3. For ideal gas treated in quantum regime and when the particles are treated as distinguish- able, using Gibb's correction, calculate a) The energy b) Chemical potential 4 3/2 where S (NIVIE) = Nkin ( * ) +Nkin (2πmky h2 NK と c) Establish the relation between specific heat capacities for constant volume and pressure separately d) Helmholtz free energy L e Enthalpy free energy [Optional]
3. For ideal gas treated in quantum regime and when the particles are treated as distinguish- able, using Gibb's correction, calculate a) The energy b) Chemical potential 4 3/2 where S (NIVIE) = Nkin ( * ) +Nkin (2πmky h2 NK と c) Establish the relation between specific heat capacities for constant volume and pressure separately d) Helmholtz free energy L e Enthalpy free energy [Optional]
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![3. For ideal gas treated in quantum regime and when the particles are treated as distinguish-
able, using Gibb's correction, calculate
a) The energy
b) Chemical potential
4
3/2
where S (NIVIE) = Nkin ( * ) +Nkin (2πmky
h2
NK
と
c) Establish the relation between specific heat capacities for constant volume and pressure
separately
d) Helmholtz free energy
L
e Enthalpy free energy [Optional]](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F21de87d3-5af2-47a0-95c5-6ccf16232021%2F09dd62be-5861-436d-9a0e-0a0f3d661c0c%2Fgi4r514_processed.jpeg&w=3840&q=75)
Transcribed Image Text:3. For ideal gas treated in quantum regime and when the particles are treated as distinguish-
able, using Gibb's correction, calculate
a) The energy
b) Chemical potential
4
3/2
where S (NIVIE) = Nkin ( * ) +Nkin (2πmky
h2
NK
と
c) Establish the relation between specific heat capacities for constant volume and pressure
separately
d) Helmholtz free energy
L
e Enthalpy free energy [Optional]
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