Question

How do you graph the parabola `f(x) = -(x+5)^2` using vertex, intercepts and additional points?

Answer 1

See below:

Explanation:

This is already in vertex form which is

`y=a(x-h)^2+k` where `(h,k)` is the vertex,

Here the vertex form can be rewritten as

`y=-1(x+5)^2+0` with `(-5,0)` as the vertex.

To find the y-intercept, plug in `0` for `x`:

`y=-1(0+5)^2+0`

`y=-1*25`

`y=-25`

The y-intercept is at `(0,-25)`

To find the x-intercept, plug in `0` for `y`:

`0=-1(x+5)^2+0`

`0=-1(x^2+10x+25)`

`0=-x^2-10x-25`

Factor:

`0= -1(x^2+10x+25)`

`0=-1(x+5)^2`

As you can see, you get the vertex form again, so you didn't have to expand.

The x-intercept is at `(5,0)`, which is also the vertex.

To find additional points, plug in values for `x`:

`y=-1(1+5)^2=-36->(1,-36)`

`y=-1(2+5)^2=-49->(2,-49)`

`y=-1(-1+5)^2=-16->(-1,-16)`

`y=-1(-2+5)^2=-9->(-2,-9)`

Here is a graph:

graph{-(x+5)^2 [-14, 6, -8.08, 1.92]}