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Question

The densities of two solid spheres A and B of the same radii R vary with radial distance r as ρA(r)=k(rR) and ρB(r)=k(rR)5, respectively, where k is a constant. The moments of inertia of the individual spheres about axis passing through their centres are IA and IB respectively. If IBIA=n10, then value of n is-

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Solution

For solid sphereA,ρA(r)=k(rR)
Consider a spherical shell of radius x and thickness dx.
Mass of the shell, dm= density × volume
=(kxR)(4πx2dx)
So, moment of inertia of shell about its diameter,
dI=23(dm)x2=23(kxR)(4πx2dx)x2=(8π3kR)x5dx
Moment of inertia of the sphere A,
IA=R0dI=8πk3RR0x5dx=8πk3R[x66]R0=(8πk18)R5....(i)
Similarly, for sphere B
IB=8πk3R5R0x9dx=(8πk3R5)[x1010]R0
IB=8πk30R5.....(ii)
From eqns. (i) and (ii), we get
IBIA=1830=610=n10n=6


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