[size=200][b][color=#1e84cc]Problema 1[/color][/b][/size]
[size=150]Sea la gráfica de la ecuación 2y-x=1[/size][br][br]¿Los puntos [math]\left(0,\frac{1}{2}\right)[/math] y [math]\left(-7,-3\right)[/math] son soluciones de la ecuación? Explica o muestra tu razonamiento.[br]
Prueba si los puntos son solución de la desigualdad [math]2y-x>1[/math]. Explica o muestra tu razonamiento.[br][list][*][math](0,2)[/math][br][/*][/list]
[list][*][math]\left(8,\frac{1}{2}\right)[/math][/*][/list]
[size=200][b][color=#1e84cc]Problema 2[/color][/b][/size]
[size=150]Selecciona [b]TODAS[/b] las parejas ordenadas que son solución de la desigualdad [math]5x+9y<45[/math].[/size]
[size=200][b][color=#1e84cc]Problema 3[/color][/b][/size]
[size=150]La línea que limita la región en la gráfica, representa la ecuación [math]5x+2y=6[/math]. 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[/img][br][br]Escribe la desigualdad que representa la región.
[size=200][b][color=#1e84cc]Problema 4[/color][/b][/size]
Elige la desigualdad cuyo conjunto solución está representado por la gráfica.[br] [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAN0AAADgCAYAAACHIGNpAAAgAElEQVR4Ae2dCZAV1bnHqZeqVzGJ0WclLxqfSpTgCyhEQFQMIgw7KOA2ghJAZVEQKNEYNQ+MzAYMTHBhZxi2mYEBZmGAAQYGBFQQVHABDWrccEmqqFhJWaZMfa/+Daenu6dPd98+l+HO3P9Unenl9Plu97+/3/lOn+7T3UL4RwWoQKMq0KJRf40/RgWogBA6OgEVaGQFXNB99913wpR6Gnz77bcSlnjeUu+8qXPiZdqG7uTJk7KmvErKqrcYpaKStbJ0VYmRDewDbKxcuz4pdkorq43soHwyjgnHE8fOmspqWVBYZKfsmflS8Pw8exl5cc4b9qV4fUWsss7fi3NMzvKYx34kw06q+V/F5hr55ptvXNy5oCuu2S1/OviFUZpVc0hmVr9sZAP7MKNit+TveMvYTm7xRpnz8kdGdlAedky1wfHguILsDJs2V6ZWHbC3ya17VwY/8oy9jLKdB2ZKnzFTXOuCbOryctduk9kv/tnYTs7y9cY2Zr/4nuSVbTO2k2r+t3bzdkKnc8Cg9Y0J3dXd+grAU/vjBQxAtmjRQs459zwBkGq7OFNCpw8wyar0CV3MKN6Y0CGCqSgGwL7/ox+74AKE/3nOD6yktosDHMoQOkLnqrWTVdM0xeYloh2gAGDOpiUg/HnrNtI+4xa5YchwuaLDDS4gE4WP0BE6QnfwC5mwYIMFEwC74KJLXJogz4LxlrulzwOPWMBhu0RhU9sTOkLncp50jXQAAhEMUc55badAwbTzaeic6+LMEzpCR+hOX3MiwqEZqQOJ0OlhYe9lzI4LOFs6RzpAp5qSfuAROkLnqpFTraZpah0p6DhB89IPNrWO0BE6l4MQOr1DBN0cx/Vbt2FjrFsEYZ0jhE6vcar5H+/TxWzuNsZ9ukdX11pNyig3vAkdoWOkiwhzUKRTTccoU0JH6AgdoXP5QJSKw7sNn72M6ERe4bCcam3qptaR4qepdx0jHSOdq5YjdHqHYPNSrw0jHSOdqyJpjI4UbzQLWmak08ObapV+aO9lUfkWmb3rmFGaUfGi5K2vNbKBfchds0VmVr9ibCenaJ3Mqj1iZAflYcdUGxwPjitRO/k73pSZGKd4OnXqdav0vGe0vYz1idrE9jkrKy0bcco6y2QvKY71+04bOIacVZXGdlLN/1ZuqAoeTzdvRbHkrd9hlDCgMbtwrZEN7ANOZO6qSmM7WfMKJXdtjZEdlIcdU21wPDiuhO2UbZPswjV26vCbm6XHrbfby8hL2Ob6HZK1YIXklmyKVdb5e9OfW2RsI7ekWrIWrjC2k2r+t2RlSTB0HDnu32xh89JfF9UE5shxvT6hzUtC5y8eofPXhdAF6wJ9CF3MDiJCF+xcjHR6fQgdoXP1ynI8nR6WZI1yIXSEjtBF9AFCF1EodY3hnPKJFH1tzkin14bQETpXhOLNcT0sTe7mOHsv/U8mO1L8dVEtCnak6PXhNV3MiEno9E4F8AidXh9CR+hczVRe0+lh4TVdTFhQC7MjRe9YhE6vDaEjdK4IxY4UPSzsSDGAJVk1DSOd3kEZ6fTaJMv/eE0XsxJgR4reOdmREqwNoUth6PAFnrD3XaouejYv9Y7O5mVMJ4dzJSu8N4XmJd7mfNPQ0YQuHT8Kubi0XGZtOWiU8tbUWD2GpnZyV5bLjPU7jPYF+5C9eLXMrH7JyA7Kw47pMeF4cFxOO8+sq5PL23WQcTMXWFNnnprHiPO8su126ti9j2Tcca+9jDy1bSJTDDbGSOtEyvhtm7WgyNgGKtmcZWXGdlLN/wpLyoIHsS4q2SAzNx0wSnmlWyR3dZWRDexDzooNMmNdrbEdC7qqfWZ2qvadgtdQGxwPjsupcceMATL5+ZUyNm++XH7VNa48e7uqlyQXldnp1PHmXtLj9nvsZay3t01gHy3oynfHKuv8vaz5RcY2ZpTvst444LQbZz7V/K+weG0wdHwMzP9a4Ux1pNyfv8z+6iqamLym4zfHXfeG1EV82DTVLmRT+ZoOkLXq2MVKF7dua31HHNd2YRqzI8W/coRuqeZ/7L2M2bFzpiKdEy5GuvckLx07Uti89K9BGwM6fEAkSpQDqIx0/ueJkS5mVFG1fzrdMlDHHHVK6Aid6xok1drUqXxNFxUy73aEjtARuohRnd8y0MPCbxlEdCJvDYxlRjq9YxE6vTaEjtC5ondjdKT4VWC6dWxe6uFNtUqftwxiViaETu/kqBj4uga9PoSO0LkiOMfT6WFJVu85oSN0hC6iDxC6iEL5XQPxloG+Nmek02tD6AidK0KxI0UPCztSDGBJVk3DSKd3UEY6vTbJ8j9e08WsBNh7qXdO9l4GaxMK3Xx8/njDTqOEQZoYAWxqJ3tJiTUY1tRO1rxl1tPrRnbKtollx1AbDO7FcSW8L2XbLU2hK1KHrjdLj0F3uNYlbHPDTslauFJySzcnvj8eHaY/t9jYBvYD+xPnOJxlUs3/Qj9/XFS+WWbXHTVKCMt567Yb2cA+4CTMrH7Z2E5OUZnkbz9sZAflYcdUGxwPjitRO/m1R1yvMbi21y3Sc9gDrnWJ2sT2OSsrLBtxyjrLZC9ZnfAxOctjHq+ByFlVYWwn1fxv5fpKjhz36+EMW8fmZXATijfH9fqENi85ns5fPELnr4uqrAidXh9Cx44U160H9l7qYWHvZUxYUBPzloHesQidXhtCR+hcEYo3x/Ww8Oa4ASzJqmkY6fQOykin1yZZ/sdrupiVADtS9M6JJjw7UvT6EDpC52qmMtLpYWGkiwkLO1L0TmVps3abzH7xzy4QsT7RxEin14yRLoZDwQHZvNQ7FfQhdHp9CB2hc0UxNi/1sLB5GRMW1MLsvdQ7FqHTa0PoCJ0rQvE+nR4W3qczgCVZNU2qR7qpVQdk2NNzrZRb964LLl2HBqEjdC5HSbWaJpWhA3BXd+sr+E7d4EeekZ+3buPSktDp4dJpk2r+x46UmJG3sXov8b26KNGOkU4PY5ODbt6KYsldVWmUshatlqyFy41sYB8wUjt7aamxnelzF1hd2ibHhS5x2DGxgbI4HhyXn52pi4rl/J/8t28eRkNPf36pna65/kbp3u8Wexl5fjbD1mHEN0aih20Xlj+94AVjG9iP6c8vNraTav4XOnJ81eadUrD/U6M0a/OrMrNqr5EN7AOG4GPEtun+wGHm7H3fyA7Kw47pvuB4cFx+dq4dcKcMnTrHNw+R1pmwbe/7JrnW+dkMW5dbWiP5dcd8fzOsrDMfo+qdy3Hm8/G2gDU1xnZSzf9KN27lyHHdtUDQ+jPdvOw8MFOGTZsb6XoO+8nmZTNqXnLkuP/JPJPQJQocofM/R6rSbHLXdITO/4SeKejQY3lx67bSd8yjdsK3x5UD6aaMdP7nCXoRupi9hRAvHe7T4ZYBIHMmrNPBptYTOkLncpJUq2lS+T6dgijRKaEjdIQuYkTnl1j1sPBLrBGdyK+GZqTTOxah02tD6AidK3qfqY4Uv0oryjo2L/Xwplqlz8fAYlYmhE7v5KgkOIhVrw+hI3SuCM7xdHpYktV7TugIHaGL6AOELqJQftdDvGWgr80Z6fTaEDpC54pQ7EjRw8KOFANYklXTMNLpHZSRTq9NsvyP13QxKwH2Xuqdk72XwdqEQrdi43aZs+9Do4SvjaKWMLWDr7miqWBqJ3flBpm9+5iRHZSHHdN9wfHguBK1M3v3ezJ71zE7XdvvNuk1Yry9jLxEbWL7nOJNMqv2zVhlnb+XXbjG2Mas2iOSW7LJ2E6q+V9x5ebg8XTWyPHSzdYnevGZ3jgpe+kayV68OlZZ5+9lLVwhOUXrzO1gdPTqKiM7KJ/13GIjGzg2HA+Oy3mcUeZzijdK1oIVdurQpat0HzDIXkZeFDvebaa/UCg5K8pjlXXamj53vrEN7EfWvEJjO6nmf6Ejxzm0x7+pwOalvy6qt5g3x/X6hDYvCZ2/eITOXxdCF6wL9CF07Ehx3Xpg76UeGvZexoQFNQ1vGegdi9DptSF0hM4VoXhzXA8Lb44bwJKsmoaRTu+gjHR6bZLlf7ymi1kJsCNF75xowrP3Uq8PoSN0rmYqI50eFka6mLCwI0XvVJY2/PyxqxKCJioROocYSpSoU17T1TuSVzNGOr02hI7Q2TUwwGHvpR6WVOu9nL1gSfCzl3wixf9ksiPFXxcVOdmR0lCfx5dvlGu7ZciESZMJnXKURKaErqFTOfUjdF/Ig8+vkSETn5S6j7+WT77+VvB39OhRqaur00P36aefysJVa13NGKewUefz1u+UvNJNxnZwImdWv2JsB9+Dm73nuJEdlIedqBrotsPxJMNBk9W8zF5cLLO2HzE+runPLTK2MWv7YcleUmxsp7H9r9e9Y+XSK1pLv0FDZPHixRZszn/FxcXy97//3blKWqglQqevzQmdXhtUMNOfXWAMS1OB7q6nZkn+jiN2RFu3bp2AHfydPHlS4WRPCV3MDhlCl97Q/V/lfuk1fKxc2qq13NjtZqvJaFPlmAF0gwYNkqKiInttKHTjJk+RwY/80SgNHPmQDBw+2sgG9mHAsFFyy+jJxnb633G3DHr4KSM7KA87ptrgeHBcYXb6P/i4XN2trzZdcNElcuUN3ULthP5O5r1y64OPGdvpd9udxjawH/0z7zW2kyz/u657b7lt7GQZPzVXpuXNkszMTJk2bZrMmTMnME2ZMkXOPfdcadmypQVfKHS/7nSt9kQHOYEzr03nG6XttTeY2+nYWdrecJOxnV+17yBXde1lZAflYcd5nHHmcTxtOnYOtXPldd3k3J/8TJv+43vfkx+cf0GonbB9bHNNJ2nbpYexnV+1+7WxjbZdugv2J2yfw/JN/K9lu07y00t+IRf89GfyXxdcID169JDBgwcnlAYMGCAXXnihtGjRQkaMGCFz587lNZ2ukyNofao1L3966eVyRYfrja+jktaR0oSv6R5ZXiNLjnxlXaNV7njR6gw5ePCgbNmyxep9tNuJEWfQvARsH374oVUiNNKx99L/2qWxocOHIR9dXSu5de/KsKfnWgnzqmIgdP7nCfpE6b1E9/51/W+3rtGm/GGaL05xoANoCjZllNA1gY6UYdPmCj6LfH/+MukzZoo1vaLDDXLOuedZEMKxCF086FREGzbqASsaqV5HBYhzGgc6Z3k1HwjdiRMnZMXGWrs2VbVqolPrFWiVu43tqFfwJfr73u1zV5Yn5T4d7HhtJ7qsXsGnKwfgkBDlOg/MtH8PUe77P/qxBSPKJgs69Qo+3f5EXY9X8EXdVredegWfLj/qeqf/IaKpXsdX3jmuOIg0feWVV+SDDz6ItK3aaNmyZfL666+rRSkoKJD58+frr+nQ3cnHwPxr0MZ4IgWgoZMAzoWp99vjWIfIh/xkQddcH3h+dut+KX35bat7f8mSJfZ9NJuGCDOA5/PPP4+wZf0mgA7Xc/gDcLi+C3wihdD5AwcnbwzoABWalPg95/UblpEQ+Qid/zk6FdHGye2jHpQDb78XqwOkHp1Tc3GgQ8nLLrtMAF/79u2tm+VNFjpc43hrfuWMYdNkDe2ZmPOs9B3zqJXi7kvQ54/RxRx0LLiuQzTENqkS6VA5DJkyXTIG32VXGEHHEJQX5/PHuEYb9ciT9iNYn3zyidWRUV5ebjm+F6REluNCN2nSJDnvvPPsDpUmCR2ucXAzeMKCDYFOqTuhyYAue9ub0qbTddY+IBphf/yikW4f1HoddIA4CDrk/7x1G/v423XvLzdlPmAvK/uJTk2bl4i+0OOB3//RahLjXCW6D2r7KNAhol0/8E55oaLWfqjY2xly+PBhycjIkG7duiXCWINt40CH1iJ+F9BhHn9NDrqnirdZJxPNqrMJnbd5iagTZ3900MHxAJ1qXipHVFM4t4pyWJesB55NoVP7h4e4oYdq/qr1iUyDoFv0+gmrex8PFU+cOFG+/PLLBpCoFaNGjZLly5efFejQpETTEk+uIDVJ6C5v18lqVqYadIg6yYx0cE6A3KpjlwaRAtHDC2MqQodzlKxINzJvsfQaPs5+qBjO641oCjLnFFEF0GFITWNHOnSgoGmJP9yrQ7TDX0pHurxdf5Zp1YesVPDqCemZOVJGPfOs5YRnA7rHS+tEJWekQ9SJ61xBkQ6RDM1WJHXtqLuWTTXoHn4m36o0Eols3m0R6TIfesSKaBl9+1tPhkQBzfLs00/4AzQ4fGNDh6Yk4HL+oXmq1n/zzTfOrPqhPdjgbN4yGDljsVw3aJiVnijbI+f88EfSe8R4ywERATrfkhmrMyXuNZ3aFzx8rKAzAQ5OFgSdckI005CCImkqQYfK4hf/2zZwf9Wxeae4RnuooNCKaO988qVs3LgxUkRzefDpBUQaPCc5efJkmTBhgvXAMZp6cf/iXNP5/VZKRzrnCUHHASJd798+ZF0noOkFh4/TaxgXOuf+ALoOXXvEjnDKVhTo1LZB01SBDsDh3Eydv6JBszho//vdP0laX32N3esIZ0WljxvScf/UtRSaeOPHj7e77uPaSzvocMKcb2M6G81Lp9MMnjxVzvnhD61rLkRdpDhNzOYGHZ6Subh1W7n8V1fZ2jh1U/OIaOoRLLzKAB0dr732mosHU+iUsbPRvFS/7TdtMpHOCx0iXFBzS51cv2kyIt0fNuyV0X/ItZp9qvkXJ+o2N+iUFrhloObVOXiseIfVGYKBn+h13LNnj59P2uuSDR0ilclf2kc6dSLjTJMBnbqmi/P7zjLNDTp1bOq9Lw/NW+eKaBhLFrUzJNnQmQCHso0G3cLiMplZtc8o5a7eaH2f29ROzrIyyVtTY7Qv2Ad8bnhG+S4jOygPO6bHhOPBcSVqB03tXHzC+XTq2C1DMobcbS9jfaI2sX32khLJW1cbq6z6vQeeKZDfZPSWiy9rKbfdNVTeeuutWOnAgQNSUVERq6zzN9Gc27Ztm7Gd6upq2bt3r7GdtWvX6t8GhppmaVmV5G97wyjNWFcreWs2G9nAPliOVLHb2E720lKZtflVIzsoDzum2sw8DU+idmZtOSgzKl60U6ce/STjrhH2MvIStYnt8Q10PJWfaNmsin3yQt0RqTx4TKblzpRx48YJoPn4449jp3feeUdqampil1e/vX//fqspq5bjTnfs2CFvvPGG8f5UVlYGQ3c2bxmopoqaOjtS1Lo4UzYv/R8ShpaJPJGiHiru8JubZd7y1a7WG8aemf6lbfOS0Pk7aDpf06leR3SGYJgMXmXg/SN0XkXql5ts72WcCKfKMNL5VyS6SDfm2dWScc8YadXmKvuh4noX8p8jdP66YC2hi/m6hnSIdIhos1ZVSL9bh1g3l6P2OsKxCB2hcz0dwUjnH+lwjdbtlttlzONPR45oOtcidDplGOlcMKrmZ5Rpc4p0iGi97xgqPfsNkCeeeELQa2j6R+j0CrJ5mYbNS9XrWPXmx3ZE++tf/2p5ycsvv2wPttS7TXgOodNrROjSCLpnNuyxB37iazJ+12iETg9Loz2RwlsG/tc/TaF5iYg2Oneea+DnZ599pvcqESF0enkIXcwIZXWLF2+0xsNFuXbTbZPK0PUZMV4ubXWl9VDx008/rfcinxxC5yPK6VWEjtDZnUCIaNf06C+/nfS4dY2Gx5X8mo56d6rPIXT1WnjnCF2aQ5ez813pPXycdY12Y7fucuONN8rUqVO9fpLwMqHTS0bo0hC6cc+VytLTX5PBwE9nZwhevkPo/IFRg1j9c6OvJXTNGDoMzp2wsNxKAK3bnSOsb1j3HzREVNe+11UInVeR+mVCZwBLOowywDtG8CFCfIX09vselPYdO1kPFR86dKjei3zmCJ2PKKdXETpCZ3eAoGdUjRy/e2qB/SqDB8afelcifAavkMMQl7A/QqdXqMlBN29FseSuqTFK2YVrJXuJuZ2sRSsFrwEw3Z+s55dITnG1kR2Uhx3TfclftUFeWF4sD0/5nTz22GOCd+5jdLJKrVq1sufVOkx37dolZWVldurevbvccccd9jLynNtHnce302pra2OVdf5GYWGhsQ3sR0lJibEdvMbPq6tzX6POQ1MMqo26vW67NWvWBA9iXVG1Tebsfd8ozax6SWaU1xnZwD7klW0TjJg23Z+cFRskv+6okR2Uh51E92VswXLpOfR+ueTyX0rljt1y/Phx64b0119/Ld6E5yDz8vIarMd2f/vb36xXieN14kh333234IPyahlTr70oy4AZH92Ism3QNhgdHZQfJQ/7gf2Jsm3QNm+//bb1prGgbaLkoWcX5yvKtkHbbN26NRg6PpGSnCdS8