5.2 Understanding Angles terminal arm q initial arm standard position

Slides:

Advertisements

Similar presentations

5.2 Understanding Angles terminal arm q initial arm standard position

Advertisements

Lesson 5-1: Angles and Degree Measure

TRIGONOMETRY. Sign for sin , cos  and tan  Quadrant I 0° <  < 90° Quadrant II 90 ° <  < 180° Quadrant III 180° <  < 270° Quadrant IV 270 ° < 

Using the Cartesian plane, you can find the trigonometric ratios for angles with measures greater than 90 0 or less than 0 0. Angles on the Cartesian.

Unit 4: Intro to Trigonometry. Trigonometry The study of triangles and the relationships between their sides and angles.

Holt Geometry 8-Ext Trigonometry and the Unit Circle 8-Ext Trigonometry and the Unit Circle Holt Geometry Lesson Presentation Lesson Presentation.

Chapter 13: Trigonometric and Circular Functions Section 13-2: Measurement of Arcs and Rotations.

Introduction to Trigonometry Angles and Radians (MA3A2): Define an understand angles measured in degrees and radians.

Introduction to the Unit Circle Angles on the circle.

Table of Contents 1. Angles and their Measures. Angles and their Measures Essential question – What is the vocabulary we will need for trigonometry?

Trigonometry by Cynthia Y. Young, © 2007 John Wiley and Sons. All rights reserved. 2.1 Angles in the Cartesian Plane JMerrill, 2009.

More Trig – Angles of Rotation Learning Objective: To find coterminal and reference angles and the trig function values of angles in standard position.

© The Visual Classroom x y Day 1: Angles In Standard Position  terminal arm initial arm standard position  initial arm 0 º terminal arm x y non-standard.

SECTION 2.1 EQ: How do the x- and y-coordinates of a point in the Cartesian plane relate to the legs of a right triangle?

Aim: How do we look at angles as rotation? Do Now: Draw the following angles: a) 60  b) 150  c) 225  HW: p.361 # 4,6,12,14,16,18,20,22,24,33.

Angles and their Measures Essential question – What is the vocabulary we will need for trigonometry?

Section 4.1. Radian and Degree Measure The angles in Quadrant I are between 0 and 90 degrees. The angles in Quadrant II are between 90 and 180 degrees.

Lesson 5-1 Angles and Degree Measure Objective: To convert decimal degrees to measure degrees. To find the number of degrees in a given number of rotations.

§5.3.  I can use the definitions of trigonometric functions of any angle.  I can use the signs of the trigonometric functions.  I can find the reference.

Concept. Example 1 Evaluate Trigonometric Functions Given a Point The terminal side of  in standard position contains the point (8, –15). Find the exact.

Warm Up List all multiples of 30° angles from 0° to 360 ° on Circle #1. List all multiples of 45 ° angles from 0° to 360 ° on Circle # 2. 30°, 60°, 90°,

TRIGONOMETRIC FUNCTIONS OF ANY ANGLE

Measurement of Rotation

6.1 Radian and Degree Measure

Unit 1 : Introduction to Trigonometry

Quadrants: Quarters on a coordinate plane

Radian and Degree Measure

6.1 Radian and Degree Measure

Introduction to Trigonometry

Day 1: Angles In Standard Position

5.1 Angles and Degree Measure

EXAMPLE 3 Find reference angles

Two angles in standard position that share the same terminal side.

Trigonometric Functions of Any Angle

6.1 Radian and Degree Measure

LADIES AND GENTLEMEN, IT IS NOW THE TIME YOU HAVE BEEN WAITING FOR: TRIGONOMETRY.

In The Coordinate Plane

10-2 Angles of Rotation Warm Up Lesson Presentation Lesson Quiz

Radian Measure and Coterminal Angles

17-1 Angles of Rotation and Radian Measure

6.3 Angles and Radian Measure

Radian and Degree Measure

Introduction to the coordinate Plane

13-2 Angles and the Unit Circle

Quadrants and Reading Ordered Pairs

The game of Standard Position

Lesson 5-1: Angles and Degree Measure

6.1 Radian and Degree Measure

LADIES AND GENTLEMEN, IT IS NOW THE TIME YOU HAVE BEEN WAITING FOR:

Angles and Their Measures

Unit Circle 1 (0,0) Center: Radius: -1.

