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Origami Ornaments: The Ultimate Kusudama Book Lew Rozelle, St. Martin's Griffin, 2000 ISBN 978-0-312-26369-0; Origami Flower Ball (Origami Hana Kusudama) (in Japanese) Yoshihide Momotani, Ishizue Publishers, 1994, ISBN 978-4-900747-02-9; Marvelous Modular Origami Meenakshi Mukerji, A K Peters. 2007, ISBN 978-1-56881-316-5
Lillian Rose Vorhaus was born on October 24, 1898, in Manhattan, New York City. [1] She was a Jew of Austrian, Hungarian, Czech, and Polish ancestry. Her father was a Polish immigrant named Bernard Vorhaus, while her mother, Molly Grossman, was also born in New York.
She started publishing origami books in 1981, and has since published more than 60 books (plus overseas editions) as of 2006. She has created numerous origami designs, including boxes, kusudama , paper toys, masks, modular polyhedra, as well as other geometric forms and objects, such as origami tessellations , with publications in Japanese ...
A quilled basket of flowers Paper craft is a collection of crafts using paper or card as the primary artistic medium for the creation of two or three-dimensional objects. Paper and card stock lend themselves to a wide range of techniques and can be folded, curved, bent, cut, glued, molded, stitched, or layered. [ 1 ]
Peter Engel (born 1959) is an American origami artist and theorist, science writer, graphic designer, and architect. He has written several books on Origami, including Origami from Angelfish to Zen, 10-Fold Origami: Fabulous Paperfolds You Can Make in Just 10 Steps!, and Origami Odyssey.
Robert J. Lang – author of many Origami books including the new benchmark Origami Design Secrets; formerly a laser physicist at NASA before quitting in 2001 and committing to origami full-time [1] [3] [4] [2] [5] David Lister – founding member of the British Origami Society
In 1936 Margharita P. Beloch showed that use of the 'Beloch fold', later used in the sixth of the Huzita–Hatori axioms, allowed the general cubic equation to be solved using origami. [1] In 1949, R C Yeates' book "Geometric Methods" described three allowed constructions corresponding to the first, second, and fifth of the Huzita–Hatori axioms.
Given two points p 1 and p 2 and a line l 1, there is a fold that places p 1 onto l 1 and passes through p 2. This axiom is equivalent to finding the intersection of a line with a circle, so it may have 0, 1, or 2 solutions. The line is defined by l 1, and the circle has its center at p 2, and a radius equal to the distance from p 2 to p 1. If ...