Linking your own trash thread doesn't validate your claims.
It is true that linking to his thread doesn't validate Stake's provably rigged in-house Black Jack.
But the thread contains proof and explanation why Stake's in-house Black Jack is rigged:
Info 1)The advertised house edge for Stake's in-house Black Jack is 0,5%, which means long-term I will lose 0,5% of all bets placed.
However, if you take a look at my Stake bets statistics here
https://ibb.co/Hxf8NpR you can see the following total numbers:
Bets: 180,904
Wins: 78,285
Losses: 86,612
If we reduce the number of wins from the number of losses, we can see that I lost 8,327 bets (86,612 minus 78,285 = 8,327)
Losing 8,327 bets out of 180,904 bets placed =
4,6% of the bets lost.
0,5% house edge out of 180,900 bets placed I should lose 900 bets + a possible small deviation.
8,327 bets lost - 900 bets I should lose =
7,427 bets too much lost.
Info 2)BetsAfter 180,900 bets, the maximal possible deviation is 0,4% from the expected outcome according to the law of large numbers (See Info 3) below).
180,000 bets x 0,4% = 720 bets I could maximal additionally lose on top of the 900 bets I will lose based on the 0,5% house edge.
7,427 bets too much lost minus 720 bets I can additionally maximal lose = 6,707 bets =
additional 9,3 times on top of the maximal possible deviation!
House edge0,5% house edge = 900 bets plus 720 bets maximal possible deviation = 80% additional maximal possible deviation from the house edge.
0,5% house edge plus 0,4% (80% additional maximal possible deviation) =
0,9% maximal possible experienced house edge!
Experienced house edge 4,6% minus 0,9% maximal possible experienced house edge = 3,7% additional experienced house edge!
3,7% additional experienced house edge : 0,4% additional maximal possible deviation =
additional 9,3 times on top of the maximal possible deviation!
Stake's own bets statistics is 100% proof that their in-house Black Jack system is rigged!Info 3)When the house edge is 0,5% and you placed 180,900 bets, you will lose 900 bets and the remaining 180,000 bets are coin flips.
The remaining 180,000 bets are coin flips, because you will win 50% = 90,000 bets and lose 50% = 90,000 bets.
Now let's take a look at the technically maximal possible deviation for 180,000 coin flips:
A) Standard deviation for 180,000 coin flips = 212 coin flips = 0,12% (In 68% of all attempts, the deviation is up to 0,12%)
B) 3 times standard deviation for 180,000 coin flips = 0,36% (In 99,7% of all attempts, the deviation is up to 0.36%)
What does 99,7% mean?
When you make 333 times a serie of 180,000 coin flips, then 332 times the deviation from the expected outcome will be up to 0,36% and
only one time the deviation will be higher than 0,36%.
I was not able to find how much the deviation could be in this one case where it is higher than 0,36%, but likely not more than 10% of the 0,36% =
0,4%.
