Ancient Greek mathematics refers to the history of mathematical ideas and texts in

Ancient Greece Ancient Greece () was a northeastern Mediterranean civilization, existing from the Greek Dark Ages of the 12th–9th centuries BC to the end of classical antiquity (), that comprised a loose collection of culturally and linguistically r ...

during classical and

late antiquity Late antiquity marks the period that comes after the end of classical antiquity and stretches into the onset of the Early Middle Ages. Late antiquity as a period was popularized by Peter Brown (historian), Peter Brown in 1971, and this periodiza ...

, mostly from the 5th century BC to the 6th century AD. Greek mathematicians lived in cities spread around the shores of the ancient

Mediterranean The Mediterranean Sea ( ) is a sea connected to the Atlantic Ocean, surrounded by the Mediterranean basin and almost completely enclosed by land: on the east by the Levant in West Asia, on the north by Anatolia in West Asia and Southern ...

, from

Anatolia Anatolia (), also known as Asia Minor, is a peninsula in West Asia that makes up the majority of the land area of Turkey. It is the westernmost protrusion of Asia and is geographically bounded by the Mediterranean Sea to the south, the Aegean ...

Italy Italy, officially the Italian Republic, is a country in Southern Europe, Southern and Western Europe, Western Europe. It consists of Italian Peninsula, a peninsula that extends into the Mediterranean Sea, with the Alps on its northern land b ...

and

North Africa North Africa (sometimes Northern Africa) is a region encompassing the northern portion of the African continent. There is no singularly accepted scope for the region. However, it is sometimes defined as stretching from the Atlantic shores of t ...

, but were united by

Greek culture The culture of Greece has evolved over thousands of years, beginning in Minoan and later in Mycenaean Greece, continuing most notably into Classical Greece, while influencing the Roman Empire and its successor the Byzantine Empire. Other cultu ...

and the

Greek language Greek (, ; , ) is an Indo-European languages, Indo-European language, constituting an independent Hellenic languages, Hellenic branch within the Indo-European language family. It is native to Greece, Cyprus, Italy (in Calabria and Salento), south ...

. The development of mathematics as a theoretical discipline and the use of

deductive reasoning Deductive reasoning is the process of drawing valid inferences. An inference is valid if its conclusion follows logically from its premises, meaning that it is impossible for the premises to be true and the conclusion to be false. For example, t ...

in proofs is an important difference between Greek mathematics and those of preceding civilizations. The early history of Greek mathematics is obscure, and traditional narratives of

mathematical theorems Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

found before the fifth century BC are regarded as later inventions. It is now generally accepted that treatises of deductive mathematics written in Greek began circulating around the mid-fifth century BC, but the earliest complete work on the subject is the '' Elements'', written during the

Hellenistic period In classical antiquity, the Hellenistic period covers the time in Greek history after Classical Greece, between the death of Alexander the Great in 323 BC and the death of Cleopatra VII in 30 BC, which was followed by the ascendancy of the R ...

. The works of renown mathematicians

Archimedes Archimedes of Syracuse ( ; ) was an Ancient Greece, Ancient Greek Greek mathematics, mathematician, physicist, engineer, astronomer, and Invention, inventor from the ancient city of Syracuse, Sicily, Syracuse in History of Greek and Hellenis ...

and

Apollonius Apollonius () is a masculine given name which may refer to: People Ancient world Artists * Apollonius of Athens (sculptor) (fl. 1st century BC) * Apollonius of Tralles (fl. 2nd century BC), sculptor * Apollonius (satyr sculptor) * Apo ...

, as well as of the astronomer

Hipparchus Hipparchus (; , ; BC) was a Ancient Greek astronomy, Greek astronomer, geographer, and mathematician. He is considered the founder of trigonometry, but is most famous for his incidental discovery of the precession of the equinoxes. Hippar ...

, also belong to this period. In the

Imperial Roman The Roman Empire ruled the Mediterranean and much of Europe, Western Asia and North Africa. The Roman people, Romans conquered most of this during the Roman Republic, Republic, and it was ruled by emperors following Octavian's assumption of ...

era,

Ptolemy Claudius Ptolemy (; , ; ; – 160s/170s AD) was a Greco-Roman mathematician, astronomer, astrologer, geographer, and music theorist who wrote about a dozen scientific treatises, three of which were important to later Byzantine science, Byzant ...

used trigonometry to determine the positions of stars in the sky, while

Nicomachus Nicomachus of Gerasa (; ) was an Ancient Greek Neopythagorean philosopher from Gerasa, in the Roman province of Syria (now Jerash, Jordan). Like many Pythagoreans, Nicomachus wrote about the mystical properties of numbers, best known for his ...

and other ancient philosophers revived ancient

number theory Number theory is a branch of pure mathematics devoted primarily to the study of the integers and arithmetic functions. Number theorists study prime numbers as well as the properties of mathematical objects constructed from integers (for example ...

and harmonics. During

Pappus of Alexandria Pappus of Alexandria (; ; AD) was a Greek mathematics, Greek mathematician of late antiquity known for his ''Synagoge'' (Συναγωγή) or ''Collection'' (), and for Pappus's hexagon theorem in projective geometry. Almost nothing is known a ...

wrote his ''Collection'', summarizing the work of his predecessors, while

Diophantus Diophantus of Alexandria () (; ) was a Greek mathematician who was the author of the '' Arithmetica'' in thirteen books, ten of which are still extant, made up of arithmetical problems that are solved through algebraic equations. Although Jose ...

' ''

Arithmetica Diophantus of Alexandria () (; ) was a Greek mathematics, Greek mathematician who was the author of the ''Arithmetica'' in thirteen books, ten of which are still extant, made up of arithmetical problems that are solved through algebraic equations ...

'' dealt with the solution of arithmetic problems by way of pre-modern algebra. Later authors such as

Theon of Alexandria Theon of Alexandria (; ; ) was a Greek scholar and mathematician who lived in Alexandria, Egypt. He edited and arranged Euclid's '' Elements'' and wrote commentaries on works by Euclid and Ptolemy. His daughter Hypatia also won fame as a mathema ...

, his daughter

Hypatia Hypatia (born 350–370 – March 415 AD) was a Neoplatonist philosopher, astronomer, and mathematician who lived in Alexandria, Egypt (Roman province), Egypt: at that time a major city of the Eastern Roman Empire. In Alexandria, Hypatia was ...

, and

Eutocius of Ascalon Eutocius of Ascalon (; ; 480s – 520s) was a Greek mathematician who wrote commentaries on several Archimedean treatises and on the Apollonian ''Conics''. Life and work Little is known about the life of Eutocius. He was born in Ascalon, ...

wrote commentaries on the authors making up the ancient Greek mathematical corpus. The works of ancient Greek mathematicians were copied in the Byzantine period and translated into Arabic and Latin, where they exerted influence on mathematics in the Islamic world and in Medieval Europe. During the

Renaissance The Renaissance ( , ) is a Periodization, period of history and a European cultural movement covering the 15th and 16th centuries. It marked the transition from the Middle Ages to modernity and was characterized by an effort to revive and sur ...

, the texts of Euclid, Archimedes, Apollonius, and Pappus in particular went on to influence the development of

early modern The early modern period is a Periodization, historical period that is defined either as part of or as immediately preceding the modern period, with divisions based primarily on the history of Europe and the broader concept of modernity. There i ...

mathematics. Some problems in Ancient Greek mathematics were solved only in the modern era by mathematicians such as

Carl Gauss Carl may refer to: *Carl, Georgia, city in USA *Carl, West Virginia, an unincorporated community *Carl (name), includes info about the name, variations of the name, and a list of people with the name *Carl², a TV series * "Carl", an episode of tel ...

