Normals are drawn from the point `(9, 6)` to the parabola `y^2 = 4x.` Then find the area enclosed by the parabola and the two normals other than the normal at `(9,6).`

Normals are drawn from the point (9,6) to the parabola y^(2)=4x. Then find the area enclosed by the parabla and the two normals other than the normal at (9,6).

Three normals are drawn from the point (7, 14) to the parabola x^2-8x-16 y=0 . Find the coordinates of the feet of the normals.

Three normals are drawn from the point (7, 14) to the parabola x^2-8x-16 y=0 . Find the coordinates of the feet of the normals.

Three normals are drawn from the point (7, 14) to the parabola x^2-8x-16 y=0 . Find the coordinates of the feet of the normals.

The number of normals drawn from the point (6, -8) to the parabola y^2 - 12y - 4x + 4 = 0 is

Three normals are drawn from the point (7, 14) to the parabola x^(2)-8x-16y=0. Find the coordinates of the feet of the normals.

The number of normals drawn from the point (6,-8) to the parabola y^(2)-12y-4x+4=0 is

If three normals are drawn from point (h,0) on parabola y^(2)=4ax, then h>2a and one of the normal is axis of the parabola and other two are equally inclined to the axis of the parabola.Prove it?

Three normals are drawn from the point (a,0) to the parabola y^2=x . One normal is the X-axis . If other two normals are perpendicular to each other , then the value of 4a is

Three normals are drawn from the point (a,0) to the parabola y^2=x . One normal is the X-axis . If other two normals are perpendicular to each other , then the value of 4a is