Write number as sum of given integers

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;
}
``````
-
Please search existing questions, since I remember seeing this problem several times before. –  Ben Voigt Mar 27 '13 at 19:09
Closely related to stackoverflow.com/q/6493120/103167 –  Ben Voigt Mar 27 '13 at 19:11
As Ben said, this (or similar) has been asked many times before. –  JBentley Mar 27 '13 at 19:11
I've seen all the examples you've posted, but I think thsi one is a little bit different. Almost every example is subset problem. This one is using all the numbers given and get the wanted number. Also i never really found example when you can subtract. –  Stefan4024 Mar 27 '13 at 19:19
Why are you converting the combination number to binary and dividing by 10 decimal? –  Thomas Matthews Mar 27 '13 at 19:25

Since this is typical homework, I'm not going to give the complete answer. But consider this:

``````K = +a[1] - a[2] - a[3] + a[4]
``````

can be rewritten as

``````a[0] = K
a[0] + a[2] + a[3] = a[1] + a[4]
``````

You now have normal subset sums on both sides.

-

So what you are worried about is you complexity .

Lets analyse what optimisations can be done.

Given n numbers in a[n] and target Value T;

And it is sure one combination of adding and subtracting gives you T ;

So Sigma(m*a[k]) =T where( m =(-1 or 1) and 0 >= k >= n-1 )

This just means ..

It can written as

(sum of Some numbers in array) = (Sum of remaining numbers in array) + T

8+15-2+9-10=20 can be written as

8+15+9= 20+10+2

So Sum of all numbers including target = 64 // we can cal that .. :)

So half of it is 32 as

Which if further written as 20+(somthing)=32 which is 12 (2+10) in this case.

Your problem can be reduced to Finding the numbers in an array whose sum is 12 in this case

So your problem now can be reduced as find the combination of numbers whose sum is k (which you can calculate as described above k=12 .) For Which the complexity is O(log (n )) n as size of array , Keep in mind that you have to sort array and use binary search based algo for getting O(log(n)).

So as complexity can be made from O(2^n) to O((N+1)logN)as sorting included.

-
How can I check which combination computes sum of 12? It reduces the time, which is obvious, but still not enough to check every combination. Anyway thank for helping me –  Stefan4024 Mar 30 '13 at 17:56
Let Sorted numbers are ..!! 1,2,8,9,10,12,14,21 Let suppose you need to compute sum of 25 A) Start to find the number less then or equal to Target (here 25) it is 21 here.. Repeat the step A for Target as (25-21) you cant find 4 or less so go to next number which is 14 Step A(11 as target 25-14) Step A(11 -10(as 10 is less then to 11 yo can find..)) Step A(target is 1) is found so Sum 25 that we can get with the ( 1, 10, 14) –  MissingNumber Mar 30 '13 at 21:43

This takes static input as you have provided and i have written using core java

``````  public static void main(String[] args) {

System.out.println("Enter number");

Scanner sc = new Scanner(System.in);

int total = 0;

while (sc.hasNext()) {

int[] array = new int[5] ;

for(int m=0;m<array.length;m++){
array[m] = sc.nextInt();
}

int res =array[0];
for(int i=0;i<array.length-1;i++){

if((array[i]%2)==1){
res = res - array[i+1];
}
else{
res =res+array[i+1];
}
}
System.out.println(res);
}
}
``````
-
Please don't answer C++ questions with Java code (or the other way around). It's also much better to give an explanation of what the code you've provided does and why/how it solves the asker's problem/question. –  Mat May 10 '13 at 8:10