seamless patterns
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Seamless Patterns
A Module “it’s the basic unit that allows to compose 2-D or 3-D structures by repetition"
The square, the triangle and the hexagon
are the only forms which fill the plane without leaving gaps, in a seamless way.
We can find several examples of seamless patterns in our everyday life.Cellular structures of living
beings.
Textile design. Urban patterns
UNKU
Perú, s. XII-XIII.
A. GAUDÍ Pabellón Güell, 1884-1887.
V. VASARELY
Tau-Ceti, 1955-1965W. WONG.
Too many artists have used the modules and networks to create their works…
Pentagonal tilings
14 types of pentagonal tilings with irregular pentagons have been discovered
Ms. Marjorie Rice discovered four of them.She is not a professional mathematician, but a housewife who makes some very nice quilts!
A mysterious tessellation: Durero's Pentagons
Durero’s fractals
The modular space: FACTORS
3.- COLOR CHANGE
1.-CREATION OF THE MODULE
2 .- DISTRIBUTION IN A NETWORK
The modular The modular compositioncompositionModular networks are geometric structures that relate modules
GridRepetition of a square
Triangular gridRepetition of a equilateral
triangle.
Hexagonal gridHexagon recurrence
REGULAR: They use a single regular polygon that is repeated.
SEMI-REGULAR: They use two or more regular
polygons
Semi-regular
Two conditions 1 - All polygons have equal sides 2 - The sum of the angles of polygons around a nodule is worth 360 º
Rectangular.
Ravine
.
Rhomboid
Radiated
Hexagon
COMPOSITION FROM A RED TRIANGLE
IRREGULAR: modules disposed in different shapes and varied resources.
.
Composite
Overlapping
OVERLAP: This consists of networks or modules mounted on top of each other for more complex structures
Super-and sub-modules
Kamal Ali’s Module
To repeat the modules, we use dynamic geometry based on the composition of motions in the plane:
By resources of symmetry. By turns.
And so, proceed to fill, or not, all the compositional plane
Moving modules. Giro de 30º
Geometry and Algebra in Moorish art
The Mosaics of the Alhambra
These decorative motifs are found almost everywhere in the Alhambra in Granada
The main reasons of this explosion of geometry in the Spanish-Muslim art are found
in religion The Koran prohibits any iconic depiction of Allah.
Divinity is identified with the singularity.
Y efectivamente comprobamos al observar todos estos mosaicos
que ningún punto es singular ni más importante que los demás.
Lo que se mueve en el plano son polígonos regulares, de tal forma que:
- No quede espacio ninguno del plano sin cubrir.
- No se superpongan unos polígonos con otros.
They can cover the plane with figures that are not regular polygons…
How did they get that?
The answer is simple: the figures used come from regular polygons
Just turn them properly.
The “Nazari Bone" is obtained by deforming a square:
The "petal" is obtained by deforming a diamond:
The " Nazarí bow" is obtained by deforming a triangle:
The flying fish
The Nazarí dove
Although it seems that there are many structures in these mosaics, everyone adjusts to 17 different models.
These models were investigated by Fedorov in the late 19th century, and it was the mathematician who proved that any tiling of the plane is a set of one of these 17 configurations. And here we have them all:
MOSAICS FOUND IN
THE ALHAMBRA
Patterns in perspective
THREE-DIMENSIONAL EFFECTS
ADDED SHADE STRUCTURE
M.C. ESCHER: Cicle, 1938.
The Wonderful World of M. Escher
Penrose’s Diagrams
Penrose Universes: A
mathematical model for quasicrystals
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