File:Cône textileII.png
Jump to navigation
Jump to search
Size of this preview: 333 × 598 pixels. Other resolutions: 133 × 240 pixels | 267 × 480 pixels | 427 × 768 pixels | 570 × 1,024 pixels | 2,344 × 4,211 pixels.
Original file (2,344 × 4,211 pixels, file size: 9.4 MB, MIME type: image/png)
File history
Click on a date/time to view the file as it appeared at that time.
Date/Time | Thumbnail | Dimensions | User | Comment | |
---|---|---|---|---|---|
current | 20:02, 3 October 2009 | 2,344 × 4,211 (9.4 MB) | Archaeodontosaurus | {{Information |Description={{en|1=Conus textile - Conidae (4.7cm) }} {{fr|1=Conus textile (Toison d'or) - Conidae (4.7cm)}} |Source=Own work |Author=Didier Descouens |Date=2009-10-03 |Permission= |other_versions= }} Category:Conus textile [[Category: |
File usage
No pages on the English Wikinews link to this file. Pages on other Wikimedia projects are not listed here.
Global file usage
The following other wikis use this file:
- Usage on en.wikipedia.org
- Benoit Mandelbrot
- Butterfly effect
- Chaos theory
- Complexity
- Dynamical system
- Fractal
- Logistic map
- Henri Poincaré
- Double pendulum
- Aleksandr Lyapunov
- Feigenbaum constants
- Unintended consequences
- Attractor
- Predictability
- Ergodic theory
- Quantum chaos
- Martin Gutzwiller
- Michael Berry (physicist)
- Edge of chaos
- Horseshoe map
- Hénon map
- Santa Fe Institute
- James A. Yorke
- Michel Hénon
- Mitchell Feigenbaum
- Buddhabrot
- Three-body problem
- Dyadic transformation
- Mary Cartwright
- Rössler attractor
- Pickover stalk
- Tilt-A-Whirl
- Baker's map
- Edward Norton Lorenz
- Floris Takens
- Van der Pol oscillator
- Zaslavskii map
- Kaplan–Yorke map
- Duffing map
- List of chaotic maps
- Tent map
- Rabinovich–Fabrikant equations
- Dynamical billiards
- Anosov diffeomorphism
- Bifurcation theory
- Interval exchange transformation
- Tinkerbell map
- Fermi–Pasta–Ulam–Tsingou problem
- Outer billiards
- Duffing equation
View more global usage of this file.