Question

How do you identify the important parts of `g(x)=-x^2+12x-36` to graph it?

Answer 1

Its vertex is `(6,0)`
Axis of symmetry is `x=6`
Since co-efficient of x is `-1`, the curve is concave downwards.
It has a maxima at `(6,0)`

Explanation:

`g(x)=−x^2+12x−36`

`x=(-b)/(2a)=(-12)/(2 xx (-1))=(-12)/(-2)=6`

At `x=6; f(x) =-(6^2)+12(6)-36`
`f(x) =-36+72-36=-72+72=0`

Its vertex is `(6,0)`
Axis of symmetry is `x=6`
Since co-efficient of x is `-1`, the curve is concave downwards.

It has a maxima at `(6,0)`