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English Pages [904]
AN INTRODUCTION SECOND EDITION
9 L
^
F
l
^rL I /
PH
TIME LINE FOR THE HISTORY OF MATHEMATICS 3000
1000
B.C.E.
3000-2000
1000-500
B.C.E.
India:
hieroglyphic writing of numbers; Building of pyramids at Giza Iraq:
numbers Mesopotamia
2000-1000
in
Greece: Beginnings
India:
mathematics; Ptolemy and
techniques Iraq:
Jordan: Nicomachus and number theory
Nehemiah and
papyri
written; Ideas of linear
equations, volumes, areas
United States: Geometry used architectural designs
axiomatic mathematics;
Egypt: Diophantus and number
Discovery of incommensurabil-
theory; Hypatia and
Spain: Gerbert learns Arabic
commentaries
number system
Eudoxus and proportionality
equations, systems of equations
300-0
Egypt: Euclid and the Elements
Mississippian civilization
China: Liu Hui and mathematical
surveying techniques
Italy:
B.C.E.
400-800 Italy:
Boethius and elementary
mathematics
Archimedes and
Mexico: Development of Mayan numeration and astronomy
theoretical physics
Egypt: Apollonius and conic sections
India:
Aryabhata and
trigonometry; Brahmagupta
Turkey: Hipparchus and
and indeterminate analysis;
trigonometry
Development
of
Hindu-Arabic
decimal place-value number
system China: First tangent tables
1000
in
200-400
ity;
B.C.E.
Abu Kamil and advanced
algebraic techniques
practical
b.c.e.
China: Square and cube roots, systems of linear equations
3000
first
Greece: Plato, Aristotle, and
Cuneiform mathematical tablets written with Pythagorean theorem, quadratic Iraq:
of algebraic
AI-KhwarizmT and
Egypt: Israel:
geometry 500-300
Moscow
Development
algebra text
of
theoretical geometry
B.C.E.
Egypt: Rhind and
800-1000
C.E.
Egypt: Heron and practical
astronomy
China: Rod numerals, Pythagorean theorem
Beginnings of cuneiform
writing of
0-200
B.C.E.
Square root calculations, Pythagorean theorem
Egypt: Beginnings of
800
0
b.c.e.
B.C.E.
0
800
in
BARCODE ON NEXT PAGE i
1600
1200
1000
1200-1400
1000-1200 Iraq: AI-KarajT, induction,
and
Egypt: Ibn al-Haytham, of
sums
powers, and volumes
of
of
Kepler,
1800-1900
Newton, and
Algebraic number theory
celestial
physics
France: Jordanus and advanced
Descartes, Fermat, and analytic
algebra; Levi ben Gerson and
geometry
Galois theory
Groups and
Napier, Briggs, and logarithms
of
and the theory of equations Girard, Descartes,
England: Velocity, acceleration, and the mean speed theorem
cubic
equations
fields
Quaternions and the discovery
Oresme and
kinematics
Omar Khayyam and the
geometric solution
and
trigonometry
induction;
paraboloids Iran:
1600-1700
Iran: NasTr al-DTn al-TusT
Pascal triangle
1800
noncommutative algebra
Theory
of
matrices
The arithmetization
of analysis
Pascal, Fermat, and elementary
and spherical trigonometry; Bhaskara and the Pell equation
China: Chinese remainder
India: Al- Biruni
theorem; Solution
of
Peru: Quipus used for record
keeping
ibn Ezra
India:
combinatorics
Leonardo
of Pisa
Algebraic solution of the
Germany: Perspective and geometry
United States. Astronomical
Anasazi buildings
the Southwest
England:
New
algebra and
Projective geometry of
techniques for
Foundations
of
geometry
differential equations
1900-2000
Development
Set theory
Growth
Attempts to give
Algebraization of mathematics
logically
Lagrange and the analysis
heliocentric system \l\ete
Functions of several variables
of the
solution of polynomial equations
and algebraic
symbolism
1200
of
topology
Influence of computers
calculus
Poland: Copernicus and the
France:
of the calculus of
correct foundations to the
trigonometry texts
Zimbabwe: Construction of Great Zimbabwe structures
1000
geometry
Non-Euclidean geometry
cubic equation
mathematics
in
and the
solving ordinary and partial
introduction of Islamic
in
Differential
Leibniz,
Development
and arctangent
and Italy:
alignments
Newton,
1700-1800
Discovery of power series
for sine, cosine, Italy:
Vector analysis
1400-1600
and
complex
analysis projective geometry
invention of calculus
Spain: Arabic works translated
of
Pascal, Desargues, and
China: Pascal triangle used to
Abraham
probability
polynomial
equations
solve equations
in Latin;
Development
1600
1800
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WOJNGAME
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BURLINGAME PUBLIC LIBRARY
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PUBLIC l IBRARV 480 PRIMROSE ROAD Burlingame, ca 94010
a 3 9042
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31
A HISTORY OF
WITHDRAWN FROM BURLINGAME PUBLIC LIBRARY
MATHEMATICS An Introduction
'°'
A HISTORY OF
MATHEMATICS An Introduction Second Edition
VICTOR
J.
KATZ
University of the District of Columbia
Addison Wesley
Longman An
imprint of
Addison Wesley Longman,
Inc.
