Difference between revisions of "Well Ordering Principle"

m
m
Line 1: Line 1:
The '''Well Ordering Principle''' states that every nonempty set of positive integers contains a smallest member.
+
The '''Well Ordering Principle''' states that every nonempty set of positive integers contains a smallest member. The proof of this is simply common sense, but we can construct a formal proof by contradiction. Assume there is no smallest element. Then for each element in the set, there exists a smaller element, so if we take this smaller element, there must a different smaller element, and so on. Since the set is finite, we cannot continue like this infinitely many times, contradiction.
  
 
{{stub}}
 
{{stub}}
 
[[Category:Axioms]]
 
[[Category:Axioms]]

Revision as of 21:54, 14 July 2020

The Well Ordering Principle states that every nonempty set of positive integers contains a smallest member. The proof of this is simply common sense, but we can construct a formal proof by contradiction. Assume there is no smallest element. Then for each element in the set, there exists a smaller element, so if we take this smaller element, there must a different smaller element, and so on. Since the set is finite, we cannot continue like this infinitely many times, contradiction.

This article is a stub. Help us out by expanding it.