Given an integer arr[] of length N such that (Ai > 0) for all (1 ? i ? N) and an integer X. In one operation you can add 1 to either X or arr[i] to make the GCD(X, Ai) not equal to 1. Remember that X or arr[i] increment in values will be permanent. Formally, If any value is incremented in any operation then the original one will also alter.
Then your task is to print all the below-mentioned things in the output:
- The minimum number of operations required to make GCD(Xi, arr[i]) is not equal to 1 for all (1 ? i ? N).
- updated arr[]
- values of X for each valid i.
Examples:
Input 1: N = 5, arr[] = {4,3,1,4,6}, X = 3
Output 1: 3
arr[] = {4, 4, 2, 4, 6}
X[] = {4, 4, 4, 4, 4}
Explanation: There are minimum 3 operations required so that GCD(Xi, arr[i]) ? 1. Three operations are defined below:
- At index 1: Initially arr[1] = 4 and X = 3. GCD(3, 4) = 1.Therefore, X increment to 3+1=4. So that GCD(4, 4) =4, Which is not equal to 1 now. X altered from 3 to 4 permanently for next values of index i.
- At index 2: arr[2] = 3 and X = 4. GCD(3, 4) = 1.Therefore, arr[2] increment to 3+1 = 4. So that GCD(4, 4) = 4, Which is not equal to 1. arr[2] altered from 3 to 4 permanently.
- At index 3: arr[3] altered to 1+1 = 2 and X = 4. So that GCD(X, arr[3]) at index 3 is : GCD(4, 2) = 2, Which is not equal to 1.
It can be verified that there is no such pair of Xi and arr[i] exist for (1<=i<=N) in output such that GCD(Xi, arr[i]) =1. So, Minimum operations required are 3.
Input 2: N = 3, arr[] = {4, 8, 2}, X = 2
Output 2: 0
arr[] = {4, 8, 2}
X[] = {2, 2, 2}
Explanation: All the pair of X and arr[i] for each valid i has GCD not equal to 1.Therefore, 0 operations required.
Approach: Implement the idea below to solve the problem:
GCD of any two integers let say X and Y can be made greater than 1 easily under 0, 1 or 2 operations. By following this hint we can alter the values of X or arr[i] to make GCD greater than 1. For clear explanation see the concept of approach below.
Concept of approach:
For this problem we just need to find to minimum operation required to make GCD of two number greater than 1 at each valid position of i, Then altering the value of X or arr[i] is not a big deal. The problem can be divided in sub-parts as :
1. if X and arr[i] both are even at any index i or the GCD(X, arr[i]) is already greater than 1, Then:
- X and arr[i] will remain same.
- Minimum Operations required = 0.
2. if value of either GCD(arr[i]+1, X) or GCD(arr[i], X+1) is not equal to 1, Then:
- Increment the element X or arr[i], Which gives GCD greater than 1.
- Minimum Operations required = 1.
3. If none of the above condition met, Then:
- Increment both X and arr[i].
- Minimum Operations required= 2 .
It can be verified that the value of GCD(Xi , arr[i]) can make greater than 1 by one of the above operation all the possible pairs of X and arr[i].
Illustration of approach(By using above discussed 3 sub-parts of the problem):
Input: N = 4, arr[] = {1, 4, 3, 5}, X = 1
Output: Minimum operations required : 4
arr[]: [2, 4, 4, 6]
Values of X: [2, 2, 2, 2]Explanation:
At index 1: arr[1] = 1, X =1, GCD(1, 1) = 1
- GCD can be altered from 1 using sub-part 3 of the problem, Which is incrementing both X and arr[i]. Then,
- GCD = (X+1, arr[1]+1) = GCD(2, 2) = 2 ? 1. X and arr[1] altered to 2 and 2 respectively. Minimum operations required = 2. Total operations till now = 2.
At index 2: arr[2] = 4, X = 2, GCD(4, 2) = 2,
- Already not equal to 1 and related to sub-part 1 of the problem, Which is not to alter any of X or arr[i]. Minimum operations required = 0. Total operations till now = 2.
