The volume charge density as a function of distance X from one face inside a unit cube is varying as shown in the figure. Find the total flux (in S.I. units) through the cube `("If "rho_(0)=8.85xx10^(-12) C//m^(3))`.

The volume charge density as a function of distance X from one face inside a unit cube is varying as shown in the figure. Then the total flux (in S.I. units) through the cube if (rho_(0)=8.85xx10^(-12)C//m^(3)) is :

An infinite wire having charge density lambda passes through one of the edges of a cube having length l. find the total flux passing through the cube

A point charge of 4.427 mu C is at the centre of a cube Gaussian surface 9.0 cm on the edge. Find the net electric flux through the surface. ( epsilon_0=8.854xx10^(-12)C^2 N^(-1) m^(-2) )

Flux (in S.I. units) coming out and eantering a closed surface is shown in the figure. Find charge enclosed by the closed surface.

Two infinite line charges each having uniform charges density lamdba .pass through the mid points of two pairs of opposite faces of a cube of edge L as shown in figure .The modulue of the total electric flux due to the both the line charges through the face

Two infinite line charges, each having a uniform density lambda . Pass through the midpoints of two pairs of opposite faces of a cube of edge L as shown in figure. The modulus of the total electric flux due to both the line charges through the face is ABCD is lambda L//(k epsilon_(0)) find the value of k ?

Two infinite line charges, each having a uniform density lambda . Pass through the midpoints of two pairs of opposite faces of a cube of edge L as shown in figure. The modulus of the total electric flux due to both the line charges through the face is ABCD is lambda L//(k epsilon_(0)) find the value of k ?

A thin straight rod of length I, has uniform linear charge density lambda . Moving at a constant speed v, the rod enters a cube of sides having length L through its left fae and leaves through the right face as shown in the figure Find the maximum electric flux through the cube.