# Efficient way to find the number of all such triplets (from a given set of numbers) whose numbers are in A.P.? [duplicate]

Possible Duplicate:
fastest algorithm count number of 3 length AP in array

I've been working on the following problem taken from CodeChef's Nov12 challenge. I tried it using the basic formula for checking whether three numbers a, b, c are in A.P., they are if c-b=b-a i.e. 2b=a+c. Here is the problem:

First line of the input contains an integer N (3 ≤ N ≤ 100000). Then the following line contains N space separated integers A1, A2, …, AN and they have values between 1 and 30000 (inclusive).

Output the number of ways to choose a triplet such that they are three consecutive terms of an arithmetic progression. Example

Input:

10

3 5 3 6 3 4 10 4 5 2

Output: 9

Explanation:

The followings are all 9 ways to choose a triplet

1 : (i, j, k) = (1, 3, 5), (Ai, Aj, Ak) = (3, 3, 3)

2 : (i, j, k) = (1, 6, 9), (Ai, Aj, Ak) = (3, 4, 5)

3 : (i, j, k) = (1, 8, 9), (Ai, Aj, Ak) = (3, 4, 5)

4 : (i, j, k) = (3, 6, 9), (Ai, Aj, Ak) = (3, 4, 5)

5 : (i, j, k) = (3, 8, 9), (Ai, Aj, Ak) = (3, 4, 5)

6 : (i, j, k) = (4, 6, 10), (Ai, Aj, Ak) = (6, 4, 2)

7 : (i, j, k) = (4, 8, 10), (Ai, Aj, Ak) = (6, 4, 2)

8 : (i, j, k) = (5, 6, 9), (Ai, Aj, Ak) = (3, 4, 5)

The code I used is

``````#include<stdio.h>
int scan() {
int p=0;
char c;
c=getchar_unlocked();
while(c<'0' || c>'9')
c=getchar_unlocked();
while(c>='0' && c<='9'){
p=(p<<3)+(p<<1)+c-'0';
c=getchar_unlocked();
}
return(p);
}
int main() {
int N, i, j, k, count=0;
N=scan();
int a[N];
for(i=0;i<N;i++)
a[i]=scan();
for(i=0;i<N-2;i++)
for(j=i+1;j<N-1;j++)
for(k=j+1;k<N;k++)
if(a[k]+a[i]==2*a[j])
++count;
printf("%d\n", count);
return 0;
}
``````

As you can see the constraints on variables, it is clear that we need fast and efficient algo. For the sake of safety I even used faster I/O but still the program runs out of time. It is clear that the algorithm is not that efficient, as I am using three nested loops. One other way that come to reduce the number of some k's is to break the k' loop as soon as a match is found, then I would have added a continue; below ++count and that is working but again NOT that efficient as the problem requires.

Please tell me some fast algo to do this, or if I might learn some mathematical theorem here to find AP triplets quicker.

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## marked as duplicate by Anirudh Ramanathan, OmnipotentEntity, Peter O., brettdj, chrisNov 11 '12 at 0:46

Solve for `b`: `b = (a + c) / 2`. Now just read in the numbers. –  Thomas Matthews Nov 10 '12 at 18:57
Could you tell why the output is 9? (2,3,4)(3,4,5)(4,5,6)(2, 4, 6), (2, 6, 10) are the 5 triplets... Tell me if I am missing something in this question? –  Vishal Nov 10 '12 at 19:02
@Vishal The followings are all 9 ways to choose a triplet 1 : (i, j, k) = (1, 3, 5), (Ai, Aj, Ak) = (3, 3, 3) 2 : (i, j, k) = (1, 6, 9), (Ai, Aj, Ak) = (3, 4, 5) 3 : (i, j, k) = (1, 8, 9), (Ai, Aj, Ak) = (3, 4, 5) 4 : (i, j, k) = (3, 6, 9), (Ai, Aj, Ak) = (3, 4, 5) 5 : (i, j, k) = (3, 8, 9), (Ai, Aj, Ak) = (3, 4, 5) 6 : (i, j, k) = (4, 6, 10), (Ai, Aj, Ak) = (6, 4, 2) 7 : (i, j, k) = (4, 8, 10), (Ai, Aj, Ak) = (6, 4, 2) 8 : (i, j, k) = (5, 6, 9), (Ai, Aj, Ak) = (3, 4, 5) 9 : (i, j, k) = (5, 8, 9), (Ai, Aj, Ak) = (3, 4, 5) –  Sunny Nov 10 '12 at 19:03
@Vishal That is, we have to print all such triplets, and NOT only those which are distinct. –  Sunny Nov 10 '12 at 19:05
Sunny, in this case you are looking for permutations... N as per my knowledge they are much more than you predicted. only for (3,4,5) there are 12 possible combinations... –  Vishal Nov 10 '12 at 19:09

I don't think you need an array.

Solve for b from your equation `2b=a+c`, and the result is:

``````b = (a + c) / 2
``````

Use 4 variables: `a, b, c, and counter`.

1. Initialize `a, b, c` by reading the 3 values.
2. if (a+c)/2 == b, increment counter, and print a,b,c.
3. shift variables: a = b, b = c.
4. while cin >> c do:
5. if (a+c)/2 == b, increment counter and print a,b,c.
6. shift variables: a = b, b = c;
7. end-while.
8. Output value of counter.

Looks very efficient to me.

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Your answer will not give all the permutations... –  Vishal Nov 10 '12 at 19:18