# Find all subsets in an array

I need help with solving this ruby array question.

Get all the subsets of an array. Unique set only. No repeats of any number. `num_subset([1,2,3])` ==> result should be `[[], ["1"], ["1", "2"], ["1", "2", "3"], ["1", "3"], ["2"], ["2", "3"], ["3"]]`

``````def num_subset(arr)
holder =[]
order_subset = [[]]

(arr.length).times do |m|
arr.map do |n|
holder += [n]
order_subset << holder
end
holder =[]  # resets holder
arr.shift  # takes the first element out
end
order_subset
end
``````

My result ==> `[[], ["1"], ["1", "2"], ["1", "2", "3"], ["2"], ["2", "3"], ["3"]`. My problem is that I am missing one result `["1", "3"]`

Need some help pointing me to the right direction. Spent hours on this already. Do not use #combination short cut. I need to work this out manually.

• "Subsets of an array" does not make sense. "Subsets of a set" or "Sub-arrays of an array" would make sense. In other words, would `[1, 1, 2, 3]` be allowed as an argument? If it is, then would that be equivalent to `[1, 2, 3]`? If not, then what result would be expected?
– sawa
Nov 18 '13 at 12:17
• @sawa, it is a unique set only. no repeats. Nov 18 '13 at 12:31

``````a = [1, 2, 3]
arr = []

for i in 0..(a.length) do
arr = arr + a.combination(i).to_a
end

> arr
# [[], [1], [2], [3], [1, 2], [1, 3], [2, 3], [1, 2, 3]]
``````
• I know that already. Trying to working out the problem instead of using #combination short cut. Nov 18 '13 at 12:37
• @hken27 You didn't write that in the question. You should have.
– sawa
Nov 18 '13 at 12:38
• @Santosh Close, but yours is wrong. The `i` should start at `0`.
– sawa
Nov 18 '13 at 12:38
• @sawa, Thanks for pointing it out. I didnt notice the `[]` in the qs. It was not easily readable. Corrected my answer Nov 18 '13 at 16:06
• Having `[]` is the normal definition. Assuming otherwise should require special motivation. Readability should not matter. Good that you corrected it.
– sawa
Nov 18 '13 at 16:09

Looks like you're looking at a starting point somewhere in the array and then looking at all sub arrays from that starting point on, after which you move the starting point down. That way, you're missing the sub arrays with gaps. For `[1,2,3]`, the only sub array with a gap is `[1,3]`.

For example (ignoring `[]` since you've hardcoded that)

``````[(1),2,3,4] -> [1]
[(1,2),3,4] -> [1,2]
[(1,2,3),4] -> [1,2,3]
[(1,2,3,4)] -> [1,2,3,4]
[1,(2),3,4] -> [2]
[1,(2,3),4] -> [2,3]
[1,(2,3,4)] -> [2,3,4]
[1,2,(3),4] -> [3]
[1,2,(3,4)] -> [3,4]
[1,2,3,(4)] -> [4]
``````

So I'd expect your output for `[1,2,3,4]` to be `[[],[1],[1,2],[1,2,3],[1,2,3,4],[2],[2,3],[2,3,4],[3],[3,4],[4]]`.

You really need to rethink your algorithm. You could try recursion. Take the head of your array (`1`), construct all possible sub arrays of the tail (`[2,3]`), duplicate that, and prefix half of it with the head. Of course, to construct the sub arrays, you call the same function, all the way down to an empty array.

``````[1,2,3] ->
....[2,3] ->
........[3] ->
............[] ->
................# an empty array is its own answer
................[]
............# duplicating the empty array and prefixing one with 3
............[3], []
........# duplicating the result from the last step and prefixing half with 2
........[2,3], [2], [3], []
....# duplicating the result from the last step and prefixing half with 1
....[1,2,3], [1,2], [1,3], [1], [2,3], [2], [3], []
``````
• Yes, that is what I expect. Any thoughts? Nov 18 '13 at 12:29
• Yes, I am missing something in the algorithm that's why I need some help. If using ([1,2,3,4]) missing [1,3,4] , [2,4], etc Nov 18 '13 at 12:48

I have created a method to find all subsets of an array. I am using binary number to make iteration of array very less.

``````def find_subset(input_array)
no_of_subsets = 2**input_array.length - 1
all_subsets = []
expected_length_of_binary_no = input_array.length
for i in 1..(no_of_subsets) do
binary_string = i.to_s(2)
binary_string = binary_string.rjust(expected_length_of_binary_no, '0')
binary_array = binary_string.split('')
subset = []
binary_array.each_with_index do |bin, index|
if bin.to_i == 1
subset.push(input_array[index])
end
end
all_subsets.push(subset)
end
all_subsets
end
``````

Output of [1,2,3] would be

``````[[3], [2], [2, 3], [1], [1, 3], [1, 2], [1, 2, 3]]
``````

I believe this is the most rubyish solution to find combinations

``````a = [1,2,3]

p (0..a.length).collect { |i|
a.combination(i).to_a
}.flatten(1)

# [[], [1], [2], [3], [4], [1, 2], [1, 3], [1, 4], [2, 3], [2, 4], [3, 4], [1, 2, 3], [1, 2, 4], [1, 3, 4], [2, 3, 4], [1, 2, 3, 4]]
``````

My solution.

The basic idea over here is that subsets of an array are

Subsets of the array with one less element - let's call these old subsets

array of elements containing that one less element added each of the old subsets

For Example -

Subsets([1, 2, 3]) are -

Subsets([1, 2]) - old_subsets

Tack on 3 to each of old_subsets

``````def subsets(arr)
return [[]] if arr.empty?
old_subsets = subsets(arr.drop(1))
new_subsets = []
old_subsets.each do |subset|
new_subsets << subset + [arr.first]
end
old_subsets + new_subsets
end
``````

Recursive solution

``````def subsets(arr)
(l = arr.pop) ? subsets(arr).map{|s| [s,s+[l]]}.flatten(1) : [[]]
end
``````

or in a more descriptive way

``````def subsets(arr)
return [[]] if arr.empty?
last = arr.pop
subsets(arr).map{|set| [set, set + [last]]}.flatten(1)
end
``````