An origamist or an origamian is a person who is associated with the art of origami. Some notable origamists / origamians are: (Wikipedia).
Why Is Everyone Obsessed With The Illuminati?
Check us out on iTunes! http://dne.ws/1NixUds Please Subscribe! http://testu.be/1FjtHn5 The Illuminati is thought to be controlling the strings of the entire world. But who are they really and how much power do they actually have? + + + + + + + + Previous Episode: Science Says These 6
From playlist Why Are There So Many Conspiracy Theories?
Art Quiz #107 - American Abstract Expressionism,
From playlist Art Quizzes
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This lecture introduces the topics covered in the course and its motivation. Examples of applications are provided, types and char
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
Gathering 4 Gardner (G4G) is a conference, a foundation, and a community of people who have a strong personal connection to the late Martin Gardner, who wrote a regular column for Scientific American over a period of 30 years. He also wrote over 100 books, and inspired many people. G4G ha
From playlist G4G12 Videos
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This class begins with a folding exercise of numerical digits. Questions discussed cover strip folding in the context of efficienc
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
Yossi Elran - 13 Ways to Tie a Knot in a Strip of Paper - G4G13 Apr 2018
Demonstration of how to tie a knot in a strip of paper.
From playlist G4G13 Videos
Check our sponsor The Great Courses Plus (free trial): http://ow.ly/j5cB30hIvm2 This video features Cliff Stoll. More links & stuff in full description below ↓↓↓ More Cliff Stoll videos: http://bit.ly/Cliff_Videos Buy a Klein Bottle from Cliff - it's an experience: http://www.kleinbottle.
From playlist Cliff Stoll on Numberphile
Stuff They Don't Want You To Know - Nazis UFOs
Everyone's familiar with the idea of UFOs, those mysterious airborne objects often linked with extraterrestrials -- but what if there weren't any aliens involved? Tune in and learn why some people believe Nazis may be responsible for modern UFO sightings. http://howstuffworks.com http://f
From playlist Stuff They Don't Want You To Know
Inspired by http://www.youtube.com/watch?v=PQOjkuJtBfM
From playlist Projects & Installations
Class 5: Tessellations & Modulars
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This class introduces more examples of origami models that use a variety of techniques and media. At the end of the session, the c
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
Lecture 17: Alexandrov's Theorem
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This lecture addresses the mathematical approaches for solving the decision problem for folding polyhedra. A proof of Alexandrov's
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
C. Matheus - Square tiled surfaces (Part 1)
) basic definitions and examples b) strata and genus c) reduced and primitive origamis, SL(2,R) action, Veech groups d) automorphisms and affine homeomorphisms e) homology of origamis f) Kontsevich-Zorich cocycle g) Lyapunov exponents of the Wollmilchsau
From playlist Ecole d'été 2018 - Teichmüller dynamics, mapping class groups and applications
Class 2: Univeresality & Simple Folds
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This class begins with a folding exercise of numerical digits. Questions discussed cover strip folding in the context of efficienc
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
Yes. I make mistakes ... rarely. http://www.flippingphysics.com
From playlist Miscellaneous
Lecture 19: Refolding & Smooth Folding
MIT 6.849 Geometric Folding Algorithms: Linkages, Origami, Polyhedra, Fall 2012 View the complete course: http://ocw.mit.edu/6-849F12 Instructor: Erik Demaine This lecture begins with a problem involving unfolding and refolding. Examples of smooth foldings and unfoldings are given, follow
From playlist MIT 6.849 Geometric Folding Algorithms, Fall 2012
What are the Types of Numbers? Real vs. Imaginary, Rational vs. Irrational
We've mentioned in passing some different ways to classify numbers, like rational, irrational, real, imaginary, integers, fractions, and more. If this is confusing, then take a look at this handy-dandy guide to the taxonomy of numbers! It turns out we can use a hierarchical scheme just lik
From playlist Algebra 1 & 2