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         Ahmes:     more books (38)
  1. L'affaire des momies royales: La verite sur la reine Ahmes-Nefertari (Collection Prehistoire-antiquite negro-africaine) (French Edition) by Aboubacry Moussa Lam, 2000
  2. Der Reformversuch der EKD 1970-1976 (German Edition) by Michael Ahme, 1990
  3. Gems of Ahmes
  4. The Rock Tombs of El Amarna. Part III. The Tombs of Huya and Ahmes (Archaeological Survey of Egypt, Fifteenth Memoir) by N. de G. Davies, 1905
  5. The rock tombs of el-Amarna, Parts III and IV: Part 3 The tombs of Huya and Ahmes & Part 4 The tombs of Penthu, Mahu, and Others (ARCH SURVEY MEMOIRS) (Pt. 3) by Norman De Garis Davies, Barry J. Kemp, 2004-12-31
  6. The homœopathic domestic physician and traveller's medical companion: Containing plain instructions for curing diseases, including those of females and children by homœopathic remedies by Ferdinand Gustav Œhme, 1859
  7. Diary of a Wimpy Kid: The Last Straw by Jeff Kinney, 2009-01-01
  8. Passions : The Wines and Travels of Thomas Jefferson by James M. Gabler, 1995-09-12
  9. While Creation Waits: A Christian Response to the Environmental Challenge by Dale Larsen, Sandy Larsen, 1992-06
  10. How to Eat Fried Worms by Thomas Rockwell, 1953-07-01

41. Ahmes/Mrs. Carlton's Algebra Web Site
ahmes A'hmose (more commonly referred to as ahmes) was an Egyptianscribe who copied an earlier mathematics text on papyrus in
http://www.bonita.k12.ca.us/schools/ramona/teachers/carlton/historypages/history
Ahmes A'h-mose (more commonly referred to as Ahmes) was an Egyptian scribe who copied an earlier mathematics text on papyrus in 1650 B.C. Ahmes began his text with a table of fractions and an explanation of the Egyptian method of using fractions. The ancient Egyptians defined all fractions, with the single exception of the fraction 2/3, in terms of unit fractions. That is, they only used fractions with a numerator of one. For example, instead of writing 3/4, they wrote 1/2 + 1/4. Instead of writing 5/6, they wrote 1/2 + 1/3. Egyptian Fractions Problem Write each fraction in terms of unit fractions only.
If you'd like a little extra credit, e-mail Mrs. Carlton with your FULL solution. You should review the correct e-mail format before you begin to type your solution.

42. MSN Money - Ahmes's Recommendation Page
ahmes Since 2/23/2001 22406 PM Add to personal favorites. Most Recent Posts0. ahmes doesn't have any yet, but there are lots of folks who do.
http://moneycentral.msn.com/community/recommend/recmember.asp?HandleID=ahmes

43. Fiche AHMES
Translate this page ahmes. Conditions de Monte Contacter MP Nudd-Mitchell. Contact. MP Nudd-Mitchell.14340 Notre Dame d'Estrées. 02 31 63 06 86. ahmes. Eleazar. Kerjacques.
http://www.trotting-promotion.com/francais/pageetalons/a/ahmes.html
AHMES Conditions de Monte : Contacter M. P. Nudd-Mitchell Contact M. P. Nudd-Mitchell AHMES Eleazar Kerjacques Querida Little Princess Querido III Dynaflow Taille : 1 m 66 Robe : Bai Date de nais. : 19/04/1988

44. High Priests Of Letopolis: Ahmes Crosslink

http://www.tyndale.cam.ac.uk/Egypt/ptolemies/hpls/hpl_ahmes.htm
This page is designed for use with a browser that supports frames.

