Il s'agit de construire des triangles isocèles à l'aide du compas ou du rapporteur.[br][br]Cet exerciseur comporte 4 questions.[br]Dans les figures ci-dessous, le segment rouge est déjà tracé. [br]La longueur du segment vert ou la mesure de l'angle vert est donnée dans l'énoncé.[br]Les triangles 1, 2, 3 et 5 sont toujours présents.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAT8AAACECAYAAADm3CypAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAC+hSURBVHhe7Z0HnBTV/cB/d3u9cXTuOKkqVUVRVBQLKmgSMJiY8rdgSRQ11hRj1BijiUGTYAvRJEaNwYbYo0ZQiRpUFFR6kX4cd0c7rvf5z/ft7OU8t+/s7uzt+/pZmZ2929udee/3fv2lGCai0Wg0SUaq9a9Go9EkFVr4aTSapEQLP41Gk5Ro4afRaJISLfw0Gk1SooWfRqNJSrTw02g0SYkWfhqNJinRwk+j0SQlWvhpNJqkRAs/jUaTlGjhp9FokhIt/DQaTVKSsMJvf32F3PPoz+SltbNlX+MO66xGo4kle/bskbvvvlv9m2gkrPBbXvaqZI7bKKUtn0h5/QbrrEajiSXr16+XTz/9VFJSUqwziUPCCr8P//WFtBuG+WiV9VX/Ed2WUKOJLcy5BQsWyLhx46SgoMA6mzgkpPDjohcVDpOM5l7q+c6aVbKvSZu+Gk2sGTlypEyZMkXKysqkurraOpsYJGwn57a2VllS/oR8tudl9Xx8v2/JcQP+T1JTdAxHo4kVbW1t6t/LL79cTjjhBJk5c6akpibGHExYSeFypcmQHkdLivUVyurWSEPrAXWs0Whig8vlUo8ZM2bIq6++Ko2NjdYrzifhhN+BAwdk7ty5snv3bumVWSL9coa7zzftkgPN5epYo9FEF+bfTTfd1GHqTp48Wc3N7du3q+eJQMIJv4qKCvnss88kLS1NstMKZEj+eNPUdUlTW61UNmyyfkqj0USTl19+WTZs2CAZGRnqeWZmplxzzTUdzxOBhBN+b731lhx00EGSm5urhF7/nEMkIzVH2oxWKa1daQrBOusnNRpNNKivr5clS5bISSedJFlZWeocfr5p06bJsGHD1PNEIKGEH87VTz75RCZMmNCxwvTMGii56VbUt3aVNn01mijT0NCg/HxnnnmmdcYNuX5NTU3S0tJinXE2CRftxa+Qnp4uOTk56nlbe4u8VTpX1u9frIIfJxTPlCP7TlevaTQa+2lvb5f9+/er3D7mogdEySuvvCKFhYVKK3Q6CWf29ujRo0PwgSs1XUb2PFkdG9IuO2o/N2+OO/yu0WjsBxO3d+/eXxJ8gOZHtPeFF16wzjibhBF+tbW1ysmKWt2VgXljpTCzWB2X122Q+rYqdazRaOylpqZGHnvsMfWvNw4//HD54IMPEqLWN2GEHw7W+fPnK5W7K66UNBlhan8pKakq6rtm39vmWV3uptHYDbl8jz76qLS2tlpnvkxJSYkcdthhKiPD6SSE8MOB+s4776iL6okudaU4d5Rku/LV8caq96Sh1fvKpNFowoNAx4svviinnHKK8ut5Iy8vT2bPni2TJk2yzjiXhBB+qNjl5eXqovvqHtEzc6D0yCxSx/WtVTrnT6OxmX379qlAxyWXXOJzHkKvXr1U3p/TY6kJIfxYTa6++moZM2aMdearZKXlS98sd45RS1uj7G7YIu2GDnxoNHbRs2dP+dWvfiWDBw+2zvhmxYoV8tFHH1nPnElCCD9y+o466iiV2OwLV0q6DMwfKxkuEp5bZE/DZmlt/2pwRKPRhAdZFhMnTrSe+aeyslJeeuklR9f6Ol74kdhMw8RgEidLcsdKQXo/dVxet940f3WjA43GDqjq2Lp1a0cXl0AMHz5c1q1bJzt2OLfVnOOF38cffyw/+9nPpKoqcPpKhitXivNGq+Oalr1SWrtCHWs0mshYvHix3HvvvSroEQx9+/ZV7qrPP//cOuM8HC38SGt5+OGHpaioSDlRA0Evv4PyjjC/FF/LkJV739R+P40mQghcLFy4UIqLi/26njrDz82ZM0fOOuss64zzcLTw27Vrl6xZs0YuuOACVUsYDEW5oyQrvYc6rm6q0FFfjSZC0PaYh/6yLbrCz/Xp0ydoYRkPHC38KJ/57ne/K8cee6x1JjDZafkyotBdV9jcXq86vWg0mvBBkE2fPl3Gjh1rnQke+v1t27bNeuYsHN/YAAdrsFqfhz0NW+X5Tbeo9lbFuWPknIN/3dHxWaPRhE448xBee+01eeCBB1Tk12m9/hwrEYjuklAZzn4AtLjql+3u8Ly/qVTKateqY41GExqYvGhv4Qg+IDeXeezEwIdjhR8Xi+hSXV3ozUnTU7OkT/Yw1ey0sa1Gttd8pgMfGk2IEHCkeTCNDMKFxsNsbUnWRrBpMrHCkcIPS/xf//qXWnUokwmVtNR06Zs91Pw3w3yvdlXt0dxWb72q0WiCobm5Wd57772IujNjuc2aNUtlazjNw+ZI4UdC5fLly+X000//Ss+w4EiRATkjJNvljvpWNe2U2pa96lij0QQHjYP37t2r2lRFApofgUv23XESjhR+rDhshnziiSdaZ0KnILOfFOe5a4FrW/ZIRf1GdazRaIKDtlV0UqKmN1KIGHvrxRlPHBnt5SMhAMMxeTtTXr9Bntt4k+rwTMPTc4bfYb2i0WgCwTxEAKKxBZvf5w3eh1ZYzz77rDz11FPW2fjjSM2PCx2p4AO6O/fNdvsrympXqxQYjUYTHMxD3E6RCD7g94cMGSJLly5VdfpOwVHCjxWCC0RukB1kunKlxNT4wDD/W7//XfNvfLUTtEaj+TLLli2zbR7C6NGj5eCDD1bRY6cYm44Sfpi67P5kV0Z4ivnf4ILxHQnO5fXrVOqLRqPxzyOPPGJrRxYsueuvv15WrVrlmJQXRwk/cvro2Dx16lTrTOT0yiqR/jmHquOqpnI50FyhjjUajXeYg+TZ2t2UgH1+586d65ior6OEHzs+4WMIpoNLsGS58mVQ/jiV8MzmRhX1G8yzzm6vrdHEC0xSNikaMGCA9O/f3zrbPXFUtBezl7wiLno4ZW2+2FL9sSzcfr8SfkMLjpEzBl0jma4861WNRtMZytmYh0OHDrXO2Ad9OdnZjWYl2dnZ1tn44CjNj8JnevfZKfiAzY3y0t3aZFndGtP81aavRuOLgoKCqAg+QPjdc889qit0vHGM8NuyZYvqGRYN8tL7dKS8UOZWVrfKMREnjcZJ4HoqLS21ntkP5jStsdaujX+zEUcIPwqo//rXv6rNkKMBNb4jep6ijkl52V7zufl/nfKi0XTlb3/7myxatMh6Zj/suz1+/Hh59913rTPxwxHCDx8DXR/OP/9864z9lOSNkZ5ZJeqYyo+6ln3qWJO8UL3A3hRPz58nZdUbZG/jdrU4JivU8lKJQWlpNDn11FNVrW+8cYTwY39PWl4fcsgh1hn7SU1JkxGFJ6ucv+a2Olm7/23rFU0yQvOMv//97zLnL7+R1c3Py8Kdc2RZ5fPS0hbcBj3dETopUY1BMnI0YXOj448/3noWPxwh/Oj5deWVV6p9QaNJUe7Ijijv+v3vSUNrtTrWJB9/+MMf5LnnnpMbrr9ehhxRKNXN5bKrbq3UtOyxfiL5QPlgp0QUkVhAy7pgtqSNFo4QfpS+TJo0yXoWPQozi1S3F2hsq5bKejY30oGPZIGJ5gl0/fCHP5T58+fLiUefIT2zBqhz7PO8W42J5OSYY46RGTNmWM+iC5o35u/KlfHbY8cRwi9WZKcVWNUeKaZ50yi7GzbrDs9JApPtwQcfVLWlQNSxR48e4kpJlyP7uSd8a3uz6vqtiT5YeaeddlpyC7+nn35annnmGetZdGGgl+QdJhmubGkzWmR34xY14DXdGxJ2b775ZlmwYIEMH+7e26UzQwvGS34Gpp4h22o+TboxgUaMG4CuzbEE4UeXl8bGRutMbImr8KPA+R//+If07t3bOhN9SnLHSEG6u2ynvG69MnU03ZtbbrlF/ctC6z15N