Derivatives CHAPTER. 3.1 Derivative of a Function. 3.2 Differentiability. 3.3 Rules for Differentiation. 3.4 Velocity and Other Rates of Change

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CHAPTER 3 Derivatives 3. Derivative of a Function 3. Differentiabilit 3.3 Rules for Differentiation 3.4 Velocit and ther Rates of Change 3.5 Derivatives of Trigonometric Functions Shown here is the pain reliever acetaminophen in crstalline form, photographed under a transmitted light microscope. While acetaminophen relieves pain with few side effects, it is toic in large doses. ne stud found that onl 30% of parents who gave acetaminophen to their children could accuratel calculate and measure the correct dose. ne rule for calculating the dosage (mg) of acetaminophen for children ages to ears old is D(t ) = 750t>(t + ), where t is age in ears. What is an epression for the rate of change of a child s dosage with respect to the child s age? How does the rate of change of the dosage relate to the growth rate of children? This problem can be solved with the information covered in Section 3.4. 98

Section 3. Derivative of a Function 99 CHAPTER 3 verview In Chapter, we learned how to find the slope of a tangent to a curve as the limit of the slopes of secant lines. In Eample 4 of Section.4, we derived a formula for the slope of the tangent at an arbitrar point ( a, > a) on the graph of the function f() = > and showed that it was ->a. This seemingl unimportant result is more powerful than it might appear at first glance, as it gives us a simple wa to calculate the instantaneous rate of change of f at an point. The stud of rates of change of functions is called differential calculus, and the formula ->a was our first look at a derivative. The derivative was the 7th-centur breakthrough that enabled mathematicians to unlock the secrets of planetar motion and gravitational attraction of objects changing position over time. We will learn man uses for derivatives in Chapter 5, but first, in the net two chapters, we will focus on what derivatives are and how the work. 3. Derivative of a Function What ou will learn about... Definition of Derivative Notation Relationships Between the Graphs of f and f Graphing the Derivative from Data ne-sided Derivatives and wh... The derivative is the ke to modeling instantaneous change mathematicall. Definition of Derivative In Section.4, we defined the slope of a curve = f() at the point where = a to be f(a + h) - f(a) m. When it eists, this limit is called the derivative of f at a. In this section, we investigate the derivative as a function derived from f b considering the limit at each point of the domain of f. DEFINITIN Derivative The derivative of the function f with respect to the variable is the function whose value at is provided the limit eists. f( + h) - f() f (), f () The domain of f, the set of points in the domain of f for which the limit eists, ma be smaller than the domain of f. If f () eists, we sa that f has a derivative (is differentiable) at. A function that is differentiable at ever point of its domain is a differentiable function. EXAMPLE Appling the Definition Differentiate (that is, find the derivative of) f() = 3. continued

00 Chapter 3 Derivatives f(a + h) f(a) P(a, f(a)) a Q(a + h, f(a + h)) = f() a + h Figure 3. The slope of the secant line PQ is f() f(a) P(a, f(a)) = f(a + h) - f(a) (a + h) - a f(a + h) - f(a) =. h a Q(, f()) = f() Figure 3. The slope of the secant line PQ is f() - f(a) =. - a SLUTIN Appling the definition, we have f( + h) - f() f () ( + h) 3-3 Eq. with f () = 3, f ( + h) = ( + h) 3 ( 3 + 3 h + 3h + h 3 ) - 3 ( + h) 3 epanded (3 3 + 3h + h )h 3 terms cancelled, h factored out (3 + 3h + h ) = 3. Now Tr Eercise. h:0 The derivative of f() at a point where = a is found b taking the limit as h : 0 of slopes of secant lines, as shown in Figure 3.. B relabeling the picture as in Figure 3., we arrive at a useful alternate formula for calculating the derivative. This time, the limit is taken as approaches a. DEFINITIN (ALTERNATE) Derivative at a Point The derivative of the function f at the point a is the limit provided the limit eists. f() - f(a) f (a), :a - a After we find the derivative of f at a point = a using the alternate form, we can find the derivative of f as a function b appling the resulting formula to an arbitrar in the domain of f. EXAMPLE Appling the Alternate Definition Differentiate f() = using the alternate definition. SLUTIN At the point = a, f (a) :a f() - f(a) - a :a - a - a - a # :a - a :a :a = a. + a + a + a - a ( - a)( + a) Eq. with f () = Rationalize Á Á the numerator. We can now take the limit. Appling this formula to an arbitrar 7 0 in the domain of f identifies the derivative as the function f () = >() with domain (0, q). Now Tr Eercise 5. ()

