# How to find a duplicate element in an array of shuffled consecutive integers?

I recently came across a question somewhere:

Suppose you have an array of 1001 integers. The integers are in random order, but you know each of the integers is between 1 and 1000 (inclusive). In addition, each number appears only once in the array, except for one number, which occurs twice. Assume that you can access each element of the array only once. Describe an algorithm to find the repeated number. If you used auxiliary storage in your algorithm, can you find an algorithm that does not require it?

What I am interested in to know is the second part, i.e., without using auxiliary storage. Do you have any idea?

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pretty sure this has been asked before, but can't find the exact qn. the total of the n integers in sequence and the repeated integer x will be x + n(n-1)/2. – Pete Kirkham Apr 9 '10 at 7:41
Can you please change question title to something more descriptive? Maybe "Find duplicate array element with special constraints" – Michał Piaskowski Apr 9 '10 at 13:27
Slightly different question with the same answer: stackoverflow.com/questions/35185/… – starblue Apr 10 '10 at 7:56
– starblue Apr 10 '10 at 7:57
Duplicate: stackoverflow.com/questions/555744/… – starblue Apr 10 '10 at 8:42

Just add them all up, and subtract the total you would expect if only 1001 numbers were used from that.

Eg:

``````Input: 1,2,3,2,4 => 12
Expected: 1,2,3,4 => 10

Input - Expected => 2
``````
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@leppie: To hold the calculated sum, but honestly I don't know exactly what the OP meant by extra storage. In any case, I like your answer. – Brian Rasmussen Apr 9 '10 at 7:42
@Brian, the interviewer probably meant "don't use a hash table or an array"... I'm pretty sure O(1) storage, especially a single variable, would be satisfactory. – Michael Aaron Safyan Apr 9 '10 at 7:44
+1, although your example is the wrong way around. – Aistina Apr 9 '10 at 7:46
the methord works perfectly fine. but the example should have been something like ( 1,3,2,4,2=>12 ) - (1+2+3+4 => 10) = 2 – SysAdmin Apr 9 '10 at 7:56
@Franci Penov: I am not sure interview questions are supposed to scale :) – Brian Rasmussen Apr 9 '10 at 8:04

Update 2: Some people think that using XOR to find the duplicate number is a hack or trick. To which my official response is: "I am not looking for a duplicate number, I am looking for a duplicate pattern in an array of bit sets. And XOR is definitely suited better than ADD to manipulate bit sets". :-)

Update: Just for fun before I go to bed, here's "one-line" alternative solution that requires zero additional storage (not even a loop counter), touches each array element only once, is non-destructive and does not scale at all :-)

``````printf("Answer : %d\n",
array[0] ^
array[1] ^
array[2] ^
// continue typing...
array[999] ^
array[1000] ^
1 ^
2 ^
// continue typing...
999^
1000
);
``````

Note that the compiler will actually calculate the second half of that expression at compile time, so the "algorithm" will execute in exactly 1002 operations.

And if the array element values are know at compile time as well, the compiler will optimize the whole statement to a constant. :-)

Original solution: Which does not meet the strict requirements of the questions, even though it works to find the correct answer. It uses one additional integer to keep the loop counter, and it accesses each array element three times - twice to read it and write it at the current iteration and once to read it for the next iteration.

Well, you need at least one additional variable (or a CPU register) to store the index of the current element as you go through the array.

Aside from that one though, here's a destructive algorithm that can safely scale for any N up to MAX_INT.

``````for (int i = 1; i < 1001; i++)
{
array[i] = array[i] ^ array[i-1] ^ i;
}

printf("Answer : %d\n", array[1000]);
``````

I will leave the exercise of figuring out why this works to you, with a simple hint :-):

``````a ^ a = 0
0 ^ a = a
``````
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+1 for leetness – larsmoa Apr 9 '10 at 8:25
A non-destructive method would be to maintain an accumulator on the side... would also make it more readable I think. – Matthieu M. Apr 9 '10 at 8:32
@Matthiey M. - but a non-destructive solution would require additional storage and thus violate the requirements of the problem. – Franci Penov Apr 9 '10 at 8:40
+1, Absolutely Brilliant! :-) – missingfaktor Apr 9 '10 at 8:56
Nice answer +1 but now my brain hurts! – leppie Apr 9 '10 at 9:16

Add all the numbers together. The final sum will be the 1+2+...+1000+duplicate number.

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A non destructive version of solution by Franci Penov.

This can be done by making use of the `XOR` operator.

