Title: 10-6 Find Segment Lengths in Circles
110-6 Find Segment Lengths in Circles
2Segments of Chords Theorem
If two chords intersect in the interior of a
circle, then the product of the lengths of the
segments of one chord is equal to the product of
the lengths of the segments of the other chord.
q
m
n
m n p q
p
3example solve for x
8 3 6 x
3
x
24 6x
6
4 x
8
4Definitions
R
- Tangent Segment a piece of a tangent with one
endpoint at the point of tangency. - Secant Segment a piece of a secant containing a
chord, with one endpoint in the exterior of the
circle and the other on the circle. - External Secant Segment the piece of a secant
segment that is outside the circle.
S
SP
Q
RP
P
PQ
5Segments of Secants Theorem
If two secant segments share the same endpoint
outside a circle, then the product of the lengths
of one secant segment and its external segment
equals the product of the lengths of the other
secant segment and its external segment.
C
AB AC AD AE
E
B
D
A
6example solve for x
- 11 21 12 (12 x)
- 231 144 12x
- 87 12x
- 7.25 x
10 11 21
10 11
x 12
X 12
7Segments of Secants and Tangents Theorem
If two secant segments share the same endpoint
outside a circle, then the product of the lengths
of one secant segment and its external segment
equals the product of the lengths of the other
secant segment and its external segment.
B
A
(AB)2 AC AD
C
D
8example solve for x
- 302 x (x 24)
- 900 x2 24x
- x2 24x 900 0
- How do you solve for x?
- Use the quadratic formula!!
- x 20.31 x -44.31
24
30
a 1 b 24 c -900
x
9example solve for x
220
1st Find the other arc
360 140 220
140
220 140 x 2
x
80 x 2
40 x