1

If you are given a list

numList = [1,2,3,4,5,6,7]

and you are asked to find the number of three sums that add to a particular number

target = 10

How you could come up with the answer?

For example, the combination of : [1,3,6], [1,2,7], [2,3,5], [1,4,5] would result in a return value of 4.

I know how to use a hashing based function to come up with the one three sum for the solution using the code below but am not sure how to add all unique three sum solutions.

def find3Numbers(A,arr_size,sum): 
    for i in range(0,arr_size-1): 
        #Find pair in subarray A[i+1..n-1]  
        # with sum equal to sum - A[i] 
        s = set() 
        curr_sum = sum - A[i] 
        for j in range(i+1,arr_size): 
            if (curr_sum - A[j]) in s: 
                print("Triplet is", A[i],  
                        ", ", A[j], ", ", curr_sum-A[j]) 
                return True
            s.add(A[j]) 

    return False
  • 2
    Looks like a homework question but itertools.combinations comes to mind here... – Jab Jan 17 at 3:46
  • 5
    Note: it is a bad idea to use variable or argument names that hide python's builtin types or functions (e.g. an argument called sum). – AChampion Jan 17 at 3:50
2

Using itertools.combinations

from itertools import combinations

numList = [1,2,3,4,5,6,7]

def check(value):
    return sum(value) == 10

filtered = list(filter(check, list(combinations(numList, 3))))
print(filtered)
#[(1, 2, 7), (1, 3, 6), (1, 4, 5), (2, 3, 5)]

Combinations finds all possible combinations, then I just filtered it down to only the ones that added up to 10

1

You just need to tweak your solution to count the solutions rather than returning after the first solution is found:

def find3Numbers(A,arr_size,sum):
    count_sums = 0

    for i in range(0,arr_size-1): 
        #Find pair in subarray A[i+1..n-1]  
        # with sum equal to sum - A[i] 
        s = set() 
        curr_sum = sum - A[i] 
        for j in range(i+1,arr_size): 
            if (curr_sum - A[j]) in s: 
                count_sums += 1 # Count here
            s.add(A[j]) 

    return count_sums # Finally return the count

Note this is not to say your algorithm is now correct. Moving on, you may want to use a counting set rather than a regular set for s. See collections.Counter.

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