pub trait BitAccess {
// Required methods
fn get_bit(&self, index: u64) -> bool;
fn set_bit(&mut self, index: u64);
fn clear_bit(&mut self, index: u64);
// Provided methods
fn assign_bit(&mut self, index: u64, bit: bool) { ... }
fn flip_bit(&mut self, index: u64) { ... }
}Expand description
Defines functions that access or modify individual bits in a number.
Required Methods§
Provided Methods§
sourcefn assign_bit(&mut self, index: u64, bit: bool)
fn assign_bit(&mut self, index: u64, bit: bool)
sourcefn flip_bit(&mut self, index: u64)
fn flip_bit(&mut self, index: u64)
Sets the bit at index to the opposite of its original value.
§Worst-case complexity
$T(n) = O(T_G(n) + \max(T_S(n), T_C(n)))$,
$M(n) = O(M_G(n) + \max(M_S(n), M_C(n)))$
where $T$ is time, $M$ is additional memory, $T_G$ and $M_G$ are the complexities of
get_bit, $T_S$ and $M_S$ are the complexities of
set_bit, and $T_C$ and $M_C$ are the complexities of
clear_bit.
§Panics
Implementations on Foreign Types§
source§impl BitAccess for i8
impl BitAccess for i8
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for i16
impl BitAccess for i16
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for i32
impl BitAccess for i32
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for i64
impl BitAccess for i64
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for i128
impl BitAccess for i128
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for isize
impl BitAccess for isize
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of a signed primitive integer is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are true if the value is negative, and false otherwise.
If $n \geq 0$, let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, i) = (b_i = 1)$.
If $n < 0$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where
- $W$ is the type’s width
- for all $i$, $b_i\in \{0, 1\}$, and $b_i = 1$ for $i \geq W$.
Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 1.
Setting bits beyond the type’s width is disallowed if the number is non-negative.
If $n \geq 0$ and $j \neq W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $n < 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n \geq 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is
the width of the type.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of a signed primitive integer to 0.
Clearing bits beyond the type’s width is disallowed if the number is negative.
If $n \geq 0$ or $j = W - 1$, let $$ n = \sum_{i=0}^{W-1} 2^{b_i}; $$ but if $n < 0$ or $j = W - 1$, let $$ 2^W + n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$ and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}, \end{cases} $$ where $n \geq 0$ or $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $n < 0$ and $i \geq W$, where $n$ is self, $i$ is index and $W$ is the
width of the type.
§Examples
See here.
source§impl BitAccess for u8
impl BitAccess for u8
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§impl BitAccess for u16
impl BitAccess for u16
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§impl BitAccess for u32
impl BitAccess for u32
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§impl BitAccess for u64
impl BitAccess for u64
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§impl BitAccess for u128
impl BitAccess for u128
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§impl BitAccess for usize
impl BitAccess for usize
source§fn get_bit(&self, index: u64) -> bool
fn get_bit(&self, index: u64) -> bool
Determines whether the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, is 0 or 1.
false means 0 and true means 1. Getting bits beyond the type’s width is allowed;
those bits are false.
Let $$ n = \sum_{i=0}^\infty 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$; so finitely many of the bits are 1, and the rest are 0. Then $f(n, j) = (b_j = 1)$.
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.
source§fn set_bit(&mut self, index: u64)
fn set_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 1.
Setting bits beyond the type’s width is disallowed.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n + 2^j & \text{if} \quad b_j = 0, \\ n & \text{otherwise}, \end{cases} $$ where $j < W$.
§Worst-case complexity
Constant time and additional memory.
§Panics
Panics if $i \geq W$, where $i$ is index and $W$ is $t::WIDTH.
§Examples
See here.
source§fn clear_bit(&mut self, index: u64)
fn clear_bit(&mut self, index: u64)
Sets the $i$th bit of an unsigned primitive integer, or the coefficient of $2^i$ in its binary expansion, to 0.
Clearing bits beyond the type’s width is allowed; since those bits are already
false, clearing them does nothing.
Let $$ n = \sum_{i=0}^{W-1} 2^{b_i}, $$ where for all $i$, $b_i\in \{0, 1\}$, and $W$ is the width of the type. Then $$ n \gets \begin{cases} n - 2^j & \text{if} \quad b_j = 1, \\ n & \text{otherwise}. \end{cases} $$
§Worst-case complexity
Constant time and additional memory.
§Examples
See here.