Find out energy stored inside a solid non-conducting sphere of total charge Q and radius R. [Assume charge is uniformly distributed in its volume.]

Find out energy stored in the electric field of uniformly charged thin spherical shell of total charge Q and radius R.

Find out energy stored in the electric field of uniformly charged thin spherical shell of total charge Q and radius R.

An isolated non-conducting solid sphere of radius R is given an electric charge. The charge is uniformly distributed in the volume of sphere. The graph which shows the correct variation of magnitude of electric field with distance from the centre of the sphere is

A solid uniformly charged ficed non-conducting sphere of total charge Q and radius R contains a tunnel of negligible diameter. If a point charge '-q' of mass 'm' is released at rest from point P as shown in figure then find out its velocity at following points (i) At the surface of sphere (ii) At the centre of the sphere

A solid uniformly charged ficed non-conducting sphere of total charge Q and radius R contains a tunnel of negligible diameter. If a point charge '-q' of mass 'm' is released at rest from point P as shown in figure then find out its velocity at following points (i) At the surface of sphere (ii) At the centre of the sphere

Find out electric field intensity due to uniformly charged solid non-conducting sphere of volume charge density rho and radius R at following points : (i) At a distance r from surface of sphere (inside) (ii) At a distance r from the surface of sphere (outside)

Find out electric field intensity due to uniformly charged solid non-conducting sphere of volume charge density rho and radius R at following points : (i) At a distance r from surface of sphere (inside) (ii) At a distance r from the surface of sphere (outside)

There is a solid non-conducting sphere of radius R. Sphere is uniformly charged over the volume. Electric field due to this where in observed.