At index 3: arr[3] = 3, X = 2, GCD(3, 2) = 1
- GCD can be altered using sub-part 2 of the problem, Which is incrementing arr[i]. Then,
- GCD = (X, arr[1]+1) = GCD(4, 2) = 2 ? 1. X and arr[3] altered to 2 and 4 respectively. Minimum operations required = 1. Till now total operations = 3.
At index 4: arr[4] = 5, X = 2, GCD(5, 2) = 1
- GCD can be altered using sub-part 2 of the problem, Which is incrementing arr[i]. Then,
- GCD = (X, arr[1]+1) = GCD(2, 5+1) = 2 ? 1. X and arr[4] altered to 2 and 6 respectively. Minimum operations required = 1. Total operations till now = 4.
So, Total number of operations required are 4. Altered values of X or arr[i] will permanent.
arr[] = {arr[1], arr[2], arr[3], arr[4]} = {2, 4, 4, 6} (updated arr[] with altered values)
X[] = {2, 2, 2, 2}
Below is the implementation for the above approach:
// C++ code to implement the approach #include <bits/stdc++.h> using namespace std;
// Euclidean algorithm to return GCD // of 2 input integers int GCD( int a, int b)
{ return b == 0 ? a : GCD(b, a % b);
} // Driver Function int main()
{ // Input value of N
int n = 5;
// Input arr[]
int arr[] = {4, 3, 1, 4, 6};
// Input value of X
int X = 3;
// variable to store minimum
// number of operations required
int min_operation = 0;
// ArrayList to store altered or
// non altered value of X at
// each index
vector< int > X_Values;
// loop for traversing on input arr[]
for ( int i = 0; i < n; i++)
{
// Calculating gcd of X and
// arr[i] by user defined
// GCD function
int gcd = GCD(X, arr[i]);
// If both X and arr[i] are
// even or already GCD > 1
if (X % 2 == 0 && arr[i] % 2 == 0 || gcd > 1)
{
// Required operations for
// this type of case = 0
min_operation += 0;
// Adding current value
// of X to list
X_Values.push_back(X);
}
// If any of the X or arr[i]
// is even
else if (arr[i] % 2 == 0 || X % 2 == 0)
{
// If arr[i] is even
if (arr[i] % 2 == 0)
{
// Add incremented
// value of X to list
X_Values.push_back(X + 1);
// Increment value of
// X permanently
X += 1;
}
else
{
// Incremented value
// of arr[i]
arr[i] += 1;
// Adding current
// value of X to list
X_Values.push_back(X);
}
// Increase the value of
// min_operations variable
min_operation += 1;
}
else
{
// If incrementing one of
// the arr[i] or X gives GCD>1
if (GCD(arr[i] + 1, X) > 1 || GCD(arr[i], X + 1) > 1)
{
// If incrementing arr[i]
// gives GCD>1
if (GCD(arr[i] + 1, X) > 1)
{
// Increment arr[i]
arr[i] += 1;
// Add current Value
// of X to list
X_Values.push_back(X);
}
// If incrementing X gives GCD>1 the
// else part will execute
else
{
// Adding incremented value of X to
// list
X_Values.push_back(X + 1);
// altered value of X permanently
X += 1;
}
// Increment min_operation variable
min_operation += 1;
}
// if incrementing both arr[i] and X gives
// GCD>, Then this else part will execute
else
{
// Incrementing both arr[i] and X
arr[i] += 1;
X_Values.push_back(X + 1);
// Altering X value permanently
X += 1;
// Operation required for this type case
// is 2.Because in first operation arr[i]
// increased and X in second operation.
