Question

How do you find the axis of symmetry, graph and find the maximum or minimum value of the function `y=(x+5)^2-1`?

Answer 1

Please see below.

Explanation:

This is a typical quadratic equation in vertex form.

In a vertex form of equation such as `y=a(x-h)^2+k`

axis of symmetry is `x-h=0`

and maxima is at `x=h` and `y=k`, if `a<0` and minima is at `x=h` and `y=k`, if `a>0`

In `y=(x+5)^2-1`

axis of symmetry is `x+5=0`

and as `a=1`, we have a minima at `x=-5` and `y=-1` i.e. `(-5,-1)`

The graph appears as follows.
graph{(x+5)^2-1 [-9.625, 0.375, -2.66, 2.34]}