Lets say we have an array of size `5`: `4, 3, 1, 2, 2`
Which are at the index:                        `0, 1, 2, 3, 4`

Now do an `XOR` of all the elements and all the indices. We get `2`, which is the duplicate element. This happens because, `0` plays no role in the XORing. The remaining `n-1` indices pair with same `n-1` elements in the array and the only unpaired element in the array will be the duplicate.

``````int i;
int dupe = 0;
for(i = 0; i < N; i++) {
dupe = dupe ^ arr[i] ^ i;
}
// dupe has the duplicate.
``````

The best feature of this solution is that it does not suffer from overflow problems that is seen in the addition based solution.

Since this is an interview question, it would be best to start with the addition based solution, identify the overflow limitation and then give the `XOR` based solution `:)`

This makes use of an additional variable so does not meet the requirements in the question completely.

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+1 very neat solution. – Parag Bafna Jun 20 '13 at 11:50
Frankly, I'm not getting these XOR based solutions. Basically, we're trying to match the "index" with the value of the element. In case of match, the result will be zero and for repeated value, the xor result will be non zero. For a simple array --> {1,2,2} we will xor 1(element value)^1(index)^0 (previous xor result) --> 0; 2^2^0 --> 0; 3^2^0 --> 1. Here 1 is the final result value as per XOR solutions. I don't see how this is valid answer unless I'm missing something very obvious. – Prabhjot Apr 1 '14 at 18:43
@codaddict I think the loop should start with i initialized to 1. – Raman Singh Jul 20 '14 at 6:29
@codaddict +1 for the clear illustration and mentioning about the overflow (also for being non-destructive). The same will work, with a few changes, even if the integers have an offset, say `{ 1043, 1042, 1044, 1042 }` by XOR-ing with `{ 0, 1042, 1043, 1044 }`. – legends2k Oct 29 '14 at 12:01

To paraphrase Francis Penov's solution.

The (usual) problem is: given an array of integers of arbitrary length that contain only elements repeated an even times of times except for one value which is repeated an odd times of times, find out this value.

The solution is:

``````acc = 0
for i in array: acc = acc ^ i
``````

Your current problem is an adaptation. The trick is that you are to find the element that is repeated twice so you need to adapt solution to compensate for this quirk.

``````acc = 0
for i in len(array): acc = acc ^ i ^ array[i]
``````

Which is what Francis' solution does in the end, although it destroys the whole array (by the way, it could only destroy the first or last element...)

But since you need extra-storage for the index, I think you'll be forgiven if you also use an extra integer... The restriction is most probably because they want to prevent you from using an array.

It would have been phrased more accurately if they had required `O(1)` space (1000 can be seen as N since it's arbitrary here).

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I've posted Python one-liner based on your answer stackoverflow.com/questions/2605766/… – J.F. Sebastian Apr 10 '10 at 5:18

Add all numbers. The sum of integers 1..1000 is (1000*1001)/2. The difference from what you get is your number.

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If you know that we have the exact numbers 1-1000, you can add up the results and subtract `500500` (`sum(1, 1000)`) from the total. This will give the repeated number because `sum(array) = sum(1, 1000) + repeated number`.

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Well, there is a very simple way to do this... each of the numbers between 1 and 1000 occurs exactly once except for the number that is repeated.... so, the sum from 1....1000 is 500500. So, the algorithm is:

```sum = 0
for each element of the array:
sum += that element of the array
number_that_occurred_twice = sum - 500500
```
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``````n = 1000
s = sum(GivenList)
r = str(n/2)
duplicate = int( r + r ) - s
``````
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``````public static void main(String[] args) {
int start = 1;
int end = 10;
int arr[] = {1, 2, 3, 4, 4, 5, 6, 7, 8, 9, 10};
System.out.println(findDuplicate(arr, start, end));
}

static int findDuplicate(int arr[], int start, int end) {

int sumAll = 0;
for(int i = start; i <= end; i++) {
sumAll += i;
}
System.out.println(sumAll);
int sumArrElem = 0;
for(int e : arr) {
sumArrElem += e;
}
System.out.println(sumArrElem);
return sumArrElem - sumAll;
}
``````
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No extra storage requirement (apart from loop variable).

``````int length = (sizeof array) / (sizeof array[0]);
for(int i = 1; i < length; i++) {
array[0] += array[i];
}

printf(
( array[0] - (length * (length + 1)) / 2 )
);
``````
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You are assuming the array is sorted. Bad assumption. – leppie Apr 9 '10 at 7:46
@leppie: how come? I didn't assume anything. And it actually uses any extra space like other answers suggest. – N 1.1 Apr 9 '10 at 7:59
How is he assuming that? – Dennis Zickefoose Apr 9 '10 at 8:05
Although I do have issue with the premise. It requires an extra two ints. – Dennis Zickefoose Apr 9 '10 at 8:06
@Dennis: well loop variable has to be there, and `length` to make it generic. – N 1.1 Apr 9 '10 at 8:20