Reading, Massachusetts • Menlo Park, California • New York • Harlow, England Don Mills, Ontario • Sydney • Mexico City • Madrid • Amsterdam
To Phyllis, for long
talks,
long walks,
and afternoon naps
Reprinted with corrections, November 1998
Sponsoring Editor: Jennifer Albanese Production Supervisor: Rebecca Malone Project Manager: Barbara Pendergast
Prepress Services Buyer: Caroline Fell
Manufacturing Supervisor: Ralph Mattivello
Design Direction: Susan Carsten Text and Cover Design: Rebecca Lloyd
Cover Photo:
Lemna
© SuperStock
Art Editor: Sarah E. Mendelsohn
Composition and Prepress Services: Integre Technical Publishing Co.,
Inc.
Library of Congress Cataloging-in-Publication Data Katz, Victor
J.
A history of mathematics: 2nd
an introduction
/
Victor
J.
Katz.
ed. p.
cm.
Includes bibliographical references and index.
ISBN 0-321-01618-1 1.
Mathematics
QA21.K33 5 10'. 9
—
History.
I.
Title.
1998
—dc21
98-9273
CIP Copyright
©
1998 by Addison-Wesley Educational Publishers,
All rights reserved. in
No part
of this publication
may
Inc.
be reproduced, stored in a retrieval system, or transmitted,
any form or by any means, electronic, mechanical, photocopying, recording, or otherwise, without the prior
written permission of the publisher. Printed in the United States of America.
4
5
6
7
8
9
10— MA—00
Contents Preface
ix
PART ONE
Mathematics Before the Sixth Century chapter
i
Ancient Mathematics
1
1.1
Ancient Civilizations
1.2
Counting
2
4
1.3
Arithmetic Computations
1.4
Linear Equations
1.5
Elementary Geometry
1
.6
8
14
19
25
Astronomical Calculations
27
1.7
Square Roots
1.8
The Pythagorean Theorem
1.9
Quadratic Equations
30
35
CHAPTER 2 The Beginnings of Mathematics
CHAPTER
3
2.1
The
2.2
The Time of Plato
2.3
Aristotle
2.4
Euclid and the Elements
2.5
Euclid's Other
Earliest
in
Greek Mathematics
Greece 47
52
54
Works
58
95
Archimedes and Apollonius
102
3.1
Archimedes and Physics
3.2
Archimedes and Numerical Calculations
103
3.3
Archimedes and Geometry
3.4
Conics Before Apollonius
116
3.5
The Conics of Apollonius
117
111
46
VI
Contents
chapter 4 Mathematical Methods 4.
chapter
s
1
in Hellenistic
Astronomy Before Ptolemy
4.2
Ptolemy and the Almagest
4.3
Practical
The
135
145
156
Mathematics
Final Chapters of
Times
136
Greek Mathematics
168
5.1
Nicomachus and Elementary Number Theory
5.2
Diophantus and Greek Algebra
5.3
Pappus and Analysis
171
173
183
PART TWO Medieval Mathematics: 500-1400 chapter 6 Medieval China and India
192
Introduction to Medieval Chinese Mathematics
192
6.2
The Mathematics of Surveying and Astronomy
193
6.3
Indeterminate Analysis
6.4
Solving Equations
6.5
Introduction to the Mathematics of Medieval India
6.6
Indian Trigonometry
6.7
Indian Indeterminate Analysis
6.8
Algebra and Combinatorics
6.9
The Hindu-Arabic Decimal Place- Value System
6.
1
197
202
chapter 7 The Mathematics of Islam
chapter
s
7.1
Decimal Arithmetic
7.2
Algebra
7.3
Combinatorics
7.4
Geometry
7.5
Trigonometry
Mathematics
218
225
238
243
in
263
268 274
288
Medieval Europe
Geometry and Trigonometry
8.2
Combinatorics
292
300
307
8.3
Medieval Algebra
8.4
The Mathematics of Kinematics
interchapter Mathematics Around the World
1.2
230
240
8.1
1. 1
210
212
Mathematics
Mathematics
at the
in
314
327
Turn of the Fourteenth Century
America, Africa, and the
Pacific
327 332
Vll
Contents
PART THREE Early
Modern Mathematics: 1400-1700
chapter 9 Algebra 9.
