Here's the problem.

Write the given number N, as sum of the given numbers, using only additioning and subtracting.

Here's an example:

```
N = 20
Integers = 8, 15, 2, 9, 10
```

20 = 8 + 15 - 2 + 9 - 10.

Here's my idea;

First idea was to use brute force, alternating plus and minus. First I calculate the number of combinations and its 2^k (where k is the nubmer of integers), because I can alternate only minus and plus. Then I run through all numbers from 1 to 2^k and I convert it to binary form. And for any 1 I use plus and for any 0 I use minus. You'll get it easier with an example (using the above example).

```
The number of combinations is: 2^k = 2^5 = 32.
Now I run through all numbers from 1 to 32.
So i get: 1=00001, that means: -8-15-2-9+10 = -24 This is false so I go on.
2 = 00010, which means: -8-15-2+9-10 = -26. Also false.
```

This method works good, but when the number of integers is too big it takes too long.

Here's my code in C++:

```
#include <iostream>
#include <cmath>
using namespace std;
int convertToBinary(int number) {
int remainder;
int binNumber = 0;
int i = 1;
while(number!=0)
{
remainder=number%2;
binNumber=binNumber + (i*remainder);
number=number/2;
i=i*10;
}
return binNumber;
}
int main()
{
int N, numberOfIntegers, Combinations, Binary, Remainder, Sum;
cin >> N >> numberOfIntegers;
int Integers[numberOfIntegers];
for(int i = 0; i<numberOfIntegers; i++)
{
cin >>Integers[i];
}
Combinations = pow(2.00, numberOfIntegers);
for(int i = Combinations-1; i>=Combinations/2; i--) // I use half of the combinations, because 10100 will compute the same sum as 01011, but in with opposite sign.
{
Sum = 0;
Binary = convertToBinary(i);
for(int j = 0; Binary!=0; j++)
{
Remainder = Binary%10;
Binary = Binary/10;
if(Remainder==1)
{
Sum += Integers[numberOfIntegers-1-j];
}
else
{
Sum -= Integers[numberOfIntegers-1-j];
}
}
if(N == abs(Sum))
{
Binary = convertToBinary(i);
for(int j = 0; Binary!=0; j++)
{
Remainder = Binary%10;
Binary = Binary/10;
if(Sum>0)
{
if(Remainder==1)
{
cout << "+" << Integers[numberOfIntegers-1-j];
}
else
{
cout << "-" << Integers[numberOfIntegers-1-j];
}
}
else
{
if(Remainder==1)
{
cout << "-" << Integers[numberOfIntegers-1-j];
}
else
{
cout << "+" << Integers[numberOfIntegers-1-j];
}
}
}
break;
}
}
return 0;
}
```