What is the vertex form of the equation of the parabola with a focus at (12,6) and a directrix of #y=1 #?

1 Answer
Jun 14, 2016

The equation of parabola is #y=1/10(x-12)^2+3.5#

Explanation:

Vertex is at equidistant from focus #(12,6)# and directrix #(y=1)# So vertex is at #(12,3.5)# The parabola opens up and the equation is #y=a(x-12)^2+3.5#. The distance between vertex and directrix is #d=1/(4|a|) or a = 1/(4d) ; d=3.5-1=2.5 :.a = 1/(4*2.5)=1/10#Hence the equation of parabola is #y=1/10(x-12)^2+3.5# graph{y=1/10(x-12)^2+3.5 [-40, 40, -20, 20]}[Ans]