, and attempts to prove or disprove Euclid's parallel line postulate spurred the development of

non-Euclidean geometry In mathematics, non-Euclidean geometry consists of two geometries based on axioms closely related to those that specify Euclidean geometry. As Euclidean geometry lies at the intersection of metric geometry and affine geometry, non-Euclidean ge ...

. Ancient Greek mathematics was not limited to theoretical works but was also used in other activities, such as business transactions and land mensuration, as evidenced by extant texts where computational procedures and practical considerations took more of a central role.

Etymology

The Greek word () derives from ( 'lesson'), and ultimately from the verb ( 'I learn'). Strictly speaking, a could be any branch of learning, or anything learnt; however, since antiquity certain were granted special status:

arithmetic Arithmetic is an elementary branch of mathematics that deals with numerical operations like addition, subtraction, multiplication, and division. In a wider sense, it also includes exponentiation, extraction of roots, and taking logarithms. ...

geometry Geometry (; ) is a branch of mathematics concerned with properties of space such as the distance, shape, size, and relative position of figures. Geometry is, along with arithmetic, one of the oldest branches of mathematics. A mathematician w ...

astronomy Astronomy is a natural science that studies celestial objects and the phenomena that occur in the cosmos. It uses mathematics, physics, and chemistry in order to explain their origin and their overall evolution. Objects of interest includ ...

, and

harmonics In physics, acoustics, and telecommunications, a harmonic is a sinusoidal wave with a frequency that is a positive integer multiple of the ''fundamental frequency'' of a periodic signal. The fundamental frequency is also called the ''1st harm ...

. These four , which appear listed together around the time of Archytas and Plato, would later become the medieval

quadrivium From the time of Plato through the Middle Ages, the ''quadrivium'' (plural: quadrivia) was a grouping of four subjects or arts—arithmetic, geometry, music, and astronomy—that formed a second curricular stage following preparatory work in th ...

Origins

The origins of Greek mathematics are not well understood. The earliest advanced civilizations in Greece were the

Minoan The Minoan civilization was a Bronze Age culture which was centered on the island of Crete. Known for its monumental architecture and Minoan art, energetic art, it is often regarded as the first civilization in Europe. The ruins of the Minoan pa ...

and later Mycenaean civilizations, both of which flourished in the second half of the

Bronze Age The Bronze Age () was a historical period characterised principally by the use of bronze tools and the development of complex urban societies, as well as the adoption of writing in some areas. The Bronze Age is the middle principal period of ...

. While these civilizations possessed writing, and many

Linear B Linear B is a syllabary, syllabic script that was used for writing in Mycenaean Greek, the earliest Attested language, attested form of the Greek language. The script predates the Greek alphabet by several centuries, the earliest known examp ...

tablets and similar objects have been deciphered, no mathematical writings have yet been discovered. The mathematics from the preceding Babylonian and Egyptian civilizations were primarily focused on land mensuration and accounting. Although some problems were contrived to be challenging beyond any obvious practical application, there are no signs of explicit theoretical concerns as found in Ancient Greek mathematics. It is generally thought that Babylonian and

Egyptian mathematics Ancient Egyptian mathematics is the mathematics that was developed and used in Ancient Egypt 3000 to c. , from the Old Kingdom of Egypt until roughly the beginning of Hellenistic Egypt. The ancient Egyptians utilized a numeral system for counti ...

had an influence on the younger Greek culture, possibly through an oral tradition of mathematical problems over the course of centuries, though no direct evidence of transmission is available. When Greek writing re-emerged in the 7th century BC, following the

Late Bronze Age collapse The Late Bronze Age collapse was a period of societal collapse in the Mediterranean basin during the 12th century BC. It is thought to have affected much of the Eastern Mediterranean and Near East, in particular Egypt, Anatolia, the Aegea ...

, it was based on an entirely new system derived from the

Phoenician alphabet The Phoenician alphabet is an abjad (consonantal alphabet) used across the Mediterranean civilization of Phoenicia for most of the 1st millennium BC. It was one of the first alphabets, attested in Canaanite and Aramaic inscriptions fo ...

, with Egyptian

papyrus Papyrus ( ) is a material similar to thick paper that was used in ancient times as a writing surface. It was made from the pith of the papyrus plant, ''Cyperus papyrus'', a wetland sedge. ''Papyrus'' (plural: ''papyri'' or ''papyruses'') can a ...

being the preferred medium. Because the earliest known mathematical treatises in Greek, starting with

Hippocrates of Chios Hippocrates of Chios (; c. 470 – c. 421 BC) was an ancient Greek mathematician, geometer, and astronomer. He was born on the isle of Chios, where he was originally a merchant. After some misadventures (he was robbed by either pirates or ...

in the 5th century BC, have been lost, the early history of Greek mathematics must be reconstructed from information passed down through later authors, beginning in the mid-4th century BC. Much of the knowledge about early Greek mathematics is thanks to references by Plato, Aristotle, and from quotations of

Eudemus of Rhodes Eudemus of Rhodes (; ) was an ancient Greek philosopher, considered the first historian of science. He was one of Aristotle's most important pupils, editing his teacher's work and making it more easily accessible. Eudemus' nephew, Pasicles, was al ...

' histories of mathematics by later authors. These references provide near-contemporary accounts for many mathematicians active in the 4th century BC. Euclid's ''Elements'' is also believed to contain many theorems that are attributed to mathematicians in the preceding centuries.

Archaic period

Ancient Greek tradition attributes the origin of Greek mathematics to either

Thales of Miletus Thales of Miletus ( ; ; ) was an Ancient Greek pre-Socratic philosopher from Miletus in Ionia, Asia Minor. Thales was one of the Seven Sages, founding figures of Ancient Greece. Beginning in eighteenth-century historiography, many came to ...

(7th century BC), one of the legendary

Seven Sages of Greece The Seven Sages or Seven Wise Men was the title given to seven philosophers, statesmen, and law-givers of the 7th–6th centuries BCE who were renowned for their wisdom Wisdom, also known as sapience, is the ability to apply knowledge, ...

, or to

Pythagoras of Samos Pythagoras of Samos (; BC) was an ancient Ionian Greek philosopher, polymath, and the eponymous founder of Pythagoreanism. His political and religious teachings were well known in Magna Graecia and influenced the philosophies of P ...

(6th century BC), both of whom supposedly visited Egypt and Babylon and learned mathematics there. However, modern scholarship tends to be skeptical of such claims as neither Thales or Pythagoras left any writings that were available in the Classical period. Additionally, widespread literacy and the scribal culture that would have supported the transmission of mathematical treatises did not emerge fully until the 5th century; the

oral literature Oral literature, orature, or folk literature is a genre of literature that is spoken or sung in contrast to that which is written, though much oral literature has been transcribed. There is no standard definition, as anthropologists have used v ...

of their time was primarily focused on public speeches and recitations of poetry. The standard view among historians is that the discoveries Thales and Pythagoras are credited with, such as

Thales' Theorem In geometry, Thales's theorem states that if , , and are distinct points on a circle where the line is a diameter, the angle is a right angle. Thales's theorem is a special case of the inscribed angle theorem and is mentioned and proved as pa ...

, the

Pythagorean theorem In mathematics, the Pythagorean theorem or Pythagoras' theorem is a fundamental relation in Euclidean geometry between the three sides of a right triangle. It states that the area of the square whose side is the hypotenuse (the side opposite t ...

, and the

Platonic solids In geometry, a Platonic solid is a convex, regular polyhedron in three-dimensional Euclidean space. Being a regular polyhedron means that the faces are congruent (identical in shape and size) regular polygons (all angles congruent and all edge ...

, are the product of attributions by much later authors.

Classical Greece

The earliest traces of Greek mathematical treatises appear in the second half of the fifth century BC. According to Eudemus,

was the first to write a book of ''Elements'' in the tradition later continued by Euclid. Fragments from another treatise written by Hippocrates on lunes also survives, possibly as an attempt to

square the circle Squaring the circle is a problem in geometry first proposed in Greek mathematics. It is the challenge of constructing a square with the area of a given circle by using only a finite number of steps with a compass and straightedge. The diffic ...

