Z = B V (2rmkT)³/2 Using this classic form of the division function, the following can easily be proven: (1) E = NKT (2) F = -NKT In [B V (2mmkT)| (3) P = NkT/V
Z = B V (2rmkT)³/2 Using this classic form of the division function, the following can easily be proven: (1) E = NKT (2) F = -NKT In [B V (2mmkT)| (3) P = NkT/V
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![Z = B V (2nmkT)³/2
Using this classic form of the division
function, the following can easily be proven:
(1) E = NKT
(2) F = -NKT In |B V (2rmkT)]
(3) P = NkT/V
(4) S = Nk In B V (2īmkT)+Nk](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F13f7e252-d365-4faf-ad5f-30b36f8a0952%2F7ea2ca32-af3e-4f2d-bf8e-dfc8135c7a58%2F98xi55_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Z = B V (2nmkT)³/2
Using this classic form of the division
function, the following can easily be proven:
(1) E = NKT
(2) F = -NKT In |B V (2rmkT)]
(3) P = NkT/V
(4) S = Nk In B V (2īmkT)+Nk
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