Section 3. Derivative of a Function 0 Wh all the notation? The prime notations and f come from notations that Newton used for derivatives. The d/d notations are similar to those used b Leibniz. Each has its advantages and disadvantages. Notation There are man was to denote the derivative of a function = f(). Besides f (), the most common notations are these: prime Nice and brief, but does not name the independent variable. d d df d d d or the derivative of with respect to df d or the derivative of f with respect to Names both variables and uses d for derivative. Emphasizes the function s name. d d f() d d of f at or the Emphasizes the idea that differentiaderivative of f at tion is an operation performed on f. Relationships Between the Graphs of f and f When we have the eplicit formula for f(), we can derive a formula for f () using methods like those in Eamples and. We have alread seen, however, that functions are encountered in other was: graphicall, for eample, or in tables of data. Because we can think of the derivative at a point in graphical terms as slope, we can get a good idea of what the graph of the function f looks like b estimating the slopes at various points along the graph of f. œ EXAMPLE 3 Graphing f œ from f Graph the derivative of the function f whose graph is shown in Figure 3.3a. Discuss the behavior of f in terms of the signs and values of f. ' (slope) 5 4 3 B C Slope 0 Slope Slope D = f() 5 4 3 A' A Slope 4 Slope E F Slope 0 3 4 5 6 7 ' = f'() B' C' F' 3 4 5 6 7 D' E' (a) (b) Figure 3.3 B plotting the slopes at points on the graph of = f(), we obtain a graph of =f (). The slope at point A of the graph of f in part (a) is the -coordinate of point A on the graph of f in part (b), and so on. (Eample 3) SLUTIN First, we draw a pair of coordinate aes, marking the horizontal ais in -units and the vertical ais in slope units (Figure 3.3b). Net, we estimate the slope of the graph of f at various points, plotting the corresponding slope values using the new aes. At A(0, f(0)), the graph of f has slope 4, so f (0) = 4. At B, the graph of f has slope, so f = at B, and so on. continued

0 Chapter 3 Derivatives We complete our estimate of the graph of f b connecting the plotted points with a smooth curve. Although we do not have a formula for either f or f, the graph of each reveals important information about the behavior of the other. In particular, notice that f is decreasing where f is negative and increasing where f is positive. Where f is zero, the graph of f has a horizontal tangent, changing from increasing to decreasing at point C and from decreasing to increasing at point F. Now Tr Eercise 3. EXPLRATIN Reading the Graphs Suppose that the function f in Figure 3.3a represents the depth (in inches) of water in a ditch alongside a dirt road as a function of time (in das). How would ou answer the following questions? = f (). What does the graph in Figure 3.3b represent? What units would ou use along the -ais?. Describe as carefull as ou can what happened to the water in the ditch over the course of the 7-da period. 3. Can ou describe the weather during the 7 das? When was it the wettest? When was it the driest? 4. How does the graph of the derivative help in finding when the weather was wettest or driest? 5. Interpret the significance of point C in terms of the water in the ditch. How does the significance of point C reflect that in terms of rate of change? 6. It is tempting to sa that it rains right up until the beginning of the second da, but that overlooks a fact about rainwater that is important in flood control. Eplain. Construct our own real-world scenario for the function in Eample 3, and pose a similar set of questions that could be answered b considering the two graphs in Figure 3.3. Figure 3.4 The graph of the derivative. (Eample 4) = f() Figure 3.5 The graph of f, constructed from the graph of f and two other conditions. (Eample 4) EXAMPLE 4 Graphing f from f œ Sketch the graph of a function f that has the following properties: i. f(0) = 0; ii. the graph of f, the derivative of f, is as shown in Figure 3.4; iii. f is continuous for all. SLUTIN To satisf propert (i), we begin with a point at the origin. To satisf propert (ii), we consider what the graph of the derivative tells us about slopes. To the left of =, the graph of f has a constant slope of -; therefore we draw a line with slope - to the left of =, making sure that it goes through the origin. To the right of =, the graph of f has a constant slope of, so it must be a line with slope. There are infinitel man such lines but onl one the one that meets the left side of the graph at (, -) will satisf the continuit requirement. The resulting graph is shown in Figure 3.5. Now Tr Eercise 7.

