Jenkz
Sep5-10, 10:08 AM
1. The problem statement, all variables and given/known data
In a quasistaic adiabatic process in a monatomic ideal gas PV^5/3 = constant [DO
NOT PROVE]. A monatomic ideal gas initially has a pressure of P0 and a volume of
V0. It undergoes a quasistatic adiabatic compression to half its initial volume. Show
that the work done on the gas is
W = 3/2 P0V0 ( 2^(2/3) - 1)
2. Relevant equations
dU= dQ + dW
dW= -p dV
V1= V0/2
3. The attempt at a solution
dU= dW as adiabatic procees means dQ=0
dU= 3/2 NKbT = -p dV
And I don't know what to do next.
3/2 NKbT= P0Vo[1-V1/V0]
In a quasistaic adiabatic process in a monatomic ideal gas PV^5/3 = constant [DO
NOT PROVE]. A monatomic ideal gas initially has a pressure of P0 and a volume of
V0. It undergoes a quasistatic adiabatic compression to half its initial volume. Show
that the work done on the gas is
W = 3/2 P0V0 ( 2^(2/3) - 1)
2. Relevant equations
dU= dQ + dW
dW= -p dV
V1= V0/2
3. The attempt at a solution
dU= dW as adiabatic procees means dQ=0
dU= 3/2 NKbT = -p dV
And I don't know what to do next.
3/2 NKbT= P0Vo[1-V1/V0]