Question

How do you find the focus, directrix and sketch `y=2x^2+x-2`?

Answer 1

The focus is `(-1/4,-2)`
The equation of the directrix is `y = -9/4`

Explanation:

Given the standard form, `y = ax^2+bx+c`

The x coordinate of the vertex is:

`h = -b/(2a)`

This is, also, the x coordinate of the focus.

The y coordinate of the vertex is:

`k = a(h)^2+b(h)+c`

The vertical distance from the vertex to focus is:

`f = 1/(4a)`

The y coordinate of the focus is:

`y_"focus" = k+f`

The equation of the directrix is:

`y = k - f`

For the given equation, `y = 2x^2+x-2`, `a = 2`, `b=1`, and `c=-2`

Substitute these values into the above equations:

`h = -1/(2(2))`

`h = -1/4`

`k = 2(-1/4)^2+ -1/4 - 2`

`k = -17/8`

`f = 1/(4(2)`

`f = 1/8`

`y_"focus"=-17/8+1/8`

`y_"focus"= -2`

The focus is `(-1/4,-2)`

`y = -17/8-1/8 = -18/8=-9/4`

The equation of the directrix is `y = -9/4`

Here is a graph of the function:
graph{2x^2+x-2 [-10, 10, -5, 5]}