Affiliation:
1. Institute for Thermodynamics, Bundeswehr University Munich, Werner-Heisenberg-Weg 39, Neubiberg 85577, Germany e-mail:
Abstract
The choked mass flux density and the choked momentum flux density for the nonideal fluids methane and nitrogen have been calculated using the Soave–Redlich–Kwong equation of state (EoS). For the computation a steady, one-dimensional (1D), isenthalpic and isentropic flow is assumed. The developed algorithm for the calculation of the choked flow properties includes a bounded multidimensional Newton method. A possible second phase emerging in the critical nozzle area is excluded using the saturation properties of the considered fluids. The critical ratios of pressure, density, temperature, and speed of sound are discussed and compared to other publications. Formulations of the choked mass flux density and the choked momentum flux density explicit in Tr, pr, and Zr are given valid for different reduced pressures and temperatures depending on the fluid. Additional computational fluid dynamics (CFD) simulations are carried out in order to validate the findings of the algorithm and the proposed correlations.
Reference42 articles.
1. One-Dimensional Flows of a Gas Characterized by Van Der Waal's Equation of State;Stud. Appl. Math.,1946
2. Note on the Importance of Imperfect-Gas Effects and Variation of Heat Capacities on the Isentropic Flow of Gases,1948
3. Flow of a Gas Characterized by the Beattie-Bridgeman Equation of State and Variable Specific Heats—Part I: isentropic Relations,1949
4. A Set of Fortran 4 Routines Used to Calculate the Mass Flow Rate of Natural Gas Through Nozzles,1971