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This code exemplifies the problem in a much simpler way (sorry for the previous one, it's too complicated). Anyway, note that out_b will print out correctly for any values of index between 0 to 958. The variable out_a, however, will always print out 36893488147419103232. And they're both of type DOUBLE. It looks like the + operation messes up the type of out_a. It won't work even if appendix is of type DOUBLE.

#include <stdio.h>
#include <stdlib.h>
#include <gsl/gsl_math.h>
#include <string.h>

double main (int argc, char *argv[]) {

    char *wrapper = "11111111111111111111111111111111111111111111111111111111111111111"; // 65 digits
    int appendix = atoi(argv[1]);

    int length = strlen(wrapper);

    double out_a = gsl_pow_int(2,length) + appendix;
    double out_b = gsl_pow_int(2,length + appendix);

    printf("%.0lf %.0lf\n", out_a, out_b);
}

Original question

This C program would compute the decimal equivalent to any binary input, as long as it's less than 64 digits... I fail to see why. Any help appreciated.

#include <stdio.h>
#include <stdlib.h>
#include <gsl/gsl_math.h>
#include <string.h>

long double main (int argc, char *argv[]) {

    char *wrapper = argv[1];

    static int *array, length, llo, i;
    static long double sum;

    while ( *wrapper && ( *wrapper == '0' ) ) wrapper++;

    length = strlen(wrapper);
    llo = length - 1;

    array = malloc((length*sizeof(*array))+1);

    for ( i = 0; i < length; i++ ) {
        if ( wrapper[i] >= '0' && wrapper[i] <= '1' ) {
            array[i] = wrapper[llo-i] - 48;
            sum += array[i] * gsl_pow_int(2,i);
        }

        else printf("Some error.\n");
    }

    free(array);

    printf("%.0Lf\n", sum);

}
share|improve this question
2  
Is there a specific section of the program you have a question about? –  Sam Dufel Jan 21 at 20:24
1  
Have you tried stepping through the code, line by line, in a debugger? –  Joachim Pileborg Jan 21 at 20:24
    
Can 2 raised to power 64 be stored in an integer variable? I am not so sure about this. –  Dinesh Jan 21 at 20:24
1  
Is your question "why does this work at all?" or "why does it fail when the input is larger than 64 bit?" ? –  Guntram Blohm Jan 21 at 20:25
    
My question is why does it fail for any binary inputs larger than 64 bit. I mean, the sum variable is double, the GSL power function returns a double... what gives? –  Edward Tigert Jan 21 at 21:44
show 1 more comment

3 Answers 3

Overall your code is ok, but:

  1. Return type of main should be int
  2. Don't really need array
  3. Should be if ( wrapper[llo-i] >= '0' && wrapper[llo-i] <= '1' ) {
  4. Initialze sum to 0

See: http://ideone.com/2ECduk

share|improve this answer
add comment

Regarding your question: I fail to see why. Any help appreciated.

Binary representation of an integer is shown as a series of 1s and 0s, each successively a higher power of 2.

eg: 10010 is equal to:

1      0       0       1       0    

(1*(2^4))+(0*(2^3))+(0*(2^2))+(1*(2^1))+(0*(2^0))
or: 16 + 0 + 0 + 2 + 0 or: 18

The section of code here: (from your example above)

for ( i = 0; i < length; i++ ) {//for each character in input (argv[1])
    if ( wrapper[llo-i] >= '0' && wrapper[llo-i] <= '1' ) {//test input for 1 or 0 (note llo-i correction)
        array[i] = wrapper[llo-i] - 48;//get next value into int array (note 48 is ascii value for 0)
                                       //results in placing either 1 or 0 into array[i]
        sum += array[i] * gsl_pow_int(2,i); //perform multiplication of appropriate power of 2 and add to sum
    }

    else printf("Some error.\n");
}

Just does the same thing. See comments to explain how.

share|improve this answer
    
Thanks, but I understand that bit. My problem is in figuring out why inputs larger than 64 bits will fail, given the sum variable is able to store the supposed result. –  Edward Tigert Jan 21 at 21:50
    
Perhaps this post will answer your questions. Please be more specific in phrasing your questions. –  ryyker Jan 21 at 22:21
add comment

The GSL man page for gsl_pow_int explicitly states that this function is used for computing small integer powers efficiently, by computing things like x^8 as ((x^2)^2)^2). Even though it returns a double, it doesn't have unlimited precision.

