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From C traps and pitfalls

If a and b are two integer variables, known to be non-negative then to test whether a+b might overflow use:

     if ((int) ((unsigned) a + (unsigned) b) < 0 )
        complain();

I didn't get that how comparing the sum of both integers with zero will let you know that there is an overflow?

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The answer you accepted is wrong... –  R.. Aug 7 '11 at 6:01
    
Oh okay, thanks for letting me know. –  Chankey Pathak Aug 7 '11 at 6:21
    
possible duplicate of Best way to detect integer overflow in C/C++ –  pmr May 12 '13 at 16:08
1  
^This was asked ~2 years ago –  Mohammad Ali Baydoun May 12 '13 at 22:14

6 Answers 6

up vote 11 down vote accepted

The code you saw for testing for overflow is just bogus.

For signed integers, you must test like this:

if (a^b < 0) overflow=0; /* opposite signs can't overflow */
else if (a>0) overflow=(b>INT_MAX-a);
else overflow=(b<INT_MIN-a);

Note that the cases can be simplified a lot if one of the two numbers is a constant.

For unsigned integers, you can test like this:

overflow = (a+b<a);

This is possible because unsigned arithmetic is defined to wrap, unlike signed arithmetic which invokes undefined behavior on overflow.

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1  
Note that the first test is not necessary for correctness. –  caf Aug 7 '11 at 6:15
    
Don't you have to special case when a is INT_MIN and -INT_MIN is an overflow? –  Jens Gustedt Aug 7 '11 at 7:02
    
@caf: Good point. Thanks. –  R.. Aug 7 '11 at 7:07
    
@Jens: Why? a is never negated. You're testing to see if a+b will overflow. If a is positive, INT_MAX-a cannot overflow. If a is negative or zero, INT_MIN-a cannot overflow. –  R.. Aug 7 '11 at 7:09
    
right, somehow I always thought of a-b as a + (-b) but which in this case, isn't. –  Jens Gustedt Aug 7 '11 at 7:36

When an overflow occurs, the sum exceeds some range (let's say this one):

-4,294,967,295 < sum < 4,294,967,295

So when the sum overflows, it wraps around and goes back to the beginning:

4,294,967,295 + 1 = -4,294,967,295

If the sum is negative and you know the the two numbers are positive, then the sum overflowed.

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1  
BTW, that's assuming your integers are unsigned. Read the Wikipedia article (yes, one exists...) on them: en.wikipedia.org/wiki/Integer_overflow –  Blender Aug 7 '11 at 5:00
2  
That's an interesting 33-bit integer you've got there... –  Chris Lutz Aug 7 '11 at 5:53
1  
If your integers are unsigned, the sum is never "negative"... This is not a valid test. –  R.. Aug 7 '11 at 5:55

If the integers are unsigned and you're assuming IA32, you can do some inline assembly to check the value of the CF flag. The asm can be trimmed a bit, I know.

int of(unsigned int a, unsigned int b)
{
        unsigned int c;

        __asm__("addl %1,%2\n"
                "pushfl \n"
                "popl %%edx\n"
                "movl %%edx,%0\n"
                :"=r"(c)
                :"r"(a), "r"(b));

        return(c&1);
}
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If a and b are known to be non negative integers, the sequence (int) ((unsigned) a + (unsigned) b) will return indeed a negative number on overflow.

Lets assume a 4 bit (max positive integer is 7 and max unsigned integer is 15) system with the following values:

a = 6

b = 4

a + b = 10 (overflow if performed with integers)

While if we do the addition using the unsigned conversion, we will have:

int((unsigned)a + (unsigned)b) = (int) ((unsigned)(10)) = -6

To understand why, we can quickly check the binary addition:

a = 0110 ; b = 0100 - first bit is the sign bit for signed int.

0110 +
0100
------
1010

For unsigned int, 1010 = 10. While the same representation in signed int means -6.

So the result of the operation is indeed < 0.

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There are some good explanations on this page.

Here's the simple way from that page that I like:

Do the addition normally, then check the result (e.g. if (a+23<23) overflow).
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That may sometimes work in practice, but the behavior of signed overflow is undefined. Even if the hardware has the typical 2's-complement behavior, an optimizing compiler is likely to assume that no overflow occurs (because if it does, any possible behavior is valid anyway). For example, the expression (a+23<23) could easily be optimized to just 1. –  Keith Thompson Aug 7 '11 at 6:15

As we know that Addition of 2 Numbers might be overflow. So for that we can use following way to add the two numbers.

Adder Concept

Suppose we have 2 numbers "a" AND "b"

(a^b)+(a&b); this equation will give the correct result.. And this is patented by the Samsung.

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Are you sure this is correct? It gives 1 for sum of 1 and 1: (1^1) + (1&1) == 1 –  sukhmel Aug 27 '14 at 18:26

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