6ed34b51-bb65-4fd0-b2b8-45aba59c24ae 41 4 5 decimal

&[DATE] &[TIME] - &[FILENAME]

1 Random 1 el 0.210661

1 Random 1 el Un-nest ≡

Unform ...  -1 < rnd < 1 n rnd μ n 11 line : 2 μ Random * 1 - 21 line :

Mathcad: [70000, 1000 => 4.6 sec]

20005012 mat 9.5 min * ≡ 500010012 mat # > 21 mat

t0 1 time :

Map kmax 2000 : kkmax 50 : XY kmax 2 el 0 : k 1 : k kmax ≤ Yseed 1 Random 1 el : Xseed 1 Random 1 el : Y Yseed : X Xseed : distance 1 : kk 1 : distance 106 -^≥ (k kmax ≤ (& (kk kkmax ≤ (& (Y Y 12 π * / 2 π * X * sin * + eval : X X Y + : Y Y 1 mod : X X 1 mod : Y Y 1 + Y 0 ≤ Y cases : X X 1 + X 0 ≤ X cases : XY k 1 el X : XY k 2 el Y : k k 1 + : kk kk 1 + : distance Xseed X - (2^Yseed Y - (2^+ : 111 line while 81 line while XY 61 line :

Map Map :

1 time t0 - min 9.8

Size 100 : (height of image ≡ kmax Map rows : (N'r colored pix ≡ 21 line

R k 1 kmax range i Size Map k 2 el * Ceil : j 2 Size * Map k 1 el * Ceil : R i j el 255 1.75 π * 2 / k kmax / * cos (2^* : 31 line for R 21 line :

G k 1 kmax range i Size Map k 2 el * Ceil : j 2 Size * Map k 1 el * Ceil : G i j el 255 π k kmax / * sin (* : 31 line for G 21 line :

B k 1 kmax range i Size Map k 2 el * Ceil : j 2 Size * Map k 1 el * Ceil : B i j el 255 1.4 π * 2 / k kmax / * sin (2^* : 31 line for B 21 line :

