Answer:
Part 1) The vertex is the point (-83,-9)
Part 2) The focus is the point (-82.75,-9)
Part 3) The directrix is [tex]x=-83.25[/tex]
Step-by-step explanation:
step 1
Find the vertex
we know that
The equation of a horizontal parabola in the standard form is equal to
[tex](y - k)^{2}=4p(x - h)[/tex]
where
p≠ 0.
(h,k) is the vertex
(h + p, k) is the focus
x=h-p is the directrix
In this problem we have
[tex]x=y^{2} +18y-2[/tex]
Convert to standard form
[tex]x+2=y^{2} +18y[/tex]
[tex]x+2+81=y^{2} +18y+81[/tex]
[tex]x+83=(y+9)^{2}[/tex]
so
This is a horizontal parabola open to the right
(h,k) is the point (-83,-9)
so
The vertex is the point (-83,-9)
step 2
we have
[tex]x+83=(y+9)^{2}[/tex]
Find the value of p
[tex]4p=1[/tex]
[tex]p=1/4[/tex]
Find the focus
(h + p, k) is the focus
substitute
(-83+1/4,-9)
The focus is the point (-82.75,-9)
step 3
Find the directrix
The directrix of a horizontal parabola is
[tex]x=h-p[/tex]
substitute
[tex]x=-83-1/4[/tex]
[tex]x=-83.25[/tex]
