Morton's theorem is a poker principle articulated by Andy Morton in a Usenet poker newsgroup. It states that in multi-way pots, a player's expectation may be maximized by an opponent making a correct decision. The most common application of Morton's theorem occurs when one player holds the best hand, but there are two or more opponents on draws. In this case, the player with the best hand might make more money in the long run when an opponent folds to a bet, even if that opponent is folding correctly and would be making a personal mistake to call the bet. This type of situation is sometimes referred to as implicit collusion. Morton's theorem contrasts with the fundamental theorem of poker, which states that a player wants their opponents to make decisions which minimize their own expectation. The two theorems differ in the presence of more than one opponent: whereas the fundamental theorem always applies heads-up (one opponent), it does not always apply in multiway pots. The scope of Morton's theorem in multi-way situations is a subject of controversy. Morton expressed the belief that his theorem is generically applicable in multi-way pots, so that the fundamental theorem rarely applies except for heads-up situations. (Wikipedia).
Theory of numbers: Congruences: Euler's theorem
This lecture is part of an online undergraduate course on the theory of numbers. We prove Euler's theorem, a generalization of Fermat's theorem to non-prime moduli, by using Lagrange's theorem and group theory. As an application of Fermat's theorem we show there are infinitely many prim
From playlist Theory of numbers
Euler's Formula for the Quaternions
In this video, we will derive Euler's formula using a quaternion power, instead of a complex power, which will allow us to calculate quaternion exponentials such as e^(i+j+k). If you like quaternions, this is a pretty neat formula and a simple generalization of Euler's formula for complex
From playlist Math
What is the Riemann Hypothesis?
This video provides a basic introduction to the Riemann Hypothesis based on the the superb book 'Prime Obsession' by John Derbyshire. Along the way I look at convergent and divergent series, Euler's famous solution to the Basel problem, and the Riemann-Zeta function. Analytic continuation
From playlist Mathematics
Webinar: Transferrable Lessons Between Insurance And Investment Risk Management
Differences in risk management techniques exist between insurance markets and investment markets. Morton Lane, Director Master of Science in Financial Engineering, University of Illinois at Urbana-Champaign discusses this in more detail in this webinar ahead of his session at RiskMinds Int
From playlist Insurance risk: Predict risk in an unpredictable world
Number Theorem | Gauss' Theorem
We prove Gauss's Theorem. That is, we prove that the sum of values of the Euler phi function over divisors of n is equal to n. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist Number Theory
Calculus - The Fundamental Theorem, Part 1
The Fundamental Theorem of Calculus. First video in a short series on the topic. The theorem is stated and two simple examples are worked.
From playlist Calculus - The Fundamental Theorem of Calculus
Simplify rational expression using the rules of exponents
👉 Learn how to simplify expressions using the quotient rule of exponents. The quotient rule of exponents states that the quotient of powers with a common base is equivalent to the power with the common base and an exponent which is the difference of the exponents of the term in the numerat
From playlist Simplify Using the Rules of Exponents | Quotient Rule
Electrical Engineering: Ch 4: Circuit Theorems (18 of 32) Norton's Theorem
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain Norton's theorem of converting a linear circuit to a single current source and resistor in parallell. Next video in this series can be seen at: https://youtu.be/VXExe_v51L8
From playlist ELECTRICAL ENGINEERING 4: CIRCUIT THEOREMS
Gonçalo Tabuada: Additive invariants of orbifolds
The lecture was held within the framework of the Hausdorff Trimester Program : Workshop "K-theory in algebraic geometry and number theory"
From playlist HIM Lectures: Trimester Program "K-Theory and Related Fields"
Informal Proof of Euler's Formula (2 of 2: Trigonometric calculus)
If you enjoyed this, you can also check out my expanded series of videos that introduces Euler's Formula from "first principles" and concludes with Euler's Identity: https://www.youtube.com/playlist?list=PLHZZ0otaqNsWV01h2ZssT17Tj8fbtLiuM More resources available at www.misterwootube.com
From playlist Introduction to Complex Numbers
Number Theory | The Multiplicativity of Euler's Totient Function
We state and prove when Euler's totient function is multiplicative. http://www.michael-penn.net
From playlist Number Theory
The Extraordinary Math Boy (feat. 3Blue1Brown) - Objectivity 225
Grant from 3Blue1Brown takes a lucky dip into the archives at the Royal Society... What will he find?! More links below ↓↓↓ Featuring Grant Sanderson from 3Blue1Brown speaking with Brady. Objectivity on Patreon: https://www.patreon.com/objectivity Check out these videos from 3Blue1Bro
From playlist Special Guests on Objectivity
Jason Morton: "An Algebraic Perspective on Deep Learning, Pt. 2"
Graduate Summer School 2012: Deep Learning, Feature Learning "An Algebraic Perspective on Deep Learning, Pt. 2" Jason Morton, Pennsylvania State University Institute for Pure and Applied Mathematics, UCLA July 20, 2012 For more information: https://www.ipam.ucla.edu/programs/summer-scho
From playlist GSS2012: Deep Learning, Feature Learning
Has The World Already Ended? Or Just History?
Viewers like you help make PBS (Thank you 😃) . Support your local PBS Member Station here: https://to.pbs.org/donateidea There’s a reason they quote Baudrillard in The Matrix. We got merch! http://bit.ly/1U8fS1B Tweet us! http://bit.ly/pbsideachanneltwitter Idea Channel Facebook! http://
From playlist Newest Episodes
Climate Grief | Philosophy Tube
rip 🌍https://www.patreon.com/PhilosophyTube Subscribe! http://tinyurl.com/pr99a46 Paypal.me/PhilosophyTube Wanna get me a gift for the show? http://amzn.eu/5JAYdOd Check out my other videos on: Men. Abuse. Trauma. ★ - https://www.youtube.com/watch?v=AeGEv0YVLtw Abortion & Ben Shapiro -
From playlist The Main Show
1964 Burroughs Computers Computer History (B5000, B280, BUIC D825; Unisys, Mainframe) Educational
A 1964 Burroughs film showcasing customers using its computers in multiple government and private sector applications. Portions of the film have been slightly restored, as it contains valuable historical information, including RARE footage of the BUIC military computer (D825) built for th
From playlist Computers of the 1960's
The Prime Number Theorem, an introduction ← Number Theory
An introduction to the meaning and history of the prime number theorem - a fundamental result from analytic number theory. Narrated by Cissy Jones Artwork by Kim Parkhurst, Katrina de Dios and Olga Reukova Written & Produced by Michael Harrison & Kimberly Hatch Harrison ♦♦♦♦♦♦♦♦♦♦ Ways t
From playlist Number Theory
Where Does Electric Charge Come From?
Electric charge is both a spacetime invariant and conserved over time. To understand why, we'll need to dive deep into it's connection to the electromagnetic field through Noether's theorem and quantum mechanics. Brilliant for 20% off: http://brilliant.org/ScienceAsylum ___________________
From playlist Quantum Physics
Theory of numbers: Fermat's theorem
This lecture is part of an online undergraduate course on the theory of numbers. We prove Fermat's theorem a^p = a mod p. We then define the order of a number mod p and use Fermat's theorem to show the order of a divides p-1. We apply this to testing some Fermat and Mersenne numbers to se
From playlist Theory of numbers
Ask Adam Savage: What Makes a Prop Work in Its Universe?
What makes a character, other than the actor? Will Adam ever recreate Sapper's kit from Blade Runner 2049? In this live stream excerpt, Adam answers these questions from Oliver Williams and Jakub Fabisiak, whom we thank for their support. Join this channel to support Tested and get access
From playlist Adam Savage's Live Streams