Steiner point (computational geometry)

Steiner Point Construction

This video provides a demonstration for constructing a Steiner Point in a network with three vertices. I use the Smart Notebook digital math tools which include a compass and ruler to guide students in the construction of a Steiner Point.

From playlist Discrete Math

Steiner Point with GeoGebra

Construct a minimum network using Torricelli's construction for a Steiner point in GeoGebra.

From playlist Discrete Math

Null points and null lines | Universal Hyperbolic Geometry 12 | NJ Wildberger

Null points and null lines are central in universal hyperbolic geometry. By definition a null point is just a point which lies on its dual line, and dually a null line is just a line which passes through its dual point. We extend the rational parametrization of the unit circle to the proj

From playlist Universal Hyperbolic Geometry

The circle and Cartesian coordinates | Universal Hyperbolic Geometry 5 | NJ Wildberger

This video introduces basic facts about points, lines and the unit circle in terms of Cartesian coordinates. A point is an ordered pair of (rational) numbers, a line is a proportion (a:b:c) representing the equation ax+by=c, and the unit circle is x^2+y^2=1. With this notation we determine

From playlist Universal Hyperbolic Geometry

Elliptic curves: point at infinity in the projective plane

This video depicts point addition and doubling on elliptic curve in simple Weierstrass form in the projective plane depicted using stereographic projection where the point at infinity can actually be seen. Explanation is in the accompanying article https://trustica.cz/2018/04/05/elliptic-

From playlist Elliptic Curves - Number Theory and Applications

Number Theory | Rational Points on the Unit Circle

We describe all points on the unit circle with rational coordinates. Furthermore, we outline a strategy for finding rational points on other quadratic curves. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/

From playlist Number Theory

Topics in Curve and Surface Implicitization, David Cox (Amherst College) [2007]

Slides for this talk: https://drive.google.com/file/d/1quB7Lg_dXTPow_qLLDeW2Zv6m9G4X4AN/view?usp=sharing (credits to zubrzetsky) Topics in Curve and Surface Implicitization Saturday, June 2, 2007 - 10:30am - 11:20am EE/CS 3-180 David Cox (Amherst College) This lecture will discuss sever

From playlist Mathematics

Lecture 1: Overview (Discrete Differential Geometry)

Full playlist: https://www.youtube.com/playlist?list=PL9_jI1bdZmz0hIrNCMQW1YmZysAiIYSSS For more information see http://geometry.cs.cmu.edu/ddg

From playlist Discrete Differential Geometry - CMU 15-458/858

Cartesian coordinates and geometry | WildTrig: Intro to Rational Trigonometry | N J Wildberger

Cartesian coordinates allow us to talk precisely about points and lines, parallel and perpendicular, and quadrance and spread---the two main concepts from rational trigonometry. ************************ Screenshot PDFs for my videos are available at the website http://wildegg.com. These g

From playlist WildTrig: Intro to Rational Trigonometry

SummerSchool 20060719 1430 Kresch - Descent, torsors

From playlist Clay Mathematics Institute Summer School 2006 on "Arithmetic geometry"

New isoperimetric inequalities for convex bodies - Amir Yehudayoff

Computer Science/Discrete Mathematics Seminar I Topic: New isoperimetric inequalities for convex bodies Speaker: Amir Yehudayoff Affiliation: Technion - Israel Institute of Technology Date: November 23, 2020 For more video please visit http://video.ias.edu

From playlist Mathematics

The fundamental theorem of projective geometry | WildTrig: Intro to Rational Trigonometry

The fundamental theorem of projective geometry states that any four planar non-collinear points (a quadrangle) can be sent to any quadrangle via a projectivity, that is a sequence of perspectivities. We prove this by first establishing the simpler one-dimensional case of three points on a

From playlist WildTrig: Intro to Rational Trigonometry

Rolf Schneider: Hyperplane tessellations in Euclidean and spherical spaces

Abstract: Random mosaics generated by stationary Poisson hyperplane processes in Euclidean space are a much studied object of Stochastic Geometry, and their typical cells or zero cells belong to the most prominent models of random polytopes. After a brief review, we turn to analogues in sp

From playlist Probability and Statistics

Wolfram Physics IV: Multiway Invariance and Advanced Quantum Mechanics

Find more information about the summer school here: https://education.wolfram.com/summer/school Stay up-to-date on this project by visiting our website: http://wolfr.am/physics Check out the announcement post: http://wolfr.am/physics-announcement Find the tools to build a universe: https:

From playlist Wolfram Summer Programs

Steiner's Porism: proving a cool animation #SoME1

Strange circle stuff. (Some people have commented that the audio is really low. Unfortunately I haven't found a way to fix it without re-uploading the whole video, but your feedback will be taken on board for the next video! Also to everyone begging for more content, I’m currently in the m

From playlist Summer of Math Exposition Youtube Videos

Lecture 16: Discrete Curvature I (Discrete Differential Geometry)

Full playlist: https://www.youtube.com/playlist?list=PL9_jI1bdZmz0hIrNCMQW1YmZysAiIYSSS For more information see http://geometry.cs.cmu.edu/ddg

From playlist Discrete Differential Geometry - CMU 15-458/858

Ciro Ciliberto, Enumeration in geometry - 15 Novembre 2017

https://www.sns.it/eventi/enumeration-geometry Colloqui della Classe di Scienze Ciro Ciliberto, Università di Roma “Tor Vergata” Enumeration in geometry Abstract: Enumeration of geometric objects verifying some specific properties is an old and venerable subject. In this talk I will

From playlist Colloqui della Classe di Scienze

Navigating Intrinsic Triangulations - SIGGRAPH 2019

Navigating Intrinsic Triangulations. Nicholas Sharp, Yousuf Soliman, and Keenan Crane. ACM Trans. on Graph. (2019) http://www.cs.cmu.edu/~kmcrane/Projects/NavigatingIntrinsicTriangulations/paper.pdf We present a data structure that makes it easy to run a large class of algorithms from co

From playlist Research

The Journey to 3264 - Numberphile

Professor David Eisenbud talks about conics, and visits a few numbers along the way. More links & stuff in full description below ↓↓↓ David Eisenbud Numberphile Playlist: http://bit.ly/Eisenbud_Videos David Eisenbud: https://math.berkeley.edu/people/faculty/david-eisenbud 3264 and All

From playlist David Eisenbud on Numberphile

Computations with homogeneous coordinates | Universal Hyperbolic Geometry 8 | NJ Wildberger

We discuss the two main objects in hyperbolic geometry: points and lines. In this video we give the official definitions of these two concepts: both defined purely algebraically using proportions of three numbers. This brings out the duality between points and lines, and connects with our

From playlist Universal Hyperbolic Geometry