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Graphs of Trigonometric Functions
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 DAY 1 : OBJECTIVES 1. Define periodic function. 2. Define symmetry. 3. Differentiate an odd function from an even function. 4. Identify whether the graph of the function is symmetric with the origin, x – axis, or y – axis. 5. Determine if the given function is an odd or even function.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 3 1.Which among the following is a periodic function? A. B. C. D.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 4 A periodic function is a function f such that f(x) = f(x + p), for every real number x in the domain where p is a constant. The smallest positive number p, if there is one, for which f(x + p) = f(x) for all x, is the period of the function. This function is periodic, the function values repeat every two units as we move from left to right.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 5 Many things in daily life repeat with a predictable pattern, such as vibrations and simple harmonic motions, rotation of the earth about its own axis, the rotation of the earth about the sun, the swinging of the pendulum of a clock, the vibrations of strings of musical instruments, the changing of seasons, the rise and fall of tides, the heartbeat and the circulation of blood through the heart, and many others. When a phenomenon such as these results from circular periodic motion, the circular functions are often used to mathematically model the data.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 6 A. B. C. D. 2. Identify if each graph is symmetric with respect to a line or to a point.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 7 Symmetry with respect to a point A graph is said to be symmetric with respect to a point Q if to each point P on the graph, we can find point P’ on the same graph, such that Q is the midpoint of the segment joining P and P’. Symmetry with respect to the axis or line A graph is said to be symmetric with respect to a line if the reflection (mirror image) about the line of every point on the graph is also on the graph The line is known as the line of symmetry.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 8 A. B. C. D. 3. Which function is symmetric with respect to the x – axis? To the y – axis? To the origin?
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 9 Two points are symmetric with respect to the y – axis if and only if their x – coordinates are additive inverses and they have the same y – coordinate.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 10 Two points are symmetric with respect to the x – axis if and only if their y –coordinates are additive inverses and they have the same x – coordinate.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 11 Two points are symmetric with respect to the origin if and only if both their x – and y – coordinates are additive inverses of each other. Imagine sticking a pin in the given figure at the origin and then rotating the figure at 180 0. Points P and P 1 would be interchanged. The entire figure would look exactly as it did before rotating.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 12 4. Which of the following function is odd? A. f(x) = 3x 2 – 4 B. f(x) = x 3 + 5x - 2 C. f(x) = 10x 5 + 4x 3 - x D. f(x) = 7x 4 – 5x + 8
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 13 4. How is an odd function differ from an even function? A function is an even function when f(-x) = f(x) for all x in the domain of f. This is a function symmetric with respect to the y – axis. A function is an odd function when f(-x) = - f(x) for all x in the domain of f. This is a function symmetric with respect to the origin.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 14 SEATWORK # 1 I. Identify whether each graph is symmetric with respect to the x – axis, the y – axis, the origin or to none of these. (1 point each) 1. 2. 3. 4. II. Identify if each function is even, odd, or neither. (1 point each) 5. f(x) = 2x 2 7. f(x) = 3x 2 – 7 9. f(x) = x 3 + x 6. f(x) = 2x + 1 8. f(x) = - x 4 10. f(x) = -3x 7 – 4x 5
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 15 ASSIGNMENT I. Identify whether each graph is symmetric with respect to the x – axis, the y – axis, the origin or to none of these. (1 point each) 1. 2. 4. II. Identify if each function is even, odd, or neither. (1 point each) 5. f(x) = x 2 – 3 7.f(x) = 3x – 79. f(x) = x 3 + 2x 8 6. f(x) = -13x 8. f(x) = - x 4 + 910. f(x) = 8x 7 – x 11 3.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 16 OBJECTIVES 1. Identify the properties of the basic sine and cosine functions from its graph. 2. Find the amplitude and period of a trigonometric function given its equation. 3. Graphing sine and cosine functions with various amplitude and period.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 17 Graph of the Sine Function To sketch the graph of y = sin x first locate the key points. These are the maximum points, the minimum points, and the intercepts. 0010sin x 0x Then, connect the points on the graph with a smooth curve that extends in both directions beyond the five points. A single cycle is called a period. y x y = sin x
