# Discriminant

function of the coefficients of a polynomial that gives information on its roots

In algebra, the discriminant, sometimes represented by the symbol ${\displaystyle \Delta }$, is an algebraic expression used to determine the number of roots a polynomial have.[1][2]

For example, the discriminant of the quadratic polynomial

${\displaystyle ax^{2}+bx+c\,}$       is       ${\displaystyle \,b^{2}-4ac}$.[3]

If the discriminant is larger than zero, then the polynomial has two (distinct) real numbers as roots.

If the discriminant is equal to zero, then the polynomial has two repeating real numbers as roots (i.e., exactly one real root).

If the discriminant is smaller than zero, then the polynomial has two (purely) complex numbers as roots (i.e., zero real root).[4]

Apart for quadratic polynomials, discriminants can be defined for cubic polynomials, general conic equations, and other mathematical entities such as differential equations and quadratic forms as well.[3]

## References

1. "Compendium of Mathematical Symbols". Math Vault. 2020-03-01. Retrieved 2020-08-16.
2. "Discriminant review (article)". Khan Academy. Retrieved 2020-08-16.
3. "Discriminant | mathematics". Encyclopedia Britannica. Retrieved 2020-08-16.
4. "Definition of Discriminant". www.mathsisfun.com. Retrieved 2020-08-16.