History of large numbers

Different cultures used different traditional numeral systems for naming large numbers. The extent of large numbers used varied in each culture.

Two interesting points in using large numbers are the confusion on the term billion and milliard in many countries, and the use of zillion to denote a very large number where precision is not required.

Ancient India

Hindu units of time on a logarithmic scale.

The Indians had a passion for high numbers. For example, in texts belonging to the Vedic literature, we find individual Sanskrit names for each of the powers of 10 up to a trillion and even 10⁶². (Even today, the words 'lakh' and 'crore', referring to 100,000 and 10,000,000, respectively, are in common use among English-speaking Indians.) One of these Vedic texts, the Yajur Veda, even discusses the concept of numeric infinity (purna "fullness"), stating that if you subtract purna from purna, you are still left with purna.

The Lalitavistara Sutra (a Mahayana Buddhist work) recounts a contest including writing, arithmetic, wrestling and archery, in which the Buddha was pitted against the great mathematician Arjuna and showed off his numerical skills by citing the names of the powers of ten up to 1 'tallakshana', which equals 10⁵³, but then going on to explain that this is just one of a series of counting systems that can be expanded geometrically. The last number at which he arrived after going through nine successive counting systems was 10⁴²¹, that is, a 1 followed by 421 zeros.

There is also an analogous system of Sanskrit terms for fractional numbers, capable of dealing with both very large and very small numbers.

Larger number in Buddhism works up to nirabhilapya nirabhilapya parivarta(Bukeshuo bukeshuo zhuan 不可說不可說轉) $10^{7\times 2^{122}}$ or 10^{37218383881977644441306597687849648128}, which appeared as Bodhisattva's maths in the Avataṃsaka Sūtra.,^[1]^[2] though chapter 30 (the Asamkyeyas) in Thomas Cleary's translation of it we find the definition of the number "untold" as exactly 10^10*2¹²², expanded in the 2nd verses to 10^45*2¹²¹ and continuing a similar expansion indeterminately.

A few large numbers used in India by about 5th century BC (See Georges Ifrah: A Universal History of Numbers, pp 422–423):

lakṣá (लक्ष) —10⁵
kōṭi (कोटि) —10⁷
ayuta (अयुत) —10⁹
niyuta (नियुत) —10¹³
pakoti (पकोटि) —10¹⁴
vivara (विवारा) —10¹⁵
kshobhya (क्षोभ्या) —10¹⁷
vivaha (विवाहा) —10¹⁹
kotippakoti (कोटिपकोटी) —10²¹
bahula (बहुल) —10²³
nagabala (नागाबाला) —10²⁵
nahuta (नाहूटा) —10²⁸
titlambha (तीतलम्भा) —10²⁹
vyavasthanapajnapati (व्यवस्थानापज्नापति) —10³¹
hetuhila (हेतुहीला) —10³³
ninnahuta (निन्नाहुता) —10³⁵
hetvindriya (हेत्विन्द्रिय) —10³⁷
samaptalambha (समाप्तलम्भ) —10³⁹
gananagati (गनानागती) —10⁴¹
akkhobini (अक्खोबिनि) —10⁴²
niravadya (निरावाद्य) —10⁴³
mudrabala (मुद्राबाला) —10⁴⁵
sarvabala (सर्वबाला) —10⁴⁷
bindu (बिंदु or बिन्दु) —10⁴⁹
sarvajna (सर्वज्ञ) —10⁵¹
vibhutangama (विभुतन्गमा) —10⁵³
abbuda (अब्बुद) —10⁵⁶
nirabbuda (निर्बुद्ध) —10⁶³
ahaha (अहाहा) —10⁷⁰
ababa (अबाबा). —10⁷⁷
atata (अटाटा) —10⁸⁴
soganghika (सोगान्घीक) —10⁹¹
uppala (उप्पल) —10⁹⁸
kumuda (कुमुद) —10¹⁰⁵
pundarika (पुन्डरीक) —10¹¹²
paduma (पद्म) —10¹¹⁹
kathana (कथन) —10¹²⁶
mahakathana (महाकथन) —10¹³³
asaṃkhyeya (असंख्येय) —10¹⁴⁰
dhvajagranishamani (ध्वजाग्रनिशमनी) —10⁴²¹
bodhisattva (बोधिसत्व or बोधिसत्त) —10^{37218383881977644441306597687849648128}
lalitavistarautra (ललितातुलनातारासूत्र) —10²⁰⁰infinities
matsya (मत्स्य) —10⁶⁰⁰infinities
kurma (कूर्म) —10²⁰⁰⁰infinities
varaha (वराह) —10³⁶⁰⁰infinities
narasimha (नरसिम्हा) —10⁴⁸⁰⁰infinities
vamana (वामन) —10⁵⁸⁰⁰infinities
parashurama (परशुराम) —10⁶⁰⁰⁰infinities
rama (राम) —10⁶⁸⁰⁰infinities
khrishnaraja (खृष्णराज) —10infinities
kalki (कल्कि) —10⁸⁰⁰⁰infinities
balarama (बलराम) —10⁹⁸⁰⁰infinities
dasavatara (दशावतार) —10¹⁰⁰⁰⁰infinities
bhagavatapurana (भागवतपुराण) —10¹⁸⁰⁰⁰infinities
avatamsakasutra (अवतांशकासूत्र) —10³⁰⁰⁰⁰infinities
mahadeva (महादेव) —10⁵⁰⁰⁰⁰infinities
prajapati (प्रजापति) —10⁶⁰⁰⁰⁰infinities
jyotiba (ज्योतिबा) —10⁸⁰⁰⁰⁰infinities
parvati (पार्वती) 10^20000000000infinities
paro (पॅरो) 10^{400000000000000000}infinities

