Nesse desafio, você precisa encontrar um pixel específico em uma fotografia (tirada com uma câmera real).
Você recebe uma tupla (R, G, B) e uma imagem e precisa retornar um ponto (x, y) na imagem que corresponda à cor RGB fornecida . A imagem pode ter vários pontos que correspondem à cor; você só precisa encontrar 1.
O desafio é que você precisa fazer isso enquanto lê o mínimo de pixels possível . Sua pontuação será o número total de pixels lidos em todos os casos de teste.
Se desejar, você pode ler a imagem inteira em uma matriz de valores RGB, desde que não faça nenhum processamento nos pixels. Eu permito isso apenas para fins de eficiência. Por exemplo, em Python, list(Image.open("image_name+".jpg").convert("RGB").getdata())
está ok.
Locais codificados não são permitidos. Seu algoritmo deve funcionar bem para mais do que apenas os casos de teste listados abaixo. Você não tem permissão para salvar dados entre os casos de teste. Eu escolhi valores RGB que aparecem com pouca freqüência ( <10
) na imagem (caso isso faça diferença no seu algoritmo). Se você estiver usando aleatoriedade no seu algoritmo, defina uma semente, para que sua pontuação seja constante.
As imagens podem ser encontradas no Github
Casos de teste:
image_name:
(r, g, b) [all possible answers]
barn:
(143,91,33) [(887,1096),(2226,1397),(2007,1402),(2161,1508),(1187,1702)]
(53,35,59) [(1999,1260)]
(20,24,27) [(1328,1087),(154,1271)]
(167,148,176) [(1748,1204)]
(137,50,7) [(596,1498)]
(116,95,94) [(1340,1123)]
(72,49,59) [(1344,857),(1345,858),(1380,926),(1405,974),(1480,1117)]
(211,163,175) [(1963,745)]
(30,20,0) [(1609,1462),(1133,1477),(1908,1632)]
(88,36,23) [(543,1494),(431,1575)]
daisy:
(21,57,91) [(1440,1935),(2832,2090),(2232,2130),(1877,2131),(1890,2132)]
(201,175,140) [(1537,1749),(2319,1757)]
(169,160,0) [(2124,759)]
(113,123,114) [(1012,994),(2134,1060),(1803,1183),(1119,1335)]
(225,226,231) [(3207,829),(3256,889),(3257,889),(1434,981),(2599,1118),(2656,1348),(2656,1351)]
(17,62,117) [(2514,3874),(2336,3885)]
(226,225,204) [(3209,812)]
(119,124,146) [(2151,974),(2194,1021),(2194,1022),(2202,1034),(2812,1500)]
(2,63,120) [(2165,3881),(2326,3882),(2330,3882),(2228,3887)]
(200,167,113) [(1453,1759)]
dandelion:
(55,2,46) [(667,825),(668,825)]
(95,37,33) [(1637,1721),(1625,1724),(1405,1753),(2026,2276),(2016,2298)]
(27,41,50) [(1267,126),(424,519),(2703,1323),(1804,3466)]
(58,92,129) [(2213,3274)]
(136,159,105) [(1300,2363),(2123,2645),(1429,3428),(1430,3432),(1417,3467),(1393,3490),(1958,3493)]
(152,174,63) [(2256,2556)]
(78,49,19) [(2128,2836)]
(217,178,205) [(2736,3531)]
(69,95,130) [(870,305),(493,460),(2777,1085),(2791,1292),(2634,3100)]
(150,171,174) [(2816,1201),(2724,2669),(1180,2706),(1470,3215),(1471,3215)]
gerbera:
(218,186,171) [(4282,1342)]
(180,153,40) [(4596,1634),(4369,1682),(4390,1708),(4367,1750)]
(201,179,119) [(4282,1876),(4479,1928)]
(116,112,149) [(5884,252),(4168,371),(4169,372),(4164,384),(5742,576)]
(222,176,65) [(4232,1548)]
(108,129,156) [(5341,3574),(5339,3595),(5302,3734)]
(125,99,48) [(4548,1825),(4136,1932),(5054,2013),(5058,2023),(5058,2035),(5055,2050),(5031,2073)]
(170,149,32) [(4461,1630),(4520,1640)]