. Eudemus' states that Hippocrates studied with an astronomer named Oenopides of Chios. Other mathematicians associated with Chios include Andron and Zenodotus, who may be associated with a "school of Oenopides" mentioned by Proclus. Although many stories of the early Pythagoreans are likely apocryphal, including stories about people being drowned or exiled for sharing mathematical discoveries, some fifth-century Pythagoreans may have contributed to mathematics. Beginning with

Philolaus of Croton Philolaus (; , ''Philólaos''; ) was a Greek Pythagorean and pre-Socratic philosopher. He was born in a Greek colony in Italy and migrated to Greece. Philolaus has been called one of three most prominent figures in the Pythagorean tradition and t ...

, a contemporary of

Socrates Socrates (; ; – 399 BC) was a Ancient Greek philosophy, Greek philosopher from Classical Athens, Athens who is credited as the founder of Western philosophy and as among the first moral philosophers of the Ethics, ethical tradition ...

, studies in arithmetic, geometry, astronomy, and harmonics became increasingly associated with

Pythagoreanism Pythagoreanism originated in the 6th century BC, based on and around the teachings and beliefs held by Pythagoras and his followers, the Pythagoreans. Pythagoras established the first Pythagorean community in the Ancient Greece, ancient Greek co ...

. Fragments of Philolaus' work are preserved in quotations from later authors. Aristotle is one of the earliest authors to associate Pythagoreanism with mathematics, though he never attributed anything specifically to Pythagoras. Other extant evidence shows fifth-century philosophers' acquaintance with mathematics:

Antiphon An antiphon ( Greek ἀντίφωνον, ἀντί "opposite" and φωνή "voice") is a short chant in Christian ritual, sung as a refrain. The texts of antiphons are usually taken from the Psalms or Scripture, but may also be freely compo ...

claimed to be able to construct a rectilinear figure with the same area as a given circle, while

Hippias Hippias of Elis (; ; late 5th century BC) was a Greek sophist, and a contemporary of Socrates. With an assurance characteristic of the later sophists, he claimed to be regarded as an authority on all subjects, and lectured on poetry, grammar, his ...

is credited with a method for squaring a circle with a neusis construction.

Protagoras Protagoras ( ; ; )Guthrie, p. 262–263. was a pre-Socratic Greek philosopher and rhetorical theorist. He is numbered as one of the sophists by Plato. In his dialogue '' Protagoras'', Plato credits him with inventing the role of the professional ...

and

Democritus Democritus (, ; , ''Dēmókritos'', meaning "chosen of the people"; – ) was an Ancient Greece, Ancient Greek Pre-Socratic philosophy, pre-Socratic philosopher from Abdera, Thrace, Abdera, primarily remembered today for his formulation of an ...

debated the possibility for a line to intersect a circle at a single point. According to Archimedes, Democritus also asserted, apparently without proof, that the area of a cone was 1/3 the area of a cylinder with the same base, a result which was later proved by

Eudoxus of Cnidus Eudoxus of Cnidus (; , ''Eúdoxos ho Knídios''; ) was an Ancient Greece, ancient Greek Ancient Greek astronomy, astronomer, Greek mathematics, mathematician, doctor, and lawmaker. He was a student of Archytas and Plato. All of his original work ...

Mathematics in the time of Plato

While Plato was not a mathematician, numerous early mathematicians were associated with

Plato Plato ( ; Greek language, Greek: , ; born BC, died 348/347 BC) was an ancient Greek philosopher of the Classical Greece, Classical period who is considered a foundational thinker in Western philosophy and an innovator of the writte ...

or with his

Academy An academy (Attic Greek: Ἀκαδήμεια; Koine Greek Ἀκαδημία) is an institution of tertiary education. The name traces back to Plato's school of philosophy, founded approximately 386 BC at Akademia, a sanctuary of Athena, the go ...

. Familiarity with mathematicians' work is also reflected in several Platonic dialogues were mathematics are mentioned, including the ''

Meno ''Meno'' (; , ''Ménōn'') is a Socratic dialogue written by Plato around 385 BC., but set at an earlier date around 402 BC. Meno begins the dialogue by asking Socrates whether virtue (in , '' aretē'') can be taught, acquired by practice, o ...

'', the '' Theaetetus'', the ''

Republic A republic, based on the Latin phrase ''res publica'' ('public affair' or 'people's affair'), is a State (polity), state in which Power (social and political), political power rests with the public (people), typically through their Representat ...

'', and the '' Timaeus''.

Archytas Archytas (; ; 435/410–360/350 BC) was an Ancient Greek mathematician, music theorist, statesman, and strategist from the ancient city of Taras (Tarentum) in Southern Italy. He was a scientist and philosopher affiliated with the Pythagorean ...

, a Pythagorean philosopher from Tarentum, was a friend of Plato who made several contributions to mathematics, including solving the problem of

doubling the cube Doubling the cube, also known as the Delian problem, is an ancient geometry, geometric problem. Given the Edge (geometry), edge of a cube, the problem requires the construction of the edge of a second cube whose volume is double that of the first ...

, now known to be impossible with only a compass and a straightedge, using an alternative method. He also systematized the study of means, and possibly worked on optics and mechanics. Archytas has been credited with early material found in Books VII–IX of the ''Elements'', which deal with

elementary number theory Number theory is a branch of pure mathematics devoted primarily to the study of the integers and arithmetic functions. Number theorists study prime numbers as well as the properties of mathematical objects constructed from integers (for exampl ...

. Theaetetus is one of the main characters in the Platonic dialogue named after him, where he works on a problem given to him by

Theodorus of Cyrene Theodorus of Cyrene (; 450 BC) was an ancient Greek mathematician. The only first-hand accounts of him that survive are in three of Plato's dialogues: the '' Theaetetus'', the ''Sophist'', and the ''Statesman''. In the first dialogue, he posits ...

to demonstrate that the square roots of several numbers from 3 to 17 are irrational, leading to the construction now known as the

Spiral of Theodorus In geometry, the spiral of Theodorus (also called the square root spiral, Pythagorean spiral, or Pythagoras's snail) is a spiral composed of right triangles, placed edge-to-edge. It was named after Theodorus of Cyrene. Construction The spiral ...

. Theaetetus is traditionally credited with much of the work contained in Book X of the ''Elements'', concerned with

incommensurable magnitudes In mathematics, the irrational numbers are all the real numbers that are not rational numbers. That is, irrational numbers cannot be expressed as the ratio of two integers. When the ratio of lengths of two line segments is an irrational number, ...

, and Book XIII, which outlines the construction of the

regular polyhedra A regular polyhedron is a polyhedron whose symmetry group acts transitively on its flags. A regular polyhedron is highly symmetrical, being all of edge-transitive, vertex-transitive and face-transitive. In classical contexts, many different eq ...

. Although some of the regular polyhedra were certainly known previously, he is credited with their systematic study and the proof that only five of them exist. Another mathematician who might have visited Plato's Academy is

, associated with the theory of proportion found in Book V of the ''Elements''.

credits Eudoxus with a proof that the volume of a cone is one-third the volume of a cylinder with the same base, which appears in two propositions in Book XII of the ''Elements''. He also developed an astronomical calendar, now lost, that remains partially preserved in

Aratus Aratus (; ; c. 315/310 240 BC) was a Greek didactic poet. His major extant work is his hexameter poem ''Phenomena'' (, ''Phainómena'', "Appearances"; ), the first half of which is a verse setting of a lost work of the same name by Eudoxus of Cn ...

' poem ''

Phaenomena A phenomenon ( phenomena), sometimes spelled phaenomenon, is an observable event. The term came into its modern philosophical usage through Immanuel Kant, who contrasted it with the noumenon, which ''cannot'' be directly observed. Kant was hea ...