8UUgGyPmqIaX6zbv9h9OkmoqKiQDz74wJampaEwatQo9YiX3y+uwo/2VZWVlTJixAjrTPTJcOVKcd5odUxr+x21zttVSmMvl156qdx2221SUuJOdfLGQHNRJB8UaH3W0h4fbSQekHBMddXAgQOtM7GBaq4LLrhA8vPzrTOxJa7Cj1SDI444QkV7Y0VqSqoMyj/CanNlyMq9b0i77vHXraBdOi2Z8PPB0UcfLYWFherYF/1yhktOmvtnqpsr5EDTLnWcDKCEHHXUUTHX/OJNXIXfQw89JHPmzLGexQ42N8pJdw/0mia9v0d3AfMJv9Ull1win376qdovNlgIhhXnjlLHlEDuSaKEZ9JbrrrqKutZbOGe3XXXXVJWVmadiR1xFX5shEwRdazJTsuXkVa5W3N7vZTWrlDHmsRm586d8uc//1mmTJkiv/nNb0Iy49JTM03hN9o0fTOVyUvKS3t7/HLQYglt5OLVYYXefuvWrZPXX3/dOhM74iL8yLVihaaZQXxIUdUetLnH9N1e86n5f236Jjqkr2BJ4EcijSU0UmRALtudFqixUFq3Uhq6eddvaup///vfx3VfDSpKzjjjDBX4pKVdLImL8Nu3b5888cQT6t94gdnbL9tdxrO/aafsrF2tjjWJA5P3k08+kSVLlqjMAYrmI+kFmZfeW/pku6PBexu2dfsNrxB6NDKora21zsSHE044QYqLi6PaTcYbcRF+XHRyr2IZ6OhKemq2anNFh+fGtlrZUfO5TnhOICiNuv/++1UaC2PJjhZlGeaYKMk/TB3j7/viwAfdtvUZCwdNRcm0iHRT8kgZNGiQzJ49O+bR5rgIP7LsqSOMZ3QpLTVNrfKkN7CjGwnPTW3u6KDG2aDlobGQHM+kmTZtmi37QqSkpMrQ/KM5Us+p9W3opnmgdLQhxWXWrFnK5xdP8P0jAO3YrjYU4tLGHvWWATx48GDrTHyobq6UFzf9Sg4075KCjP7ytSE3mtpgdDrYaiKHMeMxaYkOYubanSDPdHhly52yrWa56gQ0fdgtclDeEdar3Qe+5/bt26Vfv35xbycPRH1pazdmzJgw/LXhERfNj2TTeAs+yM/oq/r8AQnPlfVfqGON82Bnv3nz5qlu3zjJMZGiURnEe4/tPVVcpuBrN1pl4/73rVe6F3xP5qATBB+giT7//PPy3//+1zoTfeIi/JwC+/qO7XOW+f9UNdDX7n/HekXjNK699lp54IEHbN3Zzxe9sw4yF0Z3958dtSultjl521zFCkxeSt3+9Kc/WWeiT0yFH/uB0jaHPUGdQkF6P+ln7e9RXr9edjfEK/1G442amhq12TWT45///KdKZ4k29HzslUkpXIry+SEAu1PC865du+S4445TkfJwoRkBgabNmzcrbXzjxo3qfYkch+NJw51Be3tMcTs3S/dHzHx+/Bn2A8VB/eabb0a9cWmw8LmWlP9Dlle+qJ4f2fdsOaHoQuX81sQP7gumGb4gsgOGDRsWszFD1P/jiufkk8r56nMcbloHE80x4an9TXSYh+yg9tprr0luLrmuwYHAownCf/7zH3nnnXdUBQ3nuEcETTzJ0ocddph87WtfUx2hKWLgPgYDeX50dR83blxM6n1jJvyot6SMhRrL6667zjrrDEprV8mLm28zB3q7FOWOUoGPnLTYOF01X4UJxoZWlF1RcB8PSk1t741tv1fdvgfmjpWzhvxEsrvJmCDCS039FVdcYZ3xDyKCvnu//e1v5cMPP5STTz65Q7iRscGixM/s3r1bPdiciJb4RHF/9KMfqf064nUf/RFT4UdLocmTJ8c1v88b9a1V8trW2bKrbp0p9HrK14feqOp/NbEFpzemGDXfcO+99wZsSBAt6On3/KZbpaJ+g1oIzxl+Z8cGWIkOQuziiy9WXVX8QXR9w4YNat6+//77cvrppyvBGUyKGveSXeAoN0Qb5O8hNInQB4JsEH4u2u30Y5rq4klVCFYNjhV0dfmk8jnT1HlWBUEmFl8o4/p8w3zFWZ+zu0PS7Y9//GNVnnbOOefEpe67M2xotGTXE2pMnFB8kRzZd7r1SmLDPGQOBqqEQXjdd9998vWvf10JviFDhoScT4kmyIJGRReNZG+