A **binary code** represents text, computer processor instructions, or any other data using a two-symbol system. The two-symbol system used is often "0" and "1" from the binary number system. The binary code assigns a pattern of binary digits, also known as bits, to each character, instruction, etc. For example, a binary string of eight bits can represent any of 256 possible values and can, therefore, represent a wide variety of different items.

In computing and telecommunications, binary codes are used for various methods of encoding data, such as character strings, into bit strings. Those methods may use fixed-width or variable-width strings. In a fixed-width binary code, each letter, digit, or other character is represented by a bit string of the same length; that bit string, interpreted as a binary number, is usually displayed in code tables in octal, decimal or hexadecimal notation. There are many character sets and many character encodings for them.

A bit string, interpreted as a binary number, can be translated into a decimal number. For example, the lower case *a*, if represented by the bit string `01100001`

(as it is in the standard ASCII code), can also be represented as the decimal number "97".

## History of binary codes

The modern binary number system, the basis for binary code, was invented by Gottfried Leibniz in 1689 and appears in his article *Explication de l'Arithmétique Binaire*. The full title is translated into English as the "Explanation of the binary arithmetic", which uses only the characters 1 and 0, with some remarks on its usefulness, and on the light it throws on the ancient Chinese figures of Fu Xi.^{[1]} Leibniz's system uses 0 and 1, like the modern binary numeral system. Leibniz encountered the *I Ching* through French Jesuit Joachim Bouvet and noted with fascination how its hexagrams correspond to the binary numbers from 0 to 111111, and concluded that this mapping was evidence of major Chinese accomplishments in the sort of philosophical visual binary mathematics he admired.^{[2]}^{[3]} Leibniz saw the hexagrams as an affirmation of the universality of his own religious belief.^{[3]}

Binary numerals were central to Leibniz's theology. He believed that binary numbers were symbolic of the Christian idea of *creatio ex nihilo* or creation out of nothing.^{[4]} Leibniz was trying to find a system that converts logic verbal statements into a pure mathematical one^{[citation needed]}. After his ideas were ignored, he came across a classic Chinese text called *I Ching* or ‘Book of Changes’, which used 64 hexagrams of six-bit visual binary code. The book had confirmed his theory that life could be simplified or reduced down to a series of straightforward propositions. He created a system consisting of rows of zeros and ones. During this time period, Leibniz had not yet found a use for this system.^{[5]}

Binary systems predating Leibniz also existed in the ancient world. The aforementioned *I Ching* that Leibniz encountered dates from the 9th century BC in China.^{[6]} The binary system of the *I Ching*, a text for divination, is based on the duality of yin and yang.^{[7]} Slit drums with binary tones are used to encode messages across Africa and Asia.^{[7]} The Indian scholar Pingala (around 5th–2nd centuries BC) developed a binary system for describing prosody in his Chandashutram.^{[8]}^{[9]}

The residents of the island of Mangareva in French Polynesia were using a hybrid binary-decimal system before 1450.^{[10]} In the 11th century, scholar and philosopher Shao Yong developed a method for arranging the hexagrams which corresponds, albeit unintentionally, to the sequence 0 to 63, as represented in binary, with yin as 0, yang as 1 and the least significant bit on top. The ordering is also the lexicographical order on sextuples of elements chosen from a two-element set.^{[11]}

In 1605 Francis Bacon discussed a system whereby letters of the alphabet could be reduced to sequences of binary digits, which could then be encoded as scarcely visible variations in the font in any random text.^{[12]} Importantly for the general theory of binary encoding, he added that this method could be used with any objects at all: "provided those objects be capable of a twofold difference only; as by Bells, by Trumpets, by Lights and Torches, by the report of Muskets, and any instruments of like nature".^{[12]}

George Boole published a paper in 1847 called 'The Mathematical Analysis of Logic' that describes an algebraic system of logic, now known as Boolean algebra. Boole's system was based on binary, a yes-no, on-off approach that consisted of the three most basic operations: AND, OR, and NOT.^{[13]} This system was not put into use until a graduate student from Massachusetts Institute of Technology, Claude Shannon, noticed that the Boolean algebra he learned was similar to an electric circuit. Shannon wrote his thesis in 1937, which implemented his findings. Shannon's thesis became a starting point for the use of the binary code in practical applications such as computers, electric circuits, and more.^{[14]}

## Other forms of binary code

The bit string is not the only type of binary code: in fact, a binary system in general, is any system that allows only two choices such as a switch in an electronic system or a simple true or false test.

