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REPEATS w/i A SEQUENCEThe repeats 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 repeats, the average of that number per sequence, number of single repeats in average and the latter accumulated, for all found repeats (2 - 3 - 4 etc). 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 counter. Every occurence of the outcome was counted in a sequence of spins (1 to 36 or to end-of-day/end-of-file if not 36). After this, all counters at 2 or more, were inserted into the table at the appropriate length and number of repeats and then reset before the next sequence was checked. Top of Page The longer the sequence to be checked is, the fewer there are in a day. This is why the total of investigated sequences is lower for long ones than for 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 such repeats was found, in total. 4th col shows the average such repeats per sequence. 5th col shows the average number of repeat occurrances. (This figure is Col 2 times Col 4) 6th col is the accumulated value from column five. Example: This is an excerpt from the Single Numbers table Lth Rep N o F NpSA OpSA AOpSA ---------------------------------------- 36 2 2198409 6.707 13.415 13.415 36 3 692196 2.112 6.336 19.750 ...The above should be read (second line): When investigating sequences of 36 spins there was exactly 3 repeats of a single number in 692196 cases. That is an average of 2.112 such cases (triplets) per investigated sequence. Because there are three repeats, this means that in average there are 6.336 repeated single numbers within 36 spins. This far there were, in average, 19.750 repeated single numbers (2 and 3 times, accumulated) found within 36 spins. | |
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