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| ==Origin== | | ==Origin== |
− | [http://nordan.daynal.org/wiki/index.php?title=English#ca._1100-1500_.09THE_MIDDLE_ENGLISH_PERIOD Middle English] subordinat, from Medieval Latin subordinatus, past participle of subordinare to subordinate, from [[Latin]] sub- + ordinare to [[order]] — more at [[ordain]] | + | [https://nordan.daynal.org/wiki/index.php?title=English#ca._1100-1500_.09THE_MIDDLE_ENGLISH_PERIOD Middle English] subordinat, from Medieval Latin subordinatus, past participle of subordinare to subordinate, from [[Latin]] sub- + ordinare to [[order]] — more at [[ordain]] |
− | *[http://en.wikipedia.org/wiki/15th_century 15th Century] | + | *[https://en.wikipedia.org/wiki/15th_century 15th Century] |
| ==Definitions== | | ==Definitions== |
| :''Adjective'' | | :''Adjective'' |
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| *2: to treat as of less [[value]] or importance <stylist … whose crystalline [[prose]] subordinates [[content]] to [[form]] | | *2: to treat as of less [[value]] or importance <stylist … whose crystalline [[prose]] subordinates [[content]] to [[form]] |
| ==Description (Ranking)== | | ==Description (Ranking)== |
− | A '''ranking''' is a [[relationship]] between a set of items such that, for any two items, the first is either 'ranked higher than', 'ranked lower than' or 'ranked equal to' the second. In [[mathematics]], this is known as a [http://en.wikipedia.org/wiki/Strict_weak_ordering#Total_preorders weak order or total preorder] of objects. It is not necessarily a total order of objects because two [[different]] objects can have the same ranking. The rankings themselves are totally ordered. For example, [[materials]] are totally preordered by [http://en.wikipedia.org/wiki/Hardness_(materials_science) hardness], while [[degrees]] of hardness are totally ordered. | + | A '''ranking''' is a [[relationship]] between a set of items such that, for any two items, the first is either 'ranked higher than', 'ranked lower than' or 'ranked equal to' the second. In [[mathematics]], this is known as a [https://en.wikipedia.org/wiki/Strict_weak_ordering#Total_preorders weak order or total preorder] of objects. It is not necessarily a total order of objects because two [[different]] objects can have the same ranking. The rankings themselves are totally ordered. For example, [[materials]] are totally preordered by [https://en.wikipedia.org/wiki/Hardness_(materials_science) hardness], while [[degrees]] of hardness are totally ordered. |
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− | By reducing detailed [[measures]] to a [[sequence]] of [http://en.wikipedia.org/wiki/Ordinal_numbers ordinal numbers], rankings make it possible to [[evaluate]] [[complex]] [[information]] according to certain criteria. Thus, for example, an Internet search engine may rank the pages it finds according to an estimation of their [http://en.wikipedia.org/wiki/Relevance relevance], making it possible for the user quickly to select the pages they are likely to want to see. | + | By reducing detailed [[measures]] to a [[sequence]] of [https://en.wikipedia.org/wiki/Ordinal_numbers ordinal numbers], rankings make it possible to [[evaluate]] [[complex]] [[information]] according to certain criteria. Thus, for example, an Internet search engine may rank the pages it finds according to an estimation of their [https://en.wikipedia.org/wiki/Relevance relevance], making it possible for the user quickly to select the pages they are likely to want to see. |
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− | [[Analysis]] of [[data]] obtained by ranking commonly requires [http://en.wikipedia.org/wiki/Non-parametric_statistics non-parametric statistics].[http://en.wikipedia.org/wiki/Ranking] | + | [[Analysis]] of [[data]] obtained by ranking commonly requires [https://en.wikipedia.org/wiki/Non-parametric_statistics non-parametric statistics].[https://en.wikipedia.org/wiki/Ranking] |
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| [[Category: General Reference]] | | [[Category: General Reference]] |