In computing, bit numbering is the convention used to identify the bit positions in a binary number.
In computing, the least significant bit (LSb) is the bit position in a binary integer representing the binary 1s place of the integer. Similarly, the most significant bit (MSb) represents the highest-order place of the binary integer. The LSb is sometimes referred to as the low-order bit or right-most bit, due to the convention in positional notation of writing less significant digits further to the right. The MSb is similarly referred to as the high-order bit or left-most bit. In both cases, the LSb and MSb correlate directly to the least significant digit and most significant digit of a decimal integer.
Bit indexing correlates to the positional notation of the value in base 2. For this reason, bit index is not affected by how the value is stored on the device, such as the value's byte order. Rather, it is a property of the numeric value in binary itself. This is often utilized in programming via bit shifting: A value of 1 << ''n''
corresponds to the nth bit of a binary integer (with a value of 2<sup>n</sup>
).
In digital steganography, sensitive messages may be concealed by manipulating and storing information in the least significant bits of an image or a sound file. The user may later recover this information by extracting the least significant bits of the manipulated pixels to recover the original message. This allows the storage or transfer of digital information to remain concealed.
This table illustrates an example of decimal value of 149 and the location of LSb. In this particular example, the position of unit value (decimal 1 or 0) is located in bit position 0 (n = 0). MSb stands for most significant bit, while LSb stands for least significant bit.
Binary (Decimal: 149) | 1 | 0 | 0 | 1 | 0 | 1 | 0 | 1 | |
---|---|---|---|---|---|---|---|---|---|
Bit weight for given bit position n (2n) | 27 | 26 | 25 | 24 | 23 | 22 | 21 | 20 | |
Bit position label | MSb | LSb |
Most significant bit first means that the most significant bit will arrive first: hence e.g. the hexadecimal number 0x12
, 00010010
in binary representation, will arrive as the sequence 0 0 0 1 0 0 1 0
.
Least significant bit first means that the least significant bit will arrive first: hence e.g. the same hexadecimal number 0x12
, again 00010010
in binary representation, will arrive as the (reversed) sequence 0 1 0 0 1 0 0 0
.
N-1 | |
\sum | |
i=0 |
bi ⋅ 2i
The value of an unsigned binary integer is therefore
N-1 | |
\sum | |
i=0 |
bi ⋅ 2N-1-i
LSb of a number can be calculated with time complexity of
O(n)
a\And(\sima+1)
\And
\sim
a
For MSb 1 numbering, the value of an unsigned binary integer is
N | |
\sum | |
i=1 |
bi ⋅ 2N-i
PL/I numbers strings starting with 1 for the leftmost bit.
The Fortran function uses LSb 0 numbering.