R R : G G : B B : 31 sys

iVBORw0KGgoAAAANSUhEUgAAAMgAAABkCAYAAADDhn8LAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAB8wSURBVHhe7Z0HuNREF4a5l96kF0GkCSogoAJK770L0kGaAir4o2IBFBDpHaQXUXrvvffeu0pHkN7LbZl/J9nZTCZnkknbuyg8z/sk+WYvu3tvMuWc7yRxfP+QXVr/8UVg/0jXVzVtRlxplhLUeZyJM0venkgwL6BNrHMqsK8h4m9Yt8CkxeVAnVDyzlC9HnkJhUX/qddjgbDov3yf57JGq3Czv+bYjPCYP+Rto9GPUQLpsK7dDQ6kXgrqNG+vlUDdjLZnOoK6DUDRETv7vgbqTjkVdw6oi9Dty3/Q912ug20JpYOo1pRnYBuPijf6gXooERZ9VqeVuDNMp/GYV/ogqLvB0aQL0eGXFoNtRlxrmALUjdj9c05Qx7T883+gTqEeSMk0DYY0PdcF1DHbBr4O6hBXG2u/cP6N9noMEb7uehN17n4LbEsi7Za38aUjujZLRF6E9dgg4gqsWyC+dBRVnR4JttlhQt3ToG5EgQ3Wz4kd/XOBOk37kx1AnQEUPaH3p87/YBBDW5wHdR6f97oD6oRplY+huWXEe8/St4eAepyoC7AeTKLO6bRytwbqNJqJS8rrtNqTn/k6kT2+6dYhXVts0//jS6DuEqAIIjLC7O2dA318+nOwjaV7539AHfNPg5dAnceUmidA3S4NxzwJzMNFqXy9L6jHKlH6zqPY3RE6jWXMikqgzqNjT6DTecr/+1oh3yZlBPm7iX7t+sP/rmmOe33ufA3KnOeaAxkpsV5zk4Ft4GlI33bahSWh4Hrvpl08oIXpiLXVdBpL0XsjQR06UWOLKtf7gDrNyDVVA/vhMWfkbYOxTwIaS5fvb4K6EWPrK/+vWwxqZT5iH+qeFdQNAEXPONAjG6hjenS6qtPOtUun04wY0Uy/MA3wVNvbmJFY2ovqTtIv3kevrKzTIMreGgTqYdH6aY8ncKZ4ZW4NBnWaIetrao4XFd0X2E8q7dK0Ybp+DQdA3ORKi1Q67ecO5tP2/T2za44FFuY0oAgipYD1YPPuGvMRZVTjv0DdCdV+j5C38aRj8nbC0gqadltEXAajTY6J9G5enlA6AOp2GN3QPDRedFkMqLtF4/PfgLofUNQQ83IYqBshJYF1llZULkWEC23SgLoRYxpYW0tgFk4tjOb//h6aM70o2D6j4hE0v6T4iVL87nBQ1+HGic3kQFgq3bC3Vqo5Vekg3GRkEw86B4uwSwrpJc0x1ZBK0+AaUkJYxzQ5rw8XH7aQdMQUXuVtDzNrVjE0Y04JnZ5IUqYddhKE5W8OAHUNbMiYM2UKTNkEwrqleBE3hsmLyuq0+uOf6jRTXEjcFlmp/n0vtUqtaYMwSxJKSWGdg3oQk0bTgKIzm48cMRmsjy4EKTmsW+VSS/Nfmhv8Pq8UmrqgtE6vN8HGicNQ0kICT8bior/CDfFM+vhl2qnj/BL7A/uJJHXfKcOae7MWYxODgvkOHqDoOm6NTjv75RJKRL6/XGxUGf8BJ5LyTB8wEKUGMxUZur6G5tgMKyezGZYvPB+/rKoS2MfrrV9ruBtCt0Kh1ep680LbtJo2t4jJaNjJa4USi6NR5Rlw5jQmnV6jqTRT+bmy86N0bQR2lAro/nVOqAQC3OS3asfl7ajVauh07HLxPAOdiKzE5FrKUJGy4lR+o9xN42Qgj+Frq+u06v7gBAseUX9dUAZsCzYimXObgCKqODsKFVuq9MKlF0Tr2lnKz+FfFLHFleb6sKAZR5ItAnU7JKKiPQuLKeuV8Bit1WLSEmNjZGxTdyJ/+jgdWJeZMan2SXl7Mv5ceXs6fLamnebtdcrocba9