# Why the absolute value of the max negative integer -2147483648 is still -2147483648?

The result of abs(-2147483648) is -2147483648, isn't it? it seems unacceptable.

``````printf("abs(-2147483648): %d\n", abs(-2147483648));
``````

output:

``````abs(-2147483648): -2147483648
``````
• I believe this is undefined behavior. I don't have the C standard handy, so I cannot back it up. – Alexandre C. Jun 28 '12 at 10:53
• What do you expect it to be, given that `abs(int)` returns an `int`? – Philip Kendall Jun 28 '12 at 10:55
• Latest draft of C11 says (7.21.6.1, about abs and friends) "If the result cannot be represented, the behavior is undefined" – Alexandre C. Jun 28 '12 at 10:58
• @PhilipKendall The absolute value can be a negative value? – Victor S Jun 28 '12 at 10:59
• linux man page says (man 3 abs): Trying to take the absolute value of the most negative integer is not defined. – Pat Jun 28 '12 at 11:07

The standard says about `abs()`:

The `abs`, `labs`, and `llabs` functions compute the absolute value of an integer `j`. If the result cannot be represented, the behavior is undefined.

And the result indeed cannot be represented because the 2's complement representation of signed integers isn't symmetric. Think about it... If you have 32 bits in an `int`, that gives you 232 distinct values from `INT_MIN` to `INT_MAX`. That's an even number of values. So, if there's only one 0, the number of values greater than 0 cannot be the same as the number of values less than 0. And so there's no positive counterpart to `INT_MIN` with a value of -`INT_MIN`.

So, what's unacceptable is calling `abs(INT_MIN)` on your platform.

Negative numbers are usually represented whit binary complement.

To convert positive to negative it is used logic

``````x -> not(x)+1
``````

For 8 bits arithmetic

01111111b is 127 and -127 becomes
10000000b + 1 = 10000001b

and to opposite direction -127 10000001b becomes
01111110b + 1 = 01111111b

-128 is 10000000b and there is no positive counterpart of it, because there is no 128 in 8 bits signed arithmetic.

10000000 -> 01111111 + 1 = 10000000 and -128 again

Same applies to original question

• that's why 0 and the minimum value are always the same after negating in two's complement – phuclv Jan 13 '14 at 2:25

Since 2147483648 is greater than `INT_MAX` on your implementation, then `abs(-2147483648)` is undefined.

This is code in abs.c in GNU glibc source code.

``````/* Return the absolute value of I.  */
int
DEFUN(abs, (i), int i)
{
return(i < 0 ? -i : i);
}
``````

So,abs(-2147483648) return -(-2147483648) . In x86,it is implement by this two instruction

``````movl    \$-2147483648, %eax
negl    %eax
``````

negl instruction is implemented by this way: num=0-num; sbb is implemented by this way: Subtracts the source from the destination, and subtracts 1 extra if the Carry Flag is set. So abs(-2147483648) (hex is 0x80000000 ) --> -(-2147483648) --> 0-(-2147483648) becomes (0x80000000) finally.

details of negl instruction,please visit http://zsmith.co/intel_n.html#neg

details of sbb instruction ,please visit http://web.itu.edu.tr/kesgin/mul06/intel/instr/sbb.html

Try this

``````printf("abs(-2147483648): %u\n", abs(-2147483648));
``````
• This, my friend, has undefined behavior. You're printing a signed integer with the unsigned formatter. I -1 because it moreover does not answer the question. – Alexandre C. Jun 28 '12 at 11:16