# What is the Big-O complexity of my code?

Given an array of integers, write a method which returns all unique pairs which add up to 100.

Example data:

``````sample_data = [0, 1, 100, 99, 0, 10, 90, 30, 55, 33, 55, 75, 50, 51, 49, 50, 51, 49, 51]
sample_output = [[1,99], [0,100], [10,90], [51,49], [50,50]]
``````

I was solving this problem this weekend and while my solution seems scalable and efficient, I wanted to determine what the worst case time complexity of my solution is?

Here's my solution:

``````def solution(arr)
res = []
h = Hash.new

# this seems to be O(N)
arr.each do |elem|
h[elem] = true
end

# how do I determine what Time complexity of this could be?
arr.each do |elem|
if h[100-elem]
h[100-elem] = false
h[elem] = false
res << [elem, 100-elem]
end
end
res
end
``````

If both the loops are O(N) each, and I add them up: O(N + N), this would equal O(2N) and taking the 2 to be a constant, can I assume my solution is O(N) ?

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That would be correct. –  screenmutt Dec 16 '13 at 16:11
I think your assumptions are basically correct. That is also assuming that elements can be negative (and over 100) for this to be meaningful - otherwise only de-duplicating the initial input has any scaling cost and everything else could be treated as fixed cost once you filled up all keys 0..100. Technically `h[elem] = true` is not `O(1)` (which a lot of people seem to assume) but `O(log(N))` so your overall complexity is probably `O(Nlog(N))` worst case - you 'd only see that if you pumped in arrays with millions of integers though –  Neil Slater Dec 16 '13 at 16:14
@NeilSlater You are incorrect. `h` is a hash map which search is linear time. Wiki –  screenmutt Dec 16 '13 at 16:24
@screenmutt: I don't see that in benchmarking. e.g. `array = (0..10000000).map { |x| SecureRandom.random_number( 2000000000 ) - 1000000000 }; Benchmark.bm { |bm| h = Hash.new; bm.report(:five) { 100000.times {|i| h[ array[i] ] = true } }; h = Hash.new; bm.report(:six) { 1000000.times {|i| h[ array[i] ] = true } } }` - in fact I see what I would expect for `O(Nlog(N))` - explain? –  Neil Slater Dec 16 '13 at 16:36
@NeilSlater can you shed some more light on why `h[elem] = true` might be `O(log(N))` ? My assumptions and understanding have been that it's `O(1)` like you mentioned. –  Jasdeep Singh Dec 16 '13 at 16:40
show 4 more comments

You are correct. Big-O of this code will be `O(n)` if you consider amortized runtime of hash search/insert.

If you take the true-worst case of hash search/insert (`O(n)`), then it will be `O(n^2)`.

See Wikipedia on Hash Tables

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