# Sieve of Eratosthenes algorithm

I am currently reading "programming principles and practice using c++" in chapter 4 there is an exercise in which i need to make a program to calculate prime numbers between 1 and 100.

This is the program i came up with.

``````#include <vector>
#include <iostream>

using namespace std;

//finds prime numbers using Sieve of Eratosthenes algorithm
vector<int> calc_primes(const int max);

int main()
{
const int max = 100;

vector<int> primes = calc_primes(max);

for(int i = 0; i < primes.size(); i++)
{
if(primes[i] != 0)
cout<<primes[i]<<endl;
}

return 0;
}

vector<int> calc_primes(const int max)
{
vector<int> primes;

for(int i = 2; i < max; i++)
{
primes.push_back(i);
}

for(int i = 0; i < primes.size(); i++)
{
if(!(primes[i] % 2) && primes[i] != 2)
primes[i] = 0;
else if(!(primes[i] % 3) && primes[i] != 3)
primes[i]= 0;
else if(!(primes[i] % 5) && primes[i] != 5)
primes[i]= 0;
else if(!(primes[i] % 7) && primes[i] != 7)
primes[i]= 0;
}

return primes;
}
``````

Not the best or fastest, but i am still early in the book and dont know much about c++.

Now the problem, untill "max" is not bigger than 500 all the values print on the console, if "max" is bigger than 500 not everything gets printed.

Am i doing something wrong? Also any critiscism is greatly apreciated.

Os: Windows 7

-
This is not the sieve of Eratosthenes algorithm. You appear to be sieving only values divisible by 2, 3, 5 and 7 but what about values divisible by other primes? Hint: you shouldn't need modulo at all. en.wikipedia.org/wiki/Sieve_of_Eratosthenes –  UncleBens Dec 23 '09 at 19:37
could you please provide an example which compiles out of the box? –  anon Dec 23 '09 at 19:42
sure sorry my bad –  RaouL Dec 23 '09 at 19:44
Cf. Melissa O'Neill's case for what the sieve algorithm really is, and the Lambda the Ultimate discussion at lambda-the-ultimate.org/node/3127 –  Charles Stewart Dec 23 '09 at 20:18
@AndreyT: The title of the post is "Sieve of Eratosthenes algorithm". The code above does not implement the Sieve. –  jon-hanson Dec 24 '09 at 10:07

I have no idea why you're not getting all the output, as it looks like you should get everything. What output are you missing?

The sieve is implemented wrongly. Something like

``````vector<int> sieve;
vector<int> primes;

for (int i = 1; i < max + 1; ++i)
sieve.push_back(i);   // you'll learn more efficient ways to handle this later
sieve[0]=0;
for (int i = 2; i < max + 1; ++i) {   // there are lots of brace styles, this is mine
if (sieve[i-1] != 0) {
primes.push_back(sieve[i-1]);
for (int j = 2 * sieve[i-1]; j < max + 1; j += sieve[i-1]) {
sieve[j-1] = 0;
}
}
}
``````

would implement the sieve. (Code above written off the top of my head; not guaranteed to work or even compile. I don't think it's got anything not covered by the end of chapter 4.)

Return `primes` as usual, and print out the entire contents.

-
say i initialize max to 10000, it only prints ints from 8000 to 9000. –  RaouL Dec 23 '09 at 21:47
How are you checking this? Are you printing to a window? Some output may scroll off the top. –  David Thornley Dec 23 '09 at 22:03
i am printing to the console, with cout, the odd thing is that it starts printing at 8000. –  RaouL Dec 23 '09 at 22:15
with a new implementationof the sieve it prints everything fine :=) –  RaouL Dec 23 '09 at 22:51

