度数付き二次回帰
入力した度数分布表を二次回帰で分析しグラフ描画します。
2次回帰: y=A+Bx+Cx2
相関係数r の見方
0.7<|r|≦1 相関が強い
0.4<|r|<0.7 中間の強さ
0.2<|r|<0.4 相関が弱い
0≦|r|<0.2 相関がない
\(\normalsize\ Quadratic\ regression\\ (1)\ mean:\ \bar{x}={\large \frac{{\small \sum}{x_i}}{n}},\hspace{10px}\bar{y}={\large \frac{{\small \sum}{y_i}}{n}}\hspace{10px}\bar{x^{\tiny 2}}={\large \frac{{\small \sum}{x_i^2}}{n}},\hspace{10px}n={\small \sum}f_i\\ (2)\ trend\ line:\ y=A+Bx+Cx^2\\ \hspace{20px}B={\large\frac{SxySx^{\tiny 2}x^{\tiny 2}-Sx^{\tiny 2}ySxx^{\tiny 2}}{SxxSx^{\tiny 2}x^{\tiny 2}-(Sxx^{\tiny 2})^2}}\\ \hspace{20px}C={\large\frac{Sx^{\tiny 2}ySxx-SxySxx^{\tiny 2}}{SxxSx^{\tiny 2}x^{\tiny 2}-(Sxx^{\tiny 2})^2}}\\ \hspace{20px}A=\bar{y}-B\bar{x}-C\bar{x^{\tiny 2}}\\ (3)\ correlation\ coefficient:\\ \hspace{20px} r=\sqrt{1-\frac{{\small \sum}(y_i-(A+Bx_i+Cx_i^2))^2}{{\small \sum}(y_i-\bar{y})^2}}\\ \hspace{35px}S_{xx}={{\small \sum}(x_i-\bar{x})^2}={{\small \sum} x_i^2 f_i}-n \cdot \bar{x}^2\\ \hspace{35px}S_{xy}={{\small \sum}(x_i-\bar{x})(y_i-\bar{y}) f_i}={{\small \sum} x_i y_i f_i}-n \cdot \bar{x}\bar{y}\\ \hspace{35px}S_{xx^{\tiny 2}}={{\small \sum}(x_i-\bar{x})(x_i^2-\bar{x^{\tiny 2}}) f_i}={{\small \sum} x_i^3 f_i}-n \cdot \bar{x}\bar{x^{\tiny 2}}\\ \hspace{35px}S_{x^{\tiny 2}x^{\tiny 2}}={{\small \sum}(x_i^2-\bar{x^{\tiny 2}})^2 f_i}={{\small \sum} x_i^4 f_i}-n \cdot \bar{x^{\tiny 2}}\bar{x^{\tiny 2}}\\ \hspace{35px}S_{x^{\tiny 2}y}={{\small \sum}(x_i^2-\bar{x^{\tiny 2}})(y_i-\bar{y}) f_i}={{\small \sum} x_i^2y_i f_i}-n \cdot \bar{x^{\tiny 2}}\bar{y}\\ \)
0.7<|r|≦1 相関が強い
0.4<|r|<0.7 中間の強さ
0.2<|r|<0.4 相関が弱い
0≦|r|<0.2 相関がない
\(\normalsize\ Quadratic\ regression\\ (1)\ mean:\ \bar{x}={\large \frac{{\small \sum}{x_i}}{n}},\hspace{10px}\bar{y}={\large \frac{{\small \sum}{y_i}}{n}}\hspace{10px}\bar{x^{\tiny 2}}={\large \frac{{\small \sum}{x_i^2}}{n}},\hspace{10px}n={\small \sum}f_i\\ (2)\ trend\ line:\ y=A+Bx+Cx^2\\ \hspace{20px}B={\large\frac{SxySx^{\tiny 2}x^{\tiny 2}-Sx^{\tiny 2}ySxx^{\tiny 2}}{SxxSx^{\tiny 2}x^{\tiny 2}-(Sxx^{\tiny 2})^2}}\\ \hspace{20px}C={\large\frac{Sx^{\tiny 2}ySxx-SxySxx^{\tiny 2}}{SxxSx^{\tiny 2}x^{\tiny 2}-(Sxx^{\tiny 2})^2}}\\ \hspace{20px}A=\bar{y}-B\bar{x}-C\bar{x^{\tiny 2}}\\ (3)\ correlation\ coefficient:\\ \hspace{20px} r=\sqrt{1-\frac{{\small \sum}(y_i-(A+Bx_i+Cx_i^2))^2}{{\small \sum}(y_i-\bar{y})^2}}\\ \hspace{35px}S_{xx}={{\small \sum}(x_i-\bar{x})^2}={{\small \sum} x_i^2 f_i}-n \cdot \bar{x}^2\\ \hspace{35px}S_{xy}={{\small \sum}(x_i-\bar{x})(y_i-\bar{y}) f_i}={{\small \sum} x_i y_i f_i}-n \cdot \bar{x}\bar{y}\\ \hspace{35px}S_{xx^{\tiny 2}}={{\small \sum}(x_i-\bar{x})(x_i^2-\bar{x^{\tiny 2}}) f_i}={{\small \sum} x_i^3 f_i}-n \cdot \bar{x}\bar{x^{\tiny 2}}\\ \hspace{35px}S_{x^{\tiny 2}x^{\tiny 2}}={{\small \sum}(x_i^2-\bar{x^{\tiny 2}})^2 f_i}={{\small \sum} x_i^4 f_i}-n \cdot \bar{x^{\tiny 2}}\bar{x^{\tiny 2}}\\ \hspace{35px}S_{x^{\tiny 2}y}={{\small \sum}(x_i^2-\bar{x^{\tiny 2}})(y_i-\bar{y}) f_i}={{\small \sum} x_i^2y_i f_i}-n \cdot \bar{x^{\tiny 2}}\bar{y}\\ \)
この計算についてお客様の声はまだありません。