Chi-square distribution

For any positive integer <math>k</math>, the chi-square distribution with k degrees of freedom is the probability distribution of the random variable

<math>\chi^2 = Z-1^2 + \cdots + Z-k^2</math>

where Z₁, ..., Z_k are independent normal variables, each having expected value 0 and variance 1.

The chi-square distribution has numerous applications in inferential statistics, for instance in chi-square tests and in estimating variances. It enters the problem of estimating the mean of a normally distributed population and the problem of estimating the slope of a regression line via its role in Student's t-distribution. It enters all analysis of variance problems via its role in the F-distribution[?], which is the distribution of the ratio of two chi-squared random variables.

Its probability density function is

<math>

p-k(x) = \frac{(1/2)^{k/2}}{\Gamma(k/2)} x^{k/2 - 1} e^{-x/2} \quad \mbox{ for }x > 0 </math> and p_k(x) = 0 for x≤0. Here Γ denotes the Gamma function.

The expected value of a random variable having chi-square distribution with k degrees of freedom is k and the variance is 2k. Note that 2 degrees of freedom leads to an exponential distribution.

The chi-square distribution is a special case of the gamma distribution.