Brahmagupta brahmagupta (English). Search for brahmagupta in NRICH PLUS maths.org Google. Definition (keystage 1). An Indian mathematician, who lived from 598 http://thesaurus.maths.org/mmkb/entry.html?action=entryByConcept&id=1149&langcod
Brahmagupta I brahmagupta I. The First Problem Set. Roy Lisker, 2002. brahmagupta II is thesecond of a series of books of mathematics problems. http://www.fermentmagazine.org/Publicity/Science/brahma2.html
Extractions: Brahmagupta I The First Problem Set Roy Lisker, 2002 Brahma II contains 16 problems at the level of graduate students and advanced undergraduates in mathematics. It is the author's hope that some of these problems are challenging to mathematicians in general. All solutions are written out in full. Brahmagupta (598-665 C.E.) was an outstanding mathematician and astronomer of 7th Century India. Problems: Factoring Polynomials
Brahmagupta I brahmagupta I. The First Problem Set. Roy Lisker, 2002. brahmagupta 1 is thefirst of a series of books of mathematics problems, largely invented by its http://www.fermentmagazine.org/Publicity/Science/brahma1.html
General Brahmagupta's Formula - WebCalc Calculator Menu Forums About WebCalc Comments Newsletter Tell a Friend Resources Legal Search Help. General brahmagupta s Formula. Side A http://www.webcalc.net/calc/0532.php
Brahmagupta's Formula - WebCalc brahmagupta s Formula. Solving for Area For a more general calcualtion youcan use the General brahmagupta s Formula calculator which requires two more http://www.webcalc.net/calc/0021.php
Brahmagupta's Formula In its basic and easiestto-remember form, brahmagupta s formula gives the area In the case of non-cyclic quadrilaterals, brahmagupta s formula can be http://www.algebra.com/algebra/about/history/Brahmagupta%27s-formula.wikipedia
Extractions: Over US$130,000 has been donated since the drive began on 19 August. Thank you for your generosity! In geometry Brahmagupta 's formula formula finds the area of any quadrilateral . In its most common form, it yields the area of quadrilaterals that can be inscribed in a circle In its basic and easiest-to-remember form, Brahmagupta's formula gives the area of a cyclic quadrilateral whose sides have lengths a b c d as: where s , the semiperimeter , is determined by In the case of non-cyclic quadrilaterals, Brahmagupta's formula can be extended by considering the measures of two opposite angles of the quadrilateral: where is half the sum of two opposite angles. (The pair is irrelevant: if the other two angles are taken, half their sum is the supplement of . Since cos(180 â θ) = â cosθ , we have cos (180 â θ) = cos It is a property of cyclic quadrilaterals (and ultimately of inscribed angles ) that opposite angles of a quadrilateral sum to . Consequently, in the case of an inscribed quadrilateral
Science Jokes:Brahmagupta brahmagupta. brahmagupta (c.598c. 665), Hindu mathematician and astronomer.he wrote the oldest known work with the cipher zero. http://www.xs4all.nl/~jcdverha/scijokes/Brahmagupta.html
BRAHMAGUPTA Translate this page brahmagupta (598-660). Astrónomo y matemático indio. Es, sin duda, el mayormatemático, de la antigua civilización india. Desarrolló su actividad en el http://almez.pntic.mec.es/~agos0000/Brahmagupta.html
Malaspina.com - Brahmagupta (598-668) Research bibliography, books and links to 1000 other interdisciplinary entriescompiled by Russell McNeil. http://www.mala.bc.ca/~mcneil/brahma1.htm
Brahmagupta (598-668) Library Of Congress Citations 520/.934 Notes Previously published as a section of brahmagupta sBreahmasphutasiddheanta. Subjects brahmagupta, 7th cent. Astronomy, Ancient. http://www.mala.bc.ca/~mcneil/cit/citlcbrahma1.htm
Extractions: The Little Search Engine that Could Down to Name Citations LC Online Catalog Amazon Search Book Citations [4 Records] Author: Brahmagupta, 7th cent. Title: The Kharnrdakheadyaka (an astronomical treatise) of Brahmagupta; with the commentary of Bhartrtotpala. Edited ... translated [and published] by Bina Chatterjee. Published: [New Delhi]; distributor: World Press, Calcutta [1970] Description: 2 v. 23 cm. LC Call No.: QB18 .B72 Notes: Added t.p.: in Sanskrit. Sanskrit and English: introd. and notes in English. Bibliography: v. 1, p. 309-315. v. 1. Introduction, translation, and mathematical notes.v. 2. Text and commentary. Subjects: Astronomy, Hindu. Other authors: Bhartrtotpala, fl. 950-966. Kharnrdakheadyakavivrrti. Chatterjee, Bina, 1906- ed. Control No.: 78919809 /SA/r91 Author: Brahmagupta, 17th cent. Title: Breahmasphutasiddheanta and dhyeanagrahopadeseadhyeaya [microform] / by Brahmagupta ; edited with his own commentary by Maheamahopeadhyeaya Sudheakara Dvivedin. Published: Benares : Medical Hall Press, 1902. Description: ca. 500 p. LC Call No.: Microfilm 4821(Q) Notes: Title page in Hindi and English. Microfilm. Chicago, Ill. : Dept. of Photographic Reproduction, 1945. 1 microfilm reel : negative ; 35 mm. Other authors: Dvivedin, Maheamahopeadhyeaya Sudheakhara. Control No.: 89893951
Brahmagupta's Formula brahmagupta s Formula. Formula Database . Added by Holena on April 27, 2001at 174019. The area of a cyclic quad= the sq. root of (sa)(sb)(sc)(sd), http://library.thinkquest.org/20991/gather/formula/data/207.html
BRAHMAGUPTA(ca.628) And BHASKARA(1114-ca.1185) brahmagupta was the most prominent Hindu mathematician of the seventh century . The mathematical parts of brahmagupta s and Bhaskara s works were http://library.thinkquest.org/22584/temh3025.htm
Extractions: BACK Index of Development Graphic Version BRAHMAGUPTA(ca.628) and BHASKARA(1114-ca.1185) Brahmagupta was the most prominent Hindu mathematician of the seventh century. He lived and worked in the astronomical center of Ujjain, in central India. In 628, he wrote his Brahma-sphuta-sidd'hanta ("the revised system of Brahma"), a work on astronomy of twenty-one chapters, of which Chapters 12 and 18 deal with mathematics. Mahavira, who floufished about 850, was from Mysore in southern India and Brahmagrpta's city of Ujjain. His work, Siddhanta Siromani ("diadem of an astronomical system"), was written in 1150 and shows little advancement over the work of Brahmagupta of more than 500 years earlier. The important mathematical parts of Bhaskara's workare the Liavati ("the beautiful") and Vijagania ("seed arithmetic"), which deal with arithmetic and algebra, respectively. The mathematical parts of Brahmagupta's and Bhaskara's works were translated into English in 1817 by H.T.Colebrooke. the Surya Siddhanta was translated by E.Burgess in 1860, and Mahavira's work was published in 1912 by M.Rangacarya.
