Find the transformed equation of the straight line `2x "\ "3y+"\ "5"\ "="\ "0` , when the origin is shifted to the point `(3,"\ "1)` after translation of axes.

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) .

The new co-ordinates of the point (1,1) when the origin is shifted to the point (-3,-2) by translation of axes are .

Find the transformed equations of the following when the origin is shifted to the point (1,1) by a translation of axes : (i) x^(2)+xy-3y^(2)-y+2=0 (ii) xy-y^(2)-x+y=0 (iii) xy-x-y+1=0 (iv) x^(2)-y^(2)-2x+2y=0

The equation x^(2)+xy-3x-y+2=0 beome when the origin is shifted to the point (1,1) is

Find the transformed equation of the curve y^(2)-4x+4y+8=0 when the origin is shifted to (1,-2) .

What will be the new equation of straight line 3x + 4y = 6 if the origin gets shifted to (3, - 4)?

Find the new co-ordinates of the points : (i) (1,1) (ii) (5,0) (iii) (-2,1) when the origin is shifted to the point (-3,-2) by translation of axes.

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