y = 3x - 2 is a straight line touching the pa | vedclass

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(A) The given parabola is $(y - 3)^2 = 12(x - 2)$.Comparing this with $(y - k)^2 = 4a(x - h)$,we get $h = 2, k = 3$,and $4a = 12$,so $a = 3$.The direc

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$(-1, -5)$

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(A) The given parabola is $(y - 3)^2 = 12(x - 2)$.Comparing this with $(y - k)^2 = 4a(x - h)$,we get $h = 2, k = 3$,and $4a = 12$,so $a = 3$.The directrix of the parabola is $x = h - a = 2 - 3 = -1$.It is a known property of parabolas that the locus of the intersection of two perpendicular tangents is the directrix.Since the two tangents are perpendicular and meet at point $P$,point $P$ must lie on the directrix $x = -1$.Substituting $x = -1$ into the equation of the first tangent $y = 3x - 2$:$y = 3(-1) - 2 = -3 - 2 = -5$.Therefore,the point $P$ is $(-1, -5)$.

$y = 3x - 2$ is a straight line touching the parabola $(y - 3)^2 = 12(x - 2)$. If a line drawn perpendicular to this line at point $P$ on it touches the given parabola,then the point $P$ is:

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