2024 Help me understand this report
Solution scheme development of the nonhomogeneous heat conduction equation in cylindrical coordinates with Neumann boundary conditions by finite difference method
Abstract: Partial differential heat conduction equations are typically used to determine temperature distribution within any solid domain. The difficulty and complexity of the solution of the equation depend on differential equation characteristics, boundary conditions, coordinate systems, and the number of dependent variables. In the current study, the numerical solution schemes were developed by the Explicit Finite Difference and the Implicit Method- the Crank-Nicolson techniques for the partial differential heat cond…
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