[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfEAAAETCAYAAAAmvj/0AAAgAElEQVR4nO3dfVhUdd4/8PfgZPhwm9uyLe5igcEurIzBjXG7hK0V7a37s6LCVQu3mZIWTEx+yCqRC4beaeo6u2pMQcvswqr5sEnrXlm6qxUqJiUKCclks8tsznXHr8hYQx08vz+OQzAMCvN0Hub9uq65Jg8zcz4n+PDhe75PEAJMr9cH+pR+weuQF16HvPA65IXXIS++vI4QEBERkSKxiBMRESkUizgREZFCsYgTEREpFIs4ERGRQmmlDoDoajQa98evvx7QaoHYWODuu4Hz578V2MCIiGSARZwU6cIF8fH+++Jj2LDV2LoVmDtX6siIiAKHt9NJEQSh/+PCBeDvfwceeQTo7h6ORx4B9u6VOlIiktKRI0BWFvCDHwAjRwLDhwPf+Y74B/6ePVJH53ss4qRYw4cDd90F/OlPwG231QAAnngCcDgkDoyIAu6zz4Cf/QxISQEqKoDWVuDrr4FLl4D2dmDbNuC++4Dp04EvvpA6Wt9hESdVSEzcjeRk4NNPxaJORMHjs8+AKVOAN94AIiKAjRuBjz8GurvFu3Y2G7B+PfCtbwFvvgmkp0sdse+wiJNqLFokPvOWOlFweeIJ4MwZIC0NaG4GFi4EJkwAQq5UuO9/H/i//xeorwduugl45x1g0yZpY/YVFnFSjWnTxOfDh6WNg4gC58gR4C9/AcLDgV27gNGjB37thAnACy+I/62WIs7R6aQa48aJz599Jm0cRBQ4ZrP4vGABMGbMtV8/b55YzO+4w79xBQqLOKmG89bZxYvSxkFEgXP0qPg8ffrgXh8SAkyd6r94Ao2300k1Ll8Wn4cPlzYOIgqclhbxOSlJ2jikwiJOquFM5uhoaeMgosC5cEF8DgnSahakl01q9M474nOw/kVOFIxGjBCfg3V9CBZxUo0XXxSfZ8+WNg4iCpzERPH5+HFp45AKizipwvHjD6GxEfjhDwc/wIWIlO/HPxaf9+8f3Ov/9S9xOdbHHvNfTIHEIk6KdfGiuBbyQw8BJ07ch2HDgFdekToqIgqkzEzx+cUXgc7Oa79+1y5xOVa19KFzihkpwkBbkjpdd10Xdu4MVc3cTyIanIQEYMYMccnVzExxjfTQUPev/ewzYM0a8b/z8wMXoz+p5G8RCjbXXQf8x3+Iyyw+9xzw0EOFuP9+qaMiIim89JK4nGpNDTBpEvDyy8DZs998/fRp4He/AyZPFvdX+PWvgfh46eL1JbbESdYEYXCvMxg6/BsIEcnW+PHA228D998v7l72y1+KD3eeew5Yvjyw8fkTizgRESlebKy4VkRlJfDXv4oD3c6fF/u+x48X79rl5qqnBe7EIk5ERKoQEiLuaPbEE1JHEjjsEyciIlIoFnEiIiKFYhEnRWtqaoLRaERjYyNqa2ulDoeI/IB5PjD2iZMiORwOpKbOwMmTFgBpuHjxdvz3f2chLi4ce/fuQFhYmNQhEpGXmOfXxiJOipSaOgMffBCBS5deAzAaAHD+vAMffJCLlJRZKCvbh2HDlPfjbbfH4uBBqaPwHq9DXpR6HQsWzMDp0xHo7u6b58eP5+K//3sWjh7dB61WeXnuS8F99aRIDQ0NOHnS0qeAi7QQhI1obdUhLa0OQKpEEXpjKfbulToGX+B1yIsSr6MBgAVA/zy/fHkjmpt1qKurQ2qqEvPcd9gnTopz8OBBaDTT0TexnbQA0gCw34xI2Q4CGDjPL19OY/84AI1erx/kmlhE8nDq1Cm8/74O3d0VA7wiF8D3ASwLYFRE5FtGAC0ATG6/OmxYDhISjkGn0wU0KtkRAkyv1wf6lH7B65DO0aPHhZCQSAH4ShAXZu39uCQA8QLwrpuv8cEHH8p4fCYABgEIFwbK85Ej44V3331X6l9HHvHl7132iZPiPP98Ai5fjobY4i4D4NyyyAGNJg/R0WEoK5uCYcOki9FTa9aswdKlS6UOw2u8DnlRynV8/rkd27evx+uvm9DV1QVBuAXu8jwkJA+xsWGYMmWKdMHKBIs4Kcq2bcDu3QCwA8AsAHEApiMkRIPLl9/EjTcKeOutvyMyUpk/2n/4QwumTZM6Cu/xOuRF7tdhtVqxefNmmEymK9PK9Ni/Px9AGMQ8j4E41uU6XHfdO9DpxmHXrsqgH5kOcGAbKUhTE5CT4/zXWAD7ALyG++//IRIT38PDDyfiyy/b4HA4pAuSiAbNYrHAYDAgJiYGRqMRGRkZqKlpRn19GYBofJPn/weAGUA5MjNTcPToPkRGRkoZumywiJMidHYCs2YBHS47jqanJ2DXrsXQ6XTYtGkTQkNDsWrVKmmCJKJBsdvtyMrKgk6nQ3V1NebPn4/W1lZs3FiJp5+O7JfnsbHhPf998803swXeC4s4KUJhobjNYG/R0eK2g858Dg8PR3Z2Nqqrq2GxWAIfJBFdldVqRUFBAWJiYmA2m6HX69Hc3IyysjJERkYOmOcPPCBNvErAIk6yV1EBbNrU95hWC1RVAWPH9j2+dOlSjB49GuvXrw9cgER0Va63zdPT03Hs2DGUlZUhOjoawNXzPDTUzYcSABZxkrmmJiAvr//x0lLA3cDUsLAwzJkzB9u2bUOH6z05IgooZ/GOi4uD2WxGZmYmWltbUVVVhYSEhJ7XDTXP6Rss4iRbXV3AvHlif3hvGRnAkiUDvy8/Px+dnZ1YsWKFfwMkIrd6F+/q6mpkZmaiubkZlZWV/QakeZrnJGIRJ9nKyQEaGvoei44Gysu/6Qd3Jzo6GgsXLoTJZILNZvNvkETU42rFOzY21u17BpPnJSUlEAQBer0eJSUlfr4KZWERJ1mqqADM5r7HtFpg69b+/eDuLF26FFqtFmvWrPFPgETU42rF29nn7Y63eU4s4iRDFsvA/WOTJw/uM5wj1SsqKtgaJ/ITT4u3+F7v85xYxElmHA73/WOpqUPvH3vqqafgcDjYGifyMW+KN+DbPA92LOIkK/PmAXV1fY+NHdt3PvhgRUZGIjMzk61xIh/xtng7+TLPgx2LOMmG2Syujd5baKjYPzaE3w99FBUVAQBXcSPygq+KN+CfPA9mLOIkC01NQG5u/+MbNgDTp3v+uc6R6hUVFVzFjWiIfFm8Af/leTBjESfJOddFd+0fS08H5s/3/vPz8/O5pjrREPi6eAP+z/NgxSJOksvN7b9ecnj4teeDD1Z4eDgyMzO5pjrRNfijeDt5k+clJSXQaDQwm82cJ+6CRZwkZTb3nycKiANcwsJ8d578/HwA7BsncsefxRsIXJ4HIxZxksxA6yUvW+b7/rHo6Gi2xolc+Lt4A4HN82DEIk6ScDgAg6H//uDTp4uLPfhDaWkpQkNDUVhY6J8TEClEIIo3IE2eBxsWcZJEXh5QX9/3mC/7wd2JiIhAdnY2du7ciXrXkxMFgUAVbycp8jzYsIhTwG3a1H/fYEDsH4uI8O+5n376aWi1WmzevNm/JyKSkc7OzoAWb0DaPA8mLOIUUBYLUFDQ/3hxcWD6xyIiIpCZmYlt27ZxFTdSPYvFgpycHNTU1ASseIvnlTbPgwmLOAVMZycwd664f3Bv06YBzz4buDiKioq4pjqpmtVqRW5uLuLi4mAymXDzzTcHpHgD8snzYMEiTgGTm9u/fywyEnjttcD2j0VHR0Ov13NNdVIdm80Gg8GAmJgYmEwmZGdno7GxEVOnTvV78XaSS54HCxZxCoidO93vG1xVJc2+waWlpdxvnFTDarUiLy8PcXFxMJvNPbfNN27ciPj4+IDFIbc8DwYs4uR3LS1AVlb/40VF4taDUggPD0dGRgZMJhPnjZNi2Ww2FBQUQKfTwWQyITMzE8ePHw/IbXNXcszzYMAiTn7V2Qk8+GD/eaJy6B/jKm6kVO3t7cjLy0NUVBSMRiMyMjLQ2tqKsrIyJCQkBDwef+d5SUkJBEGAXq/nsqsuWMTJrwZaL3nrVun7x+Lj47mKGymK3W5HTk5OT5/3woUL0dbWhsrKSkRIOG9Lznmudizi5DcVFQOvlxweHvh43HHuN758+XKJIyEamM1m6yneFRUVyMjIQHNzMzZs2IBwiZNJCXmuZizi5BcNDcpYL9m5pvrOnTs5Up1kx263o7CwEImJiaioqIBer0dbWxvKy8sRGRkpdXiKyXM1YxEnn+vqEueJuu4bPG2aOMhFbtgaJ7lpb29HTk5OT5/3zJkz0draio0bN0re8nZSWp6rFYs4+VxOjvv+saoqYPRoaWK6mt47nDU1NUkdDgUxq9WKgoICREVFoaKiAnPmzEFraysqKytl0fLuTWl5rlYs4uRT7vYN1mrFAS5yXi/Z2Rp/6aWXJI6EgpHdbsfy5csRFxeHdevWYc6cOWhsbJR8wNpAlJrnasQiTj7T0uK+f6y4WLzFJmfO1jjnjVMgtbS0wGAwICoqCqtXr+6Z511eXo7Y2Fipw3NLyXmuRizi5BPO/jF380SXLZMmpqFytsZXrFghcSSkds7b5omJiX02JikvL5dknvdgSZXnJSUl0Gg0MJvNnCfugkWcfCInRxyp2puzf0wp80R7j1S3Wq1Sh0MqZLPZMG/ePMTExMBoNPYp3oFeYc0TashztWERJ68ZjQPPE1Va/5hzhzOOVCdfslgsyMrKgk6n69fyVkLxBtSV52rCIk5eqasDCgv7H3/2WWXOE+09Up2tcfKWxWKBwWDo2ZgkPT29Z8CaUoo3oL48VxMWcfKYwyEut+i6b3BamrLniRYVFUGr1XJNdfJY7+LtbHk7p4oFclcxX1BrnqsFizh5LC+v/77B4eHi7bXQUGli8gVna9xsNnPeOA2Ju+Ld3Nwsy3neg6XWPFcLFnHyyM6dgMnU/3hVlTr6x5wj1Tdv3ixxJKQEVyveSrpt7krtea4GLOI0ZBaLuG+ww9H3eHGxeItNDZyt8YqKCs4bpwGptXgDwZHnasAiTkPS2QnMmtV/nmhqqvT7g/uaszXOvnFypebiDQRXnisdizgNSVZW/3miYWHAjh3qmyfqbI1v27aNO5wRAPUXb6dgynOlYxGnQdu0Cdi2rf/xrVvVu2+wc944V3ELbsFSvIHgzHMlYxGnQamvBwoK+h9fskTd/WO9543b7Xapw6EAO3fuXNAUb0C+eV5SUgJBEKDX67nsqgsWcbomh0NcbtHdPNHiYmliCiRna5x948HD2fLevXt3UBRvgHmuVBq9Xi9IHQTJW339bDQ19V2WacSIL3H//cUYMeJLiaIKrNraWpw5cwbp6ekYM2aM1OGQn5w7dw4nT57EmTNnAAATJkzApEmTguJ7zjxXKCHA9Hp9oE/pF8FyHVu3CoJWKwhA38e77wYowEHy9/ejtbVV0Gq1wuLFi/16nmD5uZKb1tZWQa/XC1qtVtBqtYJer+85pgbMc3nx5XXwdjoNqKnJ/TzR558