11. The Peng-Robinson equation of state has the form: RT -2 v-b (a) evaluate the constants...
4. For the given equation of state RT a P = V-b T V (Vm +b) Evaluate the critical constants Te, Pe, and Z in terms terms of a and b
MATLAB code needed! Can garentee lots of up votes. Any questions just comment Using the Peng-Robinson EOS, do the following: Construct a P-V diagram for methane. Use Isotherms in 10-degree increments starting at 75 degrees Kelvin until you are approximately 40 degrees above the critical point. Calculate the vapor pressure of methane as a function of temperature. Compare your computed results with the literature and describe the similarities and differences. On the P-V diagram, use the limits of stability derived...
Determine the Boyle temperature in terms of constants for the equation of state: PVm = RT{1 + 8/57(P/Pc)(Tc/T)[1 – 4(Tc/T^2) ]} R, Pc, and Tc are constants. Can someone please explain why I have to set [1 – 4(Tc/T^2) ]}=0 (I know that at Boyle's temperature B=0 since p->0 and the real gas will act as an ideal gas, but why is this specific part of the equation set to 0? thank youuu!!!
2. The following equation of state for one mole of a non-ideal gas is proposed as a modified version of the van der Waals equation: RT a P = 1-6 - um Where V is the volume, and a, b, n are constants in terms of characteristics of the gas. (a) Express Vc, Pc, and Tc in terms of a, b, n and R. (b) Estimate the critical compression factor, Zc. (c) Write the equation of state in terms of...
3. (20 points) Sandler 6.18 The Clausius equation of state is P(V – b) = RT where b is a constant. (a) Show that for this volumetric equation of state Cp(P,T) = Cy(P,T) +R Cp(P,T) = CP(T) Cy(V,T) = Ci(T) (b) For a certain process the pressure of a gas must be reduced from an initial pressure P, to the final pressure P2. The gas obeys the Clausius equation of state, and the pressure reduction is to be accomplished by...
1. The Redlich-Kwong equation of state is given by P=_RT___ A _ _ V-RI2,, - 0.0866 - where 4-0.42748RT - B - P (The R-K constants can be calculated from the critical temperature and pressure of the gas.) This EOS was introduced in 1949 and is adequate for calculations of gas phase properties when P, </2 T, a) Derive an expression for the work associated with an isothermal reversible volume change of a R-K gas between two volumes V, and...
Atomic gas which obeys Van der Waals equation of state RT= (P+ a/ V2) (V-b) has internal energy (per mole) of u = 3/2 RT - a/V where 'V' is volume of mole in temperature T. In the beginning, the gas temperature is T1 and volume V1. The gas is let to expand adiabatically so that its final volume is V2. What is the final temperature of the gas?