After reading this question, I was intrigued by the fact that some answers offered optimization by running a loop with multiples of 2*3=6.

So I create a new function with the same idea, but with multiples of 2*3*5=30.

```
int check235(unsigned long n)
{
unsigned long sq, i;
if(n<=3||n==5)
return n>1;
if(n%2==0 || n%3==0 || n%5==0)
return 0;
if(n<=30)
return checkprime(n); /* use another simplified function */
sq=ceil(sqrt(n));
for(i=7; i<=sq; i+=30)
if (n%i==0 || n%(i+4)==0 || n%(i+6)==0 || n%(i+10)==0 || n%(i+12)==0
|| n%(i+16)==0 || n%(i+22)==0 || n%(i+24)==0)
return 0;
return 1;
}
```

By running both functions and checking times I could state that this function is really faster. Lets see 2 tests with 2 different primes:

```
$ time ./testprimebool.x 18446744069414584321 0
f(2,3)
Yes, its prime.
real 0m14.090s
user 0m14.096s
sys 0m0.000s
$ time ./testprimebool.x 18446744069414584321 1
f(2,3,5)
Yes, its prime.
real 0m9.961s
user 0m9.964s
sys 0m0.000s
$ time ./testprimebool.x 18446744065119617029 0
f(2,3)
Yes, its prime.
real 0m13.990s
user 0m13.996s
sys 0m0.004s
$ time ./testprimebool.x 18446744065119617029 1
f(2,3,5)
Yes, its prime.
real 0m10.077s
user 0m10.068s
sys 0m0.004s
```

So I thought, would someone gain too much if generalized? I came up with a function that will do a siege first to clean a given list of primordial primes, and then use this list to calculate the bigger one.

```
int checkn(unsigned long n, unsigned long *p, unsigned long t)
{
unsigned long sq, i, j, qt=1, rt=0;
unsigned long *q, *r;
if(n<2)
return 0;
for(i=0; i<t; i++)
{
if(n%p[i]==0)
return 0;
qt*=p[i];
}
qt--;
if(n<=qt)
return checkprime(n); /* use another simplified function */
if((q=calloc(qt, sizeof(unsigned long)))==NULL)
{
perror("q=calloc()");
exit(1);
}
for(i=0; i<t; i++)
for(j=p[i]-2; j<qt; j+=p[i])
q[j]=1;
for(j=0; j<qt; j++)
if(q[j])
rt++;
rt=qt-rt;
if((r=malloc(sizeof(unsigned long)*rt))==NULL)
{
perror("r=malloc()");
exit(1);
}
i=0;
for(j=0; j<qt; j++)
if(!q[j])
r[i++]=j+1;
free(q);
sq=ceil(sqrt(n));
for(i=1; i<=sq; i+=qt+1)
{
if(i!=1 && n%i==0)
return 0;
for(j=0; j<rt; j++)
if(n%(i+r[j])==0)
return 0;
}
return 1;
}
```

I assume I did not optimize the code, but it's fair. Now, the tests. Because so many dynamic memory, I expected the list 2 3 5 to be a little slower than the 2 3 5 hard-coded. But it was ok as you can see bellow. After that, time got smaller and smaller, culminating the best list to be:

2 3 5 7 11 13 17 19

With 8.6 seconds. So if someone would create a hardcoded program that makes use of such technique I would suggest use the list 2 3 and 5, because the gain is not that big. But also, if willing to code, this list is ok. Problem is you cannot state all cases without a loop, or your code would be very big (There would be 1658879 `ORs`

, that is `||`

in the respective internal `if`

). The next list:

2 3 5 7 11 13 17 19 23

time started to get bigger, with 13 seconds. Here the whole test:

```
$ time ./testprimebool.x 18446744065119617029 2 3 5
f(2,3,5)
Yes, its prime.
real 0m12.668s
user 0m12.680s
sys 0m0.000s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7
f(2,3,5,7)
Yes, its prime.
real 0m10.889s
user 0m10.900s
sys 0m0.000s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11
f(2,3,5,7,11)
Yes, its prime.
real 0m10.021s
user 0m10.028s
sys 0m0.000s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11 13
f(2,3,5,7,11,13)
Yes, its prime.
real 0m9.351s
user 0m9.356s
sys 0m0.004s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11 13 17
f(2,3,5,7,11,13,17)
Yes, its prime.
real 0m8.802s
user 0m8.800s
sys 0m0.008s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11 13 17 19
f(2,3,5,7,11,13,17,19)
Yes, its prime.
real 0m8.614s
user 0m8.564s
sys 0m0.052s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11 13 17 19 23
f(2,3,5,7,11,13,17,19,23)
Yes, its prime.
real 0m13.013s
user 0m12.520s
sys 0m0.504s
$ time ./testprimebool.x 18446744065119617029 2 3 5 7 11 13 17 19 23 29
f(2,3,5,7,11,13,17,19,23,29)
q=calloc(): Cannot allocate memory
```

PS. I did not free(r) intentionally, giving this task to the OS, as the memory would be freed as soon as the program exited, to gain some time. But it would be wise to free it if you intend to keep running your code after the calculation.

**BONUS**

```
int check2357(unsigned long n)
{
unsigned long sq, i;
if(n<=3||n==5||n==7)
return n>1;
if(n%2==0 || n%3==0 || n%5==0 || n%7==0)
return 0;
if(n<=210)
return checkprime(n); /* use another simplified function */
sq=ceil(sqrt(n));
for(i=11; i<=sq; i+=210)
{
if(n%i==0 || n%(i+2)==0 || n%(i+6)==0 || n%(i+8)==0 || n%(i+12)==0 ||
n%(i+18)==0 || n%(i+20)==0 || n%(i+26)==0 || n%(i+30)==0 || n%(i+32)==0 ||
n%(i+36)==0 || n%(i+42)==0 || n%(i+48)==0 || n%(i+50)==0 || n%(i+56)==0 ||
n%(i+60)==0 || n%(i+62)==0 || n%(i+68)==0 || n%(i+72)==0 || n%(i+78)==0 ||
n%(i+86)==0 || n%(i+90)==0 || n%(i+92)==0 || n%(i+96)==0 || n%(i+98)==0 ||
n%(i+102)==0 || n%(i+110)==0 || n%(i+116)==0 || n%(i+120)==0 || n%(i+126)==0 ||
n%(i+128)==0 || n%(i+132)==0 || n%(i+138)==0 || n%(i+140)==0 || n%(i+146)==0 ||
n%(i+152)==0 || n%(i+156)==0 || n%(i+158)==0 || n%(i+162)==0 || n%(i+168)==0 ||
n%(i+170)==0 || n%(i+176)==0 || n%(i+180)==0 || n%(i+182)==0 || n%(i+186)==0 ||
n%(i+188)==0 || n%(i+198)==0)
return 0;
}
return 1;
}
```

Time:

```
$ time ./testprimebool.x 18446744065119617029 7
h(2,3,5,7)
Yes, its prime.
real 0m9.123s
user 0m9.132s
sys 0m0.000s
```

`i < number`

is overkill. By definition, if a number`x = a * b`

, either`a`

or`b`

is`< int(sqrt(x))`

and the other is greater. So your loop should only need to go up to`int(sqrt(x))`

. – twalberg May 17 '13 at 14:28