In c ~ is 1's complement operator. This is equivalent to: ~a = -b + 1 So, a - ~b -1 = a-(-b + 1) + 1 = a + b – 1 + 1 = a + b

Can anyone explains this to me?

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Have you worked through a few simple examples for yourself ? Maybe try 'adding' a couple of 4-bit numbers this way, do that 3 or 4 times, explain it to yourself ? – High Performance Mark Mar 29 '14 at 18:47
Using a - -b is another way. – Bathsheba Mar 29 '14 at 18:50
This will only make sense after you understand two's complement numbers. – user3386109 Mar 29 '14 at 18:50
– anatolyg Mar 29 '14 at 18:50
The steps taken by that derivation are a bit odd. `a - ~b -1 = a-(-b + 1) + 1` is valid (and equals `a + b`), but it doesn't really make sense as a step. It looks sort of like it's substituting `~b = -b + 1` (which is incorrect) and sort of accidentally fixing it by changing the subtraction at the end to an addition. Very weird. – harold Mar 29 '14 at 19:07

From elementary school math we know

``````a = -(-a);
``````

From twos complement we know that

``````-a = (~a) + 1  (invert and add one)
``````

so we know that

``````a + b
= a - (-b)      elementary math
= a - (~b + 1)  twos complement
= a - (~b) - 1   distribute the negative (elementary math)
``````
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You are right that `~` is always 1's complement (aka bitwise not) in c. Where you are going wrong is this: C does not guarantee 2's complement for numbers. So all your calculations depend on using a major flavor of C.

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