Section 3. Derivative of a Function 03 What s happening at? Notice that f in Figure 3.5 is defined at =, while f is not. It is the continuit of f that enables us to conclude that f () = -. Looking at the graph of f, can ou see wh f could not possibl be defined at =? We will eplore the reason for this in Eample 6. David H. Blackwell (99 00) B the age of, David Blackwell had earned a Ph.D. in Mathematics from the Universit of Illinois. He taught at Howard Universit, where his research included statistics, Markov chains, and sequential analsis. He then went on to teach and continue his research at the Universit of California at Berkele. Dr. Blackwell served as president of the American Statistical Association and was the first African American mathematician of the National Academ of Sciences. Graphing the Derivative from Data Discrete points plotted from sets of data do not ield a continuous curve, but we have seen that the shape and pattern of the graphed points (called a scatter plot) can be meaningful nonetheless. It is often possible to fit a curve to the points using regression techniques. If the fit is good, we could use the curve to get a graph of the derivative visuall, as in Eample 3. However, it is also possible to get a scatter plot of the derivative numericall, directl from the data, b computing the slopes between successive points, as in Eample 5. EXAMPLE 5 Estimating the Probabilit of Shared Birthdas Suppose 30 people are in a room. What is the probabilit that two of them share the same birthda? Ignore the ear of birth. SLUTIN It ma surprise ou to learn that the probabilit of a shared birthda among 30 people is at least 0.706, well above two-thirds! In fact, if we assume that no one da is more likel to be a birthda than an other da, the probabilities shown in Table 3. are not hard to determine (see Eercise 45). TABLE 3. Probabilities of Shared Birthdas People in Room () 0 0 Probabilit () 5 0.07 0 0.7 5 0.53 0 0.4 5 0.569 30 0.706 35 0.84 40 0.89 45 0.94 50 0.970 55 0.986 60 0.994 65 0.998 70 0.999 TABLE 3. Estimates of Slopes on the Probabilit Curve Midpoint of Interval () Change (Slope > ).5 0.0054 7.5 0.080.5 0.07 7.5 0.036.5 0.036 7.5 0.074 3.5 0.06 37.5 0.054 4.5 0.000 47.5 0.0058 5.5 0.003 57.5 0.006 6.5 0.0008 67.5 0.000 5 [ 5, 75] b [ 0.,.] Figure 3.6 Scatter plot of the probabilities () of shared birthdas among people, for = 0, 5, 0, Á, 70. (Eample 5) A scatter plot of the data in Table 3. is shown in Figure 3.6. Notice that the probabilities grow slowl at first, then faster, then much more slowl past = 45. At which are the growing the fastest? To answer the question, we need the graph of the derivative. Using the data in Table 3., we compute the slopes between successive points on the probabilit plot. For eample, from = 0 to = 5 the slope is 0.07-0 5-0 = 0.0054. We make a new table showing the slopes, beginning with slope 0.0054 on the interval [ 0, 5 ] (Table 3.). A logical -value to use to represent the interval is its midpoint,.5. continued

