Understanding Gauss's Law

Maxwell’s equations describe the dynamics of the electric and magnetic fields. At the end of this series we will set the charge equal to zero and derive a wave equation that happens to travel at the speed of light. That wave turns out to be actual light!

Gauss’ Law: $$\nabla \cdot \boldsymbol{E} = 4 \pi \rho$$

To understand this, let’s start with \( \boldsymbol{E} \), the electric field. The electric field is a function that attaches an electric force vector to every point in space:

$$\boldsymbol{E} : \mathbb{R}^3 \to \mathbb{R^3}$$

Another way to think about this is if you have a coordinate system and the point \((x,y,z)\), then \(\boldsymbol{E}(x,y,z)\) is the electric force vector at that point in space

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