LL suffix of a constant literal means that the literal's type need to be interpreted as long long (signed). To answer exactly the question title:
1LL is a constant literal, which value is
1 and it's type is long long. Similarly,
-1 with the type long long.
You cannot pass
1LL literal simply into functions which accept integer values of smaller types like long, short. Probably where the All_In macro is used the expected parameter is long long.
All_In(1) == 0b00000000...00000001LL
All_In(2) == 0b00000000...00000011LL
All_In(3) == 0b00000000...00000111LL
All_In(4) == 0b00000000...00001111LL
All_In(5) == 0b00000000...00011111LL
All_In(6) == 0b00000000...00111111LL
All_In(7) == 0b00000000...01111111LL
All_In(8) == 0b00000000...11111111LL
All_In(57) == 0b00000001...11111111LL
All_In(58) == 0b00000011...11111111LL
All_In(59) == 0b00000111...11111111LL
All_In(60) == 0b00001111...11111111LL
All_In(61) == 0b00011111...11111111LL
All_In(62) == 0b00111111...11111111LL
All_In(63) == 0b01111111...11111111LL
All_In(64) == 0b11111111...11111111LL
The macro works this way:
- If the input parameter is 64 (
(G) == 64) ? see ternary operator
?:), then it yields a number which binary representation is 64
W64 specifies that the width of the number is 64 in bits). For this you need to know, that in case of signed integers and in 2 complement number representation the -1 means all bits set to 1. For example in case of a signed char, the values range from -128 to 127. The binary representation of the -128 is
11111111. Extend this to 64 bit length.
- If the input is not 64, then it yields a number which has as many 1s in the binary representation as it is specified:
1LL << (G))-1LL. This goes the following way, let's do it for input 3 and if the bit length is 8.
a. First it shifts the 1 by 3.
0b00000010 (2^1 after shifting by 1)
0b00000100 (2^2 after shifting by 1 again)
0b00001000 (2^3 after shifting by 1 again, 3 times all together)
b. Then it subtracts 1 from that number. This results in a number we wanted. 2^n-1 always consists of bits of ones without a zero in between them. So 2^3-1=7. Which representation is:
Probably this can be used to mask some flags or something.
Note, that (
0b prefix for representing binary literals in my example doesn't work with all C compilers).