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.

Slides:

Advertisements

Similar presentations

Trigonometric Identities

Advertisements

Trig Graphs. y = sin x y = cos x y = tan x y = sin x + 2.

Evaluating Sine & Cosine and and Tangent (Section 7.4)

4.5 (Day 1) Inverse Sine & Cosine. Remember: the inverse of a function is found by switching the x & y values (reflect over line y = x) Domains become.

Section 5.2 Trigonometric Functions of Real Numbers Objectives: Compute trig functions given the terminal point of a real number. State and apply the reciprocal.

Aim: How do we find the exact values of trig functions? Do Now: Evaluate the following trig ratios a) sin 45  b) sin 60  c) sin 135  HW: p.380 # 34,36,38,42.

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

Trigonometry/Precalculus ( R )

Trigonometric Equations Solve Equations Involving a Single Trig Function.

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.

EXAMPLE 1 Evaluate inverse trigonometric functions Evaluate the expression in both radians and degrees. a.cos –1 3 2 √ SOLUTION a. When 0 θ π or 0° 180°,

Lesson 4.4 Trigonometric Functions of Any Angle. Let  be an angle in standard position with (x, y) a point on the Terminal side of  and Trigonometric.

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.

Solving Trigonometric Equations  Trig identities are true for all values of the variable for which the variable is defined.  However, trig equations,

Sum and Difference Formulas Section 5.4. Exploration:  Are the following functions equal? a) Y = Cos (x + 2)b) Y = Cos x + Cos 2 How can we determine.

Solving Right Triangles

Solving Trigonometric Equations. First Degree Trigonometric Equations: These are equations where there is one kind of trig function in the equation and.

7.5 Values of Trig Functions. Trig Values for Non-special Angles Use calculator to find value & round to 4 digits * make sure calc is in DEG mode * angle.

4.6 Other Inverse Trig Functions. To get the graphs of the other inverse trig functions we make similar efforts we did to get inverse sine & cosine. We.

5-5 Solving Right Triangles. Find Sin Ѳ = 0 Find Cos Ѳ =.7.

Find the reference angle

13.4 L AW OF S INES 13.5 L AW OF COSINES Algebra II w/ trig.

Sum and Difference Formulas New Identities. Cosine Formulas.

7-5 The Other Trigonometric Functions Objective: To find values of the tangent, cotangent, secant, and cosecant functions and to sketch the functions’

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.

radius = r Trigonometric Values of an Angle in Standard Position 90º

13.7 I NVERSE T RIGONOMETRIC F UNCTIONS Algebra II w/ trig.

Warm-Up 8/26 Simplify the each radical expression

14.2 The Circular Functions

Unit 4: Trigonometry Minds On. Unit 4: Trigonometry Minds On AngleSinCosTan.

Evaluating Trigonometric Functions (Precalculus Review 3) September 10th, 2015.

Trig/Precalculus Section 5.1 – 5.8 Pre-Test. For an angle in standard position, determine a coterminal angle that is between 0 o and 360 o. State the.

Evaluating Inverse Trigonometric Functions

Properties of the Trigonometric Functions

3.2 The Inverses Continued Warm-up (IN) 1.What is the domain and range of ? 2.True or False: The graph of is increasing on the interval and. 3. If and,

Solving for (3 Ways). Examples Without using a calculator, what angle(s) would satisfy the equation ?

MATHPOWER TM 12, WESTERN EDITION Chapter 5 Trigonometric Equations.

1 What you will learn  How to solve trigonometric equations and inequalities.

5.4 Equations and Graphs of Trigonometric Functions

Warm up If sin θ= and find the exact value of each function. 1.cos 2θ 2.sin 2θ 3.Use the half-angle identity to find the exact value of the function: cos.

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 =

REVIEW Reference angle.

4.4 – Trigonometric Functions of any angle. What can we infer?? *We remember that from circles anyway right??? So for any angle….

Warm-Up 3/ Find the measure of

Math 20-1 Chapter 2 Trigonometry

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?

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:

Section 7.3 Double-Angle, Half-Angle and Product-Sum Formulas Objectives: To understand and apply the double- angle formula. To understand and apply the.

Sin x = Solve for 0° ≤ x ≤ 720°

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

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

Pg. 407/423 Homework Pg. 407#33 Pg. 423 #16 – 18 all #9 tan x#31#32 #1x = 0.30, 2.84#2x = 0.72, 5.56 #3x = 0.98#4No Solution! #5x = π/6, 5π/6#6Ɵ = π/8.

Section 4.4 Trigonometric Functions of Any Angle.

Trigonometric Ratios of Any Angle

Holt McDougal Algebra Inverses of Trigonometric Functions toolbox Pg. 953 (2-10;16-24;30-31, 41 why4)

Bell Assignment Solve the following equations. 1.x = x – 3 = 7 3.When you solve for x, what are you trying to accomplish?

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

Write each fraction as a decimal rounded to the nearest hundredth.

FLASH! Fredda Wyatt 01/2009.

Write each fraction as a decimal rounded to the nearest hundredth.

Trigonometric Functions of Any Angle (Section 4-4)

Aim: What are the double angle and half angle trig identities?

Properties of Trig Fcts.

Solving Equations 3x+7 –7 13 –7 =.

Solving Trigonometric Equations by Algebraic Methods

Double-Angle, Half-Angle Formulas

6.4 - Trig Ratios in the Coordinate Plane

Day 58 AGENDA: Notes Unit 6 Lesson8.

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

Presentation transcript:

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 Similarities? Differences? Why?

C.A.S.T. Rule The CAST rule defines the quadrants where each trig function is POSITIVE.

Therefore: A ll trig ratios are positive in Quadrant I The S ine ratio is the only ratio positive in Quad. II The T angent ratio is the only ratio positive in Quad. III The C osine ratio is the only ratio positive in Quad. IV Examples: Write the expression relating each function to its reference angle. i)sin 310cos 290 tan 125sin 150

State the exact value of each of the following; a) sin 300 b) cos 150 c) d) e)

Note: A restriction on a Trig equation limits the values of the solution set as the solutions must fall within the limits posed by the restriction. Examples: 1. Solve for to the nearest degree, a)b)c)

2. Solve for to the nearest degree. a) b)

c) d)

Pg. 454 #12,13ac,14ace,16acd, 19bcdf,MC 1,2 Pg. 437 #15,16,MC 1,2