Numeral systems, bits and Gray code
hexdecoct3210step
0hex00dec00oct0000g0
1hex01dec01oct0001h1
2hex02dec02oct0010j3
3hex03dec03oct0011i2
4hex04dec04oct0100n7
5hex05dec05oct0101m6
6hex06dec06oct0110k4
7hex07dec07oct0111l5
8hex08dec10oct1000vF
9hex09dec11oct1001uE
Ahex10dec12oct1010sC
Bhex11dec13oct1011tD
Chex12dec14oct1100o8
Dhex13dec15oct1101p9
Ehex14dec16oct1110rB
Fhex15dec17oct1111qA

Octal (base 8) is a numeral system with eight as the base.

In the decimal system, each place is a power of ten. For example:

In the octal system, each place is a power of eight. For example:

By performing the calculation above in the familiar decimal system, we see why 112 in octal is equal to in decimal.

Octal numerals can be easily converted from binary representations (similar to a quaternary numeral system) by grouping consecutive binary digits into groups of three (starting from the right, for integers). For example, the binary representation for decimal 74 is 1001010. Two zeroes can be added at the left: (00)1 001 010, corresponding to the octal digits 1 1 2, yielding the octal representation 112.

The octal multiplication table
×123456710
1123456710
22461012141620
336111417222530
4410142024303440
5512172431364350
6614223036445260
7716253443526170
1010203040506070100

Usage

In China

Fuxi's "Earlier Heaven" Arrangement of the Eight Trigrams

The eight bagua or trigrams of the I Ching correspond to octal digits:

  • 0 = ☷, 1 = ☳, 2 = ☵, 3 = ☱,
  • 4 = ☶, 5 = ☲, 6 = ☴, 7 = ☰.

Gottfried Wilhelm Leibniz made the connection between trigrams, hexagrams and binary numbers in 1703.[1]

By Native Americans

  • The Yuki language in California has an octal system because the speakers count using the spaces between their fingers rather than the fingers themselves.[2]
  • The Pamean languages in Mexico also have an octal system, because their speakers count on the knuckles of a closed fist.[3]

By Europeans

  • It has been suggested that the reconstructed Proto-Indo-European (PIE) word for "nine" might be related to the PIE word for "new". Based on this, some have speculated that proto-Indo-Europeans used an octal number system, though the evidence supporting this is slim.[4]
  • In 1668, John Wilkins in An Essay towards a Real Character, and a Philosophical Language proposed use of base 8 instead of 10 "because the way of Dichotomy or Bipartition being the most natural and easie kind of Division, that Number is capable of this down to an Unite".[5]
  • In 1716, King Charles XII of Sweden asked Emanuel Swedenborg to elaborate a number system based on 64 instead of 10. Swedenborg argued, however, that for people with less intelligence than the king such a big base would be too difficult and instead proposed 8 as the base. In 1718 Swedenborg wrote (but did not publish) a manuscript: "En ny rekenkonst som om vexlas wid Thalet 8 i stelle then wanliga wid Thalet 10" ("A new arithmetic (or art of counting) which changes at the Number 8 instead of the usual at the Number 10"). The numbers 1–7 are there denoted by the consonants l, s, n, m, t, f, u (v) and zero by the vowel o. Thus 8 = "lo", 16 = "so", 24 = "no", 64 = "loo", 512 = "looo" etc. Numbers with consecutive consonants are pronounced with vowel sounds between in accordance with a special rule.[6]
  • Writing under the pseudonym "Hirossa Ap-Iccim" in The Gentleman's Magazine, (London) July 1745, Hugh Jones proposed an octal system for British coins, weights and measures. "Whereas reason and convenience indicate to us an uniform standard for all quantities; which I shall call the Georgian standard; and that is only to divide every integer in each species into eight equal parts, and every part again into 8 real or imaginary particles, as far as is necessary. For tho' all nations count universally by tens (originally occasioned by the number of digits on both hands) yet 8 is a far more complete and commodious number; since it is divisible into halves, quarters, and half quarters (or units) without a fraction, of which subdivision ten is uncapable...." In a later treatise on Octave computation (1753) Jones concluded: "Arithmetic by Octaves seems most agreeable to the Nature of Things, and therefore may be called Natural Arithmetic in Opposition to that now in Use, by Decades; which may be esteemed Artificial Arithmetic."[7]
  • In 1801, James Anderson criticized the French for basing the metric system on decimal arithmetic. He suggested base 8, for which he coined the term octal. His work was intended as recreational mathematics, but he suggested a purely octal system of weights and measures and observed that the existing system of English units was already, to a remarkable extent, an octal system.[8]
  • In the mid-19th century, Alfred B. Taylor concluded that "Our octonary [base 8] radix is, therefore, beyond all comparison the "best possible one" for an arithmetical system." The proposal included a graphical notation for the digits and new names for the numbers, suggesting that we should count "un, du, the, fo, pa, se, ki, unty, unty-un, unty-du" and so on, with successive multiples of eight named "unty, duty, thety, foty, paty, sety, kity and under." So, for example, the number 65 (101 in octal) would be spoken in octonary as under-un.[9][10] Taylor also republished some of Swedenborg's work on octal as an appendix to the above-cited publications.

