It seems like there is a simple field property I'm missing. If we look at the group $Z_n$ for any $ n>=3$ can we say that : It is possible that $(1*2*3*....*(n-1))^2 = 0 $ ?
Can you please advise?
Guy
It seems like there is a simple field property I'm missing. If we look at the group $Z_n$ for any $ n>=3$ can we say that : It is possible that $(1*2*3*....*(n-1))^2 = 0 $ ?
Can you please advise?
Guy
Try it: if $n=3$ you get $(1\cdot 2)^2=1$ in $\Bbb Z_3$, not $0$, but if $n=4$ you get $(1\cdot2\cdot3)^2=0$ in $\Bbb Z_4$, so it clearly depends on $n$. Exercise: Prove that $\big((n-1)!\big)^2=0$ in $\Bbb Z_n$ if and only if $n$ is composite.
Of course this means that if $n$ is composite, then $\Bbb Z_n$ is not a field. If you’re interested in fields, you want $n$ to be prime.