Find r(X,Y) from the two regression equation `3x=y` and `4y=3x`.

If barx=18,bary=100, sigma_(x)=14,sigma_(y)=20 and correlation r_(xy)=0.8 , find the regression equation of y on x.

If byx=-(1)/(4) , mean of x = 3 and mean of y = 3, then regression equation y on x is

In a bivariate distribution the regression equation of y on x is 8x – 10y + 66 = 0. If barx= 13 , find bary

2x+3y-5=0 is the regression equation of x on y. Find its slope

If the regression equation of y on x is -2x + 5y= 14 and the regression equation of x on y is given by mx-y + 10= 0 . If the coefficient of correlation between x and y is (1)/(sqrt10) , then the value of m is

Given that the regression equation of y on x is y = a + 1/(m)x , find the value of m when r = 0.5 , sigma_(x)^2=1/4sigma_(y)^2 .

If the two regression lines are 4x + 3y + 7 - 0 and 3x + 4y + 8 = 0. Find mean of x and y.

Given regression co-efficient of y on x is 0.4 and r(x,y) = (2)/( sqrt(10)) , then the regression co-efficient of x on y is

If the two lines of regression are 3x - 2y+1 = 0 and 2x -y-2=0 , then bar x+bary is equal to: