A disc of radius R rotates with constant angular velocity `omega` about its own axis. Surface charge density of this disc varies as `sigma = alphar^(2)`, where r is the distance from the centre of disc. Determine the magnetic field intensity at the centre of disc.

A metal disc of radius a rotates with a constant angular velocity omega about its axis. The potential difference between the center and the rim of the disc is ("m = mass of electron, e = charge on electro")

A metal disc of radius R rotates with an angular velcoity omega about an axis perpendiclar to its plane passing through its centre in a magnetic field B acting perpendicular to the plane of the disc. Calculate the induced emf between the rim and the axis of the disc.

A uniformly charged disc of radius r and having charge q rotates with constant angular velocity omega . The magnetic dipole moment of this disc is (1)/(n)qomegar^(2) . Find the value of n.

A disc of radius R rotates at an angular velocity omega about the axis perpendicular to its surface and passing through its centre. If the disc has a uniform surface charge density sigma , find the magnetic induction on the axis of rotation at a distance x from the centre. (Given R=3m , x=4m and mu_(0)sigmaomega=20Tesla//m .)

A conducting disc of radius r rotaes with a small but constant angular velocity omega about its axis. A uniform magnetic field B exists parallel to the axis of rotation. Find the motional emf between the centre and the periphery of the disc.

A uniform rod of mass m and length L lies radialy on a disc rotating with angular speed omega in a horizontal plane about vertical axis passing thorugh centre of disc. The rod does not slip on the disc and the centre of the rod is at a distance 2L from the centre of the disc. them the kinetic energy of the rod is

A charged disc of radius 3 m has charge density sigma . Electric field at a distance of 4 m from its centre on axis is _______

From a circular disc of radius R , a triangular portion is cut (sec figure). The distance of the centre of mass of the remainder from the centre of the disc is -

An uniform disc is rotating at a constant speed in a vertical plane about a fixed horizontal axis passing through the centre of the disc. A piece of the disc from its rim detaches itself from the disc at the instant when it is at horizontal level with the centre of the disc and moving upwards, then about the fixed axis. STATEMENT-1 : Angular speed of the disc about the aixs of rotation will increase. and STATEMENT-2 : Moment of inertia of the disc is decreased about the axis of rotation.

A uniform disc is rotating at a constantt speed in a vertical plane about a fixed horizontal axis passing through the centre of the disc. A piece of the disc from its rim detaches itself from the disc at the instant when it is at horizontal level with the centre of the disc and moving upward. Then about the fixed axis, the angular speed of the