Chapter 10 Geometry Jeopardy

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

Unit 25 CIRCLES.

Circle Jeopardy.

Review Ch. 10 Complete all problems on a separate sheet of paper.

Tangency. Lines of Circles EXAMPLE 1 Identify special segments and lines Tell whether the line, ray, or segment is best described as a radius, chord,

Circles > Formulas Assignment is Due. Center Circle: A circle is the set of all points in a plane that are equidistant from a given point called the center.

A B Q Chord AB is 18. The radius of Circle Q is 15. How far is chord AB from the center of the circle? 9 15 (family!) 12 x.

Circles Review Unit 9.

Chapter 6 – Circles In previous chapters, you have extensively studied triangles and quadrilaterals to learn more about their sides and angles. In this.

8.1 Circle Terminology and Chord Properties

10-6 CIRCLES AND ARCS Objective: To find the measures of central angles and arcs. To find the circumference and arc length.

Chapter 10 Jeopardy By: Ryan Gorman, Matt Margulies, Rishab Lal, and Gabe Shindnes.

P ARTS OF A CIRCLE Objective: I will be able to identify segments and lines related to circles.

TODAY IN GEOMETRY…  Warm up: Writing equations of a circle  Learning Target : 11.4 You will find the arc length and circumferences of circles  Independent.

11.4: Circumference and Arc Length Objectives: Develop and apply the equation for the circumference of a circle Determine arc length of a circle Common.

Jeopardy Angle Relationships Circle Eqns Circle Vocab Areas of Sectors Misc. Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final.

Chapter 10: Circles.

EXAMPLE 1 Identify special segments and lines

Warm-Up Exercises 1. What measure is needed to find the circumference or area of a circle? 2. Find the radius of a circle with diameter 8 centimeters.

Lesson 8-1: Circle Terminology

Circle Geometry.

Warm Up. 9.2 Introduction To Circles 1. Radius _____ 2. chord _____ 3. diameter _____ 4. secant _____ 5. tangent _____ 6. circle _____ Let’s talk about.

Properties of Tangents. EXAMPLE 1 Identify special segments and lines Tell whether the line, ray, or segment is best described as a radius, chord, diameter,

Circles: Basic Terms Tutorial 8a. Parts of a Circle  A circle is the set of all points in a plane equidistant from a given point.  Name a circle by.

Lesson 11.1 Parts of a Circle Pages Parts of a Circle A chord is a segment whose endpoints are points on a circle. A diameter is a chord that.

EXAMPLE 1 Identify special segments and lines Tell whether the line, ray, or segment is best described as a radius, chord, diameter, secant, or tangent.

Circles Chapter 12.

Chapter 10 Circles Section 10.1 Goal – To identify lines and segments related to circles To use properties of a tangent to a circle.

Circumference Arc Radius Diameter Chord Tangent Segment Sector

Chapter 10: Circles.

A circle is a closed curve in a plane. All of its points are an equal distance from its center.

Section 10.6 Equation of Circles

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

4-2: Chords and Arcs Unit 4: Circles English Casbarro.

Geometry Chapter 9 Section 1 Circles. Circle The set of all points in a plane that are a given distance from a center point Radius a line segment from.

1. Identify a diameter. BE 2. Identify a common internal tangent. BG.

Question 1 Write the equation of the circle: Center: (-7, 14) Area: 81π.

Math 9 Unit 4 – Circle Geometry. Activity 3 – Chords Chord – a line segment that joints 2 points on a circle. A diameter of a circle is a chord through.

Review:labeled part Write the name of each of the circle E. B. C. A. D.

Write and Graph Equations of Circles Chapter 10: Circles.

Circles Grade Identify parts of a circle. Parts of a Circle center F Use the center to name a circle. Circle F F.

10.1 Use Properties of Tangents

Jeopardy Angle Relationships Segments in Circles Equation of a Circle Grab Bag Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final.

1. 3x=x y+5y+66= x+14x= a 2 +16=25 Note: A diameter is a chord but not all chords are diameters.

Applied Math II

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.

10.1 Tangent Properties to a Circle. POD 1. What measure is needed to find the circumference or area of a circle? 2. Find the radius of a circle with.

Circles: Arcs, Angles, and Chords. Define the following terms Chord Circle Circumference Circumference Formula Central Angle Diameter Inscribed Angle.

Circles Chapter 10 Sections 10.1 –10.7.

Sector of a Circle Section  If a circle has a radius of 2 inches, then what is its circumference?  What is the length of the arc 172 o around.

Geometry Section 10.5 Segments of Chords. In this section, we will be finding the lengths of segments formed when chords intersect.

CHAPTER 10.2 MEASURING ANGLES AND ARCS. A central angle of a circle is an angle with a vertex in the center of the circle. The sides of a central angle.

Copyright © Cengage Learning. All rights reserved. 12 Geometry.

Chapter 10 Definitions Chord Tangent Secant Central Angle Inscribed Angle Circumference Radius Diameter Arc Circle Success is dependent on effort. SophoclesSophocles.

