Logistic regression: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Robert Badgett
No edit summary
imported>Robert Badgett
No edit summary
Line 1: Line 1:
{{subpages}}{{TOC-right}}
{{subpages}}{{TOC-right}}
In [[statistics]] and [[epidemiology]], '''logistic regression''' is a method of multivariable [[regression analysis]] which "describe the relationship between a qualitative dependent variable (that is, one which can take only certain discrete values, such as the presence or absence of a disease) and an independent variable. A common application is in epidemiology for estimating an individual's risk (probability of a disease) as a function of a given risk factor."<ref>{{MeSH}}</ref>
In [[statistics]] and [[epidemiology]], '''logistic regression''' is a method of multivariable [[regression analysis]] which "describe the relationship between a qualitative dependent variable (that is, one which can take only certain discrete values, such as the presence or absence of a disease) and an independent variable. A common application is in epidemiology for estimating an individual's risk (probability of a disease) as a function of a given risk factor."<ref>{{MeSH}}</ref><ref name="isbn0-07-141017-1">{{cite book |author=Trapp, Robert; Beth Dawson |authorlink= |editor= |others= |title=Basic & clinical biostatistics |chapter=Chapter 10. Statistical Methods for Multiple Variables|chapterurl=http://www.accessmedicine.com/content.aspx?aID=2048525|edition= |language= |publisher=Lange Medical Books/McGraw-Hill |location=New York |year=2004 |origyear= |pages= |quote= |isbn=0-07-141017-1 |oclc= |doi= |url=http://www.accessmedicine.com/resourceTOC.aspx?resourceID=62 |accessdate=|id={{LCC|QH323.5 .D38}}{{LCCN|2005|283|263}}}}</ref>
 
A regression coefficient can be converted into [[odds ratio]]s or [[relative risk]]s by:<ref name="isbn0-07-141017-1">{{cite book |author=Trapp, Robert; Beth Dawson |authorlink= |editor= |others= |title=Basic & Clinical Biostatistics |chapter=Chapter 10. Statistical Methods for Multiple Variables|chapterurl=http://www.accessmedicine.com/content.aspx?aID=2048525|edition= |language= |publisher=Lange Medical Books/McGraw-Hill |location=New York |year=2004 |origyear= |pages= |quote= |isbn=0-07-141017-1 |oclc= |doi= |url=http://www.accessmedicine.com/resourceTOC.aspx?resourceID=62 |accessdate=|id={{LCC|QH323.5 .D38}}{{LCCN|2005|283|263}}}}</ref>
 
:<math>\mbox{odds ratio} =  e^\beta \mbox{, where } \beta \mbox{ is a regression coefficient}.\,\!</math>


==References==
==References==
<references/>
<references/>

Revision as of 21:26, 1 March 2009

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

Template:TOC-right

In statistics and epidemiology, logistic regression is a method of multivariable regression analysis which "describe the relationship between a qualitative dependent variable (that is, one which can take only certain discrete values, such as the presence or absence of a disease) and an independent variable. A common application is in epidemiology for estimating an individual's risk (probability of a disease) as a function of a given risk factor."[1][2]

A regression coefficient can be converted into odds ratios or relative risks by:[2]

References

  1. Anonymous (2024), Logistic regression (English). Medical Subject Headings. U.S. National Library of Medicine.
  2. 2.0 2.1 Trapp, Robert; Beth Dawson (2004). “Chapter 10. Statistical Methods for Multiple Variables”, Basic & clinical biostatistics. New York: Lange Medical Books/McGraw-Hill. LCC QH323.5 .D38LCCN 2005-263. ISBN 0-07-141017-1.  Cite error: Invalid <ref> tag; name "isbn0-07-141017-1" defined multiple times with different content