It is, of course, more than unsettling to realize that a collection of objects with area equal to zero has a non-zero real number representing the collective area…but that’s an issue for real “foundations of mathematics” buffs.
It is, of course, more than unsettling to realize that a collection of objects with area equal to zero has a non-zero real number representing the collective area…but that’s an issue for real “foundations of mathematics” buffs.
Notice, too, that we did not talk about area for the finite geometries...