Now add pirate number three. Pirate No.4 knows very well that if Plan No.3 fails and there are only two pirates left, he will get nothing. This situation has been analyzed above. Pirate 4 also knows that V will fully understand this situation. Therefore, as long as the distribution plan of No.3 can give No.4 a little sweetness, so that he will not return empty-handed, no matter what plan No.3 proposes, No.4 will vote in favor. So No.3 decided to give 1 a little "benefit". Since gems are not allowed to be divided, it is 1 gem! In this way, the distribution scheme proposed by No.3 is: No.3 gets 99 gems, No.5 gets none, and No.4 gets 1 gem.
The strategy of Pirate 2 is similar. He needs 50% of the votes, so he must find someone to be party member. The "benefit" he can get for his comrades-in-arms is 1 gem, which can be used to bribe No.5 pirate. Because if No.2' s plan is rejected, No.3' s plan is passed, and Pirate No.5 gets nothing, so No.5 and No.2 are on the same side. Therefore, the distribution plan of No.2 should be: 99 gems are for yourself, and 1 gem is given to No.5, No.3 and No.4.. It is worth noting that it is meaningless for No.2 to bribe No.4. One Piece No.4 will definitely enjoy No.2 being thrown into the sea, because after No.3 charged, he still has 1 gems to take.
There have been some minor changes in the strategy of Pirate 5. He needs two colleagues to get his plan through. So his suggestion should be: return 97 gems, give 3 1 gem, and give 2 gems to 4 or 5. ..