use std::borrow::Cow; use std::default::Default; use std::iter::repeat; use std::ops::{Add, BitAnd, BitOr, BitXor, Div, Mul, Neg, Rem, Shl, Shr, Sub}; use std::str::{self, FromStr}; use std::fmt; use std::cmp; use std::cmp::Ordering::{self, Less, Greater, Equal}; use std::{f32, f64}; use std::{u8, u64}; use std::ascii::AsciiExt; #[cfg(feature = "serde")] use serde; use integer::Integer; use traits::{ToPrimitive, FromPrimitive, Float, Num, Unsigned, CheckedAdd, CheckedSub, CheckedMul, CheckedDiv, Zero, One}; #[path = "algorithms.rs"] mod algorithms; pub use self::algorithms::big_digit; pub use self::big_digit::{BigDigit, DoubleBigDigit, ZERO_BIG_DIGIT}; use self::algorithms::{mac_with_carry, mul3, scalar_mul, div_rem, div_rem_digit}; use self::algorithms::{__add2, add2, sub2, sub2rev}; use self::algorithms::{biguint_shl, biguint_shr}; use self::algorithms::{cmp_slice, fls, ilog2}; use UsizePromotion; use ParseBigIntError; #[cfg(test)] #[path = "tests/biguint.rs"] mod biguint_tests; /// A big unsigned integer type. /// /// A `BigUint`-typed value `BigUint { data: vec!(a, b, c) }` represents a number /// `(a + b * big_digit::BASE + c * big_digit::BASE^2)`. #[derive(Clone, Debug, Hash)] #[cfg_attr(feature = "rustc-serialize", derive(RustcEncodable, RustcDecodable))] pub struct BigUint { data: Vec, } impl PartialEq for BigUint { #[inline] fn eq(&self, other: &BigUint) -> bool { match self.cmp(other) { Equal => true, _ => false, } } } impl Eq for BigUint {} impl PartialOrd for BigUint { #[inline] fn partial_cmp(&self, other: &BigUint) -> Option { Some(self.cmp(other)) } } impl Ord for BigUint { #[inline] fn cmp(&self, other: &BigUint) -> Ordering { cmp_slice(&self.data[..], &other.data[..]) } } impl Default for BigUint { #[inline] fn default() -> BigUint { Zero::zero() } } impl fmt::Display for BigUint { fn fmt(&self, f: &mut fmt::Formatter) -> fmt::Result { f.pad_integral(true, "", &self.to_str_radix(10)) } } impl fmt::LowerHex for BigUint { fn fmt(&self, f: &mut fmt::Formatter) -> fmt::Result { f.pad_integral(true, "0x", &self.to_str_radix(16)) } } impl fmt::UpperHex for BigUint { fn fmt(&self, f: &mut fmt::Formatter) -> fmt::Result { f.pad_integral(true, "0x", &self.to_str_radix(16).to_ascii_uppercase()) } } impl fmt::Binary for BigUint { fn fmt(&self, f: &mut fmt::Formatter) -> fmt::Result { f.pad_integral(true, "0b", &self.to_str_radix(2)) } } impl fmt::Octal for BigUint { fn fmt(&self, f: &mut fmt::Formatter) -> fmt::Result { f.pad_integral(true, "0o", &self.to_str_radix(8)) } } impl FromStr for BigUint { type Err = ParseBigIntError; #[inline] fn from_str(s: &str) -> Result { BigUint::from_str_radix(s, 10) } } // Convert from a power of two radix (bits == ilog2(radix)) where bits evenly divides // BigDigit::BITS fn from_bitwise_digits_le(v: &[u8], bits: usize) -> BigUint { debug_assert!(!v.is_empty() && bits <= 8 && big_digit::BITS % bits == 0); debug_assert!(v.iter().all(|&c| (c as BigDigit) < (1 << bits))); let digits_per_big_digit = big_digit::BITS / bits; let data = v.chunks(digits_per_big_digit) .map(|chunk| { chunk.iter().rev().fold(0, |acc, &c| (acc << bits) | c as BigDigit) }) .collect(); BigUint::new(data) } // Convert from a power of two radix (bits == ilog2(radix)) where bits doesn't evenly divide // BigDigit::BITS fn from_inexact_bitwise_digits_le(v: &[u8], bits: usize) -> BigUint { debug_assert!(!v.is_empty() && bits <= 8 && big_digit::BITS % bits != 0); debug_assert!(v.iter().all(|&c| (c as BigDigit) < (1 << bits))); let big_digits = (v.len() * bits + big_digit::BITS - 1) / big_digit::BITS; let mut data = Vec::with_capacity(big_digits); let mut d = 0; let mut dbits = 0; // number of bits we currently have in d // walk v accumululating bits in d; whenever we accumulate big_digit::BITS in d, spit out a // big_digit: for &c in v { d |= (c as BigDigit) << dbits; dbits += bits; if dbits >= big_digit::BITS { data.push(d); dbits -= big_digit::BITS; // if dbits was > big_digit::BITS, we dropped some of the bits in c (they couldn't fit // in d) - grab the bits we lost here: d = (c as BigDigit) >> (bits - dbits); } } if dbits > 0 { debug_assert!(dbits < big_digit::BITS); data.push(d as BigDigit); } BigUint::new(data) } // Read little-endian radix digits fn from_radix_digits_be(v: &[u8], radix: u32) -> BigUint { debug_assert!(!v.is_empty() && !radix.is_power_of_two()); debug_assert!(v.iter().all(|&c| (c as u32) < radix)); // Estimate how big the result will be, so we can pre-allocate it. let bits = (radix as f64).log2() * v.len() as f64; let big_digits = (bits / big_digit::BITS as f64).ceil(); let mut data = Vec::with_capacity(big_digits as usize); let (base, power) = get_radix_base(radix); let radix = radix as BigDigit; let r = v.len() % power; let i = if r == 0 { power } else { r }; let (head, tail) = v.split_at(i); let first = head.iter().fold(0, |acc, &d| acc * radix + d as BigDigit); data.push(first); debug_assert!(tail.len() % power == 0); for chunk in tail.chunks(power) { if data.last() != Some(&0) { data.push(0); } let mut carry = 0; for d in data.iter_mut() { *d = mac_with_carry(0, *d, base, &mut carry); } debug_assert!(carry == 0); let n = chunk.iter().fold(0, |acc, &d| acc * radix + d as BigDigit); add2(&mut data, &[n]); } BigUint::new(data) } impl Num for BigUint { type FromStrRadixErr = ParseBigIntError; /// Creates and initializes a `BigUint`. fn from_str_radix(s: &str, radix: u32) -> Result { assert!