Pascal’s Arithmetical Triangle

Pascal’s Arithmetical Triangle

Authors : A.W.F. Edwards
Publisher : Courier Dover Publications
Published Date : 2019-06-12
ISBN-13 : 9780486832791
Page : 224 Pages
Language : en


Descriptions Pascal’s Arithmetical Triangle

"An impressive culmination of meticulous research into original sources, this definitive study constitutes the first full-length history of the Arithmetic Triangle." — Mathematics of Computation

Pascal’s Arithmetical Triangle was named for the seventeenth-century French philosopher/mathematician Blaise Pascal, though he did not invent it. A never-ending equilateral triangle of numbers that follow the rule of adding the two numbers above to get the number below, it appears much earlier in the literature of Hindu and Arabic mathematics and continues to fascinate Western mathematicians. Two sides are comprised of "all 1s," and because the triangle is infinite, there is no "bottom side." This book by A. W. F. Edwards, Professor of Biometry at the University of Cambridge, explores Pascal’s Arithmetical Triangle and the way it has been studied, enjoyed, and used by mathematicians throughout history.

"A fascinating book…giving new insights into the early history of probability theory and combinatorics and incidentally providing much stimulating material for teachers of mathematics." — G. A. Bernard, International Statistical Institute Review

"Scrupulously researched . . . carries the reader along in a rewarding manner. It is a scientific who-dun-it and one must admire the author for the scholarly yet unpedantic manner in which he disperses some of the mists of antiquity." — A. W. Kemp, Biometrics

"Recommended not only to historians and mathematicians, but also to students seeking to put some life into the dry treatment of these topics to which they have doubtless been subjected." — Ivor Grattan-Guinness, Annals of Science


Related Post


    Likelihood
    Cogwheels of the Mind
    Pascal's Arithmetical Triangle
    Annotated Readings in the History of Statistics
    Ending the Mendel-Fisher controversy

About apujb86