tVC/HWLSKx10mfm6c11zEHRK+kYsSBdlT+8cgX3RDH6+zfww8aGUSzTHxxIv0BzbheQOPhzHT7aFAnGlk2hu6YOyixcf44Qpzgexr5szA47uPa8UX8KdkoNirFBurjIKVeFM8ZzCesFYoySPM3Fm6rRJtTl2e4vUZlzE2BxIH3vBWL+NhPVckfeeXtn8Myz4rQiox3lmnow9nmg+qENca2huOTrUzVrUE6LSLO45B4ohAZ7mQTqPT0+0B3U3oWtSuBiENmXbPZN1xnZ7vCWOYsw030mKe3JyTCBrBJLNpyNOU4DQLIEECkZS6yAa+kLFpkS6zU2OJFuIDqXg29x5zt1+nyj5oZ4drQdPpJRxUHQmeCGOlwYmbmVQNGXA5jpo8IZaYJvbkLWQV2BvWPfO+p6PZ713UpeC+ebbG+jr72+iL7vfQl/8eBt8DaHRaOumSTNmlzsUWBOx/qqEIejWNYLYRkg2nEnyGVJykdD0HhS5dN/TBNR/3NUI9dlWD2zrtbNBYL/flrqaNrvgwAEvqsbLzYhm94NNx1530Ke974JtBGKerDvpKUqM1DUBjjCRUOzMCji7r+QpcPKSzs9AWXDIU+UmEz6wXvtBYF26sQgoes6ZLzKCemxhZKJksWLFH9oiSMZEBrOEnoif6stut2Abu4uQgMlVwMqOGdRadQ+wpkMeMakBLa1eE0Qr4JDa6f+9rNFEqH6tF6hjorMaJmJCAikRrLOQuTBLQX9IMtgsnMpZLDsAr5G+/eYG2BbApVoPJ4j+zRyi7AzcVBv13NkQ9d36AfsCkDpXfpS36WJWy9uXo5cH2tb+8lZgHxP1WrjmOCJPXM0xjyPfZwF1N6jgW5yRxKYorf5UjJU9AVs+xqo13xAL1vx5096Tw67YM0ZyEzxbjNeM/dD+esnIui7inzJKcjsAFHVEZVNP8oi88AmeStoI6jzqXvkhsJ/ef6FB/LC7Meq9vb5OH7ipjry1m0gqtVBZpJWdB0fLJGCoJkAmSyN4Fv0RTWPfzeoGvzQyN2wS+4+dBK4oFfyRT5HkthEnv8pE9vWNLGtG50eRubSjAM1L0jZQp5ES4Ndt1WippQ2a40zRywL7Na7yp2wsPXc1lLd49LMzPbQDz2h52GFMXuREE8Kul8yC+/Z5vbgHbayF+m+pC66D8awFd8g/bwt0yNoXYNLFrEHVrv2kmTaJYGRrt8O6Ufl0WlTOcBSdxdmaho7E9d9sL6pmd9F3oa31ehYn05bngbZnVAdEB47z1sRQKEyvHWpEVRDfSZddHR1q/90D1b/UlX6BjuTSdlC3ixRPe5yCGWlYIt6Mixpe+M43LVslH1f9p7fuNVY50yk0omp07YNVxjsIq5oxzGI0TrSGY4/BPatCBGUnY/QKFJk7HK0ek599AUjamLWaYylM2+6U1DHrQZ0mU5RyZ771I5WRpubVnpp2+sKPfsV6D3T0O+dBgmjiUk4Jt2OwhZ/VglXjQnDLOuM2MelhncdfHdKjHjgnt7UeOtXZ+nSbzE4CnW69y93Qs/zx5INXI60b81JKmwL70MgihWuPaaS4sJ5C2oKSSTvBNh6ZoxST4YYReVGG6JUIfy98jL+bfPG/Ho5q+UZHPH2kf45AByFoftzdSN5Sc1JP2TbIvVoXGuxSPpRCNWIeS6z1Q51IoLhrTxm4a3nQAQhoCgl1AKIA7lou2N2Bt0e/e0XXRlP1n5/lLd2h4llJhmhlRoJpdOFb+Tzy7Wt/GLNyXEF5u2XIG/L21ciFmnbMivHKa4xIE7NOc5xS2qw5TibtCOynERgxCMsmvhPYf8V/YRA2Ds+rOWZZPbZAYB9fOGR/jW/kZAMREfni+qacSjjbCYKWBtt4GRViIRb054HoV5XRAKcVGlz8To6a4mk5CQaxa9zMvhkJno3gTpbS1ReEPVDtDmEPBTOoT1Tj3eahbwb2s0TZq6vYRP0fr0QpprbA53po7FuSeaIkuMjPhAE/s2pcAbR18Bvghc+DHnlw8KL6tZ807TSDNtYGdRriXPYaI2s/S37BW3y6mu8BKC7ovePZngg4oAPpPPAsZOPwPKyuOUBxHlu/AZgG6ufli+wR/6RePuFtvY5PcDpL6+TzPILvw8tjpcCoKALtPROhioV73+7prV3UitbAEK42sX7zZ6t3ubRDRb7dXBg2Qe0SoPjfghoFRdCuu9QckFmitN8WMZcCxo0ThmB2T+SBlN+Jh4jdnJcDMgpQWOkceNRgbE50vo3NtRmBZx3AjENzYEqyi66n8oVILvi+yS45/HzMiEVPNV+lpo1WQ92RjN0Gc9qCYVPE8s/LIVhhv4BpsxV1Z0IRRwFUi1HehSnmy1Ri2Qwc+GG1TcPyKNN4MmOBZxw6ASW/EDsXwUvnlV/aSxeCMz8XRmCqpgt7U/vBwkpI1E3rv2gNhlvBCuL/Y5Hi6zWMacrAv27l4Lu6zkUFTsqUZ42/RKq/3PmSaf5Q/5+0Z5TeEX8OvIU+g1vvS6Df30tE80M8f5soZUy8R3buX2bHLevAVi5jZBUiBlmM0XSWTjzT6YLlE4E1rxlpT1uPqYuS+s/gnIQEN96PXKwEfNGmPKsd0URGWDakbYTiU9P62Rpc/N53QqhmzlADqrlwAm995rTjcAFQfEEIwnM8H+nqTVmAbB+fGcl1OzuBlFdAbRC4A8EdCdTGAq03rJBG20lqG18ghq0pn3+um5xKkIoCRWNo9zNBKQ34UKeHIse+0We8jVzjPHiODKMUgwXUg4+GPpS3ia7qn4nRdsB9FO/WI3k/6WV9fXOHn+/J24T/PEVNRyqvi02aD9d+hpZDHqLEwPf6uP99eRvf993o75XghnIzA7NacRHMIn90ghVjZM8xQqREYMCmOuiPjhnQ2Q7Okn0iN+zA9pyTXwbqKrjgcgpItwJxbWSJWozCHoiXCac2X4uCYoCsB/TZ1Qwn1SEo/J5ygvEIXHTXlJOzzcAHmna3IOFdfGLjizTuXXfeJ8MJ9bvi/xdvm43wsAN4fFNn0eHBi9pgRJJmx759BfXw19KImPtOdMmMujGlAjwX9NHvs6AffaMZ1MZzIdALb1tRQKdJbgb/31k5yHzEPY9NpqP8/4uMQkmuKL11+z73UMLrSm/dZNRj1GLYQ9R6kP7kxm34IqBHhlaDH6DEfysXHh4J4t9U7gbIkpE6yQlufl+alv4OwYhUgsEEbNeBesMUTACALRfAsMVpBGK/ID6lYIE9bcSuw9YZ0clWCGhEpX187AjsFNIR+tE2esGrByWUnhp1MNDIE++2evG076tM2fB+O99+a9/FgI8/6af+HL4g3Bop3IRcfNCUzjEG82r6pKHhZZOxgxVvG8pGvu5UfY3idrULKTPA5RN4i02fdDsLm0OCAKOCxvkLS+Dz8dOfwem0TtCwaGphUHeC0QiDiXfbvBfGkBHD6CJ55bD7I8XSSaqbOJShHdIikZ1M0Up9DQY7Xdn6msg34qIPLncPHOPaCVxCgE9wUl5AO6RFa4uIdYd2J6QFppmgd88hCW7Asw4KUPQUPKLQx+H3lNHCCzIe92Yq5RZkjYeDIGybE2wlxThgGzjeUjUSMo0vfKM5zhq5AG0VqGdxE8iCJJIPowMy9DoTABQtsejXQqAeW8Q37xWEWTr5XVD3CrJG85JNw/xzdoF7W7H1NiKsHKfU3GwBSgqgOiJcd4Q9b3ZLJEQhnZDF3zEoekb6U/qrVXRKZZe4d0JvnSIKFFJ3BWD+rq0HEsghPL3O/IxAeJV2TrNRJ4vlCUECFF3n5WPqVCf8vndTKjt4sU6xC10tSUNC62ZzZoG4/nMJsfe47clbZr6eBMWQZfH7e9G6vFvRhjc2o6WF1ccFYFa8487NmEN93