Under what circumstances or axioms do spheres (the shape) have (theoretically or axiomatically) infinite surface area?

sopularity_fax@sopuli.xyz · edit-2 12 hours ago

Under what circumstances or axioms do spheres (the shape) have (theoretically or axiomatically) infinite surface area?

ch00f@lemmy.world · 11 hours ago

https://en.wikipedia.org/wiki/Banach–Tarski_paradox

mumblerfish@lemmy.world · 11 hours ago

one can further prove that the sphere S**n−1 can be partitioned into as many pieces as there are real numbers (that is, ${isplaystyle 2^{leph {0}}}$ pieces)

Would the answer to OP be some argument along the lines of defining the surface area of the ball as the sum of the partitioned balls surface areas then?

ch00f@lemmy.world · 11 hours ago

IDK what OP is even going on about. This just seemed relevant.