45. Tadjetuser Wife Of Ahmes HPL
Tadjetuser. Tadjetuser 1 , parentage and chronology unknown, married ahmes 2 andbecame the mother of Heriu II 3 . She is otherwise unknown. 1 Not in PP.
http://www.tyndale.cam.ac.uk/Egypt/ptolemies/hpls/tadjetuser.htm

[HOME]
Tadjetuser Tadjetuser , parentage and chronology unknown, married Ahmes and became the mother of Heri u II . She is otherwise unknown. Not in PP. Gr: Tetosiris. Stele BM 378. Stele BM 378. Update Notes: 14 Nov 2002: Created page Chris Bennett

46. The Ahmes (Rhind) Papyrus 2/n Table - Roger Webster's History Of Maths - NoiseFa
This site makes extensive use of JavaScript. Please make sure JavaScriptis reenabled, and then reload the page. Sorry for the inconvenience.
http://noisefactory.co.uk/maths/history/hist006.html
This site makes extensive use of JavaScript.
Please make sure JavaScript is re-enabled, and then reload the page.
Sorry for the inconvenience. Because unit fractions were used to represent all fractions, while multiplication was based on repeated doubling, it was important for Ancient Egyptians to know how to double the unit fractions. The Rhind Papyrus includes a decomposition of 2/ n in terms of unit fractions, for all odd values of n from 5 to 101. Recall that 2/3 was a standard fraction in its own right. Divisor ( n Unit Fractions making 2/ n Divisor ( n Unit Fractions making 2/ n Divisor ( n Unit Fractions making 2/ n In today's mathematics, we know of various algebraic formulae for constructing these decompositions, for example n n n n pq p p q q p q and many of the Rhind Papyrus decompositions are of these forms. The derivation of others, however, are harder to understand. For example, the decomposition for 2/15 cannot be obtained using either of these formulae. The importance of 2/3 meant, however, that the Ancient Egyptians knew, and used, the fact that two-thirds of a unit fraction 1/ n can be written as n n n and setting n = 5 in this formula gives the decomposition in the table. Whether or not this is how the Rhind Papyrus decomposition was actually obtained, we cannot know.

47. Untitled Document
Translate this page ahmes vers - 1600 ahmes est le scribe qui a copié le Papyrus de Rhind. Nousne connaissons d'ahmes que ses propres commentaires sur le papyrus.
http://www.sfrs.fr/e-doc/rhind.htm
Ahmes
vers - 1600

48. Untitled
The earliest evidence of practical attempts to solve the problem of squaring thecircle comes from the Egyptian ahmes Papyrus(circa 1550 BC), where the area of
http://www.perseus.tufts.edu/GreekScience/Students/Tim/SquaringCircle.html
The circle is one of the enigma's of mathematics. It is defined as the set of points in a given plane at a given distance from a center point. From a practical position, a compass is an excellent tool for describing such a circle. It is one of the simplest concepts, a cornerstone in the edifice of mathematics. Yet, it eludes mathematical exactness. It is a constant reminder that nothing is exact, even in mathematics. It is not difficult to see why so many wise men pondered the problem in hopes of imposing order upon a reluctant nature. The earliest evidence of practical attempts to solve the problem of squaring the circle comes from the Egyptian Ahmes Papyrus(circa 1550 BC), where the area of a circle is approximated via the formula (64/81) times the diameter^2 [or 3.16 r^2]. The Egyptian's, though, are considered practical mathematicians and probably never confronted the problem formally, and legendary credit for first formal attempt is given to Anaxagorus of Clazomenae while he was in prison for a time. The problem gained importance as Greek mathematics evolved, and it eventually became such a prominent issue that it even earned ridicule from Aristophanes in his Birds , as the astronomer Meton tries to aid in the division of land(beginning in line 997) The problem of squaring the circle defeated conventional techniques of compass and straight edge, but it remained until recent times to be proven impossible. The Greeks, realizing the difficulty, were forced to turn to more complicated structures like the

49. Historische Teksten
Inscription de Sesostris III Khartoum 2683. Nieuwe Rijk De biografie van IneniTextes relatifs à Ineni. De biografie van ahmes zoon van Abana ahmes Pennekhbet
http://millennium.arts.kuleuven.ac.be/egyptology/teksten-hist.htm
KULEUVEN
Latest update:
Home
Werkinstrumenten Teksten BIOGRAFIEEN EN HISTORISCHE TEKSTEN Oude Rijk:

