Katyayana may refer to: Katyayana (Buddhist), a disciple of Gautama Buddha. Katyayana (mathematician), an Indian mathematician. Other related archivesGautama Buddha, Indian, Katyayana (Buddhist), Katyayana (mathematician), mathematician

Read more here: » Katyayana: Encyclopedia - Katyayana

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Katyayana's expansion of sutra 4.1.175

Sutra IV.1.168 (janapada.shabdat.kshatriyad aÑ) is important. Grammatically, it teaches that the affix aÑ (or Ñyan, iÑ etc) comes after a word which is both the name of a country and a Kshatriya tribe settled therein. Here the identity of janapada and the powerful Kshatriya clans settled there is repeated. The ruling Kshatriyas inhabiting these janapadas were, as we are informed by Katyayana (2nd c BC), governed by two-fold constitutions; some were monarchies (Ekarjat) and others were repu ...

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177

A Varttika is a work where a critical study is made of that which is said and left unsaid or imperfectly said in a Bhashya, and the ways of making it perfect by supplying the omissions therein, are given. Examples are the Varttikas of Katyayana on Paninis Sutras, of Suresvara on Sankaras Upanishad-Bhashyas, and of Kumarila Bhatta on the Sabara-Bhashya on the Karma-Mimamsa.

Excerpt from All About Hinduism by Sri Swami Sivananda

Read more here: » Varttika : Varttika in the Hindu Scriptures

The princes who ruled over these countries were Kshatriyas, and Panini's sutra 4.1.174 (te tadrajah) teaches us that the same word denoted both a descendent of the Kshatriyas i.e a citizen of janapada, as well as their king or ruler (India as Known to Panini, 1953, p 427, Dr V. S. Aggarwala; Ancient Kamboja, People and the Country, 1981, p29-31, Dr J. L. Kamboj ) Sanskrit: Kshatriya.samana.shabdat janapadat tasya rajanyapatyavat | — (Katyayana's vartika V.1.168.3) ...

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers

For Kamboja (and only the Kamboja) Panini recommends Luk of an affix with janapada of Kamboja (sutra 4.1.175: Kambojal.Luk) which importantly informs us of an EXCEPTION for KAMBOJA, such that the Kshatriya word Kamboja does not need any affix ('aÑ, Ñyan, iÑ etc) to be added to it to obtain a derivative to denote the descendents of Kamboja Kshatriyas as well as the Kshatryia ruler of Kambojas. This means that the word KAMBOJA itself denotes not only (i) the Kamboja country/j ...

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Special rule for Kamboja

Panini has also read Kamboja in the ganas to IV.2.133 (Kachhadi ) and IV.3.93 (Sindhuvadi) and has recommended adding affix like aÑ etc to obtain appropriate derivatives to denote the ancestral homeland of Kamboja Kshatriyas (abhijana) and the name of products native to the Kamboja-land as follows: Kamboja + aÑ => Kaamboja where Kaamboja denotes the ancestral homeland of the Kambojas. The same term Kaamboja may also denote a horse or an e ...

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Panini’s ganas and the Kamboja

The Ganapatha 178 on Panini's rule II.1.72 - Mayuravyamsakad'i' informs us that the Kambojas and the Yavanas observed a social custom of supporting short-cut head-hair: Sanskrit: Kamboja-mundah Yavana-mundah i.e shaved headed Kambojas, shaved headed Yavanas. This same fact is also conveyed by the Mahabharata: Sanskrit: mundanetanhanishyami danavaniva vasavah. pratigyam parayishyami Kambojan.eva ma vaha. — (MBH ...

See also:

Kambojas of Panini, Kambojas of Panini - Panini’s Sutras 4.1.168-4.1.177, Kambojas of Panini - Panini’s Kshatiya monarchies, Kambojas of Panini - Panini’s rules for janapadas and the Kshatriya settlers, Kambojas of Panini - Kshatriya tribes and their janapadas, Kambojas of Panini - Kshatiya descendents and their rulers, Kambojas of Panini - Special rule for Kamboja, Kambojas of Panini - Comments on special rule for Kamboja, Kambojas of Panini - Katyayana's expansion of sutra 4.1.175, Kambojas of Panini - Panini’s ganas and the Kamboja, Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

Read more here: » Kambojas of Panini: Encyclopedia II - Kambojas of Panini - Ganapatha on Panini’s rule and the Kambojas

The first appearance of evidence of the use of mathematics in the Indian subcontinent was in the Indus Valley Civilization, which dates back to around 3300 BC. Excavations at Harrapa, Mohenjo-daro and the surrounding area of the Indus River, have uncovered much evidence of the use of basic mathematics. The mathematics used by this early Harrapan civilisation was very much for practical means, and was primarily concerned with weights, measuring scales and a surprisingly advanced brick technology, which utilised ratios. The ratio for brick ...

