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"After several months of studying the Zhu Lu theory, I've discovered an interesting phenomenon. For every Big Road:
- When arranged in a 2-bead road, there are 2 different sequences.
- When arranged in a 3-bead road, there are 3 different sequences.
- When arranged in a 4-bead road, there are 4 different sequences.
- When arranged in an N-bead road, there are N different sequences.
What does this mean? It might not be clear at first, so let me provide an example. Let's assume B=1, P=2, and T is ignored for now. Suppose the Big Road follows this pattern:
12121212121212121212121212121212
It's quite extreme, isn't it? When arranged in a 2-bead road (BPBPBPBPBP...), if we remove the first bead, we get the exact opposite result:
21212121212121212121212121212121
It becomes PBPBPBPBPB... If we remove another bead, we return to the first scenario. So, for every Big Road:
- When arranged in a 2-bead road, there are 2 different sequences.
Let's take another example:
Big Road: 122122122122122122...
When arranged in a 3-bead road:
122, 122, 122, 122, 122, 122...
If we remove the first bead, it becomes:
221, 221, 221, 221, 221,...
Remove the first two beads, and it becomes:
212, 212, 212, 212, 212,...
Remove three beads, and we return to 122, 122, 122...
So, for every Big Road:
- When arranged in a 3-bead road, there are 3 different sequences.
Similarly, when arranged in an N-bead road, there are N different sequences. The significance of this is:
1. The starting point of each shoe, whether it's the first bead or starting from the second or third bead, results in different sequences in the 2-bead and 3-bead roads.
2. It provides the foundation for the versatility of betting in the Three Many Road theory.
3. In a single shoe, the sequences starting from the first bead might be ""Poor Road,"" while those starting from the second or third bead might be ""Very Good Road.""" |
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Post time 12-10-2023 12:38:07