$ Z =\displaystyle\frac{1}{1-e^{- \beta \epsilon_r }}$

Z =1/(1-exp(-beta * epsilon_r ))

$ \bar{n}_r =\displaystyle\frac{1}{e^{ \beta \epsilon_r }-1}$

n_r =1/(exp( beta * e_r )-1)

$ Z =\displaystyle\sum_{ n_r =0}^{\infty}e^{- \beta n_r \epsilon_r }$

Z =@SUM(exp(- beta * n_r * e_r , n_r , 0 , infty )

$ \bar{n}_r =-\displaystyle\frac{1}{ \beta }\displaystyle\frac{\partial \ln Z_r }{\partial \epsilon_r }$

mn_r =-(1/ beta )*(d ln Z_r /d e_r )

$ \epsilon(\omega) d\omega = \displaystyle\frac{ 4 \pi }{(2 \pi c )^3}\displaystyle\frac{ \hbar \omega ^3 d\omega }{ e^{ \beta \hbar \omega } - 1}$

epsilon(omega) * domega = 4* pi * hbar * omega ^3 * domega /((2* pi * c )^3 * (exp( beta * hbar * omega ) - 1))

$ I(\nu) d\nu = \displaystyle\frac{ 2 h \nu ^3 }{ c ^2}\displaystyle\frac{ d\nu }{ e^{ \beta h \nu } - 1}$

I(nu) * dnu = 2* h * nu ^3 * dnu /( c ^2 * (exp( beta * h * nu ) - 1))

$ k_i =\displaystyle\frac{2 \pi n_i }{ L }$

k_i = 2* pi * n_i / L_i

$ d^3n =\displaystyle\frac{ V }{(2 \pi )^3} 4\pi k ^2 dk $

d^3n = V *4* pi * k ^2 * dk / (2* pi )^3

$ \omega = c \mid\vec{k}\mid$

omega = c *| &k |

$ n(\omega) d\omega = \displaystyle\frac{ 4 \pi }{(2 \pi c )^3}\displaystyle\frac{ \omega ^2 d\omega }{ e^{ \beta \hbar \omega } - 1}$

n(omega) * domega = 4* pi * omega ^2 * domega /((2* pi * c )^3 * (exp( beta * hbar * omega ) - 1))

$ d^3n =\displaystyle\frac{ V }{(2 \pi c )^3} 4\pi \omega ^2 d\omega $

d^3n = V *4* pi * omega ^2 * domega / (2* pi * c )^3

$ \epsilon = \hbar \omega $

epsilon = hbar * omega

$ \epsilon(\nu) d\nu = \displaystyle\frac{ 2 h \nu ^3 }{ c ^3}\displaystyle\frac{ d\nu }{ e^{ \beta h \nu } - 1}$

epsilon(nu) * dnu = 2* h * nu ^3 * dnu /( c ^3 * (exp( beta * h * nu ) - 1))

$ I = c \epsilon $

I = c * epsilon

$ \omega = \displaystyle\frac{2 \pi }{ T }$

omega = 2* pi / T