Lesson 15.3 Materials: Notes Textbook.

Slides:

Advertisements

Similar presentations

10.1 Tangents to Circles.

Advertisements

Lesson 10.1 Parts of a Circle Today, we are going to…

Definitions A circle is the set of all points in a plane that are equidistant from a given point called the center of the circle. Radius – the distance.

Definitions A circle is the set of all points in a plane that are equidistant from a given point called the center of the circle. Radius – the distance.

Circle. Circle Circle Tangent Theorem 11-1 If a line is tangent to a circle, then the line is perpendicular to the radius drawn to the point of.

Circles – Tangent Lines A tangent line touches a circle at exactly one point. In this case, line t is tangent to circle A. t A.

Circles Chapter 10.

Tangents to Circles (with Circle Review)

By Greg Wood. Introduction  Chapter 13 covers the theorems dealing with cyclic polygons, special line segments in triangles, and inscribed & circumscribed.

Warm Up Determine the measures of the indicated angles Now put it all together to solve for the missing angle.

Introduction Circles have several special properties, conjectures, postulates, and theorems associated with them. This lesson focuses on the relationship.

6.3 – 6.4 Properties of Chords and Inscribed Angles.

Circle GEOMETRY Radius (or Radii for plural) The segment joining the center of a circle to a point on the circle. Example: OA.

Bell work 1 Find the measure of Arc ABC, if Arc AB = 3x, Arc BC = (x + 80º), and __ __ AB BC AB  BC AB = 3x º A B C BC = ( x + 80 º )

4.6 Congruence in Right Triangles In a right triangle: – The side opposite the right angle is called the hypotenuse. It is the longest side of the triangle.

Triangles and Lines – Angles and Lines When two lines intersect they create angles. Some special relationships occur when the lines have properties such.

Warm-Up Match the symbols > Line segment  Ray II Perpendicular 

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.

PROPERTIES OF CIRCLES Chapter – Use Properties of Tangents Circle Set of all points in a plan that are equidistant from a given point called.

4.5 isosceles and Equilateral Triangles -Theorem 4.3: Isosceles Triangle theorem says if 2 sides of a triangle are congruent, then the angles opposite.

Chapter 7 Circles. Circle – the set of all points in a plane at a given distance from a given point in the plane. Named by the center. Radius – a segment.

Lesson 125: Distance Defined, Equidistant from Two Points, Equidistant from Sides of an Angle, Circle Proofs.

Tangent and Chord Properties

Tangent of a Circle Theorem

Circles Chapter 10.

Introduction Circles and tangent lines can be useful in many real-world applications and fields of study, such as construction, landscaping, and engineering.

Copyright © 2014 Pearson Education, Inc.

Lesson: Introduction to Circles - Tangents, Arcs, & Chords

Chords, secants and tangents

Tangent Lines A tangent to a circle is a line in the plane of the circle that intersects the circle in exactly one point. The point where a circle and.

Lesson 9-2 Tangents (page 333)

Lesson 19.2 and 19.3.

Lesson 9-2 Tangents (page 333)

Circle Geometry and Theorems

Lines, Angles and Triangles

Module 9, Lessons 9.1 and Parallelograms

Module 9, Lessons 9.1 and Parallelograms

Isosceles triangles + perp. bisectors

Lesson 15.2 Materials: Notes Textbook.

Tangent and Chord Properties

Tangent and Chord Properties

Warm-Up #33 3. Find x. 1. What is the perimeter of a regular hexagon if one of the side is 10 inches. 2. Find x X = 36 degrees Perimeter = 60 units X =

Circles – Modules 15.5 Materials: Notes Textbook.

t Circles – Tangent Lines

Tangents to Circles A line that intersects with a circle at one point is called a tangent to the circle. Tangent line and circle have one point in common.

8-3 & 8-4 TANGENTS, ARCS & CHORDS

5.2 Bisectors of a Triangle

Similar and Congruent Triangles

Unit 3 Circles.

Arcs and Angles Objective: Students will be able to apply past knowledge to solve problems involving arcs and angles with relationships to circles.

Module 9, Lessons 9.3 and 9.4 – Rectangles, Rhombuses, Squares

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

Tangents Tangent - A line in the plane of a circle that intersects the circle in exactly one point. Point of Tangency – The point of intersection between.

How do we use circles to solve problems?

Introduction Circles have several special properties, conjectures, postulates, and theorems associated with them. This lesson focuses on the relationship.

Day 123 – Angle properties of a circle2

Introduction Circles and tangent lines can be useful in many real-world applications and fields of study, such as construction, landscaping, and engineering.

