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https://github.com/KolibriOS/kolibrios.git
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git-svn-id: svn://kolibrios.org@8097 a494cfbc-eb01-0410-851d-a64ba20cac60
463 lines
9.8 KiB
Plaintext
463 lines
9.8 KiB
Plaintext
(* ***********************************************
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Модуль работы с комплексными числами.
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Вадим Исаев, 2020
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Module for complex numbers.
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Vadim Isaev, 2020
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*************************************************** *)
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MODULE CMath;
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IMPORT Math, Out;
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TYPE
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complex* = POINTER TO RECORD
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re*: REAL;
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im*: REAL
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END;
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VAR
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result: complex;
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i* : complex;
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_0*: complex;
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(* Инициализация комплексного числа.
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Init complex number. *)
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PROCEDURE CInit* (re : REAL; im: REAL): complex;
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VAR
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temp: complex;
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BEGIN
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NEW(temp);
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temp.re:=re;
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temp.im:=im;
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RETURN temp
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END CInit;
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(* Четыре основных арифметических операций.
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Four base operations +, -, * , / *)
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(* Сложение
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addition : z := z1 + z2 *)
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PROCEDURE CAdd* (z1, z2: complex): complex;
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BEGIN
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result.re := z1.re + z2.re;
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result.im := z1.im + z2.im;
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RETURN result
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END CAdd;
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(* Сложение с REAL.
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addition : z := z1 + r1 *)
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PROCEDURE CAdd_r* (z1: complex; r1: REAL): complex;
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BEGIN
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result.re := z1.re + r1;
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result.im := z1.im;
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RETURN result
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END CAdd_r;
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(* Сложение с INTEGER.
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addition : z := z1 + i1 *)
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PROCEDURE CAdd_i* (z1: complex; i1: INTEGER): complex;
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BEGIN
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result.re := z1.re + FLT(i1);
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result.im := z1.im;
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RETURN result
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END CAdd_i;
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(* Смена знака.
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substraction : z := - z1 *)
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PROCEDURE CNeg (z1 : complex): complex;
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BEGIN
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result.re := -z1.re;
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result.im := -z1.im;
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RETURN result
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END CNeg;
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(* Вычитание.
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substraction : z := z1 - z2 *)
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PROCEDURE CSub* (z1, z2 : complex): complex;
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BEGIN
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result.re := z1.re - z2.re;
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result.im := z1.im - z2.im;
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RETURN result
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END CSub;
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(* Вычитание REAL.
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substraction : z := z1 - r1 *)
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PROCEDURE CSub_r1* (z1 : complex; r1 : REAL): complex;
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BEGIN
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result.re := z1.re - r1;
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result.im := z1.im;
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RETURN result
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END CSub_r1;
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(* Вычитание из REAL.
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substraction : z := r1 - z1 *)
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PROCEDURE CSub_r2* (r1 : REAL; z1 : complex): complex;
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BEGIN
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result.re := r1 - z1.re;
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result.im := - z1.im;
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RETURN result
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END CSub_r2;
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(* Вычитание INTEGER.
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substraction : z := z1 - i1 *)
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PROCEDURE CSub_i* (z1 : complex; i1 : INTEGER): complex;
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BEGIN
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result.re := z1.re - FLT(i1);
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result.im := z1.im;
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RETURN result
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END CSub_i;
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(* Умножение.
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multiplication : z := z1 * z2 *)
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PROCEDURE CMul (z1, z2 : complex): complex;
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BEGIN
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result.re := (z1.re * z2.re) - (z1.im * z2.im);
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result.im := (z1.re * z2.im) + (z1.im * z2.re);
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RETURN result
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END CMul;
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(* Умножение с REAL.
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multiplication : z := z1 * r1 *)
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PROCEDURE CMul_r (z1 : complex; r1 : REAL): complex;
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BEGIN
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result.re := z1.re * r1;
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result.im := z1.im * r1;
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RETURN result
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END CMul_r;
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(* Умножение с INTEGER.
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multiplication : z := z1 * i1 *)
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PROCEDURE CMul_i (z1 : complex; i1 : INTEGER): complex;
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BEGIN
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result.re := z1.re * FLT(i1);
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result.im := z1.im * FLT(i1);
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RETURN result
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END CMul_i;
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(* Деление.