In computers

Octal became widely used in computing when systems such as the UNIVAC 1050, PDP-8, ICL 1900 and IBM mainframes employed 6-bit, 12-bit, 24-bit or 36-bit words. Octal was an ideal abbreviation of binary for these machines because their word size is divisible by three (each octal digit represents three binary digits). So two, four, eight or twelve digits could concisely display an entire machine word. It also cut costs by allowing Nixie tubes, seven-segment displays, and calculators to be used for the operator consoles, where binary displays were too complex to use, decimal displays needed complex hardware to convert radices, and hexadecimal displays needed to display more numerals.

All modern computing platforms, however, use 16-, 32-, or 64-bit words, further divided into eight-bit bytes. On such systems three octal digits per byte would be required, with the most significant octal digit representing two binary digits (plus one bit of the next significant byte, if any). Octal representation of a 16-bit word requires 6 digits, but the most significant octal digit represents (quite inelegantly) only one bit (0 or 1). This representation offers no way to easily read the most significant byte, because it's smeared over four octal digits. Therefore, hexadecimal is more commonly used in programming languages today, since two hexadecimal digits exactly specify one byte. Some platforms with a power-of-two word size still have instruction subwords that are more easily understood if displayed in octal; this includes the PDP-11 and Motorola 68000 family. The modern-day ubiquitous x86 architecture belongs to this category as well, but octal is rarely used on this platform, although certain properties of the binary encoding of opcodes become more readily apparent when displayed in octal, e.g. the ModRM byte, which is divided into fields of 2, 3, and 3 bits, so octal can be useful in describing these encodings. Before the availability of assemblers, some programmers would handcode programs in octal; for instance, Dick Whipple and John Arnold wrote Tiny BASIC Extended directly in machine code, using octal.[11]

Octal is sometimes used in computing instead of hexadecimal, perhaps most often in modern times in conjunction with file permissions under Unix systems (see chmod). It has the advantage of not requiring any extra symbols as digits (the hexadecimal system is base-16 and therefore needs six additional symbols beyond 0–9). It is also used for digital displays.

In programming languages, octal literals are typically identified with a variety of prefixes, including the digit 0, the letters o or q, the digit–letter combination 0o, or the symbol &[12] or $. In Motorola convention, octal numbers are prefixed with @, whereas a small (or capital[13]) letter o[13] or q[13] is added as a postfix following the Intel convention.[14][15] In Concurrent DOS, Multiuser DOS and REAL/32 as well as in DOS Plus and DR-DOS various environment variables like $CLS, $ON, $OFF, $HEADER or $FOOTER support an \nnn octal number notation,[16][17][18] and DR-DOS DEBUG utilizes \ to prefix octal numbers as well.

For example, the literal 73 (base 8) might be represented as 073, o73, q73, 0o73, \73, @73, &73, $73 or 73o in various languages.

