Question

How do you find the roots, real and imaginary, of `y=x(2x-1)-(3x-1)^2` using the quadratic formula?

Answer 1

`x = 5/14+-(sqrt(3))/14i`

Explanation:

Let's multiply out the brackets and get ourselves some quadratic terms:

`y = 2x^2 - x - 9x^2 + 6x - 1 = -7x^2 +5x -1`

The quadratic formula for polynomial of the form `ax^2+bx+c = 0` is given by:

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

`a = -7, b = 5, c = -1`

`therefore x = (-5+-sqrt(25-4(-7)(-1)))/(2(-7))`

`x= (-5+-sqrt(-3))/(-14)`

Recall that `i^2 = -1` so we can rewrite `sqrt(-3)` as `sqrt(3i^2) = sqrt(3)i`

`therefore x = 5/14+-(sqrt(3))/14i`