Suppose that $X$ is an inclusion-minimal finite set of non-zero complex numbers such that $\sum\limits_{x\in X}x^n=0\ $ for infinitely many integers $n$.
- Can the cardinality of $X$ be a composite number?
2. Can $X$ be something different from $\root^p\of c$ (for some $c\in\mathbb C$ and prime $p$)?
(Inclusion-minimal means that the number of $n\in\mathbb Z$ such that $\sum\limits_{x\in Y}x^n=0$ is finite for any proper subset $Y\subset X$.)