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951 lines
28 KiB
C
951 lines
28 KiB
C
/*
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* Cogl
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*
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* An object oriented GL/GLES Abstraction/Utility Layer
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*
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* Copyright (C) 2007,2008,2009 Intel Corporation.
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*
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* This library is free software; you can redistribute it and/or
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* modify it under the terms of the GNU Lesser General Public
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* License as published by the Free Software Foundation; either
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* version 2 of the License, or (at your option) any later version.
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*
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* This library 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 GNU
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* Lesser General Public License for more details.
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*
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* You should have received a copy of the GNU Lesser General Public
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* License along with this library. If not, see <http://www.gnu.org/licenses/>.
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*
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*
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*/
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#define G_IMPLEMENT_INLINES
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#ifdef HAVE_CONFIG_H
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#include "config.h"
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#endif
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#include "cogl-fixed.h"
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/* pre-computed sin table for 1st quadrant
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*
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* Currently contains 257 entries.
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*
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* The current maximum absolute error is about 1.9e-0.5
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* and is greatest around pi/2 where the second derivative
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* of sin(x) is greatest. If greater accuracy is needed,
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* modestly increasing the table size, or maybe using
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* quadratic interpolation would drop the interpolation
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* error below the precision limits of CoglFixed.
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*/
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static const CoglFixed sin_tbl[] =
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{
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0x00000000L, 0x00000192L, 0x00000324L, 0x000004B6L,
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0x00000648L, 0x000007DAL, 0x0000096CL, 0x00000AFEL,
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0x00000C90L, 0x00000E21L, 0x00000FB3L, 0x00001144L,
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0x000012D5L, 0x00001466L, 0x000015F7L, 0x00001787L,
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0x00001918L, 0x00001AA8L, 0x00001C38L, 0x00001DC7L,
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0x00001F56L, 0x000020E5L, 0x00002274L, 0x00002402L,
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0x00002590L, 0x0000271EL, 0x000028ABL, 0x00002A38L,
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0x00002BC4L, 0x00002D50L, 0x00002EDCL, 0x00003067L,
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0x000031F1L, 0x0000337CL, 0x00003505L, 0x0000368EL,
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0x00003817L, 0x0000399FL, 0x00003B27L, 0x00003CAEL,
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0x00003E34L, 0x00003FBAL, 0x0000413FL, 0x000042C3L,
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0x00004447L, 0x000045CBL, 0x0000474DL, 0x000048CFL,
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0x00004A50L, 0x00004BD1L, 0x00004D50L, 0x00004ECFL,
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0x0000504DL, 0x000051CBL, 0x00005348L, 0x000054C3L,
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0x0000563EL, 0x000057B9L, 0x00005932L, 0x00005AAAL,
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0x00005C22L, 0x00005D99L, 0x00005F0FL, 0x00006084L,
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0x000061F8L, 0x0000636BL, 0x000064DDL, 0x0000664EL,
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0x000067BEL, 0x0000692DL, 0x00006A9BL, 0x00006C08L,
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0x00006D74L, 0x00006EDFL, 0x00007049L, 0x000071B2L,
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0x0000731AL, 0x00007480L, 0x000075E6L, 0x0000774AL,
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0x000078ADL, 0x00007A10L, 0x00007B70L, 0x00007CD0L,
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0x00007E2FL, 0x00007F8CL, 0x000080E8L, 0x00008243L,
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0x0000839CL, 0x000084F5L, 0x0000864CL, 0x000087A1L,
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0x000088F6L, 0x00008A49L, 0x00008B9AL, 0x00008CEBL,
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0x00008E3AL, 0x00008F88L, 0x000090D4L, 0x0000921FL,
