[b]Reto 1[/b].[br][br]A partir de un deslizador de tipo angular α, representa las funciones siguientes:[br][br]f(x) = sen x                        g(x) = sen (x-α)                               h(x) = sen (x+α)[br][br][list=1][*]¿Qué sucede con las tres funciones cuando α=0°? [/*][*]¿Qué ocurre con las tres funciones cuando α= 180°?[/*][*]¿Hay algún valor del ángulo α para el que[br]coincidan las tres funciones? ¿Es único este valor?[/*][/list][br]Incluye un texto en la vista gráfica con la respuesta a las tres cuestiones anteriores.

[b]Reto 2[/b].[br][br]Se quiere construir un teleférico entre dos montañas cuyas cimas son A y B. Desde el valle se obtienen las[br]siguientes mediciones:[br][br][img width=79,height=20]data:image/png;base64,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[/img]      [img width=77,height=21]data:image/png;base64,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[/img]     [img width=70,height=21]data:image/png;base64,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[/img]     [img width=70,height=21]data:image/png;base64,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[/img]    [img width=70,height=21]data:image/png;base64,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[/img][br][br][img width=233,height=150]data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAoHBwgHBgoICAgLCgoLDhgQDg0NDh0VFhEYIx8lJCIfIiEmKzcvJik0KSEiMEExNDk7Pj4+JS5ESUM8SDc9Pjv/2wBDAQoLCw4NDhwQEBw7KCIoOzs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozs7Ozv/wAARCACWAOkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD2NlzUZtoi2dgyevFOZ/mNJ5lUr9CWk9zHls54bmWRyBFIflUZ+XBwO/celIqsMYOc+la74cYIyDXkfjq4kPiNngmmliUJHbtExAjk7jOeDnv/AIV3UZe1lyyaRzzp63R6WqEYIqQrkZIrmNB8crd2Cf2jpl3DLEoWaRE8xcjgsQOQPwxXSWmo2Opx7rG7huF7+WwJH1HUVhz3DkSQxlFRkAVIw2uVPSmMK2RzsZijZSgYNPBqmxDVTFOpd1GRSGMOaSn7hSFhQA0qCKTZ6Upb2pDJ7U9RCbTRtNBkpC+aeoCGNjUZjPcVJuIPWkJB5qlcCIqBSDjpUmVNAKgdBVXAjMhA6Zpm9qlZx6VGee2KaENye5NOAFGD70oUmmAgTPU05