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

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;

void  read(){
    cout<<" enter A array "<<endl;
    for (int i=1;i<=L;i++)
    cout<<"enter B array  "<<endl;
    for (int i=1;i<=M;i++)

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];
        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?

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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

3 Answers 3

up vote 3 down vote accepted

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.

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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

Please consider the following

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

std::sort(v.begin(), v.end());
std::cout << "median value is: " 
          << std::advance(v.begin(), v.size()/2); 
          << std::endl;
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but it is different ,i am trying to understand code itself,thanks but it is better solution of my code –  dato datuashvili Mar 13 '12 at 14:41
@dato; sorry i didn't mean to cut you short, and understand whats going on is important. –  111111 Mar 13 '12 at 14:45
thanks for helping ,just i mean to define what is values left and right –  dato datuashvili Mar 13 '12 at 14:48

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);
            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++)
            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++)
            System.out.println("Median of the two SORTED arrays is: "+findMedianUsingMergeOfMergeSort(array1,array2));
    private static int findMedianUsingMergeOfMergeSort(int[] a, int[] b) {

    /*  a1 array and a2 array can be of different lengths.
        For Example:
        a1.length = 3
        a2.length = 6
        totalElements = 3+6=9 (odd number)
        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
                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])

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

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

            prevMedian = currentMedian;


        // if the totalElements are odd
            return currentMedian;
            return (prevMedian+currentMedian)/2;
    Time Complexity = Linear Time, O((m+n)/2)
    Space Complexity = O(1)
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