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division : z := znum / zden *)
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PROCEDURE CDiv (z1, z2 : complex): complex;
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(* The following algorithm is used to properly handle
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denominator overflow:
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| a + b(d/c) c - a(d/c)
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| ---------- + ---------- I if |d| < |c|
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a + b I | c + d(d/c) a + d(d/c)
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------- = |
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c + d I | b + a(c/d) -a+ b(c/d)
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| ---------- + ---------- I if |d| >= |c|
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| d + c(c/d) d + c(c/d)
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*)
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VAR
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tmp, denom : REAL;
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BEGIN
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IF ( ABS(z2.re) > ABS(z2.im) ) THEN
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tmp := z2.im / z2.re;
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denom := z2.re + z2.im * tmp;
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result.re := (z1.re + z1.im * tmp) / denom;
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result.im := (z1.im - z1.re * tmp) / denom;
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ELSE
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tmp := z2.re / z2.im;
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denom := z2.im + z2.re * tmp;
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result.re := (z1.im + z1.re * tmp) / denom;
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result.im := (-z1.re + z1.im * tmp) / denom;
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END;
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RETURN result
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END CDiv;
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(* Деление на REAL.
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division : z := znum / r1 *)
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PROCEDURE CDiv_r* (z1 : complex; r1 : REAL): complex;
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BEGIN
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result.re := z1.re / r1;
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result.im := z1.im / r1;
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RETURN result
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END CDiv_r;
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(* Деление на INTEGER.
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division : z := znum / i1 *)
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PROCEDURE CDiv_i* (z1 : complex; i1 : INTEGER): complex;
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BEGIN
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result.re := z1.re / FLT(i1);
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result.im := z1.im / FLT(i1);
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RETURN result
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END CDiv_i;
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(* fonctions elementaires *)
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(* Вывод на экран.
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out complex number *)
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PROCEDURE CPrint* (z: complex; width: INTEGER);
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BEGIN
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Out.Real(z.re, width);
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IF z.im>=0.0 THEN
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Out.String("+");
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END;
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Out.Real(z.im, width);
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Out.String("i");
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END CPrint;
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PROCEDURE CPrintLn* (z: complex; width: INTEGER);
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BEGIN
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CPrint(z, width);
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Out.Ln;
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END CPrintLn;
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(* Вывод на экран с фиксированным кол-вом знаков
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после запятой (p) *)
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PROCEDURE CPrintFix* (z: complex; width, p: INTEGER);
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BEGIN
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Out.FixReal(z.re, width, p);
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IF z.im>=0.0 THEN
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Out.String("+");
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END;
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Out.FixReal(z.im, width, p);
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Out.String("i");
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END CPrintFix;
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PROCEDURE CPrintFixLn* (z: complex; width, p: INTEGER);
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BEGIN
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CPrintFix(z, width, p);
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Out.Ln;
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END CPrintFixLn;
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(* Модуль числа.
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module : r = |z| *)
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PROCEDURE CMod* (z1 : complex): REAL;
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BEGIN
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RETURN Math.sqrt((z1.re * z1.re) + (z1.im * z1.im))
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END CMod;
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(* Квадрат числа.
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square : r := z*z *)
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PROCEDURE CSqr* (z1: complex): complex;
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BEGIN
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result.re := z1.re * z1.re - z1.im * z1.im;
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result.im := 2.0 * z1.re * z1.im;
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RETURN result
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END CSqr;
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(* Квадратный корень числа.
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square root : r := sqrt(z) *)
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PROCEDURE CSqrt* (z1: complex): complex;
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VAR
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root, q: REAL;
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BEGIN
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IF (z1.re#0.0) OR (z1.im#0.0) THEN
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root := Math.sqrt(0.5 * (ABS(z1.re) + CMod(z1)));
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q := z1.im / (2.0 * root);
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IF z1.re >= 0.0 THEN
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result.re := root;
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result.im := q;
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ELSE
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IF z1.im < 0.0 THEN
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result.re := - q;
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result.im := - root
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ELSE
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result.re := q;
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result.im := root
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END
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END
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ELSE
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result := z1;
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END;
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RETURN result
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END CSqrt;
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(* Экспонента.
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exponantial : r := exp(z) *)
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(* exp(x + iy) = exp(x).exp(iy) = exp(x).[cos(y) + i sin(y)] *)
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PROCEDURE CExp* (z: complex): complex;
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VAR
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expz : REAL;
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BEGIN
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expz := Math.exp(z.re);
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result.re := expz * Math.cos(z.im);
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result.im := expz * Math.sin(z.im);
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RETURN result
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END CExp;
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(* Натуральный логарифм.
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natural logarithm : r := ln(z) *)
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(* ln( p exp(i0)) = ln(p) + i0 + 2kpi *)
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PROCEDURE CLn* (z: complex): complex;
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BEGIN
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result.re := Math.ln(CMod(z));
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result.im := Math.arctan2(z.im, z.re);
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RETURN result
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END CLn;
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(* Число в степени.
