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3074 lines
95 KiB
EmacsLisp
3074 lines
95 KiB
EmacsLisp
;;; calc-arith.el --- arithmetic functions for Calc
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;; Copyright (C) 1990, 1991, 1992, 1993, 2001, 2002, 2003, 2004,
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;; 2005, 2006, 2007, 2008 Free Software Foundation, Inc.
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;; Author: David Gillespie <daveg@synaptics.com>
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;; Maintainer: Jay Belanger <jay.p.belanger@gmail.com>
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;; This file is part of GNU Emacs.
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;; GNU Emacs is free software; you can redistribute it and/or modify
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;; it under the terms of the GNU General Public License as published by
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;; the Free Software Foundation; either version 3, or (at your option)
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;; any later version.
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;; GNU Emacs 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 General Public License for more details.
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;; You should have received a copy of the GNU General Public License
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;; along with GNU Emacs; see the file COPYING. If not, write to the
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;; Free Software Foundation, Inc., 51 Franklin Street, Fifth Floor,
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;; Boston, MA 02110-1301, USA.
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;;; Commentary:
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;;; Code:
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;; This file is autoloaded from calc-ext.el.
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(require 'calc-ext)
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(require 'calc-macs)
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;;; The following lists are not exhaustive.
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(defvar math-scalar-functions '(calcFunc-det
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calcFunc-cnorm calcFunc-rnorm
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calcFunc-vlen calcFunc-vcount
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calcFunc-vsum calcFunc-vprod
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calcFunc-vmin calcFunc-vmax))
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(defvar math-nonscalar-functions '(vec calcFunc-idn calcFunc-diag
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calcFunc-cvec calcFunc-index
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calcFunc-trn
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calcFunc-cons calcFunc-rcons
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calcFunc-tail calcFunc-rhead))
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(defvar math-scalar-if-args-functions '(+ - * / neg))
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(defvar math-real-functions '(calcFunc-arg
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calcFunc-re calcFunc-im
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calcFunc-floor calcFunc-ceil
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calcFunc-trunc calcFunc-round
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calcFunc-rounde calcFunc-roundu
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calcFunc-ffloor calcFunc-fceil
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calcFunc-ftrunc calcFunc-fround
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calcFunc-frounde calcFunc-froundu))
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(defvar math-positive-functions '())
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(defvar math-nonnegative-functions '(calcFunc-cnorm calcFunc-rnorm
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calcFunc-vlen calcFunc-vcount))
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(defvar math-real-scalar-functions '(% calcFunc-idiv calcFunc-abs
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calcFunc-choose calcFunc-perm
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calcFunc-eq calcFunc-neq
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calcFunc-lt calcFunc-gt
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calcFunc-leq calcFunc-geq
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calcFunc-lnot
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calcFunc-max calcFunc-min))
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(defvar math-real-if-arg-functions '(calcFunc-sin calcFunc-cos
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calcFunc-tan calcFunc-sec
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calcFunc-csc calcFunc-cot
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calcFunc-arctan
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calcFunc-sinh calcFunc-cosh
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calcFunc-tanh calcFunc-sech
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calcFunc-csch calcFunc-coth
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calcFunc-exp
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calcFunc-gamma calcFunc-fact))
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(defvar math-integer-functions '(calcFunc-idiv
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calcFunc-isqrt calcFunc-ilog
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calcFunc-vlen calcFunc-vcount))
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(defvar math-num-integer-functions '())
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(defvar math-rounding-functions '(calcFunc-floor
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calcFunc-ceil
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calcFunc-round calcFunc-trunc
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calcFunc-rounde calcFunc-roundu))
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(defvar math-float-rounding-functions '(calcFunc-ffloor
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calcFunc-fceil
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calcFunc-fround calcFunc-ftrunc
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calcFunc-frounde calcFunc-froundu))
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(defvar math-integer-if-args-functions '(+ - * % neg calcFunc-abs
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calcFunc-min calcFunc-max
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calcFunc-choose calcFunc-perm))
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;;; Arithmetic.
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(defun calc-min (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-binary-op "min" 'calcFunc-min arg '(var inf var-inf))))
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(defun calc-max (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-binary-op "max" 'calcFunc-max arg '(neg (var inf var-inf)))))
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(defun calc-abs (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-unary-op "abs" 'calcFunc-abs arg)))
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(defun calc-idiv (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-binary-op "\\" 'calcFunc-idiv arg 1)))
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(defun calc-floor (arg)
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(interactive "P")
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(calc-slow-wrapper
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(if (calc-is-inverse)
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(if (calc-is-hyperbolic)
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(calc-unary-op "ceil" 'calcFunc-fceil arg)
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(calc-unary-op "ceil" 'calcFunc-ceil arg))
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(if (calc-is-hyperbolic)
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(calc-unary-op "flor" 'calcFunc-ffloor arg)
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(calc-unary-op "flor" 'calcFunc-floor arg)))))
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(defun calc-ceiling (arg)
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(interactive "P")
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(calc-invert-func)
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(calc-floor arg))
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(defun calc-round (arg)
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(interactive "P")
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(calc-slow-wrapper
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(if (calc-is-inverse)
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(if (calc-is-hyperbolic)
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(calc-unary-op "trnc" 'calcFunc-ftrunc arg)
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(calc-unary-op "trnc" 'calcFunc-trunc arg))
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(if (calc-is-hyperbolic)
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(calc-unary-op "rond" 'calcFunc-fround arg)
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(calc-unary-op "rond" 'calcFunc-round arg)))))
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(defun calc-trunc (arg)
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(interactive "P")
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(calc-invert-func)
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(calc-round arg))
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(defun calc-mant-part (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-unary-op "mant" 'calcFunc-mant arg)))
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(defun calc-xpon-part (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-unary-op "xpon" 'calcFunc-xpon arg)))
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(defun calc-scale-float (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-binary-op "scal" 'calcFunc-scf arg)))
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(defun calc-abssqr (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-unary-op "absq" 'calcFunc-abssqr arg)))
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(defun calc-sign (arg)
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(interactive "P")
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(calc-slow-wrapper
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(calc-unary-op "sign" 'calcFunc-sign arg)))
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(defun calc-increment (arg)
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(interactive "p")
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(calc-wrapper
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(calc-enter-result 1 "incr" (list 'calcFunc-incr (calc-top-n 1) arg))))
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(defun calc-decrement (arg)
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(interactive "p")
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(calc-wrapper
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(calc-enter-result 1 "decr" (list 'calcFunc-decr (calc-top-n 1) arg))))
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(defun math-abs-approx (a)
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(cond ((Math-negp a)
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(math-neg a))
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((Math-anglep a)
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a)
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((eq (car a) 'cplx)
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(math-add (math-abs (nth 1 a)) (math-abs (nth 2 a))))
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((eq (car a) 'polar)
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(nth 1 a))
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((eq (car a) 'sdev)
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(math-abs-approx (nth 1 a)))
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((eq (car a) 'intv)
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(math-max (math-abs (nth 2 a)) (math-abs (nth 3 a))))
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((eq (car a) 'date)
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a)
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((eq (car a) 'vec)
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(math-reduce-vec 'math-add-abs-approx a))
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((eq (car a) 'calcFunc-abs)
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(car a))
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(t a)))
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(defun math-add-abs-approx (a b)
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(math-add (math-abs-approx a) (math-abs-approx b)))
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;;;; Declarations.
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(defvar math-decls-cache-tag nil)
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(defvar math-decls-cache nil)
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(defvar math-decls-all nil)
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;;; Math-decls-cache is an a-list where each entry is a list of the form:
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;;; (VAR TYPES RANGE)
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;;; where VAR is a variable name (with var- prefix) or function name;
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;;; TYPES is a list of type symbols (any, int, frac, ...)
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;;; RANGE is a sorted vector of intervals describing the range.
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(defvar math-super-types
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'((int numint rat real number)
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(numint real number)
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(frac rat real number)
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(rat real number)
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(float real number)
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(real number)
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(number)
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(scalar)
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(sqmatrix matrix vector)
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(matrix vector)
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(vector)
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(const)))
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(defun math-setup-declarations ()
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(or (eq math-decls-cache-tag (calc-var-value 'var-Decls))
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(let ((p (calc-var-value 'var-Decls))
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vec type range)
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(setq math-decls-cache-tag p
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math-decls-cache nil)
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(and (eq (car-safe p) 'vec)
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(while (setq p (cdr p))
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(and (eq (car-safe (car p)) 'vec)
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(setq vec (nth 2 (car p)))
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(condition-case err
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(let ((v (nth 1 (car p))))
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(setq type nil range nil)
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(or (eq (car-safe vec) 'vec)
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(setq vec (list 'vec vec)))
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(while (and (setq vec (cdr vec))
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(not (Math-objectp (car vec))))
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(and (eq (car-safe (car vec)) 'var)
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(let ((st (assq (nth 1 (car vec))
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math-super-types)))
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(cond (st (setq type (append type st)))
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((eq (nth 1 (car vec)) 'pos)
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(setq type (append type
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'(real number))
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range
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'(intv 1 0 (var inf var-inf))))
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((eq (nth 1 (car vec)) 'nonneg)
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(setq type (append type
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'(real number))
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range
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'(intv 3 0
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(var inf var-inf))))))))
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(if vec
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(setq type (append type '(real number))
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range (math-prepare-set (cons 'vec vec))))
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(setq type (list type range))
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(or (eq (car-safe v) 'vec)
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(setq v (list 'vec v)))
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(while (setq v (cdr v))
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(if (or (eq (car-safe (car v)) 'var)
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(not (Math-primp (car v))))
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(setq math-decls-cache
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(cons (cons (if (eq (car (car v)) 'var)
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(nth 2 (car v))
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(car (car v)))
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type)
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math-decls-cache)))))
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(error nil)))))
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(setq math-decls-all (assq 'var-All math-decls-cache)))))
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(defun math-known-scalarp (a &optional assume-scalar)
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(math-setup-declarations)
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(if (if calc-matrix-mode
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(eq calc-matrix-mode 'scalar)
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assume-scalar)
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(not (math-check-known-matrixp a))
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(math-check-known-scalarp a)))
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(defun math-known-matrixp (a)
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(and (not (Math-scalarp a))
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(not (math-known-scalarp a t))))
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(defun math-known-square-matrixp (a)
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(and (math-known-matrixp a)
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(math-check-known-square-matrixp a)))
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;;; Try to prove that A is a scalar (i.e., a non-vector).
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(defun math-check-known-scalarp (a)
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(cond ((Math-objectp a) t)
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((memq (car a) math-scalar-functions)
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t)
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((memq (car a) math-real-scalar-functions)
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t)
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((memq (car a) math-scalar-if-args-functions)
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(while (and (setq a (cdr a))
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(math-check-known-scalarp (car a))))
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(null a))
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((eq (car a) '^)
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(math-check-known-scalarp (nth 1 a)))
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((math-const-var a) t)
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(t
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(let ((decl (if (eq (car a) 'var)
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(or (assq (nth 2 a) math-decls-cache)
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math-decls-all)
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(assq (car a) math-decls-cache)))
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val)
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(cond
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((memq 'scalar (nth 1 decl))
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t)
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((and (eq (car a) 'var)
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(symbolp (nth 2 a))
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(boundp (nth 2 a))
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(setq val (symbol-value (nth 2 a))))
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(math-check-known-scalarp val))
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(t
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nil))))))
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;;; Try to prove that A is *not* a scalar.
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(defun math-check-known-matrixp (a)
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(cond ((Math-objectp a) nil)
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((memq (car a) math-nonscalar-functions)
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t)
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((memq (car a) math-scalar-if-args-functions)
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(while (and (setq a (cdr a))
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(not (math-check-known-matrixp (car a)))))
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a)
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((eq (car a) '^)
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(math-check-known-matrixp (nth 1 a)))
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((math-const-var a) nil)
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(t
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(let ((decl (if (eq (car a) 'var)
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(or (assq (nth 2 a) math-decls-cache)
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math-decls-all)
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(assq (car a) math-decls-cache)))
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val)
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(cond
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((memq 'matrix (nth 1 decl))
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t)
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((and (eq (car a) 'var)
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(symbolp (nth 2 a))
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(boundp (nth 2 a))
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(setq val (symbol-value (nth 2 a))))
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(math-check-known-matrixp val))
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(t
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nil))))))
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;;; Given that A is a matrix, try to prove that it is a square matrix.
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(defun math-check-known-square-matrixp (a)
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(cond ((math-square-matrixp a)
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t)
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((eq (car-safe a) '^)
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(math-check-known-square-matrixp (nth 1 a)))
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((or
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(eq (car-safe a) '*)
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(eq (car-safe a) '+)
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(eq (car-safe a) '-))
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(and
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(math-check-known-square-matrixp (nth 1 a))
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(math-check-known-square-matrixp (nth 2 a))))
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(t
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(let ((decl (if (eq (car a) 'var)
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(or (assq (nth 2 a) math-decls-cache)
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math-decls-all)
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(assq (car a) math-decls-cache)))
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val)
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(cond
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((memq 'sqmatrix (nth 1 decl))
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t)
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((and (eq (car a) 'var)
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(boundp (nth 2 a))
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(setq val (symbol-value (nth 2 a))))
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(math-check-known-square-matrixp val))
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((and (or
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(integerp calc-matrix-mode)
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(eq calc-matrix-mode 'sqmatrix))
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(eq (car-safe a) 'var))
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t)
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((memq 'matrix (nth 1 decl))
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nil)
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(t
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nil))))))
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;;; Try to prove that A is a real (i.e., not complex).
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(defun math-known-realp (a)
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(< (math-possible-signs a) 8))
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;;; Try to prove that A is real and positive.
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(defun math-known-posp (a)
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(eq (math-possible-signs a) 4))
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;;; Try to prove that A is real and negative.
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(defun math-known-negp (a)
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(eq (math-possible-signs a) 1))
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;;; Try to prove that A is real and nonnegative.
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(defun math-known-nonnegp (a)
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(memq (math-possible-signs a) '(2 4 6)))
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;;; Try to prove that A is real and nonpositive.
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(defun math-known-nonposp (a)
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(memq (math-possible-signs a) '(1 2 3)))
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;;; Try to prove that A is nonzero.
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(defun math-known-nonzerop (a)
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(memq (math-possible-signs a) '(1 4 5 8 9 12 13)))
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;;; Return true if A is negative, or looks negative but we don't know.
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(defun math-guess-if-neg (a)
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(let ((sgn (math-possible-signs a)))
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(if (memq sgn '(1 3))
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t
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(if (memq sgn '(2 4 6))
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nil
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(math-looks-negp a)))))
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;;; Find the possible signs of A, assuming A is a number of some kind.
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;;; Returns an integer with bits: 1 may be negative,
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;;; 2 may be zero,
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;;; 4 may be positive,
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;;; 8 may be nonreal.
