Determining values of a variable at a particular percentile in a normal distribution
From playlist Unit 2: Normal Distributions
The Normal Distribution (1 of 3: Introductory definition)
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From playlist The Normal Distribution
What is a Normal Line to a Function?
This video defines a normal line and animates a tangent line on several functions.
From playlist Differentiation of Basic Functions and Using the Power Rule
How to determine the volume of a cone by finding the height first
👉 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
👉 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
👉 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
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
Learn how to find the surface area of a cone
👉 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
Jonathan Hickman: The helical maximal function
The circular maximal function is a singular variant of the familiar Hardy--Littlewood maximal function. Rather than take maximal averages over concentric balls, we take maximal averages over concentric circles in the plane. The study of this operator is closely related to certain GMT packi
From playlist Seminar Series "Harmonic Analysis from the Edge"
Rafe Mazzeo - Minicourse - Lecture 5
Rafe Mazzeo Conic metrics on surfaces with constant curvature An old theme in geometry involves the study of constant curvature metrics on surfaces with isolated conic singularities and with prescribed cone angles. This has been studied from many points of view, ranging from synthetic geo
From playlist Maryland Analysis and Geometry Atelier
Seventh Imaging & Inverse Problems (IMAGINE) OneWorld SIAM-IS Virtual Seminar Series Talk
Date: Wednesday, December 2, 10:00am EDT Speaker: Martin Burger, FAU Title: Nonlinear spectral decompositions in imaging and inverse problems Abstract: This talk will describe the development of a variational theory generalizing classical spectral decompositions in linear filters and si
From playlist Imaging & Inverse Problems (IMAGINE) OneWorld SIAM-IS Virtual Seminar Series
Polynomial Identity Testing via Optimization: algorithms by Rafael Oliveira
Discussion Meeting Workshop on Algebraic Complexity Theory  ORGANIZERS Prahladh Harsha, Ramprasad Saptharishi and Srikanth Srinivasan DATE & TIME 25 March 2019 to 29 March 2019 VENUE Madhava Lecture Hall, ICTS Bangalore Algebraic complexity aims at understanding the computationa
From playlist Workshop on Algebraic Complexity Theory 2019
Gunther Uhlmann - Seeing Through Space-Time - IPAM at UCLA
Recorded 15 September 2021. Gunther Uhlmann of the University of Washington presents "Seeing Through Space-Time" at IPAM's Mathematical and Computational Challenges in the Era of Gravitational Wave Astronomy Tutorial Abstract: The first inverse problem we will consider is whether we can de
From playlist Tutorials: Math & Computational Challenges in the Era of Gravitational Wave Astronomy
A selective survey of selective inference – Jonathan Taylor – ICM2018
Probability and Statistics Invited Lecture 12.9 A selective survey of selective inference Jonathan Taylor Abstract: It is not difficult to find stories of a crisis in modern science, either in the popular press or in the scientific literature. There are likely multiple sources for this c
From playlist Probability and Statistics
Bertrand Maury - Transport optimal et mouvements de foules sous contrainte de congestion (Part 2)
Transport optimal et mouvements de foules sous contrainte de congestion (Part 2)
From playlist Inter’actions en mathématiques 2015
Determinantal varieties and asymptotic expansion of Bergman kernels by Harald Upmeier
DISCUSSION MEETING ANALYTIC AND ALGEBRAIC GEOMETRY DATE:19 March 2018 to 24 March 2018 VENUE:Madhava Lecture Hall, ICTS, Bangalore. Complex analytic geometry is a very broad area of mathematics straddling differential geometry, algebraic geometry and analysis. Much of the interactions be
From playlist Analytic and Algebraic Geometry-2018
Finding the volume and surface area of a cone
👉 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
Andreas H. Hamel: From set-valued quantiles to risk measures: a set optimization approach to...
Abstract : Some questions in mathematics are not answered for quite some time, but just sidestepped. One of those questions is the following: What is the quantile of a multi-dimensional random variable? The "sidestepping" in this case produced so-called depth functions and depth regions, a
From playlist Probability and Statistics