Imaginary base numbers
Imaginary base numbers are a non-standard positional numeral system which uses an imaginary number as its radix. The most common is quater-imaginary with radix 2i. The quater-imaginary numeral system was first proposed by Donald Knuth in 1955 as a submission for a high school science talent search. [Ref.]
Other imaginary bases are possible too but are not as widely discussed and aren't named.
Task: Write a set of procedures (functions, subroutines, however they are referred to in your language) to convert base 10 numbers to imaginary and back. At a minimum, support quater-imaginary (base 2i).
See Wikipedia: Quater-imaginary_base for more details.
For reference, here are some some decimal and complex numbers converted to quater-imaginary.
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D
<lang D>import std.algorithm; import std.array; import std.complex; import std.conv; import std.format; import std.math; import std.stdio; import std.string;
Complex!double inv(Complex!double v) {
auto denom = v.re*v.re + v.im*v.im; return v.conj / denom;
}
QuaterImaginary toQuaterImaginary(Complex!double v) {
if (v.re == 0.0 && v.im == 0.0) return QuaterImaginary("0"); auto re = v.re.to!int; auto im = v.im.to!int; auto fi = -1; auto sb = appender!(char[]); while (re != 0) { auto rem = re % -4; re /= -4; if (rem < 0) { rem = 4 + rem; re++; } sb.formattedWrite("%d", rem); sb.put("0"); } if (im != 0) { auto f = (complex(0.0, v.im) / complex(0.0, 2.0)).re; im = f.ceil.to!int; f = -4.0 * (f - im.to!double); auto index = 1; while (im != 0) { auto rem = im % -4; im /= -4; if (rem < 0) { rem = 4 + rem; im++; } if (index < sb.data.length) { sb.data[index] = cast(char)(rem + '0'); } else { sb.put("0"); sb.formattedWrite("%d", rem); } index += 2; } fi = f.to!int; } sb.data.reverse; if (fi != -1) sb.formattedWrite(".%d", fi); int i; while (i < sb.data.length && sb.data[i] == '0') { i++; } auto s = sb.data[i..$].idup; if (s[0] == '.') s = "0" ~ s; return QuaterImaginary(s);
}
struct QuaterImaginary {
private string b2i;
this(string b2i) { if (b2i == "" || b2i.count('.') > 1) { throw new Exception("Invalid Base 2i number"); } foreach (c; b2i) { if (!canFind("0123.", c)) { throw new Exception("Invalid Base 2i number"); } } this.b2i = b2i; }
T opCast(T : Complex!double)() { auto pointPos = b2i.indexOf('.'); size_t posLen; if (pointPos != -1) { posLen = pointPos; } else { posLen = b2i.length; } auto sum = complex(0.0, 0.0); auto prod = complex(1.0, 0.0); foreach (j; 0..posLen) { auto k = (b2i[posLen - 1 - j] - '0').to!double; if (k > 0.0) { sum += prod * k; } prod *= twoI; } if (pointPos != -1) { prod = invTwoI; foreach (j; posLen+1..b2i.length) { auto k = (b2i[j] - '0').to!double; prod *= invTwoI; } } return sum; }
void toString(scope void delegate(const(char)[]) sink, FormatSpec!char fmt) const { if (fmt.spec == 's') { for (int i=0; i<fmt.width-b2i.length; ++i) { sink(" "); } } sink(b2i); }
