# Random variate

In the mathematical fields of probability and statistics, a **random variate** is a particular outcome of a random variable: the random variates which are other outcomes of the same random variable might have different values. Random variates are used when simulating processes driven by random influences (stochastic processes). In modern applications, such simulations would derive random variates corresponding to any given probability distribution from computer procedures designed to create random variates corresponding to a uniform distribution, where these procedures would actually provide values chosen from a uniform distribution of pseudorandom numbers.

Procedures to generate random variates corresponding to a given distribution are known as procedures for *random variate generation* or pseudo-random number sampling.

In probability theory, a random variable is a measurable function from a probability space to a measurable space of values that the variable can take on. In that context, and in statistics, those values are known as a **random variates**, or occasionally **random deviates**, and this represents a wider meaning than just that associated with pseudorandom numbers.

## Definition

Devroye^{[1]} defines a random variate generation algorithm (for real numbers) as follows:

- Assume that
- Computers can manipulate real numbers.
- Computers have access to a source of random variates that are uniformly distributed on the closed interval .

- Then a random variate generation algorithm is any program that halts almost surely and exits with a real number
*X*. This*X*is called a**random variate**.

(Both assumptions are violated in most real computers. Computers necessarily lack the ability to manipulate real numbers, typically using floating point representations instead. Most computers lack a source of true randomness (like certain hardware random number generators), and instead use pseudorandom number sequences.)

The distinction between *random variable* and *random variate* is subtle and is not always made in the literature. It is useful when one wants to distinguish between a random variable itself with an associated probability distribution on the one hand, and random draws from that probability distribution on the other, in particular when those draws are ultimately derived by floating-point arithmetic from a pseudo-random sequence.

## Practical aspects

For the generation of uniform random variates, see random number generation (this is a bit of a misnomer, but a popular alternative to "random variate generation").

For the generation of non-uniform random variates, see pseudo-random number sampling.

## References

- ↑ Luc Devroye (1986).
*Non-Uniform Random Variate Generation*. New York: Springer-Verlag, pp. 1–2. ([1])