Search results
In mathematics, modular arithmetic is a system of arithmetic for integers, where numbers "wrap around" when reaching a certain value, called the modulus. The modern approach to modular arithmetic was developed by Carl Friedrich Gauss in his book Disquisitiones Arithmeticae, published in 1801.
Dla dzielnika równego 2 konstruujemy zegar z liczbami 0 i 1. Zaczynamy od 0 i idziemy w prawo 7 kroków dookoła zegara, otrzymując sekwencję liczb 1, 0, 1, 0, 1, 0, 1. Skończyliśmy na 1 więc 7 mod 2 = 1 .
25 sty 2020 · Modulo-2 Arithmetic. Modulo-2 arithmetic is an arithmetic system where every result is taken modulo-2. Here are some examples: In short, the result of the operation is 1 if the result is odd, and 0 if the result is even.
Modulo 2 Arithmetic. Modulo 2 arithmetic is performed digit by digit on binary numbers. Each digit is considered independently from its neighbours. Numbers are not carried or borrowed.
Learn what modular arithmetic is, how to use the modulo operator, and how to visualize it with clocks. See examples of modular arithmetic with different moduli and negative numbers, and how it relates to congruence modulo.
Arytmetyka modularna, arytmetyka reszt – system liczb całkowitych, w którym liczby „zawijają się” po osiągnięciu pewnej wartości nazywanej modułem, często określanej terminem modulo (skracane mod).
Learn about modular arithmetic, a system of arithmetic for integers that considers the remainder. Find out how to perform operations, define congruence, and apply modular arithmetic to cryptography and computer science.
