MATH 112 Lecture Notes - Lecture 9: Farad

If U and V are positive constants, find all critical points of the function. (Enter your answers as a comma-separated list.) F(t) = Ue t + Ve -t t = Find all critical points of f(x) = 20 x 2 e - 0.3x and classify them as local minima of ,maxima. x = (smaller value) This critical point is a . x = (larger value) This critical point is a . Consider f(x) = x 8 (7 - x) 9. Find f '(x) and simplify your answer. f '(x) = Find all critical points of f(x) and then use the first derivation test to determine local maxima and minima. f(x) has a at x = (smallest value) Local Maximum OR Minimum OR Neither f(x) has a at x = Local Maximum OR Minimum OR Neither f(x) has a at x = (largest value) Local Maximum OR Minimum OR Neither Find the inflection points of f(t) = t 4 + t 3 - 18t 2 +8. Give exact answer. t = (smallest value) t = (largest value) Sketch a possible of y = f(x), using the given information about derivation y' = f'(x) and y" = f"(x). Assume that the function is defined and continuous for all real x. Let f be a function f(x) > 0 for all x. Let g = 1/f. If f is increasing in an interval around x 0, what about g? g is increasing in an interval x 0. g is zero in an interval around x 0. g is decreasing in an interval around x 0. We cannot tell whether g is increasing or decreasing in an interval around x 0. g is constant in an interval around x 0. If f has a local maximum at x 1, what about g? g has a local maximum at x 1. g has both a local minimum and a local maximum at x 1. We cannot tell whether g has a local minimum or a local maximum at x 1. g has an inflection point at x 1. g has a local minimum at x 1. If f is a concave down at x 2, what about g? g is increasing at x 2. g is flat at x 2. We cannot tell whether g is concave up of concave down at x 2. g is concave down at x 2. g is concave up at x 2. You are given the graph of the second derivation function f" below. Which of the given have x-values that are inflection points of the function f? (Select all the apply.) A B C D E F G H I none of the above

-function-notation/2/ the bookmarks bar. Import bookmarks now... sin(z2) Answer (sin(0.5m)) Anawer (2e)Ve siantcos(tan(0.3x)))

MATH-2 X tation/3/ s bar, Import bockmarks now. SAGE COMLANDS Lab 1: Function Notation Nith SageMath we can easily plot tunctions over specited from-5 to 5 enter the following command intervals of the domain. For example, to graph the function /(r)- + 2r + 7 plot(x"2+2"x+7-5.5 Try this in the SageMath computation cell below we can also graph multiple tunctions at once For example, suppose we want to graph both y-nr) and the transtormaban,-n) .。 on the same axes We do this by frst defining the function r()- +2r +7 and then on the next line we tell SageMath to plot both ) aod fia)+10 on the interval -5.5 f(x)-x-2 , 2.1.7 Try entering these 2 tanes ot code in the Sage Math computation cell below We can specily the color ot each plot as tollows

tion-notation/3 ckmarks bar. Import bookmakes now EVALUATIE We can specity the colot of each plot as follows x)x*2 2 x+7 plot(Tx)Mx+10)-5.S.color Cred black) Try this in the SageMath computation cell above 5 Use the graph of y- fiz) and y-e)+10 above to describe the effect of adding 10 to the function's output 6e(r)-2เว00(ossy is the value of a Chevy Equinox in dollars, t year. after it computation cell below to graph y- ef) and y cit +5) on the interval lo,10, Rememaber, on the first line detine the function e and on the second line use the plot command to graph y n o) and y ci+5) simultaneously When you are finished go to file print, click to yout handout k on more settings and set the scale to 75 and print only page and set Then attach this printout type yout name here s the meaning, in peactical teems od clr +5p Be sure to state the e Use the graphs you printed in ppert (o) to explain the etfect on the grephs hat meanngled units) o·this S of adding S to the angument of the function Pages 123 DOLL DF G

/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/1/ 1/1/1/1/1/1ハハハハハハハハハ / 2· In this blem, we explore two functions that are not presented in a way that you may not be used to ppose f(ax) is defined on the interval (0, 1] by the following rule: we f(x) is the first digit in the decimal expansion for or instance, f(0.719)-7 and f(e-l ) = 3. But note that some numbers have two deci al expansions r instance, 1-0.5-0.499 , , and 2ō 0.35-0.34999 . . .. In such cases, one decinnal expansion s with an infinite trail of 9's and the other terminates. We shall agree to the con will always use the terminating decimal expansion. Hence f(1-5 and f(h) = 3. i. Sketch the graph of y = f(x) with appropriate scales for x and u. ii. Explain why y f(x) is integrable on [0,1]. iii. Calculate the integral f(x) dz. Can you use fundamental theorem of calculus? (b) Suppose g(x) is defined on the interval (0, 1] by the following similar rule. g(x) is the second digit in the decimal expansion forT Again we use the convention that if z has two such expansions, we use the terminating expansion.) For example g(0.719) = 1, g(e-1-6, g() = 0, and gun)-5. i. Explain why y = g(x) is integrable on [0,1]. i. Calculate the integral 10 f() dz. (A graph may help, but is not required.) Can you use the fundamental theorem of calculus? (c) Bonus! It actually turns out that it does not matter which decimal expansion we choose in the definition of either f(x) or g(x). For either convention, we get the same value of the integral. In fact, if a is a number with two decimal expansions for which the first digits differ, we can just leave f(a) undefined. (Similarly, if b is a number with two decimal expansions for which the second digits differ, we can just leave g(a) undefined.) Explain why this is true.