Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q791258> ?p ?o }
Showing triples 1 to 27 of
27
with 100 triples per page.
- Q791258 subject Q7139537.
- Q791258 subject Q8266681.
- Q791258 subject Q8817205.
- Q791258 abstract "In statistics, Basu's theorem states that any boundedly complete sufficient statistic is independent of any ancillary statistic. This is a 1955 result of Debabrata Basu.It is often used in statistics as a tool to prove independence of two statistics, by first demonstrating one is complete sufficient and the other is ancillary, then appealing to the theorem. An example of this is to show that the sample mean and sample variance of a normal distribution are independent statistics, which is done in the Examples section below. This property (independence of sample mean and sample variance) characterizes normal distributions.".
- Q791258 wikiPageWikiLink Q1099110.
- Q791258 wikiPageWikiLink Q12212581.
- Q791258 wikiPageWikiLink Q12483.
- Q791258 wikiPageWikiLink Q133871.
- Q791258 wikiPageWikiLink Q175199.
- Q791258 wikiPageWikiLink Q176623.
- Q791258 wikiPageWikiLink Q192276.
- Q791258 wikiPageWikiLink Q2532735.
- Q791258 wikiPageWikiLink Q2796622.
- Q791258 wikiPageWikiLink Q2937829.
- Q791258 wikiPageWikiLink Q378542.
- Q791258 wikiPageWikiLink Q467040.
- Q791258 wikiPageWikiLink Q4753046.
- Q791258 wikiPageWikiLink Q5247806.
- Q791258 wikiPageWikiLink Q599876.
- Q791258 wikiPageWikiLink Q625303.
- Q791258 wikiPageWikiLink Q670653.
- Q791258 wikiPageWikiLink Q7139537.
- Q791258 wikiPageWikiLink Q7418720.
- Q791258 wikiPageWikiLink Q8266681.
- Q791258 wikiPageWikiLink Q8817205.
- Q791258 comment "In statistics, Basu's theorem states that any boundedly complete sufficient statistic is independent of any ancillary statistic. This is a 1955 result of Debabrata Basu.It is often used in statistics as a tool to prove independence of two statistics, by first demonstrating one is complete sufficient and the other is ancillary, then appealing to the theorem.".
- Q791258 label "Basu's theorem".