A cube with sides L is located in such a way that one of its vertices coincides with the origin of our reference system. In the entire region there is an electric field given by (see image 1), where E_x and E_y are known constants, and x and y correspond to the distances from the origin to a point on the x and y axis, respectively. Find the electric field flux through each of the six faces of the cube and the total electric charge inside the cube. (see image 2)
A cube with sides L is located in such a way that one of its vertices coincides with the origin of our reference system. In the entire region there is an electric field given by (see image 1), where E_x and E_y are known constants, and x and y correspond to the distances from the origin to a point on the x and y axis, respectively. Find the electric field flux through each of the six faces of the cube and the total electric charge inside the cube. (see image 2)
Related questions
Question
A cube with sides L is located in such a way that one of its vertices coincides with the origin of our reference system. In the entire region there is an electric field given by (see image 1), where E_x and E_y are known constants, and x and y correspond to the distances from the origin to a point on the x and y axis, respectively. Find the electric field flux through each of the six faces of the cube and the total electric charge inside the cube. (see image 2)
Transcribed Image Text:dÃ
Z
JA
14+4
X
Transcribed Image Text:Ē
=
Exxx + Eyyŷ
Expert Solution
Step 1
Given that,
The electric field is
And the side of the cube is L
So the area of each face is
Since the electric flux passing through any surface is
Step by step
Solved in 6 steps with 1 images
