A uniform electric field exists in `x-y` plane. The potential of points `A (-2m, 2m), B(-2m, 2m)` and `C(2m, 4m)` are `4V, 16 V` and 1`2 V` respectively. The electric field is

A uniform electric fied exists in x-y plane. The potential of ponts A(2m,2m),B(-2m,2m) and C(2m,3m) are 4V, 16V and 12V respectively. The electric field is

A uniform electric field is along x-axis. The potential difference V_(A)-V_(B)=10 V is between two points A (2m, 3m) and (4m, 8m). Find the electric field intensity.

Two point charges of, 1 mu C and -1 mu C are kept at (-2 m, 0) and (2 m, 0) respectively. Calculate the electric field at point (0, 5 m).

A uniform electric field of 30NC^(-1) exists along the X-axis calculate the potential difference V_(B)-V_(A) between the points A (4m,2m) and B(10m,5m).

Two particle A and B of masses m_(A) and m_(B) respectively and having the same charge are moving in a plane. A uniform magnetic field exists perpendicular to this plane. The speeds of the particles are v_(A) and v_(B) respectively and the trajectories are as shown in the figure. Then-

Find the potential difference V_(AB) between A(2m, 1m, 0) and B(0, 2m, 4m) in an electric field, E=(xhati-2yhatj+zhatk)V/m

An electric field vec(E)=B x hat(i) exists in space, where B = 20 V//m^(2) . Taking the potential at (2m, 4m) to be zero, find the potential at the origin.

An electric charge 10^(-8) C is placed at the point (4 m, 7m, 2m) . At the point ( lm, 3m, 2m,) , the electric.

An electric charge 10^(-8) C is placed at the point (4m, 7m, 2m). At the point (1m, 3m, 2m), the electric :

An electric field vec(E ) = hat(i) Cx exists in the space, where C = 10 V/ m^(2) . Taking the potential at (10 m, 20 m ) to be zero, find the potential at the origin.