Xp5oEk977jXOkunoE04C1gTDPlY1FnNxyzhPt7Ox7PC1NHOQSjNg3rh4s3iLmufKxiJNbublAS0vfY+Hh4jSTYJ0n2nukOlvjysTi3RfzXPlYxKmfior++wZrteJCD2Fh0sQkF0VFRejq6mJrXGGsViuLtwvmuTqwiFMfLS3irkWuiorYPwb0XVOd88blz2KxICcnBzqdjsW7F6XleUlJCTQaDcxmM+eJu2ARpx5dXeI8Udf+senTuV5yb1xTXf6sVityc3MRFxcHk8mE9PR0Fu8rmOfqwiJOPXJygIMH+x6LiBD3DWb/2Dd6j1TnDmfyYrPZYDAYEBMTA5PJhOzsbDQ2NqKqqiroi7cT81xdWMQJgNg35q5/rLyc6yW7w/3G5cVqtSIvLw9xcXEwm809t803btyI+Ph4qcOTDea5+rCI04D9Y6Wl4i026q93a9xqtUodTtCy2WwoKCiATqeDyWRCZmYmjh8/ztvmbjDP1YlFPMhdvhyCuXP77xvMeaLXxh3OpNPe3o68vDxERUXBaDQiIyMDra2tKCsrQ0JCgtThyQ7zXL1YxIPcsWOP9Ns3OCICqKpi/9i19J43ztZ4YNjtduTk5PT0eS9cuBBtbW2orKxERESE1OHJFvNcvVjEg1h1NdDcfE+fY1qtOMCF/WODU1paitDQULbG/cxms/UU74qKCmRkZKC5uRkbNmxAOH9Yr4p5rm4s4kHKYhFXa3JVXKzu/cF9LSIiAtnZ2aiuruZIdT+w2+0oLCxEYmIiKioqoNfr0dbWhvLyckRGRkodnuwxz9WPN1KCUEcH3PaPpaYCy5ZJE5OS5efnw2QyYdWqVaisrBzy+2fNmgWdToebb74ZDtddKFx8+umneOutt/DPf/4TJ0+exM6dOz0NW9ba29uxfPlymK8MpZ4zZw6Ki4tZuIeAeR4cWMSDUE4OUF/f91hYmLjcIvvHhi48PBzZ2dkwGo0oKioa8qjojo4OvPvuuwCAkSNHXvW1ZrMZBw4c8DhWubNardi8eTNMJhO6urqQmZmJ0tJS9nd7gHkeHHg7PchUVwPbtvU/zv4x7xQVFWH06NFereI2fvx4dHV1QRAEt18XBAFHjhzBuHHjPD6HXNntdixfvhxxcXFYt24d5syZg8bGRg5Y85Da8rykpASCIECv13PZVRcs4kGkoWHg/rGZMwMfj5qMHTvW677x5ORkXL58GSdOnHD79RMnTqCrqwv/9V//5U2ostLS0gKDwYCoqCisXr26Z553eXk5YmNjpQ5PkZjnwYVFPEh0dgLz5vXvH/ve906xf8xHnnjiCQCer6menJwMAKh3vQd6RV1dHQDg9ttv9+jz5cRqtaKgoACJiYl9NiYpLy/nPG8vMM+DD4t4kMjLA5qa+h4LCwPuuKMCoaHSxKQ2veeNe9IaT0xMhEajwXvvvef26++99x60Wq2ii7jNZsO8efMQExMDo9HYp3hzhTXvMc+DD4t4EFi3Ttw7uDetFvjLX4BRo76QJiiV8maHM41GgxEjRuCTTz7BZ5991udrn376Kdra2jB58mRoNBqfxBpIFosFWVlZ/bYEZfH2HeZ5cGIRV7m6OmD58v7HS0uBKVMCH4/aedsav/766wEAR48e7XPc+W+l9YdbLBYYDIaejUnS09N7BqyxePsO8zx4sYirWHs7MGuWuH9wb+npXC/Zn5yruHnSGg+9cs/T2f/t5LzFrpQifu7cuZ7i7Wx5t7a2orKykruK+RjzPLixiKtYQQFgs/U9Fh4ubjvIeaL+480qbsOGDUN0dDTef/99dHd3AwAcDgc++OADREZG4jvf+Y4/QvYZZ8t79+7dfW6bV1ZWcqEWP2GeBzcWcZWqrhYfvWm1wNat4kAX8q/8/HyPW+NTpkyBw+HoaY3X1dXh8uXLPaPX5aj3bfPq6mpMmDChp3jztrn/BEuel5SUQKPRwGw2c564CxZxH3I4HDAajZg6dSpGjhyJ4cOHY8yYMUhPT8ehQ4cCFkdDg7hak+sKnkVFwLRpAQsjqDlXcfOkNT558mQA3/SDO5+TkpJ8G6QPuBZvZ8s7NTWVxdvPmOcEsIj7zPnz5zF16lTk5eWhtrYWX3/9NS5duoSvvvoKNTU1SE1NxZ49e/weh3OeaGdn3+MzZwLPPuv301MvnrbGJ06ciFGjRvUU7/feew/XX389EhMT/RGmRwYq3mx5BwbznJxYxH1k7dq1qKurg06nQ319Pbq7uyEIAk6cOIFpV/4sXrNmjd/jyMrqP0+U/WPS8KY1npycjM8//xyHDh3C559/jpSUFFlMLWPxlgfmOTmxiPvIH//4RwDA9u3bkZSUhJAQ8X/tpEmTsGXLFgDA+++/79cYNm3qv16yVitueKDE9ZLVID8/H8DQ542npKQAAP70pz8BgOT94Sze8sE8p95YxH3k448/hiAIbtd7dm5YcfHiRb+dv6kJKCzsf7y0VNx6kKQRHh7u0bzx5ORkhISEoLW1teffUmDxlhfmObliEfeDf/3rX9izZw+Ki4vx0EMPYcyYMQDQM2XI17q63PePcZ6oPHiyitvIkSMxceJEAOICMs6foUBh8ZYf5jm5w94TH3r11VfxzDPP4MyZMwE9b1aWOFK1t4gIoKyM/WNy0HsVN3f7je/bt8/t+37zm98M+JkDvcdbFosFq1atQvWVeUuZmZke7ZFOvsc8J3fYEveRHTt2YM6cOThz5gxuu+02PPfcc9