DOCSLIB.ORG

Pythagoras: the Father of Numbers by Mary Lynn Bushong

Total Page:16

File Type:pdf, Size:1020Kb

Download full-text PDF Read full-text
Pythagoras: the Father of Numbers by Mary Lynn Bushong Name Date Pythagoras: the Father of Numbers By Mary Lynn Bushong Why is it hard to learn about people who lived a long time ago? Records were difficult to preserve. Clay tablets were easily broken, while papyrus, paper, and parchment could be destroyed any number of ways. While many facts about Pythagoras are not certain, some are fairly well established. He was born between 580 and 572 BC on the Greek island of Samos. His mother, Pythais, was a native of Samos, while his father, Mnesarchus, was a Phoenician merchant. It is thought that Pythagoras traveled widely with his father. Some stories about Pythagoras have him staying in Tyre, his father's home city. As a child and young man, he was taught music and played the lyre well. He was also taught poetry, philosophy, and math. Three of the philosopher tutors who had a great influence on his own ideas were Pherekydes, Thales, and Anaximander. Through those three men, Pythagoras became interested in cosmology and mathematics. Later he was encouraged to travel to Egypt to build on his knowledge. There they had perfected the use of geometry. At that time there were strong political ties between Samos and Egypt. Even so, there were limits to the places where Pythagoras could go. He wanted to learn more about the Egyptian's religion. After much searching he found one temple that would train him. Some of the things he learned there made their way into the beliefs of the society he would found. In 525 BC, Egypt was attacked, and Pythagoras was carried off as a prisoner of war to Babylon. While there he studied under the Babylonian wise men. After five years in Babylon, Pythagoras was able to return to Samos. Drawing upon the ideas he had been exposed to while he was away, he established a group he called the "Semicircle" of Pythagoras. They believed that there was not enough morality in the world. He stayed in a cave nearby where he could ponder questions about life and math. About two years later, Pythagoras left Samos and moved to the southern Italian town of Croton. There he founded a religious and philosophical school. He was, of course, the head. His inner circle was called the "mathematicians," while the students were called the "listeners." All of his followers were called Pythagoreans. While the Pythagorean Theorem was known to the Babylonians and others, it is thought that Pythagoras was the first to prove it. He found that when there was a right-angled triangle, the square of the hypotenuse equaled the sum of the squares of the lengths of the other two sides. According to Pythagoras and his followers, math could be found in every part of nature. Additionally, math was an important part of music. He studied the properties of numbers, whether they were even or odd, or if they were perfect numbers. He also thought at first that the Earth was the center of the universe but later changed his mind. Pythagoras was very choosy about those he allowed to join his group. When he would not allow a man named Cylon to join the group, the man became bitter. He began attacking the Pythagoreans. Pythagoras left Croton for a time. Some say he never returned: others say that he did return and that his group grew. Name Date It is thought that Pythagoras was between 80 and 100 years old when he died (500-480 BC). Whatever his age, Pythagoras helped establish math as an important science. It's no wonder that he's called the father of numbers. Pythagoras: the Father of Numbers Questions 1. Pythagoras was from: A. Samos B. Babylon C. Egypt D. Tyre 2. Pythagoras probably traveled widely as a child. A. True B. False 3. What subject was Pythagoras not taught? A. Poetry B. Music C. Philosophy D. Computer programming 4. He developed an interest in cosmology and math because of his three tutors. A. True B. False 5. Pythagoras studied to be an Egyptian priest. A. True B. False 6. How did Pythagoras end up in Babylon? A. He worked as a trader. B. He was an ambassador. C. He was a missionary. D. He was a prisoner of war. 7. Pythagoras' inner circle was called the: A. Professors B. Listeners C. Speakers D. Mathematicians 8. What is one thing mentioned that Pythagoras is known for? Name Date If Pythagoras lived today, how do you think his ideas would be received? How do you think Pythagoras' contributions to math and geometry have affected the modern world?.
