C webassign.net/web/Student/Assignment-Responses/last?dep=29546052 Math 110 Course Resources - Curve Sketching Course Packet on relative extrema - Curve Sketching Course Packet on critical points The following graph corresponds to f(x). If the graph does not appear, please reload the page. 3000 2000 1400 -6 -2 2 -1000 -2000 - -3000 Based on the above graph of f(x), determine the number critical points and relative extrema of f(x). You may assume that f(x) is continuous and defined for all x on the interval shown. Enter the number of critical pointsumbers of f(x) :| Enter the number of relative maxima of f(x) :| Enter the number of relative minima of f(x) : 120 102 OCT astv 4 wiv 12Math 110 Course Resources - Curve Sketching Course Packet on critical points - Curve Sketching Course Packet on classifying critical points using the first derivative test The following graph corresponds to f'(x), the first derivative of f(x). If the graph does not appear, please reload the page. 200 100 -5 -100 Based on the above graph of the derivative of f(x), determine the number critical points and relative extrema of f(x). You may assume that f'(x) is continuous, f'(x) is defined for all x, and f'(x) = 0 only when x = -6, x = 0, and x = 8. Enter the number of critical pointsumbers of f(x) :[ Enter the number of relative maxima of f(x) : Enter the number of relative minima of f(x) : 120 astv 4 102 OCT 12 F10 F11 F9t on critical points - Curve Sketching Course Packet on classifying critical points using the first derivative test Determine the x-coordinates of the relative extrema of the function g(x) = 6x - 160x3 + 23. respectively. Enter each answer as a comma-separated list of values. The order of the values does not matter. Enter DNE if g(x) does not have any relative maximum or minimum values, x-coordinates of the relative maxima x-coordinates of the relative minima = 20. [-/1 Points] DETAILS MY NOTES Math 110 Course Resources - Curve Sketching Course Packet on critical points - Curve Sketching Course Packet on classifying critical points using the first derivative test Determine the x-coordinates of the relative extrema of the function g(x) = x4 - 8x3 - 32x2 - 3. Enter each answer as a comma-separated list of values. The order of the values does not matter. Enter DNE if g(x) does not have any relative maximum or minimum values, respectively. x-coordinates of the relative maxima = x-coordinates of the relative minima = win 102 OCT atv 4 12 44 F10 F7 F8 F9 20 F3 F5 F6 F4 esc F1 F2 of &Determine the x-coordinates of the relative extrema of the function g(x) = 2x4 - 24x3 + 5. Enter each answer as a comma-separated list of values. The order of the values does not matter. Enter DNE if g(x) does not have any relative maximum or minimum values, respectively. x-coordinates of the relative maxima = x-coordinates of the relative minima 22. [-/1 Points] DETAILS MY NOTES Math 110 Course Resources - Curve Sketching Course Packet on critical points - Curve Sketching Course Packet on classifying critical points using the first derivative test * 2 Determine the x-coordinates of the relative extrema of the function g(x) = - 6x - 7 Enter each answer as a comma-separated list of values. The order of the values does not matter. Enter DNE if g(x) does not have any relative maximum or minimum values, respectively. x-coordinates of the relative maxima = x-coordinates of the relative minima = 120 102 OCT tv 4 L' 12 F10 F11 F6 F7 F8 F9 F3 F4 F5 esc F1 F2 % &23. [-/1 Points] DETAILS Determine whether each statement is true or false. You have one submission for each statement. (a) If f'(c) = 0, then f has a relative maximum or minimum at x = C. OTrue OFalse (b) If f'(x) changes from positive to negative at x = a, then f has a relative maximum at x = a. OTrue OFalse (c) If f'(x) 2 0 on (a,b), then f is increasing on the interval (a,b). OTrue OFalse (d) If f'(c) does not exist, then f(x) has a critical point at X = C. OTrue OFalse Submit Assignment Save Assignment Progre 102 OCT 12 esc F1 F2 20 F3 000 F4 F5 F6 F7 DII @ LA % A & * 2 3 4 5 6 Q W F