Brahmagupta - Anagrams brahmagupta anagrams. Rearranging the letters of brahmagupta (Mathematician)gives Find more anagrams of brahmagupta (or any other text)! http://www.anagramgenius.com/archive/brahma.html
From Gls@odyssey.att.com (Col. GL Sicherman) Newsgroups Sci.math My favorite Herontype formula is brahmagupta s formula for the maximum areaof a quadrilateral KK = (s - a)(s - b)(s - c)(s - d) Does *this* have http://www.ics.uci.edu/~eppstein/junkyard/quad-area.html
Extractions: From: gls@odyssey.att.com (Col. G. L. Sicherman) Newsgroups: sci.math Subject: Re: Heron-type formulas Date: 12 Jun 90 13:03:49 GMT Organization: Jack of Clubs Precision Instruments Co. My favorite "Heron-type" formula is Brahmagupta's formula for the maximum area of a quadrilateral: KK = (s - a)(s - b)(s - c)(s - d) Does *this* have n-dimensional analogues? -:- Most people hate egotists. They remind them of themselves. I love egotists. They remind me of me. R. Smullyan Col. G. L. Sicherman gls@odyssey.att.COM
Elementary Geometry For College Students, 3e brahmagupta s Theorem. Heron s Theorem can be treated as a corollary of The Hindu mathematician brahmagupta published much of his work around 628 AD. http://college.hmco.com/mathematics/alexander/elementary_geometry/3e/students/br
Brahmagupta -- Encyclopædia Britannica brahmagupta one of the most accomplished of the ancient Indian astronomers.He also had a profound and direct influence on Islamic and Byzantine astronomy. http://www.britannica.com/eb/article-9016154
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About "Brahmagupta's Formula" ,Problem Develop a proof for brahmagupta s Formula, which provides the area Abrahmagupta s Formula. _ http://mathforum.org/library/view/5275.html
Extractions: Visit this site: http://jwilson.coe.uga.edu/emt725/brahmagupta/brahmagupta.html Author: Jim Wilson, Dept. of Mathematics Education, Univ. of Georgia Description: Problem: Develop a proof for Brahmagupta's Formula, which provides the area A of a cyclic quadrilateral (i.e., a simple quadrilateral inscribed in a circle) with sides of length a, b, c, and d as A = sqrt((s-a)(s-b)(s-c)(s-d)) where s is the semiperimeter (a+b+c+d)/2. There are alternative approaches to this proof. The one outlined here is intuitive and elementary; a more elegant approach is available using trigonometry. From a course on Problem Solving in Mathematics. Levels: College Languages: English Resource Types: Course Notes Math Topics: Conic Sections and Circles Triangles and Other Polygons Trigonometry
Math Forum Electronic Newsletter brahmagupta S FORMULA A Webmaster Correspondence http//mathforum.org/help/webmaster/bramputa.html A conversation demonstrating how educators can draw on http://mathforum.org/electronic.newsletter/mf.intnews2.23.html
Extractions: http://www.ics.uci.edu/~eppstein/junkyard/ http://www.ics.uci.edu/~eppstein/geom.html http://www.ics.uci.edu/~eppstein/recmath.html ... http://mathforum.org/social/math.women.html This collection of resources from the Math Forum for information about women and mathematics offers links to sites of general and historical interest, publications, programs, and major organizations. Featured sites include: - Women in Math Project, by Professor Marie Vitulli of the University of Oregon - Women Mathematicians, biographies written by students at Agnes Scott College - The Ada Project (TAP), Resources for Women in Computing, a resource clearinghouse - Girls' Attitudes, Self-Expectations, and Performance in Math, an annotated bibliography - NSF Report on Issues of Equity, the 1994 National Science Foundation report, online - Summer and Mentoring Programs for Undergraduate Women - GirlTECH, a Teacher Training and Student Council Program The materials on this page are among those catalogued in the Forum Internet Resource Collection. To find even more information about women in math and science, try searching our database: http://mathforum.org/dumpgrepform.html
