GeometryREVISED SENT13 and 14

PLease only complete numbered problems:

p463 # 1,2,5,6,10,11,13,14,16 – DUE ASAP,

p 473 # 1-15 due later

  

Ok…these two has the questions…please do page 463 ones first..page number on bottom of pages

Angle-Arc Summar

y

Central Angle Chord-Chord Angle

:0
~
( 15;-

___a.ogent Angle
.i-> S

Secant-Tangent.

p~d
B C

T

1 ——–…..—-.. 1 ~…..—-.. 1 …..—-..

mLP = 2(mCD – mAB) mLP = 2(mSXT – mST) mLP = 2(mRT –
Vertex outside circle ~ half the difference

•
Find y.

Find mLBEC first.
mLBEC = ~(29 + 47) = 38
Thus, y = 180 – mLBEC = 142.

Part Two: Sample Problems
Problem 1

104′

Given: AB is a diameter of OP. ~E
ED = 20°, DE = 104° C 20°

A

Find:mLC ~

First find mEA.
~ …..—-..

mAEB = 180, so mEA = 180 – (104 + 20) = 56.
1″”‘—-” …..—-.. 1

Thus, mLC = 2(mEA – mDB) = 2(56 – 20) = 18.

Solution

Problem 2

Solution

472 Chapter 10 Circles

Problem 3

Solution

Problem 5

Solution

a Find x. b Find y.

Solution a x = ~(88 + 27) b y = ~(57 – 31) c z = ~(233 – 127)= 57.! = 13 = 532

Problem 4 a Find y. b Find z. c Find a.

Part Three: Problem Sets
Problem Set A

1 Vertex at center:

Given: AB = 62°
Find: mLO

a ~(21 + y) = 72
21 + Y = 144

Y = 123

b ~(125 – z) = 32
125 – z = 64

z = 61

Find mAB and mED. ../
Let mAB = x arid mED = y.
Then ~(x + y) = 65 and ~(x – y) = 24.
So x + Y = 130 and x – y = 48.
x + Y = 130
x – Y = 48

2x = 178 Add the equations.
X = 89

89 + Y = 130
Y = 41

Thus, mAB = 89 and mED = 41.

c Find z.

233

c ~a = 65
a = 130

F

Section 10.5 Angles Related to a Circle 473

Problem Set A, continued c

2 Vertex inside:
Given: CD = 100°, Fe = 30°
Find: mLCED

3 Vertex on:
a Given: AC = 70°

Find: mL

B

F
B

Db Given: DE is tangent at E.EF = 150°
Find: mLDEF

E
4 Vertex outside:

ba c

w

R

K R

Given: Wand R are points of
contact.
WR = 140°

Find: mLX

T
Given: HP = 120°,

AM = 36°
Find: mLK

Given: TU is tangent at U.
RD = 160°,
§D = 60°

Find: mLT

5 Find the measure of each angle or arc that is labeled with a letter.

160’c ea

x

11

10

..—….
b d

12 1-,
120c 810

82c

474 Chapter 10 Circles

Problem 4 A walk-around problem:
Given: Each side of quadrilateral

ABCD is tangent to the circle.
AB = 10, BC = 15, AD = 18

Find: CD

Solution Let BE = x and “walk around” the
figure, using the given information
and the Two-Tangent Theorem.
CD = 15 – x + 18 –

(10 – x)

= 15 – x + 18 – 10 + x
= 23

See problems 16, 21, 22, and 29 for other types of
walk-around problems.

Part Three: Problem Sets
Problem Set A

1 The radius of OA is 8 cm.
Tangent segment BC is 15 cm long.
Find the length of AC.

A

B x 15 – x ,c
15 – x

(10 – x)

10 x

A 10 – x

2 Concentric circles with radii 8 and 10
have center P.
XY is a tangent to the inner circle and is
a chord of the outer circle.
Find XY. (Hint: Draw PX and PY.)

3 Given: PR and PQ are tangents to 00 at
Rand Q.

—–7 _

Prove: PO bisects LRPQ. (Hint: Draw RO
and OQ.)

4 Given: AC is a diameter of OB.
Lines sand m are tangents to the
o at A and C.

Conclusion: s II m

x
y

p~ –=-…’.R-,–

Q

Section 10.4 Secants and Tangents 463

Problem Set A, continued

5 OP and OR are internally tangent at O.
P is at (8, 0) and R is at (19, 0).
a Find the coordinates of Q and S.
b Find the length of QR.

o

6 AB and AC are tangents to 00,
and OC = 5x. Find OC.

B

A~
19 – 6x C

7 Given: CE is a common internal tangent
to circles A and B at C and E.

Prove: a LA == LB
b AD = CD

BD DE

8 Given: QR and QS are tangent to OP at
points Rand S.

Prove: PQ 1. RS (Hint: This can be
proved in just a few steps.)

9 Given: PW and PZ are common tangents
to @ A and B at W, X, Y, and Z.

Prove: WX == YZ (Hint: No auxiliary
lines are needed.)

Note This is part of the proof of a useful
property: The common external tangent
segments of two circles are congruent.

Problem Set B
10 OP is tangent to each side of ABCD.

AB = 20, BC = 11, and DC = 14. Let
AQ = x and find AD.

464 Chapter 10 Circles

w

p

z

A

x-axis

11 a Find the radius of OP.
b Find the slope of the tangent to OP at

point Q.

x-axis

12 Two concentric circles have radii 3 and 7. Find, to the nearest
hundredth, the length of a chord of the larger circle that is
tangent to the smaller circle. (See problem 2 for a diagram.)

13 The centers of two circles of radii 10 em and 5 cm are 13 em
apart.
a Find the length of a common external tangent. (Hint: Use the

common -tangent procedure.)
b Do the circles intersect?

14 The centers of two circles with radii 3 and 5 are 10 units apart.
Find the length of a common internal tangent. (Hint: Use the
common-tangent procedure.)

15 Given: PT is tangent to ® Q and R at
points Sand T.
. PQ SQ

Conclusion: PR = TR P -====——-i-*–l—+——–!

16 Given: Tangent ® A, B, and C,
AB = 8, BC = 13, AC = 11

Find: The radii of the three ® (Hint:
This is a walk-around problem.)

17 The radius of 00 is 10.
The secant segment PX measures 21 and
is 8 units from the center of the O.
a Find the external part (PY) of the se-

cant segment.
b Find OP.

T

P

Section 10.4 Secants and Tangents 465