// Copyright 2010 The Go Authors. All rights reserved. // Use of this source code is governed by a BSD-style // license that can be found in the LICENSE file. // This file implements multi-precision rational numbers. package big import "strings" // A Rat represents a quotient a/b of arbitrary precision. The zero value for // a Rat, 0/0, is not a legal Rat. type Rat struct { a Int b nat } // NewRat creates a new Rat with numerator a and denominator b. func NewRat(a, b int64) *Rat { return new(Rat).SetFrac64(a, b) } // SetFrac sets z to a/b and returns z. func (z *Rat) SetFrac(a, b *Int) *Rat { z.a.Set(a) z.a.neg = a.neg != b.neg z.b = z.b.set(b.abs) return z.norm() } // SetFrac64 sets z to a/b and returns z. func (z *Rat) SetFrac64(a, b int64) *Rat { z.a.SetInt64(a) if b < 0 { b = -b z.a.neg = !z.a.neg } z.b = z.b.setUint64(uint64(b)) return z.norm() } // SetInt sets z to x (by making a copy of x) and returns z. func (z *Rat) SetInt(x *Int) *Rat { z.a.Set(x) z.b = z.b.setWord(1) return z } // SetInt64 sets z to x and returns z. func (z *Rat) SetInt64(x int64) *Rat { z.a.SetInt64(x) z.b = z.b.setWord(1) return z } // Sign returns: // // -1 if x < 0 // 0 if x == 0 // +1 if x > 0 // func (x *Rat) Sign() int { return x.a.Sign() } // IsInt returns true if the denominator of x is 1. func (x *Rat) IsInt() bool { return len(x.b) == 1 && x.b[0] == 1 } // Num returns the numerator of z; it may be <= 0. // The result is a reference to z's numerator; it // may change if a new value is assigned to z. func (z *Rat) Num() *Int { return &z.a } // Demom returns the denominator of z; it is always > 0. // The result is a reference to z's denominator; it // may change if a new value is assigned to z. func (z *Rat) Denom() *Int { return &Int{false, z.b} } func gcd(x, y nat) nat { // Euclidean algorithm. var a, b nat a = a.set(x) b = b.set(y) for len(b) != 0 { var q, r nat _, r = q.div(r, a, b) a = b b = r } return a } func (z *Rat) norm() *Rat { f := gcd(z.a.abs, z.b) if len(z.a.abs) == 0 { // z == 0 z.a.neg = false // normalize sign z.b = z.b.setWord(1) return z } if f.cmp(natOne) != 0 { z.a.abs, _ = z.a.abs.div(nil, z.a.abs, f) z.b, _ = z.b.div(nil, z.b, f) } return z } func mulNat(x *Int, y nat) *Int { var z Int z.abs = z.abs.mul(x.abs, y) z.neg = len(z.abs) > 0 && x.neg return &z } // Cmp compares x and y and returns: // // -1 if x < y // 0 if x == y // +1 if x > y // func (x *Rat) Cmp(y *Rat) (r int) { return mulNat(&x.a, y.b).Cmp(mulNat(&y.a, x.b)) } // Abs sets z to |x| (the absolute value of x) and returns z. func (z *Rat) Abs(x *Rat) *Rat { z.a.Abs(&x.a) z.b = z.b.set(x.b) return z } // Add sets z to the sum x+y and returns z. func (z *Rat) Add(x, y *Rat) *Rat { a1 := mulNat(&x.a, y.b) a2 := mulNat(&y.a, x.b) z.a.Add(a1, a2) z.b = z.b.mul(x.b, y.b) return z.norm() } // Sub sets z to the difference x-y and returns z. func (z *Rat) Sub(x, y *Rat) *Rat { a1 := mulNat(&x.a, y.b) a2 := mulNat(&y.a, x.b) z.a.Sub(a1, a2) z.b = z.b.mul(x.b, y.b) return z.norm() } // Mul sets z to the product x*y and returns z. func (z *Rat) Mul(x, y *Rat) *Rat { z.a.Mul(&x.a, &y.a) z.b = z.b.mul(x.b, y.b) return z.norm() } // Quo sets z to the quotient x/y and returns z. // If y == 0, a division-by-zero run-time panic occurs. func (z *Rat) Quo(x, y *Rat) *Rat { if len(y.a.abs) == 0 { panic("division by zero") } a := mulNat(&x.a, y.b) b := mulNat(&y.a, x.b) z.a.abs = a.abs z.b = b.abs z.a.neg = a.neg != b.neg return z.norm() } // Neg sets z to -x (by making a copy of x if necessary) and returns z. func (z *Rat) Neg(x *Rat) *Rat { z.a.Neg(&x.a) z.b = z.b.set(x.b) return z } // Set sets z to x (by making a copy of x if necessary) and returns z. func (z *Rat) Set(x *Rat) *Rat { z.a.Set(&x.a) z.b = z.b.set(x.b) return z } // SetString sets z to the value of s and returns z and a boolean indicating // success. s can be given as a fraction "a/b" or as a floating-point number // optionally followed by an exponent. If the operation failed, the value of z // is undefined. func (z *Rat) SetString(s string) (*Rat, bool) { if len(s) == 0 { return z, false } // check for a quotient sep := strings.Index(s, "/") if sep >= 0 { if _, ok := z.a.SetString(s[0:sep], 10); !ok { return z, false } s = s[sep+1:] var n int if z.b, _, n = z.b.scan(s, 10); n != len(s) { return z, false } return z.norm(), true } // check for a decimal point sep = strings.Index(s, ".") // check for an exponent e := strings.IndexAny(s, "eE") var exp Int if e >= 0 { if e < sep { // The E must come after the decimal point. return z, false } if _, ok := exp.SetString(s[e+1:], 10); !ok { return z, false } s = s[0:e] } if sep >= 0 { s = s[0:sep] + s[sep+1:] exp.Sub(&exp, NewInt(int64(len(s)-sep))) } if _, ok := z.a.SetString(s, 10); !ok { return z, false } powTen := nat{}.expNN(natTen, exp.abs, nil) if exp.neg { z.b = powTen z.norm() } else { z.a.abs = z.a.abs.mul(z.a.abs, powTen) z.b = z.b.setWord(1) } return z, true } // String returns a string representation of z in the form "a/b" (even if b == 1). func (z *Rat) String() string { return z.a.String() + "/" + z.b.string(10) } // RatString returns a string representation of z in the form "a/b" if b != 1, // and in the form "a" if b == 1. func (z *Rat) RatString() string { if z.IsInt() { return z.a.String() } return z.String() } // FloatString returns a string representation of z in decimal form with prec // digits of precision after the decimal point and the last digit rounded. func (z *Rat) FloatString(prec int) string { if z.IsInt() { return z.a.String() } q, r := nat{}.div(nat{}, z.a.abs, z.b) p := natOne if prec > 0 { p = nat{}.expNN(natTen, nat{}.setUint64(uint64(prec)), nil) } r = r.mul(r, p) r, r2 := r.div(nat{}, r, z.b) // see if we need to round up r2 = r2.add(r2, r2) if z.b.cmp(r2) <= 0 { r = r.add(r, natOne) if r.cmp(p) >= 0 { q = nat{}.add(q, natOne) r = nat{}.sub(r, p) } } s := q.string(10) if z.a.neg { s = "-" + s } if prec > 0 { rs := r.string(10) leadingZeros := prec - len(rs) s += "." + strings.Repeat("0", leadingZeros) + rs } return s }