enum twoI = complex(0.0, 2.0); enum invTwoI = twoI.inv;
}
unittest {
import std.exception; assertThrown!Exception(QuaterImaginary("")); assertThrown!Exception(QuaterImaginary("1.2.3")); assertThrown!Exception(QuaterImaginary("a")); assertThrown!Exception(QuaterImaginary("4")); assertThrown!Exception(QuaterImaginary(" "));
}
void main() {
foreach (i; 1..17) { auto c1 = complex(i, 0); auto qi = c1.toQuaterImaginary; auto c2 = cast(Complex!double) qi; writef("%4s -> %8s -> %4s ", c1.re, qi, c2.re); c1 = -c1; qi = c1.toQuaterImaginary(); c2 = cast(Complex!double) qi; writefln("%4s -> %8s -> %4s ", c1.re, qi, c2.re); } writeln; foreach (i; 1..17) { auto c1 = complex(0, i); auto qi = c1.toQuaterImaginary; auto c2 = qi.to!(Complex!double); writef("%4s -> %8s -> %4s ", c1.im, qi, c2.im); c1 = -c1; qi = c1.toQuaterImaginary(); c2 = cast(Complex!double) qi; writefln("%4s -> %8s -> %4s ", c1.im, qi, c2.im); }
}</lang>
- Output:
1 -> 1 -> 1 -1 -> 103 -> -1 2 -> 2 -> 2 -2 -> 102 -> -2 3 -> 3 -> 3 -3 -> 101 -> -3 4 -> 10300 -> 4 -4 -> 100 -> -4 5 -> 10301 -> 5 -5 -> 203 -> -5 6 -> 10302 -> 6 -6 -> 202 -> -6 7 -> 10303 -> 7 -7 -> 201 -> -7 8 -> 10200 -> 8 -8 -> 200 -> -8 9 -> 10201 -> 9 -9 -> 303 -> -9 10 -> 10202 -> 10 -10 -> 302 -> -10 11 -> 10203 -> 11 -11 -> 301 -> -11 12 -> 10100 -> 12 -12 -> 300 -> -12 13 -> 10101 -> 13 -13 -> 1030003 -> -13 14 -> 10102 -> 14 -14 -> 1030002 -> -14 15 -> 10103 -> 15 -15 -> 1030001 -> -15 16 -> 10000 -> 16 -16 -> 1030000 -> -16 1 -> 10.2 -> 2 -1 -> 0.2 -> 0 2 -> 10.0 -> 2 -2 -> 1030.0 -> -2 3 -> 20.2 -> 4 -3 -> 1030.2 -> -2 4 -> 20.0 -> 4 -4 -> 1020.0 -> -4 5 -> 30.2 -> 6 -5 -> 1020.2 -> -4 6 -> 30.0 -> 6 -6 -> 1010.0 -> -6 7 -> 103000.2 -> 8 -7 -> 1010.2 -> -6 8 -> 103000.0 -> 8 -8 -> 1000.0 -> -8 9 -> 103010.2 -> 10 -9 -> 1000.2 -> -8 10 -> 103010.0 -> 10 -10 -> 2030.0 -> -10 11 -> 103020.2 -> 12 -11 -> 2030.2 -> -10 12 -> 103020.0 -> 12 -12 -> 2020.0 -> -12 13 -> 103030.2 -> 14 -13 -> 2020.2 -> -12 14 -> 103030.0 -> 14 -14 -> 2010.0 -> -14 15 -> 102000.2 -> 16 -15 -> 2010.2 -> -14 16 -> 102000.0 -> 16 -16 -> 2000.0 -> -16
Java
<lang Java>public class ImaginaryBaseNumber {
private static class Complex { private Double real, imag;
public Complex(double r, double i) { this.real = r; this.imag = i; }
public Complex(int r, int i) { this.real = (double) r; this.imag = (double) i; }
public Complex add(Complex rhs) { return new Complex( real + rhs.real, imag + rhs.imag ); }
public Complex times(Complex rhs) { return new Complex( real * rhs.real - imag * rhs.imag, real * rhs.imag + imag * rhs.real ); }
public Complex times(double rhs) { return new Complex( real * rhs, imag * rhs ); }
public Complex inv() { double denom = real * real + imag * imag; return new Complex( real / denom, -imag / denom ); }
public Complex unaryMinus() { return new Complex(-real, -imag); }
