In mathematics, specifically in order theory and functional analysis, if is a cone at 0 in a vector space such that then a subset is said to be -saturated if where Given a subset the -saturated hull of is the smallest -saturated subset of that contains If is a collection of subsets of then If is a collection of subsets of and if is a subset of then is a fundamental subfamily of if every is contained as a subset of some element of If is a family of subsets of a TVS then a cone in is called a -cone if is a fundamental subfamily of and is a strict -cone if is a fundamental subfamily of -saturated sets play an important role in the theory of ordered topological vector spaces and topological vector lattices. (Wikipedia).
From playlist GeoGebra 3D
Single Variable Volume of a Cone Proof
From playlist Proofs
Algebra 1 Regents June 2014 #23
In this video, we solve for one variable in terms of others
From playlist Algebra 1 Regents June 2014
Finding the volume and surface area of a cone
đ Learn how to find the volume and the surface area of a cone. A cone is a 3-dimensional object having a circular base and round surface converging at a single point called its vertex (or apex). The vertical distance from the circular base of a cone to its vertex is called the height of th
From playlist Volume and Surface Area
How to find the surface area of a cone flipped upside down
đ Learn how to find the volume and the surface area of a cone. A cone is a 3-dimensional object having a circular base and round surface converging at a single point called its vertex (or apex). The vertical distance from the circular base of a cone to its vertex is called the height of th
From playlist Volume and Surface Area
How to determine the volume of a cone by finding the height first
đ Learn how to find the volume and the surface area of a cone. A cone is a 3-dimensional object having a circular base and round surface converging at a single point called its vertex (or apex). The vertical distance from the circular base of a cone to its vertex is called the height of th
From playlist Volume and Surface Area
Learn how to determine the volume of a cone
đ Learn how to find the volume and the surface area of a cone. A cone is a 3-dimensional object having a circular base and round surface converging at a single point called its vertex (or apex). The vertical distance from the circular base of a cone to its vertex is called the height of th
From playlist Volume and Surface Area
Volume of a cone in Geogebra Zapremina kupe u Geogebri Like, Share, Subscibe In case you wanna to pay me a drink: https://www.paypal.me/admirsuljicic/
From playlist Geogebra [Tutoriali]
Nonlinear algebra, Lecture 7: "Toric Varieties", by Mateusz Michalek
This is the seventh lecture in the IMPRS Ringvorlesung, the advanced graduate course at the Max Planck Institute for Mathematics in the Sciences.
From playlist IMPRS Ringvorlesung - Introduction to Nonlinear Algebra
How to find the surface area of a cone
đ Learn how to find the volume and the surface area of a cone. A cone is a 3-dimensional object having a circular base and round surface converging at a single point called its vertex (or apex). The vertical distance from the circular base of a cone to its vertex is called the height of th
From playlist Volume and Surface Area
The Amazing Math behind Colors!
In this video, I talk about the math and science of colors for 42 minutes. Topics include cone cell response functions, electromagnetic radiation, spectral colors, luminance, color spaces, parametric equations, normal curves, mono and polychromatic light, emission spectra, spectral power
From playlist Summer of Math Exposition 2 videos
MIT 9.04 Sensory Systems, Fall 2013 View the complete course: http://ocw.mit.edu/9-04F13 Instructor: Peter H. Schiller This lecture describes the features of and major theories behind color vision. It covers how color is processed in the retina, LGN and cortex as well as color blindness a
From playlist MIT 9.04 Sensory Systems, Fall 2013
(October 16, 2009) Stephen Palmer, UC Berkeley Psychology, discusses his research on how humans think about, associate and react to color to demonstrate that it is possible to study the science of aesthetics. Stanford University: http://www.stanford.edu/ Stanford Engineering Everywh
From playlist Lecture Collection | Human-Computer Interaction Seminar (2009-2010)
Bertrand Maury: Mathematics behind some phenomena in crowd motion: Stop and Go waves and...
Abstract: This minicourse aims at providing tentative explanations of some specific phenomena observed in the motion of crowds, or more generally collections of living entities. The first lecture shall focus on the so-called Stop and Go Waves, which sometimes spontaneously emerge and persi
From playlist Mathematical Physics
C. Araujo - Foliations and birational geometry (Part 1)
Abstract - In the last few decades, much progress has been made in birational algebraic geometry. The general viewpoint is that complex projective manifolds should be classified according to the behavior of their canonical class. As a result of the minimal model program (MMP), every comple
From playlist Ecole d'ÊtÊ 2019 - Foliations and algebraic geometry
Maria Angelica Cueto - "Implicitization of surfaces via geometric tropicalization"
Implicitization of surfaces via geometric tropicalization - Research lecture at the Worldwide Center of Mathematics.
From playlist Center of Math Research: the Worldwide Lecture Seminar Series
Tropical Geometry - Lecture 11 - Toric Varieties | Bernd Sturmfels
Twelve lectures on Tropical Geometry by Bernd Sturmfels (Max Planck Institute for Mathematics in the Sciences | Leipzig, Germany) We recommend supplementing these lectures by reading the book "Introduction to Tropical Geometry" (Maclagan, Sturmfels - 2015 - American Mathematical Society)
From playlist Twelve Lectures on Tropical Geometry by Bernd Sturmfels
Light-cone spreading of perturbations and the butterfly by Abhishek Dhar
PROGRAM DYNAMICS OF COMPLEX SYSTEMS 2018 ORGANIZERS Amit Apte, Soumitro Banerjee, Pranay Goel, Partha Guha, Neelima Gupte, Govindan Rangarajan and Somdatta Sinha DATE: 16 June 2018 to 30 June 2018 VENUE: Ramanujan hall for Summer School held from 16 - 25 June, 2018; Madhava hall for W
From playlist Dynamics of Complex systems 2018
Bertrand Maury: Darcy problem and crowd motion modeling
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities: - Chapter markers and keywords to watch the parts of your choice in the video - Videos enriched with abstracts, b
From playlist Mathematical Physics
"AWESOME Antigravity double cone" (science experiments)
Physics (la physique). Explain why double cone goes up on inclaned plane (science experiments)
From playlist MECHANICS