The goal here is to determine whether all strings can be made identical given an arbitrary number of operations on a string array Str of size n. Any element can be taken out of a string and put back anywhere in the same or another string, all in one action. Returns "Yes" if the strings can be made equal, "No" otherwise, giving the minimum number of operations required.
Implement a program to minimize the number of rearrangements of characters so that all given strings are equal
Let us take the Input: n = 3, The input array, Str = {mmm, nnn, ooo}
The output obtained : Yes 6
The three strings provided in the array Str can be turned into the same string mno through at least 6 operations.
{mmm, nnn, ooo} −> {mm, mnnn, ooo} {mm, mnnn, ooo} −> {m, mnnn, mooo} {m, mnnn, mooo} −> {mn, mnn, mooo} {mn, mnn, mooo} −> {mn, mn, mnooo} {mn, mn, mnooo} −> {mno, mn, mnoo} {mno, mn, mnooo} −> {mno, mno, mno}
Let us take the Input: n = 3, The input array, Str = {abc, aab, bbd}
The output obtained: No
Using the provided string array Str, the same string cannot be generated.
Let us take the Input: n = 3, The input array, Str = {xxy, zzz, xyy}
The output obtained : Yes 4
All three strings of the provided array Str can be changed into the same string xyz through at least 4 operations.
In order to minimize the number of times of re-sizing characters so that all given strings are equal, we use the following method.
The solution to this problem is to minimize the number of character repositionings so that all given strings are equal
The goal of making all strings equal can be achieved if the letters are evenly distributed among all strings. That is, the frequency of each character in the array needs to be divisible by a number of size "n".
The minimum character repositioning algorithm required to make all given strings equal is as follows
Step 1 − Start
Step 2 - Define a function to check if the strings can become identical
Step 3 - Define an array to store the frequencies of all characters. Here we define "fre".
Step 4 − Traverse the provided string array.
Step 5 - Iterate through each character of the given string Str.
Step 6 - Update the obtained frequency
Step 7 - Now check the characters of each letter
Step 8 - If the frequency is not divisible by a number of size n, print "No"
Step 9 - Divide the frequency of each character by the size n
Step 10 - Define an integer variable "result" and store the result as the minimum number of operations
Step 11 - Store the frequency of each character in the original string "org"
Step 12 - Also get the number of extra characters
Step 13 - Print Yes and the result obtained.
Step 14 − Stop
This is a C program implementation of the above algorithm for minimizing the number of repositioning characters so that all given strings are equal.
#include <stdio.h> #include <string.h> #include <stdlib.h> // Define a function to check if the strings could be made identical or not void equalOrNot(char* Str[], int n){ // Array fre to store the frequencies of all the characters int fre[26] = {0}; // Traverse the provided array of strings for (int i = 0; i < n; i++) { // Traverse each characters of the given string Str for (int j = 0; j < strlen(Str[i]); j++){ // Update the frequencies obtained fre[Str[i][j] - 'a']++; } } // now check for every character of the alphabet for (int i = 0; i < 26; i++){ // If the frequency is not divisible by the size n, then print No. if (fre[i] % n != 0){ printf("No\n"); return; } } // Dividing the frequency of each of the character with the size n for (int i = 0; i < 26; i++) fre[i] /= n; // Store the result obtained as the minimum number of operations int result = 0; for (int i = 0; i < n; i++) { // Store the frequency of each od the characters in the original string org int org[26] = {0}; for (int j = 0; j < strlen(Str[i]); j++) org[Str[i][j] - 'a']++; // Get the number of additional characters as well for (int i = 0; i < 26; i++){ if (fre[i] > 0 && org[i] > 0){ result += abs(fre[i] - org[i]); } } } printf("Yes %d\n", result); return; } int main(){ int n = 3; char* Str[] = { "mmm", "nnn", "ooo" }; equalOrNot(Str, n); return 0; }
Yes 6
Similarly, we can minimize the number of character repositionings so that all given strings are equal.
In this article, the challenge of obtaining a program to minimize the number of character repositionings to make all given strings equal is addressed.
Provides C programming code and algorithms to minimize the number of rearrangements of characters so that all given strings are equal.
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