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Table Of Contents

Mass properties for all regions

DescriptionMass property

A 2D or 3D coordinate that is the center of area for regions. For re-

gions that are coplanar with the XY plane of the current UCS, this

Centroid

coordinate is a 2D point. For regions that are not coplanar with the

XY plane of the current UCS, this coordinate is a 3D point.

If the regions are coplanar with the XY plane of the current UCS, the additional

properties shown in the following table are displayed.

Additional mass properties for coplanar regions

DescriptionMass property

A value used when computing the distributed loads, such as fluid

pressure on a plate, or when calculating the forces inside a bending

Moments of in-

ertia

or twisting beam. The formula for determining area moments of iner-

tia is

area_moments_of_inertia = area_of_interest * radius

The area moments of inertia has units of distance to the fourth power.

Property used to determine the forces causing the motion of an object.

It is always calculated with respect to two orthogonal planes. The

formula for product of inertia for the YZ plane and XZ plane is

Products of iner-

tia

product_of_inertia

YZ,XZ

= mass * dist

centroid_to_YZ

* dist

centroid_to_XZ

This XY value is expressed in mass units times the length squared.

Another way of indicating the moments of inertia of a 3D solid. The

formula for the radii of gyration is

Radii of gyra-

tion

gyration_radii = (moments_of_ inertia/body_mass)

1/2

Radii of gyration are expressed in distance units.

Calculations that are derived from the products of inertia and that

have the same unit values. The moment of inertia is highest through

Principal mo-

ments and

a certain axis at the centroid of an object. The moment of inertia isX,Y,Z directions

about centroid lowest through the second axis that is normal to the first axis and

that also passes through the centroid. A third value included in the

results is somewhere between the high and low values.

MASSPROP | 1085