See also:

Indian mathematics, Indian mathematics - Indian contributions to mathematics, Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC, Indian mathematics - Vedic Mathematics 1500 BC - 500 BC, Indian mathematics - Vedas 1500 BC - 500 BC, Indian mathematics - Samhitas 1500 BC - 500 BC, Indian mathematics - Lagadha 1350 BC - 800 BC, Indian mathematics - Yajnavalkya 1000 BC - 600 BC, Indian mathematics - Sulba Sutras 800 BC - 500 BC, Indian mathematics - Ancient Period 500 BC - 400 CE, Indian mathematics - Panini 500 BC - 400 BC, Indian mathematics - Pingala 400 BC - 200 BC, Indian mathematics - Vaychali Ganit 300 BC - 200 BC, Indian mathematics - Katyayana 200 BC, Indian mathematics - Jaina Mathematics 400 BC - 400 CE, Indian mathematics - Surya Siddhanta 300 CE - 400 CE, Indian mathematics - Classical Period 400 CE - 1200 CE, Indian mathematics - Aryabhata I 476-550, Indian mathematics - Bhaskara I 600-680, Indian mathematics - Brahmagupta 598-668, Indian mathematics - Shridhara Acharya 650-850, Indian mathematics - Mahavira Acharya 850, Indian mathematics - Aryabhata II 920-1000, Indian mathematics - Shripati Mishra 1019-1066, Indian mathematics - Nemichandra Siddhanta Chakravati 1100, Indian mathematics - Bhaskara Acharya Bhaskara II 1114-1185, Indian mathematics - Keralese Mathematics 1300 CE -1600 CE, Indian mathematics - Narayana Pandit 1340-1400, Indian mathematics - Madhava of Sangamagramma 1340-1425, Indian mathematics - Parameshvara 1370-1460, Indian mathematics - Nilakantha Somayaji 1444-1544, Indian mathematics - Jyesthadeva 1500-1575, Indian mathematics - Charges of Eurocentrism

Read more here: » Indian mathematics: Encyclopedia II - Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC

As a result of the mathematics required for the construction of religious altars, many rules and developments of geometry are found in Vedic works, along with many astronomical developments for religious purposes. These include the use of geometric shapes, including triangles, rectangles, squares, trapezia and circles, equivalence through numbers and area, squaring the circle and visa-versa, the Pythagorean theorem and Pythagorean triples, and computations of π. Vedic works also contain all four arithmetical operators (addition, subt ...

See also:

Indian mathematics, Indian mathematics - Indian contributions to mathematics, Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC, Indian mathematics - Vedic Mathematics 1500 BC - 500 BC, Indian mathematics - Vedas 1500 BC - 500 BC, Indian mathematics - Samhitas 1500 BC - 500 BC, Indian mathematics - Lagadha 1350 BC - 800 BC, Indian mathematics - Yajnavalkya 1000 BC - 600 BC, Indian mathematics - Sulba Sutras 800 BC - 500 BC, Indian mathematics - Ancient Period 500 BC - 400 CE, Indian mathematics - Panini 500 BC - 400 BC, Indian mathematics - Pingala 400 BC - 200 BC, Indian mathematics - Vaychali Ganit 300 BC - 200 BC, Indian mathematics - Katyayana 200 BC, Indian mathematics - Jaina Mathematics 400 BC - 400 CE, Indian mathematics - Surya Siddhanta 300 CE - 400 CE, Indian mathematics - Classical Period 400 CE - 1200 CE, Indian mathematics - Aryabhata I 476-550, Indian mathematics - Bhaskara I 600-680, Indian mathematics - Brahmagupta 598-668, Indian mathematics - Shridhara Acharya 650-850, Indian mathematics - Mahavira Acharya 850, Indian mathematics - Aryabhata II 920-1000, Indian mathematics - Shripati Mishra 1019-1066, Indian mathematics - Nemichandra Siddhanta Chakravati 1100, Indian mathematics - Bhaskara Acharya Bhaskara II 1114-1185, Indian mathematics - Keralese Mathematics 1300 CE -1600 CE, Indian mathematics - Narayana Pandit 1340-1400, Indian mathematics - Madhava of Sangamagramma 1340-1425, Indian mathematics - Parameshvara 1370-1460, Indian mathematics - Nilakantha Somayaji 1444-1544, Indian mathematics - Jyesthadeva 1500-1575, Indian mathematics - Charges of Eurocentrism

Read more here: » Indian mathematics: Encyclopedia II - Indian mathematics - Vedic Mathematics 1500 BC - 500 BC

The history of the theorem called Pythagorean can be divided into three parts: knowledge of Pythagorean triples, knowledge of the relationship between the sides of a right triangle, and proofs of the theorem. Circa 2500 BC, Megalithic monuments on the British Isles incorporate right triangles with integer sides. B.L. van der Waerden conjectures that these Pythagorean triples were discovered algebraically. Written between 2000 - 1786 BC, the Middle Kingdom Egyptian papyrus Berlin 6619 includes a problem, the s ...

