Question

How do you find the axis of symmetry, graph and find the maximum or minimum value of the function `y=x^2+6x+2`?

Answer 1

`x=-3" "` is the axis of symmetry

Explanation:

the vertex of the parabola is at `(h, k)=(-3, -7)`
by the formula

`h=-b/(2a)` and `k=c-b^2/(4a)`

from the given `y=x^2+6x+2`
`a=1`, `b=6`, and `c=2`

`h=-b/(2a)=-6/(2*1)=-3`

`k=c-b^2/(4a)=2-6^2/(4*1)=2-36/4=2-9=-7`

The minimum point is the vertex `(-3, -7)`
graph{y=x^2+6x+2 [-13.58, 6.42, -8.6, 1.4]}

and clearly `x=-3` a vertical line which passes thru `(-3, -7)` is the line of symmetry.

God bless....I hope the explanation is useful.