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0x00009368L, 0x000094B0L, 0x000095F7L, 0x0000973CL,
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0x00009880L, 0x000099C2L, 0x00009B03L, 0x00009C42L,
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0x00009D80L, 0x00009EBCL, 0x00009FF7L, 0x0000A130L,
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0x0000A268L, 0x0000A39EL, 0x0000A4D2L, 0x0000A605L,
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0x0000A736L, 0x0000A866L, 0x0000A994L, 0x0000AAC1L,
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0x0000ABEBL, 0x0000AD14L, 0x0000AE3CL, 0x0000AF62L,
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0x0000B086L, 0x0000B1A8L, 0x0000B2C9L, 0x0000B3E8L,
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0x0000B505L, 0x0000B620L, 0x0000B73AL, 0x0000B852L,
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0x0000B968L, 0x0000BA7DL, 0x0000BB8FL, 0x0000BCA0L,
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0x0000BDAFL, 0x0000BEBCL, 0x0000BFC7L, 0x0000C0D1L,
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0x0000C1D8L, 0x0000C2DEL, 0x0000C3E2L, 0x0000C4E4L,
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0x0000C5E4L, 0x0000C6E2L, 0x0000C7DEL, 0x0000C8D9L,
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0x0000C9D1L, 0x0000CAC7L, 0x0000CBBCL, 0x0000CCAEL,
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0x0000CD9FL, 0x0000CE8EL, 0x0000CF7AL, 0x0000D065L,
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0x0000D14DL, 0x0000D234L, 0x0000D318L, 0x0000D3FBL,
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0x0000D4DBL, 0x0000D5BAL, 0x0000D696L, 0x0000D770L,
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0x0000D848L, 0x0000D91EL, 0x0000D9F2L, 0x0000DAC4L,
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0x0000DB94L, 0x0000DC62L, 0x0000DD2DL, 0x0000DDF7L,
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0x0000DEBEL, 0x0000DF83L, 0x0000E046L, 0x0000E107L,
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0x0000E1C6L, 0x0000E282L, 0x0000E33CL, 0x0000E3F4L,
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0x0000E4AAL, 0x0000E55EL, 0x0000E610L, 0x0000E6BFL,
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0x0000E76CL, 0x0000E817L, 0x0000E8BFL, 0x0000E966L,
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0x0000EA0AL, 0x0000EAABL, 0x0000EB4BL, 0x0000EBE8L,
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0x0000EC83L, 0x0000ED1CL, 0x0000EDB3L, 0x0000EE47L,
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0x0000EED9L, 0x0000EF68L, 0x0000EFF5L, 0x0000F080L,
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0x0000F109L, 0x0000F18FL, 0x0000F213L, 0x0000F295L,
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0x0000F314L, 0x0000F391L, 0x0000F40CL, 0x0000F484L,
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0x0000F4FAL, 0x0000F56EL, 0x0000F5DFL, 0x0000F64EL,
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0x0000F6BAL, 0x0000F724L, 0x0000F78CL, 0x0000F7F1L,
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0x0000F854L, 0x0000F8B4L, 0x0000F913L, 0x0000F96EL,
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0x0000F9C8L, 0x0000FA1FL, 0x0000FA73L, 0x0000FAC5L,
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0x0000FB15L, 0x0000FB62L, 0x0000FBADL, 0x0000FBF5L,
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0x0000FC3BL, 0x0000FC7FL, 0x0000FCC0L, 0x0000FCFEL,
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0x0000FD3BL, 0x0000FD74L, 0x0000FDACL, 0x0000FDE1L,
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0x0000FE13L, 0x0000FE43L, 0x0000FE71L, 0x0000FE9CL,
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0x0000FEC4L, 0x0000FEEBL, 0x0000FF0EL, 0x0000FF30L,
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0x0000FF4EL, 0x0000FF6BL, 0x0000FF85L, 0x0000FF9CL,
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0x0000FFB1L, 0x0000FFC4L, 0x0000FFD4L, 0x0000FFE1L,
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0x0000FFECL, 0x0000FFF5L, 0x0000FFFBL, 0x0000FFFFL,
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0x00010000L,
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};
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/* pre-computed tan table for 1st quadrant */
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static const CoglFixed tan_tbl[] =
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{
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0x00000000L, 0x00000192L, 0x00000324L, 0x000004b7L,
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0x00000649L, 0x000007dbL, 0x0000096eL, 0x00000b01L,
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0x00000c94L, 0x00000e27L, 0x00000fbaL, 0x0000114eL,
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0x000012e2L, 0x00001477L, 0x0000160cL, 0x000017a1L,
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0x00001937L, 0x00001acdL, 0x00001c64L, 0x00001dfbL,
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0x00001f93L, 0x0000212cL, 0x000022c5L, 0x0000245fL,
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0x000025f9L, 0x00002795L, 0x00002931L, 0x00002aceL,
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0x00002c6cL, 0x00002e0aL, 0x00002faaL, 0x0000314aL,
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0x000032ecL, 0x0000348eL, 0x00003632L, 0x000037d7L,
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0x0000397dL, 0x00003b24L, 0x00003cccL, 0x00003e75L,
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0x00004020L, 0x000041ccL, 0x00004379L, 0x00004528L,
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0x000046d8L, 0x0000488aL, 0x00004a3dL, 0x00004bf2L,
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0x00004da8L, 0x00004f60L, 0x0000511aL, 0x000052d5L,