min_operation += 2;
}
}
}
// Printing value of minimum number
// of operations required
cout << "Minimum operations required : "
<< min_operation;
cout << endl;
// Printing updated arr[]
cout << "arr[] : " ;
for ( int i = 0; i < n; i++)
cout << arr[i] << " " ;
cout << endl;
// Printing values of X for each index
cout << "Values of X : " ;
for ( int i = 0; i < X_Values.size(); i++)
{
cout << X_Values[i] << " " ;
}
} // This code is contributed by Potta Lokesh |
// Java code to implement the approach import java.io.*;
import java.lang.*;
import java.util.*;
class GFG {
// Driver Function
public static void main(String args[])
{
// Input value of N
int n = 5 ;
// Input arr[]
int arr[] = { 4 , 3 , 1 , 4 , 6 };
// Input value of X
int X = 3 ;
// variable to store minimum
// number of operations required
int min_operation = 0 ;
// ArrayList to store altered or
// non altered value of X at
// each index
ArrayList<Integer> X_Values = new ArrayList<>();
// loop for traversing on input arr[]
for ( int i = 0 ; i < n; i++) {
// Calculating gcd of X and
// arr[i] by user defined
// GCD function
int gcd = GCD(X, arr[i]);
// If both X and arr[i] are
// even or already GCD > 1
if (X % 2 == 0 && arr[i] % 2 == 0 || gcd > 1 ) {
// Required operations for
// this type of case = 0
min_operation += 0 ;
// Adding current value
// of X to list
X_Values.add(X);
}
// If any of the X or arr[i]
// is even
else if (arr[i] % 2 == 0 || X % 2 == 0 ) {
// If arr[i] is even
if (arr[i] % 2 == 0 ) {
// Add incremented
// value of X to list
X_Values.add(X + 1 );
// Increment value of
// X permanently
X += 1 ;
}
else {
// Incremented value
// of arr[i]
arr[i] += 1 ;
// Adding current
// value of X to list
X_Values.add(X);
}
// Increase the value of
// min_operations variable
min_operation += 1 ;
}
else {
// If incrementing one of
// the arr[i] or X gives GCD>1
if (GCD(arr[i] + 1 , X) > 1
|| GCD(arr[i], X + 1 ) > 1 ) {
// If incrementing arr[i]
// gives GCD>1
if (GCD(arr[i] + 1 , X) > 1 ) {
// Increment arr[i]
arr[i] += 1 ;
// Add current Value
// of X to list
X_Values.add(X);
}
// If incrementing X gives GCD>1 the
// else part will execute
else {
// Adding incremented value of X to
// list
X_Values.add(X + 1 );
// altered value of X permanently
X += 1 ;
}
// Increment min_operation variable
min_operation += 1 ;
}
// if incrementing both arr[i] and X gives
// GCD>, Then this else part will execute
else {
// Incrementing both arr[i] and X
arr[i] += 1 ;
X_Values.add(X + 1 );
// Altering X value permanently
X += 1 ;
// Operation required for this type case
// is 2.Because in first operation arr[i]
// increased and X in second operation.
min_operation += 2 ;
}
}
}
// Printing value of minimum number
// of operations required
System.out.println( "Minimum operations required : "
+ min_operation);
// Printing updated arr[]
System.out.println( "arr[] : "
+ Arrays.toString(arr));
// Printing values of X for each index
System.out.println( "Values of X : " + X_Values);
}
// Euclidean algorithm to return GCD
// of 2 input integers
static int GCD( int a, int b)
{
return b == 0 ? a : GCD(b, a % b);
}
} |
# Python3 code to implement the above approach # Euclidean algorithm to return GCD # of 2 input integers def GCD(a, b) :
if b = = 0 :
return a
else :
return GCD(b, a % b)
# Driver Function if __name__ = = "__main__" :
# Input value of N
n = 5 ;
# Input arr[]
arr = [ 4 , 3 , 1 , 4 , 6 ];
# Input value of X
X = 3 ;
# variable to store minimum
# number of operations required
min_operation = 0 ;
# ArrayList to store altered or
# non altered value of X at
# each index
X_Values = [];
# loop for traversing on input arr[]
for i in range (n) :
# Calculating gcd of X and
# arr[i] by user defined
# GCD function
gcd = GCD(X, arr[i]);
# If both X and arr[i] are
# even or already GCD > 1
if (X % 2 = = 0 and arr[i] % 2 = = 0 or gcd > 1 ) :
# Required operations for
# this type of case = 0
min_operation + = 0 ;
