Question

How do you find the roots, real and imaginary, of `y=-3x^2 + -x +2(x-2)^2` using the quadratic formula?

Answer 1

`x = (9 + sqrt(113)) / (-2) ~=9.8 and x = (9 - sqrt(113)) / (-2) ~=-0.8`

Explanation:

Let's first simplify this so that we can have it in the form of `y=ax^2+bx+c`:

`y=-3x^2+ -x+2(x-2)^2`

`y=-3x^2 -x+2(x^2-4x+4)`

`y=-3x^2 -x+2x^2-8x+8`

`y=-x^2 -9x+8`

Now we're ready for the quadratic formula:

`x = (-b \pm sqrt(b^2-4ac)) / (2a)`

and we have `a=-1, b=-9, c=8`

`x = (9 \pm sqrt((-9)^2-4(-1)(8))) / (2(-1))`

`x = (9 \pm sqrt(81+32)) / (-2)`

`x = (9 \pm sqrt(113)) / (-2)`

`x = (9 + sqrt(113)) / (-2) ~=9.8 and x = (9 - sqrt(113)) / (-2) ~=-0.8`