# Ranges of floating point datatype in C?

I am reading a C book, talking about ranges of floating point, the author gave the table:

I dont know where the numbers in the columns Smallest Positive and Largest Value come from.

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They come from the range of the floating-point type. – Kendall Frey Apr 11 '12 at 14:34
The correct but useless answer would be "IEEE 754". – Jerry Coffin Apr 11 '12 at 14:35
Do you mean why are the limits those values? – GuyGreer Apr 11 '12 at 14:35
Is IEEE 754 required by the C standard? – foo Apr 11 '12 at 14:59
@foo, IEEE 754 formats are common and some books are prone not to make a difference between implementation characteristics and language required one and some people are prone not to pay attention when the book is clear that it shows characteristic of one or several common implementations that are not required by the language. – AProgrammer Apr 11 '12 at 15:14

These numbers come from the IEEE-754 standard, which defines the standard representation of floating point numbers. Wikipedia article at the link explains how to arrive at these ranges knowing the number of bits used for the signs, mantissa, and the exponent.

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A 32 bit floating point number has 23 + 1 bits of mantissa and an 8 bit exponent (-126 to 127 is used though) so the largest number you can represent is:

``````(1 + 1 / 2 + ... 1 / (2 ^ 23)) * (2 ^ 127) =
(2 ^ 23 + 2 ^ 23 + .... 1) * (2 ^ (127 - 23)) =
(2 ^ 24 - 1) * (2 ^ 104) ~= 3.4e38
``````
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Thanks, good catch! – Andreas Brinck Apr 11 '12 at 19:40

It's a consequence of the size of the exponent part of the type, as in IEEE 754 for example. You can examine the sizes with FLT_MAX, FLT_MIN, DBL_MAX, DBL_MIN in float.h.

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is these macros are C standard macros ? Why I am asking is INT_MAX and INT_MIN are available in limits.h. – finalsemester.co.in Jul 11 '14 at 19:55

As dasblinkenlight already answered, the numbers come from the way that floating point numbers are represented in IEEE-754, and Andreas has a nice breakdown of the maths.

However - be careful that the precision of floating point numbers isn't exactly 6 or 15 significant decimal digits as the table suggests, since the precision of IEEE-754 numbers depends on the number of significant binary digits.

• `float` has 24 significant binary digits - which depending on the number represented translates to 6-8 decimal digits of precision.

• `double` has 53 significant binary digits, which is approximately 15 decimal digits.

Another answer of mine has further explanation if you're interested.

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The values for the float data type come from having 32 bits in total to represent the number which are allocated like this:

1 bit: sign bit

8 bits: exponent p

23 bits: mantissa

The exponent is stored as `p + BIAS` where the BIAS is 127, the mantissa has 23 bits and a 24th hidden bit that is assumed 1. The exponent must be chosen so that that 24th bit is 1.

This means that the smallest number you can represent is `01000000000000000000000000000000` which is `1x2^-126 = 1.17549435E-38`.

The largest value is `011111111111111111111111111111111`, the mantissa is 2 * (1 - 1/65536) and the exponent is 127 which gives `(1 - 1 / 65536) * 2 ^ 128 = 3.40277175E38`.

The same principles apply to double precision except the bits are:

1 bit: sign bit

11 bits: exponent bits

52 bits: mantissa bits

BIAS: 1023

So technically the limits come from the IEEE-754 standard for representing floating point numbers and the above is how those limits come about

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