chapter
chapter
io
it
The
1
343
Abacists
Italian
Germany, England, and Portugal
Algebra
9.3
The Solution of
9.4
The Work of Viete and Stevin
in France,
367
Renaissance
in the
Perspective
Geography and Navigation
10.3
Astronomy and Trigonometry
10.4
Logarithms
416
10.5
Kinematics
420
393 398
Geometry, Algebra, and Probability Analytic Geometry
.2
The Theory of Equations
1 1
.3
Elementary Probability
Number Theory Projective
445
448
460
468
The Beginnings of Calculus
469
12.1
Tangents and Extrema
12.2
Areas and Volumes
12.3
Power
12.4
Rectification of Curves and the
12.5
Isaac
12.6
Gottfried
12.7
First Calculus Texts
Newton
Seventeenth Century
458
Geometry
Series
in the
432
1 1
.5
385
389
10.1
10.2
1 1
348
358
Cubic Equation
the
Mathematical Methods
11.4
12
342
Renaissance
9.2
11.1
chapter
in the
475
492 Fundamental Theorem
503
Wilhelm Leibniz
522
532
PART FOUR
Modern Mathematics: 1700-2000 chapter
13
Analysis in the Eighteenth Century 13.1
Differential Equations
544
545
560
13.2
Calculus Texts
13.3
Multiple Integration
13.4
Partial Differential Equations:
13.5
The Foundations of Calculus
574
The Wave Equation 582
578
496
431
viii
Contents
chapter
chapter
14
is
Probability. Algebra,
chapter
chapter
16
Eighteenth Century
14.2
Algebra and Number Theory
14.3
Geometry
14.4
The French Revolution and Mathematics Education
14.5
Mathematics
Algebra
610
621
in the
Number Theory
650
652 662
15.2
Solving Algebraic Equations
15.3
Groups and Fields
15.4
Symbolic Algebra
15.5
Matrices and Systems of Linear Equations
Analysis
in the
—The Beginning of
687
706
16.2
The Arithmetization of Analysis
16.3
Complex Analysis
16.4
Vector Analysis
16.5
Probability and Statistics
in the
670
704
Nineteenth Century
Rigor
Analysis
Structure
677
16.1
in
637
640
Americas
Nineteenth Century
in the
n Geometry
is
in the
Probability
15.1
chapter
and Geometry
597
14.1
729
737 746 753
Nineteenth Century
Geometry
766
768
17.1
Differential
17.2
Non-Euclidean Geometry
17.3
Projective
Geometry
17.4
Geometry
in
17.5
The Foundations of Geometry
772
785
N Dimensions
Aspects of the Twentieth Century
792
797
805
18.1
Set Theory: Problems and Paradoxes
807
814
18.2
Topology
18.3
New
18.4
Computers and Applications
Ideas in Algebra
822
834
ANSWERS TO SELECTED PROBLEMS 857 GENERAL REFERENCES IN THE HISTORY OF MATHEMATICS INDEX AND PRONUNCIATION GUIDE l-l
863
596
Preface
APPROACH AND GUIDING PHILOSOPHY A Call For Change: Recommendations for the Mathematical Preparation of Teachers of Mathematics the Mathematical Association of America’s (MAA) Committee on the MathIn
,
ematical Education of Teachers in
recommends
that all prospective teachers of
mathematics
schools develop an appreciation of the contributions made by various cultures to the growth and devel-
opment of mathematical ideas; investigate the contributions made by individuals, both female and male, and from a variety of cultures, in the development of ancient, modern, and current mathematical topics; [and] gain an understanding of the historical development of major school
mathematics concepts.
According
to the
that mathematics
is
MAA,
knowledge of
an important
human
the history of mathematics
shows students
endeavor. Mathematics was not discovered in the
polished form of our textbooks, but often developed in intuitive and experimental fashion out of a need to solve problems. effectively used in exciting
This
new textbook
The
actual
development of mathematical ideas can be
and motivating students today.
in the history
of mathematics grew out of the conviction that not
only prospective school teachers of mathematics but also prospective college teachers of
mathematics need a background students.
It is
in history to
teach the subject
more
effectively to their
therefore designed for junior or senior mathematics majors
who
intend to
teach in college or high school and thus concentrates on the history of those topics typically
covered
in
an undergraduate curriculum or
in
elementary or high school Because the history .
of any given mathematical topic often provides excellent ideas for teaching the topic, there is sufficient detail in
each explanation of a new concept for the future (or present) teacher
of mathematics to develop a classroom lesson or series of lessons based on history.
many of
the
problems ask the reader
to
develop a particular lesson.
student and prospective teacher will gain from this
from
there, a
knowledge
that will provide a
book
a
My
hope
is
In fact,
that the
knowledge of how we got here
deeper understanding of
many of the
important
concepts of mathematics.
IX
X
Preface
DISTINGUISHING FEATURES Flexible Organization Although the chief organization of the hook the material
By
organized topically.
is
is
by chronological period, within each period
consulting the detailed subsection headings, the
reader can choose to follow a particular theme throughout history. For example, to study
equation solving one could consider ancient Egyptian and Babylonian methods, the geometrical solution methods of the Greeks, the numerical methods of the Chinese, the Islamic solution
methods
for cubic equations
by use of conic sections, the
Italian discovery
of an
algorithmic solution of cubic and quartic equations, the work of Lagrange in developing criteria for in
methods of solution of higher degree polynomial equations, the work of Gauss
solving cyclotomic equations, and the work of Galois in using permutations to formulate
what
today called Galois theory.
is
Focus on Textbooks There is
is
an emphasis throughout the book on the important textbooks of various periods.
one thing to do mathematical research and discover new theorems and techniques.
quite another to elucidate these in a therefore, there
the
is
way
It
It is
can leam them. In nearly every chapter, more important texts of the time. These will be
that others
a discussion of one or
works from which students learned
the important ideas of the great mathematicians.
Today’s students will see how certain topics were treated and will be able to compare these treatments to those in current texts and see the kinds of problems students of years ago
were expected
to solve.
Astronomy and Mathematics Two
chapters are devoted entirely to mathematical methods, that
mathematics was used
problems
to solve
in
is,
other areas of endeavor.
to the
A
ways
in
which
substantial part of
both of these chapters, one for the Greek period and one for the Renaissance, deals with
astronomy. In people.
It
is
fact, in
ancient times astronomers and mathematicians were usually the
crucial to the understanding of a substantial part of
understand the Greek model of the heavens and
model
to give predictions. Similarly,
heavens and see
how mathematicians
we
how mathematics was used
will discuss the
same
Greek mathematics in
applying
to
this
Copernicus-Kepler model of the
of the Renaissance applied mathematics to
its
study.
