Likelihood ratio: Difference between revisions

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:<math>\text{LR-} = \frac{(1-\text{sensitivity})}{\text{specificity}}</math>
:<math>\text{LR-} = \frac{(1-\text{sensitivity})}{\text{specificity}}</math>
==Facilitating interpretation==
Interpreting likelihood ratios by physicians is difficult and likelihood ratios do not improve upon sensitivity and specificity for helping physicians.<ref name="pmid16061916">{{cite journal| author=Puhan MA, Steurer J, Bachmann LM, ter Riet G| title=A randomized trial of ways to describe test accuracy: the effect on physicians' post-test probability estimates. | journal=Ann Intern Med | year= 2005 | volume= 143 | issue= 3 | pages= 184-9 | pmid=16061916 | doi= | pmc= | url=http://www.ncbi.nlm.nih.gov/entrez/eutils/elink.fcgi?dbfrom=pubmed&tool=sumsearch.org/cite&retmode=ref&cmd=prlinks&id=16061916  }} </ref>
Categorizing likelihood ratios based on strength may help.<ref name="pmid12213147">{{cite journal| author=McGee S| title=Simplifying likelihood ratios. | journal=J Gen Intern Med | year= 2002 | volume= 17 | issue= 8 | pages= 646-9 | pmid=12213147 | doi= | pmc= | url=http://www.ncbi.nlm.nih.gov/entrez/eutils/elink.fcgi?dbfrom=pubmed&tool=sumsearch.org/cite&retmode=ref&cmd=prlinks&id=12213147  }} </ref><ref name="pmid19018928">{{cite journal| author=Moreira J, Bisoffi Z, Narváez A, Van den Ende J| title=Bayesian clinical reasoning: does intuitive estimation of likelihood ratios on an ordinal scale outperform estimation of sensitivities and specificities? | journal=J Eval Clin Pract | year= 2008 | volume= 14 | issue= 5 | pages= 934-40 | pmid=19018928 | doi=10.1111/j.1365-2753.2008.01003.x | pmc= | url=http://www.ncbi.nlm.nih.gov/entrez/eutils/elink.fcgi?dbfrom=pubmed&tool=sumsearch.org/cite&retmode=ref&cmd=prlinks&id=19018928  }} </ref>


==References==
==References==

Revision as of 19:29, 15 August 2012

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In diagnostic tests, the likelihood ratio is the likelihood that a clinical sign is in a patient with disease as compared to a patient without disease.

To calculate probabilities of disease using a likelihood ratio:

This is a form of Bayes' theorem from probability theory. In this form the theorem is called Bayes' rule.

Comparing likelihoods (or odds) is different than comparing percentages. (or probabilities).

The likelihood ratio is an alternative to sensitivity and specificity for the numeric interpretation of diagnostic tests. In a randomized controlled trial that compared the two methods, physicians were able to use both similarly although the physicians had trouble with both methods.[1]

In mathematical statistics, the likelihood ratio is the ratio of the probabilities, or probability densities, of given data, under two different probability models. In probability theory the likelihood ratio goes by the name of Radon-NIkodym derivative.

In Bayesian statistics the likelihood ratio is often called the Bayes' factor.

Calculations

Likelihood ratios are related to sensitivity and specificity.

The positive likelihood ratio (LR+) measures the likelihood of a finding being present in patient with the disease. A large LR+, for example a value more than 10, helps rule in disease.[2]

The negative likelihood ratio (LR-) measures the likelihood of a finding being absent in patient with the disease. A small LR-, for example a value less than 0.1, helps rule out disease.[2]

Facilitating interpretation

Interpreting likelihood ratios by physicians is difficult and likelihood ratios do not improve upon sensitivity and specificity for helping physicians.[1]

Categorizing likelihood ratios based on strength may help.[2][3]

References

  1. 1.0 1.1 Puhan MA, Steurer J, Bachmann LM, ter Riet G (August 2005). "A randomized trial of ways to describe test accuracy: the effect on physicians' post-test probability estimates". Ann. Intern. Med. 143 (3): 184–9. PMID 16061916[e] Cite error: Invalid <ref> tag; name "pmid16061916" defined multiple times with different content
  2. 2.0 2.1 2.2 McGee S (August 2002). "Simplifying likelihood ratios". J Gen Intern Med 17 (8): 646–9. DOI:10.1046/j.1525-1497.2002.10750.x. PMID 12213147. Research Blogging. Cite error: Invalid <ref> tag; name "pmid12213147" defined multiple times with different content Cite error: Invalid <ref> tag; name "pmid12213147" defined multiple times with different content
  3. Moreira J, Bisoffi Z, Narváez A, Van den Ende J (2008). "Bayesian clinical reasoning: does intuitive estimation of likelihood ratios on an ordinal scale outperform estimation of sensitivities and specificities?". J Eval Clin Pract 14 (5): 934-40. DOI:10.1111/j.1365-2753.2008.01003.x. PMID 19018928. Research Blogging.