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*{{Cite book |last1=Radford |first1=Luis |last2=Schubring |first2=Gert |last3=Seeger |first3=Falk |year=2008 |title=Semiotics in Mathematics Education: Epistemology, History, Classroom, and Culture |series=Semiotic Perspectives in the Teaching and Learning of Math Series |volume=1 |publisher=Sense Publishers |editor-last=Kaiser|editor-first=Gabriele |location=Netherlands |isbn=978-9087905972 | contributor-last = Schubring | contributor-first = Gert|contribution=Processes of Algebraization}} |
*{{Cite book |last1=Radford |first1=Luis |last2=Schubring |first2=Gert |last3=Seeger |first3=Falk |year=2008 |title=Semiotics in Mathematics Education: Epistemology, History, Classroom, and Culture |series=Semiotic Perspectives in the Teaching and Learning of Math Series |volume=1 |publisher=Sense Publishers |editor-last=Kaiser|editor-first=Gabriele |location=Netherlands |isbn=978-9087905972 | contributor-last = Schubring | contributor-first = Gert|contribution=Processes of Algebraization}} |
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*{{cite encyclopedia |title= Number Symbolism |encyclopedia=Brittanica |year= 2024|last=Stewart |first=Ian |url= https://www.britannica.com/topic/number-symbolism |access-date=2024-08-21}} |
*{{cite encyclopedia |title= Number Symbolism |encyclopedia=Brittanica |year= 2024|last=Stewart |first=Ian |url= https://www.britannica.com/topic/number-symbolism |access-date=2024-08-21}} |
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*{{Cite book |first1=Chris |last1=Woodford |author1-link=Chris Woodford (author) |url={{GBurl|id=My7Zr0aP2L8C|p=9}} |title=Digital Technology |date=2006 |publisher=Evans Brothers |isbn=978-0-237-52725- |
*{{Cite book |first1=Chris |last1=Woodford |author1-link=Chris Woodford (author) |url={{GBurl|id=My7Zr0aP2L8C|p=9}} |title=Digital Technology |date=2006 |publisher=Evans Brothers |isbn=978-0-237-52725-9 |access-date=2016-03-24 }} |
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Revision as of 13:56, 28 September 2024
1 (one, unit, unity) is a number, numeral, and glyph. 1 is the first and smallest positive integer of the infinite sequence of natural numbers. This fundamental property has led to its unique uses in other fields, ranging from science to sports, where it commonly denotes the first, leading, or top thing in a group. 1 is the unit of counting or measurement, a determiner for singular nouns, and a gender-neutral pronoun. Historically, the representation of 1 evolved from ancient Sumerian and Babylonian symbols to the modern Arabic numeral.
In mathematics, 1 is the multiplicative identity, meaning that any number multiplied by 1 equals the same number. 1 is by convention not considered a prime number. In digital technology, 1 represents the "on" state in binary code, the foundation of computing. Philosophically, 1 symbolizes the ultimate reality or source of existence in various traditions.
In mathematics
The number 1 is the first natural number after 0. Each natural number, including 1, is constructed by succession, that is, by adding 1 to the previous natural number. The number 1 is the multiplicative identity of the integers, real numbers, and complex numbers, that is, any number multiplied by 1 remains unchanged (). As a result, the square (), square root (), and any other power of 1 is always equal to 1 itself.[1] 1 is its own factorial (), and 0! is also one 1. These are a special case of the empty product.[2] Although 1 meets the naïve definition of a prime number, being evenly divisible only by 1 and itself (also 1), by modern convention it is regarded as neither a prime nor a composite number.[3]
Different mathematical constructions of the natural numbers represent 1 in various ways. In Giuseppe Peano's original formulation of the Peano axioms, a set of postulates to define the natural numbers in a precise and logical way, 1 was treated as the starting point of the sequence of natural numbers.[4][5] Peano later revised his axioms to begin the sequence with 0.[4][6] In the Von Neumann cardinal assignment of natural numbers, where each number is defined as a set that contains all numbers before it, 1 is represented as the singleton , a set containing only the element 0.[7] The unary numeral system, as used in tallying, is an example of a "base-1" number system, since only one mark – the tally itself – is needed. While this is the simplest way to represent the natural numbers, base-1 is rarely used as a practical base for counting due to its difficult readability.[8][9]