(2 <= radix && radix <= 36, "The radix must be within 2...36"); let mut s = s; if s.starts_with('+') { let tail = &s[1..]; if !tail.starts_with('+') { s = tail } } if s.is_empty() { // create ParseIntError::Empty let e = u64::from_str_radix(s, radix).unwrap_err(); return Err(e.into()); } // First normalize all characters to plain digit values let mut v = Vec::with_capacity(s.len()); for b in s.bytes() { let d = match b { b'0'...b'9' => b - b'0', b'a'...b'z' => b - b'a' + 10, b'A'...b'Z' => b - b'A' + 10, _ => u8::MAX, }; if d < radix as u8 { v.push(d); } else { // create ParseIntError::InvalidDigit // Include the previous character for context. let i = cmp::max(v.len(), 1) - 1; let e = u64::from_str_radix(&s[i..], radix).unwrap_err(); return Err(e.into()); } } let res = if radix.is_power_of_two() { // Powers of two can use bitwise masks and shifting instead of multiplication let bits = ilog2(radix); v.reverse(); if big_digit::BITS % bits == 0 { from_bitwise_digits_le(&v, bits) } else { from_inexact_bitwise_digits_le(&v, bits) } } else { from_radix_digits_be(&v, radix) }; Ok(res) } } forward_all_binop_to_val_ref_commutative!(impl BitAnd for BigUint, bitand); impl<'a> BitAnd<&'a BigUint> for BigUint { type Output = BigUint; #[inline] fn bitand(self, other: &BigUint) -> BigUint { let mut data = self.data; for (ai, &bi) in data.iter_mut().zip(other.data.iter()) { *ai &= bi; } data.truncate(other.data.len()); BigUint::new(data) } } forward_all_binop_to_val_ref_commutative!(impl BitOr for BigUint, bitor); impl<'a> BitOr<&'a BigUint> for BigUint { type Output = BigUint; fn bitor(self, other: &BigUint) -> BigUint { let mut data = self.data; for (ai, &bi) in data.iter_mut().zip(other.data.iter()) { *ai |= bi; } if other.data.len() > data.len() { let extra = &other.data[data.len()..]; data.extend(extra.iter().cloned()); } BigUint::new(data) } } forward_all_binop_to_val_ref_commutative!(impl BitXor for BigUint, bitxor); impl<'a> BitXor<&'a BigUint> for BigUint { type Output = BigUint; fn bitxor(self, other: &BigUint) -> BigUint { let mut data = self.data; for (ai, &bi) in data.iter_mut().zip(other.data.iter()) { *ai ^= bi; } if other.data.len() > data.len() { let extra = &other.data[data.len()..]; data.extend(extra.iter().cloned()); } BigUint::new(data) } } impl Shl for BigUint { type Output = BigUint; #[inline] fn shl(self, rhs: usize) -> BigUint { biguint_shl(Cow::Owned(self), rhs) } } impl<'a> Shl for &'a BigUint { type Output = BigUint; #[inline] fn shl(self, rhs: usize) -> BigUint { biguint_shl(Cow::Borrowed(self), rhs) } } impl Shr for BigUint { type Output = BigUint; #[inline] fn shr(self, rhs: usize) -> BigUint { biguint_shr(Cow::Owned(self), rhs) } } impl<'a> Shr for &'a BigUint { type Output = BigUint; #[inline] fn shr(self, rhs: usize) -> BigUint { biguint_shr(Cow::Borrowed(self), rhs) } } impl Zero for BigUint { #[inline] fn zero() -> BigUint { BigUint::new(Vec::new()) } #[inline] fn is_zero(&self) -> bool { self.data.is_empty() } } impl One for BigUint { #[inline] fn one() -> BigUint { BigUint::new(vec![1]) } } impl Unsigned for BigUint {} forward_all_binop_to_val_ref_commutative!(impl Add for BigUint, add); impl<'a> Add<&'a BigUint> for BigUint { type Output = BigUint; fn add(mut self, other: &BigUint) -> BigUint { if self.data.len() < other.data.len() { let extra = other.data.len() - self.data.len(); self.data.extend(repeat(0).take(extra)); } let carry = __add2(&mut self.data[..], &other.data[..]); if carry != 0 { self.data.push(carry); } self } } promote_unsigned_scalars!(impl Add for BigUint, add); forward_all_scalar_binop_to_val_val_commutative!(impl Add for BigUint, add); forward_all_scalar_binop_to_val_val_commutative!(impl Add for BigUint, add); impl Add for BigUint { type Output = BigUint; #[inline] fn add(mut self, other: BigDigit) -> BigUint { if self.data.len() == 0 && other != 0 { self.data.push(0); } let carry = __add2(&mut self.data, &[other]); if carry != 0 { self.data.push(carry); } self } } impl Add for BigUint { type Output = BigUint; #[inline] fn add(mut self, other: DoubleBigDigit) -> BigUint { if self.data.len() == 0 && other != 0 { self.data.push(0); } if self.data.len() == 1 && other > BigDigit::max_value() as DoubleBigDigit { self.data.push(0); } let (lo, hi) = big_digit::from_doublebigdigit(other); let carry = __add2(&mut self.data, &[lo, hi]); if carry != 0 { self.data.push(carry); } self } } forward_val_val_binop!(impl Sub for BigUint, sub); forward_ref_ref_binop!(impl Sub for BigUint, sub); impl<'a> Sub<&'a BigUint> for BigUint { type Output = BigUint; fn sub(mut self, other: &BigUint) -> BigUint { sub2(&mut self.data[..], &other.data[..]); self.normalize() } } impl<'a> Sub for &'a BigUint { type Output = BigUint; fn sub(self, mut other: BigUint) -> BigUint { if other.data.len() < self.data.len() { let extra = self.data.len() - other.data.len(); other.data.extend(repeat(0).take(extra)); } sub2rev(&self.data[..], &mut other.data[..]); other.normalize() } } promote_unsigned_scalars!(impl Sub for BigUint, sub); forward_all_scalar_binop_to_val_val!(impl Sub for BigUint, sub); forward_all_scalar_binop_to_val_val!(impl Sub for BigUint, sub); impl Sub for BigUint { type Output = BigUint; #[inline] fn sub(mut self, other: BigDigit) -> BigUint { sub2(&mut self.data[..], &[other]); self.normalize() } } impl Sub for BigDigit { type Output = BigUint; #[inline] fn sub(self, mut other: BigUint) -> BigUint { if other.data.len() == 0 { other.data.push(0); } sub2rev(&[self], &mut other.data[..]); other.normalize() } } impl Sub for BigUint { type Output = BigUint; #[inline] fn sub(mut self, other: DoubleBigDigit) -> BigUint { let (lo, hi) = big_digit::from_doublebigdigit(other); sub2(&mut self.data[..], &[lo, hi]); self.normalize() } } impl Sub for DoubleBigDigit { type Output = BigUint; #[inline] fn sub(self, mut other: BigUint) -> BigUint { while other.data.len() < 2 { other.data.push(0); } let (lo, hi) = big_digit::from_doublebigdigit(self); sub2rev(&[lo, hi], &mut other.data[..]); other.normalize() } } forward_all_binop_to_ref_ref!(impl Mul for BigUint, mul); impl<'a, 'b> Mul<&'b BigUint> for &'a BigUint { type Output = BigUint; #[inline] fn mul(self, other: &BigUint) -> BigUint { mul3(&self.data[..], &other.data[..]) } } promote_unsigned_scalars!