OB and OT BT AB TS AB and BT T

1. OB and OT

2. BT

3. AB

4. TS

5. AB and BT

6. T

7. 8

8. 8n

9. 90°

10. RQ, PQ

11. perpendicular

12. 6

13. 6 214. Quadrilateral ABCD

15. 15

16. 8.0

17. 28

• If the center of a circle is (5, -1), find the equation of the line that is tangent to the circle at (12, 3).

• What is the equation of the circle? (You have to find the length of the radius for this one.)

724

4y x

2 25 1 65x y

A. B.

X = __________ X = __________

C. If OD=12 and CE=10, find DE. A. 68

B. 70

C. 2 85

1. 90 2. 135 3. 135 4. 225

5. 45 6. X=55 7. 20

• Find the center of the circle that passes through the points (-8, -8), (0, -4),

and (-1, -7).

• Find the equation of the same circle

The center is (-5, -4)

2 25 4 25x y

• You are at the very top of a Ferris wheel looking 100 feet down to the ground. If you travel around 10 times, how far have you traveled? Give the exact and approximate distance.

• If your ride took 7 minutes, approximately how fast were you going in feet per minute? Miles per hour?

1000 feet or 3141.59 feet

448.799 feet per minute or 5.1 miles per hour

A.

B.

A. 24

B. 14

30

20

15

90

40

98

B.

A.

75

80

85

56

62

124

6.

90

105

90

50

100

40

• Find the center of the circle that passes through the points (-3, 2), (2, 7),

and (5, -2).

• Find the equation of the same circle

2 22 2 25x y

The center is (2, 2)

1. Arc ZW= Arc XY

4. mZX=mWY

2. Addition property of equality

3. Arc addition postualte

5. Division property of equality

6. Inscribed angle conjecture

7. Substitution

79

64

30

54

100

84

270

40

145

10

40

45

75

50

35

40

75

35

58

90

65

30

30

• If the center of a circle is (1, 4), find the equation of the line that is tangent to the circle at (5, 5).

• What is the equation of the circle? (You have to find the length of the radius for this one.)

2 21 4 17x y

4 25y x

75

105

90

52.5

68 60

65 115 95

First, construct the perpendicular bisectors for each side. Where they cross is the circumcenter. The distance from the circumcenter to a vertex is the length of the radius.

First construct the angle bisectors of each angle. Where they intersect will be the incenter. The distance from the incenter to a side is the length of the radius.

First, draw radius PX. The tangent line will be perpendicular to the radius.

12

12

88

43

12 2

81 100 98

99 40 30

65 29 43

4. Chord 5. Secant 6. Radius 7. Tangent 8. Inscribed 9. Major arc 10. AB=BC

11. 90 degrees

125

235

90

55

40

180

220

TU

13

1. 90 2. 290 3. 55 4. 108 5. 140 6. 20 7a. 105, 75

7b. Its opposite angles are supplementary 8. 140 9. 20

10a. <IHJ

132

48

75

8

52

132

49

12

7 2 21

50

10

Diameter RT perp. To SU – given

<SAT and <UAT are right – def. of perp.

<SAT is congruent to <UAT – right angles are congruent

SA is congruent to UA – a line that is perpendicular to a chord and goes through the center of the circle bisects the chord

AT is congruent to AT – reflexive property

Triangle SAT is congruent to triangle UAT – SAS

ST is congruent to TU – CPCTC

A

A. X = __________

B. X = __________

29

65

Find the value of x and y if O is the center of the circle.

Y=45X=22.5