Think of the sieve as a set.
Go through the set in order. For each value in thesive remove all numbers that are divisable by it.

``````#include <set>
#include <algorithm>
#include <iterator>
#include <iostream>

typedef std::set<int>   Sieve;

int main()
{
static int const max = 100;

Sieve   sieve;

for(int loop=2;loop < max;++loop)
{
sieve.insert(loop);
}

// A set is ordered.
// So going from beginning to end will give all the values in order.
for(Sieve::iterator loop = sieve.begin();loop != sieve.end();++loop)
{
// prime is the next item in the set
// It has not been deleted so it must be prime.
int             prime   = *loop;

// deleter will iterate over all the items from
// here to the end of the sieve and remove any
// that are divisable be this prime.
Sieve::iterator deleter = loop;
++deleter;

while(deleter != sieve.end())
{
if (((*deleter) % prime) == 0)
{
// If it is exactly divasable then it is not a prime
// So delete it from the sieve. Note the use of post
// increment here. This increments deleter but returns
// the old value to be used in the erase method.
sieve.erase(deleter++);
}
else
{
// Otherwise just increment the deleter.
++deleter;
}
}
}

// This copies all the values left in the sieve to the output.
// i.e. It prints all the primes.
std::copy(sieve.begin(),sieve.end(),std::ostream_iterator<int>(std::cout,"\n"));

}
``````
-
Sets are in Chapter 21. RaouL is working on Chapter 4. –  David Thornley Dec 23 '09 at 21:26

Interestingly, nobody seems to have answered your question about the output problem. I don't see anything in the code that should effect the output depending on the value of max.

For what it's worth, on my Mac, I get all the output. It's wrong of course, since the algorithm isn't correct, but I do get all the output. You don't mention what platform you're running on, which might be useful if you continue to have output problems.

Here's a version of your code, minimally modified to follow the actual Sieve algorithm.

``````#include <vector>
#include <iostream>

using namespace std;

//finds prime numbers using Sieve of Eratosthenes algorithm
vector<int> calc_primes(const int max);

int main()
{
const int max = 100;

vector<int> primes = calc_primes(max);

for(int i = 0; i < primes.size(); i++)
{
if(primes[i] != 0)
cout<<primes[i]<<endl;
}

return 0;
}

vector<int> calc_primes(const int max)
{
vector<int> primes;

// fill vector with candidates
for(int i = 2; i < max; i++)
{
primes.push_back(i);
}

// for each value in the vector...
for(int i = 0; i < primes.size(); i++)
{
//get the value
int v = primes[i];

if (v!=0) {
//remove all multiples of the value
int x = i+v;
while(x < primes.size()) {
primes[x]=0;
x = x+v;
}
}
}
return primes;
}
``````
-
``````void runEratosthenesSieve(int upperBound) {
int upperBoundSquareRoot = (int)sqrt((double)upperBound);
bool *isComposite = new bool[upperBound + 1];
memset(isComposite, 0, sizeof(bool) * (upperBound + 1));
for (int m = 2; m <= upperBoundSquareRoot; m++) {
if (!isComposite[m]) {
cout << m << " ";
for (int k = m * m; k <= upperBound; k += m)
isComposite[k] = true;
}
}
for (int m = upperBoundSquareRoot; m <= upperBound; m++)
if (!isComposite[m])
cout << m << " ";
delete [] isComposite;
}
``````
-
The problem specifically asks for the use of `vector<>`. –  David Thornley Dec 23 '09 at 21:27
Where? His implementation happens to use it, but I don't see anything specifically asking about vector<> in his question. –  Eric J. Dec 27 '09 at 0:11

In the code fragment below, the numbers are filtered before they are inserted into the `vector`. The divisors come from the vector.

I'm also passing the vector by reference. This means that the huge vector won't be copied from the function to the caller. (Large chunks of memory take long times to copy)

``````vector<unsigned int> primes;

void calc_primes(vector<unsigned int>& primes, const unsigned int MAX)
{
// If MAX is less than 2, return an empty vector
//    because 2 is the first prime and can't be placed in the vector.
if (MAX < 2)
return;

// 2 is the initial and unusual prime, so enter it without calculations.
primes.push_back(2);

for (unsigned int number = 3;
number < MAX;
number += 2)
{
bool  is_prime(true);
for (unsigned int index = 0;
index < primes.size();
++index)
{
if ((number % primes[k]) == 0)
{
is_prime = false;
break;
}
}
if (is_prime)
{
primes.push_back(number);
}
return;
}
``````

This not the most efficient algorithm, but it follows the Sieve algorithm.

