|
The Theory of Line Patterns |
No figure out of the possible 30^49 (2E72)
is the square root or greater as improbable by design using prime digits 2 and 5 as all of the 2^23 * 29! / 18! (1E22) figures shown using prime digits 3 and 7 by the noted sub-pattern. | math on 37 patterns scholastically verified |
| patterns | k | n | t | probability | description |
|---|---|---|---|---|---|
| 1. | 1 | 1 | 10000 | 1 in 10,000 | numeric value = 37 * 73 |
| 2. | 1 | 1 | 1000 | 1 in 1,000 | Nouns, words 3 and 7 and the word in between value is 37 * 7 * 3 |
| 3. | 23 | 128 | 37 | 1 in 20,000 emperical | 23 subsets evenly divisible by 37 |
| 4. | 1 | 1 | 100000 | 1 in 100,000 | letters * product of letters over / words * product of words = PI |
| 5. | 8 | 128 | 7*7 | 1 in 200 | place of first and last letters of 8 subsets evenly divisible by 7 |
| 6. | 1 | 1 | 7 | 1 in 7 | 7 words |
| 7-13. | 7 | 28 | 7 | 1 in 10 | 7 adjacent words has number of letters evenly divisible by 7 |
| 14-17. | 1 | 1128 | 7^4 | 1 in 20 | letters, number, and place of nouns evenly divisible by 7 |
| 18-25. | 1 | 1 | 7^5 | 1 in 10,000 | 8 sets of first and last letters evenly divisible by 7 |
| 26-29. | 1 | 28 | 7^3 | 1 in 12 | place, even, and odd of first three words evenly divisible by 7 |
| 30-33. | 1 | 7 | 7^4 | 1 in 300 | 4 sets of digits evenly divisible by 7 |
| 34-37. | 4 | 12 | 7 | 1 in 12 | 4 of 12 combinations evenly divisible by 7 |