(impl Mul for BigUint, mul); forward_all_scalar_binop_to_val_val_commutative!(impl Mul for BigUint, mul); forward_all_scalar_binop_to_val_val_commutative!(impl Mul for BigUint, mul); impl Mul for BigUint { type Output = BigUint; #[inline] fn mul(mut self, other: BigDigit) -> BigUint { if other == 0 { self.data.clear(); } else { let carry = scalar_mul(&mut self.data[..], other); if carry != 0 { self.data.push(carry); } } self } } impl Mul for BigUint { type Output = BigUint; #[inline] fn mul(mut self, other: DoubleBigDigit) -> BigUint { if other == 0 { self.data.clear(); self } else if other <= BigDigit::max_value() as DoubleBigDigit { self * other as BigDigit } else { let (lo, hi) = big_digit::from_doublebigdigit(other); mul3(&self.data[..], &[lo, hi]) } } } forward_all_binop_to_ref_ref!(impl Div for BigUint, div); impl<'a, 'b> Div<&'b BigUint> for &'a BigUint { type Output = BigUint; #[inline] fn div(self, other: &BigUint) -> BigUint { let (q, _) = self.div_rem(other); q } } promote_unsigned_scalars!(impl Div for BigUint, div); forward_all_scalar_binop_to_val_val!(impl Div for BigUint, div); forward_all_scalar_binop_to_val_val!(impl Div for BigUint, div); impl Div for BigUint { type Output = BigUint; #[inline] fn div(self, other: BigDigit) -> BigUint { let (q, _) = div_rem_digit(self, other); q } } impl Div for BigDigit { type Output = BigUint; #[inline] fn div(self, other: BigUint) -> BigUint { match other.data.len() { 0 => panic!(), 1 => From::from(self / other.data[0]), _ => Zero::zero(), } } } impl Div for BigUint { type Output = BigUint; #[inline] fn div(self, other: DoubleBigDigit) -> BigUint { let (q, _) = self.div_rem(&From::from(other)); q } } impl Div for DoubleBigDigit { type Output = BigUint; #[inline] fn div(self, other: BigUint) -> BigUint { match other.data.len() { 0 => panic!(), 1 => From::from(self / other.data[0] as u64), 2 => From::from(self / big_digit::to_doublebigdigit(other.data[0], other.data[1])), _ => Zero::zero(), } } } forward_all_binop_to_ref_ref!(impl Rem for BigUint, rem); impl<'a, 'b> Rem<&'b BigUint> for &'a BigUint { type Output = BigUint; #[inline] fn rem(self, other: &BigUint) -> BigUint { let (_, r) = self.div_rem(other); r } } promote_unsigned_scalars!(impl Rem for BigUint, rem); forward_all_scalar_binop_to_val_val!(impl Rem for BigUint, rem); forward_all_scalar_binop_to_val_val!(impl Rem for BigUint, rem); impl Rem for BigUint { type Output = BigUint; #[inline] fn rem(self, other: BigDigit) -> BigUint { let (_, r) = div_rem_digit(self, other); From::from(r) } } impl Rem for BigDigit { type Output = BigUint; #[inline] fn rem(self, other: BigUint) -> BigUint { match other.data.len() { 0 => panic!(), 1 => From::from(self % other.data[0]), _ => From::from(self) } } } impl Rem for BigUint { type Output = BigUint; #[inline] fn rem(self, other: DoubleBigDigit) -> BigUint { let (_, r) = self.div_rem(&From::from(other)); r } } impl Rem for DoubleBigDigit { type Output = BigUint; #[inline] fn rem(self, other: BigUint) -> BigUint { match other.data.len() { 0 => panic!(), 1 => From::from(self % other.data[0] as u64), 2 => From::from(self % big_digit::to_doublebigdigit(other.data[0], other.data[1])), _ => From::from(self), } } } impl Neg for BigUint { type Output = BigUint; #[inline] fn neg(self) -> BigUint { panic!() } } impl<'a> Neg for &'a BigUint { type Output = BigUint; #[inline] fn neg(self) -> BigUint { panic!() } } impl CheckedAdd for BigUint { #[inline] fn checked_add(&self, v: &BigUint) -> Option { return Some(self.add(v)); } } impl CheckedSub for BigUint { #[inline] fn checked_sub(&self, v: &BigUint) -> Option { match self.cmp(v) { Less => None, Equal => Some(Zero::zero()), Greater => Some(self.sub(v)), } } } impl CheckedMul for BigUint { #[inline] fn checked_mul(&self, v: &BigUint) -> Option { return Some(self.mul(v)); } } impl CheckedDiv for BigUint { #[inline] fn checked_div(&self, v: &BigUint) -> Option { if v.is_zero() { return None; } return Some(self.div(v)); } } impl Integer for BigUint { #[inline] fn div_rem(&self, other: &BigUint) -> (BigUint, BigUint) { div_rem(self, other) } #[inline] fn div_floor(&self, other: &BigUint) -> BigUint { let (d, _) = div_rem(self, other); d } #[inline] fn mod_floor(&self, other: &BigUint) -> BigUint { let (_, m) = div_rem(self, other); m } #[inline] fn div_mod_floor(&self, other: &BigUint) -> (BigUint, BigUint) { div_rem(self, other) } /// Calculates the Greatest Common Divisor (GCD) of the number and `other`. /// /// The result is always positive. #[inline] fn gcd(&self, other: &BigUint) -> BigUint { // Use Euclid's algorithm let mut m = (*self).clone(); let mut n = (*other).clone(); while !m.is_zero() { let temp = m; m = n % &temp; n = temp; } return n; } /// Calculates the Lowest Common Multiple (LCM) of the number and `other`. #[inline] fn lcm(&self, other: &BigUint) -> BigUint { ((self * other) / self.gcd(other)) } /// Deprecated, use `is_multiple_of` instead. #[inline] fn divides(&self, other: &BigUint) -> bool { self.is_multiple_of(other) } /// Returns `true` if the number is a multiple of `other`. #[inline] fn is_multiple_of(&self, other: &BigUint) -> bool { (self % other).is_zero() } /// Returns `true` if the number is divisible by `2`. #[inline] fn is_even(&self) -> bool { // Considering only the last digit. match self.data.first() { Some(x) => x.is_even(), None => true, } } /// Returns `true` if the number is not divisible by `2`. #[inline] fn is_odd(&self) -> bool { !self.is_even() } } fn high_bits_to_u64(v: &BigUint) -> u64 { match v.data.len() { 0 => 0, 1 => v.data[0] as u64, _ => { let mut bits = v.bits(); let mut ret = 0u64; let mut ret_bits = 0; for d in v.data.iter().rev() { let digit_bits = (bits - 1) % big_digit::BITS + 1; let bits_want = cmp::min(64 - ret_bits, digit_bits); if bits_want != 64 { ret <<= bits_want; } ret |= *d