10 kg of water in a piston cylinder arrangement exists as saturated liquid/vapor at 100 kPa, with a quality of 50%. It is now heated so the volume triples. The mass of the piston is such that a cylinder pressure of 200 kPa will float it, as in Fig.3.171. Find the final temperature and the heat transfer in the process.
Question 3.171: 10 kg of water in a piston cylinder arrangement exists as sa...
Take CV as the water.
Continuity Eq.: m _{2}= m _{1}= m;
Energy Eq.: m \left( u _{2}- u _{1}\right)={ }_{1} Q _{2}-{ }_{1} W _{2}
Process: v = constant until P = P _{\text {lift }}, then P is constant.
State 1: Two-phase so look in Table B.1.2 at 100 kPa
\begin{array}{l}u _{1}=417.33+0.5 \times 2088.72=1461.7 kJ / kg \\v _{1}=0.001043+0.5 \times 1.69296=0.8475 m ^{3} / kg\end{array}
State 2: v _{2}, P _{2} \leq P _{\text {lift }} \Rightarrow v_{2}=3 \times 0.8475=2.5425 m ^{3} / kg
Interpolate: T _{ 2 }= 8 2 9 ^{\circ} C , \quad u _{2}=3718.76 kJ / kg
\Rightarrow V _{2}= mv _{2}=25.425 m ^{3}
From the process equation (see P-V diagram) we get the work as
{ }_{1} W _{2}= P _{ lift }\left( V _{2}- V _{1}\right)=200 kPa \times 10 kg (2.5425-0.8475) m ^{3} / kg =3390 kJ
From the energy equation we solve for the heat transfer
\begin{aligned}{ }_{1} Q _{2} &= m \left( u _{2}- u _{1}\right)+{ }_{1} W _{2}=10 kg \times(3718.76-1461.7) kJ / kg +3390 kJ \\&= 2 5 9 6 1 ~ k J\end{aligned}
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