Load more

Recommended publications
  • Anaximander's Ἄπειρον
    1 Pulished in: Ancient Philosophy Volume 39, Issue 1, Spring 2019 Anaximander’s ἄπειρον: from the Life-world to the Cosmic Event Horizon Norman Sieroka Pages 1-22 https://doi.org/10.5840/ancientphil2019391 1 Current affiliation of author (July 2020): Theoretische Philosophie, Universität Bremen www.uni-bremen.de/theophil/sieroka Abstract Scholars have claimed repeatedly that Anaximander’s notion of the ἄπειρον marks the first metaphysical concept, or even the first theoretical entity, in Western thought. The present paper scrutinizes this claim. Characterizing natural phenomena as ἄπειρος— that is, as being inexhaustible or untraversable by standard human means—was common in daily practice, especially when referring to landmasses and seas but also when referring to vast numbers of countable objects. I will deny the assumption that Anaximander’s notion started off as being a theoretical answer to a specific philosophical question. That said, the aforementioned everyday notion of ἄπειρος could still lead to the development of theoretical concepts. Based on the observations Anaximander did with seasonal sundials, the inexhaustible landmasses and seas just mentioned became depicted on his world map by means of concentric circles. These circles then marked the bounds of experience and, by being fixed and finite, suggested the possibility of traversing beyond what is directly experienced. Evaluating claims from recent Anaximander scholarship, the paper ends with a brief comparison with concepts from modern physics which play an analogous role of demarcating the bounds of experience. Anaximander’s ἄπειρον: from the Life-world to the Cosmic Event Horizon Norman Sieroka Interest in Anaximander (c. 610-c. 547 BC) has increased in recent years.
    [Show full text]
  • Anaximander and the Problem of the Earth's Immobility
    Binghamton University The Open Repository @ Binghamton (The ORB) The Society for Ancient Greek Philosophy Newsletter 12-28-1953 Anaximander and the Problem of the Earth's Immobility John Robinson Windham College Follow this and additional works at: https://orb.binghamton.edu/sagp Recommended Citation Robinson, John, "Anaximander and the Problem of the Earth's Immobility" (1953). The Society for Ancient Greek Philosophy Newsletter. 263. https://orb.binghamton.edu/sagp/263 This Article is brought to you for free and open access by The Open Repository @ Binghamton (The ORB). It has been accepted for inclusion in The Society for Ancient Greek Philosophy Newsletter by an authorized administrator of The Open Repository @ Binghamton (The ORB). For more information, please contact [email protected]. JOHN ROBINSON Windham College Anaximander and the Problem of the Earth’s Immobility* N the course of his review of the reasons given by his predecessors for the earth’s immobility, Aristotle states that “some” attribute it I neither to the action of the whirl nor to the air beneath’s hindering its falling : These are the causes with which most thinkers busy themselves. But there are some who say, like Anaximander among the ancients, that it stays where it is because of its “indifference” (όμοιότητα). For what is stationed at the center, and is equably related to the extremes, has no reason to go one way rather than another—either up or down or sideways. And since it is impossible for it to move simultaneously in opposite directions, it necessarily stays where it is.1 The ascription of this curious view to Anaximander appears to have occasioned little uneasiness among modern commentators.
