If `V_(o)` be the potential at origin in an electric field `vecE=E_(x)hati+E_(y)hatj`, then the potential at point `P(x, y)` is

Let V_(0) be the potential at the origin in an electric field vecE=E_(x)hati+E_(y)hatj . The potential at the point (x,y) is

Let V_0 be the potential at the origin in an electric field vecE = 4hati + 5hatj . The potential at the point (x,y) is

The potential field of an electric field vec(E)=(y hat(i)+x hat(j)) is

The potential field of an electric field vec(E)=(y hat(i)+x hat(j)) is

Find the potential V of an electrostatic field vec E = a(y hat i + x hat j) , where a is a constant.

For given vec(E)=2x hat(i)+3yhat(j) , find the potential at (x, y) if V at origin is 5 volts.

A uniform field of 8 N/C exists in space in positive x-direction. (a) Taking the potential at the origin to be zero, write an expression for the potential at a general point (x, y, z). (b) At which points, the potential is 160 V ? (c) It the potential at the origin is taken to be 80V, what will be the expression for the potential at a general point ? (d) What will be the potential at the origin if the potential at x = infinity is taken to be zero ?

The electric field and the electric potential at a point are E and V respectively.

Electric dipole of moment vecp = phati is kept at a point (x,y) in an electric field vecE = 4xy^2hati + 4x^2yhatj . Find the force on the dipole.

Find the potential function V (x,y) of an electrostatic field vec(E)=2axy hat(i)+a(x^(2)-y^(2))hat(j) where a is a constant.