What can a chi-squared distribution be used to describe?

1 Answer
David B.
Jun 3, 2016

Chi Squared distributions can be used to describe statistical quantities which are a function of a sum of squares.

Explanation:

The Chi Squared distribution is the distribution of a value which is the sum of squares of k normally distributed random variables.

Q=sum_(i=1)^k Z_i^2

The PDF of the Chi Squared distribution is given by:

f(x;k)=1/(2^(k/2)Gamma(k/2)) x^(k/2-1)e^(-x/2)

Where k is the number of degrees of freedom, and x is the value of Q for which we seek the probability.

The usefulness of the Chi Squared distribution is in modelling things which involve the sums of squared values. Two specific examples are:

  • Analysis of Variance tests (variance is a sum of squared values)
  • Goodness of fit (for a least squares fit where the error is a sum of squared values)

Taken from:
https://en.wikipedia.org/wiki/Chi-squared_distribution

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