iyZQtee+01fPzxx347r9Hofp5oVRX7x+TEmzXVA4Etb3ljntNA+Pebj6xYsQKAOMBt3rx5fb527tw5v5xzoP6xtWs5T1RurtUalwpb3vLHPKerYUvcR1paWgAAjz76aL+vrV27tue/L1++7JPzORzi7TXX9ZIzMoCFC31yCvKx4uJij1dx8zW2vJWBeU7XwiLuIxMmTAAALFq0qKflffr0aSxYsAArV67sed2XX37pk/Pl5Ig7F/U2dqz41zn7x+QpMjLS43njvsLirSzMc1FJSQkEQYBer+eyqy5YxH2k8Mr9rs2bN+OGG26ARqPBD3/4Q5SVlWHlypWIi4sDALz99tten6u6uv++wYC40AP3mJA3b9ZU94bVamXxVhjmOQ0Gi7iPGAwGVFdXIzExEcOGDcOIESOQlpaGN998E0VFRSguLgYAVLjLyiFoaQFyc/sfX7ZMvMVG8ubNKm6esFgsyMnJgU6nY/FWEOY5DRaLuA89+uij+OCDD+BwOHD+/Hns27cPP/3pTwEAs2fPhiAIXq2f3tkJPPgg0NHR9/jkycCVvxFIAfLz86HVav3aGrdarcjNzUVcXBxMJhPS09NZvBWCeU5DwSKuIHl54l/ovYWFAa+9BoSGShMTDV14eDhmzpzpl9a4zWaDwWBATEwMTCYTsrOz0djYiKqqKhZvhWCe01CwiCvEzp3u+8cqK8UFH0hZnN0rvmqNW61W5OXlIS4uDmazuee2+caNGxEfH++Tc5D/Mc9pqFjEFaClRZxm4qq4WNx6kJQnPj7eozXVXdlsNhQUFECn08FkMiEzMxPHjx/nbXMFYp6TJ1jEZW6g/rG0NO4brHTerOLW3t6OvLw8REVFwWg0IiMjA62trSgrK0NCQoKvQyU/Y56Tp1jEZc5d/9jYsdw3WA16r+I22Na43W5HTk5OT5/3woUL0dbWhsrKSkTwfqtiMc+vrqSkBBqNBmazmfPEXbCIy9i2bf37x7Ra4I03OE9ULZyt8UWLFsFoNKKxsRG1tbX9Xmez2XqKd0VFBTIyMtDc3IwNGzYgnItnKxrznLzBv/Fkqr4eMBj6H1+2DJgyJfDxkH9ERkYiLCwMf/vb39DS0oLu7m488MADiI6Oxl//+lc4HA789re/RUVFBTo6OpCdnY2ioiIWbpVgnpO3WMRlqLNT3DfYdb3k6dM5T1Rtpk2bBq1WizvuuAPDhg0DAAiCgNOnT0On06HjSifpnDlzUFxcjEg2zVSDeU6+wNvpMpSb279/LDxcnGbC/jH1aGhoQFNTE2JiYnoKOABoNBr84Ac/QEdHB+666y60traisrKSBVxlmOfkCyziMlNdDZjN/Y/v2MF9g9Xm4MGDCAsL61PAnTQaDcaNG4c777yTA9ZUiHlOvqLR6/WC1EGQ6Ny5m7BnTzEuXhzZ5/htt/0FiYl/ligq8pdTp07h008/RWxsrNuvnz59Gt/5zneg0+kCHBn5E/N86BoaGtDQ0AAASEhI4DTK3oQA0+v1gT6lX/j6Or74QhAmTxYEoO9j5kxBuHTJp6fqg98PaXzwwQeCTqcThg8fLtx1111CWlpan8c999wjfPvb3xbeffddqUP1iNK+HwNhnstDcXGxAEAAIBQXF0sdjtd8+f3g7XSZyMkRR6r2Fh4OlJWxf0xNTp06hbi4OPznf/4nGhsbcd111+H06dO4fPlyz2sEQUBraytuvfVWTOEQZVVhnpOv8cdGBkwmca5ob1qtuOEBu0PVoba2Fr/85S/R3NwMQRAQFRWFDRs2IDY2FvPmzUN9fT2+/e1vw+FwoL29HSEhIXj77beh5W921WCekz/wN4TEmpqAgoL+x4uLOU9UDWpra5GTk4OmpiYAwK233ornn38eqampPa+pqanBhx9+iMOHD2PXrl0ICQnBP/7xD3zxxRccka4SzHPyF95Ol5BzveTOzr7Hp08XF3sg5Tp27Bh0Oh2mTp2KpqYmTJgwAbt378a7777bp4A7TZw4EVlZWYiLi0NZWRkAYO7cuYEOm/yAee69kpISCIIAvV7PZVddsIhLKDcXcF0yOyICqKpi/5hSHTt2DJMmTUJycnJP8d6+fTtqa2uRnJw8qM9ISEhATEwMPvroI7z11lt+jpj8jXlO/sQiLpHVq93PE62sBMLCAh8PeefIkSNITExEcnIyGhsb+xRvdy3va/nNb34DAMjLy/N1qBRAzHPyNxZxCdTXA8uX9z9eWipuPUjKcezYMSQmJiIlJQUNDQ249dZbvSreTklJSYiJicGpU6fw9ttv+zBiChTmOQUCi3iAdXQAs2YBDkff4+np7B9Tkg8++KDntnlDQwNuueUWvPLKKwP2eXvit7/9LQBg/vz5Pvk8ChzmOQUKi3iA5eQAVmvfYxERnCeqFEeOHMGPfvQjJCUlobGxEVFRUdi1axeOHDmCGTNm+PRczr5xi8WCuro6n342+RfzXP40Gg00Go3UYXiNRTyAzOb+80QBrpesBLW1tZg0aRJSUlLQ3NzcU7wPHTqEH//4x3477+bNmwEAer3eb+cg32KeUyCxiAdIfb04StXV2rWcJypnzgFrU6dORWNjI8aPH4+qqiq/F2+n+Ph4xMbG4qOPPsKxY8f8fj7yDvOcAo1FPADa2weeJ7p4sTQx0dVZLBYYDAakpqaioaEBY8eOxfbt23H06FHcc889Xn12W1sbDh8+jM8//3xQr1+9ejUAtsbljnnuPyUlJdBoNDCbzZwn7oJFPACysgCbre+xiAigvJz9Y3LjLN5xcXGorq7GQw89BAC4/fbbfTJg7YUXXsAdd9yBjIwMJCUlYcuWLdd8T3JyMiZOnIhTp2o6M7YAAB42SURBVE7hb3/7m9cxkH8wz5Xr7bffxh133IHhw4dj9OjRSE9P79k1Te5YxP1s5Upg9+6+x7Ra4I03uF6ynLgW78zMTDQ3N2PHjh1YsmQJ9u3bh8OHD3t1jn379sFoNMJxZcjyhQsXUFRUhLNnz17zvc7W+GI26WSJea5cf/7znzFt2jQcPnwYly5dwr///W/U1NQgJSUFJ0+elDq8a2IR96O6OmDFiv7H164F4uMDH4+//eMf/8Avf/lLjBs3DsOHD8fYsWPx2GOP4dSpU1KHNqCBindlZSWio6MBAEVFRYiIiMCyZcvw73//2+Nzvfnmm/2OXbhwAe+8884135uUlIRbb70VTU1NqK2t9TgG8r1gy3O1efzxx/HMM8/AbrdDEAQcP34cEydOxNdff43nnntO6vCuiUXcT9rbgblz3c8TXbhQmpj86dChQ7jtttvw8ssvw26349KlS/jyyy/xxz/+EZMnT5bd8qGDKd5OY8eORVVVFaxWK4qLiz0+50033TSk466ca6o/+eSTHsdAvhVsea5GTz31FFatWoXvfve7AMSpna+88goAyO73ljss4n7gcIgLPbjOE42MVGf/2BdffIGHHnoIX375JZ555hnYbDZ0d3ejvr4eTz31FL7++mtkZGQM6raxvw2lePc2bdo0LF68GFu2bMGrr77q0bnnz5/fr2AnJydj6tSpg3q/c6R6c3Mz543LQLDluVo98cQT/Y7dfvvtAICurq5AhzNkLOJ+sHo1cPBg32NarThPVI3rJb/44ov43//9X5SUlGDVqlX4/ve/j5CQECQlJWHTpk1YunQpvvrqK7z44ouSxWi1Wj0q3r2VlpZi8uTJKCgowIEDB4Ycw4033og33ngDjzzyCFJSUpCTk4Pf//73Q9oz3Nk37u4XDwVWsOW5Wk2YMKHfsZAQsTReunQp0OEMGYu4jzU1AWvW9D++YQMweXLg4wmE/fv3AwAWLVrk9uvOZUOluDVlsViQk5MDnU7ncfF2Cg0NxWuvvYaIiAg8+eSTeP/994ccz7hx47Bu3Trs3LkTy5cvx4033jik9ycnJyMuLg6nTp3ivHEJBWOekzyxiPtQR4f7eaIzZ6q7f+zo0aMAxJamcynD3o+YmBgAQGNjY8BislqtyM3NRVxcHEwmE9LT0z0u3r1FRETgwIEDGDduHDIyMjxqkXvrhRdeAAA89thjAT83BW+ekzyxiPvQ3Ln99w2OjRX3DVazixcvDup1DtfRP35gs9lgMBgQExMDk8mE7OxsNDY2oqqqyqvi3VtkZCQOHDiA8ePH4/HHH/e4j9xTSUlJPX3j3OEs8II1z0meWMR9ZN06YO/e/sfLyoCxYwMfTyANHz4cANDd3Q1BEAZ8DLbYe6KzsxN5eXmIi4uD2WzuuW2+ceNGxPthnk9ERASOHDkCnU6HvLw8LFu2LCB/pDj97ne/AwAsZNMvoII5z0meWMR9oLbW/b7By5YB06YFPp5A+9GPfgTgm77xQLLZbCgoKEBNTQ1MJhMyMzNx/Phxr2+bD0ZYWBiOHDmCJUuWYMuWLbj77rs96if3RHx8PGJiYjhvPICCPc+lVFJSAkEQoNfrueyqCxZxL9nt4jQT15kI06YBpaXSxBRozi04V7hb8QLA66+/Do1Gg5/97Gc+O2d7ezvy8vIQFRUFo9GIW265Ba2trSgrK0NCQoLPznMtWq0Wa9euxYEDB+BwOHDfffdhyZIlsLrOO/IDjlQPHOY5yRWLuJcMBjHBewsPB7ZuDZ55ogsWLMANN9yAw4cPY/r06WhqagIAvPvuu1i0aBF+/vOfY9iwYT0Dsrxht9uRk5PT0+e9cOFCtLW1ITU1FRESrm+ZmpqK5uZmPPvss/jzn/+MO++8E//zP//j17nxzus9ffo0W+N+xjwnuWIR90JJifv+scrK4No3eNy4cdi+fTtGjRqFN998EzqdDhqNBnfeeSc2btyICxcuoLy83Ku+aZvN1lO8KyoqkJGRgebmZmzYsAHhMvmfHRoaitLSUrS2tmLx4sUwm81ISkrCo48+il27duHChQten8PhcGDv3r148skncccddwAQ7wZs2rTJ688m95jn6uQcq+Pp1+WCRdxDdnssVq3qf7y4WNx6MNj89Kc/RUNDA+bPn4/vfe97GDZsGK6//nrMmDEDb775JgwGg0efa7fbUVhYiMTERFRUVECv16OtrQ3l5eWIjIz08VX4RkREBNauXYu2tjYUFxejra0Nubm5iI2NxezZs/HCCy9g7969g7rl/vnnn+Pw4cOorKzEY489hoSEBDz++ONobGzE4sWL8cknn2Dx4sXYtWsXLK5Dpr109uxZ/PznP8eYMWMwfPhwjBkzJujmpjPPSfaEANPr9YE+pc+dPSsII0Z0CIDQ5zFtmiBcuiR1dEMj1+/HZ599JmRnZwuhoaFCaGiooNfrhU8++WTA18v1OpyOHTsmLFmyRJg8ebIAoOcxatQoYfz48UJycrKQkpIi3HTTTUJKSoqQkpIifO973+vz2ujoaCE7O1s4cOCAcKnXD9rZs2eF0aNH+/z/wZ133tnn/ACEr776alDvlfv3YzCY5/LD6+iPvTkeMBiAr7++oc8