In a school class with 3n children, any two children make a common present to exactly one other child. Prove that for all odd n it is possible that the following holds: For any three children A, B and C in the class, if A and B make a present to C then A and C make a present to B. functionmodular arithmeticnumber theorydivisibility testsgraph theorycombinatorics unsolvedcombinatorics