Even part: Difference between revisions

Latest revision as of 20:05, 22 September 2011

Definition

Suppose $f$ is a function whose domain is a subset of the reals that is symmetric about 0, i.e., for every $x$ in the domain of $f$ , $- x$ is also in the domain of $f$ . Then, the even part of $f$ , sometimes denoted $f_{e}$ or $f_{e v e n}$ is defined as a function with the same domain, and with the definition:

$f_{e} (x) : = \frac{f (x) + f (- x)}{2}$

Equivalently, it is the only possible choice of even function in a decomposition of $f$ of the form:

$f (x) = f_{e} (x) + f_{o} (x)$

with $f_{e}, f_{o}$ both having the same domain as $f$ , and with $f_{e}$ an even function and $f_{o}$ an odd function. The other part, $f_{o}$ , is the odd part of $f$ .

Particular cases

Function	Domain	Even part
polynomial	all of $R$	the sum of the monomials of even degree in that polynomial
exponential function $e^{x}$	all of $R$	hyperbolic cosine function $\cosh$

@@ Line 9: / Line 9: @@
 <math>\! f(x) = f_e(x) + f_o(x)</math>
-with <math>f_e, f_o</math> both having the same domain as <math>f</math>, and with <math>f_e</math> an [[even function]] and <math>f_o</math> an [[odd function]].
+with <math>f_e, f_o</math> both having the same domain as <math>f</math>, and with <math>f_e</math> an [[even function]] and <math>f_o</math> an [[odd function]]. The other part, <math>f_o</math>, is the [[odd part]] of <math>f</math>.
 ==Particular cases==