FLASH! Fredda Wyatt 01/2009.

Slides:

Advertisements

Similar presentations

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

Advertisements

1 Special Angle Values. 2 Directions A slide will appear showing a trig function with a special angle. Work out the answer Hit the down arrow to check.

Solving Equations = 4x – 5(6x – 10) -132 = 4x – 30x = -26x = -26x 7 = x.

Find the period of the function y = 4 sin x

Trigonometric equations

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

5.3 Solving Trigonometric Equations. What are two values of x between 0 and When Cos x = ½ x = arccos ½.

Trig Ratios SohCahToa Sine = Sin A = ___ Sin C = ___.

Basic Trigonometric Identities In this powerpoint, we will use trig identities to verify and prove equations.

4.7 Inverse Trig Functions. By the end of today, we will learn about….. Inverse Sine Function Inverse Cosine and Tangent Functions Composing Trigonometric.

Warm-Up Write the sin, cos, and tan of angle A. A BC

Sin x = Solve for 0° ≤ x ≤ 720°

6.1 – 6.5 Review!! Graph the following. State the important information. y = -3csc (2x) y = -cos (x + π/2) Solve for the following: sin x = 0.32 on [0,

9-1 Tangent Ratio 9-2 Sine and Cosine Ratio Learning Target: I will be able to solve problems using the tangent, sine, and cosine ratios. Goal 1.01.

Section 8-5 Solving More Difficult Trigonometric Functions.

Warm Up Determine the average rate of change of

1.9 Inverse Trig Functions Obj: Graph Inverse Trig Functions

Trigonometric Identities and Equations

Basic Trigonometric Identities

Finding sin, cos, and tan.

Trig Functions Stations

Which of the following statements is true for this triangle?

…there are three trig ratios

Sine Function 1 Max value 1 when x = 90o Mini value -1 when x = 270o 1

Graphs of Trigonometric Functions

Special Angle Values.

Unit 5: Introduction to Trigonometry Lesson 5: Evaluate Trig Functions

Solving Trigonometric Equations

14.3 Trigonometric Identities

5.5/5.6 – Double- and Half-Angle Identities

Trigonometric Function: The Unit circle

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

7.7 Solve Right Triangles Obj: Students will be able to use trig ratios and their inverses to solve right triangles.

Sum and Difference Identities for the Sin Function

Section 5.1: Fundamental Identities

…there are three trig ratios

Find all solutions of the equation

Trig Functions: the unit circle approach

Trigonometric Equations with Multiple Angles

5-3 Tangent of Sums & Differences

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

1 step solns A Home End 1) Solve Sin x = 0.24

Unit 7B Review.

Lesson 1: Establishing Trig Identities

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

Examples Double Angle Formulas

Rotated Conics WOW!!!.

Trig Ratios C 5 2 A M 4. If C = 20º, then cos C is equal to:

Intro to trig review.

sin x cos x tan x 360o 90o 180o 270o 360o 360o 180o 90o C A S T 0o

Warm – up Find the sine, cosine and tangent of angle c.

Sine Tan Cos. Sine Tan Cos Summary:

ALWAYS work with 1st Quad then translate

Trig Graphs And equations Revision A2.

8.1 Graphical Solutions to Trig. Equations

Trig Graphs And equations Revision.

Graphical Solutions of Trigonometric Equations

Standard MM2G2. Students will define and apply sine, cosine, and tangent ratios to right triangles.

Trigonometric Functions

5-4: Trig Identities Name:_________________ Hour: ________

x x HW 13: Inverse Trig Functions HW 13: Inverse Trig Functions

Trigonometry for Angle

Review for test Front side ( Side with name) : Odds only Back side: 1-17 odd, and 27.

5.3 Solving Trigonometric Equations

8-4 Trigonometry Vocab Trigonometry: The study of triangle measurement

Solving Trig Equations.

Solving Trig Equations.

Aim: How do we solve trig equations using

Right Triangle Trigonometry

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

Presentation transcript:

FLASH! Fredda Wyatt 01/2009

GIVE THE TRIG RATIO. YOU HAVE 5 SECONDS! EXAMPLE sin A 5/13

cos A 12/13

tan A 40/9

cos B 5/13

tan E 12/16

sin B 12/13

cos A 16/34

cos A 9/41

sin B 16/34

tan C 9/40

cos B 30/34

sin A 40/41

sin A 30/34

cos D 12/20

tan B 16/30

tan B 12/5

cos E 16/20

tan A 5/12

cos C 40/41

sin E 12/20

sin C 9/41

tan D 16/12

tan A 30/16

sin D 16/20

Name the trig function you would use to solve for x. YOU HAVE 5 SECONDS! EXAMPLE tan

sin

cos

tan

sin

tan

sin

tan

cos

tan

sin

cos

sin

cos

sin

cos

sin

cos

tan

cos

sin

cos

sin

tan

cos

Write the equation to solve for x. YOU HAVE 12 SECONDS! EXAMPLE tan 28 = x / 32

sin x = 12 / 16

cos 64 = 15 / x

tan x = 5 / 12

sin 40 = 16 / x

tan x = 4 / 1

sin x = 13 / 27

tan x = 27 / 8

cos 33 = x / 19

tan x = 23 / 11

sin x = 9 / 29

cos 41 = x / 32

sin 67 = x / 20

cos x = 5 / 9

sin 36 = x / 10

cos 42 = x / 12

sin x = 6 / 11

cos 18 = 9.2 / x

tan 34 = x / 1000

cos 16 = 8.3 / x

sin 45 = x / 6

cos 31 = x / 17

sin x = 11 / 13

tan y = 19 / 27

cos 49 = x / 28