If a curve is such that line joining origin to any point `P (x,y)` on the curve and the line parallel to y-axis through P are equally inclined to tangent to curve at P, then the differential equation of the curve is:

If the tangent line at a point (x ,\ y) on the curve y=f(x) is parallel to y-axis, find the value of (dx)/(dy) .

A ray of light coming from origin after reflection at the point P(x,y) of any curve becomes parallel to x-axis,the,equation of the curve may be:

The differential equation of the family of curves y = P(x+Q)^(2) is

A curve is such that the length of perpendicular from origin on the tangent at any point P of the curve is equal to the abscissa of P . Prove that the differential equation of the curve is y^2-2xy dy/dx-x^2=0 and hence find the curve.

The curve is such that the length of the perpendicular from the origin on the tangent at any point P of the curve is equal to the abscissa of Pdot Prove that the differential equation of the curve is y^2-2x y(dy)/(dx)-x^2=0, and hence find the curve.

If the tangent line at a point (x ,\ y) on the curve y=f(x) is parallel to x-axis, then write the value of (dy)/(dx) .

The points on the curve y=sin x ,where the tangent is parallel to the x axis is

A curve y=f(x) has the property that the perpendicular distance of the origin from the normal at any point P of the curve is equal to the distance of the point P from the x-axis. Then the differential equation of the curve