Non-Western Mathematics A
special effort has been
made
to consider
other than Europe. Thus, there
and the Islamic world. There
is
is
mathematics developed
substantial material
also an “interchapter" in
of the mathematics in the major civilizations
That comparison
is
at
in parts
on mathematics
in
of the world China, India,
which a comparison
is
made
about the turn of the fourteenth century.
followed by a discussion of the mathematics of various other societies
XI
Preface
around the world. The reader will see
many
how
certain mathematical ideas have occurred in
what we
places, although not perhaps in the context of
West
in the
call
“mathematics.”
Topical Exercises Each chapter contains many
exercises, collected by topic for easy access.
exercises are simple computational ones while others help to
fill
Some
of the
the gaps in the mathematical
in the text. For Discussion exercises are open-ended questions for which may involve some research to find answers. Many of these ask students think about how they would use historical material in the classroom. (Answers to most
arguments presented discussion, to
of the computational exercises are provided in the answer section.) Even attempt
many of the
exercises, they should at least read
them
if
readers do not
to gain a fuller understanding
of the material of the chapter.
Focus Essays For easy reference, many biographies of the mathematicians whose work
Biographies
discussed are in separate boxes. In particular, although participated in large
women
numbers
in
Special Topics
is
have for various reasons not
mathematical research, biographies of several important
mathematicians are included,
in contributing to the
women
women who
succeeded, usually against heavy odds,
mathematical enterprise.
There are also boxes on special topics scattered throughout the book.
These include such items as a treatment of the question of the Egyptian influence on
Greek mathematics,
a discussion of the idea of a function in the
work of Ptolemy, and
a
comparison of various notions of continuity. There are also boxes containing important definitions collected together for easy reference.
Additional Pedagogy
Each chapter begins with a relevant quotation and
a description
of an important mathematical “event.” At the end of each chapter, a brief chronology of the mathematicians discussed will help students organize their knowledge.
also contains an annotated
list
which the students can obtain more information. of mathematics location of
in the inside front
some of the important
cover and a
Finally, there is a
map
—
in the inside
time line of the history
back cover indicating the
places mentioned in the text. Finally, given that students
may have difficulty pronouncing the names of some feature
Each chapter
of references to both primary and secondary sources from
mathematicians, the index has a special
a phonetic pronunciation guide.
PREREQUISITES A
working knowledge of one year of calculus
chapters of the
text.
demanding, but the
The mathematical titles
is
sufficient to understand the first twelve
prerequisites for the later chapters are
somewhat more
of the various sections indicate clearly what kind of mathematical
— Xll
Preface
knowledge
is
required. For example, a full understanding of Chapters
1
4 and
1
5 will require
that the student has studied abstract algebra.
NEW FOR THIS EDITION The generally
friendly reception to the
first
edition of this
the basic organization and content. Nevertheless,
improvements, both first
in clarity
edition as well as
new
and
in content,
book encouraged me
to maintain
have attempted to make a number of
based on the comments of many users of the
discoveries in the history of mathematics which have appeared
There are minor changes
in the recent literature.
I
changes include new material on combinatorics
in virtually
in the
every section, but the major
Islamic tradition, Newton’s derivation
of his system of the world, linear algebra in the nineteenth and twentieth centuries, and statistical ideas in the
without introducing
nineteenth century.
new
remaining errors. There are
the references to the literature have
new stamps
as illustrations.
or indeed elsewhere are fictitious.
—
have attempted to correct
I
errors of fact
all
would appreciate notes from anyone who discovers any new problems in every chapter, some of them easier ones, and
ones, but
been updated wherever possible. There are also a few
One should
note, however, that any portraits
on these stamps
purporting to represent mathematicians before the sixteenth century
There are no known representations of any of these people
that
have credible
evidence of being authentic.
COURSE FLEXIBILITY There
is far
more material
in the history first
in this text
of mathematics. In
than can be included in a typical one-semester course
fact, there is
adequate material for a
full
year course, the
half being devoted to the period through the invention of calculus in the late seventeenth
century and the second half covering the mathematics of the eighteenth, nineteenth, and twentieth centuries. For those instructors several
ways
to use this book. First,
who have
only one semester, however, there are
one could cover most of the
first
twelve chapters and
simply conclude with calculus. Second, one could choose to follow one or two particular
themes through
history.
Some
Equation Solving:
1.4,
possible themes with the appropriate section 1.8,
numbers
are
1.9, 2.4.3, 2.5, 5.2, 6.3, 6.4, 6.7, 6.8, 7.2, 8.3, 9.3, 9.4,
11.2, 14.2.4, 15.2
Ideas of Calculus: 2.3.2, 2.3.3, 2.4.9,
3.2, 3.3, 7.2.4, 7.4.4, 8.4, 10.5, 12, 13, 16.1,
16.2, 16.3, 16.4
Concepts of Geometry:
1.5, 1.8, 2.1.2, 2.2, 2.4, 3.3, 3.4, 3.5, 4.3, 5.3, 7.4, 8.1, 10.1,
11.1, 11.5, 14.3, 17, 18.2
Trigonometry, Astronomy, and Surveying:
1
.6, 4.
