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26 votes
26 votes
When linking train cars, the 72,500 kg car on the left is moving at a rate of 0.59 m/s while the 90,269 car on the right is moving at a rate of -1.2 m/s. Once linked, how fast will the two train cars be moving?

User Uours
by
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1 Answer

18 votes
18 votes

Using conservation of momentum:


m1u1+m2u2=m1v1+m2v2

Where:

m1 = Mass of the car on the left = 72500kg

m2 = Mass of the car on the right = 90269kg

u1 = Initial speed of the car on the left = 0.59 m/s

u2 = Initial speed of the car on the right = -1.2 m/s

v1 = Final speed of the car on the left

v2 = Final speed of the car on the right

Since the train cars will be linked, we can conclude:

v1 = v2

so:


\begin{gathered} m1u1+m2u2=v1(m1+m2) \\ so\colon \\ v1=(m1u1+m2u2)/(m1+m2) \\ v1=(72500\cdot0.59+90269(-1.2))/(72500+90269) \\ v1=-(65547.8)/(162769) \\ v1=-0.4(m)/(s) \end{gathered}

Answer:

0.4 m/s

User Mlc
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3.0k points