`M.I.` of a uniform horizontal solid cylinder of mass `M` about an axis passing through its edge and perpendicular to the axis of cylinder when its length is `6` times of its radius `R` is

Moment of inertial of a uniform horizontal solid cylinder of mass M about an axis passing through its edge and perpendicular to the axis of the cylinder when its length is 6 times its radius R is

Moment of inertia, of a uniform horizontal solid cylinder of mass 'M' about an axis passing through its edge and perpendicular to the axis of the cylinder when its length is 6 times its radius 'R' is

The M.I. of thin uniform rod of mass 'M' and length 'l' about an axis passing through its centre and perpendicular to its length is

The moment of inertia of a solid cylinder of mass M, length 2R and radius R about an axis passing through the centre of mass and perpendicular to the axis of the cylinder is I_(1) and about an axis passing through one end of the cylinder and perpendicular to the axis of cylinder is I_(2)

The moment of inertia of a solid cylinder of mass M, length 2R and radius R about an axis passing through the centre of mass and perpendicular to the axis of the cylinder is I_(1) and about an axis passing through one end of the cylinder and perpendicular to the axis of cylinder is I_(2)

The moment of inertia of a solid cylinder of mass M, length 2 R and radius R about an axis passing through the centre of mass and perpendicular to the axis of the cylinder is I, and about an axis passing through one end of the cylinder and perpendicular to the axis of cylinder is I_2 then

The moment of inertia of a solid cylinder of mass M, length 2 R and radius about R an axis passing through the centre of mass and perpendicular to the axis of the cylinder is I and about an axis passing through one end of the cylinder and perpendicular to the axis of cylinder is I_(2) ,then

Moment of inertia of a cylinder of mass M, length L and radius R about an axis passing through its centre and perpendicular to the axis of the cylinder is I = M ((R^2)/4 + (L^2)/12) . If such a cylinder is to be made for a given mass of a material, the ratio L//R for it to have minimum possible I is :

Moment of inertia of a cylinder of mass M, length L and radius R about an axis passing through its centre and perpendicular to the axis of the cylinder is I = M ((R^2)/4 + (L^2)/12) . If such a cylinder is to be made for a given mass of a material, the ratio L//R for it to have minimum possible I is :