Partial differential equations | Multivariable calculus
Often a partial differential equation can be reduced to a simpler form with a known solution by a suitable change of variables. The article discusses change of variable for PDEs below in two ways: 1. * by example; 2. * by giving the theory of the method. (Wikipedia).
How to solve PDE via change of variables
Free ebook https://bookboon.com/en/partial-differential-equations-ebook How to solve PDE via change of variables.
From playlist Partial differential equations
Example of how to solve PDE via change of variables
Free ebook https://bookboon.com/en/partial-differential-equations-ebook An example showing how to solve PDE via change of variables.
From playlist Partial differential equations
How to solve PDE via change of co-ordinates
Free ebook https://bookboon.com/en/partial-differential-equations-ebook How to solve PDE with constant coefficients via a change of co-ordinates. An example is discussed and solved.
From playlist Partial differential equations
An introduction to partial differential equations. PDE playlist: http://www.youtube.com/view_play_list?p=F6061160B55B0203 Part 1 topics: -- what is a partial differential equation -- examples of solutions (4:42) -- ODE versus PDE (10:35)
From playlist Mathematical Physics II - Youtube
Lecture 11.1 Partial Differential Equations
We introduce Partial Differential Equations (PDEs) and describe how to categorise them. We then discuss two methods that can be used to solve PDEs in certain situations : partial integration and D'Alembert's solution.
From playlist MATH2018 Engineering Mathematics 2D
How to factor and solve the wave equation (PDE)
Free ebook https://bookboon.com/en/partial-differential-equations-ebook How to solve second order PDE using factoring methods. We solve a range of examples.
From playlist Partial differential equations
SYN122 - The Function of the Verb - Tense
This first of a series of three E-Lectures deals with the function of the verb in PDE, in particular with the notion of tense. Prof. Handke explains why PDE has only two tenses, the present and the past tense, and how they are used. The discussion why PDE has no future tense concludes this
From playlist VLC201 - The Structure of English
In this video, I give you a glimpse of the field calculus of variations, which is a nice way of transforming a minimization problem into a differential equation and vice-versa. And the nice thing is that I'm not using much more than single-variable calculus, enjoy!
From playlist Partial Differential Equations
Introduction to Time Rate of Change (Differential Equations 5)
https://www.patreon.com/ProfessorLeonard An explanation of Time Rate of Change and how it is a basic Differential Equation where time is our independent variable.
From playlist Differential Equations
Partial Differential Equations Overview
Partial differential equations are the mathematical language we use to describe physical phenomena that vary in space and time. Examples include gravitation, electromagnetism, and fluid dynamics. @eigensteve on Twitter eigensteve.com databookuw.com %%% CHAPTERS %%% 0:00 Overview of Pa
From playlist Engineering Math: Vector Calculus and Partial Differential Equations
Modeling Multi-Physics with PDEs
In this talk, Oliver Ruebenkoenig describes how to build multi physics models in the Wolfram Language to simulate multiple interacting physical phenomena. It introduces a new partial differential equation (PDE) modeling language that makes it easy to set up both PDEs and boundary condition
From playlist Wolfram Technology Conference 2020
PDE Modeling: Live with the R&D team
Begins at 1:37 In this stream, Oliver Ruebenkoenig gives an overview of PDE modeling capabilities based on the Finite Element Method. The presentation will cover geometry generation, mesh generation, PDE model and boundary condition setup and solving the PDEs. Stay up-to-date on future
From playlist Live with the R&D Team
Solid mechanics deals with the deformation of objects under applied forces. This talk will describe how to create solid mechanics models in the Wolfram Language. The resulting partial differential equations (PDEs) can be solved numerically using NDSolve and NDEigensystem. Techniques will b
From playlist Wolfram Technology Conference 2021
Financial Option Theory with Mathematica -- Black/Scholes PDE and Heat Equation
This is my second session of my track about Financial Option Theory with Mathematica. I develop the Black/Scholes PDE, then develop the heat equation from it, and then round-trip back from the heat equation to the BSPDE. I develop the Greeks and show how to use CUDA from Mathematica for a
From playlist Financial Options Theory with Mathematica
Solving Engineering Problems with Mathematica's PDE Tools
For the latest information, please visit: http://www.wolfram.com Speaker: Oliver Ruebenkoenig Wolfram developers and colleagues discussed the latest in innovative technologies for cloud computing, interactive deployment, mobile devices, and more.
From playlist Wolfram Technology Conference 2015
Introduction to Partial Differential Equations Welcome to the wonderful world of PDE! In this video, I define the notion of a Partial Differential Equation, and give a couple of examples and applications. Enjoy! Check out my PDE playlist: https://www.youtube.com/playlist?list=PLJb1qA
From playlist Partial Differential Equations
Introduction to Partial Differential Equations
This is the first lesson in a multi-video discussion focused on partial differential equations (PDEs). In this video we introduce PDEs and compare them with ordinary differential equations (ODEs). We investigate how PDEs introduce additional complexity and richness to an engineering appl
From playlist Partial Differential Equations
In this video, I solve one of the simplest PDE: the transport equation, simply by rewriting it as a directional derivative and ‘integrating’ it. Then I also solve the inhomogeneous transport equation.
From playlist Partial Differential Equations