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(defun math-possible-signs (a &optional origin)
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(cond ((Math-objectp a)
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(if origin (setq a (math-sub a origin)))
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(cond ((Math-posp a) 4)
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((Math-negp a) 1)
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((Math-zerop a) 2)
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((eq (car a) 'intv)
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(cond
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((math-known-posp (nth 2 a)) 4)
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((math-known-negp (nth 3 a)) 1)
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((Math-zerop (nth 2 a)) 6)
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((Math-zerop (nth 3 a)) 3)
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(t 7)))
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((eq (car a) 'sdev)
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(if (math-known-realp (nth 1 a)) 7 15))
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(t 8)))
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((memq (car a) '(+ -))
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(cond ((Math-realp (nth 1 a))
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(if (eq (car a) '-)
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(math-neg-signs
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(math-possible-signs (nth 2 a)
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(if origin
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(math-add origin (nth 1 a))
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(nth 1 a))))
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(math-possible-signs (nth 2 a)
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(if origin
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(math-sub origin (nth 1 a))
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(math-neg (nth 1 a))))))
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((Math-realp (nth 2 a))
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(let ((org (if (eq (car a) '-)
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(nth 2 a)
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(math-neg (nth 2 a)))))
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(math-possible-signs (nth 1 a)
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(if origin
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(math-add origin org)
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org))))
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(t
|
|
(let ((s1 (math-possible-signs (nth 1 a) origin))
|
|
(s2 (math-possible-signs (nth 2 a))))
|
|
(if (eq (car a) '-) (setq s2 (math-neg-signs s2)))
|
|
(cond ((eq s1 s2) s1)
|
|
((eq s1 2) s2)
|
|
((eq s2 2) s1)
|
|
((>= s1 8) 15)
|
|
((>= s2 8) 15)
|
|
((and (eq s1 4) (eq s2 6)) 4)
|
|
((and (eq s2 4) (eq s1 6)) 4)
|
|
((and (eq s1 1) (eq s2 3)) 1)
|
|
((and (eq s2 1) (eq s1 3)) 1)
|
|
(t 7))))))
|
|
((eq (car a) 'neg)
|
|
(math-neg-signs (math-possible-signs
|
|
(nth 1 a)
|
|
(and origin (math-neg origin)))))
|
|
((and origin (Math-zerop origin) (setq origin nil)
|
|
nil))
|
|
((and (or (eq (car a) '*)
|
|
(and (eq (car a) '/) origin))
|
|
(Math-realp (nth 1 a)))
|
|
(let ((s (if (eq (car a) '*)
|
|
(if (Math-zerop (nth 1 a))
|
|
(math-possible-signs 0 origin)
|
|
(math-possible-signs (nth 2 a)
|
|
(math-div (or origin 0)
|
|
(nth 1 a))))
|
|
(math-neg-signs
|
|
(math-possible-signs (nth 2 a)
|
|
(math-div (nth 1 a)
|
|
origin))))))
|
|
(if (Math-negp (nth 1 a)) (math-neg-signs s) s)))
|
|
((and (memq (car a) '(* /)) (Math-realp (nth 2 a)))
|
|
(let ((s (math-possible-signs (nth 1 a)
|
|
(if (eq (car a) '*)
|
|
(math-mul (or origin 0) (nth 2 a))
|
|
(math-div (or origin 0) (nth 2 a))))))
|
|
(if (Math-negp (nth 2 a)) (math-neg-signs s) s)))
|
|
((eq (car a) 'vec)
|
|
(let ((signs 0))
|
|
(while (and (setq a (cdr a)) (< signs 15))
|
|
(setq signs (logior signs (math-possible-signs
|
|
(car a) origin))))
|
|
signs))
|
|
(t (let ((sign
|
|
(cond
|
|
((memq (car a) '(* /))
|
|
(let ((s1 (math-possible-signs (nth 1 a)))
|
|
(s2 (math-possible-signs (nth 2 a))))
|
|
(cond ((>= s1 8) 15)
|
|
((>= s2 8) 15)
|
|
((and (eq (car a) '/) (memq s2 '(2 3 6 7))) 15)
|
|
(t
|
|
(logior (if (memq s1 '(4 5 6 7)) s2 0)
|
|
(if (memq s1 '(2 3 6 7)) 2 0)
|
|
(if (memq s1 '(1 3 5 7))
|
|
(math-neg-signs s2) 0))))))
|
|
((eq (car a) '^)
|
|
(let ((s1 (math-possible-signs (nth 1 a)))
|
|
(s2 (math-possible-signs (nth 2 a))))
|
|
(cond ((>= s1 8) 15)
|
|
((>= s2 8) 15)
|
|
((eq s1 4) 4)
|
|
((eq s1 2) (if (eq s2 4) 2 15))
|
|
((eq s2 2) (if (memq s1 '(1 5)) 2 15))
|
|
((Math-integerp (nth 2 a))
|
|
(if (math-evenp (nth 2 a))
|
|
(if (memq s1 '(3 6 7)) 6 4)
|
|
s1))
|
|
((eq s1 6) (if (eq s2 4) 6 15))
|
|
(t 7))))
|
|
((eq (car a) '%)
|
|
(let ((s2 (math-possible-signs (nth 2 a))))
|
|
(cond ((>= s2 8) 7)
|
|
((eq s2 2) 2)
|
|
((memq s2 '(4 6)) 6)
|
|
((memq s2 '(1 3)) 3)
|
|
(t 7))))
|
|
((and (memq (car a) '(calcFunc-abs calcFunc-abssqr))
|
|
(= (length a) 2))
|
|
(let ((s1 (math-possible-signs (nth 1 a))))
|
|
(cond ((eq s1 2) 2)
|
|
((memq s1 '(1 4 5)) 4)
|
|
(t 6))))
|
|
((and (eq (car a) 'calcFunc-exp) (= (length a) 2))
|
|
(let ((s1 (math-possible-signs (nth 1 a))))
|
|
(if (>= s1 8)
|
|
15
|
|
(if (or (not origin) (math-negp origin))
|
|
4
|
|
(setq origin (math-sub (or origin 0) 1))
|
|
(if (Math-zerop origin) (setq origin nil))
|
|
s1))))
|
|
((or (and (memq (car a) '(calcFunc-ln calcFunc-log10))
|
|
(= (length a) 2))
|
|
(and (eq (car a) 'calcFunc-log)
|
|
(= (length a) 3)
|
|
(math-known-posp (nth 2 a))))
|
|
(if (math-known-nonnegp (nth 1 a))
|
|
(math-possible-signs (nth 1 a) 1)
|
|
15))
|
|
((and (eq (car a) 'calcFunc-sqrt) (= (length a) 2))
|
|
(let ((s1 (math-possible-signs (nth 1 a))))
|
|
(if (memq s1 '(2 4 6)) s1 15)))
|
|
((memq (car a) math-nonnegative-functions) 6)
|
|
((memq (car a) math-positive-functions) 4)
|
|
((memq (car a) math-real-functions) 7)
|
|
((memq (car a) math-real-scalar-functions) 7)
|
|
((and (memq (car a) math-real-if-arg-functions)
|
|
(= (length a) 2))
|
|
(if (math-known-realp (nth 1 a)) 7 15)))))
|
|
(cond (sign
|
|
(if origin
|
|
(+ (logand sign 8)
|
|
(if (Math-posp origin)
|
|
(if (memq sign '(1 2 3 8 9 10 11)) 1 7)
|
|
(if (memq sign '(2 4 6 8 10 12 14)) 4 7)))
|
|
sign))
|
|
((math-const-var a)
|
|
(cond ((eq (nth 2 a) 'var-pi)
|
|
(if origin
|
|
(math-possible-signs (math-pi) origin)
|
|
4))
|
|
((eq (nth 2 a) 'var-e)
|
|
(if origin
|
|
(math-possible-signs (math-e) origin)
|
|
4))
|
|
((eq (nth 2 a) 'var-inf) 4)
|
|
((eq (nth 2 a) 'var-uinf) 13)
|
|
((eq (nth 2 a) 'var-i) 8)
|
|
(t 15)))
|
|
(t
|
|
(math-setup-declarations)
|
|
(let ((decl (if (eq (car a) 'var)
|
|
(or (assq (nth 2 a) math-decls-cache)
|
|
math-decls-all)
|
|
(assq (car a) math-decls-cache))))
|
|
(if (and origin
|
|
(memq 'int (nth 1 decl))
|
|
(not (Math-num-integerp origin)))
|
|
5
|
|
(if (nth 2 decl)
|
|
(math-possible-signs (nth 2 decl) origin)
|
|
(if (memq 'real (nth 1 decl))
|
|
7
|
|
15))))))))))
|
|
|
|
(defun math-neg-signs (s1)
|
|
(if (>= s1 8)
|
|
(+ 8 (math-neg-signs (- s1 8)))
|
|
(+ (if (memq s1 '(1 3 5 7)) 4 0)
|
|
(if (memq s1 '(2 3 6 7)) 2 0)
|
|
(if (memq s1 '(4 5 6 7)) 1 0))))
|
|
|
|
|
|
;;; Try to prove that A is an integer.
|
|
(defun math-known-integerp (a)
|
|
(eq (math-possible-types a) 1))
|
|
|
|
(defun math-known-num-integerp (a)
|
|
(<= (math-possible-types a t) 3))
|
|
|
|
(defun math-known-imagp (a)
|
|
(= (math-possible-types a) 16))
|
|
|
|
|
|
;;; Find the possible types of A.
|
|
;;; Returns an integer with bits: 1 may be integer.
|
|
;;; 2 may be integer-valued float.
|
|
;;; 4 may be fraction.
|
|
;;; 8 may be non-integer-valued float.
|
|
;;; 16 may be imaginary.
|
|
;;; 32 may be non-real, non-imaginary.
|
|
;;; Real infinities count as integers for the purposes of this function.
|
|
(defun math-possible-types (a &optional num)
|
|
(cond ((Math-objectp a)
|
|
(cond ((Math-integerp a) (if num 3 1))
|
|
((Math-messy-integerp a) (if num 3 2))
|
|
((eq (car a) 'frac) (if num 12 4))
|
|
((eq (car a) 'float) (if num 12 8))
|
|
((eq (car a) 'intv)
|
|
(if (equal (nth 2 a) (nth 3 a))
|
|
(math-possible-types (nth 2 a))
|
|
15))
|
|
((eq (car a) 'sdev)
|
|
(if (math-known-realp (nth 1 a)) 15 63))
|
|
((eq (car a) 'cplx)
|
|
(if (math-zerop (nth 1 a)) 16 32))
|
|
((eq (car a) 'polar)
|
|
(if (or (Math-equal (nth 2 a) (math-quarter-circle nil))
|
|
(Math-equal (nth 2 a)
|
|
(math-neg (math-quarter-circle nil))))
|
|
16 48))
|
|
(t 63)))
|
|
((eq (car a) '/)
|
|
(let* ((t1 (math-possible-types (nth 1 a) num))
|
|
(t2 (math-possible-types (nth 2 a) num))
|
|
(t12 (logior t1 t2)))
|
|
(if (< t12 16)
|
|
(if (> (logand t12 10) 0)
|
|
10
|
|
(if (or (= t1 4) (= t2 4) calc-prefer-frac)
|
|
5
|
|
15))
|
|
(if (< t12 32)
|
|
(if (= t1 16)
|
|
(if (= t2 16) 15
|
|
(if (< t2 16) 16 31))
|
|
(if (= t2 16)
|
|
(if (< t1 16) 16 31)
|
|
31))
|
|
63))))
|
|
((memq (car a) '(+ - * %))
|
|
(let* ((t1 (math-possible-types (nth 1 a) num))
|
|
(t2 (math-possible-types (nth 2 a) num))
|
|
(t12 (logior t1 t2)))
|
|
(if (eq (car a) '%)
|
|
(setq t1 (logand t1 15) t2 (logand t2 15) t12 (logand t12 15)))
|
|
(if (< t12 16)
|
|
(let ((mask (if (<= t12 3)
|
|
1
|
|
(if (and (or (and (<= t1 3) (= (logand t2 3) 0))
|
|
(and (<= t2 3) (= (logand t1 3) 0)))
|
|
(memq (car a) '(+ -)))
|
|
4
|
|
5))))
|
|
(if num
|
|
(* mask 3)
|
|
(logior (if (and (> (logand t1 5) 0) (> (logand t2 5) 0))
|
|
mask 0)
|
|
(if (> (logand t12 10) 0)
|
|
(* mask 2) 0))))
|
|
(if (< t12 32)
|
|
(if (eq (car a) '*)
|
|
(if (= t1 16)
|
|
(if (= t2 16) 15
|
|
(if (< t2 16) 16 31))
|
|
(if (= t2 16)
|
|
(if (< t1 16) 16 31)
|
|
31))
|
|
(if (= t12 16) 16
|
|
(if (or (and (= t1 16) (< t2 16))
|
|
(and (= t2 16) (< t1 16))) 32 63)))
|
|
63))))
|
|
((eq (car a) 'neg)
|
|
(math-possible-types (nth 1 a)))
|
|
((eq (car a) '^)
|
|
(let* ((t1 (math-possible-types (nth 1 a) num))
|
|
(t2 (math-possible-types (nth 2 a) num))
|
|
(t12 (logior t1 t2)))
|
|
(if (and (<= t2 3) (math-known-nonnegp (nth 2 a)) (< t1 16))
|
|
(let ((mask (logior (if (> (logand t1 3) 0) 1 0)
|
|
(logand t1 4)
|
|
(if (> (logand t1 12) 0) 5 0))))
|
|
(if num
|
|
(* mask 3)
|
|
(logior (if (and (> (logand t1 5) 0) (> (logand t2 5) 0))
|
|
mask 0)
|
|
(if (> (logand t12 10) 0)
|
|
(* mask 2) 0))))
|
|
(if (and (math-known-nonnegp (nth 1 a))
|
|
(math-known-posp (nth 2 a)))
|
|
15
|
|
63))))
|
|
((eq (car a) 'calcFunc-sqrt)
|
|
(let ((t1 (math-possible-signs (nth 1 a))))
|
|
(logior (if (> (logand t1 2) 0) 3 0)
|
|
(if (> (logand t1 1) 0) 16 0)
|
|
(if (> (logand t1 4) 0) 15 0)
|
|
(if (> (logand t1 8) 0) 32 0))))
|
|
((eq (car a) 'vec)
|
|
(let ((types 0))
|
|
(while (and (setq a (cdr a)) (< types 63))
|
|
(setq types (logior types (math-possible-types (car a) t))))
|
|
types))
|
|
((or (memq (car a) math-integer-functions)
|
|
(and (memq (car a) math-rounding-functions)
|
|
(math-known-nonnegp (or (nth 2 a) 0))))
|
|
1)
|
|
((or (memq (car a) math-num-integer-functions)
|
|
(and (memq (car a) math-float-rounding-functions)
|
|
(math-known-nonnegp (or (nth 2 a) 0))))
|
|
2)
|
|
((eq (car a) 'calcFunc-frac)
|
|
5)
|
|
((and (eq (car a) 'calcFunc-float) (= (length a) 2))
|
|
(let ((t1 (math-possible-types (nth 1 a))))
|
|
(logior (if (> (logand t1 3) 0) 2 0)
|
|
(if (> (logand t1 12) 0) 8 0)
|
|
(logand t1 48))))
|
|
((and (memq (car a) '(calcFunc-abs calcFunc-abssqr))
|
|
(= (length a) 2))
|
|
(let ((t1 (math-possible-types (nth 1 a))))
|
|
(if (>= t1 16)
|
|
15
|
|
t1)))
|
|
((math-const-var a)
|
|
(cond ((memq (nth 2 a) '(var-e var-pi var-phi var-gamma)) 8)
|
|
((eq (nth 2 a) 'var-inf) 1)
|
|
((eq (nth 2 a) 'var-i) 16)
|
|
(t 63)))
|
|
(t
|
|
(math-setup-declarations)
|
|
(let ((decl (if (eq (car a) 'var)
|
|
(or (assq (nth 2 a) math-decls-cache)
|
|
math-decls-all)
|
|
(assq (car a) math-decls-cache))))
|
|
(cond ((memq 'int (nth 1 decl))
|
|
1)
|
|
((memq 'numint (nth 1 decl))
|
|
3)
|
|
((memq 'frac (nth 1 decl))
|
|
4)
|
|
((memq 'rat (nth 1 decl))
|
|
5)
|
|
((memq 'float (nth 1 decl))
|
|
10)
|
|
((nth 2 decl)
|
|
(math-possible-types (nth 2 decl)))
|
|
((memq 'real (nth 1 decl))
|
|
15)
|
|
(t 63))))))
|
|
|
|
(defun math-known-evenp (a)
|
|
(cond ((Math-integerp a)
|
|
(math-evenp a))
|
|
((Math-messy-integerp a)
|
|
(or (> (nth 2 a) 0)
|
|
(math-evenp (math-trunc a))))
|
|
((eq (car a) '*)
|
|
(if (math-known-evenp (nth 1 a))
|
|
(math-known-num-integerp (nth 2 a))
|
|
(if (math-known-num-integerp (nth 1 a))
|
|
(math-known-evenp (nth 2 a)))))
|
|
((memq (car a) '(+ -))
|
|
(or (and (math-known-evenp (nth 1 a))
|
|
(math-known-evenp (nth 2 a)))
|
|
(and (math-known-oddp (nth 1 a))
|
|
(math-known-oddp (nth 2 a)))))
|
|
((eq (car a) 'neg)
|
|
(math-known-evenp (nth 1 a)))))
|
|
|
|
(defun math-known-oddp (a)
|
|
(cond ((Math-integerp a)
|
|
(math-oddp a))
|
|
((Math-messy-integerp a)
|
|
(and (<= (nth 2 a) 0)
|
|
(math-oddp (math-trunc a))))
|
|
((memq (car a) '(+ -))
|
|
(or (and (math-known-evenp (nth 1 a))
|
|
(math-known-oddp (nth 2 a)))
|
|
(and (math-known-oddp (nth 1 a))
|
|
(math-known-evenp (nth 2 a)))))
|
|
((eq (car a) 'neg)
|
|
(math-known-oddp (nth 1 a)))))
|
|
|
|
|
|
(defun calcFunc-dreal (expr)
|
|
(let ((types (math-possible-types expr)))
|
|
(if (< types 16) 1
|
|
(if (= (logand types 15) 0) 0
|
|
(math-reject-arg expr 'realp 'quiet)))))
|
|
|
|
(defun calcFunc-dimag (expr)
|
|
(let ((types (math-possible-types expr)))
|
|
(if (= types 16) 1
|
|
(if (= (logand types 16) 0) 0
|
|
(math-reject-arg expr "Expected an imaginary number")))))
|
|
|
|
(defun calcFunc-dpos (expr)
|
|
(let ((signs (math-possible-signs expr)))
|
|
(if (eq signs 4) 1
|
|
(if (memq signs '(1 2 3)) 0
|
|
(math-reject-arg expr 'posp 'quiet)))))
|
|
|
|
(defun calcFunc-dneg (expr)
|
|
(let ((signs (math-possible-signs expr)))
|
|
(if (eq signs 1) 1
|
|
(if (memq signs '(2 4 6)) 0
|
|
(math-reject-arg expr 'negp 'quiet)))))
|
|
|
|
(defun calcFunc-dnonneg (expr)
|
|
(let ((signs (math-possible-signs expr)))
|
|
(if (memq signs '(2 4 6)) 1
|
|
(if (eq signs 1) 0
|
|
(math-reject-arg expr 'posp 'quiet)))))
|
|
|
|
(defun calcFunc-dnonzero (expr)
|
|
(let ((signs (math-possible-signs expr)))
|
|
(if (memq signs '(1 4 5 8 9 12 13)) 1
|
|
(if (eq signs 2) 0
|
|
(math-reject-arg expr 'nonzerop 'quiet)))))
|
|
|
|
(defun calcFunc-dint (expr)
|
|
(let ((types (math-possible-types expr)))
|
|
(if (= types 1) 1
|
|
(if (= (logand types 1) 0) 0
|
|
(math-reject-arg expr 'integerp 'quiet)))))
|
|
|
|
(defun calcFunc-dnumint (expr)
|
|
(let ((types (math-possible-types expr t)))
|
|
(if (<= types 3) 1
|
|
(if (= (logand types 3) 0) 0
|
|
(math-reject-arg expr 'integerp 'quiet)))))
|
|
|
|
(defun calcFunc-dnatnum (expr)
|
|
(let ((res (calcFunc-dint expr)))
|
|
(if (eq res 1)
|
|
(calcFunc-dnonneg expr)
|
|
res)))
|
|
|
|
(defun calcFunc-deven (expr)
|
|
(if (math-known-evenp expr)
|
|
1
|
|
(if (or (math-known-oddp expr)
|
|
(= (logand (math-possible-types expr) 3) 0))
|
|
0
|
|
(math-reject-arg expr "Can't tell if expression is odd or even"))))
|
|
|
|
(defun calcFunc-dodd (expr)
|
|
(if (math-known-oddp expr)
|
|
1
|
|
(if (or (math-known-evenp expr)
|
|
(= (logand (math-possible-types expr) 3) 0))
|
|
0
|
|
(math-reject-arg expr "Can't tell if expression is odd or even"))))
|
|
|
|
(defun calcFunc-drat (expr)
|
|
(let ((types (math-possible-types expr)))
|
|
(if (memq types '(1 4 5)) 1
|
|
(if (= (logand types 5) 0) 0
|
|
(math-reject-arg expr "Rational number expected")))))
|
|
|
|
(defun calcFunc-drange (expr)
|
|
(math-setup-declarations)
|
|
(let (range)
|
|
(if (Math-realp expr)
|
|
(list 'vec expr)
|
|
(if (eq (car-safe expr) 'intv)
|
|
expr
|
|
(if (eq (car-safe expr) 'var)
|
|
(setq range (nth 2 (or (assq (nth 2 expr) math-decls-cache)
|
|
math-decls-all)))
|
|
(setq range (nth 2 (assq (car-safe expr) math-decls-cache))))
|
|
(if range
|
|
(math-clean-set (copy-sequence range))
|
|
(setq range (math-possible-signs expr))
|
|
(if (< range 8)
|
|
(aref [(vec)
|
|
(intv 2 (neg (var inf var-inf)) 0)
|
|
(vec 0)
|
|
(intv 3 (neg (var inf var-inf)) 0)
|
|
(intv 1 0 (var inf var-inf))
|
|
(vec (intv 2 (neg (var inf var-inf)) 0)
|
|
(intv 1 0 (var inf var-inf)))
|
|
(intv 3 0 (var inf var-inf))
|
|
(intv 3 (neg (var inf var-inf)) (var inf var-inf))] range)
|
|
(math-reject-arg expr 'realp 'quiet)))))))
|
|
|
|
(defun calcFunc-dscalar (a)
|
|
(if (math-known-scalarp a) 1
|
|
(if (math-known-matrixp a) 0
|
|
(math-reject-arg a 'objectp 'quiet))))
|
|
|
|
|
|
;;;; Arithmetic.
