visual3d:documentation:pipeline:model_based_data_commands:model_moment_of_inertia
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| - | {{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{{for more information on moment of inertia see [[[http:// | + | ====== MODEL MOMENT OF INERTIA ====== |
| - | ===== moment | + | For more information on Moment |
| - | the result is the model' | + | ==== Moment |
| - | modelmomentofinertiadlg.jpg | + | The result is the model' |
| - | ===== moment of inertia signal ===== | + | {{: |
| - | the model_momentum_inertia is a 3x3 matrix. the data at each frame represents the 9 values in this matrix. | + | ==== Moment of Inertia Signal ==== |
| - | modelmomentofinertia.jpg | + | The Model_Momentum_Inertia is a 3x3 matrix. The data at each frame represents the 9 values in this matrix. |
| - | ===== moment of inertia of a particle ===== | + | {{: |
| - | given a particle with mass //m//. | + | ==== Moment |
| - | the moment of inertia of this particle about an axis is: | + | |
| - | iparticle.jpg | + | |
| - | angularmomentofparticle.jpg | + | |
| - | ===== moment | + | |
| - | give a segment | + | Given a particle |
| - | the moment of inertia of any object | + | The moment of inertia of this particle |
| - | the moment of inertia about any axis parallel to that axis through the center of mass is given by: | + | {{:Iparticle.jpg}} |
| - | iaxis.jpg | + | {{:AngularMomentOfParticle.jpg}} |
| - | thus the moment of inertia of the body (relative to global coordinate system) is given by summing two terms: | + | ==== Moment |
| - | parallelaxis2.jpg | + | |
| - | a parallel axis theorem term which accounts for the distance each body is from the point you are calculated the center of mass about. (often this point is the total body center of mass). | + | |
| - | ===== model center | + | |
| - | the center of mass of an object is a theoretical point where all of the object’s mass can be considered to be concentrated | + | Give a segment with mass //m// and local moment of inertia //I//. |
| - | compute | + | The moment of inertia of any object about an axis through its center of mass is the minimum moment of inertia for an axis in that direction in space. |
| - | angularmomentum.jpg | + | The moment of inertia about any axis parallel to that axis through |
| + | {{: | ||
| + | Thus the moment of inertia of the body (relative to global coordinate system) is given by summing two terms: | ||
| + | {{: | ||
| + | A parallel axis theorem term which accounts for the distance each body is from the point you are calculated the center of mass about. (Often this point is the total body center of mass). | ||
| + | ==== Model Center of Mass (COM) ==== | ||
| + | |||
| + | The center of mass of an object is a theoretical point where all of the object’s mass can be considered to be concentrated | ||
| + | Compute | ||
| + | {{: | ||
| \\ | \\ | ||
| - | moment | + | Moment |
| - | the moment of inertia must be specified with respect to a chosen axis of rotation. | + | The moment of inertia must be specified with respect to a chosen axis of rotation. |
| - | for a point mass the moment of inertia is just the mass times the square of perpendicular distance to the rotation axis, i = mr2. | + | For a point mass the moment of inertia is just the mass times the square of perpendicular distance to the rotation axis, I = mr2. |
| - | the moment of inertia of a body is not only related to its mass but also the distribution of the mass throughout the body. so two bodies of the same mass may possess different moments of inertia | + | The moment of inertia of a body is not only related to its mass but also the distribution of the mass throughout the body. So two bodies of the same mass may possess different moments of inertia |
| - | ===== moment | + | ==== Moment |
| - | parallel axis | + | Parallel Axis |
| - | parallelaxis.jpg | + | {{: |
| - | now the tricky bit (proved in the next section). | + | Now the tricky bit (proved in the next section). |
| - | ilabprincipal.jpg | + | {{: |
| - | where //r// = segment | + | where //R// = Segment |
| - | ===== moment | + | ==== Moment |
| - | if the moment of inertia of each segment is resolved about the center of mass of the model in the laboratory coordinates, | + | If the moment of inertia of each segment is resolved about the center of mass of the model in the laboratory coordinates, |
| - | **note that the key concept is that the segment moments of inertia must be expressed in laboratory | + | **Note that the key concept is that the segment moments of inertia must be expressed in Laboratory |
| - | milab.jpg | + | {{:MILab.jpg}} |
| - | ===== proof courtesy | + | ==== Proof Courtesy |
| - | one of the tricky bits is recognizing the following equation. | + | One of the tricky bits is recognizing the following equation. |
| - | ilabprincipal.jpg | + | {{: |
| - | fred yeadon | + | Fred Yeadon |
| - | let: | + | Let: |
| - | omegas.jpg = the angular velocity vector in the segment frame s | + | {{:omegas.jpg}} = the angular velocity vector in the segment frame s |
| - | iomegas.jpg = the angular momentum vector in coordinate system //s// | + | {{:IOmegas.jpg}} = the angular momentum vector in coordinate system //s// |
| - | tsf.jpg = matrix that transforms a vector from frame s to frame f | + | {{:Tsf.jpg}} = matrix that transforms a vector from frame s to frame f |
| - | thus: | + | Thus: |
| - | romegas.jpg | + | {{:ROmegaS.jpg}} |
| - | rsfiws.jpg | + | {{:RsfIws.jpg}} |
| \\ | \\ | ||
| - | what we are trying to demonstrate is | + | What we are trying to demonstrate is |
| - | rir.jpg | + | {{:RIR.jpg}} |
| \\ | \\ | ||
| - | if the tensor | + | If the tensor |
| - | if the vector omegas.jpg transforms into romegas.jpg | + | if the vector |
| then:- | then:- | ||
| - | riomega.jpg | + | {{:RIomega.jpg}} |
| - | riomegas0.jpg because | + | {{: |
| if the associative rule is to hold | if the associative rule is to hold | ||
| - | riomega2.jpg | + | {{:RIOmega2.jpg}} |
| - | therefore, as expected: | + | Therefore, as expected: |
| - | riomega3.jpg | + | {{:RIOmega3.jpg}} |
| \\ | \\ | ||
| - | much of the contents of this page are courtesy of fred yeadon. | + | Much of the contents of this page are courtesy of Fred Yeadon. |
| + | |||
| + | Yeadon, M.R. 1993. The biomechanics of twisting somersaults. Part I: Rigid body motions. Journal of Sports Sciences 11, 187-198. | ||
| - | yeadon, m.r. 1993. the biomechanics of twisting somersaults. | + | Yeadon, M.R. 1993. The biomechanics of twisting somersaults. |
| - | yeadon, m.r. 1993. the biomechanics of twisting somersaults. | + | Yeadon, M.R. 1993. The biomechanics of twisting somersaults. |
| - | yeadon, m.r. 1993. the biomechanics of twisting somersaults. | + | Yeadon, M.R. 1993. The biomechanics of twisting somersaults. |
| - | yeadon, m.r. 1993. the biomechanics of twisting somersaults. part iv: partitioning performance using the tilt angle. journal | + | Yeadon, M.R. 1993. Twisting techniques used by competitive divers. Journal |
| - | yeadon, m.r. 1993. twisting techniques used by competitive divers. journal of sports sciences 11, 4, 337-342. | ||
| - | }}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}} | ||
visual3d/documentation/pipeline/model_based_data_commands/model_moment_of_inertia.1718801509.txt.gz · Last modified: 2024/06/19 12:51 by sgranger