How far behind is the automobile when it reaches a speed of 38.9 m/s?

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The discussion revolves around calculating how far behind an automobile is when it accelerates back to a speed of 38.9 m/s after stopping due to a red light. The automobile initially decelerates at -4 m/s², remains at rest for 71.7 seconds, and then accelerates at 3.52 m/s². The train continues at a constant speed of 38.9 m/s during this time. The total distance covered by the train is calculated to be 2789.13 meters. The next steps involve determining the distances traveled by the automobile during its three phases of motion to find the gap between the two vehicles.
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Homework Statement



An automobile and train move together along
parallel paths at 38.9 m/s.
The automobile then undergoes a uniform
acceleration of −4 m/s2 because of a red light
and comes to rest. It remains at rest for 71.7 s,
then accelerates back to a speed of 38.9 m/s
at a rate of 3.52 m/s2.
How far behind the train is the automobile
when it reaches the speed of 38.9 m/s, as-
suming that the train speed has remained at
38.9 m/s? Answer in units of m.

Ok i know that the total distance that the train covered in those 71.7s is 2789.13m now what else do i need to do to find out how far behind is the automobile? How can i tell the total distance traveled by the car? is it d = vi(t)+1/2a(t)^2?
 
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You need to consider the car's motion as 3 separate calculations:

1. Deceleration at -4 m/s^2
2. At rest
3. Acceleration at 3.52 m/s^2

How much time does each of those take?
 
Ok i got the times
1. 9.725 sec
2. 71.7s
3. 11.05s
 
Okay, all that's left is to figure out how far the car and the train move during those times.
 

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