Hi,
Here is yet another fictional, useless, pure math, and science(factual and proof capable) based question. I was wondering the effects of particular situation as it relates to the card distribution. The situation is 8D, DAS, LS, perfect BS, full table, no play deviations and betting does not matter. My questions is how does the deck get affected after a shoe is played but BEFORE a shuffle. (Standard dealer sweep). I am not talking about bullsh** clumping theories. I am not interested in any type of advantages or disadvantages. This is all after the shoe is played but before the shuffle. The more detailed question is how many ten through Ace get clumped, in categories of either 2 or more or specifically broken down in 2, 3, or 4 etc groups. This is a mathmatical question though a modified sim could probably take care of it as well. I have researched around for info on this and have found bits and pieces but nothing overall. There is much to consider here and I could use some help please if anyone is interested.
There are a million things to consider. Some overall and already figured numbers could be used for some rough estimates but I think it would be nice to know the true figures. Now that I have thought it out more it is probably best to run a sim. (each run starting from a random shuffled shoe, so I am NOT asking about a cumulative effect of not shuffling or about the effect of randomness on clumping etc. etc.)
For an estimate you can figure A thru ten is 5 out of 13 cards so randomly you could expect certain % of 2 being together. The BJ triggered sweep would increase this slightly. Also even though it is a delayed sweep, a natural 2 card (non_Ace) twenty would still be put in shoe together also. So how often would those happen, on top of the random ones of two of them from ajoining hands ending up together? Is there any other nature of BS that would result in more or less beyond this? The real question is how or to what degree is the post shoe/preshuffle affected beyond this by playing BS.
Thanks in advance.
