# Median of two sorted array

Here I have written code for finding median of two sorted arrays:

``````#include<iostream>
using namespace std;
#define L  5
#define  M 6
const int N=L+M;
int A[1000];//define 1 indexed aarray
int B[1000];
int max(int c,int d){
return (c>=d)?c:d;

}
int min(int c,int d)
{
return (c<=d)?c:d;
}

cout<<" enter A array "<<endl;
for (int i=1;i<=L;i++)
cin>>A[i];
cout<<endl;
cout<<"enter B array  "<<endl;
for (int i=1;i<=M;i++)
cin>>B[i];
cout<<endl;

}
int median(int a[],int b[],int left,int right){
if (left>right) {
return median(b,a,max(1,(N/2)-L),min(M,N/2));
}
int i=int(left+right)/2;
int j=int(N/2)+i;
if((j==0 || a[i]>b[j]) && (j==M || a[i]<=b[j+1])){
return a[i];
}
else
{
if((j==0 || a[i]>b[j])  &&(j!=M && a[i]>b[j+1]))
return median(a,b,left,i-1);
}

return median(a,b,i+1,right);

}

int main(){

return 0;
}
``````

My question is what could be left and right values? It is from introduction to algorithms, I just don't understand what are values of left and right variables? I have defined left and right as 1 and N and tested with following arrays:

``````3 5 7 9 11 13
1 2 4 8 10
``````

Answer is 13, which is not correct sure, what is wrong?

-
please provide functioning code. You could call your `median` function with any values for `left` and `right`. –  Constantinius Mar 13 '12 at 14:33
"i have wrote code" -> "what could be left and right values". How did you write code where you don't know what the variables are for? I guess you mean you tried to copy some code and don't understand it? –  Tony D Mar 13 '12 at 14:36
copy yes but not copy past,here it is www2.myoops.org/course_material/mit/NR/rdonlyres/… soluion of this problem,here is not indicated left and right value –  dato datuashvili Mar 13 '12 at 14:37
@dato: `left` and `right` are defined in your handout: "The invariant is that the median is always in either `A[left..right]` or `B`". It gives their initial values as `max(1,N/2−M)` and `min(L,N/2)`. –  Mike Seymour Mar 13 '12 at 14:59
so in main part,use these values? –  dato datuashvili Mar 13 '12 at 15:01

The homework problem you cited in a comment has what looks to be a pretty good explanation of `left` and `right`, including the starting values for them:

Let the default values for left and right be such that calling MEDIAN-SEARCH(A,B) is equivalent to

``````MEDIAN-SEARCH(A[1 ..l],B[1 ..m],max(1,ceil(n/2) - m),min(l,ceil(n/2)))
``````

The invariant in `MEDIAN-SEARCH(A,B)` is that the median is always in either `A[left ..right]` or `B`. This is true for the initial call because `A` and `B` are sorted, so by the definition of median it must be between `max(1,ceil(n/2) - m)` and `min(l,ceil(n/2))`, inclusive. It is also true the recursive calls on lines 8 and 9, since the algorithm only eliminates parts of the array that cannot be the median by the definition of median. The recursive call on line 2 also preserves the invariant since if `left > right` the median must be in `B` be­tween the new `left` and `right` values.

If you work through the algorithm on paper with small arrays, it should become more clear what's going on. The algorithm converges in only a few steps if your arrays are smaller than a total of say 16 elements, so it should be quite workable on paper.

-
my array are totally 11 elements –  dato datuashvili Mar 13 '12 at 15:32
how to call my median function in main part()?by which values? –  dato datuashvili Mar 13 '12 at 15:32
Going by what the above problem stated would be the defaults for `left` and `right`, I think it should be: `median(a,b,max(1,((N+1)/2)-M),min(L,(N+1)/2))`. Note that I used `(N+1)` in a couple spots instead of just `N` because of the way that C performs integer division this will result in the ceiling of `(N/2)`, which is what the algorithm calls for. You may need to make similar adjustments in your code. –  Michael Burr Mar 13 '12 at 15:49

Here is the code for finding the median of two sorted arrays of unequal length using the merge method of mergesort

``````package FindMedianBetween2SortedArrays;

import java.util.Scanner;

public class UsingMergeMethodOfMergeSort {
public static void main(String[] args) {
Scanner in = new Scanner(System.in);
try{
System.out.println("Enter the number of elements in the first SORTED array");
int n = in.nextInt();
int[] array1 = new int[n];
System.out.println("Enter the elements of the first SORTED array");
for(int i=0;i<n;i++)
array1[i]=in.nextInt();
System.out.println("Enter the number of elements in the second SORTED array");
int m = in.nextInt();
int[] array2 = new int[m];
System.out.println("Enter the elements of the second SORTED array");
for(int i=0;i<m;i++)
array2[i]=in.nextInt();
System.out.println("Median of the two SORTED arrays is: "+findMedianUsingMergeOfMergeSort(array1,array2));
}
finally{
in.close();
}
}
private static int findMedianUsingMergeOfMergeSort(int[] a, int[] b) {

/*  a1 array and a2 array can be of different lengths.
For Example:
1.
a1.length = 3
a2.length = 6
totalElements = 3+6=9 (odd number)
2.
a1.length = 4
a2.length = 4
totalElements = 4+4=8 (even number)
*/
int totalElements = a.length+b.length;  // totalElements is the addition of the individual array lengths
int currentMedian = 0;
int prevMedian = 0;
int i=0; // Index for traversing array1
int j=0; // Index for traversing array2
for(int k=0;k<totalElements;k++){    // k is index for traversing the totalElements of array1 and array2

/*NOTE: In this entire for loop, the "if", "else" and "else if" is VERY IMP. DONOT interchange among them*/

// if array1 is exhausted
if(i==a.length)
currentMedian=b[j++]; // elements of the second array would be considered

// if array2 is exhausted
else if(j==b.length)
currentMedian=a[i++]; // elements of the first array would be considered

else if(a[i]<b[j])
currentMedian=a[i++];

else //(b[j]<=a[i])            // this condition is ONLY "else" and not "if" OR "else if"
currentMedian=b[j++];

if(k==totalElements/2) // we reached the middle of the totalElements where the median of the combined arrays is found
break;

prevMedian = currentMedian;

}

// if the totalElements are odd
if(totalElements%2!=0)
return currentMedian;
else
return (prevMedian+currentMedian)/2;
}
}
/*
Analysis:
Time Complexity = Linear Time, O((m+n)/2)
Space Complexity = O(1)
*/
``````
-

``````std::cout << "enter all number separated by a space ending with 'q'"
<< std::endl;
std::vector<int> v(
(std::istream_iterator<int>(std::cin)),
std::istream_iterator<int>());

std::sort(v.begin(), v.end());
std::cout << "median value is: "