Show work please.
This is Problem 25 from Page 170 of the textbook. At 6:00 pm a policeman sees a car go by at 55mph. He radios ahead to another policeman, 5 miles down the road, who sees the same car go by at 6:04 pm (doing 55 mph again) What is the average speed of the car between 6:00 and 6:04 pm? He is convicted of speeding by a judge who points out that he must have been doing 75 mph at least once Is the judge correct? Explain your answer. A car moving from a stop sign accelerates at a constant rate of 45 miles/hour'. How far and how fast is the car travelling after 10 minutes? Find the family of anti-derivatives for the following: Consider the position function , where of a particle moving along a horizonline. Assume distance is measured in feet and time in seconds. Find The velocity function V(t) and the velocity at t=2. When does the particle stop moving? The acceleration function a(t) and the acceleration at time t=2 when is the velocity increasing? When is the velocity decreasing? How is the distance that particle travels in # seconds? Find the second derivation of each of the following Use linear Approximation to find tan(0.8)