.'' Eudoxus seems to have founded a school of mathematics in

Cyzicus Cyzicus ( ; ; ) was an ancient Greek town in Mysia in Anatolia in the current Balıkesir Province of Turkey. It was located on the shoreward side of the present Kapıdağ Peninsula (the classical Arctonnesus), a tombolo which is said to have or ...

, where one of Eudoxus' students,

Menaechmus Menaechmus (, c. 380 – c. 320 BC) was an ancient Greek mathematician, list of geometers, geometer and philosopher born in Alopeconnesus or Prokonnesos in the Thracian Chersonese, who was known for his friendship with the renowned philosopher P ...

, went on to develop a theory of conic sections.

Hellenistic and early Roman period

Ancient Greek mathematics reached its acme during the

Hellenistic In classical antiquity, the Hellenistic period covers the time in Greek history after Classical Greece, between the death of Alexander the Great in 323 BC and the death of Cleopatra VII in 30 BC, which was followed by the ascendancy of the R ...

and early Roman periods. Alexander the Great's conquest of the

Eastern Mediterranean The Eastern Mediterranean is a loosely delimited region comprising the easternmost portion of the Mediterranean Sea, and well as the adjoining land—often defined as the countries around the Levantine Sea. It includes the southern half of Turkey ...

Egypt Egypt ( , ), officially the Arab Republic of Egypt, is a country spanning the Northeast Africa, northeast corner of Africa and Western Asia, southwest corner of Asia via the Sinai Peninsula. It is bordered by the Mediterranean Sea to northe ...

Mesopotamia Mesopotamia is a historical region of West Asia situated within the Tigris–Euphrates river system, in the northern part of the Fertile Crescent. Today, Mesopotamia is known as present-day Iraq and forms the eastern geographic boundary of ...

, the

Iranian plateau The Iranian plateau or Persian plateau is a geological feature spanning parts of the Caucasus, Central Asia, South Asia, and West Asia. It makes up part of the Eurasian plate, and is wedged between the Arabian plate and the Indian plate. ...

Central Asia Central Asia is a region of Asia consisting of Kazakhstan, Kyrgyzstan, Tajikistan, Turkmenistan, and Uzbekistan. The countries as a group are also colloquially referred to as the "-stans" as all have names ending with the Persian language, Pers ...

, and parts of

India India, officially the Republic of India, is a country in South Asia. It is the List of countries and dependencies by area, seventh-largest country by area; the List of countries by population (United Nations), most populous country since ...

led to the spread of the Greek culture and language across these regions.

Koine Greek Koine Greek (, ), also variously known as Hellenistic Greek, common Attic, the Alexandrian dialect, Biblical Greek, Septuagint Greek or New Testament Greek, was the koiné language, common supra-regional form of Greek language, Greek spoken and ...

became the ''

lingua franca A lingua franca (; ; for plurals see ), also known as a bridge language, common language, trade language, auxiliary language, link language or language of wider communication (LWC), is a Natural language, language systematically used to make co ...

'' of scholarship throughout the Hellenistic world, and the mathematics of the Classical period merged with

Egyptian ''Egyptian'' describes something of, from, or related to Egypt. Egyptian or Egyptians may refer to: Nations and ethnic groups * Egyptians, a national group in North Africa ** Egyptian culture, a complex and stable culture with thousands of year ...

and

Babylonian mathematics Babylonian mathematics (also known as Assyro-Babylonian mathematics) is the mathematics developed or practiced by the people of Mesopotamia, as attested by sources mainly surviving from the Old Babylonian period (1830–1531 BC) to the Seleucid ...

to give rise to Hellenistic mathematics. Several centers of learning also appeared around this time, of which the most important one was the

Mouseion The Mouseion of Alexandria (; ), which arguably included the Library of Alexandria, was an institution said to have been founded by Ptolemy I Soter and his son Ptolemy II Philadelphus. Originally, the word ''mouseion'' meant any place that was ...

Alexandria Alexandria ( ; ) is the List of cities and towns in Egypt#Largest cities, second largest city in Egypt and the List of coastal settlements of the Mediterranean Sea, largest city on the Mediterranean coast. It lies at the western edge of the Nile ...

, in

Ptolemaic Egypt Ptolemaic is the adjective formed from the name Ptolemy, and may refer to: Pertaining to the Ptolemaic dynasty * Ptolemaic dynasty, the Macedonian Greek dynasty that ruled Egypt founded in 305 BC by Ptolemy I Soter *Ptolemaic Kingdom Pertaining ...

. Although few in number, Hellenistic mathematicians actively communicated with each other in correspondence; publication consisted of passing and copying someone's work among colleagues. Much of the work represented by authors such as

Euclid Euclid (; ; BC) was an ancient Greek mathematician active as a geometer and logician. Considered the "father of geometry", he is chiefly known for the '' Elements'' treatise, which established the foundations of geometry that largely domina ...

, and

was of a very advanced level and rarely mastered outside a small circle. Euclid collected many previous mathematical results and theorems in the '' Elements'', a reference work that would become a canon of geometry and elementary number theory for many centuries. Archimedes used the

method of exhaustion The method of exhaustion () is a method of finding the area of a shape by inscribing inside it a sequence of polygons (one at a time) whose areas converge to the area of the containing shape. If the sequence is correctly constructed, the differ ...

to approximate Pi (''

Measurement of a Circle ''Measurement of a Circle'' or ''Dimension of the Circle'' ( Greek: , ''Kuklou metrēsis'') is a treatise that consists of three propositions, probably made by Archimedes, ca. 250 BCE. The treatise is only a fraction of what was a longer work. P ...

''), measured the surface area and volume of a sphere (''

On the Sphere and Cylinder ''On the Sphere and Cylinder'' () is a treatise that was published by Archimedes in two volumes . It most notably details how to find the surface area of a sphere and the volume of the contained ball and the analogous values for a cylinder, and w ...

''), devised a mechanical method for developing solutions to mathematical problems using the

law of the lever A lever is a simple machine consisting of a beam or rigid rod pivoted at a fixed hinge, or ''fulcrum''. A lever is a rigid body capable of rotating on a point on itself. On the basis of the locations of fulcrum, load, and effort, the lever is d ...

, ('' Method of Mechanical Theorems''), and developed a way to represent very large numbers (''

The Sand-Reckoner ''The Sand Reckoner'' (, ''Psammites'') is a work by Archimedes, an Ancient Greek mathematician of the 3rd century BC, in which he set out to determine an upper bound for the number of grains of sand that fit into the universe. In order to do ...

''). Apollonius of Perga, in his extant work ''

Conics Apollonius of Perga ( ; ) was an ancient Greek geometer and astronomer known for his work on conic sections. Beginning from the earlier contributions of Euclid and Archimedes on the topic, he brought them to the state prior to the invention of ...

'', refined and developed the theory of

conic section A conic section, conic or a quadratic curve is a curve obtained from a cone's surface intersecting a plane. The three types of conic section are the hyperbola, the parabola, and the ellipse; the circle is a special case of the ellipse, tho ...

s that was first outlined by

, Euclid, and

Conon of Samos Conon of Samos (, ''Konōn ho Samios''; c. 280 – c. 220 BC) was a Greek astronomer and mathematician. He is primarily remembered for naming the constellation Coma Berenices. Life and work Conon was born on Samos, Ionia, and possibly died in Ale ...

Trigonometry Trigonometry () is a branch of mathematics concerned with relationships between angles and side lengths of triangles. In particular, the trigonometric functions relate the angles of a right triangle with ratios of its side lengths. The fiel ...

was developed around the time of the astronomer

, and both trigonometry and astronomy were further developed by Ptolemy in his ''

Almagest The ''Almagest'' ( ) is a 2nd-century Greek mathematics, mathematical and Greek astronomy, astronomical treatise on the apparent motions of the stars and planetary paths, written by Ptolemy, Claudius Ptolemy ( ) in Koine Greek. One of the most i ...