|
|
|
|
(defsubst calcFunc-neg (a)
|
|
(math-normalize (list 'neg a)))
|
|
|
|
(defun math-neg-fancy (a)
|
|
(cond ((eq (car a) 'polar)
|
|
(list 'polar
|
|
(nth 1 a)
|
|
(if (math-posp (nth 2 a))
|
|
(math-sub (nth 2 a) (math-half-circle nil))
|
|
(math-add (nth 2 a) (math-half-circle nil)))))
|
|
((eq (car a) 'mod)
|
|
(if (math-zerop (nth 1 a))
|
|
a
|
|
(list 'mod (math-sub (nth 2 a) (nth 1 a)) (nth 2 a))))
|
|
((eq (car a) 'sdev)
|
|
(list 'sdev (math-neg (nth 1 a)) (nth 2 a)))
|
|
((eq (car a) 'intv)
|
|
(math-make-intv (aref [0 2 1 3] (nth 1 a))
|
|
(math-neg (nth 3 a))
|
|
(math-neg (nth 2 a))))
|
|
((and math-simplify-only
|
|
(not (equal a math-simplify-only)))
|
|
(list 'neg a))
|
|
((eq (car a) '+)
|
|
(math-sub (math-neg (nth 1 a)) (nth 2 a)))
|
|
((eq (car a) '-)
|
|
(math-sub (nth 2 a) (nth 1 a)))
|
|
((and (memq (car a) '(* /))
|
|
(math-okay-neg (nth 1 a)))
|
|
(list (car a) (math-neg (nth 1 a)) (nth 2 a)))
|
|
((and (memq (car a) '(* /))
|
|
(math-okay-neg (nth 2 a)))
|
|
(list (car a) (nth 1 a) (math-neg (nth 2 a))))
|
|
((and (memq (car a) '(* /))
|
|
(or (math-objectp (nth 1 a))
|
|
(and (eq (car (nth 1 a)) '*)
|
|
(math-objectp (nth 1 (nth 1 a))))))
|
|
(list (car a) (math-neg (nth 1 a)) (nth 2 a)))
|
|
((and (eq (car a) '/)
|
|
(or (math-objectp (nth 2 a))
|
|
(and (eq (car (nth 2 a)) '*)
|
|
(math-objectp (nth 1 (nth 2 a))))))
|
|
(list (car a) (nth 1 a) (math-neg (nth 2 a))))
|
|
((and (eq (car a) 'var) (memq (nth 2 a) '(var-uinf var-nan)))
|
|
a)
|
|
((eq (car a) 'neg)
|
|
(nth 1 a))
|
|
(t (list 'neg a))))
|
|
|
|
(defun math-okay-neg (a)
|
|
(or (math-looks-negp a)
|
|
(eq (car-safe a) '-)))
|
|
|
|
(defun math-neg-float (a)
|
|
(list 'float (Math-integer-neg (nth 1 a)) (nth 2 a)))
|
|
|
|
|
|
(defun calcFunc-add (&rest rest)
|
|
(if rest
|
|
(let ((a (car rest)))
|
|
(while (setq rest (cdr rest))
|
|
(setq a (list '+ a (car rest))))
|
|
(math-normalize a))
|
|
0))
|
|
|
|
(defun calcFunc-sub (&rest rest)
|
|
(if rest
|
|
(let ((a (car rest)))
|
|
(while (setq rest (cdr rest))
|
|
(setq a (list '- a (car rest))))
|
|
(math-normalize a))
|
|
0))
|
|
|
|
(defun math-add-objects-fancy (a b)
|
|
(cond ((and (Math-numberp a) (Math-numberp b))
|
|
(let ((aa (math-complex a))
|
|
(bb (math-complex b)))
|
|
(math-normalize
|
|
(let ((res (list 'cplx
|
|
(math-add (nth 1 aa) (nth 1 bb))
|
|
(math-add (nth 2 aa) (nth 2 bb)))))
|
|
(if (math-want-polar a b)
|
|
(math-polar res)
|
|
res)))))
|
|
((or (Math-vectorp a) (Math-vectorp b))
|
|
(math-map-vec-2 'math-add a b))
|
|
((eq (car-safe a) 'sdev)
|
|
(if (eq (car-safe b) 'sdev)
|
|
(math-make-sdev (math-add (nth 1 a) (nth 1 b))
|
|
(math-hypot (nth 2 a) (nth 2 b)))
|
|
(and (or (Math-scalarp b)
|
|
(not (Math-objvecp b)))
|
|
(math-make-sdev (math-add (nth 1 a) b) (nth 2 a)))))
|
|
((and (eq (car-safe b) 'sdev)
|
|
(or (Math-scalarp a)
|
|
(not (Math-objvecp a))))
|
|
(math-make-sdev (math-add a (nth 1 b)) (nth 2 b)))
|
|
((eq (car-safe a) 'intv)
|
|
(if (eq (car-safe b) 'intv)
|
|
(math-make-intv (logior (logand (nth 1 a) (nth 1 b))
|
|
(if (equal (nth 2 a)
|
|
'(neg (var inf var-inf)))
|
|
(logand (nth 1 a) 2) 0)
|
|
(if (equal (nth 2 b)
|
|
'(neg (var inf var-inf)))
|
|
(logand (nth 1 b) 2) 0)
|
|
(if (equal (nth 3 a) '(var inf var-inf))
|
|
(logand (nth 1 a) 1) 0)
|
|
(if (equal (nth 3 b) '(var inf var-inf))
|
|
(logand (nth 1 b) 1) 0))
|
|
(math-add (nth 2 a) (nth 2 b))
|
|
(math-add (nth 3 a) (nth 3 b)))
|
|
(and (or (Math-anglep b)
|
|
(eq (car b) 'date)
|
|
(not (Math-objvecp b)))
|
|
(math-make-intv (nth 1 a)
|
|
(math-add (nth 2 a) b)
|
|
(math-add (nth 3 a) b)))))
|
|
((and (eq (car-safe b) 'intv)
|
|
(or (Math-anglep a)
|
|
(eq (car a) 'date)
|
|
(not (Math-objvecp a))))
|
|
(math-make-intv (nth 1 b)
|
|
(math-add a (nth 2 b))
|
|
(math-add a (nth 3 b))))
|
|
((eq (car-safe a) 'date)
|
|
(cond ((eq (car-safe b) 'date)
|
|
(math-add (nth 1 a) (nth 1 b)))
|
|
((eq (car-safe b) 'hms)
|
|
(let ((parts (math-date-parts (nth 1 a))))
|
|
(list 'date
|
|
(math-add (car parts) ; this minimizes roundoff
|
|
(math-div (math-add
|
|
(math-add (nth 1 parts)
|
|
(nth 2 parts))
|
|
(math-add
|
|
(math-mul (nth 1 b) 3600)
|
|
(math-add (math-mul (nth 2 b) 60)
|
|
(nth 3 b))))
|
|
86400)))))
|
|
((Math-realp b)
|
|
(list 'date (math-add (nth 1 a) b)))
|
|
(t nil)))
|
|
((eq (car-safe b) 'date)
|
|
(math-add-objects-fancy b a))
|
|
((and (eq (car-safe a) 'mod)
|
|
(eq (car-safe b) 'mod)
|
|
(equal (nth 2 a) (nth 2 b)))
|
|
(math-make-mod (math-add (nth 1 a) (nth 1 b)) (nth 2 a)))
|
|
((and (eq (car-safe a) 'mod)
|
|
(Math-anglep b))
|
|
(math-make-mod (math-add (nth 1 a) b) (nth 2 a)))
|
|
((and (eq (car-safe b) 'mod)
|
|
(Math-anglep a))
|
|
(math-make-mod (math-add a (nth 1 b)) (nth 2 b)))
|
|
((and (or (eq (car-safe a) 'hms) (eq (car-safe b) 'hms))
|
|
(and (Math-anglep a) (Math-anglep b)))
|
|
(or (eq (car-safe a) 'hms) (setq a (math-to-hms a)))
|
|
(or (eq (car-safe b) 'hms) (setq b (math-to-hms b)))
|
|
(math-normalize
|
|
(if (math-negp a)
|
|
(math-neg (math-add (math-neg a) (math-neg b)))
|
|
(if (math-negp b)
|
|
(let* ((s (math-add (nth 3 a) (nth 3 b)))
|
|
(m (math-add (nth 2 a) (nth 2 b)))
|
|
(h (math-add (nth 1 a) (nth 1 b))))
|
|
(if (math-negp s)
|
|
(setq s (math-add s 60)
|
|
m (math-add m -1)))
|
|
(if (math-negp m)
|
|
(setq m (math-add m 60)
|
|
h (math-add h -1)))
|
|
(if (math-negp h)
|
|
(math-add b a)
|
|
(list 'hms h m s)))
|
|
(let* ((s (math-add (nth 3 a) (nth 3 b)))
|
|
(m (math-add (nth 2 a) (nth 2 b)))
|
|
(h (math-add (nth 1 a) (nth 1 b))))
|
|
(list 'hms h m s))))))
|
|
(t (calc-record-why "*Incompatible arguments for +" a b))))
|
|
|
|
(defun math-add-symb-fancy (a b)
|
|
(or (and math-simplify-only
|
|
(not (equal a math-simplify-only))
|
|
(list '+ a b))
|
|
(and (eq (car-safe b) '+)
|
|
(math-add (math-add a (nth 1 b))
|
|
(nth 2 b)))
|
|
(and (eq (car-safe b) '-)
|
|
(math-sub (math-add a (nth 1 b))
|
|
(nth 2 b)))
|
|
(and (eq (car-safe b) 'neg)
|
|
(eq (car-safe (nth 1 b)) '+)
|
|
(math-sub (math-sub a (nth 1 (nth 1 b)))
|
|
(nth 2 (nth 1 b))))
|
|
(and (or (and (Math-vectorp a) (math-known-scalarp b))
|
|
(and (Math-vectorp b) (math-known-scalarp a)))
|
|
(math-map-vec-2 'math-add a b))
|
|
(let ((inf (math-infinitep a)))
|
|
(cond
|
|
(inf
|
|
(let ((inf2 (math-infinitep b)))
|
|
(if inf2
|
|
(if (or (memq (nth 2 inf) '(var-uinf var-nan))
|
|
(memq (nth 2 inf2) '(var-uinf var-nan)))
|
|
'(var nan var-nan)
|
|
(let ((dir (math-infinite-dir a inf))
|
|
(dir2 (math-infinite-dir b inf2)))
|
|
(if (and (Math-objectp dir) (Math-objectp dir2))
|
|
(if (Math-equal dir dir2)
|
|
a
|
|
'(var nan var-nan)))))
|
|
(if (and (equal a '(var inf var-inf))
|
|
(eq (car-safe b) 'intv)
|
|
(memq (nth 1 b) '(2 3))
|
|
(equal (nth 2 b) '(neg (var inf var-inf))))
|
|
(list 'intv 3 (nth 2 b) a)
|
|
(if (and (equal a '(neg (var inf var-inf)))
|
|
(eq (car-safe b) 'intv)
|
|
(memq (nth 1 b) '(1 3))
|
|
(equal (nth 3 b) '(var inf var-inf)))
|
|
(list 'intv 3 a (nth 3 b))
|
|
a)))))
|
|
((math-infinitep b)
|
|
(if (eq (car-safe a) 'intv)
|
|
(math-add b a)
|
|
b))
|
|
((eq (car-safe a) '+)
|
|
(let ((temp (math-combine-sum (nth 2 a) b nil nil t)))
|
|
(and temp
|
|
(math-add (nth 1 a) temp))))
|
|
((eq (car-safe a) '-)
|
|
(let ((temp (math-combine-sum (nth 2 a) b t nil t)))
|
|
(and temp
|
|
(math-add (nth 1 a) temp))))
|
|
((and (Math-objectp a) (Math-objectp b))
|
|
nil)
|
|
(t
|
|
(math-combine-sum a b nil nil nil))))
|
|
(and (Math-looks-negp b)
|
|
(list '- a (math-neg b)))
|
|
(and (Math-looks-negp a)
|
|
(list '- b (math-neg a)))
|
|
(and (eq (car-safe a) 'calcFunc-idn)
|
|
(= (length a) 2)
|
|
(or (and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(list 'calcFunc-idn (math-add (nth 1 a) (nth 1 b))))
|
|
(and (math-square-matrixp b)
|
|
(math-add (math-mimic-ident (nth 1 a) b) b))
|
|
(and (math-known-scalarp b)
|
|
(math-add (nth 1 a) b))))
|
|
(and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(or (and (math-square-matrixp a)
|
|
(math-add a (math-mimic-ident (nth 1 b) a)))
|
|
(and (math-known-scalarp a)
|
|
(math-add a (nth 1 b)))))
|
|
(list '+ a b)))
|
|
|
|
|
|
(defun calcFunc-mul (&rest rest)
|
|
(if rest
|
|
(let ((a (car rest)))
|
|
(while (setq rest (cdr rest))
|
|
(setq a (list '* a (car rest))))
|
|
(math-normalize a))
|
|
1))
|
|
|
|
(defun math-mul-objects-fancy (a b)
|
|
(cond ((and (Math-numberp a) (Math-numberp b))
|
|
(math-normalize
|
|
(if (math-want-polar a b)
|
|
(let ((a (math-polar a))
|
|
(b (math-polar b)))
|
|
(list 'polar
|
|
(math-mul (nth 1 a) (nth 1 b))
|
|
(math-fix-circular (math-add (nth 2 a) (nth 2 b)))))
|
|
(setq a (math-complex a)
|
|
b (math-complex b))
|
|
(list 'cplx
|
|
(math-sub (math-mul (nth 1 a) (nth 1 b))
|
|
(math-mul (nth 2 a) (nth 2 b)))
|
|
(math-add (math-mul (nth 1 a) (nth 2 b))
|
|
(math-mul (nth 2 a) (nth 1 b)))))))
|
|
((Math-vectorp a)
|
|
(if (Math-vectorp b)
|
|
(if (math-matrixp a)
|
|
(if (math-matrixp b)
|
|
(if (= (length (nth 1 a)) (length b))
|
|
(math-mul-mats a b)
|
|
(math-dimension-error))
|
|
(if (= (length (nth 1 a)) 2)
|
|
(if (= (length a) (length b))
|
|
(math-mul-mats a (list 'vec b))
|
|
(math-dimension-error))
|
|
(if (= (length (nth 1 a)) (length b))
|
|
(math-mul-mat-vec a b)
|
|
(math-dimension-error))))
|
|
(if (math-matrixp b)
|
|
(if (= (length a) (length b))
|
|
(nth 1 (math-mul-mats (list 'vec a) b))
|
|
(math-dimension-error))
|
|
(if (= (length a) (length b))
|
|
(math-dot-product a b)
|
|
(math-dimension-error))))
|
|
(math-map-vec-2 'math-mul a b)))
|
|
((Math-vectorp b)
|
|
(math-map-vec-2 'math-mul a b))
|
|
((eq (car-safe a) 'sdev)
|
|
(if (eq (car-safe b) 'sdev)
|
|
(math-make-sdev (math-mul (nth 1 a) (nth 1 b))
|
|
(math-hypot (math-mul (nth 2 a) (nth 1 b))
|
|
(math-mul (nth 2 b) (nth 1 a))))
|
|
(and (or (Math-scalarp b)
|
|
(not (Math-objvecp b)))
|
|
(math-make-sdev (math-mul (nth 1 a) b)
|
|
(math-mul (nth 2 a) b)))))
|
|
((and (eq (car-safe b) 'sdev)
|
|
(or (Math-scalarp a)
|
|
(not (Math-objvecp a))))
|
|
(math-make-sdev (math-mul a (nth 1 b)) (math-mul a (nth 2 b))))
|
|
((and (eq (car-safe a) 'intv) (Math-anglep b))
|
|
(if (Math-negp b)
|
|
(math-neg (math-mul a (math-neg b)))
|
|
(math-make-intv (nth 1 a)
|
|
(math-mul (nth 2 a) b)
|
|
(math-mul (nth 3 a) b))))
|
|
((and (eq (car-safe b) 'intv) (Math-anglep a))
|
|
(math-mul b a))
|
|
((and (eq (car-safe a) 'intv) (math-intv-constp a)
|
|
(eq (car-safe b) 'intv) (math-intv-constp b))
|
|
(let ((lo (math-mul a (nth 2 b)))
|
|
(hi (math-mul a (nth 3 b))))
|
|
(or (eq (car-safe lo) 'intv)
|
|
(setq lo (list 'intv (if (memq (nth 1 b) '(2 3)) 3 0) lo lo)))
|
|
(or (eq (car-safe hi) 'intv)
|
|
(setq hi (list 'intv (if (memq (nth 1 b) '(1 3)) 3 0) hi hi)))
|
|
(math-combine-intervals
|
|
(nth 2 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(math-infinitep (nth 2 lo)))
|
|
(memq (nth 1 lo) '(2 3)))
|
|
(nth 3 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(math-infinitep (nth 3 lo)))
|
|
(memq (nth 1 lo) '(1 3)))
|
|
(nth 2 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(math-infinitep (nth 2 hi)))
|
|
(memq (nth 1 hi) '(2 3)))
|
|
(nth 3 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(math-infinitep (nth 3 hi)))
|
|
(memq (nth 1 hi) '(1 3))))))
|
|
((and (eq (car-safe a) 'mod)
|
|
(eq (car-safe b) 'mod)
|
|
(equal (nth 2 a) (nth 2 b)))
|
|
(math-make-mod (math-mul (nth 1 a) (nth 1 b)) (nth 2 a)))
|
|
((and (eq (car-safe a) 'mod)
|
|
(Math-anglep b))
|
|
(math-make-mod (math-mul (nth 1 a) b) (nth 2 a)))
|
|
((and (eq (car-safe b) 'mod)
|
|
(Math-anglep a))
|
|
(math-make-mod (math-mul a (nth 1 b)) (nth 2 b)))
|
|
((and (eq (car-safe a) 'hms) (Math-realp b))
|
|
(math-with-extra-prec 2
|
|
(math-to-hms (math-mul (math-from-hms a 'deg) b) 'deg)))
|
|
((and (eq (car-safe b) 'hms) (Math-realp a))
|
|
(math-mul b a))
|
|
(t (calc-record-why "*Incompatible arguments for *" a b))))
|
|
|
|
;;; Fast function to multiply floating-point numbers.