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0x00005492L, 0x00005651L, 0x00005812L, 0x000059d5L,
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0x00005b99L, 0x00005d60L, 0x00005f28L, 0x000060f3L,
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0x000062c0L, 0x0000648fL, 0x00006660L, 0x00006834L,
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0x00006a0aL, 0x00006be2L, 0x00006dbdL, 0x00006f9aL,
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0x0000717aL, 0x0000735dL, 0x00007542L, 0x0000772aL,
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0x00007914L, 0x00007b02L, 0x00007cf2L, 0x00007ee6L,
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0x000080dcL, 0x000082d6L, 0x000084d2L, 0x000086d2L,
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0x000088d6L, 0x00008adcL, 0x00008ce7L, 0x00008ef4L,
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0x00009106L, 0x0000931bL, 0x00009534L, 0x00009750L,
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0x00009971L, 0x00009b95L, 0x00009dbeL, 0x00009febL,
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0x0000a21cL, 0x0000a452L, 0x0000a68cL, 0x0000a8caL,
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0x0000ab0eL, 0x0000ad56L, 0x0000afa3L, 0x0000b1f5L,
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0x0000b44cL, 0x0000b6a8L, 0x0000b909L, 0x0000bb70L,
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0x0000bdddL, 0x0000c04fL, 0x0000c2c7L, 0x0000c545L,
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0x0000c7c9L, 0x0000ca53L, 0x0000cce3L, 0x0000cf7aL,
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0x0000d218L, 0x0000d4bcL, 0x0000d768L, 0x0000da1aL,
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0x0000dcd4L, 0x0000df95L, 0x0000e25eL, 0x0000e52eL,
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0x0000e806L, 0x0000eae7L, 0x0000edd0L, 0x0000f0c1L,
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0x0000f3bbL, 0x0000f6bfL, 0x0000f9cbL, 0x0000fce1L,
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0x00010000L, 0x00010329L, 0x0001065dL, 0x0001099aL,
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0x00010ce3L, 0x00011036L, 0x00011394L, 0x000116feL,
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0x00011a74L, 0x00011df6L, 0x00012184L, 0x0001251fL,
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0x000128c6L, 0x00012c7cL, 0x0001303fL, 0x00013410L,
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0x000137f0L, 0x00013bdfL, 0x00013fddL, 0x000143ebL,
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0x00014809L, 0x00014c37L, 0x00015077L, 0x000154c9L,
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0x0001592dL, 0x00015da4L, 0x0001622eL, 0x000166ccL,
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0x00016b7eL, 0x00017045L, 0x00017523L, 0x00017a17L,
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0x00017f22L, 0x00018444L, 0x00018980L, 0x00018ed5L,
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0x00019445L, 0x000199cfL, 0x00019f76L, 0x0001a53aL,
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0x0001ab1cL, 0x0001b11dL, 0x0001b73fL, 0x0001bd82L,
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0x0001c3e7L, 0x0001ca71L, 0x0001d11fL, 0x0001d7f4L,
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0x0001def1L, 0x0001e618L, 0x0001ed6aL, 0x0001f4e8L,
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0x0001fc96L, 0x00020473L, 0x00020c84L, 0x000214c9L,
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0x00021d44L, 0x000225f9L, 0x00022ee9L, 0x00023818L,
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0x00024187L, 0x00024b3aL, 0x00025534L, 0x00025f78L,
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0x00026a0aL, 0x000274edL, 0x00028026L, 0x00028bb8L,
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0x000297a8L, 0x0002a3fbL, 0x0002b0b5L, 0x0002bdddL,
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0x0002cb79L, 0x0002d98eL, 0x0002e823L, 0x0002f740L,
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0x000306ecL, 0x00031730L, 0x00032816L, 0x000339a6L,
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0x00034bebL, 0x00035ef2L, 0x000372c6L, 0x00038776L,
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0x00039d11L, 0x0003b3a6L, 0x0003cb48L, 0x0003e40aL,
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0x0003fe02L, 0x00041949L, 0x000435f7L, 0x0004542bL,
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0x00047405L, 0x000495a9L, 0x0004b940L, 0x0004def6L,
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0x00050700L, 0x00053196L, 0x00055ef9L, 0x00058f75L,
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0x0005c35dL, 0x0005fb14L, 0x00063709L, 0x000677c0L,
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0x0006bdd0L, 0x000709ecL, 0x00075ce6L, 0x0007b7bbL,
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0x00081b98L, 0x000889e9L, 0x0009046eL, 0x00098d4dL,
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0x000a2736L, 0x000ad593L, 0x000b9cc6L, 0x000c828aL,
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0x000d8e82L, 0x000ecb1bL, 0x001046eaL, 0x00121703L,
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0x00145b00L, 0x0017448dL, 0x001b2672L, 0x002095afL,
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0x0028bc49L, 0x0036519aL, 0x00517bb6L, 0x00a2f8fdL,
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0x46d3eab2L,
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};
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/* 257-value table of atan.
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*
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* atan_tbl[0] is atan(0.0) and atan_tbl[256] is atan(1).
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* The angles are radians in CoglFixed truncated to 16-bit (they're
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* all less than one)