### Braille

Braille is a type of binary code that is widely used by the blind to read and write by touch, named for its creator, Louis Braille. This system consists of grids of six dots each, three per column, in which each dot has two states: raised or not raised. The different combinations of raised and flattened dots are capable of representing all letters, numbers, and punctuation signs.

### Bagua

The *bagua* are diagrams used in *feng shui,* Taoist cosmology and *I Ching* studies. The *ba gua* consists of 8 trigrams; *bā* meaning 8 and *guà* meaning divination figure. The same word is used for the 64 guà (hexagrams). Each figure combines three lines (*yáo*) that are either broken (*yin*) or unbroken (*yang*). The relationships between the trigrams are represented in two arrangements, the primordial, "Earlier Heaven" or "Fuxi" *bagua*, and the manifested, "Later Heaven,"or "King Wen" *bagua.*^{[15]} (See also, the King Wen sequence of the 64 hexagrams).

### Ifá, Ilm Al-Raml and Geomancy

The Ifá/Ifé system of divination in African religions, such as of Yoruba, Igbo, Ewe, consists of an elaborate traditional ceremony producing 256 oracles made up by 16 symbols with 256 = 16 x 16. An initiated priest "babalowo" who had memorized oracles, would request sacrifice from consulting clients and make prayers. Then, divination nuts or a pair of chains are used to produce random binary numbers, which are drawn with sandy material on an "Opun" figured wooden tray representing the totality of fate.

Through the spread of Islamic culture, Ifé/Ifá was assimilated as the "Science of Sand" (ilm al-raml), which then spread further and became "Science of Reading the Signs on the Ground" (Geomancy) in Europe.

This was thought to be another possible route from which computer science was inspired,^{[16]} as Geomancy arrived at Europe at an earlier stage (about 12th Century, described by Hugh of Santalla) than I Ching (17th Century, described by Gottfried Wilhelm Leibniz).

## Coding systems

### ASCII code

The American Standard Code for Information Interchange (ASCII), uses a 7-bit binary code to represent text and other characters within computers, communications equipment, and other devices. Each letter or symbol is assigned a number from 0 to 127. For example, lowercase "a" is represented by `1100001`

as a bit string (which is "97" in decimal).

### Binary-coded decimal

Binary-coded decimal (BCD) is a binary encoded representation of integer values that uses a 4-bit nibble to encode decimal digits. Four binary bits can encode up to 16 distinct values; but, in BCD-encoded numbers, only ten values in each nibble are legal, and encode the decimal digits zero, through nine. The remaining six values are illegal and may cause either a machine exception or unspecified behavior, depending on the computer implementation of BCD arithmetic.

BCD arithmetic is sometimes preferred to floating-point numeric formats in commercial and financial applications where the complex rounding behaviors of floating-point numbers is inappropriate.^{[17]}

## Early uses of binary codes

- 1875: Émile Baudot "Addition of binary strings in his ciphering system," which, eventually, led to the ASCII of today.
- 1884: The Linotype machine where the matrices are sorted to their corresponding channels after use by a binary-coded slide rail.
- 1932: C. E. Wynn-Williams "Scale of Two" counter
^{[18]} - 1937: Alan Turing electro-mechanical binary multiplier
- 1937: George Stibitz "excess three" code in the Complex Computer
^{[18]} - 1937: Atanasoff–Berry Computer
^{[18]} - 1938: Konrad Zuse Z1

## Current uses of binary

Most modern computers use binary encoding for instructions and data. CDs, DVDs, and Blu-ray Discs represent sound and video digitally in binary form. Telephone calls are carried digitally on long-distance and mobile phone networks using pulse-code modulation, and on voice over IP networks.

## Weight of binary codes

The weight of a binary code, as defined in the table of constant-weight codes,^{[19]} is the Hamming weight of the binary words coding for the represented words or sequences.

