Theorems in complex analysis | Theorems in real analysis | Theorems in harmonic analysis
The Titchmarsh convolution theorem describes the properties of the support of the convolution of two functions. It was proven by Edward Charles Titchmarsh in 1926. (Wikipedia).
From playlist Trigonometry TikToks
Trigonometry 6 The Sine of the Sum and the Difference of Two Angles
A description of the sine function of the sum and difference of two angles.
From playlist Trigonometry
Around the Davenport-Heilbronn Function - Enrico Bombieri
Enrico Bombieri Institute for Advanced Study November 10, 2011 The Davenport-Heilbronn function (introduced by Titchmarsh) is a linear combination of the two L-functions with a complex character mod 5, with a functional equation of L-function type but for which the analogue of the Riemann
From playlist Mathematics
Solving for sine with no constraints
👉 Learn how to solve trigonometric equations. There are various methods that can be used to evaluate trigonometric identities, they include by factoring out the GCF and simplifying the factored equation. Another method is to use a trigonometric identity to reduce and then simplify the give
From playlist Solve Trigonometric Equations
Trigonometry 7 The Cosine of the Sum and Difference of Two Angles
A geometric proof of the cosine of the sum and difference of two angles identity.
From playlist Trigonometry
Garden Experts Weigh In On James May's Plasticine Garden | James May's Toy Stories | Spark
It's preparation time for the Chelsea flower show and James May's crew are well underway when it comes to setting up the garden. Things are going very smoothly until James spots one thing. James May continues his quest to show just what is possible with old-fashioned toys by using them on
From playlist James May's Toy Stories
Spectral summation formulae and their applications - Valentin Blomer
Valentin Blomer Georg-August-Universität Göttingen; von Neumann Fellow, School of Mathematics September 17, 2015 http://www.math.ias.edu/calendar/event/87305/1442521800/1442525400 Starting from the Poisson summation formula, I discuss spectral summation formulae on GL(2) and GL(3) and pr
From playlist Joint IAS/PU Number Theory Seminar
Kannan Soundararajan - Selberg's Contributions to the Theory of Riemann Zeta Function [2008]
http://www.ams.org/notices/200906/rtx090600692p-corrected.pdf January 11, 2008 3:00 PM Peter Goddard, Director Welcome Kannan Soundararajan Selberg's Contributions to the Theory of Riemann Zeta Function and Dirichlet L-Functions Atle Selberg Memorial Memorial Program in Honor of His
From playlist Number Theory
Numbers are Serious but they are also Fun - Michael Atiyah
Oxford Mathematics Public Lectures - Numbers are Serious but they are also Fun - Michael Atiyah Archimedes, who famously jumped out of his bath shouting "Eureka", also 'invented' the number pi. Euler invented e and had fun with his formula e^(2 pi i) = 1. The world is full of important nu
From playlist Oxford Mathematics Public Lectures
Introduction to the Distributive Property
This video explains the distributive property and provides examples on how to use the distributive property. http://mathispower4u.yolasite.com/
From playlist The Distributive Property and Simplifying Algebraic Expressions
Trigonometry 5 The Cosine Relationship
A geometrical explanation of the law of cosines.
From playlist Trigonometry
How to Multiply a Trinomial by a Trinomial Using Box Method - Math Tutorial
👉 Learn how to multiply polynomials. To multiply polynomials, we use the distributive property. The distributive property is essential for multiplying polynomials. The distributive property is the use of each term of one of the polynomials to multiply all the terms of the other polynomial.
From playlist How to Multiply a Trinomial by a Trinomial
Birth of an Idea - Cedric Villani
Oxford Mathematics Public Lectures: Cedric Villani - Birth of an Idea: A Mathematical Adventure What goes on inside the mind of a mathematician? Where does inspiration come from? CĂ©dric Villani, winner of the most prestigious prize in mathematics, the Fields Medal, explains the process. I
From playlist Oxford Mathematics Public Lectures
Math Park - 18/11/2017 - Olivier RAMARÉ - NOMBRES PREMIERS : UNE PROBLÉMATIQUE MODERNE (...)
NOMBRES PREMIERS : UNE PROBLÉMATIQUE MODERNE POUR UN PUBLIC MODERNE Cet exposé se développera sur trois axes : tout d'abord, nous montrerons que la théorie des nombres premiers et plus généralement la théorie multiplicative des nombres est très actuelle et notamment que plusieurs résultat
From playlist SĂ©minaire Mathematic Park
Pablo Shmerkin: Additive combinatorics methods in fractal geometry - lecture 2
In the last few years ideas from additive combinatorics were applied to problems in fractal geometry and led to progress on some classical problems, particularly on the smoothness of Bernoulli convolutions and other self-similar measures. We will introduce some of these tools from additive
From playlist Combinatorics
PROGRAM NAME :WINTER SCHOOL ON STOCHASTIC ANALYSIS AND CONTROL OF FLUID FLOW DATES Monday 03 Dec, 2012 - Thursday 20 Dec, 2012 VENUE School of Mathematics, Indian Institute of Science Education and Research, Thiruvananthapuram Stochastic analysis and control of fluid flow problems have
From playlist Winter School on Stochastic Analysis and Control of Fluid Flow
Lecture 10 | The Fourier Transforms and its Applications
Lecture by Professor Brad Osgood for the Electrical Engineering course, The Fourier Transforms and its Applications (EE 261). Professor Osgood introduces the final operation of convolution to the central limit theorem. The Fourier transform is a tool for solving physical problems. In t
From playlist Fourier
Easiest Way to Multiply Two Trinomials by Each Other - Math Tutorial
👉 Learn how to multiply polynomials. To multiply polynomials, we use the distributive property. The distributive property is essential for multiplying polynomials. The distributive property is the use of each term of one of the polynomials to multiply all the terms of the other polynomial.
From playlist How to Multiply a Trinomial by a Trinomial