A tangent to the parabola $y^{2} = 4 a x$ meets x axis at a point T. This tangent meets the tangent at the vertex at point P. If rectangle TAPQ is completed then the locus of Q is.

Circle

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Straight line

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parabola

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Ellipse

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Solution

The correct option is C
parabola

Here we will make use of the parametric form for tangents. The tangent at any point B $(a t^{2}, 2 a t)$ to the parabola is,

$t y = x + a t^{2}$

lets draw a figure representing given conditions

Here Q is the required locus point given by (h, k) and forms the vertex of □QPAT. We can obtain points P and T by solving equation of tangents at x and y axis.

$T \equiv (- a t^{2}, 0)$

$P \equiv (0, a t)$

Also

$A \equiv (0, 0)$

Since

$Q \equiv (h, k)$

$h = A T = - a t^{2}$ - - - - - - (1)

k = AP = at - - - - - - (2)

eliminating t from (1) & (2)

$k^{2} + a h = 0$

hence locus of Q is,

$y^{2} + a x = 0$

$y^{2} = - a x$

which represents a parabola.

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