# What does ~0 do?

Does ~0 mean its flipping 000000000 to 1111111111?

``````printf("Check: %i", ~0);
``````

The printf results to -1, which is why I am confused.
Does -1 essentially mean the same thing as 11111111111111111 bits?

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first hit on google eskimo.com/~scs/cclass/int/sx4ab.html –  maazza Aug 31 '12 at 20:29

Does ~0 mean its flipping 000000000 to 1111111111?

Yes, it does.

Does -1 essentially mean the same thing as 11111111111111111 bits?

In 2s complement representation, it does.

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Okay thanks thanks, i appreciate it. –  Austin Truong Aug 31 '12 at 20:30
I'm used to someone beating me to the answer (slow typing here), but typically they don't grab nine upvotes too! A tip of the hat to you. –  Edwin Buck Aug 31 '12 at 20:35
@AustinTruong `~0` does not evaluate in `1111111111` unless `int` is internally only 10 bits. Same issue with second part. –  oldrinb Aug 31 '12 at 23:35
``````Does ~0 mean its flipping 000000000 to 1111111111?
``````

Yes, that's what it means.

``````printf("Check: %i", ~0);

The printf results to -1, which is why I am confused.
``````

That's because of 2's complement arithmetic, where we have conventionally accepted zero to be

``````000000000000
``````

and subtracting one from it requires a "borrow" that requires a borrow, and so on, until you "roll" the entire register

``````111111111111
``````

Logically, if you add "1" to that number, it will carry, and carry, and so on until it "rolls" in the opposite direction, yielding `000000000` again.

``````Does -1 essentially mean the same thing as 11111111111111111 bits?
``````

Yes, as long as you are using 2's complement signed integers.

---- Edited, to include details from cincutar's now deleted post (I wish he didn't delete it) ---

To see the same memory formatted as a (unsigned) hexadecimal number, use the command

``````printf("Check: %x", ~0);
``````

which will print the output

``````Check ffffffff
``````

``````11111111111111111111111111111111
``````
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It is due to the mathematical operation "two's complement". A nice video tutorial of two's complement can be found on youtube. Here's one of them :)

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`~0 == 0xFFFFFFFF`
where `0xFFFFFFFF`= 32 times 1 , which is -1 in 2's compliement representation
since `~` is a bitwise operation and turns zero to one in each bit:
``````~0b1010 == 0b0101