as u64 >> (digit_bits - bits_want); ret_bits += bits_want; bits -= bits_want; if ret_bits == 64 { break; } } ret } } } impl ToPrimitive for BigUint { #[inline] fn to_i64(&self) -> Option { self.to_u64().and_then(|n| { // If top bit of u64 is set, it's too large to convert to i64. if n >> 63 == 0 { Some(n as i64) } else { None } }) } #[inline] fn to_u64(&self) -> Option { let mut ret: u64 = 0; let mut bits = 0; for i in self.data.iter() { if bits >= 64 { return None; } ret += (*i as u64) << bits; bits += big_digit::BITS; } Some(ret) } #[inline] fn to_f32(&self) -> Option { let mantissa = high_bits_to_u64(self); let exponent = self.bits() - fls(mantissa); if exponent > f32::MAX_EXP as usize { None } else { let ret = (mantissa as f32) * 2.0f32.powi(exponent as i32); if ret.is_infinite() { None } else { Some(ret) } } } #[inline] fn to_f64(&self) -> Option { let mantissa = high_bits_to_u64(self); let exponent = self.bits() - fls(mantissa); if exponent > f64::MAX_EXP as usize { None } else { let ret = (mantissa as f64) * 2.0f64.powi(exponent as i32); if ret.is_infinite() { None } else { Some(ret) } } } } impl FromPrimitive for BigUint { #[inline] fn from_i64(n: i64) -> Option { if n >= 0 { Some(BigUint::from(n as u64)) } else { None } } #[inline] fn from_u64(n: u64) -> Option { Some(BigUint::from(n)) } #[inline] fn from_f64(mut n: f64) -> Option { // handle NAN, INFINITY, NEG_INFINITY if !n.is_finite() { return None; } // match the rounding of casting from float to int n = n.trunc(); // handle 0.x, -0.x if n.is_zero() { return Some(BigUint::zero()); } let (mantissa, exponent, sign) = Float::integer_decode(n); if sign == -1 { return None; } let mut ret = BigUint::from(mantissa); if exponent > 0 { ret = ret << exponent as usize; } else if exponent < 0 { ret = ret >> (-exponent) as usize; } Some(ret) } } impl From for BigUint { #[inline] fn from(mut n: u64) -> Self { let mut ret: BigUint = Zero::zero(); while n != 0 { ret.data.push(n as BigDigit); // don't overflow if BITS is 64: n = (n >> 1) >> (big_digit::BITS - 1); } ret } } macro_rules! impl_biguint_from_uint { ($T:ty) => { impl From<$T> for BigUint { #[inline] fn from(n: $T) -> Self { BigUint::from(n as u64) } } } } impl_biguint_from_uint!(u8); impl_biguint_from_uint!(u16); impl_biguint_from_uint!(u32); impl_biguint_from_uint!(usize); /// A generic trait for converting a value to a `BigUint`. pub trait ToBigUint { /// Converts the value of `self` to a `BigUint`. fn to_biguint(&self) -> Option; } impl ToBigUint for BigUint { #[inline] fn to_biguint(&self) -> Option { Some(self.clone()) } } macro_rules! impl_to_biguint { ($T:ty, $from_ty:path) => { impl ToBigUint for $T { #[inline] fn to_biguint(&self) -> Option { $from_ty(*self) } } } } impl_to_biguint!(isize, FromPrimitive::from_isize); impl_to_biguint!(i8, FromPrimitive::from_i8); impl_to_biguint!(i16, FromPrimitive::from_i16); impl_to_biguint!(i32, FromPrimitive::from_i32); impl_to_biguint!(i64, FromPrimitive::from_i64); impl_to_biguint!(usize, FromPrimitive::from_usize); impl_to_biguint!(u8, FromPrimitive::from_u8); impl_to_biguint!(u16, FromPrimitive::from_u16); impl_to_biguint!(u32, FromPrimitive::from_u32); impl_to_biguint!(u64, FromPrimitive::from_u64); impl_to_biguint!(f32, FromPrimitive::from_f32); impl_to_biguint!(f64, FromPrimitive::from_f64); // Extract bitwise digits that evenly divide BigDigit fn to_bitwise_digits_le(u: &BigUint, bits: usize) -> Vec { debug_assert!(!u.is_zero() && bits <= 8 && big_digit::BITS % bits == 0); let last_i = u.data.len() - 1; let mask: BigDigit = (1 << bits) - 1; let digits_per_big_digit = big_digit::BITS / bits; let digits = (u.bits() + bits - 1) / bits; let mut res = Vec::with_capacity(digits); for mut r in u.data[..last_i].iter().cloned() { for _ in 0..digits_per_big_digit { res.push((r & mask) as u8); r >>= bits; } } let mut r = u.data[last_i]; while r != 0 { res.push((r & mask) as u8); r >>= bits; } res } // Extract bitwise digits that don't evenly divide BigDigit fn to_inexact_bitwise_digits_le(u: &BigUint, bits: usize) -> Vec { debug_assert!(!u.is_zero() && bits <= 8 && big_digit::BITS % bits != 0); let mask: BigDigit = (1 << bits) - 1; let digits = (u.bits() + bits - 1) / bits; let mut res = Vec::with_capacity(digits); let mut r = 0; let mut rbits = 0; for c in &u.data { r |= *c << rbits; rbits += big_digit::BITS; while rbits >= bits { res.push((r & mask) as u8); r >>= bits; // r had more bits than it could fit - grab the bits we lost if rbits > big_digit::BITS { r = *c >> (big_digit::BITS - (rbits - bits)); } rbits -= bits; } } if rbits != 0 { res.push(r as u8); } while let Some(&0) = res.last() { res.pop(); } res } // Extract little-endian radix digits #[inline(always)] // forced inline to get const-prop for radix=10 fn to_radix_digits_le(u: &BigUint, radix: u32) -> Vec { debug_assert!(!u.is_zero() && !radix.is_power_of_two()); // Estimate how big the result will be, so we can pre-allocate it. let radix_digits = ((u.bits() as f64) / (radix as f64).log2()).ceil(); let mut res = Vec::with_capacity(radix_digits as usize); let mut digits = u.clone(); let (base, power) = get_radix_base(radix); let radix = radix as BigDigit; while digits.data.len() > 1 { let (q, mut r) = div_rem_digit(digits, base); for _ in 0..power { res.push((r % radix) as u8); r /= radix; } digits = q; } let mut r = digits.data[0]; while r != 0 { res.push((r % radix) as u8); r /= radix; } res } pub fn to_radix_le(u: &BigUint, radix: u32) -> Vec { if u.is_zero() { vec![0] } else if radix.is_power_of_two() { // Powers of two can use bitwise masks and shifting instead of division let bits = ilog2(radix); if big_digit::BITS % bits == 0 { to_bitwise_digits_le(u, bits) } else { to_inexact_bitwise_digits_le(u, bits) } } else if radix == 10 { // 10 is so common that it's worth separating out for const-propagation. // Optimizers can often turn constant division into a faster multiplication. to_radix_digits_le(u, 10) } else { to_radix_digits_le(u, radix) } } pub fn to_str_radix_reversed(u: &BigUint, radix: u32) -> Vec { assert!