# Is there a way that my program can make subsets of any given size?

I have to make subsets of an array and add them individually ({1,2} = 1+2). If I get the result match with user input (con), the output will be YES or NO.

Now the problem I am facing is I don’t know how much size the user will input. If he/she puts in that the size of the array is 4, 4 loops will be needed. Is there any one my subset program works on every size of array?

``````#include <iostream>

using namespace std;
bool Check(int arr[], int size, int con)
{
for (int i = 0; i < size; i++)
{
if (arr[i] == con)
{
return true;
}
for (int j = i+1; j < size;j++)
{
if (arr[i]+arr[j] == con)
{
return true;
}
for (int k = j + 1; k < size; k++)
{
if (arr[i] + arr[j] + arr[k] == con)
{
return true;
}
for (int l = k + 1; l < size;l++)
{
if (arr[i] + arr[j] + arr[k] + arr[l] == con)
{
return true;
}
}
}
}
}
}

int main()
{
int size;
int con;
cout << "Enter desire size of array" << endl;
cin >> size;
cout << "ENter number" << endl;
cin >> con;
int *arr = new int[size];
for (int i = 0; i < size; i++)
{
cin >> *(arr + i);
}
if (Check(arr, size, con) == true)
{
cout << "YESSS!!";
}
else
{
cout << "NOOO!!";
}
}
``````
• You need to use recursion, or use a second array to store the current subset (i.e. the selected indices) and modify this array in a loop (but recursion is a way easier solution).
– Frax
Commented Sep 28, 2020 at 18:51
• what about size of array? Commented Sep 28, 2020 at 18:56
• (All three diff views fails to show the real change in revision 3.) Commented Mar 30, 2023 at 11:01

Here's a simple example of a recursive implementation of your function:

``````bool Check(int *arr, int size, int con, int curr_sum = 0)
{
for (int i = 0; i < size; i++)
{
int new_sum = curr_sum + arr[i];
if (new_sum == con
|| Check(arr + i, size - i, con, new_sum))
{
return true;
}
}
return false;
}
``````

Here's how it works...

We pass around a `curr_sum` parameter that holds the sum from the parent recursion. The current recursion will go through adding all of its indexes to it, looking for `curr_sum + arr[i] == con`. If it doesn't, then we'll take the new sum (`curr_sum + arr[i]`) and put it through another round of recursion starting on the index after the one we're currently looking at.

BEWARE: this is an O(n^2) implementation that you're working with, so it'll be extremely slow (and since this is recursion, liable to stack overflow) as you deal with larger sized arrays.