![]() ![]() R obert Fathauer has had a life-long interest in art but studied physics and mathematics in college, going on to earn a PhD from Cornell University in electrical engineering. Non-Euclidean Tessellations.173Įscheresque Tessellations. Rosettes and Spirals.115Īnd Substitution Tilings.135ĩ. Treats special topics like tiling rosettes, fractal tessellations, and decoration of tilesĪbout the Author.Filled with templates to aid in creating Escheresque tessellations.Highlights numerous examples of tessellations in the real world.Contains tutorial content on designing and drawing Escheresque tessellations.Covers polygonal, aperiodic, and non-Euclidean tilings.Introduces the mathematics of tessellations, including symmetry.Going beyond planar designs, the book contains numerous nets of polyhedra and templates for applying Escheresque designs to them.Īctivities and worksheets are spread throughout the book, and examples of real-world tessellations are also provided. Techniques demonstrated in the book are aimed at making these designs more achievable. These are extremely popular with students and math hobbyists but are typically very challenging to execute. The book has a particular focus on ‘Escheresque’ designs, in which the individual tiles are recognizable real-world motifs. Inclusion of special topics like spiral tilings and tessellation metamorphoses allows the reader to explore beautiful and entertaining math and art. Additionally, it covers techniques, tips, and templates to facilitate the creation of mathematical art based on tessellations. Tessellations: Mathematics, Art and Recreation aims to present a comprehensive introduction to tessellations (tiling) at a level accessible to non-specialists. ![]()
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