(2 <= radix && radix <= 36, "The radix must be within 2...36"); if u.is_zero() { return vec![b'0']; } let mut res = to_radix_le(u, radix); // Now convert everything to ASCII digits. for r in &mut res { debug_assert!((*r as u32) < radix); if *r < 10 { *r += b'0'; } else { *r += b'a' - 10; } } res } impl BigUint { /// Creates and initializes a `BigUint`. /// /// The digits are in little-endian base 2^32. #[inline] pub fn new(digits: Vec) -> BigUint { BigUint { data: digits }.normalize() } /// Creates and initializes a `BigUint`. /// /// The digits are in little-endian base 2^32. #[inline] pub fn from_slice(slice: &[BigDigit]) -> BigUint { BigUint::new(slice.to_vec()) } /// Creates and initializes a `BigUint`. /// /// The bytes are in big-endian byte order. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// assert_eq!(BigUint::from_bytes_be(b"A"), /// BigUint::parse_bytes(b"65", 10).unwrap()); /// assert_eq!(BigUint::from_bytes_be(b"AA"), /// BigUint::parse_bytes(b"16705", 10).unwrap()); /// assert_eq!(BigUint::from_bytes_be(b"AB"), /// BigUint::parse_bytes(b"16706", 10).unwrap()); /// assert_eq!(BigUint::from_bytes_be(b"Hello world!"), /// BigUint::parse_bytes(b"22405534230753963835153736737", 10).unwrap()); /// ``` #[inline] pub fn from_bytes_be(bytes: &[u8]) -> BigUint { if bytes.is_empty() { Zero::zero() } else { let mut v = bytes.to_vec(); v.reverse(); BigUint::from_bytes_le(&*v) } } /// Creates and initializes a `BigUint`. /// /// The bytes are in little-endian byte order. #[inline] pub fn from_bytes_le(bytes: &[u8]) -> BigUint { if bytes.is_empty() { Zero::zero() } else { from_bitwise_digits_le(bytes, 8) } } /// Creates and initializes a `BigUint`. The input slice must contain /// ascii/utf8 characters in [0-9a-zA-Z]. /// `radix` must be in the range `2...36`. /// /// The function `from_str_radix` from the `Num` trait provides the same logic /// for `&str` buffers. /// /// # Examples /// /// ``` /// use num_bigint::{BigUint, ToBigUint}; /// /// assert_eq!(BigUint::parse_bytes(b"1234", 10), ToBigUint::to_biguint(&1234)); /// assert_eq!(BigUint::parse_bytes(b"ABCD", 16), ToBigUint::to_biguint(&0xABCD)); /// assert_eq!(BigUint::parse_bytes(b"G", 16), None); /// ``` #[inline] pub fn parse_bytes(buf: &[u8], radix: u32) -> Option { str::from_utf8(buf).ok().and_then(|s| BigUint::from_str_radix(s, radix).ok()) } /// Creates and initializes a `BigUint`. Each u8 of the input slice is /// interpreted as one digit of the number /// and must therefore be less than `radix`. /// /// The bytes are in big-endian byte order. /// `radix` must be in the range `2...256`. /// /// # Examples /// /// ``` /// use num_bigint::{BigUint}; /// /// let inbase190 = &[15, 33, 125, 12, 14]; /// let a = BigUint::from_radix_be(inbase190, 190).unwrap(); /// assert_eq!(a.to_radix_be(190), inbase190); /// ``` pub fn from_radix_be(buf: &[u8], radix: u32) -> Option { assert!(2 <= radix && radix <= 256, "The radix must be within 2...256"); if radix != 256 && buf.iter().any(|&b| b >= radix as u8) { return None; } let res = if radix.is_power_of_two() { // Powers of two can use bitwise masks and shifting instead of multiplication let bits = ilog2(radix); let mut v = Vec::from(buf); v.reverse(); if big_digit::BITS % bits == 0 { from_bitwise_digits_le(&v, bits) } else { from_inexact_bitwise_digits_le(&v, bits) } } else { from_radix_digits_be(buf, radix) }; Some(res) } /// Creates and initializes a `BigUint`. Each u8 of the input slice is /// interpreted as one digit of the number /// and must therefore be less than `radix`. /// /// The bytes are in little-endian byte order. /// `radix` must be in the range `2...256`. /// /// # Examples /// /// ``` /// use num_bigint::{BigUint}; /// /// let inbase190 = &[14, 12, 125, 33, 15]; /// let a = BigUint::from_radix_be(inbase190, 190).unwrap(); /// assert_eq!(a.to_radix_be(190), inbase190); /// ``` pub fn from_radix_le(buf: &[u8], radix: u32) -> Option { assert!(2 <= radix && radix <= 256, "The radix must be within 2...256"); if radix != 256 && buf.iter().any(|&b| b >= radix as u8) { return None; } let res = if radix.is_power_of_two() { // Powers of two can use bitwise masks and shifting instead of multiplication let bits = ilog2(radix); if big_digit::BITS % bits == 0 { from_bitwise_digits_le(buf, bits) } else { from_inexact_bitwise_digits_le(buf, bits) } } else { let mut v = Vec::from(buf); v.reverse(); from_radix_digits_be(&v, radix) }; Some(res) } /// Returns the byte representation of the `BigUint` in big-endian byte order. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// let i = BigUint::parse_bytes(b"1125", 10).unwrap(); /// assert_eq!(i.to_bytes_be(), vec![4, 101]); /// ``` #[inline] pub fn to_bytes_be(&self) -> Vec { let mut v = self.to_bytes_le(); v.reverse(); v } /// Returns the byte representation of the `BigUint` in little-endian byte order. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// let i = BigUint::parse_bytes(b"1125", 10).unwrap(); /// assert_eq!(i.to_bytes_le(), vec![101, 4]); /// ``` #[inline] pub fn to_bytes_le(&self) -> Vec { if self.is_zero() { vec![0] } else { to_bitwise_digits_le(self, 8) } } /// Returns the integer formatted as a string in the given radix. /// `radix` must be in the range `2...36`. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// let i = BigUint::parse_bytes(b"ff", 16).unwrap(); /// assert_eq!(i.to_str_radix(16), "ff"); /// ``` #[inline] pub fn to_str_radix(&self, radix: u32) -> String { let mut v = to_str_radix_reversed(self, radix); v.reverse(); unsafe { String::from_utf8_unchecked(v) } } /// Returns the integer in the requested base in big-endian digit order. /// The output is not given in a human readable alphabet but as a zero /// based u8 number. /// `radix` must be in the range `2...256`. