# Determine if array contains two elements which equal a certain sum?

``````// Checks whether the array contains two elements whose sum is s.
// Input: A list of numbers and an integer s
// Output: return True if the answer is yes, else return False

public static boolean calvalue (int[] numbers, int s){
for (int i=0; i< numbers.length; i++){
for (int j=i+1; j<numbers.length;j++){
if (numbers[i] < s){
if (numbers[i]+numbers[j] == s){
return true;
}
}
}
}
return false;
}
``````
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Sort it, then creep from both ends. –  nhahtdh Oct 8 '12 at 3:13
Homework? You have a bug in your code. `if (numbers[i] < s)` will always evaluate `false` if your input is [1,0]. In fact... your code never accepts the case where zero is the second addend required to produce a match (i.e. [1,0] for sum = 1; [2,0] for sum = 2; [5, 0, 0] for sum = 5; [1, 5, 0, 0] for sum = 5; will all fail unit tests). –  Adam Oct 8 '12 at 3:23

Here is a solution witch takes into account duplicate entries. It is written in javascript and assumes array is sorted.

``````var count_pairs = function(_arr,x) {
if(!x) x = 0;
var pairs = 0;
var i = 0;
var k = _arr.length-1;
if((k+1)<2) return pairs;
var halfX = x/2;
while(i<k) {
var curK = _arr[k];
var curI = _arr[i];
var pairsThisLoop = 0;
if(curK+curI==x) {
// if midpoint and equal find combinations
if(curK==curI) {
var comb = 1;
while(--k>=i) pairs+=(comb++);
break;
}
// count pair and k duplicates
pairsThisLoop++;
while(_arr[--k]==curK) pairsThisLoop++;
// add k side pairs to running total for every i side pair found
pairs+=pairsThisLoop;
while(_arr[++i]==curI) pairs+=pairsThisLoop;
} else {
// if we are at a mid point
if(curK==curI) break;
var distK = Math.abs(halfX-curK);
var distI = Math.abs(halfX-curI);
if(distI > distK) while(_arr[++i]==curI);
else while(_arr[--k]==curK);
}
}
return pairs;
}
``````

Enjoy!

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You can solve this by sorting the array, then keep 2 pointers to the start and the end of the array and find the 2 numbers by moving both pointers. The sorting step takes O(nlog n) and the 2nd step takes O(n).

As @Adam has pointed out, it is also good to remove duplicate elements from the array, so that you may reduce the time from the second step if the array contains many duplicated numbers.

As for how to do the second step:

• Move the pointer at the end backward if sum of the current 2 numbers is larger than n.
• Move the pointer at the start forward if sum of the current 2 numbers is smaller than n.
• Stop and reject when both pointers point to the same element. Accept if sum is equal to n.

Why is this correct (I use right end to denote larger end and left end to denote smaller end):

• If sum is larger than n, there is no point in using the right end, since all numbers larger than current left end will make it worse.
• If sum is smaller than n, there is no point in using the left end, since all numbers smaller than current right end will make it worse.
• At each step, we will have gone through all possible combinations (logically) between the removed numbers and the numbers which remain. At the end, we will exhaust all possible combinations possible between all pairs of numbers.
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Good answer. I'd also enhance the sorter to overwrite duplicate entries-the list only needs to be a set.This marginally improves the performance of step-2 because you wont repeat the testing the same number. This would however, destroy your list. You could instead keep a lookup table counting the number of numeric duplicates encountered in the list during sorting (won't work if you use a divide/conquer sort however) - then you know how many elements to skip during step-2. This won't achieve an order of magnitude improvement, but it could be significant depending on your data-set. –  Adam Oct 8 '12 at 3:35

This can be achieved in O(n).

1. Create a hash-backed set out of your list, such that it contains all elements of the list. This takes O(n).
2. Walk through each element `n` of your list, calculate `s-n = d`, and check for the presence of `d` in the set. If `d` is present, then `n+d = s`, so return `true`. If you pass through the list without finding an appropriate `d`, return `false`. This is achieved in a single pass through your list, with each lookup taking O(1), so this step also takes O(n).
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One problem, what if [5, 2] =? 10 –  budsiya Mar 4 '13 at 23:19
It works fine in that scenario, as far as I can tell. No? –  cheeken Mar 5 '13 at 3:30
Well initially the set will contain 5 and 2. And when you start walking through the arra the first element it finds is "5". Then you look it up in the set for a 5 and .. there you go. It's there. So it think it found a 5 and incorrectly return true. I guess a slight modification would fix the issue. Use a Map instead of a Set. Then keep a count of each number. If you find that it's count is more than 1 then you got your answer. –  budsiya Mar 8 '13 at 7:18
Agreed that this is efficient, but will it handle duplicates? For input: {1, 1, 1, 5, 7, 9} and expected sum: 3? I don't quite get the 'hash-backed' set term. What will it be? A hashset? –  Darshan Bidkar Apr 8 at 17:27