What is the equation in standard form of the parabola with a focus at (12,-3) and a directrix of y= 12?

1 Answer
Sep 3, 2017

# y-9/2=-1/30(x-12)^2.#

Explanation:

We will use the following Focus-Directrix Property of Parabola (FDP) :

FDP : Any point on a Parabola is equidistant from the

Focus F and the Directrix d.

Let #P(x,y)# be any arbitrary point on the Parabola. Then.

The Distance #PF,# btwn. #P(x,y), and, F(12,-3), is,

#PF=...............................(1).#

The Dist. btwn #P(x,y), and, d : y-12=0," is, "|y-12|...(2).#

#:. (1), (2),# and, FDP,

#rArr sqrt{(x-12)^2+(y-(-3)^2)}=|y-12|.#

# :. (x-12)^2=|y-12|^2-(y+3)^2.#

#:. (x-12)^2=y^2-24y+144-y^2-6y-9, i.e., #

# (x-12)^2=-30y+135=-30(y-9/2).#

#:. y-9/2=-1/30(x-12)^2,# is the desired eqn. of the Parabola.