# How to represent a negative number with a fraction in 2's complement?

So I want to represent the number -12.5. So 12.5 equals to:

001100.100

If I don't calculate the fraction then it's simple, -12 is:

110100

But what is -12.5? is it 110100.100? How can I calculate this negative fraction?

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With decimal number systems we are use to having a units, tens and hundreds columns, with unsigned binary numbers this becomes 1,2,4 etc 2 to the power of column number.

For example

2^2 (4), 2^1 (2), 2^0 (1).

In twos-complement the most significant bit (MSB) becomes negative. For a three bit number the rows would hold these values;

-4, 2, 1
0  0  1 => 1
1  0  0 => -4
1  0  1 => -4 + 1 = -3

The value of the bits held by a fixed-point (fractional) system is unchanged. Column values follow the same pattern as before, base (2) to a power, but with power going negative:

2^2 (4), 2^1 (2), 2^0 (1) . 2^-1 (0.5), 2^-2 (0.25), 2^-3 (0.125)

-1 will always be 111.000
-0.5 add 0.5 to it: 111.100

In your case 110100.10 is equal to -32+16+4+0.5 = -11.5. What you did was create -12 then add 0.5 rather than subtract 0.5.

What you actually want is -32+16+2+1+0.5 = -12.5 = 110011.1

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you can double the number again and again until it's negative integer or reaches a defined limit and then set the decimal point correspondingly.

-25 is 11100111, so -12.5 is 1110011.1

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