S 48t + t² – for 0

a)  According to the model f, what is the average rate of change of the amount of dirt removed over the interval 6 ≤ t ≤ 12 hours?

b)  Use the data in the table to approximate f'(9), the instantaneous rate of change in the amount of dirt removed, in cubic meters per hour, at time t = 9 hours.  Show the computations that lead to your answer.

c)  Is f continuous for 0 ≤ t ≤ 12?  Justify your answer.

d)  Find f'(2), the instantaneous rate of change in the amount of dirt removed, in cubic meters per hour, at time t = 2 hours.

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S 48t + t? – for 0<t<6 f (t) = for 6 <t< 12 t (hours) 8 10 12 g (t) (cubic meters) 306 376 428 474 At an excavation site, the amount of dirt that has been removed, in cubic meters, is modeled by the functionf defined above, where g is a differentiable function and t is measured in hours. Values of g (t) at selected values of t are given in the table above. a) According to the model f, what is the average rate of change of the amount of dirt removed over the interval 6 sts 12 hours? b) Use the data in the table to approximate f (9), the instantaneous rate of change in the amount of dirt removed, in cubic meters per hour, at time t = 9 hours. Show the computations that lead to your answer. c) Is f continuous for 0st s 12? Justify your answer. d) Find f'(2), the instantaneous rate of change in the amount of dirt removed, in cubic meters per hour, at time t = 2 hours.