Likelihood ratio: Difference between revisions

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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.

${\displaystyle {\text{Likelihood ratio}}={\frac {\mbox{probability of test result with disease}}{\mbox{probability of same result without disease}}}}$

${\displaystyle {\text{Likelihood ratio}}={\frac {\mbox{sensitivity}}{1-{\mbox{specificity}}}}}$

To calculate probabilities of disease using a likelihood ratio:

${\displaystyle {\text{Post-test odds}}={\text{Pre-test odds}}*{\text{Likelihood}}\ {\text{ratio}}}$

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

${\displaystyle {\text{Odds}}={\frac {\text{probability}}{(1-{\text{probability}})}}}$

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]

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]

${\displaystyle {\text{LR+}}={\frac {\text{sensitivity}}{(1-{\text{specificity}})}}}$

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]

${\displaystyle {\text{LR-}}={\frac {(1-{\text{sensitivity}})}{\text{specificity}}}}$

References