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// assert_eq!(BigUint::from(0xFFFFu64).to_radix_be(159), /// vec![2, 94, 27]); /// // 0xFFFF = 65535 = 2*(159^2) + 94*159 + 27 /// ``` #[inline] pub fn to_radix_be(&self, radix: u32) -> Vec { let mut v = to_radix_le(self, radix); v.reverse(); v } /// Returns the integer in the requested base in little-endian digit order. /// The output is not given in a human readable alphabet but as a zero /// based u8 number. /// `radix` must be in the range `2...256`. /// /// # Examples /// /// ``` /// use num_bigint::BigUint; /// /// assert_eq!(BigUint::from(0xFFFFu64).to_radix_le(159), /// vec![27, 94, 2]); /// // 0xFFFF = 65535 = 27 + 94*159 + 2*(159^2) /// ``` #[inline] pub fn to_radix_le(&self, radix: u32) -> Vec { to_radix_le(self, radix) } /// Determines the fewest bits necessary to express the `BigUint`. #[inline] pub fn bits(&self) -> usize { if self.is_zero() { return 0; } let zeros = self.data.last().unwrap().leading_zeros(); return self.data.len() * big_digit::BITS - zeros as usize; } /// Strips off trailing zero bigdigits - comparisons require the last element in the vector to /// be nonzero. #[inline] fn normalize(mut self) -> BigUint { while let Some(&0) = self.data.last() { self.data.pop(); } self } } #[cfg(feature = "serde")] impl serde::Serialize for BigUint { fn serialize(&self, serializer: &mut S) -> Result<(), S::Error> where S: serde::Serializer { self.data.serialize(serializer) } } #[cfg(feature = "serde")] impl serde::Deserialize for BigUint { fn deserialize(deserializer: &mut D) -> Result where D: serde::Deserializer { let data = try!(Vec::deserialize(deserializer)); Ok(BigUint { data: data }) } } /// Returns the greatest power of the radix <= big_digit::BASE #[inline] fn get_radix_base(radix: u32) -> (BigDigit, usize) { debug_assert!(2 <= radix && radix <= 256, "The radix must be within 2...256"); debug_assert!(!radix.is_power_of_two()); // To generate this table: // for radix in 2u64..257 { // let mut power = big_digit::BITS / fls(radix as u64); // let mut base = radix.pow(power as u32); // // while let Some(b) = base.checked_mul(radix) { // if b > big_digit::MAX { // break; // } // base = b; // power += 1; // } // // println!("({:10}, {:2}), // {:2}", base, power, radix); // } // and // for radix in 2u64..257 { // let mut power = 64 / fls(radix as u64); // let mut base = radix.pow(power as u32); // // while let Some(b) = base.checked_mul(radix) { // base = b; // power += 1; // } // // println!("({:20}, {:2}), // {:2}", base, power, radix); // } match big_digit::BITS { 32 => { const BASES: [(u32, usize); 257] = [ ( 0, 0), ( 0, 0), ( 0, 0), // 2 (3486784401, 20), // 3 ( 0, 0), // 4 (1220703125, 13), // 5 (2176782336, 12), // 6 (1977326743, 11), // 7 ( 0, 0), // 8 (3486784401, 10), // 9 (1000000000, 9), // 10 (2357947691, 9), // 11 ( 429981696, 8), // 12 ( 815730721, 8), // 13 (1475789056, 8), // 14 (2562890625, 8), // 15 ( 0, 0), // 16 ( 410338673, 7), // 17 ( 612220032, 7), // 18 ( 893871739, 7), // 19 (1280000000, 7), // 20 (1801088541, 7), // 21 (2494357888, 7), // 22 (3404825447, 7), // 23 ( 191102976, 6), // 24 ( 244140625, 6), // 25 ( 308915776, 6), // 26 ( 387420489, 6), // 27 ( 481890304, 6), // 28 ( 594823321, 6), // 29 ( 729000000, 6), // 30 ( 887503681, 6), // 31 ( 0, 0), // 32 (1291467969, 6), // 33 (1544804416, 6), // 34 (1838265625, 6), // 35 (2176782336, 6), // 36 (2565726409, 6), // 37 (3010936384, 6), // 38 (3518743761, 6), // 39 (4096000000, 6), // 40 ( 115856201, 5), // 41 ( 130691232, 5), // 42 ( 147008443, 5), // 43 ( 164916224, 5), // 44 ( 184528125, 5), // 45 ( 205962976, 5), // 46 ( 229345007, 5), // 47 ( 254803968, 5), // 48 ( 282475249, 5), // 49 ( 312500000, 5), // 50 ( 345025251, 5), // 51 ( 380204032, 5), // 52 ( 418195493, 5), // 53 ( 459165024, 5), // 54 ( 503284375, 5), // 55 ( 550731776, 5), // 56 ( 601692057, 5), // 57 ( 656356768, 5), // 58 ( 714924299, 5), // 59 ( 777600000, 5), // 60 ( 844596301, 5), // 61 ( 916132832, 5), // 62 ( 992436543, 5), // 63 ( 0, 0), // 64 (1160290625, 5), // 65 (1252332576, 5), // 66 (1350125107, 5), // 67 (1453933568, 5), // 68 (1564031349, 5), // 69 (1680700000, 5), // 70 (1804229351, 5), // 71 (1934917632, 5), // 72 (2073071593, 5), // 73 (2219006624, 5), // 74 (2373046875, 5), // 75 (2535525376, 5), // 76 (2706784157, 5), // 77 (2887174368, 5), // 78 (3077056399, 5), // 79 (3276800000, 5), // 80 (3486784401, 5), // 81 (3707398432, 5), // 82 (3939040643, 5), // 83 (4182119424, 5), // 84 ( 52200625, 4), // 85 ( 54700816, 4), // 86 ( 57289761, 4), // 87 ( 59969536, 4), // 88 ( 62742241, 4), // 89 ( 65610000, 4), // 90 ( 68574961, 4), // 91 ( 71639296, 4), // 92 ( 74805201, 4), // 93 ( 78074896, 4), // 94 ( 81450625, 4), // 95 ( 84934656, 4), // 96 ( 88529281, 4), // 97 ( 92236816, 4), // 98 ( 96059601, 4), // 99 ( 100000000, 4), // 100 ( 104060401, 4), // 101 ( 108243216, 4), // 102 ( 112550881, 4), // 103 ( 116985856, 4), // 104 ( 121550625, 4), // 105 ( 126247696, 4), // 106 ( 131079601, 4), // 107 ( 136048896, 4), // 108 ( 141158161, 4), // 109 ( 146410000, 4), // 110 ( 151807041, 4), // 111 ( 157351936, 4), // 112 ( 163047361, 4), // 113 ( 168896016, 4), // 114 ( 174900625, 4), // 115 ( 181063936, 4), // 116 ( 187388721, 4), // 117 ( 193877776, 4), // 118 ( 200533921, 4), // 119 ( 207360000, 4), // 120 ( 214358881, 4), // 121 ( 221533456, 4), // 122 ( 228886641, 4), // 123 ( 236421376, 4), // 124 ( 244140625, 4), // 125 ( 252047376, 4), // 126 ( 260144641, 4), // 127 ( 0, 0), // 128 ( 276922881, 4), // 129 ( 285610000, 4), // 130 ( 294499921, 4), // 131 ( 303595776, 4), // 132 ( 312900721, 4), // 133 ( 322417936, 4), // 134 ( 332150625, 4), // 135 ( 342102016, 4), // 136 ( 352275361, 