YIhUcAOcOTFEMZKEbJAPjhRXIwggqJrZDnk/GRbnV+NbuTaqf5/2feq+29sk9B7938JHLtBWIiNdKKQOL4VRwM2reJyA56zO2j1OD5Yw6gVsGMCb13Mc4Fi0FlZUB/Dz7NV+ZKF74/RtRmR7/GvmuPXdqu/rFW+98m23/kvL52BC3pJkBf2zztOSg88dTUogKIhi6eYR63i3uEvvJe/q58Kvb5DPWlz7pFQgUeTNO1u8c7D8YH99++NQq9v118sa95SM7tL3tuD1uXxTeleF7evhyKZqdwTsf9gIN+dCFbWAl6VPTAZb68ARcukA6JThI25N6GlRfSP9cq7RUL5H08OHBd6MFbTHhu86/sM+AIlx3l8n5FuxywrpF37GHUGL3Af7LcLv3vfLH/hFqDoCmvzwR4besojSq5ns0Dda9iRrPADZbqXm1oLPe+whlRsKA1GPsYK2GuX9LK19c3SSa5MdUFRGChku6io+oiwN3xTmLceT9G0m5EzQuwZgHmfTEWvP52O3nz6O9hOyB4xF2WLVO8kmDOCf/fAXM/0T7S1Qg5/4GDFO/CdId0IWthl0a/itiHinSN5GDPXthd44mWzDiiC0LkMI7Lvs3cSZI9UnyCLbQt0W2yBL0BIN6Lgo4ma4ze3xd5F4TYd+igdInFgNx2p5GWwC5u8xi4ap7Y/GkUTS/kqULQEHYZ9gTFF7o8GdRbRzijYGBlNE11TFs1GNT8thumnbo1/eSy7tEmRWog5tEHRErl2Gf8xcz+bgfI8+Q298XQa2P5vI5tvJMwhOE10ikhEkcdihx46ven0vlyywKv1wXU++CJK4NPa9VNGIrqmh1vPc9zZYtxu2H3JFPnn4MbYnCv/18j3RJu3MSNUrDpsjQ8E8dmRiwbX9uD9JP6LghCqtT0+QNEUvECG9BdY5zWDCB0ZnVcVEJvGGoXb3YadbrFlC3ZMqPQowjOZ4rVI0OxAVmL4ovPn2OZ2jaTy9k61JLo2wt3KieXt9frqjZnvVVC0F+hhXdjs9CoUMHI3WIXqaPSNhJVvK6HKN/2WDx5GPSDE/bKJ0KNiCdCDMonAdi+4WTsZqGNufJAc1N3gWYF46GHJhOhhiYTy8ZPC8XWvsQt2BZCIIR1aZ+F1gtA0GgoO8KZ0cT0uUzAi7L7epMkdcaDvSY1AJp47UJTj+Wy40g6PiidATwrpT4qn78RDj4sm0OlO2Zt+BdqcU63B3pFFW++8J4NaAYfZnlUt7dz9svqEIZb9acRvlGyX++Xc6TBw7olN0q5/09nN1P7DYOuE4o0SyQ7niFAe1RUMrtdLju6XV0+ana/Aj08zY1Mua89vF2Frdv0NkXdlVu58eLu6MsUz42lB5dF3j9/XdhS4U8FbqGOhwdFBSCfQCdolRfagja+rj23ALPf/3V+gZ12eLb7f12YUh7ZSEBuFEXRG2ioPSivTDFG25hB/LJsoXfc2RZ8f/0SjfXG0bWD/2/0tNG1OuFVL7EIhPLT4+8Hg8DnZFwmj59wtoXcfjpP3sReObachU2wz2DwYrtlZm3erPGptyq1elJBJlQC5uTG0cZTUAeH9ZbpaIGvPtISg3wvj//1oX+QUPN+mj5++7ZtKMT0kj5t1+esEUboc/AjUab483ArURfn6UEtQDxYPfGs4SLdL/keqYTQ35arG5KCNmwZrUTYXRrspcK0O3tJlCMSPl3ezpCk/YF3d0HvSMx1lKTBB3ieOBVIXpCt7CEQEd6Bs1OdjXd3vPhgndyT+Y/U/cIPH78VHD0tZ7wkJ+9Jqbyr2X+FuFX7EjUDWbTi4gYMc0Gu8gl6PuhnNJOUHRe+NDDi7aVe31RmOKHTZgwlag54d75Ed7lQ1PyFY/nekDaiL0uKvzqAO0e7UZ6D+byJ7hOJ9w743IwPnfxxQ/FfT5o9OmuPtA3Jrjs1odu4rULfCZyfagzrEzTrOp552cepufh5hOgtt47+ZAW0vgjqPPu0vo58++1unD25p/tBLq3Q69jGoE/ali/2pJ+2esDPTeI0zSuX2X4Qifj3s+Ob53Kzm42hwSQTeZtUHoTQHrkNCnrdqifeCHU1OFif8+MU1UOdxsXUaUA8VtuTYIIfD71UMPReAk4in25CQuA3DLCi6yq5M8JORWD61MO2wy+WPUmmO31shbk8otMr8tec/SQvqL3huAcXnmr+bpQT1YPHOWjVk6BWdTQIWdpOqL9ABio7Zls39JJ/XnIw3B50OU+exxxOqFY4HUy1FR5Mo95k9/NLigP6C4PCoREKdj80ta44JoKjjbmUlLPvPh4r7lTfnPRAEzxKPtzZ533NjJtY9BeqiFFgPf85rjVKAerAhbmiMnXC8mzwpYmy34Xn9XEQvGtnEMXbdr25noJ2eUJNrnQzsD/novKbtvwQ2eEK6CKRswCtYZ4YRcgLVfQOsVrhVU+8fMrKKYzeskQs2VBje7ByoB4tx9c+AuhFuj4jfHDC34WA25dqEtr+qdUEfSK0+XIfmRt3k6Hp9pcP0sp4GGzshlwaxMln1+VkAFA1hLeOxQUHONIUwqvFfoG7IM2sh4AAR+lyJFUY3/BPUefzdNLhBiD0ZtX/vbVSJwH8AUJTZ5xt6tzC1FWbWceKM/faAmCu22bmvQd0uYxr8AerPEyOb2Li4XaLb3qboq0OKmZN1PUMY1tCkNV+Pmk3ngwUeBe9DI+DOzM7DgV33NvP9MtuhLw+3BttF2NX3NVDH4NxCMEKnVvn8pzuoU487qPMPt9FXXW+h77pcR12/Mn9qk45nV2HdAkWXWSs3/ciCLw1DlwTYga6fIXUzBGhajxExcAYBUPSUT059hg7+kFWnD2lpf6E8rp7BHF/wBJw9sxia/3sRsC22Gd7c+hrqcgs1Kdq/7SVNW5szndC+Xtk1mgjf7m8O6sGARFCdwkbmbvjLLPb7neRMMZz6QlFEai5EgbxOweS3+aXRtLkl0YzZxcF2liSSchPuBNIhXRsmqaQW8iSUDmraQhmrhk0eXx/0plaGNWziSKqovYaEra3YnShA0TEt/voysL/3pxyBfegP0bfdZXl7sY3qeyosYOtwgykLy+i0xNI+eRtfOiLf9Y/o1aapzwusM1m9r1PDMU9QeIwygs0po79wav2qvQdUMsl59RsLHbLmYcVWQ2h36lNQDzbErEmviUMiUei0BoPQmrGY2+Fwcm+fgkrzwUTlNpphMX+ieaUOoBkVj/gumGO619mh/nj1uRaJpP2aNsyv/ov2t/ml5NGNbQ8G2Mnc63Pj0b3ZWee2fyfsyCK+fj6QWgkYbMu2Ttgb6AcUPcGq3ZxwMKXyKOKjSby/oXWN38SfKjthaXl5O2ZlZXk7Yk01eTtkQ83Aa4wIjzmNFhTfj6ZWP47iScfB12Bm+qd/s2cWRXOnv69rlzEJUZ+Mp9i5aSsNDzMH8+4+/ICKKJ8dbydvv9/XDHU66p57ey+VgsC5nD0ZHefo9CJ21X7n0WKsxxf6BbPVoX9iHY7Vw2I+IqlvqkN68FnlD6Op1fgnqZtMXlwusD9ueUVNG6Y6cJGSaR9mwW/OAgnHE5nb0Authv8mg1u5XwsT4oCi51z+KDWo05yJo/Z2JyjjoBW6mYRdPxyn3FwZ9+S0PmpVFTRsXQ2N5iW/+N6P7A9bV13TRqZ7mAS+dRHd5hZHk2of+B/bdHaQMnAZUAwZTsWzf5d0nJeAdBJdYhfPBKhXj23CY5QEKA4a4DUR2+6ECXVPB/ZFncqhmJeigdbOXYAIG57qdTLO8cQJZE6DQbBqNTr1uA3qSagwLMQkavojSom7wwP7ZW8NDOwXuzsisF/m9uDAPqbijX6aYytMr3RU3saXjqKq09THkpEQ9L+ZbwCHBs7+423HY