So it would seem that an important part of if a complete set of infinite numbers is to define what it means to be a complete set? We didn’t do very well with defining a point, can we please define this. How is it complete, but not indicating a stop or an end?
It appears to me, that these sets are just loosely defined, or openly defined but how does that translate to the real world, and how can that be completed if it is open?
It appears to me, that these sets are just loosely defined, or openly defined but how does that translate to the real world, and how can that be completed if it is open?
It is said that an argument is what convinces reasonable men and a proof is what it takes to convince even an unreasonable man. - Alexander Vilenkin
If I am shown my error, I will be the first to throw my books into the fire. - Martin Luther
If I am shown my error, I will be the first to throw my books into the fire. - Martin Luther
