# Pseudocode for an array search

The question:

"Write an algorithm that given an array A and an integer value k it returns the value true if there are two different integers in A that sum to k, and it returns false otherwise."

My pseudocode:

Input: array A of size n with value k

Output: true if two different integers in A sum to k, false otherwise

``````Algorithm ArraySum(A, n, k)
for (i=0, i<n, i++)
for (j=i+1, j<n, j++)
if (A[i]+A[j]=k)
return true
return false
``````

Have I written this algorithm correctly? Are there any mistakes I'm just not seeing?

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If two different integers means `A[i], A[j]` where `i != j` rather than `A[i] != A[j]`, your pseudocode is correct.

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Sorry for the ambiguity. Each position in the array contains a unique integer. For instance, the example array given was [4|7|3|9|2|1|5]. We are meant to compare/sum the contents of the array, not the positions. –  user41419 Sep 25 '12 at 5:21
@user41419, now that I believe your algorithm is right. –  Marcus Sep 25 '12 at 5:22
Great! Thank you for the help. –  user41419 Sep 25 '12 at 5:29
@user41419 Marcus is right to mention the comparison of positions. However, in your algorithm, that comparison would always evaluate to true, which is why it's unnecessary. –  phant0m Sep 25 '12 at 8:44

There are two solutions in my mind regarding the problem

First Solution

1.Make an empty hash
2.Mark all number in array in hash

`````` for each i (Array A){
hash[i] = 1;
}
``````

3.Just run an `O(n)` loop

``````for each i (Array A)
if(  hash[ k - i ] )
print "solution i and k-i"
``````

That will give you `O(n)` complexity

Second Solution

1.Sort Array
2.Run an `O(n)` loop over the sorted Array

``````for each i (Array A)
binary_search( Array, k - i); [log n operation]
``````

That will give you `O(n logn)` complexity.

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I think second solution is more convenient. –  Samiron Sep 25 '12 at 6:47
to keep lees memory, Yes. second method will not required any extra memory spaces. –  Atanu Sep 25 '12 at 6:52

It is looks like as some case of knapsack problem.

For your case (only two numbers), may be will be better to sort your array to reduce number of comparision (A[i]+A[j]=k).

For example:

``````you have sorted array [1 3 5 8 10 12 14 20 50 60 100]
sum of two numbers must be equal to 30
``````

Then you can write

`````` while(a[i] <= 30) {
while(a[i] + a[j] <= 30) {
// ...
i++;
j++;
}
}
``````
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