# What data type should I use to represent money in C#?

In C#, what data type should I use to represent monetary amounts? Decimal? Float? Double? I want to take in consideration: precision, rounding, etc.

The Decimal value type represents decimal numbers ranging from positive 79,228,162,514,264,337,593,543,950,335 to negative 79,228,162,514,264,337,593,543,950,335. The Decimal value type is appropriate for financial calculations requiring large numbers of significant integral and fractional digits and no round-off errors. The Decimal type does not eliminate the need for rounding. Rather, it minimizes errors due to rounding.

Neither `System.Single` (`float`) nor `System.Double` (`double`) are precise enough capable of representing high-precision floating point numbers without rounding errors.

• I've upvoted this, but I take issue with the final claim. It's not that float/double aren't precise enough - it's just that they use an inappropriate base for money. You could have a 512 bit floating binary point value with more actual precision than decimal - but it still wouldn't be appropriate because it couldn't represent decimal values such as 0.1 exactly. – Jon Skeet Jun 17 '09 at 18:43
• My mistake - I mixed meanings in my answer. I used "precise" in my final statement not to mean "mathematical precision" but rather to express that a rounded number (1 in this example) is "less precise" than (0.99999_) when the number assigned to the variable was in fact 0.9999_. Poor choice of words on my part... – Andrew Hare Jun 17 '09 at 18:46
• I still don't agree with your last line. I'd say: "Any floating point system that relies on a binary mantissa is incapable of representing all decimal hundredths as rational numbers. – Nosredna Jun 17 '09 at 18:52
• Nosredna, you are running into problems here because I think you have a misunderstanding of what "irrational" means. Irrationality is invariant over choice of base; an exact real value is either irrational or it isn't. Choice of base is irrelevant. The distinction you actually want to be making here has nothing to do with rationality but rather has to do with representation error. – Eric Lippert Jun 17 '09 at 20:13
• What you should be saying is that any finite floating point system with a binary mantissa is incapable of exactly representing all decimal hundredths. That is, without accruing representation error. For more analysis of basic issues in representation error in floating point arithmetic, you might want to see the series of articles I wrote on this topic: blogs.msdn.com/ericlippert/archive/tags/… – Eric Lippert Jun 17 '09 at 20:22

Use decimal and money in the DB if you're using SQL.

Decimal is the one you want.

In C#, the Decimal type actually a struct with overloaded functions for all math and comparison operations in base 10, so it will have less significant rounding errors. A float (and double), on the other hand is akin to scientific notation in binary. As a result, Decimal types are more accurate when you know the precision you need.

Run this to see the difference in the accuracy of the 2:

``````using System;
using System.Collections.Generic;
using System.Text;

namespace FloatVsDecimal
{
class Program
{
static void Main(string[] args)
{
Decimal _decimal = 1.0m;
float _float = 1.0f;
for (int _i = 0; _i < 5; _i++)
{
Console.WriteLine("float: {0}, decimal: {1}",
_float.ToString("e10"),
_decimal.ToString("e10"));
_decimal += 0.1m;
_float += 0.1f;
}