Question

How do you graph `f(x)=(x+4)^2` and identify the x intercepts, vertex?

Answer 1

`f(x)` has the graph of standard parabolic `y=x^2` shifted 4 units negative on the `x-`axis.

`x-`intercept and vertex at `(-4,0)`

Explanation:

`f(x) = (x+4)^2`

Let `x' = x+4 -> x=x'-4`

`f(x) = (x')^2`

Hence, `f(x)` has the graph of standard `y=x^2` shifted 4 units negative ('left') on the `x-`axis

The `x-`intercepts occur where `f(x)=0`

I.e. where `(x+4)^2 = 0`

`(x+4)(x+4)=0`

`->f(x)` has coincident `x-`intercepts at `(-4,0)`

Expanding `f(x)`

`f(x)=x^2+8x+16`

`f(x)` is a parabola of the form `ax^2+bx+c` with vertex at `x=(-b)/(2a)`

Hence, the vertex of `f(x)` is at `x=(-8)/2 =-4`

So, the vertex of `f(x)` is also at (-4,0)

The graph of `f(x)` is shown below.

graph{(x+4)^2 [-10, 10, -5, 5]}