04 Chapter 3 Derivatives Slope f(a lim h) f(a) h 0 + h 0 40 60 [ 5, 75] b [ 0.0, 0.04] Figure 3.7 A scatter plot of the derivative data in Table 3.. (Eample 5) f() Slope f(b h) f(b) lim h 0 h a a h b h b h 0 h 0 Figure 3.8 Derivatives at endpoints are one-sided limits. A scatter plot of the derivative data in Table 3. is shown in Figure 3.7. From the derivative plot, we can see that the rate of change peaks near = 0. You can impress our friends with our pschic powers b predicting a shared birthda in a room of just 5 people (since ou will be right about 57% of the time), but the derivative warns ou to be cautious: A few less people can make quite a difference. n the other hand, going from 40 people to 00 people will not improve our chances much at all. Now Tr Eercise 9. Generating shared birthda probabilities: If ou know a little about probabilit, ou might tr generating the probabilities in Table 3.. Etending the Idea Eercise 45 at the end of this section shows how to generate them on a calculator. ne-sided Derivatives A function = f() is differentiable on a closed interval [ a, b] if it has a derivative at ever interior point of the interval, and if the limits f(a + h) - f(a) lim+ f(b + h) - f(b) lim- [the right-hand derivative at a] [the left-hand derivative at b] eist at the endpoints. In the right-hand derivative, h is positive and a + h approaches a from the right. In the left-hand derivative, h is negative and b + h approaches b from the left (Figure 3.8). Right-hand and left-hand derivatives ma be defined at an point of a function s domain. The usual relationship between one-sided and two-sided limits holds for derivatives. Theorem 3, Section., allows us to conclude that a function has a (two-sided) derivative at a point if and onl if the function s right-hand and left-hand derivatives are defined and equal at that point. EXAMPLE 6 ne-sided Derivatives Can Differ at a Point Show that the following function has left-hand and right-hand derivatives at = 0, but no derivative there (Figure 3.9). Figure 3.9 A function with different onesided derivatives at = 0. (Eample 6) = e, 0, 7 0 SLUTIN We verif the eistence of the left-hand derivative: lim (0 + h) - 0 h:0 - h We verif the eistence of the right-hand derivative: (0 + h) - 0 lim+ h h:0 - h = 0. h:0 + h h =. Since the left-hand derivative equals zero and the right-hand derivative equals, the derivatives are not equal at = 0. The function does not have a derivative at 0. Now Tr Eercise 3.

Section 3. Derivative of a Function 05 Quick Review 3. (For help, go to Sections. and.4.) Eercise numbers with a gra background indicate problems that the authors have designed to be solved without a calculator. In Eercises 4, evaluate the indicated limit algebraicall. ( + h) - 4. lim. lim + 3 : + 3. lim ƒ ƒ 4. :0 - lim :4-8 - 5. Find the slope of the line tangent to the parabola = + at its verte. 6. B considering the graph of f() = 3-3 +, find the intervals on which f is increasing. In Eercises 7 0, let f() = e +, ( - ), 7. 7. Find lim : +f() and lim : - f(). 8. Find lim h:0 + f( + h). 9. Does lim : f() eist? Eplain. 0. Is f continuous? Eplain. Section 3. Eercises In Eercises 4, use the definition f (a) h:0 f(a + h) - f(a) h to find the derivative of the given function at the given value of a.. f() = >, a =. f() = + 4, a = 3. f() = 3 -, a = - 4. f() = 3 +, a = 0 In Eercises 5 8, use the definition f (a) :a f() - f(a) - a to find the derivative of the given function at the given value of a. 5. f() = >, a = 6. f() = + 4, a = 7. f() = +, a = 3 8. f() = + 3, a = - 9. Find f () if f() = 3 -. 0. Find d> d if = 7. d. Find. d ( ) d. Find if f() = 3. d f() In Eercises 3 6, match the graph of the function with the graph of the derivative shown here: ' ' 3. 4. 5. f () f () f 3 () 6. f 4 () (a) (b) ' ' 7. If f() = 3 and f () = 5, find an equation of (a) the tangent line, and (b) the normal line to the graph of = f() at the point where =. [Hint: Recall that the normal line is perpendicular to the tangent line.] (c) (d)

