# Finding average case complexity with probability

Lets say we have a string n, which can either be populated with "a"s or "b"s ex: n = "aaabbbab", "ababababab" and so on. and we define a function called

``````HalfA(n):
count a = 0;
for each i in n:
if n == 'a'
i++;
if i >= n.length/2
return true
return false
``````

and if n has a uniform distribution, what is the average case complexity of halfA. Intuitively, I believe it to be len(n) but I'm not sure how to show this. And suppose a is more probable than b, and its not a uniform distribution, how do I calculate the average case then?

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it's `len(n)`. in the absolute best case, every character is 'a'. In this case is would still be `O(len(n)/2) = O(len(n))` –  Cruncher Oct 21 at 14:22
Thanks. As I mentioned, I get that its len(n) but I'm not sure how to show it. What if it was not a uniform distribution, and p(a) = .8 and p(b) = .2 or something –  user65663 Oct 21 at 14:25
No matter which distribution you use, it will still take at least n/2 steps. And at most n steps. The distribution doesn't change much in this case. –  Cruncher Oct 21 at 14:26
A more interesting question, would be: "assume you have an infinite stream of characters, governed by distribution d. What is the time complexity to find n 'a's." Even in this case it's `O(n)` for all distributions(except for `p(a)=0`), but it's less intuitive –  Cruncher Oct 21 at 14:28
I agree that for best case, it doesnt matter what distribution it is, it'll take atleast n/2 steps to count n/2 times, but what about average case –  user65663 Oct 21 at 14:29
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Best case: n = "a*". This will take `len(n)/2` steps, so the best case is: `O(len(n))`
Worst case: n = "b*". This will take `len(n)` steps, because you have to go through the entire array. So worst case is `O(len(n))`
Average case is bounded by best case and worst case. That is, `O(len(n)) <= average case <= O(len(n))`. It follows that the average case complexity is `O(len(n))`