The mentioned key is like a cipher that very similar to the Vedic Square. Fibonacci sequence is an approximation of the Golden Ratio. The Golden Ratio is within all of nature. In Fibonacci sequence, you start with 1 and 1, and add together. 2. You take the sum you just acquired (2), and add it to the number right before it. 2+1=3. Then, 3+2=5.The string of sums ends up looking like this: 1, 2, 3, 5, 8, 13, 21, 34, 55, and on and on. It ends up creating a spiral, called the Golden Spiral.
There are the results of starting Fibonacci not just by the number 1, but of all single-digit numbers: 1-9. Then, we want all multi-digit numbers to be reduced to single digit numbers. Let’s take the first Fibonacci number that sums to a multi-digit number: 13. To reduce it to a single digit number you just add them together until the result is a single digit. 1+3=4. So, the single digit reduction of 13 is 4. So, what we did is simplify all Fibonacci solutions to single digit. It goes from the multi-digit sums of Fibonacci sequence to single-digit:
1 2 3 5 8 1+3 2+1 3+4 5+5 etc, results in:
1 1 2 3 5 8 4 3 7 1 8 9 8 8 7 6 4 1 5 6 2 8 1 9
After the 24th sequence of Fibonacci, the entire seemingly random ‘single-digit numbers’ repeat. If you look at 25 - 48, it would repeat perfectly the same numbers in the same sequence:
1 1 2 3 5 8 4 3 7 1 8 9 8 8 7 6 4 1 5 6 2 8 1 9.
Same thing, always.
If you looked at the string of single-digit numbers from 49-75, you would see the number string exactly the same.Then, we can use the number 2 to start the Fibonacci sequence, instead of 1. And there it is again - though the numbers were sometimes different - the entire string of single digit numbers through 24 sequences, repeated.
You see it go:
2 2 4 6 1 7 8 6 5 2 7 9 7 7 5 3 8 2 1 3 4 7 2 9.
If you were to look at the single-digit solutions for number 2 when continuing the Fibonacci sequence past 24, you would see the exact string of numbers repeating:
2 2 4 6 1 7 8 6 5 2 7 9 7 7 5 3 8 2 1 3 4 7 2 9.
Now, something amazing that links to 3 6 9. This is so intriguing, so we continued and started with the number 3, and found that the string of single-digit numbers - remember, they were originally multi-digit, and reduced them to single digit - didn’t repeat at the 24th Fib sequence, but the 8th! Going down through the sequence, you see: 3 3 6 9 6 6 3 9 3 3 6 9 6 6 3 9 3 3 6 9 6 6 3 9. Interesting as well, all single digit solutions are either 3 6 or 9. This is true for number 6 as well. Number 9 repeats itself eternally, without any variation. So, to summarize, when starting the Fibonacci sequence off with numbers 1, 2, 4, 5, 7, 8, they all repeat the first string of numbers in intervals of 24. 3 and 6 repeat their strings at the 8th sequence. 9 is infinite and never changing. Numbers 1 2 4 5 7 8 all repeat their sequence at the 24th sum. This is also the number the Egyptian’s used to create the ratio’s for the Eye of Horus – 1 2 4 8 7 5, which is another solution when messing with this pattern. Numbers 3 and 6 repeat their sequence every 8th sum. Numbers 3 and 6 make a lattice type framework with convergence points always being 9. Number 9 repeats infinitely. Whenever 9 appears alone, numbers 3 and 6 are on all 4 sides. Figure 1 and 2 show what the 3 and 6 column of number looks like when not in number form, but visual Fibonacci form. Figure 3 is result of their mix. Amazing how all 216 numbers of the sequence make this symmetrical and beautiful pattern.
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