Table of Mechanics Demonstration List of Mechanics Equipment & Supplies Lecture Demonstrations

# Foucault Pendulum - Model, 1E20.09

Location:

• Cabinet: Mechanic (ME)

• Bay: (B12)

• Shelf: #1

• Alternative location is within the Ingersoll Museum

Description:

• A pendulum is suspended from a "U" shape frame on a rotating platform. The pendulum is also aloud to swing freely in a plane.

Important Setup Notes:

1. Do not pull the pendulum bob back past the "U" shape support frame. The bob will hit the frame when platform is rotated
2. This is an old Museum Exhibit, which may return to the museum for time to time.

Demonstration:

• If a pendulum is suspended so that it may swing freely, it will maintain a constant plane of oscillation, relative to an inertial frame of reference. This is the result of the force which act on a pendulum. These forces act in the direction of the path of the pendulum and along the string. There is no force acting perpendicularly to the path of the pendulum. If a pendulum were suspended at the north pole of the earth, it would continue to oscillate, unperturbed, in it's original plane of motion, while the earth revolved beneath it, making one revolution in twenty-four hours. To an observer on the earth at the north pole, who is unconscious of the earth's rotation, it will appear the the pendulum's plane of motion is constantly changing, completing 360 degrees of rotation in twenty-four hours. This horizontal rotation will appear to be in the opposite direction of the earth's rotation, that is, in the clockwise direction. At the equator, no such rotation takes place. At a point between the pole and the equator, the period of this rotation varies between twenty-four hours and infinity, depending on the latitude. In Madison the period is 35 hours, 8 minutes, 8 seconds. In 1852, Leon Foucault suspended a pendulum from the dome of the Pantheon in Paris. This pendulum, now known as the Foucault Pendulum, showed the apparent rotation of a pendulum's plane of oscillation.

References:

fw: FoucaultPendulumModel (last edited 2013-07-12 18:17:56 by localhost)