Exercício 02. Trajetória do Inseto

2. Questão 136 – Prova Azul – ENEM PPL 2021
[justify]Um inseto percorreu sobre a superfície de um objeto, em formato de um prisma reto ABCDEFGH, com base retangular, uma trajetória poligonal, com vértices nos pontos: A-X-Y-G-F-E-X-G-E, na ordem em que foram apresentados.[/justify][center][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQAAAAFiCAYAAAAZTgY3AAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAACQAAAAAQAAAJAAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAQCgAwAEAAAAAQAAAWIAAAAAliDf8QAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAQABJREFUeAHtXQV8VMfW/8eIe0ISgiRoBHd3K1AoVoq0tLR9fX1VXu1Z5Xstde+rU6BI8QIt0hZ3JziF4IEECAlxl++cGzZE9m5kE3bv7hl+S3Zn5s6d+Z+ZM3bEppACJAgCgoBVImBrla2WRgsCgoCCgDAA6QiCgBUjIAzAiokvTRcEhAFIHxAErBgBeytu+52mF+bgyM4t2LozCtkqR6IunoG4f9pU+DveeUy+CQJaR0AYAFGwIDMZuzatxbwVuxAY6A9bW5vSdC0sgH/4QDwig780LvJL8wgIAyASpicn41rsFQS26oNXn54AR4eysBTCyScILpontzRAECiNQNmeXjrVSn4lp6Tgaux1NO09Fm3atScGIEcjVkJ6q2+m9HQUIiX5Oq0AUtGkSTDs7Mos/62+iwgAloyArAAK8pB07RLicrzg5ZCHa3GxKMcCbOsgKIjOBiy5J0jbrBIBq2cA+fl5iD1/Fjk5N/Dei0/hXT2S0bYhA7D39y/hbJVdRBptVgjk5+DSxXOIi4tHWnomCmAPn4C6qN+gIQJ8PctPXhVUXhhAXh7OnT2PemHtMGxQX/i41SkFmQ1B6lQ/QgZ/KVTkhykQSLp8AouW/Iy9Bw7i7LkY3EpKIQZAq9PQELRs2xljHngA3du1gEO5Jax6ba2eAeTlpeH8hVi06DwFD0x9GAFuDupoSYogYCIE4qP34J23P8H2g6cQ3nMInprwF4QG07Y0Nx2H923D8uVr8OmNZHi9+iLaNKlX6VpaPQPIvXUW0ZcLMXhkPXi4yuCvdM+RjHcNgYKMa5j59bfYvPcsJv73O/x9XFda+N8Jnbr3QbvIEDz9/EfYHnUvwkKC4FjJw+yS5dwp0Yq+JZw7hRR3DwQGB8KpCksnK4JImmpCBAoLcrF38x/Yuuc4+v7lH3iZBn+5YGOD8C7D8c4HrrCvV482rSzOWrnObPUM4Oj+g3D39EJwveBKQlYOfokQBGoNgazkeOzbsRUZXq3w+Ph+qu9x9fRFv+FjVdPVEqycARQi6shxuLmHIYCu+SQIAuaGQHJyEv48dRoRXR5EoKf77eoV4lZ8LM6du4icvDs1LnRwRlhYc/h6ut2JrOCblTMAYNprX2OSrTsa+cslXwV9RZJNgEBWZhJuXE9F2+AA1Klz+4yqMBfHd/2BL75agJTbDIAX/c71wvCff70kDKDydLJBoxatK59dcgoCdxmBQhJUI1EVODs53lFSKyiEd1Ao+g8fhQLa/xeSstr+9SuRWGgPZ+fKz/7cFKtfAdxlesrrBIEqIeDg6A4PL3tcjIlFVnYuXOxJTsXOES0791U+XFhBQSaity2FTYA/3L2qxgBEurVK5JDMgsDdRcDT0w9h4c1xZOtGHDp5odzLC0ky8Er0XpyLyUG9oPokyFY1nXVZAZSDtCjiVmIijh49irS0NLIREIh27drB1s5OJbdECwLVRyAuLg5Hog4rN3cNGzZAi7BwUkor6mtuPnUxeMRI7J7xOT55922cGjoAYY0bwdmhEMk3r+HksRM4deIQEhx80DwyjFYIVauHjZgFLw/Y4agofPbRx4i5coX2X3lwdHREh04dMf3FF+Hn51f+AYkRBKqBQEFBAX5fuw7z5s4l2f44pQRXFxcMH3kvHpo6Fa5uRcv53KxU7NuwEp998R3Ox2fDw90VdjaFyM3JQkqmDTr1HoD7J01Ax1bN4elStRWAMIAyhCvIz0fv7j2QmpoKGzpg0QVbW1uMHDUKb7z5X+LUd+J16fJXEKgqAodIpv8///oXYq9eLfVodnY23n7vPYweO6ZUPJCHsyeisGvrfqQX2CEkvBV69O4ODyMEWIUBlIF4/tx5eP+dd+jEtfzxSP0GDfDgw1MRHBxc5qnyP3XMQ83vii5d92RF+dTSdc9X9W9l31/Vciub39rfn08TzeaNm7Bi+fJSEw3jx7Ru2qwZlq9aWVk4q52vijuGar9HMw+eP3e2HEF0lY+5fBlvvv6GQiBdnPwVBKqDAK8heZLRd67EzPH8uXPVKbbKzwgDKANZYFCQMsDLzlCczcvbG526dFX+lnlMfgoCVUKA9/9nz5yhw79D5SYcXgHUq8Qqs0ovVMksDKAMMP0HDsQXn35WJpa3/TZo0qw5ho0cRRJZpW0GlMssEYJABQjwWROf9B8/dgQF+QWlcjNzKL//L5Wlxn4IAygBJQP/zlszlKUZE4hGvaIgVEAcuUHDhhg3YQJc6JS2pvfjJaogX60AAZ5MommJv3rlCuTl5in9SXftl0e3TkOH3YMJEyfeFSSEAdyG+datW/jkgw8RdfAgguvXx7B7RyGZzIVnpKehbgDJAXToAAea+WXw35V+abEv4QF+/uxZ/PDt10pfumcE6e9HROC7r76EPa0IHv3L45hAln2caaK5G0EYAKGclJSE2T/8gA3r14PPACZPfQRNmzcvxp8HvQz8YjjkSzUR4MG/f89uLPlpgbKlHDBkKPrRltON7FHwnT/fOzWjbebdGvzcDKtnAEyURT/9hKWLl8DLywtTHp6Gxk2bknx10b6Ml2sy+KvZ4+WxYgS4n+3euQNr6GovIz0d4yZOQq++feHkRFqoNMHowt3ua1bPAObPm4cfZ8+Bu7s7xhNRQho3VgY8EyJF2QKkwz8gAPb2Vg+Vro/K3yoiwHf+hw7sx5qVK0nALAVTpk1D1249lC1lFYuq8ezlpV1q/BXmW+DKFSvw3oy3YWdrp5zuh0W0LL6SYRHgNb+swquvvITEhATzbYTUzKwR4BXkyWPHsGDObDpTSlImmX4DBpnF4GfgrHJay8nJwW/r1uFdOvH38fHBcBLx7dy1Gx/6lwp8Mmvv4FDMFEolyg9BoAIEuJ8d2r8fC+f9CCdnZ2XZ35XEzHk7YC7B6hhAbm6uIoL55edfIL8gHyNG3YfeffvpH+TFh3939mjmQjiph3kjwIN/57atWLpoIVxdXXHPvSNp2d8dDjShmFOwKgbA+/o9u3bjyy++AF/73Td2PPoOGKhX7p9FNDt26YIgksjiU1oJgkBlEeDBv23zJtL0W6PIkdw3bjw6kwQpXyObW7AqBnDxwgW8O2OGonrJROnZp6/ewc9EYjntxk2bIbRJU9U85kZMqY/pEeDBv2XjBvy+ZjVsqA/99ZlnEdGyJUn9medQM89a1QIdWd96ygMTkZWVhX6DBinL/opEevkAhz8SBIHKIMB9ZcfWrVi+eBGtGt0x7S9/RcvWrYuvlCtTxt3OYxUM4Myff5Le9b+RmZmpHPYNHjoMjk5OBrHm7UIa2QTIyMhQjIDYyTWgQbysPZH71o6tW7By2VL4160LXmG2CA8368HPNLPsa0AaxOdI7PL9d9/DaWICLM7LhPEkgZ+KAusC7Nm1E7O/+xYpKSkVZZd0K0YgnQR7Nvz+O5YvWaz0rZGjx1Bf61hs1sucobHoFcAVsrTy2cefIOrQIXTq2pWUeSYqBKqMtBXn4fv/ixfOm9W1jTl3JmusG1uO4v3+zm3b4OHhQZKkj9DMH6GJwc/0slgGwNd9H3/wAbYTYcLpEGYc7f89yQWYBEGgphDIycnGH3TSz4d+PPiffeEl8jAVpKlzI4vcArDo5euvvoqN6zegCZ3kT5g0ueqDnw50fHz9ENKkiYgB19SIsaByeIW47tdflas+D09PPPbkUwhkx5waOzS2uBUAq/B+8emnWL3qF7rCa0J7/nGKOm9V+x7L/g+65x4Mpk9ltgxVLV/yaxeBpKRb2PTHH1j/2zo0bNRIOVdiHRItBotiAKzWO2fWLKxasRIBgUEYNWYcqfW2qP4AJi4vMoBa7Na1VGea3RNv3sSvZMhj1/ZtaECDn7eWYWTHn6b+Wnpp7RZrMQyAT2KXLl6MZaTW60xy1w8//heE3tbsqy6EynKOCFt4WzW4uuXIc5aBQBI5i+HBf3DfXmW5zwd+IaHanPl1FLGYMwBe8n//zbeK1N4TTz+LxrT8N2Y/xtqAG//4HR++PQNJtxJ1eMlfK0WAbfWv+nk59tLVsK+/P5578WXND34mpeZXALw/30bSVx/RiT/LWk+Y8qAy8xvbT7nc+Bs3EH36T+SS3TYJ1osAi/fOmfkdog4cUAb9Q9MeVbRILQERTTMANqi4lQb/y9Onw5VEL1mzr3XbdooMtiUQR9pgegR4Elj803xFp58l+8ZOeAD1yGakpQTNMgDel2/csAEfvv8+2Govn9h3IXXLGrPcQ3t/b28fOuUNqbkyLaXXWEk7rpH+yMplS3Ds8GE0DwvDmPsnoFFIaPUPlc0QN00yAL7n37l9B7763/+QQKeyo8aOQ68+/VCHnHjWVGBjIF26d0fLNm3gTkIeEqwLgRvXryty/cfJmk+zFi0UQ7E6pzGWhIQmGcDZM9HKnp/dJ40jE8qDSLnHmAM/fQTl8lhnoDJ6A/qelzjtIsDivbO//xYXqH+xTP+URx4hox5Fnnq12yr9NdccA+A92T9efhmXL10iIZ1h6Nt/YI0Pfh1UigAQbS9Yr1uCdSDAg//zDz/A1SsxaN2uHbndnmyxg58pqqmezZp90599DldiYtCtZ0+a+e+p0WV/yS7OZsEvnj9Pppx3IotUPSVYPgLcr7789BNl8Ldq2xZjac/vTTYjLTlohgHwcv9dsuB7JCoKrdq0xfCR98GTnHXWVmB14L27dynXP6miDlxbMJtFubzSY289ixfMp2X/WbTr2BFjxt9PTmLqmUX9arMSmtgCXCa33J+TfP+hQwfBnHk0EcfHz6+UQ4XaAInPAdg0mFbFPGsDE0srkwc/r/SWLFygbCv79OtPVqJpcqHzH2ULaGkNLtMes2cASWS885uvvlIs+TZo2IhsrD1XZFmVCFfbga8a+caBekJtv0rKNwUCxOCTqX/NoQM/NhnXp/8AxXR3RabiTFHV2nqnWTOAHBK/nPn998WafY+TyuXdMqvMJsD6kMXgliRY5FEJC0K1RSApt3YQ4Nn9Jh0of/rBu0hOSkb3Xr1w7+jRVuf63WwZQHpaGr795hv8NG8+iV+G4n5y2+Xj61s7vUFPqbz8DyL97npkFtwaloJ6ILDYKD7gPf3nKSyeP08Z/N169FTs9nt4eFpsm9UaVikGkHh6O2at2q1+3Ubc1Cu0HR4dP0jtPVWKT0tLxazvf6DPTNRv2JD0re9XzHPzoLyb4W6/7262zVrfxYP/5PFj+Jns97Gk34DBQ8AuulnYyxoZfaUYwN7fl2Lu7I10IKZ/ABaSh532oz1qhAGw2e6f5i3AElLtdSEf6RMmTVHEMO/2YOTOwNJgfAbBxh6saV9oqcyBaXqGZn423hlPtB1G3nr4KpndcVvj4Gc6V4IB5OLIkePw8m+EDxYuR+cgR/1g2Rh/o8g+09iYx6yZP9DhWx5eIFPejUgW3xSB1YHZ1tvmDevx33ffV0w9m6Ie8s6aQYAnkOvXrmEWWXlOJsMxw0aOVD729ublqqtmWlv5UipkAIXpl7H/aCKcGg1EWLCz4upI/zqg8i9Vy7l540bFbZetnS0mP/wYQsnYAi/ZTBV4VrDWmcFUmNfGe/km5/Spk/juy/8pUp18zcdSpNY++BnrChnArYvRuJKTj/BWrVBbRyR83bZn927M+O+byoC/j5R72rZvb9LBr3REYgAStI0AryqPRB3CIjrwY63RAQMGKHYenSpwDKPtVle+9hUygDOnTpMX3QK42+aRo4xdCoili7dB3fqhaNQgCA7V3AWs/2M93nnrLWRn52DoiBGKDX9Tc2d2DspCR+5k8dWFvLtK0B4CPPijDh7AquXLFQ9PbC+iH13tOjk5a68xtVTjChhAAaLPnKVlsA0O/TYP0VvKZy+098ADTz6DBsQAqhO2bt6sLPtvklrviPtGK8IYjjWo1ludOvEzLAEYFhGJFmTwkZmBBG0hwFu3g/v34Rcy45VB9iJZrp+dwcphbmk6lh/RJdPzbuJ0dDxynOphysSRqFNQfkls6+KJTq2aw7Eas//Jkyfx2Sef4gKJYg4cMpSs+I41qz23IgYsmoAle4QmvjPdeOb/ceb3ioeeyVMfIWMx3USrUw/1DDKAjLgYXElJRmDnIZj+9NN6Hq9+VPSZM4qr7ksXL6JX33544MGHwAo45hTY4SNLI/IdscIMzKlyUhe9COSRR6iDB/aTeO93iofeocNHoEPnzjL49aJVgTrwlUsxSElOQbt2HVQer150LPns++Sjj3H86HF07NJVsehjboOfrwH37NiBmd98TRgkV6+h8tRdRYAt9+7euUOR8HMi0/DsBZrl+++W+PhdbWwNvczACiAfMVevkGfcfHKpHVlDrwOuXLmC1+h+nx12tmnXHvfSvt+dDHqaW+A95I0b129bBc41t+pZfX34Xp8NtfCVNNOK3bjv2LIFf/y2VlmtjSHjnZ1ocqkxG5EWirg6A8hNR8zlq0jJdURc1Ab8fLoOQ10OBkc3H9Kf7oR6fuUHMRvSWPnzCuzbtw+ZRKDIVi1x6OBBHNi/HxGRkYqFVV9W65UgCFQBAZYWPUITyGG63svNzVEMdfIKcuumjcqAf5DMdrPNCNm2VQyqKgPISknE5ZhLSE+Pw5f/92pxSYqXnBIy+fUju+LND1qWYwDZRKQXyVz3ls1bil0l79i+XSEK76kfJc0+nvnNVtCG2ujq5qZIAEpHKia/yb8wLVYsXaI4bdHN7my1l4MrXddOeXiacn1bVnTchiRVDyz9FPN3xmLSY8+gU2RwqbZwesz+dZjxv7noMOpZPD6mq/n2zVI1N+6HKgOwqeOJIaMfQkTP0Qbf4FU3GBEhpbX0eFAvWriQZvtDpZZgbGmXQytSsbUjQrI7L3MO/QcNxgD68LqHl5gSTIsAL/dPk6OWbZs3ldrX6wY796umZMFX97tkbW1sCvDn+Yvw9AmEX5CeVadNIa7EXaMJygGNWzShR8uvdkuWZynfVRmAo7s3uvQbii7VaCkPlj9P/ak6aA7R/awD6dsTn5AgCFQaAV54njl9SjV/PJ3ZpCQnKUpk5TLlJuL8xUS4tmgNP08nSi7d+WwKMhF75TrybbzRPNTXavqmKgMoB2AVIlgCKy9P/eCMtwesZGPOgWcb5ZCJeh3rI5jtVsWcQayFuvEWQG1Lxp6i8vP0XSXbIOPaOcRl2qBdUDDcHYi6ZWRaclMTcO1WKhzrNUGgC61UC02ng1ILsKkWWSsMgPdidesGKHt/xaRWmdezgY8pj0wry4TL5DLtzzzSRmTnoPv37MEz01+Aty9Zhy09aZi2gtb4dhq3B/ftx29rftXbej9y2smi22UDrxwu/xmNQjt71G8QopjCLuTIEiGFJFFT0tPQsFkv1KHtQBn+UCKnZX2tFQbAhzMjRt5LB4CbyMTy1XKIPfLEkwgICCgXb04RLFDi5lZ0sxFIloH869Y1p+pZbV3qBdfHvj27FI9QJff6POnwtbInMQB9q7Xoi+dQkJeDn796HUu/oNm9DAPgQ0Dut8NGh+l93lIBrxUGwGCFR0TgrXffxWck8HOYTHmzMEYwOVUcQpJZgYGBVgWypXYeU7SLl/9PkmHY5UsW4Vx0NF0D5tKs3hADhgxBZxL31Tf4kZ+CyxcSYOfsjsbBASQ7QGreJStfmI/kxATcSrNDswbWtdKrNQbA+LYjzypzSA2zDSnV+PnXxf2Tp6Bxk6b6iVSSIObwnWYIHx9fumMW56DmQI6SdWjQqBHpjYzDjz/MRCwJq/3t+emKu269g5+Ge3bCVVxOzoJfi3545YXJsCs9/JGfeQu/LvoRG09looFXnTKpJd9sed9rlQGUhMuOjHzwNaB+IpXMaR7fua6daEaJIOElcQ5qHjTR1ULXh3RbAMc6NGhVrpR4pX895gqy6WC6RbPmsCmgg8JS0z+QRo5f2ERYQP2WpNRmXZqfd40B6Iinlb/cubzIHDh/JJgnAmW28forSQwgNi4WebmFdL/fWO9Bbjod/t1MSES98PqqNwz6C9d+bDWUeLXfaGmB9SBgU5CBq5euI6/AGy1CvPUs7wuQnhyPhPgCNKznTwyg9O2ApSMlDECFwnz3z/7idmzdClYLlmB+CKis+ktVNDflFq6n0P1+o6YIcCw/uAtJhyDp+hWkufuhrqcrrGz8V2wTsBSaVvSDlUv27dmNTev/IKtAYXAm9VIJ2kMgIyML7t6+6BDUGrYk3FNWvIfPDkh+CBEtI+Dj6aG9BhpZYzkDMAAgnwMoUmeV2mwaKEiSTIaAs3c9DL3vftg6e5JEZ5nTP6qVjZ0DwrsMROMCOzrvcTNZPU31YtkCGECeZwe102UDj0mSGSFg7+gEv4Ag+Hi46K0VM3kPH3/4+/mQfoo2hsONy3/i1Scm4KX35yApPVtvu/Lz0vDpy49i/NRnsffkRT1nH0WPaaPFeptYu5HsHHQouYx6/a234eXtXbsvk9IFgSog4Eti9uHhTbF+8QIcj03Q82QhVn30POas/xOdew9A67AQxXCKnoyKWLS+eKuP010D1iPpRTEpZfXdwawAsHPyQtc+/dEyIAdffbcMJdXuCnIzsHH++3hrzj50Hzoak8aT6zMD07yBJLNqs0kqw0yAPxIEgdpAgLeXcbGxOLBvL9h6VgEdUhrSor1TBxuERnZA727tEb15GX6Nii1KKsjBwY0/46OvlyKwXX/87anHEOzBlrzUgzAAFWz4GvDypUuKbXk2NilBEKhJBFhL9ihZMpo/exYWzZuL9LQ0xQDv6l9+xZWYmApfZVPHC6PG3Ytg1zx8//FXSMjOx4Wju/Ddd3Nxy7kp/vPGP9CyfsVCbMIAVKBmBrB/727MmzULqSQqKkEQqEkEbsbHk4vyRTh/7izSaPDzaiAnJwebN23C0sVLKmUtKyC8N8YNaoWrh9dh4c/rsWzeLBy6mo+X//s6ujcPrFR1hQGowcT3wzm5JASUITcBahhJfLUQ4Kvls9FnlOV/2QJ4ZbBpwwbFLX3ZtPK/7fHAX5+AT34GZn/6f1ix4QTG/XU67unUonxWlRhhACrASLT5I6DV4xk+V0q4Ga96vsQrAn2GdPRRxN6vPf7+aC8UZGYjYvA4TB7RB05VcNIpgkD6UKU49gcYHtmSHEk66bcxp/KcRAsCFSHAy31/usrTJ2PCcXztXBXnuI1JPdrJ6zJ69xuEhv7lzfMbqo8wABV0eJnWmrwD80eCIFCTCPD5UmjjJmjYKIQO/C6XWglwv+s/oD+8qyB7su9glGIKrWFowypXU7YAVYZMHhAEjEegLpnEGzthgmJqjhkCB5Y3GTZiOCZMnAhnl8rqnmTgWNQZ8rHhi/rBesydV1BVYQAGAGLrxnwFqG+pZuAxSRIEKkSAZ/qIlq3w6psz8PT0v5NTEzdl1h8+YgSYOVQ6pF7A4fPkwLZuKOp5VH04V/2JStdM2xl58G8mTcBP3nunkiey2m6v1P7uI8ATSx2yZtSaHJo4uxbpKuhTWDJUs+QrMaTqHIrw9i2hX9vB0NMQdWBVeIg4iQkJuHj+PElnkb6oBEHADBGoE9gGM96egQCyd1CdIIeAhlDjeyat3jUZapekWQwCzt5B6NApqNrtkS2ACnR8V8u+C8LCw0UZSAUjU0fTIk2CkQjICkAFQFYH7keOQfsPHqK4BlPJJtGCgKYREAZggHx8SCM3AAYAMnGS7M6MJ4BsAQxgyM5BdS7NDWSTJEFAswgIA1AhHctibyEPxh+/9y6Sk5JUckm0IKBtBIQBqNCvkKSzrsXF4dSJ44qapko2iRYENI2AMABNk08qLwgYh4AwADX86ITJw8MTQeQanG8EJAgCloiA9GwVqvLhH7ubDosIJ0WLqqlYqhQp0TWMgMgBGA+oMAAVDFkQyNfPT/moZJFoQUDzCMgWwAAJmQnwR4IgYKkICANQoSzraMeQVeCoAweQnZWlkkuiBQFtIyAMQIV+7Bx0x7at+OrzT8lcc7JKLokWBLSNgDAAA/Tj5T8bbhCNQAMgSZKmERAGoGnySeUFAeMQkFsAFfz47n/gkKHo0q27OAdVwUiitY+AMAAVGso1oAowZhQtFzTGE0O2ABVgKNeAFQAkyZpGQBiACvn4GpCdg+7fu0euAVUwkmjtIyAMQIWGzACiDuzHkgXzFeeNKtkkWhDQNALCANTIR4LmWSQAlEKegXWOG9SySrwgoFUEhAEYoBwrBLG3FhEGNgCSJGkaAbkFUCEfCwCFRUSgjqMjuWmqjssFlYIlusYQEG1A46EUBqCCIXsHbtWmrfIRw6AqIEm05hEQBmCAhDLwDYBjBkkiB2A8EeQMwACGxWcA0tMMoCRJWkZAGIAK9dgf4Kqfl+OV6c/hZny8Si6JNiUCcgZgPPrCANQwpN6VnpamDH65BlQDSeK1joAwgAooKOcAFQBkwmTZmRkPvjAAFQzZK1CDhg3RoXMXONJVoARBwBIRkFsAFaryAWDPPn3Ru19/sJcgWQmoACXRmkZAGIAB8vHeX/b/BgCSJM0jIFsAAyTkmT83N1dmfwMYmTJJbgGMR18YgAqGPPj37NyBH775WlEIUskm0YKAphEQBqBCPnYOeiUmBocPHUROdrZKLokWBLSNgDAAbdNPai8IGIWAMAA1+OiS2dOTnYMGg28EJJgfAiIHYDxN5BZABUMe9N169kLrtu3hQYxAgiBgiQgIA1ChKhsD9fTyUj4qWSTaxAjILYDxBJAtQAUYilXgCgCSZE0jIAxAhXwsAHTx/Hns3rkTmZmZKrkk2pQIyBmA8egLA1DBkJ2D7t29C3O+/xZpqakquSRaENA2AsIAtE0/qb0gYBQCwgAMwMcKQIougJw2GUBJkrSMgNwCqFCPnYMOGTYcPXr1hpePj0ouiTYlAsKXjUdfGIAKhnz6700Dnz8SBAFLRUC2AJZKWWmXIFAJBIQBqIDE+/+42Ks4fvSoKAOpYCTR2kdAGIAKDVkd+MC+ffhp7hxyDirXgCowmTRa5ACMh18YgBqGtALISE9HYkICmQQrUMsl8YKAphEQBmCAfLY0xbCPQHEOagAkSdI0AnILoEI+tgrcuFkz5BXkw8nZWSWXRAsC2kZAGIAK/VgduCOZBO/UpasYBlXBSKK1j4AwAAM05JsAMQduACBJ0jwCcgZggIS8/7cniUBRCTYAkgmTRBLQePCFAahgyM5Bf13xM/7xwnRxDqqCkURrHwFhAGo0pOkljZ2D3rghZwBqGJk4XuQAjCeAMABDGBafARQayiVpgoBmEZBDQBXS8TVgSOMmZBg0E45Ocg2oApNJo+UMwHj4hQGoYMjXgJ27dUOnrl0VYSCVbBItCGgaAWEABsjHp/9yA2AAIEnSPAJyBmCAhDk5OYo+gHgINgCSJGkaAWEAKuRjbcCDpA24cN5cMQqqgpFEax8BYQAqNGTnoJcvXcT+vXuQLc5BVVCSaK0jYPFnAGkJcTh65BgKvULQu2ML5BeUv9LLy07H6aNRuBSbhMhe/RDi46p1ukr9BYFKIWDxKwA3D1dcO3sMC77+Hw7FpJQDhQf/rt+X44cf5uF6nhPqeTqjgO6XMjIyFEtAfAiYmpIClgyUIAhYGgIWzwBQxxO9B/RDXbdcrFy4DMlZ+cU0LMzLwP7Nv2D1+j1o0eMejBzcA3Xs7XDxwnksW7SIVg6HFV2AhfPnYsfWLQpTKH5YvggCFoCA5TMAms39m7TGPb3bI+7UbmzdexyFNKsjPxO7f1uB5as2on7r3hg1YiB83Z2RnJSM+bNnY9+eXcrhH8/8MZcuYcWypdhJTEC0Ay2g10sTihGwfAZATS2EPToOHY3Iug44vHMzLl9LxP4Na7Bq3RZ4Nu2J+8eNQKC3m3Lnv2vHVly9ElPq/p+3ATl0EHg46hApBt0oBk++mBYB5uMSjEPAKhgAQ2Tn4o+JU8fi5sXTWDLrK6xYux55vm3x8guPKoNfB+PVmBjd13J/U5JTyEZgYrl4iRAEtIqA1TAAWrvDqzFZ+GnmhbOnz8DGJxwvvTgNjrhzJsBEdHVzV6Wlo2MduLi4qKZLgiCgNQSshgHwcvHa2eO4npxFsv32aNC8Bbxd6pSiF+/v2QyYk5NTqXj+wcZBGjRqhLqBgeXSJEIQ0CoCVsEAbGxtcPXkbsyb+xOS7fzQpUtbXDiwDaeu3KK9fmnSNW3eHPeNHQ8PD0+wi3AWA+aDwMjWrTFg8FC9zKF0CfJLENAOAhYvCKTM/Kf24sd5SxGX6YSpj0xFiHMKEq7OwfKlqxH50iNwoGPCkqFn374IbdoEly5eRHZWFgICg9AwJASenp5yC1ASKPmueQQsmwHQ6E+6+ifmzV+Ms1fT8NSMj9GxAe3xbQrRo3045v+yCat39cHYHo0V4R8dNdkOYKOQUISSPQAOYhxUh4z8tTQELHgLUIjEq2fx86LFuJZihynT/6kMfpbyKyiwQccBg9Ek0BfbVv6ES4kZep1/8PKfP3L3b2ndXtqjQ8BiGUBGYhx+W7EUJ2PSMHD8JPRuHVJili+Eg0d9jB49AIW3zmH9hh3IzC+9DeBBfy0uFiePH0NOTrYOL/lrRggQiSQYiYDFbgFsbO3QvH0vtOzrj6ZNQ2FHB4ElAw/wkPb9MXWaF+zc/XmdT8l38rA68P49e7Bz+za89K//wNfPseTj8l0QsAgELJYBOHsFoGO3AMNEsnNBu2499echhsAKQUm3bolVYP0ImTy27A2OySukwQpY7BagZmih8wwka82awVNKMTcELHYFYCzQbBU4LDyCtAEd4Ows0n/G4inPmycCwgBU6MJWgdt26Ih2HTvJFkAFI4nWPgLCAAzQUO7/DYAjSRaBgJwBGCAjqwHzR4IgYKkICANQoWxubi4WzJmNRyY9gBvXr6vkkmhBQNsICANQoR/P+3YkElynTh1ZBahgJNHaR0AYQAU0LBIDlmvACmAySbJIAhoPuzAAFQz5GrB+w4bo0KkT6jiWtw+g8phECwKaQkBuAVTIxdeAnbp0RbsOHUQOQAUjidY+AsIADNCQ9//8kSAIWCoCsgUwQFm+CcjKzBR1YAMYmTJJbmiNR18YgAqGrA147PBhrFy+DGlpaSq5JFoQ0DYCwgBU6MfOQaPPnMaWjRuUVYBKNokWBDSNgDAATZNPKi8IGIeAMAAD+LFtQBEEMgCQJGkeAbkFUCEhSwEOHjYcvfr2g5e3t0ouiRYEtI2AMAAV+rESkLu7O/kH8JBbABWMJFr7CMgWwBAN5Z7JEDqSZgEICANQISKbAz998iQ2/LZOsQ2okk2iTYiA6AIYD74wABUM2S1Y1MEDWPzTAqSnpqrkkmhBQNsICAMwQD8+B2CnoOUcCBp4RpLuHgKyQzMea2EAahhS76rj6Ejuwt3EHoAaRhKveQTkFkCFhKwN2KtPH7Ru0xaeXl4quSTalAjIGYDx6AsDUMGQl/9+/nWVj0oWiRYENI+AbAE0T0LrbYCcARhPe2EAKhiyKbAb16/h9KlTyM3JUckl0YKAthEQBqBCP1YH3rltG7798gskJyer5JJoQUDbCAgDUKMfrQByaObPSE8XUWA1jCRe8wgIAzBAQt4GsERgketwAxklySQIyC2A8bDLLYAKhiwAFNmqNVxcXODi6qqSS6IFAW0jIAxAhX62JAfQum1b5VPkG0Alo0QLAhpGQBiAAeLJwDcAjiRZBAJyBmCAjNnZ2Ugng6DKOYCBfJJkGgREDsB43IUBqGCYRybBVy1fiheffRoJN2+q5JJoQUDbCAgDMEA/PmWWbYABgEycJLcAxhNAGIDxGEoJgoBmEZBDQBXSsXPQ0MZNkNUzC45O4hxUBSaTRssZgPHwCwNQwZDVgdu0b4+IVq0UWQCVbBItCGgaAWEABsjnSAZB+CNBELBUBOQMwABl2TlopjgHNYCQJGkdAWEAKhRkbcCjUVFYuWwp0sQoqApKpo2WWwDj8RcGoIIhOwc9G32myDloVpZKLokWBLSNgDCACujHpsEkCAKWioAwABXKkgwQ8vLyFJsAIgykApJEax4BuQVQIaGDgwPGPTARo8aOk2tAFYxMHS2LM+MpIAzAAIZyDWgAHEmyCARkC2CAjMWegQzkkSRBQMsICANQoR6rAJ84dhSrV61U7AKqZJNoQUDTCAgDUCEfOwc9wnIAS5coNgFUskm0IKBpBIQBGCAf2wVk02DiHNQASJKkaQSEAaiRj46YHerUgTMZBRVZADWQTBsvkoDG4y+3ACoYsjZg1+7d0bR5c7h7eKjkkmhBQNsICANQoR/P+vWC6ysflSwSbWIERA7AeALIFsB4DKUEQUCzCAgDUCEdi//eSkzE5UsXwQZCJZgfAnIGYDxNhAGoYMjqwFs3bcTnH32IpKQklVwSLQhoGwFhAGr0o+mF/QKwLQBRBlIDSeK1joAwAEMU5DWmrDMNISRpGkdAbgFUCMhCQM3CwkgIyBbOzs4quSRaENA2AsIAVOjHEoDtO3ZSPipZJFoQ0DwCsgXQPAmlAYJA9REQBqCCHR/8sWPQhPh48I2ABEHAEhEQBqBCVR70G37/De/NeBNJt26p5JJoQUDbCAgDUKMfrQCyyBpwSnKyuAdXw0jiNY+AMADNk9B6GyC6AMbTXm4BVDAscg7amJyD9hLnoCoYSbT2ERAGoEJDVgdu16EjWrVpCyfxDqyCkkRrHQFhAAYoyAZB+CNBELBUBOQMwABl+SYgNydHdAEMYCRJ2kZAGIAK/Xjw79+zG/Nmz0KqOAdVQUmitY6AMAAVCrJz0IsXLmDv7l3IzspUySXRgoC2ERAGYIB+bBasyCCoOAg1AJMkaRgBYQAGiMfOQdhBqNgDMACSCZNEU9t48OUWQAVDe3IOOnnqw5jy8COiC6CCkURrHwFhAAZoyCsACeaLgEgCGk8b2QIYwJD3/2wYRIIgYKkISO9WoSz7Bjx2+DBWLV8qvgFVMJJo7SMgDECFhrz8P3niONatXo2MjAyVXBItCGgbAWEABujHp/9yDmAAIEnSPALCANRISPt/VgLy9PSUcwA1jCRe8wjILYAKCe3o8K9j5y5oFBoKN3d3lVwSLQhoGwFhACr0Y3sAwQ0aKB+VLBItCGgeAatgADY2hTi5ZzMu3cxASaFe3uMHt2iPyBYNYEeHfuQGRIKGEBBJQOOJZRUMAFnxWLVoOS6