# Compute the complexity of the following Algorithm? [duplicate]

Compute the complexity of the following Algorithm?

I have the following code snippet:

``````i = 1;
while (i < n + 1) {
j = 1;
while (j < n + 1) {
j = j * 2;
}
i = i + 1;
}
``````

plz explain it in detail

I want to know the the steps to solve the problem so I can solve such problems

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## marked as duplicate by Holger Just, hopper, Josh Kelley, mustaccio, VerviousAug 19 '14 at 19:39

Inner loop takes `O(log(n))`, since `j` grows exponentially. Outer loop takes `O(n)` since `i` grows linearly. Hence the overall complexity is `O(n*log(n))`. – barak manos Aug 19 '14 at 16:11
@Jarod42: OP most likely meant `i<n+1`. – barak manos Aug 19 '14 at 16:12
@Jarod42: Haha, no, there's a minimum length for comments here :) – barak manos Aug 19 '14 at 16:15

``````i = 1;
while(i < n + 1){
j = 1;
While(j < n + 1){
j = j * 2:
}

i = i + 1;
}
``````

outer loop takes O(n) since it increments by constant.

``````i = 1;
while(i < n + 1){

i = i + 1;
}
``````

inner loop : j = 1, 2, 4, 8, 16, ...., 2^k
j = 2^k (k >= 0) when will j stops ?
when j == n,
log(2^k) = log(n)
=> k * lg(2) = lg(n) ..... so k = lg(n).

``````While(j < n + 1){

j = j * 2;
}
``````

so total O(n * lg(n))

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Since `j` grows exponentially, the inner loop takes `O(log(n))`.

Since `i` grows linearly, the outer loop takes `O(n)`.

Hence the overall complexity is `O(n*log(n))`.

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+1 for succinct, correct answer and proper use of math-words. – Conduit Aug 19 '14 at 16:17
@Conduit: Thanks :) ... What does succinct mean by the way? – barak manos Aug 19 '14 at 16:18
Thank you so much Barak manos , but go in more detail :p – sangeen Aug 19 '14 at 16:19
@sangeen: More details?? It's kinda hard considering the sheer size of your code... – barak manos Aug 19 '14 at 16:21
@sangeen: Sorry, but I don't think that this website is meant for people to provide other people with answers sufficient for full marks given to them by their teachers. I provided you with a basic answer (plus an up-vote to your question, by the way), and I think it is reasonable enough for you to do the rest of the job here. – barak manos Aug 19 '14 at 16:26

This one is similar to the following code :

``````for( int i = 1;i < n+1 ; i++){ // this loop runs n times
for(int j = 1 ; j<n+1 ; j=j*2){// this loop runs log_2(n)(log base 2 because it grows exponentially with 2)
//body
}
}
``````

Hence in Big-Oh notation it is O(n)*O(logn) ; i.e, O(n*logn)

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You can simply understand outer-loop(with `i`) because it loops exactly `n` times. (1, 2, 3, ..., n). But inner-loop(`j`) is little difficult to understand.

Let's assume that `n` is 8. How much it loops? Starting with `j = 1`, it will be increased as exponentially : 1, 2, 4, 8. When `j` is over 8, loop will be terminated. It loops exactly 4 times. Then we can think general-form of this problem...

Think of that sequence 1, 2, 4, 8, .... If `n` is 2^k (k is non-negative integer), inner-loop will take `k+1` times. (Because 2^(loop-1) = 2^k) Due to the assumption : `n = 2^k`, we can say that `k = lg(n)`. So we can say inner-loop takes `lg(n)+1` times.

When `n` is not exactly fit to 2^k, it takes one more time. (`[lg(n)]+1`) It's not a big deal with complexity though it has floor function. You can ingonre it this time.

So the total costs will be like this : `n*(lg(n)+1)`. If you are familiar with Big-O notation, it can be expressed as : `O(n lg n)`.

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+1 for details. – user1935024 Aug 19 '14 at 16:42
Oh I wrote this to slowly.... – Phryxia Aug 19 '14 at 16:43
It doesn't matter , at last you helped some people to understand. – user1935024 Aug 19 '14 at 16:43

You can proceed like the following:

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how cn * log(n+1) = O(n) ? – user1935024 Aug 19 '14 at 18:56
A small mistake, sorry. – Mohamed Ennahdi El Idrissi Aug 19 '14 at 19:04