1math::complexnumbers(n) Tcl Math Library math::complexnumbers(n)
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8 math::complexnumbers - Straightforward complex number package
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11 package require Tcl 8.3
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13 package require math::complexnumbers ?1.0.2?
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15 ::math::complexnumbers::+ z1 z2
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17 ::math::complexnumbers::- z1 z2
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19 ::math::complexnumbers::* z1 z2
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21 ::math::complexnumbers::/ z1 z2
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23 ::math::complexnumbers::conj z1
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25 ::math::complexnumbers::real z1
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27 ::math::complexnumbers::imag z1
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29 ::math::complexnumbers::mod z1
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31 ::math::complexnumbers::arg z1
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33 ::math::complexnumbers::complex real imag
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35 ::math::complexnumbers::tostring z1
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37 ::math::complexnumbers::exp z1
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39 ::math::complexnumbers::sin z1
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41 ::math::complexnumbers::cos z1
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43 ::math::complexnumbers::tan z1
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45 ::math::complexnumbers::log z1
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47 ::math::complexnumbers::sqrt z1
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49 ::math::complexnumbers::pow z1 z2
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54 The mathematical module complexnumbers provides a straightforward
55 implementation of complex numbers in pure Tcl. The philosophy is that
56 the user knows he or she is dealing with complex numbers in an abstract
57 way and wants as high a performance as can be had within the limita‐
58 tions of an interpreted language.
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60 Therefore the procedures defined in this package assume that the argu‐
61 ments are valid (representations of) "complex numbers", that is, lists
62 of two numbers defining the real and imaginary part of a complex number
63 (though this is a mere detail: rely on the complex command to construct
64 a valid number.)
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66 Most procedures implement the basic arithmetic operations or elementary
67 functions whereas several others convert to and from different repre‐
68 sentations:
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70 set z [complex 0 1]
71 puts "z = [tostring $z]"
72 puts "z**2 = [* $z $z]
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74 would result in:
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77 z = i
78 z**2 = -1
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82 The package implements all or most basic operations and elementary
83 functions.
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85 The arithmetic operations are:
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87 ::math::complexnumbers::+ z1 z2
88 Add the two arguments and return the resulting complex number
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90 complex z1 (in)
91 First argument in the summation
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93 complex z2 (in)
94 Second argument in the summation
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97 ::math::complexnumbers::- z1 z2
98 Subtract the second argument from the first and return the
99 resulting complex number. If there is only one argument, the
100 opposite of z1 is returned (i.e. -z1)
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102 complex z1 (in)
103 First argument in the subtraction
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105 complex z2 (in)
106 Second argument in the subtraction (optional)
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109 ::math::complexnumbers::* z1 z2
110 Multiply the two arguments and return the resulting complex num‐
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113 complex z1 (in)
114 First argument in the multiplication
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116 complex z2 (in)
117 Second argument in the multiplication
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120 ::math::complexnumbers::/ z1 z2
121 Divide the first argument by the second and return the resulting
122 complex number
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124 complex z1 (in)
125 First argument (numerator) in the division
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127 complex z2 (in)
128 Second argument (denominator) in the division
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131 ::math::complexnumbers::conj z1
132 Return the conjugate of the given complex number
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134 complex z1 (in)
135 Complex number in question
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138 Conversion/inquiry procedures:
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140 ::math::complexnumbers::real z1
141 Return the real part of the given complex number
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143 complex z1 (in)
144 Complex number in question
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147 ::math::complexnumbers::imag z1
148 Return the imaginary part of the given complex number
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150 complex z1 (in)
151 Complex number in question
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154 ::math::complexnumbers::mod z1
155 Return the modulus of the given complex number
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157 complex z1 (in)
158 Complex number in question
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161 ::math::complexnumbers::arg z1
162 Return the argument ("angle" in radians) of the given complex
163 number
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165 complex z1 (in)
166 Complex number in question
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169 ::math::complexnumbers::complex real imag
170 Construct the complex number "real + imag*i" and return it
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172 float real (in)
173 The real part of the new complex number
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175 float imag (in)
176 The imaginary part of the new complex number
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179 ::math::complexnumbers::tostring z1
180 Convert the complex number to the form "real + imag*i" and
181 return the string
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183 float complex (in)
184 The complex number to be converted
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187 Elementary functions:
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189 ::math::complexnumbers::exp z1
190 Calculate the exponential for the given complex argument and
191 return the result
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193 complex z1 (in)
194 The complex argument for the function
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197 ::math::complexnumbers::sin z1
198 Calculate the sine function for the given complex argument and
199 return the result
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201 complex z1 (in)
202 The complex argument for the function
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205 ::math::complexnumbers::cos z1
206 Calculate the cosine function for the given complex argument and
207 return the result
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209 complex z1 (in)
210 The complex argument for the function
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213 ::math::complexnumbers::tan z1
214 Calculate the tangent function for the given complex argument
215 and return the result
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217 complex z1 (in)
218 The complex argument for the function
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221 ::math::complexnumbers::log z1
222 Calculate the (principle value of the) logarithm for the given
223 complex argument and return the result
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225 complex z1 (in)
226 The complex argument for the function
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229 ::math::complexnumbers::sqrt z1
230 Calculate the (principle value of the) square root for the given
231 complex argument and return the result
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233 complex z1 (in)
234 The complex argument for the function
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237 ::math::complexnumbers::pow z1 z2
238 Calculate "z1 to the power of z2" and return the result
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240 complex z1 (in)
241 The complex number to be raised to a power
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243 complex z2 (in)
244 The complex power to be used
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247 This document, and the package it describes, will undoubtedly contain
248 bugs and other problems. Please report such in the category math ::
249 complexnumbers of the Tcllib Trackers
250 [http://core.tcl.tk/tcllib/reportlist]. Please also report any ideas
251 for enhancements you may have for either package and/or documentation.
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253 When proposing code changes, please provide unified diffs, i.e the out‐
254 put of diff -u.
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256 Note further that attachments are strongly preferred over inlined
257 patches. Attachments can be made by going to the Edit form of the
258 ticket immediately after its creation, and then using the left-most
259 button in the secondary navigation bar.
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262 complex numbers, math
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265 Mathematics
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268 Copyright (c) 2004 Arjen Markus <arjenmarkus@users.sourceforge.net>
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273tcllib 1.0.2 math::complexnumbers(n)