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Heat Equation- Derivation and Equilibrium Solution in 1D - Laplace's Equation

Offered By: Steve Brunton via YouTube

Tags

Engineering Mathematics Courses Heat Transfer Courses Laplace's Equation Courses

Course Description

Overview

Explore the derivation and equilibrium solution of the Heat Equation in one dimension, also known as Laplace's equation, in this comprehensive lecture from the Engineering Mathematics course at the University of Washington. Delve into key concepts such as heat energy, temperature, and Fourier's Law. Examine the step-by-step derivation of the Heat Equation and discuss its implications. Investigate common boundary conditions, including insulated boundaries, to gain a thorough understanding of this fundamental concept in engineering mathematics. Access accompanying lecture notes and the course website for additional resources and in-depth study materials.

Syllabus

Introduction
Heat Equation
Heat Energy
Temperature
Fourier Law
Heat Equation derivation
Discussion
Common boundary conditions
Insulated boundary conditions


Taught by

Steve Brunton

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