Prove that the line joining the orthocen...

Prove that the line joining the orthocentre to the centroid of a triangle formed by the focal chord of a parabola and tangents drawn at its extremities is parallel to the axis of the parabola.

Similar Questions

Explore conceptually related problems

The focal chord of the parabola perpendicular to its axis is called as

Prove that the tangent at one extremity of the focal chord of a parabola is parallel to the normal at the other extremity.

The locus of the Orthocentre of the triangle formed by three tangents of the parabola (4x-3)^(2)=-64(2y+1) is

Prove that the centroid of any triangle is the same as the centroid of the triangle formed by joining the middle points of its sides

The length of a focal chord of the parabola y^(2)=4ax making an angle theta with the axis of the parabola is (a>0) is:

The equation of the line joining the centroid with the orthocentre of the triangle formed by the points (-2,3) (2,-1), (4,0) is

The locus of centroid of triangle formed by a tangent to the parabola y^(2) = 36x with coordinate axes is