Wolfram Research

Mathematica MathWorld Wolfram Science More »

The Generalized Weierstrass-Riemann Functions


	The generalized Weierstrass–Riemann functions are continuous everywhere but are differentiable almost nowhere. They are defined by . This Demonstration plots these functions in the complex plane for values of between 0 and .


	Contributed by: Michael Croucher
	Show Initialization Code

Weierstrass Function (Wolfram MathWorld)

Nowhere Differentiable Function (Wolfram MathWorld)

"The Generalized Weierstrass-Riemann Functions" from The Wolfram Demonstrations Project
http://demonstrations.wolfram.com/TheGeneralizedWeierstrassRiemannFunctions/

Contributed by: Michael Croucher

Report an issue »

Interact with Demonstrations using the latest version of the free Mathematica Player—Download Now

Related Topics

Browse all topics

Some Related Demonstrations

Share & Bookmark This Demonstration

Contribute

Powered by Wolfram Mathematica

Give us your feedback

	Source page:
	Email	Name (optional)
	Occupation (optional)	Organization (optional)
	I use Mathematica often occasionally never
	Country (optional) Remember me
	Note: Please do not include anything you consider confidential or proprietary. Your message and contact information may be shared with the author of any specific Demonstration for which you give feedback, but will not otherwise be published or distributed. Privacy Policy »

© 2009 Wolfram Demonstrations Project & Contributors

Wolfram Research

Site Index

RSS

Atom

Note: To run this Demonstration you need the free
Mathematica Player or Mathematica 7+