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User: CGimaging |
Introduction To Sacred Geometry A lively video featuring artist Charles Gilchrist and his creations in which he speaks about the ancient spiritual discipline known as Sacred Geometry. Tags: sacred geometry mandala meditation healing spiritual discipline Gilchrist phi pi golden mean rectangle merkaba mercaba M |
User: mathrapper |
One Geometry Perelman's proof of the Poincare conjecture to the tune of Snoop Dogg and Pharrell William's "Drop it Like it's Hot" Lyrics: http://cs.fairfield.edu/~sawin/Rap/perelman.pdf videography:Lisa Sawin sound engineer:Oliver Sawin Artist/Author:Steve Sawin Tags: math topology geometry rap perelman poincare snoop dogg Pharrell |
User: CGimaging |
Sacred Geometry 101A: 7 Pennies Gilchrist introduces a root principle of Sacred Geometry, Seven Tangent Circles Tags: Charles Gilchrist Sacred Geometry Seven Tangent Circles |
User: reedbananaboat |
GEOMETRY WARS GEOMETRY WARS Tags: GEOMETRY WARS |
User: Jasmerrin |
The Hyperbolic Geometry Song This is a math project I did back in 9th Grade about Hyperbolic Geometry. It's a parody of one of my old favorite songs, Superman by Five for Fighting. I wrote the lyrics, animated the movie, and *shudder* sang the song. Feel free to laugh at my singing, I don't pretend I'm any good. I got an A on the project, though. Tags: The Hyperbolic Geometry Song Algebra Math Calculus Superman Five for Fighting Jasmerrin Jason Merrin School Class Parody |
User: CGimaging |
Sacred Geometry 101B: The Vesica Piscis Gilchrist introduces a root principle of Sacred Geometry, The Vesica Piscis Tags: Charles Gilchrist Sacred Geometry Two Circles Of Common Radius Vesica Piscis Meditation |
User: googletechtalks |
CGAL: The Open Source Computational Geometry Algorithms Library Google Tech Talks March, 3 2008 ABSTRACT Introduction Project mission statement, history, internal organization, partners, CGAL in numbers. What's in CGAL A survey on available data structures and algorithms, as well as examples how and by whom they are used. Topics include Triangulations, Voronoi diagrams, Boolean operations on polygons and polyhedra, arrangements of curves and their applications, Mesh generation, Geometry processing, Alpha shapes, Convex hull algorithms, Operations on polygons, Search structures, Interpolation, Shape analysis, fitting, and distances, Kinetic data structures... Generic Programming Paradigm CGAL data structures are C++ template classes and functions, usually taking several template parameters (with default values for ease of use). This gives developers an incredible flexibility to adapt the data structures to their needs, which is important internally for code reuse, and important for end users, as they typically integrate CGAL in already existing applications. Parts of CGAL are also interfaced with languages and software like Python, Java, Scilab, Qt and the Ipe drawing editor. Exact Geometric Computing Paradigm We present how to make geometric algorithms correct, robust, and nevertheless fast, by combining floating point arithmetic with exact arithmetic, and clever filtering mechanisms to switch between these two modes. These mechanisms can be used for geometric predicates, as well as for geometric constructions, which instead of a discrete return value generate new geometric entities. Conclusion and Outlook A wrapup, and a sneak preview on algorithms that might make it into future releases of CGAL. Speaker: Andreas Fabri, PhD, GeometryFactory As member of the initial development team of the CGAL project, Andreas is one of the architects of the CGAL software. For several years he chaired the CGAL Editorial Board. In 2003, Andreas founded the GeometryFactory as spin-off of the CGAL project, offering licenses, service and support to commercial users. Andreas received his PhD in 1994 from the Ecole des Mines de Paris, while working on geometric algorithms for parallel machines at INRIA. Speaker: Sylvain Pion, PhD, INRIA Sophia-Antipolis Sylvain got involved in the CGAL project during his PhD, which he received in 1999 at INRIA. He worked then on providing generic solutions to numerical robustness issues arising in geometric algorithms. Later on he worked on the efficiency of some fundamental geometric algorithms such as 3D Delaunay triangulations. He is now also involved in C++ standardization, and is working on parallel geometric algorithms. He is employed as researcher at INRIA, and is the current chair of the CGAL Editorial Board. Tags: google techtalks techtalk engedu talk talks googletechtalks education |
User: eschwartz1ster |
Discover Waldorf Education: Grade 6 Geometry This is a kaleidoscopic presentation of geometrical drawings by Waldorf school sixth graders. Eugene Schwartz provides commentary on a vast array of student work. Its beauty and mathematical precision testify to the rigorous curriculum of the Waldorf middle school experience. Tags: waldorf schools eugene schwartz children's art geometry homeschooling rudolf steiner anthroposophy adolescence |
User: CGimaging |
Sacred Geometry 101D: Concentric Circles Charles Gilchrist introduces a root principle of Sacred Geometry, Concentric Circles Tags: Charles Gilchrist Sacred Geometry Mandala The Germ Seed Flower Fruit Of Life Vesica Piscis Concentric Circles Drunvalo |
User: mearbhrach |
Jain - Sacred Geometry & Vedic Mathematics http://www.jainmathemagics.com Vedic mathematics is a system of mathematics consisting of a list of 16 basic sutras, or aphorisms, that allegedly encompass all mathematics. They were presented by a Hindu scholar and mathematician, Jagadguru Swami Sri Bharati Krishna Tirthaji Maharaja, during the early part of the 20th century (Trivedi, 1965). See Also http://www.constructingtheuniverse.com http://www.isbn.nu/0060169397 http://www.lauralee.com/index.cgi?pid=3268 Download Audio: http://www.lauralee.com/audio/asf/032300.asf Tags: egypt math |
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