Differential geometry of surfaces | Surfaces
In differential geometry, a smooth surface in three dimensions has a ridge point when a line of curvature has a local maximum or minimum of principal curvature. The set of ridge points form curves on the surface called ridges. The ridges of a given surface fall into two families, typically designated red and blue, depending on which of the two principal curvatures has an extremum. At umbilical points the colour of a ridge will change from red to blue. There are two main cases: one has three ridge lines passing through the umbilic, and the other has one line passing through it. Ridge lines correspond to cuspidal edges on the focal surface. (Wikipedia).
11_6_1 Contours and Tangents to Contours Part 1
A contour is simply the intersection of the curve of a function and a plane or hyperplane at a specific level. The gradient of the original function is a vector perpendicular to the tangent of the contour at a point on the contour.
From playlist Advanced Calculus / Multivariable Calculus
This video introduces slope fields and shows how to graph a slope field
From playlist Introduction to Differential Equations (Calculus I)
Classical curves | Differential Geometry 1 | NJ Wildberger
The first lecture of a beginner's course on Differential Geometry! Given by Prof N J Wildberger of the School of Mathematics and Statistics at UNSW. Differential geometry is the application of calculus and analytic geometry to the study of curves and surfaces, and has numerous applications
From playlist Differential Geometry
Solve the general solution for differentiable equation with trig
Learn how to solve the particular solution of differential equations. A differential equation is an equation that relates a function with its derivatives. The solution to a differential equation involves two parts: the general solution and the particular solution. The general solution give
From playlist Differential Equations
How to draw the slope field and sketch the particular equation
Learn how to create slope fields and sketch the particular solution to a differential equation. Slope fields are tools used to graphically obtain the solutions to a differential equation. It is the estimation of the graphical representation of a differential equation using the slopes of th
From playlist Differential Equations
Learn how to create slope fields and sketch the particular solution to a differential equation. Slope fields are tools used to graphically obtain the solutions to a differential equation. It is the estimation of the graphical representation of a differential equation using the slopes of th
From playlist Differential Equations
In this video I take a look at the slope of a curve (that is not straight line).
From playlist Biomathematics
The Differential Calculus of the Sketch - Greg Lynn
Creativity: The Sketch in the Arts and Sciences Title: The Differential Calculus of the Sketch Speaker: Greg Lynn
From playlist CASVA symposium
Morphogenesis: L. Mahadevan Public Lecture
In his Perimeter Public Lecture webcast on May 5, 2021, Harvard professor L. Mahadevan will take viewers on a journey into the mathematical, physical, and biological workings of morphogenesis to demonstrate how researchers are beginning to unlock secrets that have vexed scientists since Da
From playlist Public Lecture Series
Determine if a set of points is a trapezoid or not
👉 Learn how to determine the figure given four points. A quadrilateral is a polygon with four sides. Some of the types of quadrilaterals are: parallelogram, square, rectangle, rhombus, kite, trapezoid, etc. Each of the types of quadrilateral has its properties. Given four points that repr
From playlist Quadrilaterals on a Coordinate Plane
Quadratisch Praktisch Gut - Zur Quadratischen Gleichung | Bernd Sturmfels
Mathematische Weihnachtsvorlesung 2020 gehalten von Prof. Dr. Bernd Sturmfels Direktor am Max-Planck-Institut für Mathematik in den Naturwissenschaften und Leiter der Nonlinear Algebra Arbeitsgruppe. Für Schüler:innen ab Klassenstufe 10
From playlist Schulvorträge
How to solve differentiable equations with logarithms
Learn how to solve the particular solution of differential equations. A differential equation is an equation that relates a function with its derivatives. The solution to a differential equation involves two parts: the general solution and the particular solution. The general solution give
From playlist Differential Equations
David Drubin - Harnessing actin dynamics for endocytic trafficking
Clathrin-mediated endocytosis (CME) is the best-studied pathway by which cells selectively internalize molecules from the plasma membrane and surrounding environment. We study this process by live-cell microscopy in yeast and mammalian cells. The yeast studies have revealed a regular seque
From playlist From Molecules and Cells to Human Health : Ideas and concepts
Basic Physics II 3B. Lecture 19.
UCI Physics 3B: Basic Physics II (Summer 2013) Lec 19. Basic Physics II View the complete course: http://ocw.uci.edu/courses/physics_3b_basic_physics_ii.html Instructor: Roger McWilliams, Ph.D. License: Creative Commons CC-BY-SA Terms of Use: http://ocw.uci.edu/info More courses at http:/
From playlist Physics 3B
Tkinter Python Tutorial 2023 | Modern GUI Design With Tkinter | Basics of Tkinter | Simplilearn
🔥Artificial Intelligence Engineer Program (Discount Coupon: YTBE15): https://www.simplilearn.com/masters-in-artificial-intelligence?utm_campaign=TkinterPythonTutorial-PfZaJbZPYXs&utm_medium=Descriptionff&utm_source=youtube 🔥Professional Certificate Program In AI And Machine Learning: https
Introduction to Hydrodynamic Instability (Lecture 1) by Rama Govindarajan
DISCUSSION MEETING WAVES, INSTABILITIES AND MIXING IN ROTATING AND STRATIFIED FLOWS (ONLINE) ORGANIZERS: Thierry Dauxois (CNRS & ENS de Lyon, France), Sylvain Joubaud (ENS de Lyon, France), Manikandan Mathur (IIT Madras, India), Philippe Odier (ENS de Lyon, France) and Anubhab Roy (IIT M
From playlist Waves, Instabilities and Mixing in Rotating and Stratified Flows (ONLINE)
Efficient and Modular Implicit Differentiation (Machine Learning Research Paper Explained)
#implicitfunction #jax #autodiff Many problems in Machine Learning involve loops of inner and outer optimization. Finding update steps for the outer loop is usually difficult, because of the.need to differentiate through the inner loop's procedure over multiple steps. Such loop unrolling
From playlist Papers Explained
Boris Adamczewski, CNRS, Institut Camille Jordan Algebraic independence of G-functions via reductions modulo primes Siegel G-functions form an important class of analytic functions which are solutions to some arithmetic linear differential equations. In this talk, I will discuss a new me
From playlist Spring 2020 Kolchin Seminar in Differential Algebra
How To Retopologize High Poly Game Assets | Session 06 | #gamedev
Don’t forget to subscribe! In this project series, you will learn how to retopologize high poly game assets. ​​This project tutorial will go over all the steps on how to retopologize high-fidelity assets and bring them down to lower-resolution assets. I will be showing you how to retopo
From playlist Retopologize High Poly Game Assets
Determine the values of two angles that lie on a lie with a third angle
👉 Learn how to define and classify different angles based on their characteristics and relationships are given a diagram. The different types of angles that we will discuss will be acute, obtuse, right, adjacent, vertical, supplementary, complementary, and linear pair. The relationships
From playlist Angle Relationships From a Figure