${\displaystyle V\left(aX+bY\right)}$${\displaystyle =a^{2}V\left(X\right)+2abC\left(X,Y\right)+b^{2}V\left(X\right)}$

2つの確率変数 ${\displaystyle X}$，${\displaystyle Y}$ について

${\displaystyle V\left(aX+bY\right)}$${\displaystyle =a^{2}V\left(X\right)+2abC\left(X,Y\right)+b^{2}V\left(X\right)}$ 　･･････(1)

が成り立つ．

■証明

${\displaystyle E\left(X\right)={\mu }_x}$　･･････(2)

${\displaystyle E\left(Y\right)={\mu }_y}$　･･････(3)

とする．

分散の定義より

${\displaystyle V\left(aX+bY\right)}$${\displaystyle =E\left({\left\{\left(aX+bY\right)-\left(a{\mu }_x+b{\mu }_y\right)\right\}}^2\right)}$

${\displaystyle =E\left({\left(aX+bY\right)}^2\right)-{\left\{E\left(a{\mu }_x+b{\mu }_y\right)\right\}}^2}$

∵${\displaystyle V\left(X\right)=E\left(X^2\right)-{\left\{E\left(X\right)\right\}}^2}$ (分散を参照)

${\displaystyle =E\left(a^2{X}^2+2abXY+b^2{Y}^2\right)-{\left(a{\mu }_x+b{\mu }_y\right)}^2}$

${\displaystyle =E\left(a^2{X}^2\right)+E\left(2abXY\right)+E\left(b^2{Y}^2\right)}$${\displaystyle -a^2{\mu }_x{}^2}$${\displaystyle -2ab{\mu }_x{\mu }_y}$${\displaystyle -b^2{\mu }_y{}^2}$

${\displaystyle =a^{2}E\left(X^2\right)-a^2{\mu }_x{}^2+2abE\left(XY\right)}$${\displaystyle -2ab{\mu }_x{\mu }_y}$${\displaystyle +b^{2}E\left(Y^2\right)}$${\displaystyle -b^2{\mu }_y{}^2}$

${\displaystyle =a^2\left\{E\left(X^2\right)-{\mu }_x{}^2\right\}}$ ${\displaystyle +2ab\left\{E\left(XY\right)-{\mu }_x{\mu }_y\right\}}$ ${\displaystyle +2ab\left\{E\left(XY\right)-{\mu }_x{\mu }_y\right\}}$

${\displaystyle =a^{2}V\left(X\right)+2abC\left(X,Y\right)+b^{2}V\left(X\right)}$

∵ ${\displaystyle V\left(X\right)=E\left(X^2\right)-{\left\{E\left(X\right)\right\}}^2}$ ，${\displaystyle C\left(X,Y\right)=E\left(XY\right)-E\left(X\right)E\left(Y\right)}$

　

ホーム>>カテゴリー分類>>確率統計>> $E\left(X\right)$ ， $V\left(X\right)$ ， $C\left(X,Y\right)$ の計算則>>$C\left(X,Y\right)=0$

最終更新日： 2024年2月23日