No. YOU decided to “add 50”, apparently just to makeup and argument. I never said anything close to that.
And if you can’t figure out how to count 50 days and deduce that no one left the island, I am not interested in your responses.
Well yeah, if you are merely trying to win an online argument, not the slightest interested in the truth of the situation and perhaps learning something, then I am truly only interested in the others.
Anyway ‘deducing that no one left the island’ is completely separate from ‘counting 50 days’. You deduce that no one left the island by looking at them at seeing that no one left. You also just happened to have counted 50 days. Two not apparently related facts.
So, yes, I CAN count 50 days.
And I CAN look at other people and notice if no one left.
What I can’t do is use those two facts to deduce my own eye color.
Nothing has been said since my presentation of the correct solution 2 pages ago. I suggest not saying anything if you have nothing to say.
It’s basically just been Carleas trying his level best to draw a more precise solution presentation from James (well, since more than just 2 pages ago), yet being met only by distraction, diversion and accusation. You can’t just accuse others of being “imperfect logicians” just because they don’t accept solutions that won’t be presented in a detailed enough way such as to uncover their faults more clearly.
I think it’s pretty safe to say that we’re never going to get that from him, so there’s nothing left to say. His answer will be that he’s already done it, nobody excepting it on the grounds that he clearly hasn’t aside - that’s our fault for not understanding and not his. Whatever.
You’re either one of those who protest that there “must” be a better solution than the correct one “because the islanders are perfect logicians” and everyone else is accused of not being so because we don’t agree, or you’ve long accepted the correct solution and understood why it is the only consistent solution based on nothing but certain knowledge and deduction - as is all the puzzle asks.
And we all know who belongs to which group so…
If the islanders care about getting off the island as quickly as possible and if we want to complicate the simplicity of the puzzle then …
The islanders could accelerate the process by mentally skipping the days that don’t contribute ‘useful’ information. They know that nobody is going to leave on day 4, 5, 6, … 96 so they deduce that they can consider night one after the guru speaks as the night when 97 blues would leave if there are 97 blues. Being ‘perfect logicians’, they realize that they don’t need to wait.
Uncomfortable problems with the idea:
It bypasses the logical path that was open by the guru. Without that path, the browns can think exactly the same thing. Both brown and blue islanders leave on day 4, but how can any individual know their own eye color? They can’t. The ‘solution’ is inconsistent.
It requires a leap of faith based on the concept of ‘perfect’ logician to start from day 9x.
There aren’t any days that don’t contribute useful information. Every day raises the base, and without each day’s raise, the next day’s isn’t possible. You can’t raise the base case to 97 before you raise it to 96, or to 96 before you raise it to 95, or to 95 before…
This doesn’t depend on whether or not they want to get off the island, but on the common knowledge they use to deduce their eye color.
The problem with common knowledge is that they already have it. Everyone can already see 99 people with blue eyes. They know that nobody will leave on day 1 … 97. That’s why the problem seems so artificial. It prompts a search for ‘faster’ solutions.
Your reasoning involved knowing what days nobody is going to leave on. If that’s the route, you end at 98, not 96.
If you end at 96, you must be using some criteria other than what days we know nobody is going to leave on.
What is it?
My argument that I presented with a few pages back debunked the whole “If there’s 100, you can start with 97” argument.
The reasoning is that, no matter what number there are, his idea is that you always start with 2 less than the person sees.
There are 2 problems with this:
If I see 99, then I start with 97, but I don’t know that the 99 I’m seeing are starting with 97. They might only see 98, in which case they’d be starting at 96.
You end up using information that would be the case regardless of your eye color to deduce your eye color (namely, that nobody leaves after 3 days – I demonstrated, and will demonstrate again if necessary, that following the plan, nobody would have left after 3 days regardless of your eye color).
No you didn’t (again).
What you debunked (again) was merely that a person could not just take “2 less than he sees”.
As always, you rush to conclude your own success.
That’s what the “start with 97” argument WAS. “Take 2 less than he sees” = “start with 97”. That’s what I debunked. Yes. The only solution you offered which involved starting from 97 was debunked. So unless there’s a new one, I don’t see why we’re still thinking it’s a good idea to start from 97.
No it wasn’t “what the 97 argument was”. Again, merely trying to claim a victory.
The argument was that IF EVERYONE STARTS WITH THE SAME NUMBER, IT WILL ALWAYS WORK.
The 97 was an example. When you started questioning it, I rushed, mistakenly, into thinking “well just take 2 less than you see”. Okay, it isn’t THAT simple. You can’t just take 2 less than you see.