In many mathematical and engineering problems, numeric values are typically normalized to fall within the unit interval from 0 to 1, where 1 usually represents the maximum possible value in the range of parameters. For example, by definition, 1 is the probability of an event that is absolutely or almost certain to occur.[10] Likewise, vectors are often normalized into unit vectors (i.e., vectors of magnitude one), because these often have more desirable properties. Functions, are often normalized by the condition that they have integral one, maximum value one, or square integral one, depending on the application.[11]
1 is the value of Legendre's constant, introduced in 1808 by Adrien-Marie Legendre to express the asymptotic behavior of the prime-counting function.[12] The Weil's conjecture on Tamagawa numbers states that the Tamagawa number , a geometrical measure of a connected linear algebraic group over a global number field, is 1 for all simply connected groups (those that are path-connected with no 'holes').[13][14] 1 is the most common leading digit in many sets of real-world numerical data. This is a consequence of Benford’s law, which states that the probability for a specific leading digit is . The tendency for real-world numbers to grow exponentially or logarithmically biases the distribution towards smaller leading digits, with 1 occurring approximately 30% of the time.[15]
As a word
Etymology
One originates from the Old English word an, derived from the Germanic root *ainaz, from the Proto-Indo-European root *oi-no- (meaning "one, unique").[16]
Modern usage
Linguistically, one is a cardinal number used for counting and expressing the number of items in a collection of things.[17] One is most commonly a determiner used with singular countable nouns, as in one day at a time.[18] The determiner has two senses: numerical one (I have one apple) and singulative one (one day I'll do it).[19]
One is also a gender-neutral pronoun used to refer to an unspecified person or to people in general as in one should take care of oneself.[20]
Words that derive their meaning from one include alone, which signifies all one in the sense of being by oneself, none meaning not one, once denoting one time, and atone meaning to become at one with the someone. Combining alone with only (implying one-like) leads to lonely, conveying a sense of solitude.[21] Other common numeral prefixes for the number 1 include uni- (e.g., unicycle, universe, unicorn), sol- (e.g., solo dance), derived from Latin, or mono- (e.g., monorail, monogamy, monopoly) derived from Greek.[22][23]
Symbols and representation
History
Among the earliest known record of a numeral system, is the Sumerian decimal-sexagesimal system on clay tablets dating from the first half of the third millennium BCE.[24] The Archaic Sumerian numerals for 1 and 60 both consisted of horizontal semi-circular symbols.[25] By c. 2350 BCE, the older Sumerian curviform numerals were replaced with cuneiform symbols, with 1 and 60 both represented by the same symbol . The Sumerian cuneiform system is a direct ancestor to the Eblaite and Assyro-Babylonian Semitic cuneiform decimal systems.[26] Surviving Babylonian documents date mostly from Old Babylonian (c. 1500 BCE) and the Seleucid (c. 300 BCE) eras.[24] The Babylonian cuneiform script notation for numbers used the same symbol for 1 and 60 as in the Sumerian system.[27]
The most commonly used glyph in the modern Western world to represent the number 1 is the Arabic numeral, a vertical line, often with a serif at the top and sometimes a short horizontal line at the bottom. It can be traced back to the Brahmic script of ancient India, as represented by Ashoka as a simple vertical line in his Edicts of Ashoka in c. 250 BCE.[28] This script's numeral shapes were transmitted to Europe via the Maghreb and Al-Andalus during the Middle Ages [29] The Arabic numeral, and other glyphs used to represent the number one (e.g., Roman numeral (I ), Chinese numeral (一)) are logograms. These symbols directly represent the concept of 'one' without breaking it down into phonetic components.[30]
Modern typefaces
