Chandravākyas () are a collection of numbers, arranged in the form of a list, related to the motion of the

Moon The Moon is Earth's only natural satellite. It is the fifth largest satellite in the Solar System and the largest and most massive relative to its parent planet, with a diameter about one-quarter that of Earth (comparable to the width ...

in its orbit around the

Earth Earth is the third planet from the Sun and the only astronomical object known to harbor life. While large volumes of water can be found throughout the Solar System, only Earth sustains liquid surface water. About 71% of Earth's surf ...

. These numbers are couched in the

katapayadi system ''Kaṭapayādi'' system (Devanagari: कटपयादि, also known as ''Paralppēru'', Malayalam: പരല്‍പ്പേര്) of numerical notation is an ancient Indian alphasyllabic numeral system to depict letters to numerals fo ...

of representation of numbers and so apparently appear like a list of words, or phrases or short sentences written in

Sanskrit Sanskrit (; attributively , ; nominalization, nominally , , ) is a classical language belonging to the Indo-Aryan languages, Indo-Aryan branch of the Indo-European languages. It arose in South Asia after its predecessor languages had Trans-cul ...

and hence the terminology ''Chandravākyas''. In

, ''Chandra'' is the

and ''vākya'' means a sentence. The term ''Chandravākyas'' could thus be translated as Moon-sentences. (p.522)

Vararuchi Vararuci (also transliterated as Vararuchi) () is a name associated with several literary and scientific texts in Sanskrit and also with various legends in several parts of India. This Vararuci is often identified with Kātyāyana. Kātyāyana is ...

(c. 4th century CE), a legendary figure in the astronomical traditions of

Kerala Kerala ( ; ) is a state on the Malabar Coast of India. It was formed on 1 November 1956, following the passage of the States Reorganisation Act, by combining Malayalam-speaking regions of the erstwhile regions of Cochin, Malabar, South C ...

, is credited with the authorship of the collection of ''Chandravākyas''. These were routinely made use of for computations of native almanacs and for predicting the position of the Moon. The work ascribed to Vararuchi is also known as ''Chandravākyāni'', or ''Vararucivākyāni'', or ''Pañcāṅgavākyāni''.

Madhava of Sangamagrama Iriññāttappiḷḷi Mādhavan known as Mādhava of Sangamagrāma () was an Indian mathematician and astronomer from the town believed to be present-day Kallettumkara, Aloor Panchayath, Irinjalakuda in Thrissur District, Kerala, India. He i ...

(c. 1350 – c. 1425), the founder of the

Kerala school of astronomy and mathematics The Kerala school of astronomy and mathematics or the Kerala school was a school of Indian mathematics, mathematics and Indian astronomy, astronomy founded by Madhava of Sangamagrama in Kingdom of Tanur, Tirur, Malappuram district, Malappuram, K ...

, had set forth a revised set of ''Chandravākyās'', together with a method for computing them, in his work titled Venvaroha. ''Chandravākyas'' were also popular in Tamil Nadu region of South India. There, the astrologers and astronomers used these ''vākyā''s to construct almanacs. These almanacs were popularly referred to as the ''Vākya-pañcāṅga''s. This is used in contrast to the modern mode computation of almanacs based on parameters derived from astronomical observations that are known as ''Dṛk Pañcāṅgas'' ( or ''Thirukanitha Pañcāṅgas'').

''Vākya'' tradition

The

Parahita Parahita is a system of astronomy prevalent in Kerala and Tamil Nadu, India. It was introduced by the Kerala astronomer Haridatta, (c. 683 AD). Nilakantha Somayaji (1444–1544), in his ''Dr̥kkaraṇa'', relates how Parahita was created based o ...

system of astronomical computations introduced by

Haridatta Haridatta (c. 683 CE) was an astronomer-mathematician of Kerala, India, who is believed to be the promulgator of the Parahita system of astronomical computations. This system of computations is widely popular in Kerala and Tamil Nadu. According ...

(ca. 683 CE), though simplified the computational processes, required long tables of numbers for its effective implementation. For timely use of these numbers they had to be memorised in toto and probably the system of constructing astronomical ''Vākya''s arose as an answer to this problem. The

provided the most convenient medium for constructing easily memorable

mnemonic A mnemonic ( ) device, or memory device, is any learning technique that aids information retention or retrieval (remembering) in the human memory for better understanding. Mnemonics make use of elaborative encoding, retrieval cues, and image ...

