Equations for calculating the properties of dissociated steam
- Authors: Aminov R.Z.1, Gudym A.A.1
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Affiliations:
- Saratov Scientific Center
- Issue: Vol 64, No 8 (2017)
- Pages: 597-603
- Section: Heat and Mass Transfer, Properties of Working Fluids and Materials
- URL: https://journals.rcsi.science/0040-6015/article/view/172781
- DOI: https://doi.org/10.1134/S004060151708002X
- ID: 172781
Cite item
Abstract
The equations of state for dissociated steam have been developed in the temperature and pressure ranges of 1250–2300 K and 0.01–10.00 MPa for calculating thermodynamic processes in thermal power units operating on high-temperature steam. These equations are based on the property tables for dissociated steam derived at a reference temperature of 0 K. It is assumed that the initial substance is steam, the dissociation of which—in accordance with the most likely chemical reactions—results in formation of molecules of hydrogen, oxygen, steam, hydroxyl, and atoms of oxygen and hydrogen. Differential thermodynamic correlations, considering a change in the chemical potential and the composition of the mixture, during the steam dissociation are used. A reference temperature of 0.01°С used in the calculation of parameters of nondissociated steam has been adopted to predict processes in thermal power units without matching the reference temperatures and to account for transformation of dissociated steam into its usual form for which there is the international system of equations with the water triple point of 0.01°С taken as the reference. In the investigated region, the deviation of dissociated steam properties from those of nondissociated steam, which increases with decreasing the pressure or increasing the temperature, was determined. For a pressure of 0.02 MPa and a temperature of 2200 K, these deviations are 512 kJ/kg for the enthalpy, 0.2574 kJ/(kg K) for the entropy, and 3.431 kJ/(kg K) for the heat capacity at constant pressure. The maximum deviation of the dissociated steam properties calculated by the developed equations from the handbook values that these equations are based on does not exceed 0.03–0.05%.
About the authors
R. Z. Aminov
Saratov Scientific Center
Author for correspondence.
Email: oepran@inbox.ru
Russian Federation, Saratov, 410054
A. A. Gudym
Saratov Scientific Center
Email: oepran@inbox.ru
Russian Federation, Saratov, 410054