50. Math Forum - Ask Dr. Math
What is the quantity? ahmes uses the method of false position whichwas still a standard method three thousand years later. In
http://mathforum.org/library/drmath/view/62036.html

Associated Topics
Dr. Math Home Search Dr. Math
The Egyptians' Method of False Position
Date: 01/16/2003 at 10:46:24 From: Lisa Subject: The Egyptians' method of false position I understand method of false position: if x is a value added to fraction of x/number = some number. Why does the theory work? Is it because it is similar to the way we would solve by making a common denominator, adding the fractions, and cross multiplying, thus solving for x? In a roundabout way the false position method seems to do the same. Any math reason why it works? Date: 01/16/2003 at 12:48:48 From: Doctor Peterson Subject: Re: The Egyptians' method of false position Hi, Lisa. I'm not positive what kind of problem you are referring to; the method of false position can be applied to many problems, and your description is slightly confusing. But I think you mean the kind of problem discussed here: Aha Problems in Egyptian Mathematics http://www.ms.uky.edu/~carl/ma330/html/aha1.html False Position and Backtracking http://www.learner.org/channel/courses/learningmath/algebra/session6/part_b/

51. ANE Theoretical Standpoints By Milo Gardner
As I read the modern literature, mathematicians continue to argue over plausiblemental hieratic fraction methods used by ahmes, when the issues are
http://mathforum.org/epigone/math-history-list/climpskunseld
ANE Theoretical Standpoints by Milo Gardner
reply to this message
post a message on a new topic

Back to math-history-list
Subject: ANE Theoretical Standpoints Author: gardnerm@ecs.csus.edu Date: The Math Forum

52. Baby Names - Ahmes
Similar pages matematikçiler ahmes. Dogum m.ö 1680 civari Misir. Ölüm m.ö 1620 civari Misir.ahmes, ünlü Rhind Papirüslerinin yazari bilim adamidir.
http://www.kabalarians.com/male/ahmes.htm
Kabalarian Philosophy Main Menu Home Page
Important:
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53. O Papiro De Rhind
Translate this page Alessandro Home Page. O Papiro de ahmes ( ou Rhind) eo Papiro de MoscouDentre todos os antigos documentos matemáticos que chegaram
http://sites.uol.com.br/sandroatini/rhind.htm
Alessandro Home Page O Papiro de Ahmes ( ou Rhind) e o Papiro de Moscou Dentre todos os antigos documentos matemáticos que chegaram aos dias de hoje, talvez os mais famosos sejam os cahmados Papiro de Ahmes ( ou Rhind) e o Papiro de Moscou. O de Ahmes é um longo papiro egípcio, de cerca de 1.650 a.C., onde um escriba de nome Ahmes, ensina as soluções de 85 problemas de aritmética e geometria. Este papiro foi encontrado pelo egiptólogo inglês Rhind no final do século 19 e hoje está exposto no Museu Britânico, em Londres. O de Moscou é um pouco mais velho e contém a fórmula correta para o cálculo do volume de um tronco de pirâmide. Muito provalvelmente existiram papiros análogos anteriores, mas estes foram os mais velhos que se salvaram. Além disto, o de Ahmes notabilizou-se por ter sido seu autor o mais antigo matemático cujo nome a história registrou. Em ambos os papiros aparecem problemas que contêm, timida e disfarçadamente, equações de 1º grau. Um dos problemas de Ahmes dizia : "Uma quantidade , somadaa seus 2/3, mais a metade e mais a sua sétima parte perfaz 33. Qual essa quantidade? "