public Complex divide(Complex rhs) { return this.times(rhs.inv()); }
// only works properly if 'real' and 'imag' are both integral public QuaterImaginary toQuaterImaginary() { if (real == 0.0 && imag == 0.0) return new QuaterImaginary("0"); int re = real.intValue(); int im = imag.intValue(); int fi = -1; StringBuilder sb = new StringBuilder(); while (re != 0) { int rem = re % -4; re /= -4; if (rem < 0) { rem += 4; re++; } sb.append(rem); sb.append(0); } if (im != 0) { Double f = new Complex(0.0, imag).divide(new Complex(0.0, 2.0)).real; im = ((Double) Math.ceil(f)).intValue(); f = -4.0 * (f - im); int index = 1; while (im != 0) { int rem = im % -4; im /= -4; if (rem < 0) { rem += 4; im++; } if (index < sb.length()) { sb.setCharAt(index, (char) (rem + 48)); } else { sb.append(0); sb.append(rem); } index += 2; } fi = f.intValue(); } sb.reverse(); if (fi != -1) sb.append(".").append(fi); while (sb.charAt(0) == '0') sb.deleteCharAt(0); if (sb.charAt(0) == '.') sb.insert(0, '0'); return new QuaterImaginary(sb.toString()); }
@Override public String toString() { double real2 = real == -0.0 ? 0.0 : real; // get rid of negative zero double imag2 = imag == -0.0 ? 0.0 : imag; // ditto String result = imag2 >= 0.0 ? String.format("%.0f + %.0fi", real2, imag2) : String.format("%.0f - %.0fi", real2, -imag2); result = result.replace(".0 ", " ").replace(".0i", "i").replace(" + 0i", ""); if (result.startsWith("0 + ")) result = result.substring(4); if (result.startsWith("0 - ")) result = result.substring(4); return result; } }
private static class QuaterImaginary { private static final Complex TWOI = new Complex(0.0, 2.0); private static final Complex INVTWOI = TWOI.inv();
private String b2i;
public QuaterImaginary(String b2i) { if (b2i.equals("") || !b2i.chars().allMatch(c -> "0123.".indexOf(c) > -1) || b2i.chars().filter(c -> c == '.').count() > 1) { throw new RuntimeException("Invalid Base 2i number"); } this.b2i = b2i; }
public Complex toComplex() { int pointPos = b2i.indexOf("."); int posLen = pointPos != -1 ? pointPos : b2i.length(); Complex sum = new Complex(0, 0); Complex prod = new Complex(1, 0);
for (int j = 0; j < posLen; ++j) { double k = b2i.charAt(posLen - 1 - j) - '0'; if (k > 0.0) sum = sum.add(prod.times(k)); prod = prod.times(TWOI); } if (pointPos != -1) { prod = INVTWOI; for (int j = posLen + 1; j < b2i.length(); ++j) { double k = b2i.charAt(j) - '0'; if (k > 0.0) sum = sum.add(prod.times(k)); prod = prod.times(INVTWOI); } }
return sum; }
@Override public String toString() { return b2i; } }
public static void main(String[] args) { String fmt = "%4s -> %8s -> %4s"; for (int i = 1; i <= 16; ++i) { Complex c1 = new Complex(i, 0); QuaterImaginary qi = c1.toQuaterImaginary(); Complex c2 = qi.toComplex(); System.out.printf(fmt + " ", c1, qi, c2); c1 = c2.unaryMinus(); qi = c1.toQuaterImaginary(); c2 = qi.toComplex(); System.out.printf(fmt, c1, qi, c2); System.out.println(); } System.out.println(); for (int i = 1; i <= 16; ++i) { Complex c1 = new Complex(0, i); QuaterImaginary qi = c1.toQuaterImaginary(); Complex c2 = qi.toComplex(); System.out.printf(fmt + " ", c1, qi, c2); c1 = c2.unaryMinus(); qi = c1.toQuaterImaginary(); c2 = qi.toComplex(); System.out.printf(fmt, c1, qi, c2); System.out.println(); } }
