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There are several widely adopted genealogical numbering systems for depicting a family tree or pedigree chart in text format. Example of family tree A family tree is generally the totality of ones ancestors, or more specifically, a chart used in genealogy to show the family connections between individuals, consisting of the individuals names (usually accompanied by dates, and often also places and occupations) connected by various types of...
Example pedigree chart A pedigree chart is a chart which tells you all of the known phenotypes for an organism and its ancestors, most commonly humans, show dogs, and race horses. ...
Ahnentafel
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Ahnentafel, also known as the Sosa-Stradonitz system, allows for the numbering of ancestors beginning with a descendant. The system allows one to derive an ancestor's number without compiling the list and allows one to derive an ancestor's relationship based on their number. An Ahnentafel (or Ahnenreihe), also known as the Sosa-Stradonitz System, is a list of a persons ancestors in a particular order. ...
An Ahnentafel (or Ahnenreihe), also known as the Sosa-Stradonitz System, is a list of a persons ancestors in a particular order. ...
The numbering is as follows:
1 self 2 father 3 mother 4 father's father 5 father's mother 6 mother's father 7 mother's mother 8 father's father's father 9 father's father's mother 10 father's mother's father 11 father's mother's mother 12 mother's father's father 13 mother's father's mother 14 mother's mother's father 15 mother's mother's mother
Register Numbering System The Register Numbering System uses both common numerals (1, 2, 3, 4) and Roman numerals (i, ii, iii, iv). Generations are grouped separately. Numerals sans-serif Arabic numerals, known formally as Hindu-Arabic numerals, and also known as Indian numerals, Hindu numerals, European numerals, and Western numerals, are the most common symbolic representation of numbers around the world. ...
The system of Roman numerals is a numeral system originating in ancient Rome, and was adapted from Etruscan numerals. ...
The system was created in 1870 for use in the New England Historic and Genealogical Register published by the the New England Historic Genealogical Society. Register Style, of which the numbering system is part, is one of two major styles used in the U.S. for compiling descending genealogies. (The other being the NGSQ style.)[1] The New England Historic Genealogical Society, also known as NEHGS, is the oldest and largest genealogical society in the United States. ...
NGSQ Numbering System The NGSQ Numbering System gets its name from the National Genealogical Society Quarterly, which uses the numbering system. It is sometimes called the Record System, or the Modified Register System because it derives from the Register Numbering System.
Henry Numbering System The Henry Numbering System is a descending system created by Reginald Buchanan Henry. The system begins with 1. The oldest child becomes 11, the next child is 12, and so on. The oldest child of 11 is 111, the next 112, and so on. The system allows one to derive an ancestor's relationship based on their number. For example, 621 is the first child of 62, who is the second child of 6, who is the sixth child of 1.
In the Henry system, when there are more than nine children, X is used for the 10th child, A is used for the 11th child, B is used for the 12th child, and so on. In the Modified Henry system, when there are more than nine children, numbers greater than nine are placed in parentheses.
Henry Modified Henry 1. Progenitor 1. Progenitor 11. Child 11. Child 111. Grandchild 111. Grandchild 112. Grandchild 112. Grandchild 12. Child 12. Child 121. Grandchild 121. Grandchild 122. Grandchild 122. Grandchild 123. Grandchild 123. Grandchild 124. Grandchild 124. Grandchild 125. Grandchild 125. Grandchild 126. Grandchild 126. Grandchild 127. Grandchild 127. Grandchild 128. Grandchild 128. Grandchild 129. Grandchild 129. Grandchild 12X. Grandchild 12(10). Grandchild
d'Aboville System d'Aboville is a descending system very similar to the Henry system. It differs in that periods are used to separate the generations and no changes in numbering are needed for families with more than nine children.[2] For example: 1 Progenitor 1.1 Child 1.1.1 Grandchild 1.1.2 Grandchild 1.2 Child 1.2.1 Grandchild 1.2.2 Grandchild 1.2.3 Grandchild 1.2.4 Grandchild 1.2.5 Grandchild 1.2.6 Grandchild 1.2.7 Grandchild 1.2.8 Grandchild 1.2.9 Grandchild 1.2.10 Grandchild This system was developed by Count Jacques d'Aboville in 1940 and is widely used in France.[3]
de Villiers/Pama System The de Villiers/Pama System gives letters to generations, and then numbers children in birth order. Therefore c4 is the fourth grandchild and d3 is the third great grandchild. For example: a Progenitor b1 Child c1 Grandchild d1 Great grandchild d2 Great grandchild c2 Grandchild c3 Grandchild b2 Child c1 Grandchild c2 Grandchild c3 Grandchild The de Villiers/Pama system is the standard for genealogical works in South Africa. It was developed in the 19th century by Christoffel Coetzee de Villiers and used in his three volume Geslachtregister der Oude Kaapsche Familien (Genealogies of Old Cape Families). The system was refined by Dr. Cornelis (Cor) Pama, one of the founding members of the Genealogical Society of South Africa.[4]
Notes - ^ Curran, Joan Ferris, Madilyn Coen Crane, and John H.Wray.Numbering Your Genealogy: Basic Systems, Complex Families, and International Kin. Arlington, Virginia: National Genealogical Society, 1999.
- ^ Encyclopedia of Genealogy: d'Aboville Numbers
- ^ Les systèmes de numérotation (Numbering Systems)
- ^ Genealogical Society of South Africa
References
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