For a monoatomic ideal gas, the ratio of specific heats is γ=35.
In an adiabatic process, PVγ=constant.
P1V1γ=P2V2γ
PV5/3=P2(27V)5/3
P2=P(271)5/3=243P
The change in internal energy is given by:
ΔU=γ−1P2V2−P1V1
Substituting the values:
ΔU=35−1(243P)(27V)−PV
ΔU=329PV−PV
ΔU=32−98PV=−34PV
Answer: −34PV