n5cDZkfX7bw916kHZq1aieadBmDJ5DHxc7+j+66wC8w2Ar58f2ECIBEHA0hCwfAZAh3mp164iMTcP9SK7497erYu8fdFSoDA3GyejduLg8f04eCQSA7q3gu5UNJ90AFYTc9i0/g/MeP9D+AcEWBrtpT2CACyeAfCS/8rlGOSSi+8WHXqTma+muvmfUmzQonk9nHvjQyQnJYOt/+sYAPeNYklAkTllOCRYIAIWzwBAwzr26lViAA5o3rwBCspsHPMyU5BV6ABXd1fIIl9bPVz4svH0sngGYJObiitxt5Dn0gCRoV6ok0fzPC0L8rNSce7UESycNRuOgS3QunVEqdmffQNGtGypOAZ1cXU1HmkpQRAwQwQsngGk37qJW+lpsMmIxdMTxpcmAd8ChHfGxCmTUN/LsZQncFYCYovArdu2E3sApVGTXxaEgMUzgIT4m0hNSUVQs1Zo5O9B+3/dDUABMlKTcDHmHI4cOowg395wd7oDB3sEio+/gXxaMfAKIKhePbkJsKCOL00pQuBOj7dIRAqQmBCPtNQ8DH90MvqG16MzAGoobQFsCvORnnILW5bNxMbtmxHarDk6htVXDv4unDuHtb/+guvX4hSLQK5ubspKoP+gwXBxcbFIpLTYqDLHOVpsgtLf+LCZbVAWsuo5n1rfxWDRDKAwLws3b9xAqp0PQuq6IV9n4IOYQCEh7eLhhyaNgrDuSHyxyi/P/LO++wbx9JwuJCYkIP76dYVYw0eO0kXLX0HAaARuXL+GP9auVRzQ2tjaYOa33ykrzU6dO8PevvaHZ8lbL6MbY24F5GamKysAz+D68HYsDaaNjS05/QCZ/j4EJ0dnkvf3VAb4RvIIfIMGe9nAjkKPHo7Ctbi4skny20QIaP0W4FZiIubPmY3tW7coZufySFYl6tAhPP/Mszh5/PhdQbX0qLgrr7x7L0lPS8eNuBvw8A5UBq6Tg+6irwDJ8bHYtek3HLqQjva9+yCsSZBSsYTEBNUKZpJUYEpKMgKDivJmZmYWrxz4IR9f32LNwezsbCWN1Ym5ozo5u8D19m0CL/kSEm6iIL/I5FgdR0dF65ClD/mTRn4I+HkOLIHo7uFRPBtkZ2cpZxpKIq1jvH18i88mSr6T051pu6J7J/++SWcaujWmI72TlZyU5Se9Mz0tTfGGzPlsaSby9PIuLpfbnZ6ezknKGYqXlxccmHtSYPmK1NSU220pJA1KZqZ3lKdKvpO1K13dXOmdtko7S76T280SlzoLTBkZ6chQ3llkmZkxqHPbSxMbak2mlRr/5cB5dTc1XA4PrIICluqwQR2S/HRzcy8ul9vB7SkKhUSzO+9kembQgTEVoeTnrR/jxIENxCQW9w1aPRK2uncyjXnlmJeXSznpnVRPxkDXlrS0VGRlZinl8H/+desqA/740aM4Fx2t0ECXyPTIonp88/U3+Orbb3TRtfbXohlARnoS4hOSEHthA947sL4UiHYOjvDxq4tOfQZj+IihcLuNhBsRXS3Y2dnDwd5BSWbi8orgt9W/FhNw+sv/UAYrZzh75gx+X7MaTHxeynXt0RMDBg9ROj7/nj97Ni37EpXffN048cGpSodmCcTf166hGeCY8h4eFGMfmIjAwCKmc+b0aaxYslhJ44733IsvExPwUX5fOHcWa39ZRe9MUzpfj169MWDIUMWmAV9rfvHxR8qg5kHCNxz3jh5DA9lBYTabN6xH1MEDSjkuLq549K9PFpfL8et/W6e0k9/58GN/QUjjxkreOJKxWLFsCQlSJSltYQ1KLpfzcdC9k7+3JV+Lg4YOpatVF/K1kIUtmzbi0P59nKQwkn++9oYyqHgQHNi7V5HCZJwdiXGMGT8BzVq0UPLyCm3NLytpdZeg1Gnfnj0Ydu9IJS2HGOfcH2YqjJojWoRHKGnMQHgQ79m1Ezu2bC5uyyv/eU1hlPzOY0cOY/26tcrg5MF/z4h76Sq4lVIuO4f53ycfFw/qnjRpMLaMJTOyJQsX4FpsrJK3CZ0njR43XmkLM/BtmzZh/949xf3kTZIszczMoEkpVqE5v7tk4N/79xXhUjK+Nr5bNAPw9A3CsPEPIaewNMAMpB3NYN6+/mgYGgpnB5qROJKI2bVHL+zYuu02N+fIosBE4Rneg+wDcGDC8+DhWYBnNA4lCWlnb6d0LBY84k5Q1segs4szcnJc+ZU0Szkpf28XQrOOE5VbxIh4sNjZ6lYuIGbC7yxK40FW6p3EoJxp8PJBJ8/i/E6upxLoL9eVmRjH6WY2TuMyeBWiK9fZ2bm4o3N6UTvdlHw8szIz0QX+ziuNXFq+FhYWKOUUv5MyuVJdlfy330nzedGj/M469E6qLxWMPFpJlGyLDltbajvXtaQuhq1dEVPQzbCcVxe4DK5PHg12Dowla3Yqgd9JdNfRjBlCyXcyY+a0fFqZ8Qxfcg/O+3NuS1FZRPsSPiO5DF756PBjhlWy3CJsdf2E6KHQhFc26jtw3WqnqOK1978NEet2D6m9l7SJiESDhg3x4LRH0bBRSO29qAZKZsIxp+fZQEdEhqh5WBgmP/SwsnzTDQA+F+Dlp65Te9LSWNcpc8inIKcVKtcOtAWgTsEdkwOXm3TrVvEsyZ3JnZaM/B7+8DKVfRJy4HfxqkQ3ALhcnnE48JUmL8d5kHAo904ayDyYdUE3Y/Jv7mBFA4FOoOmdrPTEsycHrh8zOl1buJ26ZTN3Fg+qK5tN58DLcK6Pbsbnwcrl6kKpd3IaYcDl8zu5TN1Wh3/zSkaHOS/HeZZkbDmOZ2TdQOd3njpxAssXL0Qczbpvf/ixsn3gd3I5vD3gU3UOdxhJ0WDjMnXLccbP2/vOO3lVojP/xu/kdugGIrcvKelWMa1L0pPTeNvG7uQ4MDZMM11beCvDWzdCVknniYSf2bl9GxbO/bEYOyWR/uO0e4YPw3sffqiLqrW/Fr0CqC5qvfv2w9UrMcrykffQEa1aKUtmXp6XDNwJ+KMvcMfRdZ6y6dxJmVmUDBzHgTuNoW2IUu7tJX/J5/m7oXdyOnc8fUEZYNTOkucFJfMZaifPkmXbUvJZQ+/kAVaSWZR8jhlXSeZVMo3fyQxTxxRL5uO2MFNUC7yi4o++wDM3f/QFZoY+dN6iL3CabmWoL71sO5nWvE07