The Secret of the numbers 1,2,3 & 4

In short the following graphs and diagrams prove that there are in actual fact only four different vibrations that we should consider and therefore only four numbers namely 1,2,3,4 (I think Pythagoras with his techtractys wanted to say the same thing). The other four vibrations, what we call 5, 6, 7 and 8 are in fact the same as the previous four but operating as inverse mirrors of the first four vibrations. It is like two sides of the same coin. The number 9 represents the centre between these vibrations that keeps the vibrations together.

The vibration type of ANY number can be known instantly. It can only be one of 4.

The number 5461 will be similar in vibration than the number value 7 and 3268 will be similar to 1. When we use the theosophical addition method and add up 5+4+6+1 then we get =16 and then = 7. The number 5461 therefore will have the same vibration as the number 7 which is the same as the number 2 vibration. On a vibration level therefore the number 11 or (2) will therefore be the mirror image (same but inverse) vibration than say 5461 (7). The number pattern for say the number 23632 will be the same as the number pattern for the number 7 etc.

The matrix information of numbers 2 and 7 are entered into the Matlab program and the Inverse of both were asked. The results were quite astonishing.

The matrix starts with the number 7134

7 1 3 4

4 6 8 7

6 4 2 1

1 7 5 6

All 4 rows down add up to 18 which is 1+8=9.

The total of the rows across when reduced will add up to 9 again.

In the above matrix we can use the last two rows down and up to prove again that numbers 4 and 5 are inverse mirrors of each other and the same for 3 and 6.

The row 3825 down. Subtract the next number from the previous one and you get 3 - 8 = -5; 8 - 2 = 6 ;2 - 5 = -3. So all and all –5+6-3 = -2.

For the row 6174 up we do the same and we get: 6 - 1= 5 1 - 7= -6 7 - 4 = 3 So all and all+5-6+3 = 2. For the numbers 4 and 5 we use the number set 4716 down and the number set 5283 up. 4-7 = -3 7-1= 6 1-6 = -5 . Added up it gives –3+6-5 = -2 5-2 = 3 2-8 = -6 8-3 = 5 Added up it gives +3-6+5 = 2.

Do we need any more prove that there are in actual fact only 4 vibration types to which a number can be allocated?

The Matlab results: