novel faro relationships\nintroducing mathematical language and some properties
- basic terminology and operations
- for a 52 card deck only
- for a 51 card deck only\nmurray bonfeld
1977
Murray Bonfeld
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Novel Faro Relationships
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2
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in and out terminology\n\nalex elmsley
1977
Alex Elmsley
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In and Out Terminology
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2
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faro functions\nfurther notations and properties\nmurray bonfeld
1977
Murray Bonfeld
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Faro Functions
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8
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even number of cards\nrelationships for decks with 2n cards\nmurray bonfeld
1977
Murray Bonfeld
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Even Number Of Cards
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8
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faro shuffle recycling table\nrequired number of in and out shuffles listed for a deck with two to 52 cards\nmurray bonfeld
1977
Murray Bonfeld
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Faro Shuffle Recycling Table
|
10
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up and down faro system\nturning one half over before faro shuffling them together and how it affects the recycling properties\nmurray bonfeld
1977
Murray Bonfeld
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Up And Down Faro System
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11
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unit shuffles\n\nmurray bonfeld\nthe theoretical faro\nkarl fulves
1977
Murray Bonfeld
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Unit Shuffles
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Related to |
11
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multiples of four\nrelationships for decks with 4n cards\nmurray bonfeld
1977
Murray Bonfeld
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Multiples Of Four
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12
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odd numbers of cards\nrelationships for decks with 2n-1 cards\nmurray bonfeld
1977
Murray Bonfeld
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Odd Numbers Of Cards
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13
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unit restorations\n\nmurray bonfeld\nthe theoretical faro\nkarl fulves
1977
Murray Bonfeld
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Unit Restorations
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Related to |
16
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the 32-card deck: an analysis\ntwenty properties and relationships for a deck with 32 cards, some things also hold for a deck with 2<sup>n</sup> cards\nmurray bonfeld
1977
Murray Bonfeld
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The 32-Card Deck: An Analysis
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18
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the principle of internal shuffling\nfollowing groups and belts within a 52-card deck and how they behave under variations of in- and out-shuffles
- controlling 16 cards among 52
- controlling 10 cards among 52
- controlling 8 cards among 52
- inshuffle groups
- odd deck technique\nmurray bonfeld\nother forms of the transposition\nkarl fulves\n(2) primitive cycles\nkarl fulves
1977
Murray Bonfeld
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The Principle of Internal Shuffling
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Related to |
27
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placement for thirds\nfaro shuffle that distributes a group three cards apart, e.g. the spades then lie sxxsxxsxx..., not a perfect tripe faro\nmurray bonfeld
1977
Murray Bonfeld
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Placement For Thirds
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31
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sympathetic perception\nfive (mental) selections, deck shuffled and dealt into three piles, all selections end up in one pile\nmurray bonfeld
1977
Murray Bonfeld
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Sympathetic Perception
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32
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thirteen reverse\nspades are ordered but distributed in deck, their order is reversed with faro shuffles\nmurray bonfeld
1977
Murray Bonfeld
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Thirteen Reverse
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33
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shuffled interchange\ntwo spade cards are named, their position in the deck is transposed with faros\nmurray bonfeld
1977
Murray Bonfeld
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Shuffled Interchange
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34
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any card, any number - the first system\nshuffling card from position x to the top in odd deck, modified in-faro for even deck that ignored bottom card, reverse method for alex elmsley's binary translocation no. 1\nmurray bonfeld\nbeginning again\nwilliam zavis\nbinary translocations\nalex elmsley
1977
Murray Bonfeld
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Any Card, Any Number - The First System
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Inspired byRelated to |
41
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any card, any number - the second system\nbringing a card from position x to y with faro shuffling, odd deck, with even deck modified in-faro is required that ignores top card, generalization of alex elmsley's binary translocations\nmurray bonfeld\nbinary translocations\nalex elmsley
1977
Murray Bonfeld
|
Any Card, Any Number - The Second System
|
Related to |
42
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principles and routines\napplications\nmurray bonfeld\nalex elmsley\npenelope's principle\nalex elmsley
1977
Murray Bonfeld, Alex Elmsley
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Principles and Routines
|
Inspired by |
48
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cut coincidence\nselection is found at number specified by amount of cut-off cards, penelope's principle, faro\nmurray bonfeld
1977
Murray Bonfeld
|
Cut Coincidence
|
48
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more power of thought\nstay stack, faro, penelope's principle\nmurray bonfeld
1977
Murray Bonfeld
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More Power Of Thought
|
48
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column correspondence\nfaro, penelope's principle\nmurray bonfeld
1977
Murray Bonfeld
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Column Correspondence
|
49
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penelope's principle as a force\nfaro\nkarl fulves\nalex elmsley
1977
Karl Fulves, Alex Elmsley
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Penelope's Principle as a Force
|
49
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caught card #1001\nfaro, penelope's principle\nmurray bonfeld
1977
Murray Bonfeld
|
Caught Card #1001
|
50
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double coincidence\nfinding mates ala power of thought, then the other two mates as well, faro, penelope's principle, full deck stack\nmurray bonfeld
1977
Murray Bonfeld
|
Double Coincidence
|
50
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|
more theorems\nrelationships when faros are combined with cuts in even deck
- cuts and faros combined
- shuffle theorems\nmurray bonfeld
1977
Murray Bonfeld
|
More Theorems
|
52
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