66Sa/7gvEEYsePl4EbbjVOsEQM8cWGeVOFHxAmyuCHmT4txmtsr36M2lsq7Ne1UQbz/pLtQHpLBdddFHcBR8Myh8n6a5sFexYVvmCtHWDRgfMQ8zRQEKFRgOYrNwL9jvBxA0nkZyd2s466yy5/fbblT/vpz/9qarO8QXygYaz1P4T7IomMRF+RIBoMxTPAupAFGYOlNx0d94YUd+qJOrnFi9wlNNBmL6OmEmYR7GI5gZLj4wB0jOjWB03tFbJLnNcJDJEY/G7o435Aq3w7bfflj/+8Y8qteib3/ymEpZdQYgyr2lOQvYGD7qzUK/Pa12hootoPb/De5O36Qv8kQhIfL/RJCbCD7V31apVMcnRCpf89D4dKS/0c6PRQQw9AkkHkwChh//J2+RyAhmuHBnWg/b2buj+g2WQqGzbtk0JPn9+N09bMDQ+/PPe7g2bmz/66KNy2WWXybe//W35zne+ox7nnnuunHfeeWpLUG9QTYLZS/DEs5GUN/BFzpw5M+rlblEXfqwkpLawTR1f3qm4UtNlhNXjDzOH9vbtus1V1GDDHCK6CD8mmh21udFgeI/jVK8/oNaXXf8SFdJTSEPJy3PvXe0NfoZGB9/73vd8Lkr4AhF8BELw037xxRcqzw8F54033lACkHQab4wcOVJZgbQe86YhAsKZLTSjXQUWdeGH9sTAxm/gdAbmjZHeWYPUMd2da5N4A+tow+R69tlnZezYsdYZZ5Kb3lNKrNre/U1lsrcxcdtc0dafIgNffvcVK1bI3LlzZerUqX61cfLxMGPp/owQY0tQuuvQTgxwYXC+qqpKPe/KhAkTVCQXE9xfDz9e82xFEA1cvzKxjqMCjlUyt/HlODHY0RkSm5vaG0yTd6Vp3jQrs4etLjWRw0BGG8CJTV0ug5+UCaePCVqe0QCjzNT6Wo0m1QCDdvdO/9zeQOhgUnoLdmCh/e53v1ORWLQ6f5o46Ufk+bGATZw4UQnUE088UTZt2qS2DwCaE0yfPt1rWgyaHeluCMgzzzzT68/gD8Y3SJwA+RGN6x0Tnx+Ru2iGrO2kKGeEZKa5s8s3Vv1XGlu7dzffWEAZ1E9+8hNV3YMlkEi+VIRfn+zBkpGaZX7udmX6NiVoJgDmri+htmfPHlm2bJnS5gL52hBcRx55pBKUngwOkpiPPfbYjmRm3sOfb/H4449Xghhz2RtUixApxjqorq62ztpLVCUSqzxdGvyFtkOFiUPCNE5XT0Y5f4dzdtAjc4Ba3aGprUb1+dOED4GNu+++WwnA+fPnK+0j1FWcEirqPdlljBSMF154QU2Kp556Sl566SXlU0bjoHbcnxkVLr2yBikrAPY2bpfqFt/RUifCHCGC6w+uL9F2an5DBd8df4P74pmHwewG941vfEMlUfviW9/6lprbW7dGx9UQVbOXqA7h7WAzu/2B0KOA+i9/+YtqZMng58EFp5QGRyvRLNplRdIPjMDHvsYd1o5uhkqBGZBziDlhE0NzdSLcE0ykUANemGLke7EZ0WOPPaYc6/iTPNoFx/iEMI0YC4w1xhw5aXZmFpD/yXjYZwq+NqNF+uccrLqAJwr//ve/5eWXX1bCxhfk4LFwsPlTMDDX6L+H5sb8w0RdvHixMlcxZVnwuAf+FjpqgxF+tLH3ZhkiM9D6eB8SrO0mqhUejz/+uNLQrrnmGutMaPDRGNyExck5IqeILHGEKZ1fSYplAnAjGPTUHTJBUL9R3/k3HKG76cCH8taOB5V5c3DhRDmt5KqOlV8TGLQ87gf75fqLLPoCocc9JRr8yiuvKP/SlVdeGXACkGuG853aUjYqP//885VpZYe/qLx+g8zf+HPzyFARYOq/EwGEEfoNc+XCCy+0zn4V0o4QNMHU3aPp3XrrrSpS3xmCJCxyuDfYkyPQdWe+0sPvl7/8ZVjjJFKiqs4QNidhMRwwl1jNyffBUX711Vcr1Z3J8Itf/EINbByt+A644GgHvMbPkHNEHhLlMWiEoZpC7N5fkOFOtt1Vt17V/moCw0RjQHOv0DZYmEKF5Fd28uI9MJswa4kKBrPyM9boB4d5zaLLRGYMhvM5utI/+5COTIDtNZ9JbUv8Nt8KBZKOyd2jU4o/MC8DmakeEGpUYRDswExG0/aUrC1cuFCVJ5LrF8gVhWLCPA/0cyhBvtJiIiGqZi/mDqkMoSYrog4TeWIFR/hdfvnlKvcIc9ZfCB4nKSoyTRG5MYAQrKysDOlzuFLSZX9TqSpqb2lvkJ6ZJaapc4j1qsYbDFDMoDvvvFPVgXLPgp1MHhB8bKWIACVAwqLG/QwlWMb4IOWC6COQT8jiR35bJLmETPgDzeXK/MX0JQBSkkeajv1RSDvhO2MtkV/n7/uT5oJvHp9sILgWpLpgRpPkzB4qzDcWnNWrVysLDf8sghELzRf07mMfkdNOO83n3EToUQWEJWB73h9mr5PYtWuXYWpzxrnnnmuYq4J1NjzMC2eUlpYaU6ZMMUwtwDA1E+uVwGw+sNR44LNzjPs/+6Yxb/11Rlt7q/WKpjNcYx7A/TI1iI7noWBqZ4ZpRhmTJ082TG3FOvtlTHPYMAWZ0djY2PEwtQb1u97gc5SXlxvmJDSeeeaZsD5XZ7Ye+MR4aOX/qTHx5LrrjIaWauuVxMfUlo2bb77ZehYepsAzCgoKcKMZpoA0br/9dusV75hWmmHqXuoe+uPBBx80zjvvPJ/3OVyiYvayAiD5QwWNDz/CpEmTlL8nUKNFVGb8S/yeN1ihyCmjRRIb3vz6178OOmxelDNSctPdTvOapkrZk8DJrdECc5JoPg5vcyyp+4XvhuseCmhmBLF4r4cfftirxsj9e+SRR1Q1CJrCSSedpB5UAmAl8HpX+BxogTjf2emNJpyRQNSXel+gzx9Jz06G64o2jg81EASjqM2NBFJTPG2oGA/IAVwhviA6TxpcoN3j0DCpSyaibCdREX6kHSC8QoEbRFADE4fOD/4ittxUTGJ8CyRS8vAn1PAXYf5wc4kOmxqA9YpvstLyZaRV7tZsmr6lNSvVscYNfhqc1Zi5XM9QBV5nmAT45m677TZlonUFc4wWV4wL0lsQkiyuPOhGjL/3xhtv9OnbxS+MkCQY4m8yBoKN7klwxtRtaq9T0V8nt7fnmjKngvnO+PAQMGRUBIKgIoINAeeBY1JS8DEC85hkaF+mNj+PP54O3YHGDqYzcxjz11bMD2ErmBamoDEef/xx60xwvPXWW8aoUaOMlStXWme8Y2p5hjlJDFPDUOq157Fnzx7rJ3xjroKGqTUYGzdutM74Z2/9duPhlecpM+e5jTdp09cCc/Ouu+4yDj/8cMMckMocDRfGyx133KHeD5PWG9xz7nFGRoZhThZj5syZxqmnnmpkZmZ+aQw8/fTT1m98FUzps88+2zC1wIjM3w373zceWoHpO8N4e8efjZY2/yZbvMBExN1jasVBfV+u/cUXX2xceeWVAX++qKjImDhxomFaVMZHH31kfPjhh4apuRujR49W5i73wtQCjTfffNP6ja9iClA1fkyFxDrjny1bthg7duywntmD7cLPNEONWbNmGcuWLbPOBMbU2ozzzz/fmD17tnXmq3BDuNDTpk1TFzc/P/9LAz8Y4YdP6tprr1W+iGAmbH1LlbHgi1uU8PvrqguN7TWfW68kJ1wz7gMPU7tXQilSli9fbgwePFj96wv8iFOnTlXCzeMfqqurM66++uovjYEJEyb49QstWrTIGDNmjLFp0ybrTOhUNe4ynlh7lRoT/1h7pXruRBAqI0eODGkeLly40DjmmGOM1atXW2e8M3bsWMPlcn3p2nsepsZnDBgwwLj11lvVPfJGfX29cdlllxlXXHGFOo4Xtpu9JKDSA4zwd7AsWbJEmTb+mh+Yn1UlauJfIrKEuRUq+KSoW8RkDhReh/TUbNXmihKnxtZa2VHzudrcJhnhemE2YmpippA6EWmLeVwdpDERyWezal9w38gZJbLoSXAmtYKuz50xhbJf/xb5oWQC0H2E8RQOmL69stzbMBxoKpdd9ZH5yaIFvjTaRxHlDhauD5Fb0lW4lr6g0IA8yq65eVSIfP/731c5g/46NuMWIzH95z//ufqdYMF8pwzP32cLBduFHxeErhDBduLFaY5vgpy9QKkR1BTi30EAUvoSDoToccxygwORlppuCr+DJS0l01zW2mVPw9aEreuMBPw4BA2eeOIJVWoWruDoCgEr/HeBNiryBC66pjl1/Rz4C/29