Transform to axes inclined at 45° to the original axes the equations
` y^(4) + x^(4) + 6 x^(2) y^(2) = 2 `

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

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.

Vertex of y=x^(2)-2ax+1 is closest to the origin then

(3,-4) is the point to which the origin is shifted and the transformed equation is X^(2)+Y^(2)=4 then the original equation is (A) x^(2)+y^(2)+6x+8y+21=0 (B) x^(2)+y^(2)+6x+8y-21,=0 (C) x^(2)+y^(2)-6x+8y+21=0 (D) x^(2)+y^(2)-6x-8y+21=0

An ellipse is drawn by taking a diameter of the circle (x""""1)^2+""y^2=""1 as its semiminor axis and a diameter of the circle x^2+""(y""""2)^2=""4 as its semi-major axis. If the centre of the ellipse is the origin and its axes are the coordinate axes, then the equation of the ellipse is (1) 4x^2+""y^2=""4 (2) x^2+""4y^2=""8 (3) 4x^2+""y^2=""8 (4) x^2+""4y^2=""16

The equation of a curve referred to a given system of axes is 3x^(2)+2xy+3y^(2)=10 . The transformed equation of the curve. If the axes are rotated about the origin through an angle 45^(@) is 2x^(2)+y^(2)=k then k=

Without changing the direction of the axes, the origin is transferred to the point (2,3). Then the equation x^(2)+y^(2)-4x-6y+9=0 changes to

The equation of the incircle formed by the cordinate axes and the line 4dx+3y=6 is x^(2)+y^(2)-6x-6y+9=04(x^(2)+y^(2)-x-y)+1=04(x^(2)+y^(2)+x+y)+1=0 None o these

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