Do arguments and callstacks count as auxiliary storage?

``````int sumRemaining(int* remaining, int count) {
if (!count) {
return 0;
}
return remaining[0] + sumRemaining(remaining + 1, count - 1);
}
``````
``````printf("duplicate is %d", sumRemaining(array, 1001) - 500500);
``````

Edit: tail call version

``````int sumRemaining(int* remaining, int count, int sumSoFar) {
if (!count) {
return sumSoFar;
}
return sumRemaining(remaining + 1, count - 1, sumSoFar + remaining[0]);
}
printf("duplicate is %d", sumRemaining(array, 1001, 0) - 500500);
``````
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This requires linear stack space, so that is definitely cheating. – Dennis Zickefoose Apr 9 '10 at 8:21
Throw in another argument and you can tail call optimize it. – cobbal Apr 9 '10 at 8:27

### One line solution in Python

``````arr = [1,3,2,4,2]
print reduce(lambda acc, (i, x): acc ^ i ^ x, enumerate(arr), 0)
# -> 2
``````

Explanation on why it works is in @Matthieu M.'s answer.

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+1, well done: even though it's not a code golf, using python's built-in loops is faster :) – Matthieu M. Apr 10 '10 at 12:43

A triangle number T(n) is the sum of the n natural numbers from 1 to n. It can be represented as n(n+1)/2. Thus, knowing that among given 1001 natural numbers, one and only one number is duplicated, you can easily sum all given numbers and subtract T(1000). The result will contain this duplicate.

For a triangular number T(n), if n is any power of 10, there is also beautiful method finding this T(n), based on base-10 representation:

``````n = 1000
s = sum(GivenList)
r = str(n/2)
duplicate = int( r + r ) - s
``````
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I support the addition of all the elements and then subtracting from it the sum of all the indices but this won't work if the number of elements is very large. I.e. It will cause an integer overflow! So I have devised this algorithm which may be will reduce the chances of an integer overflow to a large extent.

``````   for i=0 to n-1
begin:
diff = a[i]-i;
dup = dup + diff;
end
// where dup is the duplicate element..
``````

But by this method I won't be able to find out the index at which the duplicate element is present!

For that I need to traverse the array another time which is not desirable.

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Simple sums will actually work work. Integer overflow is not a problem, provided the variable tallying the sum is unsigned. – Greg A. Woods Nov 14 '12 at 22:27

Improvement of Fraci's answer based on the property of XORing consecutive values:

``````int result = xor_sum(N);
for (i = 0; i < N+1; i++)
{
result = result ^ array[i];
}
``````

Where:

``````// Compute (((1 xor 2) xor 3) .. xor value)
int xor_sum(int value)
{
int modulo = x % 4;
if (modulo == 0)
return value;
else if (modulo == 1)
return 1;
else if (modulo == 2)
return i + 1;
else
return 0;
}
``````

Or in pseudocode/math lang f(n) defined as (optimized):

``````if n mod 4 = 0 then X = n
if n mod 4 = 1 then X = 1
if n mod 4 = 2 then X = n+1
if n mod 4 = 3 then X = 0
``````

And in canonical form f(n) is:

``````f(0) = 0
f(n) = f(n-1) xor n
``````
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``````public int duplicateNumber(int[] A) {
int count = 0;
for(int k = 0; k < A.Length; k++)
count += A[k];
return count - (A.Length * (A.Length - 1) >> 1);
}
``````
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This does not provide an answer to the question. To critique or request clarification from an author, leave a comment below their post. – M D Apr 7 at 6:57

My answer to question 2:

Find the sum and product of numbers from 1 -(to) N, say `SUM`, `PROD`.

Find the sum and product of Numbers from 1 - N- x -y, (assume x, y missing), say mySum, myProd,

Thus:

``````SUM = mySum + x + y;
PROD = myProd* x*y;
``````

Thus:

``````x*y = PROD/myProd; x+y = SUM - mySum;
``````

We can find x,y if solve this equation.

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