Shift the origin to a suitable point so that the equation `y^2+4y+8x-2=0` will not contain a term in `y` and the constant term.

Shift the origin to a suitable point so that the equation y^(2)+4y+8x-2=0 will not contain term of y and the constant term.

At what point the origin be shifted so that the equation x^(2)+xy3xy+2=0 does not contain any first degree term and constant term?

Find the point at which origin is shifted such that the transformed equation of y^(2)-4y+8x-2=0 is independent of constant term.

The origin is shifted to (1,2), the equation y^(2)-8x-4y+12=0 changes to Y^(2)+4aX=0 then a=

Find the point at which origin is shifted such that the transformed equation of x^(2)+2y^(2)-4x+4y-2=0 has no first degree term. Also find the transformed equation .

When the origin is shifted to (2,3) then the original equation of x^(2)+y^(2)+4x+6y+12=0 is

Without rotating the original coordinate axes, to which point should origin be transferred,so that the equation x^(2)+y^(2)-4x+6y-7=0 is changed to an equation which contains no term of first degree?