Archimedean

From Conservapedia
This is an old revision of this page, as edited by Aschlafly (Talk | contribs) at 14:01, 17 September 2011. It may differ significantly from current revision.

Jump to: navigation, search

A ring R is said to be Archimedean if the ring is ordered, has a metric and for all in R, x non-zero, there exists in the natural numbers such that . Here concatentation with denotes adding times. Informally, a ring is Archimedean if it has no infinitely small or infinitely large elements. Examples of Archimedean rings include the real numbers and the rational numbers. Examples of non-Archimedean are less simple.