Probability distribution
Geometric
Probability mass function |
Cumulative distribution function |
Parameters |
success probability (real) |
success probability (real) |
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Support |
k trials where |
k failures where |
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PMF |
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CDF |
for , for |
for , for |
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Mean |
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Median |
(not unique if is an integer) |
(not unique if is an integer) |
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Mode |
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Variance |
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Skewness |
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Excess kurtosis |
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Entropy |
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MGF |
for |
for |
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CF |
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PGF |
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Fisher information |
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In probability theory and statistics, the geometric distribution is either one of two discrete probability distributions:
- The probability distribution of the number of Bernoulli trials needed to get one success, supported on ;
- The probability distribution of the number of failures before the first success, supported on .
These two different geometric distributions should not be confused with each other. Often, the name shifted geometric distribution is adopted for the former one (distribution of ); however, to avoid ambiguity, it is considered wise to indicate which is intended, by mentioning the support explicitly.
The geometric distribution gives the probability that the first occurrence of success requires independent trials, each with success probability . If the probability of success on each trial is , then the probability that the -th trial is the first success is
for
The above form of the geometric distribution is used for modeling the number of trials up to and including the first success. By contrast, the following form of the geometric distribution is used for modeling the number of failures until the first success:
for
The geometric distribution gets its name because its probabilities follow a geometric sequence. It is sometimes called the Furry distribution after Wendell H. Furry.[1]: 210
- ^ Cite error: The named reference
:8
was invoked but never defined (see the help page).