''.

Arithmetic

Euclid devoted part of his '' Elements'' (Books VII–IX) to topics that belong to elementary number theory, including

prime number A prime number (or a prime) is a natural number greater than 1 that is not a Product (mathematics), product of two smaller natural numbers. A natural number greater than 1 that is not prime is called a composite number. For example, 5 is prime ...

s and

divisibility In mathematics, a divisor of an integer n, also called a factor of n, is an integer m that may be multiplied by some integer to produce n. In this case, one also says that n is a ''Multiple (mathematics), multiple'' of m. An integer n is divis ...

. He gave an algorithm, the

Euclidean algorithm In mathematics, the Euclidean algorithm,Some widely used textbooks, such as I. N. Herstein's ''Topics in Algebra'' and Serge Lang's ''Algebra'', use the term "Euclidean algorithm" to refer to Euclidean division or Euclid's algorithm, is a ...

, for computing the

greatest common divisor In mathematics, the greatest common divisor (GCD), also known as greatest common factor (GCF), of two or more integers, which are not all zero, is the largest positive integer that divides each of the integers. For two integers , , the greatest co ...

of two numbers (Prop. VII.2) and a proof implying the infinitude of primes (Prop. IX.20). There is also older material likely based on Pythagorean teachings (Prop. IX.21–34), such as "odd times even is even" and "if an odd number measures dividesan even number, then it also measures divideshalf of it". Ancient Greek mathematicians conventionally separated ''numbers'' (mostly positive integers but occasionally rationals) from ''magnitudes'' or ''lengths'', with only the former being the subject of arithmetic. The Pythagorean tradition spoke of so-called

polygonal In geometry, a polygon () is a plane (mathematics), plane Shape, figure made up of line segments connected to form a closed polygonal chain. The segments of a closed polygonal chain are called its ''edge (geometry), edges'' or ''sides''. The p ...

figurate numbers The term figurate number is used by different writers for members of different sets of numbers, generalizing from triangular numbers to different shapes (polygonal numbers) and different dimensions (polyhedral numbers). The ancient Greek mathemat ...

. The study of the sums of triangular and pentagonal numbers would prove fruitful in the

early modern period The early modern period is a Periodization, historical period that is defined either as part of or as immediately preceding the modern period, with divisions based primarily on the history of Europe and the broader concept of modernity. There i ...

. Building on the works of the earlier Pythagoreans,

Nicomachus of Gerasa Nicomachus of Gerasa (; ) was an Ancient Greek Neopythagorean philosopher from Gerasa, in the Roman province of Syria (now Jerash, Jordan). Like many Pythagoreans, Nicomachus wrote about the mystical properties of numbers, best known for his ...

wrote an ''Introduction to Arithmetic'' which would go on to receive later commentary in late antiquity and the Middle Ages. The continuing influence of mathematics in Platonism is shown in Theon of Smyrna's ''Mathematics Useful For Understanding Plato'', written around the same time.

also wrote on

polygonal number In mathematics, a polygonal number is a Integer, number that counts dots arranged in the shape of a regular polygon. These are one type of 2-dimensional figurate numbers. Polygonal numbers were first studied during the 6th century BC by the Ancien ...

s in addition to a work in pre-modern algebra (''

''). An

epigram An epigram is a brief, interesting, memorable, sometimes surprising or satirical statement. The word derives from the Greek (, "inscription", from [], "to write on, to inscribe"). This literary device has been practiced for over two millennia ...

published by Gotthold Ephraim Lessing, Lessing in 1773 appears to be a letter sent by

Eratosthenes Eratosthenes of Cyrene (; ; – ) was an Ancient Greek polymath: a Greek mathematics, mathematician, geographer, poet, astronomer, and music theory, music theorist. He was a man of learning, becoming the chief librarian at the Library of A ...

. The epigram proposed what has become known as

Archimedes's cattle problem Archimedes's cattle problem (or the or ) is a problem in Diophantine analysis, the study of polynomial equations with integer solutions. Attributed to Archimedes, the problem involves computing the number of cattle in a herd of the sun god from ...

; its solution (absent from the manuscript) requires solving an indeterminate quadratic equation (which reduces to what would later be misnamed

Pell's equation Pell's equation, also called the Pell–Fermat equation, is any Diophantine equation of the form x^2 - ny^2 = 1, where ''n'' is a given positive Square number, nonsquare integer, and integer solutions are sought for ''x'' and ''y''. In Cartesian ...

). As far as it is known, such equations were first successfully treated by Indian mathematicians. It is not known whether Archimedes himself had a method of solution.

Geometry

During the Hellenistic age, three construction problems in geometry became famous:

trisecting an angle Angle trisection is a classical problem of straightedge and compass construction of ancient Greek mathematics. It concerns construction of an angle equal to one third of a given arbitrary angle, using only two tools: an unmarked straightedge an ...

, and

squaring the circle Squaring the circle is a problem in geometry first proposed in Greek mathematics. It is the challenge of constructing a square (geometry), square with the area of a circle, area of a given circle by using only a finite number of steps with a ...

, all of which are now known to be impossible with a straight edge and compass. Many attempts were made using

neusis In geometry, the neusis (; ; plural: ) is a geometric construction method that was used in antiquity by Greek mathematics, Greek mathematicians. Geometric construction The neusis construction consists of fitting a line element of given length ...

constructions including the

Cissoid of Diocles In geometry, the cissoid of Diocles (; named for Diocles (mathematician), Diocles) is a cubic plane curve notable for the property that it can be used to construct two Geometric mean, mean proportionals to a given ratio. In particular, it can b ...

Quadratrix In geometry, a quadratrix () is a curve having ordinates which are a measure of the area (or quadrature) of another curve. The two most famous curves of this class are those of Dinostratus and E. W. Tschirnhaus, which are both related to the circ ...

, and the Conchoid of Nicomedes. Regular polygons and polyhedra had already been known before Euclid's ''Elements'', but Archimedes extended their study to include semiregular polyhedra, also known as

Archimedean solid The Archimedean solids are a set of thirteen convex polyhedra whose faces are regular polygon and are vertex-transitive, although they aren't face-transitive. The solids were named after Archimedes, although he did not claim credit for them. They ...

s. A work transmitted as Book XIV of Euclid's ''Elements'', likely written a few centuries later by

Hypsicles Hypsicles (; c. 190 – c. 120 BCE) was an ancient Greek mathematician and astronomer known for authoring ''On Ascensions'' (Ἀναφορικός) and possibly the Book XIV of Euclid's ''Elements''. Hypsicles lived in Alexandria. Life and work ...

, lists other works on the topic, such

Aristaeus the Elder Aristaeus the Elder (; 370 – 300 BC) was a Greek mathematician who worked on conic sections. He was a contemporary of Euclid. Life Only little is known of his life. The mathematician Pappus of Alexandria refers to him as Aristaeus the Elder. Pa ...

's ''Comparison of Five Figures'' and Apollonius of Perga's ''Comparison of the Dodecahedron and the Icosahedron''. Another book, transmitted as Book XV of Euclid's ''Elements'', which was compiled in the 6th century AD, provides further developments. Most of the works that became part of a standard mathematical curriculum in late antiquity were composed during the Hellenistic period: ''

Data Data ( , ) are a collection of discrete or continuous values that convey information, describing the quantity, quality, fact, statistics, other basic units of meaning, or simply sequences of symbols that may be further interpreted for ...

'' and ''

Porisms A porism is a mathematical proposition or corollary. It has been used to refer to a direct consequence of a Mathematical proof, proof, analogous to how a corollary refers to a direct consequence of a theorem. In modern usage, it is a relationship t ...