See also:

Pythagorean theorem, Pythagorean theorem - History, Pythagorean theorem - Proofs, Pythagorean theorem - Geometrical proof, Pythagorean theorem - A visual proof, Pythagorean theorem - Converse of the theorem, Pythagorean theorem - Algebraic Proof, Pythagorean theorem - Pythagorean triples, Pythagorean theorem - Generalizations, Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry, Pythagorean theorem - Other facts, Pythagorean theorem - Notes

Read more here: » Pythagorean theorem: Encyclopedia II - Pythagorean theorem - History

Sathanang Sutra, Bhagvati Sutra and Anoyogdwar Sutra are famous books of this time. Apart from these the book titled Tatvarthaadigyam Sutra Bhashya by Jaina philosopher Omaswati (135 BC) and the book titled Tiloyapannati of Aacharya (Guru) Yativrisham (176 BC) are famous writings of this time. Indian mathematicians during this period used notations for squares, cube and other exponents of numbers. They gave shape to Beezganit Samikaran (Algebraic Equations). ...

See also:

Indian mathematics, Indian mathematics - Indian contributions to mathematics, Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC, Indian mathematics - Vedic Mathematics 1500 BC - 500 BC, Indian mathematics - Vedas 1500 BC - 500 BC, Indian mathematics - Samhitas 1500 BC - 500 BC, Indian mathematics - Lagadha 1350 BC - 800 BC, Indian mathematics - Yajnavalkya 1000 BC - 600 BC, Indian mathematics - Sulba Sutras 800 BC - 500 BC, Indian mathematics - Ancient Period 500 BC - 400 CE, Indian mathematics - Panini 500 BC - 400 BC, Indian mathematics - Pingala 400 BC - 200 BC, Indian mathematics - Vaychali Ganit 300 BC - 200 BC, Indian mathematics - Katyayana 200 BC, Indian mathematics - Jaina Mathematics 400 BC - 400 CE, Indian mathematics - Surya Siddhanta 300 CE - 400 CE, Indian mathematics - Classical Period 400 CE - 1200 CE, Indian mathematics - Aryabhata I 476-550, Indian mathematics - Bhaskara I 600-680, Indian mathematics - Brahmagupta 598-668, Indian mathematics - Shridhara Acharya 650-850, Indian mathematics - Mahavira Acharya 850, Indian mathematics - Aryabhata II 920-1000, Indian mathematics - Shripati Mishra 1019-1066, Indian mathematics - Nemichandra Siddhanta Chakravati 1100, Indian mathematics - Bhaskara Acharya Bhaskara II 1114-1185, Indian mathematics - Keralese Mathematics 1300 CE -1600 CE, Indian mathematics - Narayana Pandit 1340-1400, Indian mathematics - Madhava of Sangamagramma 1340-1425, Indian mathematics - Parameshvara 1370-1460, Indian mathematics - Nilakantha Somayaji 1444-1544, Indian mathematics - Jyesthadeva 1500-1575, Indian mathematics - Charges of Eurocentrism

Read more here: » Indian mathematics: Encyclopedia II - Indian mathematics - Ancient Period 500 BC - 400 CE

This theorem may have a greater variety of known proofs than any other (the law of quadratic reciprocity being also a contender for that distinction); the book Pythagorean Proposition, by Elisha Scott Loomis, contains over 250 different proofs. James Garfield, who later became a President of the United States, devised an original proof of the Pythagorean theorem in 1876. The external links below provide a sampling of the many different proofs of the Pythagorean theorem. Pythagorean theorem - Geometrical proof. Like many of the proofs of the Pythagorean theorem, this one is based on the proporti ...

