# Why does the vacuum permeability have the value of $\pi$ in it?

The vacuum permeability, or the capability of the vacuum to permit magnetic field lines, contains the value of $\pi$. Why? What does this have to do with the ratio of a circle's circumference to its diameter?

• Coulomb's Law is $\vec F = k \frac{q_1 q_2}{r^2} \hat{\vec r}$ for the force between two charges $q_1$ and $q_2$. $k$ is different in the various systems of units - essentially, it depends on how the unit of charge is defined.
• Ampere's Law is $\vec F = k' I_1 I_2 \oint_{C_1} \oint_{C_2} \frac{d\vec r_1 \times (d\vec r_2 \times \vec r)}{|r|^3}$ for the force between two currents along $C_1$ and $C_2$. $k'$ is different in the various systems of units - essentially, it depends on how the unit of current is defined.
In electrodynamics, we find out that $$k / k' = c^2$$ otherwise, we are free to choose. In CGS, we define $k = 1$, and in SI $k' = 10^{-7} \frac{Vs}{Am}$.
Now we introduce constants $$\mu_0 = 4\pi\, k', \quad \varepsilon_0 = \frac{1}{4\pi k}$$ That is nothing more than a definition - the factors of $4\pi$ simplify some formulas later on, e.g. when fields are integrated over the surface of a sphere.