# Sum of consecutive elements in an array, C++

Suppose that I have an array consisting of n elements.

``````1 2 3 4 5 6 ... n
``````

I need to find a way to extract the sums of consecutive elements in this array using C++. Like this:

``````1, 2, 3,...n, 1+2, 2+3, 3+4,...(n-1)+n, 1+2+3, 2+3+4,...(n-2)+(n-1)+n,...1+2+3...n
``````

So far I figured out I need to iterate through this array by summing certain number of elements on each run. I am not sure if it is possible to implement the algorithm I explained above. There might be a better solution but this is the best I could come up with.

• Are the elements actually integers that equal to their indices, i. e. the first element is 1, the second is 2, etc.? – user529758 Oct 28 '12 at 11:59
• No they are not, they are arbitrary numbers in the real problem. I just wanted to make it simpler by giving simpler numbers in the example above. – harbinger Oct 28 '12 at 12:01
• in this case what is your question? Why wouldn't this algorithm work? – user529758 Oct 28 '12 at 12:03
• I couldn't find a way to implement this algorithm that is the problem. – harbinger Oct 28 '12 at 12:06
• well... `int sum = 0; for (int i = lowerindex; i <= upperindex; i++) sum += array[i];` – user529758 Oct 28 '12 at 12:12

Let's inspect case with 4 elements:

``````{1,3,4,5, // from original array
4,7,9, // sum of 2 consecutive elements
8,12, // sum of 3
13} // sum of 4
``````

As you can see every part for N sum array is of size lower from original array by (N-1). So you need target array of size: N + (N-1) + (N-2) + ... 1 - which is N*(1+N)/2

``````int* createSumArray(int* arr, int size)
{
int ti = 0; // target index
int* ta = new int[size*(size+1)/2];
for (int s = 1; s <= size; ++s) // how many elements to sum
{
for (int si = 0; si < size + 1 - s; ++si)
{
ta[ti] = 0;
for (int i = si; i < si + s; ++i)
ta[ti] += arr[i];
++ti;
}
}
return ta;
}
``````

See test on ideone

• This is exactly the answer I needed. Thank you! – harbinger Oct 28 '12 at 12:51
• It is possible to opimize this approach to get optimal O(N^2) complexity instead of cubic one, removing internal cycle: use previous sums and add only one number (Sum(2,3,4,5) = Sum(2,3,4) + 5) – MBo Oct 28 '12 at 13:00

You can use `std::transform` to do this:

``````std::transform(
v.begin(), v.end()-1,
v.begin()+1,
std::ostream_iterator<int>(std::cout, "\n"),
std::plus<int>()
);
``````

Of course you don't have to use an ostream_iterator as it's output, you can also use another containers iterator, or a `std::back_inserter` for a container or any other `OutputIterator`

### references

http://en.cppreference.com/w/cpp/algorithm/transform

http://en.cppreference.com/w/cpp/utility/functional/plus

http://en.cppreference.com/w/cpp/container/vector

EDIT:

``````std::vector<int> v(100), t;
//this just populates v with 1,2,3...100
std::iota(v.begin(), v.end(), 1);

std::transform(
v.begin(), v.end()-1, v.begin()+1,
std::back_inserter(t),
std::plus<int>()
);

std::transform(
t.begin(), t.end()-1, v.begin()+2,
std::ostream_iterator<int>(std::cout, "\n"),
std::plus<int>()
);
``````
• working example ideone.com/xjuvbh – 111111 Oct 28 '12 at 12:10
• where is this part in your answer: `1+2+3, 2+3+4,...(n-2)+(n-1)+n`... – PiotrNycz Oct 28 '12 at 12:43
• @PiotrNycz It's a very simple extension of my current answer, as seen in my edit – 111111 Oct 28 '12 at 12:51
• So, where is this part: `1+2+3+4 2+3+4+5 ... (n-3)+..+n`? And the next iterations up to last one: `1+2+3...+n`.... `std::tranform` is good advice - but it should be done in some loop - `std::plus` is not good choice for next iterations - you would need `std::accumulate`... – PiotrNycz Oct 28 '12 at 12:58
• @PiotrNycz I don't know the specific problem, it's a pretty trivail extension of the code I have provided. – 111111 Oct 28 '12 at 13:01