See also:

Pythagorean theorem, Pythagorean theorem - History, Pythagorean theorem - Proofs, Pythagorean theorem - Geometrical proof, Pythagorean theorem - A visual proof, Pythagorean theorem - Converse of the theorem, Pythagorean theorem - Algebraic Proof, Pythagorean theorem - Pythagorean triples, Pythagorean theorem - Generalizations, Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry, Pythagorean theorem - Other facts, Pythagorean theorem - Notes

Read more here: » Pythagorean theorem: Encyclopedia II - Pythagorean theorem - Proofs

A Pythagorean triple consists of three positive integers a, b, and c, such that a2 + b2 = c2. In other words, a Pythagorean triple represents the lengths of the sides of a right triangle where all three sides have integer lengths. Evidence from megalithic monuments on the British Isles shows that such triples were known before the discovery of writing. Such a triple is commonly written (a, b,  ...

See also:

Pythagorean theorem, Pythagorean theorem - History, Pythagorean theorem - Proofs, Pythagorean theorem - Geometrical proof, Pythagorean theorem - A visual proof, Pythagorean theorem - Converse of the theorem, Pythagorean theorem - Algebraic Proof, Pythagorean theorem - Pythagorean triples, Pythagorean theorem - Generalizations, Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry, Pythagorean theorem - Other facts, Pythagorean theorem - Notes

Read more here: » Pythagorean theorem: Encyclopedia II - Pythagorean theorem - Pythagorean triples

The Pythagorean theorem is derived from the axioms of Euclidean geometry, and in fact, the Euclidean form of the Pythagorean theorem given above does not hold in non-Euclidean geometry. For example, in spherical geometry, all three sides of the right triangle bounding an octant of the unit sphere have length equal to π / 2; this violates the Euclidean Pythagorean theorem because . This means that in non-Euclidean geometry, the Pythagorean theorem must necessarily take a different form from the Euclidean t ...

See also:

Pythagorean theorem, Pythagorean theorem - History, Pythagorean theorem - Proofs, Pythagorean theorem - Geometrical proof, Pythagorean theorem - A visual proof, Pythagorean theorem - Converse of the theorem, Pythagorean theorem - Algebraic Proof, Pythagorean theorem - Pythagorean triples, Pythagorean theorem - Generalizations, Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry, Pythagorean theorem - Other facts, Pythagorean theorem - Notes

Read more here: » Pythagorean theorem: Encyclopedia II - Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry

In heraldry, the Pythagorean theorem appears as a charge in the arms of Seissenegger. The theorem is referenced in an episode of The Simpsons. After finding a pair of glasses at the Nuclear Power Plant, Homer puts them on and in an attempt to sound smart, comments "the square roots of any two sides of an isosceles triangle is equal to the square root of the remaining side." A man in a nearby toilet stall then yells out "That's a right triangle, you idiot!" (This was a homage to The Wizard of Oz. When the Scarecrow receives his diploma from the Wizar ...

See also:

Pythagorean theorem, Pythagorean theorem - History, Pythagorean theorem - Proofs, Pythagorean theorem - Geometrical proof, Pythagorean theorem - A visual proof, Pythagorean theorem - Converse of the theorem, Pythagorean theorem - Algebraic Proof, Pythagorean theorem - Pythagorean triples, Pythagorean theorem - Generalizations, Pythagorean theorem - The Pythagorean theorem in non-Euclidean geometry, Pythagorean theorem - Other facts, Pythagorean theorem - Notes

Read more here: » Pythagorean theorem: Encyclopedia II - Pythagorean theorem - Other facts

This period is often known as the golden age of Indian Mathematics. Although earlier Indian mathematics was also very significant, this period saw great mathematicians such as Aryabhatta, Brahmagupta, Mahavira Acharya and Bhaskara Acharya give a broad and clear shape to almost all the branches of mathematics. Their important contributions to mathematics would spread throughout Asia and the Middle East, and eventually Europe and other parts of the world ...

See also:

