PRIMES is in P - CSE-IITK
PRIMES is in P - CSE-IITK

M3P14 LECTURE NOTES 11: CONTINUED FRACTIONS 1
M3P14 LECTURE NOTES 11: CONTINUED FRACTIONS 1

Sample pages 6 PDF
Sample pages 6 PDF

Remainder Theorem
Remainder Theorem

... Let’s understand this theorem with an example: Q.5) – Rahul has certain number of cricket balls with him. If he divides them into 4 equal groups, 2 are left over. If he divides them into 7 equal groups, 6 are left over. If he divides them into 9 equal groups, 7 are left over. What is the smallest nu ...
arXiv
arXiv

2340-001/lectures - NYU
2340-001/lectures - NYU

Math 4: Homework due 21 January
Math 4: Homework due 21 January

Homework 9 Solutions
Homework 9 Solutions

Modular Arithmetic
Modular Arithmetic

here
here

slides04-p - Duke University
slides04-p - Duke University

Solutions
Solutions

public_key_cryptography
public_key_cryptography

CHAPTER FIVE
CHAPTER FIVE

Algebraic Numbers - Harvard Mathematics Department
Algebraic Numbers - Harvard Mathematics Department

Grade 7/8 Math Circles Modular Arithmetic 1 Introduction
Grade 7/8 Math Circles Modular Arithmetic 1 Introduction

A CHARACTERIZATION OF ALL EQUILATERAL TRIANGLES IN Z3
A CHARACTERIZATION OF ALL EQUILATERAL TRIANGLES IN Z3

Part 1
Part 1

Some remarks on Euler`s totient function - HAL
Some remarks on Euler`s totient function - HAL

algebraic approach to composite integer factorization
algebraic approach to composite integer factorization

Unit 5 Quadratic Functions
Unit 5 Quadratic Functions

On the least common multiple of q
On the least common multiple of q

Goldbach’s Pigeonhole
Goldbach’s Pigeonhole

(pdf)
(pdf)

examples of groups
examples of groups

Quadratic reciprocity