Newer languages have been abandoning the prefix 0, as decimal numbers are often represented with leading zeroes. The prefix q was introduced to avoid the prefix o being mistaken for a zero, while the prefix 0o was introduced to avoid starting a numerical literal with an alphabetic character (like o or q), since these might cause the literal to be confused with a variable name. The prefix 0o also follows the model set by the prefix 0x used for hexadecimal literals in the C language; it is supported by Haskell,[19] OCaml,[20] Python as of version 3.0,[21] Raku,[22] Ruby,[23] Tcl as of version 9,[24] PHP as of version 8.1,[25] Rust[26] and ECMAScript as of ECMAScript 6[27] (the prefix 0 originally stood for base 8 in JavaScript but could cause confusion,[28] therefore it has been discouraged in ECMAScript 3 and dropped in ECMAScript 5[29]).

Octal numbers that are used in some programming languages (C, Perl, PostScript...) for textual/graphical representations of byte strings when some byte values (unrepresented in a code page, non-graphical, having special meaning in current context or otherwise undesired) have to be to escaped as \nnn. Octal representation may be particularly handy with non-ASCII bytes of UTF-8, which encodes groups of 6 bits, and where any start byte has octal value \3nn and any continuation byte has octal value \2nn.

Octal was also used for floating point in the Ferranti Atlas (1962), Burroughs B5500 (1964), Burroughs B5700 (1971), Burroughs B6700 (1971) and Burroughs B7700 (1972) computers.

In aviation

Transponders in aircraft transmit a "squawk" code, expressed as a four-octal-digit number, when interrogated by ground radar. This code is used to distinguish different aircraft on the radar screen.

Conversion between bases

Decimal to octal conversion

Method of successive Euclidean division by 8

To convert integer decimals to octal, divide the original number by the largest possible power of 8 and divide the remainders by successively smaller powers of 8 until the power is 1. The octal representation is formed by the quotients, written in the order generated by the algorithm. For example, to convert 12510 to octal:

125 = 82 × 1 + 61
61 = 81 × 7 + 5
5 = 80 × 5 + 0

Therefore, 12510 = 1758.

Another example:

900 = 83 × 1 + 388
388 = 82 × 6 + 4
4 = 81 × 0 + 4
4 = 80 × 4 + 0

Therefore, 90010 = 16048.

Method of successive multiplication by 8

To convert a decimal fraction to octal, multiply by 8; the integer part of the result is the first digit of the octal fraction. Repeat the process with the fractional part of the result, until it is null or within acceptable error bounds.

Example: Convert 0.1640625 to octal:

0.1640625 × 8 = 1.3125 = 1 + 0.3125
0.3125 × 8 = 2.5 = 2 + 0.5
0.5 × 8 = 4.0 = 4 + 0

Therefore, 0.164062510 = 0.1248.

These two methods can be combined to handle decimal numbers with both integer and fractional parts, using the first on the integer part and the second on the fractional part.

Method of successive duplication

To convert integer decimals to octal, prefix the number with "0.". Perform the following steps for as long as digits remain on the right side of the radix: Double the value to the left side of the radix, using octal rules, move the radix point one digit rightward, and then place the doubled value underneath the current value so that the radix points align. If the moved radix point crosses over a digit that is 8 or 9, convert it to 0 or 1 and add the carry to the next leftward digit of the current value. Add octally those digits to the left of the radix and simply drop down those digits to the right, without modification.

Example:

 0.4 9 1 8 decimal value
  +0
 ---------
   4.9 1 8
  +1 0
  --------
   6 1.1 8
  +1 4 2
  --------
   7 5 3.8
  +1 7 2 6
  --------
 1 1 4 6 6. octal value

Octal to decimal conversion

To convert a number k to decimal, use the formula that defines its base-8 representation:

In this formula, ai is an individual octal digit being converted, where i is the position of the digit (counting from 0 for the right-most digit).

Example: Convert 7648 to decimal:

7648 = 7 × 82 + 6 × 81 + 4 × 80 = 448 + 48 + 4 = 50010

For double-digit octal numbers this method amounts to multiplying the lead digit by 8 and adding the second digit to get the total.

