Question

How do you find the roots, real and imaginary, of `y=(x/5-5)(-x/2-2)` using the quadratic formula?

Answer 1

`x_1 = 25 and x_2 = -4` are the two real roots of the given function.

Explanation:

`=(x/5)(-x/2 -2) - 5(-x/2 -2)`
`=-x^2/10 -(2x)/5 + (5x)/2 + 10`
`= (-x^2 - 4x + 25x + 100)/10`

Note that by definition, the roots equal 0. So we can set `y = 0`
`implies 0 = (-x^2 - 4x + 25x + 100)/10`
`implies (-x^2 - 4x + 25x + 100)= 0`
Let's multiply this by -1 to simply things.
`(x^2 + 4x - 25x - 100) = 0`
Funnily, you can quite easily factorize this polynomial: by factoring x and -25. However, you need to use the formula, which complicates things.
`(x^2- 21x - 100) = 0` The formula is `x_1 = [-b + sqrt(b^2 - 4ac)]/(2a)`
`x_2 = [-b - sqrt(b^2 - 4ac)]/(2a)`

Substitute `a = 1, b = -21 and c= -100` into both of these to get the two roots. I will not solve it here as it would clutter the answer, however, the end result would be `x_1 = 25 and x_2 = -4`.