If a thin wire of length L and mass m is bent in the form of a semi-circle, then its M.I. about an axis joining its free ends will be
A. `ML^2`
B. Zero
C. `(ML^2)/PI^2`
D. `( ML^2)/(2PI^2)`

If the moment of inertia of a ring about transverse axis passing through its centre is 6 kg m^2 , then the M.I. about a tangent in its plane will be

A thin wire of mass m and length l is bent in the form of a ring . Moment of inertia of that ring about an axis passing througfh its centre and perpendicular to its plane is

The radius of disc is 2m, the radius of gyration of disc about an axis passing through its diameter is

The radius of disc is 2 m.The radius of gyration of disc about an axis passing through its diameter is

Choose the corect options. A thin rod of length L is magnetized and has magnetic moment M. The rod is then bent in a semicircular arc. The magnetic moment in this case is A. frac(M)(L) B. frac(M)(pi) C. frac(M)(2pi) D. frac(2M)(pi)

Calculate M.I. of a thin uniform ring about an axis tangent to the ring and in a plane of the ring, if its M.I. about an axis passing through the centre and perpendicular to plane is 4 kgm2 A. 3 kgm^2 B. 6 kgm^2 C. 9 kgm^2 D. 12 kgm^2

M.i of the solid sphere about its diameter is 25 kg m^2 . Find its M.I about the tangent.

M.i of the solid sphere about its diameter is 25 kg m^2 . Find its M.I about the tangent.

A wire of length a is cut into two parts which are bent, respectively, in the form of a square and a circle. The least value of the sum of the areas so formed is (a^2)/(pi+4) (b) a/(pi+4) a/(4(pi+4)) (d) (a^2)/(4(pi+4))

The M.I.of.thiriuniformrod of mass'M' and length 'l' about an.axis passing through its one end and perpendicular to length is