10.3 Inscribed Angles Intercepted arc. Definition of Inscribed Angles An Inscribed angle is an angle with its vertex on the circle.

Slides:

Advertisements

Similar presentations

Bellwork  A 10 foot piece of wire is cut into two pieces. One piece is bent to form a square. The other forms a circle inscribed in the square. How long.

Advertisements

1 Lesson 6.3 Inscribed Angles and their Intercepted Arcs Goal 1 Using Inscribed Angles Goal 2 Using Properties of Inscribed Angles.

Chapter 10 Circles Section 10.3 Inscribed Angles U SING I NSCRIBED A NGLES U SING P ROPERTIES OF I NSCRIBED P OLYGONS.

TODAY IN GEOMETRY… Review:

For each circle C, find the value of x. Assume that segments that appear to be tangent are tangent. 1)2)

10.3 Inscribed Angles Goal 1: Use inscribed angles to solve problems Goal 2: Use properties of inscribed polygons CAS 4, 7, 16, 21.

Inscribed Angles Section 10.5.

Warm up 30  80  100  180  100  260 . Review HW.

6.4 Use Inscribed Angles and Polygons Quiz: Friday.

Warm – up 2. Inscribed Angles Section 6.4 Standards MM2G3. Students will understand the properties of circles. b. Understand and use properties of central,

1 Sect Inscribed Angles Goal 1 Using Inscribed Angles Goal 2 Using Properties of Inscribed Angles.

11-3 Inscribed Angles Objective: To find the measure of an inscribed angle.

Section 10.3 – Inscribed Angles

Geometry Section 10-4 Use Inscribed Angles and Polygons.

Warm-Up Find the area of the shaded region. 10m 140°

Chapter 10.4 Notes: Use Inscribed Angles and Polygons

Inscribed Angles By the end of today, you will know what an inscribed angle is and how to find its measure.

Warm up. P A B Case I: Central Angle: Vertex is AT the center 

Inscribed Angles 10.3 California State Standards

Warm Up Week 1. Section 10.3 Day 1 I will use inscribed angles to solve problems. Inscribed Angles An angle whose vertex is on a circle and whose.

Lesson 8-5: Angle Formulas 1 Bell Ringer 5/27/2010 Find the value of x.

10.3 Inscribed Angles. Definitions Inscribed Angle – An angle whose vertex is on a circle and whose sides contain chords of the circle Intercepted Arc.

Section 10.3 Inscribed Angles. Inscribed Angle An angle whose vertex is on a circle and whose sides contain chords of the circle Inscribed Angle.

Inscribed Angles Section 9-5. Inscribed Angles An angle whose vertex is on a circle and whose sides contain chords of the circle.

Inscribed Angles Section 10.3 Goal: To use inscribed angles to solve problems To use properties of inscribed polygons.

Warm up. Review HW Skills Check P A B Case I: Central Angle: Vertex is AT the center 

Inscribed Angle: An angle whose vertex is on the circle and whose sides are chords of the circle INTERCEPTED ARC INSCRIBED ANGLE.

Have your homework out and be ready to discuss any questions you had. Wednesday, February 6, 2013 Agenda No TISK or MM HW Questions (9-2 & 9-3) Lesson.

Inscribed Angles Inscribed angles have a vertex on the circle and sides contain chords of the circle.

Section 9-5 Inscribed Angles. Inscribed angles An angle whose vertex is on a circle and whose sides contain chords of the circle. A B C D are inscribed.

Warm up 30  80  100  180  100  260 . Inscribed Angles and Inscribed Quadrilaterals.

Friday-Chapter 6 Quiz 2 on

Objective: Measures of Inscribed Angles & Inscribed Polygons. (3.12.3) Section 10.4.

Inscribed and Circumscribed Polygons Inscribed n If all of the vertices of a polygon lie on the circle, then the polygon is inscribed.

Warm-up Find the measure of each arc.. Inscribed Angles.

Inscribed Angles By the end of today, you will know what an inscribed angle is and how to find its measure.

Section 10-3 Inscribed Angles. Inscribed angles An angle whose vertex is on a circle and whose sides contain chords of the circle. A B D is an inscribed.

Use Inscribed Angles and Polygons Lesson Definitions/Theorem 10.7 BAC = ½(BC) Intercepted Arc Inscribed Angle A B C. Central Angle.

Warm up April 22. EOCT Week 14 #2 Review HW P A B Case I: Central Angle: Vertex is AT the center 

Topic 12-3 Definition Secant – a line that intersects a circle in two points.

Warm up 30  80  100  180  100  260 . Wheel of Formulas!!

For each circle C, find the value of x. Assume that segments that appear to be tangent are tangent. 1)2)

Geometry 11-4 Inscribed Angles

Inscribed Angles By the end of today, you will know what an inscribed angle is and how to find its measure.

Inscribed Angles and their Intercepted Arcs

Warm-Up For each circle C, find the value of x. Assume that segments that appear to be tangent are tangent. 1) 2)

Warm up NL and KM are diameters.

Warm up 30 80 100 180 100 260.

Daily Check For each circle C, find the value of x. Assume that segments that appear to be tangent are tangent. 1) 2)

Daily Check For each circle C, find the value of x. Assume that segments that appear to be tangent are tangent. 1) 2)

WELCOME Math 2 Last Night’s HW: None Chapter 9: Circles

Section 10.3 – Inscribed Angles

Inscribed Angles and Quadrilaterals

Warm up Find the missing measures: 130° D A R ° 60 C 230° B.

Warm up NL and KM are diameters.

Warm up 30 80 100 180 100 260.

Inscribed Angle: An angle whose vertex is on the circle and whose sides are chords of the circle

9-5 Inscribed Angles.

_____________: An angle whose vertex is on the circle and whose sides are chords of the circle

Circles and inscribed angles

Section 10.4 Use Inscribed Angles And Polygons Standard:

Inscribed Angles & Inscribed Quadrilaterals

10.4 Inscribed Angles.

Warm up #1 1/6 & 1/9 30 80 100 180 100 260.

Presentation transcript:

10.3 Inscribed Angles Intercepted arc

Definition of Inscribed Angles An Inscribed angle is an angle with its vertex on the circle.

Theorem An Inscribed angle equals half the intercepted arc.

Theorem An Inscribed angle equals half the intercepted arc. ADC = 180°

Theorem An Inscribed angle equals half the intercepted arc. ADC = 240°

Theorem If two inscribed angles have the same intercepted arc, then the angles are equal.

Some Definitions A polygon whose vertices are touching a circle is called inscribed. If a Circle is drawn around a polygon, it is circumscribed about the circle.

Theorem If a right triangle is inscribed in a circle, the hypotenuse is the diameter.

Theorem A Quadrilateral can be inscribed in a circle if and only if opposite angles are supplementary

Solve for x

Solve for x, y and z

Solve for x and y

Homework Page 617 # 9 – 29