phi0TT: Second Derivative of the Ideal-Gas Part of the Dimensionless Helmholtz Energy Equation
with respect to Temperature, Function of Temperature and Density
Description
The function phi0TT(Temp,D,digits =9) returns the Second Derivative of the
Ideal-gas Part of the Dimensionless Helmholtz Energy Equation with respect to
Temperature, for given Temp [K] and D [kg/m3].
Usage
phi0TT(Temp, D, digits = 9)
Value
The Second Temp Derivative of Ideal-gas part of the Helmholtz Energy: phi0TT and an Error
Message (if an error occur: errorCodes)
Arguments
Temp
Temperature [ K ]
D
Density [ kg m-3 ]
digits
Digits of results (optional)
Details
This function calls a Fortran DLL that solves the Helmholtz Energy Equation.
in accordance with the Revised Release on the IAPWS Formulation 1995 for the
Thermodynamic Properties of Ordinary Water Substance for General and Scientific
Use (June 2014) developed by the International Association for the Properties of
Water and Steam, http://www.iapws.org/relguide/IAPWS-95.html. It is valid
from the triple point to the pressure of 1000 MPa and temperature of 1273.