Blancmange curve

Gerhard Wanner : On the discovery of Lagrange multipliers

From playlist Lagrange Days at CIRM

WTF is a Bézier Curve?

What is a Bézier curve? Programmers use them everyday for graphic design, animation timing, SVG, and more. #shorts #animation #programming Animated Bézier https://www.jasondavies.com/animated-bezier/

From playlist CS101

Math research I have been working on: (Partial Derivative Of Okamoto’s Functions)

One of the math research projects I have been working on is now a preprint on the arxiv and on ResearchGate. I helped mentor two undergraduate students as our group investigated different properties of the partial derivative of Okomoto's functions with respect to the parameter. Even though

From playlist Academic Talks

Polynumbers and de Casteljau Bezier curves | Algebraic Calculus and dCB curves | N J Wildberger

The Algebraic Calculus is an exciting new approach to calculus, not reliant on "infinite processes" and "real numbers". The central objects are polynomially parametrized curve, which turn out to be the same as the de Casteljau Bezier curves which play such a big role in design, animation,

From playlist Algebraic Calculus One Info

Shake! (1929)

Introductory intertitle reads: "Not content with dancing the floor off the Hippodrome, these young ladies from "Mr Cinders" believe in shaking a loose limb off stage -" High angle shot looking down on 8 chorus girls standing inside big rubber bands attached to machines. They wear sho

From playlist Crazy Inventions

Droplets in Motion (feat. Hannah Fry) - Objectivity 192

Special guest Hannah Fry joins us to revisit her PhD subject - droplet deformation! More links below ↓↓↓ Featuring mathematician and broadcaster Hannah Fry speaking with Brady. Check out Hannah's website: http://www.hannahfry.co.uk/ Browse her research & publications (including her PhD

From playlist Special Guests on Objectivity

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

Edward Witten: Mirror Symmetry & Geometric Langlands [2012]

2012 FIELDS MEDAL SYMPOSIUM Thursday, October 18 Geometric Langlands Program and Mathematical Physics 1.30am-2.30pm Edward Witten, Institute for Advanced Study, Princeton "Superconformal Field Theory And The Universal Kernel of Geometric Langlands" The universal kernel of geometric Langl

From playlist Number Theory

A09 The Hamiltonian

Moving on from Lagrange's equation, I show you how to derive Hamilton's equation.

From playlist Physics ONE

Ruby On Ales 2015 - Stupid Ruby Tricks

By, Mike Moore Ruby is awesome. We all love Ruby. And Ruby loves us. We shouldn't abuse Ruby. Well, maybe a little. Help us caption & translate this video! http://amara.org/v/GVIo/

From playlist Ruby on Ales 2015

LA Ruby Conf 2014 - Writing Games with Ruby by Mike Moore

Creating games is crazy fun and dirt simple with Ruby. You will leave this session with a working game; no previous game development experience necessary. We will introduce basic concepts of game programming and show how to implement them using the Gosu library. This includes the game loop

From playlist LA RubyConf 2014

mandelbrot julia rotation 3

some julia dynamics combined with a rotation in the direction of mandelbrot.

From playlist Fractal

Infinite Sierpinski Zoom

This is an infinite zoom on the famous Sierpinski triangle fractal. If you want to see six different constructions of this fractal, check out this long form video I made : https://youtu.be/IZHiBJGcrqI . #math #manim #fractal #sierpinski #zoom #infinite #shorts #mathshorts

From playlist Fractals

Hilbert Curve

This shows a 3d print of a mathematical sculpture I produced using shapeways.com. This model is available at http://shpws.me/2toQ.

From playlist 3D printing

Quadratic de Casteljau-Bezier Curves (Ch7 Pr12)

An introductory mathematical description of Quadratic de Casteljau-Bezier curves. This is Chapter 7 Problem 12 from the MATH1131/1141 Calculus notes. Presented by Dr Daniel Mansfield from the UNSW School of Mathematics and Statistics.

From playlist Mathematics 1A (Calculus)

Maria Montanucci: Algebraic curves with many rational points over finite fields

CONFERENCE Recording during the thematic meeting : « Conference On alGebraic varieties over fiNite fields and Algebraic geometry Codes» the February 13, 2023 at the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Jean Petit Find this video and other talks

From playlist Algebraic and Complex Geometry

Lecture 10: Smooth Curves (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

Binbin Xu: Equivalent curves on surfaces

We consider a closed oriented surface of genus at least 2. For any positive integer k, an essential closed curve on the surface with k self-intersections is called a k-curve. A pair of curves on the surface are said to be k-equivalent, if they have the same intersection numbers with each k

From playlist Topology

CurvesSurfaces3: De Casteljau Bezier Curves in Algebraic Calculus | N J Wildberger

We explain how to extend Archimedes' famous Parabolic Area Formula to the cubic situation. This formula was historically the first major calculation in Calculus, and gave an explicit and workable formula for the area of a slice of a parabola, cut off by a chord, in terms of the area of a p

From playlist MathSeminars

Lecture 11: Discrete Curves (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