# Calculate the complexity

I want to calculate the complexity of a special case:

``````s = 0;
for(i = 0; i<=n; i*=2)
s=s+i;
``````

what ls the number of iterations here in the worst case???

thanks :)

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This appears to have infinite complexity because you've posted an infinite loop (assuming `n >= 0`). Each time through the loop, the value of `i` doubles. However, since it starts out at 0, it will stay at 0.

If the loop initialized `i` to 1 instead of 0, then `i` would take on increasing powers of 2 (20, 21, 22, 23, ...). It would exceed `n` after 1 + floor(log2(n)) iterations.

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I'm going to presume that your code actually is :

``````s = 0;
for(i = 1; i<=n; i*=2)
s=s+i;
``````

Now the questions is, given a value 'n' , how many times does the loop iterate? If I had to solve this I would try specific cases and then attempt a generalization (see how many times the loop iterates for specific values on n). Since, doubling is involved, why not play with multiples of 2?

It seems that the loop runs one more than the number of times we can double up 1 to get to 'n'. Or, in other words, one more than the number of times we can divide by 2 to get to 1. This is the definition of the logarithmic function - logarithm of a number n to the base b is how many times we can divide n by b to get to one (the floor value). So the number of iterations for your case will be 1+{log n}base 2. If instead of i*=2 you had i*=3, the number of iterations would be 1+{log(n)}base 3.

While figuring out the complexities we discard the constants, so your complexity would be log(n).

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