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5 September, 16:56

The front 1.20 m of a 1,350-kg car is designed as a "crumple zone" that collapses to absorb the shock of a collision. (a) If a car traveling 30.0 m/s stops uniformly in 1.20 m, how long does the collision last

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Answers (2)
  1. 5 September, 17:01
    0
    d = t (V2+V1) / 2

    t = 2d / (V2+V1)

    t = 2 (1.2) / (0+25)

    t = 0.096S

    Explanation:

    The stopping distance is known to be 1.20m. the final velocity is 0 meters per second and the starting or initial velocity is 25 meters per second.
  2. 5 September, 17:04
    0
    Answer: 0.08s

    Explanation:

    From the question:

    Initial velocity (u) = 30m/s

    Final velocity (v) = 0

    Distance (s) = 1.2m

    Calculating the acceleration of the car using the third equation of motion;

    v^2 = u^2 + 2as

    a = acceleration, s = distance

    0 = 30^2 + (2 * a * 1.2)

    0 = 900 + (2.4 * a)

    a = ( - 900) : 2.4

    a = - 375 m/s^2

    Therefore, time taken

    v = u + at

    Where, t = time taken

    0 = 30 + (-375 * t)

    0 = 30 - 375 * t

    375 * t = 30

    t = 30 : 375

    t = 0.08 seconds
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