Trait malachite_base::num::arithmetic::traits::WrappingAddMulAssign

source · []
pub trait WrappingAddMulAssign<Y = Self, Z = Self> {
    fn wrapping_add_mul_assign(&mut self, y: Y, z: Z);
}
Expand description

Adds a number and the product of two other numbers, in place, wrapping around at the boundary of the type.

Required Methods

Implementations on Foreign Types

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Adds a number and the product of two other numbers in place, wrapping around at the boundary of the type.

$x \gets w$, where $w \equiv x + yz \mod 2^W$ and $W$ is Self::WIDTH.

Worst-case complexity

Constant time and additional memory.

Examples

See here.

Implementors