Count rotations divisible by 4
Given a large positive number as string, count all rotations of the given number which are divisible by 4.
Examples:
Input: 8
Output: 1
Input: 20
Output: 1
Rotation: 20 is divisible by 4
02 is not divisible by 4
Input : 13502
Output : 0
No rotation is divisible by 4
Input : 43292816
Output : 5
5 rotations are : 43292816, 16432928, 81643292
92816432, 32928164
For large numbers it is difficult to rotate and divide each number by 4. Therefore, ‘divisibility by 4’ property is used which says that a number is divisible by 4 if the last 2 digits of the number is divisible by 4. Here we do not actually rotate the number and check last 2 digits for divisibility, instead we count consecutive pairs (in circular way) which are divisible by 4.
Illustration:
Consider a number 928160
Its rotations are 928160, 092816, 609281, 160928,
816092, 281609.
Now form pairs from the original number 928160
as mentioned in the approach.
Pairs: (9,2), (2,8), (8,1), (1,6),
(6,0), (0,9)
We can observe that the 2-digit number formed by the these
pairs, i.e., 92, 28, 81, 16, 60, 09, are present in the last
2 digits of some rotation.
Thus, checking divisibility of these pairs gives the required
number of rotations.
Note: A single digit number can directly
be checked for divisibility.
Below is the implementation of the approach.
C++
// C++ program to count all rotation divisible// by 4.#include <bits/stdc++.h>using namespace std;// Returns count of all rotations divisible// by 4int countRotations(string n){ int len = n.length(); // For single digit number if (len == 1) { int oneDigit = n.at(0)-'0'; if (oneDigit%4 == 0) return 1; return 0; } // At-least 2 digit number (considering all // pairs) int twoDigit, count = 0; for (int i=0; i<(len-1); i++) { twoDigit = (n.at(i)-'0')*10 + (n.at(i+1)-'0'); if (twoDigit%4 == 0) count++; } // Considering the number formed by the pair of // last digit and 1st digit twoDigit = (n.at(len-1)-'0')*10 + (n.at(0)-'0'); if (twoDigit%4 == 0) count++; return count;}//Driver programint main(){ string n = "4834"; cout << "Rotations: " << countRotations(n) << endl; return 0;} |
Java
// Java program to count// all rotation divisible// by 4.import java.io.*;class GFG { // Returns count of all // rotations divisible // by 4 static int countRotations(String n) { int len = n.length(); // For single digit number if (len == 1) { int oneDigit = n.charAt(0)-'0'; if (oneDigit % 4 == 0) return 1; return 0; } // At-least 2 digit // number (considering all // pairs) int twoDigit, count = 0; for (int i = 0; i < (len-1); i++) { twoDigit = (n.charAt(i)-'0') * 10 + (n.charAt(i+1)-'0'); if (twoDigit%4 == 0) count++; } // Considering the number // formed by the pair of // last digit and 1st digit twoDigit = (n.charAt(len-1)-'0') * 10 + (n.charAt(0)-'0'); if (twoDigit%4 == 0) count++; return count; } //Driver program public static void main(String args[]) { String n = "4834"; System.out.println("Rotations: " + countRotations(n)); }}// This code is contributed by Nikita tiwari. |
Python3
# Python3 program to count# all rotation divisible# by 4.# Returns count of all# rotations divisible# by 4def countRotations(n) : l = len(n) # For single digit number if (l == 1) : oneDigit = (int)(n[0]) if (oneDigit % 4 == 0) : return 1 return 0 # At-least 2 digit number # (considering all pairs) count = 0 for i in range(0, l - 1) : twoDigit = (int)(n[i]) * 10 + (int)(n[i + 1]) if (twoDigit % 4 == 0) : count = count + 1 # Considering the number # formed by the pair of # last digit and 1st digit twoDigit = (int)(n[l - 1]) * 10 + (int)(n[0]) if (twoDigit % 4 == 0) : count = count + 1 return count# Driver programn = "4834"print("Rotations: " , countRotations(n))# This code is contributed by Nikita tiwari. |
C#
// C# program to count all rotation// divisible by 4.using System;class GFG { // Returns count of all // rotations divisible // by 4 static int countRotations(String n) { int len = n.Length; // For single digit number if (len == 1) { int oneDigit = n[0] - '0'; if (oneDigit % 4 == 0) return 1; return 0; } // At-least 2 digit // number (considering all // pairs) int twoDigit, count = 0; for (int i = 0; i < (len - 1); i++) { twoDigit = (n[i] - '0') * 10 + (n[i + 1] - '0'); if (twoDigit % 4 == 0) count++; } // Considering the number // formed by the pair of // last digit and 1st digit twoDigit = (n[len - 1] - '0') * 10 + (n[0] - '0'); if (twoDigit % 4 == 0) count++; return count; } //Driver program public static void Main() { String n = "4834"; Console.Write("Rotations: " + countRotations(n)); }}// This code is contributed by nitin mittal. |
PHP
<?php// PHP program to count all // rotation divisible by 4.// Returns count of all// rotations divisible// by 4function countRotations($n){ $len = strlen($n); // For single digit number if ($len == 1) { $oneDigit = $n[0] - '0'; if ($oneDigit % 4 == 0) return 1; return 0; } // At-least 2 digit // number (considering all // pairs) $twoDigit;$count = 0; for ($i = 0; $i < ($len - 1); $i++) { $twoDigit = ($n[$i] - '0') * 10 + ($n[$i + 1] - '0'); if ($twoDigit % 4 == 0) $count++; } // Considering the number // formed by the pair of // last digit and 1st digit $twoDigit = ($n[$len - 1] - '0') * 10 + ($n[0] - '0'); if ($twoDigit % 4 == 0) $count++; return $count;}// Driver Code$n = "4834";echo "Rotations: " , countRotations($n);// This code is contributed by ajit?> |
Javascript
<script>// Javascript program to count all// rotation divisible by 4.// Returns count of all// rotations divisible// by 4function countRotations(n){ let len = n.length; // For single digit number if (len == 1) { let oneDigit = n[0] - '0'; if (oneDigit % 4 == 0) return 1; return 0; } // At-least 2 digit // number (considering all // pairs) let twoDigit; let count = 0; for(let i = 0; i < (len - 1); i++) { twoDigit = (n[i] - '0') * 10 + (n[i + 1] - '0'); if (twoDigit % 4 == 0) count++; } // Considering the number // formed by the pair of // last digit and 1st digit twoDigit = (n[len - 1] - '0') * 10 + (n[0] - '0'); if (twoDigit % 4 == 0) count++; return count;}// Driver Codelet n = "4834";document.write("Rotations: " + countRotations(n));// This code is contributed by _saurabh_jaiswal </script> |
Output
Rotations: 2
Time Complexity : O(n) where n is number of digits in input number.
Auxiliary Space: O(1)
This article is contributed by Ayush Jauhari. If you like zambiatek and would like to contribute, you can also write an article using write.zambiatek.com or mail your article to review-team@zambiatek.com. See your article appearing on the zambiatek main page and help other Geeks.
Feeling lost in the world of random DSA topics, wasting time without progress? It’s time for a change! Join our DSA course, where we’ll guide you on an exciting journey to master DSA efficiently and on schedule.
Ready to dive in? Explore our Free Demo Content and join our DSA course, trusted by over 100,000 zambiatek!
Ready to dive in? Explore our Free Demo Content and join our DSA course, trusted by over 100,000 zambiatek!
