Given an array of length N. How will you find the minimum length
contiguous subarray 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]
.



Just go from left to right, and sum all the numbers, if the sum > S, then throw away left ones.
For your example, I think it is OR. Product is nothing different from sum, except for calculation. 


pseudocode:
I think that'll find the result with one pass through the array. There's a bit of detail missing there in the To find the Product subarray just substitute multiplication/division for addition/subtraction in the above algorithm 


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). 


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