Example: 658 = 6 × 8 + 5 = 5310

Method of successive duplication

To convert octals to decimals, prefix the number with "0.". Perform the following steps for as long as digits remain on the right side of the radix: Double the value to the left side of the radix, using decimal rules, move the radix point one digit rightward, and then place the doubled value underneath the current value so that the radix points align. Subtract decimally those digits to the left of the radix and simply drop down those digits to the right, without modification.

Example:

 0.1 1 4 6 6  octal value
  -0
 -----------
   1.1 4 6 6
  -  2
  ----------
     9.4 6 6
  -  1 8
  ----------
     7 6.6 6
  -  1 5 2
  ----------
     6 1 4.6
  -  1 2 2 8
  ----------
     4 9 1 8. decimal value

Octal to binary conversion

To convert octal to binary, replace each octal digit by its binary representation.

Example: Convert 518 to binary:

58 = 1012
18 = 0012

Therefore, 518 = 101 0012.

Binary to octal conversion

The process is the reverse of the previous algorithm. The binary digits are grouped by threes, starting from the least significant bit and proceeding to the left and to the right. Add leading zeroes (or trailing zeroes to the right of decimal point) to fill out the last group of three if necessary. Then replace each trio with the equivalent octal digit.

For instance, convert binary 1010111100 to octal:

001010111100
1274

Therefore, 10101111002 = 12748.

Convert binary 11100.01001 to octal:

011100 . 010010
34 . 22

Therefore, 11100.010012 = 34.228.

Octal to hexadecimal conversion

The conversion is made in two steps using binary as an intermediate base. Octal is converted to binary and then binary to hexadecimal, grouping digits by fours, which correspond each to a hexadecimal digit.

For instance, convert octal 1057 to hexadecimal:

To binary:
1057
001000101111
then to hexadecimal:
001000101111
22F

Therefore, 10578 = 22F16.

Hexadecimal to octal conversion

Hexadecimal to octal conversion proceeds by first converting the hexadecimal digits to 4-bit binary values, then regrouping the binary bits into 3-bit octal digits.

For example, to convert 3FA516:

To binary:
3FA5
0011111110100101
then to octal:
0011111110100101
037645

Therefore, 3FA516 = 376458.

Real numbers

Fractions

Due to having only factors of two, many octal fractions have repeating digits, although these tend to be fairly simple:

Decimal base
Prime factors of the base: 2, 5
Prime factors of one below the base: 3
Prime factors of one above the base: 11
Other Prime factors: 7 13 17 19 23 29 31
Octal base
Prime factors of the base: 2
Prime factors of one below the base: 7
Prime factors of one above the base: 3
Other Prime factors: 5 13 15 21 23 27 35 37
Fraction Prime factors
of the denominator
Positional representation Positional representation Prime factors
of the denominator
Fraction
1/2 2 0.5 0.4 2 1/2
1/3 3 0.3333... = 0.3 0.2525... = 0.25 3 1/3
1/4 2 0.25 0.2 2 1/4
1/5 5 0.2 0.1463 5 1/5
1/6 2, 3 0.16 0.125 2, 3 1/6
1/7 7 0.142857 0.1 7 1/7
1/8 2 0.125 0.1 2 1/10
1/9 3 0.1 0.07 3 1/11
1/10 2, 5 0.1 0.06314 2, 5 1/12
1/11 11 0.09 0.0564272135 13 1/13
1/12 2, 3 0.083 0.052 2, 3 1/14
1/13 13 0.076923 0.0473 15 1/15
1/14 2, 7 0.0714285 0.04 2, 7 1/16
1/15 3, 5 0.06 0.0421 3, 5 1/17
1/16 2 0.0625 0.04 2 1/20
1/17 17 0.0588235294117647 0.03607417 21 1/21
1/18 2, 3 0.05 0.034 2, 3 1/22
1/19 19 0.052631578947368421 0.032745 23 1/23
1/20 2, 5 0.05 0.03146 2, 5 1/24
1/21 3, 7 0.047619 0.03 3, 7 1/25
1/22 2, 11 0.045 0.02721350564 2, 13 1/26
1/23 23 0.0434782608695652173913 0.02620544131 27 1/27
1/24 2, 3 0.0416 0.025 2, 3 1/30
1/25 5 0.04 0.02436560507534121727 5 1/31
1/26 2, 13 0.0384615 0.02354 2, 15 1/32
1/27 3 0.037 0.022755 3 1/33
1/28 2, 7 0.03571428 0.02 2, 7 1/34
1/29 29 0.0344827586206896551724137931 0.0215173454106475626043236713 35 1/35
1/30 2, 3, 5 0.03 0.02104 2, 3, 5 1/36
1/31 31 0.032258064516129 0.02041 37 1/37
1/32 2 0.03125 0.02 2 1/40

