![]() ![]() There are three types that we have already discussed, and it is linked closely to hyperbolic geometry. Escher was so into this style of artwork that he created his own new classification system for plane division.Ī tessellation pattern, also called tiling, is when a number of different shapes fit together perfectly on a flat plane. Many of his pieces featured animals using which he would divide the planes of the work. Escher used tessellation patterns extensively in his work, often to great effect. ![]() You can commonly find examples of these in Islamic architecture, as no animals or humans are depicted on buildings with the belief that it might lead to idol worship. Tessellation patterns can be seen in various areas of life, including in patterns and designs, hobbies, architecture, and also in the art of M. ![]() There are nine different types of semi-regular tessellations that can be created by using various shapes at various lengths, such as combining triangles, hexagons, and squares.ĭemi-Regular tessellations: These are the type that consists of two or three polygonal arrangements, of which there are 20. Semi-regular tessellations: When two or three different polygonal shapes share a common vortex, it is called a semi-regular tessellation. These have interior angles which are divisors of 360. There are three types of regular tessellations, those being triangles, hexagons, and squares. Regular tessellations: Regular tessellations are tile coverings made up of only one shape. There are three types of tessellations that you’re going to come across, and they are as follows: What are The Three Types of Tessellations? Things like a tile floor or a chessboard are an example of a tessellation pattern.Īs tessellation is the much more common of the two, we’re going to be focusing our efforts on those for the majority of this article. A tessellation is the covering of a flat plane surface with one or more geometric shapes, in which there are no gaps. Tessellations, on the other hand, are much more common. It is quite rare you’re ever going to have to use or come across fractals, whether it be art, geometry, mathematics, or otherwise. ![]()
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