'' by Euclid, several works by Apollonius of Perga including ''Cutting off a ratio'', ''Cutting off an area'', ''Determinate section'', ''Tangencies'', and ''Neusis'', and several works dealing with loci, including ''Plane Loci'' and ''Conics'' by Apollonius, ''Solid Loci'' by

, ''Loci on a Surface'' by Euclid, and ''On Means'' by Eratosthenes of Cyrene. All of these works other than ''Data'', ''Conics'' Books I–VII, and ''Cutting off a ratio'' are lost but are known from Book 7 of Pappus' ''Collection''.

Applied mathematics

Astronomy was considered one of the , and accordingly many mathematicians devoted time to astronomy. The ''

Little Astronomy ''Little Astronomy'' ( ) is a collection of minor works in Ancient Greek mathematics and astronomy dating from the 4th to 2nd century BCE that were probably used as an astronomical curriculum starting around the 2nd century CE. In the astronomy o ...

'' is a collection of short works that included

Theodosius Theodosius ( Latinized from the Greek "Θεοδόσιος", Theodosios, "given by god") is a given name. It may take the form Teodósio, Teodosie, Teodosije etc. Theodosia is a feminine version of the name. Emperors of ancient Rome and Byzantium ...

's ''Spherics'',

Autolycus In Greek mythology, Autolycus (; ) was a robber who had the power to metamorphose or make invisible the things he stole. He had his residence on Mount Parnassus and was renowned among men for his cunning and oaths. Family There are a number of d ...

's ''On the Moving Sphere'', Euclid's ''Optics'' and ''Phaenomena'', and Aristarchus's '' On the Sizes and Distances.'' They were part of an astronomy curriculum beginning in the 2nd century AD and often transmitted as a group. The collection was translated into Arabic with a few additions such as Euclid's ''Data'',

Menelaus In Greek mythology, Menelaus (; ) was a Greek king of Mycenaean (pre- Dorian) Sparta. According to the ''Iliad'', the Trojan war began as a result of Menelaus's wife, Helen, fleeing to Troy with the Trojan prince Paris. Menelaus was a central ...

's ''Spherics'' (extant in Arabic only), and various works by Archimedes as the ''Middle Books'', intermediate between Euclid's ''Elements'' and Ptolemy's ''

''. The development of

trigonometry Trigonometry () is a branch of mathematics concerned with relationships between angles and side lengths of triangles. In particular, the trigonometric functions relate the angles of a right triangle with ratios of its side lengths. The fiel ...

as a synthesis of Babylonian and Greek methods is commonly attributed to

, who made extensive astronomical observations and wrote several mathematical treatises, though only his ''Commentary on the Phaenomena of Eudoxus and Aratus'' survives. In the 2nd century AD, Ptolemy wrote the ''Mathematical Syntaxis'', now known as the ''

,'' explaining the motions of the stars and planets according to a geocentric model, and calculated out chord tables to a higher degree of precision than had been done previously, along with an instruction manual, in the '' Handy Tables''. Ancient Greeks often considered the study of optics to be a part of applied geometry. An extant work on

catoptrics Catoptrics (from ''katoptrikós'', "specular", from ''katoptron'' "mirror") deals with the phenomena of reflected light and image-forming optical systems using mirrors. A catoptric system is also called a ''catopter'' (''catoptre''). Histor ...

is dubiously attributed to Euclid. Archimedes is known to have written a now lost work on catoptrics, while Diocles' ''On Burning Mirrors'' is extant in an Arabic translation. Other examples of

applied mathematics Applied mathematics is the application of mathematics, mathematical methods by different fields such as physics, engineering, medicine, biology, finance, business, computer science, and Industrial sector, industry. Thus, applied mathematics is a ...

around this time include the construction of analogue computers like the

Antikythera mechanism The Antikythera mechanism ( , ) is an Ancient Greece, Ancient Greek hand-powered orrery (model of the Solar System). It is the oldest known example of an Analog computer, analogue computer. It could be used to predict astronomy, astronomical ...

, the accurate measurement of the

circumference of the Earth Earth's circumference is the distance around Earth. Measured around the equator, it is . Measured passing through the poles, the circumference is . Treating the Earth as a sphere, its circumference would be its single most important measuremen ...

, and the mathematical and mechanical works of

Heron Herons are long-legged, long-necked, freshwater and coastal birds in the family Ardeidae, with 75 recognised species, some of which are referred to as egrets or bitterns rather than herons. Members of the genus ''Botaurus'' are referred to as bi ...

Late antiquity

Although the mathematicians in the later Roman era generally had few notable original works, they are distinguished for their commentaries and expositions on the works of their predecessors. These commentaries have preserved valuable extracts from works no longer extant, or historical allusions which, in the absence of original documents, are precious because of their rarity.

Pappus' ''Collection''

compiled a survey of earlier mathematical methods and results in the ''Collection'' in eight books, of which part of Book II and Books III–VII are extant in Greek and Book VIII is extant in Arabic. The collection covers a wide span of Ancient Greek mathematics, with a particular focus on the Hellenistic period. Book III is framed as a letter to

Pandrosion Pandrosion of Alexandria () was a mathematician in fourth-century-AD Alexandria, discussed in the ''Mathematical Collection'' of Pappus of Alexandria and known for having possibly developed an approximate method for doubling the cube. She is likel ...

, a woman mathematician, and discusses solutions to three construction problems:

angle trisection Angle trisection is a classical problem of straightedge and compass construction of ancient Greek mathematics. It concerns construction of an angle equal to one third of a given arbitrary angle, using only two tools: an unmarked straightedge and ...

, and

. Book IV discusses classical geometry, which Pappus divides into plane geometry, line geometry, and solid geometry, and includes a discussion of Archimedes' construction of the

arbelos In geometry, an arbelos is a plane region bounded by three semicircles with three apexes such that each corner of each semicircle is shared with one of the others (connected), all on the same side of a straight line (the ''baseline'') that conta ...

. Book V discusses isoperimetric figures, summarizing otherwise lost works by

Zenodotus Zenodotus () was a Greek grammarian, literary critic, Homeric scholar, and the first librarian of the Library of Alexandria. A native of Ephesus and a pupil of Philitas of Cos, he lived during the reigns of the first two Ptolemies, and was at ...

and

on isoperimetric plane and solid figures, respectively. Book VI deals with astronomy, commenting on some of the works making up the ''Little Astronomy''. Book VII deals with ancient analysis, providing epitomes and lemmas from otherwise lost works of Apollonius and others. Book VIII is an introduction to ancient mechanics. The Greek version breaks off in the middle of a sentence discussing

Hero of Alexandria Hero of Alexandria (; , , also known as Heron of Alexandria ; probably 1st or 2nd century AD) was a Greek mathematician and engineer who was active in Alexandria in Egypt during the Roman era. He has been described as the greatest experimental ...

, but a complete edition of Book VIII survives in Arabic.

Commentaries

The commentary tradition began in the late Hellenistic period and continued into late antiquity. The first known commentary on the ''Elements'' was written by

, who likely set the format for future commentaries. Serenus of Antinoöpolis wrote a lost commentary on the ''Conics'' of Apollonius, along with two works that survive, ''Section of a Cylinder'' and ''Section of a Cone'', expanding on specific subjects in the ''Conics''. Pappus wrote a commentary on Book X of the ''Elements'', while

Heliodorus of Larissa Heliodorus of Larissa (fl. 3rd century?) was a Greek mathematician, and the author of a short treatise on optics which is still extant. Biography Nothing is known about the life of Heliodorus.John Aikin, William Enfield, et al., (1804), ''General ...

wrote a summary of Euclid's ''Optics''. Many of the late antique commentators were associated with Neoplatonist philosophy; Porphyry of Tyre, a student of Plotinus, the founder of

Neoplatonism Neoplatonism is a version of Platonic philosophy that emerged in the 3rd century AD against the background of Hellenistic philosophy and religion. The term does not encapsulate a set of ideas as much as a series of thinkers. Among the common id ...

