Geometric distribution
2020 Mathematics Subject Classification: Primary: 60E99 [MSN][ZBL]
The distribution of a discrete random variable assuming non-negative integral values $ m = 0, 1 \dots $ with probabilities $ p _ {m} = pq ^ {m} $, where the distribution parameter $ p = 1 - q $ is a number in $ ( 0, 1) $. The characteristic function is
$$ f ( t) = \frac{p}{1 - qe ^ {it} } , $$
the mathematical expectation is $ q/p $; the variance is $ q/ p ^ {2} $; the generating function is
$$ P ( t) = \frac{p}{1 - qt } . $$
Figure: g044230a
A geometric distribution of probability $ p _ {m} $.
Figure: g044230b
The distribution function $ ( p = 0.2) $.
The random variable equal to the number of independent trials prior to the first successful outcome with a probability of success $ p $ and a probability of failure $ q $ has a geometric distribution. The name originates from the geometric progression which generates such a distribution.
Geometric distribution. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Geometric_distribution&oldid=21286