Theorems about triangles | Elementary geometry
Maxwell's theorem is the following statement about triangles in the plane. For a given triangle and a point not on the sides of that triangle construct a second triangle , such that the side is parallel to the line segment , the side is parallel to the line segment and the side is parallel to the line segment . Then the parallel to through , the parallel to through and the parallel to through intersect in a common point . The theorem is named after the physicist James Clerk Maxwell (1831–1879), who proved it in his work on , which are of importance in statics. (Wikipedia).
Physics - E&M: Maxwell's Equations (30 of 30) Fundamental Form of Maxwell's Equation
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain the fundamental form of Maxwell's equations.
From playlist PHYSICS 46 MAXWELL'S EQUATIONS
Maxwell's Equations: Gauss' Law Explained (ft. @Higgsinophysics ) | Physics for Beginners
Can YOU understand Gauss Law, which is the Maxwell Equation that prescribes how Electric Fields must behave? Hey everyone, I'm back with another video! This one was highly requested, as a follow-up to my first two Maxwell Equation videos. This, therefore, is the third video in the series
From playlist Maxwell's Equations EXPLAINED
Physics - E&M: Maxwell's Equations (1 of 30) What are the Maxwell equations? Introduction
Visit http://ilectureonline.com for more math and science lectures! In this video I will introduction to Maxwell's equations.
From playlist PHYSICS - ELECTRICITY AND MAGNETISM 3
Here's What Maxwell's Equations ACTUALLY Mean.
Offset your carbon footprint on Wren: https://www.wren.co/start/parthg The first 100 people who sign up will have 10 extra trees planted in their name! Maxwell's Equations are a set of 4 equations that describe how electric and magnetic fields behave within our universe, as well as how th
From playlist Maxwell's Equations EXPLAINED
Maxwell’s Equations Part 1: Gauss’s Law for the Electric Field
It's time to go a little deeper with our understanding of classical physics! From the very introductory conceptual tutorials on electricity and magnetism, we need to apply some more rigor and use advanced math that will help us really understand these topics. To start we will examine Maxwe
From playlist Classical Physics
Physics - E&M: Maxwell's Equations (9 of 30) Differential Form of Gauss' Law: 1
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain Gauss' Law in differential form.
From playlist PHYSICS 46 MAXWELL'S EQUATIONS
The Search for a Theory of Everything – with Yang-Hui He
The search for a theory of everything spans centuries, from Kepler, Galileo and Newton, to Faraday and Maxwell, to Einstein, Bohr, Dirac, and C.N.Yang, to recent advances in superstring theory. Watch the Q&A: https://youtu.be/FB7aeEevo3g This event is in collaboration with the London Inst
From playlist Ri Talks
Physics - E&M: Maxwell's Equations (18 of 30) Differential Form of Gauss' Law: 10
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain the differential form of Gauss' Law for magnetic field.
From playlist PHYSICS 46 MAXWELL'S EQUATIONS
There are 8 Maxwell Equations, Not 4.
Get the exclusive NordVPN deal here at https://nordvpn.com/parthg. It's risk-free with NordVPN's 30-day money-back guarantee! In this video, we're looking at how there are two sides to every Maxwell, equation, and therefore there are two ways of understanding each of Maxwell's equations.
From playlist Maxwell's Equations EXPLAINED
On the Boltzmann equation without angular cut-off - Robert Strain
Robert Strain University of Pennsylvania March 18, 2014 In this talk we will explain several results surrounding global stability problem for the Boltzmann equation 1872 with the physically important collision kernels derived by Maxwell 1867 for the full range of inverse power intermolecul
From playlist Mathematics
Michael Atiyah: Poincaré conjecture, Hodge conjecture, Yang-Mills, Navier-Stokes [2000]
Millennium Meeting These videos document the Institute's landmark Paris millennium event which took place on May 24-25, 2000, at the Collège de France. On this occasion, CMI unveiled the "Millennium Prize Problems," seven mathematical quandaries that have long resisted solution. The announ
From playlist Number Theory
Panorama of Mathematics: Felix Otto
Panorama of Mathematics To celebrate the tenth year of successful progression of our cluster of excellence we organized the conference "Panorama of Mathematics" from October 21-23, 2015. It outlined new trends, results, and challenges in mathematical sciences. Felix Otto: "A large-scale
From playlist Panorama of Mathematics
A new potential theory for the Maxwell equations - Leslie Greengard
Leslie Greengard New York University April 18, 2015 Existing formulations of Maxwell's equations encounter numerical difficulties in geometries with sub-wavelength features and/or non-trivial genus. We will describe a new system of boundary value problems for the electromagnetic vector an
From playlist Mathematics
Metamaterials and Topological Mechanics (Lecture - 01) by Tom Lubensky
Infosys-ICTS Chandrasekhar Lectures Metamaterials and Topological Mechanics Speaker: Tom Lubensky (University of Pennsylvania, Pennsylvania) Date: 24 June 2019, 16:00 to 18:00 Venue: Ramanujan lecture hall, ICTS campus Lecture 1 : Metamaterials and Topological Mechanics Date & Time
From playlist Infosys-ICTS Chandrasekhar Lectures
Lars Andersson - Geometry and analysis in black hole spacetimes (Part 3)
Black holes play a central role in general relativity and astrophysics. The problem of proving the dynamical stability of the Kerr black hole spacetime, which is describes a rotating black hole in vacuum, is one of the most important open problems in general relativity. Following a brief i
From playlist Ecole d'été 2014 - Analyse asymptotique en relativité générale
Michael Atiyah, What is a Spinor
From playlist Number Theory
Sir Michael Atiyah, What is a Spinor ?
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From playlist Conférence en l'honneur de Jean-Pierre Bourguignon
LET THERE BE... Voltage? | Maxwell's Equation #2 Explained for Beginners
The second Maxwell Equation made simple! Hey you lot, I'm back with possibly my longest physics video yet - hopefully it's digestible haha! A lot of you enjoyed my previous video on one of Maxwell's Equations of Electromagnetism (check it out here: https://www.youtube.com/watch?v=0jW74lr
From playlist Maxwell's Equations EXPLAINED
Converting Maxwells Equations from Differential to Integral Form
In this video I show how to make use of Stokes and Divergence Theorem in order to convert between Differential and Integral form of Maxwell's equations. I also try to explain their connection to fluid dynamics, as well as motivation for each form.
From playlist Math/Derivation Videos
Sascha Husa (2) - Introduction to theory and numerics of partial differential equations
PROGRAM: NUMERICAL RELATIVITY DATES: Monday 10 Jun, 2013 - Friday 05 Jul, 2013 VENUE: ICTS-TIFR, IISc Campus, Bangalore DETAL Numerical relativity deals with solving Einstein's field equations using supercomputers. Numerical relativity is an essential tool for the accurate modeling of a wi
From playlist Numerical Relativity