Objective: Use unit circle to define trigonometric functions. Even and odd trig functions. Warm up 1.Find and. 2.Give the center and radius of a circle.

Slides:

Advertisements

Similar presentations

5.2 Circles and Sine Ratio. Angles on a Grid Initial Arm Terminal Arm Terminal Point Coterminal Angle.

Advertisements

Trigonometry/Precalculus ( R )

QUADRANT I THE UNIT CIRCLE. REMEMBER Find the length of the missing side: x y x y x y Aim: Use the unit circle in order to find the exact value.

Chapter 14 Day 5 Trig Functions of Any Angle.  We can also evaluate trig functions of an angle that contains a point that isn’t necessarily on the unit.

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.

Trigonometric Functions on the

Drill Calculate:.

Terminal Arm Length and Special Case Triangles DAY 2.

More Practice with Trigonometry Section 4.3b. Let’s consider… Quadrantal Angle – angles whose terminal sides lie along one of the coordinate axes Note:

Definition of Trigonometric Functions With trigonometric ratios of acute angles in triangles, we are limited to angles between 0 and 90 degrees. We now.

2.5 Properties of the Trig Functions

Polar Coordinates and Graphs of Polar Equations. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 The polar coordinate system is formed.

4.2 Day 1 Trigonometric Functions on the Unit Circle Pg. 472 # 6-10 evens, evens, 46, 54, 56, 60 For each question (except the 0 o, 90 o, 180 o,

30º 60º 1 45º 1 30º 60º 1 Do Now: Find the lengths of the legs of each triangle.

Section 7.5 Unit Circle Approach; Properties of the Trigonometric Functions.

Tuesday 3/24. Warm Up Determine the six trigonometric ratios for the following triangle: y r x θ sin θ =csc θ = cos θ =sec θ = tan θ =cot θ = What if.

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

Chapter 14 Day 5 Trig Functions of Any Angle.  The of a circle is a portion of the of a circle. arc circumference.

Warm-Up 8/26 Simplify the each radical expression

Copyright © 2011 Pearson, Inc. 4.3 Trigonometry Extended: The Circular Functions Goals: Solve problems involving trigonometric functions. Memorize the.

+ 4.4 Trigonometric Functions of Any Angle *reference angles *evaluating trig functions (not on TUC)

The Unit Circle Dr. Shildneck Fall, The Unit Circle The Unit Circle is a circle of radius 1-unit. Since angles have the same measure regardless.

Geometry Section 11.6 Areas of Regular Polygons. Polygon Terms The center of the polygon and the radius of the polygon are the center and the radius of.

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.

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

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.

Warm Up Week 2. Section 10.6 Day 1 I will write the equation of a circle. Circle Equation Must know the coordinate of the center and the radius.

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

Understanding the Unit Circle

Warm-Up 3/ Find the measure of

The Unit Circle The unit circle is a circle of radius 1 centered at the origin of the xy-plane. Its equation is x 2 +y 2 = 1.

Warm Up. EQUATION OF A CIRCLE Geometry How can we make a circle? What are the most important aspects when drawing a circle?

Trig. Functions & the Unit Circle. Trigonometry & the Unit Circle VERY important Trig. Identity.

Polar Coordinates and Graphs of Polar Equations. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 The polar coordinate system is formed.

Print polar coordinates for hw

Section 3 – Circular Functions Objective To find the values of the six trigonometric functions of an angle in standard position given a point on the terminal.

Section 7-3 The Sine and Cosine Functions Objective: To use the definition of sine and cosine to find values of these functions and to solve simple trigonometric.

Bellringer 3-28 What is the area of a circular sector with radius = 9 cm and a central angle of θ = 45°?

Trigonometry Section 7.3 Define the sine and cosine functions Note: The value of the sine and cosine functions depend upon the quadrant in which the terminal.

Warm Up. Answers Mastery Objectives Find values of trigonometric functions for any angle. Find values of trigonometric functions using the unit circle.

14.1 The Unit Circle Part 2. When measuring in radians, we are finding a distance ____ the circle. This is called. What is the distance around a circle?

Section 7-6 The Inverse Trigonometric Functions. Inverse Trig. Functions With the trigonometric functions, we start with an angle, θ, and use one or more.

4.4 Trig Functions of Any Angle Objectives: Evaluate trigonometric functions of any angle Use reference angles to evaluate trig functions.

Definition 3: Trigonometric Functions: The Unit Circle 3.4 JMerrill, 2009 Contributions from DDillon.

The Unit Circle with Radian Measures. 4.2 Trigonometric Function: The Unit circle.

Trigonometric Function: The Unit circle Trigonometric Function: The Unit circle SHS Spring 2014.

Objective: Finding trigonometric functions of any angle. Warm up Make chart for special angles.

Section 8-5 Solving More Difficult Trigonometric Functions.

5.2 Trigonometric Ratios in Right Triangles. A triangle in which one angle is a right angle is called a right triangle. The side opposite the right angle.

Objective: Polar coordinate system. Coordinate conversion.

Solving Right Triangles

Bell Ringer How many degrees is a radian?

Trigonometric Function: The Unit circle

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

Unit Circle 1 (0,0) Center: Radius: -1.

Section 3 – Trig Functions on the Unit Circle

LESSON ____ SECTION 4.2 The Unit Circle.

Which of the following points is on the unit circle

Trigonometric Functions: The Unit Circle (Section 4-2)

Unit 7B Review.

Warm-up: Find the exact values of the other 5 trigonometric functions given sin= 3 2 with 0 <  < 90 CW: Right Triangle Trig.

4.3 – Trig Functions on the Unit Circle

Trig. Ratios in a Coordinate System

1.3 – Trigonometric Functions

6.4 - Trig Ratios in the Coordinate Plane

13-2 Angles and Angle Measure

Trig Functions of Any Angle

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

5-3 The Unit Circle.

Presentation transcript:

Objective: Use unit circle to define trigonometric functions. Even and odd trig functions. Warm up 1.Find and. 2.Give the center and radius of a circle. a. b.

Unit Circle Center: Radius:

Example 1 Find the value of the trig functions at angle t. Given that the terminal side of t on the unit circle is at P Example 2 Find sin t, cost t, tan t. Terminal side of t coordinates P

Example 3 Use the unit circle to find: a. b. c. d. e. f. g. h.

Unit circle: Where are those values coming from?

Assignment: pg 486 #5-18