The endpoints of two normal chords of a parabola are concyclic. Then the tangents at the feet of the normals will intersect (a) at tangent at vertex of the parabola (b) axis of the parabola (c) directrix of the parabola (d) none of these

Intersection of line and Tangent to the parabola

Tangents and Normals of a parabola

Statement 1: If the endpoints of two normal chords AB and CD (normal at A and C) of a parabola y^(2)=4ax are concyclic,then the tangents at A and C will intersect on the axis of the parabola.Statement 2: If four points on the parabola y^(2)=4ax are concyclic,then the sum of their ordinates is zero.

Locus of the intersection of the tangents at the ends of the normal chords of the parabola y^(2) = 4ax is

The circles on the focal radii of a parabola as diameter touch: A the tangent tat the vertex B) the axis C) the directrix D) latus rectum

The vertex of a parabola is (a,0) and the directrix is x+y=3a. The equation of the parabola is

If the tangent at the extrenities of a chord PQ of a parabola intersect at T, then the distances of the focus of the parabola from the points P.T. Q are in

Point of intersection of tangent at any Two points on the Parabola