Dismiss
Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

# What is the equivalent of the Java BigDecimal class in C#?

`BigDecimal` is a class in the `java.math` package that has a lot of benefits for handling big numbers of a certain scale. Is there an equivalent class or data type in c# with this feature.

-

C# only has `BigInteger` built it (in .NET framework 4).

Is `decimal` enough precision for your task? It's a 128-bit number that can hold values in the range ±1.0 × 10−28 to ±7.9 × 1028.

-
The BigRational class is also on its way. Currently in beta. – Raheel Khan Aug 8 '12 at 20:57

Just recently I also needed an arbitrary precision decimal in C# and came across the idea posted here: http://stackoverflow.com/a/4524254/804614

I then completed the draft to support all basic arithmetic and comparison operators, as well as conversions to and from all typical numerical types and a few exponential methods, which I needed at that time.

It certainly is not comprehensive, but very functional and almost ready-to-use. As this is the result of one night coding, I can not assure that this thing is bug free or entirely exact, but it worked great for me. Anyway, I want to publish it here because I did not find any other way to use arbitrary precision decimals in C# without the need to include massive librarys (mostly not even .net, but wrappers to c++), which come with all kinds of unnecessary stuff.

The basic idea is to build a custom floating-point type with an arbitrary large mantissa using the BigInteger type of .NET 4.0 and a base 10 exponent (Int32).

