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Some questions to be answered:
1. How do I identify segments and lines related to circles?
2. How do I use the properties of a tangent to a circle?
2.
Essential Questions
How do I identify segments and lines
related to circles?
How do I use properties of a tangent to a
circle?
3.
A circle is the set of all points in a plane that are
equidistant from a given point called the center of the
circle.
Radius – the distance from the center to a point on the
circle
Congruent circles – circles that have the same radius.
Diameter – the distance across the circle through its
center
4.
Diagram of Important Terms
center
radius
P
diameter
name of circle: P
5.
Chord – a segment whose endpoints are points on the
circle.
B
A
AB is a chord
6.
Secant – a line that intersects a circle in two points.
N
M
MN is a secant
7.
Tangent – a line in the plane of a circle that intersects
the circle in exactly one point.
T
S
ST is a tangent
8.
Example 1
Tell whether the line or segment is best described as a chord, a
secant, a tangent, a diameter, or a radius.
H
a. AH tangent
b. EI diameter
B E
C F
c. DF chord
I G
d. CE radius
A D
9.
Tangent circles – coplanar circles that
intersect in one point
10.
Concentric circles – coplanar circles that
have the same center.
11.
Common tangent – a line or segment that is
tangent to two coplanar circles
Common internal tangent – intersects the segment
that joins the centers of the two circles
Common external tangent – does not intersect the
segment that joins the centers of the two circles
common external tangent
common internal tangent
12.
Example 2
Tell whether the common tangents are internal or external.
a. b.
common internal tangents common external tangents
13.
More definitions
Interior of a circle – consists of the points
that are inside the circle
Exterior of a circle – consists of the points
that are outside the circle
14.
Point of tangency – the point at which a tangent line
intersects the circle to which it is tangent
point of tangency
15.
Perpendicular Tangent Theorem
If a line is tangent to a circle, then it is perpendicular to
the radius drawn to the point of tangency.
l
P
Q
If l is tangent to Q at P, then l QP.
16.
Perpendicular Tangent Converse
In a plane, if a line is perpendicular to a radius of a circle
at its endpoint on the circle, then the line is tangent to
the circle.
l
P
Q
If l QP at P, then l is tangent to Q.
17.
Right Triangles
Pythagorean Theorem
Radius is perpendicular to the
tangent. < E is a right angle
C
43
E
45
11
D
18.
Example 3
C
Tell whether CE is tangent to D. 43
E
Use the converse of the Pythagorean 45
Theorem to see if the triangle is right. 11
D
11 + 43 ? 45
2 2 2
121 + 1849 ? 2025
1970 2025
CED is not right, so CE is not tangent to D.
19.
Congruent Tangent Segments Theorem
If two segments from the same exterior point are tangent
to a circle, then they are congruent.
R
P
S
T
If SR and ST are tangent to P, then SR ST.
20.
Example 4
AB is tangent to C at B. D
AD is tangent to C at D. x2 + 2
Find the value of x. C A
11
AD = AB
B
x2 + 2 = 11
x2 = 9
x = 3
21.
Central angle – an angle whose vertex is the center of a circle.
central angle
22.
Minor arc – Part of a circle that measures less
than 180°
Major arc – Part of a circle that measures
between 180° and 360°.
Semicircle – An arc whose endpoints are the
endpoints of a diameter of the circle.
Note : major arcs and semicircles are named with
three points and minor arcs are named
with two points
23.
Diagram of Arcs
A
minor arc: AB
major arc: ABD
D B
C
semicircle: BAD
24.
Measure of a minor arc – the measure of its
central angle
Measure of a major arc – the difference between
360° and the measure of its associated minor
arc.
25.
Arc Addition Postulate
The measure of an arc formed by two adjacent arcs is the sum of
the measures of the two arcs.
A
C
mABC = mAB + mBC
B
26.
Congruent arcs – two arcs of the same circle or of
congruent circles that have the same measure
27.
Arcs and Chords Theorem
In the same circle, or in congruent circles, two minor arcs are
congruent if and only if their corresponding chords are
congruent.
A
B
AB BC if and only if AB BC
C
28.
Perpendicular Diameter Theorem
If a diameter of a circle is perpendicular to a chord, then the
diameter bisects the chord and its arc.
F
DE EF, DG FG
E
G
D
29.
Perpendicular Diameter Converse
If one chord is a perpendicular bisector of another chord, then
the first chord is a diameter.
J
M
K
L
JK is a diameter of the circle.
30.
Congruent Chords Theorem
In the same circle, or in congruent circles, two chords are
congruent if and only if they are equidistant from the center.
C
G
AB CD if and only if EF EG. E D
B
F
A
31.
Example 1
Find the measure of each arc.
a. LM 70°
N L
P 70
b. MNL 360° - 70° = 290°
c. LMN 180° M
32.