1
,
4.2, 6.2, 6.6, 7.5, 8.1,1 0.2, 10.3,
12.5.6, 13.1.3
Combinatorics, Probability, and
Linear Algebra:
Statistics: 6.8, 7.3, 8.2,
1
1.3, 14.1, 16.5
1.4, 14.2.2, 14.2.4, 15.5, 17.4, 18.3.3, 18.4.7
Number Theory: 2.1.1, 2.4.7, 5.1, 1.4, 14.2.3, 15.1 Modern Algebra: 6.8, 7.2, 8.3, 9.1, 9.2, 14.2, 15.2, 1
18.4.8
15.3, 15.4, 18.3, 18.4.4, 18.4.6,
Xlll
Preface
Third, one could cover in detail most of the
first
ten chapters
ideas from the later chapters, again following a particular theme.
and then pick selected
One could
also assign
various sections for individual or small-group reading assignments and reports.
ACKNOWLEDGMENTS Like any book,
this
one could not have been written without the help of many people. The
following people contributed to the
Marcia Ascher (Ithaca College), Kreiser (A.A.U.P.
),
J.
first
edition and their input continues to impact the text:
Lennart Berggren (Simon Fraser University), Robert
Robert Rosenfeld (Nassau Community College), and John Milcetich
(University of the District of Columbia).
Many
people made detailed suggestions for the second edition. Although
followed every one of them (and
may come
to regret that),
I
have not
1
sincerely appreciate the
thought they gave to improving the book. These people include Ivor Grattan-Guinness,
Kim Plofker, Eleanor Robson,
Richard Askey, William Anglin. Claudia Zaslavsky, Rebekka
William Ramaley, Joseph Albree, Calvin Jongsma, David Fowler, John
Struik,
Christian Thybo, Jim Tattersall, Judith Grabiner,
Stillwell,
Tony Gardiner, Ubi D’Ambrosio, Dirk
and David Rowe. My heartfelt thanks to all of them. The many reviewers of sections of the manuscript have also provided great help with their detailed critiques and have made this a much better book than it otherwise could have Struik,
been. First Edition Reviewers:
Duane Blumberg, University of Southwestern Louisiana;
Walter Czamec, Framingham State University; Joseph Dauben, Herbert
CUNY; sity;
Lehman College-
Harvey Davis, Michigan State University; Joy Easton, West Virginia Univer-
Carl FitzGerald, University of Califomia-San Diego; Basil Gordon, University of
Califomia-Los Angeles; Mary Gray, American University; Branko Grunbaum, University of Washington; William Hintzman, San Diego State University; Barnabas Hughes, California State University-Northridge; Israel Kleiner,
York University; David
E.
Kullman, Miami
University; Robert L. Hall, University of Wisconsin, Milwaukee; Richard Marshall, Eastern
Michigan University; Jerold Mathews, Iowa State University; Willard Parker, Kansas State
M. Petty, University of Missouri-Columbia; Howard Prouse, Mankato Helmut Rohrl, University of Califomia-San Diego; David Wilson, University of Florida; and Frederick Wright, University of North Carolina-Chapel Hill. Second Edition Reviewers: Salvatore Anastasio, State University of New York, New Platz; Bruce Crauder, Oklahoma State University; Walter Czamec, Framingham State College; William England. Mississippi State University; David Jabon, Eastern Washington University; Clinton State University;
University; Charles Jones, Ball State University; Michael Lacey, Indiana University; Harold
Martin, Northern Michigan University; James Murdock, Iowa State University;
Ken Shaw, Domina
Florida State University; Sverre Smalo, University of California, Santa Barbara;
Jimmy Woods, North Georgia College. I have also benefited greatly from conversations with many historians of mathematics various forums. In particular, those who have regularly attended the annual History
Eberle Spencer, University of Connecticut;
at
of Mathematics seminars, organized by Uta Merzbach, former curator of mathematics at the
National
Museum
of American History,
may
well recognize
some of
the ideas
discussed there. The book has also profited from discussions over the years with,
among
XIV
Preface
Rickey (Bowling Green State
others, Charles Jones (Ball State University), V. Frederick
(MAA), Israel Kleiner (York University), Abe Shenitzer Ubiratan D'Ambrosio (Univ. Estadual de Campinas), and Frank Swetz
University), Florence Fasanelli
(York University).
(Pennsylvania State University).
My students in History of Mathematics (and other) classes
Columbia have also helped me clarify many of my comments and correspondence from students and colleagues elsewhere in an effort to continue to improve this book. Special thanks are due to the librarians at the University of the District of Columbia and especially to Clement Goddard, who never failed to secure any of the obscure books I at
the University of the District of
ideas. Naturally,
I
welcome any
additional
requested on interlibrary loan. Leslie Overstreet of the Smithsonian Institution Libraries’ Special Collections Department was extremely helpful in finding sources for pictures.
Thanks
are
due
and George Duda, I
my
to
who
former editors
helped form the
at
first
also want to thank Jennifer Albanese.
Don Gecewicz,
HarperCollins, Steve Quigley, edition.
my new editor at Addison Wesley Longman, for
her suggestions and her patience as she pushed this book to completion, as well as Rebecca
Malone and Barbara Pendergast,
for their efforts in handling the production aspects,
and
Susan Holbert for preparation of the index.
My family has been very supportive during the many years of writing the book. my
Naomi last,
I
for help at various times
thank
being there
my
I
needed
her.
I
thank
my
children Sharon, Ari, and
and especially for allowing
me
to use our
wife Phyllis for long discussions
when
I
thank
parents for their patience and their faith in me.
owe
her
at
much more
I
computer.
And
any hour of the day or night and for than
I
can ever repay.
Victor
J.