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 18 Cosine Function Graph of the Cosine Function To sketch the graph of y = cos x first locate the key points. These are the maximum points, the minimum points, and the intercepts. 1001cos x 0x Then, connect the points on the graph with a smooth curve that extends in both directions beyond the five points. A single cycle is called a period. y x y = cos x
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 19 6. The cycle repeats itself indefinitely in both directions of the x-axis. Properties of Sine and Cosine Functions The graphs of y = sin x and y = cos x have similar properties: 3. The maximum value is 1 and the minimum value is –1. 4. The graph is a smooth curve. 1. The domain is the set of real numbers. 5. Each function cycles through all the values of the range over an x-interval of. 2. The range is the set of y values such that.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 20 y x Example: y = 3 cos x Example: Sketch the graph of y = 3 cos x on the interval [– , 4 ]. Partition the interval [0, 2 ] into four equal parts. Find the five key points; graph one cycle; then repeat the cycle over the interval. maxx-intminx-intmax 30-303 y = 3 cos x 22 0x (0, 3) (, 0) (, 3) (, –3)
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 21 Amplitude The amplitude of y = a sin x (or y = a cos x) is half the distance between the maximum and minimum values of the function. amplitude = |a| If |a| > 1, the amplitude stretches the graph vertically. If 0 < |a| < 1, the amplitude shrinks the graph vertically. If a < 0, the graph is reflected in the x-axis. y x y = – 4 sin x reflection of y = 4 sin x y = 4 sin x y = 2 sin x y = sin x
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 22 y x Period of a Function period: 2 period: The period of a function is the x interval needed for the function to complete one cycle. For b 0, the period of y = a sin bx is. For b 0, the period of y = a cos bx is also. If 0 < b < 1, the graph of the function is stretched horizontally. If b > 1, the graph of the function is shrunk horizontally. y x period: 2 period: 4
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 23 y x y = cos (–x) Graph y = f(-x) Use basic trigonometric identities to graph y = f (–x) Example 1: Sketch the graph of y = sin (–x). Use the identity sin (–x) = – sin x The graph of y = sin (–x) is the graph of y = sin x reflected in the x-axis. Example 2: Sketch the graph of y = cos (–x). Use the identity cos (–x) = cos x The graph of y = cos (–x) is identical to the graph of y = cos x. y x y = sin x y = sin (–x) y = cos (–x)
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 24 Steps in Graphing y = a sin bx and y = a cos bx. 4. Apply the pattern, then graph. 3. Find the intervals. 2. Find the period =. 1. Identify the amplitude =.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 25 y = a cos bx y = a sin bx
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 26 y x 0 20 –2 0y = –2 sin 3x 0 x Example: y = 2 sin(-3x) Example: Sketch the graph of y = 2 sin (–3x). Rewrite the function in the form y = a sin bx with b > 0 amplitude: |a| = |–2| = 2 Calculate the five key points. (0, 0) (, 0) (, 2) (, -2) (, 0) Use the identity sin (– x) = – sin x: y = 2 sin (–3x) = –2 sin 3x period: 2 2 3 =
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 27 More Examples: 1. Graph y = 3 cos (- 2x). 2. Graph y =.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 28 y x Tangent Function Graph of the Tangent Function 2. range: (– , + ) 3. period: 4. vertical asymptotes: 1. domain : all real x Properties of y = tan x period: To graph y = tan x, use the identity. At values of x for which cos x = 0, the tangent function is undefined and its graph has vertical asymptotes.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 29 Steps in Graphing y = a tan bx. 1. Determine the period. 2. Locate two adjacent vertical asymptotes by solving for x: 3. Sketch the two vertical asymptotes found in Step 2. 4. Divide the interval into four equal parts. 5. Evaluate the function for the first – quarter point, midpoint, and third - quarter point, using the x – values in Step 4. 6. Join the points with a smooth curve, approaching the vertical asymptotes. Indicate additional asymptotes and periods of the graph as necessary.
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 30 2. Find consecutive vertical asymptotes by solving for x: 4. Sketch one branch and repeat. Example: Find the period and asymptotes and sketch the graph of Vertical asymptotes: 3. Plot several points in 1. Period of y = tan x is . y x
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 31 2. Find consecutive vertical asymptotes by solving for x: 4. Sketch one branch and repeat. Example: Find the period and asymptotes and sketch the graph of Vertical asymptotes: 3. Divide - to into four equal parts. 1. Period of y = tan x is. of Period is y x
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Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 32 Graph 1. Period is or 4 . 2. Vertical asymptotes are 3. Divide the interval - 2 to 2 into four equal parts. y x x = - 2 x = 2
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