Radian and Degree Measure

Angles and Radian Measure

Trigonometry Terms Radian and Degree Measure

13.2A General Angles Alg. II.

Introduction to Trigonometry

Aim: How do we look at angles as rotation?

Welcome to Trigonometry!

Warm-up: Determine the circumference of the following circles in terms of π. HW: p (5 – 10 , , 25, 27, 33 – 36 , 43 – 61 odd, 71, 73)

Reference and Coterminal Angles

Trigonometric Functions of Any Angle

Mrs. Volynskaya Pre-Calculus 4.1 Radian and Degree Measure

Standard Position, Coterminal and Reference Angles

ANGLES & ANGLE MEASURES

13-2 Angles and Angle Measure

Conversions, Angle Measures, Reference, Coterminal, Exact Values

Presentation transcript:

5.2 Understanding Angles terminal arm q initial arm standard position non-standard position x y x y terminal arm q q q initial arm 0º

y Positive angles ex: 80º rotate counterclockwise q x x y Negative angles rotate clockwise q ex: –120º

Quadrants II I III IV x y quadrant angle I II III IV 90º II I quadrant angle I II III IV 0º < q < 90º 180º 90º < q < 180º 0º 180º < q < 270º III IV 270º < q < 360º 270º

x y Example: P(x, y) Let P(x, y) be a point on the terminal arm of an angle in standard position. q1 Point P can be anywhere in the x-y plane. q1 is in quadrant II. 90º < q1 < 180º x y 270º < q2 < 360º q2 q2 is in quadrant IV. P(x, y)

x y q3 = 180º P(x, y) q3 q3 lies in the negative x-axis.

Coterminal angles x y They share the same initial arm and the same terminal arm. q1 Ex: q1 = 210º q2 q2 = – 150º

x y Coterminal angles share the same initial arm and the same terminal arm. q2 Ex: q1 = 30º q1 q2 = 360º + 30º q3 = 390º q3 = 720º + 30º x y = 750º q4 = – 360º + 30º = – 330º q4

The principal angle is the angle between 0º and 360º. The coterminal angles of 390º, 750º and – 330º all share the same principal angle of 30º. x y The related acute angle is the angle formed by the terminal arm of an angle in standard position and the x-axis. q1 b The related acute angle lies between 0º and 90º.

x y x y q q b b q = 220º b = 220º – 180º q = 150º = 40º b = 180º – 150º x y = 30º q = 325º b = 360º – 325º b q = 35º

b) determine the principal angle. Example 1: x y a) Sketch an angle of –160º b) determine the principal angle. principal angle c) determine the related acute angle. related acute angle a) –160º will be in quadrant III. – 160º b) The principal angle: 360º– 160º = 200º c) The related acute angle: 200º– 180º = 20º

b) Determine the value of the related acute angle. q Example 2: The point P(–5, –4) lies on the terminal arm an angle in standard position. x y a) Sketch the angle. b) Determine the value of the related acute angle. q 5 b 4 P(–5, –4) c) Determine the principal angle q. q = 180º + 39º q = 219º

b) Determine the value of the related acute angle. q Example 3: The point P(– 6, 7) lies on the terminal arm an angle in standard position. x y P(–6, 7) a) Sketch the angle. b) Determine the value of the related acute angle. 7 q b 6 c) Determine the principal angle q. q = 180º – 49.4º q = 130.6º

Example 4: State all values of q , where n Î I. q = 25º + 360ºn, 1 £ n £ 3 q1 = 25º + 360º(1) q2 = 25º + 360º(2) q3 = 25º + 360º(3) = 385º q2 = 25º + 720º q3 = 25º + 1080º = 745º = 1105º Answer: {385º, 745º, 1105º }