An imaginary cubical surface of side LL has its edges parallel to the xx-, yy- and zz-axes, one corner at the point xx = 0, yy = 0, zz = 0 and the opposite corner at the point x=Lx=L, y=Ly=L, z=Lz=L. The cube is in a region of uniform electric field E⃗ =E1i^+E2j^E→=E1i^+E2j^, where E1E1 and E2E2 are positive constants. Calculate the electric flux through the cube face in the plane xx = 0 and the cube face in the plane x=Lx=L. For each face the normal points out of the cube. Express your answers in terms of some or all of the variables E1E1E_1, E2E2E_2, and LLL separated by a comma.

An imaginary cubical surface of side LL has its edges parallel to the xx-, yy- and zz-axes, one corner at the point xx = 0, yy = 0, zz = 0 and the opposite corner at the point x=Lx=L, y=Ly=L, z=Lz=L. The cube is in a region of uniform electric field E⃗ =E1i^+E2j^E→=E1i^+E2j^, where E1E1 and E2E2 are positive constants. Calculate the electric flux through the cube face in the plane xx = 0 and the cube face in the plane x=Lx=L. For each face the normal points out of the cube. Express your answers in terms of some or all of the variables E1E1E_1, E2E2E_2, and LLL separated by a comma.

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Express your answers in terms of some or all of the variables E1E1E_1, E2E2E_2, and LLL separated by a comma.

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