I'm not entirely sure if this is the best spot to place this thing, but this is one of the top questions on SO about this topic and I really want to share my solution. ;)

``````using System;
using System.Numerics;

namespace Common
{
/// <summary>
/// Arbitrary precision decimal.
/// All operations are exact, except for division. Division never determines more digits than the given precision.
/// Based on http://stackoverflow.com/a/4524254
/// Author: Jan Christoph Bernack (contact: jc.bernack at googlemail.com)
/// </summary>
public struct BigDecimal
: IComparable
, IComparable<BigDecimal>
{
/// <summary>
/// Specifies whether the significant digits should be truncated to the given precision after each operation.
/// </summary>
public static bool AlwaysTruncate = false;

/// <summary>
/// Sets the maximum precision of division operations.
/// If AlwaysTruncate is set to true all operations are affected.
/// </summary>
public static int Precision = 50;

public BigInteger Mantissa { get; set; }
public int Exponent { get; set; }

public BigDecimal(BigInteger mantissa, int exponent)
: this()
{
Mantissa = mantissa;
Exponent = exponent;
Normalize();
if (AlwaysTruncate)
{
Truncate();
}
}

/// <summary>
/// Removes trailing zeros on the mantissa
/// </summary>
public void Normalize()
{
if (Mantissa.IsZero)
{
Exponent = 0;
}
else
{
BigInteger remainder = 0;
while (remainder == 0)
{
var shortened = BigInteger.DivRem(Mantissa, 10, out remainder);
if (remainder == 0)
{
Mantissa = shortened;
Exponent++;
}
}
}
}

/// <summary>
/// Truncate the number to the given precision by removing the least significant digits.
/// </summary>
/// <returns>The truncated number</returns>
public BigDecimal Truncate(int precision)
{
// copy this instance (remember its a struct)
var shortened = this;
// save some time because the number of digits is not needed to remove trailing zeros
shortened.Normalize();
// remove the least significant digits, as long as the number of digits is higher than the given Precision
while (NumberOfDigits(shortened.Mantissa) > precision)
{
shortened.Mantissa /= 10;
shortened.Exponent++;
}
// normalize again to make sure there are no trailing zeros left
shortened.Normalize();
return shortened;
}

public BigDecimal Truncate()
{
return Truncate(Precision);
}

private static int NumberOfDigits(BigInteger value)
{
// do not count the sign
//return (value * value.Sign).ToString().Length;
// faster version
return (int)Math.Ceiling(BigInteger.Log10(value * value.Sign));
}

#region Conversions

public static implicit operator BigDecimal(int value)
{
return new BigDecimal(value, 0);
}

public static implicit operator BigDecimal(double value)
{
var mantissa = (BigInteger) value;
var exponent = 0;
double scaleFactor = 1;
while (Math.Abs(value * scaleFactor - (double)mantissa) > 0)
{
exponent -= 1;
scaleFactor *= 10;
mantissa = (BigInteger)(value * scaleFactor);
}
return new BigDecimal(mantissa, exponent);
}

public static implicit operator BigDecimal(decimal value)
{
var mantissa = (BigInteger)value;
var exponent = 0;
decimal scaleFactor = 1;
while ((decimal)mantissa != value * scaleFactor)
{
exponent -= 1;
scaleFactor *= 10;
mantissa = (BigInteger)(value * scaleFactor);
}
return new BigDecimal(mantissa, exponent);
}

public static explicit operator double(BigDecimal value)
{
return (double)value.Mantissa * Math.Pow(10, value.Exponent);
}

public static explicit operator float(BigDecimal value)
{
return Convert.ToSingle((double)value);
}

public static explicit operator decimal(BigDecimal value)
{
return (decimal)value.Mantissa * (decimal)Math.Pow(10, value.Exponent);
}

public static explicit operator int(BigDecimal value)
{
return (int)(value.Mantissa * BigInteger.Pow(10, value.Exponent));
}

public static explicit operator uint(BigDecimal value)
{
return (uint)(value.Mantissa * BigInteger.Pow(10, value.Exponent));
}

#endregion

#region Operators

public static BigDecimal operator +(BigDecimal value)
{
return value;
}

public static BigDecimal operator -(BigDecimal value)
{
value.Mantissa *= -1;
return value;
}

public static BigDecimal operator ++(BigDecimal value)
{
return value + 1;
}

public static BigDecimal operator --(BigDecimal value)
{
return value - 1;
}

public static BigDecimal operator +(BigDecimal left, BigDecimal right)
{
}

public static BigDecimal operator -(BigDecimal left, BigDecimal right)
{
}

private static BigDecimal Add(BigDecimal left, BigDecimal right)
{
return left.Exponent > right.Exponent
? new BigDecimal(AlignExponent(left, right) + right.Mantissa, right.Exponent)
: new BigDecimal(AlignExponent(right, left) + left.Mantissa, left.Exponent);
}

public static BigDecimal operator *(BigDecimal left, BigDecimal right)
{
return new BigDecimal(left.Mantissa * right.Mantissa, left.Exponent + right.Exponent);
}

public static BigDecimal operator /(BigDecimal dividend, BigDecimal divisor)
{
var exponentChange = Precision - (NumberOfDigits(dividend.Mantissa) - NumberOfDigits(divisor.Mantissa));
if (exponentChange < 0)
{
exponentChange = 0;
}
dividend.Mantissa *= BigInteger.Pow(10, exponentChange);
return new BigDecimal(dividend.Mantissa / divisor.Mantissa, dividend.Exponent - divisor.Exponent - exponentChange);
}

public static bool operator ==(BigDecimal left, BigDecimal right)
{
return left.Exponent == right.Exponent && left.Mantissa == right.Mantissa;
}

public static bool operator !=(BigDecimal left, BigDecimal right)
{
return left.Exponent != right.Exponent || left.Mantissa != right.Mantissa;
}

public static bool operator <(BigDecimal left, BigDecimal right)
{
return left.Exponent > right.Exponent ? AlignExponent(left, right) < right.Mantissa : left.Mantissa < AlignExponent(right, left);
}

public static bool operator >(BigDecimal left, BigDecimal right)
{
return left.Exponent > right.Exponent ? AlignExponent(left, right) > right.Mantissa : left.Mantissa > AlignExponent(right, left);
}

public static bool operator <=(BigDecimal left, BigDecimal right)
{
return left.Exponent > right.Exponent ? AlignExponent(left, right) <= right.Mantissa : left.Mantissa <= AlignExponent(right, left);
}

public static bool operator >=(BigDecimal left, BigDecimal right)
{
return left.Exponent > right.Exponent ? AlignExponent(left, right) >= right.Mantissa : left.Mantissa >= AlignExponent(right, left);
}

/// <summary>
/// Returns the mantissa of value, aligned to the exponent of reference.
/// Assumes the exponent of value is larger than of reference.
/// </summary>
private static BigInteger AlignExponent(BigDecimal value, BigDecimal reference)
{
return value.Mantissa * BigInteger.Pow(10, value.Exponent - reference.Exponent);
}

#endregion

public static BigDecimal Exp(double exponent)
{
var tmp = (BigDecimal)1;
while (Math.Abs(exponent) > 100)
{
var diff = exponent > 0 ? 100 : -100;
tmp *= Math.Exp(diff);
exponent -= diff;
}
return tmp * Math.Exp(exponent);
}

public static BigDecimal Pow(double basis, double exponent)
{
var tmp = (BigDecimal)1;
while (Math.Abs(exponent) > 100)
{
var diff = exponent > 0 ? 100 : -100;
tmp *= Math.Pow(basis, diff);
exponent -= diff;
}
return tmp * Math.Pow(basis, exponent);
}

#endregion

public override string ToString()
{
return string.Concat(Mantissa.ToString(), "E", Exponent);
}

public bool Equals(BigDecimal other)
{
return other.Mantissa.Equals(Mantissa) && other.Exponent == Exponent;
}

public override bool Equals(object obj)
{
if (ReferenceEquals(null, obj))
{
return false;
}
return obj is BigDecimal && Equals((BigDecimal) obj);
}

public override int GetHashCode()
{
unchecked
{
return (Mantissa.GetHashCode()*397) ^ Exponent;
}
}

public int CompareTo(object obj)
{
if (ReferenceEquals(obj, null) || !(obj is BigDecimal))
{
throw new ArgumentException();
}
return CompareTo((BigDecimal) obj);
}

public int CompareTo(BigDecimal other)
{
return this < other ? -1 : (this > other ? 1 : 0);
}
}
}
``````
-
Excellent work! This comes in handy for my PI calculation endeavor. – vbocan Feb 21 '13 at 9:49
This is nice. One suggestion I might make is not to negate the mantissa in your unary `-` operator, instead to return a new `BigDecimal` with the negated mantissa, for immutablilty. Otherwise you might find that `BigDecimal x = 1.01, y = -x` has the undesired effect of `x == y == -1.01`. – jimbobmcgee Nov 27 '14 at 18:47
@jimbobmcgee First I thought you were right and was already editing the answer, but then I realized again that the `BigDecimal` is a struct. That means the argument into the unary operator is already a copy of the original which makes it impossible to accidentally modify it. – Gigo Nov 28 '14 at 17:25
@Gigo - noted and accepted. A quick `BigDecimal one = new BigDecimal(1, 0); BigDecimal minusOne = -one; (new { one, minusOne }).Dump("negation?");` in LINQPad confirms it. Good to learn something new, today! – jimbobmcgee Dec 1 '14 at 15:09
I think you need to do another `Normalize` whenever you `Truncate`, otherwise `1.000000005` after `Truncate(8)` is `1.0000000` and doesn't correctly equal `1`. – Nigel Touch Aug 21 '15 at 14:31

