If axes are translated to the point (-3, 0) without rotation then find the transformed equation of `y=(x+2)(x+3)(x+4).`

If the axes are shifted to the point (1,-2) without rotation, what do the following equations become? 2x^2+y^2-4x+4y=0 y^2-4x+4y+8=0

If the axes are shifted to the point (1,-2) without rotation, what do the following equations become? 2x^2+y^2-4x+4y=0 y^2-4x+4y+8=0

If 3X^(2)+XY-Y^(2)-7X+Y+7 = 0 is the transformed equation of a curve, when the axes are translated to the point (1,2), then find the original equation of the curve.

If the transformed equation of curve is X^(2)+2Y^(2)+16=0 when the axes are translated to the point (-1,2) then find the original equation of the curve.

If the transformed equation of curve is X^(2)+Y^(2)=4 when the axes are translated to the point (-1,2) then find the original equation of the curve.

If the transformed equation of curve is X^(2)+3XY-2Y^(2)+17X-7Y-11=0 when the axes are translated to the point (2,3) then find the original equation of the curve.

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 ?

If the origin is shifted to the point ((a b)/(a-b),0) without rotation, then the equation (a-b)(x^2+y^2)-2a b x=0 becomes

Choose a new origin so that the equation 2x^(2)+7y^(2)+8x-14y+15 = 0 may be translated to the which the first degree terms be missing. Find the transformed equation also.

if the axes are rotated through 60 in the anticlockwise sense,find the transformed form of the equation x^2-y^2=a^2 ,