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*/
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static const guint16 atan_tbl[] =
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{
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0x0000, 0x00FF, 0x01FF, 0x02FF, 0x03FF, 0x04FF, 0x05FF, 0x06FF,
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0x07FF, 0x08FF, 0x09FE, 0x0AFE, 0x0BFD, 0x0CFD, 0x0DFC, 0x0EFB,
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0x0FFA, 0x10F9, 0x11F8, 0x12F7, 0x13F5, 0x14F3, 0x15F2, 0x16F0,
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0x17EE, 0x18EB, 0x19E9, 0x1AE6, 0x1BE3, 0x1CE0, 0x1DDD, 0x1ED9,
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0x1FD5, 0x20D1, 0x21CD, 0x22C8, 0x23C3, 0x24BE, 0x25B9, 0x26B3,
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0x27AD, 0x28A7, 0x29A1, 0x2A9A, 0x2B93, 0x2C8B, 0x2D83, 0x2E7B,
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0x2F72, 0x306A, 0x3160, 0x3257, 0x334D, 0x3442, 0x3538, 0x362D,
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0x3721, 0x3815, 0x3909, 0x39FC, 0x3AEF, 0x3BE2, 0x3CD4, 0x3DC5,
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0x3EB6, 0x3FA7, 0x4097, 0x4187, 0x4277, 0x4365, 0x4454, 0x4542,
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0x462F, 0x471C, 0x4809, 0x48F5, 0x49E0, 0x4ACB, 0x4BB6, 0x4CA0,
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0x4D89, 0x4E72, 0x4F5B, 0x5043, 0x512A, 0x5211, 0x52F7, 0x53DD,
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0x54C2, 0x55A7, 0x568B, 0x576F, 0x5852, 0x5934, 0x5A16, 0x5AF7,
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0x5BD8, 0x5CB8, 0x5D98, 0x5E77, 0x5F55, 0x6033, 0x6110, 0x61ED,
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0x62C9, 0x63A4, 0x647F, 0x6559, 0x6633, 0x670C, 0x67E4, 0x68BC,
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0x6993, 0x6A6A, 0x6B40, 0x6C15, 0x6CEA, 0x6DBE, 0x6E91, 0x6F64,
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0x7036, 0x7108, 0x71D9, 0x72A9, 0x7379, 0x7448, 0x7516, 0x75E4,
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0x76B1, 0x777E, 0x7849, 0x7915, 0x79DF, 0x7AA9, 0x7B72, 0x7C3B,
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0x7D03, 0x7DCA, 0x7E91, 0x7F57, 0x801C, 0x80E1, 0x81A5, 0x8269,
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0x832B, 0x83EE, 0x84AF, 0x8570, 0x8630, 0x86F0, 0x87AF, 0x886D,
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0x892A, 0x89E7, 0x8AA4, 0x8B5F, 0x8C1A, 0x8CD5, 0x8D8E, 0x8E47,
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0x8F00, 0x8FB8, 0x906F, 0x9125, 0x91DB, 0x9290, 0x9345, 0x93F9,
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0x94AC, 0x955F, 0x9611, 0x96C2, 0x9773, 0x9823, 0x98D2, 0x9981,
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0x9A2F, 0x9ADD, 0x9B89, 0x9C36, 0x9CE1, 0x9D8C, 0x9E37, 0x9EE0,
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0x9F89, 0xA032, 0xA0DA, 0xA181, 0xA228, 0xA2CE, 0xA373, 0xA418,
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0xA4BC, 0xA560, 0xA602, 0xA6A5, 0xA746, 0xA7E8, 0xA888, 0xA928,
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0xA9C7, 0xAA66, 0xAB04, 0xABA1, 0xAC3E, 0xACDB, 0xAD76, 0xAE11,
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0xAEAC, 0xAF46, 0xAFDF, 0xB078, 0xB110, 0xB1A7, 0xB23E, 0xB2D5,
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0xB36B, 0xB400, 0xB495, 0xB529, 0xB5BC, 0xB64F, 0xB6E2, 0xB773,
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0xB805, 0xB895, 0xB926, 0xB9B5, 0xBA44, 0xBAD3, 0xBB61, 0xBBEE,
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0xBC7B, 0xBD07, 0xBD93, 0xBE1E, 0xBEA9, 0xBF33, 0xBFBC, 0xC046,
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0xC0CE, 0xC156, 0xC1DD, 0xC264, 0xC2EB, 0xC371, 0xC3F6, 0xC47B,
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0xC4FF, 0xC583, 0xC606, 0xC689, 0xC70B, 0xC78D, 0xC80E, 0xC88F,
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0xC90F
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};
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/* look up table for square root */
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static const CoglFixed sqrt_tbl[] =
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{
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0x00000000L, 0x00010000L, 0x00016A0AL, 0x0001BB68L,
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0x00020000L, 0x00023C6FL, 0x00027312L, 0x0002A550L,
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0x0002D414L, 0x00030000L, 0x0003298BL, 0x0003510EL,
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0x000376CFL, 0x00039B05L, 0x0003BDDDL, 0x0003DF7CL,
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0x00040000L, 0x00041F84L, 0x00043E1EL, 0x00045BE1L,
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0x000478DEL, 0x00049524L, 0x0004B0BFL, 0x0004CBBCL,
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0x0004E624L, 0x00050000L, 0x00051959L, 0x00053237L,
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0x00054AA0L, 0x0005629AL, 0x00057A2BL, 0x00059159L,
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0x0005A828L, 0x0005BE9CL, 0x0005D4B9L, 0x0005EA84L,
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0x00060000L, 0x00061530L, 0x00062A17L, 0x00063EB8L,
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0x00065316L, 0x00066733L, 0x00067B12L, 0x00068EB4L,
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0x0006A21DL, 0x0006B54DL, 0x0006C847L, 0x0006DB0CL,
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0x0006ED9FL, 0x00070000L, 0x00071232L, 0x00072435L,
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0x0007360BL, 0x000747B5L, 0x00075935L, 0x00076A8CL,
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0x00077BBBL, 0x00078CC2L, 0x00079DA3L, 0x0007AE60L,
