Functional subgroups | Module theory | Group theory
In mathematics, the term socle has several related meanings. (Wikipedia).
What's a plane? Geometry Terms and Definitions
Points, lines and planes are some of the fundamental objects in Euclidean geometry. Learn about the plane and its essential properties. Geometer: Louise McCartney Artwork: Kelly Vivanco Director: Michael Harrison Written & Produced by Kimberly Hatch Harrison and Michael Harrison ♦♦♦♦♦♦
From playlist Socratica: The Geometry Glossary Series
DDPS | Structure-preserving learning of embedded, discrete closure models by Benjamin Sanderse
Description: Discovering physics models is an ongoing, fundamental challenge in computational science. In fluid flow problems, this problem is usually known as the “closure problem”, and the art is to discover a “closure model” that represents the effect of the small scales on the large sc
From playlist Data-driven Physical Simulations (DDPS) Seminar Series
Viviane Durand-Guerrier : Démarche expérimentale et apprentissages mathématiques [...]
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities: - Chapter markers and keywords to watch the parts of your choice in the video - Videos enriched with abstracts, b
From playlist Forum mathématiques vivantes
Group Definition (expanded) - Abstract Algebra
The group is the most fundamental object you will study in abstract algebra. Groups generalize a wide variety of mathematical sets: the integers, symmetries of shapes, modular arithmetic, NxM matrices, and much more. After learning about groups in detail, you will then be ready to contin
From playlist Abstract Algebra
Field Definition (expanded) - Abstract Algebra
The field is one of the key objects you will learn about in abstract algebra. Fields generalize the real numbers and complex numbers. They are sets with two operations that come with all the features you could wish for: commutativity, inverses, identities, associativity, and more. They
From playlist Abstract Algebra
What is a Module? (Abstract Algebra)
A module is a generalization of a vector space. You can think of it as a group of vectors with scalars from a ring instead of a field. In this lesson, we introduce the module, give a variety of examples, and talk about the ways in which modules and vector spaces are different from one an
From playlist Abstract Algebra
Episode 122 - Don't Do the Dew - 5/24/2012
On this week's episode, Chloe requests a toy, Norm checks some facts, and Will yells at the crows. All that, plus the latest on the Facebook IPO, Windows 8 news, SpaceX's Dragon launch, and a whole lot more. Enjoy!
From playlist This Is Only a Test
What's a Chord? Geometry Terms and Definitions
Learn the definition of the geometric term "chord" - an important concept when working with circles. You will also learn to distinguish "chords" from "diameters." Geometer: Louise McCartney Artwork: Kelly Vivanco Director: Michael Harrison Written & Produced by Kimberly Hatch Harrison a
From playlist Socratica: The Geometry Glossary Series
8. Solvent, Leaving Group, Bridgehead Substitution, and Pentavalent Carbon
Freshman Organic Chemistry II (CHEM 125B) The nature of nucleophiles and leaving groups has strong influence on the rate of SN2 reactions. Generally a good nucleophile or strong base is a poor leaving group, but hydrogen-bonding solvents can alter nucleophile reactivity. Although amino
From playlist Freshman Organic Chemistry II with Michael McBride
On the Mod p Cohomology for GL_2 (II) by Yongquan Hu
Program Recent developments around p-adic modular forms (ONLINE) ORGANIZERS: Debargha Banerjee (IISER Pune, India) and Denis Benois (University of Bordeaux, France) DATE: 30 November 2020 to 04 December 2020 VENUE: Online This is a follow up of the conference organized last year arou
From playlist Recent Developments Around P-adic Modular Forms (Online)
Abstract Algebra: The definition of a Ring
Learn the definition of a ring, one of the central objects in abstract algebra. We give several examples to illustrate this concept including matrices and polynomials. Be sure to subscribe so you don't miss new lessons from Socratica: http://bit.ly/1ixuu9W ♦♦♦♦♦♦♦♦♦♦ We recommend th
From playlist Abstract Algebra
As part of the college algebra series, this Center of Math video will teach you the basics of functions, including how they're written and what they do.
From playlist Basics: College Algebra
Breakthrough Prize in Mathematics 2014
Breakthrough Prize in Mathematics 2014 recipients talking about mathematics
From playlist Actualités
Abstract Algebra: Motivation for the definition of a group
The definition of a group is very abstract. We motivate this definition with a simple, concrete example from basic algebra. Be sure to subscribe so you don't miss new lessons from Socratica: http://bit.ly/1ixuu9W ♦♦♦♦♦♦♦♦♦♦ Ways to support our channel: ► Join our Patreon : https:/
From playlist Abstract Algebra
ICM 2006 Closing Round Table Are pure and applied mathematics drifting apart? Intervention by John Ball (Slides https://www.mathunion.org/fileadmin/IMU/Videos/ICM2006/tars/table2006_ball.pdf) Intervention by Lennart Carleson (Slides https://www.mathunion.org/fileadmin/IMU/Videos/ICM2006/
From playlist Number Theory
On theories in mathematics education and their conceptual differences – Luis Radford – ICM2018
Mathematics Education and Popularization of Mathematics Invited Lecture 18.1 On theories in mathematics education and their conceptual differences Luis Radford Abstract: In this article I discuss some theories in mathematics education research. My goal is to highlight some of their diffe
From playlist Mathematics Education and Popularization of Mathematics
Lisa Rougetet - The Role of Mathematical Recreations in the 17th and 19th Centuries - CoM Apr 2021
The aim of this talk is to retrace the history of mathematical recreations since the first books entirely dedicated to them at the beginning of the 17th century and at the end of the 19th century, especially in Europe. I will explain what mathematical recreations were exactly when they fir
From playlist Celebration of Mind 2021
Mathematics has an uncanny ability to describe the physical world. It elegantly explains and predicts features of space, time, matter, energy, and gravity. But is this magnificent scientific articulation an invention of the human mind or is mathematics indelibly imprinted upon the substrat
From playlist WSF Latest Releases
What are obtuse angles? Geometry Terms and Definitions
Obtuse angles are neither smarter nor dumber than acute angles, so don't let the name fool you. But they are important. You would be wise to know all about them in case you meet one while hiking in the woods... Geometer: Louise McCartney Artwork: Kelly Vivanco Director: Michael Harriso
From playlist Socratica: The Geometry Glossary Series