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| 183_notes:angular_motivation [2014/11/18 14:07] – [An observation] caballero | 183_notes:angular_motivation [2021/05/31 15:47] (current) – [An Observation You Can't Fully Explain] stumptyl | ||
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| + | Section 5.4 in Matter and Interactions (4th edition) | ||
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| ===== Why Angular Momentum? ===== | ===== Why Angular Momentum? ===== | ||
| - | It seems like conservation of momentum and conservation of energy can helps us describe any and all observations that you have. Indeed, both of these principles are quite powerful and can be used in many situations. However, there are some where a new idea must be brought to bear to be able to predict or explain the motion of the system. In these notes, you will read about a puzzle where linear momentum and energy are insufficient to explain the motion. | + | It seems like [[183_notes: |
| + | ** | ||
| + | ===== Catching A Ball ===== | ||
| - | ==== Catching a Ball ==== | + | ==== An Observation You Can Explain With Momentum and Energy |
| - | === An observation you can explain with momentum | + | Consider a person sitting on a stool that is free to rotate. Another person throws a heavy ball (like a medicine ball) directly at the sitting person |
| + | \\ | ||
| + | {{youtube> | ||
| + | //This video is primarily used for visual learning. No audio is within this demonstration video.// | ||
| - | Consider a person sitting on a still that is free to rotate. Another person throws a heavy ball (like a medicine ball) directly at the sitting person and " | + | \\ |
| - | VIDEO | + | **This is an inelastic collision.** You have read how to [[183_notes: |
| - | This is an inelastic collision. You have learned how to deal with this this kind of collision and you can explain this observation relatively well with conservation of momentum and energy. | + | |
| - | + | ||
| - | | + | |
| Δ→psys=→FextΔt | Δ→psys=→FextΔt | ||
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| With estimates of the velocity and mass of the ball as well as the collision time, you can determine the frictional force that the floor exerts on the stool. | With estimates of the velocity and mass of the ball as well as the collision time, you can determine the frictional force that the floor exerts on the stool. | ||
| - | * The collision is inelastic, so the kinetic energy of this system is not conserved, which is fairly obvious. Initially the system has kinetic energy (the ball is moving) and in the final state it does not. The system' | + | * The collision is inelastic, so the kinetic energy of this system is not conserved, which is fairly obvious. Initially, the system has kinetic energy (the ball is moving) and in the final state, it does not. The system' |
| ΔEsys=Wsurr+Q | ΔEsys=Wsurr+Q | ||
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| Again, with estimates of the velocity and mass of the ball, you can determine the increase in internal energy of the system as a result of the collision. | Again, with estimates of the velocity and mass of the ball, you can determine the increase in internal energy of the system as a result of the collision. | ||
| - | * Changing the mass or speed of the ball, changes the force entered by the floor and internal energy | + | * Changing the mass or speed of the ball, changes the force entered by the floor, and internal energy |
| - | === An observation you can' | + | ==== An Observation You Can' |
| - | Consider the same two people, but now the ball is thrown just to the left (or right) of the stool, so that the person on the stool catches it just to the side. | + | Consider the same two people, but now the ball is thrown just to the left (or right) of the stool so that the person on the stool catches it just to the side. This is demonstrated in the second and third clips in the video below. |
| - | VIDEO | + | {{youtube> |
| + | //This video is primarily used for visual learning. No audio is within this demonstration video.// | ||
| + | \\ | ||
| - | Now, when the ball is caught, the person in the stool begins to rotate. There' | + | Now, when the ball is caught, the person in the stool begins to rotate. There are a few other observations that you can make (depending on how much friction is in the bearings): |
| * Tossing a bigger (more massive) ball at the same speed results in a faster rotation. | * Tossing a bigger (more massive) ball at the same speed results in a faster rotation. | ||
| Line 44: | Line 51: | ||
| This situation is similar to the the previous one, linear momentum can help explain the size of the frictional force due to the floor. Furthermore, | This situation is similar to the the previous one, linear momentum can help explain the size of the frictional force due to the floor. Furthermore, | ||
| - | Conservation of linear momentum and energy are insufficient to describe this observation fully. You will need a new physical principle to do so: conservation of angular momentum. | + | |
| + | ΔEsys=Wsurr+Q | ||
| + | ΔEsys=ΔKball+ΔKrot+ΔEinternal=0 | ||
| + | ΔKrot+ΔEinternal=−ΔKball | ||
| + | |||
| + | Conservation of linear momentum and energy are insufficient to describe this observation fully. You will need a new physical principle to do so: [[183_notes: | ||