If a tangent to the parabola y2=8x meets the x-axis at T and intersect the tangent at vertex A at P, and the rectangle TAPQ is completed, then the locus of the point Q is
A
y2+2x=0
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B
x2+2y=0
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C
x2−2y=0
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D
y2−2x=0
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Solution
The correct option is Ay2+2x=0
y2=8x ⇒a=2 Vertex A is (0,0). The tangent at any point (at2,2at) of the parabola y2=4ax is given by ty=x+at2. Therefore, the tangent at any point of y2=8x is ty=x+2t2. Since, the tangent at vertex A is y-axis, so, T and P are (−2t2,0) and (0,2t), respectively.
Let point Q be (h,k). Then h=AT=−2t2⋯(1) and k=AP=2t⋯(2) Eliminating t, using (1) and (2), we get 2h=−(k)2 ⇒k2+2h=0 Hence, the locus of Q is y2+2x=0