Kaligraphic wrote:Actually, from 4:
MMCC ________________________MMCC
5: Cannibal goes back and switches with both remaining missionaries, who go to the right (this should be safe because there are no longer any missionaries on the starting side)
CCC ________________________MMMMC
Kaligraphic wrote:Only if the boat is not a separate container or the switch is not simultaneous.
If you count the return trips as separate steps with everyone exiting between steps, then you fail either the first time you move a missionary or the move immediately after.
Given this, MS Pants' solution breaks down at step 4 because the only possible move would be to send back both missionaries, and you cannot replace them with cannibals or the boat won't be large enough to balance them in a single trip. You can't have both sides balanced or emptied at the end of each move.
You sure it's four of each? Because there's a common puzzle that's basically the same situation but with only three of each.
Anime Dad wrote:I googled this..... basically, if it's 4 of each it can't be solved but it can be with 3 of each.
battletech wrote:I've figured it out, but since Natsumi got here first. I will wait to see if Natsumi can figure it out. Never mind I forgot about no one staying on the boat. I have to go back to the drawing board!
Mr. SmartyPants wrote:I TOLD YOU! SHOOT THE CANNIBALS! Gosh pay attention to me!
uc pseudonym wrote:Interesting, but it does become logically impossible if we assume that every individual moment must satisfy M >= C. However, considering that in reality a person can remain in a boat, we're operating from faulty assumptions.
Still, I'll keep this in mind the next time I'm among four missionaries with four cannibals, all needing to cross a river in one small boat.
termyt wrote:But can you depend on a cannibal to stay in the boat? The cannibal would likely look at out numbering the missionaries as a possitive thing. You can't count on them to stay in the boat to maintain a certain ratio.
uc pseudonym wrote:Or what about vegetarian cannibals? Then your problem would be solved from the start.
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