Blocks A (mass 7.00 kg ) and B (mass 12.00 kg , to the right of A) move on a fri
ID: 1371421 • Letter: B
Question
Blocks A (mass 7.00 kg ) and B (mass 12.00 kg , to the right of A) move on a frictionless, horizontal surface. Initially, block B is moving to the left at 0.500 m/s and block A is moving to the right at 2.00 m/s. The blocks are equipped with ideal spring bumpers. The collision is headon, so all motion before and after it is along a straight line. Let +x be the direction of the initial motion of A.
Part A
Find the maximum energy stored in the spring bumpers.
Express your answer with the appropriate units.
Uspringmax =
Part B
Find the velocity of block A when the energy stored in the spring bumpers is maximum.
Express your answer with the appropriate units.
vA =
Part C
Find the velocity of block B when the energy stored in the spring bumpers is maximum.
Express your answer with the appropriate units.
vB=
Part D
Find the velocity of block A after the blocks have moved apart.
Express your answer with the appropriate units.
vA=
Part E
Find the velocity of block B after the blocks have moved apart.
Express your answer with the appropriate units.
vB=
Explanation / Answer
Part A The maximum spring compression occurs when the velocities are the same (otherwise the spring is compressing or decompressing). To find the common velocity, conserve momentum:
7kg * 2m/s - 12kg*0.5m/s = 19kg * v
v = 0.42 m/s
initial KE = ½ * 7 * (2)² = 14 J
final KE = ½ * 19* (0.42)² = 1.676 J
so max U = 12.324J
Part D
Begin again with conservation of momentum:
7kg * 2m/s-12kg*0.5m/s = 7kg * u + 12kg * v
for u, v the final velocity of A and B, respectively.
8 =7u + 12v
For an elastic, head-on collision, we know (from CoE) that
the relative velocity of approach = relative velocity of separation, or
2+0.5 = v - u, so
v = u + 2.5m/s plug into momentum equation
u=-1.157m/s ,
Part E v=1.343 m/s