I am trying to impliment RSA encryption scheme. It goes something like this:

`encrypted data = ((message)^e) % n`

and `decrypted data = ((encrypted data)^d) % n`

I tried to implement this in c. Here is the code :

```
#include <stdio.h>
#include <stdlib.h>
#include <math.h>
int main(){
long int num = 3255859;
long int encrypt =(int)pow((double) num,3) % 33;
printf("%ld\n",encrypt);
return 0;
}
```

I compiled this using `gcc -Werror -g -o encrypt encrypt.c -lm`

This is the output I get = `-2`

, which is obviously wrong. When i try this code for smaller numbers, I get the right result. For eg:

when I set `num = 2`

, I get the right result which is `8`

I know I am either type casting wrong or I am running out of boundaries somewhere. I do need to use this code to encrypt large numbers like the one in the code above.

Could you please point out where I am going wrong.

Thanks

EDIT:

Ok as per suggestion from @Micael Oliver here is the modified code:

```
#include <stdio.h>
#include <stdlib.h>
#include <math.h>
int main(){
unsigned long long num = 3255859;
long long encrypt =(long long)pow((double) num,3) % 33;
printf("%llu\n",encrypt);
long long decrypt =(long long)pow((double) encrypt,7) % 33;
printf("%llu\n",decrypt);
return 0;
}
```

here is the output of this code :

```
Notra:Desktop Sukhvir$ gcc -Werror -g -o encrypt encrypt.c -lm
Notra:Desktop Sukhvir$ ./encrypt
18446744073709551608
18446744073709551614
```

which is obviously wrong as the 2nd outpt should have been 3255859

`long long`

, but only if you expect your numbers to remain under 2^63, positive or negative. – Michael Oliver Sep 29 '13 at 1:17`long long int`

. Usually people use just`long long`

. Also, if you only want positive numbers, use`unsigned long long`

. For`long long`

, you can use`%lld`

, and for the unsigned version use`%llu`

. – Michael Oliver Sep 29 '13 at 1:21`long long encrypt =(long long)pow((double) num,3) % 33;`

– Michael Oliver Sep 29 '13 at 1:23`pow`

returns a`double`

, which generally has only 15 digits of precision (reliably), even when a number might be larger than that. Then when you convert it to a`long long`

, you won't regain those digits you lost, so your mod might end up being wrong. – Michael Oliver Sep 29 '13 at 1:33