Euclid

Information about Euclid

**Euclid**

Born	fl. 300 BC
Residence	Alexandria, Egypt
Nationality	Greek
Field	Mathematics
Known for	Euclid's Elements

Euclid (Greek: Εὐκλείδης -- Eukleidis), also known as Euclid of Alexandria, "The Father of Geometry" was a Greek mathematician of the Hellenistic period who flourished in Alexandria, Egypt, almost certainly during the reign of Ptolemy I (323 BC-283 BC). His Elements is the most successful textbook in the history of mathematics. In it, the principles of Euclidean geometry are deduced from a small set of axioms. Euclid's method of proving mathematical theorems by logical deduction from accepted principles remains the backbone of all mathematics, imbuing that field with its characteristic rigor.

Although best-known for its geometric results, the Elements also includes much number theory, in considering the connection between perfect numbers and Mersenne primes, the infinitude of prime numbers, Euclid's lemma on factorization (which leads to the fundamental theorem of arithmetic on uniqueness of prime factorizations), and the Euclidean algorithm for finding the greatest common divisor of two numbers.

Euclid also wrote works on perspective, conic sections, spherical geometry, and possibly quadric surfaces.

Biographical knowledge

A fragment of Euclid's Elements found at Oxyrhynchus, which is dated to circa 100 AD. The diagram accompanies Proposition 5 of Book II of the Elements.

Little is known about Euclid other than his writings. What little biographical information we do have comes largely from commentaries by Proclus and Pappus of Alexandria: Euclid was active at the great Library of Alexandria and may have studied at Plato's Academy in Greece. Euclid's exact lifespan and place of birth are unknown.

Some writers in the Middle Ages confused him with Euclid of Megara, a Greek Socratic philosopher who lived approximately one century earlier.

Other works

In addition to the Elements, at least five works of Euclid have survived to the present day.

Data deals with the nature and implications of "given" information in geometrical problems; the subject matter is closely related to the first four books of the Elements.
On Divisions of Figures, which survives only partially in Arabic translation, concerns the division of geometrical figures into two or more equal parts or into parts in given ratios. It is similar to a third century (AD) work by Heron of Alexandria
Optics, the earliest surviving Greek treatise on perspective, contains propositions on the apparent sizes and shapes of objects viewed from different distances and angles.
Phaenomena, spherical geometry of use to astronomers. It is similar to Sphere by Autolycus.
Catoptrics, which concerns the mathematical theory of mirrors, particularly the images formed in plane and spherical concave mirrors. This work is of doubtful authenticity, being perhaps by Theon of Alexandria.

All of these works follow the basic logical structure of the Elements, containing definitions and proved propositions.

There are four works credibly attributed to Euclid which have been lost.

Conics was a work on conic sections that was later extended by Apollonius of Perga into his famous work on the subject.
Porisms might have been an outgrowth of Euclid's work with conic sections, but the exact meaning of the title is controversial.
Pseudaria, or Book of Fallacies, was an elementary text about errors in reasoning.
Surface Loci concerned either loci (sets of points) on surfaces or loci which were themselves surfaces; under the latter interpretation, it has been hypothesized that the work might have dealt with quadric surfaces.

References

Artmann, Benno (1999). Euclid: The Creation of Mathematics. New York: Springer. ISBN 0-387-98423-2.
Bulmer-Thomas, Ivor (1971). "Euclid". Dictionary of Scientific Biography.
Heath, Thomas L. (1956). The Thirteen Books of Euclid's Elements, Vol. 1 (2nd ed.). New York: Dover Publications. ISBN 0-486-60088-2: includes extensive commentaries on Euclid and his work in the context of the history of mathematics that preceded him.
Heath, Thomas L. (1981). A History of Greek Mathematics, 2 Vols. New York: Dover Publications. ISBN 0-486-24073-8 / ISBN 0-486-24074-6.
Kline, Morris (1980). Mathematics: The Loss of Certainty. Oxford: Oxford University Press. ISBN 0-19-502754-X.
O'Connor, John J; Edmund F. Robertson "Euclid". MacTutor History of Mathematics archive.
Boyer, Carl B. (1991). A History of Mathematics, Second Edition, John Wiley & Sons, Inc.. ISBN 0471543977.