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exp : z := z1^z2 *)
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PROCEDURE CPower* (z1, z2 : complex): complex;
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VAR
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a: complex;
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BEGIN
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a:=CLn(z1);
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a:=CMul(z2, a);
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result:=CExp(a);
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RETURN result
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END CPower;
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(* Число в степени REAL.
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multiplication : z := z1^r *)
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PROCEDURE CPower_r* (z1: complex; r: REAL): complex;
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VAR
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a: complex;
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BEGIN
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a:=CLn(z1);
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a:=CMul_r(a, r);
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result:=CExp(a);
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RETURN result
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END CPower_r;
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(* Обратное число.
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inverse : r := 1 / z *)
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PROCEDURE CInv* (z: complex): complex;
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VAR
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denom : REAL;
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BEGIN
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denom := (z.re * z.re) + (z.im * z.im);
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(* generates a fpu exception if denom=0 as for reals *)
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result.re:=z.re/denom;
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result.im:=-z.im/denom;
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RETURN result
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END CInv;
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(* direct trigonometric functions *)
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(* Косинус.
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complex cosinus *)
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(* cos(x+iy) = cos(x).cos(iy) - sin(x).sin(iy) *)
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(* cos(ix) = cosh(x) et sin(ix) = i.sinh(x) *)
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PROCEDURE CCos* (z: complex): complex;
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BEGIN
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result.re := Math.cos(z.re) * Math.cosh(z.im);
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result.im := - Math.sin(z.re) * Math.sinh(z.im);
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RETURN result
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END CCos;
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(* Синус.
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sinus complex *)
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(* sin(x+iy) = sin(x).cos(iy) + cos(x).sin(iy) *)
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(* cos(ix) = cosh(x) et sin(ix) = i.sinh(x) *)
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PROCEDURE CSin (z: complex): complex;
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BEGIN
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result.re := Math.sin(z.re) * Math.cosh(z.im);
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result.im := Math.cos(z.re) * Math.sinh(z.im);
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RETURN result
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END CSin;
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(* Тангенс.
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tangente *)
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PROCEDURE CTg* (z: complex): complex;
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VAR
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temp1, temp2: complex;
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BEGIN
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temp1:=CSin(z);
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temp2:=CCos(z);
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result:=CDiv(temp1, temp2);
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RETURN result
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END CTg;
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(* inverse complex hyperbolic functions *)
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(* Гиперболический арккосинус.
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hyberbolic arg cosinus *)
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(* _________ *)
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(* argch(z) = -/+ ln(z + i.V 1 - z.z) *)
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PROCEDURE CArcCosh* (z : complex): complex;
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BEGIN
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result:=CNeg(CLn(CAdd(z, CMul(i, CSqrt(CSub_r2(1.0, CMul(z, z)))))));
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RETURN result
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END CArcCosh;
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(* Гиперболический арксинус.
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hyperbolic arc sinus *)
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(* ________ *)
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(* argsh(z) = ln(z + V 1 + z.z) *)
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PROCEDURE CArcSinh* (z : complex): complex;
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BEGIN
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result:=CLn(CAdd(z, CSqrt(CAdd_r(CMul(z, z), 1.0))));
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RETURN result
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END CArcSinh;
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(* Гиперболический арктангенс.
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hyperbolic arc tangent *)
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(* argth(z) = 1/2 ln((z + 1) / (1 - z)) *)
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PROCEDURE CArcTgh (z : complex): complex;
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BEGIN
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result:=CDiv_r(CLn(CDiv(CAdd_r(z, 1.0), CSub_r2(1.0, z))), 2.0);
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RETURN result
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END CArcTgh;
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(* trigonometriques inverses *)
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(* Арккосинус.
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arc cosinus complex *)
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(* arccos(z) = -i.argch(z) *)
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PROCEDURE CArcCos* (z: complex): complex;
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BEGIN
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result := CNeg(CMul(i, CArcCosh(z)));
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RETURN result
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END CArcCos;
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(* Арксинус.
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arc sinus complex *)
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(* arcsin(z) = -i.argsh(i.z) *)
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PROCEDURE CArcSin* (z : complex): complex;
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BEGIN
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result := CNeg(CMul(i, CArcSinh(z)));
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RETURN result
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END CArcSin;
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(* Арктангенс.
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arc tangente complex *)
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(* arctg(z) = -i.argth(i.z) *)
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PROCEDURE CArcTg* (z : complex): complex;
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BEGIN
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result := CNeg(CMul(i, CArcTgh(CMul(i, z))));
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RETURN result
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END CArcTg;
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BEGIN
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result:=CInit(0.0, 0.0);
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i :=CInit(0.0, 1.0);
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_0:=CInit(0.0, 0.0);
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END CMath.
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