FDxpnc+s9/rqO6j/eUvf5F27drJ9ddfb30sUDWS8M5G9V0ztS5oyualXp0m17wkdPGgsx4qvnesDBkx1n6o2M8t8FgWOkn+/e9/WwnbJAocyhA6P3VPrSN0zbwjBRHt4T/OEnTv41UGYcNk8GVP3P9Rf7j2OP/88wWPb6mEp9LD/gidXiFC18ygu/OJGdY3rPOWr7cjmmo66t2gPscLHRwEkDkT1oX9ETq9QoSumUC36NAn0vKKX1rXaNnZ2bGfdfRCp3ed4BxCp9eH0DVR6HCNhmcd6z7+2opo+NQRupBN/widXkG+gs8Allk1h6wXmOqGyURdfzaeSHloTqFc2a6D9XIe57OOgC7KtZbepU7lEDq9QoQuTaBDRBvxdIEd0f75z3/6Nh0JnR4W5PB1DXp9UFnDf5x/LdQCapp0uWWAZx0vveLU12TQ6xj2R+iCFSJ0en3SFrqxf1ohi18/YUc0fHwwkV5HQqd3KuQQOr0+aQXd5MJqqzPkov+5RPoMHGQ9R6eXJjiH0AXrQ+j0+jR76CYt3dhg4Kffp4r0EvnnEDp/XdRaQqeUaDhtltBZj2DhVQZX/FJGjn2owVH7HXSDjUJWELpggQidXh8//2uSHSnTqg/aEW1paZnrVQbew/c7aO82YcuELlghQqfXx8//mgx0iGidet9qvZwnd+7z+qP05PgdtGeT0EVCFywRodPr4+d/LuhWb6mTggOfGSWMgZtZvc/IBvYBY/Lytx+RJW98Ljs/PCl9bx0sCxcutMZKfffddxI14RV1//jHPyJv72cX5WHHLy+RdegxxSiDRMpg23/961+uhGFATz31lGtdojax/b59+6yxenHKOsts3rw54WNylsc8xgy+9NJLxnbef/99wZg6r/1El3GecL4SLefdHn6DStv554LOGjm+slxyDVLWolWStaAoto0+mcPlpv63ys8uvEiKikut70fjG9Jx09KlS60u7bjlUQ41OeyY2EBZjCpYtWpVwnbw+8uXL7dT165dZdCgQfYy8uLsG8phpHWcss4yqAydy3HmsR9xj8P5e+vWrZPSUnO/wXnC+XLajjMfOnL8bN4cx+vm5m+sk+69+ljDZHCAeGzK9M8vvCdqk83LYMXYvNTr4+d/rkjXmNCpXkf1pmLvbp/J9w56fytsmdAFK0To9PqkBHSIaMMn/s4a+Ol8qNi724TOq0j9Mof21GvhnePQnoNfCCJa19vukeK9R+yBnx999JFXqwbLhK6BJPYKQmdL0WAmraHLrz3s+j7aBx980ECgoBWETq8OodNrk1bQDZzwpPUC1fL9b8ve19+0VEnkoWKvjITOq0j9MqGr18I7lxbQ3TbxSSui9ew/wH45z9GjR71aJLxM6PSSETq9Ns0SOlyj/X75RnuYzGuvveYaJtMUDlp/yvxz2Hvpr4tay95LpUTDqVHvZa/h46TzzT3tF6g2NH9qDaHTKSPWfUdEcNM/Rjq9gk3B/7T36RDRnN9HwwhrHFDYX1M46LBj8OYz0nkVcS8z0rn1cC6FRrrZS1ZJu6497e+jvffee87ykeYJnV4mvphIr03avpioYtNWMXmvIyQldHrHInR6bdIWOrw7xPSP0OkVJHR6bQidXpvQHEKnl4jQ6bUhdHptQnMInV6iIOjw9Z5Jk+q/yqq3wq/2BGnTFPzP1XvJ5qX/6TzTvZdwFIyPw+ePo/zxloFepSYHHUa5YgSvSTp8+LAcOHDAyAZ+f8+ePXLs2DFjOxjVjO/CmRwTysOOiQ2UxfHguLx2+vXrJ/iaaZcuXRrkYdsTJ05YHVRwKCR8+njixImudV6bUZbxyWHYi7Jt0DYY7BmUHyUP+9Fc/Q+VtvPPFenwujoAY5JwzwajgE1soOyGDRus72