Moment of inertia, Explanation of inertia, Calculating the moment of inertia – Dukane Dual Servo Spin Welder 403570-01 User Manual

Dukane Manual Part No. 403-570-01

Page 105

Appendix B

USEFUL UNIT CONVERSIONS

1 in . = 2 .54 cm = .025 m
1 lb . = 0 .45 kg
1 cm = 0 .39 in .
1 m = 39 .4 in .
1 kg = 2 .20 lb .

Moment of Inertia

Explanation of Inertia

The moment of inertia is a measure of the mass and the
mass distribution of the tool. It is defined mathemati-
cally as the product of the mass times the distance of
that mass from the axis of rotation squared. For a cyl-
inder spinning around its axis, the formula for the mo-
ment of inertia is:

Inertia = 1/8 *M*D

2

,

where

Inertia is in kg-cm

2

M is the mass in kg

D is the cylinder diameter in cm

Taking into account material density, the formula can
be rewritten as:

Inertia = .098 *ρ *L *D

4

,

where

ρ is the density in kg/cm

3

L is the cylinder length in cm

Calculating the Moment

of Inertia

For spin welder applications, most tools will have a
geometry close to a cylinder with internal cutouts for the
parts. To estimate the inertia of such a tool, first calculate
the inertia of a solid cylinder, then the inertia of the void
created for the part using the density of the tool material,
and then subtract the two values.
Example:

Aluminum tool with outside dimensions:

D = 4 in. = 10.1 cm

L = 2.5 in. = 6.4 cm

P = 0.1 lb/in.

3

(density of

Aluminum) = .0028 kg/cm

3

The inertia would be calculated as follows:

Inertia, cylinder = .098* .0028* 6.4* (10.1)

4

= 18.1 kg-cm

2

Inertia, void = .098* .0028* 2.5* (7.6)

4

= 2.3 kg-cm

2

Inertia, tool = Inertia, cylinder – Inertia, void = 16 kg-cm

2

Part void:

D = 3 inches = 7.6 cm

L = 1 inch = 2.5 cm