I'm not exactly fluent in Romanian but it seems to me that the official exam paper says $2^{n-1}$ and not $2n-1$...

Write down all thev $2^n $ subsets on a borad. Match each with its complement, and mark the ones representing the set of the solvers of a problem. We have $2^{n-1} $ matches and cannot have both ends of a match marked. While we have $2^{n-1} $ marks. The empty set is not marked $, $ its match, the full set. Which needs to be marked. It is proved that there is a problem, which is solved by all.