Now one could have seen the specialness of 10 and its multiplications of 10^x , for x a counting number, for that 10 base is the maximum number for which we have zero digits involved and only a singular "1".
So we already knew that, that no other number as base except for (2*5) yields the maximum zeros.
So did we have to find out that the 10 Maxwell Equations are the full Maxwell Equations and symmetrical to know that 10 is special? I think so, because I think that we can derive the fact that 2*5 is special to the Maxwell Equations.
In other words the uniqueness of 10 as the maximum zero accumulator comes from the Maxwell Equations.