-
The first comment says you are returning 2 as the first prime, but you are not. Why are you stopping short of MAX? –  Eric J. Dec 23 '09 at 20:27
Actually, the comment said that I am returning because #2 is the first prime and MAX is less than 2. –  Thomas Matthews Dec 23 '09 at 20:49

Here is a more efficient version for Sieve of Eratosthenes algorithm that I implemented.

``````#include <iostream>
#include <cmath>
#include <set>

using namespace std;

void sieve(int n){
set<int> primes;
primes.insert(2);
for(int i=3; i<=n ; i+=2){
primes.insert(i);
}

int p=*primes.begin();
cout<<p<<"\n";
primes.erase(p);

int maxRoot = sqrt(*(primes.rbegin()));

while(primes.size()>0){
if(p>maxRoot){
while(primes.size()>0){
p=*primes.begin();
cout<<p<<"\n";
primes.erase(p);
}
break;
}

int i=p*p;
int temp = (*(primes.rbegin()));
while(i<=temp){
primes.erase(i);
i+=p;
i+=p;
}
p=*primes.begin();
cout<<p<<"\n";
primes.erase(p);
}
}

int main(){
int n;
n = 1000000;
sieve(n);
return 0;
}
``````
-

try this code it will be useful to you by using java question bank

`import java.io.*;

class Sieve

{

public static void main(String[] args) throws IOException

{

int n=0,primeCounter=0;

double sqrt=0;

System.out.println(“Enter the n value:”);

sqrt=Math.sqrt(n);

boolean[] prime=new boolean[n];

System.out.println(“\n\nThe primes upto ” +n+ ” are:”);

for(int i=2;i

{

prime[i]=true;

}

for(int i=2;i<=sqrt;i++)

{

for(int j=i*2;j

{

prime[j]=false;

}

}

for(int i=0;i

{

if(prime[i])

{

primeCounter++;

System.out.print(i + ” “);

}

}

prime=new boolean[0];

}

}`

-

Here's my implementation not sure if 100% correct though : http://pastebin.com/M2R2J72d

``````#include<iostream>
#include <stdlib.h>

using namespace std;
void listPrimes(int x);

int main() {

listPrimes(5000);
}

void listPrimes(int x) {
bool *not_prime = new bool[x];
unsigned j = 0, i = 0;

for (i = 0; i <= x; i++) {
if (i < 2) {
not_prime[i] = true;
} else if (i % 2 == 0 && i != 2) {
not_prime[i] = true;
}
}

while (j <= x) {
for (i = j; i <= x; i++) {
if (!not_prime[i]) {
j = i;
break;
}
}
for (i = (j * 2); i <= x; i += j) {
not_prime[i] = true;
}
j++;
}

for ( i = 0; i <= x; i++) {
if (!not_prime[i])
cout << i << ' ';
}

return;
}
``````
-

below is my version which basically uses a bit vector of bool and then goes through the odd numbers and a fast add to find multiples to set to false. In the end a vector is constructed and returned to the client of the prime values.

``````std::vector<int>  getSieveOfEratosthenes ( int max )
{
std::vector<bool> primes(max, true);
int sz = primes.size();

for ( int i = 3; i < sz ; i+=2 )
if ( primes[i] )
for ( int j = i * i; j < sz; j+=i)
primes[j] = false;

std::vector<int> ret;
ret.reserve(primes.size());
ret.push_back(2);

for ( int i = 3; i < sz; i+=2 )
if ( primes[i] )
ret.push_back(i);

return ret;
}
``````
-
``````import java.io.BufferedReader;
import java.io.IOException;

public class exp {

private int size;
private boolean[] arr;
public exp(int a){
size = a;
arr = new boolean[size];
}
public void initialize(){
for(int i=2;i<size;++i)
arr[i] = true;

arr[0] = arr[1] = false;
}

public void precompute(){
int i=2;
while(i<size){
if(arr[i]){
for(int j=2*i; j<size; j=j+i)
arr[j] = false;
}
i++;
}
}
public String printX(int as){
int counter = 0;
String ans="",b = " ";
for(int i=0; i<size ; ++i){
if(arr[i]){
ans += String.valueOf(i) + b;
counter++;
}
if(counter == as)
break;
}
return ans;
}
public static void main(String[] args) throws NumberFormatException, IOException {

long a = System.currentTimeMillis();
exp e = new exp(50000);
e.initialize();
e.precompute();
long b = System.currentTimeMillis();

//System.out.println(b-a);
int t = Integer.parseInt(br.readLine());
int N;
for(int i=0;i<t;++i){