54. Tumble, Bouncing Balls: Page2
All those lines, and only one ball? ahmes looking over Kidinu's shoulder Ithought it would help explain things. ahmes Let us start with one ball.
http://aleph0.clarku.edu/~djoyce/java/Tumble/page2.html
Tumble: Bouncing Balls
The Physics of Motion
The coordinates of position and velocity
Kidinu: Hey, what happened? All those lines, and only one ball? Ahmes [looking over Kidinu's shoulder]: I thought it would help explain things. Kidinu: I beg your pardon, but I thought I was controling this computer. Ahmes: Please excuse my intrusion, but I think I can explain the physics, if you would like. Nabu-rimanni: I'd like to hear that. Ahmes: Let us start with one ball. It's simpler that way. Notice how it keeps going at the same rate in the same direction until it hits a wall. Nabu-rimanni: Well, yes, but the other balls kept falling down. Why isn't this one? Ahmes: I thought it would be easier if we started without gravity. We can add it later. We can specify where the ball is by using coordinates . The coordinates of the center of the ball are a pair of numbers ( x y ). The number x indicates how far right (if x is positive) or how far left (if x is negative) it is from the vertical center line, while the number y indicates how far above (if y is positive) or how far below (if y is negative) from the horizontal center line.

55. Tumble, Bouncing Balls: Page3
What happens, though, to the velocity when the ball hits the wall? ahmesYou're asking what the new velocity will be? ahmes Which means ?
http://aleph0.clarku.edu/~djoyce/java/Tumble/page3.html
Tumble: Bouncing Balls
The Physics of Motion
Collsions with walls
Kidinu: Okay, fine. What happens, though, to the velocity when the ball hits the wall? Ahmes: You're asking what the new velocity will be? You can probably answer the question yourself when the wall is straight, can't you? Kidinu: Well, sure. It just goes off in the opposite direction. Ahmes: Which means...? Kidinu: Maybe not the opposite direction. That would mean it goes back the way it came. I really meant something like this. [Kidinu draws a picture.] Ahmes: So what you're saying is that the angle of incidence equals the angle of reflection. Is that so? Kidinu: Yes, that's it. Nabu-rimanni: That's fine if the wall is straight, but these walls are curved. Ahmes: It's almost the same thing, that is, it's as if the place where the ball hits the wall is straight. Kidinu: I haven't seen much physics yet. Ahmes: Not that much is needed, so far. But collisions between balls is more complicated. to coordinates to the cover page to the ball collisions David E. Joyce ...
Department of Mathematics and Computer Science

Clark University
Worcester, MA 01610

56. Egypt
Much is known about the Ancient Egyptian knowledge of Mathematics becauseof a document recorded in the second century BC by the scribe, ahmes.
http://www.cmi.k12.il.us/Urbana/projects/cybermummy/egypt.html
Ancient Egyptian Mathematics
Much is known about the Ancient Egyptian knowledge of Mathematics because of a document recorded in the second century B.C. by the scribe, Ahmes. The papyrus roll was found in a Thebes ruin and was purchased in 1858 by Henry Rhind. The Ahmes or Rhind Papyrus was later sold to the British Museum. The references in this papyrus to earlier mathematical concepts, indicate that some of this knowledge may have been handed down from Imhotep, the supervisor of the building of the pyramids around 3,000 B.C.
Calculation of
The Ahmes Papyrus , which contains 84 mathematical problems and their solutions, provides a clue to the Ancient Egyptian value for . The Egyptians used a method of assuming a solution and then correcting it known as regula falsi. Using this approach, a comparison was made between the area of a circle and a square. View the Ancient Egyptian comparison that yields a value for Based on this method, the ancient Egyptians determined a value for that was 3.1605. Ahmes Find out more information about the Egyptian scribe.