Katz
)
PART ONE Mathematics Before the Sixth Century
h
a
p
r
t
Ancient
Mathematics Accurate reckoning. The entrance into the knowledge of all existing things and
all
obscure secrets. Introduction to Rhind Mathematical Papyrus'
M
in
some 3800
trying to
years ago, a teacher
is
develop mathematics problems to assign
to his students so they
can practice the ideas just
troduced on the relationship triangle.
Larsa
esopotamia: In a scribal school
among
the sides of a right
The teacher not only wants
to be difficult
enough
to
show who
the computations
really understands
the material but also w'ants the answers to
whole numbers so the students
in-
come
out as
will not be frustrated.
After playing for several hours with the few triples
of numbers he knows that satisfy the equation
( ct,b,c
cr
+
b
2
=
c
2 ,
a
new
idea occurs to him. With a few deft
strokes of his stylus, he quickly does
on a moist clay discovered
tablet
how
some
calculations
and convinces himself that he has
to generate as
many of these
triples as
necessary. After organizing his thoughts a bit longer,
he takes a fresh tablet and carefully records a table
list-
ing not only 15 such triples but also a brief indication
of some of the preliminary calculations.
He does
not,
however, record the details of his new method. Those will be
saved for his lecture to his colleagues. They will
then be forced to acknowledge his abilities, and his reputation as
one of the best teachers of mathematics
will
spread throughout the kingdom.
The opening quotation from one of the few documentary sources on Egyptian mathematics and the fictional story of the Babylonian scribe illustrate some of the difficulties in presenting an accurate picture of ancient mathematics. Mathematics certainly existed in virtually every ancient civilization of which there are records, but trained priests and scribes,
government
officials
mathematics for the benefit of the government
in
was always in the domain of specially whose job it was to develop and use
it
such areas as tax collection, measurement. 1
2
Chapter
1
Ancient Mathematics
building, trade, calendar making, and ritual practices. Yet, even though the origins of
many
mathematical concepts stem from their usefulness in these contexts, mathematicians have always exercised their curiosity by extending their ideas necessity. Nevertheless, because
on only
far
beyond
mathematics was a tool of power,
to the privileged few, often
much
detail.
In recent years, scholars have labored to reconstruct the
but
methods were passed
through an oral tradition. Hence the written records are
generally sparse and seldom provide
ilizations
the limits of practical
its
mathematics of ancient civ-
from whatever clues can be found. Naturally, they do not agree on every point,
enough consensus
India. In order to see
these civilizations,
we
we can
exists so that
mathematical knowledge
present a reasonable picture of the state of
in the ancient civilizations
most
clearly the similarities
of Egypt, Mesopotamia, China, and
and differences
mathematics of
in the
each civilization separately but will instead organize
will not treat
our discussion around the following key topics: counting, arithmetic computations, linear equations, elementary geometry, astronomical and calendrical computations, square roots, the “Pythagorean” theorem,
and quadratic equations. To place the story
in context,
we
begin with a brief description of the civilizations themselves and the sources from which
our knowledge of their mathematics
1
.
is
derived.
ANCIENT CIVILIZATIONS
1
Probably the oldest of the world's civilizations the Tigris to
and Euphrates
prominence
river valleys
in this area
is
that of
Mesopotamia, which emerged
sometime around 3500
b.c.e.
over the next 3000 years, including one based
Babylon, whose ruler Hammurapi conquered the entire area around 1700
By
this time, the civilization
had developed a national
in
Many kingdoms came
political loyalty
in the city
of
b.c.e. (Fig. 1.1).
and a pantheon of
gods, including Enlil, the god of Nippur, the traditional religious capital of Mesopotamia,
FIGURE
and Marduk. the city-god of Babylon.
1.1
A bureaucracy and a professional army had come into
existence, and a middle class of merchants and artisans had
Hammurapi on
a stamp
of peasants and the royal
of Iraq. tool,
officials. In addition, writing
which was then used
to aid the
government
1.2
a
stamp of Austria.
maintaining central control over a large
Writing was done by means of a stylus on clay
been excavated during the past 150 years (Fig.
FIGURE
the masses
tablets, thousands of which have was Henry Rawlinson (1810-1895) who, by the mid- 1850s, was first able to translate this cuneiform writing by comparing the Persian and Babylonian inscriptions of King Darius I of Persia (sixth century b.c.e.) on a rockface at Behistun (in modern Iran) describing a military victory. A large number of these tablets contain mathematical problems and solutions or mathematical tables. Hundreds of them have been copied, translated, and explained. They are generally rectangular but occasionally round in shape. They usually fit comfortably into one's hand and are an inch or so in thickness, although some are as small as a postage stamp and others are as large as an encyclopedia volume. We are fortunate that these tablets are virtually indestructible, because they are our only source for Mesopotamian mathematics. The written tradition that they represent died out under Greek domination in the last centuries b.c.e. and remained totally lost until the nineteenth century. The great majority of the excavated tablets date from the time of Hammurapi. although small collections date from the earliest beginnings of Mesopotamian civilization, from the centuries surrounding
area.
Babylonian clay tablet on
in
grown up between
had been invented as an accountancy
1.2). It
3
1
1000
b.c.e. ,
and from the Seleucid period around 300
ter will generally
Hammurapi),
but, as
to refer to the civilization
was
3
Ancient Civilizations
1
b.c.e.
