The electric field intensity at all points in space is given by `vec(E) = sqrt(3) hat (i) - hat (j)` volts/metre. A square frame LMNO of side 1 metre is shown in figure. The point N lies in x-y plane. The initial angle between line ON and x-axis is `theta = 60^(@)`

The magnitude of electric flux through area enclosed in square frame LMNO is -

The electric field intensity at all points in space is given by vec(E) = sqrt(3) hat (i) - hat (j) volts/metre. A square frame LMNO of side 1 metre is shown in figure. The point N lies in x-y plane. The initial angle between line ON and x-axis is theta = 60^(@) The work done by electric field in taking a point charge of 1 muC from origin O to point M is -

The electric field intensity at all points in space is given by vecE = sqrt(3)hati - hatj volts//metre. The nature of equipotential lines is x-y plane is given by

The electric field in a region of space is given by E = (5 hat(i) + 2hat(j))N//C . The electric flux due to this field through an area 2m^(2) lying in the YZ plane, in S.I. unit is :-

If the electric field is given by vec(E) = 8 hat(i) + 4 hat(j) + 3 hat(k) NC^(-1) , calculate the electric flux through a surface of area 100 m^(2) lying in X-Y plane.

The electric field in a region of space is given bar(E)=E_(0)hat i+2E_(0)hat j where E_(0)=100N/C .The flux of this field through a circular surface of radius 0.02m parallel to the Y-Z plane is nearly:

The electric potential V at any point (x, y) in a plane is given by V=5x^(2)-4y^(2) volt. Find the magnitude of electric field intensity at the point (1m, 2m).

A square of side L meters lies in the x-y plane in a region, where the magnetic field is give by B = B_(0) (2 hati + 3 hat j + 4 hatk) T, where B_(0) is constant. The magnitude of flux passing through the square is