If the transformed equation of curve is `17X^(2) - 16XY + 17y^(2) = 225` when the axes are rotated through an angle `45^(0)`, then the original equation of the curve is

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

If the transformed equation of a curve is X^(2) - 2XY tan 2 alpha - Y^(2) = a^(2) when the axes are rotated through an angle alpha , then the original equation of the curve is

If the transferred equation of a curve is x^(2) + 2sqrt(3)xy - y^(2) = 2a^(2) when the axes are rotated through an angle 60^(@) , then the original equation of the curve is

If the transformed equation of a curve is X^(2) + 2 sqrt(3) XY - Y^(2) =2 a^(2) when the axes are rotated through angle 60^(0) , then find the original equation of the curve.

If the transformed equation of a curve is 3X^(2) + XY - Y^(2)- 7X + Y +7=0 when the axes are translated to the point (1,2), then the original equation of the curve is 3x^(2) + xy - y^(2) -ax + by+c=0 , then the ascending order of a,b,c is

Find the transformed equation of x^(2) + 2 sqrt(3) xy - y^(2) = 2a^(2) when the axes are rotated through an angle 30^(0)

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

If the transformed equation of a curve is X^(2) + Y^(2) = 4 when the axes are translated to the point (3, -4) then find the original equation of the curve.