Answer:
w = 134121.2 [kJ]
Step-by-step explanation:
This is a classic problem of thermodynamics, with the initial saturation conditions we can find the initial enthalpy.
We have to remember that working in a closed system that expands is equal to:
W = P * DV
where:
P = pressure of the system [Pa]
DV = volume differential (Final - initial)[m^3]
W = work done by the volume change [J]
And the enthalpy in each state is given by the following expression.
H = U + P*V
Where:
H = enthalpy [J]
U = internal energy [J]
P = pressure [Pa]
V = volume [m^3]
The work performed per unit of mass is equal to:
w = m*(h2 - h1)
Where:
m = mass of the system [kg}
h2 = enthalpy at pooint with 80% of quality [kJ]
h1 = enthalpy at saturated liquid water [kJ]
The mass can be solved using the initial data of water saturation.
In the attached image we can see how was selected the specific volume for the saturated liquid water.
![v_(specf)=0.01157[m^3/kg]](https://img.qammunity.org/2021/formulas/physics/college/7d8xe1nb39cbuqod0eultiimic1fztgwly.png)
![m=(V)/(v_(specf))\\ m=(1)/(0.01157)\\ m=86.43[kg]](https://img.qammunity.org/2021/formulas/physics/college/pkutn6bo7q9fqrt63522e2dgtf8wpz5tjj.png)
And the enthalpy at the initial saturation point can be found using the tables, (see the second attached image).
h1 = 852.26[kJ/kg]
And now using the definition for the quality of a pure substance in the saturation condition we can find the enthalpy at the second point.
h2 = hf + x*(hg - hf)
where:
hf = enthalpy at saturated liquid [kJ/kg]
hg = enthalpy at saturated gas [kJ/kg]
x = quality
h2 = enthalpy at the second point [kJ/kg]
using the tables we can find the values for hf and hg
hg = 2792 [kJ/kg]
hf = 852.26 [kJ/kg]
h2 = 852.26 + 0.8*(2792 - 852.26)
h2 = 2404.05[kJ/kg]
Now replacing in the equation we have:
w = 86.43 * (2404.05 - 852.26)
w = 134121.2 [kJ]