Difference between revisions of "1 (number)" - New World Encyclopedia

"One" redirects here.

1
0 1 2 3 4 5 6 7 8 9 >> List of numbers — Integers 0 10 20 30 40 50 60 70 80 90 >>
Cardinal	1 one
Ordinal	1st first
Numeral system	unary
Factorization	${\displaystyle 1}$
Divisors	1
Greek numeral	α'
Roman numeral	I
Roman numeral (Unicode)	Ⅰ, ⅰ
Arabic	١
Ge'ez	፩
Bengali	১
Chinese numeral	一，弌，壹
Korean	일, 하나
Devanāgarī	१
Hebrew	א (Alef)
Khmer	១
Thai	๑
prefixes	mono- /haplo- (from Greek) uni- (from Latin)
Binary	1
Octal	1
Duodecimal	1
Hexadecimal	1

1 (one) is a number, numeral, and the name of the glyph representing that number. It represents a single entity. One is sometimes referred to as unity or unit as a noun or adjective. For example, a line segment of "unit length" is a line segment of length 1.

In mathematics, the number one is a natural numberCite error: Invalid <ref> tag; refs with no name must have content that follows 0 and precedes 2. It is classified as a real number^[1] Historically, it was regarded as the first ordinal number, but most modern conventions use 0 as the first ordinal.

In mathematics, it may represent:

• historically, the first ordinal number, though the majority of modern conventions use 0 as the first ordinal
• the natural number following 0 and preceding 2
• the corresponding real number 1, the multiplicative identity of the real and complex numbers
• in abstract algebra, it is the multiplicative identity

Mathematics

For any number x:

x·1 = 1·x = x (1 is the multiplicative identity)

x/1 = x (see division)

x¹ = x, 1^x = 1, and for nonzero x, x⁰ = 1 (see exponentiation)

Using ordinary addition, we have 1 + 1 = 2.

One cannot be used as the base of a positional numeral system; sometimes tallying is referred to as "base 1," since only one mark (the tally) is needed, but this is not a positional notation.

The logarithms base 1 is undefined, since 1^x=1 and so has no unique inverse function.

In the real number system, 1 can be represented in two ways as a recurring decimal: as 1.000... and as 0.999... (q.v.).

In the Von Neumann representation of natural numbers, 1 is defined as the set {0}. This set has cardinality 1 and hereditary rank 1. Sets like this with a single element are called singletons.

In Principia Mathematica, 1 is defined as the set of all singletons.

In a multiplicative group or monoid, the identity element is sometimes denoted "1," but "e" (from the German Einheit, unity) is more traditional. However, "1" is especially common for the multiplicative identity of a ring. (Note that this multiplicative identity is also often called "unity".)

One is its own factorial, and its own square and cube (and so on, as 1 × 1 × ... × 1 = 1). One is the first figurate number of every kind, such as triangular number, pentagonal number and centered hexagonal number to name just a few.

Because of the multiplicative identity, if f(x) is a multiplicative function, then f(1) must equal 1.

It is also the first and second numbers in the Fibonacci sequence, and is the first number in many mathematical sequences. As a matter of convention, Sloane's early Handbook of Integer Sequences added an initial 1 to any sequence that didn't already have it, and considered these initial 1's in its lexicographic ordering. Sloane's later Encyclopedia of Integer Sequences and its Web counterpart, the On-Line Encyclopedia of Integer Sequences, ignore initial ones in their lexicographic ordering of sequences, because such initial ones often correspond to trivial cases.

One is the empty product.

One is the smallest positive odd integer.

One is a harmonic divisor number.

One is often the internal representation of the Boolean constant true in computer systems.

One is neither a prime number nor a composite number, but a unit, like -1 and, in the Gaussian integers, i and -i. The fundamental theorem of arithmetic guarantees unique factorization over the integers only up to units (e.g. 4 = 2² = (-1)⁴×1²³×2²).

One was formerly considered prime by some mathematicians, using the definition that a prime is divisible only by one and itself. However, this complicates the fundamental theorem of arithmetic, so modern definitions exclude units. The last professional mathematician to publicly label 1 a prime number was Henri Lebesgue in 1899.

One is one of three possible values of the Möbius function: it takes the value one for square-free integers with an even number of distinct prime factors.

One is the only odd number in the range of Euler's totient function φ(x), in the cases x = 1 and x = 2.

One is the only 1-perfect number (see multiply perfect number).

