* MOTOROLA MICROPROCESSOR & MEMORY TECHNOLOGY GROUP * M68000 Hi-Performance Microprocessor Division * M68040 Software Package * * M68040 Software Package Copyright (c) 1993, 1994 Motorola Inc. * All rights reserved. * * THE SOFTWARE is provided on an "AS IS" basis and without warranty. * To the maximum extent permitted by applicable law, * MOTOROLA DISCLAIMS ALL WARRANTIES WHETHER EXPRESS OR IMPLIED, * INCLUDING IMPLIED WARRANTIES OF MERCHANTABILITY OR FITNESS FOR A * PARTICULAR PURPOSE and any warranty against infringement with * regard to the SOFTWARE (INCLUDING ANY MODIFIED VERSIONS THEREOF) * and any accompanying written materials. * * To the maximum extent permitted by applicable law, * IN NO EVENT SHALL MOTOROLA BE LIABLE FOR ANY DAMAGES WHATSOEVER * (INCLUDING WITHOUT LIMITATION, DAMAGES FOR LOSS OF BUSINESS * PROFITS, BUSINESS INTERRUPTION, LOSS OF BUSINESS INFORMATION, OR * OTHER PECUNIARY LOSS) ARISING OF THE USE OR INABILITY TO USE THE * SOFTWARE. Motorola assumes no responsibility for the maintenance * and support of the SOFTWARE. * * You are hereby granted a copyright license to use, modify, and * distribute the SOFTWARE so long as this entire notice is retained * without alteration in any modified and/or redistributed versions, * and that such modified versions are clearly identified as such. * No licenses are granted by implication, estoppel or otherwise * under any patents or trademarks of Motorola, Inc. * * sacos.sa 3.3 12/19/90 * * Description: The entry point sAcos computes the inverse cosine of * an input argument; sAcosd does the same except for denormalized * input. * * Input: Double-extended number X in location pointed to * by address register a0. * * Output: The value arccos(X) returned in floating-point register Fp0. * * Accuracy and Monotonicity: The returned result is within 3 ulps in * 64 significant bit, i.e. within 0.5001 ulp to 53 bits if the * result is subsequently rounded to double precision. The * result is provably monotonic in double precision. * * Speed: The program sCOS takes approximately 310 cycles. * * Algorithm: * * ACOS * 1. If |X| >= 1, go to 3. * * 2. (|X| < 1) Calculate acos(X) by * z := (1-X) / (1+X) * acos(X) = 2 * atan( sqrt(z) ). * Exit. * * 3. If |X| > 1, go to 5. * * 4. (|X| = 1) If X > 0, return 0. Otherwise, return Pi. Exit. * * 5. (|X| > 1) Generate an invalid operation by 0 * infinity. * Exit. * SACOS IDNT 2,1 Motorola 040 Floating Point Software Package section 8 PI DC.L $40000000,$C90FDAA2,$2168C235,$00000000 PIBY2 DC.L $3FFF0000,$C90FDAA2,$2168C235,$00000000 xref t_operr xref t_frcinx xref satan xdef sacosd sacosd: *--ACOS(X) = PI/2 FOR DENORMALIZED X fmove.l d1,fpcr ...load user's rounding mode/precision FMOVE.X PIBY2,FP0 bra t_frcinx xdef sacos sacos: FMOVE.X (a0),FP0 ...LOAD INPUT move.l (a0),d0 ...pack exponent with upper 16 fraction move.w 4(a0),d0 ANDI.L #$7FFFFFFF,D0 CMPI.L #$3FFF8000,D0 BGE.B ACOSBIG *--THIS IS THE USUAL CASE, |X| < 1 *--ACOS(X) = 2 * ATAN( SQRT( (1-X)/(1+X) ) ) FMOVE.S #:3F800000,FP1 FADD.X FP0,FP1 ...1+X FNEG.X FP0 ... -X FADD.S #:3F800000,FP0 ...1-X FDIV.X FP1,FP0 ...(1-X)/(1+X) FSQRT.X FP0 ...SQRT((1-X)/(1+X)) fmovem.x fp0,(a0) ...overwrite input move.l d1,-(sp) ;save original users fpcr clr.l d1 bsr satan ...ATAN(SQRT([1-X]/[1+X])) fMOVE.L (sp)+,fpcr ;restore users exceptions FADD.X FP0,FP0 ...2 * ATAN( STUFF ) bra t_frcinx ACOSBIG: FABS.X FP0 FCMP.S #:3F800000,FP0 fbgt t_operr ;cause an operr exception *--|X| = 1, ACOS(X) = 0 OR PI move.l (a0),d0 ...pack exponent with upper 16 fraction move.w 4(a0),d0 TST.L D0 ;D0 has original exponent+fraction BGT.B ACOSP1 *--X = -1 *Returns PI and inexact exception FMOVE.X PI,FP0 FMOVE.L d1,FPCR FADD.S #:00800000,FP0 ;cause an inexact exception to be put * ;into the 040 - will not trap until next * ;fp inst. bra t_frcinx ACOSP1: FMOVE.L d1,FPCR FMOVE.S #:00000000,FP0 rts ;Facos of +1 is exact end