Warm-Up 2/12 Evaluate – this is unit circle stuff, draw your triangle.

Slides:

Advertisements

Similar presentations

Using Fundamental Identities

Advertisements

Math 4 S. Parker Spring 2013 Trig Foundations. The Trig You Should Already Know Three Functions: Sine Cosine Tangent.

An identity is an equation that is true for all defined values of a variable. We are going to use the identities that we have already established and establish.

The Trigonometric Functions What about angles greater than 90°? 180°? The trigonometric functions are defined in terms of a point on a terminal side r.

8.4 Relationships Among the Functions

Trigonometry/Precalculus ( R )

MTH 112 Elementary Functions Chapter 6 Trigonometric Identities, Inverse Functions, and Equations Section 1 Identities: Pythagorean and Sum and Difference.

Verifying Trigonometric Identities

7.1 – Basic Trigonometric Identities and Equations

11. Basic Trigonometric Identities. An identity is an equation that is true for all defined values of a variable. We are going to use the identities to.

Ch 7 – Trigonometric Identities and Equations 7.1 – Basic Trig Identities.

Chapter 6: Trigonometry 6.5: Basic Trigonometric Identities

10.3 Verify Trigonometric Identities

EXAMPLE 1 Find trigonometric values Given that sin  = and <  < π, find the values of the other five trigonometric functions of . 4 5 π 2.

Warm-Up: February 18, 2014 Write each of the following in terms of sine and cosine: tan x = csc x = sec x = cot x =

Right Triangle Trigonometry

Chapter 6 Trig 1060.

5.1 Using Fundamental Identities

Right Triangle Trigonometry

November 5, 2012 Using Fundamental Identities

13.2 – Define General Angles and Use Radian Measure.

Y x Radian: The length of the arc above the angle divided by the radius of the circle. Definition, in radians.

Chapter 6 – Trigonometric Functions: Right Triangle Approach Trigonometric Functions of Angles.

Advanced Precalculus Notes 5.3 Properties of the Trigonometric Functions Find the period, domain and range of each function: a) _____________________________________.

Trig Functions of Angles Right Triangle Ratios (5.2)(1)

13.1 Trigonometric Identities

14.2 The Circular Functions

Trigonometric Identities

Pg. 362 Homework Pg. 362#56 – 60 Pg. 335#29 – 44, 49, 50 Memorize all identities and angles, etc!! #40

(x, y) (x, - y) (- x, - y) (- x, y). Sect 5.1 Verifying Trig identities ReciprocalCo-function Quotient Pythagorean Even/Odd.

Right Triangles Consider the following right triangle.

EXAMPLE 1 Evaluate trigonometric functions given a point Let (–4, 3) be a point on the terminal side of an angle θ in standard position. Evaluate the six.

Vocabulary identity trigonometric identity cofunction odd-even identities BELLRINGER: Define each word in your notebook.

October 27, 2011 At the end of today, you will be able to : Apply trig identities to solve word problems. Warm-up: Prepare for the Unit Circle Quiz. When.

Right Angle Trigonometry Pythagorean Theorem & Basic Trig Functions Reciprocal Identities & Special Values Practice Problems.

EXAMPLE 1 Evaluate trigonometric expressions Find the exact value of (a) cos 165° and (b) tan. π 12 a. cos 165° 1 2 = cos (330°) = – 1 + cos 330° 2 = –

Trigonometry Section 4.2 Trigonometric Functions: The Unit Circle.

Trigonometric Identity Review. Trigonometry Identities Reciprocal Identities sin θ = cos θ = tan θ = Quotient Identities Tan θ = cot θ =

7.1 Basic Trigonometric Identities Objective: Identify and use reciprocal identities, quotient identities, Pythagorean identities, symmetry identities,

Trigonometry Section 8.4 Simplify trigonometric expressions Reciprocal Relationships sin Θ = cos Θ = tan Θ = csc Θ = sec Θ = cot Θ = Ratio Relationships.

1 T Trigonometric Identities IB Math SL - Santowski.

4.3 Right Triangle Trigonometry Objective: In this lesson you will learn how to evaluate trigonometric functions of acute angles and how to use the fundamental.

Pythagorean Identities Unit 5F Day 2. Do Now Simplify the trigonometric expression: cot θ sin θ.

Math III Accelerated Chapter 14 Trigonometric Graphs, Identities, and Equations 1.

Remember an identity is an equation that is true for all defined values of a variable. We are going to use the identities that we have already established.

Trig Functions – Part Pythagorean Theorem & Basic Trig Functions Reciprocal Identities & Special Values Practice Problems.

Using Fundamental Identities Objectives: 1.Recognize and write the fundamental trigonometric identities 2.Use the fundamental trigonometric identities.

Trigonometric identities Trigonometric formulae

TRIGONOMETRIC IDENTITIES

Section 5.1 Trigonometric Identities

Trigonometric Functions: The Unit Circle Section 4.2

Using Fundamental Identities

Warm Up Use trigonometric identities to simplify: csc ∙tan

14.3 Trigonometric Identities

Objective Use fundamental trigonometric identities to simplify and rewrite expressions and to verify other identities.

Trigonometric Function: The Unit circle

Evaluating Trigonometric Functions

Lesson 6.5/9.1 Identities & Proofs

MATH 1330 Section 5.1.

Pythagorean Identities

One way to use identities is to simplify expressions involving trigonometric functions. Often a good strategy for doing this is to write all trig functions.

7 Trigonometric Identities and Equations

Pyrhagorean Identities

Basic Trigonometric Identities and Equations

Unit 7B Review.

Fundamental Trig Identities

Pre-Calculus PreAP/Dual, Revised ©2014

WArmup Rewrite 240° in radians..

Presentation transcript:

Warm-Up 2/12 Evaluate – this is unit circle stuff, draw your triangle.

7.1 Basic Trigonometric Identities Trig Identity: a trig expression that is true for all values of the variables Reciprocal Identities

Quotient Identities Pythagorean Identities This is the most basic all are derived from it. Divide everything by cos 2  Divide everything by sin 2 

Opposite angle Identities

Examples Use the given info to find the trig value. 1. If, find Since and are reciprocals,

2. If use the identities to find tan  Use an identity that involves given info. Substitute what you know. Move the 1 to the right side. Change it to 9/9. Then

Express each value as a trigonometric function of an angle in Quadrant I. 3. Draw everything you know. Then draw the same reference angle in the first quadrant. Sine is ____________ in the 3 rd quadrant So If I have to write it as an angle in the 1 st quadrant will it be the same or will I have to take the opposite? Take the opposite, so your final answer is negative -sin60 o If the original problem is in radians your final answer must be in radians, if it is degrees, your final answer will be in degrees Subtract 360 or 2  if in radians

Try these: Check: If the original problem is in radians your final answer must be in radians, if it is degrees, your final answer will be in degrees.

Simplify Is there a GCF? Yes sinx Factor Use your identities, look back at your notes 1+cot 2 x = csc 2 x Write csc x in terms of sin x, Simplify completely done

7.1 Assignment p. 428 # 25 – 35, 45 – 53 odds Must use the identities for #