}</lang>
- Output:
1 -> 1 -> 1 -1 -> 103 -> -1 2 -> 2 -> 2 -2 -> 102 -> -2 3 -> 3 -> 3 -3 -> 101 -> -3 4 -> 10300 -> 4 -4 -> 100 -> -4 5 -> 10301 -> 5 -5 -> 203 -> -5 6 -> 10302 -> 6 -6 -> 202 -> -6 7 -> 10303 -> 7 -7 -> 201 -> -7 8 -> 10200 -> 8 -8 -> 200 -> -8 9 -> 10201 -> 9 -9 -> 303 -> -9 10 -> 10202 -> 10 -10 -> 302 -> -10 11 -> 10203 -> 11 -11 -> 301 -> -11 12 -> 10100 -> 12 -12 -> 300 -> -12 13 -> 10101 -> 13 -13 -> 1030003 -> -13 14 -> 10102 -> 14 -14 -> 1030002 -> -14 15 -> 10103 -> 15 -15 -> 1030001 -> -15 16 -> 10000 -> 16 -16 -> 1030000 -> -16 1i -> 10.2 -> 1i 1i -> 0.2 -> 1i 2i -> 10.0 -> 2i 2i -> 1030.0 -> 2i 3i -> 20.2 -> 3i 3i -> 1030.2 -> 3i 4i -> 20.0 -> 4i 4i -> 1020.0 -> 4i 5i -> 30.2 -> 5i 5i -> 1020.2 -> 5i 6i -> 30.0 -> 6i 6i -> 1010.0 -> 6i 7i -> 103000.2 -> 7i 7i -> 1010.2 -> 7i 8i -> 103000.0 -> 8i 8i -> 1000.0 -> 8i 9i -> 103010.2 -> 9i 9i -> 1000.2 -> 9i 10i -> 103010.0 -> 10i 10i -> 2030.0 -> 10i 11i -> 103020.2 -> 11i 11i -> 2030.2 -> 11i 12i -> 103020.0 -> 12i 12i -> 2020.0 -> 12i 13i -> 103030.2 -> 13i 13i -> 2020.2 -> 13i 14i -> 103030.0 -> 14i 14i -> 2010.0 -> 14i 15i -> 102000.2 -> 15i 15i -> 2010.2 -> 15i 16i -> 102000.0 -> 16i 16i -> 2000.0 -> 16i
Kotlin
The following deals with conversions to and from quater-imaginary only.
As the JDK lacks a complex number class, I've included a very basic one in the program. <lang scala>// version 1.2.10
import kotlin.math.ceil
class Complex(val real: Double, val imag: Double) {
constructor(r: Int, i: Int) : this(r.toDouble(), i.toDouble())
operator fun plus(other: Complex) = Complex(real + other.real, imag + other.imag)
operator fun times(other: Complex) = Complex( real * other.real - imag * other.imag, real * other.imag + imag * other.real )
operator fun times(other: Double) = Complex(real * other, imag * other)
fun inv(): Complex { val denom = real * real + imag * imag return Complex(real / denom, -imag / denom) }
operator fun unaryMinus() = Complex(-real, -imag)
operator fun minus(other: Complex) = this + (-other)
operator fun div(other: Complex) = this * other.inv()
// only works properly if 'real' and 'imag' are both integral fun toQuaterImaginary(): QuaterImaginary { if (real == 0.0 && imag == 0.0) return QuaterImaginary("0") var re = real.toInt() var im = imag.toInt() var fi = -1 val sb = StringBuilder() while (re != 0) { var rem = re % -4 re /= -4 if (rem < 0) { rem = 4 + rem re++ } sb.append(rem) sb.append(0) } if (im != 0) { var f = (Complex(0.0, imag) / Complex(0.0, 2.0)).real im = ceil(f).toInt() f = -4.0 * (f - im.toDouble()) var index = 1 while (im != 0) { var rem = im % -4 im /= -4 if (rem < 0) { rem = 4 + rem im++ } if (index < sb.length) { sb[index] = (rem + 48).toChar() } else { sb.append(0) sb.append(rem) } index += 2 } fi = f.toInt() } sb.reverse() if (fi != -1) sb.append(".$fi") var s = sb.toString().trimStart('0') if (s.startsWith(".")) s = "0$s" return QuaterImaginary(s) }
