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1 April, 15:10

Derive the equation of the parabola with a focus at (0, 1) and a directrix of y = - 1.

f (x) = - 1/4 x^2

f (x) = 1/4 x^2

f (x) = - 4x^2

f (x) = 4x^2

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  1. 1 April, 15:22
    0
    Ok, so from previous question

    (x-h) ^2=4p (y-k)

    distance from focus to directix is 2

    2/2=1=p

    1>-1

    focus is above the vertex

    1 unit down from (0,1) is (0,0)

    vertex at (0,0)

    since focus is above, p is positive

    (x-0) ^2=4 (1) (y-0)

    x^2=4y

    4y=x^2

    divide both sides by 4

    y = (1/4) x^2

    f (x) = 1/4x^2

    2nd one is answer
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