|
|
(defun math-mul-float (a b) ; [F F F]
|
|
(math-make-float (math-mul (nth 1 a) (nth 1 b))
|
|
(+ (nth 2 a) (nth 2 b))))
|
|
|
|
(defun math-sqr-float (a) ; [F F]
|
|
(math-make-float (math-mul (nth 1 a) (nth 1 a))
|
|
(+ (nth 2 a) (nth 2 a))))
|
|
|
|
(defun math-intv-constp (a &optional finite)
|
|
(and (or (Math-anglep (nth 2 a))
|
|
(and (equal (nth 2 a) '(neg (var inf var-inf)))
|
|
(or (not finite)
|
|
(memq (nth 1 a) '(0 1)))))
|
|
(or (Math-anglep (nth 3 a))
|
|
(and (equal (nth 3 a) '(var inf var-inf))
|
|
(or (not finite)
|
|
(memq (nth 1 a) '(0 2)))))))
|
|
|
|
(defun math-mul-zero (a b)
|
|
(if (math-known-matrixp b)
|
|
(if (math-vectorp b)
|
|
(math-map-vec-2 'math-mul a b)
|
|
(math-mimic-ident 0 b))
|
|
(if (math-infinitep b)
|
|
'(var nan var-nan)
|
|
(let ((aa nil) (bb nil))
|
|
(if (and (eq (car-safe b) 'intv)
|
|
(progn
|
|
(and (equal (nth 2 b) '(neg (var inf var-inf)))
|
|
(memq (nth 1 b) '(2 3))
|
|
(setq aa (nth 2 b)))
|
|
(and (equal (nth 3 b) '(var inf var-inf))
|
|
(memq (nth 1 b) '(1 3))
|
|
(setq bb (nth 3 b)))
|
|
(or aa bb)))
|
|
(if (or (math-posp a)
|
|
(and (math-zerop a)
|
|
(or (memq calc-infinite-mode '(-1 1))
|
|
(setq aa '(neg (var inf var-inf))
|
|
bb '(var inf var-inf)))))
|
|
(list 'intv 3 (or aa 0) (or bb 0))
|
|
(if (math-negp a)
|
|
(math-neg (list 'intv 3 (or aa 0) (or bb 0)))
|
|
'(var nan var-nan)))
|
|
(if (or (math-floatp a) (math-floatp b)) '(float 0 0) 0))))))
|
|
|
|
|
|
(defun math-mul-symb-fancy (a b)
|
|
(or (and math-simplify-only
|
|
(not (equal a math-simplify-only))
|
|
(list '* a b))
|
|
(and (Math-equal-int a 1)
|
|
b)
|
|
(and (Math-equal-int a -1)
|
|
(math-neg b))
|
|
(and (or (and (Math-vectorp a) (math-known-scalarp b))
|
|
(and (Math-vectorp b) (math-known-scalarp a)))
|
|
(math-map-vec-2 'math-mul a b))
|
|
(and (Math-objectp b) (not (Math-objectp a))
|
|
(math-mul b a))
|
|
(and (eq (car-safe a) 'neg)
|
|
(math-neg (math-mul (nth 1 a) b)))
|
|
(and (eq (car-safe b) 'neg)
|
|
(math-neg (math-mul a (nth 1 b))))
|
|
(and (eq (car-safe a) '*)
|
|
(math-mul (nth 1 a)
|
|
(math-mul (nth 2 a) b)))
|
|
(and (eq (car-safe a) '^)
|
|
(Math-looks-negp (nth 2 a))
|
|
(not (and (eq (car-safe b) '^) (Math-looks-negp (nth 2 b))))
|
|
(math-known-scalarp b t)
|
|
(math-div b (math-normalize
|
|
(list '^ (nth 1 a) (math-neg (nth 2 a))))))
|
|
(and (eq (car-safe b) '^)
|
|
(Math-looks-negp (nth 2 b))
|
|
(not (and (eq (car-safe a) '^) (Math-looks-negp (nth 2 a))))
|
|
(not (math-known-matrixp (nth 1 b)))
|
|
(math-div a (math-normalize
|
|
(list '^ (nth 1 b) (math-neg (nth 2 b))))))
|
|
(and (eq (car-safe a) '/)
|
|
(or (math-known-scalarp a t) (math-known-scalarp b t))
|
|
(let ((temp (math-combine-prod (nth 2 a) b t nil t)))
|
|
(if temp
|
|
(math-mul (nth 1 a) temp)
|
|
(math-div (math-mul (nth 1 a) b) (nth 2 a)))))
|
|
(and (eq (car-safe b) '/)
|
|
(math-div (math-mul a (nth 1 b)) (nth 2 b)))
|
|
(and (eq (car-safe b) '+)
|
|
(Math-numberp a)
|
|
(or (Math-numberp (nth 1 b))
|
|
(Math-numberp (nth 2 b)))
|
|
(math-add (math-mul a (nth 1 b))
|
|
(math-mul a (nth 2 b))))
|
|
(and (eq (car-safe b) '-)
|
|
(Math-numberp a)
|
|
(or (Math-numberp (nth 1 b))
|
|
(Math-numberp (nth 2 b)))
|
|
(math-sub (math-mul a (nth 1 b))
|
|
(math-mul a (nth 2 b))))
|
|
(and (eq (car-safe b) '*)
|
|
(Math-numberp (nth 1 b))
|
|
(not (Math-numberp a))
|
|
(math-mul (nth 1 b) (math-mul a (nth 2 b))))
|
|
(and (eq (car-safe a) 'calcFunc-idn)
|
|
(= (length a) 2)
|
|
(or (and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(list 'calcFunc-idn (math-mul (nth 1 a) (nth 1 b))))
|
|
(and (math-known-scalarp b)
|
|
(list 'calcFunc-idn (math-mul (nth 1 a) b)))
|
|
(and (math-known-matrixp b)
|
|
(math-mul (nth 1 a) b))))
|
|
(and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(or (and (math-known-scalarp a)
|
|
(list 'calcFunc-idn (math-mul a (nth 1 b))))
|
|
(and (math-known-matrixp a)
|
|
(math-mul a (nth 1 b)))))
|
|
(and (math-identity-matrix-p a t)
|
|
(or (and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(list 'calcFunc-idn (math-mul
|
|
(nth 1 (nth 1 a))
|
|
(nth 1 b))
|
|
(1- (length a))))
|
|
(and (math-known-scalarp b)
|
|
(list 'calcFunc-idn (math-mul
|
|
(nth 1 (nth 1 a)) b)
|
|
(1- (length a))))
|
|
(and (math-known-matrixp b)
|
|
(math-mul (nth 1 (nth 1 a)) b))))
|
|
(and (math-identity-matrix-p b t)
|
|
(or (and (eq (car-safe a) 'calcFunc-idn)
|
|
(= (length a) 2)
|
|
(list 'calcFunc-idn (math-mul (nth 1 a)
|
|
(nth 1 (nth 1 b)))
|
|
(1- (length b))))
|
|
(and (math-known-scalarp a)
|
|
(list 'calcFunc-idn (math-mul a (nth 1 (nth 1 b)))
|
|
(1- (length b))))
|
|
(and (math-known-matrixp a)
|
|
(math-mul a (nth 1 (nth 1 b))))))
|
|
(and (math-looks-negp b)
|
|
(math-mul (math-neg a) (math-neg b)))
|
|
(and (eq (car-safe b) '-)
|
|
(math-looks-negp a)
|
|
(math-mul (math-neg a) (math-neg b)))
|
|
(cond
|
|
((eq (car-safe b) '*)
|
|
(let ((temp (math-combine-prod a (nth 1 b) nil nil t)))
|
|
(and temp
|
|
(math-mul temp (nth 2 b)))))
|
|
(t
|
|
(math-combine-prod a b nil nil nil)))
|
|
(and (equal a '(var nan var-nan))
|
|
a)
|
|
(and (equal b '(var nan var-nan))
|
|
b)
|
|
(and (equal a '(var uinf var-uinf))
|
|
a)
|
|
(and (equal b '(var uinf var-uinf))
|
|
b)
|
|
(and (equal b '(var inf var-inf))
|
|
(let ((s1 (math-possible-signs a)))
|
|
(cond ((eq s1 4)
|
|
b)
|
|
((eq s1 6)
|
|
'(intv 3 0 (var inf var-inf)))
|
|
((eq s1 1)
|
|
(math-neg b))
|
|
((eq s1 3)
|
|
'(intv 3 (neg (var inf var-inf)) 0))
|
|
((and (eq (car a) 'intv) (math-intv-constp a))
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf)))
|
|
((and (eq (car a) 'cplx)
|
|
(math-zerop (nth 1 a)))
|
|
(list '* (list 'cplx 0 (calcFunc-sign (nth 2 a))) b))
|
|
((eq (car a) 'polar)
|
|
(list '* (list 'polar 1 (nth 2 a)) b)))))
|
|
(and (equal a '(var inf var-inf))
|
|
(math-mul b a))
|
|
(list '* a b)))
|
|
|
|
|
|
(defun calcFunc-div (a &rest rest)
|
|
(while rest
|
|
(setq a (list '/ a (car rest))
|
|
rest (cdr rest)))
|
|
(math-normalize a))
|
|
|
|
(defun math-div-objects-fancy (a b)
|
|
(cond ((and (Math-numberp a) (Math-numberp b))
|
|
(math-normalize
|
|
(cond ((math-want-polar a b)
|
|
(let ((a (math-polar a))
|
|
(b (math-polar b)))
|
|
(list 'polar
|
|
(math-div (nth 1 a) (nth 1 b))
|
|
(math-fix-circular (math-sub (nth 2 a)
|
|
(nth 2 b))))))
|
|
((Math-realp b)
|
|
(setq a (math-complex a))
|
|
(list 'cplx (math-div (nth 1 a) b)
|
|
(math-div (nth 2 a) b)))
|
|
(t
|
|
(setq a (math-complex a)
|
|
b (math-complex b))
|
|
(math-div
|
|
(list 'cplx
|
|
(math-add (math-mul (nth 1 a) (nth 1 b))
|
|
(math-mul (nth 2 a) (nth 2 b)))
|
|
(math-sub (math-mul (nth 2 a) (nth 1 b))
|
|
(math-mul (nth 1 a) (nth 2 b))))
|
|
(math-add (math-sqr (nth 1 b))
|
|
(math-sqr (nth 2 b))))))))
|
|
((math-matrixp b)
|
|
(if (math-square-matrixp b)
|
|
(let ((n1 (length b)))
|
|
(if (Math-vectorp a)
|
|
(if (math-matrixp a)
|
|
(if (= (length a) n1)
|
|
(math-lud-solve (math-matrix-lud b) a b)
|
|
(if (= (length (nth 1 a)) n1)
|
|
(math-transpose
|
|
(math-lud-solve (math-matrix-lud
|
|
(math-transpose b))
|
|
(math-transpose a) b))
|
|
(math-dimension-error)))
|
|
(if (= (length a) n1)
|
|
(math-mat-col (math-lud-solve (math-matrix-lud b)
|
|
(math-col-matrix a) b)
|
|
1)
|
|
(math-dimension-error)))
|
|
(if (Math-equal-int a 1)
|
|
(calcFunc-inv b)
|
|
(math-mul a (calcFunc-inv b)))))
|
|
(math-reject-arg b 'square-matrixp)))
|
|
((and (Math-vectorp a) (Math-objectp b))
|
|
(math-map-vec-2 'math-div a b))
|
|
((eq (car-safe a) 'sdev)
|
|
(if (eq (car-safe b) 'sdev)
|
|
(let ((x (math-div (nth 1 a) (nth 1 b))))
|
|
(math-make-sdev x
|
|
(math-div (math-hypot (nth 2 a)
|
|
(math-mul (nth 2 b) x))
|
|
(nth 1 b))))
|
|
(if (or (Math-scalarp b)
|
|
(not (Math-objvecp b)))
|
|
(math-make-sdev (math-div (nth 1 a) b) (math-div (nth 2 a) b))
|
|
(math-reject-arg 'realp b))))
|
|
((and (eq (car-safe b) 'sdev)
|
|
(or (Math-scalarp a)
|
|
(not (Math-objvecp a))))
|
|
(let ((x (math-div a (nth 1 b))))
|
|
(math-make-sdev x
|
|
(math-div (math-mul (nth 2 b) x) (nth 1 b)))))
|
|
((and (eq (car-safe a) 'intv) (Math-anglep b))
|
|
(if (Math-negp b)
|
|
(math-neg (math-div a (math-neg b)))
|
|
(math-make-intv (nth 1 a)
|
|
(math-div (nth 2 a) b)
|
|
(math-div (nth 3 a) b))))
|
|
((and (eq (car-safe b) 'intv) (Math-anglep a))
|
|
(if (or (Math-posp (nth 2 b))
|
|
(and (Math-zerop (nth 2 b)) (or (memq (nth 1 b) '(0 1))
|
|
calc-infinite-mode)))
|
|
(if (Math-negp a)
|
|
(math-neg (math-div (math-neg a) b))
|
|
(let ((calc-infinite-mode 1))
|
|
(math-make-intv (aref [0 2 1 3] (nth 1 b))
|
|
(math-div a (nth 3 b))
|
|
(math-div a (nth 2 b)))))
|
|
(if (or (Math-negp (nth 3 b))
|
|
(and (Math-zerop (nth 3 b)) (or (memq (nth 1 b) '(0 2))
|
|
calc-infinite-mode)))
|
|
(math-neg (math-div a (math-neg b)))
|
|
(if calc-infinite-mode
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf))
|
|
(math-reject-arg b "*Division by zero")))))
|
|
((and (eq (car-safe a) 'intv) (math-intv-constp a)
|
|
(eq (car-safe b) 'intv) (math-intv-constp b))
|
|
(if (or (Math-posp (nth 2 b))
|
|
(and (Math-zerop (nth 2 b)) (or (memq (nth 1 b) '(0 1))
|
|
calc-infinite-mode)))
|
|
(let* ((calc-infinite-mode 1)
|
|
(lo (math-div a (nth 2 b)))
|
|
(hi (math-div a (nth 3 b))))
|
|
(or (eq (car-safe lo) 'intv)
|
|
(setq lo (list 'intv (if (memq (nth 1 b) '(2 3)) 3 0)
|
|
lo lo)))
|
|
(or (eq (car-safe hi) 'intv)
|
|
(setq hi (list 'intv (if (memq (nth 1 b) '(1 3)) 3 0)
|
|
hi hi)))
|
|
(math-combine-intervals
|
|
(nth 2 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(and (math-infinitep (nth 2 lo))
|
|
(not (math-zerop (nth 2 b)))))
|
|
(memq (nth 1 lo) '(2 3)))
