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

Consider the curved mirror y =f(x) passing through (0, 6) having the property that all light rays emerging from origin, after getting reflected from the mirror becomes parallel to x-axis, then the equation of curve, is

Consider a curved mirror y=f(x) passing through (8,6) having the property that all light rays emerging from origin,after getting reflected from the mirror becomes parallel to x-axis.Find the equation of curve.

Consider the curved mirror y=f(x) passing through (0,6) having the property that all light rays emerging from origin,after getting reflected from the mirror becomes parallel to x-axis,then the equation of curve,is

Consider a curved mirror y = f(x) passing through (8, 6) having the property that all light rays emerging from origin, after reflected from the mirror becomes parallel to x-axis. The equation of the mirror is y^(a) = b(c-x^(d)) where a, b, c, d are constants, then

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 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 to the contentious curve y=f(x) "at" p(a,b) is parallel to the x-axis, then the equation of the tangent at p is

The point on the curve y=x^(2) is the tangent parallel to X-axis is

A normal at any point (x,y) to the curve y=f(x) cuts a triangle of unit area with the axis,the differential equation of the curve is