PlanetMath (more info)
 Math for the people, by the people.
Encyclopedia | Requests | Forums | Docs | Wiki | Random | RSS  
Login
create new user
name:
pass:
forget your password?
Main Menu
sections
Encyclopædia
Papers
Books
Expositions

meta
Requests (232)
Orphanage
Unclass'd
Unproven (519)
Corrections (22)
Classification

talkback
Polls
Forums
Feedback
Bug Reports

downloads
Snapshots
PM Book

information
News
Docs
Wiki
ChangeLog
TODO List
Legalese
About
Owner confidence rating: Very high Entry average rating: No information on entry rating
[parent] power function (Definition)

A real power function $ f:\,\mathbb{R}_+\to\mathbb{R}$ has the form

$\displaystyle f(x) = x^a$
where $ a$ is a given real number.
Theorem 1   The power function $ x\mapsto x^a$ is differentiable with the derivative $ x\mapsto ax^{a-1}$ and strictly increasing if $ a > 0$ and strictly decreasing if $ a < 0$ (and constant 1 if $ a = 0$).

The power functions comprise the natural power functions $ x\mapsto x^n$ with $ n = 0,\,1,\,2,\,\ldots$, the root functions $ x\mapsto \sqrt[n]{x} = x^{\frac{1}{n}}$ with $ n = 1,\,2,\,3,\,\ldots$ and other fraction power functions $ x\mapsto x^a$ with $ a$ any fractional number.

Note. The power $ x^a$ may of course be meaningful also for other than positive values of $ x$, if $ a$ is an integer. On the other hand, e.g. $ (-1)^{\sqrt{2}}$ has no real values -- see the general power.



"power function" is owned by pahio.
(view preamble | get metadata)

View style:

See Also: fraction power, cube of a number, power tower sequence, Laplace transform of logarithm

Also defines:  natural power function, root function, fraction power function

This object's parent.
Log in to rate this entry.
(view current ratings)

Cross-references: general power, integer, positive, power, fractional number, strictly decreasing, strictly increasing, derivative, differentiable, real
There are 14 references to this entry.

This is version 11 of power function, born on 2004-10-25, modified 2006-11-18.
Object id is 6421, canonical name is PowerFunction.
Accessed 17357 times total.

Classification:
AMS MSC26A99 (Real functions :: Functions of one variable :: Miscellaneous)
Pending Errata and Addenda
None.
Discussion
Style: Expand: Order:
forum policy

No messages.

Interact
post | correct | update request | add derivation | add example | add (any)