    [Show full text]
  • Epicurus and the Epicureans on Socrates and the Socratics
    chapter 8 Epicurus and the Epicureans on Socrates and the Socratics F. Javier Campos-Daroca 1 Socrates vs. Epicurus: Ancients and Moderns According to an ancient genre of philosophical historiography, Epicurus and Socrates belonged to distinct traditions or “successions” (diadochai) of philosophers. Diogenes Laertius schematizes this arrangement in the following way: Socrates is placed in the middle of the Ionian tradition, which starts with Thales and Anaximander and subsequently branches out into different schools of thought. The “Italian succession” initiated by Pherecydes and Pythagoras comes to an end with Epicurus.1 Modern views, on the other hand, stress the contrast between Socrates and Epicurus as one between two opposing “ideal types” of philosopher, especially in their ways of teaching and claims about the good life.2 Both ancients and moderns appear to agree on the convenience of keeping Socrates and Epicurus apart, this difference being considered a fundamental lineament of ancient philosophy. As for the ancients, however, we know that other arrangements of philosophical traditions, ones that allowed certain connections between Epicureanism and Socratism, circulated in Hellenistic times.3 Modern outlooks on the issue are also becoming more nuanced. 1 DL 1.13 (Dorandi 2013). An overview of ancient genres of philosophical history can be seen in Mansfeld 1999, 16–25. On Diogenes’ scheme of successions and other late antique versions of it, see Kienle 1961, 3–39. 2 According to Riley 1980, 56, “there was a fundamental difference of opinion concerning the role of the philosopher and his behavior towards his students.” In Riley’s view, “Epicurean criticism was concerned mainly with philosophical style,” not with doctrines (which would explain why Plato was not as heavily attacked as Socrates).
    [Show full text]
  • Thales of Miletus Sources and Interpretations Miletli Thales Kaynaklar Ve Yorumlar
    Thales of Miletus Sources and Interpretations Miletli Thales Kaynaklar ve Yorumlar David Pierce October , Matematics Department Mimar Sinan Fine Arts University Istanbul http://mat.msgsu.edu.tr/~dpierce/ Preface Here are notes of what I have been able to find or figure out about Thales of Miletus. They may be useful for anybody interested in Thales. They are not an essay, though they may lead to one. I focus mainly on the ancient sources that we have, and on the mathematics of Thales. I began this work in preparation to give one of several - minute talks at the Thales Meeting (Thales Buluşması) at the ruins of Miletus, now Milet, September , . The talks were in Turkish; the audience were from the general popu- lation. I chose for my title “Thales as the originator of the concept of proof” (Kanıt kavramının öncüsü olarak Thales). An English draft is in an appendix. The Thales Meeting was arranged by the Tourism Research Society (Turizm Araştırmaları Derneği, TURAD) and the office of the mayor of Didim. Part of Aydın province, the district of Didim encompasses the ancient cities of Priene and Miletus, along with the temple of Didyma. The temple was linked to Miletus, and Herodotus refers to it under the name of the family of priests, the Branchidae. I first visited Priene, Didyma, and Miletus in , when teaching at the Nesin Mathematics Village in Şirince, Selçuk, İzmir. The district of Selçuk contains also the ruins of Eph- esus, home town of Heraclitus. In , I drafted my Miletus talk in the Math Village. Since then, I have edited and added to these notes.
    [Show full text]
  • Meet the Philosophers of Ancient Greece
    Meet the Philosophers of Ancient Greece Everything You Always Wanted to Know About Ancient Greek Philosophy but didn’t Know Who to Ask Edited by Patricia F. O’Grady MEET THE PHILOSOPHERS OF ANCIENT GREECE Dedicated to the memory of Panagiotis, a humble man, who found pleasure when reading about the philosophers of Ancient Greece Meet the Philosophers of Ancient Greece Everything you always wanted to know about Ancient Greek philosophy but didn’t know who to ask Edited by PATRICIA F. O’GRADY Flinders University of South Australia © Patricia F. O’Grady 2005 All rights reserved. No part of this publication may be reproduced, stored in a retrieval system or transmitted in any form or by any means, electronic, mechanical, photocopying, recording or otherwise without the prior permission of the publisher. Patricia F. O’Grady has asserted her right under the Copyright, Designs and Patents Act, 1988, to be identi.ed as the editor of this work. Published by Ashgate Publishing Limited Ashgate Publishing Company Wey Court East Suite 420 Union Road 101 Cherry Street Farnham Burlington Surrey, GU9 7PT VT 05401-4405 England USA Ashgate website: http://www.ashgate.com British Library Cataloguing in Publication Data Meet the philosophers of ancient Greece: everything you always wanted to know about ancient Greek philosophy but didn’t know who to ask 1. Philosophy, Ancient 2. Philosophers – Greece 3. Greece – Intellectual life – To 146 B.C. I. O’Grady, Patricia F. 180 Library of Congress Cataloging-in-Publication Data Meet the philosophers of ancient Greece: everything you always wanted to know about ancient Greek philosophy but didn’t know who to ask / Patricia F.
