Question

What is the discriminant of -8x^2+4x−1 and what does that mean?

Answer 1

discriminant =`-16`
It means that the polynomial has no real solutions

Explanation:

the discriminant is a function of the coefficients of a polynomial equation whose value gives information about the roots of the polynomial
consider a function `ax^2+bx+c=0`

in order to find the values of `x` that satisfies the equation We use the following formula

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

where `b^2-4ac` is the discriminant
if
`b^2-4ac>0` then the equation has two real solutions
`b^2-4ac=0` then the equation has one real solution
`b^2-4ac<0` then the equation has no real solution

so in the equation `-8x^2+4x-1=0`
by substituting in the discriminant formula with
`a=-8 ,b=4 ,c=-1`

`b^2-4ac=16-4(-8xx-1)=-16` `<0`
so the functions will have no real solutions
(but it will have imaginary solutions)