The governing equation for the temperature distribution with time on a 2D square plate measuring 1 unit by1 unit is
∂T/∂t = ∂2T/∂x2 + ∂2T/∂y2
subjected to the Dirichlet boundary conditions for T provided in Fig.1. You are to obtain the following:
(a) The temperature contour plot on the square plate with time, say at t=0.01, 0.1, and at steady state. (You can provide contours at other times too to depict the convergence of the results at a steady state.) Take the initial condition at t=0 as T=0.0 for the whole domain.
(b) Separately, program and compute for the Laplace Equation
∂2T/∂x2 + ∂2T/∂y2 = 0
and obtain the solution for comparison to the steady-state solution in (a).
For the above, you have to show clearly how you treat the Dirichlet boundary conditions and provide a listing of your program, and other pertinent workings. The various contour plots can be carried out using the Techp1ot or any other suitable software.
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The same governing equation for the temperature distribution with time on a 2D square plate measuring 1 unit by 1 unit is given as
∂T/∂t = ∂2T/∂x2 + ∂2T/∂y2
In this case, the boundary conditions are given as the Dirichlet type for 3 sides of the plate and reflected as follows
0 ≤ x ≤ 1.0, y = 0, T = 0.0
0 ≤ x ≤ 1.0, y = 1.0, T = 1.0
0 ≤ y ≤ 1.0, x = 0, T = 0.0
and the Neumann boundary condition for
0 ≤ y ≤ 1.0, x = 1.0,
is given as
∂T/∂x = 0.0.
Obtain the temperature contour plot on the square plate with time, say at=0.01, 0.1, and at steady state.
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The post ME3291: The governing equation for the temperature distribution with time on a 2D square plate measuring 1 unit by1 unit is: Numerical Methods In Engineering Assignment, NUS appeared first on Singapore Assignment Help.