An electric field exists in space. A cube of side is placed in the space. The electric flux through the cube is:
- A
- B
- C
- D
An electric field exists in space. A cube of side is placed in the space. The electric flux through the cube is:
Correct answer:C
Standard Method
Given: Electric field is and the cube has side .
Find: The total electric flux through the cube.
Using Gauss's law for flux through a closed surface,
Since the field is only along the -direction, faces perpendicular to the and axes contribute zero flux.
Consider the cube from to . The two relevant faces are at and . Area of each face is
For the face at ,
So the flux through this face is
For the face at ,
Hence the flux through this face is
Therefore, total flux through the cube is
The correct option is C.
Face-to-face flux difference
Given: and cube side .
Find: Net flux through the cube.
Only the left and right faces contribute because the field has no or component. So directly use
with
Substituting,
Therefore, the correct option is C.
Students often add contributions from all six faces. This is wrong because has no component normal to the faces perpendicular to the and axes. Only the two faces normal to the -axis contribute.
A common mistake is taking the field to be constant everywhere as . This is wrong because the field depends on position . Evaluate separately at and .
Some students ignore the outward area direction and write both face contributions with the same sign. For a closed surface, flux depends on . Use outward normals and then add the signed contributions correctly.
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