In a region of space, the electric field is in the x-direction and proportional to x, i.e. `vec(E)=E_(0)xhati`.
Consider an imaginary cubical volume of edge a, with its edges parellel to the axes of coordinates. What is the charge enclosed by this volume ?

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 parallel to the axes of coordinates. The charge inside this volume will be

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 magnetic field existing in a region is given by vecB =B_0(1+(x)/(l))vec k. A square loop of edge l and carrying a current I, is placed with its edges parallel to the x-y axes. Find the magnitude of the net magnetic force experienced by the loop.

The magnetic field existing in a region is gicen by vecB =B_0(1+(x)/(l))vec k. A square loop of edge l and carrying a current I, is placed with its edges parallel to the x-y axes. Find the magnitude of the net magnetic force experienced by the loop.

In a region of space uniform electric field is present as vec(E)=E_(0)hat(i) and uniform magnetci field is present as vec(B)=-B_(0)hat(j) . An electron is released from rest at origin. What is the path followed by electron after released. (E_(0) & B_(0) are positive constants )

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.

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.

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 .

There is and electric field E in the +x direction. If the work done by the electric field in moving a charges 0.2C through a distance of 2m along a line making an angle of 60^(@) with the x-axis is 1.0J , what is the value of E in NC^(-1) ?