The following built-in functions allow performing simple arithmetic operations together with checking whether the operations overflowed.

— Built-in Function: bool **__builtin_add_overflow**
(`type1 a, type2 b, type3 *res`
)`
`

— Built-in Function: bool**__builtin_sadd_overflow**
(`int a, int b, int *res`
)`
`

— Built-in Function: bool**__builtin_saddl_overflow**
(`long int a, long int b, long int *res`
)`
`

— Built-in Function: bool**__builtin_saddll_overflow**
(`long long int a, long long int b, long long int *res`
)`
`

— Built-in Function: bool**__builtin_uadd_overflow**
(`unsigned int a, unsigned int b, unsigned int *res`
)`
`

— Built-in Function: bool**__builtin_uaddl_overflow**
(`unsigned long int a, unsigned long int b, unsigned long int *res`
)`
`

— Built-in Function: bool**__builtin_uaddll_overflow**
(`unsigned long long int a, unsigned long long int b, unsigned long long int *res`
)`
`

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

These built-in functions promote the first two operands into infinite precision signed type and perform addition on those promoted operands. The result is then cast to the type the third pointer argument points to and stored there. If the stored result is equal to the infinite precision result, the built-in functions return false, otherwise they return true. As the addition is performed in infinite signed precision, these built-in functions have fully defined behavior for all argument values.

The first built-in function allows arbitrary integral types for operands and the result type must be pointer to some integral type other than enumerated or boolean type, the rest of the built-in functions have explicit integer types.

The compiler will attempt to use hardware instructions to implement these built-in functions where possible, like conditional jump on overflow after addition, conditional jump on carry etc.

— Built-in Function: bool **__builtin_sub_overflow**
(`type1 a, type2 b, type3 *res`
)`
`

— Built-in Function: bool**__builtin_ssub_overflow**
(`int a, int b, int *res`
)`
`

— Built-in Function: bool**__builtin_ssubl_overflow**
(`long int a, long int b, long int *res`
)`
`

— Built-in Function: bool**__builtin_ssubll_overflow**
(`long long int a, long long int b, long long int *res`
)`
`

— Built-in Function: bool**__builtin_usub_overflow**
(`unsigned int a, unsigned int b, unsigned int *res`
)`
`

— Built-in Function: bool**__builtin_usubl_overflow**
(`unsigned long int a, unsigned long int b, unsigned long int *res`
)`
`

— Built-in Function: bool**__builtin_usubll_overflow**
(`unsigned long long int a, unsigned long long int b, unsigned long long int *res`
)`
`

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

These built-in functions are similar to the add overflow checking built-in functions above, except they perform subtraction, subtract the second argument from the first one, instead of addition.

— Built-in Function: bool **__builtin_mul_overflow**
(`type1 a, type2 b, type3 *res`
)`
`

— Built-in Function: bool**__builtin_smul_overflow**
(`int a, int b, int *res`
)`
`

— Built-in Function: bool**__builtin_smull_overflow**
(`long int a, long int b, long int *res`
)`
`

— Built-in Function: bool**__builtin_smulll_overflow**
(`long long int a, long long int b, long long int *res`
)`
`

— Built-in Function: bool**__builtin_umul_overflow**
(`unsigned int a, unsigned int b, unsigned int *res`
)`
`

— Built-in Function: bool**__builtin_umull_overflow**
(`unsigned long int a, unsigned long int b, unsigned long int *res`
)`
`

— Built-in Function: bool**__builtin_umulll_overflow**
(`unsigned long long int a, unsigned long long int b, unsigned long long int *res`
)`
`

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

— Built-in Function: bool

These built-in functions are similar to the add overflow checking built-in functions above, except they perform multiplication, instead of addition.

The following built-in functions allow checking if simple arithmetic operation would overflow.

— Built-in Function: bool **__builtin_add_overflow_p**
(`type1 a, type2 b, type3 c`
)`
`

— Built-in Function: bool**__builtin_sub_overflow_p**
(`type1 a, type2 b, type3 c`
)`
`

— Built-in Function: bool**__builtin_mul_overflow_p**
(`type1 a, type2 b, type3 c`
)`
`

— Built-in Function: bool

— Built-in Function: bool

These built-in functions are similar to

`__builtin_add_overflow`

,`__builtin_sub_overflow`

, or`__builtin_mul_overflow`

, except that they don't store the result of the arithmetic operation anywhere and the last argument is not a pointer, but some expression with integral type other than enumerated or boolean type.The built-in functions promote the first two operands into infinite precision signed type and perform addition on those promoted operands. The result is then cast to the type of the third argument. If the cast result is equal to the infinite precision result, the built-in functions return false, otherwise they return true. The value of the third argument is ignored, just the side effects in the third argument are evaluated, and no integral argument promotions are performed on the last argument. If the third argument is a bit-field, the type used for the result cast has the precision and signedness of the given bit-field, rather than precision and signedness of the underlying type.

For example, the following macro can be used to portably check, at compile-time, whether or not adding two constant integers will overflow, and perform the addition only when it is known to be safe and not to trigger a

-Woverflowwarning.#define INT_ADD_OVERFLOW_P(a, b) \ __builtin_add_overflow_p (a, b, (__typeof__ ((a) + (b))) 0) enum { A = INT_MAX, B = 3, C = INT_ADD_OVERFLOW_P (A, B) ? 0 : A + B, D = __builtin_add_overflow_p (1, SCHAR_MAX, (signed char) 0) };The compiler will attempt to use hardware instructions to implement these built-in functions where possible, like conditional jump on overflow after addition, conditional jump on carry etc.