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- In [[mathematics]], an '''ordered field''' is a [[field (mathematics)|field]] which has a [[linear order]] structur Formally, ''F'' is an ordered field if there is a linear order ≤ on ''F'' which satisfies2 KB (314 words) - 02:23, 23 November 2008
- 113 bytes (16 words) - 16:24, 21 November 2008
- 271 bytes (31 words) - 11:54, 23 November 2008
- 860 bytes (137 words) - 11:55, 23 November 2008
Page text matches
- {{r|Ordered field}}226 bytes (28 words) - 17:33, 7 February 2009
- In [[mathematics]], an '''ordered field''' is a [[field (mathematics)|field]] which has a [[linear order]] structur Formally, ''F'' is an ordered field if there is a linear order ≤ on ''F'' which satisfies2 KB (314 words) - 02:23, 23 November 2008
- #REDIRECT [[Ordered field#Artin-Schreier theorem]]50 bytes (5 words) - 02:22, 23 November 2008
- #REDIRECT [[Ordered field#Artin-Schreier theorem]]50 bytes (5 words) - 02:22, 23 November 2008
- *[[Ordered field]]389 bytes (39 words) - 12:37, 4 January 2009
- {{r|Ordered field}}644 bytes (86 words) - 19:50, 11 January 2010
- {{r|Ordered field}}1 KB (169 words) - 19:54, 11 January 2010
- {{r|Ordered field}}692 bytes (91 words) - 16:33, 11 January 2010
- {{r|Ordered field}}1 KB (169 words) - 08:53, 22 December 2008
- {{r|Ordered field}}1 KB (146 words) - 16:32, 11 January 2010
- ...ism. This is harder to prove, and relies on the fact that '''R''' is an [[ordered field]], with a unique ordering defined by the [[positive]] real numbers, which a3 KB (418 words) - 12:18, 20 December 2008
- ...ally, the field of real numbers has the two basic properties of being an [[ordered field]], and having the [[least upper bound axiom|least upper bound]] property. T *The field '''R''' is [[ordered field|ordered]], meaning that there is a [[total order]] ≥ such that, for all19 KB (2,948 words) - 10:07, 28 February 2024