There is a uniform spherically symmetric surface charge density at a distance `R_(0)` from the origin . The charge distribution is initially at rest and starts expanding because of mutual repulsion , the figure that represents best the speed V (r(t)) of the distribution as a function of its instant radius R(t) is :

For spherically symmetrical charge distribution, electric field at a distance r from the centre of sphere is vec(E)=kr^(7) vec(r) , where k is a constant. What will be the volume charge density at a distance r from the centre of sphere?

For a spherically symmetrical charge distribution electric field at a distance r from the centre of sphere is vec(E)=kr^(2)hat(r) where k is a constant what will be the volume charge density at a distance r from the centre of sphere?

A sphere of radius R_(0 carries a volume charge density proportional to the distance (x) from the origin, rho=alpha x where alpha is a positive constant.The total charge in the sphere of radius R_(0) is

Consider a uniform charged sphere of charge density r and radius R.If the cavity of radius R/2is made inside the sphere and the removed part is again placed near the charge distribution as shown in the figure. If the electric field at the centre of the cavity is (rho R)/(n varepsilon_(0) find n .

7.Consider a uniform charged sphere of charge density p and radius R.If the cavity of radius R/2is made inside the sphere and the removed part is again placed near the charge distribution as shown in the figure.If the electric field at the centre of the cavity is (rho R)/(n varepsilon_(0)) find n .

A solid sphere of radius R has total charge Q. The charge is distributed in spherically symmetric manner in the sphere. The charge density is zero at the centre and increases linearly with distance from the centre. (a) Find the charge density at distance r from the centre of the sphere. (b) Find the magnitude of electric field at a point ‘P’ inside the sphere at distance r_1 from the centre.

A uniformly charged disc of radius R having surface charge density sigma is placed in the xy plane with its center at the origin. Find the electric field intensity along the z-axis at a distance Z from origin :

A positive point charge is released from rest at a distance r _ 0 from a positive line charge with uniform density. The speed (v) of the point charge, as a function of instantaneous distance r from line charge, is proportional to:

Consider a uniform spherical charge distribution of radius R_(1) centred at the orgin O . In this distribution a spherical cavity fo radius R_(2) , centred at P with distance OP = a = R_(1) - R_(2) (fig) is made.If the electric field inside the cavity at position vec(r ) , then the correct statement is