The hidden 24 number subcode in the Fibonacci numbers

The hidden 24 number subcode in the Fibonacci numbers

Within the Fibonacci series there is a hidden sub code which repeats every 24 numbers;

It is not so easy to identify if we take this numeric sequence on its face value
eg;
1,1,2,3,5,8,13,21,34,55,89,144,233,377,610,987,1597,2584,4181,6765,10946,17711,28657,

46368,75025.

This patterning becomes visible only when we apply a form of numeric reduction-similar to that which is utilised within Marko Rodin’s vortex math or in Jain’s Vedic mathematical research.
By this I mean we use a form of reduction whereby all the digits of a number are added together until only one number remains.
For example,the number 21 becomes 2+1=3
or 75025 is treated as 7+5+0+2+5=19=10=1

This is also known as Mod 9 or base 9.

Applying this method of reduction to the Fibonacci numbers reveals an infinitely repeating sequence of 24 digits.

1, 1, 2, 3, 5, 8, 4, 3, 7, 1, 8, 9, 8, 8, 7, 6, 4, 1, 5, 6, 2, 8, 1, 9

When we divide this reduced 24 sequence into two blocks of 12 digits and add them to each other we discover that they all without fail add up to 9.

1st 12 numbers      1     1     2     3     5     8     4     3     7     1     8     9
2nd 12 numbers     8     8     7     6     4     1     5     6     2     8     1     9
……………………..9     9     9     9     9     9     9     9     9     9     9     9

This same 24 sequence repeats ad infinitum throughout the Fibonacci numbers no matter how far we choose to progress them.

This understanding is by far from new. I’m sure you have come across it before. After all, it has been around on the web for quite some time now.
As it is however intrinsic to the understanding of the material we wish to present here, maybe it is necessary to cover all of the basics before we move on.

What we would like to share with you next however is something completely new.

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One comment on “The hidden 24 number subcode in the Fibonacci numbers

  1. […] The hidden 24 number subcode in the Fibonacci numbers […]

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