Well, apart from using third-party libraries with support of the BigDecimal (if they exist), there are no easy workarounds. The most easy way, as far as i am concerned is to take a decimal implementation( from mono for example) and to rewrite it using the BigInteger type. Internally, in mono's implementation, decimal type is composed from three integers. So i don't think that would be hard to implement. I am not sure about efficiency though. You should first however consider using standard decimal type as codeka mentioned.

-

Here's a C# library that does what you're looking for, and in some cases has additional functionality: http://www.fractal-landscapes.co.uk/bigint.html (or try it at http://web.archive.org/web/20110721173046/http://www.fractal-landscapes.co.uk/bigint.html).

For example, it has a square root function, which BigDecimal doesn't have:

``````PrecisionSpec precision = new PrecisionSpec(1024, PrecisionSpec.BaseType.BIN);
BigFloat bf = new BigFloat(13, precision);
bf.Sqrt();
Console.WriteLine(bf.ToString());
``````

Wikipedia has a list of other such libraries at http://en.wikipedia.org/wiki/Arbitrary-precision_arithmetic#Libraries

-
404: Library no longer available? – Shlomo Jul 10 '12 at 1:56
The link is dead, and archive.org doesn't keep the source code zip files. – kristianp Sep 8 '12 at 9:32
Please, can someone reupload the original for this? – Arlen Beiler Jun 29 '13 at 14:15

This may not have been an option when the question was originally posted, but one really easy way to use a `BigDecimal` in your C# code is to install the IKVM.NET package via NuGet:

``````PM> Install-Package IKVM
``````

Then do exactly as you would in Java:

``````using System;
using java.math;

namespace BigDecimalDemo
{
class Program
{
static void Main(string[] args)
{
int n = int.Parse(args[0]);
Console.WriteLine(Factorial(n));
}

static BigDecimal Factorial(int n)
{
return n == 1
? BigDecimal.ONE
: Factorial(n - 1).multiply(new BigDecimal(n));
}
}
}
``````

Depending on how far you go with IKVM there can be the occasional interop issue to stumble through but in my experience it usually works great for simple stuff like this.

-

# GitHub:

https://github.com/deveel/deveel-math

# Author GitHub:

Antonello Provenzano

• BigComplex
• BigDecimal
• BigMath
• Rational
• ...

# How to Install It

From the NuGet Package Management console, select the project where the library will be installed and type the following command

``````PM> Install-Package dmath
``````
-