Strongly regular graphs | Individual graphs
The M22 graph, also called the Mesner graph or Witt graph is the unique strongly regular graph with parameters (77, 16, 0, 4). It is constructed from the Steiner system (3, 6, 22) by representing its 77 blocks as vertices and joining two vertices iff they have no terms in common or by deleting a vertex and its neighbors from the Higman–Sims graph. For any term, the family of blocks that contain that term forms an independent set in this graph, with 21 vertices. In a result analogous to the Erdős–Ko–Rado theorem (which can be formulated in terms of independent sets in Kneser graphs), these are the unique maximum independent sets in this graph. It is one of seven known triangle-free strongly regular graphs. Its graph spectrum is (−6)21255161, and its automorphism group is the Mathieu group M22. (Wikipedia).
Graph of x^2 + 6xb + 5b^2 as b varies
From playlist 3d graphs
Graph of x^2 + 6xy + 5y^2 rotating
From playlist 3d graphs
From playlist 3d graphs
What are Cubic Graphs? | Graph Theory
What are cubic graphs? We go over this bit of graph theory in today's math lesson! Recall that a regular graph is a graph in which all vertices have the same degree. The degree of a vertex v is the number of edges incident to v, or equivalently the number of vertices adjacent to v. If ever
From playlist Graph Theory
Graph of x^2 + y^2 + pxy as p varies
From playlist 3d graphs
From playlist 3d graphs
Find a Basis for the Image and Kernel of a Transformation: M22 to R3
This video explains how to determine a basis for the image (range) and kernel of a linear transformation given the transformation formula.
From playlist Transformations of General Vector Spaces
Find a Nontrivial Matrix for the Kernel of a Linear Transformation (M22 to M22)
This video explains how to determine a nontrivial element in the kernel given a linear transformation.
From playlist Transformations of General Vector Spaces
Vector Space of All 2 by 2 Matrices (M22): Find the Zero Vector, Mult Identity and Additive Inverse
This video explains how to find the zero vector , the multiplicative, and additive inverse of the vector space of all 2 by 2 matrices.
From playlist Vector Spaces
This video defines and gives and example of isomorphic graphs. mathispower4u.com
From playlist Graph Theory (Discrete Math)
Time-independent scattering theory and its dynamical formulation (Lecture -02) by Ali Mostafazadeh
PROGRAM NON-HERMITIAN PHYSICS - PHHQP XVIII DATE :04 June 2018 to 13 June 2018 VENUE:Ramanujan Lecture Hall, ICTS Bangalore Non-Hermitian Physics-"Pseudo-Hermitian Hamiltonians in Quantum Physics (PHHQP) XVIII" is the 18th meeting in the series that is being held over the years in Qua
From playlist Non-Hermitian Physics - PHHQP XVIII
Nazi Buddhist Iron Man from Space!! - The Countdown #6
SUBSCRIBE, future astronauts: http://goo.gl/bRbj4 THE TOP 5 are listed BELOW!! CLICK HERE to learn more about this week's Top 5: http://goo.gl/MD2tS --------------- THE TOP 5: Black Hole Neighbors Asteroid Cooling SpaceX Launch Nazi Buddhist Iron Man from Space Water on Mars --------
From playlist The Countdown
My notes are available at http://asherbroberts.com/ (so you can write along with me). Elementary Linear Algebra: Applications Version 12th Edition by Howard Anton, Chris Rorres, and Anton Kaul
From playlist Linear Algebra
Learning how to graph and determine characteristics of a quadratic using vertex formula
👉 Learn how to graph quadratics in standard form. A quadratic equation is an equation whose highest exponent in the variable(s) is 2. To graph a quadratic equation, we make use of a table of values and the fact that the graph of a quadratic is a parabola which has an axis of symmetry, to p
From playlist Graph a Quadratic in Standard Form | ax^2+bx+c
How to graph a quadratic in vertex form
👉 Learn the basics to understanding graphing quadratics. A quadratic equation is an equation whose highest exponent in the variable(s) is 2. To graph a quadratic equation, we make use of a table of values and the fact that the graph of a quadratic is a parabola which has an axis of symmetr
From playlist Graph a Quadratic in Standard Form | Essentials
Linear Algebra 6.2 Angle and Orthogonality in Inner Product Spaces
My notes are available at http://asherbroberts.com/ (so you can write along with me). Elementary Linear Algebra: Applications Version 12th Edition by Howard Anton, Chris Rorres, and Anton Kaul A. Roberts is supported in part by the grants NSF CAREER 1653602 and NSF DMS 2153803.
From playlist Linear Algebra
Dynamic formation of compact (Course 4 - Lensing) Lecture - 05 by Sourav Chatterjee
Summer School on Gravitational-Wave Astronomy ORGANIZERS: Parameswaran Ajith, K. G. Arun and Bala R. Iyer DATE: 13 August 2018 to 24 August 2018 VENUE: Madhava Lecture Hall, ICTS, Bangalore This school is part of the annual ICTS summer schools on gravitational-wave (GW) astronomy. Rece
From playlist Summer School on Gravitational-Wave Astronomy - 2018
Applied Calc 1, Episode 29: Total change
Episode 29 of my videos for my "flipped" Math 119 (Applied Calculus 1) course from Spring 2015 at Fairfield University. This is a first calculus course for undergraduates, taken mostly by business and health/life sciences students. This episode is about using the definite integral of a de
From playlist Math 119 (Applied Calc I) Fall 2017
What do I need to know to graph a quadratic in vertex form
👉 Learn the basics to understanding graphing quadratics. A quadratic equation is an equation whose highest exponent in the variable(s) is 2. To graph a quadratic equation, we make use of a table of values and the fact that the graph of a quadratic is a parabola which has an axis of symmetr
From playlist Graph a Quadratic in Standard Form | Essentials
Linear Algebra 2.1 Determinants by Cofactor Expansion
My notes are available at http://asherbroberts.com/ (so you can write along with me). Elementary Linear Algebra: Applications Version 12th Edition by Howard Anton, Chris Rorres, and Anton Kaul
From playlist Linear Algebra