Now, a look at the principles of the function of the esophagus
From playlist Acute Care Surgery
This video explains what a mathematical function is and how it defines a relationship between two sets, the domain and the range. It also introduces three important categories of function: injective, surjective and bijective.
From playlist Foundational Math
(New Version Available) Inverse Functions
New Version: https://youtu.be/q6y0ToEhT1E Define an inverse function. Determine if a function as an inverse function. Determine inverse functions. http://mathispower4u.wordpress.com/
From playlist Exponential and Logarithmic Expressions and Equations
Sigmoid functions for population growth and A.I.
Some elaborations on sigmoid functions. https://en.wikipedia.org/wiki/Sigmoid_function https://www.learnopencv.com/understanding-activation-functions-in-deep-learning/ If you have any questions of want to contribute to code or videos, feel free to write me a message on youtube or get my co
From playlist Analysis
Trigonometry - Vocabulary of trigonometric functions
In this video will cover some of the basic vocabulary that you'll hear when working with trigonometric functions. Specifically we'll cover what is trigonometry, angles, and defining the trigonometric functions as ratios of sides. You'll hear these terms again as we dig deeper into the st
From playlist Trigonometry
Using the vertical line test to determine if a graph is a function or not
👉 Learn how to determine whether relations such as equations, graphs, ordered pairs, mapping and tables represent a function. A function is defined as a rule which assigns an input to a unique output. Hence, one major requirement of a function is that the function yields one and only one r
From playlist What is the Domain and Range of the Function
The Bernstein Sato polynomial: Holonomic modules
This is the third of three talks about the Bernstein-Sato polynomial. The first talk is at https://youtu.be/CX2iej9NKzs We use Bernstein's inequality from the second talk to show that holonomic modules have finite length. We then use this to prove that a particular module is holonomic, wh
From playlist Commutative algebra
What is an Injective Function? Definition and Explanation
An explanation to help understand what it means for a function to be injective, also known as one-to-one. The definition of an injection leads us to some important properties of injective functions! Subscribe to see more new math videos! Music: OcularNebula - The Lopez
From playlist Functions
08: Lagrange multiplier method - Part 2
Jacob Linder: 19.01.2012, Classical Mechanics (TFY4345), v2012 NTNU A full textbook covering the material in the lectures in detail can be downloaded for free here: http://bookboon.com/en/introduction-to-lagrangian-hamiltonian-mechanics-ebook
From playlist NTNU: TFY 4345 - Classical Mechanics | CosmoLearning Physics
Maxim Kontsevich - Riemann-Hilbert correspondence for q-difference modules
Abstract: For complex number q,0 less than |q| less than 1 denote by Aq:=C〈X±1,Y±1〉/(relationY X=qXY) the corresponding quantum torus algebra. By the q-version of Riemann-Hilbert correspondence (essentially due to Ramis, Sauloy and Zhang, 2009), the category of holonomic Aq-modules is nat
From playlist Algebraic Analysis in honor of Masaki Kashiwara's 70th birthday
April 30, Mioara Joldes, Laboratoire d'analyse et d'architecture des systèmes (LAAS-CNRS) On Moment Problems with Holonomic Functions
From playlist Spring 2021 Online Kolchin Seminar in Differential Algebra
07: Lagrange multiplier method - Part 1
Jacob Linder: 19.01.2012, Classical Mechanics (TFY4345), v2012 NTNU A full textbook covering the material in the lectures in detail can be downloaded for free here: http://bookboon.com/en/introduction-to-lagrangian-hamiltonian-mechanics-ebook
From playlist NTNU: TFY 4345 - Classical Mechanics | CosmoLearning Physics
S. Kebekus - Varieties with vanishing first Chern class
We investigate the holonomy group of singular Kähler-Einstein metrics on klt varieties with numerically trivial canonical divisor. Finiteness of the number of connected components, a Bochner principle for holomorphic tensors, and a connection between irreductibility of holonomy representat
From playlist Complex analytic and differential geometry - a conference in honor of Jean-Pierre Demailly - 6-9 juin 2017
Trigonometry 2 The Trigonometric Functions
Meet the 6 main trigonometric functions of right triangles and some of their identities.
From playlist Trigonometry
Transcendental Functions 3 Examples using Properties of Logarithms.mov
Examples using the properties of logarithms.
From playlist Transcendental Functions
02: Fundamentals part2, Generalized coordinates
2012-01-11 - Jacob Linder: Lecture 1, 11.01.2012, Klassisk Mekanikk (TFY 4345) v2012 NTNU A full textbook covering the material in the lectures in detail can be downloaded for free here: http://bookboon.com/en/introduction-to-lagrangian-hamiltonian-mechanics-ebook
From playlist NTNU: TFY 4345 - Classical Mechanics | CosmoLearning Physics
Pavel Etingof - "D-modules on Poisson varieties and Poisson traces"
Pavel Etingof delivers a research talk on "D-modules on Poisson varieties and Poisson traces" at the Worldwide Center of Mathematics
From playlist Center of Math Research: the Worldwide Lecture Seminar Series
Microlocal sheaves III: Regular singularities and Riemann-Hilbert - Michael McBreen
SL2 Seminar Topic: Microlocal sheaves III: Regular singularities and Riemann-Hilbert Speaker: Michael McBreen Affiliation: Chinese University of Hong Kong Date: March 23, 2021 For more video please visit http://video.ias.edu
From playlist Mathematics
What is General Relativity? Lesson 43: Holonomic and Non-Holonomic Basis
What is General Relativity? Lesson 43: Holonomic and Non-Holonomic Basis Since we have already discussed coordinate systems, basis vectors, and commutator, now is as good a time as any to talk about how 4 arbitrary vector fields may or may not be tangent vectors to coordinate curves. That
From playlist What is General Relativity?
Working with Functions (1 of 2: Notation & Terminology)
More resources available at www.misterwootube.com
From playlist Working with Functions