## See also

## References

**^**Leibniz G., Explication de l'Arithmétique Binaire, Die Mathematische Schriften, ed. C. Gerhardt, Berlin 1879, vol.7, p.223; Engl. transl.[1]**^**Aiton, Eric J. (1985).*Leibniz: A Biography*. Taylor & Francis. pp. 245–8. ISBN 978-0-85274-470-3.- ^
^{a}^{b}J.E.H. Smith (2008).*Leibniz: What Kind of Rationalist?: What Kind of Rationalist?*. Springer. p. 415. ISBN 978-1-4020-8668-7. **^**Yuen-Ting Lai (1998).*Leibniz, Mysticism and Religion*. Springer. pp. 149–150. ISBN 978-0-7923-5223-5.**^**"Gottfried Wilhelm Leibniz (1646 - 1716)".*www.kerryr.net*.**^**Edward Hacker; Steve Moore; Lorraine Patsco (2002).*I Ching: An Annotated Bibliography*. Routledge. p. 13. ISBN 978-0-415-93969-0.- ^
^{a}^{b}Jonathan Shectman (2003).*Groundbreaking Scientific Experiments, Inventions, and Discoveries of the 18th Century*. Greenwood Publishing. p. 29. ISBN 978-0-313-32015-6. **^**Sanchez, Julio; Canton, Maria P. (2007).*Microcontroller programming: the microchip PIC*. Boca Raton, Florida: CRC Press. p. 37. ISBN 978-0-8493-7189-9.**^**W. S. Anglin and J. Lambek,*The Heritage of Thales*, Springer, 1995, ISBN 0-387-94544-X**^**Bender, Andrea; Beller, Sieghard (16 December 2013). "Mangarevan invention of binary steps for easier calculation".*Proceedings of the National Academy of Sciences*.**111**(4): 1322–1327. doi:10.1073/pnas.1309160110. PMC 3910603. PMID 24344278.**^**Ryan, James A. (January 1996). "Leibniz' Binary System and Shao Yong's "Yijing"".*Philosophy East and West*.**46**(1): 59–90. doi:10.2307/1399337. JSTOR 1399337.- ^
^{a}^{b}Bacon, Francis (1605). "The Advancement of Learning". London. pp. Chapter 1. **^**"What's So Logical About Boolean Algebra?".*www.kerryr.net*.**^**"Claude Shannon (1916 - 2001)".*www.kerryr.net*.**^**Wilhelm, Richard (1950).*The I Ching or Book of Changes*. trans. by Cary F. Baynes, foreword by C. G. Jung, preface to 3rd ed. by Hellmut Wilhelm (1967). Princeton, NJ: Princeton University Press. pp. 266, 269. ISBN 978-0-691-09750-3.**^**Eglash, Ron (June 2007). "The fractals at the heart of African designs".*www.ted.com*. Retrieved 2021-04-15.**^**Cowlishaw, Mike F. (2015) [1981,2008]. "General Decimal Arithmetic". IBM. Retrieved 2016-01-02.- ^
^{a}^{b}^{c}Glaser 1971 **^**Table of Constant Weight Binary Codes

## External links

- Sir Francis Bacon's BiLiteral Cypher system, predates binary number system.
- Weisstein, Eric W. "Error-Correcting Code".
*MathWorld*. - Table of general binary codes. An updated version of the tables of bounds for small general binary codes given in M.R. Best; A.E. Brouwer; F.J. MacWilliams; A.M. Odlyzko; N.J.A. Sloane (1978), "Bounds for Binary Codes of Length Less than 25",
*IEEE Trans. Inf. Theory*,**24**: 81–93, CiteSeerX 10.1.1.391.9930, doi:10.1109/tit.1978.1055827. - Table of Nonlinear Binary Codes. Maintained by Simon Litsyn, E. M. Rains, and N. J. A. Sloane. Updated until 1999.
- Glaser, Anton (1971). "Chapter VII Applications to Computers".
*History of Binary and other Nondecimal Numeration*. Tomash. ISBN 978-0-938228-00-4. cites some pre-ENIAC milestones.