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.

If the origin is shifted to the point O(2,3) the axes remaining parallel to the original axes the new co-ordinate of the point A (1,3) is ….

If origin is shifted to the point (-1,2) then what will be the transformed equation of the curve 2x^(2)+y^(2)-3x+4y-1=0 in the new axes ?

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

Find the transformed equation of the curve : x^(2)+y^(2)+4x-6y+16=0 when the origin is shifted to the point (-2,3) .

If by shifting the origin to (1,2) the equation of the parabola y^(2)-4y+8x-4=0 becomes y^(2)=4ax, then a equal to

If origin is shifted to the point (a,b) then what will be the transformed equation of the curve (x-a)^(2)+(y-b)^(2)=r^(2) ?

If the origin is shifted to the point (1, 2) by a translation of the axes, find the new coordinates of the point (3,-4)

When origin is shifted to the point (4, 5) without changing the direction of the coordinate axes, the equation x^(2)+y^(2)-8x-10y+5=0 is tranformed to the equation x^(2)+y^(2)=K^(2) . Value of |K| is

If the origin is shifted to the point (0,-2) by a translation of the axes, the coordinates of a point become (3, 2). Find the original coordinates of the point.

If the origin is shifted to the point (2,-1) by a translation of the axes, the coordinates of a point become (-3,5). Find the original coordinates of the point.