# Query regarding binary numbers

I am reading a book on assembly languages. I came across these sentences in that book.

``````Consider the value “-64”. The eight bit two’s complement value for this number is
0C0h. The 16-bit equivalent of this number is 0FFC0h.
``````

I can't understand these two sentences. Can anybody show me how -64's eight bit 2's complement is 0c0h? And how the 16 bit equivalent is 0ffc0h? Please show me the calculation if possible. Thanks in advance.

-

+64 = %0100_0000
-64 = %1011_1111 + 1 = %1100_0000 = 0xC0
When you take an 8 bit signed 2's complement number and extend it to 16 bits, you must sign extend it (copy the sign bit into all of the new HO bits)

This makes -64 = %1111_1111_1100_0000 = 0xFFC0

-

It may help to picture a negative number as the subtraction of two positive numbers, such as "0 - 64".

Zero is just `00h` in 8 bits.

Subtract `1` and you'll get `FFh`.

Subtract `1` again and you'll get `FEh`.

Continue that pattern 62 more times and you'll be at `C0h`.

Try the pattern again in 16 bits, remembering that subracting one from `0000h` is `FFFFh`.

-

Integers in a CPU are represented using a fixed number of binary digits. For example, 64 expressed in binary using eight bits is `01000000`.

Generally, negative numbers are expressed in two's complement. To get the two's complement of a binary number, you first compute the one's complement of the positive number (which means, flip all the bits), then add one.

For example, to calculate the two's complement of -64, start with 64 in binary:

``````01000000 then flip all the bits to get one's complement
10111111 then add one, ignoring the final carry (i.e. overflow)
11000000
``````

`11000000` is `C0` in hex.

The same process can be carried out using 16-bits:

``````00000000 01000000 (64)
11111111 10111111 (one's complement of 64)
11111111 11000000 (one's complement of 64 plus one)
``````

`11111111 11000000` in hex is `FFC0`.

The reason two's complement is used for negative numbers is because it eliminates special cases. A negative number and a positive number can be added together normally, and the right answer will result. For example, -1 in 8-bit two's complement is `11111111`. Adding one to that correctly gives back zero (`11111111` + `00000001` = `00000000`), since there are not enough bits to hold the carry.

-

I'm going to use subscripts for bases rather than any programming language's syntax. First off, in positive numbers,

+6410 = +4016

The two's complement representation of a negative number is the bitwise complement of that number, plus 1. In 8 bits,

-(4016) = ~(4016) + 1 = BF16 + 1 = C016

as your book says. To get the 16-bit representation, you copy the highest bit of the 8-bit representation to all higher bits (this is called sign extension):

4016 = 004016
C016 = FFC016

You have to know from context whether sign extension or zero extension is appropriate. C016, without context, is ambiguous: it could be either -6410 or +19210. If the latter, it should be zero-extended to 00C016 rather than sign-extended to FFC016.

-