In modern typefaces, the shape of the character for the digit 1 is typically typeset as a lining figure with an ascender, such that the digit is the same height and width as a capital letter. However, in typefaces with text figures (also known as Old style numerals or non-lining figures), the glyph usually is of x-height and designed to follow the rhythm of the lowercase, as, for example, in .[31] In old-style typefaces (e.g., Hoefler Text), the typeface for numeral 1 resembles a small caps version of I, featuring parallel serifs at the top and bottom, while the capital I retains a full-height form. This is a relic from the Roman numerals system where I represents 1.[32] Many older typewriters do not have dedicated key for the numeral 1, requiring the use of the lowercase letter l or uppercase I as substitutes.[33][34][35][36]
The lower case "j" can be considered a swash variant of a lower-case Roman numeral "i", often employed for the final i of a "lower-case" Roman numeral. It is also possible to find historic examples of the use of j or J as a substitute for the Arabic numeral 1.[37][38][39][40] In some countries, the serif at the top may be extended into a long upstroke as long as the vertical line. This variation can lead to confusion with the glyph used for seven in other countries and so to provide a visual distinction between the two the digit 7 may be written with a horizontal stroke through the vertical line.[41]
In other fields
Computer science
In digital technology, data is represented by binary code, i.e., a base-2 numeral system with numbers represented by a sequence of 1s and 0s. Digitised data is represented in physical devices, such as computers, as pulses of electricity through switching devices such as transistors or logic gates where "1" represents the value for "on". As such, the numerical value of true is equal to 1 in many programming languages.[42][43] In lambda calculus and computability theory, natural numbers are represented by Church encoding as functions, where the Church numeral for 1 is represented by the function applied to an argument once (1).[44]
Physics
Dimensionless quantities are also known as 'quantities of dimension one'.[45] In physics, selected physical constants are set to 1 in natural unit systems in order to simplify the form of equations; for example, in Planck units the speed of light equals 1.[46] In quantum mechanics, the normalization condition for wavefunctions requires the integral of a wavefunction's squared modulus to be equal to 1.[47]
Chemistry
Hydrogen, the first element of the periodic table and the most abundant element in the known universe, has an atomic number of 1. Group 1 of the periodic table consists of hydrogen and the alkali metals.[48]
Philosophy and religion
The number 1 is commonly regarded as a symbol of unity, often representing God or the universe in monotheistic traditions.[49] The Pythagoreans considered the numbers to be plural and therefore did not classify 1 itself as a number, but as the origin of all numbers. In their number philosophy, where odd numbers were considered male and even numbers female, 1 was considered neutral capable of transforming even numbers to odd and vice versa by addition.[49] The Neopythagorean philosopher Nicomachus of Gerasa's number treatise, as recovered by Boethius in the Latin translation Introduction to Arithmetic, affirmed that one is not a number, but the source of number.[50] In the philosophy of Plotinus (and that of other neoplatonists), 'The One' is the ultimate reality and source of all existence.[51] Philo of Alexandria (20 BC – AD 50) regarded the number one as God's number, and the basis for all numbers. [52]
See also
References
- ^ Colman 1912, pp. 9–10, chapt.2.
- ^ Graham, Knuth & Patashnik 1994, p. 111.
- ^ Caldwell & Xiong 2012, pp. 8–9.
- ^ a b Kennedy 1974, pp. 389.
- ^ Peano 1889, p. 1.
- ^ Peano 1908, p. 27.
- ^ Halmos 1974, p. 32.
- ^ Hodges 2009, p. 14.
- ^ Hext 1990.
- ^ Graham, Knuth & Patashnik 1994, p. 381.
- ^ Blokhintsev 2012, p. 35.
- ^ Pintz 1980, pp. 733–735.
- ^ Gaitsgory & Lurie 2019, pp. 204–307.
- ^ Kottwitz 1988.
- ^ Miller 2015, pp. 3–4.
- ^ "Online Etymology Dictionary". etymonline.com. Douglas Harper. Archived from the original on 2013-12-30. Retrieved 2013-12-30.
- ^ Hurford 1994, pp. 23–24.
- ^ Huddleston, Pullum & Reynolds 2022, p. 117.
- ^ Huddleston & Pullum 2002, pp. 386.
- ^ Huddleston & Pullum 2002, p. 426-427.
- ^ Conway & Guy 1996, pp. 3–4.
- ^ Chrisomalis, Stephen. "Numerical Adjectives, Greek and Latin Number Prefixes". The Phrontistery. Archived from the original on 2022-01-29. Retrieved 2022-02-24.
- ^ Conway & Guy 1996, p. 4.
- ^ a b Conway & Guy 1996, p. 17.
- ^ Chrisomalis 2010, p. 241.
- ^ Chrisomalis 2010, p. 244.
- ^ Chrisomalis 2010, p. 249.
