# SPOJ PRIME1 : TLE

I tried implementing the segmented sieve algorithm for this [question]:http://www.spoj.pl/problems/PRIME1/ as follows :

``````#include <iostream>
#include <string>
#include <set>
#include<math.h>
#include<vector>
#include<cstdlib>
#include<cstdio>
#include<cstring>
#include<cstdio>
#define MAX 32000 // sqrt of the upper range
using namespace std;
int base[MAX];  // 0 indicates prime

vector<int> pv;   // vector of primes

int mod (int a, int b)
{
if(b < 0)
return mod(-a, -b);
int ret = a % b;
if(ret < 0)
ret+=b;
return ret;
}
void sieve(){

for(int i = 2 ; i * i < MAX ; i++ )
if(!base[i])
for(int j = i * i ; j <  MAX ; j += i )
base[j] = 1;

for(int i = 2 ; i < MAX ; i++ )
if(!base[i]) pv.push_back(i);

}
int fd_p(int p ,int a ,int b){  // find the first number in the range [a,b] which is divisible by prime p

/*  while(1){

if(a % p == 0 && a !=p) break;
a++;
}
return a;
*/

if(a != p){
return (a + mod(-a,p)) ;

}
else{
return (a + p);
}

}
void seg_sieve(int a , int b){

if(b < 2 ){
cout << "" ;
return;
}
if(a < 2){
a = 2;
}
int i,j;
int seg_size  = b - a + 1;
int*is_prime = new int[seg_size];
memset(is_prime,0,seg_size*sizeof(int));

vector<int> :: iterator p ;

for(p = pv.begin(); p!=pv.end(); p++){
int x = fd_p(*p,a,b);

for(i = x; i <= b; i += *p )
is_prime[i - a] = 1;
}

for(i=0; i < b - a + 1; i++)
if(!is_prime[i])
printf("%u\n", i + a);

delete []is_prime ;
}

int main()
{
sieve();
int a,b,T;
scanf("%d",&T);

while(T--){
scanf("%d%d",&a,&b);
seg_sieve(a,b);
printf("\n");
}
//     cout<<endl;
//     system("PAUSE");
return 0;
}
``````

I am getting TLE nevertheless .. I don't understand what other optimization would be required . Plz help ..

Edit 1 :just tried to implement fd_p() in constant time ... [failure] .. plz if u could help me with this bug..

Edit 2:Issue Resolved.

-
See <a href="stackoverflow.com/questions/10249378/…;. –  user448810 Aug 17 '12 at 12:45

You can get the first number in the interval [a,b] that is divisible by p in constant time. Try to do that and I think you should be good to go.

-
plz see the edited code: [concept] let n = a + x be the desired number .. so we want n % p = 0 or (a + x) % p = 0 so [ans = (-a % p ) + a] –  spd Aug 17 '12 at 15:05
finally got it working .. Thanks.. –  spd Aug 19 '12 at 13:38

I have solved this problem many years ago. Assume, that n-m <= 100000 All you need to calculate all Primes between 1 and sqrt(1000000000) < 40000. Than manually test each number between n and m. This will be ehough

`````` program prime1;
Var
t:longint;
m,n:longint;
i,j,k:longint;
prime:array of longint;
bool:boolean;
begin
SetLength(prime,1);
prime[0]:=2;
for i:=3 to 40000
do begin
j:=0; bool:=true;
while (prime[j]*prime[j]<= i ) do begin
if (i mod prime[j] = 0) then begin
bool:=false;
break;
end;
inc(j);
end;
if (bool) then begin
SetLength(prime,length(prime)+1);
prime[length(prime)-1]:=i;
end;
end;
for k:=1 to t do begin
for i:=m to n do begin
if (i=1) then continue;
j:=0; bool:=true;
while (prime[j]*prime[j]<= i ) do begin
if (i mod prime[j] = 0) then begin
bool:=false;
break;
end;
inc(j);
end;
if (bool) then
writeln(i);
end;
writeln;
end;
end.
``````
-

You've left one last step of improvement to make. Work with the odds only.

We know that `2` is prime, and we know that no even (other than 2) is ever a prime. So there's no need to check them.

The sieve of Eratosthenes for odd primes is P = {3,5, ...} \ U {{p2, p2 + 2p, ...} | p in P}. Implementing that will be enough to get you through:

• Treat `2` specially, as a separate case. Work with arrays half the normal size, where the array entry at offset `i` represents an odd value `ao + 2*i` where `ao = a|1` is the least odd number not below `a`. That means that increment value of 2p corresponds to the increment of p in the offset in the array.
• The starting odd multiple of a prime `p` in the offset sieve array, equal to or above `p*p`, is `m = p*p >= ao ? p*p : ((ao+p-1)/p)*p; m = m&1 ? m : m+p;`, provided that `p <= sqrt_b`. The corresponding offset in the sieve array is `(m-ao)/2`.

As a side note, your naming is confusing: `is_prime` is actually `is_composite`.

-
hey thanks , but I got the code accepted by just making fd_p function run in constant time .. :) .. no need to treat 2 as a separate case.. but i will try to implement ur method as well . –  spd Aug 19 '12 at 13:37
ohh I see .. :) –  spd Aug 19 '12 at 16:47