Equation of Circle Midpoint and Endpoint Distance Slope

The circumference & the circle. Elements of the circumference Centre (UK) / center (US)

Circle Geometry.

Segment Lengths in Circles 10.5 Chapter 10 Circles Section 10.5 Segment Lengths in Circles Find the lengths of segments of chords. Find the lengths of.

Circles – Segments and Circumference Circle – The set of all points in a plane a given distance from a given point (the center). Circles are named by their.

10-7 Area of Circles and Sectors. REVIEW Circumference: The total distance (in length) around a circle. Arc measure: The measure of the central angle.

1. What measure is needed to find the circumference

Circles Chapter 10 Sections 10.1 –10.7.

Chapter 10: Circles Geometry H.

Angle Relationships in circles

Lesson 23 Parts of a Circle

EXAMPLE 1 Identify special segments and lines

Lesson: Angle Measures and Segment Lengths in Circles

Test is next class Test is open note

Parts, Circumference, Area

Presentation transcript:

Chapter 10 Geometry Jeopardy Vocab/Cir-cumference Arcs and Angles Angles on Circles Segments on Circles Equations of Circles Final Jeopardy Challenge 100 100 100 100 100 200 200 200 200 200 300 300 300 300 300 400 400 400 400 400 500 500 500 500 500

The diameter on the circle. Vocab/Circumference 100 The diameter on the circle. G F B E A C D

Vocab/Circumference 100 What is segment BE?

A chord that is not the diameter on the circle. Vocab/Circumference 200 A chord that is not the diameter on the circle. G F B E A C D

Vocab/Circumference 200 What is segment FG?

The tangent on the circle. Vocab/Circumference 300 The tangent on the circle. G F B E A C D

Vocab/Circumference 300 What is line CD?

Vocab/Circumference 400 A secant on the circle. G F B E A C D

Vocab/Circumference 400 What is line FG ?

The exact circumference of the circle shown below. Vocab/Circumference 500 The exact circumference of the circle shown below. 2.5 in

500 Vocab/Circumference What is 5π inches?

The value of x in the circle when arc BC is 45. Arcs and Angles 100 The value of x in the circle when arc BC is 45. B C X A D

Arcs and Angles 100 What is 45?

The value of x on the circle when arc BC is 30. 200 Arcs and Angles The value of x on the circle when arc BC is 30. B C A X D

Arcs and Angles 200 What is 150?

The value of x on the circle when arc BC is 35. Arcs and Angles 300 The value of x on the circle when arc BC is 35. B C A X D

Arcs and Angles 300 What is 17.5 ?

The value of arc CDB when arc CD is 140. Arcs and Angles 400 The value of arc CDB when arc CD is 140. B C A D

Arcs and Angles 400 What is 320 ?

The exact length of arc BC. Arcs and Angles 500 The exact length of arc BC. B C 40 A 5in D

Arcs and Angles 500 What is inches?

The value on angle CAB on the circle. Angles on Circles 100 The value on angle CAB on the circle. A B C D

Angles on Circles 100 What is 90 ?

The value of x in the circle. Angles on Circles 200 The value of x in the circle. 84 X 110

Angles on Circles 200 What is 97?

The value of x on the circle. Angles on Circles 300 The value of x on the circle. 83 33 X

Angles on Circles 300 What is 25?

Angles on Circles 400 The value of x on the circle. 165 x

Angles on Circles 400 What is 82.5?

The value of x on the circle. Angles on Circles 500 The value of x on the circle. x 40

Angles on Circles 500 What is 145?

The value of CB when AD is 10 meters. Segments on Circles 100 The value of CB when AD is 10 meters. B C D A

Segments on Circles 100 What is 5 meters?

The value of RS on the circle. Segments on Circles 200 The value of RS on the circle. 6in P 7in 3in S R

Segments on Circles 200 What is 10 inches?

The value of z on the circle. Segments on Circles 300 The value of z on the circle. 3 6 4 z

Segments on Circles 300 What is 8?

The radius of circle P if Segments on Circles 400 The radius of circle P if DE = 24 and PF is a radius. D P 5 F E

Segments on Circles 400 What is 13?

Segments on Circles 500 The value of x on the circle. 5 4 2 x

Segments on Circles 500 What is 16?

Equations of Circles 100 The formula for the equation of a circle.

What is (x-h)² + (y–k)² = r² Equations of Circles 100 What is (x-h)² + (y–k)² = r²

Equations of Circles 200 The coordinate of the center of the circle from the equation (x-4)² + (y +7)² = 16.

Equations of Circles 200 What is (4, -7)?

Equations of Circles 300 The value of the radius in the equation (x+2)²+(y-9)²= 196.

Equations of Circles 300 What is 14?

Equations of Circles 400 The equation of the circle with center point (-2, 5) and radius of 7.

Equations of Circles 400 What is (x+2)² + (y-5)²= 7 ?

Equations of Circles 500 The equation of the circle from the graph shown.

Equations of Circles 500 What is (x+2)²+(y-1)²=36?

The value of x on the circle. Final Jeopardy The value of x on the circle. X+2 X 12 feet

Final Jeopardy ANSWER What is 8 feet?