- ^ Acharya, Eka Ratna (2018). "Evidences of Hierarchy of Brahmi Numeral System". Journal of the Institute of Engineering. 14: 136–142. doi:10.3126/jie.v14i1.20077.
- ^ Schubring 2008, pp. 147.
- ^ Crystal 2008, pp. 289.
- ^ Cullen 2007, p. 93.
- ^ "Fonts by Hoefler&Co". www.typography.com. Retrieved 2023-11-21.
- ^ "Why Old Typewriters Lack A "1" Key". Post Haste Telegraph Company. April 2, 2017.
- ^ Polt 2015, pp. 203.
- ^ Chicago 1993, pp. 52.
- ^ Guastello 2023, pp. 453.
- ^ Köhler, Christian (November 23, 1693). "Der allzeitfertige Rechenmeister" – via Google Books.
- ^ "Naeuw-keurig reys-boek: bysonderlijk dienstig voor kooplieden, en reysende persoonen, sijnde een trysoor voor den koophandel, in sigh begrijpende alle maate, en gewighte, Boekhouden, Wissel, Asseurantie ... : vorders hoe men ... kan reysen ... door Neederlandt, Duytschlandt, Vrankryk, Spanjen, Portugael en Italiën ..." by Jan ten Hoorn. November 23, 1679 – via Google Books.
- ^ "Articvli Defensionales Peremptoriales & Elisivi, Bvrgermaister vnd Raths zu Nürmberg, Contra Brandenburg, In causa die Fraiszlich Obrigkait [et]c: Produ. 7. Feb. Anno [et]c. 33". Heußler. November 23, 1586 – via Google Books.
- ^ August (Herzog), Braunschweig-Lüneburg (November 23, 1624). "Gustavi Seleni Cryptomenytices Et Cryptographiae Libri IX.: In quibus & planißima Steganographiae a Johanne Trithemio ... magice & aenigmatice olim conscriptae, Enodatio traditur; Inspersis ubique Authoris ac Aliorum, non contemnendis inventis". Johann & Heinrich Stern – via Google Books.
- ^ Huber & Headrick 1999, pp. 181.
- ^ Woodford 2006.
- ^ Godbole 2002, p. 34.
- ^ Hindley & Seldin 2008, p. 48.
- ^ Mills 1995, pp. 538–539.
- ^ Glick, Darby & Marmodoro 2020, pp. 99.
- ^ McWeeny 1972, pp. 14.
- ^ Emsley 2001.
- ^ a b Stewart 2024.
- ^ British Society for the History of Science (July 1, 1977). "From Abacus to Algorism: Theory and Practice in Medieval Arithmetic". The British Journal for the History of Science. 10 (2). Cambridge University Press: Abstract. doi:10.1017/S0007087400015375. S2CID 145065082. Archived from the original on May 16, 2021. Retrieved May 16, 2021.
- ^ Halfwassen 2014, pp. 182–183.
- ^ "De Allegoriis Legum", ii.12 [i.66]
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- Caldwell, Chris K.; Xiong, Yeng (2012). "What is the smallest prime?". Journal of Integer Sequences. 15 (9, Article 12.9.7). Waterloo, CA: University of Waterloo David R. Cheriton School of Computer Science: 1–14. MR 3005530. Zbl 1285.11001.
- Chicago, University of (1993). The Chicago Manual of Style (14th ed.). University of Chicago Press. ISBN 0-226-10389-7.
- Chrisomalis, Stephen (2010). Numerical Notation: A Comparative History. New York: Cambridge University Press. doi:10.1017/CBO9780511676062. ISBN 978-0-521-87818-0.
- Colman, Samuel (1912). Coan, C. Arthur (ed.). Nature's Harmonic Unity: A Treatise on Its Relation to Proportional Form. New York and London: G.P. Putnam's Sons.
- Crystal, D. (2008). A Dictionary of Linguistics and Phonetics (6th ed.). Malden, MA: Wiley-Blackwell. ISBN 978-0631226642.
- Conway, John H.; Guy, Richard K. (1996). The Book of Numbers. New York: Copernicus Publications. doi:10.1007/978-1-4612-4072-3. ISBN 0614971667.
- Cullen, Kristin (2007). Layout Workbook: A Real-World Guide to Building Pages in Graphic Design. Gloucester, MA: Rockport Publishers. pp. 1–240. ISBN 978-1-592-533-527.
