malachite_base/num/arithmetic/divisible_by_power_of_2.rs
1// Copyright © 2025 Mikhail Hogrefe
2//
3// This file is part of Malachite.
4//
5// Malachite is free software: you can redistribute it and/or modify it under the terms of the GNU
6// Lesser General Public License (LGPL) as published by the Free Software Foundation; either version
7// 3 of the License, or (at your option) any later version. See <https://www.gnu.org/licenses/>.
8
9use crate::num::arithmetic::traits::{DivisibleByPowerOf2, ModPowerOf2};
10use crate::num::conversion::traits::WrappingFrom;
11
12macro_rules! impl_divisible_by_power_of_2_unsigned {
13 ($t:ident) => {
14 impl DivisibleByPowerOf2 for $t {
15 /// Returns whether a number is divisible by $2^k$.
16 ///
17 /// $f(x, k) = (2^k|x)$.
18 ///
19 /// $f(x, k) = (\exists n \in \N : \ x = n2^k)$.
20 ///
21 /// # Worst-case complexity
22 /// Constant time and additional memory.
23 ///
24 /// # Examples
25 /// See [here](super::divisible_by_power_of_2#divisible_by_power_of_2).
26 #[inline]
27 fn divisible_by_power_of_2(self, pow: u64) -> bool {
28 self.mod_power_of_2(pow) == 0
29 }
30 }
31 };
32}
33apply_to_unsigneds!(impl_divisible_by_power_of_2_unsigned);
34
35macro_rules! impl_divisible_by_power_of_2_signed {
36 ($u:ident, $s:ident) => {
37 impl DivisibleByPowerOf2 for $s {
38 /// Returns whether a number is divisible by $2^k$.
39 ///
40 /// $f(x, k) = (2^k|x)$.
41 ///
42 /// $f(x, k) = (\exists n \in \N : x = n2^k)$.
43 ///
44 /// # Worst-case complexity
45 /// Constant time and additional memory.
46 ///
47 /// # Examples
48 /// See [here](super::divisible_by_power_of_2#divisible_by_power_of_2).
49 #[inline]
50 fn divisible_by_power_of_2(self, pow: u64) -> bool {
51 $u::wrapping_from(self).divisible_by_power_of_2(pow)
52 }
53 }
54 };
55}
56apply_to_unsigned_signed_pairs!(impl_divisible_by_power_of_2_signed);