord AR.
OB
A
R 1
2
3
April 19, 2023
(Very old) Review
The Exterior Angle Theorem (4.2) The measure of an exterior angle of a
triangle is equal to the sum of the two remote, interior angles.
1
2
3
m1 + m2 = m3
April 19, 2023
mARO + mOAR = mAOB
OB
A
R
What type of triangle is OAR?
Isosceles
The base angles of an isosceles triangle are congruent.
1 2
1
2
3
April 19, 2023
mARO + mOAR = mAOB
OB
A
R
• m1 + m2 = m3
• But m1 = m2
• m1 + m1 = m3
• 2m1 = m3
• m1 = (½)m3
This angle is half the measure of this angle.
1
2
3
April 19, 2023
Where we are now.
OB
A
R x(x/2)
Recall: the measure of a central angle is equal to the measure of the intercepted arc.
12
3
1
m mAB
m mAB
x
m1 = (½)m3
1
2
3
April 19, 2023
Theorem 12.8
OB
A
R (x/2)
If an angle is inscribed in a circle, then its measure is one-half the measure of the intercepted arc.
x
Inscribed Angle Demo
April 19, 2023
Example 1
88
?44
April 19, 2023
Example 2
A
B
C
85
mABC ?170
April 19, 2023
Example 3
x
200
100
The circle contains 360.
360 – (100 + 200) = 60
30
?60
April 19, 2023
Another Theorem
2x
xx
?
?
Theorem 10.9
If two inscribed angles intercept the same (or congruent) arcs, then the angles are congruent.Theorem Demonstration
April 19, 2023
A very useful theorem.
Draw a circle.
Draw a diameter.
Draw an inscribed angle, with the sides intersecting the endpoints of the diameter.
April 19, 2023
A very useful theorem.
What is the measure of each semicircle?
180
What is the measure of the inscribed angle?
90
90
April 19, 2023
Theorem 12.10
If an angle is inscribed in a semicircle, then it is a right angle.
Theorem 12.10 Demo
04/19/23
Theorem 12.2: Tangent-Chord
A
BC
12
If a tangent and a chord intersect at a point on a circle, then the measure of each angle formed is one-half the measure of the intercepted arc.
1 122 and1 2m mA m m CAB B
04/19/23
Simplified Formula
ab
12
12
12
1
2
m a
m b
04/19/23
Example 1
Find the and .mAB mBCA
1280
160
mAB
mAB
A
BC
80 360 160
200
mBCA
160200
04/19/23
Example 2. Solve for x.
A
BC
4x
(10x – 60)
124 (10 60)
8 10 60
2 60
30
x x
x x
x
x
April 19, 2023
Inscribed Polygon
The vertices are all on the same circle.
The polygon is inside the circle; it is inscribed.
April 19, 2023
April 19, 2023
A cyclic quadrilateral has all of its vertices on the circle.
B
A
C
D
April 19, 2023
An interesting theorem.
m BAD
A
B
C
D
12mBCD
April 19, 2023
An interesting theorem.
m BAD 12mBCD
m BCD
A
B
C
D
12mBAD
April 19, 2023
An interesting theorem.
1
12
2
m BC
m BAD
D mB D
mBCD
A
A
B
C
D
Adding the equations together…
April 19, 2023
An interesting theorem.
A
B
C
D
1 12 2m BAD m BCD mBCD mBAD
April 19, 2023
An interesting theorem.
1 12 2
12
12 360
180
m BAD m BCD mBCD mBAD
m BAD m BCD mBCD mBAD
m BAD m BCD
m BAD m BCD
April 19, 2023
An interesting theorem.
A
B
C
DBAD and BCD are supplementary.
180m BAD m BCD
April 19, 2023
Theorem 12.11
1
3
4
2
A quadrilateral can be inscribed in a circle if and only if its opposite angles are supplementary.
m1 + m3 = 180 & m2 + m4 = 180
Theorem 10.11 Demo
April 19, 2023
Example Solve for x and y.
4x
2x5y
100
4x + 2x = 180
6x = 180
x= 30
and
5y + 100 = 180
5y = 80
y = 16
April 19, 2023
Summary
The measure of an inscribed angle is one-half the measure of the intercepted arc.
If two angles intercept the same arc, then the angles are congruent.
The opposite angles of an inscribed quadrilateral are supplementary.
April 19, 2023
Practice Problems
Inscribed
Hexagon