The Uniform Distribution

This page covers Uniform Distribution, Expectation and Variance, Proof of Expectation and Cumulative Distribution Function.

A continuous random variable X which has probability density function given by:

f(x) = 1   for a £ x £ b

         b - a

(and f(x) = 0 if x is not between a and b) follows a uniform distribution with parameters a and b. We write X ~ U(a,b)

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Remember that the area under the graph of the random variable must be equal to 1 (see continuous random variables).

Expectation and Variance

If X ~ U(a,b), then:

  • E(X) = ½ (a + b)

  • Var(X) = (1/12)(b - a)2

Proof of Expectation

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Cumulative Distribution Function

The cumulative distribution function can be found by integrating the p.d.f between 0 and t:

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