Inertia
- class compas_fab.robots.Inertia(inertia_tensor, mass, center_of_mass)[source]
Bases:
object
The moments of inertia represent the spatial distribution of mass in a rigid body.
It depends on the mass, size, and shape of a rigid body with units of [mass * m**2]. The moments of inertia can be expressed as the components of a symmetric positive-definite 3x3 matrix, with 3 diagonal elements, and 3 unique off-diagonal elements. Each inertia matrix is defined relative to a coordinate frame or set of axes.
- Attributes
inertia_tensor (list of float) – A symmetric positive-definite 3x3 matrix: | ixx ixy ixz | | ixy iyy iyz | | ixz iyz izz | with [ixx, iyy, izz] as the principal moments of inertia and [ixy, ixz, iyz] as the products of inertia.
mass (float) – The mass of the object in kg.
center_of_mass (
Point
) – The center of mass of the object in meters.
Examples
>>> inertia = Inertia([[0] * 3] * 3, 1., Point(0.1, 3.1, 4.4)) >>> inertia Inertia([[0, 0, 0], [0, 0, 0], [0, 0, 0]], 1.0, Point(0.100, 3.100, 4.400)) >>> inertia.principal_moments [0, 0, 0]
Notes
Assuming uniform mass density, inertial data can be obtained using the free software MeshLab, refering to this great tutorial.
Methods
__init__
(inertia_tensor, mass, center_of_mass)Initialize self.
calculate_inertia_tensor
(cls, mesh)Returns the inertia tensor.
Attributes
principal_moments
Returns the diagonal elements of the inertia tensor [ixx, iyy, izz]