    [Show full text]
  • 1 Anaximander and the Origins of Greek Philosophy
    1 Anaximander and the Origins of Greek Philosophy The Problem and the Three Tiers of Explanation ow shall we account for the origins of Greek philoso- phy? To answer the question requires, first of all, that we determine precisely what we are trying to explain. HThis, of course, proves to be a daunting task for it is in large measure a perennial problem for philosophers: What exactly is philosophy, and what did it mean to the ancient Greeks? We can profitably distinguish two kinds of questions in our inquiries: (A) What are the defining characteristics of Greek philosophy in terms of which we can distinguish it from earlier pre- philosophical thought? (B) What explains the rise of this particular type of thinking in Greece? 15 16 Anaximander Naturally, the answer we give to (A) will affect the way we and the approach (B). Reflecting upon the diverse scholarly literature Architects over the course of the last century, the disparate views and approaches suggest, not surprisingly, that there is considerable disagreement about precisely what “Greek philosophy” denotes and connotes.When the variety of opinions have been assem- bled, however, they may be roughly but usefully classified into two groups. On the one hand, we have what might be called first-tier accounts. These accounts answer (A) by identifying epistemological and ontological concerns in the systematic pro- grams of Plato and Aristotle as characteristic of philosophical thought. First-tier approaches offer historical narratives that tend to look backward in time, before the classical period, to determine who should and who should not be included in the story that leads up to them.
    [Show full text]
  • Lecture 4. Pythagoras' Theorem and the Pythagoreans
    Lecture 4. Pythagoras' Theorem and the Pythagoreans Figure 4.1 Pythagoras was born on the Island of Samos Pythagoras Pythagoras (born between 580 and 572 B.C., died about 497 B.C.) was born on the island of Samos, just off the coast of Asia Minor1. He was the earliest important philosopher who made important contributions in mathematics, astronomy, and the theory of music. Pythagoras is credited with introduction the words \philosophy," meaning love of wis- dom, and \mathematics" - the learned disciplines.2 Pythagoras is famous for establishing the theorem under his name: Pythagoras' theorem, which is well known to every educated per- son. Pythagoras' theorem was known to the Babylonians 1000 years earlier but Pythagoras may have been the first to prove it. Pythagoras did spend some time with Thales in Miletus. Probably by the suggestion of Thales, Pythagoras traveled to other places, including Egypt and Babylon, where he may have learned some mathematics. He eventually settled in Groton, a Greek settlement in southern Italy. In fact, he spent most of his life in the Greek colonies in Sicily and 1Asia Minor is a region of Western Asia, comprising most of the modern Republic of Turkey. 2Is God a mathematician ? Mario Livio, Simon & Schuster Paperbacks, New York-London-Toronto- Sydney, 2010, p. 15. 23 southern Italy. In Groton, he founded a religious, scientific, and philosophical organization. It was a formal school, in some sense a brotherhood, and in some sense a monastery. In that organization, membership was limited and very secretive; members learned from leaders and received education in religion.
