Jasbir S. Chahal

Number Theory and Geometry through History

• Broschiertes Buch

Produktbeschreibung

Developed from a course on the history of mathematics, the book is aimed at school teachers of mathematics who need to learn more about mathematics than its history, and in a way they can communicate to middle and high school students. The author hopes to overcome, through these teachers using this book, math phobia among these students.

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Produktdetails

• Verlag: Taylor & Francis Ltd
• Seitenzahl: 284
• Erscheinungstermin: 22. Mai 2025
• Englisch
• Abmessung: 234mm x 156mm
• ISBN-13: 9781041010166
• ISBN-10: 1041010168
• Artikelnr.: 72600266

Autorenporträt

Dr. Jasbir S. Chahal is a Professor of Mathematics at Brigham Young University. He received his Ph.D. from Johns Hopkins University. After spending a couple of years at the University of Wisconsin as a postdoc, he joined Brigham Young University as an assistant professor and has been there ever since. He specializes in and has published several papers in number theory. For hobbies, he likes to travel and hike. His books, Fundamentals of Linear Algebra, and Algebraic Number Theory, are also published by CRC Press.

Inhaltsangabe

I Arithmetic
1 What is a Number?
1.1 Various Numerals to Represent
2 Arithmetic in Different Bases
3 Arithmetic in Euclid's Elements
4 Gauss-Advent of Modern Number Theory
4.1 Number Theory of Gauss
4.2 Cryptography
4.3 Complex Numbers
4.4 Application of Number Theory - Construction of Septadecagon
4.5 How Did Gauss Do It?
4.6 Equations over Finite Fields*
4.7 Law of Quadratic Reciprocity*
4.8 Cubic Equations*
4.9 Riemann Hypothesis*
5 Numbers beyond Rationals
5.1 Arithmetic of Rational Numbers
5.2 Real Numbers
II Geometry
6 Basic Geometry
7 Greece: Beginning of Theoretical Mathematics
8 Euclid: The Founder of Pure Mathematics
8.1 Some Comments on Euclid's Proof
9 Famous Problems from Greek Geometry
III Contributions of Some Prominent Mathematicians
10 Fibonacci's Time and Legacy
10.1 Liber Abaci
10.2 Liber Quadratorum
10.3 Equivalent Formulations of the Problems
11 Solution of the Cubic
11.1 Introduction
11.2 History
12 Leibniz, Newton, and Calculus
12.1 Differential Calculus
12.2 Integral Calculus
12.3 Proof of FTC
12.4 Application of FTC
13 Euler and Modern Mathematics
13.1 Algebraic Number Theory
13.2 Analytical Number Theory
13.3 Euler's Discovery of e¿i + 1 = 0
13.4 Graph Theory and Topology
13.5 Traveling Salesman Problem
13.6 Planar Graphs
13.7 Euler-Poincaré Characteristic
13.8 Euler Characteristic Formula
14 Non-European Roots of Mathematics
15 Mathematics of the 20th Century*
15.1 Hilbert's 23 Problems
1 Riemann Hypothesis
2 Poincaré Conjecture
3 Birch & Swinnerton-Dyer (B&S-D) Conjecture
15.2 Fermat's Last Theorem
15.3 Miscellaneous