, wrote a commentary on Ptolemy's ''Harmonics''.

Iamblichus Iamblichus ( ; ; ; ) was a Neoplatonist philosopher who determined a direction later taken by Neoplatonism. Iamblichus was also the biographer of the Greek mystic, philosopher, and mathematician Pythagoras. In addition to his philosophical co ...

, who was himself a student of Porphyry, wrote a commentary on Nicomachus' Introduction to Arithmetic. In Alexandria in the 4th century,

wrote commentaries on the writings of

, including a commentary on the ''Almagest'' and two commentaries on the ''Handy Tables'', one of which is more of an instruction manual ("Little Commentary"), and another with a much more detailed exposition and derivations ("Great Commentary").

, Theon's daughter, also wrote a commentary on Diophantus' ''Arithmetica'' and a commentary on the ''Conics'' of Apollonius, which have not survived. In the 5th century, in Athens,

Proclus Proclus Lycius (; 8 February 412 – 17 April 485), called Proclus the Successor (, ''Próklos ho Diádokhos''), was a Greek Neoplatonist philosopher, one of the last major classical philosophers of late antiquity. He set forth one of th ...

wrote a commentary on Euclid's elements, which the first book survives. Proclus' contemporary, Domninus of Larissa, wrote a summary of Nicomachus' Introduction to Arithmetic, while

Marinus of Neapolis Marinus (; born c. 440 AD) was a Neoplatonist philosopher, mathematician and rhetorician born in Flavia Neapolis (modern Nablus), Palaestina Secunda. He was a student of Proclus in Athens. His surviving works are an introduction to Euclid' ...

, Proclus' successor, wrote an ''Introduction to Euclid's Data''. Meanwhile, in Alexandria,

Ammonius Hermiae Ammonius Hermiae (; ; – between 517 and 526) was a Greek philosopher from Alexandria in the eastern Roman empire during Late Antiquity. A Neoplatonist, he was the son of the philosophers Hermias and Aedesia, the brother of Heliodorus of Alex ...

John Philoponus John Philoponus ( Greek: ; , ''Ioánnis o Philóponos''; c. 490 – c. 570), also known as John the Grammarian or John of Alexandria, was a Coptic Miaphysite philologist, Aristotelian commentator and Christian theologian from Alexandria, Byza ...

and

Simplicius of Cilicia Simplicius of Cilicia (; ; – c. 540) was a disciple of Ammonius Hermiae and Damascius, and was one of the last of the Neoplatonists. He was among the pagan philosophers persecuted by Justinian in the early 6th century, and was forced for ...

wrote commentaries on the works of Aristotle that preserve information on earlier mathematicians and philosophers.

(c. 480–540), another student of Ammonius, wrote commentaries that are extant on Apollonius' ''Conics'' along with some treatises of Archimedes: ''On the Sphere and Cylinder'', ''Measurement of a Circle'', and ''On Balancing Planes'' (though the authorship of the last one is disputed). In Rome, Boethius, seeking to preserve Ancient Greek philosophical, translated works on the

into Latin, deriving much of his work on Arithmetic and Harmonics from Nicomachus. After the closure of the Neoplatonic schools by the emperor

Justinian Justinian I (, ; 48214 November 565), also known as Justinian the Great, was Roman emperor from 527 to 565. His reign was marked by the ambitious but only partly realized ''renovatio imperii'', or "restoration of the Empire". This ambition was ...

in 529 AD, the institution of mathematics as a formal enterprise entered a decline. However, two mathematicians connected to the Neoplatonic tradition were commissioned to build the

Hagia Sophia Hagia Sophia (; ; ; ; ), officially the Hagia Sophia Grand Mosque (; ), is a mosque and former Church (building), church serving as a major cultural and historical site in Istanbul, Turkey. The last of three church buildings to be successively ...

Anthemius of Tralles Anthemius of Tralles (, Medieval Greek: , ''Anthémios o Trallianós''; – 533 558) was a Byzantine Greek from Tralles who worked as a geometer and architect in Constantinople, the capital of the Byzantine Empire. With Isidor ...

and

Isidore of Miletus Isidore of Miletus (; Medieval Greek pronunciation: ; ) was one of the two main Byzantine Greek mathematician, physicist and architects ( Anthemius of Tralles was the other) that Emperor Justinian I commissioned to design the cathedral Hagia Sop ...

. Anthemius constructed many advanced mechanisms and wrote a work ''On Surprising Mechanisms'' which treats "burning mirrors" and skeptically attempts to explain the function of

Archimedes' heat ray Archimedes is purported to have invented a large scale solar furnace, sometimes described as a heat ray, and used it to burn attacking Roman ships during the Siege of Syracuse (). It does not appear in the surviving works of Archimedes and there ...

. Isidore, who continued the project of the Hagia Sophia after Anthemius' death, also supervised the revision of Eutocius' commentaries of Archimedes. From someone in Isidore's circle we also have a work on polyhedra that is transmitted pseudepigraphically as ''Book XV'' of Euclid's ''Elements.''

Reception and legacy

The majority of mathematical treatises written in Ancient Greek, along with the discoveries made within them, have been lost; around 30% of the works known from references to them are extant. Authors whose works survive in Greek manuscripts include:

Autolycus of Pitane Autolycus of Pitane (; c. 360 – c. 290 BC) was a Greek astronomer, mathematician, and geographer. He is known today for his two surviving works ''On the Moving Sphere'' and ''On Risings and Settings'', both about spherical geometry. Life Auto ...

Aristarchus of Samos Aristarchus of Samos (; , ; ) was an ancient Greek astronomer and mathematician who presented the first known heliocentric model that placed the Sun at the center of the universe, with the Earth revolving around the Sun once a year and rotati ...

Philo of Byzantium Philo of Byzantium (, ''Phílōn ho Byzántios'', ), also known as Philo Mechanicus (Latin for "Philo the Engineer"), was a Greek engineer, physicist and writer on mechanics, who lived during the latter half of the 3rd century BC. Although he wa ...

, Biton of Pergamon,

Apollonius of Perga Apollonius of Perga ( ; ) was an ancient Greek geometer and astronomer known for his work on conic sections. Beginning from the earlier contributions of Euclid and Archimedes on the topic, he brought them to the state prior to the invention o ...

Theodosius of Bithynia Theodosius of Bithynia ( ; 2nd–1st century BC) was a Hellenistic astronomer and mathematician from Bithynia who wrote the '' Spherics'', a treatise about spherical geometry, as well as several other books on mathematics and astronomy, of which tw ...

Athenaeus Mechanicus Athenaeus Mechanicus is the author of a book on siegecraft, ''On Machines'' (). He is identified by modern scholars with Athenaeus of Seleucia, a member of the Peripatetic school active in the mid-to-late 1st century BC, at Rome and elsewhere.Sera ...

Geminus Geminus of Rhodes (), was a Greek astronomer and mathematician, who flourished in the 1st century BC. An astronomy work of his, the ''Introduction to the Phenomena'', still survives; it was intended as an introductory astronomy book for students ...

Apollodorus of Damascus Apollodorus of Damascus () was an architect and engineer from Roman Syria, who flourished during the 2nd century AD. As an engineer he authored several technical treatises, and his massive architectural output gained him immense popularity dur ...

Theon of Smyrna Theon of Smyrna ( ''Theon ho Smyrnaios'', ''gen.'' Θέωνος ''Theonos''; fl. 100 CE) was a Greek philosopher and mathematician, whose works were strongly influenced by the Pythagorean school of thought. His surviving ''On Mathematics Useful fo ...