|
|
(nth 3 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(and (math-infinitep (nth 3 lo))
|
|
(not (math-zerop (nth 2 b)))))
|
|
(memq (nth 1 lo) '(1 3)))
|
|
(nth 2 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(and (math-infinitep (nth 2 hi))
|
|
(not (math-zerop (nth 3 b)))))
|
|
(memq (nth 1 hi) '(2 3)))
|
|
(nth 3 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(and (math-infinitep (nth 3 hi))
|
|
(not (math-zerop (nth 3 b)))))
|
|
(memq (nth 1 hi) '(1 3)))))
|
|
(if (or (Math-negp (nth 3 b))
|
|
(and (Math-zerop (nth 3 b)) (or (memq (nth 1 b) '(0 2))
|
|
calc-infinite-mode)))
|
|
(math-neg (math-div a (math-neg b)))
|
|
(if calc-infinite-mode
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf))
|
|
(math-reject-arg b "*Division by zero")))))
|
|
((and (eq (car-safe a) 'mod)
|
|
(eq (car-safe b) 'mod)
|
|
(equal (nth 2 a) (nth 2 b)))
|
|
(math-make-mod (math-div-mod (nth 1 a) (nth 1 b) (nth 2 a))
|
|
(nth 2 a)))
|
|
((and (eq (car-safe a) 'mod)
|
|
(Math-anglep b))
|
|
(math-make-mod (math-div-mod (nth 1 a) b (nth 2 a)) (nth 2 a)))
|
|
((and (eq (car-safe b) 'mod)
|
|
(Math-anglep a))
|
|
(math-make-mod (math-div-mod a (nth 1 b) (nth 2 b)) (nth 2 b)))
|
|
((eq (car-safe a) 'hms)
|
|
(if (eq (car-safe b) 'hms)
|
|
(math-with-extra-prec 1
|
|
(math-div (math-from-hms a 'deg)
|
|
(math-from-hms b 'deg)))
|
|
(math-with-extra-prec 2
|
|
(math-to-hms (math-div (math-from-hms a 'deg) b) 'deg))))
|
|
(t (calc-record-why "*Incompatible arguments for /" a b))))
|
|
|
|
(defun math-div-by-zero (a b)
|
|
(if (math-infinitep a)
|
|
(if (or (equal a '(var nan var-nan))
|
|
(equal b '(var uinf var-uinf))
|
|
(memq calc-infinite-mode '(-1 1)))
|
|
a
|
|
'(var uinf var-uinf))
|
|
(if calc-infinite-mode
|
|
(if (math-zerop a)
|
|
'(var nan var-nan)
|
|
(if (eq calc-infinite-mode 1)
|
|
(math-mul a '(var inf var-inf))
|
|
(if (eq calc-infinite-mode -1)
|
|
(math-mul a '(neg (var inf var-inf)))
|
|
(if (eq (car-safe a) 'intv)
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf))
|
|
'(var uinf var-uinf)))))
|
|
(math-reject-arg a "*Division by zero"))))
|
|
|
|
(defun math-div-zero (a b)
|
|
(if (math-known-matrixp b)
|
|
(if (math-vectorp b)
|
|
(math-map-vec-2 'math-div a b)
|
|
(math-mimic-ident 0 b))
|
|
(if (equal b '(var nan var-nan))
|
|
b
|
|
(if (and (eq (car-safe b) 'intv) (math-intv-constp b)
|
|
(not (math-posp b)) (not (math-negp b)))
|
|
(if calc-infinite-mode
|
|
(list 'intv 3
|
|
(if (and (math-zerop (nth 2 b))
|
|
(memq calc-infinite-mode '(1 -1)))
|
|
(nth 2 b) '(neg (var inf var-inf)))
|
|
(if (and (math-zerop (nth 3 b))
|
|
(memq calc-infinite-mode '(1 -1)))
|
|
(nth 3 b) '(var inf var-inf)))
|
|
(math-reject-arg b "*Division by zero"))
|
|
a))))
|
|
|
|
;; For math-div-symb-fancy
|
|
(defvar math-trig-inverses
|
|
'((calcFunc-sin . calcFunc-csc)
|
|
(calcFunc-cos . calcFunc-sec)
|
|
(calcFunc-tan . calcFunc-cot)
|
|
(calcFunc-sec . calcFunc-cos)
|
|
(calcFunc-csc . calcFunc-sin)
|
|
(calcFunc-cot . calcFunc-tan)
|
|
(calcFunc-sinh . calcFunc-csch)
|
|
(calcFunc-cosh . calcFunc-sech)
|
|
(calcFunc-tanh . calcFunc-coth)
|
|
(calcFunc-sech . calcFunc-cosh)
|
|
(calcFunc-csch . calcFunc-sinh)
|
|
(calcFunc-coth . calcFunc-tanh)))
|
|
|
|
(defvar math-div-trig)
|
|
(defvar math-div-non-trig)
|
|
|
|
(defun math-div-new-trig (tr)
|
|
(if math-div-trig
|
|
(setq math-div-trig
|
|
(list '* tr math-div-trig))
|
|
(setq math-div-trig tr)))
|
|
|
|
(defun math-div-new-non-trig (ntr)
|
|
(if math-div-non-trig
|
|
(setq math-div-non-trig
|
|
(list '* ntr math-div-non-trig))
|
|
(setq math-div-non-trig ntr)))
|
|
|
|
(defun math-div-isolate-trig (expr)
|
|
(if (eq (car-safe expr) '*)
|
|
(progn
|
|
(math-div-isolate-trig-term (nth 1 expr))
|
|
(math-div-isolate-trig (nth 2 expr)))
|
|
(math-div-isolate-trig-term expr)))
|
|
|
|
(defun math-div-isolate-trig-term (term)
|
|
(let ((fn (assoc (car-safe term) math-trig-inverses)))
|
|
(if fn
|
|
(math-div-new-trig
|
|
(cons (cdr fn) (cdr term)))
|
|
(math-div-new-non-trig term))))
|
|
|
|
(defun math-div-symb-fancy (a b)
|
|
(or (and (math-known-matrixp b)
|
|
(math-mul a (math-pow b -1)))
|
|
(and math-simplify-only
|
|
(not (equal a math-simplify-only))
|
|
(list '/ a b))
|
|
(and (Math-equal-int b 1) a)
|
|
(and (Math-equal-int b -1) (math-neg a))
|
|
(and (Math-vectorp a) (math-known-scalarp b)
|
|
(math-map-vec-2 'math-div a b))
|
|
(and (eq (car-safe b) '^)
|
|
(or (Math-looks-negp (nth 2 b)) (Math-equal-int a 1))
|
|
(math-mul a (math-normalize
|
|
(list '^ (nth 1 b) (math-neg (nth 2 b))))))
|
|
(and (eq (car-safe a) 'neg)
|
|
(math-neg (math-div (nth 1 a) b)))
|
|
(and (eq (car-safe b) 'neg)
|
|
(math-neg (math-div a (nth 1 b))))
|
|
(and (eq (car-safe a) '/)
|
|
(math-div (nth 1 a) (math-mul (nth 2 a) b)))
|
|
(and (eq (car-safe b) '/)
|
|
(or (math-known-scalarp (nth 1 b) t)
|
|
(math-known-scalarp (nth 2 b) t))
|
|
(math-div (math-mul a (nth 2 b)) (nth 1 b)))
|
|
(and (eq (car-safe b) 'frac)
|
|
(math-mul (math-make-frac (nth 2 b) (nth 1 b)) a))
|
|
(and (eq (car-safe a) '+)
|
|
(or (Math-numberp (nth 1 a))
|
|
(Math-numberp (nth 2 a)))
|
|
(Math-numberp b)
|
|
(math-add (math-div (nth 1 a) b)
|
|
(math-div (nth 2 a) b)))
|
|
(and (eq (car-safe a) '-)
|
|
(or (Math-numberp (nth 1 a))
|
|
(Math-numberp (nth 2 a)))
|
|
(Math-numberp b)
|
|
(math-sub (math-div (nth 1 a) b)
|
|
(math-div (nth 2 a) b)))
|
|
(and (or (eq (car-safe a) '-)
|
|
(math-looks-negp a))
|
|
(math-looks-negp b)
|
|
(math-div (math-neg a) (math-neg b)))
|
|
(and (eq (car-safe b) '-)
|
|
(math-looks-negp a)
|
|
(math-div (math-neg a) (math-neg b)))
|
|
(and (eq (car-safe a) 'calcFunc-idn)
|
|
(= (length a) 2)
|
|
(or (and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(list 'calcFunc-idn (math-div (nth 1 a) (nth 1 b))))
|
|
(and (math-known-scalarp b)
|
|
(list 'calcFunc-idn (math-div (nth 1 a) b)))
|
|
(and (math-known-matrixp b)
|
|
(math-div (nth 1 a) b))))
|
|
(and (eq (car-safe b) 'calcFunc-idn)
|
|
(= (length b) 2)
|
|
(or (and (math-known-scalarp a)
|
|
(list 'calcFunc-idn (math-div a (nth 1 b))))
|
|
(and (math-known-matrixp a)
|
|
(math-div a (nth 1 b)))))
|
|
(and math-simplifying
|
|
(let ((math-div-trig nil)
|
|
(math-div-non-trig nil))
|
|
(math-div-isolate-trig b)
|
|
(if math-div-trig
|
|
(if math-div-non-trig
|
|
(math-div (math-mul a math-div-trig) math-div-non-trig)
|
|
(math-mul a math-div-trig))
|
|
nil)))
|
|
(if (and calc-matrix-mode
|
|
(or (math-known-matrixp a) (math-known-matrixp b)))
|
|
(math-combine-prod a b nil t nil)
|
|
(if (eq (car-safe a) '*)
|
|
(if (eq (car-safe b) '*)
|
|
(let ((c (math-combine-prod (nth 1 a) (nth 1 b) nil t t)))
|
|
(and c
|
|
(math-div (math-mul c (nth 2 a)) (nth 2 b))))
|
|
(let ((c (math-combine-prod (nth 1 a) b nil t t)))
|
|
(and c
|
|
(math-mul c (nth 2 a)))))
|
|
(if (eq (car-safe b) '*)
|
|
(let ((c (math-combine-prod a (nth 1 b) nil t t)))
|
|
(and c
|
|
(math-div c (nth 2 b))))
|
|
(math-combine-prod a b nil t nil))))
|
|
(and (math-infinitep a)
|
|
(if (math-infinitep b)
|
|
'(var nan var-nan)
|
|
(if (or (equal a '(var nan var-nan))
|
|
(equal a '(var uinf var-uinf)))
|
|
a
|
|
(if (equal a '(var inf var-inf))
|
|
(if (or (math-posp b)
|
|
(and (eq (car-safe b) 'intv)
|
|
(math-zerop (nth 2 b))))
|
|
(if (and (eq (car-safe b) 'intv)
|
|
(not (math-intv-constp b t)))
|
|
'(intv 3 0 (var inf var-inf))
|
|
a)
|
|
(if (or (math-negp b)
|
|
(and (eq (car-safe b) 'intv)
|
|
(math-zerop (nth 3 b))))
|
|
(if (and (eq (car-safe b) 'intv)
|
|
(not (math-intv-constp b t)))
|
|
'(intv 3 (neg (var inf var-inf)) 0)
|
|
(math-neg a))
|
|
(if (and (eq (car-safe b) 'intv)
|
|
(math-negp (nth 2 b)) (math-posp (nth 3 b)))
|
|
'(intv 3 (neg (var inf var-inf))
|
|
(var inf var-inf)))))))))
|
|
(and (math-infinitep b)
|
|
(if (equal b '(var nan var-nan))
|
|
b
|
|
(let ((calc-infinite-mode 1))
|
|
(math-mul-zero b a))))
|
|
(list '/ a b)))
|
|
|
|
;;; Division from the left.
|
|
(defun calcFunc-ldiv (a b)
|
|
(if (math-known-scalarp a)
|
|
(math-div b a)
|
|
(math-mul (math-pow a -1) b)))
|
|
|
|
(defun calcFunc-mod (a b)
|
|
(math-normalize (list '% a b)))
|
|
|
|
(defun math-mod-fancy (a b)
|
|
(cond ((equal b '(var inf var-inf))
|
|
(if (or (math-posp a) (math-zerop a))
|
|
a
|
|
(if (math-negp a)
|
|
b
|
|
(if (eq (car-safe a) 'intv)
|
|
(if (math-negp (nth 2 a))
|
|
'(intv 3 0 (var inf var-inf))
|
|
a)
|
|
(list '% a b)))))
|
|
((and (eq (car-safe a) 'mod) (Math-realp b) (math-posp b))
|
|
(math-make-mod (nth 1 a) b))
|
|
((and (eq (car-safe a) 'intv) (math-intv-constp a t) (math-posp b))
|
|
(math-mod-intv a b))
|
|
(t
|
|
(if (Math-anglep a)
|
|
(calc-record-why 'anglep b)
|
|
(calc-record-why 'anglep a))
|
|
(list '% a b))))
|
|
|
|
|
|
(defun calcFunc-pow (a b)
|
|
(math-normalize (list '^ a b)))
|
|
|
|
(defun math-pow-of-zero (a b)
|
|
"Raise A to the power of B, where A is a form of zero."
|
|
(if (math-floatp b) (setq a (math-float a)))
|
|
(cond
|
|
;; 0^0 = 1
|
|
((eq b 0)
|
|
1)
|
|
;; 0^0.0, etc., are undetermined
|
|
((Math-zerop b)
|
|
(if calc-infinite-mode
|
|
'(var nan var-nan)
|
|
(math-reject-arg (list '^ a b) "*Indeterminate form")))
|
|
;; 0^positive = 0
|
|
((math-known-posp b)
|
|
a)
|
|
;; 0^negative is undefined (let math-div handle it)
|
|
((math-known-negp b)
|
|
(math-div 1 a))
|
|
;; 0^infinity is undefined
|
|
((math-infinitep b)
|
|
'(var nan var-nan))
|
|
;; Some intervals
|
|
((and (eq (car b) 'intv)
|
|
calc-infinite-mode
|
|
(math-negp (nth 2 b))
|
|
(math-posp (nth 3 b)))
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf)))
|
|
;; If none of the above, leave it alone.