override fun toString(): String { val real2 = if (real == -0.0) 0.0 else real // get rid of negative zero val imag2 = if (imag == -0.0) 0.0 else imag // ditto var result = if (imag2 >= 0.0) "$real2 + ${imag2}i" else "$real2 - ${-imag2}i" result = result.replace(".0 ", " ").replace(".0i", "i").replace(" + 0i", "") if (result.startsWith("0 + ")) result = result.drop(4) if (result.startsWith("0 - ")) result = "-" + result.drop(4) return result }
}
class QuaterImaginary(val b2i: String) {
init { if (b2i == "" || !b2i.all { it in "0123." } || b2i.count { it == '.'} > 1 ) throw RuntimeException("Invalid Base 2i number") }
fun toComplex(): Complex { val pointPos = b2i.indexOf(".") var posLen = if (pointPos != -1) pointPos else b2i.length var sum = Complex(0.0, 0.0) var prod = Complex(1.0, 0.0) for (j in 0 until posLen) { val k = (b2i[posLen - 1 - j] - '0').toDouble() if (k > 0.0) sum += prod * k prod *= twoI } if (pointPos != -1) { prod = invTwoI for (j in posLen + 1 until b2i.length) { val k = (b2i[j] - '0').toDouble() if (k > 0.0) sum += prod * k prod *= invTwoI } } return sum }
override fun toString() = b2i
companion object { val twoI = Complex(0.0, 2.0) val invTwoI = twoI.inv() }
}
fun main(args: Array<String>) {
val fmt = "%4s -> %8s -> %4s" for (i in 1..16) { var c1 = Complex(i, 0) var qi = c1.toQuaterImaginary() var c2 = qi.toComplex() print("$fmt ".format(c1, qi, c2)) c1 = -c1 qi = c1.toQuaterImaginary() c2 = qi.toComplex() println(fmt.format(c1, qi, c2)) } println() for (i in 1..16) { var c1 = Complex(0, i) var qi = c1.toQuaterImaginary() var c2 = qi.toComplex() print("$fmt ".format(c1, qi, c2)) c1 = -c1 qi = c1.toQuaterImaginary() c2 = qi.toComplex() println(fmt.format(c1, qi, c2)) }
}</lang>
- Output:
1 -> 1 -> 1 -1 -> 103 -> -1 2 -> 2 -> 2 -2 -> 102 -> -2 3 -> 3 -> 3 -3 -> 101 -> -3 4 -> 10300 -> 4 -4 -> 100 -> -4 5 -> 10301 -> 5 -5 -> 203 -> -5 6 -> 10302 -> 6 -6 -> 202 -> -6 7 -> 10303 -> 7 -7 -> 201 -> -7 8 -> 10200 -> 8 -8 -> 200 -> -8 9 -> 10201 -> 9 -9 -> 303 -> -9 10 -> 10202 -> 10 -10 -> 302 -> -10 11 -> 10203 -> 11 -11 -> 301 -> -11 12 -> 10100 -> 12 -12 -> 300 -> -12 13 -> 10101 -> 13 -13 -> 1030003 -> -13 14 -> 10102 -> 14 -14 -> 1030002 -> -14 15 -> 10103 -> 15 -15 -> 1030001 -> -15 16 -> 10000 -> 16 -16 -> 1030000 -> -16 1i -> 10.2 -> 1i -1i -> 0.2 -> -1i 2i -> 10.0 -> 2i -2i -> 1030.0 -> -2i 3i -> 20.2 -> 3i -3i -> 1030.2 -> -3i 4i -> 20.0 -> 4i -4i -> 1020.0 -> -4i 5i -> 30.2 -> 5i -5i -> 1020.2 -> -5i 6i -> 30.0 -> 6i -6i -> 1010.0 -> -6i 7i -> 103000.2 -> 7i -7i -> 1010.2 -> -7i 8i -> 103000.0 -> 8i -8i -> 1000.0 -> -8i 9i -> 103010.2 -> 9i -9i -> 1000.2 -> -9i 10i -> 103010.0 -> 10i -10i -> 2030.0 -> -10i 11i -> 103020.2 -> 11i -11i -> 2030.2 -> -11i 12i -> 103020.0 -> 12i -12i -> 2020.0 -> -12i 13i -> 103030.2 -> 13i -13i -> 2020.2 -> -13i 14i -> 103030.0 -> 14i -14i -> 2010.0 -> -14i 15i -> 102000.2 -> 15i -15i -> 2010.2 -> -15i 16i -> 102000.0 -> 16i -16i -> 2000.0 -> -16i
