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WINNER REPEATSThe winning outcome can be any one of the single numbers, single or double streets, dozens, columns or the even chances. The answer is shown in the form of a table showing the number of found sequences with (or without) repeats where all repeats (or the absence of repeats) have its own line (also noted in % and accumulated values). Example (bottom of page) The complete tables were very long so they are shortened to show these lengths of sequences: 3, 6, 9, 12, 15, 18, 21, 24, 27, 30, 33 and 36 spins in all tables. Top of Page To make these tables, every outcome (0, 17, 5th double street, red etc) got its own 36 counters, one for each length to be checked. Having an outcome (spin), every occurence of it in the next 1 to 36 spins was counted by those "lenght-counters", depending of where in the checked sequence the repeat occured. That is; if the repeat was found in the first spin, all 36 counters were incremented but if it was found at the 36th spin, only the 36th counter was incremented. After this, all counters were inserted into the tables and reset. If the remaining sequence at any point (day's end for example) was not 36 spins, the counting was aborted after last spin and the counters up to and including that length was inserted into the table. The checking then continued, as described - with shorter and shorter sequences until there was no "future" spins left. As for the stats made in the section Wait for a Repeat there was no counting done until after an outcome occurred. Top of Page As none of the outcomes except the single numbers, can have a zero as a winner they have a lower total of checked sequences than the single numbers. Also; the longer the sequence to be checked is, the fewer there are in a day. This is why the total is lower for a long sequence than for a short. Top of Page The results are compiled into eight tables showing outcome types, as the figures for every single outcome within the groups are close to equal. One table for all Single Numbers One table for all Single Streets One table for all Double Streets One table for all Dozens One table for all Columns Low and High in one table Even and Odd in one table Red and Black in one table Top of Page The tables are pretty straight-forward to read: 1st col indicates the lenght of the checked sequence. 2nd col indicates the number of repeats within that sequence. 3rd col shows how many sequences there was found. 4th col shows the same figure in per cent of the total checked. 5th col is the accumulated number of sequences from column three. 6th col is the accumulated per centage from column four. Example: This is an excerpt from the Single Numbers table Lth Rpt N o S % o T AN o S A% o T ---------------------------------------- 18 1 110811 30.568 110811 30.568 18 2 26416 7.287 137227 37.855 18 3 3833 1.057 141060 38.913 ...The above should be read (third line): When investigating sequences of 18 spins after a previous winner, there was exactly 3 repeats of a winner in 3833 such sequences (or in 1.057% of all investigated such sequences). This far there was 141,060 18-spins sequences found (or 38.913% of all investigated 18-spins sequences) with 1, 2 or 3 repeats of a winner. | |
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