External links

Euclid's elements, All thirteen books, with interactive diagrams using Java. Clark University
Euclid's elements, with the original Greek and an English translation on facing pages (includes PDF version for printing) (only the first ten books). University of Texas.
Euclid's Elements in ancient Greek (typeset in PDF format, public domain, available in print at Lulu.com as "Euclid's Elements".)
Euclid's elements, All thirteen books, in Spanish and Catalan.
Elementa Geometriae 1482, Venice. From Rare Book Room.
Elementa 888 AD, Byzantine. From Rare Book Room.
Euclid biography by Charlene Douglass With extensive bibliography.
Euclid's Elements. Heiberg's edition of the Greek with Latin translation (public domain). PDF scans of all 13 books.

Persondata
NAME	Euclid
ALTERNATIVE NAMES	Euclid of Alexandria; Εὐκλείδης (Greek)
SHORT DESCRIPTION	Greek mathematician
DATE OF BIRTH	325 BCE
PLACE OF BIRTH
DATE OF DEATH	265 BCE
PLACE OF DEATH

Floruit (often abbreviated fl. or flor. and sometimes italicized to show it is Latin) refers to a period of time during which a person, school, movement or even species was active or flourishing.
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Gumhūriyyat Miṣr al-ʿArabiyyah

Arab Republic of Egypt

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Ελευθερία ή θάνατος
Eleftheria i thanatos
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Mathematics (colloquially, maths or math) is the body of knowledge centered on such concepts as quantity, structure, space, and change, and also the academic discipline that studies them. Benjamin Peirce called it "the science that draws necessary conclusions".
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Euclid's Elements (Greek: Στοιχεῖα) is a mathematical and geometric treatise consisting of 13 books written by the Greek mathematician Euclid in Alexandria circa 300 BC.
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Greek}}}
Writing system: Greek alphabet
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Official language of: Greece
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mathematician is a person whose primary area of study and research is the field of mathematics.

Problems in mathematics

Some people incorrectly believe that mathematics has been fully understood, but the publication of new discoveries in mathematics continues at an immense
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The term Hellenistic (derived from Ἕλλην Héllēn, the Greeks' traditional self-described ethnic name) was established by the German historian Johann Gustav Droysen to refer to the spreading of
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Gumhūriyyat Miṣr al-ʿArabiyyah

Arab Republic of Egypt

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Bilady, Bilady, Bilady
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Ptolemy I Soter (Greek: Πτολεμαῖος Σωτήρ, Ptolemaios Soter, i.e.
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4th century BC - 3rd century BC
350s BC 340s BC 330s BC - 320s BC - 310s BC 300s BC 290s BC
326 BC 325 BC 324 BC - 323 BC - 322 BC 321 BC 320 BC

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3rd century BC - 2nd century BC
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286 BC 285 BC 284 BC - 283 BC - 282 BC 281 BC 280 BC

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A textbook is a manual of instruction or a standard book in any branch of study. They are produced according to the demand of the educational institutions. Textbooks are usually published by one of the four major publishing companies.
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history of mathematics is primarily an investigation into the origin of new discoveries in mathematics, to a lesser extent an investigation into the standard mathematical methods and notation of the past.
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Euclidean geometry is a mathematical system attributed to the Greek mathematician Euclid of Alexandria. Euclid's text Elements is the earliest known systematic discussion of geometry.
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axiom is a sentence or proposition that is not proved or demonstrated and is considered as self-evident or as an initial necessary consensus for a theory building or acceptation.
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theorem is a statement, often stated in natural language, that can be proved on the basis of explicitly stated or previously agreed assumptions. In logic, a theorem is a statement in a formal language that can be derived by applying rules and axioms from a deductive system.
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Number theory is the branch of pure mathematics concerned with the properties of numbers in general, and integers in particular, as well as the wider classes of problems that arise from their study.
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In mathematics, a perfect number is defined as an integer which is the sum of its proper positive divisors, that is, the sum of the positive divisors not including the number itself.
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A Mersenne prime is a Mersenne number that is a prime number.

In mathematics, a Mersenne number is a number that is one less than a power of two,

As of August 2007, only 44 Mersenne primes are known; the largest known prime number (2^32,582,657
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In mathematics, a prime number (or a prime) is a natural number which has exactly two distinct natural number divisors: 1 and itself. An infinitude of prime numbers exists, as demonstrated by Euclid in about 300 BC.
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Euclid's lemma (Greek λῆμμα) is a generalization of Proposition 30 of Book VII of Euclid's Elements.
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In number theory, the fundamental theorem of arithmetic (or unique factorization theorem) states that every natural number greater than 1 can be written as a unique product of prime numbers.
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integer factorization is the process of breaking down a composite number into smaller non-trivial divisors, which when multiplied together equal the original integer.
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Euclidean algorithm (also called Euclid's algorithm) is an algorithm to determine the greatest common divisor (GCD) of two elements of any Euclidean domain (for example, the integers).
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