x9o/5htVqxebNm2EymdDV1YXMzEyUlpZK2t/tC5MnT8bkK0t5dXR0oKmpCQ0NDfjoo4/Q0dEB25WNqENCQnqm7N19992YOHEi4uPjER8fP+Cdh/DwcGRnZ8NoNKKoqMhno/IPHToEADh48CB+8pOf4PLlyz3LUQYD5jkpAX8Uh4j9Y/5ht9uxefNmrFu3Dl1dXZg/fz7y8/MRGxsrdWg+N3bsWKSmpiI1NbXf1wwGAyorK4f8mUVFRaioqMCqVas8er873d3dAICf/OQnABBUBZx5TkoRPFnpAwcPgv1jPtbS0gKDwYCoqCisXr26Z553eXm5Kgu4v4wdOxbZ2dmorq72um/cuVyu6797H1Mz5rn8lJSUQKPRwGw2c564CxbxQbLb3e8bPG0a8Oyz0sSkZFarFQUFBUhMTOyzMUl5eXlA53mriXO++Cp3FYgGhXlOSsMiPkicJ+obNpsN8+bNQ0xMDIxGY5/i7e8V1tQuOjoamZmZXrfGBZepNUKvpXPVjnlOSsMiPgjsH/OexWJBVlZWvy1BWbx9q6ioCABb455gnpMSsYhfw0D9YwkJNewfGwSLxQKDwdCzMUl6ejoaGxsDsrZ5MPJVazzYMM9JqVjEr+Jq/WOTJr0uTVAK0bt4O1vera2tqKys9MuuYvSN0tJShIaGsjU+SMxzUjIW8au4Wv9YSMhlaYKSOXfFu7m5GZWVlbJdYU1tIiIifDZSPRgwz0nJWMQHwP6xobla8eZt88DLz89na3wQmOekdCzibtTVcZ7oYLF4y5NzFTe2xgfGPCc1YBF30dUF5ORwnui1sHjLH1vjA2Oek1qwiLvIyQEaGvoe4zzRb7B4Kwdb4wNjnpNasIj3YjaLD1fsH2PxVqr8/HwAnDfeG/NceUpKSiAIAvR6PZdddcEifkVLC5CX1/94sPePsXgrW3h4OOeN98I8J7VhEYfYPzZ3LtDR0fd4MPePsXirh6eruKltqVXmOakRizjYP9Ybi7f6cBU3EfOc1Cjoizj7x0Qs3uoW7GuqM89JrYK6iLN/DDh37hyLdxAI5tY485zULGiLeLD3jzlb3rt372bxDhLFxcVBN2882POc1E+j1+vVM3JlCGprn4DFktrn2IgRX+L++4sxYsSXEkXlf+fOncPJkydx5swZAMCECRMwadIkjBkzRuLIKBDq6+tx6tQppKenB8X3PFjznIKIEGB6vT7Qp+ynslIQgP6PN94Y/GfI4TqG4pNPPhH0er2g1WoFrVYr6PV6obW1VXHXMRBex+CcPXtWGD16tN/PI4fvRzDm+UCUfh3FxcUCAAGAUFxcLHU4XvPl9yPobqcHW/+YxWJBTk4OdDodb5tT0KziFmx5TsErqIp4MPWPWa1W5ObmIi4uDiaTCenp6SzeBEBcxU2r1aq2bzyY8pwoqIp4MMwTtdlsMBgMiImJgclkQnZ2NhobG1FVVcXiTQDE1vjMmTNV2xoPhjwncgqaIq72eaJWqxV5eXmIi4uD2WzuuW2+ceNGxMfHSx0eyUxxcTEA9c0bV3ueE7kKiiKu5v4xm82GgoIC6HQ6mEwmZGZm4vjx47xtTlcVHx+vunnjas5zooGovoh3dgIPPqi+/rH29nbk5eUhKioKRqMRGRkZaG1tRVlZGRISEqQOjxRATau4qTXPia5F9UU8N1f8C703JfeP2e125OTk9PR5L1y4EG1tbaisrERERITU4ZGCqGkVN7XlOdFgqbqIV1Sop3/MZrP1FO+KigpkZGSgubkZGzZsQLjSLoZkw9kaX758ucSReE5NeU40VKot4g0N7vvHli1TVv+Y3W5HYWEhEhMTUVFRAb1ej7a2NpSXlyMyMlLq8EjhnK3xnTt3wmazSR3OkKklz4k8pcoibrcDM2aI/WS9TZsGXGl4yF57eztycnJ6+rxnzpyJ1tZWbNy4kS1v8imltsbVkOdE3lJlETcYxATvLTwcqKoCRo+WJqbBslqtKCgoQFRUFCoqKjBnzhy0traisrKSLW/yi959401NTVKHM2hKznMampKSEgiCAL1ej5KSEqnDkRXVFXGzGdi7t+8xrVYc4CLncV92ux3Lly9HXFwc1q1bhzlz5qCxsZED1iggnK3xl156SeJIBkepeU7ka6oq4lebJzptWuDjGYyWlhYYDAZERUVh9erVPfO8y8vLERsbK3V4FCScrXGTyST7kepKzHMif1FNEb/aesnLlkkT09U4b5snJib22ZikvLyc87xJEs7W+IoVKySOZGBKy3Mif1NNER9oveSqKnnNE7XZbJg3bx5iYmJgNBr7FG+usEZS6j1S3Wq1Sh2OW0rJc6JAUUURNxoHnicql/4xi8WCrKysfluCsniTnBQVFcHhcMhypLoS8pwo0BRfxOvqgMLC/seffVYe80QtFgsMBkPPxiTp6ek9A9ZYvElueo9Ul1NrXO55TiQVRd+A6ugA5s0T+8l6S0uTfp6oxWLBqlWrUF1dDQDIzMxEcXExp4mR7BUVFaG6uhqrVq1CeXm51OHIOs/J99rb29HS0gKLxYIPP/wQ7e3tsNlscDgc6HAdDEHKLuLz5gGuA2nDw8Xba6Gh0sTkrngXFRWx1U2K4WyNm81mPP3005JvZSvHPCffqq2tRU1NDfbv34+GXoMeRo0ahRtvvBEOhwNnz54FIM4Z51zxbyj2dvq6dcCePf2PV1VJ0z/W+7Z57z5v3jYnJXKOVN+8ebOkccgtz8l3