Y805VOORTwpqWxjRAvc07yE9ad5Z9af5R9ahy8wNhzhz9aYWp8iHcxrI1nUTpunSXC43jhM9MmuGKud7dhniLUjZWBSNsSzfKp9B3NeeXvlxwvLeAeVEd+AM9Dwa0zeXN9Ksl1KZWIyCemOwqlqVrHNZXSEkBkKZ68mtUrGT1KDmeM77e6kt5OCrxNhlrqdDl07xBZs+tRW0Oo2/W6gYwsy9n3DGD6iuPRysSjcSQAMkdaVSMEEAg9QRkEUWuQnY9HfTdasvmstTS9jH/LG/X5se0i8/mDUTa/9kwurafcWP/TUDzYv++16fiBWb4Y1WKHTZYPNuJWiBdYD85CgdE7n6Gty01K31G2E9pKskZ4PYg9wR2PsauMX3IlJdiS3vLe9jEtrPHPGf4o2DD9Km3elY9zoenXExnWA21wf+W1qxib9Ov41H5GuWX+ouodRjH8Fyvlyf99rwfxFaWa3I0NstTS9Y48RW8LCPU4LjTn6ZnTMZ+jjI/PFaccsc8YkhkSVD0ZGBB/EU1Zid0SZFBPpTMc9aq2stxLcXCyrtRNoQbCMHL55P3uAp445obSaQ0rpstljSbqNp9aNlVoSIXFNLUpXHpSbc9BVaAN3GjLU7yz6Uuwii6AYAaXFO2n0NGDnpRcBuRS8elP2ZFJt5pXQD4wrAin+XjoKjVcHrU6SY6jNQ/IaEWIselPMWKmRwegxTtuQeKycmaKKZAsWSKseV9KfFFu5qfy/as5T1NoU9Bznk1wniq7e51F7JWzFCBlSP4u9dnfXcdnBLPIQAgJ5OMn0rzGe++2TzSHh2O5j6561MEXNliFAuHBzleT6VBdYS2xngk5Ap1vMzwhDxyPrioz8yMoAJBOfWtDN7GHZ2z21iscgO5c4Ge2Tj9KXNLC8txfXMDk5icBccYUgEf1qSaNUbCNux1570kQyS0mkgnSaJtrocg+9d5apHJC19bW8aT3MYZmxjcQOM4rzxD6V3XhS/W7sVtSQJYO2Oq9jWsHYzkifTr2e6d7a7tJLa7iALpjKMP7yt0I/Wrx3Kau+UV434/pWVp9rqcd41tdyLd2+Mx3JIEn+6w6H6irU+5LiWOWUhgGU9QRkGsyXQLEyma1ElhMefMtH2Z+q/dP5VvPFEkQKndnoQciq5AzQmpA7xMf/AIn1l0NvqcY9f3Mv/wASf0p8fiKy8wRXgl0+Y8BLtNgP0b7p/OtXaP72KHgSaMxyKsiHqrAEH8KPQL9xoYMoZTuU9CDkGlyazm8OW8LGTTp59NkP/Pu/yH6ocrSebrtlxNbQanGP44D5Uv8A3yeD+BFHN3QW7GltLHpR5Rqnb+INOllEEkjWc548m6QxN+GeD+BrVGfTg9DRz9gt3K+xvU0u1sdKsjP92nYOPu0ucLFXB9KXa3pVnj+7ilCjHSlzD5SqEc07yferQwTgAU4pgZqXMtU2yoIsVIE4qULuPSnCNqTkCgyNQB2p2TUpjKrnOaZnFTe5fK0SQOwYCrW6qkfLZqxurKS1N4Xsec+JdQubrWriGWVjHFKyJGDgAA9fesLaMkYzIeuOi1q68xXXL/ZyxuH5Pbms3KxISBz3JFUtjGW4pkMTbgG+UcUvmbIzuBG7kAdaEXK75MOQOB0qG1VpHeeQ5UdPSmIeJoxdG3KnzHi8wtjqM4x9aoyALIyrng8A1cniRbmOZuJlRkQE9c8/j0qi6srZYYJ5pgOWtrwzfiw1iMt9yX923tnp+tYgp6MQfcU0S0esM43etKkiq4NZei3v9oaXFMxHmD5Xx6ir+K2smjG7TKkGlxWV889nO8MEuTLa9Yy5/iX+6fXHBp9rf2t5LNFDLmSBtskZGGU/Q9vQ1OagksLea7ivHhU3EIISQcMAe3uPY0JW2Bu+5aKhhkdqbwO9URqbQ6j9iu7d4PNbFtN95JvbP8Lexq+AM0Jg0HHrSg4pSMUDrQA2eKG7iMNzDHPGeqSIGH61nDQBbZbSr6408/8APNT5kX/fDdPwxWsv0FPwD2xUNIpNmQLvW7P/AI+9Pjvox/y1smw34xt/Q1Zs9b029k8mO6CT94JgY5B/wFsVfH4VDe2dpqEXlXlrFcL28xQcfQ9qiz6FprqWfu9f1ppJPTpWMNEuLTnStVuLZR0gn/fxfTDcj8DQ2q6npyM+p6X5kKAlrixbeAB1JQ4YfhmjbctampPcC1RZGGcsFGWx2J6/hU8cnmRo4HDqGH41zGleNLDWr8WctrLahsvBK8uN2B3xjacE106bAqhMbQMDHTFXUg4e7JWZaJAmRmn+wpARikLYrDcvYcTxzURXmnjJHNMcgdKaEx6kAU7ePWoM0mTT5Rc551rxP9u6gvJLXEnQe9Z4V3YbmGwDIz1J9a0NeO7xBfqCF/0h+fxrMuJFihwAOmOaS2Je4x5wysicscjP/wBer0EYgVUzyMg4rM0795cKn/Aj+FajEl9opiKeoQiVrZ0cB4Zg/wA3cdDUFwdzk+tLqbyCznMBYSIuV29eOafJ88QY4XcAQKAKy08cVHTxyKYNHQ+FtV+x3f2WT/VXBAz/AHW7V22MV5ZFI0ciupwykEH3r0jSL8anp0dwcbz8rgdmHWtIswmupbApy+4pcUoHtVtkIRm4xjis2Y6rbakJIlW7spmCtHwrwf7QP8S+o61qhB6VLHbh1z0+tQ2kWk2yuM+lPH0qrfaG5vEv7K6a2ueFk/ijlQdmX+RHNWTd2a362JlVblk3rETgsvqPWlzor2bRIoHpTwB6VNHEDyf50MmDwKjmuaKDSIiimmFQDUjRk96zdTfUYvLh062SSWXOZpWxHCPUjqT6AU0yWvIk1DUbPS7Y3N5MsUY4GeSx9AOpNcxrPiH+09MFvBHcWqzffy21yvpx2Ip2sag84jtXkWbyMBpAgG98YJA7ViXWQgc9fT2q0r7kylZaGfb6elrqEU0DnygjLsck7c4xt/lWvDqt9aLtjndVzkDPFZk4+0QvHvKl1xkHBHuDUdpLO1sn2lMSgYf3xxn8etattvXUzcm9Tu9L8VRzAR3pWJgPv9mrfEoYAqQQehFeWo2D/KtfSfEE+nssUh8y3zyp6ge1Q4LoNVGd75hxTTuY1St9WsLkqIrqMs3RScGro8zPArO1jTmbHBcdaX8Kbh+9GPakO55vrzoniG/AIy1w+frmsW8DZ4xjGemK0fELFvFGo7sgfaXA/Os67KlcA8g4xjtULY16ktjG0UQdRlpCPwFaI+QZZuBVe1Hlom7IIGD9fSp5tpXbyOR+NMRSeXlzg5zwKbazC8s0nK7dy5I64PpQ+FcjOfxptoYNjRQMAiOVwOx6n+dAiHvSjg06VPLbjkHpTc0hj810vgzUPI1P7JI2I7ngZ7P2/wAK5gGpIpGRwysVZTkEdRTuS0j12SBwx+So8EHBXFQeG9dXV9MBkI+0Q4WQevo341oNhmzjIpqb6ilTW6ZGkZyCTU5cAAU3GAKO/NJ6miXKrIVlJ57VBfabaapAsN3Dv2sGRlO1429VYcg1cUcCnAAjd0xUNmiiZuoatHpE0Ru7eVbRhh7ocpE3beOoB/vdKnvNX0+xWEz3Cg3DBYUT5mkz/dA5I96rSarcXGpmytbBpIY223VxOCkYHdV/vn9PequoWVxa3w1TSrW3lnC7Zo3GHlQdAjfwkenQ0rXBuxb1XS/7TlVLi7kWxVfntovl81s/xMOdvsMVj69r8aRfYrAjONrOOw9BS6v4iX7IYYFkjldRv3gAx56r9e1ctIQqlj94j5a1hDqYTn0Edti5JGT2qCV8o3rinSAnknjrUTPtDA9e3vW6OdlcNVaeaWG8h7wyZRgB91uoP07VYfhj0xSduOtNiQ4Einq5xziqtnObq33ldjqxSRM/dYVNihMGiUP7/jXUaJ4sa3jFtqLM6DhJRyR7H1rlUUMpz17UoyBzQ0nuCbjsepW93