Aim: How do we find angle measurements inside and outside of circles? Do now: A security camera located at point S views part of a circular area by rotating.

Slides:

Advertisements

Similar presentations

Radius- Is the edge to the middle of the circle. Diameter- It goes throw the whole center of the circle.

Advertisements

GEOMETRY Circle Terminology.

Circle Theorems-“No Brainers”

Unit 25 CIRCLES.

Session 25 Warm-up 1.Name a segment tangent to circle A. 2.What is the 3.If BD = 36, find BC. 4.If AC = 10 and BD = 24, find AB. 5.If AD = 7 and BD = 24,

Circles Review Unit 9.

Angles Related to a Circle Section 10.5 Works Cited: By: Tara Mazurczyk “Geometry.” Glencoe. 19 May McDougal, Littell & Company. “Angles Related.

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.

Circle Vocabulary. Circle – set of all points _________ from a given point called the _____ of the circle. C Symbol: equidistant center C.

Formulas for Angles in Circles

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: ______________________ __________________________.

Warm-up 1.Name a segment tangent to circle A. 2.What is the 3.If BD = 36, find BC. 4.If AC = 10 and BD = 24, find AB. 5.If AD = 7 and BD = 24, find BE.

B D O A C Aim: What is a circle? Homework: Workbook page 370

1. Draw 4 concentric circles 2. Draw a circle with r = 4 and center A. 3. What is the diameter of the circle? 4. Explain the difference between a secant.

9.1 Circles and Spheres. Circle: ______________________________ ____________________________________ Given Point:______ Given distance:_______ Radius:

Circle Geometry.

8-5 Angles in Circles.

Lesson 9.2A R.4.G.5 Investigate and use the properties of angles (central and inscribed) arcs, chords, tangents, and secants to solve problems involving.

Inscribed Angles Find measures of inscribed angles Find measures of angles of inscribed polygons. Three congruent central angles are pictured. What is.

10.2 Find Arc Measures & 10.4 Use Inscribed Angles and Polygons

SECANTS Secant - A line that intersects the circle at two points.

The Many Parts of a Circle A B T Secant Tangent Chord.

Circles. Points & Circle Relationships Inside the circle THE circle Outside the circle A C B E G F D.

6.3 – 6.4 Properties of Chords and Inscribed Angles.

Angles, Circles, and parts of Circles. secant: a line, ray, or segment that contains a chord chord: segment has endpoints on circle tangent: a line, ray,

Circumference Arc Radius Diameter Chord Tangent Segment Sector

11.4 Inscribed Angles. New Vocab: Inscribed Angle and Intercepted Arc.

What’s a skey? Defining Circle Terms Use the examples and non-examples to write a good definition for each boldfaced term.

Radius diameter secant tangent chord Circle: set of all points in a plane equidistant from a fixed point called the center. Circle 4.1.

Circle Vocabulary.

Circles Vocabulary Unit 7 OBJECTIVES: Degree & linear measure of arcs Measures of angles in circles Properties of chords, tangents, & secants.

Circles. Circle  Is the set of all points in a plane that are equal distance from the center. This circle is called Circle P. P.

circle - set of all points in a plane at a given distance from a given point in the plane.

Circles Chapter 10 Sections 10.1 –10.7.

Circle Vocabulary. Circle – set of all points _________ from a given point called the _____ of the circle. C Symbol: equidistant center C.

Section 10.5 Angles in Circles.

circle - set of all points in a plane at a given distance from a given point in the plane.

Section 10.4 Other Angle Relationships in Circles.

Circles Chapter 10 Sections 10.1 –10.7.

Circle Vocabulary.

Angle Relationships in circles

Other Angle Relationships in Circles

Make the fish face right by moving only 3 matchsticks.

WARM UP Graph y = -2/3x + 5.

Circle Vocabulary.

Circles Definitions.

Lesson 10.6 – Secants, Tangents, and Angle Measure

Lesson: Angle Measures and Segment Lengths in Circles

Other Angle Relationships in Circles

Monday December 16.

Angles in Circles.

Chapter 10.5 Notes: Apply Other Angle Relationships in Circles

Circle Unit Notes AA1 CC.

Μη μου τους κύκλους τάραττε

9-6 Other Angles.

CIRCLES AND ANGLES Section 10-4, 10-6 spi.3.3.A, spi.3.3.B

Circle Vocabulary.

Circle Vocabulary.

Unit 4: Circles and Volume

Warm-up #2 ( Find x and m AD B 72o A C 9xo D.

Angles in Circles.

Parts of a Circle Circle – set of all points _________ from a given point called the _____ of the circle (in a plane). equidistant C center Symbol:

Parts of a Circle Circle – set of all points _________ from a given point called the _____ of the circle (in a plane). equidistant C center Symbol:

Parts of a Circle Circle – set of all points _________ from a given point called the _____ of the circle (in a plane). equidistant C center Symbol:

More Angle-Arc Theorems

Circle Vocabulary.

Circle Vocabulary.

Learning Target #18 Angles in Circles

Presentation transcript:

Aim: How do we find angle measurements inside and outside of circles? Do now: A security camera located at point S views part of a circular area by rotating 30 o. How many degrees of the circle’s circumference does the camera observe? 60 o S 30 o

Basic angles 1. Central angles2. Inscribed angles ab a b a = ½ ba = b An angle inscribed in a semicircle (diameter) is a right angle. a = 70 o, then b = 70 o If… a = 36 o, then b = 36 o b = 170 o, then a = 170 o a = 70 o, then b = 140 o If… a = 36 o, then b = 72 o b = 170 o, then a = 85 o

Special angles Group 1: Tangent - Chord a x x = ½ a Mnemonic a x Since a = 180 o, x = 90 o. x = ½ a. a = 80 o, then x = 40 o If… a = 228 o, then x = 114 o x = 25 o, then a = 50 o

Special angles Group 2: Secant - Secant x = ½ (a - b) a x a = 100 o and b = 60 o, then x = 20 o If… b = 60 o and x = 25 o, then a = 110 o a = 70 o and x = 10 o, then b = 50 o Tangent - SecantTangent - Tangent x xa b b b a Mnemonic

Special angles Group 3: Chord - Chord a x = ½ (a + b) Mnemonic The three formulas: x = ½ a x = ½ (a-b) x = ½ (a+b) b x a = 90 o and b = 10 o, then x = 50 o If… b = 100 o and x = 70 o, then a = 40 o a = 200 o and x = 150 o, then b = 100 o Review

Putting it all together Given: In circle O, angle AOB = 60 o, angle BEA = 80 o, and BOD is a diameter. Find: Arc AB Angle AOD Arc AD Arc CD Arc BC Angle BCA Angle BEC Angle CBE 60 o 30 o O B A C D 80 o 100 o 80 o 120 o 100 o 50 o E

Regents problems 96 o 48 o

Regents problems 180 o 9 = 20 o AC: 20 o x 7 = 140 o BC: 20 o x 2 = 40 o x = ½ (a - b) x = ½ (140 o - 40 o ) x = ½ (100 o ) x = 50 o m angle CPA = 50 o m arc ACB = 180 o a x b