Proof of Gauss's Law: Difference between revisions
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In physics, Gauss's Law is one of Maxwell's four equations which describes how the electric field behaves around electric charges. Gauss's law can be derived from Coulomb's law, and vice versa. | |||
== Main Idea == | == Main Idea == |
Revision as of 18:41, 24 November 2016
Claimed by Dea Boyadjiev (Fall 2016)
In physics, Gauss's Law is one of Maxwell's four equations which describes how the electric field behaves around electric charges. Gauss's law can be derived from Coulomb's law, and vice versa.
Main Idea
There are 4 main components to Gauss's Law: 1) that the electric field is proportional with the inside charge by a constant of [math]\displaystyle{ \epsilon ^{-1} }[/math] 2) The size and the shape of the surface that you choose to enclose the charge do not affect Guass's Law. 3) Gauss's law works for any number of point charges within the closed surface. 4) Any charges that are found outside of the closed surface do not contribute to the net flux.
Proof of Gauss's Law
Gauss's law works backwards into finding out what charge is present inside a 3D surface, by looking at the pattern of the electric field. The properties of Gauss's law can be confirmed through the following proofs and examples.
We know that the formula for Gauss's law is the sum of the Electric field (perpendicular to the surface) multiplied by the area of the surface is equal to the total inside charge times [math]\displaystyle{ \epsilon ^{-1} }[/math].
The constant [math]\displaystyle{ \epsilon }[/math] can be confirmed by an experiment. When you choose to enclose a point charge by a sphere, the electric field is uniform around the entire surface of the sphere (assuming the point charge is in the center of the sphere). The electric field is also perpendicular at every point of the sphere because a point charge has an electric field pointing away from the charge in every direction (if it is positive). So the total electric flux is equal to [math]\displaystyle{ \frac{1}{4\pi \epsilon}\frac{q}{r^2}(4\pi r^2) }[/math]. When we set that equal to the inside charge times [math]\displaystyle{ k }[/math] (a constant) - we find that the constant must be [math]\displaystyle{ \epsilon ^{-1} }[/math].
The size of the surface doesn't matter, because the radius of both the surface as well as the radius of the electric field equation change simultaneously. They cancel each other out and the radius doesn't appear in the Gauss's law equation.
The shape of the surface doesn't matter either. The electric flux is the sum of all the electric perpendicular fields at a small area on the surface. The shape will not affect the results.
Any charges outside of the enclosed surface doesn't affect the result. It produces negative flux on the side of the surface that it is closest too, but it produces positive flux a the opposite side, so in the end it ends up cancelling each other out.
Connectedness
How is this topic connected to something that you are interested in? I like the idea that we can work backwards into finding the source of the electric field that is present. How is it connected to your major? It is not connected to industrial engineering, but the problem solving side of it is connected to really any engineering.