# Adding current value
# of X to list
X_Values.append(X);
# If any of the X or arr[i]
# is even
elif (arr[i] % 2 = = 0 or X % 2 = = 0 ) :
# If arr[i] is even
if (arr[i] % 2 = = 0 ) :
# Add incremented
# value of X to list
X_Values.append(X + 1 );
# Increment value of
# X permanently
X + = 1 ;
else :
# Incremented value
# of arr[i]
arr[i] + = 1 ;
# Adding current
# value of X to list
X_Values.append(X);
# Increase the value of
# min_operations variable
min_operation + = 1 ;
else :
# If incrementing one of
# the arr[i] or X gives GCD>1
if (GCD(arr[i] + 1 , X) > 1 or GCD(arr[i], X + 1 ) > 1 ) :
# If incrementing arr[i]
# gives GCD>1
if (GCD(arr[i] + 1 , X) > 1 ) :
# Increment arr[i]
arr[i] + = 1 ;
# Add current Value
# of X to list
X_Values.append(X);
# If incrementing X gives GCD>1 the
# else part will execute
else :
# Adding incremented value of X to
# list
X_Values.append(X + 1 );
# altered value of X permanently
X + = 1 ;
# Increment min_operation variable
min_operation + = 1 ;
# if incrementing both arr[i] and X gives
# GCD>, Then this else part will execute
else :
# Incrementing both arr[i] and X
arr[i] + = 1 ;
X_Values.append(X + 1 );
# Altering X value permanently
X + = 1 ;
# Operation required for this type case
# is 2.Because in first operation arr[i]
# increased and X in second operation.
min_operation + = 2 ;
# Printing value of minimum number
# of operations required
print ( "Minimum operations required : " ,min_operation)
# Printing updated arr[]
print ( "arr[] : " ,end = "");
for i in range (n) :
print (arr[i],end = " " );
# Printing values of X for each index
print ( "\n Values of X : " ,end = "");
for i in range ( len (X_Values)) :
print (X_Values[i],end = " " );
# This code is contributed by AnkThon
|
// C# implementation using System;
public class GFG {
// Euclidean algorithm to return GCD
// of 2 input integers
static int GCD( int a, int b)
{
return b == 0 ? a : GCD(b, a % b);
}
static public void Main()
{
// Input value of N
int n = 5;
// Input arr
int [] arr = { 4, 3, 1, 4, 6 };
// Input value of X
int X = 3;
int [] X_Values= new int [5];
// variable to store minimum
// number of operations required
int min_operation = 0;
// ArrayList to store altered or
// non altered value of X at
// each index
// loop for traversing on input arr[]
for ( int i = 0; i < n; i++)
{
// Calculating gcd of X and
// arr[i] by user defined
// GCD function
int gcd = GCD(X, arr[i]);
// If both X and arr[i] are
// even or already GCD > 1
if (X % 2 == 0 && arr[i] % 2 == 0 || gcd > 1) {
// Required operations for
// this type of case = 0
min_operation += 0;
// Adding current value
// of X to list
X_Values[i] = X;
}
// If any of the X or arr[i]
// is even
else if (arr[i] % 2 == 0 || X % 2 == 0) {
// If arr[i] is even
if (arr[i] % 2 == 0)
{
// Add incremented
// value of X to list
X_Values[i] = (X + 1);
// Increment value of
// X permanently
X += 1;
}
else {
// Incremented value
// of arr[i]
arr[i] += 1;
// Adding current
// value of X to list
X_Values[i] = (X);
}
// Increase the value of
// min_operations variable
min_operation += 1;
}
else {
// If incrementing one of
// the arr[i] or X gives GCD>1
if (GCD(arr[i] + 1, X) > 1
|| GCD(arr[i], X + 1) > 1) {
// If incrementing arr[i]
// gives GCD>1
if (GCD(arr[i] + 1, X) > 1) {
// Increment arr[i]
arr[i] += 1;
// Add current Value
// of X to list
X_Values[i] = (X);
}
// If incrementing X gives GCD>1 the
// else part will execute
else {
// Adding incremented value of X to
// list
X_Values[i] = (X + 1);
// altered value of X permanently
X += 1;
}
// Increment min_operation variable
min_operation += 1;
}
// if incrementing both arr[i] and X gives
// GCD>, Then this else part will execute
else {
// Incrementing both arr[i] and X
arr[i] += 1;
X_Values[i] = (X + 1);
// Altering X value permanently
X += 1;
// Operation required for this type case
// is 2.Because in first operation
// arr[i] increased and X in second
// operation.