4), // 137 ( 362673936, 4), // 138 ( 373301041, 4), // 139 ( 384160000, 4), // 140 ( 395254161, 4), // 141 ( 406586896, 4), // 142 ( 418161601, 4), // 143 ( 429981696, 4), // 144 ( 442050625, 4), // 145 ( 454371856, 4), // 146 ( 466948881, 4), // 147 ( 479785216, 4), // 148 ( 492884401, 4), // 149 ( 506250000, 4), // 150 ( 519885601, 4), // 151 ( 533794816, 4), // 152 ( 547981281, 4), // 153 ( 562448656, 4), // 154 ( 577200625, 4), // 155 ( 592240896, 4), // 156 ( 607573201, 4), // 157 ( 623201296, 4), // 158 ( 639128961, 4), // 159 ( 655360000, 4), // 160 ( 671898241, 4), // 161 ( 688747536, 4), // 162 ( 705911761, 4), // 163 ( 723394816, 4), // 164 ( 741200625, 4), // 165 ( 759333136, 4), // 166 ( 777796321, 4), // 167 ( 796594176, 4), // 168 ( 815730721, 4), // 169 ( 835210000, 4), // 170 ( 855036081, 4), // 171 ( 875213056, 4), // 172 ( 895745041, 4), // 173 ( 916636176, 4), // 174 ( 937890625, 4), // 175 ( 959512576, 4), // 176 ( 981506241, 4), // 177 (1003875856, 4), // 178 (1026625681, 4), // 179 (1049760000, 4), // 180 (1073283121, 4), // 181 (1097199376, 4), // 182 (1121513121, 4), // 183 (1146228736, 4), // 184 (1171350625, 4), // 185 (1196883216, 4), // 186 (1222830961, 4), // 187 (1249198336, 4), // 188 (1275989841, 4), // 189 (1303210000, 4), // 190 (1330863361, 4), // 191 (1358954496, 4), // 192 (1387488001, 4), // 193 (1416468496, 4), // 194 (1445900625, 4), // 195 (1475789056, 4), // 196 (1506138481, 4), // 197 (1536953616, 4), // 198 (1568239201, 4), // 199 (1600000000, 4), // 200 (1632240801, 4), // 201 (1664966416, 4), // 202 (1698181681, 4), // 203 (1731891456, 4), // 204 (1766100625, 4), // 205 (1800814096, 4), // 206 (1836036801, 4), // 207 (1871773696, 4), // 208 (1908029761, 4), // 209 (1944810000, 4), // 210 (1982119441, 4), // 211 (2019963136, 4), // 212 (2058346161, 4), // 213 (2097273616, 4), // 214 (2136750625, 4), // 215 (2176782336, 4), // 216 (2217373921, 4), // 217 (2258530576, 4), // 218 (2300257521, 4), // 219 (2342560000, 4), // 220 (2385443281, 4), // 221 (2428912656, 4), // 222 (2472973441, 4), // 223 (2517630976, 4), // 224 (2562890625, 4), // 225 (2608757776, 4), // 226 (2655237841, 4), // 227 (2702336256, 4), // 228 (2750058481, 4), // 229 (2798410000, 4), // 230 (2847396321, 4), // 231 (2897022976, 4), // 232 (2947295521, 4), // 233 (2998219536, 4), // 234 (3049800625, 4), // 235 (3102044416, 4), // 236 (3154956561, 4), // 237 (3208542736, 4), // 238 (3262808641, 4), // 239 (3317760000, 4), // 240 (3373402561, 4), // 241 (3429742096, 4), // 242 (3486784401, 4), // 243 (3544535296, 4), // 244 (3603000625, 4), // 245 (3662186256, 4), // 246 (3722098081, 4), // 247 (3782742016, 4), // 248 (3844124001, 4), // 249 (3906250000, 4), // 250 (3969126001, 4), // 251 (4032758016, 4), // 252 (4097152081, 4), // 253 (4162314256, 4), // 254 (4228250625, 4), // 255 ( 0, 0), // 256 ]; let (base, power) = BASES[radix as usize]; (base as BigDigit, power) } 64 => { const BASES: [(u64, usize); 257] = [ ( 0, 0), ( 0, 0), ( 9223372036854775808, 63), // 2 (12157665459056928801, 40), // 3 ( 4611686018427387904, 31), // 4 ( 7450580596923828125, 27), // 5 ( 4738381338321616896, 24), // 6 ( 3909821048582988049, 22), // 7 ( 9223372036854775808, 21), // 8 (12157665459056928801, 20), // 9 (10000000000000000000, 19), // 10 ( 5559917313492231481, 18), // 11 ( 2218611106740436992, 17), // 12 ( 8650415919381337933, 17), // 13 ( 2177953337809371136, 16), // 14 ( 6568408355712890625, 16), // 15 ( 1152921504606846976, 15), // 16 ( 2862423051509815793, 15), // 17 ( 6746640616477458432, 15), // 18 (15181127029874798299, 15), // 19 ( 1638400000000000000, 14), // 20 ( 3243919932521508681, 14), // 21 ( 6221821273427820544, 14), // 22 (11592836324538749809, 14), // 23 ( 876488338465357824, 13), // 24 ( 1490116119384765625, 13), // 25 ( 2481152873203736576, 13), // 26 ( 4052555153018976267, 13), // 27 ( 6502111422497947648, 13), // 28 (10260628712958602189, 13), // 29 (15943230000000000000, 13), // 30 ( 787662783788549761, 12), // 31 ( 1152921504606846976, 12), // 32 ( 1667889514952984961, 12), // 33 ( 2386420683693101056, 12), // 34 ( 3379220508056640625, 12), // 35 ( 4738381338321616896, 12), // 36 ( 6582952005840035281, 12), // 37 ( 9065737908494995456, 12), // 38 (12381557655576425121, 12), // 39 (16777216000000000000, 12), // 40 ( 550329031716248441, 11), // 41 ( 717368321110468608, 11), // 42 ( 929293739471222707, 11), // 43 ( 1196683881290399744, 11), // 44 ( 1532278301220703125, 11), // 45 ( 1951354384207722496, 11), // 46 ( 2472159215084012303, 11), // 47 ( 3116402981210161152, 11), // 48 ( 3909821048582988049, 11), // 49 ( 4882812500000000000, 11), // 50 ( 6071163615208263051, 11), // 51 ( 7516865509350965248, 11), // 52 ( 9269035929372191597, 11), // 53 (11384956040305711104, 11), // 54 (13931233916552734375, 11), // 55 (16985107389382393856, 11), // 56 ( 362033331456891249, 10), // 57 ( 430804206899405824, 10), // 58 ( 511116753300641401, 10), // 59 ( 604661760000000000, 10), // 60 ( 713342911662882601, 10), // 61 ( 839299365868340224, 10), // 62 ( 984930291881790849, 10), // 63 ( 1152921504606846976, 10), // 64 ( 1346274334462890625, 10), // 65 ( 1568336880910795776, 10), // 66 ( 1822837804551761449, 10), // 67 ( 2113922820157210624, 10), // 68 ( 2446194060654759801, 10), // 69 ( 2824752490000000000, 10), // 70 ( 3255243551009881201, 10), // 71 ( 3743906242624487424, 10), // 72 ( 4297625829703557649, 10), // 73 ( 4923990397355877376, 10), // 74 ( 5631351470947265625, 10), // 75 ( 6428888932339941376, 10), // 76 ( 7326680472586200649, 10), // 77 ( 8335775831236199424, 10), // 78 ( 9468276082626847201, 10), // 79 (10737418240000000000, 10), // 80 (12157665459056928801, 10), // 81 (13744803133596058624, 10), // 82 (15516041187205853449, 10), // 83 (17490122876598091776, 10), // 84 ( 231616946283203125, 9), // 85 ( 257327417311663616, 