# Calculating PI java

I'm trying to write a programm, which will calculate PI, using BigDecimal, but it works incorrect. Could yu help me fix mistake, or if you know how to realise Gauss–Legendre algorithm in parallel programm give an example, please. Thanks a lot!

Here's my code:

``````   import java.math.BigDecimal;
import java.util.List;
import java.util.concurrent.ExecutorService;
import java.util.concurrent.Executors;
import java.util.concurrent.Future;

public class PI_Epta implements IParallelPiEx {

public static void main(String[] args) throws InterruptedException {
PI_Epta pe = new PI_Epta();
pe.calculatePi(0, 0);
}

@Override
public BigDecimal calculatePi(int numberOfThreads, int precision) {
BigDecimal PI = new BigDecimal(0.0);
for (int i = 0, n = 0; i < 1000000; n++, i += 2500) {
PiParallel counter = new PiParallel(i, i + 2499, n, PI);
Future<BigDecimal> task = es.submit(new PiParallel(i, i + 2499, n, PI));
}
try {
for (Future<BigDecimal> t : tasks) {
}
PI = PI.multiply(new BigDecimal(4));
System.out.println(PI);
// 3.14159265358979323846
} catch (Exception e) {
System.err.println(e);
}
es.shutdown();
return PI;
}
}

import java.math.BigDecimal;
import java.util.concurrent.Callable;

public class PiParallel implements Callable<BigDecimal> {

BigDecimal pi = new BigDecimal(0.0);

int s;
int f;
int n;

public PiParallel(int s, int f, int n, BigDecimal pi) {
this.s = s;
this.f = f;
this.n = n;
this.pi = pi;
}

@Override
public BigDecimal call() throws Exception {
for (; s < f; s++) {
BigDecimal bd = new BigDecimal((1.0 / (1.0 + 2.0 * s)));
bd= bd.multiply(new BigDecimal(((s % 2 == 0) ? 1 : (-1))));
}
return pi;
}
}
``````
-
Define your usage of the term "incorrect." –  MarsAtomic Dec 1 '13 at 0:13
It incorrectly counts the pi –  user3051506 Dec 1 '13 at 0:15
That holds true for every PI calculation program out there. –  TwoThe Dec 1 '13 at 0:20
it prints me 3.1431595480721799391020127717455423521641932893544435501098632812500. here 3-rd number is incorrect, hovewer i make 10000 iterations. When i made same programm, but using double it works right. –  user3051506 Dec 1 '13 at 0:23
Sanity Check: The Gauss–Legendre algorithm has a square root in each iteration. Where's your square root? –  Mysticial Dec 1 '13 at 1:03