Perl 6
These are generalized imaginary-base conversion routines. They only work for imaginary bases, not complex. (Any real portion of the radix must be zero.) Theoretically they could be made to work for any imaginary base; in practice, they are limited to integer bases from -6i to -2i and 2i to 6i. Bases -1i and 1i exist but require special handling and are not supported. Bases larger than 6i (or -6i) require digits outside of base 36 to express them, so aren't as standardized, are implementation dependent and are not supported here. Note that imaginary number coefficients are stored as floating point numbers in Perl 6 so some rounding error may creep in during calculations. The precision these conversion routines use is configurable; we are using 8 decimal, um... radicimal(?) places of precision here.
Note that this implementation can convert any number, not just integers.
<lang perl6>multi sub base ( Real $num, Int $radix where -37 < * < -1, :$precision = -15 ) {
return '0' unless $num; my $value = $num; my $result = ; my $place = 0; my $upper-bound = 1 / (-$radix + 1); my $lower-bound = $radix * $upper-bound;
$value = $num / $radix ** ++$place until $lower-bound <= $value < $upper-bound;
while ($value or $place > 0) and $place > $precision { my $digit = ($radix * $value - $lower-bound).Int; $value = $radix * $value - $digit; $result ~= '.' unless $place or $result.contains: '.'; $result ~= $digit == -$radix ?? ($digit-1).base(-$radix)~'0' !! $digit.base(-$radix); $place-- } $result
}
multi sub base (Numeric $num, Complex $radix where *.re == 0, :$precision = -8 ) {
die "Base $radix out of range" unless -6 <= $radix.im <= -2 or 2 <= $radix.im <= 6; my ($re, $im) = $num.Complex.reals; my ($re-wh, $re-fr) = $re.&base( -$radix.im².Int, :precision($precision) ).split: '.'; my ($im-wh, $im-fr) = ($im/$radix.im).&base( -$radix.im².Int, :precision($precision) ).split: '.'; $_ //= for $re-fr, $im-fr;
sub zip (Str $a, Str $b) { my $l = '0' x ($a.chars - $b.chars).abs; ([~] flat ($a~$l).comb Z flat ($b~$l).comb).subst(/ '0'+ $ /, ) || '0' }
my $whole = flip zip $re-wh.flip, $im-wh.flip; my $fraction = zip $im-fr, $re-fr; $fraction eq 0 ?? "$whole" !! "$whole.$fraction"
}
multi sub parse-base (Str $str, Complex $radix where *.re == 0) {
return -1 * $str.substr(1).&parse-base($radix) if $str.substr(0,1) eq '-'; my ($whole, $frac) = $str.split: '.'; my $fraction = 0; $fraction = [+] $frac.comb.kv.map: { $^v.parse-base($radix.im².Int) * $radix ** -($^k+1) } if $frac; $fraction + [+] $whole.flip.comb.kv.map: { $^v.parse-base($radix.im².Int) * $radix ** $^k }
