$$Z_N=Z_1^N$$
$$Z_N=\prod_i Z_i$$
$$\prod_i \frac{Z_i}{i}=\frac{Z_1^N}{N!}$$
Alireza Jamali's Blog
$$Z_N=Z_1^N$$
$$Z_N=\prod_i Z_i$$
$$\prod_i \frac{Z_i}{i}=\frac{Z_1^N}{N!}$$
$$Z_N=Z_1^N$$
This reminds us of the Gibbs paradox.
Next step:
$$Z_N=\frac{Z_1^N}{N!},$$
but since $$m=-\frac{dF}{dB}$$
it still doesn't change magnetization as the relation to \(Z_1\) still hasn't changed. So the ultimate solution would be
$$Z_N=\frac{(N+Z_1-1)!}{N!(Z_1-1)!},$$
and
$$Z_N=\frac{Z_1!}{N!(Z_1-N)!}.$$
$$Z=e^{0\beta\mu_B B}+e^{\beta\mu_B B}+e^{-\beta\mu_B B}=1+2\cosh(\beta\mu_B B)$$
Periodic magnetization:
$$M=i\frac{N\mu_B}{V}\tan(\beta\mu_B B)$$