Three normals to `y^2=4x` pass through the point (15, 12). Show that one of the normals is given by `y=x-3` and find the equation of the other.

" The slope of the normal to "y^(2)=-4ax" passing through the point "(15,12)" is "

Let L be a normal to the parabola y^(2)=4x. If L passes through the point (9,6) then L is given by

Let L be a normal to the parabola y^(2) = 4x . If L passes through the point (9, 6), then L is given by

In parabola y^2=4x, From the point (15,12), three normals are drawn to the three co-normals point is

(i) Find the equation of the normal to the curve : x^(2)=4y , which passes through the point (1, 2). (ii) Find the equation of the normal to the curve : y^(2)=4x , which passes through the point (1, 2).

The number of normals to the curve 3y ^(3) =4x which passes through the point (0,1) is

The normal at a point on y^(2)=4x passes through (5,0). There are three such normals one of which is the axies.The feet of the three normals form a triangle whose centroid is

Find the equation of the normal at a point on the curve x^(2)=4y , which passes through the point (1,2). Also find the equation of the corresponding tangent.

Find the equation of the normal to the parabola y^(2)=4ax at a point (x_(1),y_(1)) on it. Show that three normalls can be drawn to a parabola from an external point.

Find the equation of the normal to curve y^(2)=4x at the point (1, 2) .