# Why should I use Integers when I could just use floats or doubles in C#? [closed]

Just learning C# at the moment.

I don't get why anyone would use Integers when they could use floats or doubles..

Floats will add/subtract whole numbers AND decimal numbers so why would anyone ever bother using a plain old integer?

Seems like floats or double will take care of anything that an Integer can do with the bonus of being able to handle . numbers too..

Thanks!

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You have a lot to learn about the downsides of floating point! Start with the classic What Every Computer Scientist Should Know About Floating-Point Arithmetict. –  David Schwartz Nov 26 '12 at 13:42
Calculations with integers are faster than with floating point numbers. –  Hans Kesting Nov 26 '12 at 13:49

## closed as not a real question by marc_s, Soner Gönül, Cory, Chris, Joris MeysNov 26 '12 at 16:26

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The main reason is the same reason we often prefer to use integer fractions instead of fixed-precision decimals. With rational fractions, (1/3) times 3 is always 1. (1/3) plus (2/3) is always 1. (1/3) times 2 is (2/3).

Why? Because integer fractions are exact, just like integers are exact.

But with fixed-precision real numbers -- it's not so pretty. If (1/3) is `.33333`, then 3 times (1/3) will not be 1. And if (2/3) is `.66666`, then (1/3)+(2/3) will not be one. But if (2/3) is `.66667`, then (1/3) times 2 will not be (2/3) and 1 minus (1/3) will not be (2/3).

And, of course, you can't fix this by using more places. No number of decimal digits will allow you to represent (1/3) exactly.

Floating point is a fixed-precision real format, much like my fixed-precision decimals above. It doesn't always follow the naive rules you might expect. See the classic paper What Every Computer Scientist Should Know About Floating-Point Arithmetic.

To answer your question, to a first approximation, you should use integers whenever you possibly can and use floating point numbers only when you have to. And you should always remember that floating point numbers have limited precision and comparing two floating point numbers to see if they are equal can give results you might not expect.

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As you can see in here the different types each have their own size.

For example, when working with big databases, an `int` or `float` may double up the required size.

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There are several reasons. Performance, memory, even the desire to not see decimals (without having to play with format strings).

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You have different datatypes because they use a different amount of bits to store data.

Typically an integer will use less memory than a double, that is why one doesn't just use the largest possible datatype.

http://en.wikipedia.org/wiki/Data_type

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In computing, floating point describes a method of representing an approximation to real numbers in a way that can support a wide range of values. Numbers are, in general, represented approximately to a fixed number of significant digits and scaled using an exponent.

In computer science, an integer is a datum of integral data type, a data type which represents some finite subset of the mathematical integers.

So, precision is one argument.

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There are several reasons. First off, like people have already said, double stores 64-bit numeric values, while int only requires 32-bit.

Float is a different case. Both int and float store 32-bit numbers, but float is less precise. A float value is precise up to 7 digits, but beyond that it is just an approximation. If you have larger numbers, or if there is some case where you purposefully want to force only integer values with no fractional numbers, int is the way to go. If you don't care about loss of precision and want to allow a wider range of values, you can use float instead.

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The primary reason for using integers is memory consumption and performance.

1. doubles are in most cases stored in a 64b memory blocks (compared to 32b for int)and use a somewhat complicated standard for representation (in some cases approximation of the real values)
2. complicated representation that requires calculation of mantis and exponent.
3. in most cases it requires use of dedicated coprocessor for floating point arithmetic
4. for integers complements and shifting can be used in order to speed up the arithmetic operations.
5. a number of use cases where it is more appropriate (natural) to use integers like for indexing arrays, loops, for getting reminder of the division, counting etc.

Also if you would need to do all of this using types for representing real numbers your code would be more more error prone.

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