To find the exact (ish) perimeter of a circle, we simply multiply the diameter by a ratio we have defined as being equal to the circumference / the diameter, known as $\pi$.
My question is, why do we not just do something similar for an ellipse, such that for each eccentricity there exists a unique $\pi$ value, which when multiplied by the semimajor + semiminor axes gives the circumference? Would this not be a suitable way of calculating the perimeter?
This could perhaps be done by defining a functin $f(x)$ which when the eccentricity is inputted, yields the corresponding "$\pi$" value for that eccentricity, such that the general equation for the perimeter of an ellipse is $f(x)(a+b)$.