57. Hieroglyphics
ahmes Papyrus. The ahmes or Rhind Papyrus, was deciphered once Egyptologistunlocked the Egyptian Hieroglyphs, using the Rosetta Stone.
http://www.cmi.k12.il.us/Urbana/projects/cybermummy/hieroglyphics.html
The Roman Egyptian mummies did not have hieroglyphs (picture writing) on the cartonnage or wrappings, as did mummies in the earlier Egyptian periods. However, much of what we know about the Ancient Egyptians comes from the hieroglyphs on the walls of their tombs and in their art. The tomb writing tells about the individual who died, their accomplishments, where and how they lived.The writing is an attempt to justify their lives and win a place in the after life. It is interesting to note that the writing has lasted thousands of years and their stories have granted them immortality, if not everlasting life. Hieroglyphs are found on the Ancient Egyptian art, sculpture and architecture. This picture writing was a mystery for hundreds of years until the discovery of the Rosetta Stone, which helped unlock the language mystery.
Rosetta Stone
More is known about life in Ancient Egypt than other ancient civilizations. This knowledge comes from the discovery of the Rosetta Stone , a basalt rock inscribed with a message written in three languages: Egyptian Hieroglyphic, Egyptian Demotic and Greek. Napoleonic soldiers found the Rosetta Stone in 1799 and because Egyptologists were familiar with Greek were able to decipher the message and decode the Egyptian Hieroglyphs.

58. Historia Matematica Mailing List Archive: Re: [HM] Any Views On
Re HM Any views on 'Number from ahmes to Cantor'? Subject Re HMAny views on 'Number from ahmes to Cantor'? From Milo Gardner
http://sunsite.utk.edu/math_archives/.http/hypermail/historia/sep00/0109.html
Re: [HM] Any views on 'Number from Ahmes to Cantor'?
Subject: Re: [HM] Any views on 'Number from Ahmes to Cantor'?
From: Milo Gardner ( milogardner@juno.com
Date: Mon Sep 18 2000 - 16:58:05 EDT I thank David from requesting a brief review of this book. My view
is guarded as I will detail. Gazale set out to discuss Egyptian
fractions early in his book; however deferred it, saying it would be
discussed later. When the later time arrived Gazale discussed
an interesting but none historical view of the subject, as he freely
concluded. In the end, nothing of historical value was concluded
concerning reasons why Egyptians like Ahmes wrote in in exact form of
rational number conversions, nor the methods that were employed to

59. Historia Matematica Mailing List Archive: [HM] Any Views On 'Nu
HM Any views on 'Number from ahmes to Cantor'? Subject HM Any views on 'Numberfrom ahmes to Cantor'? Number from ahmes to Cantor / Midhat Gazale/ p. cm.
http://sunsite.utk.edu/math_archives/.http/hypermail/historia/sep00/0106.html
[HM] Any views on 'Number from Ahmes to Cantor'?
Subject: [HM] Any views on 'Number from Ahmes to Cantor'?
From: David Wilkins ( dwilkins@maths.tcd.ie
Date: Mon Sep 18 2000 - 06:46:05 EDT I have within the past hour come across a recently published book
'Number from Ahmes to Cantor', by Midhat Gazale/, amongst the
recent accessions to our departmental library.
I haven't of course had time to work through it yet, but I have
dipped into it (as one does) to see what it has to say about
such topics as the burning of the Library of Alexandria, and
the alleged drowning of Hippasus.
My initial impression is that this is the sort of book that one
could recommend with a clear conscience to the general reader, in particular to undergraduates or mathematically interested schoolchildren. (In particular, my impression from a superficial

60. Untitled Document
Terriers Lose To Miami As ahmes Provides Point. March 11, 2003. Lauraahmes provided the Terriers with their point vs. Miami.
http://www.bu.edu/athletics/tennis/women/2002-03/Neww/03-11-03-vs-miami.html
Terriers Lose To Miami As Ahmes Provides Point March 11, 2003 Laura Ahmes provided the Terriers with their point vs. Miami. Freshman Laura Ahmes (East Sarasota, FL) won her match at number six singles but the Terrier women's tennis team dropped a 6-1 decision to the University of Miami as B.U. continued its spring break trip to Florida. Ahmes won the first set in her match against Abby Smith, 6-2, but then lost the second set, 3-6. However, she came back to win the tiebreaker, 11-9, to emerge with the Terriers' point. Miami started the match off by winning the point in doubles as the Hurricanes won all three matches. At number one, B.U. juniors Elena deMendoza (Madrid, Spain) and Lindsey Dynof (Colts Neck, NJ) lost to Melissa Applebaum and Megan Bradley, 8-0. Junior Elisa Glas (Irun, Spain) and senior captain

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