how to find radius of gyration of any rotating body??
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Radius of gyration is defined as the distance from the axis of rotation to a point where the total mass of the body is supposed to be concentrated, so that the moment of inertia about the axis may remain the same. Simply, gyration is the distribution of the components of an object. It is denoted by K. In terms of radius of gyration, the moment of inertia of the body of mass M is given as,
Inertia (I) = MK2
Suppose a body consists of n particles each of mass m. Let r1, r2, r3, ... , rn be their perpendicular distances from the axis of rotation. Then, the moment of inertia I of the body about the axis of rotation is
Formula of moment of inertia
If all the particles are of same mass m, then
Moment of inertia if all mass is same
Since mn = M, total mass of the body,
Formula of inertia in terms of total mass or body and radius
From the above equations, we have
Radius of gyration is the root mean square distance of particles from axis formula
Therefore, the radius of gyration of a body about a given axis may also be defined as the root mean square distance of the various particles of the body from the axis of rotation.
Inertia (I) = MK2
Suppose a body consists of n particles each of mass m. Let r1, r2, r3, ... , rn be their perpendicular distances from the axis of rotation. Then, the moment of inertia I of the body about the axis of rotation is
Formula of moment of inertia
If all the particles are of same mass m, then
Moment of inertia if all mass is same
Since mn = M, total mass of the body,
Formula of inertia in terms of total mass or body and radius
From the above equations, we have
Radius of gyration is the root mean square distance of particles from axis formula
Therefore, the radius of gyration of a body about a given axis may also be defined as the root mean square distance of the various particles of the body from the axis of rotation.
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