May I throw geometry’s hat into the ring? If you consider things like complex numbers and quarternions, or even vectors, what we have are two-or-more dimensional numbers.
I propose that units are a generalization of dimension beyond spatial dimensions, and therefore geometry is their progenitor.
May I throw geometry’s hat into the ring? If you consider things like complex numbers and quarternions, or even vectors, what we have are two-or-more dimensional numbers.
I propose that units are a generalization of dimension beyond spatial dimensions, and therefore geometry is their progenitor.
It’s a mathematical Maury Povich situation.
I think the idea of coordinates makes a very clear link between dimensionality and algebraic variables, so I can definitely see this, yes.