06 Chapter 3 Derivatives 8. Find the derivative of the function = - 3 + 5 and use it to find an equation of the line tangent to the curve at = 3. 9. Find the lines that are (a) tangent and (b) normal to the curve = 3 at the point (, ). 0. Find the lines that are (a) tangent and (b) normal to the curve = at = 4.. Dalight in Fairbanks The viewing window below shows the number of hours of dalight in Fairbanks, Alaska, on each da for a tpical 365-da period from Januar to December 3. Answer the following questions b estimating slopes on the graph in hours per da. For the purposes of estimation, assume that each month has 30 das. 000 000 (0, 700) Number of rabbits Initial no. rabbits 000 Initial no. foes 40 Number of foes 0 0 50 00 50 00 Time (das) 00 (a) 50 0 (0, 40) 50 [0, 365] b [0, 4] (a) n about what date is the amount of dalight increasing at the fastest rate? What is that rate? (b) Do there appear to be das on which the rate of change in the amount of dalight is zero? If so, which ones? (c) n what dates is the rate of change in the number of dalight hours positive? negative? œ. Graphing f from f Given the graph of the function f below, sketch a graph of the derivative of f. 00 0 50 00 50 00 Time (das) Derivative of the rabbit population (b) Figure 3.0 Rabbits and foes in an arctic predator-pre food chain. Source: Differentiation b W. U. Walton et al., Project CALC, Education Development Center, Inc., Newton, MA, 975, p. 86. 4. Shown below is the graph of f() = ln -. From what ou know about the graphs of functions (i) through (v), pick out the one that is the derivative of f for 7 0. [ 5, 5] b [ 3, 3] 3. The graphs in Figure 3.0a show the numbers of rabbits and foes in a small arctic population. The are plotted as functions of time for 00 das. The number of rabbits increases at first, as the rabbits reproduce. But the foes pre on the rabbits and, as the number of foes increases, the rabbit population levels off and then drops. Figure 3.0b shows the graph of the derivative of the rabbit population. We made it b plotting slopes, as in Eample 3. (a) What is the value of the derivative of the rabbit population in Figure 3.0 when the number of rabbits is largest? smallest? (b) What is the size of the rabbit population in Figure 3.0 when its derivative is largest? smallest? [, 6] b [ 3, 3] i. = sin ii. = ln iii. = iv. = v. = 3-5. From what ou know about the graphs of functions (i) through (v), pick out the one that is its own derivative. i. = sin ii. = iii. = iv. = e v. =

Section 3. Derivative of a Function 07 6. The graph of the function = f() shown here is made of line elevations () at various distances () downriver from the start segments joined end to end. of the kaaking route (Table 3.4). (0, ) (6, ) f() ( 4, 0) 0 6 TABLE 3.3 Skiing Distances Time t (seconds) (, ) (4, ) (a) Graph the function s derivative. (b) At what values of between = -4 and = 6 is the function not differentiable? 7. Graphing f from fœ Sketch the graph of a continuous function f with f(0) = - and, 6 - f () = e -, 7 -. 8. Graphing f from fœ Sketch the graph of a continuous function f with f(0) = and f () = e, 6 -, 7. In Eercises 9 and 30, use the data to answer the questions. 9. A Downhill Skier Table 3.3 gives the approimate distance traveled b a downhill skier after t seconds for 0 t 0. Use the method of Eample 5 to sketch a graph of the derivative; then answer the following questions: (a) What does the derivative represent? (b) In what units would the derivative be measured? (c) Can ou guess an equation of the derivative b considering its graph? Distance Traveled (feet) 0 0 3.3 3.3 3 9.9 4 53. 5 83. 6 9.8 7 63.0 8.9 9 69.5 0 33.7 30. A Whitewater River Bear Creek, a Georgia river known to kaaking enthusiasts, drops more than 770 feet over one stretch of 3.4 miles. B reading a contour map, one can estimate the TABLE 3.4 Elevations Along Bear Creek Distance Downriver (miles) River Elevation (feet) 0.00 577 0.56 5 0.9 448.9 384.30 39.39 55.57 9.74 6.98 06.8 998.4 933.64 869 3.4 805 (a) Sketch a graph of elevation () as a function of distance downriver (). (b) Use the technique of Eample 5 to get an approimate graph of the derivative, d>d. (c) The average change in elevation over a given distance is called a gradient. In this problem, what units of measure would be appropriate for a gradient? (d) In this problem, what units of measure would be appropriate for the derivative? (e) How would ou identif the most dangerous section of the river (ignoring rocks) b analzing the graph in (a)? Eplain. (f) How would ou identif the most dangerous section of the river b analzing the graph in (b)? Eplain. 3. Using one-sided derivatives, show that the function f() = e +, 3 -, 7 does not have a derivative at =. 3. Using one-sided derivatives, show that the function f() = e 3, 3, 7 does not have a derivative at =. 33. Writing to Learn Graph = sin and = cos in the same viewing window. Which function could be the derivative of the other? Defend our answer in terms of the behavior of the graphs. 34. In Eample of this section we showed that the derivative of = is a function with domain (0, q). However, the function = itself has domain [0, q), so it could have a right-hand derivative at = 0. Prove that it does not. 35. Writing to Learn Use the concept of the derivative to define what it might mean for two parabolas to be parallel. Construct equations for two such parallel parabolas and graph them. Are the parabolas everwhere equidistant, and if so, in what sense?

