What is the equation in standard form of the parabola with a focus at (2,-4) and a directrix of y= 6?

1 Answer
Nov 7, 2016

#y = -1/20x^2 + 1/5x + 4/5#

Explanation:

The general form for the equation of a horizontal directrix is #y = k - f#

The focus of a parabola with a horizontal directrix is of the general form #(h, k + f)#

Therefore, we can write these 3 equations that will help us:

h = 2

-4 = k + f

6 = k - f

solve the last two equation for k and f:

#k = 1#
#f = -5#

The vertex form of the equation of this type of parabola is:

#y = a(x - h)^2 + k#

Because we are not given the value of a, substitute #1/(4f)# for #a#:

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

Substitute our known values into the above equation:

#y = 1/(4(-5))(x - 2)^2 + 1#

Expand the square:

#y = -1/20(x^2 - 4x+ 4) + 1#

Distribute #-1/20#:

#y = -1/20x^2 + 1/5x - 1/5 + 1#

Combine the constants:

#y = -1/20x^2 + 1/5x + 4/5#