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Chapter 9 Trigonometric Functions Section 2 Derivatives of Trigonometric Functions Part 1 Learning Objectives for Section 9.2 Derivatives of Trig Functions β The student will be able to use and apply the formulas for derivatives of the trigonometric functions. Barnett/Ziegler/Byleen Business Calculus 12e 2 Review of Derivatives ο§ Power Rule w/ Chain Rule: β’ π¦ = π(π₯) π π¦ β² = π π(π₯) ο§ Natural Log w/ Chain Rule: β’ π¦ = ln π(π₯) π¦β² = πβ1 πβ²(π₯) 1 πβ²(π₯) π(π₯) ο§ Exponential w/ Chain Rule: β’ π¦ = π π(π₯) π¦ β² = π π(π₯) πβ²(π₯) ο§ Product Rule: β’ π¦ = πΏ π₯ π (π₯) π¦ β² = πΏ π₯ π β² π₯ + π π₯ πΏβ²(π₯) ο§ Quotient Rule: β’ π¦= π»(π₯) πΏ(π₯) π¦β² = πΏ π₯ π» β² π₯ βπ» π₯ πΏβ² π₯ πΏ(π₯) 2 Barnett/Ziegler/Byleen Business Calculus 12e 3 Derivative Formulas For Sine and Cosine Basic Form: π¦ = sin π₯ π¦ β² = cos π₯ π¦ = cos π₯ π¦ β² = β sin π₯ Chain Rule: π¦ = sin π(π₯) π¦ β² = cos π(π₯) β πβ²(π₯) Barnett/Ziegler/Byleen Business Calculus 12e π¦ = cos π(π₯) π¦ β² = β sin π(π₯) β πβ²(π₯) 4 Example 1 Find the derivative of each function given. π¦ = 2 sin π₯ π¦ = sin(3π₯) π¦ = sin(π₯ 2 ) π¦β² = 2 cos π₯ π¦β² = cos(3π₯) β 3 π¦β² = πππ (π₯ 2 ) β 2π₯ π¦β² = 3 cos(3π₯) π¦β² = 2x πππ (π₯ 2 ) π¦ = sin π₯ 3 π¦β² = 3 sin π₯ π¦ = sin 4π₯ 2 β cos π₯ π¦β² = 3 cos π₯ π ππ2 π₯ 3 π¦β² = 3 sin 4π₯ 2 β (cos 4π₯) β 4 π¦β² = 12 sin 4π₯ 2 β (cos 4π₯) π¦β² = 12 π ππ2 4π₯ β (cos 4π₯) Barnett/Ziegler/Byleen Business Calculus 12e 5 Example 2 Find the derivative of each function given. π¦ = 5 πππ π₯ π¦ β² = β5 π ππ π₯ π¦ = πππ π₯ π¦ = cos(8π₯) π¦ = πππ (π₯ 3 ) π¦β² = βπ ππ(8π₯) β 8 π¦β² = βπ ππ(π₯ 3 ) β 3π₯ 2 π¦ β² = β8 π ππ(8π₯) π¦β² = β3π₯ 2 π ππ (π₯ 3 ) 4 π¦β² = 4 πππ π₯ 3 (βπ ππ π₯) π¦ β² = β4 πππ π₯ 3 (π ππ π₯) π¦ β² = β4(πππ 3 π₯) (π ππ π₯) Barnett/Ziegler/Byleen Business Calculus 12e 6 Example 3 Find the derivative of tan x: sin π₯ π¦ = tan π₯ = cos π₯ β² πΏπ» β π»πΏβ² β² π¦ = πΏ2 cos π₯ cos π₯ β sin π₯ (β sin π₯) β² π¦ = cos π₯ 2 2 π₯ + π ππ2 π₯ πππ π¦β² = πππ 2 π₯ 1 = πππ 2 π₯ Barnett/Ziegler/Byleen Business Calculus 12e πΌππππ‘ππ‘π¦: π ππ2 π₯ + πππ 2 π₯ = 1 = π ππ 2 π₯ 7 Example 4 Find the derivative of the function given. 1 π¦ = π ππ π₯ = cos π₯ π¦ β² = cos π₯ β1 π¦ β² = β1 cos π₯ β2 β (β sin π₯) sin π₯ 1 sin π₯ sin π₯ β² = tan π₯ sec π₯ = β π¦ = = cos π₯ cos π₯ cos π₯ 2 cos π₯ cos π₯ Barnett/Ziegler/Byleen Business Calculus 12e 8 Example 5 Find the derivative of the function given. π¦ = sin(π₯π π₯ ) π¦ β² = cos(π₯π π₯ ) β (πΏπ β² + π πΏβ² ) π¦ β² = cos(π₯π π₯ ) β (π₯π π₯ + π π₯ β 1) π¦ β² = cos(π₯π π₯ )π π₯ π₯ + 1 Barnett/Ziegler/Byleen Business Calculus 12e 9 Example 6 Find the derivative of each function given. π¦ = ln(cos π₯) 1 β² π¦ = β (β sin π₯) cos π₯ π¦ = π sin π₯ π¦ β² = π sin π₯ β cos π₯ π¦ β² = β tan π₯ Barnett/Ziegler/Byleen Business Calculus 12e 10 Homework Barnett/Ziegler/Byleen Business Calculus 12e 11 Homework Barnett/Ziegler/Byleen Business Calculus 12e 12 Chapter 9 Trigonometric Functions Section 2 Derivatives of Trigonometric Functions Part 2 Learning Objectives for Section 9.2 Derivatives of Trig Functions β The student will be able to solve applications of derivatives of trigonometric functions. Barnett/Ziegler/Byleen Business Calculus 12e 14 The Meaning of Derivatives ο§ Recall the geometric interpretation of a derivative: β’ The derivative of a function is a βslope machineβ. β’ When you βplugβ an x value into π β² π₯ , it gives you a slope. β’ It is the slope of the line tangent to the graph of f(x) at the point (x, f(x)). Barnett/Ziegler/Byleen Business Calculus 12e 15 Example 1: Slope A) Find the slope of the graph of f (x) = sin x at π₯ = π . 