Transform to axes inclined at `45^@` to the original axes for the equation `17x^2-16xy+17y^2=225` is

13.When the axes are rotated through an angle 45^@ , the transformed equation of a curve is 17x^(2)-16xy+17y^(2)=225 .Find the original equation of the curve.

On shifting the origin to the point (1,-1) , the axes remaining parallel to the original axes, the equation of a curve becomes : 4x^(2)+y^(2)+3x-4y+2=0 . Find its original equation.

The Curve represented by the equation 2x^(2)+xy+6y^(2)-2x+17y-12=0 is

When the axes are translated to the point (5,-2) then the transformed form of the equation xy+2x-5y-11=0 is

Transform the equation x^(2)+y^(2)=ax into polar form.

Transforming to parallel axes through a point (p,q),the equation 2(x^(2))+3xy+4y^(2)+x+18y+25=0 becomes 2(x^(2))+3xy+4y^(2)=1

Find the point to which the origin should be shifted so that the equation y^(2)-6y-4x+13=0 is transformed to the form y^(2)+Ax=0

When the coordinate axes are rotated about the origin in the positive direction through an angle (pi)/(4) if the equation 25x^(2)+9y^(2)=225 is transformed to alpha x^(2)+beta xy+gamma y^(2)=delta then (alpha+beta+gamma-sqrt(delta))^(2)=

When the axes of coordinates are rotates through an angle pi//4 without shifting the origin, the equation 2x^(2)+2y^(2)+3xy=4 is transformed to the equation 7x^(2)+y^(2)=k where the value of k is