|
|
(t
|
|
(list '^ a b))))
|
|
|
|
(defun math-pow-zero (a b)
|
|
(if (eq (car-safe a) 'mod)
|
|
(math-make-mod 1 (nth 2 a))
|
|
(if (math-known-matrixp a)
|
|
(math-mimic-ident 1 a)
|
|
(if (math-infinitep a)
|
|
'(var nan var-nan)
|
|
(if (and (eq (car a) 'intv) (math-intv-constp a)
|
|
(or (and (not (math-posp a)) (not (math-negp a)))
|
|
(not (math-intv-constp a t))))
|
|
'(intv 3 (neg (var inf var-inf)) (var inf var-inf))
|
|
(if (or (math-floatp a) (math-floatp b))
|
|
'(float 1 0) 1))))))
|
|
|
|
(defun math-pow-fancy (a b)
|
|
(cond ((and (Math-numberp a) (Math-numberp b))
|
|
(or (if (memq (math-quarter-integer b) '(1 2 3))
|
|
(let ((sqrt (math-sqrt (if (math-floatp b)
|
|
(math-float a) a))))
|
|
(and (Math-numberp sqrt)
|
|
(math-pow sqrt (math-mul 2 b))))
|
|
(and (eq (car b) 'frac)
|
|
(integerp (nth 2 b))
|
|
(<= (nth 2 b) 10)
|
|
(let ((root (math-nth-root a (nth 2 b))))
|
|
(and root (math-ipow root (nth 1 b))))))
|
|
(and (or (eq a 10) (equal a '(float 1 1)))
|
|
(math-num-integerp b)
|
|
(calcFunc-scf '(float 1 0) b))
|
|
(and calc-symbolic-mode
|
|
(list '^ a b))
|
|
(math-with-extra-prec 2
|
|
(math-exp-raw
|
|
(math-float (math-mul b (math-ln-raw (math-float a))))))))
|
|
((or (not (Math-objvecp a))
|
|
(not (Math-objectp b)))
|
|
(let (temp)
|
|
(cond ((and math-simplify-only
|
|
(not (equal a math-simplify-only)))
|
|
(list '^ a b))
|
|
((and (eq (car-safe a) '*)
|
|
(or
|
|
(and
|
|
(math-known-matrixp (nth 1 a))
|
|
(math-known-matrixp (nth 2 a)))
|
|
(and
|
|
calc-matrix-mode
|
|
(not (eq calc-matrix-mode 'scalar))
|
|
(and (not (math-known-scalarp (nth 1 a)))
|
|
(not (math-known-scalarp (nth 2 a)))))))
|
|
(if (and (= b -1)
|
|
(math-known-square-matrixp (nth 1 a))
|
|
(math-known-square-matrixp (nth 2 a)))
|
|
(math-mul (math-pow-fancy (nth 2 a) -1)
|
|
(math-pow-fancy (nth 1 a) -1))
|
|
(list '^ a b)))
|
|
((and (eq (car-safe a) '*)
|
|
(or (math-known-num-integerp b)
|
|
(math-known-nonnegp (nth 1 a))
|
|
(math-known-nonnegp (nth 2 a))))
|
|
(math-mul (math-pow (nth 1 a) b)
|
|
(math-pow (nth 2 a) b)))
|
|
((and (eq (car-safe a) '/)
|
|
(or (math-known-num-integerp b)
|
|
(math-known-nonnegp (nth 2 a))))
|
|
(math-div (math-pow (nth 1 a) b)
|
|
(math-pow (nth 2 a) b)))
|
|
((and (eq (car-safe a) '/)
|
|
(math-known-nonnegp (nth 1 a))
|
|
(not (math-equal-int (nth 1 a) 1)))
|
|
(math-mul (math-pow (nth 1 a) b)
|
|
(math-pow (math-div 1 (nth 2 a)) b)))
|
|
((and (eq (car-safe a) '^)
|
|
(or (math-known-num-integerp b)
|
|
(math-known-nonnegp (nth 1 a))))
|
|
(math-pow (nth 1 a) (math-mul (nth 2 a) b)))
|
|
((and (eq (car-safe a) 'calcFunc-sqrt)
|
|
(or (math-known-num-integerp b)
|
|
(math-known-nonnegp (nth 1 a))))
|
|
(math-pow (nth 1 a) (math-div b 2)))
|
|
((and (eq (car-safe a) '^)
|
|
(math-known-evenp (nth 2 a))
|
|
(memq (math-quarter-integer b) '(1 2 3))
|
|
(math-known-realp (nth 1 a)))
|
|
(math-abs (math-pow (nth 1 a) (math-mul (nth 2 a) b))))
|
|
((and (math-looks-negp a)
|
|
(math-known-integerp b)
|
|
(setq temp (or (and (math-known-evenp b)
|
|
(math-pow (math-neg a) b))
|
|
(and (math-known-oddp b)
|
|
(math-neg (math-pow (math-neg a)
|
|
b))))))
|
|
temp)
|
|
((and (eq (car-safe a) 'calcFunc-abs)
|
|
(math-known-realp (nth 1 a))
|
|
(math-known-evenp b))
|
|
(math-pow (nth 1 a) b))
|
|
((math-infinitep a)
|
|
(cond ((equal a '(var nan var-nan))
|
|
a)
|
|
((eq (car a) 'neg)
|
|
(math-mul (math-pow -1 b) (math-pow (nth 1 a) b)))
|
|
((math-posp b)
|
|
a)
|
|
((math-negp b)
|
|
(if (math-floatp b) '(float 0 0) 0))
|
|
((and (eq (car-safe b) 'intv)
|
|
(math-intv-constp b))
|
|
'(intv 3 0 (var inf var-inf)))
|
|
(t
|
|
'(var nan var-nan))))
|
|
((math-infinitep b)
|
|
(let (scale)
|
|
(cond ((math-negp b)
|
|
(math-pow (math-div 1 a) (math-neg b)))
|
|
((not (math-posp b))
|
|
'(var nan var-nan))
|
|
((math-equal-int (setq scale (calcFunc-abssqr a)) 1)
|
|
'(var nan var-nan))
|
|
((Math-lessp scale 1)
|
|
(if (math-floatp a) '(float 0 0) 0))
|
|
((Math-lessp 1 a)
|
|
b)
|
|
((Math-lessp a -1)
|
|
'(var uinf var-uinf))
|
|
((and (eq (car a) 'intv)
|
|
(math-intv-constp a))
|
|
(if (Math-lessp -1 a)
|
|
(if (math-equal-int (nth 3 a) 1)
|
|
'(intv 3 0 1)
|
|
'(intv 3 0 (var inf var-inf)))
|
|
'(intv 3 (neg (var inf var-inf))
|
|
(var inf var-inf))))
|
|
(t (list '^ a b)))))
|
|
((and (eq (car-safe a) 'calcFunc-idn)
|
|
(= (length a) 2)
|
|
(math-known-num-integerp b))
|
|
(list 'calcFunc-idn (math-pow (nth 1 a) b)))
|
|
(t (if (Math-objectp a)
|
|
(calc-record-why 'objectp b)
|
|
(calc-record-why 'objectp a))
|
|
(list '^ a b)))))
|
|
((and (eq (car-safe a) 'sdev) (eq (car-safe b) 'sdev))
|
|
(if (and (math-constp a) (math-constp b))
|
|
(math-with-extra-prec 2
|
|
(let* ((ln (math-ln-raw (math-float (nth 1 a))))
|
|
(pow (math-exp-raw
|
|
(math-float (math-mul (nth 1 b) ln)))))
|
|
(math-make-sdev
|
|
pow
|
|
(math-mul
|
|
pow
|
|
(math-hypot (math-mul (nth 2 a)
|
|
(math-div (nth 1 b) (nth 1 a)))
|
|
(math-mul (nth 2 b) ln))))))
|
|
(let ((pow (math-pow (nth 1 a) (nth 1 b))))
|
|
(math-make-sdev
|
|
pow
|
|
(math-mul pow
|
|
(math-hypot (math-mul (nth 2 a)
|
|
(math-div (nth 1 b) (nth 1 a)))
|
|
(math-mul (nth 2 b) (calcFunc-ln
|
|
(nth 1 a)))))))))
|
|
((and (eq (car-safe a) 'sdev) (Math-numberp b))
|
|
(if (math-constp a)
|
|
(math-with-extra-prec 2
|
|
(let ((pow (math-pow (nth 1 a) (math-sub b 1))))
|
|
(math-make-sdev (math-mul pow (nth 1 a))
|
|
(math-mul pow (math-mul (nth 2 a) b)))))
|
|
(math-make-sdev (math-pow (nth 1 a) b)
|
|
(math-mul (math-pow (nth 1 a) (math-add b -1))
|
|
(math-mul (nth 2 a) b)))))
|
|
((and (eq (car-safe b) 'sdev) (Math-numberp a))
|
|
(math-with-extra-prec 2
|
|
(let* ((ln (math-ln-raw (math-float a)))
|
|
(pow (calcFunc-exp (math-mul (nth 1 b) ln))))
|
|
(math-make-sdev pow (math-mul pow (math-mul (nth 2 b) ln))))))
|
|
((and (eq (car-safe a) 'intv) (math-intv-constp a)
|
|
(Math-realp b)
|
|
(or (Math-natnump b)
|
|
(Math-posp (nth 2 a))
|
|
(and (math-zerop (nth 2 a))
|
|
(or (Math-posp b)
|
|
(and (Math-integerp b) calc-infinite-mode)))
|
|
(Math-negp (nth 3 a))
|
|
(and (math-zerop (nth 3 a))
|
|
(or (Math-posp b)
|
|
(and (Math-integerp b) calc-infinite-mode)))))
|
|
(if (math-evenp b)
|
|
(setq a (math-abs a)))
|
|
(let ((calc-infinite-mode (if (math-zerop (nth 3 a)) -1 1)))
|
|
(math-sort-intv (nth 1 a)
|
|
(math-pow (nth 2 a) b)
|
|
(math-pow (nth 3 a) b))))
|
|
((and (eq (car-safe b) 'intv) (math-intv-constp b)
|
|
(Math-realp a) (Math-posp a))
|
|
(math-sort-intv (nth 1 b)
|
|
(math-pow a (nth 2 b))
|
|
(math-pow a (nth 3 b))))
|
|
((and (eq (car-safe a) 'intv) (math-intv-constp a)
|
|
(eq (car-safe b) 'intv) (math-intv-constp b)
|
|
(or (and (not (Math-negp (nth 2 a)))
|
|
(not (Math-negp (nth 2 b))))
|
|
(and (Math-posp (nth 2 a))
|
|
(not (Math-posp (nth 3 b))))))
|
|
(let ((lo (math-pow a (nth 2 b)))
|
|
(hi (math-pow a (nth 3 b))))
|
|
(or (eq (car-safe lo) 'intv)
|
|
(setq lo (list 'intv (if (memq (nth 1 b) '(2 3)) 3 0) lo lo)))
|
|
(or (eq (car-safe hi) 'intv)
|
|
(setq hi (list 'intv (if (memq (nth 1 b) '(1 3)) 3 0) hi hi)))
|
|
(math-combine-intervals
|
|
(nth 2 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(math-infinitep (nth 2 lo)))
|
|
(memq (nth 1 lo) '(2 3)))
|
|
(nth 3 lo) (and (or (memq (nth 1 b) '(2 3))
|
|
(math-infinitep (nth 3 lo)))
|
|
(memq (nth 1 lo) '(1 3)))
|
|
(nth 2 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(math-infinitep (nth 2 hi)))
|
|
(memq (nth 1 hi) '(2 3)))
|
|
(nth 3 hi) (and (or (memq (nth 1 b) '(1 3))
|
|
(math-infinitep (nth 3 hi)))
|
|
(memq (nth 1 hi) '(1 3))))))
|
|
((and (eq (car-safe a) 'mod) (eq (car-safe b) 'mod)
|
|
(equal (nth 2 a) (nth 2 b)))
|
|
(math-make-mod (math-pow-mod (nth 1 a) (nth 1 b) (nth 2 a))
|
|
(nth 2 a)))
|
|
((and (eq (car-safe a) 'mod) (Math-anglep b))
|
|
(math-make-mod (math-pow-mod (nth 1 a) b (nth 2 a)) (nth 2 a)))
|
|
((and (eq (car-safe b) 'mod) (Math-anglep a))
|
|
(math-make-mod (math-pow-mod a (nth 1 b) (nth 2 b)) (nth 2 b)))
|
|
((not (Math-numberp a))
|
|
(math-reject-arg a 'numberp))
|
|
(t
|
|
(math-reject-arg b 'numberp))))
|
|
|
|
(defun math-quarter-integer (x)
|
|
(if (Math-integerp x)
|
|
0
|
|
(if (math-negp x)
|
|
(progn
|
|
(setq x (math-quarter-integer (math-neg x)))
|
|
(and x (- 4 x)))
|
|
(if (eq (car x) 'frac)
|
|
(if (eq (nth 2 x) 2)
|
|
2
|
|
(and (eq (nth 2 x) 4)
|
|
(progn
|
|
(setq x (nth 1 x))
|
|
(% (if (consp x) (nth 1 x) x) 4))))
|
|
(if (eq (car x) 'float)
|
|
(if (>= (nth 2 x) 0)
|
|
0
|
|
(if (= (nth 2 x) -1)
|
|
(progn
|
|
(setq x (nth 1 x))
|
|
(and (= (% (if (consp x) (nth 1 x) x) 10) 5) 2))
|
|
(if (= (nth 2 x) -2)
|
|
(progn
|
|
(setq x (nth 1 x)
|
|
x (% (if (consp x) (nth 1 x) x) 100))
|
|
(if (= x 25) 1
|
|
(if (= x 75) 3)))))))))))
|
|
|
|
;;; This assumes A < M and M > 0.
|
|
(defun math-pow-mod (a b m) ; [R R R R]
|
|
(if (and (Math-integerp a) (Math-integerp b) (Math-integerp m))
|
|
(if (Math-negp b)
|
|
(math-div-mod 1 (math-pow-mod a (Math-integer-neg b) m) m)
|
|
(if (eq m 1)
|
|
0
|
|
(math-pow-mod-step a b m)))
|
|
(math-mod (math-pow a b) m)))
|
|
|
|
(defun math-pow-mod-step (a n m) ; [I I I I]
|
|
(math-working "pow" a)
|
|
(let ((val (cond
|
|
((eq n 0) 1)
|
|
((eq n 1) a)
|
|
(t
|
|
(let ((rest (math-pow-mod-step
|
|
(math-imod (math-mul a a) m)
|
|
(math-div2 n)
|
|
m)))
|
|
(if (math-evenp n)
|
|
rest
|
|
(math-mod (math-mul a rest) m)))))))
|
|
(math-working "pow" val)
|
|
val))
|
|
|
|
|
|
;;; Compute the minimum of two real numbers. [R R R] [Public]
|
|
(defun math-min (a b)
|
|
(if (and (consp a) (eq (car a) 'intv))
|
|
(if (and (consp b) (eq (car b) 'intv))
|
|
(let ((lo (nth 2 a))
|
|
(lom (memq (nth 1 a) '(2 3)))
|
|
(hi (nth 3 a))
|
|
(him (memq (nth 1 a) '(1 3)))
|
|
res)
|
|
(if (= (setq res (math-compare (nth 2 b) lo)) -1)
|
|
(setq lo (nth 2 b) lom (memq (nth 1 b) '(2 3)))
|
|
(if (= res 0)
|
|
(setq lom (or lom (memq (nth 1 b) '(2 3))))))
|
|
(if (= (setq res (math-compare (nth 3 b) hi)) -1)
|
|
(setq hi (nth 3 b) him (memq (nth 1 b) '(1 3)))
|
|
(if (= res 0)
|
|
(setq him (or him (memq (nth 1 b) '(1 3))))))
|
|
(math-make-intv (+ (if lom 2 0) (if him 1 0)) lo hi))
|
|
(math-min a (list 'intv 3 b b)))
|
|
(if (and (consp b) (eq (car b) 'intv))
|
|
(math-min (list 'intv 3 a a) b)
|
|
(let ((res (math-compare a b)))
|
|
(if (= res 1)
|
|
b
|
|
(if (= res 2)
|
|
'(var nan var-nan)
|
|
a))))))
|
|
|
|
(defun calcFunc-min (&optional a &rest b)
|
|
(if (not a)
|
|
'(var inf var-inf)
|
|
(if (not (or (Math-anglep a) (eq (car a) 'date)
|
|
(and (eq (car a) 'intv) (math-intv-constp a))
|
|
(math-infinitep a)))
|
|
(math-reject-arg a 'anglep))
|
|
(math-min-list a b)))
|
|
|
|
(defun math-min-list (a b)
|
|
(if b
|
|
(if (or (Math-anglep (car b)) (eq (car b) 'date)
|
|
(and (eq (car (car b)) 'intv) (math-intv-constp (car b)))
|
|
(math-infinitep (car b)))
|
|
(math-min-list (math-min a (car b)) (cdr b))
|
|
(math-reject-arg (car b) 'anglep))
|
|
a))
|
|
|
|
;;; Compute the maximum of two real numbers. [R R R] [Public]
|
|
(defun math-max (a b)
|
|
(if (or (and (consp a) (eq (car a) 'intv))
|
|
(and (consp b) (eq (car b) 'intv)))
|
|
(math-neg (math-min (math-neg a) (math-neg b)))
|
|
(let ((res (math-compare a b)))
|
|
(if (= res -1)
|
|
b
|
|
(if (= res 2)
|
|
'(var nan var-nan)
|
|
a)))))
|
|
|
|
(defun calcFunc-max (&optional a &rest b)
|
|
(if (not a)
|
|
'(neg (var inf var-inf))
|
|
(if (not (or (Math-anglep a) (eq (car a) 'date)
|
|
(and (eq (car a) 'intv) (math-intv-constp a))
|
|
(math-infinitep a)))
|
|
(math-reject-arg a 'anglep))
|
|
(math-max-list a b)))
|
|
|
|
(defun math-max-list (a b)
|
|
(if b
|
|
(if (or (Math-anglep (car b)) (eq (car b) 'date)
|
|
(and (eq (car (car b)) 'intv) (math-intv-constp (car b)))
|
|
(math-infinitep (car b)))
|
|
(math-max-list (math-max a (car b)) (cdr b))
|
|
(math-reject-arg (car b) 'anglep))
|
|
a))
|
|
|
|
|
|
;;; Compute the absolute value of A. [O O; r r] [Public]
|
|
(defun math-abs (a)
|
|
(cond ((Math-negp a)
|
|
(math-neg a))
|
|
((Math-anglep a)
|
|
a)
|
|
((eq (car a) 'cplx)
|
|
(math-hypot (nth 1 a) (nth 2 a)))
|
|
((eq (car a) 'polar)
|
|
(nth 1 a))
|
|
((eq (car a) 'vec)
|
|
(if (cdr (cdr (cdr a)))
|
|
(math-sqrt (calcFunc-abssqr a))
|
|
(if (cdr (cdr a))
|
|
(math-hypot (nth 1 a) (nth 2 a))
|
|
(if (cdr a)
|
|
(math-abs (nth 1 a))
|
|
a))))
|
|
((eq (car a) 'sdev)
|
|
(list 'sdev (math-abs (nth 1 a)) (nth 2 a)))
|
|
((and (eq (car a) 'intv) (math-intv-constp a))
|
|
(if (Math-posp a)
|
|
a
|
|
(let* ((nlo (math-neg (nth 2 a)))
|
|
(res (math-compare nlo (nth 3 a))))
|
|
(cond ((= res 1)
|
|
(math-make-intv (if (memq (nth 1 a) '(0 1)) 2 3) 0 nlo))
|
|
((= res 0)
|
|
(math-make-intv (if (eq (nth 1 a) 0) 2 3) 0 nlo))
|
|
(t
|
|
(math-make-intv (if (memq (nth 1 a) '(0 2)) 2 3)
|
|
0 (nth 3 a)))))))
|
|
((math-looks-negp a)
|
|
(list 'calcFunc-abs (math-neg a)))
|
|
((let ((signs (math-possible-signs a)))
|
|
(or (and (memq signs '(2 4 6)) a)
|
|
(and (memq signs '(1 3)) (math-neg a)))))
|
|
((let ((inf (math-infinitep a)))
|
|
(and inf
|
|
(if (equal inf '(var nan var-nan))
|
|
inf
|
|
'(var inf var-inf)))))
|
|
(t (calc-record-why 'numvecp a)
|
|
(list 'calcFunc-abs a))))
|
|
|
|
(defalias 'calcFunc-abs 'math-abs)
|
|
|
|
(defun math-float-fancy (a)
|
|
(cond ((eq (car a) 'intv)
|
|
(cons (car a) (cons (nth 1 a) (mapcar 'math-float (nthcdr 2 a)))))
|
|
((and (memq (car a) '(* /))
|
|
(math-numberp (nth 1 a)))
|
|
(list (car a) (math-float (nth 1 a))
|
|
(list 'calcFunc-float (nth 2 a))))
|
|
((and (eq (car a) '/)
|
|
(eq (car (nth 1 a)) '*)
|
|
(math-numberp (nth 1 (nth 1 a))))
|
|
(list '* (math-float (nth 1 (nth 1 a)))
|
|
(list 'calcFunc-float (list '/ (nth 2 (nth 1 a)) (nth 2 a)))))
|
|
((math-infinitep a) a)
|
|
((eq (car a) 'calcFunc-float) a)
|
|
((let ((func (assq (car a) '((calcFunc-floor . calcFunc-ffloor)
|
|
(calcFunc-ceil . calcFunc-fceil)
|
|
(calcFunc-trunc . calcFunc-ftrunc)
|
|
(calcFunc-round . calcFunc-fround)
|
|
(calcFunc-rounde . calcFunc-frounde)
|
|
(calcFunc-roundu . calcFunc-froundu)))))
|
|
(and func (cons (cdr func) (cdr a)))))
|
|
(t (math-reject-arg a 'objectp))))
|
|
|
|
(defalias 'calcFunc-float 'math-float)
|
|
|
|
;; The variable math-trunc-prec is local to math-trunc in calc-misc.el,
|
|
;; but used by math-trunc-fancy which is called by math-trunc.
