Question

What is the vertex form of the equation of the parabola with a focus at (20,29) and a directrix of `y=37`?

Answer 1

`y=-1/16(x-20)^2+33`

Explanation:

Let their be a point `(x,y)` on parabola. Its distance from focus at `(20,29)` is

`sqrt((x-20)^2+(y-29)^2)`

and its distance from directrix `y=37` will be `|y-37|`

Hence equation would be

`sqrt((x-20)^2+(y-29)^2)=(y-37)` or

`(x-20)^2+(y-29)^2=(y-37)^2` or

`x^2-40x+400+y^2-58y+841=y^2-74y+1369` or

`x^2-40x+16y-128=0`

or `16y=-x^2+40x+128`

or `y=-1/16(x^2-40x+400)+8+400/16`

or `y=-1/16(x-20)^2+33`

graph{x^2-40x+16y-128=0 [-56.3, 103.7, -35.5, 44.5]}