Suppose that f(ac) = (12 - 5x) ex. (A) List all the critical values of f(x). Note: If there are no critical values, enter 'NONE'. 0.6 (B) Use interval notation to indicate where f(x) is increasing. Note: Use 'INF' for co, '-INF' for -co, and use 'U' for the union symbol. Increasing: (0.6, inf) (C) Use interval notation to indicate where f(x) is decreasing. Decreasing: (-inf , 0.6) (D) List the a values of all local maxima of f(x). If there are no local maxima, enter 'NONE'. x values of local maximums = none (E) List the a values of all local minima of f(x). If there are no local minima, enter 'NONE'. x values of local minimums = 0.6 (F) Use interval notation to indicate where f(x) is concave up. Concave up: (0, infinity) (G) Use interval notation to indicate where f(x) is concave down. Concave down: (H) List the a values of all the inflection points of f. If there are no inflection points, enter 'NONE'. x values of inflection points =Suppose that it is given to you that f'(a) = (2 + 3)(10 - 2) (13 - 2) Then the first local extremum (from the left) for f(x) occurs at x = The function f(x) has a local ? at this point. The second local extremum (from the left) for f(x) occurs at x = The function f(x) has a local ? at this point. The third local extremum (from the left) for f(x) occurs at x = The function f(x) has a local ? at this point. The first inflection point (from the left) for f(x) occurs at x = The second inflection point (from the left) for f(x) occurs at x =