Statement 1: If the endpoints of two nor...

Statement 1: If the endpoints of two normal chords `A Ba n dC D` (normal at `Aa n dC)` of a parabola `y^2=4a x` are concyclic, then the tangents at `Aa n dC` will intersect on the axis of the parabola. Statement 2: If four points on the parabola `y^2=4a x` are concyclic, then the sum of their ordinates is zero.

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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.

The endpoints of two normal chords of a parabola are concyclic. Then the tangents at the feet of the normals will intersect

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P(t_1) and Q(t_2) are the point t_1a n dt_2 on the parabola y^2=4a x . The normals at Pa n dQ meet on the parabola. Show that the middle point P Q lies on the parabola y^2=2a(x+2a)dot

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