Titlebook: An Introduction to Computational Origami; Tetsuo Ida Book 2020 Springer Nature Switzerland AG 2020 paper fold.Euclid and Origami geometry.

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Simple Origami Geometry,fold rules and show, by examples, that it is as powerful as a straightedge and a compass. Furthermore, we show that the set of basic fold rules enables us to construct the shapes by folding by hand. The set of the basic fold rules is the main ingredient of more powerful Huzita-Justin’s fold rules that we discuss in Chapter ..

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https://doi.org/10.1007/978-94-015-0602-1lds. The knot folds are the combination of superpositions of faces and insertions of faces into the slits between the face layers. The inserts enable the knot to be rigid. We use Huzita-Justin folds as the basis of the knot folds and extend them to allow for the knot folds.

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Logical Analysis of Huzita-Justin Folds, folded. The obtained solutions, both in numeric and symbolic forms, make origami computationally tractable for further treatments, such as visualization and automated verification of the correctness of the origami construction.

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0943-853X d graphical images to do so. In turn, it discusses the verification of origami using computer software and symbolic computation tools. The binary code for the origami software, called Eos and created by the author, is also provided..978-3-319-59189-6Series ISSN 0943-853X Series E-ISSN 2197-8409

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