fPCgwkD5GR2z5cHv7e2NJ558Ul9RNR4nDKAMpEycyNat8cqrr8OD9o06Ll528Jd5TH6aAIHbPNMEbzbulQk3b2LBj7MRfeY0uvXojsaNmyin/8wEmjRtiskPTkFoaKhxL6nk08IACCg+yeYZn0+EedAzIdgWoARBoCYR4Mnk4oXz+ImW/bFXrqBPv7545rnnEEKDnSce3sKVPJupyXerlWX1DICXXEejDmENSf6F0YnxmPsnlDr8UQNO4k2PAI0nTYWz0WewYukS5epvCN2GPPf3v6MhnY1xYOZgaPCnJ8fj9InTSMnKhbOnP1qENYWXq/7tSlVAsWoGwKBfOH8OyxYtRDodSAUPblC8F6sKiJJXEDCEAM/ufC285KcFykpzxKiReOmVV+BHV7wVhYzkG/hl/vdYuX43EhJTkEeHyrb2dIMV0ABjHn4CYwd1hiPdOFU3WD0DOHzgAAmypGIYifh26dZdGEB1e5I8pxcBnmRYevRHkk1g3ZIx48bivzNm6M1bPjIDH7z4GBZtOQ3vwBD07j8MTet5I+naBWzcsAlvTn8aOV/NwcP9i2QVyj9fcYxVMwBe/o8igY0WEZFo2ry5LP0r7i+SowoIcP+6fOkSfpz5PV2VpmL8hAl45vnnKlVCXuZNfPbSY1hz5BZGPvoCnn5sIhr46SQsC/Hg5IOY8fp/8cP/ZmJC/89w57K3UsUXZ7I6BsDLsdSUFOX6jgU0+EqpVZs2yiFMMSryRRMImPMtAPczliVhWX+W6Rg7fjymPf4YXSUWSW1WBPDh3xdg1roT6H3/U5j+9DQE6kRVlQdtENC0PR4iuZpG+y8hkURGgu/Ys62o6FLpVscA+PR19coVCGnSRBHNZQbAxJIgCNQUAtyfomhruernZYq48uN//SsenvaIcr9fqXfkxmP5ii2kzBGMSY9OKTP4dSWQ45oBo+ij+129v1bFAFgy76d5PyqnsP6BYuW3el1GnjKEAC/7WXeCD5ZZQej5F1/AlAcfVCQgDT1XMi354kn8GZsA385D0LVxxQeFJZ+t6nerYQB8t794/nxl8Ldt3x4DBg2RPX9Ve4vkN4gAH/id+fMU5s36QRFxfpFO+qc89KDBZ/Ql3rx6nTQzc9C2TVeQmkqtBqthAMyZx5FWnQ9dvXTt3sOg+GqtIi6F1xgCNN7MJrAQz5+knzB31kwSJ3YEL/tHjx1TrfplZmUr+gBqYslcaG52JukmJMHBzYfkAYpUlqvzslrmL9WpUs0+wwoaPPg5sEroqDFji/X5a/ZNUpq1IsCDf+f2rZj5zVfKqvLRxx/HA5MmqupWVISTj583KRTZk4xKNIp6bpknyJxddNQOfPT2+zhw/nqZxKr9tGgGwIYq2Lbf8aNHipkAwyOHflXrJJJbHQEe/NvJvsC6X39VtAGf+/t0TJg40aBCl3ppRSkBzcJQz8MV57ctx96zN8tlT4o7hyXzZuHYjXzF0G25DFWIsFgGwLM+D342ysFql0woCYJATSLAOiRbyajJGjLCwqrEH5Aa+cj77lPVEK3su+08m2D0PZ2QmXAO7/zzH1i1/TCycmktUJCFw9vX4tUXX8SGE6l48JEpCPE3TmfFIs8A+DCGCbPpjz9QNyAQQ4YNN5oolSWe5LMeBHZu20o2CRYpqsDvk+5+rz69a6jxNhj25Bu4fuUyvly9H68+/gD+SVtZNmTLBmG86jbAQ8//C6NJDNjByHMQi2QAfKvPhkfYBFWP3r0RSuqWEgSBmkKADbbsolXlymVLUS84GE8/+ywdLHerqeJvl1MHj8yYi7aD12Hjtt24ePka8hw9EEnm4/oOHoZWjQNr5H0WxQB45ufAe/wmzZrhoXpBiskpXXyNICaFWDUCLEXK9hH5UzT4n8Fgsg3Ih3Y1H2zRrs9w5VPzZReVWBu1rq26GiyX92N/njxBGlb+CCKuzIFtuEkQBGoKATb79duaX7Fz2zbFfNlrb7yBTl06F1smqqn33M1yLOYQ8PChA4rSxZJFP5FNvSKbeXcTSHnX3Ufgbkpw8yEyH/Zt2bhRMRrzPWn3denWVdODnylmEQzgKsn3L5gzB7lks69L1+6qNt/ufheVN1oCAnyjtGj+PMVMeaNGjfDJ558r2qOWsLXU/BaAiRB79QpZhfVHl+7d0a5jR9Hpt4RRZyZtYOvNq35ejj07dyAiMhIvvPQiIlu1NJPaGV8NzTMAPvDr1KUr6tYNUCT8DJlVMh4uKcGaEGBDHmt/XYW9u3ahJVmGfm76dOprXSwKAk0yAB70zJnZDDbbi+fQ6C5ZUbUo6mu8MbWpC8DOYVcuX0pSpEfRpm1bvPZ/b6Ap3SxZWtDkGUAsuaP68tNPsHjB/GJHDpZGGGmP6RBg5yDs6ovt9kfSsv+zL/+HZmQxyhL2/GVR1RwDYI8xs7//Vtn3u5CjSZ1DhbINk9+CQHUQYIcdn7z3Lk7QzM/L/bfeeafSVnyq8z5TP6OpLQBz4IPkNDEp8RY6d+uGIfeIiK+pO5AlvZ9vk+bPnqVMLj1798L0F14gidKGltTEcm3RFAPgvX9XOulnx5vNmrdQXF1xnARBwBgEuA+xefiVS5fi3Nlo9B8wgGz2T0djMhtn6UETDEBxy0WzP/uCY8eLbNCDVwMy+C29e9Z++7gPXbpwHkvJZv+lixfJDfk4PPm3v1mNzQizZwDseZaNKwYEBpErpf4KA7DEw5ja7+qW9wZjF3/cj/g2ac733+EqHSyPvX88XvnnP6tkv0/rqJr1ISC7gf6FhDC2btqEw+S+i733SBAEagIBnvljLl/CO/99A4mJibhvzBjFTx+7L7emYNYrgJPHj2E3SWCFNm5MHlXuV2SwrYk40lbDCNAEXq3Aor2nT5Hxztk/IINUe0eNGY2nnn5a1X16tV6ikYfMmgGwuuXAofegRXg4QogJyNJfI73KjKvJq8oTx45i1fLlYDfdk6ZMIQOeT1jl4GcymTUD8POvq1jzcaCDPxn8ZjyqTFS1qp4B8LKfvfX8vGSxYrOfRXvHPzDBqleWZsUA2IIvE4jFe/maj4PI9ptodFnYa1lgLPrMaTLbTTb7yX4fX/NNJocdPLlYczCrQ8D9e3Zj9nffkg/1pcrprDUTRtpecwjwNfKBfXvx2QfvK1