min_operation += 2;
}
}
}
// Printing value of minimum number
// of operations required
Console.Write( "Minimum operations required : " +
min_operation);
Console.WriteLine();
// Printing updated arr[]
Console.Write( "arr[] : " );
for ( int i = 0; i < n; i++)
Console.Write(arr[i] + " " );
Console.WriteLine();
// Printing values of X for each index
Console.Write( "Values of X : " );
for ( int i = 0; i < X_Values.Length; i++) {
Console.Write(X_Values[i] + " " );
}
}
} // This code is contributed by ksam24000 |
// JS code to implement the approach // Euclidean algorithm to return GCD // of 2 input integers function GCD(a,b)
{ return b == 0 ? a : GCD(b, a % b);
} // Driver Function // Input value of N
let n = 5;
// Input arr[]
let arr = [4, 3, 1, 4, 6];
// Input value of X
let X = 3;
// variable to store minimum
// number of operations required
let min_operation = 0;
// ArrayList to store altered or
// non altered value of X at
// each index
let X_Values=[];
// loop for traversing on input arr[]
for (let i = 0; i < n; i++)
{
// Calculating gcd of X and
// arr[i] by user defined
// GCD function
let gcd = GCD(X, arr[i]);
// If both X and arr[i] are
// even or already GCD > 1
if (X % 2 == 0 && arr[i] % 2 == 0 || gcd > 1)
{
// Required operations for
// this type of case = 0
min_operation += 0;
// Adding current value
// of X to list
X_Values[i]=(X);
}
// If any of the X or arr[i]
// is even
else if (arr[i] % 2 == 0 || X % 2 == 0)
{
// If arr[i] is even
if (arr[i] % 2 == 0)
{
// Add incremented
// value of X to list
X_Values[i]=(X + 1);
// Increment value of
// X permanently
X += 1;
}
else
{
// Incremented value
// of arr[i]
arr[i] += 1;
// Adding current
// value of X to list
X_Values[i]=(X);
}
// Increase the value of
// min_operations variable
min_operation += 1;
}
else
{
// If incrementing one of
// the arr[i] or X gives GCD>1
if (GCD(arr[i] + 1, X) > 1 || GCD(arr[i], X + 1) > 1)
{
// If incrementing arr[i]
// gives GCD>1
if (GCD(arr[i] + 1, X) > 1)
{
// Increment arr[i]
arr[i] += 1;
// Add current Value
// of X to list
X_Values[i]=(X);
}
// If incrementing X gives GCD>1 the
// else part will execute
else
{
// Adding incremented value of X to
// list
X_Values[i]=(X + 1);
// altered value of X permanently
X += 1;
}
// Increment min_operation variable
min_operation += 1;
}
// if incrementing both arr[i] and X gives
// GCD>, Then this else part will execute
else
{
// Incrementing both arr[i] and X
arr[i] += 1;
X_Values[i]=(X + 1);
// Altering X value permanently
X += 1;
// Operation required for this type case
// is 2.Because in first operation arr[i]
// increased and X in second operation.
min_operation += 2;
}
}
}
// Printing value of minimum number
// of operations required
console.log( "Minimum operations required :" ,min_operation);
// Printing updated arr[]
console.log( "arr[] : " );
for (let i = 0; i < n; i++){
console.log(arr[i]);
}
// Printing values of X for each index
console.log( "Values of X : " );
for (let i = 0; i < X_Values.length; i++)
{
console.log(X_Values[i]);
}
// This code is contributed by ksam24000 |
Minimum operations required : 3 arr[] : [4, 4, 2, 4, 6] Values of X : [4, 4, 4, 4, 4]
Time Complexity: O(N*log(N))
Auxiliary Space: O(N)