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I was stuck in solving the following interview practice question:
I have to write a function:

int triangle(int[] A);

that given a zero-indexed array A consisting of N integers returns 1 if there exists a triple (P, Q, R) such that 0 < P < Q < R < N.

A[P] + A[Q] > A[R],  
A[Q] + A[R] > A[P],  
A[R] + A[P] > A[Q].

The function should return 0 if such triple does not exist. Assume that 0 < N < 100,000. Assume that each element of the array is an integer in range [-1,000,000..1,000,000].

For example, given array A such that

A[0]=10, A[1]=2, A[2]=5, A[3]=1, A[4]=8, A[5]=20

the function should return 1, because the triple (0, 2, 4) fulfills all of the required conditions.

For array A such that

A[0]=10, A[1]=50, A[2]=5, A[3]=1

the function should return 0.

If I do a triple loop, this would be very very slow (complexity: O(n^3)). I am thinking maybe to use to store an extra copy of the array and sort it, and use a binary search for a particular number. But I don't know how to break down this problem.
Any ideas?

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1  
(0, 2, 4) doesn't fit: 0 + 2 is not > 4. –  Vlad Mar 22 '11 at 12:32
5  
He is mentioning the index numbers as the answer ... 10 , 5 , 8 –  user506710 Mar 22 '11 at 12:33
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6 Answers

up vote 21 down vote accepted

First of all, you can sort your sequence. For the sorted sequence it's enough to check that A[i] + A[j] > A[k] for i < j < k, because A[i] + A[k] > A[k] > A[j] etc., so the other 2 inequalities are automatically true.

(From now on, i < j < k.)

Next, it's enough to check that A[i] + A[j] > A[j+1], because other A[k] are even bigger (so if the inequality holds for some k, it holds for k = j+1 as well).

Next, it's enough to check that A[j-1] + A[j] > A[j+1], because other A[i] are even smaller (so if inequality holds for some i, it holds for i = j-1 as well).

So, you have just a linear check: you need to check whether for at least one j A[j-1] + A[j] > A[j+1] holds true.

Altogether O(N log N) {sorting} + O(N) {check} = O(N log N).

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3  
Nice job. [15chars] –  st0le Mar 22 '11 at 12:56
    
@st0le: thanks! –  Vlad Mar 22 '11 at 13:09
    
Thanks for sharing the idea Vlad. This really helps to break down the problem into an easier task. Thanks ! –  all_by_grace Mar 22 '11 at 15:19
    
@Bob: you're welcome! –  Vlad Mar 22 '11 at 16:08
3  
@useless: Nope. Obviously if a triple exists in the sorted array, it must exist in the original array (just map the indices back and sort them). You can see that the problem is symmetric w.r.t. index swapping. –  Vlad Apr 17 '13 at 10:11
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Do a quick sort first, this will generally take nlogn. And you can omit the third loop by binary search, which can take log(n). So altogether, the complexity is reduced to n^2log(n).

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Yeah, I have tried this previously. And still got a timeout error :-) It expects a better solution than n^2 log(n). –  all_by_grace Mar 22 '11 at 12:38
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In ruby what about

def check_triangle (_array)
  for p in 0 .. _array.length-1
    for q in p .. _array.length-1
      for r in q .. _array.length-1
        return true if _array[p] + _array[q] > _array[r] && _array[p] + _array[r] > _array[q] && _array[r] + _array[q] > _array[p]
      end
    end
  end

  return false
end

Just port it in the language of your choice

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2  
In the question time complexity is not mentioned but in a real quiestion on Codility there is a requirement that a solution must be O(NlogN) so your solution is not suitable. –  skwllsp Nov 13 '13 at 17:20
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In Java:

public int triangle2(int[] A) {

    if (null == A)
        return 0;
    if (A.length < 3)
        return 0;

    Arrays.sort(A);

    for (int i = 0; i < A.length - 2 && A[i] > 0; i++) {
        if (A[i] + A[i + 1] > A[i + 2])
            return 1;
    }

    return 0;

}
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Here is an implementation of the algorithm proposed by Vlad. The question now requires to avoid overflows, therefore the casts to long long.

#include <algorithm>
#include <vector>

int solution(vector<int>& A) {

    if (A.size() < 3u) return 0;

    sort(A.begin(), A.end());

    for (size_t i = 2; i < A.size(); i++) {
        const long long sum = (long long) A[i - 2] + (long long) A[i - 1];
        if (sum > A[i]) return 1;
    }

    return 0;

}
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A 100/100 php solution: http://www.rationalplanet.com/php-related/maxproductofthree-demo-task-at-codility-com.html

function solution($A) {
    $cnt = count($A);
    sort($A, SORT_NUMERIC);
    return max($A[0]*$A[1]*$A[$cnt-1], $A[$cnt-1]*$A[$cnt-2]*$A[$cnt-3]);
}
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and the triangle one: rationalplanet.com/php-related/… –  Alexander Missa Feb 20 at 12:10
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