We have the equation
[tex]20y=x^2-10-15[/tex]
Let's complete the square, to do it let's add and subtract 25 on the right side
[tex]\begin{gathered} 20y=x^2-10-15+25-25 \\ \\ 20y=(x-5)^2-15-25_{} \\ \\ 20y=(x-5)^2-40 \\ \\ \end{gathered}[/tex]
Now we can have y in function of x
[tex]\begin{gathered} y=\frac{1}{20}(x-5)^2-2 \\ \\ \end{gathered}[/tex]
Now we can already identify the vertex because it's in the vertex form:
[tex]y=a(x-h)+k[/tex]
Where the vertex is
[tex](h,k)[/tex]
As we can see, h = 5 and k = -2, then the vertex is
[tex](5,-2)[/tex]
Now we can continue and find the focus, the focus is
[tex]\mleft(h,k+\frac{1}{4a}\mright)[/tex]
We have a = 1/20, therefore
[tex]\begin{gathered} \mleft(5,-2+5\mright) \\ \\ (5,3) \end{gathered}[/tex]
The focus is
[tex](5,3)[/tex]
And the last one, the directrix, it's
[tex]y=k-\frac{1}{4a}[/tex]
Then
[tex]\begin{gathered} y=-2-5 \\ \\ y=-7 \end{gathered}[/tex]
Hence the correct answer is: vertex (5, -2); focus (5, 3); directrix y = -7
