The rules of the game are: first, please raise your right hand, then start with the first student in the first group and count off in a cycle of 1, 2, 3, 4 ... The first student in the second group counts down from the last student in the first group, and so on, and connect the groups in an "S" way. After the last student finished counting, the first student in the first group continued to count. In other words, the "lucky number king" qualification is cancelled, and the number can no longer be counted. Other students who are still raising their hands continue to count the games until the last student who is still raising their hands is the last "lucky number king", because he or she has never reported a multiple of the number 3, and the lucky number can also be changed to 4, 5, 6 ... Who will be the "lucky king" of the next number?