In a region of space the electric field in the `x`-direction and proportional to `x`i.e., `vec(E )=E_(0)xhat(i)`. Consider an imaginary cubical volume of edge a with its parallel to the axes of coordinates. The charge inside this volume will be

In a region of space the electric field in the x -direction and proportional to x i.e., vec(E )=E_(0)xhat(i) . Consider an imaginary cubical volume of edge a with its sides parallel to the axes of coordinates. The charge inside this volume will be

The electric fields in a region is given by vec(E)=E_(0)(x)/(L)hat(i) ,Find the charge contained inside a cubical volume bounded by the surface x=0,x=L,y=0,y=L,z=0,z=L .

In a uniform electric field E if we consider an imaginary cubical closed surface of side a, then find the net flux through the cube ?

The electric field in a certain region is given by vec(E) = ((K)/(x^(3)))vec(i) . The dimensions of K are -

The electric field in a region is given by vec(E)=E_(0)x hat(i) . The charge contained inside a cubical volume bounded by the surface x=0, x=2m, y=0, y=2m, z=0 and z=2m is n epsi_(0)E_(0) . Find the va,ue of n.

In a certain region of space, the electric field always pointing in x - direction but its magnitude decreases from E = 560 N/Cat x =0 to E = 410 N/C at x =25m if a cubical box of side length I = 25 m is oriented, such that its four sides are parallel to the field lines, then charge enclosed by the box is......

In a certain region of space the electric field increases radially as vec E=90r(-hat r) .The electric charge contained within a sphere of radius 2m centred at the origin is:

The electric field in a region is given by vec (E ) = (E_(0))/(a) x hat(i) . Find the electric flux passing through a cubical volume bounded by the surfaces x = 0 , x = a , y = 0 , y = a , z = 0 and z = a .

The electric field in a cubical volume is vecE = E_0 (1+z/a) hati + E_0(z/a)hatj Each edge of the cube measures d, and one of the corners lies at the origin of the coordinates. Determine the net charge within the cube.

Electric field in a region of space is given by vec E=ayhat i+axhat j then