Answer:
The common velocity of truck v = 2.759 m/s
Step-by-step explanation:
Given that,
Mass of first railway truck, M = 800 Kg
Mass of second railway truck, m = 650 Kg
Velocity of first railway truck, U = 5 m/s
Velocity of second truck, u = 0 m/s
According to the conservation of linear momentum,
The total momentum after impact = total momentum before impact
The mass of the truck remains the same, but the velocity after impact is coupled to be v.
Therefore,
Mv + mv = MU + mu
v (M+m) = MU (u = 0)
v = MU/(M+m)
Substituting the values in the above equation,
v = 800 Kg x 5 m/s / (800 Kg + 650 Kg)
v = 2.759 m/s
Hence, the common velocity of the coupled tucks moving off after collision is v = 2.759 m/s