DexCW3lWRD3U1Lt968ysNTvNMkMlrMULDBHUH8K0v8AhMNX/wCekf8A37FZuD6GqnHqYfiYlfFF+W6faXGPbNZTSZm3dga1PEO//hJtTbcQPtcgz+PasxFDXADdAec+lYLY6TXjQNEhwcdf8KdcTALnZyPeo1mIgMgTax6D0qKVPkHmN74pmZBO5aTg5HbFFrB9nlmdSGMzhlXHCnGKcioxB28j5cUxIJU1kuMmLyDk54BB4/nTaC/QfO2WKk5I71DmnSsSQccdKYcev40DQoNOzn61HyDTuQM9qANfQNYbSNSSfBaNvlkX1WvTLXVLG9AFrcxSk87Q3P5V46jHcCKliuXhmEkLsjocqynBFFgTseyOxB5pIxvkFcx4f8WpfoLfUJEinAOJW+VWAHc9jWzp2rLfPI9tDN9mUYS5ZdqynvszyQPXpR5Cvrd7Go80EdwLbzo/OK7xFuG7b649KzbW21SXUjd314EiQsIbS3+5jpucnljjt0FSafplnpqO0Ks08pzLcStvlkPux/l0qyZOeKzSfU2bRM2D16isvWtRXT7QspHnvxGv8z+FO1HVotPt97/NI33I88sf8K4i8v5ru6ea4fc7fko9BWkYsznNIz7yB79wRNJFKjbkkQ9D7juPakaTy0ie8mjDkhMr8qs3tmntKBuCgn8aZLDFcW3kzRhos8hu9bWOa99GTzKCuPu4GSaz5OZODmmTTmys9kYmmjTr/EwH9QKbHKk8KyxOro3Rl700J9yV1ypPT0qLNOznvmmVQkMaaK1lQFNpuHxuA43Y4zVgHnFV54UuIjFJnBIOQcEEHINPilSUkowbaxU89CKVxtFlPl3DFMPUnPNOOFZd3frQ3OOMUyBACe3FLsPtSPlMehpm8ehoCw/Xgr+K9TXoBdSE5HfNVJ0jWZWRip6H61o+IcJ4h1MqoLNdvkjtzWXOjMdigsSckkd640d73LsTqxEa87egPf3NR3k7eaFQggce+aUItvApZ/3vVsnNVHlXzGYgnPOapECJLJHKZCMgdc0+a6ZLqFVwUuG8s8dOMjH5VE0ofg/l601rhLaATOAwRwRx9054P602FupNK4HyhehOaj3A9uac7BmcgcE/Woed+O9DBIkV8MCOtPbcDtP1qJiD2wR1pDKkal5XCqo+8T0oBolGRzTHcxozIpkYdFBxk1EJDc2uYZHi3/x7ecewPT60kMSW67EBAzkknJJ9SaB2J7drgBjcshZj9xRwo9M969D8M+KYri2Sy1CYLLGMRyN0ZfQn1Fed7smnrIV+lAj2mO5tcbjPERgn746Vjax4wstPUxWarczkfeH3F/xrzhJyeNx9OtOzVqCepDqNaJGudSl1C7ea4ctI3Vj29h6VDIAGyWOTzVCN/m5OB3qzDMpBZgOvFaW7GN77jkhZjlmxnqKSaZmYqFAA49hQ8vUjgjkk9B/jVct5jAMWOKYCsQqEFsk1TdZEicWwjVycgMOCffFXZdixqSPmNRMsfHzHkUAiC3maaPdJC8TqcMrevse4qVwQQcYzyKJIVljKb2UMMZBwR9KijjuI0f7VMjhOknQlffsKQySoY4BFczSq2FlwSn+16/jVxYVKKc53c5BzkVWvrF57V0Qnd1Rh2Ycg0AmT/fA56CpcZX6cYHNVoS5jUyDD4+YLyAe9SLIQ2QPrTuTYmk2gYaodvuKdJk8mmbk/2qARb8QgHX9TYbiBcvnj37VmK4UMHIXA4HfPvWj4gMr+JNTVd20XT7j6c1mhARnaGOcnmuRHaxk0juT8wbP6VAzkMePbHXFSSqNo2nPsBUTIynBGDTGiWK2nuQ7wwySBBl9oztFRPEtxbyQt0dcEg8j3rT0zU4LW0a3nEwxJ5itC2CxxjB9qgUQkyAKDvGMk9PWqdrAyFQkZCk54HOetJguxAHU9aq2xS3s41lljHl/JkMCParM0E8hCrL5MOMsV++fYHtQtjN6Fe4leEhEiaSRugHAHuT2pxiWVU89FZl59QD7VZcIygg+31qNV3Hrx60WKT0EPPOMZpDnNSSLg4pjqRg+tAIAxByDilDZOSaaKWgLDgeeDirEUu47T1/nVanKc8D73amnYiUboubGxkKaRWOMelPspgzlGyr47HrVhl4OQG9+9ap3MWraMrly33jT4zt5Yc/zp6269Qc49aXyduTzTuSRyszNytRgHIBzjtVkfKMA5+tKioh+ZTnrQBXETFwFBPNWlttufOAYnqvb8akhAVi+OnTNEjjPDc+mKQFGG1SzMnlbxG3IizkL/ALvp9KmsbqK5jLxE/KcOrDDKfQingZYFiP8ACh1ijZpUiUysu0uBgkemaA9So6TJqbYDNDNHn2Rh2/GpQoUY9881VW+uWEsDRCO5VSUON0bfQ/0NaWgXsM0sVzIVjVoyAH/hb/OaE9SrXCNQ0ZJxyKj8tPWrt9IjXOYmVvlxIV+6W7mqv4CmyWrHc33gNL29uLn+0njM8rSFREDjJzjrVJ/hhC+catIufSAf40UVwczPR5UN/wCFXJgL/bU2B28kf40n/Cq4S2TrEp9f3I5/WiinzMfKhW+FsBBC6tIoPbyR/jUVx8Kla2lWDWHEjIVXdCACffB6UUUKbFyo53Qvh8/iKeWWS8jsVs2MeYYw5ZvxAAHHXr9K6O4+FQmCiPX54sf3bdTn8zRRXTiqkpVpNsSirDV+EyLCUOvTM5z8/wBnXI/DNOtvhUIWJk16aYEcA26jH5GiiubmY3FMafhS3n+YviGcLuzs+zJjHp1pbn4UiZgY9eliA7C2U5/M0UUc0g5UKPhSog2DXJfMxjzPsy/yzTYfhQEJMuvSyg9B9mVcfrRRRzMOVCL8KHEmf+EhkKZzt+yL09M5pZvhQXcGHX5IhjkfZVbP60UUczDlQ4/CsiIBNekWYY/eG2B/TNTwfDeVN32jXGlzwMWoXH60UUc8kJwi90Rx/DW7EwaTxBujzyotADj67qWb4b3m/wD0bX/LTHR7UMc/XdRRT55dxezh2JJ/h1O0AEOtbZuMs9sCD68bqS3+HE4jP2nW/MfPylLYKAP++qKKPaS7h7KHYht/hvfLIPtGuxtH3Edrgk9ud1Lc/DnUWmP2bXIliwMLJa5OfqGooo9pLuHs4dh9z8OLjy0+yayqyA/MZbfII/BqIvhxc/ZmE+sK0/O1kt8L7ZBaiij2ku4eyh2IrT4bXol/0zV4Gjx0htiDn8WrjNH0eS88SQ6X9pZJmuJIpZskghd27j8OKKK9DBvmhVb1tEmUIq1kegL8OY0+7qsg/wC2I/xp/wDwr5P+gm//AH5H+NFFcHtJdyvZQ7H/2Q==[/img][br][br]Calcular la distancia [i]d [/i]entre los picos de las dos montañas.[br]

[b]Reto 3[/b].[br][br]Representa en la circunferencia goniométrica los segmentos correspondientes a la tangente y cotangente de un ángulo α. [br][br][img width=249,height=210]data:image/png;base64,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[/img][br][br]Utiliza la herramienta Lugar geométrico o [b]Rastro[/b] y [b]Animación[/b] para obtener los puntos que darán lugar a la representación de las funciones tangente y cotangente al mover el punto C que determina el ángulo α en la circunferencia goniométrica.[br]