![matlab - Solving the heat diffusion equation with source term - Computational Science Stack Exchange matlab - Solving the heat diffusion equation with source term - Computational Science Stack Exchange](https://i.stack.imgur.com/kN2rA.png)
matlab - Solving the heat diffusion equation with source term - Computational Science Stack Exchange
Inhomogeneous problems Up to now, we've dealt almost exclusively with problems for the wave and heat equations where the equat
![Figure 1 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation Figure 1 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation](https://static-02.hindawi.com/articles/jam/volume-2012/390876/figures/390876.fig.001a.jpg)
Figure 1 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation
![SOLVED: Problem 3: (24 points) Consider the heat conduction problem in bar that is in thermal contact with an external heat source. Then the modified heat conduction equation is 02 u 1 SOLVED: Problem 3: (24 points) Consider the heat conduction problem in bar that is in thermal contact with an external heat source. Then the modified heat conduction equation is 02 u 1](https://cdn.numerade.com/ask_images/4509b23d2b11455f8d31d09dbdecfee2.jpg)
SOLVED: Problem 3: (24 points) Consider the heat conduction problem in bar that is in thermal contact with an external heat source. Then the modified heat conduction equation is 02 u 1
![Keenan Crane on Twitter: "Adding a source term f yields a Poisson equation Δu = f, where f describes a "background temperature." Imagine heat being pumped into the domain at a rate Keenan Crane on Twitter: "Adding a source term f yields a Poisson equation Δu = f, where f describes a "background temperature." Imagine heat being pumped into the domain at a rate](https://pbs.twimg.com/media/FS3-lTUXEAMaCmv.jpg:large)
Keenan Crane on Twitter: "Adding a source term f yields a Poisson equation Δu = f, where f describes a "background temperature." Imagine heat being pumped into the domain at a rate
![Numerical Reconstruction of a Space-Dependent Heat Source Term in a Multi-Dimensional Heat Equation | Semantic Scholar Numerical Reconstruction of a Space-Dependent Heat Source Term in a Multi-Dimensional Heat Equation | Semantic Scholar](https://d3i71xaburhd42.cloudfront.net/c58cf73eb231a29ecc15f70604eae367d259d4c1/7-Figure1-1.png)
Numerical Reconstruction of a Space-Dependent Heat Source Term in a Multi-Dimensional Heat Equation | Semantic Scholar
![Solving the Steady and Unsteady 2D Heat Conduction Equation by point Iterative techniques using MATLAB Solving the Steady and Unsteady 2D Heat Conduction Equation by point Iterative techniques using MATLAB](https://skill-lync-portal.nyc3.digitaloceanspaces.com/tinymce/07_20/15938927418998.jpg)
Solving the Steady and Unsteady 2D Heat Conduction Equation by point Iterative techniques using MATLAB
![Symmetry | Free Full-Text | On the Analytical and Numerical Study of a Two-Dimensional Nonlinear Heat Equation with a Source Term | HTML Symmetry | Free Full-Text | On the Analytical and Numerical Study of a Two-Dimensional Nonlinear Heat Equation with a Source Term | HTML](https://www.mdpi.com/symmetry/symmetry-12-00921/article_deploy/html/images/symmetry-12-00921-g002.png)
Symmetry | Free Full-Text | On the Analytical and Numerical Study of a Two-Dimensional Nonlinear Heat Equation with a Source Term | HTML
![Figure 2 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation Figure 2 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation](https://static-02.hindawi.com/articles/jam/volume-2012/390876/figures/390876.fig.002b.jpg)
Figure 2 | Numerical Solution of the Inverse Problem of Determining an Unknown Source Term in a Heat Equation
![SOLVED: The heat equation for the temperatie of & pipe of length L is given by the bllowing PDE 8u +92,+}, 0 < I<L +> 0, 812 where k is the thermal SOLVED: The heat equation for the temperatie of & pipe of length L is given by the bllowing PDE 8u +92,+}, 0 < I<L +> 0, 812 where k is the thermal](https://cdn.numerade.com/ask_images/2a47347af9a34ed8910917e5ca561ddf.jpg)