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- Glick, David; Darby, George; Marmodoro, Anna (2020). The Foundation of Reality: Fundamentality, Space, and Time. Oxford University Press. ISBN 978-0198831501.
- Guastello, Stephen J. (2023). Human Factors Engineering and Ergonomics: A Systems Approach (3rd ed.). CRC press. ISBN 978-1000822045.
- Godbole, Achyut S. (2002). Data Comms & Networks. Tata McGraw-Hill Education. ISBN 978-1-259-08223-8.
- Graham, Ronald L.; Knuth, Donald E.; Patashnik, Oren (1994). Concrete Mathematics (2 ed.). Reading, MA: Addison-Wesley. ISBN 0-201-14236-8.
- Halfwassen, Jens (2014). "The Metaphysics of the One". In Remes, Pauliina; Slaveva-Griffin, Svetla (eds.). The Routledge Handbook of Neoplatonism. Routledge Handbooks in Philosophy. Abingdon, Oxfordshire and New York: Routledge. ISBN 9781138573963.
- Halmos, Paul R. (1974). Naive Set Theory. Undergraduate Texts in Mathematics. Springer. pp. vii, 1–104. doi:10.1007/978-1-4757-1645-0. ISBN 0-387-90092-6. MR 0453532.
- Hext, Jan (1990). Programming Structures: Machines and programs. Vol. 1. Prentice Hall. p. 33. ISBN 9780724809400..
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- Hodges, Andrew (2009). One to Nine: The Inner Life of Numbers. New York, NY: W. W. Norton & Company. pp. 1–330. ISBN 9780385672665. S2CID 118490841.
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- Huddleston, Rodney D.; Pullum, Geoffrey K.; Reynolds, Brett (2022). A student's Introduction to English Grammar (2nd ed.). Cambridge: Cambridge University Press. pp. 1–418. ISBN 978-1-316-51464-1. OCLC 1255524478.
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- Kottwitz, Robert E. (1988). "Tamagawa numbers". Annals of Mathematics. 2. 127 (3). Princeton, NJ: Princeton University & the Institute for Advanced Study: 629–646. doi:10.2307/2007007. JSTOR 2007007. MR 0942522.
- McWeeny, Roy (1972). Quantum Mechanics: Principles and Formalism. Dover Books on Physics (reprint ed.). Courier Corporation, 2012. ISBN 0486143805.
- Miller, Steven J., ed. (2015). Benford's law: theory and applications. Princeton, NJ: Princeton University Press. pp. xxvi, 1–438. ISBN 978-0-691-14761-1. MR 3408774.
- Mills, I. M. (1995). "Unity as a Unit". Metrologia. 31: 537–541. doi:10.1088/0026-1394/31/6/013.
- Peano, Giuseppe (1889). Arithmetices principia, nova methodo exposita [The principles of arithmetic, presented by a new method]. An excerpt of the treatise where Peano first presented his axioms, and recursively defined arithmetical operations. Turin: Fratres Bocca. pp. xvi, 1–20. JFM 21.0051.02.
- Peano, Giuseppe (1908). Formulario Mathematico [Mathematical Formulary] (V ed.). Turin: Fratres Bocca. pp. xxxvi, 1–463. JFM 39.0084.01.
- Pintz, Janos (1980). "On Legendre's Prime Number Formula". The American Mathematical Monthly. 87 (9): 733–735. doi:10.2307/2321863. ISSN 0002-9890. JSTOR 2321863.
- Polt, Richard (2015). The Typewriter Revolution: A Typist's Companion for the 21st Century. The Countryman Press. ISBN 978-1581575873.
- Schubring, Gert (2008). "Processes of Algebraization". Semiotics in Mathematics Education: Epistemology, History, Classroom, and Culture. By Radford, Luis; Schubring, Gert; Seeger, Falk. Kaiser, Gabriele (ed.). Semiotic Perspectives in the Teaching and Learning of Math Series. Vol. 1. Netherlands: Sense Publishers. ISBN 978-9087905972.
- Stewart, Ian (2024). "Number Symbolism". Brittanica. Retrieved 2024-08-21.
- Woodford, Chris (2006). Digital Technology. Evans Brothers. ISBN 978-0-237-52725-9. Retrieved 2016-03-24.