    [Show full text]
  • Heraclitus on Pythagoras
    Leonid Zhmud Heraclitus on Pythagoras By the time of Heraclitus, criticism of one’s predecessors and contemporaries had long been an established literary tradition. It had been successfully prac­ ticed since Hesiod by many poets and prose writers.1 No one, however, practiced criticism in the form of persistent and methodical attacks on both previous and current intellectual traditions as effectively as Heraclitus. Indeed, his biting criti­ cism was a part of his philosophical method and, on an even deeper level, of his self­appraisal and self­understanding, since he alone pretended to know the correct way to understand the underlying reality, unattainable even for the wisest men of Greece. Of all the celebrities figuring in Heraclitus’ fragments only Bias, one of the Seven Sages, is mentioned approvingly (DK 22 B 39), while another Sage, Thales, is the only one mentioned neutrally, as an astronomer (DK 22 B 38). All the others named by Heraclitus, which is to say the three most famous poets, Homer, Hesiod and Archilochus, the philosophical poet Xenophanes, Pythago­ ras, widely known for his manifold wisdom, and finally, the historian and geog­ rapher Hecataeus – are given their share of opprobrium.2 Despite all the intensity of Heraclitus’ attacks on these famous individuals, one cannot say that there was much personal in them. He was not engaged in ordi­ nary polemics with his contemporaries, as for example Xenophanes, Simonides or Pindar were.3 Xenophanes and Hecataeus, who were alive when his book was written, appear only once in his fragments, and even then only in the company of two more famous people, Hesiod and Pythagoras (DK 22 B 40).
    [Show full text]
  • The Fragments of Zeno and Cleanthes, but Having an Important
    ,1(70 THE FRAGMENTS OF ZENO AND CLEANTHES. ftonton: C. J. CLAY AND SONS, CAMBRIDGE UNIVERSITY PRESS WAREHOUSE, AVE MARIA LANE. ambriDse: DEIGHTON, BELL, AND CO. ltip>ifl: F. A. BROCKHAUS. #tto Hork: MACMILLAX AND CO. THE FRAGMENTS OF ZENO AND CLEANTHES WITH INTRODUCTION AND EXPLANATORY NOTES. AX ESSAY WHICH OBTAINED THE HARE PRIZE IX THE YEAR 1889. BY A. C. PEARSON, M.A. LATE SCHOLAR OF CHRIST S COLLEGE, CAMBRIDGE. LONDON: C. J. CLAY AND SONS, CAMBRIDGE UNIVERSITY PRESS WAREHOUSE. 1891 [All Rights reserved.] Cambridge : PBIXTKIi BY C. J. CLAY, M.A. AND SONS, AT THK UNIVERSITY PRKSS. PREFACE. S dissertation is published in accordance with thr conditions attached to the Hare Prize, and appears nearly in its original form. For many reasons, however, I should have desired to subject the work to a more under the searching revision than has been practicable circumstances. Indeed, error is especially difficult t<> avoid in dealing with a large body of scattered authorities, a the majority of which can only be consulted in public- library. to be for The obligations, which require acknowledged of Zeno and the present collection of the fragments former are Cleanthes, are both special and general. The Philo- soon disposed of. In the Neue Jahrbticher fur Wellmann an lofjie for 1878, p. 435 foil., published article on Zeno of Citium, which was the first serious of Zeno from that attempt to discriminate the teaching of Wellmann were of the Stoa in general. The omissions of the supplied and the first complete collection fragments of Cleanthes was made by Wachsmuth in two Gottingen I programs published in 187-i LS75 (Commentationes s et II de Zenone Citiensi et Cleaitt/ie Assio).
    [Show full text]
  • Pythagoras' Theorem Information Sheet Finding the Length of the Hypotenuse
    Pythagoras’ Theorem In this activity you will use Pythagoras’ Theorem to solve real-life problems. Information sheet There is a formula relating the three sides of a right-angled triangle. It can be used to mark out right angles on sports pitches and buildings. If the length of the hypotenuse of a right-angled triangle is c and the lengths of the other sides are a and b: 2 2 2 c = a + b c 2 2 2 a and a = c – b 2 2 2 and b = c – a b To find the hypotenuse, add the squares of the other sides, then take the square root. To find a shorter side, subtract the squares of the other sides, then take the square root. Think about … How do you decide which sides to call a, b and c? How do you decide whether to add or subtract? Finding the length of the hypotenuse: example Find c. 12.4 cm 6.3 cm c How to do it …. Using Pythagoras gives c2 = 6.32 + 12.42 c 2 = 39.69 + 153.76 = 193.45 c = 193.45 = 13.9086… c = 13.9 cm (to 1 dp) Nuffield Free-Standing Mathematics Activity ‘Pythagoras Theorem’ Student sheets Copiable page 1 of 4 © Nuffield Foundation 2012 ● downloaded from www.fsmq.org Rollercoaster example C The sketch shows part of a rollercoaster ride between two points, A and B at the same horizontal level. drop The highest point C is 20 metres above AB, ramp 30 m the length of the ramp is 55 metres, and 55 m 20 m the length of the drop is 30 metres.
