What are the zero divisors of the ring $\mathbb Z_n[i]$, where $n$ has only one prime factor which is congruent to 3 (mod 4)?

Question

What are the zero divisors of the ring $\mathbb Z_n[i]$, where $n$ has only one prime factor which is congruent to 3 (mod 4)?

I feel like this is the set of all those elements where real and imaginary parts are divisible by the prime p. How to prove it?