MODERN PHYSICS (LOOSELEAF)
4th Edition
ISBN: 9781119495550
Author: Krane
Publisher: WILEY
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Chapter 10, Problem 4P
To determine
The probability for energy 0, 3 and 5 shared among 5 identical and indistinguishable particles.
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Students have asked these similar questions
05. Find the total number of microstates of distributing 5 distinguishable particles among energy
level 0, E, 2E, 3E, and 4E such that the internal Energy remains 4E.
a. How many distributions are possible?
b. Find the total number of microstates
c. What is the most probable distribution?
d. What is the Entropy of the system?
Please make a table clearly showing the energy levels and particle distribution. Show your
calculations.
1. N independent simple harmonic oscillators.2. Differential of a function of several variables.3. First law of thermodynamics - recap.4. Chemical potential defined.
Re-write the first law of thermodynamics expressing S as a function of U, V, N.Now explain how the pressure, temperature and chemical potential may be computedif somehow we were given the entropy.
A system consisting of six indistinguishable particles obeys the Fermi-Dirac statistics. This
system includes four possible macrostate assembles and with each macrostate contains four
equally spaced energy levels. The degeneracy of each energy level (g) is 3 (see the table
below).
k=
8 = 3
2
1
0
1
9
2
●
27
3
9
4
..
●●
A. Calculate the thermodynamic probabilities, wk, of macrostate k = 4.
B. What is the total number of possible microstates of the system?
C. Find the average occupation number of energy levels 1, 2 and 3.
Chapter 10 Solutions
MODERN PHYSICS (LOOSELEAF)
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