# -128 and 128 in 2's complement

In 2's complement, 0-127 is represented as 00000000 to 01111111. In case of negative numbers, we invert all bits in the unsigned representation and add 1 to get the 2's complement.

so -1 in 2's complement will be:

```
unsigned 1 =      00000001

invert all bits = 11111110

```

But for -128, if we follow the same steps:

```
unsigned 128 =    10000000

invert all bits=  01111111

```

so -128 and 128 have the same representation in 2's complement notation? Why isn't the range of 2's complement for 8 bits given as -127 to 128? In short, why is -128 preferred over representing unsigned 128 using the same number of bits?

• `8h` isn't preferred in anyway. Since the most significant bit is set, it is considered negative, plain and simple. Commented Jun 9, 2013 at 8:03

There is no "128" in a signed byte. The range is

• 0 to 127 : 128 values
• -1 to -128 : 128 values

Total 256 values, ie 2^8.

`0x80` could have been considered as -128, or +128. Wikipedia explanation is worth reading

The two's complement of the minimum number in the range will not have the desired effect of negating the number.

For example, the two's complement of −128 in an 8-bit system results in the same binary number. This is because a positive value of 128 cannot be represented with an 8-bit signed binary numeral. Note that this is detected as an overflow condition since there was a carry into but not out of the most-significant bit. This can lead to unexpected bugs in that an unchecked implementation of absolute value could return a negative number in the case of the minimum negative. The abs family of integer functions in C typically has this behaviour. This is also true for Java. In this case it is for the developer to decide if there will be a check for the minimum negative value before the call of the function.

The most negative number in two's complement is sometimes called "the weird number," because it is the only exception. Although the number is an exception, it is a valid number in regular two's complement systems. All arithmetic operations work with it both as an operand and (unless there was an overflow) a result.

Furthermore, right-shifting a signed integer would have the CPU propagate the MSb (bit 7) to the right, which would be against simple logic if `0x80` is +128, as, after only one shift, we would obtain `0xC0` which is a negative number (-64)... (while a right-shift from a positive number can, normally, never produce a negative result).

-128 is preferred over 128, because of sign bit convention. In signed number representation the most significant bit is considered as sign bit. If this bit is 1, the number is negative. In the representation of 128 and -128 (10000000) this bit is 1, so it means -128, not 128.

• And also representing the only zero in the set with anything but 0x0 would be kind of silly. Commented Jun 9, 2013 at 8:26
• Good short explanation. I think this answer combined with ring0's answer (with editing made by ollb) responds to my question appropriately. Upvoted. Thanks. Commented Jun 9, 2013 at 12:01

In order to keep the MSB as the sign bit