Table of Contents 5. Right Triangle Trigonometry

Slides:

Advertisements

Similar presentations

Trigonometry Ratios.

Advertisements

Right Triangle Trigonometry

The Inverse Trigonometric Functions Section 4.2. Objectives Find the exact value of expressions involving the inverse sine, cosine, and tangent functions.

1 7.2 Right Triangle Trigonometry In this section, we will study the following topics: Evaluating trig functions of acute angles using right triangles.

Section 5.3 Trigonometric Functions on the Unit Circle

Trigonometric Ratios Triangles in Quadrant I. a Trig Ratio is … … a ratio of the lengths of two sides of a right Δ.

7.3 Trigonometric Functions of Angles. Angle in Standard Position Distance r from ( x, y ) to origin always (+) r ( x, y ) x y  y x.

Right Triangle Trigonometry Digital Lesson. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 The six trigonometric functions of a.

Right Triangle Trigonometry Trigonometry is based upon ratios of the sides of right triangles. The six trigonometric functions of a right triangle, with.

Terminal Arm Length and Special Case Triangles DAY 2.

Right Triangle Trigonometry Digital Lesson. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 The six trigonometric functions of a.

Trigonometry Chapters Theorem.

Solving Right Triangles

Interactive Notes Ms. Matthews.  Label it QRS, where R is the RIGHT angle  Which SIDE is OPPOSITE of ANGLE Q?  Which SIDE is ADJACENT to ANGLE Q? 

Chapter 3 Trigonometric Functions of Angles Section 3.2 Trigonometry of Right Triangles.

Section 5.3 Trigonometric Functions on the Unit Circle

Geometry Notes Lesson 5.3A – Trigonometry T.2.G.6 Use trigonometric ratios (sine, cosine, tangent) to determine lengths of sides and measures of angles.

Right Triangle Trigonometry. Degree Mode v. Radian Mode.

Trigonometry. Basic Ratios Find the missing Law of Sines Law of Cosines Special right triangles

Unit 1 – Physics Math Algebra, Geometry and Trig..

θ hypotenuse adjacent opposite There are 6 trig ratios that can be formed from the acute angle θ. Sine θ= sin θCosecant θ= csc θ Cosine θ= cos θSecant.

Right Triangle Trigonometry 23 March Degree Mode v. Radian Mode.

Solving Right Triangles

Right Triangle Trigonometry

Right Triangle Trigonometry

TRIG FUNCTIONS OF ACUTE ANGLES Section 12-2 Pages

Bell Work Find all coterminal angles with 125° Find a positive and a negative coterminal angle with 315°. Give the reference angle for 212°.

9.5 Trigonometric ratios How are trigonometric ratios used to find missing sides of right triangles?

Right Triangle Trigonometry Obejctives: To be able to use right triangle trignometry.

Do Now: Graph the equation: X 2 + y 2 = 1 Draw and label the special right triangles What happens when the hypotenuse of each triangle equals 1?

Right Triangle Trigonometry

13.1 – Use Trig with Right Triangles

1 What you will learn  How to find the value of trigonometric ratios for acute angles of right triangles  More vocabulary than you can possibly stand!

Section 5.3 Evaluating Trigonometric Functions

5.3 The Unit Circle. A circle with center at (0, 0) and radius 1 is called a unit circle. The equation of this circle would be So points on this circle.

Table of Contents 3. Right Triangle Trigonometry.

Right Triangle Trigonometry Trigonometry is based upon ratios of the sides of right triangles. The six trigonometric functions of a right triangle, with.

The Right Triangle Right Triangle Pythagorean Theorem

Right Triangle Geometry “for physics students”. Right Triangles Right triangles are triangles in which one of the interior angles is 90 otrianglesangles.

13.1 Right Triangle Trigonometry

8.3 Trigonometry. Similar right triangles have equivalent ratios for their corresponding sides. These equivalent ratios are called Trigonometric Ratios.

Section 13.1.a Trigonometry. The word trigonometry is derived from the Greek Words- trigon meaning triangle and Metra meaning measurement A B C a b c.

Trigonometry Chapter 7. Review of right triangle relationships  Right triangles have very specific relationships.  We have learned about the Pythagorean.

Trigonometry Chapters Theorem.

Lesson 46 Finding trigonometric functions and their reciprocals.

