Polar Moment of Inertia of Masses

The polar moment of inertia of a body depends on the mass of the object, its shape and its relative point of rotation

Convert between Moment of Inertia Units

Multiply with
from	to
from	kg m²	kg cm²	lb_m ft²	lb_m in²	slug ft²	slug in²
kg m²	1	1 10⁷	2.37 10¹	3.42 10³	7.38 10^-1	1.06 10²
kg cm²	1 10^-7	1	2.37 10^-6	3.42 10^-4	7.38 10^-8	1.06 10⁵
lb_m ft²	4.21 10^-2	4.21 10⁵	1	1.44 10²	3.11 10^-2	4.48
lb_m in²	2.93 10^-4	2.93 10³	6.94 10^-3	1	2.16 10⁴	3.11 10^-2
slug ft²	1.36	1.36 10⁷	3.22 10¹	4.63 10³	1	1.44 10²
slug in²	9.42 10^-3	9.42 10⁴	2.23 10^-1	3.22 10¹	6.94 10^-3	1

Some Typical Bodies and their Polar Moments of Inertia

Inertia of Cylinder

Thin-walled hollow cylinder:

A thin-walled hollow cylinder is comparable with the point mass (1) and can be expressed as:

J = m r² (3a)

where

m = mass of the hollow (lb_m, kg)

r = distance between axis and the thin walled hollow (ft, m)

r_o = distance between axis and outside hollow (ft, m)

Hollow cylinder:

J = 1/2 m ( r_i² + r_o²) (3b)

where

m = mass of hollow (lb_m, kg)

r_i = distance between axis and inside hollow (ft, m)

r_o = distance between axis and outside hollow (ft, m)

Solid cylinder:

J = 1/2 m r² (3c)

where

m = mass of cylinder (lb_m, kg)

r = distance between axis and outside cylinder (ft, m)

Inertia of Sphere

Thin-walled hollow sphere:

J = 2/3 m r² (4a)

where

m = mass of sphere hollow (lb_m, kg)

r = distance between axis and hollow (ft, m)

Solid sphere:

J = 2/5 m r² (4b)

where

m = mass of sphere (lb_m, kg)

r = radius in sphere (ft, m)

Moment of Inertia - General Formula

The Inertia formula may be generally expressed as

J = k m r² (5)

where

k = inertial constant - depending on the shape of the body

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