How to compute mod of a big number? Last Updated : 10 Apr, 2023 Comments Improve Suggest changes Like Article Like Report Given a big number 'num' represented as string and an integer x, find value of "num % a" or "num mod a". Output is expected as an integer. Examples : Input: num = "12316767678678", a = 10 Output: num (mod a) ? 8 The idea is to process all digits one by one and use the property that xy (mod a) ? ((x (mod a) * 10) + (y (mod a))) mod a where, x : left-most digit y: rest of the digits except x. for example: 625 % 5 = (((6 % 5)*10) + (25 % 5)) % 5 = 0 Below is the implementation. Thanks to utkarsh111 for suggesting the below solution. C++ // C++ program to compute mod of a big number represented // as string #include <iostream> using namespace std; // Function to compute num (mod a) int mod(string num, int a) { // Initialize result int res = 0; // One by one process all digits of 'num' for (int i = 0; i < num.length(); i++) res = (res * 10 + num[i] - '0') % a; return res; } // Driver program int main() { string num = "12316767678678"; cout << mod(num, 10); return 0; } Java // Java program to compute mod of a big // number represented as string import java.io.*; class GFG { // Function to compute num (mod a) static int mod(String num, int a) { // Initialize result int res = 0; // One by one process all digits of 'num' for (int i = 0; i < num.length(); i++) res = (res * 10 + num.charAt(i) - '0') % a; return res; } // Driver program public static void main(String[] args) { String num = "12316767678678"; System.out.println(mod(num, 10)); } } // This code is contributed by vt_m. Python3 # program to compute mod of a big number # represented as string # Function to compute num (mod a) def mod(num, a): # Initialize result res = 0 # One by one process all digits # of 'num' for i in range(0, len(num)): res = (res * 10 + int(num[i])) % a return res # Driver program num = "12316767678678" print(mod(num, 10)) # This code is contributed by Sam007 C# // C# program to compute mod of a big // number represented as string using System; public class GFG { // Function to compute num (mod a) static int mod(String num, int a) { // Initialize result int res = 0; // One by one process all // digits of 'num' for (int i = 0; i < num.Length; i++) res = (res * 10 + num[i] - '0') % a; return res; } // Driver code public static void Main() { String num = "12316767678678"; Console.WriteLine(mod(num, 10)); } } // This code is contributed by Sam007 PHP <?php // PHP program to compute mod // of a big number represented // as string // Function to compute num (mod a) function mod($num, $a) { // Initialize result $res = 0; // One by one process // all digits of 'num' for ($i = 0; $i < $r = strlen($num); $i++) $res = ($res * 10 + $num[$i] - '0') % $a; return $res; } // Driver Code $num = "12316767678678"; echo mod($num, 10); // This code is contributed by ajit ?> JavaScript <script> // Javascript program to compute mod // of a big number represented // as string // Function to compute num (mod a) function mod(num, a) { // Initialize result let res = 0; // One by one process // all digits of 'num' for(let i = 0; i < num.length; i++) res = (res * 10 + parseInt(num[i])) % a; return res; } // Driver Code let num = "12316767678678"; document.write(mod(num, 10)); // This code is contributed by _saurabh_jaiswal </script> Output8 Time Complexity : O(|num|) Time complexity will become size of num string as we are traversing once in num. Auxiliary Space: O(1) Comment More infoAdvertise with us Next Article Exponential Squaring (Fast Modulo Multiplication) K kartik Follow Improve Article Tags : Mathematical DSA Modular Arithmetic large-numbers Practice Tags : MathematicalModular Arithmetic Similar Reads Modular Arithmetic Modular arithmetic is a system of arithmetic for numbers where numbers "wrap around" after reaching a certain value, called the modulus. It mainly uses remainders to get the value after wrap around. It is often referred to as "clock arithmetic. 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This generator polynomial represents key 15+ min read Using Chinese Remainder Theorem to Combine Modular equationsGiven N modular equations: A ? x1mod(m1) . . A ? xnmod(mn) Find x in the equation A ? xmod(m1*m2*m3..*mn) where mi is prime, or a power of a prime, and i takes values from 1 to n. The input is given as two arrays, the first being an array containing values of each xi, and the second array containing 12 min read Like