(156,185,203) [(3809,108)]
(103,67,17) [(4844,1790)]
hot-air:
(48,21,36) [(1992,1029),(2005,1030),(2015,1034),(2018,1036)]
(104,65,36) [(3173,1890),(3163,1893)]
(169,89,62) [(4181,931),(4210,938),(4330,1046),(4171,1056),(3117,1814)]
(68,59,60) [(1872,220),(1874,220),(1878,220),(1696,225),(3785,429)]
(198,96,74) [(4352,1057)]
(136,43,53) [(1700,931)]
(82,42,32) [(4556,961),(4559,973),(4563,989),(4563,990),(4441,1004),(4387,1126),(4378,1128)]
(192,132,72) [(1399,900),(3105,1822),(3104,1824),(3105,1824),(3107,1826),(3107,1827),(3104,1839),(3119,1852)]
(146,21,63) [(1716,993)]
(125,64,36) [(4332,937)]
in-input:
(204,90,1) [(1526,1997),(1385,2145),(4780,2807),(4788,3414)]
(227,163,53) [(1467,1739),(2414,1925),(2441,2198),(134,2446)]
(196,179,135) [(3770,2740),(1110,3012),(3909,3216),(1409,3263),(571,3405)]
(208,59,27) [(1134,1980),(4518,2108),(4515,2142)]
(149,70,1) [(4499,1790),(2416,2042),(1338,2150),(3731,2408),(3722,2409),(4400,3618)]
(168,3,7) [(987,402),(951,432),(1790,1213),(1790,1214),(1848,1217),(4218,1840),(4344,1870),(1511,1898)]
(218,118,4) [(3857,1701),(1442,1980),(1411,2156),(25,2606)]
(127,153,4) [(3710,2813)]
(224,230,246) [(2086,160),(2761,222),(4482,1442)]
(213,127,66) [(4601,1860),(4515,2527),(4757,2863)]
klatschmohn:
(170,133,19) [(1202,2274),(1202,2275),(957,2493),(1034,2633),(3740,3389),(3740,3391),(3683,3439)]
(162,92,4) [(489,2854)]
(159,175,104) [(3095,2475),(3098,2481)]
(199,139,43) [(1956,3055)]
(171,169,170) [(3669,1487),(3674,1490),(3701,1507)]
(184,115,58) [(1958,2404)]
(228,169,5) [(1316,2336),(1317,2336)]
(179,165,43) [(3879,2380),(1842,2497),(1842,2498)]
(67,21,6) [(1959,2197),(2157,2317),(2158,2317),(2158,2318),(2116,2373)]
(213,100,106) [(1303,1816)]
tajinaste-rojo:
(243,56,99) [(1811,2876),(1668,4141),(2089,4518),(1981,4732),(1659,4778),(2221,5373),(1779,5598),(2210,5673),(2373,5860)]
(147,157,210) [(1835,1028),(1431,3358)]
(114,37,19) [(1792,3572),(1818,3592)]
(108,117,116) [(2772,4722),(1269,5672),(2512,5811),(2509,5830),(2186,5842),(2186,5846),(2190,5851),(2211,5884)]
(214,197,93) [(1653,4386)]
(163,102,101) [(2226,2832),(2213,3683),(1894,4091),(1875,4117)]
(192,192,164) [(2175,2962),(2206,3667),(2315,3858),(1561,3977),(3039,5037),(3201,5641)]
(92,118,45) [(1881,1704),(1983,1877),(2254,2126),(3753,5862),(3766,5883)]
(145,180,173) [(1826,1585)]
(181,124,105) [(1969,3892)]
turret-arch:
(116,70,36) [(384,648),(516,669)]
(121,115,119) [(2419,958)]
(183,222,237) [(172,601),(183,601),(110,611),(111,617)]
(237,136,82) [(2020,282),(676,383),(748,406),(854,482),(638,497),(647,661),(1069,838),(1809,895),(1823,911)]
(193,199,215) [(1567,919),(1793,1047)]
(33,30,25) [(1307,861),(309,885),(1995,895),(504,1232),(2417,1494)]
(17,23,39) [(1745,1033),(788,1090),(967,1250)]
(192,139,95) [(1445,1337)]
(176,125,98) [(1197,1030)]
(178,83,0) [(2378,1136)]
water-lilies:
(86,140,80) [(2322,2855),(4542,3005),(4540,3006),(4577,3019)]
(218,124,174) [(1910,2457)]
(191,77,50) [(2076,1588)]
(197,211,186) [(4402,1894)]
(236,199,181) [(2154,1836)]
(253,242,162) [(1653,1430)]
(114,111,92) [(1936,2499)]
(111,93,27) [(2301,2423),(2127,2592),(2137,2717),(2147,2717)]
(139,92,102) [(1284,2243),(1297,2258)]
(199,157,117) [(3096,993)]