Distance between the objects revolving in cicular path with constant angular eoity
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when a body is revolving around a circular path, it experiences 2 forces: Centrifugal force and Centripetal Force.
Centrifugal force (Latin for "center fleeing") describes the tendency of an object following a curved path to fly outwards, away from the center of the curve. It's not really a force; it results from inertia — the tendency of an object to resist any change in its state of rest or motion.
Centripetal force is a real force that counteracts the centrifugal force and prevents the object from "flying out," keeping it moving instead with a uniform speed along a circular path.
Centripetal force: Fc = mv2/r = mw2r
Thus acceleration of particle in radial direction is equal to w2r where w is the angular velocity of particle and r is the radius of the circular path.
Centrifugal force (Latin for "center fleeing") describes the tendency of an object following a curved path to fly outwards, away from the center of the curve. It's not really a force; it results from inertia — the tendency of an object to resist any change in its state of rest or motion.
Centripetal force is a real force that counteracts the centrifugal force and prevents the object from "flying out," keeping it moving instead with a uniform speed along a circular path.
Centripetal force: Fc = mv2/r = mw2r
Thus acceleration of particle in radial direction is equal to w2r where w is the angular velocity of particle and r is the radius of the circular path.
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