Introduction of compressible flow
... In studying compressible flows, another variable, the entropy, s, has to be introduced. The entropy basically places limitations on which flow processes are physically possible and which are physically excluded. The entropy change between any two points in the flow is given by ; ...
... In studying compressible flows, another variable, the entropy, s, has to be introduced. The entropy basically places limitations on which flow processes are physically possible and which are physically excluded. The entropy change between any two points in the flow is given by ; ...
On the potential of an infinite dielectric cylinder and a line of charge
... and radial variables. In the case of the angular variable η (−1 ≤ η ≤ 1), the solutions are the well known first class Chebyshev polynomials. However, in the case of the radial variable ξ (1 ≤ ξ < ∞) it is necessary to construct another independent solution which, to our knowledge, has not been prev ...
... and radial variables. In the case of the angular variable η (−1 ≤ η ≤ 1), the solutions are the well known first class Chebyshev polynomials. However, in the case of the radial variable ξ (1 ≤ ξ < ∞) it is necessary to construct another independent solution which, to our knowledge, has not been prev ...
MHD Simulations for Fusion Applications
... economic development. Most of this population growth and new energy demand is in urban areas, which implies the need for large centralized power generation. By many estimates, worldwide oil and gas production is near or past its peak, which implies the need for an alternative source. The only possib ...
... economic development. Most of this population growth and new energy demand is in urban areas, which implies the need for large centralized power generation. By many estimates, worldwide oil and gas production is near or past its peak, which implies the need for an alternative source. The only possib ...
this PDF file - Canadian Center of Science and Education
... appears that the form of Maxwell’s Electromagnetism emerges as an approximation of General Relativity. The main lines of this demonstration were the following. Einstein’s fundamental tensor of components , is the solution of the system of equations (44) of Einstein (1916) obtained from pure mathemat ...
... appears that the form of Maxwell’s Electromagnetism emerges as an approximation of General Relativity. The main lines of this demonstration were the following. Einstein’s fundamental tensor of components , is the solution of the system of equations (44) of Einstein (1916) obtained from pure mathemat ...
