# how to understand the code: to calculate the number of 1 in range(0:a)

I see a code that is used to calculate the total number of 1-bits in all integers in range(0,a).

``````int count(int a)
{
int sum = 0;
while(a)
{
sum +=1;
a = a & (a-1);
}
return sum;
}
long solve(int a)
{
if(a == 0) return 0 ;
if(a % 2 == 0) return solve(a - 1) + count(a) ;
return ((long)a + 1) / 2 + 2 * solve(a / 2) ;
}
``````

I can understand the count function, but really can not understand the recurrence in solve:

``````if (a%2 ==1)
solve(a) = (a+1)/2 + 2* solve(a/2)
``````

Is there anybody who can explain a bit it ? Thanks a lot.

-
Try single-stepping through the code in your favourite IDE/debugger. –  Paul R May 10 '12 at 15:09
possible duplicate of Finding the total number of set-bits from 1 to n –  BlueRaja - Danny Pflughoeft May 10 '12 at 15:35

Suppose you have the number `n = 2X+1` and you want to find

``````solve(n) = sum of count(i) for 0<=i<=n
``````

This is equal to:

``````solve(n) = sum of count(2j)+count(2j+1) for 0<=j<=X
``````

Since `count(2j+1) = count(2j)+1` and `count(2j) = count(j)`, you can simplify to:

``````solve(n) = sum of 2*count(2j)+1 for 0<=j<=X
= sum of 2*count(j)+1 for 0<=j<=X
= 2*(sum of count(j) for 0<=j<=X) + (sum of 1 for 0<=j<=X)
= 2*solve(X) + X + 1
= 2*solve(floor(n/2)) + (n+1)/2
``````

If `n` is even (and thus not of the form `2X+1`), you can use the formula
``````solve(n) = count(n) + solve(n-1)
which follows directly from the definition of `solve` as a sum above.