}
- TESTING
for 0, 2i, 1, 2i, 5, 2i, -13, 2i, 9i, 2i, -3i, 2i, 7.75-7.5i, 2i, .25, 2i, # base 2i tests
5+5i, 2i, 5+5i, 3i, 5+5i, 4i, 5+5i, 5i, 5+5i, 6i, # same value, positive imaginary bases 5+5i, -2i, 5+5i, -3i, 5+5i, -4i, 5+5i, -5i, 5+5i, -6i, # same value, negative imaginary bases 227.65625+10.859375i, 4i, # larger test value 31433.3487654321-2902.4480452675i, 6i # heh -> $v, $r {
my $ibase = $v.&base($r, :precision(-6)); printf "%33s.&base\(%2si\) = %-11s : %13s.&parse-base\(%2si\) = %s\n",
$v, $r.im, $ibase, "'$ibase'", $r.im, $ibase.&parse-base($r).round(1e-10).narrow;
}</lang>
- Output:
0.&base( 2i) = 0 : '0'.&parse-base( 2i) = 0 1.&base( 2i) = 1 : '1'.&parse-base( 2i) = 1 5.&base( 2i) = 10301 : '10301'.&parse-base( 2i) = 5 -13.&base( 2i) = 1030003 : '1030003'.&parse-base( 2i) = -13 0+9i.&base( 2i) = 103010.2 : '103010.2'.&parse-base( 2i) = 0+9i -0-3i.&base( 2i) = 1030.2 : '1030.2'.&parse-base( 2i) = 0-3i 7.75-7.5i.&base( 2i) = 11210.31 : '11210.31'.&parse-base( 2i) = 7.75-7.5i 0.25.&base( 2i) = 1.03 : '1.03'.&parse-base( 2i) = 0.25 5+5i.&base( 2i) = 10331.2 : '10331.2'.&parse-base( 2i) = 5+5i 5+5i.&base( 3i) = 25.3 : '25.3'.&parse-base( 3i) = 5+5i 5+5i.&base( 4i) = 25.C : '25.C'.&parse-base( 4i) = 5+5i 5+5i.&base( 5i) = 15 : '15'.&parse-base( 5i) = 5+5i 5+5i.&base( 6i) = 15.6 : '15.6'.&parse-base( 6i) = 5+5i 5+5i.&base(-2i) = 11321.2 : '11321.2'.&parse-base(-2i) = 5+5i 5+5i.&base(-3i) = 1085.6 : '1085.6'.&parse-base(-3i) = 5+5i 5+5i.&base(-4i) = 10F5.4 : '10F5.4'.&parse-base(-4i) = 5+5i 5+5i.&base(-5i) = 10O5 : '10O5'.&parse-base(-5i) = 5+5i 5+5i.&base(-6i) = 5.U : '5.U'.&parse-base(-6i) = 5+5i 227.65625+10.859375i.&base( 4i) = 10234.5678 : '10234.5678'.&parse-base( 4i) = 227.65625+10.859375i 31433.3487654321-2902.4480452675i.&base( 6i) = PERL6.ROCKS : 'PERL6.ROCKS'.&parse-base( 6i) = 31433.3487654321-2902.4480452675i
Sidef
<lang ruby>func base (Number num, Number radix { _ ~~ (-36 .. -2) }, precision = -15) -> String {
num || return '0'
var place = 0 var result = var value = num var upper_bound = 1/(-radix + 1) var lower_bound = radix*upper_bound
while (!(lower_bound <= value) || !(value < upper_bound)) { value = num/(radix**++place) }
while ((value || (place > 0)) && (place > precision)) { var digit = (radix*value - lower_bound -> int) value = (radix*value - digit) result += '.' if (!place && !result.contains('.')) result += ((digit == -radix) ? (digit-1 -> base(-radix) + '0') : digit.base(-radix)) place-- }
return result
}
func base (Number num, Number radix { .re == 0 }, precision = -8) -> String {
(radix.im.abs ~~ 2..6) || die "Base #{radix} out of range"
var (re, im) = (num.re, num.im) var (re_wh, re_fr=) = base(re, -radix.im**2, precision).split('.')... var (im_wh, im_fr=) = base(im/radix.im, -radix.im**2, precision).split('.')...
