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Two trains A and B of length 400 m each are moving on two parallel tracks with a uniform speed of 72 kmh-1 in the same direction with A ahead of B. The driver of B decides to overtake A and accelerate by 1 ms-2. If after 50 s, the guard of B just passes the driver of A, what was the original distance between them? |
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Answer» Train A Initial Velocity = UA = 72 kmh-1 = 20 ms-1 Time Taken = t = 50s Acceleration = aA = 0 ms-2 Now, from the equations of motion, we know that, \(s_A =u_At + \frac{1}{2}a_At^2\) \(s_A =20\times50\) \(s_A =1000\,m\) Driver is at starting of Train A Train B Initial Velocity = UA = 72 kmh-1 = 20 ms-1 Time Taken = t = 50 s Acceleration = aB = 1 ms-2 Now, from the equations of motion, we know that, \(s_B = u_B +\frac{1}{2}a_Bt^2\) \(s_B =20\times50 +\frac{1}{2}\times1\times50^2\) \(s_B = 2250\,m\) Guard is at the end of Train B Now, length of both trains = 400 m + 400 m = 800 m Now, Original distance between Train A and B is S, which can be obtained as given below: S = 2250 m – 1000 m – 800 m = 450 m |
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