D/4n2i2RgM24C4d0leJyuDpmTHxR9YHaBsFpkNxNUnOgYEJn+FnSi5gbLHK+7jM+VAJTCCIWEtpakWCO75YxQudmX0KNACXVOig6/tJgvEEVCgnRdnV6sVX4IZGZHKFA2xtKZDx5Wb7AgXrxxRer/K9INA4mANFCkmEDa38pUpQ7UrLT3cEXcv+SLeEZAUUwgUgbSedoB5EENzrDveceMJlCBeGFNuiBhZNofiAOPfRQ1SE4kgk0vMexSgjC7obNUuew1mdov6HOQw8EFhCAtJ0nB8/fQkduHho7yeVo7yg8/sYG95rqDxYoSuBCBWuS7+arVVao2Cr8WAUwR0NZVYnScoGD2dGNi+YvUTMYuDncMBIsWYUCkZfRx0pmNQVByz6l/SUTXHO0JSKxRATtBIGK0PKXuO4Lkmk9wo8xgZaDYAsEExbBEIzbwxekQB1S6F6s68wxUa7qwJ0D3VnoxhyOAET7Y6tJNi1C0WDXNn+uhGChcQIlcaQksZj27u3eMiIUyABhP1/kjB3YJvwQYKjCqLuhZOST1c+F8OUfiAaYvQhoT1jeH+zcNbbXVPNCuUzzplVW71tomjv2mH1OhPvIpCEvjnuD8DvllFPCGqyBQPiFsz0hWhtdhCnbAkw8fLnBwPfhe4WrGXkY22uKpKVkKNN3/f7/OGZMcP8wK/GPhasoIACppf7BD36g9vb1ND3gvUMFwcl9uuGGG2Tz5s1KKIe7dS0LV7CNF4LBNuGHvU8eDu3qQxF+BDoQfAzKWEHJVCjqc4+M/tIr233D2Ntjd0P3bHPFgkDwiV27CAoFmxAeLmjhoWp9CD4WWfJImZDkid1///2qcD8Y+JvhTOKu4AopzHTve8t42N/oFsTxhlJOND+aekRiJTGHCX7g68VFdPPNN6va+WDnDPeGwMY999yjND4+D0IZzS1c+EwIv3BMZm/YJvyQ7jic6eMVCgx+BJFdEZxgwORhEgQrcDPScmWgZfri5l63f7E5gZzn5I4UHNdU2OCDo2oi2jupoU0G43rwwIRiIuKP4veYSLhZ6PoSrBDlPYge+6olDZYsV56q+MA2aGyrkZ11qxyh/ZGozIIQTI1uINAACV6yjy7Cizp5Iu533HGHErCYsNwHEp6xolCA6OaMO4ICBLQ95jYBLRpV2NW5hcXLjh6htgk/2hc9+eSTIbeQQuvj4kVqhoQCN4pVMdjCe0zfoQUTVMoLVNZtlIa26GpF8YBJw0pNYAnB4s95bQcIP0zfYDQxhBaTD2HHeKFlEuVupFaEYjWw8DFGIxV+6a4s6Z09WO35zH6+aH+t7eH7Ee2CFCS64oSSQuIPFhXcRAg9NDf8gLgNMIsRjFTeeHZuowyNLAwqN9DOuF90YKKpQqTXuzM0TqAfC2MiEmwRfgxeNLdQwuoemGS004m2idWZ0tJSNThC8WPRzmhAjtu0orsHOV6JDmYu24riruAYd8Do0aNDcltEAn+PRQgtwh9oD5TSoXEwTqjXZvCfffbZ1k8EDxOHyRypjznFnDoH5R0h2Wk9TH2PNKgt0txmX8fycGAOMhfDmYfBQMABoYZVgB+QcYMPj7JDykfJw8XUpQSRBZTIcTQWUJQWxi1ldpFgyyjH5MUBHY4kJjzOg+hdLGCAcNNI2QglZSbbla928FcJz221VoTPGU7ucEDYoTlde+21ajGIByx8mGdMJn/aHwKLz+kJcCAw8UnSsJZ8Mc8D84qf9QfaC+3N7BAQfbKHSJ8sd5/BfY2latuDeMH1o8W/rz1zowFmLIslLczQOINpYGoHyAvuIRpmJO4yW4QfF5x21MGYL11hAuAnpOMGK7wveG+cuYS5eXTtQMFzz3l/FwTzmlULtT0UDYc29rQup6U5Ud/S2hWmEEzMhGcigfjOEAS0H8dkicQ5Hi6YVDSlQFvoej87Qydv7r0HervRsp5OMJ0fVB6gEXgbh5xbvny5Ssal6sGOSepKSZPhhex5kaL6Pq7e53+fjGhCIIimHaH4UBMRfO3NRr2MP/lQ2b2vIqKUpYiFHyYrnXPx+YUTsWUQ4jsg6x5nqS8YvPgQiPbwIPesM/gkOH/GGWf4TGBFKLI6YvKEk7PWM3Ogaea4tUWaWlY17VLHiQLXkAdCh0RvtHUc2fGEhY+8MsrcfHUfIbmVsRXoQSCDxdQb+AnxZ5IPaGe+YlHOKHNMuKuZ1uxbJA1x2u0PoYf/lLSk7omhCgw+3/MveXXLb6Rx+FKZcemJkpkVvi8xYuGHxof0RfiFu5pScsYmJmTo40z1BWY10SweZOl3hkgT54kC+focDA40Bhy0TJZQycvorZzc0GSavmV1q5UwSQS4LmgG1FSi8WI2RHtH/GDA/MRkRWPzpf1R/YP2F+jx4osvqnHU9f6z6NFWn0UR89lOLZed/jzt7ZtNS4AxEQ8Y28wjuqd3Nygf3Fq9XN7Y9gf5oPyfUl6/XpqkWvalrpfW9vADpRFvYITgY1UNdWeuriC4cKay8zsRI28mKVpmoDwjJhOfpevvMwEWLFigND9MvXBL5LaZN+GVLXeqtIaD8sfJtKE3K/PHqXB7EXw0JUD40dg13H1VogUaH1oZ+6+gjYaT+OwP3CEIPSoL7EyS9bBy7xuyuPRhdXxY77NkUvHFahfAWIJiwFz0pfkmKq3tzbLC1PaWVsxXrgVcDMw3qmwOzZwqtZtz5PTTpoSleEW8hwerKOZGpHDTiA7hP6TgmYheVwiXE3Hy98AJ2/VCMDDYCAcHP5Epbw0zg6Ugo59sOvCRad4ckMa2ajm0cJJkpcV+56lgwRyiNI30HnL40PicBmY4taE0wySRls4rRPTCtSQ8sODh32Wxo1yL6HA0fJuZrhy14x+Tk64/wwonxHy3P66hnekkTqCxtUaW735JPtv9sjS316tgI7X2R/f7lkwsulDqy9Pl+utuUI0Ugm2k0pmIhB+mJqu2XTlFCD86RaAF4Auik4cdEwCTh8RYUiXYVCWSVA4CH6qzc+0K90Y25iAvyQu+bVCsYVKwkBDUiFU0LhzIvcN1Qtt1SuvGjx8fUUkdwTM2M2exw6dM6oVd47QrTEq2OWC/Z8bEgNxDlX84VlA3C+Fs0+pUWkxz9oNd80yt+nU131LMazyq56kyaeAlqtaeeYfvftGiRcoapM1dqGM7bOGHNkXCKX4a/Cx2wEQlEodw4r2R5ji7w12t8fEQ0aQUCn/i5MmTIxJ8HjAlt9Z8rJJaccKi/aWnOmPV5bOxgOD/wgfEhKD2Fa3AqYLPA5+V/Vv4/Nx/Pi9+Sc4H+9lZ7FiUKYGbN2+eKsui2iAcH2+wsCDWNu+Vsro15qRtkpy0nlKSb47jGGx0zxhni04adQTqjJQoENFdX/WuLK98UQnBtNQMGd93hpxQNFOy0/6XfM895fvT4g6tPlTNN2zhh4OVTHL2z7XTyYqgQ+vjPTFTKYbGrEYQBvvl2NCI7Q/xb9GXjB5gbHZj1+R3mavQ9prPpa5lr3rPotxR0iOzv/lKfIULuXueEjVMSL6zHS6JWML9p7cj958sAnrL4bNEqLFwsUB2XgwR9qQvMR7JFUXLv++++5QfmmaZCFO77rsvEH4shFusBZHnQwuONrWT6GianSGv0VP5Eo7p50TK6tfIuzv/Jg1tB1RD4Qn9vyPj+8/w6kfFhYWbjH8ZG6EQdsCD6BzChcJnMvXthsFOPheF9pTNEcjAtmcjGm/BFX4eQUklwHvvvacGAukvmLloPnaCafN+2eOyYs9rpiBMl2MHfFeO7DvdXOnjG/gg6RP/HjucEdGORieWWMIiRl4eCxhJzQhBvhO+XTqDMNjJNiBDAG2PWmRSPbjnNDqIpfMfH/D8jT9X1T9UfXxtyM+kOHe09Wr08ATxyHPsDrQZrfLqlt+aysWn6vmIwpPkpIE/UBuK2U3Ywo9Gh2gXRGijvbJi02PCkAuGQGQCkKuFdoDQo0KBFA6iXZh61BvSSj+aWg8O7rd2PKg6Ow/vcbycdtBVkumKj5bl0YowF9F+qF7pbni0WjRB7jfCDlj1cY1QZRBsZ5do8U7pQ7Jq779V6duJxRfJuL7TrFeiByk+LALdIb8PcxeF4t2yR9Tz3tlD5NyDfxfQpYQLjiR4YgShVO5EnOoSS+gqTIkT3SRIe2Gyc+NJW0EgsvIjEGPh+KWJ5ctb7lQ1nYTdzxl+hxRmFluvxgac+tTF4vCOViRTEzwHmirkyQ3XqPSMIlPr+/bB7DMTX1dIIrG3cbvS+qqbK5QiMbnkKjm4MHCXb3J+cXHwCGUBDMsj66uCItqQxsKXo2cgZVGXXHKJzJw5U018nL1oALGKeJHVX5LrThtBEG6tWa6OYwVaLtowN5xFIYHWsG4Lfl/2fIGK+vVR7/uIxtNd7jtaX1ntGmmwtokYkDNSBub53tSqM8gFrB+6TodCyMIPbYNEZHrxJzP490ryj1AmDqzd97aq+Y0FDHjqWHlwH0LdqEYTPQblH6nGBPl+K/e8oZLhowV99vCHdwdajWZVMtpias340YcUHKUiu8FAygt+Xnz9/voDdCVk4YfJiQOatJFkpyhnhDJ5odo0eWK1vwc+VrqhzJ07V+XDRdvnqgme4txRkmklvZfVrVVWQTRA02GykxDeHcB3XtFAiypD8jP6msLvaPM4uHHN+KehLdZfVIUf0TX6oYXasbk7QmUHiZdAIuaO2pXqOBrg8Kf7CYEmQPh5ciI1zqFnVrH0ynSnftHhOVrt7emChI83mE2bEgGi5VVNZeq4d9bgDqUiWAh8hZrPGfLMIfJKF45Qc2q6K4f2nCSZLlZ6Q7ZUf6zSYOyGEjXyuGbNmqWuP2Yvq53W+JxHtquHqkBQlUBt9cqJHw3TlzxWOhhF2pTVKZTWrOxwG/XLHmYKphBz9sy5gOAjHSpY7S9k4UcKCaVSGjcEPvpmu1skVTXtVE5bO6Fz8Zw5c1REl6J/fBta6DkXhB4dvzNTc9VCWFG/QVra7N+igXby7FjXXTT/vU3braMU1SknnDFOAIhKLiykYAj5yqHxaa3vf5CB3i97uKrvbGytVZUfdgY+WM1I1qbemdxGLficD23P8FsB46E2CpuaE+DqTqlNtS3uJqyM73ATmrkmpL/hC8VNFIig8/z4sYqXXpI+a9ZImhZ+/4Pr0rBJthxYKvtLMqXlnGlyxqBrlUYYLpRrrV26VIbU15saRKpkMNDNB/eA1a3NurEp5muU/LH64wAn/cUw/wXOZVmF/DSfaDF/z0O6KVA90WH+VrtlJnR+P96H9+N9gQUvw3yNwcnA4nPw3cHzfnw+3s/zGSDHSjRXn4/XrN9JNd/PU2/Ma42muaIwnzOp+c78ZOfvy2ukMqnva35m9X07vZ8nzUl9PvM1Dy7zvXg//hbnOyaG+TzT/Owu8+/xmRs7Xz/P5zOPW82/1fn7siBxP4DP0PH5TDL5DClt8nHlAtOUW2G+X4pMKDpXBk+6iNZF1k+FT5v5Oapff10K1q4Vl/n5uwtv9n5XDmTUSntmupxeNkF6N/ewXgmN9Rs2yMfmeP/2n/4kWQGud9DCj0G93DR3j3v11dDVxSRh28TBsv3JO2VCyYyIqj1oP/XcjTfKdNPM7WFed88qz61CiDEZASHARPyS8PMIA/NchzAwB0Oz+fCgJq+lNSCQ2qwJj3DoEH7m+3xF+Jm/5xF+CFTP3/K8X9ffAY9PiteUYLR+x8Vn7yz8zNc88H09wrTz9+38+bp+X95PCR6TDuFsoYSp+RmB8x7hx/txnu/W9bMH832h8/sBn4/fbTVN3vZ287wp/NLTzO+5eLHI+PHWT4VPtanZrP/+9+XIRYukO6W0t2S5pC09VdoyzHF7oFlcre5rHSrcvS1TpkjRvHmSE6gvpHlDg8K8wcaeG24wFzJTXrrXQP3o8miYcprR1NxgXbHwMSeg0fzuu0Z7//5e/45+JOBj6VLr7kZGc22tsefyy412l8v730nyR3tqqtF06aVGW02NdcV8E1p5G1vF+dloJumh4YINm0Ur2Kns2WdFamutE5qE5tJLRYptKH9EMzVNO2G/mxCmblLB9gyjR6O+Wye8E5rw02g0mm6Cdt9pNJqkRAs/jUaTlGjhp9FokhIt/DQaTVKihZ9Go0lKtPDTaDRJiMj/Az+baEV+0f9TAAAAAElFTkSuQmCC[/img][img]data:image/png;base64,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[/img][br]Cette activité est notée sur 2.[br]Elle convient pour Moodle et est adaptée aux portables et tablettes.