Polina wrote on the first page of her notebook $n$ different positive integers. On the second page she wrote all pairwise sums of the numbers from the first page, and on the third - absolute values of pairwise differences of number from the second page. After that she kept doing same operations, i.e. on the page $2k$ she wrote all pairwise sums of numbers from page $2k-1$, and on the page $2k+1$ absolute values of differences of numbers from page $2k$. At some moment Polina noticed that there exists a number $M$ such that, no matter how long she does her operations, on every page there are always at most $M$ distinct numbers. What is the biggest $n$ for which it is possible? M. Karpuk