Z^3 - (1-B) \, Z^2 +(A-2B-3B^2) \, Z -(AB-B^2-B^3) = 0 |
A=\frac{a \, \alpha \, p}{ R^2 \, T^2}, \, B=\frac{b \, p}{ R \, T}, \, a = 0.45724 \cdot \frac{R^2 \, T_c^2}{p_c}, \, b = 0.07780 \cdot \frac{R \, T_c}{p_c}, \, \alpha = \left( 1 + \kappa \, (1-T_r^{0.5}) \right)^2
|
where
| Compressibility factor | Gas molar mass | ||||
| Gas pressure | Gas constant | ||||
| Gas temperature | |||||
where
| Gas density | Gas pressure | Gas molar mass | |||
| Compressibility factor | Gas temperature | Gas constant |
Natural Science / Physics / Thermodynamics / Real Gas
[ State of matter ] [ PVT ] [ Ideal Gas ]
[ Real Gas EOS @model ] [ Ideal Gas EOS @model ]