Intensity of electric field at a perpendicular distance of 0.5 m from an infinitely long line charge having linear charge density `(lamda)` is `3.6 xx 10^(3) Vm^(-1)` . Find the value of `lamda`

Intensity of electric field at a point at a perpendicular distance .r. from an infinite line charge, having linear charge density .lambda. is given by :

The electric field at distance .r. from infinte line of charge ("having linear charge density" lambda) is

Find the electric flux (in S.I. unit) through the rectangular plate abcd of length l = 2m width L and whose centre is at a distance OP = x_(0) = L/2 from an infinite line of charge with linear charge density lambda = 1/(36 pi) xx 10^(-9) Cm^(-1) . Consider that the plate of the frame is perpendicular to line OP.

Electric field at a point of distance r from a uniformly charged wire of infinite length having linear charge density lambda is directly proportional to

The electric field due to a point charge at a distance 6 m from it is 630 N/C. The magnitude of the charge is

Find the electric field at the centre of a uniformly charged semicircular ring of radius R. Linear charge density is lamda

Find the electric field due to an infinitely long cylindrical charge distribution of radius R and having linear charge density lambda at a distance half of the radius from its axis.

Let E_1(r) , E_2(r) and E_3(r) be the respectively electric field at a distance r from a point charge Q , an infinitely long wire with constant linear charge density lambda , and an infinite plane with uniform surface charge density sigma . If E_1(r_0)=E_2(r_0)=E_3(r_0) at a given distance r_0 , then

Find the electric flux crossing the wire frame ABCD of length l, width b, and center at a distance OP = d from an infinite line of charge with linear charge density lambda . Consider that the plane of the frame is perpendicular to the line OP

An electric dipole consists of charges +- 2.0 xx 10^(-8) C separated by distance of +- 2.0 xx 10^(-3) m. It is placed at a distance of 6 cm from a line charge of linear charge density 4.0 xx 10^(-4) Cm^(-1) as shown in figure such that the dipole makes an angle of theta = 60^@ with line AB. Find the force acting on the dipole.