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How can one find a median of 2 sorted arrays A and B which are of length m and n respectively. I have searched, but most the algorithms assume that both arrays are of same size. I want to know how can we find median if m != n consider example, A={1, 3, 5, 7, 11, 15} where m = 6, B={2, 4, 8, 12, 14} where n = 5 and the median is 7

Any help is appreciated. I am preparing for interviews and i am struggling with this algo right now.

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This question has been answered in geeksforgeeks. Check this out... geeksforgeeks.org/archives/24514 –  premprakash Nov 4 '12 at 21:20
    
no extra space .... i know the method to create a 3rd array use merging technique as in merge sort and then find median. that is naive approach and take extra space of O(m+n), i was looking for algorithm which does not use extra array. –  ravi Nov 4 '12 at 21:22
    
That's cool how they used binary search to achieve O(LogM + LogN). My first stab would have been the linear approach of O(M + N). –  goat Nov 4 '12 at 21:29
    
The complexity analysis is similar to how you would argue for arrays with same size . Let say you have 2 arrays A and B of size n . If A[n/2] < B[n/2] , then the median will be in A[n/2+1 ... n] .. B[0 .. n/2] . You basically cut off the first half of A and the second half of B. If A[n/2] > B[n/2] you would do the exact reverse. Thus at each step you reduce the array size to its half . So you fill be able to determine the answer in lg(n) steps –  premprakash Nov 4 '12 at 21:42

2 Answers 2

Here is the JAVA code to find the median of two sorted arrays of unequal length

package FindMedianBetween2SortedArraysOfUnequalLength;

import java.util.Arrays;
import java.util.Scanner;

public class UsingKthSmallestElementLogic {

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: "+findMedian(array1,array2,array1.length,array2.length));
    }
    finally{
        in.close();
    }
}
private static int findMedian(int[] a, int[] b,
        int aLength, int bLength) { 

    int left = (aLength+bLength+1)>>1;
    int right = (aLength+bLength+2)>>1;
    return ((findKthSmallestElement(a,b,a.length,b.length,left)+findKthSmallestElement(a,b,a.length,b.length,right))/2);
}
private static int findKthSmallestElement(int[] a, int[] b,
        int aLength, int bLength, int k) {                    // All the 5 parameters passed are VERY VERY IMP

    /* to maintain uniformity, we will assume that size_a is smaller than size_b
    else we will swap array in call :) */
    if(aLength>bLength)
        return findKthSmallestElement(b, a, bLength, aLength, k);

    /* We have TWO BASE CASES
     * Now case when size of smaller array is 0 i.e there is no elemt in one array*/
    //BASE CASE 1. If the smallest array length is 0
    if(aLength == 0 && bLength > 0)
            return b[k-1]; // due to zero based index

    /* case where k==1 that means we have hit limit */
    //BASE CASE 2. If k==1
    if(k==1)
            return Math.min(a[0], b[0]);

    /* Now the divide and conquer part */
    int i =  Math.min(aLength, k/2) ; // k should be less than the size of array  
    int j =  Math.min(bLength, k/2) ; // k should be less than the size of array  

    if(a[i-1] > b[j-1])
            // Now we need to find only K-j th element
            return findKthSmallestElement(a, Arrays.copyOfRange(b, j, b.length), a.length, b.length -j, k-j);
    else
            return findKthSmallestElement(Arrays.copyOfRange(a, i, a.length), b, a.length-i, b.length,  k-i);
}
}
/*
Analysis:
    Time Complexity = O(log(n+m))
    Space Complexity = O(1)*/
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Very good solution! Just need to consider when length is even or odd –  Think Recursively Apr 30 at 22:26

A linear search for the median'th ordered element would be O(m + n) with constant space. This isn't optimal, but it's realistic to produce in an interview.

numElements = arr1.length + arr2.length
elementsToInspect = floor(numElements / 2)
i1 = 0
i2 = 0

if elementsToInspect == 0
    return arr1[i1]

while (1) {
    if (arr1[i1] < arr2[i2]) {
        i1++
        elementsToInspect--
        if elementsToInspect == 0
            return arr1[i1]
    } else {
        i2++
        elementsToInspect--
        if elementsToInspect == 0
            return arr2[i2]
    }
}
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