Question

How do you find focus of a parabola `x=y^2 + 4`?

Answer 1

Please read the explanation.

Explanation:

The standard form for a parabola that opens left or right is

`x = ay^2 + by + c`

This matches the given equation

`x = y^2 + 4`

where `a = 1, b = 0 and c = 4`

To find the focus, you must begin by finding the vertex `(h, k)`

The formula for k of the standard form is:

`k = -b/(2a)`

But b is 0 in our equation:

`k = 0`

To find the value of h, evalaute the equation at `y = k = 0`:

`h = 0^2 + 4`

`h = 4`

The vertex is `(4, 0)`

For the standard form, the signed focal distance is

`f = 1/(4a)`

Because a = 1, the focal distance for our equation is:

`f = 1/4`

To obtain the focus, add the focal distance to the x coordinate of the vertex:

`(4.25, 0)`