Irrational numbers

The table below gives the expansions of some common irrational numbers in decimal and octal.

Number Positional representation
Decimal Octal
2 (the length of the diagonal of a unit square) 1.414213562373095048... 1.3240 4746 3177 1674...
3 (the length of the diagonal of a unit cube) 1.732050807568877293... 1.5666 3656 4130 2312...
5 (the length of the diagonal of a 1×2 rectangle) 2.236067977499789696... 2.1706 7363 3457 7224...
φ (phi, the golden ratio = (1+5)/2) 1.618033988749894848... 1.4743 3571 5627 7512...
π (pi, the ratio of circumference to diameter of a circle) 3.141592653589793238462643
383279502884197169399375105...
3.1103 7552 4210 2643...
e (the base of the natural logarithm) 2.718281828459045235... 2.5576 0521 3050 5355...

See also

References

  1. Leibniz, Gottfried Wilhelm (1703). "Explanation of binary arithmetic". leibniz-translations.com. Archived from the original on 2021-02-11. Retrieved 2022-03-02.
  2. Ascher, Marcia (1992). "Ethnomathematics: A Multicultural View of Mathematical Ideas". The College Mathematics Journal. 23 (4): 353–355. doi:10.2307/2686959. JSTOR 2686959.
  3. Avelino, Heriberto (2006). "The typology of Pame number systems and the limits of Mesoamerica as a linguistic area" (PDF). Linguistic Typology. 10 (1): 41–60. doi:10.1515/LINGTY.2006.002. S2CID 20412558. Archived (PDF) from the original on 2011-06-04. Retrieved 2007-11-21.
  4. Winter, Werner (1991). "Some thoughts about Indo-European numerals". In Gvozdanović, Jadranka (ed.). Indo-European numerals. Trends in Linguistics. Vol. 57. Berlin: Mouton de Gruyter. pp. 13–14. ISBN 3-11-011322-8. Archived from the original on 2023-04-01. Retrieved 2013-06-09.
  5. Wilkins, John (1668). An Essay Towards a Real Character and a Philosophical Language. London. p. 190. Archived from the original on 2023-04-01. Retrieved 2015-02-08.
  6. Donald Knuth, The Art of Computer Programming
  7. See H. R. Phalen, "Hugh Jones and Octave Computation," The American Mathematical Monthly 56 (August–September 1949): 461-465.
  8. James Anderson, On Octal Arithmetic [title appears only in page headers], Recreations in Agriculture, Natural-History, Arts, and Miscellaneous Literature Archived 2023-04-01 at the Wayback Machine, Vol. IV, No. 6 (February 1801), T. Bensley, London; pages 437-448.
  9. Alfred B. Taylor, Report on Weights and Measures, Pharmaceutical Association, 8th Annual Session, Boston, 1859-09-15. See pages 48 and 53.
  10. Alfred B. Taylor, Octonary numeration and its application to a system of weights and measures, Proc. Amer. Phil. Soc. Vol XXIV Archived 2023-04-01 at the Wayback Machine, Philadelphia, 1887; pages 296-366. See pages 327 and 330.
  11. "TB Code Sheet". Dr. Dobb's Journal of Computer Calisthenics & Orthodontia, Running Light Without Overbyte. 1 (1). December 1975.
  12. Microsoft Corporation (1987). "Constants, Variables, Expressions and Operators". GW-BASIC User's Manual. Archived from the original on 2016-01-05. Retrieved 2015-12-12.
  13. 1 2 3 "2.4.1 Numeric Constants". CP/M-86 - Operating System - Programmer's Guide (PDF) (3 ed.). Pacific Grove, California, USA: Digital Research. January 1983 [1981]. p. 9. Archived (PDF) from the original on 2020-02-27. Retrieved 2020-02-27. (1+viii+122+2 pages)
