# Number of terms in this code series? [closed]

Given a C code

``````for(i=n,j=0 , i>0,i/=2 ,  j+=i)
``````

What is the value of j after termination of for loop?

In the solution in my book, it starts with:

``````j=n+n/2 +n/4+....+log n terms.
``````

Now I can understand how there are log n terms in the above series.

Any help appreciated, thanks.

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## closed as too localized by djechlin, Jack Maney, qrdl, Eitan T, Jonathan LefflerDec 8 '12 at 19:57

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That's not valid C code. –  melpomene Dec 8 '12 at 15:21
Sorry I forgot to end it with a semicolon. Now let me know the solution. –  Brite Roy Dec 8 '12 at 15:23
You need to add more than one semi-colon; so please correct your question till the C code is valid. –  Basile Starynkevitch Dec 8 '12 at 15:25

It is log2 n, that is the number of binary bits (or the rank of the highest 1 bit) in the binary representation of n

And you made a typo, you probably mean

`````` for(i=n,j=0 ; i>0 ;  (i/=2), (j+=i));
``````

So you start with `i==n` then you halve it till 0 is reached (hence the log2 n number of loops).

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By "binary bits" do you actually mean "binary bit digits"? –  Kerrek SB Dec 8 '12 at 15:22
Yes, bit is a binary digit, i.e. a digit in base 2 –  Basile Starynkevitch Dec 8 '12 at 15:24
Basile , please explain me how can we reach to log n base 2. I still cant get. Sorry for the trouble. –  Brite Roy Dec 8 '12 at 15:28
This is a sum of geometric series with log2n elements. The sum depends on your `n`, but in any case it's bounded by`2n`. Theory is here: http://en.wikipedia.org/wiki/Geometric_progression