    [Show full text]
  • Pythagoras and the Pythagoreans1
    Pythagoras and the Pythagoreans1 Historically, the name Pythagoras meansmuchmorethanthe familiar namesake of the famous theorem about right triangles. The philosophy of Pythagoras and his school has become a part of the very fiber of mathematics, physics, and even the western tradition of liberal education, no matter what the discipline. The stamp above depicts a coin issued by Greece on August 20, 1955, to commemorate the 2500th anniversary of the founding of the first school of philosophy by Pythagoras. Pythagorean philosophy was the prime source of inspiration for Plato and Aristotle whose influence on western thought is without question and is immeasurable. 1 c G. Donald Allen, 1999 ° Pythagoras and the Pythagoreans 2 1 Pythagoras and the Pythagoreans Of his life, little is known. Pythagoras (fl 580-500, BC) was born in Samos on the western coast of what is now Turkey. He was reportedly the son of a substantial citizen, Mnesarchos. He met Thales, likely as a young man, who recommended he travel to Egypt. It seems certain that he gained much of his knowledge from the Egyptians, as had Thales before him. He had a reputation of having a wide range of knowledge over many subjects, though to one author as having little wisdom (Her- aclitus) and to another as profoundly wise (Empedocles). Like Thales, there are no extant written works by Pythagoras or the Pythagoreans. Our knowledge about the Pythagoreans comes from others, including Aristotle, Theon of Smyrna, Plato, Herodotus, Philolaus of Tarentum, and others. Samos Miletus Cnidus Pythagoras lived on Samos for many years under the rule of the tyrant Polycrates, who had a tendency to switch alliances in times of conflict — which were frequent.
    [Show full text]
  • No Man Is an Island: Evolution Before Darwin and Wallace
    Journal of the Royal Society of Western Australia, 92: 365–368, 2009 No man is an island: Evolution before Darwin and Wallace Stefan A. Revets University of Western Australia, School of Earth and Environment, 35 Stirling Highway M004, Crawley WA 6008 Manuscript received January 2010; accepted February 2010 Abstract Darwin and Wallace did not publish their Theory of Evolution in an intellectual or conceptual vacuum. The confrontation between a static and dynamic view of the world harks back to the beginning of speculative thought. The nature of the organic world played a role in these early debates and, once Biology came into existence, would become a focal point of attention. I propose a sketch of the thoughts and ideas on organismic change from the earliest Greek “Phusikoi’’ through the ages up to Darwin and Wallace’s time. Charting the evolution of Evolution as a concept should help and illuminate the climate and context in which Darwin and Wallace proposed their important theory. Keywords: evolution, history of ideas; Darwin; Wallace Introduction turn to Ancient Greece. The myths and religion which made up the world of thought can be seen quite well in The concept of organismic evolution proposed by the works of Hesiod and Homer, both whom lived Darwin and Wallace did not appear in a vacuum. To around 700 BC. For them, Chaos was the first principle, understand the intellectual climate in which their theory from which came Earth and Eros and from them, the was proposed, we need to see how it evolved. other Gods. Under various guises, this is the familiar To cover 2 millenia of thought, theories and story of a cosmogony centred around a deity (or deities), philosophies would be a titanic task and to do so within who ends up creating the world.
    [Show full text]