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A railroad car of mass 3.45 ✕ 104 kg moving at 2.60 m/s collides and couples with two coupled railroad cars, each of the same mass as the single car and moving in the same direction at 1.20 m/s. (a) What is the speed of the three coupled cars after the collision? 1.27 Incorrect: Your answer is incorrect. m/s (b) How much kinetic energy is lost in the collision?

1 Answer

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Answer:

a) 1.67 m/s

b) 23kJ

Step-by-step explanation:

We need to apply the linear momentum conservation formula, that states:


m1*v_(o1)+m2*v_(o2)=m1*v_(f1)+m2*v_(f2)

in this case:


3.45*10^4kg*2.60m/s+2*3.45*10^4kg*1.20m/s=3*m1*v_(f)\\v_f=1.67m/s

the initital kinetic energy is:


K_i=(1)/(2)*3.45*10^4kg*(2.60m/s)^2+2((1)/(2)*3.45*10^4kg*(1.20m/s)^2\\K_i=167kJ

and the final:


K_f=3*(1)/(2)*3.45*10^4kg*(1.67m/s)^2\\K_f=144kJ

The energy lost is given by:


E_l=|K_f-K_i|\\E_l=23kJ

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