Answer:
[tex]y=-\frac{1}{24}(x+5)^2+1[/tex]
Step-by-step explanation:
When we plot the focus and draw in the directrix, there are 12 units between them. Directly between them will sit the vertex. Since the parabola by definition will wrap itself around the focus, we know that this is an upside down parabola with the vertex aligning itself with the x coordinate of the focus. So the vertex is at (-5, 1) since that is the point that is in line with x coordinate of the focus and the y coordinate of 1 is halfway between the focus and the directrix. The form for this type of parabola that opens upside down is:
[tex]-(x-h)^2=4p(y-k)[/tex],
where p is the distance between the vertex and the focus (or the vertex and the directrix since it is the same distance), h is the first coordinate of the vertex and k is the second coordinate of the vertex.
We need to get those numbers filled in there and then put the parabola either into work form or in standard form.
We know from up above that there are 12 units between the focus and the directrix, we know that the vertex is at (-5, 1), so that means that p is the number of units between the vertex and the focus which is 6. We have everything we need now to fill in our equation.
[tex]-(x+5)^2=4(6)(y-1)[/tex]
If we put this into vertex form, we need to simplify the above equation into
[tex]y=-a(x-h)^2+k[/tex] so we will do some simplifying on our equation.
[tex]-(x+5)^2=24(y-1)[/tex] and
[tex]-\frac{1}{24}(x+5)^2=y-1[/tex]. One last step is to add 1 to both sides:
[tex]-\frac{1}{24}(x+5)^2+1=y[/tex]