s for the numbers in these tables. ''Chandravākyās'' ascribed to Vararuci are the earliest example of such a set of

s. The period of Vararuci of

tradition has been determined as around fourth century CE and the year of the promulgation of the ''Parahita'' system is known to be 683 CE, Vararuci's ''Chandravākyās'' should have been around at the time of the institution of the ''Parahita'' system. Besides Vararuci's ''Vākya''s, several other sets of ''Vākyas'' had been composed by astronomers and mathematicians of the Kerala school. While Vararuci's ''Vākya''s contain a list of 248 numbers, another set of ''Vākyas'' relating to

's motion contains 3031 numbers. There is a set of 2075 ''Vākya''s called ''Samudra-vākyas'' or ''Maṇḍala-vākyas'' or ''Kujādi-pañcagraha-mahāvākyas'' relating to the motion of the five planets Kuja (

Mars Mars is the fourth planet from the Sun and the second-smallest planet in the Solar System, only being larger than Mercury. In the English language, Mars is named for the Roman god of war. Mars is a terrestrial planet with a thin atmos ...

), Budha ( Mercury), Guru (

Jupiter Jupiter is the fifth planet from the Sun and the largest in the Solar System. It is a gas giant with a mass more than two and a half times that of all the other planets in the Solar System combined, but slightly less than one-thousandt ...

), Bhrigu (

Venus Venus is the second planet from the Sun. It is sometimes called Earth's "sister" or "twin" planet as it is almost as large and has a similar composition. As an interior planet to Earth, Venus (like Mercury) appears in Earth's sky never f ...

) and Sani (

Saturn Saturn is the sixth planet from the Sun and the second-largest in the Solar System, after Jupiter. It is a gas giant with an average radius of about nine and a half times that of Earth. It has only one-eighth the average density of Earth; ...

). There are also lists of ''Vākya''s encoding other mathematical tables like

Madhava's sine table Madhava's sine table is the table of trigonometric sines of various angles constructed by the 14th century Kerala mathematician-astronomer Madhava of Sangamagrama. The table lists the trigonometric sines of the twenty-four angles 3.75°, 7.50 ...

''Vākya-pañcāṅga''

The first known text to use these ''Chandravākyas''s is

's manual on his ''Parahita'' system, known as ''Graha-cāra-nibandhana''. The next major work that makes use of the mnemonic system of the ''Vākya''s which has down to us is ''Vākya-karaṇa'' (''karaṇa'', or computations, utilising ''Vākya''s). The authorship of this work is uncertain, but, is apocryphally assigned to Vararuci. The work is known to have been composed around 1300 CE. It has been extensively commented upon by Sundararaja (c.1500 CE) of Trichinopopy of

Tamil Nadu Tamil Nadu (; , TN) is a state in southern India. It is the tenth largest Indian state by area and the sixth largest by population. Its capital and largest city is Chennai. Tamil Nadu is the home of the Tamil people, whose Tamil languag ...

. The almanac makers of

fully make use of this ''Vākya-karaṇa'' for computing the almanacs. These almanacs are known as ''Vākya-pañcāṅga''s.

Numbers encoded in ''Chandravākyās''

The

's orbit approximates an ellipse rather than a circle. The orientation and the shape of this

orbit In celestial mechanics, an orbit is the curved trajectory of an object such as the trajectory of a planet around a star, or of a natural satellite around a planet, or of an artificial satellite around an object or position in space such a ...

is not fixed. In particular, the positions of the extreme points, the point of closest approach (

perigee An apsis (; ) is the farthest or nearest point in the orbit of a planetary body about its primary body. For example, the apsides of the Earth are called the aphelion and perihelion. General description There are two apsides in any ell ...

) and the point of farthest excursion (

apogee An apsis (; ) is the farthest or nearest point in the orbit of a planetary body about its primary body. For example, the apsides of the Earth are called the aphelion and perihelion. General description There are two apsides in any el ...

), make a full circle in about nine years. It takes the

longer to return to the same position,

, because it moved ahead during one revolution. This longer period is called the

anomalistic month In lunar calendars, a lunar month is the time between two successive syzygies of the same type: new moons or full moons. The precise definition varies, especially for the beginning of the month. Variations In Shona, Middle Eastern, and Europ ...

, and has an average length of 27.554551 days (27 d 13 h 18 min 33.2 s). The apparent diameter of the Moon varies with this period. 9

s constitute a period of approximately 248 days. The differences in the

longitude Longitude (, ) is a geographic coordinate that specifies the east– west position of a point on the surface of the Earth, or another celestial body. It is an angular measurement, usually expressed in degrees and denoted by the Greek let ...

s of the Moon on the successive days of a 248-day cycle constitute the ''Chandravākyas''. Each set of ''Chandravākyas'' contains a list of 248 ''Vākyās'' or sentences.

''Vākya'' tradition

''Vākya-pañcāṅga''

Numbers encoded in ''Chandravākyās''

See also

References

Further reading