What can we say about repeats? Dozens in 5 spins: we know that (excluding 0) it's more likely to result in 2 repeats:
11123
33222
That's more extreme than what I guessed as being most likely:
11223
Specifically we expect AT LEAST 2 repeats! Unfortunately, we can't say what will repeat, other than what Turbo said: only 1s can become 2s, etc.
However, we can predict WHEN a repeat will happen:
Spin 1: 1... we expect first repeat (1s > 2) to be on Spin 3
...
Spin 3: 122 = repeat as expected! We now expect the next 1s > 2 to happen on the next spin and the 2s to reach 3s (2nd repeat) on the 5th spin:
...
...
Spin 5: 12211 = 2nd repeat as expected!
Now did you hear this story from Dyksexlic?
28* Every morning, the SUN rises. We call this 'EVENT' -------> SUNRISE
29* Every evening, the SUN sets. We call this 'EVENT' --------> SUNSET
30* Sunrise and sunset are ALSO two OPPOSITES.
31* In the course of a day, at some places on our planet it is SUNRISE, and at the same time in ANOTHER place it is SUNSET
32* the sun is both, sunset and sunrise at the same time to two observers in two different places, but time is independent..
33* The two observers are still looking at the same 'EVENT'
34* sunset and sunrise are essentially the SAME 'EVENT' being simultaneously viewed from two different perspectives. "No man is an island..."
12211 - we expected on spin 3 (1s > 2) and spin 5 (2s > 3). On the spins in-between we expected 0s > 1.
2211 - what did we expect?
211 - what did we expect?
11 - what did we expect?
(link:s://s15.postimg.cc/us1ozqoe3/structures.gif)
Check this out Falkor.
Let's take 3 unique numbers.
123.
Now reverse them, as 321.
What do you get with the difference?
198.
Another 3.
654.
456.
198.
Cool, huh?
The difference is always a constant.