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How might I go about calculating PI in C# to a certain number of decimal places?

I want to be able to pass a number into a method and get back PI calculated to that number of decimal places.

public decimal CalculatePi(int places)
{
    // magic
    return pi;
}

Console.WriteLine(CalculatePi(5)); // Would print 3.14159

Console.WriteLine(CalculatePi(10)); // Would print 3.1415926535

etc...

I don't care about the speed of the program. I just want it to be as simple and easy to understand as it can be. Thanks in advance for the help.

share|improve this question
1  
Simple to understand in terms of programming, or in terms of math? – Egor Jul 26 '12 at 20:21
1  
en.wikipedia.org/wiki/… – Dani Jul 26 '12 at 20:22
2  
Take a look here: dotnetperls.com/pi There are sample methods that calculate pi to 20 places, however some limitations are discussed such as lack of precision – Robert H Jul 26 '12 at 20:22
    
@Egor programming. – Chev Jul 26 '12 at 20:24
Math.Round(Math.PI, places)

If you need more precision you will have trouble using the double data type as it supports a certain max. precision (which is provided by Math.PI).

share|improve this answer
    
Yes, you did answer the question, but no this was not what the question asker wanted ;-). – Toon Krijthe Jul 26 '12 at 20:25
    
This only lets me go to 15 places. – Chev Jul 26 '12 at 20:27
1  
Decimal always has 4 decimal places? Where did you get that idea? – Matt Burland Jul 26 '12 at 20:29
    
@AlexFord: Then you need to define the domain of your problem better. This method works for the two examples you give (5 and 10 d.p.) What is you maximum number of decimal places? – Matt Burland Jul 26 '12 at 20:34
1  
@usr: Yes, I know what decimal is for, but your comment is still nonsense. If I do this: decimal myPi = (decimal)Math.Round(Math.PI, 10); I get 3.1415926536. In other words, 10 decimal places in a decimal type. Go ahead and check the MSDN (msdn.microsoft.com/en-us/library/system.decimal.aspx) – Matt Burland Jul 26 '12 at 21:03

If you are satisfied with the number of digits provided by the native math library, then it is simple; just round to the desired number of digits. If you need more digits (dozens, or hundreds, or thousands), you need a spigot algorithm that spits out the digits one at a time. Jeremy Gibbons gives an algorithm which I implement twice at my blog, where you will find code in Scheme, C, Python, Haskell, Perl and Forth (but not C#, sorry).

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The easiest way is to store a large number of digits pi in a String constant. Then whenever you need n digits of precision, you just take a substring from 0 to n+2.

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First, assuming you want some arbitrary number of digits of pi, and we do not want to be confined with the precision of any of the various floating point numbers out there, let us define a Pi function as a string rather than any number type.

One of the coolest algorithms I found while searching for this technique is the Stanley Rabinowitz and Stan Wagon - Spigot Algorithm. It requires no floating point math, and is mostly an iterative method. It does require some memory for storing integer arrays in the intermediate calculations.

Without taking the time to streamline or clean the code here is an implementation of the algorithm (note the result does not add the decimal point).

Please be sure to cite the algorithm and this site if you intend to use this code for anything other than personal use.

C# Code

static public string CalculatePi(int digits)
{
    string result = "";
    digits++;

    uint[] x = new uint[digits*3+2];
    uint[] r = new uint[digits*3+2];

    for (int j = 0; j < x.Length; j++)
        x[j] = 20;

    for (int i = 0; i < digits; i++)
    {
        uint carry = 0;
        for (int j = 0; j < x.Length; j++)
        {
            uint num = (uint)(x.Length - j - 1);
            uint dem = num * 2 + 1;

            x[j] += carry;

            uint q = x[j] / dem;
            r[j] = x[j] % dem;

            carry = q * num;
        }
        if(i<digits-1)
            result += (x[x.Length-1] / 10).ToString();
        r[x.Length - 1] = x[x.Length - 1] % 10; ;
        for (int j = 0; j < x.Length; j++)
            x[j] = r[j] * 10;
    }

    return result;
}
share|improve this answer
    
Something goes wrong after about 30 digits - maybe an overflow. I'll look at a fix later. – nicholas Jul 26 '12 at 22:38
    
Any updates on this? I also see it start deviating from true pi around 30 digits. – Levitikon Dec 22 '13 at 18:22
    
@Levitikon, I have not looked at this for a while, and I kind of quit working on it after a different answer was accepted. I'll review it sometime this week to see if I can't find where it goes wrong. – nicholas Dec 23 '13 at 5:01
    
static public? Isn't it public static. – user3208848 Dec 5 '15 at 6:10
up vote 4 down vote accepted

After much searching I found this little snippet:

public static class BigMath
{
    // digits = number of digits to calculate;
    // iterations = accuracy (higher the number the more accurate it will be and the longer it will take.)
    public static BigInteger GetPi(int digits, int iterations)
    {
        return 16 * ArcTan1OverX(5, digits).ElementAt(iterations)
            - 4 * ArcTan1OverX(239, digits).ElementAt(iterations);
    }

    //arctan(x) = x - x^3/3 + x^5/5 - x^7/7 + x^9/9 - ...
    public static IEnumerable<BigInteger> ArcTan1OverX(int x, int digits)
    {
        var mag = BigInteger.Pow(10, digits);
        var sum = BigInteger.Zero;
        bool sign = true;
        for (int i = 1; true; i += 2)
        {
            var cur = mag / (BigInteger.Pow(x, i) * i);
            if (sign)
            {
                sum += cur;
            }
            else
            {
                sum -= cur;
            }
            yield return sum;
            sign = !sign;
        }
    }
}

It is working like a charm so far. You just have to add the System.Numerics library from the GAC to resolve the BigInteger type.

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1  
This will be faster if you don't use IEnumerable and ElementAt, but just provide ArcTan1OverX the number of iterations to make. – Dani Jul 27 '12 at 12:31

Same algorithm as nicholas but uses yield for lazy evaluation

    static public IEnumerable<uint> Pi()
    {
        uint[] x = new uint[short.MaxValue];
        uint[] r = new uint[short.MaxValue];

        for (int j = 0; j < short.MaxValue; j++)
            x[j] = 20;

        for (int i = 0; i < short.MaxValue; i++)
        {
            uint carry = 0;
            for (int j = 0; j < x.Length; j++)
            {
                uint num = (uint)(x.Length - j - 1);
                uint dem = num * 2 + 1;

                x[j] += carry;

                uint q = x[j] / dem;
                r[j] = x[j] % dem;

                carry = q * num;
            }

            yield return (x[x.Length - 1] / 10);

            r[x.Length - 1] = x[x.Length - 1] % 10; ;
            for (int j = 0; j < x.Length; j++)
            {
                x[j] = r[j] * 10;
            }                    
        }
    }

I used short.MaxValue as the upper bound for the number of places but that is because my machine is low on virtual memory. A better machine should be able to accommodate up to int.MaxValue.

The function can be called like so:

 class Program
{
    static void Main(string[] args)
    {
        foreach (uint digit in Calculator.Pi().Take(100))
        {
            Console.WriteLine(digit);
        }

        Console.Read();
    }
}
share|improve this answer
    
Well done. Thanks! I do love that yield :D – Chev Jan 5 '15 at 15:51

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