5 12 Consider h(t) -t² + 3t == 2 5 Determine the intervals on which h is decreasing. Oh is decreasing on: Oh is decreasing nowhere. Determine the intervals on which h is increasing. Oh is increasing on: Oh is increasing nowhere. Determine the value and location of any local minimum of f. Enter the solution in (t, h(t)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Oh has a local minimum at: Oh has no local minimum. Determine the value and location of any local maximum of f. Enter the solution in (t, h(t)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Oh has a local maximum at: Oh has no local maximum.

14.)

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5 4.² + 3t 12 5 Consider h(t) 2 Determine the intervals on which h is decreasing. Oh is decreasing on: Oh is decreasing nowhere. Determine the intervals on which h is increasing. Oh is increasing on: Oh is increasing nowhere. Determine the value and location of any local minimum of f. Enter the solution in (t, h(t)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Oh has a local minimum at: Oh has no local minimum. Determine the value and location of any local maximum of f. Enter the solution in (t, h(t)) form. If multiple solutions exist, use a comma-separated list to enter the solutions. Oh has a local maximum at: Oh has no local maximum.