Classical antiquity

In the Western world, specific number names for larger numbers did not come into common use until quite recently. The Ancient Greeks used a system based on the myriad, that is ten thousand; and their largest named number was a myriad myriad, or one hundred million.

In The Sand Reckoner, Archimedes (c. 287–212 BC) devised a system of naming large numbers reaching up to

10^{8 \times 10^{16}}

,

essentially by naming powers of a myriad myriad. This largest number appears because it equals a myriad myriad to the myriad myriadth power, all taken to the myriad myriadth power. This gives a good indication of the notational difficulties encountered by Archimedes, and one can propose that he stopped at this number because he did not devise any new ordinal numbers (larger than 'myriad myriadth') to match his new cardinal numbers. Archimedes only used his system up to 10⁶⁴.

Archimedes' goal was presumably to name large powers of 10 in order to give rough estimates, but shortly thereafter, Apollonius of Perga invented a more practical system of naming large numbers which were not powers of 10, based on naming powers of a myriad, for example,

M^{\!\!\!\!\! {}^\beta}

would be a myriad squared.

Much later, but still in antiquity, the Hellenistic mathematician Diophantus (3rd century) used a similar notation to represent large numbers.

The Romans, who were less interested in theoretical issues, expressed 1,000,000 as decies centena milia, that is, 'ten hundred thousand'; it was only in the 13th century that the (originally French) word 'million' was introduced .

Medieval India

The Indians, who invented the positional numeral system, along with negative numbers and zero, were quite advanced in this aspect. By the 7th century, Indian mathematicians were familiar enough with the notion of infinity as to define it as the quantity whose denominator is zero.

Modern use of large finite numbers

Far larger finite numbers than any of these occur in modern mathematics. See for instance Graham's number which is too large to express using exponentiation or even tetration. For more about modern usage for large numbers see Large numbers.

Infinity

The ultimate in large numbers was, until recently, the concept of infinity, a number defined by being greater than any finite number, and used in the mathematical theory of limits.

However, since the 19th century, mathematicians have studied transfinite numbers, numbers which are not only greater than any finite number, but also, from the viewpoint of set theory, larger than the traditional concept of infinity. Of these transfinite numbers, perhaps the most extraordinary, and arguably, if they exist, "largest", are the large cardinals. The concept of transfinite numbers, however, was first considered by Indian Jaina mathematicians as far back as 400 BC.

References

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[1] 無量大数の彼方へ

[2] 大数の名前について