# Why does C# allow dividing a non-zero number by zero in floating-point type?

Why C# allows:

``````1.0 / 0 // Infinity
``````

And doesn't allow:

``````1 / 0 // Division by constant zero [Compile time error]
``````

Mathematically, is there any differences between integral and floating-point numbers in dividing by zero?

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+1 good question. and in additional to other answers, this is why we only have `float/double.Is(Positive/Nagative)Infinity` while no `int.IsInfinity` methods. –  Danny Chen Nov 24 '10 at 1:59

According to Microsoft, "Floating-point arithmetic overflow or division by zero never throws an exception, because floating-point types are based on IEEE 754 and so have provisions for representing infinity and NaN (Not a Number)."

More on this here.

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Mathematically, there is no difference. With computers, however, only the standard IEEE-754 floating-point specification has special values for representing ±∞. Integers can only hold... integers :-)

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Floating point division is govered by IEEE754, which specifies that divide by zero should be infinity. There is no such standard for integer division, so they simply went with the standard rules of math.

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The IEEE Standard for Floating-Point Arithmetic (IEEE 754) is the most widely-used standard for floating-point computation, and is followed by many hardware and software implementations, including the C# compiler.

This means that any floating-point variable can contain strange creatures such as PositiveInfinity, NegativeInfinity, and Not-a-Number (abbreviated as NaN). Under the IEEE 754 arithmetic rules, any of these non-finite floating-point values can be generated by certain operations. For example, an invalid floating-point operation such as dividing zero by zero results in NaN.

In your specific example, you can see that C# (unlike VB) overloads the / operator to mean either integer or floating-point division. This means that the compiler works out whether to do integer or floating-point arithmetic based on the type of the numbers used.

There are also other interesting subtleties. And it's worth reading Eric Lippert's blog entry on the subject.

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