Let the sum of the numbers be S. Therefore S devides $ x_1 (S-x_1+1) $ so S devides $ x_1-x_1^2 $ and now it's trivially

Let the sum of the numbers be S. Therefore S | x_1(S-x_1+1) so S | x_1-x_1^2. Then summing over all permutations, S | -(x_1^2+x_2^2+…+x_n^2-x_1-x_2-…-x_n), where x_1+x_2+…+x_n=S, and we’re done. Note that if the problem meant S | x_1(S-x_1)+1, then summing over all permutations would mean S | -(x_1^2-1+x_2^2-1+…)= -(x_1^2+x_2^2+…+x_n^2-n), which is not always true unless S | n.