This demo provides a comprehensive look at the core principles behind Gauss's Law and the Divergence Theorem. You'll learn to visually interpret electric flux as the amount of electric field passing through a surface and see how it is directly proportional to the total enclosed charge—a key concept of Gauss's Law in its integral form. The demo highlights the Divergence Theorem as the critical link between this integral form and the differential form of Gauss's Law, which is one of Maxwell's equations. Finally, it illustrates the behavior of electric field lines, showing how they originate from positive charges and terminate on negative ones, and reinforces that the net electric flux through a closed surface is determined solely by the charge it encloses, regardless of outside charges or the surface's shape.
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