List all properties you remember about triangles, especially the trig ratios.

13.1 Right Triangle Trigonometry ©2002 by R. Villar All Rights Reserved.

13.1 Right Triangle Trigonometry. Definition  A right triangle with acute angle θ, has three sides referenced by angle θ. These sides are opposite θ,

Pythagorean Theorem Algebra 2/Trig Name __________________________

Right Triangle Trigonometry

Right Triangle Trigonometry

Table of Contents 5. Right Triangle Trigonometry

Lesson 1 sine, cosine, tangent ratios

CHAPTER 4 TRIGONOMETRIC FUNCTIONS

θ hypotenuse adjacent opposite θ hypotenuse opposite adjacent

Right Triangle Trigonometry

Right Triangle Trigonometry

CHAPTER 8 Right Triangles.

Agenda EQ: What are the 6 trig functions? Turn in Portfolio Warm Up

Right Triangle Trigonometry

7-5 and 7-6: Apply Trigonometric Ratios

Unit 3: Right Triangle Trigonometry

Right Triangle Ratios Chapter 6.

Review these 1.) cos-1 √3/ ) sin-1-√2/2 3.) tan -1 -√ ) cos-1 -1/2

SIX TRIGNOMETRIC RATIOS

Section 2 – Trigonometric Ratios in Right Triangles

Right Triangle Trigonometry

θ hypotenuse adjacent opposite θ hypotenuse opposite adjacent

Triangle Relationships

5.2 Apply the Tangent Ratio

Presentation transcript:

Table of Contents 5. Right Triangle Trigonometry

Right Triangle Trigonometry Essential Question – How can right triangles help solve real world applications?

The Pythagorean theorem In a rt Δ the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the legs. c2 = a2+b2 c a __ b __

Example x2=72+242 x2=49+576 x2=625 x x=25 7 __ __ 24

Example __ __ x 12

3 basic trig ratios Sine (sin) Cosine (cos) Tangent (tan) Sin  Cos 

SOH CAH TOA Sin = opp/hyp Cos = adj/hyp Tan = opp/adj

Ex: Find sin, cos, & tan of A & B. sin A= 12/13 cos A= 5/13 tan A= 12/5 12 C B B sin B= 5/13 cos B= 12/13 tan B= 5/12 5 13 A

Inverse Trig Functions Cosecant is the inverse of sin Secant is the inverse of cos Cotangent is the inverse of tan

Example: Six Trig Ratios Given that , calculate the other trigonometric functions for  . 4 3 5  Step 1: Draw a right triangle and find third side using Pythagorean theorem. Step 2: Find the other ratios using formulas. sin  = csc  = cos  = sec  = tan  = cot  = Example: Six Trig Ratios

More examples Given that sin = 7/25, sketch the triangle and find the third side. Then find cos Given that tan = ¾, sketch the triangle and find the third side. Then find sin Given that tan = 4/5, what is cot ?

Given a point, find all trig functions 1. Draw right triangle 2. Label theta 3. Label sides 4. Use Pythagorean theorem to find missing side 5. Find all 6 functions

Example Given the point (-4,10) find the values of the six trig function of the angle. 1. Plot point (-4,10) 2. Draw rt triangle 3. Label angle and sides 10.8 10 4. Use Pyt. Th. to find 3rd side. -4 5. Find trig functions

Example Given the point (-5,-2) find the values of the six trig function of the angle. 1. Plot point 2. Draw rt triangle 3. Label angle and sides -5 4. Use Pyt. Th. to find 3rd side. -2 (-5,-2) 5. Find trig functions

Last type of problem You are given a trig ratio It can be in one of two quadrants Therefore you have to be given another piece of information to determine which quadrant it is in

Always Study Trig Carefully Sin y values Cos x values Tan sin/cos Sin + Cos - Tan - Sin + Cos + Tan + Where are these positive? Always Sin All Study Sin - Cos - Tan + Sin - Cos + Tan - Trig Carefully Tan Cos

Steps 1. Find what quadrant the triangle is in 2. Draw right triangle, only sides will be negative, hypotenuse will never be negative 3. Use Pythagorean theorem to find 3rd side 4. Find other trig functions

Example Given that cos θ = 8/17 and tan θ < 0, find all six trig functions. 8 θ -15 17 Triangle is in 4th quadrant because that is where cos is positive and tan is negative