Presentation is loading. Please wait.

Presentation is loading. Please wait.

Secants, Tangents and Angle Measures. Definition - Secant.

Published byGeoffrey Gibbs Modified over 8 years ago

Similar presentations

Presentation on theme: "Secants, Tangents and Angle Measures. Definition - Secant."— Presentation transcript:

1 Secants, Tangents and Angle Measures

2 Definition - Secant

3 Theorem – Secant-Secant Angle If 2 secants intersect in the interior of a circle, then the measure of an angle formed is one-half the sum of the measures of the arcs intercepted by the angle and its vertical angle.

4 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20.

5 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20. By the previous theorem,

6 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20. By the previous theorem,

7 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20. By the previous theorem,

8 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20. By the previous theorem,

9 Example 1 – Secant-Secant Angle Compute the measure of angle 2 if the measurement of arc BC is 30 and for arc AD is 20. By the previous theorem,

10 Example 2 – Secant-Secant Angle Compute the measurement of angle 4

11 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

12 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

13 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

14 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

15 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

16 Example 2 – Secant-Secant Angle Compute the measurement of angle 4 By the previous theorem

17 Theory – Secant-Tangent Angle If a secant and a tangent intersect at the point of tangency, then the measure of each angle formed is one-half the measure of its intercepted arc.

18 Example 3 – Secant-Tangent Angle Compute the measurement of angle ABC

19 Example 3 – Secant-Tangent Angle Compute the measurement of angle ABC

20 Example 3 – Secant-Tangent Angle Compute the measurement of angle ABC

21 Example 3 – Secant-Tangent Angle Compute the measurement of angle ABC

22 Example 3 – Secant-Tangent Angle Compute the measurement of angle ABC

23 Theorem For any variation of secants and tangents that intersect outside of the circle, the measure of the angle formed is one-half the positive difference of the measures of the intercepted arcs.

24 Example 4 – Secant-Tangent Angle

25

26

27

28

29

30

31

32

33

Download ppt "Secants, Tangents and Angle Measures. Definition - Secant."

Similar presentations

Other Angle Relationships in Circles Section 10.4

Other Angle Relationships in Circles Section 10.4
Classifying Angles with Circles

Classifying Angles with Circles
Secants, Tangents, & Angle Measures Section 10-6.

Secants, Tangents, & Angle Measures Section 10-6.
Angles Formed by Tangents, Chords, and Secants

Angles Formed by Tangents, Chords, and Secants
Other Angle Relationships

Other Angle Relationships
Apply Other Angle Relationships in Circles

Apply Other Angle Relationships in Circles
Circles Chapter 10.

Circles Chapter 10.
Other Angles in Circles 10.4 California State Standards 7: Prove/use theorems involving circles. 21: Prove/solve relationships with circles.

Other Angles in Circles 10.4 California State Standards 7: Prove/use theorems involving circles. 21: Prove/solve relationships with circles.
Angles Related to a Circle Section 10.5 Works Cited: By: Tara Mazurczyk “Geometry.” Glencoe. 19 May 2008. McDougal, Littell & Company. “Angles Related.

Angles Related to a Circle Section 10.5 Works Cited: By: Tara Mazurczyk “Geometry.” Glencoe. 19 May McDougal, Littell & Company. “Angles Related.
10.5 Inscribed Angles. An inscribed angle is an angle whose vertex is on a circle and whose sides are determined by two chords. Intercepted arc: the arc.

10.5 Inscribed Angles. An inscribed angle is an angle whose vertex is on a circle and whose sides are determined by two chords. Intercepted arc: the arc.
Warm-Up: 1)simplify: (x – 1)² 2)Factor: 10r² – 35r 3) Factor: t ² + 12t + 36 4) Solve: 2x ² – 3x + 1 = x ² + 2x – 3 5) Find the radius of a circle with.

Warm-Up: 1)simplify: (x – 1)² 2)Factor: 10r² – 35r 3) Factor: t ² + 12t ) Solve: 2x ² – 3x + 1 = x ² + 2x – 3 5) Find the radius of a circle with.
Geometry Section 10.4 Angles Formed by Secants and Tangents

Geometry Section 10.4 Angles Formed by Secants and Tangents
Formulas for Angles in Circles

Formulas for Angles in Circles
Secants, Tangents and Angle Measures

Secants, Tangents and Angle Measures
Secants, Tangents, and Angle Measures

Secants, Tangents, and Angle Measures
Angles Related to a Circle Lesson 10.5. Angles with Vertices on a Circle Inscribed Angle: an angle whose vertex is on a circle and whose sides are determined.

Angles Related to a Circle Lesson Angles with Vertices on a Circle Inscribed Angle: an angle whose vertex is on a circle and whose sides are determined.
10.4: Angles formed by Secants and Tangents Obj: ______________________ __________________________.

10.4: Angles formed by Secants and Tangents Obj: ______________________ __________________________.
Rules for Dealing with Chords, Secants, Tangents in Circles

Rules for Dealing with Chords, Secants, Tangents in Circles
10.4 Other Angles Relationships In Circles. Theorem A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc.

10.4 Other Angles Relationships In Circles. Theorem A tangent and a chord intersect at a point, it makes angles that are ½ the intercepted arc.
Other Angle Relationships in Circles

Other Angle Relationships in Circles

Similar presentations

Ads by Google