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In C++11 7.2.7 it says:

For an enumeration [with a non-fixed underlying type] where e_min is the smallest enumerator and e_max is the largest, the values of the enumeration are the values in the range b_min to b_max defined as follows... [snip]

I don't understand what it is defining here. How are the range of possible values [b_min, b_max] distinct from the range of the enumerators [e_min, e_max] ?

Perhaps an example could help of a specific enumeration definition and the calculation of e_min, e_max, b_min and b_max?

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Think about bits. Example: If you have enum Mask { flag_A = 1<<0, flag_B = 1<<1 }; then "e_min" is flag_A i.e. "0b01" (in base 2) i.e. 1, and "e_max" is flag_B i.e. "0b10" i.e. 2, and this enum can be represented using 2 bits and is unsigned (never negative). Then "b_min" is "0b00" i.e. 0 and "b_max" is "0b11" i.e. 3, so that you can use Mask(0) or Mask(flag_A|flag_B) and write tests like if (m & flag_A) .... –  gx_ May 24 '13 at 14:27

1 Answer 1

up vote 3 down vote accepted

In C++ you can use enums as bit-masks.

For example:

enum Flag {
    Read = 1 << 0,
    Write = 1 << 1,
    WithSugar = 1 << 2
};

Then you can say: Flag f = Read | Write | WithSugar; and f's value is perfectly defined: assert(f == 7);!

It's inherited from C...

In our case, the rules says that Flag should be able to represent any value from 0 (enums are positive unless a negative enumerator exist) to 7.

The value 7 is determined by taking the largest enumerator (WithSguar: 4) and looking for k such that 2^(k-1) <= 4 < 2^k - 1. The maximum representable value is then 2^k-1. It makes sense if you consider the bitwise representation of the value in 2-complement: 4 is 100 so you can fill the 00 with 1 without taking more space, giving 111 as the maximum value, which happens to be 7.

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Thanks, I didn't realize there was actual language support for using enumerations as bit masks. The definition makes sense now. –  Andrew Tomazos May 25 '13 at 5:36

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