What is radius of gyration of hollow sphere?
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Radius of gyration is actually the distance between the axis of rotation to the point of concentration of the total mass of body.This radius is such a way that the moment of inertia remains same when it comes to axis.. This is represented by the "K" . .
The other mathematical defination of the radius of gyration with regard to axis is as "From axis of rotation it is the root mean square distance of different particles of body "
The other mathematical defination of the radius of gyration with regard to axis is as "From axis of rotation it is the root mean square distance of different particles of body "
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The radius of gyration of the macromolecule, Rg is more important naturally as it gives a feeling of the extent of the polymer coil. It is additionally the amount that can be accessed experimentally.
The square radius of gyration is the normal squared separation of any point in the protest (polymer loop) from its focal point of mass.
The radius of gyration of an identical openly jointed chain is given by < Rg2 = Nb2∕6 =< R2 > ∕6. That is, the sweep of gyration is littler than the root mean square end-end distance by a factor of √ -
It is educational to recollect that the span of gyration of a strong circle isn't comparable to its physical radius.
The square radius of gyration is the normal squared separation of any point in the protest (polymer loop) from its focal point of mass.
The radius of gyration of an identical openly jointed chain is given by < Rg2 = Nb2∕6 =< R2 > ∕6. That is, the sweep of gyration is littler than the root mean square end-end distance by a factor of √ -
It is educational to recollect that the span of gyration of a strong circle isn't comparable to its physical radius.
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