Question

Consider a system with 1000 particles that can only have two energies, &, and &, with &z > &. The difference between these two values is Aε = &z - & . Assume that gi=g2 = 1. Using the equation for the Boltzmann distribution graph the number of particles, ni and n2, in states & and Ez as a function of temperature for a Aε = 1x10-21 J and for a temperature range from 2 to 300 K. n; - die n; 8; %97 or 12 ekot

Answer 1

Answer:

Here, the total number of particles => 1000 = n₁ + n₂ (1)

As given in the expression;

n₂ = n₁exp^-dE/K_bT (2)

Hence, for the calculation of n₁, we will substitute the value of value of n₂ in equation (1)

and n₁ can be given as n₁ = 1000/(1 + exp^-dE/K_bT)

and n₂ as: n₂ =  n₁*exp^-dE/K_bT

Here, we are considering the a Temp. step of "10K" for the calculation of particles.

-- | | | |T500 1000 - ---------- 900 - 800 - لا کہ 700 - 600 . 500 +10 0 50 250 300 100 150 200 Temperature

The data for the correspondence graph is

T n₁ n₂

2 1000 1.8678E-13
12   997.61484   2.38516
22   964.16779   35.83221
32   905.81187   94.18813
42   848.7204   151.2796
52   801.06216   198.93784
62   762.83351   237.16649
72   732.23988   267.76012
82   707.51216   292.48784
92   687.25503   312.74497
102   670.42975   329.57025
112   656.27207   343.72793
122   644.21703   355.78297
132   633.84237   366.15763
142   624.82827   375.17173
152   616.92915   383.07085
162   609.95392   390.04608
172   603.752   396.248
182   598.20335   401.79665
192   593.21117   406.78883
202   588.6967   411.3033
212   584.59517   415.40483
222   580.85292   419.14708
232   577.42511   422.57489
242   574.27401   425.72599
252   571.36765   428.63235
262   568.67877   431.32123
272   566.18397   433.81603
282   563.8631   436.1369
292   561.69867   438.30133
300   560.06947   439.93053

Please comment if you need further help for the same.

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