The chord x+y=1 of the curve y2=12x cuts it at the points A and B. The normals at A and B intersect at C. If a third line from C cuts the curve normally at D, then the co-ordinates of D are
A
(3,−6)
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B
(12,−12)
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C
(6,−3)
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D
(12,12)
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Solution
The correct option is D(12,12) Let the ordinates of conormal points A,B,D be y1,y2,y3 respectively. ⇒y1+y2+y3=0 A and B lie on line x+y=1
On solving, x+y=1 and y2=12x y2=12(1−y) ⇒y2+12y−12=0 ⇒y1+y2=−12
Since, y1+y2+y3=0, ⇒y3=12 ∴x3=y2312=12
Hence, coordinates of D are (12,12)