The following is a table of results, showing the six which will follow the sixes in the first column, in their three forms, by plain, bob and single, whether it is a quick or slow. It will be referred to as Table B.
Sixes in The numbers in Column 1 produce the numbers in the same Table A line shown below the Plain or Call which gives it by the DIRECT REVERSED Column By a Slow Six By a Quick Six By a Slow Six By a Quick Six Number Plain Bob Single P B S P B S P B S 1A 2C 10B 10A 2A 10C 10A 9B 10A 10B 14A 1C 1B 1B 2B 10A 10B 2C 10B 10B 14A 1C 1A 9C 10B 10B 1C 11B 1A 1C 11C 1B 1C 9C 10B 10A 9B 10A 10C 2A 7C 3A 12A 7A 3B 12A 1A 8A 11A 10C 13C 2B 2B 3A 6B 6C 3B 6C 6C 10C 13C 2A 1B 8B 11A 2C 6B 7C 5C 6C 7A 5C 1B 8B 11C 1A 8A 11B 3A 5A 4C 4C 5B 4A 4C 12C 5B 7A 2B 2A 13A 3B 8B 8C 11B 8C 8A 11B 2B 2A 13C 5A 6A 6B 3C 12A 5C 7C 12B 5A 7C 5A 6A 6A 12C 5B 7B 4A 12B 5A 7B 12C 5B 7B 7C 3A 12A 11B 11C 8C 4B 8A 8B 11C 8B 8C 11C 11B 11C 8B 4C 7B 5B 4C 4B 12A 3A 4C 12B 3A 4C 7B 5A 7C 3A 12B 5A 3B 6C 6B 3C 6A 6B 7B 3C 12B 3A 4A 4C 5B 7B 3C 12B 7C 3A 12B 3A 4A 4B 11C 11A 8B 5C 13B 13A 2C 13C 13B 2C 11C 11A 8A 7B 3C 12C 6A 7A 3B 12C 7B 3C 12C 12B 5A 7B 6B 12C 3C 6B 6A 7B 5A 6B 7C 5A 6B 12C 3B 2C 2B 13C 6C 13C 13B 2B 13A 13C 2B 2C 2B 13B 12B 5A 7C 7A 8C 8A 11A 8A 8B 11A 2A 2C 13A 6A 12B 3A 7B 5C 4B 4A 5A 4C 4A 6A 12B 3C 5B 6B 6A 7C 4C 12B 3C 4A 12C 3C 5B 6B 6C 2A 2C 13B 8A 9A 2C 13A 9B 2A 13A 7A 3B 12C 4B 7A 5C 8B 9C 2B 13B 9A 2C 13B 4B 7A 5B 3B 4B 4B 8C 14A 11B 8C 14B 11C 8C 3B 4B 4A 7A 3B 12A 9A 10C 9B 9A 10A 9C 9A 8B 14C 14B 8A 14B 14A 9B 1C 14C 14B 1A 14A 14B 8A 14B 14C 13C 9A 9C 9C 1B 14B 14C 1C 14C 14C 13C 9A 9B 8B 14C 14C 10A 11A 1C 1A 11B 1A 1A 9A 10C 10C 14C 1B 1C 10B 11C 1B 1B 11A 1C 1B 14C 1B 1B 14B 1A 1A 10C 2A 10C 10C 2B 10A 10C 14B 1A 1C 9A 10C 10A 11A 12C 5B 7A 12A 5C 7A 10B 13B 2B 10A 13A 2A 11B 4A 12C 3B 4B 12A 3B 10A 13A 2C 1C 8C 11C 11C 5B 4A 4B 5C 4B 4B 1C 8C 11B 10B 13B 2C 12A 13A 13C 2A 13B 13A 2A 11A 11B 8C 3C 4C 4A 12B 6C 7A 5B 6A 7B 5B 3C 4C 4C 4A 7C 5A 12C 3C 6A 6A 3A 6B 6A 4A 7C 5C 11A 11B 8A 13A 14C 11A 8A 14A 11B 8A 6C 12A 3A 12A 5C 7A 13B 14B 11C 8B 14C 11A 8B 12A 5C 7C 5C 6C 6C 13C 9B 2A 13C 9C 2B 13C 5C 6C 6B 6C 12A 3B 14A 1A 14A 14A 1B 14B 14A 13A 9B 9A 8C 14A 14B 14B 10B 9A 9B 10C 9B 9B 8C 14A 14A 13B 9C 9A 14C 10A 9C 9C 10B 9A 9C 13B 9C 9C 13A 9B 9B
It will be found that the posession of Tables A and B provides one with a most fascinating set of figures. The wonderful properties revealed by a careful study of them will more than repay anyone for their time and trouble. It is easily seen that the usefulness of RCEPs is manifold, and it has already been stated what the two Tables will do in Stedman Triples. In addition, they solved the difficulty of discovering peals of Erin Triples, and will show blocks of mixed sixes.
Proceeding now to set out what Table B will produce, it must be understood that the only proof needed of blocks of fourteen sixes is to see that no column number is repeated twice. This being so, the particular block will give sixty courses without fear of falseness. These sixty will, almost without exception, be found united into two, three or five fourteen-six blocks.
Note. - In the table, direct and reversed refers to each individual six. It will apply to whole blocks only if nosingles are used in their construction.
This page created by Philip Saddleton
Last updated 01/09/96