  14. Küveler, Gerd; Schwoch, Dietrich (2013) [1996]. Arbeitsbuch Informatik - eine praxisorientierte Einführung in die Datenverarbeitung mit Projektaufgabe (in German). Vieweg-Verlag, reprint: Springer-Verlag. doi:10.1007/978-3-322-92907-5. ISBN 978-3-528-04952-2. 978-3-32292907-5. Archived from the original on 2023-04-01. Retrieved 2015-08-05.
  15. Küveler, Gerd; Schwoch, Dietrich (2007-10-04). Informatik für Ingenieure und Naturwissenschaftler: PC- und Mikrocomputertechnik, Rechnernetze (in German). Vol. 2 (5 ed.). Vieweg, reprint: Springer-Verlag. ISBN 978-3-83489191-4. 978-3-83489191-4. Archived from the original on 2023-04-01. Retrieved 2015-08-05.
  16. Paul, Matthias R. (1997-07-30). NWDOS-TIPs — Tips & Tricks rund um Novell DOS 7, mit Blick auf undokumentierte Details, Bugs und Workarounds. Release 157 (in German) (3 ed.). Archived from the original on 2016-11-04. Retrieved 2014-08-06. {{cite book}}: |work= ignored (help) (NB. NWDOSTIP.TXT is a comprehensive work on Novell DOS 7 and OpenDOS 7.01, including the description of many undocumented features and internals. It is part of the author's yet larger MPDOSTIP.ZIP collection maintained up to 2001 and distributed on many sites at the time. The provided link points to a HTML-converted older version of the NWDOSTIP.TXT file.)
  17. Paul, Matthias R. (2002-03-26). "Updated CLS posted". freedos-dev mailing list. Archived from the original on 2019-04-27. Retrieved 2014-08-06.
  18. CCI Multiuser DOS 7.22 GOLD Online Documentation. Concurrent Controls, Inc. (CCI). 1997-02-10. HELP.HLP.
  19. "Haskell 98 Lexical Structure". Archived from the original on 2021-04-11. Retrieved 2019-11-01.
  20. OCaml: 7.1 Lexical conventions Archived 2013-07-01 at archive.today
  21. Python 3: https://docs.python.org/3.1/reference/lexical_analysis.html#integer-literals Archived 2014-03-20 at the Wayback Machine
  22. Perl 6: http://perlcabal.org/syn/S02.html#Radix_markers Archived 31 October 2014 at the Wayback Machine
  23. RubySpec: https://github.com/ruby/ruby/blob/master/spec/ruby/core/string/to_i_spec.rb Archived 2022-05-29 at the Wayback Machine
  24. Tcl: http://wiki.tcl.tk/498 Archived 2014-01-04 at the Wayback Machine
  25. PHP.Watch - PHP 8.1: Explicit Octal numeral notation https://php.watch/versions/8.1/explicit-octal-notation Archived 2021-01-08 at the Wayback Machine
  26. Rust literals and operators: https://doc.rust-lang.org/rust-by-example/primitives/literals.html Archived 2022-05-28 at the Wayback Machine
  27. ECMAScript 6th Edition draft: https://people.mozilla.org/~jorendorff/es6-draft.html#sec-literals-numeric-literals Archived 16 December 2013 at the Wayback Machine
  28. "Why does the radix for JavaScript's parseInt default to 8?". Stack Overflow. 2011-04-08. Archived from the original on 2020-08-06. Retrieved 2019-08-21.
  29. "parseInt()", Mozilla Developer Network (MDN), archived from the original on 2014-03-05, retrieved 2014-01-03, If the input string begins with "0" (a zero), radix is assumed to be 8 (octal) or 10 (decimal). Exactly which radix is chosen is implementation-dependent. ECMAScript 5 clarifies that 10 (decimal) should be used, but not all browsers support this yet
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