Pendulum Calculator

How to Use This Calculator

1. Enter pendulum length in meters and adjust gravity if needed.
2. See period, frequency, and angular frequency instantly.
3. Use Physical Pendulum tab for a rigid body with moment of inertia.
4. Use Foucault tab to find the rotation rate at a given latitude.
5. The Professional tab applies large-angle correction and damped oscillation decay.

Formula

Example

Frequently Asked Questions

• What is the formula for pendulum period? ▼
  For a simple pendulum (small angle): T = 2π√(L/g), where L is length in meters and g is gravitational acceleration (9.81 m/s² on Earth). The period is independent of mass and amplitude for small angles.
• What is the pendulum period on the Moon? ▼
  On the Moon g ≈ 1.62 m/s². A 1-meter pendulum has period T = 2π√(1/1.62) ≈ 4.95 s, compared to 2.006 s on Earth. Pendulums swing slower on the Moon.
• What is a Foucault pendulum? ▼
  A Foucault pendulum demonstrates Earth's rotation. Its plane of oscillation appears to rotate at a rate that depends on latitude. At the poles the period is 24 hours; at the equator there is no rotation.
• What is a physical pendulum? ▼
  A physical (compound) pendulum is a rigid body swinging about a pivot. Its period is T = 2π√(I/(mgd)), where I is the moment of inertia, m is mass, and d is the distance from pivot to center of mass.
• Does amplitude affect pendulum period? ▼
  For small angles (< 15°) the effect is negligible. For large angles θ₀, a correction factor is needed: T ≈ T₀ × (1 + (1/16)θ₀² + (11/3072)θ₀⁴...) where θ₀ is in radians.

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