# Given an array of numbers, except for one number all the others, occur twice. Give an algorithm to find that number which occurs only once in the array

What I can think of is:

Algo:

1. Have a hash table which will store the number and its associated count
2. Parse the array and increment the count for number.
3. Now parse the hash table to get the number whose count is 1.

Can you guys think of solution better than this. With O(n) runtime and using no extra space

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That's a pretty good solution with good efficiency. –  glasnt Jul 7 '09 at 1:45
Is this a homework question? If it is, that's ok as you asked it well, with supplying your attempt at a solution. But you should tag it such if it is. –  Tim Jarvis Jul 7 '09 at 1:53
Btw, that word "parse". I don't think it means what you think it means. –  Steve Jessop Jul 7 '09 at 2:05
why rosetta-stone ? BRad –  Learner Jul 9 '09 at 1:21

An answer in Ruby, assuming one singleton, and all others exactly two appearances:

``````def singleton(array)
number = 0
array.each{|n| number = number ^ n}
number
end

irb(main):017:0> singleton([1, 2, 2, 3, 1])
=> 3
``````

^ is the bitwise XOR operator, by the way. XOR everything! HAHAHAH!

Rampion has reminded me of the inject method, so you can do this in one line:

``````def singleton(array) array.inject(0) { |accum,number| accum ^ number }; end
``````
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and one liner: `array.inject(0) { |accum,number| accum ^ number }` –  rampion Jul 7 '09 at 1:59
<troll> I wouldn't've expected bitwise savvy from a ruby programmer</troll> ducks –  poundifdef Jul 7 '09 at 2:06
Equivalent Python one-liner: `def singleton(array): return reduce(lambda x,y:x^y, array)` –  Adam Rosenfield Jul 7 '09 at 2:10
@Michael - the word is absorb - resistance is futile ;) –  rampion Jul 7 '09 at 2:46
I'm "code golfing", in Haskell: `singleton = foldr xor 0` –  R. Martinho Fernandes Jul 14 '09 at 23:14

Assuming you can `XOR` the numbers, that is the key here, I believe, because of the following properties:

• `XOR` is commutative and associative (so the order in which it's done is irrelevant).
• a number `XOR`ed with itself will always be zero.
• zero `XOR`ed with a number will be that number.

So, if you simply `XOR` all the values together, all of the ones that occur twice will cancel each other out (giving 0) and the one remaining number (`n`) will `XOR` with that result (0) to give `n`.

``````r = 0
for i = 1 to n.size:
r = r xor n[i]
print "number is " + r
``````

No hash table needed, this has O(n) performance and O(1) extra space (just one tiny little integer).

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Commutativity alone isn't enough to prove that "the order in which it's done is irrelevant." For that you also need associativity. Conveniently, XOR is also associative. To see why you need both, consider the (commutative!) pairwise average function: average(average(2, 4), 8) = 5.5, but average(2, average(4, 8)) = 4. –  Doug McClean Jul 7 '09 at 3:20
I'll yield to your judgment on that one, @Doug - I haven't done that level of math for over 20 years :-) –  paxdiablo Jul 7 '09 at 3:37
Assuming that the "number" behaves as a POD this will work regardless of how it is implemented inside - will work even for floating point numbers if they are read as blocks of raw data. Excellent solution. –  sharptooth Jul 7 '09 at 10:26

"Parse the array and increment the count for number."

You could change this to "Parse the array and if the number already exists in the hash table, remove the number from the hash table". Then step 3 is just "get the only number that remains in the hash table"

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+1, not sure why you were down-voted. Seems perfectly reasonable to me. Finding an item in a hash and deleting an item from a hash should both be O(1). –  Seth Jul 7 '09 at 2:02
O(1)? you have to consider resizing (en.wikipedia.org/wiki/Hash_table ). I suggest use .resize() in the very beginning, as you know the size of array. Anyhow, the solution with XORs is more efficient. –  MadH Jul 7 '09 at 9:47
+1 when talking about things like job interview, this is actually preferable way of solving this problem. IMO, `XOR`ing is just too smart to be the first thing to come to interviewee's mind –  taras.roshko Jun 25 at 7:48

