Answer:
[tex](15,\, 0)[/tex].
Step-by-step explanation:
In general, depending on whether the parabola opens vertically or horizontally, the the vertex equation of a parabola would be:
In both equations, [tex]k[/tex], [tex]h[/tex], and [tex]p[/tex] are constants, where [tex]h[/tex] and [tex]k[/tex] specify the position of the vertex of the parabola, and [tex]p[/tex] specifies the distance between the vertex and the focus of the parabola.
While the vertex of the parabola is at [tex](h,\, k)[/tex] regardless of whether the parabola opens vertically or horizontally, the position of the focus of the parabola depends on the direction of the opening:
Notice that in the two equations, only one of [tex]x[/tex] or [tex]y[/tex] is raised to the power of [tex]2[/tex], but not both. Whether the parabola opens vertically or horizontally depends on the variable that is raised to a power of [tex]2[/tex]: vertically if [tex]x[/tex] is raised to a power of [tex]2[/tex], and horizontally if [tex]y[/tex] is raised to a power of [tex]2[/tex].
In the parabola in this question, [tex]y[/tex] is raised to a power of [tex]2[/tex]. Hence, this parabola would open horizontally. Rearrange the given equation to match the form of the vertex equation for a parabola that opens horizontally:
[tex]y^{2} = 2\, (x - 10)[/tex].
[tex](y - 0)^{2} = 4\, (5)\, (x - 10)[/tex].
Hence, [tex]k = 0[/tex], [tex]h = 10[/tex], and [tex]p = 5[/tex] for this parabola.
Since this parabola opens horizontally and [tex]p > 0[/tex], the focus would be located to the right of the vertex, at [tex](h + p,\, k)[/tex], which would be [tex](15,\, 0)[/tex].