The density of an ideal gas can be written in terms of the variables p and T: Mp where M is the molar mass of a gas. d = RT (a) Use the cyclic rule to write an expression for in terms of a ratio of partial derivatives. (b) show that the cyclic rule in part a is true for an ideal gas.
The density of an ideal gas can be written in terms of the variables p and T: Mp where M is the molar mass of a gas. d = RT (a) Use the cyclic rule to write an expression for in terms of a ratio of partial derivatives. (b) show that the cyclic rule in part a is true for an ideal gas.
Physical Chemistry
2nd Edition
ISBN:9781133958437
Author:Ball, David W. (david Warren), BAER, Tomas
Publisher:Ball, David W. (david Warren), BAER, Tomas
Chapter1: Gases And The Zeroth Law Of Thermodynamics
Section: Chapter Questions
Problem 1.66E
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![The density of an ideal gas can be written in terms of the variables p and T:
Mp
d =
where M is the molar mass of a gas.
RT
(a) Use the cyclic rule to write an expression for (oden)
(%),
in terms of a ratio of partial
derivatives.
(b) show that the cyclic rule in part a is true for an ideal gas.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F28bc5d66-072a-42bf-a671-1c3a7c2a0582%2F508acd2b-b0d2-4460-8743-33bf67469503%2Feiishnq_processed.jpeg&w=3840&q=75)
Transcribed Image Text:The density of an ideal gas can be written in terms of the variables p and T:
Mp
d =
where M is the molar mass of a gas.
RT
(a) Use the cyclic rule to write an expression for (oden)
(%),
in terms of a ratio of partial
derivatives.
(b) show that the cyclic rule in part a is true for an ideal gas.
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