Given an array of integers, every element appears twice except for one. Find that single one. We can use XOR operation. Because every number XOR itself, the results will be zero. So We XOR every integer in the array, and the result is the single one we want to find. Here is the java version code:

``````public class Solution {
public int singleNumber(int[] A) {
int res=0;
for(int i=0;i<A.length;i++){
res=res^A[i];
}
return res;
}
}
``````

Follow up 1: Given an array of integers, every element appears three times except for one. Find that single one. Note: Your algorithm should have a linear runtime complexity. Could you implement it without using extra memory? For this problem, we can't use the XOR operation.The best way to solve this problem is use "bit count". Create a 32 length int array count[32]. count[i] means how many '1' in the ith bit of all the integers. If count[i] could be divided by 3, then we ignore this bit, else we take out this bit and form the result.Below is java version code:

``````public class Solution {
public int singleNumber(int[] A) {
int res=0;
int[] count=new int[32];
for(int i=0;i<32;i++){
for(int j=0;j<A.length;j++){
if(((A[j]>>i)&1)==1){
count[i]=count[i]+1;
}
}
if((count[i]%3)!=0){
res=res|(1<<i);
}
}
return res;
}
}
``````

Follow up 2: Given an array of integers, every element appears twice except for two. Find that two integers. Solution: First, XOR all the integers in the array we can get a result.(suppose it's c) Second, from the least significant bit to the most significant bit, find the first '1' position(suppose the position is p). Third, divided the integers in to two groups, the p position is '1' in one group, '0' in other group. Fourth, XOR all the integers in the two groups, and the results is the two integers we want.

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Really neat follow ups :) –  Ivan Z. Siu Mar 10 at 17:43

I'm stealing Michael Sofaer's answer and reimplementing it in Python and C:

Python:

``````def singleton(array):
return reduce(lambda x,y:x^y, array)
``````

C:

``````int32_t singleton(int32_t *array, size_t length)
{
int32_t result = 0;
size_t i;
for(i = 0; i < length; i++)
result ^= array[i];
return result;
}
``````

Of course, the C version is limited to 32-bit integers (which can trivially be changed to 64-bit integers if you so desire). The Python version has no such limitation.

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Here's a solution in Python that beats the Ruby one for size (and readability too, IMO):

``````singleton = lambda x: reduce(operator.xor, x)
``````
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Python 3.1 Solution:

``````>>> from collections import Counter
>>> x = [1,2,3,4,5,4,2,1,5]
>>> [value for value,count in Counter(x).items() if count == 1 ][0]
3
>>>
``````
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Algo 2:

1. Sort the array.
2. Now parse the array and if 2 consecutive numbers are not same we got our number.
3. This will not use extra space
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The problem is that this isn't O(n). Sorting is O(log n). –  Glenn Jul 7 '09 at 1:53
Sure, this won't use any extra space, but will run in O(log n) time, since the sort will take you O(log n) –  a_m0d Jul 7 '09 at 1:54
Sorting is O(n log n), not O(log n). –  Steve Jessop Jul 7 '09 at 1:58
O(log n) is so much better than O(n)... too bad onbyone got it right... –  R. Martinho Fernandes Jul 14 '09 at 23:18
Sorting is O(N). COMPARISON sort is O(n log n), but there's no need to use a compare sort for this. These aer numbers so you can use an O(N) inplace sort like a radix sort. –  SPWorley Jul 14 '09 at 23:21

This doesn't fit the bill for "no extra space" but it will cut the space unless the numbers are sorted in a certain way.

In Python:

``````arr = get_weird_array()
hash = {}

for number in arr:
if not number in hash:
hash[number] = 1
else:
del hash[number]

for key in hash:
print key
``````
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I think you meant `del hash[number]`. –  Seth Jul 7 '09 at 2:01