Question

What is the vertex form of `y= -6x^2 -27x-18`?

Answer 1

`y=-6(x+2.25)^2-109.5`

Explanation:

Currently your equation is in standard form:

`y=ax^2+bx+c` where `(-b/(2a),f(-b/(2a)))` is the vertex

We want to put it in vertex form:

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

We know `a=-6`, but we have to figure out the vertex to find `h` and `k`

`-b/(2a)=-(-27)/(2(-6))=(27/-12)=(-9/4)=-2.25`

So:

`f(-2.25)=-6(-2.25)^2-27(-2.25)-18`

`=-30.375-60.75-18=-109.5`

Thus our vertex is `(-2.25, -109.5)` and `h=-2.25, k=-109.5`

Thus our equation is:

`y=-6(x+2.25)^2-109.5`