Answer:
[tex] y=-\frac{1}{24}(x+5)^2+1[/tex]
Step-by-step explanation:
The given parabola has its focus at (-5,-5) and the directrix is at: y=7.
The equation of such parabola is given by the formula:
[tex](x-h)^2=-4p(y-k)[/tex]
The vertex of the parabola is the midpoint of (-5,-5) and (-5,7).
[tex](\frac{-5+-5}{2},\frac{-5+7}{2} )=(-5,1)[/tex]
The value of p is the distance from the (-5,-5) to (-5,1).
p=|1--5|=6
We substitute the values of the vertex and p into the equation to get;
[tex](x--5)^2=-4(6)(y-1)[/tex]
[tex](x+5)^2=-24(y-1)[/tex]
Or
[tex] y=-\frac{1}{24}(x+5)^2+1[/tex]
