Objective: Sketch the graphs of tangent and cotangent functions.

Slides:

Advertisements

Similar presentations

Graphs of Tangent and Cotangent Functions

Advertisements

Graphs of Other Trigonometric Functions

Graphs of Tangent & Cotangent

Copyright © Cengage Learning. All rights reserved. Trigonometric Functions: Unit Circle Approach.

Y = tan x  Recall from the unit circle:  that tan  =  tangent is undefined when x = 0.  y=tan x is undefined at x = and x =.

Section 4.6. Graphs of Other Trigonometric Functions What you should learn Sketch the graphs of tangent functions. Sketch the graphs of cotangent functions.

4.5 – Graphs of the other Trigonometric Functions Tangent and Cotangent.

Copyright © 2009 Pearson Addison-Wesley Graphs of the Circular Functions.

Chapter 4.5 Graphs of Tangent, Cotangent, Secant, and Cosecant Learning Target: Learning Target: I can generate the graphs for tangent, cotangent, secant,

February 8 th copyright2009merrydavidson Warm up: Factor These. 1)y 2 – 812) cos 2 x – 9 3)z 2 - 7z + 104) sin 2 x – 5sinx – 6 5) x 2 + 2x – 86) tan 2.

A brief journey into Section 4.5a HW: p , 4, 5, 9, 13, 25, 27.

TRIGONOMETRY, 5.0 STUDENTS KNOW THE DEFINITIONS OF THE TANGENT AND COTANGENT FUNCTIONS AND CAN GRAPH THEM. Graphing Other Trigonometric Functions.

1 Example 7 Sketch the graph of the function Solution I. Intercepts The x-intercepts occur when the numerator of r(x) is zero i.e. when x=0. The y-intercept.

LESSON 5 Section 6.3 Trig Functions of Real Numbers.

Unit 5 – Graphs of the other Trigonometric Functions Tangent and Cotangent MM4A3. Students will investigate and use the graphs of the six trigonometric.

Graphs of the Other Trigonometric Functions Section 4.6.

Lesson 4-6 Graphs of Secant and Cosecant. 2 Get out your graphing calculator… Graph the following y = cos x y = sec x What do you see??

Inverse Trig Functions Remember that the inverse of a relationship is found by interchanging the x’s and the y’s. Given a series of points in.

1 Example 6 Sketch the graph of the function Solution I. Intercepts The x-intercepts occur when the numerator of q(x) is zero i.e. when x=1. The y-intercept.

Section 3.6 – Curve Sketching. Guidelines for sketching a Curve The following checklist is intended as a guide to sketching a curve by hand without a.

1 Example 2 Sketch the graph of the function Solution Observe that g is an even function, and hence its graph is symmetric with respect to the y-axis.

1 Example 4 Sketch the graph of the function k(x) = (x 2 -4) 4/5. Solution Observe that k is an even function, and its graph is symmetric with respect.

Graphing Cotangent. Objective To graph the cotangent.

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

Lesson 2.6 Read: Pages Page 152: #1-37 (EOO), 47, 49, 51.

20 Days. Three days  Graphing Sine and Cosine WS.

What is the symmetry? f(x)= x 3 –x.

Graph Trigonometric Functions

EXAMPLE 7 Graph logarithmic functions Graph the function. SOLUTION a.y = 3 log x Plot several convenient points, such as (1, 0), (3, 1), and (9, 2). The.

Do now Solve 4x 4 -65x (3, ∞) Write as an inequality Sketch Bound or unbound?

Graphs of Trigonometric Functions Digital Lesson.

Limits, Asymptotes, and Continuity Ex.. Def. A horizontal asymptote of f (x) occurs at y = L if or Def. A vertical asymptote of f (x) occurs at.

5.3 The Tangent Function. Graph the function using critical points. What are the y-values that correspond to the x values of Graphically what happens?

1 Example 3 Sketch the graph of the function Solution Observe that h is an odd function, and its graph is symmetric with respect to the origin. I. Intercepts.

Section 7.7 Graphs of Tangent, Cotangent, Cosecant, and Secant Functions.

1 Objectives ► Graphs of Tangent, Cotangent, Secant, and Cosecant ► Graphs of Transformation of Tangent and Cotangent ► Graphs of Transformations of Cosecant.

Tangent and Cotangent Functions Graphing. Copyright © 2009 Pearson Addison-Wesley6.5-2 Graph of the Tangent Function A vertical asymptote is a vertical.

Notes Over 9.2 Graphing a Rational Function The graph of a has the following characteristics. Horizontal asymptotes: center: Then plot 2 points to the.

EXAMPLE 7 Graph logarithmic functions Graph the function. SOLUTION a.y = 3 log x Plot several convenient points, such as (1, 0), (3, 1), and (9, 2). The.

Copyright © 2013, 2009, 2005 Pearson Education, Inc. 1 4 Graphs of the Circular Functions.

Graphs of Other Trigonometric Functions

Pre-Calculus Honors 4.5, 4.6, 4.7: Graphing Trig Functions

Sect.1.5 continued Infinite Limits

Graphing Trigonometric Functions

Increasing Decreasing Constant Functions.

MATH 1330 Section 5.3b.

Graphs of Trigonometric Functions

Lesson 4.6 Graphs of Other Trigonometric Functions

Graphing Rational Functions

Warm-up: HW: Graph Tangent and Cotangent Functions

Section 4.6. Graphs of Other Trigonometric Functions

Graphing Trigonometric Functions

Chapter 7: Trigonometric Functions

How do we recognize and graph trigonometric functions?

Unit 4: curve sketching.

Copyright © Cengage Learning. All rights reserved.

Graphs of the Tangent, Cotangent, Cosecant, and Secant Functions

5.3 The Tangent Function.

Copyright © Cengage Learning. All rights reserved.

Section 3.5 Cosecant Secant and Cotangent Functions

Domain, Range, and Symmetry

Copyright © 2017, 2013, 2009 Pearson Education, Inc.

Graphing Rational Functions

Copyright © 2017, 2013, 2009 Pearson Education, Inc.

Ex1 Which mapping represents a function? Explain

9.5: Graphing Other Trigonometric Functions

Graphs of Other Trigonometric Functions

Presentation transcript:

Objective: Sketch the graphs of tangent and cotangent functions

 Since the values of are positive in quadrants I and III, and negative in quadrants II and IV, so the period is. A convenient interval for this purpose is because, although the endpoints are not in the domain, since those values are undefined, and exists for all other values in the interval.  So increases without bound as approaches from the left and decreases without bound as approaches from the right. So the graph has vertical asymptotes at.

 To sketch the graph of the basic tangent function by hand, it helps to note three key points in one period of the graph and the vertical asymptotes.  Tangent key points:  The amplitude of a tangent function is not defined.

 Domain:  Range:  Vertical Asymptote:  Symmetry: Odd  Period:

 A convenient interval for is because, although the endpoints are not in the domain, since those values are undefined, and exists for all other values in the interval.  In the interval, the values of are positive and increase without bound. In the interval, the values of are negative and decreases without bound. So the graph has vertical asymptotes at

 To sketch the graph of the basic cotangent function by hand, it helps to note three key points in one period of the graph and the vertical asymptotes.  Cotangent key points:

 Domain:  Range:  Vertical Asymptote:  Symmetry: Odd  Period:

 1.

 2.

 3.

 4.

 5.