The forum discussion centers around a 1980 A Level Physics multiple-choice question regarding a 5-gram pellet fired vertically into 95 grams of clay, focusing on the calculation of the height the clay reaches post-collision. Participants debate whether the collision can be treated as perfectly inelastic, emphasizing that momentum conservation applies only when no external forces act on the system. The discussion highlights the importance of using conservation of energy as a more straightforward approach to solving the problem, given the complexities introduced by the collision dynamics.
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The pellet is fired from underneath the clay no mention was made of the type of collision .I agree with you that it would be solvable if the collision was perfectly inelastic.In this case you cannot assume that momentum is conserved as there is a resultant foce on the system .Ahmad Kishki said:Assume perfectly inelastic collision, and it should be solvable. I expect the height to be a function in v.
The odd thing here is that the question doesn't specify the position of the gun. I assume the clay is somehow held by a sufficiently long rope such that the pellet is fired from underneath.
eddie said:The pellet is fired from underneath the clay no mention was made of the type of collision .I agree with you that it would be solvable if the collision was perfectly inelastic.In this case you cannot assume that momentum is conserved as there is a resultant foce on the system .
Thanks for taking the trouble to make such a pithy reply.I agree totally with your comment.Vanadium 50 said:The key word is "clay".
Thanks for your reply Mr.Kishki ,there will be a resultant force on the bullet and clay during the period of momentum transfer before they reach a common velocity.Momentum is only conserved when the resultant force on a system is zero .Note resultant force equals rate of change of momentum.PS. there would be no problem if the bullet was fired horizontally as in the Ballistic Pendulum experiment.Ahmad Kishki said:Clay assumes the collision will be perfectly inelastic. Momentum is conserved here, there are no external forces on the ssystem. Notice: it is not resultant force that matters, it is external forces. I think this might be where you are confused. Momentum is not conserved if for example the collisionwas restricted in one way or another such that an external force is present. Here we have NO external forces.
I think this might be helpful: http://www.physicsclassroom.com/class/momentum/Lesson-2/Isolated-Systems
The net resultant force on the system consisting of the clay plus bullet during the instant of the collision is gravity. If the collision is of negligible duration, then what can be said about the magnitude of the change in momentum resulting from this resultant force?eddie said:Thanks for your reply Mr.Kishki ,there will be a resultant force on the bullet and clay during the period of momentum transfer before they reach a common velocity. Momentum is only conserved when the resultant force on a system is zero.
Thanks Zz for your reply ,the bullet loses energy in penetrating the clay.ZapperZ said:Why are you doing this using "forces" or even conservation of momentum? Why not solve this directly using conservation of energy? The bullet has an initial kinetic energy, and the bullet plus clay has a final potential energy since at the maximum height, it has no KE. This is so much easier since at this level, you don't care about energy loss due to heat, sound, etc.
Zz.
ZapperZ said:Why not solve this directly using conservation of energy?