Is there a more efficient way to calculate pi?

Question

I started learning java yesterday. Since I know other programming languages, it's easier for me to learn Java. It's pretty cool, actually. I still prefer Python :) Anyhoo, I wrote this program to calculate pi based on the algorithm (pi = 4/1 - 4/3 + 4/5 - 4/7....) and I know there are more efficient ways of calculating pi. How would I go about doing this?

import java.util.Scanner;

public class PiCalculator
{
  public static void main(String[] args)
  {
    int calc;
    Scanner in = new Scanner(System.in);
    System.out.println("Welcome to Ori's Pi Calculator Program!");
    System.out.println("Enter the number of calculations you would like to perform:");
    calc = in.nextInt();
    while (calc <= 0){
      System.out.println("Your number cannot be 0 or below. Try another number.");
      calc = in.nextInt();
    }
    float a = 1;
    float pi = 0;
    while (calc >= 0) {
      pi = pi + (4/a);
      a = a + 2;
      calc = calc - 1;
      pi = pi - (4/a);
      a = a + 2;
      calc = calc - 1;
    }
    System.out.println("Awesome! Pi is " + pi);
  }
}

The result of this code, after 1,000,000 calculations is still 3.1415954. There HAS to be a more efficient way of doing this.

Thanks!

Answer 1

The most efficient way to calculate Pi in Java is to not calculate it at all:

System.out.println("Awesome! Pi is " + Math.PI);

Though your question isn't clear about this, my guess is that you are actually trying an exercise. In this case, you could try the Nilakantha series:

float pi = 3;
for(int i = 0; i < 1000000; i += 2) {
    pi += 4 / (float) (i * (i + 1) * (i + 2));
}

Even more efficient and accurate is Machin's formula:

float pi = 4f * (4f * Math.atan(5) - Math.atan(239)) / 5f;

Answer 2

Why not use Python’s generator expression to implement Leibniz formula for π (one liner :)) :

4*sum(pow(-1, k)/(2*k + 1) for k in range (10000))