9), // 86 ( 285544154243029527, 9), // 87 ( 316478381828866048, 9), // 88 ( 350356403707485209, 9), // 89 ( 387420489000000000, 9), // 90 ( 427929800129788411, 9), // 91 ( 472161363286556672, 9), // 92 ( 520411082988487293, 9), // 93 ( 572994802228616704, 9), // 94 ( 630249409724609375, 9), // 95 ( 692533995824480256, 9), // 96 ( 760231058654565217, 9), // 97 ( 833747762130149888, 9), // 98 ( 913517247483640899, 9), // 99 ( 1000000000000000000, 9), // 100 ( 1093685272684360901, 9), // 101 ( 1195092568622310912, 9), // 102 ( 1304773183829244583, 9), // 103 ( 1423311812421484544, 9), // 104 ( 1551328215978515625, 9), // 105 ( 1689478959002692096, 9), // 106 ( 1838459212420154507, 9), // 107 ( 1999004627104432128, 9), // 108 ( 2171893279442309389, 9), // 109 ( 2357947691000000000, 9), // 110 ( 2558036924386500591, 9), // 111 ( 2773078757450186752, 9), // 112 ( 3004041937984268273, 9), // 113 ( 3251948521156637184, 9), // 114 ( 3517876291919921875, 9), // 115 ( 3802961274698203136, 9), // 116 ( 4108400332687853397, 9), // 117 ( 4435453859151328768, 9), // 118 ( 4785448563124474679, 9), // 119 ( 5159780352000000000, 9), // 120 ( 5559917313492231481, 9), // 121 ( 5987402799531080192, 9), // 122 ( 6443858614676334363, 9), // 123 ( 6930988311686938624, 9), // 124 ( 7450580596923828125, 9), // 125 ( 8004512848309157376, 9), // 126 ( 8594754748609397887, 9), // 127 ( 9223372036854775808, 9), // 128 ( 9892530380752880769, 9), // 129 (10604499373000000000, 9), // 130 (11361656654439817571, 9), // 131 (12166492167065567232, 9), // 132 (13021612539908538853, 9), // 133 (13929745610903012864, 9), // 134 (14893745087865234375, 9), // 135 (15916595351771938816, 9), // 136 (17001416405572203977, 9), // 137 (18151468971815029248, 9), // 138 ( 139353667211683681, 8), // 139 ( 147578905600000000, 8), // 140 ( 156225851787813921, 8), // 141 ( 165312903998914816, 8), // 142 ( 174859124550883201, 8), // 143 ( 184884258895036416, 8), // 144 ( 195408755062890625, 8), // 145 ( 206453783524884736, 8), // 146 ( 218041257467152161, 8), // 147 ( 230193853492166656, 8), // 148 ( 242935032749128801, 8), // 149 ( 256289062500000000, 8), // 150 ( 270281038127131201, 8), // 151 ( 284936905588473856, 8), // 152 ( 300283484326400961, 8), // 153 ( 316348490636206336, 8), // 154 ( 333160561500390625, 8), // 155 ( 350749278894882816, 8), // 156 ( 369145194573386401, 8), // 157 ( 388379855336079616, 8), // 158 ( 408485828788939521, 8), // 159 ( 429496729600000000, 8), // 160 ( 451447246258894081, 8), // 161 ( 474373168346071296, 8), // 162 ( 498311414318121121, 8), // 163 ( 523300059815673856, 8), // 164 ( 549378366500390625, 8), // 165 ( 576586811427594496, 8), // 166 ( 604967116961135041, 8), // 167 ( 634562281237118976, 8), // 168 ( 665416609183179841, 8), // 169 ( 697575744100000000, 8), // 170 ( 731086699811838561, 8), // 171 ( 765997893392859136, 8), // 172 ( 802359178476091681, 8), // 173 ( 840221879151902976, 8), // 174 ( 879638824462890625, 8), // 175 ( 920664383502155776, 8), // 176 ( 963354501121950081, 8), // 177 ( 1007766734259732736, 8), // 178 ( 1053960288888713761, 8), // 179 ( 1101996057600000000, 8), // 180 ( 1151936657823500641, 8), // 181 ( 1203846470694789376, 8), // 182 ( 1257791680575160641, 8), // 183 ( 1313840315232157696, 8), // 184 ( 1372062286687890625, 8), // 185 ( 1432529432742502656, 8), // 186 ( 1495315559180183521, 8), // 187 ( 1560496482665168896, 8), // 188 ( 1628150074335205281, 8), // 189 ( 1698356304100000000, 8), // 190 ( 1771197285652216321, 8), // 191 ( 1846757322198614016, 8), // 192 ( 1925122952918976001, 8), // 193 ( 2006383000160502016, 8), // 194 ( 2090628617375390625, 8), // 195 ( 2177953337809371136, 8), // 196 ( 2268453123948987361, 8), // 197 ( 2362226417735475456, 8), // 198 ( 2459374191553118401, 8), // 199 ( 2560000000000000000, 8), // 200 ( 2664210032449121601, 8), // 201 ( 2772113166407885056, 8), // 202 ( 2883821021683985761, 8), // 203 ( 2999448015365799936, 8), // 204 ( 3119111417625390625, 8), // 205 ( 3242931408352297216, 8), // 206 ( 3371031134626313601, 8), // 207 ( 3503536769037500416, 8), // 208 ( 3640577568861717121, 8), // 209 ( 3782285936100000000, 8), // 210 ( 3928797478390152481, 8), // 211 ( 4080251070798954496, 8), // 212 ( 4236788918503437921, 8), // 213 ( 4398556620369715456, 8), // 214 ( 4565703233437890625, 8), // 215 ( 4738381338321616896, 8), // 216 ( 4916747105530914241, 8), // 217 ( 5100960362726891776, 8), // 218 ( 5291184662917065441, 8), // 219 ( 5487587353600000000, 8), // 220 ( 5690339646868044961, 8), // 221 ( 5899616690476974336, 8), // 222 ( 6115597639891380481, 8), // 223 ( 6338465731314712576, 8), // 224 ( 6568408355712890625, 8), // 225 ( 6805617133840466176, 8), // 226 ( 7050287992278341281, 8), // 227 ( 7302621240492097536, 8), // 228 ( 7562821648920027361, 8), // 229 ( 7831098528100000000, 8), // 230 ( 8107665808844335041, 8), // 231 ( 8392742123471896576, 8), // 232 ( 8686550888106661441, 8), // 233 ( 8989320386052055296, 8), // 234 ( 9301283852250390625, 8), // 235 ( 9622679558836781056, 8), // 236 ( 9953750901796946721, 8), // 237 (10294746488738365696, 8), // 238 (10645920227784266881, 8), // 239 (11007531417600000000, 8), // 240 (11379844838561358721, 8), // 241 (11763130845074473216, 8), // 242 (12157665459056928801, 8), // 243 (12563730464589807616, 8), // 244 (12981613503750390625, 8), // 245 (13411608173635297536, 8), // 246 (13854014124583882561, 8), // 247 (14309137159611744256, 8), // 248 (14777289335064248001, 8), // 249 (15258789062500000000, 8), // 250 (15753961211814252001, 8), // 251 (16263137215612256256, 8), // 252 (16786655174842630561, 8), // 253 (17324859965700833536, 8), // 254 (17878103347812890625, 8), // 255 ( 72057594037927936, 7), // 256 ]; let (base, power) = BASES[radix as usize]; (base as BigDigit, power) } _ => panic!("Invalid bigdigit size") } }