Math 20-1 Chapter 2 Trigonometry 2.2B Trig Ratios of Any Angle (Solving for the Angle) Teacher Notes.

Slides:

Advertisements

Similar presentations

Evaluating Sine & Cosine and and Tangent (Section 7.4)

Advertisements

TF Angles in Standard Position and Their Trig. Ratios

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

Section 2.1 Acute Angles Section 2.2 Non-Acute Angles Section 2.3 Using a Calculator Section 2.4 Solving Right Triangles Section 2.5 Further Applications.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 1 Objectives: Use the formula for the cosine of the difference of two angles. Use sum and difference.

Math 20-1 Chapter 2 Trigonometry 2.1 A Angles in Standard Position Teacher Notes.

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.

Merrill pg. 759 Find the measures of all angles and sides

(a) How to memorize the trigonometric identities? Trigonometric Identities Easy Memory Tips: Quadrant  is acute sin cos tan IIIII IV I sin  -  -  

Chapter 5 Review. 1.) If there is an angle in standard position of the measure given, in which quadrant does the terminal side lie? Quad III Quad IV Quad.

I.1 ii.2 iii.3 iv.4 1+1=. i.1 ii.2 iii.3 iv.4 1+1=

I.1 ii.2 iii.3 iv.4 1+1=. i.1 ii.2 iii.3 iv.4 1+1=

Trigonometry Jeopardy Radians Degrees Misc Trig Misc.

Angles All about Sides Special Triangles Trig Ratios Solving Triangles

WARM-UP Prove: sin 2 x + cos 2 x = 1 This is one of 3 Pythagorean Identities that we will be using in Ch. 11. The other 2 are: 1 + tan 2 x = sec 2 x 1.

Hosted by Mr. Guthrie Definitions Trig IdentitiesCoordinate Trig Trig Problems

Warm- Up 1. Find the sine, cosine and tangent of  A. 2. Find x. 12 x 51° A.

9-1 & 9-2 Trigonometry Functions. Vocabulary Examples 1) Write the ratios for Sin A Cos A Tan A 2) Write the ratios for Sin A Cos A Tan A.

TF Trigonometric Ratios of Special Angles

Inverse Trigonometric

MATHPOWER TM 12, WESTERN EDITION Chapter 5 Trigonometric Equations.

Lesson 13.1 Right Triangle Trigonometry

Math 20-1 Chapter 2 Trigonometry

5.4 Equations and Graphs of Trigonometric Functions

Point P(x, y) is the point on the terminal arm of angle ,an angle in standard position, that intersects a circle. P(x, y) x y r  r 2 = x 2 + y 2 r =

Math 20-1 Chapter 2 Trigonometry

Unit 7: Right Triangle Trigonometry

Chapter 9 - Trigonometry. Trigonometry: tri’gonon - triangle met’ron - measure.

Math 20-1 Chapter 2 Trigonometry

Warm Up If name is on the board put HW on the board Complete the warm up on the board with a partner. Section 8.3.

Does point P lie on the unit circle? If Point P is the point on the terminal arm of angle  that intersects the unit circle, in which quadrant does P lie?

Math 20-1 Chapter 2 Trigonometry 2.4 The Cosine Law Teacher Notes.

Special Right Triangles Definition and use. The Triangle Definition  There are many right angle triangles. Today we are most interested in right.

MATH 110 UNIT 1 – TRIGONOMETRY Part A. Activity 7 – Find Missing Sides To find an unknown side on a triangle, set up our trigonometric ratios and use.

13.1 R IGHT T RIANGLE T RIG Algebra II w/ trig. Right Triangle:hypotenuse Side opposite Side adjacent 6 Basic Trig Functions: In addition:

Lesson 46 Finding trigonometric functions and their reciprocals.

9-2 Sine and Cosine Ratios. There are two more ratios in trigonometry that are very useful when determining the length of a side or the measure of an.

A C M If C = 20º, then cos C is equal to: A. sin 70 B. cos 70 C. tan 70.

