root/arch/m68k/fpsp040/satanh.S

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   1 |
   2 |       satanh.sa 3.3 12/19/90
   3 |
   4 |       The entry point satanh computes the inverse
   5 |       hyperbolic tangent of
   6 |       an input argument; satanhd does the same except for denormalized
   7 |       input.
   8 |
   9 |       Input: Double-extended number X in location pointed to
  10 |               by address register a0.
  11 |
  12 |       Output: The value arctanh(X) returned in floating-point register Fp0.
  13 |
  14 |       Accuracy and Monotonicity: The returned result is within 3 ulps in
  15 |               64 significant bit, i.e. within 0.5001 ulp to 53 bits if the
  16 |               result is subsequently rounded to double precision. The 
  17 |               result is provably monotonic in double precision.
  18 |
  19 |       Speed: The program satanh takes approximately 270 cycles.
  20 |
  21 |       Algorithm:
  22 |
  23 |       ATANH
  24 |       1. If |X| >= 1, go to 3.
  25 |
  26 |       2. (|X| < 1) Calculate atanh(X) by
  27 |               sgn := sign(X)
  28 |               y := |X|
  29 |               z := 2y/(1-y)
  30 |               atanh(X) := sgn * (1/2) * logp1(z)
  31 |               Exit.
  32 |
  33 |       3. If |X| > 1, go to 5.
  34 |
  35 |       4. (|X| = 1) Generate infinity with an appropriate sign and
  36 |               divide-by-zero by       
  37 |               sgn := sign(X)
  38 |               atan(X) := sgn / (+0).
  39 |               Exit.
  40 |
  41 |       5. (|X| > 1) Generate an invalid operation by 0 * infinity.
  42 |               Exit.
  43 |
  44 
  45 |               Copyright (C) Motorola, Inc. 1990
  46 |                       All Rights Reserved
  47 |
  48 |       THIS IS UNPUBLISHED PROPRIETARY SOURCE CODE OF MOTOROLA 
  49 |       The copyright notice above does not evidence any  
  50 |       actual or intended publication of such source code.
  51 
  52 |satanh idnt    2,1 | Motorola 040 Floating Point Software Package
  53 
  54         |section        8
  55 
  56         |xref   t_dz
  57         |xref   t_operr
  58         |xref   t_frcinx
  59         |xref   t_extdnrm
  60         |xref   slognp1
  61 
  62         .global satanhd
  63 satanhd:
  64 |--ATANH(X) = X FOR DENORMALIZED X
  65 
  66         bra             t_extdnrm
  67 
  68         .global satanh
  69 satanh:
  70         movel           (%a0),%d0
  71         movew           4(%a0),%d0
  72         andil           #0x7FFFFFFF,%d0
  73         cmpil           #0x3FFF8000,%d0
  74         bges            ATANHBIG
  75 
  76 |--THIS IS THE USUAL CASE, |X| < 1
  77 |--Y = |X|, Z = 2Y/(1-Y), ATANH(X) = SIGN(X) * (1/2) * LOG1P(Z).
  78 
  79         fabsx           (%a0),%fp0      | ...Y = |X|
  80         fmovex          %fp0,%fp1
  81         fnegx           %fp1            | ...-Y
  82         faddx           %fp0,%fp0               | ...2Y
  83         fadds           #0x3F800000,%fp1        | ...1-Y
  84         fdivx           %fp1,%fp0               | ...2Y/(1-Y)
  85         movel           (%a0),%d0
  86         andil           #0x80000000,%d0
  87         oril            #0x3F000000,%d0 | ...SIGN(X)*HALF
  88         movel           %d0,-(%sp)
  89 
  90         fmovemx %fp0-%fp0,(%a0) | ...overwrite input
  91         movel           %d1,-(%sp)
  92         clrl            %d1
  93         bsr             slognp1         | ...LOG1P(Z)
  94         fmovel          (%sp)+,%fpcr
  95         fmuls           (%sp)+,%fp0
  96         bra             t_frcinx
  97 
  98 ATANHBIG:
  99         fabsx           (%a0),%fp0      | ...|X|
 100         fcmps           #0x3F800000,%fp0
 101         fbgt            t_operr
 102         bra             t_dz
 103 
 104         |end

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