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package main
import (
"aphopkins/radix_info/factors"
"fmt"
"io"
"math"
"slices"
)
// FactorInfo contains all of the information this program
// calculates about a radix.
type FactorInfo struct {
// The radix this info is about
Radix uint
// A representation of this radix as a product of prime numbers.
// Most of the important info about radices is determined through this.
PrimeFactorization factors.PrimeFactorization
// The radix's factors, in sorted order.
Factors []uint
// An estimate of the utility of the radix's factors.
Score float64
// The number of digits that are totatives (numbers that share no
// factors with the radix - they are the worst kind of digits)
TotativeCount uint
// The fraction of digits that are totatives (numbers that share no
// factors with the radix - they are the worst kind of digits)
TotativeRatio float64
// A rank measuring how well the radix works with the most elementary
// numbers and ratios
BasicRank string
// Whether or not this radix is part of any special factor-related classes.
// This is not calculated if the radix is too large - in this case
// this field will be nil.
Type *factors.NumberType
// An estimate of the complexity of the radix's multiplication table.
// This is not calculated if the radix is too large - in this case
// this field will be nil.
MTC *uint64
// The radix's natural logarithm. This determines the length of numbers
// in this radix - higher Ln means numbers take up fewer digits.
// If c = log(a)/log(b), then numbers in radix b will be around
// c times longer than numbers in radix a.
Ln float64
// Information about each digit's compatibility with the radix.
// This determines what kind of decimal expansion the digit's
// reciprocoal has and what patterns are in its row of the multiplication
// table.
DigitMap []factors.DigitType
}
func GetFactorInfo(radix uint) *FactorInfo {
r_factors := factors.Factors(radix)
slices.Sort(r_factors)
var r_type_ptr *factors.NumberType
var mtc_ptr *uint64
if radix < 1<<32 {
r_type := factors.Type(uint32(radix))
r_type_ptr = &r_type
mtc := factors.MTC(uint64(radix))
mtc_ptr = &mtc
} else {
r_type_ptr = nil
mtc_ptr = nil
}
var digitMap []factors.DigitType
if radix <= maxSmallRadix {
digitMap = factors.DigitMap(radix)
} else {
digitMap = []factors.DigitType{}
}
return &FactorInfo{radix, factors.PrimeFactorize(radix),
r_factors, factors.Score(radix), factors.TotativeCount(radix),
factors.TotativeRatio(radix), factors.BasicRank(radix),
r_type_ptr, mtc_ptr, math.Log(float64(radix)), digitMap}
}
func (fi *FactorInfo) WriteTo(w io.Writer) {
fmt.Fprintln(w, fi.Radix, "=", fi.PrimeFactorization)
fmt.Fprintf(w, "Factors: %v (Score: %.4f)\n", fi.Factors, fi.Score)
fmt.Fprintf(w, "Totative Digit Count: %d (%.3f%%)\n",
fi.TotativeCount, fi.TotativeRatio * 100.0)
fmt.Fprintln(w, "2345 Rank:", fi.BasicRank)
if fi.Type != nil {
writeTypeMessage(w, *fi.Type)
}
if fi.MTC != nil {
fmt.Fprintln(w, "Multiplication Table Complexity:", *fi.MTC)
} else {
fmt.Fprintf(w, "Multiplication Table Complexity ≤ %.4g\n",
float32(fi.Radix)*float32(fi.Radix-2))
}
fmt.Fprintf(w, "Natural Logarithm: %.3f\n", fi.Ln)
if len(fi.DigitMap) > 0 {
writeDigitMap(w, fi.DigitMap)
}
}
func (fi *FactorInfo) WriteToCompact(w io.Writer) {
fmt.Fprintf(w, "%d = %s | σ(n)/n: %.2f | τ(n)/n: %.3f\n",
fi.Radix, fi.PrimeFactorization, fi.Score, fi.TotativeRatio)
fmt.Fprintf(w, "Ln: %.2f", fi.Ln)
if fi.MTC != nil {
fmt.Fprintf(w, " | MTC: %d", *fi.MTC)
}
if fi.Type != nil {
fmt.Fprintf(w, " | %s", typeAbbrev(*fi.Type))
}
fmt.Fprintln(w)
if len(fi.DigitMap) > 0 {
writeDigitMapCompact(w, fi.DigitMap)
}
}
func writeTypeMessage(w io.Writer, t factors.NumberType) {
switch t {
case factors.ColossallyAbundant:
fmt.Fprintln(w, "This radix is colossally abundant!")
case factors.Superabundant:
fmt.Fprintln(w, "This radix is superabundant.")
case factors.OrderedExponent:
fmt.Fprintln(w, "This radix has ordered exponents.")
case factors.Practical:
fmt.Fprintln(w, "This radix is practical.")
}
}
func typeAbbrev(t factors.NumberType) string {
switch t {
case factors.ColossallyAbundant:
return "Colossally Abundant"
case factors.Superabundant:
return "Superabundant"
case factors.OrderedExponent:
return "Ordered Exponents"
case factors.Practical:
return "Practical"
case factors.NotPractical:
return "Not Practical"
default:
panic("Should not be possible to get here.")
}
}
|
