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Home / Shared Math Details / Distribution Functions / Chi-Square Distribution

Chi-Square Distribution

This page defines the chi-square-based interval formulas Quantum XL shares: the confidence interval for the standard deviation, and the exact confidence interval for a Poisson rate.

Notation

Term Description
\(\chi^2_{\,df,\,q}\) the \(q\)-quantile of the chi-square distribution with \(df\) degrees of freedom
\(s\) sample standard deviation (n − 1 denominator)
\(n\) sample size
\(\alpha\) significance level (\(1 -\) confidence)
\(T\) total number of occurrences (Poisson)
\(m\) sample size or exposure (Poisson)

Confidence interval for the standard deviation

\[ \left[\ \sqrt{\frac{(n-1)\,s^2}{\chi^2_{\,n-1,\,1-\alpha/2}}}\ ,\ \ \sqrt{\frac{(n-1)\,s^2}{\chi^2_{\,n-1,\,\alpha/2}}}\ \right] \]

with \(df = n - 1\). Constant data (\(s^2 = 0\)) returns a zero-width interval.

Used by: Confidence Interval and Summary Statistics.

Exact confidence interval for a Poisson rate (Garwood)

\[ \text{lower} = \frac{\chi^2_{\,2T,\,\alpha/2}}{2m} \quad (0 \text{ when } T = 0) \qquad \text{upper} = \frac{\chi^2_{\,2(T+1),\,1-\alpha/2}}{2m} \]

Used by: Confidence Interval.

See Also

References

  1. Garwood, F. (1936). Fiducial limits for the Poisson distribution. Biometrika, 28(3/4), 437-442.
  2. NIST/SEMATECH e-Handbook of Statistical Methods, section on the chi-square distribution.