Answer:
[tex]y^2=-16x[/tex]
Step-by-step explanation:
Equation of the Parabola
The standard form of the parabola with the axis of symmetry parallel to the y-axis, vertex at (h.k) and directrix y=k-p is
[tex](x-h)^2=4p(y-k)[/tex]
If the parabola has its axis of symmetry parallel to the x-axis, vertex at (h.k) and directrix x=h-p is
[tex](y-k)^2=4p(x-h)[/tex]
The focus of this form of the parabola is located at (h+p,k)
The parabola described in the question belongs to the second form since the directrix is at x=4. We also know that the focus is at (-4,0). We can find the values of h and p by equating
[tex]h+p=-4[/tex]
[tex]h-p=4[/tex]
Adding up both equations
[tex]2h=0[/tex]
[tex]h=0[/tex]
then
[tex]p=-4[/tex]
The vertex is (h,k)=(0,0)
We can now write the equation of the parabola as
[tex](y-0)^2=4\cdot -4(x-0)[/tex]
Simplifying
[tex]\boxed{y^2=-16x}[/tex]
