# Array containing n-2 integers 1 to n, O(n) algorithm to find missing 2 numbers with O(1) extra space? [duplicate]

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Find two missing numbers

I been thinking for a while and can't seem to get an answer to this... So an array with n-2 unique integers in the range from 1 to n and O(1) space in addition to the space used by the array is given. How can you find the two integers from 1 to n that is missing in the array in O(n) time?

So for example, a = [4,3,1,6] and O(1) extra space How can you find 2, 5 in O(n) time?

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## marked as duplicate by John3136, nhahtdh, Blastfurnace, Oleh Prypin, dgwOct 5 '12 at 7:15

Here's an idea: Just keep some statistic that gives you information about the missing numbers. For example, if you calculate the sum of all your numbers as S, then:

``````(1+2+..+N) - S = a+b
``````

where a and b are your missing numbers. In your example, you get:

``````1+2+3+4+5+6 - 4+3+1+6 = 7 = a+b
``````

You could then also do the same, for example, for multiplication and get:

``````(1*2*..*N) / S = a*b
``````

``````(1*2*3*4*5*6) / 72 = 10 = a*b
``````

so the answer is 2 and 5.

Basically there are a lot of statistics you can use in this way...

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the idea is interesting, but how do you know which numbers are missing, let say a + b = 7. (a, b) could be (1, 6) or (3, 4)? –  Krypton Oct 5 '12 at 5:10
@Krypton because you also have the product which gives you a second constraint, so a*b=10, and since 1*6=6 and 3*4=12 the answer must be 2*5... –  Bitwise Oct 5 '12 at 5:21
1*2*3*....*n is NOT `O(1)` space, nor `O(N)` time. The assumption of integers ops being `O(1)` space and time is failing for repeating multiplications, since: `1 * 2 * ... * N = N!` To represent `N!` you are going to need `O(N*log(N))` bits. So, even if neglecting the `O(log(N))` bits for an integers (which is usually an assumption made), you cannot ignore the `N` factor –  amit Oct 5 '12 at 7:10

Consider to have array b constructed as b = [1, 0, 1, 1, 0, 1]. Look for the element that is 0, it is the one that is missing from array a.

Edit: b[1] = 1 because 1 exists in array a, b[2] = 0 because 2 doesn't exist in array a, and so on.

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Your solution requires `O(n)` additional space, not `O(1)`. –  paddy Oct 5 '12 at 4:28
This is not a O(1) space answer. –  Kay Zhu Oct 5 '12 at 4:30
(-1) This is not O(1) space. –  idz Oct 5 '12 at 5:00
Oops, forgot abt the O(1) space. –  Krypton Oct 5 '12 at 5:07