How this. Given an array of 5 integers : 5, 7, 3, 9, 4

``````
void DoMaths (void)
{
int       iArray [] = { 5, 7, 3, 9, 4 } ;
int       iSize = 5 ;

int       iGroup ;
int       iIndex ;
int       iPass ;
int       iResults ;
int       iStart ;
int       iSum ;

// Init
iGroup   = 1 ;
iResults = iSize ;
// Repeat for each pass
for (iPass = 0 ; iPass < iSize ; iPass ++)
{
printf ("\n") ;
printf ("Pass %d : Group %d :\n", iPass, iGroup) ;
// Repeat for each group of integers in a pass
for (iStart = 0 ; iStart < iResults ; iStart ++)
{
iSum = 0 ;
printf ("  %d [ ", iStart) ;
for (iIndex = iStart ; iIndex < (iStart + iGroup) ; iIndex ++)
{
printf ("%d ", iIndex) ;
iSum += iArray [iIndex] ;
}
printf ("] sum = %d \n", iSum) ;
}
iGroup ++ ;
iResults -- ;
}
return ;
}``````

This produces the following results...

```
Pass 0 : Group 1 :
0 [ 0 ] sum = 5
1 [ 1 ] sum = 7
2 [ 2 ] sum = 3
3 [ 3 ] sum = 9
4 [ 4 ] sum = 4

Pass 1 : Group 2 :
0 [ 0 1 ] sum = 12
1 [ 1 2 ] sum = 10
2 [ 2 3 ] sum = 12
3 [ 3 4 ] sum = 13

Pass 2 : Group 3 :
0 [ 0 1 2 ] sum = 15
1 [ 1 2 3 ] sum = 19
2 [ 2 3 4 ] sum = 16

Pass 3 : Group 4 :
0 [ 0 1 2 3 ] sum = 24
1 [ 1 2 3 4 ] sum = 23

Pass 4 : Group 5 :
0 [ 0 1 2 3 4 ] sum = 28

```

I hope this helps...

I think this code should do what you are asking for:

``````int main()
{
int ptr=0,i,j,k;
int Ar[]={1,2,3,4,5,6,7,8,9,10,11,12,13};
int n=13;
int *Res;
Res=(int*)calloc(n*(n+1)/2,sizeof(int));
for(i=1;i<=n;i++) //tells about how many element's sum we need
for(j=i;j<=n;j++)
{
for(k=0;k<i;k++)
{
Res[ptr]+=Ar[j-i+k];
}
ptr++;
}
for(int x=0;x<ptr;x++)
cout<<Res[x]<<"\t";
return 0;
}
``````
• Frankly, this is C code, not C++, although it compiles with C++ compiler because of C++ backward compatibility to C++. And this is wrong answer after all: we need `n*(n+1)/2` elements - not `n*n` – PiotrNycz Oct 28 '12 at 13:03
• Thanks for pointing out the mistakes @PiotrNycz I have made the changes. – Gaurav Oct 28 '12 at 14:01

Let's call the original array A.

Let's call the array of sums of k consecutive elements B.

Let's call the array of sums of k+1 consecutive elements C.

Each of the array is of size n.

First k-2 cells of C are irrelevant.

``````for(int i = k-1; i < n; i++)
C[i] = A[i-1] + B[i];
``````

Iterate the above code for each k up to n and after each pass concatenate the resulting array to the result from previous iteration. (Make sure to check the corner cases well)

• This is wrong: `Each of the array is of size n.` – PiotrNycz Oct 28 '12 at 12:59
• @PyotrNycz that's completely fine, just using a bit more space for temporary array for simplicity. It can be optimized of course but that doesn't compromise the correctness (first k-2 cells of the temporary array are ignored on concatenation) – SomeWittyUsername Oct 28 '12 at 13:05

See it working at ideone.com:

``````std::vector<std::vector<int> > sums(int array[], int size)
{
std::vector<std::vector<int> > result(size - 1);
//build the two element sums
for(int *p = array; p - array < size - 1; ++p)
result.push_back(std::accumulate(p, p + 2, 0));
//build the rest of the sums
for(int i = 1; i < size - 1; ++i)
for(int j = 0; j < size - (i + 1); ++j)
result[i].push_back(result[i - 1][j] + array[i + j + 1]);
return result;
}
``````

This should use the previously calculated sums too.