# How can we find a repeated number in array in O(n) time and O(1) space complexity

How can we find a repeated number in array in O(n) time and O(1) complexity? eg array 2,1,4,3,3,10 output is 3

EDIT: I tried in following way. i found that if no is oddly repeated then we can achieve the result by doing xor . so i thought to make the element which is odd no repeating to even no and every evenly repeating no to odd.but for that i need to find out unique element array from input array in O(n) but couldn't find the way.

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With O(1) space complexity I don't know why you have the `data-structures` tag. –  Karoly Horvath Sep 10 '11 at 10:14

Assuming that there is an upped bound for the values of the numbers in the array (which is the case with all built-in integer types in all programming languages I 've ever used -- for example, let's say they are 32-bit integers) there is a solution that uses constant space:

1. Create an array of N elements, where N is the upper bound for the integer values in the input array and initialize all elements to `0` or `false` or some equivalent. I 'll call this the lookup array.
2. Loop over the input array, and use each number to index into the lookup array. If the value you find is `1` or `true` (etc), the current number in the input array is a duplicate.
3. Otherwise, set the corresponding value in the lookup array to `1` or `true` to remember that we have seen this particular input number.

Technically, this is O(n) time and O(1) space, and it does not destroy the input array. Practically, you would need things to be going your way to have such a program actually run (e.g. it's out of the question if talking about 64-bit integers in the input).

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yes, I thought of that solution also but complexity is O(K*n) where k is no of bits.if k>logn then O(nlogn) will be efficient solution. –  Suri Sep 10 '11 at 10:23
@Suri: I lost you there. Where does `n` come into the memory requirement complexity? –  Jon Sep 10 '11 at 10:25
a lot of dynamic languages have no limit on integer size. –  Karoly Horvath Sep 10 '11 at 10:26
@Jon - by the same technicality you could iterate over the array 2^32 times, where each iteration looks for duplicates of a single number (using only boolean to store whether I've found one, and if I find another then I have a duplicate). Technically, it's O(n), and certainly O(1) space. –  hatchet Sep 10 '11 at 11:28
@Jon - For integer sorting, i can create an array X with 2^32 elements, all initialized to 0. Now i iterate through the original sequence of integers (a1,a2... ai... an) and increment X[ai] by 1 at every step. At the end i just need one loop over X, taking n + 2^32 (constant amount of time) to get the sorted sequence. –  Nitin Garg Sep 10 '11 at 11:43

Without knowing more about the possible values in the array you can't.

With O(1) space requirement the fastest way is to sort the array so it's going to be at least O(n*log(n)).

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This is impossible without knowing any restricted rules about the input array, either that the Memory complexity would have some dependency on the input size or that the time complexity is gonna be higher.

The 2 answers above are infact the best answers for getting near what you have asked, one's trade off is Time where the second trade off is in Memory, but you cant have it run in O(n) time and O(1) complexity in SOME UNKNOWN INPUT ARRAY.

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You can do this

``````#include<iostream.h>
#include<conio.h>
#include<stdio.h>
void main ()
{
clrscr();
int array[5],rep=0;
for(int i=1; i<=5; i++)
{
cout<<"enter elements"<<endl;
cin>>array[i];
}
for(i=1; i<=5; i++)
{
if(array[i]==array[i+1])
{
rep=array[i];
}
}
cout<<" repeat value is"<<rep;
getch();
}
``````
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are you sure you get the answer? what if the repeating number is not together? –  Akhil K Nambiar Jun 27 '13 at 7:38