Well-Ordering Theorem
From Conservapedia - Reading time: 1 min
The Well-Ordering Theorem was proved by Zermelos in 1904, and it states:
Every set can be well-ordered.
This result surprised mathematicians everywhere. The Well-Ordering Theorem is equivalent of the Axiom of Choice, and no well-ordering relation has ever been explicitly constructed for uncountable sets. Thus, the mathematicians who reject the Axiom of Choice also reject this theorem.
Licensed under CC BY-SA 3.0 | Source: https://www.conservapedia.com/Well-Ordering_Theorem12 views | Status: cached on February 03 2024 14:13:58↧ Download this article as ZWI file
EncycloReader
is supported by the 
KSF