Given two array of size n and m. The task is to find the number of ways we can merge the given arrays into one array such that order of elements of each array doesn’t change.
Examples:
Input : n = 2, m = 2 Output : 6 Let first array of size n = 2 be [1, 2] and second array of size m = 2 be [3, 4]. So, possible merged array of n + m elements can be: [1, 2, 3, 4] [1, 3, 2, 4] [3, 4, 1, 2] [3, 1, 4, 2] [1, 3, 4, 2] [3, 1, 2, 4] Input : n = 4, m = 6 Output : 210
The idea is to use the concept of combinatorics. Suppose we have two array A{a1, a2, …., am} and B{b1, b2, …., bn} having m and n elements respectively and now we have to merge them without losing their order.
After merging we know that the total number of element will be (m + n) element after merging. So, now we just need the ways to choose m places out of (m + n) where you will place element of array A in its actual order, which is m + nCn.
After placing m element of array A, n spaces will be left, which can be filled by the n elements of B array in its actual order.
So, total number of ways to merge two array such that their order in merged array is same is m + nCn
Below is the implementation of this approach:
// CPP Program to find number of ways // to merge two array such that their // order in merged array is same #include <bits/stdc++.h> using namespace std;
// function to find the binomial coefficient int binomialCoeff( int n, int k)
{ int C[k + 1];
memset (C, 0, sizeof (C));
C[0] = 1; // nC0 is 1
for ( int i = 1; i <= n; i++) {
// Compute next row of pascal triangle
// using the previous row
for ( int j = min(i, k); j > 0; j--)
C[j] = C[j] + C[j - 1];
}
return C[k];
} // function to find number of ways // to merge two array such that their // order in merged array is same int numOfWays( int n, int m)
{ return binomialCoeff(m + n, m);
} // Driven Program int main()
{ int n = 2, m = 2;
cout << numOfWays(n, m) << endl;
return 0;
} |
// Java Program to find number of ways // to merge two array such that their // order in merged array is same import java.io.*;
class GFG {
// function to find the binomial
// coefficient
static int binomialCoeff( int n, int k)
{
int C[] = new int [k + 1 ];
// memset(C, 0, sizeof(C));
C[ 0 ] = 1 ; // nC0 is 1
for ( int i = 1 ; i <= n; i++) {
// Compute next row of pascal
// triangle using the previous
// row
for ( int j = Math.min(i, k);
j > 0 ; j--)
C[j] = C[j] + C[j - 1 ];
}
return C[k];
}
// function to find number of ways
// to merge two array such that their
// order in merged array is same
static int numOfWays( int n, int m)
{
return binomialCoeff(m + n, m);
}
// Driven Program
public static void main (String[] args)
{
int n = 2 , m = 2 ;
System.out.println(numOfWays(n, m));
}
} // This code is contributed by anuj_67. |
# Python 3 Program to find number of ways # to merge two array such that their # order in merged array is same # function to find the binomial coefficient def binomialCoeff(n, k):
C = [ 0 for i in range (k + 1 )]
C[ 0 ] = 1
for i in range ( 1 , n + 1 , 1 ):
# Compute next row of pascal
# triangle using the previous row
j = min (i, k)
while (j > 0 ):
C[j] = C[j] + C[j - 1 ]
j - = 1
return C[k]
# function to find number of ways # to merge two array such that their # order in merged array is same def numOfWays(n, m):
return binomialCoeff(m + n, m)
# Driver Code if __name__ = = '__main__' :
n = 2
m = 2
print (numOfWays(n, m))
# This code is contributed by # Sahil_shelangia |
// C# Program to find number of ways // to merge two array such that their // order in merged array is same using System;
class GFG {
// function to find the binomial
// coefficient
static int binomialCoeff( int n, int k)
{
int []C = new int [k + 1];
// memset(C, 0, sizeof(C));
C[0] = 1; // nC0 is 1
for ( int i = 1; i <= n; i++) {
// Compute next row of pascal
// triangle using the previous
// row
for ( int j = Math.Min(i, k);
j > 0; j--)
C[j] = C[j] + C[j - 1];
}
return C[k];
}
// function to find number of ways
// to merge two array such that their
// order in merged array is same
static int numOfWays( int n, int m)
{
return binomialCoeff(m + n, m);
}
// Driven Program
public static void Main ()
{
int n = 2, m = 2;
Console.WriteLine(numOfWays(n, m));
}
} // This code is contributed by anuj_67. |
<?php // PHP Program to find number of ways // to merge two array such that their // order in merged array is same // function to find the binomial coefficient function binomialCoeff( $n , $k )
{ $C = array ( $k + 1);
for ( $i =0; $i < count ( $C ); $i ++)
$C [ $i ] = 0;
$C [0] = 1; // nC0 is 1
for ( $i = 1; $i <= $n ; $i ++) {
// Compute next row of pascal triangle
// using the previous row
for ( $j = min( $i , $k ); $j > 0; $j --)
$C [ $j ] = $C [ $j ] + $C [ $j - 1 ];
}
return $C [ $k ];
} // function to find number of ways // to merge two array such that their // order in merged array is same function numOfWays( $n , $m )
{ return binomialCoeff( $m + $n , $m );
} $n = 2; $m = 2;
echo numOfWays( $n , $m );
//This code is contributed by Rajput-Ji.
?> |
<script> // Javascript Program to find number of ways
// to merge two array such that their
// order in merged array is same
// function to find the binomial
// coefficient
function binomialCoeff(n, k)
{
let C = new Array(k + 1);
C.fill(0);
// memset(C, 0, sizeof(C));
C[0] = 1; // nC0 is 1
for (let i = 1; i <= n; i++) {
// Compute next row of pascal
// triangle using the previous
// row
for (let j = Math.min(i, k); j > 0; j--)
C[j] = C[j] + C[j - 1];
}
return C[k];
}
// function to find number of ways
// to merge two array such that their
// order in merged array is same
function numOfWays(n, m)
{
return binomialCoeff(m + n, m);
}
let n = 2, m = 2;
document.write(numOfWays(n, m));
// This code is contributed by divyeshrabadiya07.
</script> |
6
Time Complexity: O((m+n)*m)
Auxiliary Space: O(m)
We can solve above problem in linear time using linear time implementation of binomial coefficient.