Fundamentals of Statistical and Thermal Physics, Volume 10This book is devoted to a discussion of some of the basic physical concepts and methods useful in the description of situations involving systems which consist of very many particulars. It attempts, in particular, to introduce the reader to the disciplines of thermodynamics, statistical mechanics, and kinetic theory from a unified and modern point of view. The presentation emphasizes the essential unity of the subject matter and develops physical insight by stressing the microscopic content of the theory. |
From inside the book
Results 1-3 of 74
Page 234
... solid . ( b ) Find an expression , as a function of T , of the nuclear contribution to the molar entropy of the solid . ( c ) By directly counting the total number of accessible states , calculate the nuclear contribution to the molar ...
... solid . ( b ) Find an expression , as a function of T , of the nuclear contribution to the molar entropy of the solid . ( c ) By directly counting the total number of accessible states , calculate the nuclear contribution to the molar ...
Page 305
... Solid Liquid Gas T * gas . The three lines meet at one common point A , called the " triple point " ; at this unique ... solid ( s ) to liquid ( 1 ) the entropy of the substance ( or degree of disorder ) almost always increases . † Thus ...
... Solid Liquid Gas T * gas . The three lines meet at one common point A , called the " triple point " ; at this unique ... solid ( s ) to liquid ( 1 ) the entropy of the substance ( or degree of disorder ) almost always increases . † Thus ...
Page 366
... solid . If it consists of N2 atoms and has a volume V2 , its chemical potential is related to its partition function Z by = με ( V. ) T.V . In Z = -kT T.V2 ƏN 2 T.V : ( 9.11.14 ) Although we could try to calculate Z by using a model ...
... solid . If it consists of N2 atoms and has a volume V2 , its chemical potential is related to its partition function Z by = με ( V. ) T.V . In Z = -kT T.V2 ƏN 2 T.V : ( 9.11.14 ) Although we could try to calculate Z by using a model ...
Contents
Introduction to statistical methods | 1 |
GENERAL DISCUSSION OF THE RANDOM WALK | 24 |
Statistical description of systems of particles | 47 |
Copyright | |
33 other sections not shown
Other editions - View all
Common terms and phrases
absolute temperature approximation assume atoms becomes Boltzmann equation calculate chemical potential classical coefficient collision condition Consider constant container corresponding curve d³r d³v denote density depends discussion e-BE electrons ensemble entropy equal equation equilibrium situation equipartition theorem evaluated example expression external parameters fluctuations gases given heat capacity heat reservoir Hence ideal gas independent infinitesimal integral integrand interaction internal energy isolated system kinetic liquid macroscopic macrostate magnetic field magnetic moment mass maximum mean energy mean number mean pressure mean value mole molecular molecules momentum n₁ number of molecules number of particles obtains partition function phase space photons physical piston probability problem quantity quantum quantum mechanics quasi-static range relation result simply solid specific heat spin statistical mechanics thermal contact thermally insulated Thermodynamics tion total number unit volume v₁ variables velocity