fJj/7lccVRp7UPfkbYbFYAfCLL/tOdnV2U6z43d50n1JrrCFKS9SHAhjx4YmFXXaw89vC0aYq3Hmfn6vrTtSwMzYYBkMlTsuPXXPHU265jB3HbZVn9zCSt4cHPevxryZIP7///9swzGEdeetlzj4QiBMyGATQMCcGkh6bCxdWVOLUQSDqocQjwVd/2zZvIht9qONDM/+/XX8M9w4ZZ/Z6/LKomZQDsPZWO9+Hp6alwaO9K+k4v2wj5LQiURIBFxrfR4F9Ky343OlD+96uvYsDAAbChg0AJpREwCQPgK71zZ89iwZxZ4Ku+yVMfVpwrlK6a/BIEqo5AFp3wb9+6RZHtDwoKwhN/exJ9+/eTwa8CpUkYwI0b17Fw7o+4GR+PiFatFfl+lfpJtCBQaQRYb2T9779hI3148LPDjhEj74UtrQgk6EfAJAwgIy0daWmp6NqjBwYOHmJVyhf6ySCxxiLAVnx48G/duEGR6qopXg8AAAatSURBVPv3q/9B7759RYCsAmBrnwHoEdfiA78nnnoa3r5+yv6/gjpKsiCgFwGdLgALkP26cgX27d6NgIC6+Pdrr5J5+K7K+ZLeByWyGAEbuh6pFYsa2dnZ+ObLLzHzu+8V4Qtn0rIaPnIUepNKrwhgFOMvX6qBAKvwLiQ7/SfI7TsPfhrp5P6dXGWHNMI777+vWPCtRrFW+UitrADYf9rHH36EX1etKvackklLNBbG4EOatu07iDEPq+xuNdPohfN+xLno6BLL+0JlG3nfmLGK7f6aeYt1lFIrDODUyVPYQf7TWPOqbGD9/lXLl5WNlt+CQKURYLn+ssphPLGcOnFCESH38fWtdFnWnrHGGQALYMTFxSKeTvj1BSYeL9tqaeeh75USZ0EI8B1/2cGva94VMuqZkJBgtaq9Ohyq8rfGGQAThyWv+K/aIP/ki88RfNuDb1UqK3mtGwHuUx+8+x4OHjigFwi2F8kMQkLlEagVBlC/fgMyp9xIMbJYsirMEAIDAzFw0KCS0fJdEKg0Ag9Mmoj9ZBqeV5IlA/etULpd4v4lofIIlEax8s8ZzBkeEY6x48aRIc87xGDOzMR56R//MPisJAoChhAYNGQI7h05UrEZodsK2NvbowM5hX1g0iRFl0Tt+ez0ZLDLr1If2qqmZ2ajoFbuwtRqYj7xtXYNmJubi+10ELh54yawNx9/f3/0698f7Tu2J00/6zbCYD7k12ZNWIdk7Zo1OHb0GB005ypSf8NGjEDzFkVGZNRate2nj7F4G90elMhgY2uHhi1aok37TujWoSXcXaxLEa3WGIAOY74JYAbA1lZlf6ZDRf7WBAJ88s+HzpWz5FuIt6b2xbpoW0S2joTT7aOC/KxUnDkTjSw7T4z/y/P424RBsLerlYVxTTS5xsuodQZQ4zWWAgWB6iCQfxXjOw6BY+exmPH283BHgVJKIQkQ3bj8J2Z+/gl2nc/Hx/N/RLdG3tV5gyafqXFWl5JwFf98cACaNgzBf2b/pklQpNKWh0DW+aM4lWULP/Ly28jXW7kqZHkBX9JGDe/QG5MmjYMvrmLRir2W13gDLapxBnB002Lsj85AcINgxJ2LMfBqSRIE7h4CZ0+ehJ2DPZo31X9O0Kx5M/jX9cexk1F3r1Jm8KYavQbMSzqHWXNWoUmXnvAqTELUpfNm0ESpgiAAHDp0FA72TmR2LlQvHM5kOITlV5JSU/SmW2pkza0ACrOx5It3EJ3siMHjJyMy2BfpMZeQYKnISbs0hEAKTp2Mgb1LfTRT2d/n0IEiWw/287IuMeIaYwCxhzfi6+W7EdpzJIZ3b426Qb5wzLqKUzfK6wNoqOdIVS0AgcKEyzh2LRNOTSLQwFV/l78acwXJScmIJAM11hT0o1FVBApS8OMPC5CY6YpHn3oETiSl5eNDDMAhCyfOJ1a1NMkvCNQoArFnTyOV1NNbtm4PvRIo+Rk4cuQIYuNtMXJ4lxp9t7kXZjwDKMzDofWrsPPEZfR87CX0buCqtDmYpP5cnB0RfeyMuWMg9bNwBC5ciEFubj4i2+mZ3QsLcPHEAfyxcQeaDByFzoHiHbhK3SHtZgzWrP0D1xKy0MExBQvmzlWez4w/h9TMXBw/fpR+96xSmZJZEKg5BHJx9twF5OR5oGO7RqWLpcnrzJE9WPD994jJqYt/PjQGLnX0rhFKP2dBv4y6BSjMz8GxvVuwbfcxZOdkY/mXH5SCho0x5pOL73SKLVoXlEqWH4JA7SOQdRPnryQgvzAHc958CUvZAw2FQv6Xl4OYi9FIs6uLv5KvwM5hjUiLtfarZE5vMIoBpKXcxOolS+DeajDeenYa6vvdcedlZ5eHH99+BbPXncLllAKEexi/2zAn4KQu2kAgLT6OVqeJpDOQgm1r19yptIMbIiMj0OHehzF22EA0DPSFgxWJAOuAMIoBnN6yCGuPpuHJ14aiXesw1CnDPZs1J466+iBOxyQjPNJ6xCt14Mpf0yPg1qA9vluy1vQVMdMaVHtazr11Fp99vQThJPTTr0fncoOf29uMxIFtbAtx6cwlM22+VEsQsG4EqrkCKMDx7X/AIbg1ho8diyYBbnpRrB8WgXbt28OxMFNvukQKAoKAaRGopjZgIW7GxiA91wa+AUFwc9LPRwpy0nHpynW4ePkhwMfDtC2VtwsCgkA5BKrJAMqVIxGCgCCgQQSqfQagwbZKlQUBQaAMAsIAygAiPwUBa0JAGIA1UVvaKgiUQUAYQBlA5KcgYE0ICAOwJmpLWwUBQUAQEAQEAR0C/w/+VAeeDKYMswAAAABJRU5ErkJggg==[/img][/center][justify]É necessário representar a projeção ortogonal do trajeto percorrido pelo inseto sobre o plano determinado pela base do prisma.[br]A representação da projeção ortogonal do trajeto percorrido pelo inseto é[/justify]
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Information: Exercício 02. Trajetória do Inseto