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230 | cejka | 1 | /* |
2 | * Copyright (C) 2005 Josef Cejka |
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3 | * All rights reserved. |
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4 | * |
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5 | * Redistribution and use in source and binary forms, with or without |
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6 | * modification, are permitted provided that the following conditions |
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7 | * are met: |
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8 | * |
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9 | * - Redistributions of source code must retain the above copyright |
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10 | * notice, this list of conditions and the following disclaimer. |
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11 | * - Redistributions in binary form must reproduce the above copyright |
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12 | * notice, this list of conditions and the following disclaimer in the |
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13 | * documentation and/or other materials provided with the distribution. |
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14 | * - The name of the author may not be used to endorse or promote products |
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15 | * derived from this software without specific prior written permission. |
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16 | * |
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17 | * THIS SOFTWARE IS PROVIDED BY THE AUTHOR ``AS IS'' AND ANY EXPRESS OR |
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18 | * IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES |
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19 | * OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. |
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20 | * IN NO EVENT SHALL THE AUTHOR BE LIABLE FOR ANY DIRECT, INDIRECT, |
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21 | * INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT |
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22 | * NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, |
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23 | * DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY |
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24 | * THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT |
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25 | * (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF |
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26 | * THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. |
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27 | */ |
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28 | |||
29 | #include <arch/fmath.h> |
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30 | #include <print.h> |
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31 | |||
32 | //TODO: |
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33 | #define FMATH_MANTISA_MASK ( 0x000fffffffffffffLL ) |
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34 | |||
35 | signed short fmath_get_binary_exponent(double num) |
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36 | { //TODO: |
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37 | /* fmath_ld_union_t fmath_ld_union; |
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38 | fmath_ld_union.bf = num; |
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39 | return (signed short)((((fmath_ld_union.ldd[7])&0x7f)<<4) + (((fmath_ld_union.ldd[6])&0xf0)>>4)) -FMATH_EXPONENT_BIAS; // exponent is 11 bits lenght, so sevent bits is in 8th byte and 4 bits in 7th |
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40 | */ |
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41 | return 0; |
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42 | } |
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43 | |||
44 | double fmath_get_decimal_exponent(double num) |
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45 | { //TODO: |
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46 | double value; |
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47 | // log10(2)*log2(x) => log10(x) |
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48 | /* __asm__ __volatile__ ( \ |
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49 | "fldlg2 #load log10(2) \n\t" \ |
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50 | "fxch %%st(1) \n\t" \ |
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51 | "fyl2x #count st(0)*log2(st(1))->st(1); pop st(0) \n\t" \ |
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52 | : "=t" (value) : "0"(num) ); |
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53 | */ return value; |
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54 | |||
55 | } |
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56 | |||
57 | __u64 fmath_get_binary_mantisa(double num) |
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58 | { //TODO: |
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59 | /* union { __u64 _u; double _d;} un = { _d : num }; |
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60 | un._u=un._u &(FMATH_MANTISA_MASK); // mask 52 bits of mantisa |
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61 | return un._u; |
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62 | */ |
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63 | return 0; |
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64 | } |
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65 | |||
66 | double fmath_fint(double num, double *intp) |
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67 | { //TODO: |
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68 | /* fmath_ld_union_t fmath_ld_union_num; |
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69 | fmath_ld_union_t fmath_ld_union_int; |
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70 | signed short exp; |
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71 | __u64 mask,mantisa; |
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72 | int i; |
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73 | |||
74 | exp=fmath_get_binary_exponent(num); |
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75 | |||
76 | if (exp<0) { |
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77 | *intp = 0.0; |
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78 | *intp = fmath_set_sign(0.0L,fmath_is_negative(num)); |
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79 | return num; |
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80 | } |
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81 | |||
82 | |||
83 | if (exp>51) { |
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84 | *intp=num; |
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85 | num=0.0; |
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86 | num= fmath_set_sign(0.0L,fmath_is_negative(*intp)); |
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87 | return num; |
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88 | } |
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89 | |||
90 | fmath_ld_union_num.bf = num; |
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91 | |||
92 | mask = FMATH_MANTISA_MASK>>exp; |
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93 | //mantisa = (fmath_get-binary_mantisa(num))&(~mask); |
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94 | |||
95 | for (i=0;i<7;i++) { |
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96 | // Ugly construction for obtain sign, exponent and integer part from num |
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97 | fmath_ld_union_int.ldd[i]=fmath_ld_union_num.ldd[i]&(((~mask)>>(i*8))&0xff); |
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98 | } |
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99 | |||
100 | fmath_ld_union_int.ldd[6]|=((fmath_ld_union_num.ldd[6])&(0xf0)); |
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101 | fmath_ld_union_int.ldd[7]=fmath_ld_union_num.ldd[7]; |
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102 | |||
103 | *intp=fmath_ld_union_int.bf; |
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104 | return fmath_ld_union_num.bf-fmath_ld_union_int.bf; |
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105 | */ |
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106 | |||
107 | return 0.0; |
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108 | }; |
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109 | |||
110 | |||
111 | double fmath_dpow(double base, double exponent) |
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112 | { //TODO: |
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113 | /* double value=1.0; |
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114 | if (base<=0.0) return base; |
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115 | |||
116 | //2^(x*log2(10)) = 2^y = 10^x |
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117 | |||
118 | __asm__ __volatile__ ( \ |
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119 | "fyl2x # ST(1):=ST(1)*log2(ST(0)), pop st(0) \n\t " \ |
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120 | "fld %%st(0) \n\t" \ |
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121 | "frndint \n\t" \ |
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122 | "fxch %%st(1) \n\t" \ |
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123 | "fsub %%st(1),%%st(0) \n\t" \ |
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124 | "f2xm1 # ST := 2^ST -1\n\t" \ |
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125 | "fld1 \n\t" \ |
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126 | "faddp %%st(0),%%st(1) \n\t" \ |
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127 | "fscale #ST:=ST*2^(ST(1))\n\t" \ |
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128 | "fstp %%st(1) \n\t" \ |
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129 | "" : "=t" (value) : "0" (base), "u" (exponent) ); |
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130 | return value; |
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131 | */ |
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132 | return 1.0; |
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133 | } |
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134 | |||
266 | cejka | 135 | |
136 | int fmath_is_nan(double num) |
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137 | { |
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138 | /* __u16 exp; |
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139 | fmath_ld_union_t fmath_ld_union; |
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140 | fmath_ld_union.bf = num; |
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141 | exp=(((fmath_ld_union.ldd[7])&0x7f)<<4) + (((fmath_ld_union.ldd[6])&0xf0)>>4); // exponent is 11 bits lenght, so sevent bits is in 8th byte and 4 bits in 7th |
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142 | |||
143 | if (exp!=0x07ff) return 0; |
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144 | if (fmath_get_binary_mantisa(num)>=FMATH_NAN) return 1; |
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145 | |||
146 | */ |
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147 | return 0; |
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148 | } |
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149 | |||
150 | int fmath_is_infinity(double num) |
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151 | { |
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152 | /* __u16 exp; |
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153 | fmath_ld_union_t fmath_ld_union; |
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154 | fmath_ld_union.bf = num; |
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155 | exp=(((fmath_ld_union.ldd[7])&0x7f)<<4) + (((fmath_ld_union.ldd[6])&0xf0)>>4); // exponent is 11 bits lenght, so sevent bits is in 8th byte and 4 bits in 7th |
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156 | |||
157 | if (exp!=0x07ff) return 0; |
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158 | if (fmath_get_binary_mantisa(num)==0x0) return 1; |
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159 | */ return 0; |
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160 | } |
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161 |