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

Prove that the circle described on the focal chord of parabola as a diameter touches the directrix

Circles are described on any focal chords of a parabola as diameters touches its directrix

The equation of the latus rectum of a parabola is x+y=8 and the equation of the tangent at the vertex is x+y=12. Then find the length of the latus rectum.

The equation of the latus rectum of a parabola is x+y=8 and the equation of the tangent at the vertex is x+y=12. Then find the length of the latus rectum.

The endpoints of two normal chords of a parabola are concyclic. Then the tangents at the feet of the normals will intersect at a. Tangent at vertex of the parabola b. Axis of the parabola c. Directrix of the parabola d. None of these

If the bisector of angle A P B , where P Aa n dP B are the tangents to the parabola y^2=4a x , is equally, inclined to the coordinate axes, then the point P lies on the tangent at vertex of the parabola directrix of the parabola circle with center at the origin and radius a the line of the latus rectum.

Statement 1: In the parabola y^2=4a x , the circle drawn the taking the focal radii as diameter touches the y-axis. Statement 2: The portion of the tangent intercepted between the point of contact and directrix subtends an angle of 90^0 at focus.

If the point (2, 3) is the focus and x = 2y + 6 is the directrix of a parabola, find (i) The equation of the axis. (ii) The co-ordinates of the vertex. (iii) Length of the latus rectum. (iv) Equation of the latus rectum.

Find the coordinates of the focus, axis of the parabola, the equation of the directrix and the length of the latus rectum. x^2=6y

Find the coordinates of the focus, axis of the parabola, the equation of the directrix and the length of the latus rectum. y^2=-8x