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0x0007BEF8L, 0x0007CF6DL, 0x0007DFBFL, 0x0007EFF0L,
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0x00080000L, 0x00080FF0L, 0x00081FC1L, 0x00082F73L,
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0x00083F08L, 0x00084E7FL, 0x00085DDAL, 0x00086D18L,
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|
0x00087C3BL, 0x00088B44L, 0x00089A32L, 0x0008A906L,
|
|
0x0008B7C2L, 0x0008C664L, 0x0008D4EEL, 0x0008E361L,
|
|
0x0008F1BCL, 0x00090000L, 0x00090E2EL, 0x00091C45L,
|
|
0x00092A47L, 0x00093834L, 0x0009460CL, 0x000953CFL,
|
|
0x0009617EL, 0x00096F19L, 0x00097CA1L, 0x00098A16L,
|
|
0x00099777L, 0x0009A4C6L, 0x0009B203L, 0x0009BF2EL,
|
|
0x0009CC47L, 0x0009D94FL, 0x0009E645L, 0x0009F32BL,
|
|
0x000A0000L, 0x000A0CC5L, 0x000A1979L, 0x000A261EL,
|
|
0x000A32B3L, 0x000A3F38L, 0x000A4BAEL, 0x000A5816L,
|
|
0x000A646EL, 0x000A70B8L, 0x000A7CF3L, 0x000A8921L,
|
|
0x000A9540L, 0x000AA151L, 0x000AAD55L, 0x000AB94BL,
|
|
0x000AC534L, 0x000AD110L, 0x000ADCDFL, 0x000AE8A1L,
|
|
0x000AF457L, 0x000B0000L, 0x000B0B9DL, 0x000B172DL,
|
|
0x000B22B2L, 0x000B2E2BL, 0x000B3998L, 0x000B44F9L,
|
|
0x000B504FL, 0x000B5B9AL, 0x000B66D9L, 0x000B720EL,
|
|
0x000B7D37L, 0x000B8856L, 0x000B936AL, 0x000B9E74L,
|
|
0x000BA973L, 0x000BB467L, 0x000BBF52L, 0x000BCA32L,
|
|
0x000BD508L, 0x000BDFD5L, 0x000BEA98L, 0x000BF551L,
|
|
0x000C0000L, 0x000C0AA6L, 0x000C1543L, 0x000C1FD6L,
|
|
0x000C2A60L, 0x000C34E1L, 0x000C3F59L, 0x000C49C8L,
|
|
0x000C542EL, 0x000C5E8CL, 0x000C68E0L, 0x000C732DL,
|
|
0x000C7D70L, 0x000C87ACL, 0x000C91DFL, 0x000C9C0AL,
|
|
0x000CA62CL, 0x000CB047L, 0x000CBA59L, 0x000CC464L,
|
|
0x000CCE66L, 0x000CD861L, 0x000CE254L, 0x000CEC40L,
|
|
0x000CF624L, 0x000D0000L, 0x000D09D5L, 0x000D13A2L,
|
|
0x000D1D69L, 0x000D2727L, 0x000D30DFL, 0x000D3A90L,
|
|
0x000D4439L, 0x000D4DDCL, 0x000D5777L, 0x000D610CL,
|
|
0x000D6A9AL, 0x000D7421L, 0x000D7DA1L, 0x000D871BL,
|
|
0x000D908EL, 0x000D99FAL, 0x000DA360L, 0x000DACBFL,
|
|
0x000DB618L, 0x000DBF6BL, 0x000DC8B7L, 0x000DD1FEL,
|
|
0x000DDB3DL, 0x000DE477L, 0x000DEDABL, 0x000DF6D8L,
|
|
0x000E0000L, 0x000E0922L, 0x000E123DL, 0x000E1B53L,
|
|
0x000E2463L, 0x000E2D6DL, 0x000E3672L, 0x000E3F70L,
|
|
0x000E4869L, 0x000E515DL, 0x000E5A4BL, 0x000E6333L,
|
|
0x000E6C16L, 0x000E74F3L, 0x000E7DCBL, 0x000E869DL,
|
|
0x000E8F6BL, 0x000E9832L, 0x000EA0F5L, 0x000EA9B2L,
|
|
0x000EB26BL, 0x000EBB1EL, 0x000EC3CBL, 0x000ECC74L,
|
|
0x000ED518L, 0x000EDDB7L, 0x000EE650L, 0x000EEEE5L,
|
|
0x000EF775L, 0x000F0000L, 0x000F0886L, 0x000F1107L,
|
|
0x000F1984L, 0x000F21FCL, 0x000F2A6FL, 0x000F32DDL,
|
|
0x000F3B47L, 0x000F43ACL, 0x000F4C0CL, 0x000F5468L,
|
|
0x000F5CBFL, 0x000F6512L, 0x000F6D60L, 0x000F75AAL,
|
|
0x000F7DEFL, 0x000F8630L, 0x000F8E6DL, 0x000F96A5L,
|
|
0x000F9ED9L, 0x000FA709L, 0x000FAF34L, 0x000FB75BL,
|
|
0x000FBF7EL, 0x000FC79DL, 0x000FCFB7L, 0x000FD7CEL,
|
|
0x000FDFE0L, 0x000FE7EEL, 0x000FEFF8L, 0x000FF7FEL,
|
|
0x00100000L,
|
|
};
|
|
|
|
/* the difference of the angle for two adjacent values in the
|
|
* sin_tbl table, expressed as CoglFixed number
|
|
*/
|
|
static const int sin_tbl_size = G_N_ELEMENTS (sin_tbl) - 1;
|
|
|
|
static const double _magic = 68719476736.0 * 1.5;
|
|
|
|
/* Where in the 64 bits of double is the mantissa.
|
|
*
|
|
* FIXME - this should go inside the configure.ac
|
|
*/
|
|
#if (__FLOAT_WORD_ORDER == 1234)
|
|
#define _COGL_MAN 0
|
|
#elif (__FLOAT_WORD_ORDER == 4321)
|
|
#define _COGL_MAN 1
|
|
#else
|
|
#define COGL_NO_FAST_CONVERSIONS
|
|
#endif
|
|
|
|
/*
|
|
* cogl_double_to_fixed :
|
|
* @value: value to be converted
|
|
*
|
|
* A fast conversion from double precision floating to fixed point
|
|
*
|
|
* Return value: Fixed point representation of the value
|
|
*/
|
|
CoglFixed
|
|
cogl_double_to_fixed (double val)
|
|
{
|
|
#ifdef COGL_NO_FAST_CONVERSIONS
|
|
return (CoglFixed) (val * (double) COGL_FIXED_1);
|
|
#else
|
|
union {
|
|
double d;
|
|
unsigned int i[2];
|
|
} dbl;
|
|
|
|
dbl.d = val;
|
|
dbl.d = dbl.d + _magic;
|
|
|
|
return dbl.i[_COGL_MAN];
|
|
#endif
|
|
}
|
|
|
|
/*
|
|
* cogl_double_to_int :
|
|
* @value: value to be converted
|
|
*
|
|
* A fast conversion from doulbe precision floatint point to int;
|
|
* used this instead of casting double/float to int.
|
|
*
|
|
* Return value: Integer part of the double
|
|
*/
|
|
int
|
|
cogl_double_to_int (double val)
|
|
{
|
|
#ifdef COGL_NO_FAST_CONVERSIONS
|
|
return (int) (val);
|
|
#else
|
|
union {
|
|
double d;
|
|
unsigned int i[2];
|
|
} dbl;
|
|
|
|
dbl.d = val;
|
|
dbl.d = dbl.d + _magic;
|
|
|
|
return ((int) dbl.i[_COGL_MAN]) >> 16;
|
|
#endif
|
|
}
|
|
|
|
unsigned int
|
|
cogl_double_to_uint (double val)
|
|
{
|
|
#ifdef COGL_NO_FAST_CONVERSIONS
|
|
return (unsigned int)(val);
|
|
#else
|
|
union {
|
|
double d;
|
|
unsigned int i[2];
|
|
} dbl;
|
|
|
|
dbl.d = val;
|
|
dbl.d = dbl.d + _magic;
|
|
|
|
return (dbl.i[_COGL_MAN]) >> 16;
|
|
#endif
|
|
}
|
|
|
|
#undef _COGL_MAN
|
|
|
|
CoglFixed
|
|
cogl_fixed_sin (CoglFixed angle)
|
|
{
|
|
int sign = 1, indx1, indx2;
|
|
CoglFixed low, high;
|
|
CoglFixed p1, p2;
|
|
CoglFixed d1, d2;
|
|
|
|
/* convert negative angle to positive + sign */
|
|
if ((int) angle < 0)
|
|
{
|
|
sign = -sign;
|
|
angle = -angle;
|
|
}
|
|
|
|
/* reduce to <0, 2*pi) */
|
|
angle = angle % COGL_FIXED_2_PI;
|
|
|
|
/* reduce to first quadrant and sign */
|
|
if (angle > COGL_FIXED_PI)
|
|
{
|
|
sign = -sign;
|
|
|
|
if (angle > COGL_FIXED_PI + COGL_FIXED_PI_2)
|
|
{
|
|
/* fourth qudrant */
|
|
angle = COGL_FIXED_2_PI - angle;
|
|
}
|
|
else
|
|
{
|
|
/* third quadrant */
|
|
angle -= COGL_FIXED_PI;
|
|
}
|
|
}
|
|
else
|
|
{
|
|
if (angle > COGL_FIXED_PI_2)
|
|
{
|
|
/* second quadrant */
|
|
angle = COGL_FIXED_PI - angle;
|
|
}
|
|
}
|
|
|
|
/* Calculate indices of the two nearest values in our table
|
|
* and return weighted average.
