Step-by-step explanation:
The equation that relates the distance from the focus and directrix to any point is
[tex](y - k) {}^{2} = 4p(x - h)[/tex]
or
[tex](x - h) {}^{2} = 4p(y - k)[/tex]
Since the directrix is a horizontal line, we will use the second equation.
The vertex lies halfway between the focus and directrix.
Since y=1, is perpendicular to the axis of symmetry, we are going to use the point (0,1) to represent the directrix.
Next, using the y values the number that lies between 7 and 1 is 4 so our vertex is
[tex](0,4)[/tex]
Our h is 0 and. k is 4.
[tex](x - 0) {}^{2} = 4p(y - 4)[/tex]
[tex] {x}^{2} = 4p(y - 4)[/tex]
To find p, the equation of the focus is
[tex](h,k + p)[/tex]
[tex](0,4 + p)[/tex]
[tex]4 + p = 7[/tex]
[tex]p = 3[/tex]
So we have
[tex] {x}^{2} = 4(3)(y - 4)[/tex]
[tex] {x}^{2} = 12(y - 4)[/tex]
or
[tex] \frac{ {x}^{2} }{12} + 4 = y[/tex]
