Odds ratio: Difference between revisions
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The '''odds ratio (OR)''' is | The '''odds ratio (OR)''' is the ''ratio'' of the ''odds'' of D (Disease) in the presence of V (Variant Allele) and the odds of D (Disease) in the absence of V (Variant Allele). Recall that odds and probability are slightly different in that... | ||
Ratio: N(D|V) / ( N(D|v) + N(D|~V) ) | |||
Prob: N(D|V) / ( N(D|v) + N(D|~V) ) | |||
This statistic attempts to quantify the strength of the association between A and B. | |||
If the OR is greater than 1, then A is considered to be associated with B in the sense that, compared to the absence of B, the presence of B raises the odds of A. | If the OR is greater than 1, then A is considered to be associated with B in the sense that, compared to the absence of B, the presence of B raises the odds of A. | ||
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Often the odds ratio is used to compare the occurrence of some outcome (A) in the presence of some exposure (B), with the occurrence of the outcome (A) in the absence of a particular exposure (absence of B). | Often the odds ratio is used to compare the occurrence of some outcome (A) in the presence of some exposure (B), with the occurrence of the outcome (A) in the absence of a particular exposure (absence of B). | ||
Two similar statistics that are often used to quantify associations are the '''[ | Two similar statistics that are often used to quantify associations are the '''[https://en.wikipedia.org/wiki/Risk_ratio risk ratio] (RR)''' and the '''[https://en.wikipedia.org/w/index.php?title=Absolute_risk_reduction absolute risk reduction] (ARR)'''. | ||
Often, the parameter of greatest interest is actually the RR, | Often, the parameter of greatest interest is actually the RR, | ||
Latest revision as of 18:29, 22 October 2018
The odds ratio (OR) is the ratio of the odds of D (Disease) in the presence of V (Variant Allele) and the odds of D (Disease) in the absence of V (Variant Allele). Recall that odds and probability are slightly different in that...
Ratio: N(D|V) / ( N(D|v) + N(D|~V) )
Prob: N(D|V) / ( N(D|v) + N(D|~V) )
This statistic attempts to quantify the strength of the association between A and B.
If the OR is greater than 1, then A is considered to be associated with B in the sense that, compared to the absence of B, the presence of B raises the odds of A.
Often the odds ratio is used to compare the occurrence of some outcome (A) in the presence of some exposure (B), with the occurrence of the outcome (A) in the absence of a particular exposure (absence of B).
Two similar statistics that are often used to quantify associations are the risk ratio (RR) and the absolute risk reduction (ARR).
Often, the parameter of greatest interest is actually the RR,
RR is the ratio of the probabilities analogous to the odds used in the OR. However, available data frequently do not allow for the computation of the RR or the ARR but do allow for the computation of the OR, as in case-control studies
The OR plays an important role in logistic regression (in the logistic function model, aka logit model; see also probit model, and sigmoid function)