# Why is the “f” required when declaring floats?

Example:

``````float timeRemaining = 0.58f;
``````

Why is the `f` is required at the end of the number?

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Probably, because otherwise it would be treated as `double`. –  Uwe Keim Jul 17 '12 at 9:35
0.58 (without the f suffix) is a literal of type double and one cannot assign a double value to a float, just like one cannot assign an int value to a string. However you can assign a float value to a double because here you are widening (C# will implicitly convert this for you as no precision will be lost). –  davenewza Jul 17 '12 at 9:40
possible duplicate of Why should we use literals in C#? –  AVD Jul 17 '12 at 9:42
@AVD Although this is a duplicate, the question title above doesn't yield your link in the possible duplicate list. So this may be adding value in terms of more search criteria at least. –  Adam Houldsworth Jul 17 '12 at 9:44
@AdamHouldsworth - all road goes to `double & int`. –  AVD Jul 17 '12 at 9:46

Your declaration of a float contains two parts:

1. It declares that the variable `timeRemaining` is of type `float`.
2. It assigns the value `0.58` to this variable.

The problem occurs in part 2.

The right-hand side is evaluated on its own. According to the C# specification, a number containing a decimal point that doesn't have a suffix is interpreted as a `double`.

So we now have a `double` value that we want to assign to a variable of type `float`. In order to do this, there must be an implicit conversion from `double` to `float`. There is no such conversion, because you may (and in this case do) lose information in the conversion.

The reason is that the value used by the compiler isn't really 0.58, but the floating-point value closest to 0.58, which is 0.57999999999999978655962351581366... for `double` and exactly 0.579999946057796478271484375 for `float`.

Strictly speaking, the `f` is not required. You can avoid having to use the `f` suffix by casting the value to a `float`:

``````float timeRemaining = (float)0.58;
``````
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Because there are several numeric types that the compiler can use to represent the value `0.58`: `float`, `double` and `decimal`. Unless you are OK with the compiler picking one for you, you have to disambiguate.

The documentation for `double` states that if you do not specify the type yourself the compiler always picks `double` as the type of any real numeric literal:

By default, a real numeric literal on the right side of the assignment operator is treated as double. However, if you want an integer number to be treated as double, use the suffix d or D.

Appending the suffix `f` creates a `float`; the suffix `d` creates a `double`; the suffix `m` creates a `decimal`. All of these also work in uppercase.

However, this is still not enough to explain why this does not compile:

``````float timeRemaining = 0.58;
``````

The missing half of the answer is that the conversion from the `double` `0.58` to the `float` `timeRemaining` potentially loses information, so the compiler refuses to apply it implicitly. If you add an explicit cast the conversion is performed; if you add the `f` suffix then no conversion will be needed. In both cases the code would then compile.

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but how can it be a double or a decimal if the variable is a float, I am missing something –  Blaz Art Jul 17 '12 at 9:41
@BlazArt Yes, the sentence that states the compiler doesn't even try to check the assignment target. The reason for this will be buried in the design choices made by the compiler team. I would guess it is best to be explicit in the face of possible confusion, or it was too expensive to bother implementing instead of just having two rules, one for `int` and one for `double`. –  Adam Houldsworth Jul 17 '12 at 9:42
@BlazArt: Just finished fleshing out the answer, please have a look again. –  Jon Jul 17 '12 at 9:44
The problem is that .NET, in order to allow some types of implicit operations to be carried out involving `float` and `double`, needed to either explicitly specify what should happen in all scenarios involving mixed operands or else allow implicit conversions between the types to be performed in one direction only; Microsoft chose to follow the lead of Java in allowing the direction which occasionally favors precision, but frequently sacrifices correctness and generally creates hassle.
In almost all cases, taking the `double` value which is closest to a particular numeric quantity and assigning it to a `float` will yield the `float` value which is closest to that same quantity. There are a few corner cases, such as the value 9,007,199,791,611,905; the best `float` representation would be 9,007,200,328,482,816 (which is off by 536,870,911), but casting the best `double` representation (i.e. 9,007,199,791,611,904) to `float` yields 9,007,199,254,740,992 (which is off by 536,870,913). In general, though, converting the best `double` representation of some quantity to `float` will either yield the best possible `float` representation, or one of two representations that are essentially equally good.
Note that this desirable behavior applies even at the extremes; for example, the best `float` representation for the quantity 10^308 matches the `float` representation achieved by converting the best `double` representation of that quantity. Likewise, the best `float` representation of 10^309 matches the `float` representation achieved by converting the best `double` representation of that quantity.
Unfortunately, conversions in the direction that doesn't require an explicit cast are seldom anywhere near as accurate. Converting the best `float` representation of a value to `double` will seldom yield anything particularly close to the best `double` representation of that value, and in some cases the result may be off by hundreds of orders of magnitude (e.g. converting the best `float` representation of 10^40 to `double` will yield a value that compares greater than the best `double` representation of 10^300.