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( =W. =W. =W. =W. =W. %W. =W. =_. =_. =_. =_. =_. =_. =7( 7( 7( 7( ?( H(  4( H( )( H( ( =( =( =( =( ( =>( ( ( ( ( ( ( %' ' ' ' ' ' =( =&( =&( -' -' -( H( =K( H( H' u( H' H' _( H' f(( H' ( H' -' H' -' H' -' H' -' H' -' H' -' -' -' -' -' -' -' -' ' H( =' H]( ' f(' HN( ' %' ' =v' =' %' =' ' ' ' ' ' ' ' ' ' ' ' ' ' ' ' ' HH[Df.`zufۜHHD:tanhmath domain errormath range errorD:tanD:expD:sqrtD:sinhD:sinD:coshD:cosdd:rectD:polarddD:phaseD:log10D|O:logD:isnanD:isinfD:isfiniteD:atanhD:atanD:asinhD:asinD:acoshD:acospitauinfjnanjabrel_tolabs_tolDD|$dd:isclosecmathtolerances must be non-negative??9B.?7'{O^B@Q?Gz?_? @@Ҽz+#@iW @?Uk@& .>9B.?-DT! @-DT!@!3|@-DT!?|)b,g-DT!?!3|-DT! -DT!-DT!?-DT!?!3|@-DT!?-DT! @;,$Hp0ppp@0p`8дhp(pXx `PPp pX`@`hzRx $FJ w?;*3$"D8tD  D dH L D d$8yAD0# AG $AG`5 AB <hAADP AAG _ EAC ,(AKF@f AAF ,DAKFP AAE <thBLA A(D (A ABBG $ADP AB ,AKF@f AAF ,  eAD` AG  AG ,<`AKF@f AAF ,lAKFP AAE ,eAD` AG  AG ,AKF@f AAF ,pAKF@r AAJ ,hDf F \ D 4L`+BNA D   AABF 4XBKA D`  AABG 4BKA DPt  AABF ,hAKF@v AAF D$ZBOB D(A0D 0A(A BBBD l D@x A D@x A D@b J $p5AT AE 4BNA F@i  AABD 4,BNA FP  AABC $dADPP AJ ,0AKF@f AAF ,AKFP AAE $pANP AK $HAN`i AG $<+AP +DdhpK|M|O|W| \f{ ( X{h p o@0   8 @ o oo oQ fv&6FVfv&6FVfvThis module provides access to mathematical functions for complex numbers.isclose($module, /, a, b, *, rel_tol=1e-09, abs_tol=0.0) -- Determine whether two complex numbers are close in value. rel_tol maximum difference for being considered "close", relative to the magnitude of the input values abs_tol maximum difference for being considered "close", regardless of the magnitude of the input values Return True if a is close in value to b, and False otherwise. For the values to be considered close, the difference between them must be smaller than at least one of the tolerances. -inf, inf and NaN behave similarly to the IEEE 754 Standard. That is, NaN is not close to anything, even itself. inf and -inf are only close to themselves.isinf($module, z, /) -- Checks if the real or imaginary part of z is infinite.isnan($module, z, /) -- Checks if the real or imaginary part of z not a number (NaN).isfinite($module, z, /) -- Return True if both the real and imaginary parts of z are finite, else False.rect($module, r, phi, /) -- Convert from polar coordinates to rectangular coordinates.polar($module, z, /) -- Convert a complex from rectangular coordinates to polar coordinates. r is the distance from 0 and phi the phase angle.phase($module, z, /) -- Return argument, also known as the phase angle, of a complex.log($module, x, y_obj=None, /) -- The logarithm of z to the given base. If the base not specified, returns the natural logarithm (base e) of z.tanh($module, z, /) -- Return the hyperbolic tangent of z.tan($module, z, /) -- Return the tangent of z.sqrt($module, z, /) -- Return the square root of z.sinh($module, z, /) -- Return the hyperbolic sine of z.sin($module, z, /) -- Return the sine of z.log10($module, z, /) -- Return the base-10 logarithm of z.exp($module, z, /) -- Return the exponential value e**z.cosh($module, z, /) -- Return the hyperbolic cosine of z.cos($module, z, /) -- Return the cosine of z.atanh($module, z, /) -- Return the inverse hyperbolic tangent of z.atan($module, z, /) -- Return the arc tangent of z.asinh($module, z, /) -- Return the inverse hyperbolic sine of z.asin($module, z, /) -- Return the arc sine of z.acosh($module, z, /) -- Return the inverse hyperbolic cosine of z.acos($module, z, /) -- Return the arc cosine of z._| n| 5|L -|J` &|I |0I |E |D {8 { 8 {P(` f|B | B` {A {A {?@ {> {0> {P=@ { : {3 {3 {.` {p' r{& cmath.cpython-37m-x86_64-linux-gnu.so.debug7zXZִF!t/'C]?Eh=ڊ2NsAh6oik&nu 5eQ|חMz=1GRS.ԹHؼX5AA#'Rއw>hie?%u(ʞ&(F>b0>8TeƛԵQ;2CNev"M3c3ٶ>'_aAoOjd҉̻:tW5MC+:"2K9Z1>Gee"ZS,S &)|yB NX*~QJ\8 I{< Ѿ]@U~%f*LbxOHNh:P 㰻%iU`N]Ë|؟银#oG0Ee.+DJEi9Sʽ㥫ǯe9?jbZjPAZ!FHDE$0֧gYZ.shstrtab.note.gnu.build-id.gnu.hash.dynsym.dynstr.gnu.version.gnu.version_r.rela.dyn.rela.plt.init.text.fini.rodata.eh_frame_hdr.eh_frame.init_array.fini_array.jcr.data.rel.ro.dynamic.got.got.plt.data.bss.gnu_debuglink.gnu_debugdata $o@( 000@@8o  lEo pT @^B88h((cPPnUatX{X{ zp{p{@~@~,pp|h hp px x 0   8 h @  p" 0t