> Let's say a Mobius strip goes to infinity "feedback style" (in layman's > terms) while a line goes to two separate but equal infinities "linear > style." How many different infinities does that make according to > Cantor? One, two, or three?
No portion of the Mobius strip can go to infinity as it's bounded. Does "go to infinity feedback style" mean anything? The line can be consider to extend to a point at infinite.
Cantor did not deal with geometric infinity. His infinities are the cardinalities of sets.