The point of intersection of normals to the parabola `y^(2) = 4x` at the points whose ordinates are 4 and 6 is

Equation of normal to y^(2) = 4x at the point whose ordinate is 4 is

The locus of point of intersection of two normals drawn to the parabola y^2 = 4ax which are at right angles is

The number of normals drawn to the parabola y^(2)=4x from the point (1,0) is

The normal to parabola y^(2) =4ax from the point (5a, -2a) are

The line 4x+6y+9 =0 touches the parabola y^(2)=4ax at the point

If the normals from any point to the parabola y^2=4x cut the line x=2 at points whose ordinates are in AP, then prove that the slopes of tangents at the co-normal points are in GP.

Prove that the locus of point of intersection of two perpendicular normals to the parabola y^(2) = 4ax isl the parabola y^(2) = a(x-3a)

The normal to the parabola y^(2)=8x at the point (2, 4) meets the parabola again at eh point

The line 4x -7y + 10 = 0 intersects the parabola y^(2) =4x at the points P and Q. The coordinates of the point of intersection of the tangents drawn at the points P and Q are

The normal to the parabola y^(2)=8ax at the point (2, 4) meets the parabola again at the point