|
|
*
|
|
* We multiple first than divide to preserve precision. Since
|
|
* angle is in the first quadrant, angle * SIN_TBL_SIZE (=256)
|
|
* can't overflow.
|
|
*
|
|
* Handle the end of the table gracefully
|
|
*/
|
|
indx1 = (angle * sin_tbl_size) / COGL_FIXED_PI_2;
|
|
|
|
if (indx1 == sin_tbl_size)
|
|
{
|
|
indx2 = indx1;
|
|
indx1 = indx2 - 1;
|
|
}
|
|
else
|
|
{
|
|
indx2 = indx1 + 1;
|
|
}
|
|
|
|
low = sin_tbl[indx1];
|
|
high = sin_tbl[indx2];
|
|
|
|
/* Again multiply the divide; no danger of overflow */
|
|
p1 = (indx1 * COGL_FIXED_PI_2) / sin_tbl_size;
|
|
p2 = (indx2 * COGL_FIXED_PI_2) / sin_tbl_size;
|
|
d1 = angle - p1;
|
|
d2 = p2 - angle;
|
|
|
|
angle = ((low * d2 + high * d1) / (p2 - p1));
|
|
|
|
if (sign < 0)
|
|
angle = -angle;
|
|
|
|
return angle;
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_angle_sin (CoglAngle angle)
|
|
{
|
|
int sign = 1;
|
|
CoglFixed result;
|
|
|
|
/* reduce negative angle to positive + sign */
|
|
if (angle < 0)
|
|
{
|
|
sign = -sign;
|
|
angle = -angle;
|
|
}
|
|
|
|
/* reduce to <0, 2*pi) */
|
|
angle &= 0x3ff;
|
|
|
|
/* reduce to first quadrant and sign */
|
|
if (angle > 512)
|
|
{
|
|
sign = -sign;
|
|
|
|
if (angle > 768)
|
|
{
|
|
/* fourth qudrant */
|
|
angle = 1024 - angle;
|
|
}
|
|
else
|
|
{
|
|
/* third quadrant */
|
|
angle -= 512;
|
|
}
|
|
}
|
|
else
|
|
{
|
|
if (angle > 256)
|
|
{
|
|
/* second quadrant */
|
|
angle = 512 - angle;
|
|
}
|
|
}
|
|
|
|
result = sin_tbl[angle];
|
|
|
|
if (sign < 0)
|
|
result = -result;
|
|
|
|
return result;
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_tan (CoglFixed angle)
|
|
{
|
|
return cogl_angle_tan (COGL_ANGLE_FROM_DEGX (angle));
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_angle_tan (CoglAngle angle)
|
|
{
|
|
int sign = 1;
|
|
CoglFixed result;
|
|
|
|
/* reduce negative angle to positive + sign */
|
|
if (angle < 0)
|
|
{
|
|
sign = -sign;
|
|
angle = -angle;
|
|
}
|
|
|
|
/* reduce to <0, pi) */
|
|
angle &= 0x1ff;
|
|
|
|
/* reduce to first quadrant and sign */
|
|
if (angle > 256)
|
|
{
|
|
sign = -sign;
|
|
angle = 512 - angle;
|
|
}
|
|
|
|
result = tan_tbl[angle];
|
|
|
|
if (sign < 0)
|
|
result = -result;
|
|
|
|
return result;
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_atan (CoglFixed x)
|
|
{
|
|
gboolean negative = FALSE;
|
|
CoglFixed angle;
|
|
|
|
if (x < 0)
|
|
{
|
|
negative = TRUE;
|
|
x = -x;
|
|
}
|
|
|
|
if (x > COGL_FIXED_1)
|
|
{
|
|
/* if x > 1 then atan(x) = pi/2 - atan(1/x) */
|
|
angle = COGL_FIXED_PI / 2
|
|
- atan_tbl[COGL_FIXED_DIV (COGL_FIXED_1, x) >> 8];
|
|
}
|
|
else
|
|
angle = atan_tbl[x >> 8];
|
|
|
|
return negative ? -angle : angle;
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_atan2 (CoglFixed y, CoglFixed x)
|
|
{
|
|
CoglFixed angle;
|
|
|
|
if (x == 0)
|
|
angle = y >= 0 ? COGL_FIXED_PI_2 : -COGL_FIXED_PI_2;
|
|
else
|
|
{
|
|
angle = cogl_fixed_atan (COGL_FIXED_DIV (y, x));
|
|
|
|
if (x < 0)
|
|
angle += y >= 0 ? COGL_FIXED_PI : -COGL_FIXED_PI;
|
|
}
|
|
|
|
return angle;
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_sqrt (CoglFixed x)
|
|
{
|
|
/* The idea for this comes from the Alegro library, exploiting the
|
|
* fact that,
|
|
* sqrt (x) = sqrt (x/d) * sqrt (d);
|
|
*
|
|
* For d == 2^(n):
|
|
*
|
|
* sqrt (x) = sqrt (x/2^(2n)) * 2^n
|
|
*
|
|
* By locating suitable n for given x such that x >> 2n is in <0,255>
|
|
* we can use a LUT of precomputed values.
|
|
*
|
|
* This algorithm provides both good performance and precision;
|
|
* on ARM this function is about 5 times faster than c-lib sqrt,
|
|
* whilst producing errors < 1%.
|
|
*/
|
|
int t = 0;
|
|
int sh = 0;
|
|
unsigned int mask = 0x40000000;
|
|
unsigned fract = x & 0x0000ffff;
|
|
unsigned int d1, d2;
|
|
CoglFixed v1, v2;
|
|
|
|
if (x <= 0)
|
|
return 0;
|
|
|
|
if (x > COGL_FIXED_255 || x < COGL_FIXED_1)
|
|
{
|
|
/*
|
|
* Find the highest bit set
|
|
*/
|
|
#if __arm__
|
|
/* This actually requires at least arm v5, but gcc does not seem
|
|
* to set the architecture defines correctly, and it is I think
|
|
* very unlikely that anyone will want to use clutter on anything
|
|
* less than v5.
