9.1 Points, Lines, Planes, and Angles Part 2: Angles.

Slides:

Advertisements

Similar presentations

2-5 Proving Angles Congruent

Advertisements

Angles and Parallel Lines

Chapter 12 and Chapter 3 Geometry Terms.

Angles and Parallel Lines

Complementary and Supplementary Angles.

Parallel Lines.

Angle Relationships Vocabulary

Bell Work: Marsha swam 400 meters in 6 minutes and 12 seconds. Convert that time to minutes.

9.1 – Points, Line, Planes and Angles

Introduction to Angles

10.1 Points, Lines, Planes and Angles

Section 9-1 Points, Lines, Planes, and Angles.

PARALLEL LINES and TRANSVERSALS.

GEOMETRY PRE-UNIT 4 VOCABULARY REVIEW ALL ABOUT ANGLES.

1.5 Describe Angle Pair Relationships

© 2008 Pearson Addison-Wesley. All rights reserved Chapter 1 Section 9-1 Points, Lines, Planes, and Angles.

Line and Angle Relationships

Line and Angle Relationships Sec 6.1 GOALS: To learn vocabulary To identify angles and relationships of angles formed by tow parallel lines cut by a transversal.

1 Angles and Parallel Lines. 2 Transversal Definition: A line that intersects two or more lines in a plane at different points is called a transversal.

Angle Relationships Common Necessary Vocabulary for Parallel and Intersecting Lines.

PRE-ALGEBRA Find ALL of the missing angle measures. 40° 120° 60° 40 ° 60° 180-(40+60) = 80° 80° 100° Classifying Polygons (9-2)

Lesson 11.1 Angle and Line Relationships

Special angles, perpendicular lines, and parallel lines and planes September 10, 2008.

© 2010 Pearson Prentice Hall. All rights reserved. CHAPTER 10 Geometry.

Slide 1 Copyright © 2015, 2011, 2008 Pearson Education, Inc. Lines and Angles Section9.1.

Warm Up 1.) Name a line that contains C. 2.) Name a ray with endpoint B that contains A. 3.) Name an angle with vertex B that contains C. 4.) Name a segment.

Special Pairs of Angles Return to table of contents.

VOCABULARY UNIT 3. PARALLEL LINES Lines on the same plane that never intersect.

Section 3.1 Lines and Angles. Perpendicular Lines Intersecting lines that form right angles Symbol XS SR.

LINE AND ANGLE RELATIONSHIPS Quiz Review. TYPES OF ANGLES Acute Angles have measures less than 90°. Right Angles have measures equal to 90°. Obtuse Angles.

Angles and Parallel Lines

Lines Section 5.1 Essential question: How are the measures of angles related when parallel lines are cut by a transversal?

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

Lines that are coplanar and do not intersect. Parallel Lines.

3-1 Parallel and Perpendicular Lines 3-1 Parallel Lines and Transversals.

I CAN FIND UNKNOWN ANGLE MEASURES BY WRITING AND SOLVING EQUATIONS. 6.1 Angle Measures.

Geometry. Definitions Geometry Definitions 1.straight angle - 180º.

Section 10.1 Points, Lines, Planes, and Angles Math in Our World.

8-3 Angle Relationships Objective: Students identify parallel and perpendicular lines and the angles formed by a transversal.

GEOMETRY UNIT 3 VOCABULARY ALL ABOUT ANGLES. ANGLE DEFINITION Angle A figure formed by two rays with a common endpoint.

Exploring Angle Pairs Unit 1 Lesson 5. Exploring Angle Pairs Students will be able to: Identify Special Angle Pairs and use their relationships to find.

Parallel Lines Cut by Transversal Created by Mrs. Bentley.

Angles and Parallel Lines

Angle Relationships in Parallel Lines and Triangles

Lesson 3.1 Lines and Angles

Alternate Interior Angles

Topic 1-5 Angle Relationships.

Angles and Parallel Lines

Angle Relationships.

Angle Relationships.

Exploring Angle Pairs Unit 1 Lesson 5.

LT 3.1: Identify parallel lines, perpendicular lines, skew lines and angles formed by two lines and a transversal.

Angle Pairs Module A1-Lesson 4

3.1 Pairs of Lines and Angles

G-CO.1.1, G-CO.1.2, G-Co.1.4, G-CO.1.5, G-CO.4.12, G-CO.3.9

Parallel Lines and Transversals

Angles and Parallel Lines

Angles and Parallel Lines

Angles and Parallel Lines

Angles and Parallel Lines

Angles and Parallel Lines

Angles on Lines and Figures Vocabulary

Angles and Parallel Lines

Objectives: Identify parallel and perpendicular lines

Relationships Between Lines

Angles and Parallel Lines

Section 3.1: Lines and Angles

Presentation transcript:

9.1 Points, Lines, Planes, and Angles Part 2: Angles

Parts of an Angle An angle is made up of two rays with a common endpoint. – The rays forming the angle are called its sides. – The common endpoint of the rays is the vertex of the angle. – The angle is formed by points on the rays and NO OTHER points. (Point X is NOT a point on the angle; it is in the interior of the angle.) This angle can be named  B,  ABC, or  CBA. – The textbook uses the symbol  for “angle”.

Types of Angles A tool called a protractor can be used to measure angles. You can classify angles according to their measures. Symbol for right angle!

Other Types of Angles When two lines intersect to form right angles, they are called perpendicular lines. – Our sense of vertical and horizontal depends of perpendicularity. When two lines intersect, they form two pairs of vertical angles. – Vertical angles always have equal measures.

Finding Angle Measures Find the measure of each marked angle in the given figure.

 Find the measure of each marked angle in the given figure.

 Find the measure of each marked angle in the figure, given that  ABC is a right angle.

Complementary and Supplementary Angles If the sum of the measures of two angles is 90 , the angles are said to be complementary, and each is called the complement of the other. If two angles have a sum of 180 , they are supplementary, and each is the supplement of the other. If a represents the degree measure of an angle, 90 – a represents the measure of its complement and 180 – a represents the measure of its supplement.

Using Complementary and Supplementary Angles The supplement of an angle measures 10  more than three times its complement. Find the measure of the angle.

 The supplement of an angle measures 25  more than twice its complement. Find the measure of the angle.

Angle Relationships A transversal is a line that intersects two parallel lines (line t). Two angles are corresponding angles if they occupy corresponding positions (1 and 5, 3 and 7, 2 and 6, 4 and 8). – These angles are equal. Two angles are alternate exterior angles if they lie outside the two lines on opposite sides of the transversal (1 and 8, 2 and 7). – These angles are equal. Two angles are alternate interior angles if they lie between the two lines on opposite sides of the transversal (3 and 6, 4 and 5). – These angles are equal. Two angles are same side interior angles if they lie between the two lines on the same side of the transversal (3 and 5, 4 and 6). – These angles are supplementary. t

Finding Angle Measures Find the measure of each marked angle, given that lines m and n are parallel.

 Assume that lines m and n are parallel. Find the measure of each marked angle.