forked from KolibriOS/kolibrios
254 lines
5.3 KiB
Plaintext
254 lines
5.3 KiB
Plaintext
(*
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Copyright 2016 Anton Krotov
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This program is free software: you can redistribute it and/or modify
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it under the terms of the GNU Lesser General Public License as published by
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the Free Software Foundation, either version 3 of the License, or
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(at your option) any later version.
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This program is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU Lesser General Public License for more details.
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You should have received a copy of the GNU Lesser General Public License
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along with this program. If not, see <http://www.gnu.org/licenses/>.
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*)
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MODULE Math;
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IMPORT sys := SYSTEM;
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CONST pi* = 3.141592653589793D+00;
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e* = 2.718281828459045D+00;
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VAR Inf*, nInf*: LONGREAL;
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PROCEDURE IsNan*(x: LONGREAL): BOOLEAN;
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VAR h, l: SET;
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BEGIN
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sys.GET(sys.ADR(x), l);
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sys.GET(sys.ADR(x) + 4, h);
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RETURN (h * {20..30} = {20..30}) & ((h * {0..19} # {}) OR (l * {0..31} # {}))
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END IsNan;
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PROCEDURE IsInf*(x: LONGREAL): BOOLEAN;
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RETURN ABS(x) = sys.INF(LONGREAL)
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END IsInf;
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PROCEDURE Max(A, B: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF A > B THEN
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Res := A
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ELSE
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Res := B
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END
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RETURN Res
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END Max;
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PROCEDURE Min(A, B: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF A < B THEN
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Res := A
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ELSE
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Res := B
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END
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RETURN Res
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END Min;
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PROCEDURE SameValue(A, B: LONGREAL): BOOLEAN;
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VAR Epsilon: LONGREAL; Res: BOOLEAN;
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BEGIN
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Epsilon := Max(Min(ABS(A), ABS(B)) * 1.0D-12, 1.0D-12);
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IF A > B THEN
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Res := (A - B) <= Epsilon
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ELSE
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Res := (B - A) <= Epsilon
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END
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RETURN Res
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END SameValue;
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PROCEDURE IsZero(x: LONGREAL): BOOLEAN;
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RETURN ABS(x) <= 1.0D-12
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END IsZero;
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PROCEDURE [stdcall] sqrt*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D9FAC9C20800")
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RETURN 0.0D0
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END sqrt;
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PROCEDURE [stdcall] sin*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D9FEC9C20800")
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RETURN 0.0D0
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END sin;
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PROCEDURE [stdcall] cos*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D9FFC9C20800")
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RETURN 0.0D0
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END cos;
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PROCEDURE [stdcall] tan*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D9F2DEC9C9C20800")
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RETURN 0.0D0
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END tan;
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PROCEDURE [stdcall] arctan2*(y, x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508DD4510D9F3C9C21000")
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RETURN 0.0D0
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END arctan2;
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PROCEDURE [stdcall] ln*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("D9EDDD4508D9F1C9C20800")
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RETURN 0.0D0
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END ln;
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PROCEDURE [stdcall] log*(base, x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("D9E8DD4510D9F1D9E8DD4508D9F1DEF9C9C21000")
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RETURN 0.0D0
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END log;
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PROCEDURE [stdcall] exp*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D9EADEC9D9C0D9FCDCE9D9C9D9F0D9E8DEC1D9FDDDD9C9C20800")
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RETURN 0.0D0
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END exp;
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PROCEDURE [stdcall] round*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("DD4508D97DF4D97DF666814DF60003D96DF6D9FCD96DF4C9C20800")
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RETURN 0.0D0
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END round;
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PROCEDURE [stdcall] frac*(x: LONGREAL): LONGREAL;
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BEGIN
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sys.CODE("50DD4508D9C0D93C24D97C240266814C2402000FD96C2402D9FCD92C24DEE9C9C20800")
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RETURN 0.0D0
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END frac;
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PROCEDURE arcsin*(x: LONGREAL): LONGREAL;
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RETURN arctan2(x, sqrt(1.0D0 - x * x))
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END arcsin;
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PROCEDURE arccos*(x: LONGREAL): LONGREAL;
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RETURN arctan2(sqrt(1.0D0 - x * x), x)
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END arccos;
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PROCEDURE arctan*(x: LONGREAL): LONGREAL;
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RETURN arctan2(x, 1.0D0)
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END arctan;
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PROCEDURE sinh*(x: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF IsZero(x) THEN
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Res := 0.0D0
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ELSE
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Res := (exp(x) - exp(-x)) / 2.0D0
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END
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RETURN Res
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END sinh;
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PROCEDURE cosh*(x: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF IsZero(x) THEN
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Res := 1.0D0
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ELSE
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Res := (exp(x) + exp(-x)) / 2.0D0
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END
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RETURN Res
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END cosh;
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PROCEDURE tanh*(x: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF IsZero(x) THEN
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Res := 0.0D0
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ELSE
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Res := sinh(x) / cosh(x)
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END
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RETURN Res
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END tanh;
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PROCEDURE arcsinh*(x: LONGREAL): LONGREAL;
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RETURN ln(x + sqrt((x * x) + 1.0D0))
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END arcsinh;
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PROCEDURE arccosh*(x: LONGREAL): LONGREAL;
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RETURN ln(x + sqrt((x - 1.0D0) / (x + 1.0D0)) * (x + 1.0D0))
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END arccosh;
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PROCEDURE arctanh*(x: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF SameValue(x, 1.0D0) THEN
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Res := Inf
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ELSIF SameValue(x, -1.0D0) THEN
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Res := nInf
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ELSE
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Res := 0.5D0 * ln((1.0D0 + x) / (1.0D0 - x))
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END
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RETURN Res
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END arctanh;
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PROCEDURE floor*(x: LONGREAL): LONGREAL;
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VAR f: LONGREAL;
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BEGIN
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f := frac(x);
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x := x - f;
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IF f < 0.0D0 THEN
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x := x - 1.0D0
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END
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RETURN x
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END floor;
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PROCEDURE ceil*(x: LONGREAL): LONGREAL;
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VAR f: LONGREAL;
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BEGIN
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f := frac(x);
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x := x - f;
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IF f > 0.0D0 THEN
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x := x + 1.0D0
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END
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RETURN x
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END ceil;
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PROCEDURE power*(base, exponent: LONGREAL): LONGREAL;
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VAR Res: LONGREAL;
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BEGIN
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IF exponent = 0.0D0 THEN
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Res := 1.0D0
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ELSIF (base = 0.0D0) & (exponent > 0.0D0) THEN
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Res := 0.0D0
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ELSE
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Res := exp(exponent * ln(base))
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END
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RETURN Res
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END power;
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PROCEDURE sgn*(x: LONGREAL): INTEGER;
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VAR Res: INTEGER;
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BEGIN
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IF x > 0.0D0 THEN
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Res := 1
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ELSIF x < 0.0D0 THEN
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Res := -1
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ELSE
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Res := 0
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END
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RETURN Res
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END sgn;
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BEGIN
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Inf := sys.INF(LONGREAL);
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nInf := -sys.INF(LONGREAL)
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END Math. |