Gb2lm9erX1WgITO3itAeyY2EBZODmOy2ln9OjRMnXqVOvLrB06dHDlqe3wGgNAqVJGRoZkZmbay1ivtk1kilHNu3fvjlXW+TtFRUXGNrAfzdH/QkeOs3nprI/q55PVvMTnj/FdcbxOAAlPp6BZiT/cRGXzMj16z12RjtDVg+acSyZ0U6ZMkdmzZ1uRDcBNnjzZ+grryJEjpWXLltbnkJ2/7TfPazo/VU6tQzM11R+4J3T682fnJAs6b+8lIh0iHFJBQYG0b9/e9Xlkewc8M4TOI4hjkdA5xEh0Nt2G9rB5eVLSpaXFSBehNjhTkS7CT/tuwkjnK4u1kpFOr01oTrpFulBBHBsQOocYnllC5xEkkUVCp1eL0Om1IXR6bUJzCJ1eIkKn14bQ6bUJzSF0eokInV4bQqfXJjSH0OklInR6bQidXpvQHEKnl4jQ6bUhdHptQnMInV4iQqfXhtDptQnNIXR6iQidXhtCp9cmNIfQ6SUidHptCJ1em9AcQqeXiNDptSF0em1CcwidXiJCp9emyUFXXV0tx48fN0oY8ImHd03tbN26VV599VVjOxg0iqEeJvuD8rBjYgNlcTw4rkTt4PfxMLBKAwcOlPvuu89exvpEbWJ7nG+M9I9T1lkGYwOdy3HmsR/N1f/w7K7zz/XAM0Z84wWzJgmvI9i5c6eRDfx+TU2N7N+/39jO+vXr5a233jKyg/KwY6ILyuJ4cFyJ2sGH61GZqTRgwABBtFPLmCZqE9tXVVVZQ4nilHWWKSkpifX7Thto2TRX/wuELkH/mkEAAAGVSURBVF2GVjhrnSjzHGUQrBJfq67XB60+QqfXR5tD6LTSWBmETq8PodNrE5hD6ALlEUKn14fQ6bUJzCF0gfIQugB5CF2AOEFZhC5IHSF0AfIQugBxgrIIXZA6hC5IHUIXpE5AHqELEEcIXZA6hC5InYA8QhcgDqELFIfQBcqjzyR0em2Qw95LvT6ETq9NYA6hC5SH0AXIQ+gCxAnKInRB6jDSBalD6ILUCcgjdAHisHkZKA6hC5RHn0no9Nogh9d0en0InV6bwBxCFygPoQuQh9AFiBOUReiC1GGkC1KH0AWpE5BH6ALEYfMyUJxQ6MrKyuTQoUNGCSOjN23aZGQD+1BRUWENhjXdH3xSF+METeygPOyY2EBZDO7FcSVqB4NfoalKvXr1kqFDh9rLcfXG+cag40T3x7t9MrTBfjRH/8MbB1BpO//skeNY+dVXXzGloAaffvpp6OsQeO5S13edwGHeBZ03k8tUgAokXwFCl3xNaZEKBCpA6ALlYSYVSL4ChC75mtIiFQhUgNAFysNMKpB8Bf4f/ej9Mw0Emc4AAAAASUVORK5CYII=[/img]
[size=200][b][color=#1e84cc]Problema 5[/color][/b][/size]
[size=150]Elena tiene planeado ir a acampar el próximo fin de semana y ya ha gastado $40 en suministros.[br][br]Ella va a la tienda y compra más suministros.[/size][br][br]¿Qué desigualdad representa [math]d[/math], que es el total del monto en dólares que Elena gasta en suministros?
[size=200][b][color=#1e84cc]Problema 6[/color][/b][/size]
[size=150]¿Qué gráfica representa el conjunto solución de [math]\frac{4x-8}{3}\le2x-5[/math]?[/size][br][br]