8.5 : Chi-square Distribution

Consider a normally distributed population from which several independent samples of size n are drawn, and the sample variance is calculated. The resulting distribution is called the chi-square distribution. The chi-square distribution is used to estimate the population variance and the standard deviation.

Unlike the normal and t distributions, the chi-square distribution is skewed to the right.

However, the shape of the distribution curve varies for each degree of freedom, where the number of degrees of freedom is generally n minus one.

As the degrees of freedom increase, the symmetry of the curve approaches that of the normal distribution. At degrees of freedom greater than 90, the chi-square distribution approximately resembles a normal distribution.

As one can see, the chi-square test statistic can be greater than or equal to zero but never negative.

This distribution has wide applications in tests of independence, goodness-of-fit tests, and single variance tests.

How does one determine if bingo numbers are evenly distributed or if some numbers occurred with a greater frequency? Or if the types of movies people preferred were different across different age groups or if a coffee machine dispensed approximately the same amount of coffee each time. These questions can be addressed by conducting a hypothesis test. One distribution that can be used to find answers to such questions is known as the chi-square distribution. The chi-square distribution has applications in tests for independence, goodness-of-fit tests, and test of a single variance.

The properties of the chi-square distribution are as follows:

The curve is nonsymmetrical and skewed to the right.
There is a different chi-square curve for each degree of freedom (df).
The test statistic for any test is always greater than or equal to zero.
When df > 90, the chi-square curve approximates the normal distribution.
The mean, μ, is located just to the right of the peak.

This text is adapted from 11.1 Facts About the Chi-Square Distribution - Introductory Statistics OpenStax

Tags

Chi square Distribution Hypothesis Test Independence Test Goodness of fit Test Variance Test Statistical Properties Degree Of Freedom Non symmetrical Curve Skewed Distribution Test Statistic Normal Distribution Approximation

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