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You have an array with n=2k+2 elements where 2 elements haven't pair. Example for 8 elemets array: 1 2 3 47 3 1 2 0. "47" and "0" haven't pair in array. If I have array where only 1 element has't pair, I solve this problem with XOR. But I have 2 unpair elements! What can I do? Solution could be for a O(n) time performance and for O(1) additional memory.

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Since all elements are paired, does that mean the remaining two must be a pair. Will you elaborate on your description a little more? –  rudolph9 Feb 2 '12 at 15:31
    
I have only 2 unpair elements in all array and I need to find it. –  rodart Feb 2 '12 at 15:36
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Are you looking for an O(n) solution? It's easy with sorting, which gives O(n*log(n)). –  ugoren Feb 2 '12 at 15:39
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what are the bounds for the elements? integer? I think it can be done linearly but with some memory (pigeon holes) –  Alex Nikolaenkov Feb 2 '12 at 15:40
    
Yes, solution could be for a O(n) time performance and for O(1) additional memory. Let elements are integer –  rodart Feb 2 '12 at 15:58

3 Answers 3

Some hints...

It will take 2 passes. First, go through the list and XOR all elements together. See what you get. Proceed from there.

Edit: The key observation about the result of the first pass should be that it shows you the set of bits in which the 2 unpaired elements differ.

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Ok, I have xor-result this two unpair elements. And what next i don't know –  rodart Feb 2 '12 at 16:08
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This looks like a homework/puzzle problem so I'm trying to avoid just giving you the answer. Play with it a little bit. I'm pretty sure this exact question has been asked before too, so you could instead opt to search... –  R.. Feb 2 '12 at 16:12
    
Thank you for the hint. –  Alex Nikolaenkov Feb 2 '12 at 16:15
    
@user1185443, you should read about a xor operation a bit more. There is another application of xor to change two elements without using additional space. a, b -> a = a xor b, b = a xor b, a = a xor b. This may help. –  Alex Nikolaenkov Feb 2 '12 at 16:17
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Found the actual implementation at geeksforgeeks.org/archives/2457 Credit goes to @R.. –  The Real Baumann Feb 2 '12 at 16:34

Use INT_MAX/8 bytes of memory. Walk the array. XOR the bit corresponding to each value with 1. If there are 0 or 2 instances the bit will end up 0. If there is only one instance, it will be set. O(1) mem, O(N) time.

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That's not O(1) because you invoked INT_MAX. It's O(N). –  R.. Feb 2 '12 at 16:06
    
O(N) memory; you can have N/2 + 2 distinct elements and need a bit for each of them. –  Michael J. Barber Feb 2 '12 at 16:07
    
And...good luck fitting that bit array on earth if by chance int happens to be 64-bit... ;-) –  R.. Feb 2 '12 at 16:11
    
@real, this will result in an array with a bit set for any element which appears an odd number of times. Identifying which bits are set is constant time, since the array is constant size. Yes, both constants are big, but they are constant. –  AShelly Feb 2 '12 at 16:15
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@R, it is constant for any given platform/ implementation. It just happens to be a very large constant. –  AShelly Feb 2 '12 at 16:15
  1. Scan the Array and put each number and count in hash.
  2. Rescan and find out the items with count=1.

This is O(n).

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And how much memory is needed? –  asaelr Feb 3 '12 at 0:03

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