What is the vertex form of the equation of the parabola with a focus at (1,-9) and a directrix of #y=0#?

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Answer 1 · 2017-07-21T18:29:40

#y = -1/18(x - 1)^2 - 9/2#

Because the directrix is a horizontal line, #y = 0#, we know that the vertex form of the equation of the parabola is:

#y = 1/(4f)(x - h)^2 + k" [1]"#

where #(h,k)# is the vertex and #f# is the signed vertical distance from the focus to the vertex.

The x coordinate of the vertex is the same as the x coordinate of the focus, #h = 1#.

Substitute into equation [1]:

#y = 1/(4f)(x - 1)^2 + k" [2]"#

The y coordinate of the vertex is the midpoint between the y coordinate of the focus and the y coordinates of the directrix:

#k = (0+ (-9))/2 = -9/2#

Substitute into equation [2]:

#y = 1/(4f)(x - 1)^2 - 9/2" [3]"#

The value of #f# is the y coordinate of the vertex subtracted from the y coordinate of the focus:

#f = -9 - -9/2#

#f = -9/2#

Substitute into equation [3]:

#y = 1/(4(-9/2))(x - 1)^2 - 9/2#

#y = -1/18(x - 1)^2 - 9/2" [4]"#

Equation [4] is the solution.