Indian mathematics, Indian mathematics - Indian contributions to mathematics, Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC, Indian mathematics - Vedic Mathematics 1500 BC - 500 BC, Indian mathematics - Vedas 1500 BC - 500 BC, Indian mathematics - Samhitas 1500 BC - 500 BC, Indian mathematics - Lagadha 1350 BC - 800 BC, Indian mathematics - Yajnavalkya 1000 BC - 600 BC, Indian mathematics - Sulba Sutras 800 BC - 500 BC, Indian mathematics - Ancient Period 500 BC - 400 CE, Indian mathematics - Panini 500 BC - 400 BC, Indian mathematics - Pingala 400 BC - 200 BC, Indian mathematics - Vaychali Ganit 300 BC - 200 BC, Indian mathematics - Katyayana 200 BC, Indian mathematics - Jaina Mathematics 400 BC - 400 CE, Indian mathematics - Surya Siddhanta 300 CE - 400 CE, Indian mathematics - Classical Period 400 CE - 1200 CE, Indian mathematics - Aryabhata I 476-550, Indian mathematics - Bhaskara I 600-680, Indian mathematics - Brahmagupta 598-668, Indian mathematics - Shridhara Acharya 650-850, Indian mathematics - Mahavira Acharya 850, Indian mathematics - Aryabhata II 920-1000, Indian mathematics - Shripati Mishra 1019-1066, Indian mathematics - Nemichandra Siddhanta Chakravati 1100, Indian mathematics - Bhaskara Acharya Bhaskara II 1114-1185, Indian mathematics - Keralese Mathematics 1300 CE -1600 CE, Indian mathematics - Narayana Pandit 1340-1400, Indian mathematics - Madhava of Sangamagramma 1340-1425, Indian mathematics - Parameshvara 1370-1460, Indian mathematics - Nilakantha Somayaji 1444-1544, Indian mathematics - Jyesthadeva 1500-1575, Indian mathematics - Charges of Eurocentrism

Read more here: » Indian mathematics: Encyclopedia II - Indian mathematics - Classical Period 400 CE - 1200 CE

The Kerala School was a school of mathematics and astronomy founded by Madhava in Kerala (in South India) which included as its prominent members Parameshvara, Neelakanta Somayaji, Jyeshtadeva, Achyuta Pisharati, Melpathur Narayana Bhattathiri and Achyuta Panikkar. It flourished between the 14th and 16th centuries and has its intellectual roots with Aryabhatta who lived in the 5th century. The lineage continues down to modern times but the original research seems to have ended with Narayana Bhattathiri (1559-1632). These astronomers, in atte ...

See also:

Indian mathematics, Indian mathematics - Indian contributions to mathematics, Indian mathematics - Harappan Mathematics 3300 BC - 1700 BC, Indian mathematics - Vedic Mathematics 1500 BC - 500 BC, Indian mathematics - Vedas 1500 BC - 500 BC, Indian mathematics - Samhitas 1500 BC - 500 BC, Indian mathematics - Lagadha 1350 BC - 800 BC, Indian mathematics - Yajnavalkya 1000 BC - 600 BC, Indian mathematics - Sulba Sutras 800 BC - 500 BC, Indian mathematics - Ancient Period 500 BC - 400 CE, Indian mathematics - Panini 500 BC - 400 BC, Indian mathematics - Pingala 400 BC - 200 BC, Indian mathematics - Vaychali Ganit 300 BC - 200 BC, Indian mathematics - Katyayana 200 BC, Indian mathematics - Jaina Mathematics 400 BC - 400 CE, Indian mathematics - Surya Siddhanta 300 CE - 400 CE, Indian mathematics - Classical Period 400 CE - 1200 CE, Indian mathematics - Aryabhata I 476-550, Indian mathematics - Bhaskara I 600-680, Indian mathematics - Brahmagupta 598-668, Indian mathematics - Shridhara Acharya 650-850, Indian mathematics - Mahavira Acharya 850, Indian mathematics - Aryabhata II 920-1000, Indian mathematics - Shripati Mishra 1019-1066, Indian mathematics - Nemichandra Siddhanta Chakravati 1100, Indian mathematics - Bhaskara Acharya Bhaskara II 1114-1185, Indian mathematics - Keralese Mathematics 1300 CE -1600 CE, Indian mathematics - Narayana Pandit 1340-1400, Indian mathematics - Madhava of Sangamagramma 1340-1425, Indian mathematics - Parameshvara 1370-1460, Indian mathematics - Nilakantha Somayaji 1444-1544, Indian mathematics - Jyesthadeva 1500-1575, Indian mathematics - Charges of Eurocentrism

Read more here: » Indian mathematics: Encyclopedia II - Indian mathematics - Keralese Mathematics 1300 CE -1600 CE

Mahabhashya mahabhasya (Sanskrit) (from maha great + bhashya commentary on technical sutras, usually in the vernacular)

Great commentary; Patanjali's Commentary on the Sutras (Grammar) of Panini and the Varttikas of Katyayana (Katyayana's critical annotations of Panini's Sutras). Sometimes referred to simply as the Bhashya, it is one of the three known writings of Patanjali.

(See also: Mahabhashya, mahabhasya, Mysticism, Mysticism Dictionary, Occultism, Occultism Dictionary)

Abhidharma (Sanskrit). The metaphysical (third) part of Tripitaka, a very philosophical Buddhist work by Katyayana.

(See also: Abhidharma, Theosophy, Spirituality, Body mind and Soul, Spiritual Dictionary, )