A Moore curve (after E. H. Moore) is a continuous fractal space-filling curve which is a variant of the Hilbert curve. Precisely, it is the loop version of the Hilbert curve, and it may be thought as the union of four copies of the Hilbert curves combined in such a way to make the endpoints coincide. Because the Moore curve is plane-filling, its Hausdorff dimension is 2. The following figure shows the initial stages of the Moore curve: (Wikipedia).
What is the difference between convex and concave
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
#Cycloid: A curve traced by a point on a circle rolling in a straight line. (A preview of this Sunday's video.)
From playlist Miscellaneous
What is the difference between convex and concave polygons
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
What are four types of polygons
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
Hyperbola 3D Animation | Objective conic hyperbola | Digital Learning
Hyperbola 3D Animation In mathematics, a hyperbola is a type of smooth curve lying in a plane, defined by its geometric properties or by equations for which it is the solution set. A hyperbola has two pieces, called connected components or branches, that are mirror images of each other an
From playlist Maths Topics
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
What are the names of different types of polygons based on the number of sides
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons
Geometric and algebraic aspects of space curves | Differential Geometry 20 | NJ Wildberger
A space curve has associated to it various interesting lines and planes at each point on it. The tangent vector determines a line, normal to that is the normal plane, while the span of adjacent normals (or equivalently the velocity and acceleration) is the osculating plane. In this lectur
From playlist Differential Geometry
Quasi-Biweekly Mode of the Asian Summer Monsoon Revealed in Bay of Bengal Surface... by Sree Lekha
DISCUSSION MEETING WAVES, INSTABILITIES AND MIXING IN ROTATING AND STRATIFIED FLOWS (ONLINE) ORGANIZERS: Thierry Dauxois (CNRS & ENS de Lyon, France), Sylvain Joubaud (ENS de Lyon, France), Manikandan Mathur (IIT Madras, India), Philippe Odier (ENS de Lyon, France) and Anubhab Roy (IIT M
From playlist Waves, Instabilities and Mixing in Rotating and Stratified Flows (ONLINE)
The Arnold conjecture via Symplectic Field Theory polyfolds -Ben Filippenko
Symplectic Dynamics/Geometry Seminar Topic: The Arnold conjecture via Symplectic Field Theory polyfolds Speaker: Ben Filippenko Affiliation: University of California, Berkeley Date: April 1, 2019 For more video please visit http://video.ias.edu
From playlist Mathematics
Stanford Seminar - Building Billion Dollar Businesses
Ravi Belani Alchemist Accelerator March 4, 2020 As a lecturer in Stanfordโs Department of Management Science and Engineering, Ravi Belani regularly teaches MS&E 472, the Stanford course associated with the Entrepreneurial Thought Leaders series. He is also the managing director of Alchem
From playlist MS&E472 - Entrepreneurial Thought Leaders - Stanford Seminars
February 20, 2008 lecture by Nick Tredennick for the Stanford University Computer Systems Colloquium (EE 380). Nick Tredennick talks about the semiconductor industry and its impact in the world. He takes the audience through the history of semiconductors and where he believes they are
From playlist Lecture Collection | Computer Systems Laboratory Colloquium (2007-2008)
Tutorial: Clustered Many-core Computing with CPUs + GPUs, Part 1 - William Dorland
Tutorial: Clustered Many-core Computing with CPUs + GPUs, Part 1 William Dorland University of Maryland July 14, 2009
From playlist PiTP 2009
Michio Kaku: How to Stop Robots From Killing Us | Big Think
Michio Kaku: How to Stop Robots From Killing Us New videos DAILY: https://bigth.ink Join Big Think Edge for exclusive video lessons from top thinkers and doers: https://bigth.ink/Edge ---------------------------------------------------------------------------------- Even if computer techno
From playlist The future: artificial intelligence | Big Think
26C3: Weaponizing Cultural Viruses 6/7
Clip 6/7 Speaker: Aaron Muszalski A Manual For Engaged Memetic Resistance on The Front Lines of The Culture Wars What does it mean to fight a culture war? How does culture propagate through a population? What is a meme? And why are some cultural memes more virulent than others? As th
From playlist 26C3: Here be dragons day 3
Arnold Diffusion by Variational Methods III - John Mather
John Mather Princeton University; Institute for Advanced Study November 9, 2011 For more videos, visit http://video.ias.edu
From playlist Mathematics
Banned Books, Burned Books: Forbidden Literary Work | Anne Carroll Moore
Anne Carroll Moore advocated for children's reading in the early 20th century. Unfortunately, she was also a strict gatekeeper who fought against classics like Stuart Little and Charlotte's Web. Discover her legacy, for better or worse, in this first part of a two-part series. To see more
From playlist Psychology and Communication
Henry Moore โ Meet 500 Years of British Art
Tate's curators introduce the new displays at Tate Britain, from 1540 to the present. This week, Chris Stephens explores the work of Henry Moore. This room is part of the display: Walk through British Art BP Displays sponsored by BP
From playlist Expressionism to Pop Art | Art History | Khan Academy
What is the difference between concave and convex polygons
๐ Learn about polygons and how to classify them. A polygon is a plane shape bounded by a finite chain of straight lines. A polygon can be concave or convex and it can also be regular or irregular. A concave polygon is a polygon in which at least one of its interior angles is greater than 1
From playlist Classify Polygons