Example 2
Find the measures of the red arcs. Are the arcs congruent?
A
C
41
41
D
mAC = mDE = 41 E
Since the arcs are in the same circle, they are congruent!
33.
Example 3
Find the measures of the red arcs. Are the arcs congruent?
A
D
81
E
C
mDE = mAC = 81
However, since the arcs are not of the same circle or
congruent circles, they are NOT congruent!
34.
Example 4
B
Find mBC.
(3x + 11)
(2x + 48)
3x + 11 = 2x + 48
A
x = 37
D C
mBC = 2(37) + 48
mBC = 122
35.
Inscribed angle – an angle whose vertex is on a circle
and whose sides contain chords of the circle
Intercepted arc – the arc that lies in the interior of an
inscribed angle and has endpoints on the angle
intercepted arc
inscribed angle
36.
Measure of an Inscribed Angle Theorem
If an angle is inscribed in a circle, then its measure is
half the measure of its intercepted arc.
A
1 C
mADB = mAB D
2 B
37.
Example 1
Find the measure of the blue arc or angle.
E
a. S R b.
80
F
Q G
T
1
mQTS = 2(90 ) = 180 mEFG = (80 ) = 40
2
38.
Congruent Inscribed Angles Theorem
If two inscribed angles of a circle intercept
the same arc, then the angles are
congruent.
A
B
C
D
C D
39.
Example 2
It is given that mE = 75 . What is mF?
Since E and F both intercept D
the same arc, we know that the
angles must be congruent.
E
mF = 75
F
H
40.
Inscribed polygon – a polygon whose vertices all lie on a
circle.
Circumscribed circle – A circle with an inscribed polygon.
The polygon is an inscribed polygon and
the circle is a circumscribed circle.
41.
Inscribed Right Triangle Theorem
If a right triangle is inscribed in a circle, then the hypotenuse
is a diameter of the circle. Conversely, if one side of an
inscribed triangle is a diameter of the circle, then the triangle
is a right triangle and the angle opposite the diameter is the
right angle.
A
B is a right angle if and only if AC
is a diameter of the circle. B
C
42.
Inscribed Quadrilateral Theorem
A quadrilateral can be inscribed in a circle if and only if
its opposite angles are supplementary.
E
F
C
D
G
D, E, F, and G lie on some circle, C if and only if
mD + mF = 180 and mE + mG = 180 .
43.
Example 3
Find the value of each variable.
D
a. b.
B z
G y 120 E
Q
A 2x
80
F
C
mD + mF = 180 mG + mE = 180
2x = 90
z + 80 = 180 y + 120 = 180
x = 45
z = 100 y = 60
44.
Tangent-Chord Theorem
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 its intercepted arc.
B
1
m1 = mAB C
2
1 1
m2 = mBCA 2
2 A
45.
Example 1
Line m is tangent to the circle. Find mRST m
R
102
mRST = 2(102 )
S
mRST = 204
T
46.
Try This!
Line m is tangent to the circle. Find m1
1 R
m1 = (150 )
2 1
m
m1 = 75
150
T
47.
Example 2
BC is tangent to the circle. Find mCBD. C
A
(9x+20)
5x B
2(5x) = 9x + 20
10x = 9x + 20
x = 20
D
mCBD = 5(20 )
mCBD = 100
48.
Interior Intersection Theorem
If two chords intersect in the interior of a circle, then the
measure of each angle is one half the sum of the
measures of the arcs intercepted by the angle and its
vertical angle.
1 D
m1 = (mCD + mAB) A
2
1
2
1
m2 = (mAD + mBC) C
2 B
49.
Exterior Intersection Theorem
If a tangent and a secant, two tangents, or
two secants intersect in the exterior of a
circle, then the measure of the angle
formed is one half the difference of the
measures of the intercepted arcs.
50.
Diagrams for Exterior
Intersection Theorem
B
A P
1
2
Q
C R
1
1 m2 = (mPQR - mPR)
m1 = (mBC - mAC) X 2
2
W
3
Z Y
1
m3 = (mXY - mWZ)
2
51.
Example 3
P
Find the value of x. 106
Q
1
x = (mPS + mRQ)
2 x
1 S
x = (106 +174 )
2 174 R
1
x= (280)
2
x = 140
52.
Try This!
Find the value of x. T
40
1 S
x = (mST + mRU) x
2
U
1
x = (40 +120 )
2
R 120
1
x= (160)
2
x = 80
53.
Example 4
Find the value of x.
1
72 = (200 - x ) 200
2
144 = 200 - x
x 72
x = 56
54.
Example 5
Find the value of x.
A
mABC = 360 - 92 B
mABC = 268 92 x
1
x= (268 - 92) C
2
1
x = (176)
2
x = 88
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