Use x) = x2/3(x – 5) and its derivative r(x) - 5(x - 2) to find each of the following. 3x/3 Find the critical values. (Enter your answers as a comma-separated list.) x- 0,2 Find the critical points. (x, y) = (0,0 v ) (smaller x-value) (x, y) - (larger x-value) Find the intervals on which the function is increasing. (Enter your answer using interval notation.) Find the intervals on which the function is decreasing. (Enter your answer using interval notation.) Find the relative maxima, relative minima, and horizontal points of inflection. (If an answer does not exist, enter DNE.) (x, v) = ( 0,0 v) relative maxima relative minima horizontal points of inflection (x, y) = (| Sketch the graph of the function. y y 10- 10 -10 10 -10 -5 10 -10 y y 10 10- 5- -10 -5 10 -10 5 10 The xy-coordinate plane is given. The curve enters the window at the approximate point (-1.7, 9.5), goes down and right becoming

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Use (x) = x2/3(x – 5) and its derivative f(x) = 5(x – 2) to find each of the following. 3x1/3 Find the critical values. (Enter your answers as a comma-separated list.) 0,2 Find the critical points. - ( 0,0 (x, y) = (smaller x-value) (x, y) = (larger x-value) Find the intervals on which the function is increasing. (Enter your answer using interval notation.) Find the intervals on which the function is decreasing. (Enter your answer using interval notation.) Find the relative maxima, relative minima, and horizontal points of inflection. (If an answer does not exist, enter DNE.) (x, y) = (| 0,0 relative maxima relative minima (х, у horizontal points of inflection Sketch the graph of the function. y y 10 10 5 X -10 5 10 -10 -5 10 -5 -10 y 10 10 5 10 -5 10 -10 10 The xy-coordinate plane is given. The curve enters the window at the approximate point (-1.7, 9.5), goes down and right becoming less steep, passes through the approximate point (-1, 6), goes down and right becoming more steep, sharply changes direction at the origin, goes up and right becoming less steep, changes direction at the approximate point (2, 4.8), goes down and right becoming more steep, crosses the x-axis at approximately x = 5, and exits the window at the approximate point (7.5, -9.6). -10- Need Help? Read It