bDYbCgsLERUVhalTp8JoNOJb3/oW8vPz8fLLL+Odd95Bc3Mzjh49ikceeUTqcGVLkS3xujrA3bib4mLxFlsgseVNauRsjVdUVCA/P1+Sn2c55Tn5jrN479y5Ew6HA2lpaXjmmWeQnJyMm266SerwFEdxLfHOTiArq3//WGpqYPcNPnfuHFvepGpS7jculzwn3+ns7ERhYSHi4uKwbds2PPTQQzh06BB+//vfY+bMmSzgHlJcSzwrC3Bd3jksDNixIzDzRJ0t7927dyMkJIQtb1ItZ2t827ZtKC0tDejyv1LnOfnWnj17kJubC6vVigceeADPPPMMxo8fL3VYqqColvimTcC2bf2Pb93q/32DXfu8J0yYwJY3qZ5z3nggV3GTMs/Jt7q6ulBQUIAHH3wQWq0WO3fuRFlZGQu4DymmiNfXAwUF/Y8vWeLf/rGBBqylpqayeJPq9Z43bnfdMswPpMpz8r2Ojg7cddddWLduHR5++GG88cYbSElJkTos1VFEEe/sHHieaHGxf87J0eZEImdr3N9941LkOfmHzWZDWloa6uvrsXr1amzYsAGjRo2SOixVUkQRz8oSdy7qzV/7BrN4E/UVqB3OApnn5D82mw1Tp07FiRMn8Morr+AXv/iF1CGpmuyL+OrV7vvHduzwbf8YizfRwPw9bzxQeU7+1dHRgZkzZ8Jms+GVV17BvffeK3VIqifrIr53r/t5os8/L0418QUWb6Jr690at9lsPv3sQOQ5+V9XVxdmzJiBDz/8kAU8gGRbxO128faaw9H3eFqaOMjFWyzeREPjj75xf+c5Bc7y5ctRV1eHlStX+ryA5+fnIyUlBeHh4Vxy1YUsi7jDIQ5wcf2DPzxcnGbizTxRFm8iz/Qeqe6L1rg/85wCa8+ePTAajZg9ezb7wANMlkV85Upg//6+x7RasX8sLMyzz7RarSzeRF4qKipCV1eXT1rj/shzCrzOzk7k5uYiMjISK1eulDqcoCO7It7UBKxf3/94UZFn/WMWiwU5OTnQ6XQs3kRe6r2mujfzxn2d5ySdVatWwWq1YvXq1YOeRrZv3z6sX78ee/fuhcO1L4WGRFZFvKMDmDVLnC/a2/TpQ18v2Wq1Ijc3F3FxcTCZTEhPT2fxJvIBb9dU92Wek7RsNhs2bdqEhx9+eNALuTz55JN47LHHsH79ejz++ONYsGABC7kXZFXE587tP080IkLcN3iw/WM2mw0GgwExMTEwmUzIzs5GY2MjqqqqWLyJfMDbeeO+yHOSh8LCQnR1deFXv/rVoF6/b98+7HHZW3bPnj3Y79qvQoMmmyJeUiJONelNqwXKywc3T9RqtSIvLw9xcXEwm809t803btyI+Ph4/wRNFKQ8nTfubZ6TfNhsNuzcuROPPPLIoNdCP3nypNvjH374oS9DCyqyKOIHDwLu7syVloq32K7GZrOhoKAAOp0OJpMJmZmZOH78OG+bE/lR79a41Wod1Hu8yXOSn82bN8PhcOCpp54a9HsmTZrk9vjEiRN9FVbQkbyIt7eLt9dcu0SmT7/6PNH29nbk5eUhKioKRqMRGRkZaG1tRVlZGRISEvwbNBENaYczT/Oc5Ku6uhrTp08f0o5k9957L2bOnNnn2MyZM5F2jd1t1q9fj8OHD8Nut3OeuAtJe6Cc80RdB7mGhQ3cP2a327FixQps27YNXV1dWLhwIZYuXYpw3osjCqje88aLi4sRGRnp9nWe5DnJW21tLWw2G379618P+b0vv/wy9u3bh5MnT2LixIlIS0uDlj8EHpO0Jb56df/+MUBMbNeabLVaUVBQgJiYGFRUVECv16OtrQ0bNmxgASeSSGlpKUJDQ6/aGh9KnpMy1NTUQKvVIjk52aP333vvvcjPz8f06dNZwL0kWRFvaHDfP/bss0Dvuy0dHR3Iy8vrGW0+f/58NDY2YsOGDQjjihBEkoqIiIBer8e2bdvc9o0PNs9JWfbu3YupU6fipptukjqUoCdJEXc4xP4xd/sGXxn0CrvdjsLCQsTExGDTpk09o803bNiA2NjYwAdNRG45W+OFhYV9jg8mz0l52tvb0dTUhNtvv13qUAgSFfFZs9zPE92xA7DbxUVaYmJiYDQakZmZibNnz6KyshIRERFShEtEVzF27FjMnz8fO3fu7DNv/Gp5Hhoa4CDJZ1qufFM5+0ceAtYZ0dTUhP379+NvfzuPtrZaAH3XVnzuuXYYjZuwfv16dHV1Qa/XY+nSpfxBIVKAp59+GiaTCUVFRfjxj388YJ5v2ACMHStNjOQbziLO9Tfkwe9F3OFwIDV1Bk6etEAQ0tDVdROALADhAHYAcGDq1PVYtMiErq4uzJ8/H0uXLh1wpCsRyU94eDhuuCEC27e/jZqa/8CFC655HobnnwcyMqSNk7z30UcfYdSoUbwzKhN+L+KpqTPwwQcRuHTpNQCjrxx1AMgF8F8YNux/cfSoA9On6zF37lKEh0fCagUGuX6EZOz2WBw8KHUU3uN1yItSr2PBghmw26cA2IgLF1zzfBZmz96HJUs4ClkN2tvbceONN3JUuUz49bvQ0NCAkyctLgXcedqNAKLR3T0N3d0b8Prr0Xj9dX9G42tL3U6bUR5eh7wo8ToaAFgAuM9zjSYWISFPYuXKm92++1qLdwxlcQ9+lvuvNzQ0uD3uyWe98847cDgcWO+yDV1+fv5VP8v19Vdzrc+ib2gEQRD89eFGoxFFRR/h/PmyAV6xEEAEgGX+CoGI/M4I4CMAA+X5kwDKB3z3tX4FaTSaQUfi688yGAyorKyUXVxy/Kxr7WJ2+PBhjz+rra0NbW1tAIDi4mLFr9p2tZ+rodIaDAaffJA7p06dwsWLVxv8MPgfECJSJ1/+DvLHZ/niM+V+jb5w5swZv35WeHg4wsPD8Y9//MOncUvFV9eg9dVfA+40NDQgJeVBOByd6HubDRD7yw5i4L/eiUgZpgH4LQD3eX7dde8gM9OAm2/27Hb6LbfcMuhIfP1ZV2sxSRnXUD+rpqYGDzzwgKRx+aLLwJctWCn58jr8ejsdAKZMuffKwLYyAM7JoQ5oNHmIjm5CWdk+DBumvAESa9aswdKlS6UOw2u8DnlR6nUsWHAvTp+OQHd33zwPCclDQkITjh7dp8iBUCwa8sLr6M/vWbV37w5Mnz4LJ0/GQRCm49Il4PrraxEbG4ZduyoRGam8xAaAP/yhBdOmSR2F93gd8qLU6zh8+Op5rsQCTqQEfs+ssWPHoq5uHxoaGnDw4EFUV1fDaCzDlClTmNhEKsE8J5JGwLIrISEBCQkJOHHiBFJTU6/9BiJSHOY5UWBJuhUpEREReY5FnPzO4XDAaDRi6tSpGDlyJIYPH44xY8YgPT0dhw4dkjo8IiLFYmcV+dX58+dxzz33oK6urs/xS5cuoaamBjU1NfjLX/6CmdxcmohoyNgSJ79au3Yt6urqoNPpUF9fj+7ubgiCgBMnTmDalWHYa9askThKIiJlYhEnv/rjH/8IANi+fTuSkpIQEiL+yE2aNAlbtmwBALz//vuSxUdEpGRe3U4/f17cG/jSJeC664DPPwdGuy7YREHt448/HvBr48aNAwBcvHgxUOEQEamKV0V861axgAPi85YtwJNP+iIsUqN//etfOH78OI4dO4bGxkbs378fANDd3S1xZEREyuTV7XSzWXx+6inx+Q9/8DYcUqNXX30Vt956KyIiInDffffhueeew2uvvYavvvpK6tDIT8zmSmg06PfQaoGRI4GpU4F16wDehCHyjsctcYsFqK0FwsMBoxF49VXg8GHxeHS0L0MkJduxYwfmzJkDALjtttvw8MMPIzo6GiNGjMCkSZNw6623ShwhBVJ3N/D11+LvjtpaYNcu4MABIDT02u8lov48bok7W92PPir+df3oo32PEwHAihUrAIgD3BoaGrB8+XLMnTsX6enpCAsLkzg68jdB6P/4+mvgr38FIiOBujrg+eeljpJIuTwu4lcGHSMzU3zW68Vn5y12IgBoaWkBADzq/Cuvl7Vr1/b89+XLlwMWE0krNBT42c+A114T/11RIW08RErmURE/cAD45z8BnQ5ISBCPJSQAEycCNhtwZbwSESZMmAAAWLRoEc6dOwcAOH36NBYsWICVK1f2vO7LL7+UJD6SjvN3x//7f9LGQaRkHhVxZ2v7F7/oe9zZ2Kqq8iYkUpPCwkIAwObNm3HDDTdAo9Hghz/8IcrKyrBy5UrExcUBAN5++20pwyQJNDWJz7Gx0sZBpGRDLuLnz4tTy4YNA+bO7fs15y31rVuBzk5fhEdKZzAYUF1djcTERAwbNgwjRoxAWloa3nzzTRQVFaG4uBgAUMF7qkHj4kXg9deBBx4Q//3009LGQ6RkQx6d7pwbnpYGfP/7fb82bhxw993A3//OOeP0jUcffdRtnzgAzJ49G7Nnzw5wRBQoGs3Vv/7cc4DBEJhYiNRoyC1x5630/fv7zwHVaMQCDnCUOhFd28GDwKlTUkdBpFxDKuLOueGD4ZwzTkTBy90Us0uXgPp68U7d3/8OTJkCnD4tdaREyjSkIu5sXT/5pPvkdD7mz+/7eiIiJ60WSEoCXnoJ+PWvga++An71K6mjIlKmIRVx59zwnJyrvy47W3zmnHEiupqiIvH5rbekjYNIqQZdxJ1zw6dM+WZ+50CSksQH54wT0dVc2ZkWXOuHyDODLuLOVrWzlX0tzk1ROGeciAby+9+Lz0lJ0sZBpFSDKuJdXeLUsrAwYN68wX3wvHni6zlnnIhcnT0L/OY3wOLF4r8XLpQ2HiKlGtQ88dDQoW8ZqNUCn33mSUhEpBbXmicOiANhXReOIqLB8XgrUiIiT1x/PfDd7wIpKcATT4gLRxGRZ1jEicjn9HoDKisrpQ6DSPU83oqUiIiIpMUiTkREpFAs4kRERArFIk5ERKRQLOJEREQKxSJORESkUCziRERECsUiTkREpFAs4kRERArFIk5ERKRQLOJEREQK9f8BbCU1Q7i+UFQAAAAASUVORK5CYII=[/img]

[b][color=#9900ff]Aufgabe 1:[/color][/b][br]Zeichne die Skizze einer Raute in dein Heft![br]Die Seite a ist 5 cm lang![br]Beachte die Kathetenlängen im Dreieck rechts!

[b][color=#9900ff]Aufgabe 4:[/color][/b][br]Von einer Raute kennt man die Längen der Diagonalen: e = 90 cm und f = 56 cm.[br]Berechne die Seitenlänge a! (Verwende das Dreieck ABM)[br]Berechne den Flächeninhalt und damit die Höhe h![br][Kontrollwert: h rund 47,5 cm]