In probability theory and statistics the

**odds**in favor of an event or a proposition are the quantity

*p*/(1 −

*p*), where

*p*is the probability of the event or proposition. The logarithm of the odds is the logit of the probability.

Odds have long been the standard way of representing probability used by bookmakers, though the method of presenting odds varies by location.

Taking an event with a 1 in 5 probability of occuring (i.e. 0.2 or 20%), then the odds are 0.2/0.8=**0.25**. If you bet 1 at fair odds and the event occurred, you would recieve back 4 plus your original 1 stake. This would be presented by a British bookmaker as odds of 4 to 1 against (written as 4/1), by a European bookmaker as 5.0 to include the returned stake, and by an American bookmaker as +400 representing the gain from a 100 stake.

By contrast, for an event with a 4 in 5 probability of occuring (i.e. 0.8 or 80%), then the odds are 0.8/0.2=**4**. If you bet 4 at fair odds and the event occurred, you would recieve back 1 plus your original 4 stake. This would be presented by a British bookmaker as odds of 4 to 1 on (written as 1/4), by a European bookmaker as 1.25 to include the returned stake, and by an American bookmaker as −400 representing the stake necessary to gain 100.

The odds are a ratio of probabilities; an odds-ratio is a ratio of odds, i.e., a ratio of ratios of probabilities. Odds-ratios are often used in analysis of clinical trials.