Karl Pearson’s formula of calculating $\\gamma$<\/strong> is a formula for calculating the correlation coefficient between two variables. It is calculated by taking the covariance of the two variables, and dividing by the product of their standard deviations.<\/li>\n<\/ul>\nHere is a table that shows the correct match between List-I and List-II:<\/p>\n
| List-I | List-II |
\n|—|—|
\n| a. Coefficient of determination | 1. $${\\gamma _{xy}}\\frac{{{\\sigma _x}}}{{{\\sigma _y}}}$$ |
\n| b. Spearman’s rank correlation coefficient | 4. $${\\gamma ^2}$$ |
\n| c. Regression coefficient of $x$ on $y$ variable | 3. $$\\frac{{\\sum {xy} }}{{n\\,{\\sigma _x}\\,{\\sigma _y}}}$$ |
\n| d. Karl Pearson’s formula of calculating $\\gamma$ | 2. $$1 – \\frac{{6\\sum {{d^2}} }}{{n\\left( {{n^2} – 1} \\right)}}$$ |<\/p>\n","protected":false},"excerpt":{"rendered":"
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Match List-I with List-II and select the correct answer: List-I List-II a. Coefficient of determination 1. $${\\gamma _{xy}}\\frac{{{\\sigma _x}}}{{{\\sigma _y}}}$$ b. Spearman's rank correlation coefficient 2. $$1 - \\frac{{6\\sum {{d^2}} }}{{n\\left( {{n^2} - 1} \\right)}}$$ c. Regression coefficient of $$x$$ on $$y$$ variable 3. $$\\frac{{\\sum {xy} }}{{n\\,{\\sigma _x}\\,{\\sigma _y}}}$$ d. 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