Match the column.

Column I

Column II

(A)

Tangents are drawn from point (2, 3) to the parabola y² = 4x, then points of contact are

(p)

(9, – 6)

(B)

From a point P on the circle x² + y² = 5, the equation of chord of contact to the parabola y² = 4x is y = 2 (x – 2), then the coordinate of point P will be

(q)

(1, 2)

(C)

P (4, – 4), Q are point on parabola y² = 4x such that area of ΔPOQ is 6 sq. units where O is the vertex, then coordinates of Q may be

(r)

(–2, 1)

(D)

The common chord of circle x² + y² = 5 and parabola 6y = 5x² + 7x will pass through point(s)

(s)

(4, 4)

(A) → (q), (s); (B) → (r); (C) → (p), (q); (D) → (q), (r)

(A) → (q); (B) → (q); (C) → (p), (q); (D) → (p), (r)

(A) → (r); (B) → (q); (C) → (p), (q); (D) → (q)

(A) → (q), (s); (B) → (q); (C) → (p), (q); (D) → (q), (r)

Column I		Column II
(A)	Tangents are drawn from point (2, 3) to the parabola y² = 4x, then points of contact are	(p)	(9, – 6)
(B)	From a point P on the circle x² + y² = 5, the equation of chord of contact to the parabola y² = 4x is y = 2 (x – 2), then the coordinate of point P will be	(q)	(1, 2)
(C)	P (4, – 4), Q are point on parabola y² = 4x such that area of ΔPOQ is 6 sq. units where O is the vertex, then coordinates of Q may be	(r)	(–2, 1)
(D)	The common chord of circle x² + y² = 5 and parabola 6y = 5x² + 7x will pass through point(s)	(s)	(4, 4)