Any point on the parabola whose focus is (0, 1) and the directrix is x+2=0 is given by

$t^{2} + 1, 2 t - 1$

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$t^{2} + 1, 2 t + 1$

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$t^{2}, 2 t$

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$t^{2} - 1, 2 t + 1$

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Solution

The correct option is D
$t^{2} - 1, 2 t + 1$

Any point on the parabola is equidistant from the focus and the directrix.
$\Rightarrow (x - 0)^{2} + (y - 1)^{2} = {(\frac{x + 2}{\sqrt{1}})}^{2} o r (y - 1)^{2} = 4 (x + 1) C l e a r l y, x = t^{2} - 1 a n d y = 2 t + 1 s a t i s f y i t f o r a l l t$

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Find the equation of the parabola whose:

(i) focus is (3,0) and the directrix is 3x+4y=1

(ii) focus is (1,1) and the directrix is x+y+1=0

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(iv) focus is (2,3) and the directrix is x-4y+3=0

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