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Here is my code for sieve of eratosthenes in C. It is giving me the following output.

2 3 5 7 11 13 17 19 23 25 31 35 37 41 43 47

My output include 25 and 35 also which are not prime numbers and it doesn't include 29.

Can anyone tell me where I am wrong.

#include<stdio.h>
#include<math.h>
int main()
{
    int i,a[50],b[50],j,n=0,s;
    for(i=0;i<50;i++)
        a[i] = 1;
    a[0]=a[1] = 0;

    for(i=2;i<50;i++)
        if(a[i])
            for(j=pow(i,2);j<50;j+=i)
                a[j] = 0;

    for(i=0;i<50;i++)
        if(a[i])
        {
            b[n] = i;
            n++;
        }

    for(j=0;j<n;j++)
        printf("%d\n",b[j]);
    return 0;
}
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closed as off-topic by πάντα ῥεῖ, sashoalm, jthill, this, Lundin Jun 9 '14 at 13:14

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "This question was caused by a problem that can no longer be reproduced or a simple typographical error. While similar questions may be on-topic here, this one was resolved in a manner unlikely to help future readers. This can often be avoided by identifying and closely inspecting the shortest program necessary to reproduce the problem before posting." – this, Lundin
If this question can be reworded to fit the rules in the help center, please edit the question.

2  
I cannot reproduce the error. Maybe you have different implementation of pow(). Try i*i instead. – Oswald Jun 9 '14 at 11:50
    
The same for me. Please specify compiler version and more environment details. – marol Jun 9 '14 at 11:53
    
And compile without optimization flags (if gcc) – marol Jun 9 '14 at 11:55
    
please specify the compiler – where_is_tftp Jun 9 '14 at 12:06
1  
Unrelated, but I would recommend using more descriptive variable names than a and b. – Teepeemm Jun 9 '14 at 12:30
up vote 6 down vote accepted

Compiled with gcc version 4.4.7 (Ubuntu/Linaro 4.4.7-2ubuntu1) your code returnes correct result. The issue is probably related to a compiler and to the pow() implementation.

Probably you have a naive implementation of pow that computes pow(x,y) as exp(y*log(x)). This is floating point arithmetic and it suffers from common floating point issues. This imply that result of pow(x,y) converted to integer will be truncated, because of double arithmetic log(x)*y and exponentiation that will return double value slightly smaller than integer x*y.

Change the code to

for( j = i * i; j < 50; j += i)
    a[j] = 0;

Additionally, we can iterate only until sqrt(n) because the second loop will only then be executed:

for( i = 2; i < sqrt(50); i++)
    if( a[i]) // if not marked
        /* mark starting from i*i because i*j for j<i
         * has been already marked when i was j */
        for( j = i * i; j < 50; j += i)
            a[j] = 0; 

related issue: code blocks power function is not working in c

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1  
2*i has already been marked as non prime when i was 2. Similarly for 3*i, 4*i, etc. It is sufficient to start at i*i. – Oswald Jun 9 '14 at 11:59
    
@bits_international Still this is no answer to SO problem. In fact we're dealing with some others issues than algorithmic ones. – marol Jun 9 '14 at 12:00
    
Yeah, the pow implementation of code blocks was the problem. Thanks for the link. – user1178323 Jun 9 '14 at 12:35
    
I am at your service, my good sir – where_is_tftp Jun 9 '14 at 17:17

As others have observed, the error is in the pow function. I cannot reproduce your error with the code you've shown, but when I roll my own ppow function:

double ppow(double a, double x)
{
    return exp(log(a) * x);
}

my list matches yours. I think standard-conforming implementations of pow should treat integer exponents as a special case that can take negative bases, so your pow seems to be non-conforming.

Instead of pow(i, 2), use i*i. That should be faster and you won't have to link to the maths library either.

share|improve this answer
    
Thank you, using i*i instead of pow(i,2) solved my problem but I can't still understand why pow(i,2) is giving me the wrong answer. – user1178323 Jun 9 '14 at 12:21
1  
pow works with floating-point numbers. They are not exact, even less so when they are the result of a calculation as in the ppow implementaion above. For ppow(20, 2) I get 399.9999999999999, for exmple, which upon conversion to int will become 399. You could probably get away with rounding: ppow(i, 2) + 0.5, but I recommend to use simple multiplication for integer powers, especially for simple ones like squares. – M Oehm Jun 9 '14 at 12:28
    
What is the difference between ppow() and pow(). – user1178323 Jun 9 '14 at 12:31
1  
pow is the power function of your maths library. ppow is the implementation of pow I used above. It is not a standard-conforming implementation, but I assume that the math library you use implements pow that way. I used ppow to show that your compiler's pow is probably broken. – M Oehm Jun 9 '14 at 12:37

I try to reproduce your output, but I can't.

OS info:

$ uname -a Linux 3.13.0-29-generic #53-Ubuntu SMP Wed Jun 4 21:00:20 UTC 2014 x86_64 x86_64 x86_64 GNU/Linux

Compiler info:

$ gcc --version gcc (Ubuntu 4.8.2-19ubuntu1) 4.8.2

Compile:

$ gcc sieve_of_eratosthenes.c -lm -o sieve_of_eratosthenes

Launch:

$ ./sieve_of_eratosthenes

2 3 5 7 11 13 17 19 23 29 31 37 41 43 47

share|improve this answer
    
Should be a comment, though. – marol Jun 9 '14 at 11:59
    
My rate doesn't allow me leave a comment. – Gluttton Jun 9 '14 at 12:04

When the pow function makes use of the floating-point unit on your processor, it might yield an exception.

When such exception occurs during the execution of this function, it might return an incorrect value.

This is probably the case on your system when you call pow(i,2) with i being equal to 5.

As a circumstantial evidence to support this conjecture, please note that every number (in the specified range of [0-49]) which is a multiple of 5 and a prime larger than 5, appears on your list of prime numbers.


Here is a piece of code for retrieving the exceptions that may have occurred as a result of a FP operation:

#include <fenv.h>
#include <stdio.h>

void print_fe_exceptions()
{
    printf("Exceptions raised:");
    if (fetestexcept(FE_DIVBYZERO)) printf(" FE_DIVBYZERO");
    if (fetestexcept(FE_INEXACT  )) printf(" FE_INEXACT  ");
    if (fetestexcept(FE_INVALID  )) printf(" FE_INVALID  ");
    if (fetestexcept(FE_OVERFLOW )) printf(" FE_OVERFLOW ");
    if (fetestexcept(FE_UNDERFLOW)) printf(" FE_UNDERFLOW");
    feclearexcept(FE_ALL_EXCEPT);
    printf("\n");
}

And here is the description of each exception:

FE_DIVBYZERO // Pole error occurred in an earlier floating-point operation
FE_INEXACT   // Inexact result: rounding was necessary to store the result of an earlier floating-point operation
FE_INVALID   // Domain error occurred in an earlier floating-point operation
FE_OVERFLOW  // The result of an earlier floating-point operation was too large to be representable
FE_UNDERFLOW // The result of an earlier floating-point operation was subnormal with a loss of precision
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