I want to calculate Big O of x++
in below algorithm.
for (int i = 2;i < n;i*=2)
for(int j = i;j < m;j*=j)
x++;
I think a lot about it, but I can't solve it. How can I solve it?
at most EDIT: more help to prove: lets change the variables :
the code will become:
now the runtime will be EDIT(2): the bound can become tighter(because we have if and if 


Obviously, the outer loop is O(log_{2}(n)) as i is doubled with each iteration from 2 until n exclusive. So:
So it requires at most log_{2}(n) iterations of the outer loop until The inner is a little tricky as the current value of i of the outer loop is used to initialize j of the inner loop. Additionally, j is multiplied with itself (i. e. j^{2}) with every iteration. So:
So it requires at most log_{2}(log_{j}(m)) iterations of the inner loop until the condition 





I have tried to deduce the order of growth complexity of your algorithm, in methodical way. Unfortunately, I couldn't do so with Nonetheless, I came up with a formula with a constant factor Your algorithm, according to my suggestion, should look like the following:
The solution is as follows: Meanwhile, I will attempt to find a solution fitting exactly your initial problem. 


m
orn
? – Oli Charlesworth Nov 30 '11 at 15:20m
. As soon asn
exceedsm
then the runtime won't increase. – Oli Charlesworth Nov 30 '11 at 15:23