|
|
*/
|
|
int bit;
|
|
__asm__ ("clz %0, %1\n"
|
|
"rsb %0, %0, #31\n"
|
|
:"=r"(bit)
|
|
:"r" (x));
|
|
|
|
/* make even (2n) */
|
|
bit &= 0xfffffffe;
|
|
#else
|
|
/* TODO -- add i386 branch using bshr
|
|
*
|
|
* NB: it's been said that the bshr instruction is poorly implemented
|
|
* and that it is possible to write a faster code in C using binary
|
|
* search -- at some point we should explore this
|
|
*/
|
|
int bit = 30;
|
|
while (bit >= 0)
|
|
{
|
|
if (x & mask)
|
|
break;
|
|
|
|
mask = (mask >> 1 | mask >> 2);
|
|
bit -= 2;
|
|
}
|
|
#endif
|
|
|
|
/* now bit indicates the highest bit set; there are two scenarios
|
|
*
|
|
* 1) bit < 23: Our number is smaller so we shift it left to maximase
|
|
* precision (< 16 really, since <16,23> never goes
|
|
* through here.
|
|
*
|
|
* 2) bit > 23: our number is above the table, so we shift right
|
|
*/
|
|
|
|
sh = ((bit - 22) >> 1);
|
|
if (bit >= 8)
|
|
t = (x >> (16 - 22 + bit));
|
|
else
|
|
t = (x << (22 - 16 - bit));
|
|
}
|
|
else
|
|
{
|
|
t = COGL_FIXED_TO_INT (x);
|
|
}
|
|
|
|
/* Do a weighted average of the two nearest values */
|
|
v1 = sqrt_tbl[t];
|
|
v2 = sqrt_tbl[t+1];
|
|
|
|
/*
|
|
* 12 is fairly arbitrary -- we want integer that is not too big to cost
|
|
* us precision
|
|
*/
|
|
d1 = (unsigned)(fract) >> 12;
|
|
d2 = ((unsigned)COGL_FIXED_1 >> 12) - d1;
|
|
|
|
x = ((v1*d2) + (v2*d1))/(COGL_FIXED_1 >> 12);
|
|
|
|
if (sh > 0)
|
|
x = x << sh;
|
|
else if (sh < 0)
|
|
x = x >> -sh;
|
|
|
|
return x;
|
|
}
|
|
|
|
/**
|
|
* cogl_sqrti:
|
|
* @x: integer value
|
|
*
|
|
* Very fast fixed point implementation of square root for integers.
|
|
*
|
|
* This function is at least 6x faster than clib sqrt() on x86, and (this is
|
|
* not a typo!) about 500x faster on ARM without FPU. It's error is < 5%
|
|
* for arguments < %COGL_SQRTI_ARG_5_PERCENT and < 10% for arguments <
|
|
* %COGL_SQRTI_ARG_10_PERCENT. The maximum argument that can be passed to
|
|
* this function is COGL_SQRTI_ARG_MAX.
|
|
*
|
|
* Return value: integer square root.
|
|
*
|
|
*
|
|
* Since: 0.2
|
|
*/
|
|
int
|
|
cogl_sqrti (int number)
|
|
{
|
|
#if defined __SSE2__
|
|
/* The GCC built-in with SSE2 (sqrtsd) is up to twice as fast as
|
|
* the pure integer code below. It is also more accurate.
|
|
*/
|
|
return __builtin_sqrt (number);
|
|
#else
|
|
/* This is a fixed point implementation of the Quake III sqrt algorithm,
|
|
* described, for example, at
|
|
* http://www.codemaestro.com/reviews/review00000105.html
|
|
*
|
|
* While the original QIII is extremely fast, the use of floating division
|
|
* and multiplication makes it perform very on arm processors without FPU.
|
|
*
|
|
* The key to successfully replacing the floating point operations with
|
|
* fixed point is in the choice of the fixed point format. The QIII
|
|
* algorithm does not calculate the square root, but its reciprocal ('y'
|
|
* below), which is only at the end turned to the inverse value. In order
|
|
* for the algorithm to produce satisfactory results, the reciprocal value
|
|
* must be represented with sufficient precission; the 16.16 we use
|
|
* elsewhere in clutter is not good enough, and 10.22 is used instead.
|
|
*/
|
|
CoglFixed x;
|
|
guint32 y_1; /* 10.22 fixed point */
|
|
guint32 f = 0x600000; /* '1.5' as 10.22 fixed */
|
|
|
|
union
|
|
{
|
|
float f;
|
|
guint32 i;
|
|
} flt, flt2;
|
|
|
|
flt.f = number;
|
|
|
|
x = COGL_FIXED_FROM_INT (number) / 2;
|
|
|
|
/* The QIII initial estimate */
|
|
flt.i = 0x5f3759df - ( flt.i >> 1 );
|
|
|
|
/* Now, we convert the float to 10.22 fixed. We exploit the mechanism
|
|
* described at http://www.d6.com/users/checker/pdfs/gdmfp.pdf.
|
|
*
|
|
* We want 22 bit fraction; a single precission float uses 23 bit
|
|
* mantisa, so we only need to add 2^(23-22) (no need for the 1.5
|
|
* multiplier as we are only dealing with positive numbers).
|
|
*
|
|
* Note: we have to use two separate variables here -- for some reason,
|
|
* if we try to use just the flt variable, gcc on ARM optimises the whole
|
|
* addition out, and it all goes pear shape, since without it, the bits
|
|
* in the float will not be correctly aligned.
|
|
*/
|
|
flt2.f = flt.f + 2.0;
|
|
flt2.i &= 0x7FFFFF;
|
|
|
|
/* Now we correct the estimate */
|
|
y_1 = (flt2.i >> 11) * (flt2.i >> 11);
|
|
y_1 = (y_1 >> 8) * (x >> 8);
|
|
|
|
y_1 = f - y_1;
|
|
flt2.i = (flt2.i >> 11) * (y_1 >> 11);
|
|
|
|
/* If the original argument is less than 342, we do another
|
|
* iteration to improve precission (for arguments >= 342, the single
|
|
* iteration produces generally better results).