A. Calculate the value of each to 4 decimal places: i)sin 43sin 137sin 223sin 317. ii) cos 25cos 155cos 205cos 335. iii)tan 71tan 109 tan 251tan 289.

8-5 The Tangent Ratio.  Greek for “Triangle Measurement”  You will need to use a scientific calculator to solve some of the problems. (You can find.

Chapter 6 Analytic Trigonometry Copyright © 2014, 2010, 2007 Pearson Education, Inc Double-Angle, Power- Reducing, and Half-Angle Formulas.

Section 4.4 Trigonometric Functions of Any Angle.

Trigonometric Ratios of Any Angle

Math 20-1 Chapter 2 Trigonometry

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

(a) To use the formulae sin (A B), cos (A B) and tan (A B). (b) To derive and use the double angle formulae (c) To derive and use the half angle formulae.

Chapter 8 Right Triangles (page 284)

Evaluating Inverse Trig Functions or.

Solving Right Triangles

4.3A Trigonometric Ratios

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Got ID? T2.1c To Solve Other Trig Functions If One, or Other Information Is Given Knowing what we know, can we find all six trig functions on.

Lesson 7.7, For use with pages

Trigonometry Terms Radian and Degree Measure

Right Triangle Ratios Chapter 6.

Properties of Trig Fcts.

T2.1 f To find Compound Functions

Introduction to College Algebra & Trigonometry

Jeopardy Hosted by Mr. Guthrie.

Solving Equations 3x+7 –7 13 –7 =.

Trigonometry for Angle

6.4 - Trig Ratios in the Coordinate Plane

Warm Up: Find the angle measurement for the labeled reference angle to the nearest degree. The reference angle is labeled with Theta. 9 ft. 17 cm 8 cm.

Math 20-1 Chapter 2 Trigonometry

Agenda Go over homework

Solving Trig Equations

2.1 Angles in Standard Position

2.2 Trig Ratios of Any Angle (x, y, r)

Chapter 2 Trigonometry 2.4 The Cosine Law

Given A unit circle with radius = 1, center point at (0,0)

Presentation transcript:

Math 20-1 Chapter 2 Trigonometry 2.2B Trig Ratios of Any Angle (Solving for the Angle) Teacher Notes

Math 20-1 Chapter 1 Sequences and Series 2.2B Trig Ratios of Any Angle Quadrantal Angles and Solve for the Angle The reference angles for angles in standard position 150 ° and 210 ° are equal. Does this imply that ? ref 30 ° II ref 30 ° III

Quadrantal Angles 0°0° 90 ° 180 ° 270 °, 360 ° P(0, 3) Q(-4, 0) 2.2.2

Solve for angle  given Angle in Standard Position Reference Angle 1 2  1 2  = 30 0 R = 30 0 Reference Angle  = 30 0  = Angle in Standard Position 0 0 ≤  <  Determine the Measure of an Angle Given a Trig Ratio R I or II 2.2.3

Solve for angle  given Angle in Standard Position Reference Angle 3 5  3 5  = 37 0 R = 37 0 Reference Angle  = 37 0  = Angle in Standard Position 0 0 ≤  < nearest degree  Determine the Measure of an Angle Given a Trig Ratio R I or II 2.2.4

Solve for each angle  given a specific trig ratio.  =  45 0,  =  30 0  =  60 0  =  30 0,  =   =   =  RA = 45 0 RA = 60 0 RA = 45 0 RA = 30 0 RA = ≤  < RA = 60 0  =  Determine the Measure of the Angle Given the Exact Ratio III IIV IIIII IIIII I III IV IIIII, 300 0, 225 0, 210 0, 300 0, 240 0

Determine the measure of angle A, to the nearest degree: 0 0 ≤ A < sinA = cosA = tanA = cosA = sinA = tanA = R A Quadrants III III II IV I III IV IIII Determine the Measure of the Angle Given the Approximate Ratio Enter a positive ratio in your calculator 2.2.6

Page 96: 7, 9a,d,e,f, 10, 12, 15, 29 22a 2.2.7