I am really stuck on this
In how many ways can three pairs of siblings from different families be seated in two rows of three chairs, if siblings may sit next to each other in the same row, but no child may sit directly in front of their sibling?
This is a classic combinatorics problem that requires careful consideration of the given constraints. It can be quite challenging at first, but with some patience and a systematic approach, you can arrive at the correct solution. Good luck!