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11 Nov 2019
full working out please... so i can rate u 5 stars
This question relates to finding partial derivatives. (a) Burger's Equation is a partial differential equation, used for describing wave processes in acoustics and hydrodynamics, partialw/partialt = partial2w/partialx2 + wpartialw/partialx. Verify that w(x,t) = lambda +2/x+lambdat+alpha is a solution, where lambda and alpha are arbitrary constants. It can be shown that the radially symmetric temperature distribution in a spherical metal ball is given by the solution to the partial differential equation partialu/partialt = alpha/r2 partial/partialr (r2partialu/partialr), where the constant alpha is the thermal diffusivity. Verify that satisfies the PDH for the temperature distribution in the ball.
full working out please... so i can rate u 5 stars
This question relates to finding partial derivatives. (a) Burger's Equation is a partial differential equation, used for describing wave processes in acoustics and hydrodynamics, partialw/partialt = partial2w/partialx2 + wpartialw/partialx. Verify that w(x,t) = lambda +2/x+lambdat+alpha is a solution, where lambda and alpha are arbitrary constants. It can be shown that the radially symmetric temperature distribution in a spherical metal ball is given by the solution to the partial differential equation partialu/partialt = alpha/r2 partial/partialr (r2partialu/partialr), where the constant alpha is the thermal diffusivity. Verify that satisfies the PDH for the temperature distribution in the ball.
Nestor RutherfordLv2
7 Feb 2019