Our discussion
in this
chap-
concern the mathematics of the “Old Babylonian” period (the time of
"Babylonian" itself
.
is
standard
of mathematics,
in the history
we
shall use the adjective
and culture of Mesopotamia, even though Babylon
the major city of the area for only a limited time.
Agriculture emerged in the Nile valley in Egypt about 7000 years ago, but the
first
dynasty to rule both Upper Egypt (the river valley) and Lower Egypt (the delta) dates
from about 3100 and
b.c.e.
The legacy of
priests, a rich court, and, for the
the
pharaohs included an
first
of officials
elite
kings themselves, a role as intermediary between
mortals and gods. This role fostered the development of Egypt's monumental architecture,
FIGURE
including the pyramids, built as royal tombs, and the great temples
1.3
(Fig. 1.3).
The pyramids
at
Gizeh.
The
scribes gradually developed the hieroglyphic writing
and temples. Jean Champollion of this writing early
in the
(
1790-1832)
is
at
Luxor and Karnak
which dots the tombs
chiefly responsible for the
of a multilingual inscription
—
the Rosetta Stone
—
in
hieroglyphics and Greek as well as
the later demotic writing, a form of the hieratic writing of the papyri (Fig.
Much of our knowledge of the mathematics of ancient Egypt, the hieroglyphs in the temples but
problems with
Papyrus purchased ,
FIGURE
1.4
Jean Champollion and a piece of the Rosetta Stone.
Museum
in
1
Mathematical Papyrus named ,
who purchased it at Luxor in
893 by
1
.4).
however, comes not from
from two papyri containing collections of mathematical
their solutions: the Rhincl
A. H. Rhind( 1833- 1863)
translation
first
nineteenth century. His work was accomplished through the help
V. S.
Golenishchev
(d.
for the
Scotsman
Moscow Mathematical who later sold to the Moscow
1858, and the
1947)
it
of Fine Arts. The former papyrus was copied about 1650 b.c.e. by the scribe
A'h-mose from an original about 200 years earlier and is approximately 8 feet long and inches high. The latter papyrus dates from roughly the same period and is over 5 feet long, 1
1
1
but only
some
3 inches high.
As
in the
Mesopotamian
we
case,
are fortunate that the dry
Egyptian climate allowed these mathematical papyri, along with hundreds of other papyri, to
be preserved, because again Greek domination of Egypt
in the
centuries surrounding the
beginning of our era was responsible for the disappearance of the native Egyptian hieratic script (Fig. 1.5).
Although there are legends dating Chinese evidence of such a civilization
earliest solid
Huang
near the there, the
River,
which are dated
Shang dynasty,
to
that the “oracle
is
civilization
back 5000 years or more, the
provided by the excavations
about 1600
b.c.e.
It
is
at
Anyang,
to the society centered
bones” belong, curious pieces of bone inscribed
with very ancient writing that were used for divination by the priests of the period. The
bones are the source of our knowledge of early Chinese number systems. Around the beginning of the
which
FIGURE
1.5
in turn
high official and scribe (15th century, b.c.e.).
millennium
b.c.e., the
Shang were replaced by
the
Zhou
dynasty,
there occured a great intellectual flowering, in
which the most famous philosopher was
Confucius. Academies of scholars were founded
in several
were hired by other feudal lords
by the coming of Amenhotep, an Egyptian
first
dissolved into numerous warring feudal states. In the sixth century b.c.e.,
The
them
in a
of the states. Individual scholars
time of technological growth caused
iron.
feudal period ended as the weaker states were gradually absorbed by the stronger
ones, until ultimately China
Under
to advise
his leadership.
He enforced
was
unified under the
China was transformed
Emperor Qin Shi Huangdi
in
221 b.c.e.
into a highly centralized bureaucratic state.
a severe legal code, levied taxes evenly, and
of weights, measures, money, and. especially, the written
demanded the standardization script. Legend holds that this
— 4
Chapter
1
Ancient Mathematics
emperor ordered the burning of all books from earlier periods to suppress dissent, but there is some reason to doubt that this decree was actually carried out. The emperor died in 210 B.c.r.. and his dynasty was soon overthrown and replaced by that of the Han, which was
400 years The Han completed
to last about
the establishment of a trained civil service, for
which a system of education was necessary. Among' the texts used for
two mathematical works, probably compiled early (Arithmetical Classic of the
Gnomon and
snan slut (Nine Chapters on the
Art).
It is
it
to
should be kept
in
and the Jiuzhang
impossible to date exactly the
it
is
at least several
first
fragmentary
generally believed that at least
China near the beginning of the Zhou period.
mind that even with this
be discussed took place
puipose were
in these texts, but since there are
records of older sources similar to the Nine Chapters, material was extant in
this
dynasty, the Zhoubi suanjing
the Circular Paths of Heaven)
Mathematical
discoveries of the mathematics contained
some of the
Han
in the
Of course,
dating, the Chinese mathematical developments
hundred years
and Egypt. Whether there was any transmission from
later than those in
Mesopotamia
these civilizations to
China
not
is
known.
A
civilization called the
Harappan arose
the third millennium B.c.r.. but there
Indian civilization for which there
by Aryan
tribes migrating
about the eighth century
had
to
is
is
in India
its
late in the
second millennium
monarchical states were established
manage complex systems, such
in the area,
had highly
stratified social
By
b.c.e.
and they
as fortifications, administrative centralization,
large-scale irrigation works. These states
and
systems headed by
kings and priests (brahmins). The literature of the brahmins was oral for
expressed
in
mathematics. The earliest
such evidence was formed along the Ganges River
from the Asian steppes
b.c.e..
on the banks of the Indus River
no direct evidence of
many
generations,
lengthy verses called Vedas. Although these verses probably achieved their
in
current form by
600
b.c.e., there are
no written records dating back beyond the current era
(Fig. 1.6).
