SOLUTION: Identify the equation of the parabola with its focus at (-4,7) and the directrix y=1. A) 24(y-3)=(x+4)^2 B) 12 (y-4)=(x+4)^2 C) 24 (y-7)=(x+4)^2 D) -12(y+4)=(x+4)^2

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Question 1039378: Identify the equation of the parabola with its focus at (-4,7) and the directrix y=1.
A) 24(y-3)=(x+4)^2
B) 12 (y-4)=(x+4)^2
C) 24 (y-7)=(x+4)^2
D) -12(y+4)=(x+4)^2
Answer by Edwin McCravy(20064) (Show Source):
You can put this solution on YOUR website!

The equation of a parabola is 4p(y-k) = (x-h)^2 Where (h,k) is the vertex which is halfway between the directrix and the focus. |p| is the distance from the focus to the vertex, and also from the vertex to the directrix. p is taken as a positive number if the parabola opens upward, i.e., the directrix is below the vertex and focus. p is taken as a negative number if the parabola opens downward, i.e., the directrix is above the vertex and focus. You can find those and substitute in 4p(y-k) = (x-h)^2 Edwin