# Physical Pendulum Equations Calculator

Science Physics Oscillations Design Formulas

Solving for distance from center of mass.

## Inputs:

inertia moment or mass center (I)
mass (M)
acceleration of gravity (g)
period (T)

## Conversions:

inertia moment or mass center (I)
= 0
= 0
kilogram-meter^2
mass (M)
= 0
= 0
kilogram
acceleration of gravity (g)
= 0
= 0
meter/second^2
period (T)
= 0
= 0
second

## Solution:

distance - moment of inertia to pivot (D)
= NOT CALCULATED

## Other Units:

Change Equation
Select to solve for a different unknown
simple pendulum
 Solve for period. Solve for length. Solve for acceleration of gravity
physical pendulum
 Solve for period. Solve for center of mass or moment of inertia. Solve for mass Solve for acceleration of gravity Solve for distance from center of mass to pivot

References - Books: Tipler, Paul A.. 1995. Physics For Scientists and Engineers. Worth Publishers. 3rd ed.

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By Jimmy Raymond

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