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SynonymsCompressibility factorZ-factor


Dimensionless multiplier describing the deviation of a fluid density from ideal gas estimate under the same pressure & temperature conditions:

(1) Z = \frac{p \, V_m}{R \, T} = \frac{p}{\rho} \cdot \frac{M}{R \, T}

where

p

fluid pressure

V_m = V/\nu

fluid molar volume

T

fluid temperature

V

fluid volume

\rho

fluid density

\nu

amount of substance

R

gas constant

M

molar mass of a fluid


Z-factor is related to fluid density  \rho as:

(2) \rho(T, p) =\frac{p}{Z(T, p)} \cdot \frac{M}{R \, T}


Z-factor is related to fluid compressibility  c as:

(3) c(p) = \frac{1}{p} - \frac{1}{Z} \frac{dZ}{dp}
(4) Z(p) = \frac{Z_0}{p_0} \cdot p \cdot \exp \left[ - \int_{p_0}^p c(p) dp \right]
(5) c = \frac{1}{\rho} \frac{d\rho}{dp} = \frac{d \ln \rho}{dp} = \frac{d }{dp} \left( \ln \left(\frac{p}{Z} \right) \right) = \frac{Z}{p} \cdot \frac{d }{dp} \left(\frac{p}{Z} \right) = \frac{Z}{p} \cdot \left( \frac{1}{Z} + p \cdot \frac{d }{dp} \left( \frac{1}{Z} \right) \right) = \frac{1}{p} - \frac{1}{Z} \frac{dZ}{dp}

Integrating  (5) one arrives to  (3).



The Z-factor value is trending towards unit value ( Z \rightarrow 1) for incompressible fluids and linear pressure dependence ( Z \rightarrow a \cdot p) for strongly compressible Fluids.

Modelling Z-factor  Z(T,p) as a function of fluid pressure  p and temperature  T is based on Equation of State.


There is also a good number of explicit Z-factor Correlations @models.


See also

Natural Science / Physics / Thermodynamics / Equation of State

Fluid Compressibility ][ Gas compressibility ]

References









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