|
|
*/
|
|
if (x < 171)
|
|
{
|
|
y_1 = (flt2.i >> 11) * (flt2.i >> 11);
|
|
y_1 = (y_1 >> 8) * (x >> 8);
|
|
|
|
y_1 = f - y_1;
|
|
flt2.i = (flt2.i >> 11) * (y_1 >> 11);
|
|
}
|
|
|
|
/* Invert, round and convert from 10.22 to an integer
|
|
* 0x1e3c68 is a magical rounding constant that produces slightly
|
|
* better results than 0x200000.
|
|
*/
|
|
return (number * flt2.i + 0x1e3c68) >> 22;
|
|
#endif
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_mul (CoglFixed a,
|
|
CoglFixed b)
|
|
{
|
|
#ifdef __arm__
|
|
/* This provides about 12% speedeup on the gcc -O2 optimised
|
|
* C version
|
|
*
|
|
* Based on code found in the following thread:
|
|
* http://lists.mplayerhq.hu/pipermail/ffmpeg-devel/2006-August/014405.html
|
|
*/
|
|
int res_low, res_hi;
|
|
|
|
__asm__ ("smull %0, %1, %2, %3 \n"
|
|
"mov %0, %0, lsr %4 \n"
|
|
"add %1, %0, %1, lsl %5 \n"
|
|
: "=r"(res_hi), "=r"(res_low) \
|
|
: "r"(a), "r"(b), "i"(COGL_FIXED_Q), "i"(32 - COGL_FIXED_Q));
|
|
|
|
return (CoglFixed) res_low;
|
|
#else
|
|
gint64 r = (gint64) a * (gint64) b;
|
|
|
|
return (CoglFixed) (r >> COGL_FIXED_Q);
|
|
#endif
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_div (CoglFixed a,
|
|
CoglFixed b)
|
|
{
|
|
return (CoglFixed) ((((gint64) a) << COGL_FIXED_Q) / b);
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_mul_div (CoglFixed a,
|
|
CoglFixed b,
|
|
CoglFixed c)
|
|
{
|
|
CoglFixed ab = cogl_fixed_mul (a, b);
|
|
CoglFixed quo = cogl_fixed_div (ab, c);
|
|
|
|
return quo;
|
|
}
|
|
|
|
/*
|
|
* The log2x() and pow2x() functions
|
|
*
|
|
* The implementation of the log2x() and pow2x() exploits the
|
|
* well-documented fact that the exponent part of IEEE floating
|
|
* number provides a good estimate of log2 of that number, while
|
|
* the mantissa serves as a good error-correction.
|
|
*
|
|
* The implementation here uses a quadratic error correction as
|
|
* described by Ian Stephenson at:
|
|
* http://www.dctsystems.co.uk/Software/power.html.
|
|
*/
|
|
|
|
CoglFixed
|
|
cogl_fixed_log2 (unsigned int x)
|
|
{
|
|
/* Note: we could easily have a version for CoglFixed x, but the int
|
|
* precision is enough for the current purposes.
|
|
*/
|
|
union
|
|
{
|
|
float f;
|
|
CoglFixed i;
|
|
} flt;
|
|
|
|
CoglFixed magic = 0x58bb;
|
|
CoglFixed y;
|
|
|
|
/*
|
|
* Convert x to float, then extract exponent.
|
|
*
|
|
* We want the result to be 16.16 fixed, so we shift (23-16) bits only
|
|
*/
|
|
flt.f = x;
|
|
flt.i >>= 7;
|
|
flt.i -= COGL_FIXED_FROM_INT (127);
|
|
|
|
y = COGL_FIXED_FRACTION (flt.i);
|
|
|
|
y = COGL_FIXED_MUL ((y - COGL_FIXED_MUL (y, y)), magic);
|
|
|
|
return flt.i + y;
|
|
}
|
|
|
|
unsigned int
|
|
cogl_fixed_pow2 (CoglFixed x)
|
|
{
|
|
/* Note: we could easily have a version that produces CoglFixed result,
|
|
* but the range would be limited to x < 15, and the int precision
|
|
* is enough for the current purposes.
|
|
*/
|
|
|
|
union
|
|
{
|
|
float f;
|
|
guint32 i;
|
|
} flt;
|
|
|
|
CoglFixed magic = 0x56f7;
|
|
CoglFixed y;
|
|
|
|
flt.i = x;
|
|
|
|
/*
|
|
* Reverse of the log2x function -- convert the fixed value to a suitable
|
|
* floating point exponent, and mantisa adjusted with quadratic error
|
|
* correction y.
|
|
*/
|
|
y = COGL_FIXED_FRACTION (x);
|
|
y = COGL_FIXED_MUL ((y - COGL_FIXED_MUL (y, y)), magic);
|
|
|
|
/* Shift the exponent into it's position in the floating point
|
|
* representation; as our number is not int but 16.16 fixed, shift only
|
|
* by (23 - 16)
|
|
*/
|
|
flt.i += (COGL_FIXED_FROM_INT (127) - y);
|
|
flt.i <<= 7;
|
|
|
|
return COGL_FLOAT_TO_UINT (flt.f);
|
|
}
|
|
|
|
unsigned int
|
|
cogl_fixed_pow (unsigned int x,
|
|
CoglFixed y)
|
|
{
|
|
return cogl_fixed_pow2 (COGL_FIXED_MUL (y, cogl_fixed_log2 (x)));
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_angle_cos (CoglAngle angle)
|
|
{
|
|
CoglAngle a = angle + 256;
|
|
|
|
return cogl_angle_sin (a);
|
|
}
|
|
|
|
CoglFixed
|
|
cogl_fixed_cos (CoglFixed angle)
|
|
{
|
|
CoglFixed a = angle + COGL_FIXED_PI_2;
|
|
|
|
return cogl_fixed_sin (a);
|
|
}
|