Cleomedes Cleomedes () was a Greek astronomer who is known chiefly for his book ''On the Circular Motions of the Celestial Bodies'' (Κυκλικὴ θεωρία μετεώρων), also known as ''The Heavens'' (). Placing his work chronologically His bi ...

Cleonides Cleonides () is the author of a Greek treatise on music theory titled Εἰσαγωγὴ ἁρμονική ''Eisagōgē harmonikē'' (Introduction to Harmonics). The date of the treatise, based on internal evidence, can be established only to the b ...

, Gaudentius,

Anatolius of Laodicea Anatolius of Laodicea (; early 3rd century – July 3, 283"Lives of the Saints," Omer Englebert New York: Barnes & Noble Books, 1994, p. 256.), also known as Anatolius of Alexandria, was a Syro- Egyptian saint and Bishop of Laodicea on the Medi ...

, Aristides Quintilian,

Porphyry Porphyry (; , ''Porphyrios'' "purple-clad") may refer to: Geology * Porphyry (geology), an igneous rock with large crystals in a fine-grained matrix, often purple, and prestigious Roman sculpture material * Shoksha porphyry, quartzite of purple c ...

, Alypius,

, Serenus of Antinoöpolis,

, Domninus of Larissa,

, and

Eutocius Eutocius of Ascalon (; ; 480s – 520s) was a Greek mathematician who wrote commentaries on several Archimedean treatises and on the Apollonian ''Conics''. Life and work Little is known about the life of Eutocius. He was born in Ascalon, t ...

. The earliest surviving papyrus to record a Greek mathematical text is P. Hib. i 27, which contains a parapegma of Eudoxus' astronomical calendar, along with several

ostraca An ostracon (Greek language, Greek: ''ostrakon'', plural ''ostraka'') is a piece of pottery, usually broken off from a vase or other earthenware vessel. In an archaeology, archaeological or epigraphy, epigraphical context, ''ostraca'' refer ...

from the 3rd century BC that deal with propositions XIII.10 and XIII.16 of Euclid's ''Elements''. A papyrus recovered from

Herculaneum Herculaneum is an ancient Rome, ancient Roman town located in the modern-day ''comune'' of Ercolano, Campania, Italy. Herculaneum was buried under a massive pyroclastic flow in the eruption of Mount Vesuvius in 79 AD. Like the nearby city of ...

contains an essay by the Epicurean philosopher

Demetrius Lacon Demetrius Lacon or Demetrius of Laconia (; fl. late 2nd century BC) was an Epicurean philosopher, and a disciple of Protarchus. He was an older contemporary of Zeno of Sidon and a teacher of Philodemus. Sextus Empiricus quotes part of a commentary ...

on Euclid's Elements. Most of the oldest extant manuscripts for each text date from the 9th century onward, copies of works written during and before the Hellenistic period. The two major sources of manuscripts are Byzantine-era codices, copied some 500 to 1500 years after their originals, and

Arabic Arabic (, , or , ) is a Central Semitic languages, Central Semitic language of the Afroasiatic languages, Afroasiatic language family spoken primarily in the Arab world. The International Organization for Standardization (ISO) assigns lang ...

translations of Greek works; what has survived reflects the preferences of readers in late antiquity along with the interests of mathematicians in the Byzantine empire and the medieval Islamic world who preserved and copied them. Despite the lack of original manuscripts, the dates for some Greek mathematicians are more certain than the dates of surviving Babylonian or Egyptian sources because a number of overlapping chronologies exist, though many dates remain uncertain.

Byzantine mathematics

With the closure of the Neoplatonist schools in the 6th century, Greek mathematics declined in the medieval Byzantine period, although many works were preserved in medieval manuscript transmission and translated into first Syriac and

, and later into Latin. The transition to miniscule manuscript in the 9th century, however, many works that were not copied during this time period were lost, although a few uncial manuscripts do survive. Many surviving works are derived from only a single manuscript; such as Pappus' ''Collection'' and Books I–IV of the Conics. Many of the surviving manuscripts originate from two scholars in this period in the circle of Photios I,

Leo the Mathematician Leo the Mathematician, the Grammarian or the Philosopher ( or ὁ Φιλόσοφος, ''Léōn ho Mathēmatikós'' or ''ho Philósophos''; – after January 9, 869) was a Byzantine philosopher and logician associated with the Macedonian Renai ...

and Arethas of Caesarea. Scholia written in the margins of Euclid's elements that have been copied throughout multiple extant manuscripts that were also written by Arethas, derived from Proclus' commentary along with many commentaries on Euclid which are now lost. The works of Archimedes survived in three different recensions in manuscripts from the 9th and 10th centuries; two of which are now lost after being copied, the third of which, the Archimedes Palimpsest, was only rediscovered in 1906. In the later Byzantine period, George Pachymeres wrote a summary of the quadrivium, and Maximus Planudes wrote scholia on the first two books of ''Diophantus.''

Medieval Islamic mathematics

Numerous mathematical treatises were translated into Arabic in the 9th century; many works that are only extent today in Arabic translation, and there is evidence for several more that have since been lost. Medieval Islamic scientists such as Alhazen developed the ideas of the Ancient Greek geometry into advanced theories in optics and astronomy, and Diophantus' ''Arithmetica'' was synthezied with the works of Al-Khwarizmi and works from Indian mathematics to develop a theory of algebra. The following works are extant only in Arabic translations: * Apollonius, ''Conics'' books V–VII, ''Cutting Off of a Ratio'' * Archimedes, ''Book of Lemmas'' * Diocles, ''On Burning Mirrors'' * Diophantus, ''

'' books IV–VII * Euclid, ''On Divisions of Figures'', ''On Weights'' *

, ''Sphaerica'' * Hero, ''Catoptrica'', ''Mechanica'' * Pappus, ''Commentary on Euclid's Elements book X'', ''Collection'' Book VIII * Ptolemy, ''Planisphaerium'', Additionally, the work ''Optics (Ptolemy), Optics'' by Ptolemy only survives in a Latin translations of the 12th century, Latin translations of the Arabic translation of a Greek original.

In Latin Medieval Europe

The works derived from Ancient Greek mathematical writings that had been written in late antiquity by Boethius and Martianus Capella had formed the basis of early medieval quadrivium of arithmetic, geometry, astronomy, and music. In the 12th century the original works of Ancient Greek mathematics were translated into Latin first from Arabic by Gerard of Cremona, and then from the original Greek a century later by William of Moerbeke.

Renaissance

The publication of Greek mathematical works increased their audience; Pappus's collection was published in 1588, Diophantus in 1621. Diophantus would go on to influence Pierre de Fermat's work on number theory; Fermat scribbled his famous note about Fermat's Last theorem in his copy of ''Arithmetica''. Descartes, working through the Problem of Apollonius from his edition of Pappus, proved what is now called Descartes' theorem and laid the foundations for Analytic geometry.

Modern mathematics

Ancient Greek mathematics constitutes an important period in the history of mathematics: fundamental in respect of

and for the idea of formal proof. Greek mathematicians also contributed to

, Theoretical astronomy, mathematical astronomy, combinatorics, mathematical physics, and, at times, approached ideas close to the integral calculus. Richard Dedekind acknowledged Eudoxus's theory of proportion as an inspiration for the Dedekind cut, a method of constructing the real numbers.

Notes

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References

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External links

Vatican Exhibit

MacTutor archive of History of Mathematics
{{DEFAULTSORT:Greek Mathematics Greek mathematics,

Etymology

Origins

Archaic period

Classical Greece

Mathematics in the time of Plato

Hellenistic and early Roman period

Arithmetic

Geometry

Applied mathematics

Late antiquity

Pappus' ''Collection''

Commentaries

Reception and legacy

Byzantine mathematics

Medieval Islamic mathematics

In Latin Medieval Europe

Renaissance

Modern mathematics

See also

Notes

Footnotes

Citations

References

Further reading

External links