The equation of the curve such that the distance between the origin and the tangent at an arbitrary point is equal to the distance between the origin and the normal at the same point is

Show that the curve such that the distance between the origin and the tangent at an arbitrary point is equal to the distance between the origin and the normal at the same point sqrt(x^2+y^2) =ce^(+-tan^(-1y/x))

Find the distance between the origin and the point : (-8, 6)

Find the distance between origin and the point (a, -b).

Find the distance between the origin and the point (12,-6)

Find the distance between origin and the point (a, -b).

The distance between the origin and co-ordinates of point (x,y) is

Find the distance between the origin and the point : (-5, 12)

Find the distance between the origin and the point : (15, -8)

Find the distance between the origin and the point : (8, -15)

Find the distance between the origin and the point : (-12, - 5)