# Sub array that produces a given sum and product

Given an array of length N. How will you find the minimum length contiguous sub-array of whose sum is S and whose product is P. For eg `5 6 1 4 6 2 9 7` `for S = 17, Ans = [6, 2, 9]` `for P = 24, Ans = [4 6]`.

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I'd just sort the numbers from highest to lowest and brute force it. –  Blender Apr 4 '11 at 6:00
If you sort the numbers, you'll lose the original ordering and as we need a contiguous sub-array, this is not possible. –  shreyasva Apr 4 '11 at 6:01
whose sum is S OR whose product is P? –  Jean-François Corbett Apr 4 '11 at 6:04
As a first attempt, brute force should be adequate without any sorting. In practice, it's going to O(N) is it not? AND/ OR don't appear to make it more interesting. –  Keith Apr 4 '11 at 6:06
Sorry, I didn't understand the question originally. You could traverse the array in a non-linear order, checking the highest numbers first, and then the lower (or vice-versa; set up some criterion for each case). –  Blender Apr 4 '11 at 6:10

Just go from left to right, and sum all the numbers, if the sum > S, then throw away left ones.

``````import java.util.Arrays;

public class test {
public static void main (String[] args) {
int[] array = {5, 6, 1, 4, 6, 2, 9, 7};
int length = array.length;
int S = 17;
int sum = 0;                       // current sum of sub array, assume all positive
int start = 0;                     // current start of sub array
int minLength = array.length + 1;  // length of minimum sub array found
int minStart = 0;                  // start of of minimum sub array found
for (int index = 0; index < length; index++) {
sum = sum + array[index];
// Find by add to right
if (sum == S && index - start + 1 < minLength) {
minLength = index - start + 1;
minStart = start;
}
while (sum >= S) {
sum = sum - array[start];
start++;
// Find by minus from left
if (sum == S && index - start + 1 < minLength) {
minLength = index - start + 1;
minStart = start;
}
}
}
// Found
if (minLength != length + 1) {
System.out.println(Arrays.toString(Arrays.copyOfRange(array, minStart, minStart + minLength)));
}
}
}
``````

For your example, I think it is OR.

Product is nothing different from sum, except for calculation.

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Tried your code with the input, does not work. –  shreyasva Apr 7 '11 at 12:22
@usercccd, apologize for my carelessness. Here is the fixed full version. –  Dante is not a Geek Apr 7 '11 at 13:32
Hey, your code does not work for {2, 6, 6, -2}. I think it only works for positive nos, Is this correct. I need an universal solution. –  shreyasva Apr 8 '11 at 4:00
I have stated in the comment that current sum of sub array, assume all positive. If this assumption is not valid, just fix that single line yourself. I suspect this is actually homework, otherwise, this assumption is pretty much fine. –  Dante is not a Geek Apr 8 '11 at 4:08

pseudocode:

``````subStart = 0;
Sum = 0
for (i = 0; i< array.Length; i++)
Sum = Sum + array[i];
if (Sum < targetSum) continue;
if (Sum == targetSum) result = min(result, i - subStart +1);
while (Sum >= targetSum)
Sum = Sum - array[subStart];
subStart++;
``````

I think that'll find the result with one pass through the array. There's a bit of detail missing there in the `result` value. Needs a bit more complexity there to be able to return the actual subarray if needed.

To find the Product sub-array just substitute multiplication/division for addition/subtraction in the above algorithm

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This won't find the minimum-length sub-array... –  Jean-François Corbett Apr 4 '11 at 6:23
@Jean-François Corbett: Why not? As the sub-array you've got the total of slides through the main array you should find all possible sub-arrays with the target total. you just keep the shotest one as the result. That's what i meant by `result - min(result, i - subStart +1)` –  Andrew Cooper Apr 4 '11 at 6:55
Aha... Gotcha. O, thou flexibile pseudocode syntax. –  Jean-François Corbett Apr 4 '11 at 16:43

Put two indices on the array. Lets call them i and j. Initially j = 1 and i =0. If the product between i and j is less than P, increment j. If it is greater than P, increment i. If we get something equal to p, sum up the elements (instead of summing up everytime, maintain an array where S(i) is the sum of everything to the left of it. Compute sum from i to j as S(i) - S(j)) and see whether you get S. Stop when j falls out of the array length.

This is O(n).

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This was for the subarray sum to be S AND product to be P. –  I J Apr 17 '12 at 21:40

You can use a hashmap to find the answer for product in O(N) time with extra space.

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