# Calculating algorithm complexity of 1 2 4 8 pattern

I need to calculate the complexity of this algorithm :

``````f=1;
x=2;

for(int i=1;i<=n;i*=2)
for(int j=1;j<=i*i;j++)
if(j%i==0)
for(int k=1;k<=j*i;k++)
f=x*f;
``````

I figured out the pattern and the summation of the inner loop which is i^2(i(i+1)/2) but I can't get the summation of this pattern along the series of (1 2 4 8 16 ...)

So, how can I find the summation of this series?

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Is this a homework? – svick May 3 '12 at 14:33
Smells like homework... – Anish Gupta May 3 '12 at 14:58

I'm not going to solve this for you (this looks like homework). But here is a hint to simplify the problem.

This code:

``````for(int j=1; j<=i*i; j++)
if(j%i==0)
// ... blah ...
``````

is equivalent to this code:

``````for(int j=i; j<=i*i; j += i)
// ... blah ...
``````
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thanks for your concern.. I understand what u mean .. my problem is in the math formula that I can user to do the summation of a serie of the form : 1 4 8 16 32 48 64 64 128 192 256 320 384 448 512 where n=8... as I said I figured out the formula of the inner series as n^2(n(n+1)/2) but I need the outer one.. – VEGA May 3 '12 at 22:47

Another hint for the outer `for(int i=1;i<=n;i*=2)`: after each execution of the body of the `for` loop, i is multiplied with 2:

1 · 2 · 2 · … · 2

And this is repeated as long as the condition is true:

1 · 2 · 2 · … · 2 ≤ n

We can also write the repeated multiplication of 2’s as follows:

2 · 2 · … · 2 = 2xn

The number of times that i is multiplied with 2, i. e. x, can be calculated with the logarithm to the base 2, i. e. log2(n):

2xn

With x = log2(n) it’s actually equal:

2log2(n) = n

Thus the `for` condition is floor(log2(n)) times true, so its complexity is Ο(log(n)), Ω(log(n)), and thus θ(log(n)).

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