Some priests.
It
of the material from the Vedic era describes the intricate sacrificial system of the is
in these
works, the Sulvasutras, that
we
find mathematical ideas. Curiously,
mathematics deals with the theoretical requirements for building altars out of bricks, as far as is known the early Vedic civilization did not have a tradition of brick technology, while the Harappan culture did. Thus there is a possibility that the mathematics although
FIGURE
in the
1.6
this
Sulvasutras was created in the Harappan period, although the
transmission to the later period
A Vedic
manuscript.
are the sources for our
.2
unknown. In any
civilizations in other parts of the
the data uncovered so
far give us
discussion, therefore, must await
1
currently
case,
it is
mechanism of
its
the Sulvasutras that
knowledge of ancient Indian mathematics.
Although there were b.c.e..
is
new
few clues
world before the
to their
first
millennium
mathematical knowledge.
Any
archaeological evidence.
COUNTING
—
The simplest mathematical idea and one that probably existed even before civilization is that of counting, in words and in more permanent form as written symbols. Although an interesting study can be made of number words in various languages (Sidebar 1.1), we restrict ourselves here to a discussion of number symbols. Several methods of organization can be distinguished in the w riting of these symbols. O ne method is called the grouping
1.2
SIDEBAR Number Words
5
Counting
1.1
Languages
in Various 18
10 (ten becomes teen)
English
eighteen
8,
Welsh
deu naw
2X9 (deu from dau =
Hebrew
shmona-eser
8,
Yoruba
eeji
Chinese
shih-pa
2, naw = 9) = 8, eser = 10) 20 less 2 (ogun = 20, eeji = 2) 10, 8 (shih = 10, pa = 8) 8, 10 (asta = 8, dasa = 10) 8, 10(uaxac = 8, lahun = 10) 2 from 20 (duo = 2, viginti = 20) 8 and 10 (okto = 8, deka = 10)
din logun
10 (shmona
Sanskrit
asta-dasa
Mayan
uaxac-lahun
Latin
duodeviginti
Greek
okto kai deka
English
forty
Welsh
de-ugeint
2
Hebrew
arba-im
4s (arba
40
4X10 (ten becomes ty) X 20
(de from dau
=
4,
im
is
=
2.
ugeint
=
20)
the plural ending)
Sanskrit
catvarim-sat
20 X 2 (from ogun = 20. eeji = 2) 4 X 10 (szu = 4, shih = 10) 4X10 (catvarah = 4, sat from dasa
Mayan
ca-ikal
2
Latin
quadraginta
Greek
tettarrakonto
4X10 (quad = 4, ginta from decern = 4X10 (tettara = 4, kunta from deka =
Yoruba
ogoji
Chinese
szu-shih
This table displays the words for 18 and 40 a linguistic analysis of the
method. In
made
to represent larger
such a representation of numbers
is
who
(ca
=
nine ancient and
2, kal is suffix for
modem
=
10)
20) 1
0)
10)
languages along with
2
/ is
used to represent the number
numbers. One of the
earliest
on a fossilized bone discovered
carbon-dated to some time around 20.000 represent, but one scholar
in
derivations.
simplest form, a stroke
its
repetitions are
word
X 20
b.c.e.
It is
1;
appropriate
dated occurrences of
at
Ishango
in
Zaire and
not clear what the strokes or notches
has studied the bone in detail believes they represent a
count of certain periods of the moon.
'
That early peoples used
this
elementary form of
numerical representation to deal with astronomical phenomena would confirm what will be seen
much
in
later
time periods
—
that the
development of mathematics goes hand
in
hand
with the development of astronomy. Artifacts similar to the Ishango bone and dating from
perhaps 8000
b.c.e.,
with regular groupings of notches perhaps representing astronomical
observations, have been found in central Europe as well.
A
more sophisticated example of
the grouping
developed by the Egyptians some 5000 years ago. the
first
several
powers of ten was represented by
familiar vertical stroke for
1.
method of number representation was In this hieroglyphic
a different
Thus 10 was represented by
Pi.
system each of ,
symbol, beginning with the 100 by 9, 1000 by
and
6
Chapter
1
Ancient Mathematics
V Arbitrary whole numbers were then represented by appropriate
10,000 by
the symbols. For example, to represent 12,643 the Egyptians
would write
(Note that the usual practice was to put the smaller digits on the
repetitions of
"|R
left.)
The hieroglyphic number system was the one used fbr writing on temple walls or when the scribes wrote on papyrus, they needed a form of
carving on columns. But
handwriting. For this purpose th ey developed the hieratic system, an example of a ciphered
system. Hcre each
number from
had a specific symbol, as did each multiple of 10
to 9
1
90 and each multiple of 100 from 100 to 900, and so on. A given number, for example 37, was written by putting the symbol for 7 next to that for 30. Since the symbol from 10 for 7
40
cipher
as
to
was £ and that and 200 as
necessary
30 was the
used
is
in
specific
r
Tk
i
—
ill
->'•
/Although a^ero symbol
is
HI,
not
,
CwS
'