EDIT

To be honest, this code is overly complicated, does some unnecessary memory management, and invokes undefined behavior in at least one respect. Do me a favor and see if the following code doesn't give you the results you expect:

#include <stdio.h>
#include <stdlib.h>

int main( int argc, char **argv )
{
  if ( argc < 2 )
  {
    printf( "USAGE: %s binary-string\n", argv[0] );
    exit(0);
  }

  long double result = 0;
  char *p = argv[1];

  while ( *p == '0' || *p == '1' )
  {
    result *= 2;
    result += *p++ - '0';
  }

  if ( *p && *p != '0' && *p != '1' )
  {
    printf( "%s is not a valid binary string; "
            "found non-binary digit %c at position %zu\n",
      argv[1], *p, (p - argv[1]) + 1 );
  }
  else
  {
    printf( "Result: %Lf\n", result );
  }

  return 0;
}

EDIT2

Here are the results on my system at home, up to 127 bits; I don't see any obvious discontinuity:

john@marvin:~/Development/Prototypes/C/converter$ input=1; let len=$(echo $input | wc -c)-1; while [ $len -lt 128 ]; do   echo "$input ($len)";   ./converter $input;   input=$input"0";   let len=$(echo $input | wc -c )-1; done
1 (1)
Result: 1.000000
10 (2)
Result: 2.000000
100 (3)
Result: 4.000000
1000 (4)
Result: 8.000000
10000 (5)
Result: 16.000000
100000 (6)
Result: 32.000000
1000000 (7)
Result: 64.000000
10000000 (8)
Result: 128.000000
100000000 (9)
Result: 256.000000
1000000000 (10)
Result: 512.000000
10000000000 (11)
Result: 1024.000000
100000000000 (12)
Result: 2048.000000
1000000000000 (13)
Result: 4096.000000
10000000000000 (14)
Result: 8192.000000
100000000000000 (15)
Result: 16384.000000
1000000000000000 (16)
Result: 32768.000000
10000000000000000 (17)
Result: 65536.000000
100000000000000000 (18)
Result: 131072.000000
1000000000000000000 (19)
Result: 262144.000000
10000000000000000000 (20)
Result: 524288.000000
100000000000000000000 (21)
Result: 1048576.000000
1000000000000000000000 (22)
Result: 2097152.000000
10000000000000000000000 (23)
Result: 4194304.000000
100000000000000000000000 (24)
Result: 8388608.000000
1000000000000000000000000 (25)
Result: 16777216.000000
10000000000000000000000000 (26)
Result: 33554432.000000
100000000000000000000000000 (27)
Result: 67108864.000000
1000000000000000000000000000 (28)
Result: 134217728.000000
10000000000000000000000000000 (29)
Result: 268435456.000000
100000000000000000000000000000 (30)
Result: 536870912.000000
1000000000000000000000000000000 (31)
Result: 1073741824.000000
10000000000000000000000000000000 (32)
Result: 2147483648.000000
100000000000000000000000000000000 (33)
Result: 4294967296.000000
1000000000000000000000000000000000 (34)
Result: 8589934592.000000
10000000000000000000000000000000000 (35)
Result: 17179869184.000000
100000000000000000000000000000000000 (36)
Result: 34359738368.000000
1000000000000000000000000000000000000 (37)
Result: 68719476736.000000
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Result: 137438953472.000000
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Result: 274877906944.000000
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Result: 549755813888.000000
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Result: 1099511627776.000000
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Result: 2199023255552.000000
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Result: 4398046511104.000000
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Result: 8796093022208.000000
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Result: 17592186044416.000000
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Result: 35184372088832.000000
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Result: 70368744177664.000000
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Result: 5316911983139663491615228241121378304.000000
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1000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000 (127)
Result: 85070591730234615865843651857942052864.000000
share|improve this answer
    
Nah, that's not the reason. The function works perfectly fine until up to 2^1023. –  Edward Tigert Jan 21 at 22:47
    
@EdwardTigert: see my edit. The code you posted has some problems, and these may be responsible for your issues. –  John Bode Jan 21 at 23:36
    
it behaves exactly like mine. Try to input any binary longer than 64 digits and you'll see. –  Edward Tigert Jan 21 at 23:55
    
@EdwardTigert: attached a sequence of runs from 1 bit to 127; I don't see any obvious discontinuity. What hardware are you running on? –  John Bode Jan 22 at 5:46
    
Try to input 10000000000000000000000000000000000000000000000000000000000000000 and 10000000000000000000000000000000000000000000000000000000000000001 and you'll see. The outcome is the same. –  Edward Tigert Jan 22 at 6:24
show 1 more comment

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