proof of Fermat’s Theorem (stationary points)

Suppose that $x_{0}$ is a local maximum (a similar proof applies if $x_{0}$ is a local minimum). Then there exists $\delta>0$ such that $(x_{0}-\delta,x_{0}+\delta)\subset(a,b)$ and such that we have $f(x_{0})\geq f(x)$ for all $x$ with $|x-x_{0}|<\delta$ . Hence for $h\in(0,\delta)$ we notice that it holds

$\frac{f(x_{0}+h)-f(x_{0})}{h}\leq 0.$

Since the limit of this ratio as $h\to 0^{+}$ exists and is equal to $f^{\prime}(x_{0})$ we conclude that $f^{\prime}(x_{0})\leq 0$ . On the other hand for $h\in(-\delta,0)$ we notice that

$\frac{f(x_{0}+h)-f(x_{0})}{h}\geq 0$

but again the limit as $h\to 0^{+}$ exists and is equal to $f^{\prime}(x_{0})$ so we also have $f^{\prime}(x_{0})\geq 0$ .

Hence we conclude that $f^{\prime}(x_{0})=0$ .

To prove the second part of the statement (when $x_{0}$ is equal to $a$ or $b$ ), just notice that in such points we have only one of the two estimates written above.

Title	proof of Fermat’s Theorem (stationary points)
Canonical name	ProofOfFermatsTheoremstationaryPoints
Date of creation	2013-03-22 13:45:09
Last modified on	2013-03-22 13:45:09
Owner	paolini (1187)
Last modified by	paolini (1187)
Numerical id	5
Author	paolini (1187)
Entry type	Proof
Classification	msc 26A06