Statistical physics - average potential energy and gravity field

xz5x
Messages
18
Reaction score
0
Please help me solve this problem:

Homework Statement

[PLAIN]http://img688.imageshack.us/img688/8140/86617607.jpg


The attempt at a solution

[PLAIN]http://img63.imageshack.us/img63/9531/79093945.jpg


This is my whole procedure:

[PLAIN]http://img685.imageshack.us/img685/5706/62291576.jpg

[PLAIN]http://img706.imageshack.us/img706/7240/94560340.jpg


This is the expected result:

[PLAIN]http://img143.imageshack.us/img143/1264/21782586.jpg
 
Last edited by a moderator:
Physics news on Phys.org
I can see 2 problems:
1 - The second step in (b) is wrong.
2 - The expected result's dimension is wrong.
 
Average energy may be rewriten in the form
E_p=\frac{1}{\beta}[1-\frac{x}{e^x-1}]
where
x={\beta}mgl
WolframAlpha for the series gives
\frac{1}{e^x-1}=\frac{1}{x}-\frac{1}{2}+\frac{x}{12}
and I get
E_p=\frac{x}{2\beta}(1-\frac{x}{6})
 
Last edited:
@zzzoak

I didn't know that average energy may be rewriten in this form. Can you please show me the procedure of how can I get your average energy from mine?

I see that you got the right result. I'll try to solve the problem with this form of potential energy.
Thank you very much!
 
Last edited:
@hikaru1221

Thank you for your response!
Yes, the second step in b) is not correct. This is my new result:
[PLAIN]http://img704.imageshack.us/img704/4834/85676997.jpg

I can’t get the expected result. Please tell me, is dimension of my new result OK?
 
Last edited by a moderator:
It is the expect result's dimension that is wrong. I guess this should be the result: E_p=\frac{mgl}{2}(1-\frac{mgl}{6kT}).
So in your newest result, just omit the second power of (mgl/kT), you should get the expected result.
 
Your equation is
E_p=\frac{1}{\beta}\frac{1-e^{-x}(1+x)}{1-e^{-x}}=
=\frac{1}{\beta}\frac{1-e^{-x}-xe^{-x}}{1-e^{-x}}=
=\frac{1}{\beta}[1-\frac{xe^{-x}}{1-e^{-x}}]=
=\frac{1}{\beta}[1-\frac{x}{e^{x}-1}]
 
Last edited:
@zzzoak

@hikaru1221Thank you very much!
 
Back
Top