Use the derivative f' to determine the local minima and maxima of f and the intervals of increase and decrease. Sketch a possible graph of f (f is not unique). f'(x) = 8 sin 2x on [- 2x,21] The local minimum/minima is/are at x = (Use a comma to separate answers as needed. Type an exact answer, using n as needed.) The local maximum/maxima is/are at x = (Use a comma to separate answers as needed. Type an exact answer, using n as needed.) Find the intervals of increase and decrease of f. Choose the correct answer below. 3n -2n, - fis decreasing on -T, - and T, f is increasing on and 2n 2 3n 2n, - 3n and 1, 2 f is increasing on - T, - - f is decreasing on 2 and 2n 2 Sketch a possible graph of f. Choose the correct graph below.

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Use the derivative f' to determine the local minima and maxima of f and the intervals of increase and decrease. Sketch a possible graph of f (f is not unique). f'(x) = 8 sin 2x on [- 2n,27] The local minimum/minima is/are at x= (Use a comma to separate answers as needed. Type an exact answer, using n as needed.) The local maximum/maxima is/are at x = (Use a comma to separate answers as needed. Type an exact answer, using n as needed.) Find the intervals of increase and decrease of f. Choose the correct answer below. 3n f is decreasing on ·2π,- - T, - and T, 3n f is increasing on and 2n 2 2 f is increasing on 3n - 2n, - 3n and T,- – T, - 2 3n 3n f is decreasing on and ,2n 2 2 Sketch a possible graph of f. Choose the correct graph below.