how did they vary the angular velocity in this model ?
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farzad
am 8 Feb. 2014
Beantwortet: farzad
am 10 Feb. 2014
Hi All
I notied this example http://blogs.mathworks.com/seth/2014/02/05/win-olympic-gold-with-simmechanics-modeling-figure-skating-and-angular-momentum/?s_eid=PSM_6817 about an ice skater , with the model demonstrated ,even the first one , I see no possibility of changing the angular velocity
how with one revolute joint you can change the angular velocity ? and should it be an R2013b , I am using r2013a that has a drastic difference in torque calculation with the following version
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Roger Stafford
am 9 Feb. 2014
Bearbeitet: Roger Stafford
am 9 Feb. 2014
A fundamental law of mechanics is that a body free of external torques will preserve its angular momentum. However, that is not the same as the body's angular velocity. Roughly speaking, the angular momentum is the product of the angular velocity and the moment of inertia. If the body preserves its moment of inertia, then the angular velocity along with the angular momentum is preserved. However, if the body changes its moment of inertia, then the angular velocity must also change in the opposite direction to preserve the angular momentum. When the ice skater brings his or her arms in close to the torso, that has the effect of reducing the total moment of inertia of the skater, and consequently their angular velocity must increase to maintain a constant angular momentum.
To choose an extreme case, when a hiker ascends a mountain, that increases the total moment of inertia of the whole earth system including the humans on it by a tiny amount and it must consequently slow down its rotation rate with the day increasing in length by a tiny amount. However, as far as I am aware no-one has seriously worried about the effect mountain climbers have on the length of earth's day.
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