|
|
(defvar math-trunc-prec)
|
|
|
|
(defun math-trunc-fancy (a)
|
|
(cond ((eq (car a) 'frac) (math-quotient (nth 1 a) (nth 2 a)))
|
|
((eq (car a) 'cplx) (math-trunc (nth 1 a)))
|
|
((eq (car a) 'polar) (math-trunc (math-complex a)))
|
|
((eq (car a) 'hms) (list 'hms (nth 1 a) 0 0))
|
|
((eq (car a) 'date) (list 'date (math-trunc (nth 1 a))))
|
|
((eq (car a) 'mod)
|
|
(if (math-messy-integerp (nth 2 a))
|
|
(math-trunc (math-make-mod (nth 1 a) (math-trunc (nth 2 a))))
|
|
(math-make-mod (math-trunc (nth 1 a)) (nth 2 a))))
|
|
((eq (car a) 'intv)
|
|
(math-make-intv (+ (if (and (equal (nth 2 a) '(neg (var inf var-inf)))
|
|
(memq (nth 1 a) '(0 1)))
|
|
0 2)
|
|
(if (and (equal (nth 3 a) '(var inf var-inf))
|
|
(memq (nth 1 a) '(0 2)))
|
|
0 1))
|
|
(if (and (Math-negp (nth 2 a))
|
|
(Math-num-integerp (nth 2 a))
|
|
(memq (nth 1 a) '(0 1)))
|
|
(math-add (math-trunc (nth 2 a)) 1)
|
|
(math-trunc (nth 2 a)))
|
|
(if (and (Math-posp (nth 3 a))
|
|
(Math-num-integerp (nth 3 a))
|
|
(memq (nth 1 a) '(0 2)))
|
|
(math-add (math-trunc (nth 3 a)) -1)
|
|
(math-trunc (nth 3 a)))))
|
|
((math-provably-integerp a) a)
|
|
((Math-vectorp a)
|
|
(math-map-vec (function (lambda (x) (math-trunc x math-trunc-prec))) a))
|
|
((math-infinitep a)
|
|
(if (or (math-posp a) (math-negp a))
|
|
a
|
|
'(var nan var-nan)))
|
|
((math-to-integer a))
|
|
(t (math-reject-arg a 'numberp))))
|
|
|
|
(defun math-trunc-special (a prec)
|
|
(if (Math-messy-integerp prec)
|
|
(setq prec (math-trunc prec)))
|
|
(or (integerp prec)
|
|
(math-reject-arg prec 'fixnump))
|
|
(if (and (<= prec 0)
|
|
(math-provably-integerp a))
|
|
a
|
|
(calcFunc-scf (math-trunc (let ((calc-prefer-frac t))
|
|
(calcFunc-scf a prec)))
|
|
(- prec))))
|
|
|
|
(defun math-to-integer (a)
|
|
(let ((func (assq (car-safe a) '((calcFunc-ffloor . calcFunc-floor)
|
|
(calcFunc-fceil . calcFunc-ceil)
|
|
(calcFunc-ftrunc . calcFunc-trunc)
|
|
(calcFunc-fround . calcFunc-round)
|
|
(calcFunc-frounde . calcFunc-rounde)
|
|
(calcFunc-froundu . calcFunc-roundu)))))
|
|
(and func (= (length a) 2)
|
|
(cons (cdr func) (cdr a)))))
|
|
|
|
(defun calcFunc-ftrunc (a &optional prec)
|
|
(if (and (Math-messy-integerp a)
|
|
(or (not prec) (and (integerp prec)
|
|
(<= prec 0))))
|
|
a
|
|
(math-float (math-trunc a prec))))
|
|
|
|
;; The variable math-floor-prec is local to math-floor in calc-misc.el,
|
|
;; but used by math-floor-fancy which is called by math-floor.
|
|
(defvar math-floor-prec)
|
|
|
|
(defun math-floor-fancy (a)
|
|
(cond ((math-provably-integerp a) a)
|
|
((eq (car a) 'hms)
|
|
(if (or (math-posp a)
|
|
(and (math-zerop (nth 2 a))
|
|
(math-zerop (nth 3 a))))
|
|
(math-trunc a)
|
|
(math-add (math-trunc a) -1)))
|
|
((eq (car a) 'date) (list 'date (math-floor (nth 1 a))))
|
|
((eq (car a) 'intv)
|
|
(math-make-intv (+ (if (and (equal (nth 2 a) '(neg (var inf var-inf)))
|
|
(memq (nth 1 a) '(0 1)))
|
|
0 2)
|
|
(if (and (equal (nth 3 a) '(var inf var-inf))
|
|
(memq (nth 1 a) '(0 2)))
|
|
0 1))
|
|
(math-floor (nth 2 a))
|
|
(if (and (Math-num-integerp (nth 3 a))
|
|
(memq (nth 1 a) '(0 2)))
|
|
(math-add (math-floor (nth 3 a)) -1)
|
|
(math-floor (nth 3 a)))))
|
|
((Math-vectorp a)
|
|
(math-map-vec (function (lambda (x) (math-floor x math-floor-prec))) a))
|
|
((math-infinitep a)
|
|
(if (or (math-posp a) (math-negp a))
|
|
a
|
|
'(var nan var-nan)))
|
|
((math-to-integer a))
|
|
(t (math-reject-arg a 'anglep))))
|
|
|
|
(defun math-floor-special (a prec)
|
|
(if (Math-messy-integerp prec)
|
|
(setq prec (math-trunc prec)))
|
|
(or (integerp prec)
|
|
(math-reject-arg prec 'fixnump))
|
|
(if (and (<= prec 0)
|
|
(math-provably-integerp a))
|
|
a
|
|
(calcFunc-scf (math-floor (let ((calc-prefer-frac t))
|
|
(calcFunc-scf a prec)))
|
|
(- prec))))
|
|
|
|
(defun calcFunc-ffloor (a &optional prec)
|
|
(if (and (Math-messy-integerp a)
|
|
(or (not prec) (and (integerp prec)
|
|
(<= prec 0))))
|
|
a
|
|
(math-float (math-floor a prec))))
|
|
|
|
;;; Coerce A to be an integer (by truncation toward plus infinity). [I N]
|
|
(defun math-ceiling (a &optional prec) ; [Public]
|
|
(cond (prec
|
|
(if (Math-messy-integerp prec)
|
|
(setq prec (math-trunc prec)))
|
|
(or (integerp prec)
|
|
(math-reject-arg prec 'fixnump))
|
|
(if (and (<= prec 0)
|
|
(math-provably-integerp a))
|
|
a
|
|
(calcFunc-scf (math-ceiling (let ((calc-prefer-frac t))
|
|
(calcFunc-scf a prec)))
|
|
(- prec))))
|
|
((Math-integerp a) a)
|
|
((Math-messy-integerp a) (math-trunc a))
|
|
((Math-realp a)
|
|
(if (Math-posp a)
|
|
(math-add (math-trunc a) 1)
|
|
(math-trunc a)))
|
|
((math-provably-integerp a) a)
|
|
((eq (car a) 'hms)
|
|
(if (or (math-negp a)
|
|
(and (math-zerop (nth 2 a))
|
|
(math-zerop (nth 3 a))))
|
|
(math-trunc a)
|
|
(math-add (math-trunc a) 1)))
|
|
((eq (car a) 'date) (list 'date (math-ceiling (nth 1 a))))
|
|
((eq (car a) 'intv)
|
|
(math-make-intv (+ (if (and (equal (nth 2 a) '(neg (var inf var-inf)))
|
|
(memq (nth 1 a) '(0 1)))
|
|
0 2)
|
|
(if (and (equal (nth 3 a) '(var inf var-inf))
|
|
(memq (nth 1 a) '(0 2)))
|
|
0 1))
|
|
(if (and (Math-num-integerp (nth 2 a))
|
|
(memq (nth 1 a) '(0 1)))
|
|
(math-add (math-floor (nth 2 a)) 1)
|
|
(math-ceiling (nth 2 a)))
|
|
(math-ceiling (nth 3 a))))
|
|
((Math-vectorp a)
|
|
(math-map-vec (function (lambda (x) (math-ceiling x prec))) a))
|
|
((math-infinitep a)
|
|
(if (or (math-posp a) (math-negp a))
|
|
a
|
|
'(var nan var-nan)))
|
|
((math-to-integer a))
|
|
(t (math-reject-arg a 'anglep))))
|
|
|
|
(defalias 'calcFunc-ceil 'math-ceiling)
|
|
|
|
(defun calcFunc-fceil (a &optional prec)
|
|
(if (and (Math-messy-integerp a)
|
|
(or (not prec) (and (integerp prec)
|
|
(<= prec 0))))
|
|
a
|
|
(math-float (math-ceiling a prec))))
|
|
|
|
(defvar math-rounding-mode nil)
|
|
|
|
;;; Coerce A to be an integer (by rounding to nearest integer). [I N] [Public]
|
|
(defun math-round (a &optional prec)
|
|
(cond (prec
|
|
(if (Math-messy-integerp prec)
|
|
(setq prec (math-trunc prec)))
|
|
(or (integerp prec)
|
|
(math-reject-arg prec 'fixnump))
|
|
(if (and (<= prec 0)
|
|
(math-provably-integerp a))
|
|
a
|
|
(calcFunc-scf (math-round (let ((calc-prefer-frac t))
|
|
(calcFunc-scf a prec)))
|
|
(- prec))))
|
|
((Math-anglep a)
|
|
(if (Math-num-integerp a)
|
|
(math-trunc a)
|
|
(if (and (Math-negp a) (not (eq math-rounding-mode 'up)))
|
|
(math-neg (math-round (math-neg a)))
|
|
(setq a (let ((calc-angle-mode 'deg)) ; in case of HMS forms
|
|
(math-add a (if (Math-ratp a)
|
|
'(frac 1 2)
|
|
'(float 5 -1)))))
|
|
(if (and (Math-num-integerp a) (eq math-rounding-mode 'even))
|
|
(progn
|
|
(setq a (math-floor a))
|
|
(or (math-evenp a)
|
|
(setq a (math-sub a 1)))
|
|
a)
|
|
(math-floor a)))))
|
|
((math-provably-integerp a) a)
|
|
((eq (car a) 'date) (list 'date (math-round (nth 1 a))))
|
|
((eq (car a) 'intv)
|
|
(math-floor (math-add a '(frac 1 2))))
|
|
((Math-vectorp a)
|
|
(math-map-vec (function (lambda (x) (math-round x prec))) a))
|
|
((math-infinitep a)
|
|
(if (or (math-posp a) (math-negp a))
|
|
a
|
|
'(var nan var-nan)))
|
|
((math-to-integer a))
|
|
(t (math-reject-arg a 'anglep))))
|
|
|
|
(defalias 'calcFunc-round 'math-round)
|
|
|
|
(defsubst calcFunc-rounde (a &optional prec)
|
|
(let ((math-rounding-mode 'even))
|
|
(math-round a prec)))
|
|
|
|
(defsubst calcFunc-roundu (a &optional prec)
|
|
(let ((math-rounding-mode 'up))
|
|
(math-round a prec)))
|
|
|
|
(defun calcFunc-fround (a &optional prec)
|
|
(if (and (Math-messy-integerp a)
|
|
(or (not prec) (and (integerp prec)
|
|
(<= prec 0))))
|
|
a
|
|
(math-float (math-round a prec))))
|
|
|
|
(defsubst calcFunc-frounde (a &optional prec)
|
|
(let ((math-rounding-mode 'even))
|
|
(calcFunc-fround a prec)))
|
|
|
|
(defsubst calcFunc-froundu (a &optional prec)
|
|
(let ((math-rounding-mode 'up))
|
|
(calcFunc-fround a prec)))
|
|
|
|
;;; Pull floating-point values apart into mantissa and exponent.