func zip (String a, String b) { var l = ('0' * abs(a.len - b.len)) chars(a+l) ~Z chars(b+l) -> flat.join.sub(/0+\z/, ) || '0' }
var whole = zip(re_wh.flip, im_wh.flip).flip var fraction = zip(im_fr, re_fr) fraction == '0' ? whole : "#{whole}.#{fraction}"
}
func parse_base (String str, Number radix { .re == 0 }) -> Number {
if (str.char(0) == '-') { return (-1 * parse_base(str.substr(1), radix)) }
var (whole, frac=) = str.split('.')...
var fraction = frac.chars.map_kv {|k,v| Number(v, radix.im**2) * radix**-(k+1) }.sum
fraction += whole.flip.chars.map_kv {|k,v| Number(v, radix.im**2) * radix**k }.sum
return fraction
}
var tests = [0, 2i, 1, 2i, 5, 2i, -13, 2i, 9i, 2i, -3i, 2i, 7.75-7.5i, 2i, .25, 2i, # base 2i tests
5+5i, 2i, 5+5i, 3i, 5+5i, 4i, 5+5i, 5i, 5+5i, 6i, # same value, positive imaginary bases 5+5i, -2i, 5+5i, -3i, 5+5i, -4i, 5+5i, -5i, 5+5i, -6i, # same value, negative imaginary bases 227.65625+10.859375i, 4i] # larger test value
tests.each_slice(2, {|v,r|
var ibase = base(v, r) printf("base(%20s, %2si) = %-10s : parse_base(%12s, %2si) = %s\n", v, r.im, ibase, "'#{ibase}'", r.im, parse_base(ibase, r).round(-8))
})</lang>
- Output:
base( 0, 2i) = 0 : parse_base( '0', 2i) = 0 base( 1, 2i) = 1 : parse_base( '1', 2i) = 1 base( 5, 2i) = 10301 : parse_base( '10301', 2i) = 5 base( -13, 2i) = 1030003 : parse_base( '1030003', 2i) = -13 base( 9i, 2i) = 103010.2 : parse_base( '103010.2', 2i) = 9i base( -3i, 2i) = 1030.2 : parse_base( '1030.2', 2i) = -3i base( 7.75-7.5i, 2i) = 11210.31 : parse_base( '11210.31', 2i) = 7.75-7.5i base( 0.25, 2i) = 1.03 : parse_base( '1.03', 2i) = 0.25 base( 5+5i, 2i) = 10331.2 : parse_base( '10331.2', 2i) = 5+5i base( 5+5i, 3i) = 25.3 : parse_base( '25.3', 3i) = 5+5i base( 5+5i, 4i) = 25.c : parse_base( '25.c', 4i) = 5+5i base( 5+5i, 5i) = 15 : parse_base( '15', 5i) = 5+5i base( 5+5i, 6i) = 15.6 : parse_base( '15.6', 6i) = 5+5i base( 5+5i, -2i) = 11321.2 : parse_base( '11321.2', -2i) = 5+5i base( 5+5i, -3i) = 1085.6 : parse_base( '1085.6', -3i) = 5+5i base( 5+5i, -4i) = 10f5.4 : parse_base( '10f5.4', -4i) = 5+5i base( 5+5i, -5i) = 10o5 : parse_base( '10o5', -5i) = 5+5i base( 5+5i, -6i) = 5.u : parse_base( '5.u', -6i) = 5+5i base(227.65625+10.859375i, 4i) = 10234.5678 : parse_base('10234.5678', 4i) = 227.65625+10.859375i