CodeWebs said:
The problem does not state any information about if the ball penetrated a certain distance into the mud, all it says is it stopped in the mud at the bottom. No matter how i show my teacher the calculations i did to find the answer, she says its wrong, yet she doesn't have any calculations to back up her answer. The other physics teacher in my school tryed to tell me that the reference point for the gravitational potential energy can be changed, and at the top of the well, the top is the reference point, and at the bottom its the bottom, yet from what i know this can't be done because it does not follow the law of conservation of energy. I feel as though I solved the problem as stated, and my teachers are only trying to back up the answer given to them rather than thinking about what is actualy taking place. I'm not sure what can be done if anything. If anyone has any further input into this problem it would be very helpfull, thank you.
Your solution is entirely correct. However, in order to try to "educate" your teacher
you might do it stepwise.
As you write, at that top, the ball is at rest, and has, according to the problem statement, also zero potential energy (this fixes the origin of the axis x in the formula U = m.g.x).
So we have E = U + T = m.g.0 + 1/2 m.0^2 = 0.
During its falling down, if we neglect air resistance, we have a conservative motion (meaning: E is conserved).
Hence, we have: E = m.g.x(t) + 1/2.m.(v(t))^2 = 0 (because it was 0 at the start, and remains conservedly 0).
This allows you to express the velocity as a function of the distance fallen (x, which must be negative, because the object is FALLING):
v = \sqrt{2.g.(-x)} where (-x) is a positive number and so the square root has a meaning. At the bottom of the shaft, just before penetrating into the mud, the velocity is hence: v_{final} = \sqrt{2.g.(+10m)} = 14.0 m/s. If you plug this into the formula for the total energy, you will find of course that this is still 0, because that was what we required to find v in the first place.
However, enters the mud. The motion of the object in the mud is a thermodynamically dissipative process (you heat the mud in fact a little bit) in which mechanical work is converted in thermal energy. As such, conservation of energy
restricted to the mechanical motion is not valid anymore. The object is loosing speed (while almost not changing its position and hence its potential energy). The total energy of the system will hence DECREASE, and fall to: E' = m.g.x because v=0 at the end too. This is what you calculated correctly. It is negative, because (by convention) the initial energy was 0, and we lost some to the mud (which got heated up with exactly that amount of energy: 196 J). It is also negative, because you don't have enough mechanical energy anymore to get up to the initial position.
If we had choosen the origin of potential energy at the bottom of the well, then we would have 0 now, but we would have had an initial energy of +196J in the initial state.
Print this brilliant answer of mine out, and show it to your teacher
