Life In 19x19 :: Fibonacci in Kageyamaâs four rank barriers?

Hi,

Kageyama wrote that, in his experience, a player faces four barriers at: 12-13k, 8-9k, 4-5k, and 1-2k.

The ‘barrier’ levels seem to imprefectly relate to the Fibonacci sequence: 1, 1, 2, 3, 5, 8, 13.

What do you all think? (an idle weekend thought :lol:

).

Cheers
tezza

Or maybe selling derivatives. :mrgreen:

12-13k, 8-9k, 4-5k, and 1-2k
imprefectly... Fibonacci 1, 1, 2, 3, 5, 8, 13

He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k.

daniel_the_smith wrote:

He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k.

You know, it's funny, I had no idea what this was supposed to mean, because they have a sort of rhythm in my head, like a telephone number. One four one five nine is a single discrete chunk, and then two-six-five is the next... nine-two just doesn't compute!

daniel_the_smith wrote:

He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k.

Author:	tezza [ Sat Nov 05, 2011 3:31 pm ]
Post subject:	Fibonacci in Kageyamaâs four rank barriers?
Hi, Kageyama wrote that, in his experience, a player faces four barriers at: 12-13k, 8-9k, 4-5k, and 1-2k. The ‘barrier’ levels seem to imprefectly relate to the Fibonacci sequence: 1, 1, 2, 3, 5, 8, 13. What do you all think? (an idle weekend thought ). Cheers tezza

Author:	Joaz Banbeck [ Sat Nov 05, 2011 4:05 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
I'm sure that you have a great future ahead of you in phrenology or alchemy. Or maybe selling derivatives.

Author:	Bill Spight [ Sat Nov 05, 2011 4:20 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
tezza wrote: Hi, Kageyama wrote that, in his experience, a player faces four barriers at: 12-13k, 8-9k, 4-5k, and 1-2k. The ‘barrier’ levels seem to imprefectly relate to the Fibonacci sequence: 1, 1, 2, 3, 5, 8, 13. What do you all think? (an idle weekend thought ). Cheers tezza I think that, on this topic, Kageyama was full of it. The only barriers are in your mind.

Author:	ACGalaga [ Sat Nov 05, 2011 4:47 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
Heh heh

Author:	tezza [ Sat Nov 05, 2011 5:28 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
Joaz Banbeck wrote: Or maybe selling derivatives. heh heh

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Author:	daniel_the_smith [ Sun Nov 06, 2011 7:38 am ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k.

Author:	EdLee [ Sun Nov 06, 2011 8:20 am ]
Post subject:
tezza wrote: 12-13k, 8-9k, 4-5k, and 1-2k imprefectly... Fibonacci 1, 1, 2, 3, 5, 8, 13 Oh my gosh, tezza, you're right! Note how they also imperfectly fit into: Natural numbers: 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13 Primes: 2, 3, 5, 7, 11, 13 pi: 3.14159265358979... sqrt(2): 1.414213562... (80% of the first 10 digits! Wow!) e: 2.7182818284590452353602874713526... Incredible & amazing! And what Joaz said.

Author:	wessanenoctupus [ Sun Nov 06, 2011 8:33 am ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
be nice now

Author:	hailthorn011 [ Mon Nov 07, 2011 9:23 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
daniel_the_smith wrote: He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k. Wow, if someone's 92k, they must not even know how to put the stones on the board. <<

Author:	jts [ Mon Nov 07, 2011 10:33 pm ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
daniel_the_smith wrote: He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k. You know, it's funny, I had no idea what this was supposed to mean, because they have a sort of rhythm in my head, like a telephone number. One four one five nine is a single discrete chunk, and then two-six-five is the next... nine-two just doesn't compute!

Author:	Dusk Eagle [ Tue Nov 08, 2011 3:55 am ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
Reminds me of this :

Author:	Sverre [ Tue Nov 08, 2011 9:01 am ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
jts wrote: daniel_the_smith wrote: He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k. You know, it's funny, I had no idea what this was supposed to mean, because they have a sort of rhythm in my head, like a telephone number. One four one five nine is a single discrete chunk, and then two-six-five is the next... nine-two just doesn't compute! The dan ranks are to the left of the decimal point

Author:	daniel_the_smith [ Tue Nov 08, 2011 9:04 am ]
Post subject:	Re: Fibonacci in Kageyamaâs four rank barriers?
jts wrote: daniel_the_smith wrote: He got it wrong. Actually they're at 3d, 1k, 4k, 15k, and--rumor has it--at 92k. You know, it's funny, I had no idea what this was supposed to mean, because they have a sort of rhythm in my head, like a telephone number. One four one five nine is a single discrete chunk, and then two-six-five is the next... nine-two just doesn't compute! Same here, 14159 and 26583 are distinct chunks in my mind... It was kinda difficult to split them up, I had to check like a dozen times that I'd done it right.

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