# conversion from binary to base 10 using floating point conversion

This is my first time posting.

So here is my problem, I don't understand the following example.

Binary representation: 01000000011000000000000000000000

`=+(1.11)base 2x 2^(128-127)` <-all questions refer to this line.

`=+(1.11)base 2 x2^1`

`=+(11.1) base 2`

`=+(1x21+1x20+1x2-1)=(3.5) base 10`

Questions: Where does the 128-127 come from?
Why is it 1.11?

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In single precision floating point format, the exponent bias is constant 127. And the particular bit pattern you gave encodes a float with 128 (1000000) as exponent:

``````0 10000000 11000000000000000000000
s exponent fraction
``````

First look at the sign (s) bit, it's 0. So it's a positive number.

Then you subtract the exponent bias from the exponent, which is where 128 - 127 comes from. This gives `1`.

Then we start adding the bits in the fraction together (`11000000000000000000000`):

``````1 + 0.5 + 0.25 + 0 + 0 + 0....
``````

Gives 1.75

Now we have 1(sign) * 2^1(exponent) * 1.75(fraction) = 2 * 1.75 = 3.5

Another example:

``````00111110101010101010101010101011
``````

Break it down:

``````0 01111101 01010101010101010101011
s exponent fraction
``````

Sign is 0, so it's Positive number again.

125 (01111101) exponent, subtract exponent bias from it: `125 - 127 = -2`

Decode the fraction `01010101010101010101011`

``````1 + 0 + 0.25 + 0 + 0.0625 + 0 + 0.015625 + 0 + 0.00390625 + 0 + 0.0009765625 + 0 + 0.000244140625 + 0 + 0.00006103515625 + 0 + 0.0000152587890625 + 0 + 0.000003814697265625 + 0 + 9.5367431640625e-7 + 0 + 2.384185791015625e-7 + 1.1920928955078125e-7
``````

This gives `1.3333333730697632` or so.

``````1(sign) * 2^-2(exponent) * 1.3333333730697632(fraction) = 0.25 * 1.3333333730697632 = 0.3333333432674408 =~ 0.3333333
``````
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Btw if you don't want to do fraction decoding by hand jsfiddle.net/jcnN7/1 –  Esailija Aug 13 '12 at 18:27

First of all, the very first thing you have to do is separate the fields (given IEEE 754 32-bit Floating Point encoding):

Sign bit: 0

Exponent bits: 10000000

Mantissa bits: 11000000000000000000000

The (128 - 127) is calculating the exponent by subtracting the exponent bias.

When converting from floating point to decimal, you subract the exponent bias. When converting the other way, you add it. The exponent bias is calculated as:

2^(k−1) − 1 where k is the number of bits in the exponent field.

``````2^(8 - 1) - 1 = 127
``````

The mantissa is 1.11 as base 2 (binary). The mantissa is composed of a fraction and has an implied leading 1. Hence, with 11000... in the mantissa bits, you have an implied leading one to give you 1.11

Had the mantissa bits been 1011, your value of the fraction would be 1.011

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This tutorial should give you a better understanding of floating points:

http://www.tfinley.net/notes/cps104/floating.html

The binary representation is broken down into 3 parts: 1 sign bit, 8 exponent bits, and 23 mantissa bits.

``````   0|10000000|11000000000000000000000
sign|exponent|       mantissa
``````

The sign bit is zero, meaning it is a positive number. The exponent (128), which is 127 greater than the actual value by definition, resolves to 1 (i.e. 128 - 127). The mantissa is 1.11 (the leading 1 is implied, again by definition). So therefore, we have

``````  01000000011000000000000000000000
= +(1.11)base 2 x 2^(128-127)
= (2^0 + 2^-1 + 2^-2) x 2^1
= 2^1 + 2^0 + 2^-1
= 2 + 1 + 0.5
= 3.5
``````
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I think that the rationale for having a bias (+127) in the exponent is that:

if you interpret the float as a 32bit integer, then you don't change the order.
That is

``````float a,b;
assert((a < b) == ((int)(a) < (int)(b)));
``````
• consequently, the sign bit comes first, then the exponent, then the mantissa
• consequently, the smallest positive float have a zero exponent
• consequently, 0.0 is encoded with all bits set to 0

You thus have to debias the exponent by subtracting 127...

EDIT: the inequality works for regular float, but not for NaN

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