[eBook Code] Elementary Number Theory with Programming (eBook Code, 1st)

Preface xi

Words xiii

Notation in Mathematical Writing and in Programming xv

1 Special Numbers: Triangular, Oblong, Perfect, Deficient, and Abundant 1
The programs include one for factoring numbers and one to test a conjecture up to a fixed limit.

Triangular Numbers 1

Oblong Numbers and Squares 3

Deficient, Abundant, and Perfect Numbers 4

Exercises 7

2 Fibonacci Sequence, Primes, and the Pell Equation 13
The programs include examples that count steps to compare two different approaches.

Prime Numbers and Proof by Contradiction 13

Proof by Construction 17

Sums of Two Squares 18

Building a Proof on Prior Assertions 18

Sigma Notation 19

Some Sums 19

Finding Arithmetic Functions 20

Fibonacci Numbers 22

An Infinite Product 26

The Pell Equation 26

Goldbach’s Conjecture 30

Exercises 31

3 Pascal’s Triangle 44
The programs include examples that generate factorial using iteration and using recursion and thus demonstrate and compare important techniques in programming.

Factorials 44

The Combinatorial Numbers n Choose k 46

Pascal’s Triangle 48

Binomial Coefficients 50

Exercises 50

4 Divisors and Prime Decomposition 56
The programs include one that uses the algorithm to produce the GCD of a pair of numbers and a program to produce the prime decomposition of a number.

Divisors 56

Greatest Common Divisor 58

Diophantine Equations 65

Least Common Multiple 67

Prime Decomposition 68

Semiprime Numbers 70

When is a Number an mth Power? 71

Twin Primes 73

Fermat Primes 73

Odd Primes Are Differences of Squares 74

When is n a Linear Combination of a and b? 75

Prime Decomposition of n! 76

No Nonconstant Polynomial with Integer Coefficients Assumes Only Prime Values 77

Exercises 78

5 Modular Arithmetic 85
One program checks if a mod equation is true, and another determines the solvability of a mod equation and then solves an equation that is solvable by a brute-force approach.

Congruence Classes Mod k 85

Laws of Modular Arithmetic 87

Modular Equations 90

Fermat’s Little Theorem 91

Fermat’s Little Theorem 92

Multiplicative Inverses 92

Wilson’s Theorem 93

Wilson’s Theorem 95

Wilson’s Theorem (2nd Version) 95

Squares and Quadratic Residues 96

Lagrange’s Theorem 98

Lagrange’s Theorem 99

Reduced Pythagorean Triples 100

Chinese Remainder Theorem 102

Chinese Remainder Theorem 103

Exercises 104

6 Number Theoretic Functions 111
The programs include two distinct approaches to calculating the tau function.

The Tau Function 111

The Sigma Function 114

Multiplicative Functions 115

Perfect Numbers Revisited 115

Mersenne Primes 116

F(n) = Σf(d) Where d is a Divisor of n 117

The Möbius Function 119

The Riemann Zeta Function 121

Exercises 124

7 The Euler Phi Function 134
The programs demonstrate two approaches to calculating the phi function.

The Phi Function 134

Euler’s Generalization of Fermat’s Little Theorem 138

Phi of a Product of m and n When gcd(m,n) > 1 139

The Order of a (mod n) 139

Primitive Roots 140

The Index of m (mod p) Relative to a 141

To Be or Not to Be a Quadratic Residue 145

The Legendre Symbol 146

Quadratic Reciprocity 147

Law of Quadratic Reciprocity 148

When Does x² = a (mod n) Have a Solution? 148

Exercises 150

8 Sums and Partitions 158
The exposition explains the central role of binary representation in computing and the programs produce the binary partition using a built-in function.

An nth Power is the Sum of Two Squares 158

Solutions to the Diophantine Equation a² + b² + c² = d² 159

Row Sums of a Triangular Array of Consecutive Odd Numbers 160

Partitions 160

When is a Number the Sum of Two Squares? 167

Sums of Four or Fewer Squares 170

Exercises 175

9 Cryptography 182
The programs include different ways to generate counts of letters and also Fermat factoring.

Introduction and History 182

Public-Key Cryptography 187

Factoring Large Numbers 188

The Knapsack Problem 191

Superincreasing Sequences 192

Exercises 194

Answers or Hints to Selected Exercises 203

Index 207