By definition, 1 is the magnitude or absolute value of a unit vector and a unit matrix (more usually called an identity matrix). Note that the term unit matrix is usually used to mean something quite different.

One is the most common leading digit in many sets of data, a consequence of Benford's law.

Egyptian people used to represent all fraction in terms of sum of fractions with numerator 1 and distinct denominators. For example,${\displaystyle {\frac {3}{4}}={\frac {1}{4}}+{\frac {1}{2}}}$. Such representations are popularly known as Egyptian Fractions or Unit Fractions.

The Generating Function which has all coefficients 1 is given by

${\displaystyle {\frac {1}{1-x}}=1+x+x^{2}+x^{3}+\cdots }$.

This power series converges and has finite value if, and only if, ${\displaystyle |x|<1}$.

List of basic calculations

Multiplication	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15	16	17	18	19	20		21	22	23	24	25		50	100	1000
${\displaystyle 1\times x}$	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15	16	17	18	19	20		21	22	23	24	25		50	100	1000

Division	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15
${\displaystyle 1\div x}$	1	0.5	${\displaystyle 0.{\overline {3}}}$	0.25	0.2	${\displaystyle 0.1{\overline {6}}}$	${\displaystyle 0.{\overline {142857}}}$	0.125	${\displaystyle 0.{\overline {1}}}$	0.1		${\displaystyle 0.{\overline {0}}{\overline {9}}}$	${\displaystyle 0.08{\overline {3}}}$	${\displaystyle 0.{\overline {076923}}}$	${\displaystyle 0.0{\overline {714285}}}$	${\displaystyle 0.0{\overline {6}}}$
${\displaystyle x\div 1}$	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15

Exponentiation	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15	16	17	18	19	20
${\displaystyle 1^{x}\,}$	1	1	1	1	1	1	1	1	1	1		1	1	1	1	1	1	1	1	1	1
${\displaystyle x^{1}\,}$	1	2	3	4	5	6	7	8	9	10		11	12	13	14	15	16	17	18	19	20

Interesting multiplications

If a number containing only ones (such as 1, 11, 111, and so forth) is multiplied by itself, the results are very interesting.^[2]

1 x 1 = 1

11 x 11 = 121

111 x 111 = 12321

1111 x 1111 = 1234321

11111 x 11111 = 123454321

Evolution of the glyph

The glyph used today in the Western world to represent the number 1, a vertical line, often with a serif at the top and sometimes a short horizontal line at the bottom, traces its roots back to the Indians, who wrote 1 as a horizontal line, as is still the case in Chinese script. The Gupta wrote it as a curved line, and the Nagari sometimes added a small circle on the left (rotated a quarter turn to the right, this 9-look-alike became the present day numeral 1 in the Gujarati and Punjabi scripts). The Nepali also rotated it to the right, but kept the circle small.^[3] This eventually became the top serif in the modern numeral, but the occasional short horizontal line at the bottom probably originates from similarity with the Roman numeral I. In some European countries (e.g., Germany) the little serif at the top is sometimes extended into a long upstroke, sometimes as long as the vertical line, which can lead to confusion with the glyph for seven in other countries. Where the 1 is written with a long upstroke, the number 7 has a horizontal stroke through the vertical line.

While the shape of the 1 character has an ascender in most modern typefaces, in typefaces with text figures the character usually is of x-height, as, for example, in .

In recycling

• The resin identification code used in recycling to identify polyethylene terephthalate.

See also

• 0.999...
• −1
• Number

Notes

References

ISBN links support NWE through referral fees

• Flegg, Graham. 2002. Numbers: Their History and Meaning. Mineola, NY: Dover Publications. ISBN 0486421651.

• Ifrah, Georges. 2000. The Universal History of Numbers: From Prehistory to the Invention of the Computer. Translated by David Bellos et al. New York: Wiley. ISBN 0471393401.

• McLeish, John. 1994. The Story of Numbers: How Mathematics Has Shaped Civilization. New York: Fawcett Columbine. ISBN 0449909387.

• Menninger, Karl. 1992. Number Words and Number Symbols: A Cultural History of Numbers. New York: Dover Publications. ISBN 0486270963.

• Wells, D. G. 1998. The Penguin Dictionary of Curious and Interesting Numbers. Rev. ed. London, UK: Penguin Books. ISBN 0140261494.

External links

• Learning Math: Number and Operations. Teacher Resources/Mathematics. Retrieved August 15, 2008.

• Number 1! High School Math. Retrieved August 15, 2008.