Greetings Etacarinae.
Thank you very much for sharing this system.
This system is going over heads i see.
Not sure if i am the only one who understands it, probably not, but i will say it's unique and i like it.
For the chance that i may help to elaborate, i will say this:
First part: With your last draw you add the first and second number, the first and third number, then the second and third number. This is the most simple part for most, i believe. 114 would become 255..
Second part: add this new number altogether to get a numerical singular. 2+5+5 = 12. At this part, the interest is in the second number, being 2.
Third part: Attach that 2 we are interested in to that new number from the first part: 2552 is the resulting number. Get your calculator ready and multiply 2552 by 369. 369 is a factor of this system, a prioritized number for the purpose of producing the number we need for part four. Your calculations should lead you to: 941,688.
Fourth part: This part is i believe most are getting stuck at. The aforementioned number (941,688) will be added one by one, and since theres no number above, you add nothing from above. So, adding left to right, with "lottery math" (second digit kept) you get 3 5 7 4 6.
At this part, it is crucial to add 9 and 4 together, (3), from top number, and add it to (3) from bottom number. You get 6. 4+1 (5) from top number, added to (5) from bottom number and you get 0.
SHould look like this as you continue:
9 4 1 6 8 8
3 5 7 4 6
6 0 4 8 2
4 2 5 8
0 6 7 8
6 3 0
2 9 5
1 2
2 6
5
Note: as you add, you will find that there comes a point where on the following lines, there's a number that seems left out. Fourth from the top8 for instance. 4+2+0 = 6, 2+5+6 = 3 , 5+8+7 = 0.. What about the 8 that's there? leave it. from the addition, you get 630 after 0678.
The final part, which is the simplest, is picking the numbers you would use as a selection: From last three rows, (12) (26) (5).. You get right first, left second, then remaining. 1(2), (2)6, (5).
Hopefully this helps someone to understand this system.
Once again, thank you very much for sharing it, love it.
Terciary Acacians, Assemble! :D
Oh, Punch me if i did something wrong here, hehe.