I am making a program to prove Leibnitz method for computing PI.

(pi/4) = 1 - 1/3 + 1/5 - 1/7 + 1/9 - 1/11 + ...

I took a very interesting approach to this and I am just wondering if there is a much easier way to do this.

What I did was I made the variable `j`

the denominator. and the main idea was to have a counter start at -3 then go to Absolute value of -5 then -7 then absolute values of -9...so on. Do you think there is any way to make it smaller? Thanks :)

(To end the loop the teacher said to find the absolute difference and have that be < 1e-6)

```
public class Leibnitz
{
public static void main(String argv[])
{
double answer = (Math.PI) / 4; //answer
double numTheory = 1; //answer
double j = -3; //counts the Denominator
double piFrac; //extra variable for calc
int i = 0; //counts loop
System.out.print("How many iterations does it take to compute pi this series: ");
while (Math.abs(answer - numTheory) > 1e-6)
{
if (j % 4 == -1) //checks if number should be negative (5,9,... needs to be positive so -5 % 4 = -1, -9 % 4 = -1)
j = Math.abs(j);
piFrac = (1 / j); //fraction of pie
numTheory = numTheory + piFrac; //answer
if (j > 0) //makes counter a negative
j = -j;
j -= 2; //goes down by 2
i++; //counts how many times it goes thru the loop
}
System.out.println(i);
}
}
```