In combinatorial game theory, and particularly in the theory of impartial games in misère play, an indistinguishability quotient is a commutative monoidthat generalizes and localizes the Sprague–Grundy theorem for a specific game's rule set. In the specific case of misere-play impartial games, such commutative monoids have become known as misere quotients. (Wikipedia).
This lecture is on Calculus I. It follows Part I of the book Calculus Illustrated by Peter Saveliev. The text of the book can be found at http://calculus123.com.
From playlist Calculus I
Ex 2: Determine the Number of Permutations With Repeated Items
This video explains how to determine the number of permutations when there are indistinguishable or repeated items. Site: http://mathispower4u.com
From playlist Permutations and Combinations
Using L'Hopital's Rule to Find the e Limit // Math Minute [#60] [CALCULUS] [ANALYSIS]
It is e to the iπ week over here at @polymathematic HQ. All week long I will be publishing videos getting at an intuition for what on earth it might mean to raise e to an imaginary power, how the π fits into all that, and why we should expect that to equal –1. Subscribe: https://bit.ly/p
From playlist Math Minutes
Learn how to solve absolute value inequalites by creating compound inequalities
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Medium
Learning to solve and graph an absolute value inequality with a rational quantity
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Hard
Solving an absolute value inequality by rewriting as a compound inequality
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Hard
Indeterminate Partial Sums (1 of 2: Finding the length of the series)
More resources available at www.misterwootube.com
From playlist Modelling Financial Situations
Solving absolute value inequalities when there are infinite many solutions
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Medium
The Difference Between a Linear Equation and Linear Inequality (Two Variables)
This video explains the difference between a linear equation and linear inequality in two variables.
From playlist Solving Linear Inequalities in Two Variables
How to solve a absolute value inequality as an and statement one variable
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Hard
Using L'Hopital's Rule to find a Special Inverse Tangent Limit // Math Minute [#61]
It is e to the iπ week over here at polymathematic HQ. All week long I will be publishing videos getting at an intuition for what on earth it might mean to raise e to an imaginary power, how the π fits into all that, and why we should expect that to equal –1. Subscribe: https://bit.ly/pol
From playlist Math Minutes
Solving and graphing an absolute value inequality
👉 Learn how to solve multi-step absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality where there are more terms apart from th
From playlist Solve Absolute Value Inequalities | Medium
Ian Agol University of California, Berkeley; Distinguished Visiting Professor, School of Mathematics October 12, 2015 http://www.math.ias.edu/calendar/event/89554/1444672800/1444676400 I'll review recent progress on properties of 3-manifold groups, especially following from geometric pr
From playlist Members Seminar
Introduction to elliptic curves and BSD Conjecture by Sujatha Ramadorai
12 December 2016 to 22 December 2016 VENUE Madhava Lecture Hall, ICTS Bangalore The Birch and Swinnerton-Dyer conjecture is a striking example of conjectures in number theory, specifically in arithmetic geometry, that has abundant numerical evidence but not a complete general solution. An
From playlist Theoretical and Computational Aspects of the Birch and Swinnerton-Dyer Conjecture
Solving and graphing an inequalty as an absolute value
👉 Learn how to solve absolute value inequalities. The absolute value of a number is the positive value of the number. For instance, the absolute value of 2 is 2 and the absolute value of -2 is also 2. To solve an absolute value inequality, we create the two cases of absolute value problems
From playlist Solve Absolute Value Inequalities
Guy Rothblum - The Multi-X Framework Pt. 4/4 - IPAM at UCLA
Recorded 13 July 2022. Guy Rothblum of Apple Inc. presents "The Multi-X Framework" at IPAM's Graduate Summer School on Algorithmic Fairness. Abstract: A third general notion of fairness lies between the individual and group notions. We call this “multi-X,” where “multi” refers to the fact
From playlist 2022 Graduate Summer School on Algorithmic Fairness
Adeline Roux-Langlois : Using structured variants in lattice-based cryptography - Lecture 1
CONFERENCE Recording during the thematic meeting : « Francophone Computer Algebra Days» the March 06, 2023 at the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Jean Petit Find this video and other talks given by worldwide mathematicians on CIRM's Audiov
From playlist Mathematical Aspects of Computer Science
Nathan Dunfield, Lecture 1: Fun with Finite Covers of 3-Manifolds
33rd Workshop in Geometric Topology, Colorado College, June 9, 2016
From playlist Nathan Dunfield: 33rd Workshop in Geometric Topology
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From playlist Solving Absolute Value Inequalities