F-分佈

在機率論和統計學裏，F-分佈（F-distribution）是一種連續機率分佈，^[1]^[2]^[3]^[4]被廣泛應用於似然比率檢驗，特別是ANOVA中。

定義

如果隨機變量 X 有參數為 d₁ 和 d₂ 的 F-分佈，我們寫作 X ~ F(d₁, d₂)。那麼對於實數 x ≥ 0，X 的機率密度函數 (pdf)是

{\begin{aligned}f(x;d_{1},d_{2})&={\frac {\sqrt {\frac {(d_{1}\,x)^{d_{1}}\,\,d_{2}^{d_{2}}}{(d_{1}\,x+d_{2})^{d_{1}+d_{2}}}}}{x\,\mathrm {B} \!\left({\frac {d_{1}}{2}},{\frac {d_{2}}{2}}\right)}}\\&={\frac {1}{\mathrm {B} \!\left({\frac {d_{1}}{2}},{\frac {d_{2}}{2}}\right)}}\left({\frac {d_{1}}{d_{2}}}\right)^{\frac {d_{1}}{2}}x^{{\frac {d_{1}}{2}}-1}\left(1+{\frac {d_{1}}{d_{2}}}\,x\right)^{-{\frac {d_{1}+d_{2}}{2}}}\end{aligned}}

這裏 $\mathrm {B}$ 是B函數。在很多應用中，參數 d₁ 和 d₂ 是正整數，但對於這些參數為正實數時也有定義。

F(x;d_{1},d_{2})=I_{\frac {d_{1}x}{d_{1}x+d_{2}}}\left({\tfrac {d_{1}}{2}},{\tfrac {d_{2}}{2}}\right),

右邊表格中已給出期望值、方差和偏度；對於 $d_{2}>8$ ，峰度為：

\gamma _{2}=12{\frac {d_{1}(5d_{2}-22)(d_{1}+d_{2}-2)+(d_{2}-4)(d_{2}-2)^{2}}{d_{1}(d_{2}-6)(d_{2}-8)(d_{1}+d_{2}-2)}}

.

一個F-分佈的隨機變量是兩個卡方分佈變量除以自由度的比率：

{\frac {U_{1}/d_{1}}{U_{2}/d_{2}}}={\frac {U_{1}/U_{2}}{d_{1}/d_{2}}}

其中：

^ Johnson, Norman Lloyd; Samuel Kotz; N. Balakrishnan. Continuous Univariate Distributions, Volume 2 (Second Edition, Section 27). Wiley. 1995. ISBN 0-471-58494-0.
^ Abramowitz, Milton; Stegun, Irene Ann (編). Chapter 26. Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables. Applied Mathematics Series 55 Ninth reprint with additional corrections of tenth original printing with corrections (December 1972); first. Washington D.C.; New York: United States Department of Commerce, National Bureau of Standards; Dover Publications. 1983: 946. ISBN 978-0-486-61272-0. LCCN 64-60036. MR 0167642.
LCCN 65-12253
.
^ NIST (2006). Engineering Statistics Handbook – F Distribution （頁面存檔備份，存於互聯網檔案館）
^ Mood, Alexander; Franklin A. Graybill; Duane C. Boes. Introduction to the Theory of Statistics (Third Edition, pp. 246–249). McGraw-Hill. 1974. ISBN 0-07-042864-6.

**F分佈**
機率密度函數
累積分佈函數
參數	$d_{1}>0,\ d_{2}>0$ 自由度
值域	$x\in [0;+\infty )\!$
機率密度函數	${\frac {\sqrt {\frac {(d_{1}\,x)^{d_{1}}\,\,d_{2}^{d_{2}}}{(d_{1}\,x+d_{2})^{d_{1}+d_{2}}}}}{x\,\mathrm {B} \!\left({\frac {d_{1}}{2}},{\frac {d_{2}}{2}}\right)}}\!$
累積分佈函數	$I_{\frac {d_{1}x}{d_{1}x+d_{2}}}(d_{1}/2,d_{2}/2)\!$
期望值	${\frac {d_{2}}{d_{2}-2}}\!$ for $d_{2}>2$
眾數	${\frac {d_{1}-2}{d_{1}}}\;{\frac {d_{2}}{d_{2}+2}}\!$ for $d_{1}>2$
變異數	${\frac {2\,d_{2}^{2}\,(d_{1}+d_{2}-2)}{d_{1}(d_{2}-2)^{2}(d_{2}-4)}}\!$ for $d_{2}>4$
偏度	${\frac {(2d_{1}+d_{2}-2){\sqrt {8(d_{2}-4)}}}{(d_{2}-6){\sqrt {d_{1}(d_{1}+d_{2}-2)}}}}\!$ for $d_{2}>6$
峰度	見下文