|
|
(defun calcFunc-mant (x)
|
|
(if (Math-realp x)
|
|
(if (or (Math-ratp x)
|
|
(eq (nth 1 x) 0))
|
|
x
|
|
(list 'float (nth 1 x) (- 1 (math-numdigs (nth 1 x)))))
|
|
(calc-record-why 'realp x)
|
|
(list 'calcFunc-mant x)))
|
|
|
|
(defun calcFunc-xpon (x)
|
|
(if (Math-realp x)
|
|
(if (or (Math-ratp x)
|
|
(eq (nth 1 x) 0))
|
|
0
|
|
(math-normalize (+ (nth 2 x) (1- (math-numdigs (nth 1 x))))))
|
|
(calc-record-why 'realp x)
|
|
(list 'calcFunc-xpon x)))
|
|
|
|
(defun calcFunc-scf (x n)
|
|
(if (integerp n)
|
|
(cond ((eq n 0)
|
|
x)
|
|
((Math-integerp x)
|
|
(if (> n 0)
|
|
(math-scale-int x n)
|
|
(math-div x (math-scale-int 1 (- n)))))
|
|
((eq (car x) 'frac)
|
|
(if (> n 0)
|
|
(math-make-frac (math-scale-int (nth 1 x) n) (nth 2 x))
|
|
(math-make-frac (nth 1 x) (math-scale-int (nth 2 x) (- n)))))
|
|
((eq (car x) 'float)
|
|
(math-make-float (nth 1 x) (+ (nth 2 x) n)))
|
|
((memq (car x) '(cplx sdev))
|
|
(math-normalize
|
|
(list (car x)
|
|
(calcFunc-scf (nth 1 x) n)
|
|
(calcFunc-scf (nth 2 x) n))))
|
|
((memq (car x) '(polar mod))
|
|
(math-normalize
|
|
(list (car x)
|
|
(calcFunc-scf (nth 1 x) n)
|
|
(nth 2 x))))
|
|
((eq (car x) 'intv)
|
|
(math-normalize
|
|
(list (car x)
|
|
(nth 1 x)
|
|
(calcFunc-scf (nth 2 x) n)
|
|
(calcFunc-scf (nth 3 x) n))))
|
|
((eq (car x) 'vec)
|
|
(math-map-vec (function (lambda (x) (calcFunc-scf x n))) x))
|
|
((math-infinitep x)
|
|
x)
|
|
(t
|
|
(calc-record-why 'realp x)
|
|
(list 'calcFunc-scf x n)))
|
|
(if (math-messy-integerp n)
|
|
(if (< (nth 2 n) 10)
|
|
(calcFunc-scf x (math-trunc n))
|
|
(math-overflow n))
|
|
(if (math-integerp n)
|
|
(math-overflow n)
|
|
(calc-record-why 'integerp n)
|
|
(list 'calcFunc-scf x n)))))
|
|
|
|
|
|
(defun calcFunc-incr (x &optional step relative-to)
|
|
(or step (setq step 1))
|
|
(cond ((not (Math-integerp step))
|
|
(math-reject-arg step 'integerp))
|
|
((Math-integerp x)
|
|
(math-add x step))
|
|
((eq (car x) 'float)
|
|
(if (and (math-zerop x)
|
|
(eq (car-safe relative-to) 'float))
|
|
(math-mul step
|
|
(calcFunc-scf relative-to (- 1 calc-internal-prec)))
|
|
(math-add-float x (math-make-float
|
|
step
|
|
(+ (nth 2 x)
|
|
(- (math-numdigs (nth 1 x))
|
|
calc-internal-prec))))))
|
|
((eq (car x) 'date)
|
|
(if (Math-integerp (nth 1 x))
|
|
(math-add x step)
|
|
(math-add x (list 'hms 0 0 step))))
|
|
(t
|
|
(math-reject-arg x 'realp))))
|
|
|
|
(defsubst calcFunc-decr (x &optional step relative-to)
|
|
(calcFunc-incr x (math-neg (or step 1)) relative-to))
|
|
|
|
(defun calcFunc-percent (x)
|
|
(if (math-objectp x)
|
|
(let ((calc-prefer-frac nil))
|
|
(math-div x 100))
|
|
(list 'calcFunc-percent x)))
|
|
|
|
(defun calcFunc-relch (x y)
|
|
(if (and (math-objectp x) (math-objectp y))
|
|
(math-div (math-sub y x) x)
|
|
(list 'calcFunc-relch x y)))
|
|
|
|
;;; Compute the absolute value squared of A. [F N] [Public]
|
|
(defun calcFunc-abssqr (a)
|
|
(cond ((Math-realp a)
|
|
(math-mul a a))
|
|
((eq (car a) 'cplx)
|
|
(math-add (math-sqr (nth 1 a))
|
|
(math-sqr (nth 2 a))))
|
|
((eq (car a) 'polar)
|
|
(math-sqr (nth 1 a)))
|
|
((and (memq (car a) '(sdev intv)) (math-constp a))
|
|
(math-sqr (math-abs a)))
|
|
((eq (car a) 'vec)
|
|
(math-reduce-vec 'math-add (math-map-vec 'calcFunc-abssqr a)))
|
|
((math-known-realp a)
|
|
(math-pow a 2))
|
|
((let ((inf (math-infinitep a)))
|
|
(and inf
|
|
(math-mul (calcFunc-abssqr (math-infinite-dir a inf)) inf))))
|
|
(t (calc-record-why 'numvecp a)
|
|
(list 'calcFunc-abssqr a))))
|
|
|
|
(defsubst math-sqr (a)
|
|
(math-mul a a))
|
|
|
|
;;;; Number theory.
|
|
|
|
(defun calcFunc-idiv (a b) ; [I I I] [Public]
|
|
(cond ((and (Math-natnump a) (Math-natnump b) (not (eq b 0)))
|
|
(math-quotient a b))
|
|
((Math-realp a)
|
|
(if (Math-realp b)
|
|
(let ((calc-prefer-frac t))
|
|
(math-floor (math-div a b)))
|
|
(math-reject-arg b 'realp)))
|
|
((eq (car-safe a) 'hms)
|
|
(if (eq (car-safe b) 'hms)
|
|
(let ((calc-prefer-frac t))
|
|
(math-floor (math-div a b)))
|
|
(math-reject-arg b 'hmsp)))
|
|
((and (or (eq (car-safe a) 'intv) (Math-realp a))
|
|
(or (eq (car-safe b) 'intv) (Math-realp b)))
|
|
(math-floor (math-div a b)))
|
|
((or (math-infinitep a)
|
|
(math-infinitep b))
|
|
(math-div a b))
|
|
(t (math-reject-arg a 'anglep))))
|
|
|
|
|
|
;;; Combine two terms being added, if possible.
|
|
(defun math-combine-sum (a b nega negb scalar-okay)
|
|
(if (and scalar-okay (Math-objvecp a) (Math-objvecp b))
|
|
(math-add-or-sub a b nega negb)
|
|
(let ((amult 1) (bmult 1))
|
|
(and (consp a)
|
|
(cond ((and (eq (car a) '*)
|
|
(Math-objectp (nth 1 a)))
|
|
(setq amult (nth 1 a)
|
|
a (nth 2 a)))
|
|
((and (eq (car a) '/)
|
|
(Math-objectp (nth 2 a)))
|
|
(setq amult (if (Math-integerp (nth 2 a))
|
|
(list 'frac 1 (nth 2 a))
|
|
(math-div 1 (nth 2 a)))
|
|
a (nth 1 a)))
|
|
((eq (car a) 'neg)
|
|
(setq amult -1
|
|
a (nth 1 a)))))
|
|
(and (consp b)
|
|
(cond ((and (eq (car b) '*)
|
|
(Math-objectp (nth 1 b)))
|
|
(setq bmult (nth 1 b)
|
|
b (nth 2 b)))
|
|
((and (eq (car b) '/)
|
|
(Math-objectp (nth 2 b)))
|
|
(setq bmult (if (Math-integerp (nth 2 b))
|
|
(list 'frac 1 (nth 2 b))
|
|
(math-div 1 (nth 2 b)))
|
|
b (nth 1 b)))
|
|
((eq (car b) 'neg)
|
|
(setq bmult -1
|
|
b (nth 1 b)))))
|
|
(and (if math-simplifying
|
|
(Math-equal a b)
|
|
(equal a b))
|
|
(progn
|
|
(if nega (setq amult (math-neg amult)))
|
|
(if negb (setq bmult (math-neg bmult)))
|
|
(setq amult (math-add amult bmult))
|
|
(math-mul amult a))))))
|
|
|
|
(defun math-add-or-sub (a b aneg bneg)
|
|
(if aneg (setq a (math-neg a)))
|
|
(if bneg (setq b (math-neg b)))
|
|
(if (or (Math-vectorp a) (Math-vectorp b))
|
|
(math-normalize (list '+ a b))
|
|
(math-add a b)))
|
|
|
|
(defvar math-combine-prod-e '(var e var-e))
|
|
|
|
;;; The following is expanded out four ways for speed.
|
|
|
|
;; math-unit-prefixes is defined in calc-units.el,
|
|
;; but used here.
|
|
(defvar math-unit-prefixes)
|
|
|
|
(defun math-combine-prod (a b inva invb scalar-okay)
|
|
(cond
|
|
((or (and inva (Math-zerop a))
|
|
(and invb (Math-zerop b)))
|
|
nil)
|
|
((and scalar-okay (Math-objvecp a) (Math-objvecp b))
|
|
(setq a (math-mul-or-div a b inva invb))
|
|
(and (Math-objvecp a)
|
|
a))
|
|
((and (eq (car-safe a) '^)
|
|
inva
|
|
(math-looks-negp (nth 2 a)))
|
|
(math-mul (math-pow (nth 1 a) (math-neg (nth 2 a))) b))
|
|
((and (eq (car-safe b) '^)
|
|
invb
|
|
(math-looks-negp (nth 2 b)))
|
|
(math-mul a (math-pow (nth 1 b) (math-neg (nth 2 b)))))
|
|
((and math-simplifying
|
|
(math-combine-prod-trig a b)))
|
|
(t (let ((apow 1) (bpow 1))
|
|
(and (consp a)
|
|
(cond ((and (eq (car a) '^)
|
|
(or math-simplifying
|
|
(Math-numberp (nth 2 a))))
|
|
(setq apow (nth 2 a)
|
|
a (nth 1 a)))
|
|
((eq (car a) 'calcFunc-sqrt)
|
|
(setq apow '(frac 1 2)
|
|
a (nth 1 a)))
|
|
((and (eq (car a) 'calcFunc-exp)
|
|
(or math-simplifying
|
|
(Math-numberp (nth 1 a))))
|
|
(setq apow (nth 1 a)
|
|
a math-combine-prod-e))))
|
|
(and (consp a) (eq (car a) 'frac)
|
|
(Math-lessp (nth 1 a) (nth 2 a))
|
|
(setq a (math-div 1 a) apow (math-neg apow)))
|
|
(and (consp b)
|
|
(cond ((and (eq (car b) '^)
|
|
(or math-simplifying
|
|
(Math-numberp (nth 2 b))))
|
|
(setq bpow (nth 2 b)
|
|
b (nth 1 b)))
|
|
((eq (car b) 'calcFunc-sqrt)
|
|
(setq bpow '(frac 1 2)
|
|
b (nth 1 b)))
|
|
((and (eq (car b) 'calcFunc-exp)
|
|
(or math-simplifying
|
|
(Math-numberp (nth 1 b))))
|
|
(setq bpow (nth 1 b)
|
|
b math-combine-prod-e))))
|
|
(and (consp b) (eq (car b) 'frac)
|
|
(Math-lessp (nth 1 b) (nth 2 b))
|
|
(setq b (math-div 1 b) bpow (math-neg bpow)))
|
|
(if inva (setq apow (math-neg apow)))
|
|
(if invb (setq bpow (math-neg bpow)))
|
|
(or (and (if math-simplifying
|
|
(math-commutative-equal a b)
|
|
(equal a b))
|
|
(let ((sumpow (math-add apow bpow)))
|
|
(and (or (not (Math-integerp a))
|
|
(Math-zerop sumpow)
|
|
(eq (eq (car-safe apow) 'frac)
|
|
(eq (car-safe bpow) 'frac)))
|
|
(progn
|
|
(and (math-looks-negp sumpow)
|
|
(Math-ratp a) (Math-posp a)
|
|
(setq a (math-div 1 a)
|
|
sumpow (math-neg sumpow)))
|
|
(cond ((equal sumpow '(frac 1 2))
|
|
(list 'calcFunc-sqrt a))
|
|
((equal sumpow '(frac -1 2))
|
|
(math-div 1 (list 'calcFunc-sqrt a)))
|
|
((and (eq a math-combine-prod-e)
|
|
(eq a b))
|
|
(list 'calcFunc-exp sumpow))
|
|
(t
|
|
(condition-case err
|
|
(math-pow a sumpow)
|
|
(inexact-result (list '^ a sumpow)))))))))
|
|
(and math-simplifying-units
|
|
math-combining-units
|
|
(let* ((ua (math-check-unit-name a))
|
|
ub)
|
|
(and ua
|
|
(eq ua (setq ub (math-check-unit-name b)))
|
|
(progn
|
|
(setq ua (if (eq (nth 1 a) (car ua))
|
|
1
|
|
(nth 1 (assq (aref (symbol-name (nth 1 a))
|
|
0)
|
|
math-unit-prefixes)))
|
|
ub (if (eq (nth 1 b) (car ub))
|
|
1
|
|
(nth 1 (assq (aref (symbol-name (nth 1 b))
|
|
0)
|
|
math-unit-prefixes))))
|
|
(if (Math-lessp ua ub)
|
|
(let (temp)
|
|
(setq temp a a b b temp
|
|
temp ua ua ub ub temp
|
|
temp apow apow bpow bpow temp)))
|
|
(math-mul (math-pow (math-div ua ub) apow)
|
|
(math-pow b (math-add apow bpow)))))))
|
|
(and (equal apow bpow)
|
|
(Math-natnump a) (Math-natnump b)
|
|
(cond ((equal apow '(frac 1 2))
|
|
(list 'calcFunc-sqrt (math-mul a b)))
|
|
((equal apow '(frac -1 2))
|
|
(math-div 1 (list 'calcFunc-sqrt (math-mul a b))))
|
|
(t
|
|
(setq a (math-mul a b))
|
|
(condition-case err
|
|
(math-pow a apow)
|
|
(inexact-result (list '^ a apow)))))))))))
|
|
|
|
(defun math-combine-prod-trig (a b)
|
|
(cond
|
|
((and (eq (car-safe a) 'calcFunc-sin)
|
|
(eq (car-safe b) 'calcFunc-csc)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-sin)
|
|
(eq (car-safe b) 'calcFunc-sec)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-tan (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-sin)
|
|
(eq (car-safe b) 'calcFunc-cot)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-cos (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-cos)
|
|
(eq (car-safe b) 'calcFunc-sec)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-cos)
|
|
(eq (car-safe b) 'calcFunc-csc)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-cot (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-cos)
|
|
(eq (car-safe b) 'calcFunc-tan)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-sin (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-tan)
|
|
(eq (car-safe b) 'calcFunc-cot)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-tan)
|
|
(eq (car-safe b) 'calcFunc-csc)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-sec (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-sec)
|
|
(eq (car-safe b) 'calcFunc-cot)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-csc (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-sinh)
|
|
(eq (car-safe b) 'calcFunc-csch)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-sinh)
|
|
(eq (car-safe b) 'calcFunc-sech)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-tanh (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-sinh)
|
|
(eq (car-safe b) 'calcFunc-coth)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-cosh (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-cosh)
|
|
(eq (car-safe b) 'calcFunc-sech)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-cosh)
|
|
(eq (car-safe b) 'calcFunc-csch)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-coth (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-cosh)
|
|
(eq (car-safe b) 'calcFunc-tanh)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-sinh (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-tanh)
|
|
(eq (car-safe b) 'calcFunc-coth)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
1)
|
|
((and (eq (car-safe a) 'calcFunc-tanh)
|
|
(eq (car-safe b) 'calcFunc-csch)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-sech (cdr a)))
|
|
((and (eq (car-safe a) 'calcFunc-sech)
|
|
(eq (car-safe b) 'calcFunc-coth)
|
|
(= 0 (math-simplify (math-sub (cdr a) (cdr b)))))
|
|
(cons 'calcFunc-csch (cdr a)))
|
|
(t
|
|
nil)))
|
|
|
|
(defun math-mul-or-div (a b ainv binv)
|
|
(if (or (Math-vectorp a) (Math-vectorp b))
|
|
(math-normalize
|
|
(if ainv
|
|
(if binv
|
|
(list '/ (math-div 1 a) b)
|
|
(list '/ b a))
|
|
(if binv
|
|
(list '/ a b)
|
|
(list '* a b))))
|
|
(if ainv
|
|
(if binv
|
|
(math-div (math-div 1 a) b)
|
|
(math-div b a))
|
|
(if binv
|
|
(math-div a b)
|
|
(math-mul a b)))))
|
|
|
|
;; The variable math-com-bterms is local to math-commutative-equal,
|
|
;; but is used by math-commutative collect, which is called by
|
|
;; math-commutative-equal.
|
|
(defvar math-com-bterms)
|
|
|
|
(defun math-commutative-equal (a b)
|
|
(if (memq (car-safe a) '(+ -))
|
|
(and (memq (car-safe b) '(+ -))
|
|
(let ((math-com-bterms nil) aterms p)
|
|
(math-commutative-collect b nil)
|
|
(setq aterms math-com-bterms math-com-bterms nil)
|
|
(math-commutative-collect a nil)
|
|
(and (= (length aterms) (length math-com-bterms))
|
|
(progn
|
|
(while (and aterms
|
|
(progn
|
|
(setq p math-com-bterms)
|
|
(while (and p (not (equal (car aterms)
|
|
(car p))))
|
|
(setq p (cdr p)))
|
|
p))
|
|
(setq math-com-bterms (delq (car p) math-com-bterms)
|
|
aterms (cdr aterms)))
|
|
(not aterms)))))
|
|
(equal a b)))
|
|
|
|
(defun math-commutative-collect (b neg)
|
|
(if (eq (car-safe b) '+)
|
|
(progn
|
|
(math-commutative-collect (nth 1 b) neg)
|
|
(math-commutative-collect (nth 2 b) neg))
|
|
(if (eq (car-safe b) '-)
|
|
(progn
|
|
(math-commutative-collect (nth 1 b) neg)
|
|
(math-commutative-collect (nth 2 b) (not neg)))
|
|
(setq math-com-bterms (cons (if neg (math-neg b) b) math-com-bterms)))))
|
|
|
|
(provide 'calc-arith)
|
|
|
|
;;; arch-tag: 6c396b5b-14c6-40ed-bb2a-7cc2e8111465
|
|
;;; calc-arith.el ends here
|