A discrete probability distribution describes the probabilities of countable outcomes for a random variable. Unlike continuous distributions which assign probability to intervals, discrete distributions assign probability to specific values: 0 heads, 1 head, 2 heads, etc.
The probability mass function (PMF) gives P(X=k) for each possible value k. PMF values must be non-negative and sum to 1 across all possible outcomes. The PMF completely characterizes the distribution—knowing all individual probabilities determines every property.
Discrete distributions model counted phenomena: number of successes, defects, events, trials, or occurrences. The random variable takes integer values (sometimes all non-negative integers, sometimes a finite range). Examples include coin flips (0 to n heads), website visits (0 to infinity), cards drawn (0 to min(n,K) target cards).
Key properties include mean μ (expected value, center of distribution), variance σ² (spread around mean), and standard deviation σ (variance square root). The cumulative distribution function (CDF) gives P(X≤k), accumulating probabilities from minimum to k.
For comprehensive theory on discrete probability distributions including derivations, properties, and applications, see discrete probability distributions theory.