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Physical Pendulum Equations Formulas Design Calculator
Science - Physics - Oscillations
Solving for center of mass or moment of inertia.
Inputs:
Conversions:
| period (T) | = | 0 | = | 0 | second | |
| mass (M) | = | 0 | = | 0 | kilogram | |
| acceleration of gravity (g) | = | 0 | = | 0 | meter/second^2 | |
| distance from moment of inertia to pivot (D) | = | 0 | = | 0 | meter |
Solution:
| inertia moment or mass center (I) | = | HAS NOT BEEN CALCULATED |
Other Units:
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physical pendulum
Select an equation to solve for a different unknown
simple pendulum
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Solve for period. |
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Solve for length. |
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Solve for acceleration of gravity |
physical pendulum
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Solve for period. |
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Solve for center of mass or moment of inertia. |
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Solve for mass |
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Solve for acceleration of gravity |
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Solve for distance from center of mass to pivot |
References - Books:
Tipler, Paul A.. 1995. Physics For Scientists and Engineers. Worth Publishers. 3rd ed.
AJ Design - Online Science Mathematics Engineering Software Programs | 2 | 3 | 4 | 5
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