Module 19: Lesson 3 Tangents and Circumscribed Angles

9-2 Tangents Theorem : If a line is tangent to a circle, then the line is perpendicular to the radius drawn to the point of tangency.

Tangents to Circles.

Y. Davis Geometry Notes Chapter 10.

CIRCLES DEFINITIONS TRIANGLES ANGLES SEGMENTS & LINES 1pt 1 pt 1 pt

Standards: 7.0 Students prove and use theorems involving the properties of parallel lines cut by a transversal, the properties of quadrilaterals, and the.

What are the main properties of Trapezoids and Kites?

Properties of Triangles

Section 10-1 Tangents to Circles.

Lesson 3-2 Isosceles Triangles.

Proofs for circle theorems

Presentation transcript:

Lesson 15.3 Materials: Notes Textbook

Module 15: Angles and Segments in Circles Tangents Tangent – A tangent line or segment is a line or segment that touches the circle at one and only one point, and never passes inside of a circle. Point of tangency Tangent The point where a tangent intersects a circle is called the point of tangency.

Module 15: Angles and Segments in Circles Tangents – Special relationships Tangent and Radius – What angle does it appear must be formed when a radius intersects with a line tangent to a circle? Point of tangency Tangent Radius

Module 15: Angles and Segments in Circles Tangents – Special relationships Tangent and Radius – If a tangent line intersects with a radius (at the point of tangency), they will be perpendicular to each other, creating a right angle. Point of tangency Tangent Radius NOTE – This will be assumed knowledge on the EOC! There will never be a right angle labeled at this intersection, so you must memorize this fact.

Module 15: Angles and Segments in Circles Tangents – Special relationships Point of tangency Tangent Radius

Module 15: Angles and Segments in Circles Tangents – Special relationships Point of tangency Tangent Radius

Module 15: Angles and Segments in Circles Tangents – Special relationships Point of tangency Tangent Radius

Module 15: Angles and Segments in Circles Tangents – Special relationships The intersection of 2 tangents – If two lines are drawn tangent to a circle, they will connect and form a special kind of quadrilateral called a kite (unless the lines’ points of tangency are 180 degrees apart, in which case the lines will be parallel!) The angle formed at the intersection of the tangents is called a circumscribed angle. Circumscribed Angle

Module 15: Angles and Segments in Circles Tangents – Special relationships Discuss the relationship between angles a and b in the diagram. Opposite angles in “tangent” kites are SUPPLEMENTARY Notice that one pair of opposite sides will ALWAYS be supplementary, as each angle created at the points of tangency are 90˚ Therefore, since the total angle measure of any quadrilateral is 360˚, the remaining two angles (labeled ‘a’ and ‘b’) must be supplementary as well. m∠a + m∠b = 180˚ b a

Module 15: Angles and Segments in Circles Tangents – Special relationships Connecting the center of the circle with the point where the two tangents intersect creates two right triangles. What do you know about the two triangles and why? Since each triangle shares the hypotenuse (in green), each shares a radius, and each has a right angles, the triangles are congruent by the HL triangle congruence theorem.

Module 15: Angles and Segments in Circles Tangents – Special relationships By the concept that corresponding parts of congruent triangles are congruent (CPCTC), each angle and side of the triangles are congruent! Notice that the green segment is in fact an angle bisector since it separates two pairs of congruent angles.

Module 15: Angles and Segments in Circles Tangents – Special relationships These congruencies allow you to solve problems relating to the sides of the quadrilateral formed. Find ‘x’ in the following diagram: 10x - 14 2x + 10

Module 15: Angles and Segments in Circles Tangents – Special relationships Find ‘x’ in the following diagram and use it to find the measure of each side of the quadrilateral: 3x + 8 x + 12 12x

Module 15: Angles and Segments in Circles Tangents – Solving Problems Additional problem solving with tangents will involve a chord connecting the two points of tangency, thus creating an isosceles triangle (ABC) with CONGRUENT BASE ANGLES (∠ABC and ∠BAC). In fact, there is another isosceles triangle (ADB) with congruent base angles (∠DAB and ∠DBA)! A C D B

Module 15: Angles and Segments in Circles Tangents – Solving Problems With one angle measure, it is now possible to solve for each angle in the diagram. Try to find each angle measure if the measure of ∠BAC = 20˚ 20˚ A 70˚ 140˚ C D 40˚ 20˚ 70˚ B

Module 15: Angles and Segments in Circles Open your book to pages 810 and 811, #’s 9-10 and 12-15

Module 15: Angles and Segments in Circles Open your book to pages 810 and 811, #’s 9-10 and 12-15

Module 15: Angles and Segments in Circles Open your book to pages 810 and 811, #’s 9-10 and 12-15