polynomial equation of odd degree

Theorem.

The equation

\displaystyle a_{0}x^{n}+a_{1}x^{n-1}+\cdots+a_{n-1}x+a_{n}=0

(1)

with odd degree $n$ and real coefficients $a_{i}$ ( $a_{0}\neq 0$ ) has at least one real root $x$ .

Proof. Denote by $f(x)$ the left hand side of (1). We can write

f(x)=a_{0}x^{n}[1+g(x)]

where $\displaystyle g(x):=\frac{a_{1}}{x}\!+\cdots\!+\!\frac{a_{n-1}}{x^{n-1}}\!+\!% \frac{a_{n}}{x^{n}}$ . But we have $\displaystyle\lim_{|x|\to\infty}g(x)=0$ because

\lim_{|x|\to\infty}\frac{a_{i}}{x^{i}}=0

for all $i=1,\,...,\,n$ . Thus there exists an $M>0$ such that

|g(x)|<1\,\,\mbox{for}\,\,|x|\geqq M.

Accordingly $1+g(\pm M)>0$ and

\mbox{sign}f(\pm M)=(\mbox{sign}a_{0})(\mbox{sign}(\pm M))^{n}\cdot 1=(\mbox{% sign}a_{0})(\pm 1)

since $n$ is odd. Therefore the real polynomial function $f$ has opposite signs in the end points of the interval $[-M,\,M]$ . Thus the continuity of $f$ guarantees, according to Bolzano’s theorem, at least one zero $x$ of $f$ in that interval. So (1) has at least one real root $x$ .

Title	polynomial equation of odd degree
Canonical name	PolynomialEquationOfOddDegree
Date of creation	2013-03-22 15:39:19
Last modified on	2013-03-22 15:39:19
Owner	pahio (2872)
Last modified by	pahio (2872)
Numerical id	7
Author	pahio (2872)
Entry type	Theorem
Classification	msc 26A15
Classification	msc 26A09
Classification	msc 12D10
Classification	msc 26C05
Related topic	AlgebraicEquation
Related topic	ExampleOfSolvingACubicEquation