Answer to Question #252444 in Linear Algebra for lakish

In general if a polynomial with REAL coefficients have complex roots, then they come in pair and they are each other conjugate.

Thus a 3rd degree polynomial can have either two conjugate complex roots and one real root or three real roots.

Hence a 3rd degree polynomial with REAL coefficients can have either one x-intercept or 3 x-intercepts.

Given that a third degree polynomial has a lone x-intercept at "x=a."

Let the multiplicity of the root "x=a" be 1. Then the polynomial has two conjugate complex roots and one real root "x=a." The linear factor is "x-a" and the quadratic factor is "bx^2+cx+d," where "c^2-4bd<0."

Let the multiplicity of the root "x=a" be 3. Then the polynomial has three equal linear factors and no quadratic factor: "b(x-a)^3."