2 π 2 B) Write the equation of the line tangent to f(x) at π₯ = . π β² π₯ = cos π₯ π β² π = cos π2 2 =0 πππππ = 0 π π₯ = sin π₯ π π =1 2 π πππππππ‘ ππππ πππ π ππ π‘βπππ’πβ ,1 2 π¦ β π¦1 = π(π₯ β π₯1 ) πΈππ’ππ‘πππ ππ π‘ππππππ‘ ππππ: π¦ β 1 = 0 π₯ β π2 π¦=1 Barnett/Ziegler/Byleen Business Calculus 12e 16 Example 2: Slope A) Find the slope of the graph of π π₯ = cos 2π₯ ππ‘ π₯ = B) Write the equation of the tangent line in point-slope form. π π₯ = cos(2π₯) π β² π₯ = β2sin(2π₯) π π6 = πππ π3 π β² π6 = β2sin π3 = 12 = β2 3 2 πππππ = β 3 π 6 πππππππ‘ ππππ πππ π ππ π‘βπππ’πβ π6, 12 πΈππ’ππ‘πππ ππ π‘ππππππ‘ ππππ: π¦ β 12 = β 3 π₯ β π6 Barnett/Ziegler/Byleen Business Calculus 12e 17 Example 3: Slope A) Find the slope of the graph of π π₯ = sin π₯ 2 ππ‘ π₯ = B) Write the equation of the tangent line in point-slope form. π π₯ = sin π₯ 2 π β² π₯ = 2(sin π₯)(cos π₯) 2 π 2 π 4 = 2 π 2 2 β² π 4 =2 2 2 = 12 =1 πππππππ‘ ππππ πππ π ππ π 1 π‘βπππ’πβ πππππ = 1 4, 2 π 4 πΈππ’ππ‘πππ ππ π‘ππππππ‘ ππππ: π¦ β 12 = π₯ β π4 Barnett/Ziegler/Byleen Business Calculus 12e 18 More Derivative Applications ο§ The derivative also represents the rate of change of f(x) with respect to x. ο§ For example: β’ π (π₯) = the total revenue generated at a production level of x products β’ π β²(π₯) = the rate at which the revenue is increasing/decreasing at a production level of x products. (also known as marginal revenue) Barnett/Ziegler/Byleen Business Calculus 12e 19 Example 4: Application A soft-drink company has revenues from sales over a 2-year period as given approximately by R(t) = 4 β 3πππ ππ‘ 0 ο£ t ο£ 24 6 where R(t) is revenue (in millions of dollars) for a month of sales t months after February 1. a. What is the total revenue 6 months after February 1? b. What is the rate of change of revenue t months after February 1? c. What is the rate of change of revenue 6 months after February 1? d. What is the rate of change of revenue 8 months after February 1? Barnett/Ziegler/Byleen Business Calculus 12e 20 Example 4: Application A soft-drink company has revenues from sales over a 2-year period as given approximately by R(t) = 4 β 3πππ ππ‘ 0 ο£ t ο£ 24 6 where R(t) is revenue (in millions of dollars) for a month of sales t months after February 1. a. What is the total revenue 6 months after February 1? π 6 = 4 β 3πππ π = 4 β 3(β1) =7 The total revenue is $7 million for a month of sales 6 months after Feb. 1. Barnett/Ziegler/Byleen Business Calculus 12e 21 Example 4: Application A soft-drink company has revenues from sales over a 2-year period as given approximately by R(t) = 4 β 3πππ ππ‘ 0 ο£ t ο£ 24 6 where R(t) is revenue (in millions of dollars) for a month of sales t months after February 1. b. What is the rate of change of revenue t months after February 1? π β² π‘ = β3 β sin ππ‘ 6 β π β² π‘ = π2 sin π 6 ππ‘ 6 Barnett/Ziegler/Byleen Business Calculus 12e 22 Example 4: Application A soft-drink company has revenues from sales over a 2-year period as given approximately by R(t) = 4 β 3πππ ππ‘ 0 ο£ t ο£ 24 6 where R(t) is revenue (in millions of dollars) for a month of sales t months after February 1. c. What is the rate of change of revenue 6 months after February 1? π β² π‘ = π2 sin ππ‘ 6 π β² 6 = π2 sin π =0 The revenue isnβt increasing or decreasing 6 months after Feb. 1. Barnett/Ziegler/Byleen Business Calculus 12e 23 Example 4: Application A soft-drink company has revenues from sales over a 2-year period as given approximately by R(t) = 4 β 3πππ ππ‘ 0 ο£ t ο£ 24 6 where R(t) is revenue (in millions of dollars) for a month of sales t months after February 1. d. What is the rate of change of revenue 8 months after February 1? π β² π‘ = π2 sin π β² 8 = π2 sin ππ‘ 6 4π 3 = π2 β 3 2 β β1.4 The revenue is decreasing at a rate of $1.4 million per month 8 months after Feb. 1. Barnett/Ziegler/Byleen Business Calculus 12e 24 Example 4: Application To verify the correctness of our results, letβs look at the graph of R(x). When t=6, the slope is 0. Revenue is not increasing or decreasing. Barnett/Ziegler/Byleen Business Calculus 12e When t=8, the slope is -1.4. Revenue is decreasing. 25 Homework Barnett/Ziegler/Byleen Business Calculus 12e 26
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