In the mathematical theory of probability, David Lewis's triviality result is a theorem about the impossibility of systematically equating the conditional probability with the probability of a so-called conditional event, . (Wikipedia).
Overview of Multiplicity of a zero - Online Tutor - Free Math Videos
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
What is the multiplicity of a zero?
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
What does the fundamental theorem of algebra tell us about a polynomial
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Characteristics of Functions
Overview of zeros of a polynomial - Online Tutor - Free Math Videos
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
What is multiplicity and what does it mean for the zeros of a graph
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
Find the zeros factoring vs square root method
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
What do the zeros roots tell us of a polynomial
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
Fourier series + Fourier's theorem
Free ebook http://tinyurl.com/EngMathYT A basic lecture on how to calculate Fourier series and a discussion of Fourier's theorem, which gives conditions under which a Fourier series will converge to a given function.
From playlist Engineering Mathematics
Learn how and why multiplicity of a zero make sense
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
Fields Medal Lecture: Regularity of interfaces in phase transition β Alessio Figalli β ICM2018
Regularity of interfaces in phase transitions via obstacle problems Alessio Figalli Abstract: The so-called Stefan problem describes the temperature distribution in a homogeneous medium undergoing a phase change, for example ice melting to water. An important goal is to describe the struc
From playlist Special / Prizes Lectures
RedDotRuby 2014 - 80,000 Plaintext Passwords: An Open Source Love Story in 3 Acts by T.j. Schuck
fluffmuffin, peppercorn, gilligan β those are just a few of our users' plain text passwords. I have 80,000 more, and it only took me 87 seconds to gather them from our customer database in a white-hat attack. In Act I, we'll cover the history of secure password storage, examine the hack,
From playlist RedDotRuby 2014
Chemistry - Chemical Bonding (35 of 35) Bond Dissociation - Average Bond Energies
Visit http://ilectureonline.com for more math and science lectures! In this video I will show explain bond dissociation of average bond energies.
From playlist CHEMISTRY 13 LEWIS STRUCTURES
Chemistry 202. Organic Reaction Mechanisms II. Lecture 01. Introduction
UCI Chem 202 Organic Reaction Mechanisms II (Winter 2014) Lec 01. Organic Reaction Mechanism -- Introduction View the complete course: http://ocw.uci.edu/courses/chem_202_organic_reaction_mechanisms_ii.html Instructor: David Van Vranken, Ph.D. License: Creative Commons BY-NC-SA Terms of U
From playlist Chem 202: Week 1
Lewis Bowen - When does injectivity imply surjectivity
November 23, 2015 - Princeton University Any injective map from a finite set to itself is surjective. Ax's Theorem extends this to algebraic varieties and regular maps. Gromov invented sofic groups as a way to extend to this result to cellular automata and other settings. We'll re-prove hi
From playlist Minerva Mini Course - Lewis Bowen
Mark Burstein - The Literary Englishman & the "Scientific American" - G4G14 Apr 2022
"The Literary Englishman and The Scientific American" discusses Martin Gardner's affinity for Lewis Carroll as expressed in his "Mathematical Games," where Carroll was the most mentioned individual over the life of the column. Along with various diversions and digressions, the lavishly ill
From playlist G4G14 Videos
The Vortex Ansatz as a Fertile Testing Ground for Certain Systems of PDEs by Vamsi Pingali
PROGRAM: VORTEX MODULI ORGANIZERS: Nuno RomΓ£o (University of Augsburg, Germany) and Sushmita Venugopalan (IMSc, India) DATE & TIME: 06 February 2023 to 17 February 2023 VENUE: Ramanujan Lecture Hall, ICTS Bengaluru For a long time, the vortex equations and their associated self-dual fie
From playlist Vortex Moduli - 2023
Coproduct Structures, a Tale of Two Outputs - Lea Kenigsberg
Joint IAS/Princeton/Montreal/Paris/Tel-Aviv Symplectic Geometry Zoominar Topic: Coproduct Structures, a Tale of Two Outputs Speaker: Lea Kenigsberg Affiliation: Columbia University Date: November 25, 2022 I will motivate the study of coproducts and describe a new coproduct structure on
From playlist Mathematics
RailsConf 2014 - Demystifying Data Science: A Live Tutorial by Todd Schneider
To get a grip on what "data science" really is, we'll work through a real text mining problem live on stage. Our mission? Trace the evolution of popular words and phrases in RailsConf talk abstracts over the years! We'll cover all aspects of the problem, from gathering and cleaning our dat
From playlist RailsConf 2014
Overview Zeros of a functions - Online Math Tutor - Free Math Videos
π Learn about zeros and multiplicity. The zeroes of a polynomial expression are the values of x for which the graph of the function crosses the x-axis. They are the values of the variable for which the polynomial equals 0. The multiplicity of a zero of a polynomial expression is the number
From playlist Zeros and Multiplicity of Polynomials | Learn About
Aaron Sidford: Introduction to interior point methods for discrete optimization, lecture III
Over the past decade interior point methods (IPMs) have played a pivotal role in mul- tiple algorithmic advances. IPMs have been leveraged to obtain improved running times for solving a growing list of both continuous and combinatorial optimization problems including maximum flow, bipartit
From playlist Summer School on modern directions in discrete optimization