Law of truly large numbers

For a simplified example of the law, assume that a given event happens with a probability for its occurrence of 0.1%, within a single trial. Then, the probability that this so-called unlikely event does not happen (improbability) in a single trial is 99.9% (0.999).

Already for a sample of 1000 independent trials, however, the probability that the event does not happen in any of them, even once (improbability), is only[5] 0.999¹⁰⁰⁰ ≈ 0.3677 = 36.77%. Then, the probability that the event does happen, at least once, in 1000 trials is 1 − 0.999¹⁰⁰⁰ ≈ 0.6323 or 63.23%. This means that this "unlikely event" has a probability of 63.23% of happening if 1000 independent trials are conducted, or over 99.9% for 10,000 trials.

The probability that it happens at least once in 10,000 trials is 1 − 0.999¹⁰⁰⁰⁰ ≈ 0.99995 = 99.995%. In other words, a highly unlikely event, given enough trials with some fixed number of draws per trial, is even more likely to occur.

This calculation can be generalized, formalized to use in straightforward mathematical proof that: "the probability c for the less likely event X to happen in N independent trials can become arbitrarily near to 1, no matter how small the probability a of the event X in one single trial is, provided that N is truly large."[6]

The law comes up in criticism of pseudoscience and is sometimes called the Jeane Dixon effect (see also Postdiction). It holds that the more predictions a psychic makes, the better the odds that one of them will "hit". Thus, if one comes true, the psychic expects us to forget the vast majority that did not happen (confirmation bias).[7] Humans can be susceptible to this fallacy.

Another similar (to some degree) manifestation of the law can be found in gambling, where gamblers tend to remember their wins and forget their losses,[8] even if the latter far outnumbers the former (though depending on a particular person, the opposite may also be truth when they think they need more analysis of their losses to achieve fine tuning of their playing system[9]). Mikal Aasved links it with "selective memory bias", allowing gamblers to mentally distance themselves from the consequences of their gambling[9] by holding an inflated view of their real winnings (or losses in the opposite case - "selective memory bias in either direction").

• Weisstein, Eric W. "Law of truly large numbers". MathWorld.
• Diaconis, P.; Mosteller, F. (1989). "Methods of Studying Coincidences" (PDF). Journal of the American Statistical Association. 84 (408): 853–61. doi:10.2307/2290058. JSTOR 2290058. MR 1134485. Archived from the original (PDF) on 2010-07-12. Retrieved 2009-04-28.
• Everitt, B.S. (2002). Cambridge Dictionary of Statistics (2nd ed.). ISBN 978-0521810999.
• David J. Hand, (2014), The Improbability Principle: Why Coincidences, Miracles, and Rare Events Happen Every Day

• Math Explains Likely Long Shots, Miracles and Winning the Lottery (Excerpt) in Scientific American by David Hand 2014
• skepdic.com on the Law of Truly Large Numbers
• on the Law of Truly Large Numbers
• The On-Line Encyclopedia of Integer Sequences – related integer sequence