Mathematical diagrams, such as charts and graphs, are mainly designed to convey mathematical relationships—for example, comparisons over time. (Wikipedia).
Graphing Equations By Plotting Points - Part 1
This video shows how to graph equations by plotting points. Part 1 of 2 http://www.mathispower4u.yolasite.com
From playlist Graphing Various Functions
Basics of Complex Geometry (example questions)
More resources available at www.misterwootube.com
From playlist Introduction to Complex Numbers
Quiz: Composition of Functions (Graph & Table)
Link: https://www.geogebra.org/m/QgN7nwCh
From playlist Algebra 1: Dynamic Interactives!
From playlist 3d graphs
Scientific Notation to Decimal Form: Quick Question Generator w/Feedback
Link: https://www.geogebra.org/m/zeYuKGFn
From playlist Algebra 1: Dynamic Interactives!
Graphs in the Complex Plane (1 of 4: Introductory Examples)
More resources available at www.misterwootube.com
From playlist Complex Numbers
Graph of x^2 + 6xb + 5b^2 as b varies
From playlist 3d graphs
From playlist 3d graphs
Tesla’s 3-6-9 and Vortex Math: Is this really the key to the universe?
Today, a long overdue foray into the realm of VORTEX MATHEMATICS :) 00:00 Intro 04:16 The vortex 08:10 The maths of remainders and digital roots 13:25 Demystifying the vortex 16:30 A matter of base. The 8 fingered Tesla. 19:21 Explanation why the digital root is the remainder on division
From playlist Recent videos
3D Shapes - Faces, Edges, and Vertices - Euler's Formula - Geometry
This geometry video tutorial provides a basic introduction into 3d shapes. It covers 3-dimensional figures such as cylinders, cones, rectangular prisms, triangular prisms, square pyramids, and cubes. It provides the equations and formulas needed to calculate the surface area and volume o
From playlist Geometry Video Playlist
Nicolas Behr - Tracelet Algebras
Stochastic rewriting systems evolving over graph-like structures are a versatile modeling paradigm that covers in particular biochemical reaction systems. In fact, to date rewriting-based frameworks such as the Kappa platform [1] are amongst the very few known approaches to faithfully enco
From playlist Combinatorics and Arithmetic for Physics: 02-03 December 2020
Pythagoras twisted squares: Why did they not teach you any of this in school?
A video on the iconic twisted squares diagram that just about anybody who knows anything about mathematics has been familiar with since primary school. Surprisingly, there is a LOT more to this diagram than even expert mathematicians are aware of. And lots of this LOT is really really beau
From playlist Recent videos
Sketching Science in the Seventeenth Century - Michael S. Mahoney
Lecture: Michael S. Mahoney, Sketching Science in the Seventeenth Century
From playlist CASVA symposium
Thinking better with mathematics – with Marcus du Sautoy
Discover how calculus, geometry and probability can help make life a bit easier for us all. Marcus du Sautoy explores how maths helps us solve problems like the Bridges of Königsburg, neural networks and the quickest way to save someone from drowning. Watch the Q&A: https://youtu.be/8hRPW0
From playlist Mathematics
DSI | Diagrammatic Differential Equations in Physics Modeling and Simulation
Abstract: I’ll discuss some results from a recent paper on applying categories of diagrams for specifying multiphysics models for PDE-based simulations. We developed a graphical formalism inspired by the graphical approach to physics pioneered by the late Enzo Tonti. We will discuss the gr
From playlist DSI Virtual Seminar Series
Hiraoka Yasuaki (8/30/21): On characterizing rare events in persistent homology
Indecomposables obtained through decompositions of persistent homology are regarded as topological summary of real data. However, as is well known, there exist pathologically complicated indecomposables in multi-parameter persistent homology in purely algebraic setting, and this fact makes
From playlist Beyond TDA - Persistent functions and its applications in data sciences, 2021
Scattering amplitudes and positive Grassmannian by Jaroslav Trnka
Program : School on Cluster Algebras ORGANIZERS : Ashish Gupta and Ashish K Srivastava DATE & TIME : 08 December 2018 to 22 December 2018 VENUE : Madhava Lecture Hall, ICTS Bangalore In 2000, S. Fomin and A. Zelevinsky introduced Cluster Algebras as abstractions of a combinatoro-algebra
From playlist School on Cluster Algebras 2018
Peter Bubenik - Lecture 2 - TDA: Theory
38th Annual Geometric Topology Workshop (Online), June 15-17, 2021 Peter Bubenik, University of Florida Title: TDA: Theory Abstract: In the second talk, I will discuss some of the theory of TDA. An important feature of TDA is that many of its constructions have been proven to be stable -
From playlist 38th Annual Geometric Topology Workshop (Online), June 15-17, 2021