What is the equation in standard form of the parabola with a focus at (14,5) and a directrix of y= -3?

1 Answer
Aug 8, 2017

The equation of the parabola is #(x-14)^2=16(y-1)#

Explanation:

Any point #(x,y)# on the parabola is equidistant from the focus #F=(14,5)# and the directrix #y=-3#

Therefore,

#sqrt((x-14)^2+(y-5)^2)=y+3#

#(x-14)^2+(y-5)^2=(y+3)^2#

#(x-14)^2+y^2-10y+25=y^2+6y+9#

#(x-14)^2=16y-16=16(y-1)#

graph{((x-14)^2-16(y-1))(y+3)=0 [-11.66, 33.95, -3.97, 18.85]}