ZapperZ said:
v = \frac{1}{\sqrt{\mu_0 \epsilon_0}}
then the value of c=v pops right out since the the value of permittivity and permeability of free space can be measured separately.
Zz.
Now this I don't understand. How do you measure permittivity and permeability of free space? These quantities are "artifacts" of a somewhat unnatural (but useful for everyday life of electricians) choice of units.
In the SI of units, the basic electromagnetic unit is that of electric current. It's defined by the magnitude of the force, acting between two parallel straight infinitely long wires of 0 thickness at a distance of 1 m. The current through this wires is by definition 1 A (1 Ampere) if this force per unit length of the wires is 2 \cdot 10^{-7} \; \mathrm{N}).
Since this force is, in the SI unit system, given by
F=\mu_0 \frac{I_1 I_2 l}{2 \pi r}
from the definition of the Ampere it follows
2 \cdot 10^{-7} \mathrm{N} = \frac{\mu_0}{2 \pi} {\mathrm{A}^2}
or
\mu_0=4 \pi 10^{-7} \frac{\mathrm{N}}{\mathrm{A}^2}.
Then one defines the unit of charge by: "1C is the amount of electric charge flowing through a unit surface within 1 second, if the particles run perpendicular to that unit surface and together make a current of 1 A."
The Coulomb force law then reads, in SI units, by definition
F=\frac{q_1 q_2}{4 \pi \epsilon_0 r^2}.
From this the Maxwell equations turn out to be consistent only, if
\epsilon_0=\frac{1}{c^2 \mu_0}.
Through high-precision measurements it turns out that, to an amazing accuracy, the velocity of light is identical with the upper boundary for signal velocities in relativisic space-time. Thus, nowadays within the SI the speed of light has a defined exact value, defining that light travels a certain distance within 1 second. In this way, the SI of units uses very fundamental properties of space time to define the unit of length (metre) from the unit of time by fixing arbitrarily the value of the fundamental velocity in Minkowski space. Since \mu_0 is as arbitrarily defined to set the unit of electric current to a certain value, also \epsilon_0 is arbitrarily set to the above given value. All these "fundamental constants" are thus just used to define arbitrary units for length, time, mass (inherent in the definition of the unit of force, Newton), and electric current.
From the point of view of fundamental laws of nature, the quantities c, \epsilon_0, and \mu_0 are just arbitrary settings for convenient use of men in everyday life. For fundamental physics, it's much better to set all of the to 1 and just use one arbitrary unit of length (or time, mass, energy,...) to define everything else.
If you take into account also gravity, you can also eliminate this last arbitrariness and measure lengths in Planck units.