0rm38ryoKtvDUT26UQ39T7qi0OVKTVPoqEuu22nVTkmh3GhNlHK3xwA6nYodWcoqFsFh595OZrPftLfz1bmqY3sfwjhcQcPip7z1sbYG6Jx3mJOGftJvJJ2T+Yo8QVuhZv9QZ1loj+SJkqnnnfQV91ugW1OKbBB+ze91jA06lscAoqmNLVhMrza2PovbHizs6AuY9F9i3vWOpPgdYcIptOiSCXhGSfiirKNMhj1opiQd6TWCkJT4s4wUKcZs6KSTmswVglAQHT57qZl35gdy/6/AFD815HYYH5O8he28Z/cYdHOXbjy/0EuNJuMZL7PnLLKlCup5P7Nqs2s+m7UtFg1VroMKMq0OKvaRWiw2RBvD/6YTaMbOXJZzOo5MLZqOvzM//09UKftIoTR/kSfEaWZRXawCIv2jaBkRPJTjgoEGDFkPZywjE2PmNValjZnOoKmStYC09y7rD4ociG+Kp51hJgPec7ccxZui+OktmPWzGKaY3pBPr+k9TBpsXsjQT1OpD13gC2i9I5eHCmrcr2PTjejJifEbQrHGe1GDcsP/7uG+n+sn2ru6K/17x3qrneCewgoCrN9IN8FSkyIEO+s8XaRPnVBaZ1GZ6Pjxli78ULZW4P0uoVFd6hC+8LcYJiALZ+uXaEt+VbY3ScnqHsAKNpiQBtvetPxNmo9piwqC+qYehOe+qYu1spcQYwW4cGAuUDZXAuPyYvV3w32g5F9yDgZ22DTJN6aGSc9ozlnneGUHp3gE/eC39IeLDs7RI2p4oZEQnEqGRhysBExH5Vu9NVpLOOXKY6BBSX2o5kVDuvaCcRd7BVFVoqfC4Nc9oIJrF1AUYOdkO7zhm3fFbOAft6gPWAEyCyJrffTLVrvRWpUeFxsZe7Vs4rNaBgoesalluoXf3+5ec9xxIMakESSukhfWFxdl4xaXTWwD8HNnDsMy7oKk08pdXuI5hhi+FqtOZIHtt3PnlEUbBPlZPy56HS48bNICq32bn3a/qTlAjBQ1IGjV5+cVh8qc4AJ8XoBqQPBHHO5FgRb3fEWu3npebgdo6IcigX05xniIE4saR8vPW/a+3y7vUDiVsRqz3L+Y/s3BN/fUw0RW49+xUH/Bw4Fhkye0Pl/AAAAAElFTkSuQmCC R G B 1 3 mat Map

Arrays R, G,B are defined that contain the amount of red, green and blue to be displayed at each pixel location.

The ceil functions in the program loops find which pixel location [i,j] corresponds to the x, y location in

Map _k,1 and in Map _k,2 . After the pixel is found, the sine and cosine functions assign the R, G, B values based

on the line number k in the matrix Map. This method assigns about the same color to pixels created about the

same time. The color functions change the colors gradually from red, to green, to blue, to magenta.

Pixels not in the Map are black because undefined elements matrix are zero by default.

]]>

Mathcad: [70000, 1000 => 4.6 sec] Reference: S.N Rasband Cahotic dynamics of nonlinear systems Wiley, New York, 1990 [section 8.5]