08 Chapter 3 Derivatives Standardized Test Questions 36. True or False If f() = +, then f () eists for ever real number. Justif our answer. 37. True or False If the left-hand derivative and the right-hand derivative of f eist at = a, then f (a) eists. Justif our answer. 38. Multiple Choice Let f() = 4-3. Which of the following is equal to f (-)? (A) -7 (B) 7 (C) -3 (D) 3 (E) does not eist 39. Multiple Choice Let f() = - 3. Which of the following is equal to f ()? (A) -6 (B) -5 (C) 5 (D) 6 (E) does not eist In Eercises 40 and 4, let 40. Multiple Choice Which of the following is equal to the lefthand derivative of f at = 0? (A) - (B) 0 (C) (D) q (E) - q 4. Multiple Choice Which of the following is equal to the righthand derivative of f at = 0? (A) - (B) 0 (C) (D) q (E) - q Eplorations 4. Let f() = e,, 7. (a) Find f () for 6. (b) Find f () for 7. (c) Find lim : - f (). (d) Find lim : + f (). (e) Does lim : f () eist? Eplain. (f) Use the definition to find the left-hand derivative of f at = if it eists. (g) Use the definition to find the right-hand derivative of f at = if it eists. (h) Does f () eist? Eplain. 43. Group Activit Using graphing calculators, have each person in our group do the following: (a) pick two numbers a and b between and 0; (b) graph the function = ( - a)( + b) ; (c) graph the derivative of our function (it will be a line with slope ); (d) find the -intercept of our derivative graph. (e) Compare our answers and determine a simple wa to predict the -intercept, given the values of a and b. Test our result. Etending the Ideas f() = e -, 6 0 -, Ú 0. 44. Find the unique value of k that makes the function f() = e 3, 3 + k, 7 differentiable at =. 45. Generating the Birthda Probabilities Eample 5 of this section concerns the probabilit that, in a group of n people, at least two people will share a common birthda. You can generate these probabilities on our calculator for values of n from to 365. Step : Set the values of N and P to zero: 0 N:0 P Step : Tpe in this single, multi-step command: N+ N: ( P) (366 N)/365 P: {N,P} Now each time ou press the ENTER ke, the command will print a new value of N (the number of people in the room) alongside P (the probabilit that at least two of them share a common birthda): 0 { 0} {.0073976} {3.00804659} {4.0635595} {5.07355737} {6.040464836} {7.05635703} If ou have some eperience with probabilit, tr to answer the following questions without looking at the table: (a) If there are three people in the room, what is the probabilit that the all have different birthdas? (Assume that there are 365 possible birthdas, all of them equall likel.) (b) If there are three people in the room, what is the probabilit that at least two of them share a common birthda? (c) Eplain how ou can use the answer in part (b) to find the probabilit of a shared birthda when there are four people in the room. (This is how the calculator statement in Step generates the probabilities.) (d) Is it reasonable to assume that all calendar dates are equall likel birthdas? Eplain our answer.