It is given that
y2 = 4x
The equation of normal is
y = mx – 2m –
m3 (1)
which is passing through the point (3, 0). Therefore, Eq. (1) becomes
0 = 3m – 2m –
m3 m3 – m = 0 ⇒ m = 0, −1, 1
That is,
(m12−2m1),(m22,−2m2),(m32−2m3)
; hence, we have the points P(0, 0), Q(1, 2) and R(1, −2) as shown in the following figure:
(A) The area of triangle PQR is
× 1 × 4 = 2
Therefore, (A)→(P).
(B) The radius of circumcircle is
R =
=
=
Therefore, (B)→(Q).
(C) The centroid of ΔPQR is
(,) =
(,0) Therefore, (C)→(S).
(D) The circumradius of ΔPQR is 5/2 and the circumcentre of
ΔPQR is
(,0)
Therefore, (D)→(R).