How to calculate the maximum block length in C of a binary number

I want to reiterate the fact that I am not asking for direct code to my problem rather than wanting information on how to reach that solution.

I asked a problem earlier about counting specific integers in binary code. Now I would like to ask how one comes about counting the maximum block length within binary code.

I honestly just want to know where to get started and what exactly the question means by writing code to figure out the "Maximum block length" of an inputted integers binary representation.

Ex: Input 456 Output: 111001000 Number of 1's: 4 Maximum Block Length: ?

Here is my code so far for reference if you need to see where I'm coming from.

``````#include <stdio.h>

int main(void)
{
int integer; // number to be entered by user
int i, b, n;
unsigned int ones;
printf("Please type in a decimal integer\n"); // prompt
fflush(stdout);
scanf("%d", &integer); // read an integer

if(integer < 0)
{
printf("Input value is negative!"); // if integer is less than
fflush(stdout);

return;                  // zero, print statement
}
else{
printf("Binary Representation:\n", integer);
fflush(stdout);} //if integer is greater than zero, print statement

for(i = 31; i >= 0; --i) //code to convert inputted integer to binary form
{
b = integer >> i;
if(b&1){
printf("1");
fflush(stdout);
}
else{
printf("0");
fflush(stdout);
}
}
printf("\n");
fflush(stdout);
ones = 0; //empty value to store how many 1's are in binary code
while(integer)  //while loop to count number of 1's within binary code
{
++ones;
integer &= integer - 1;
}
printf("Number of 1's in Binary Representation: %d\n", ones); // prints number
fflush(stdout);                                           //of ones in binary code
printf("Maximum Block Length: \n");
fflush(stdout);
printf("\n");
fflush(stdout);
return 0;

}//end function main
``````
-
You've provided no information here to explain what you mean by "Maximum Block Length". Without a definition of the term, it's hard to explain how to get there. –  Ken White Sep 12 '12 at 2:48
Sorry, by "Maximum Block Length" I mean the greatest length of a block that a binary representation contains. Example: 187 is 10111011. Contains 3 blocks(the leftmost, the middle, and the rightmost). The LENGTHS of these blocks are 1, 3, and 2. Meaning that the maximum block length for this representation is 3. See where I'm getting at? –  user1664272 Sep 12 '12 at 2:50
No, I'm afraid not. How do you define the three blocks? I see one block of 8 bits, with a max block with of 1. Not sure what you're trying to define as a "block". –  Ken White Sep 12 '12 at 2:58
I think is talking about run length (ie how many consecutive 1 bits) and he is looking for the longest run 1's. –  James Sep 12 '12 at 3:02
By "block" I mean consecutive number within the binary code(Basically both lone and pair values of 1). So when I write 10111011, there is one "block" on the leftmost(the lone 1), another in the middle(the three 1s) and the rightmost(the pair of 1's). The "length" of these blocks are 1, 3, 2(just basically the number of one's within their respective "block"). I want to know how to go about forming an array to loop through the "blocks" and get their lengths in C as I am very new to it. Whew! Did that help? –  user1664272 Sep 12 '12 at 3:04

Assuming you are looking for the longest run of 1's.

Heres how you do it for 32bits. You should be able to extend this idea to arbitrarily long bitstreams.

``````int maxRunLen(uint32_t num) {
int count = 0;
int maxCount = 0;
while(num) {
if(num & 1) count++;
else {
if( count > maxCount) maxCount = count;
count = 0;
}
num >>=1;
}
if( count > maxCount) maxCount = count;
return maxCount;
}
``````

The idea is to test each bit in order to determine if it is a 1 or not. If it is 1, increment the count. Otherwise it is the end of a run and in this case check if the previous run is longer than any previous maximum run and reset the count.

The way to test a bit is using masking. In the above example the lowest order bit tested by

``````num & 1
``````

To test the next bit in the number you move all the bits 1 bit to the right which is called a shift. More explicitly in this a case a logical right shift (>>). Example bit pattern 0110 becomes 0011. This is done in the above example:

``````num >>= 1;
``````

Which is equivalent to:

``````num = num >> 1;
``````
-
Is there a way to alter this to keep it within one function(in my case the int main(void) function. –  user1664272 Sep 12 '12 at 3:14
@user1664272 yes, but you stated: "I honestly just want to know where to get started...". I can do it, but I think the exercise of you doing it will benefit you greater than me telling you. –  James Sep 12 '12 at 3:17
Oh jeez you're right. I jumped the gun on almost slacking, I apologize. Thank you for contributing though, this will help me greatly. Off to work! –  user1664272 Sep 12 '12 at 3:19
@user1664272 If you have specific questions on how it works, go ahead and ask. If you are happy with the answer you should accept it. –  James Sep 12 '12 at 3:26
Then could you please explain how it works? –  user1664272 Sep 12 '12 at 19:05

Try this:

``````int max_run_of_ones (unsigned x)
{
int max_run = 0;
int cur_run;

while (x != 0) {
// skip right-most zeros
while ((x & 1) == 0) {
x >>= 1;
}
// skip and measure right-most run of ones
cur_run = 0;
while ((x & 1) == 1) {
cur_run++;
x >>= 1;
}
if (cur_run > max_run) max_run = cur_run;
}
return max_run;
}
``````
-

From looking at your code, it looks like you want to know the count of the bits set. This is a guess...

Credit goes to Ratko Tomic for this. The guy is brilliant at bit operations.

```int countBits( int value )
{
int n = 0;

if( value )
{
do
{
n++;
} while( 0 != (value = value & (value - 1) ) );
}
return( n );
}
```
-
That's not exactly what he's looking for. If you have a binary representation of a number as 10110111011010. In that number, there are 5 "blocks", of length 1, 2, 3, 2, 1. So the max block length is 3. –  sharth Sep 12 '12 at 2:57

This should solve it in python, using string operations...

The main point of this is to help others with understanding what you're trying to accomplish.

``````import re

number = 500
binary_repr = bin(number)[2:]             # '111110100'
blocks = re.split(r'0+', binary_repr)     # ['11111', '1', '']
block_lengths = [len(x) for x in blocks]  # [5, 1, 0]
maximum_block_length = max(block_lengths) # 5
``````
-
I should mention that I must do this in C and I'm not very well experienced in coding. I can't interpret Python code at all, my apologies. –  user1664272 Sep 12 '12 at 3:08
That's fine, this is almost more for the people commenting than it is for you. James solution is more along what you're looking for I think. I only used python because it's simple to rapidly write functional code. –  sharth Sep 12 '12 at 3:09
No problem, I also forget that others look at this who may code in different languages. I'm more so happy that this is a topic that sparked some radical thinking, I feel like I contributed a worthwhile question :) –  user1664272 Sep 12 '12 at 3:13