Mathematics
Grade-2
Easy
Question
12 - 10 = ____
THINK 10 + ___ = 12
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAboAAABkCAYAAADwtPVuAAAgAElEQVR4nOy9d3hU953v/zrnTO8z6r2hAqJXg20wxgUbO26x9yYuiRNnN+skm/Lkbn7xPslm781NdjfZzSZO4hTbcUlxxyYYQgyYYkwHAUJICPVeRprR9HLO+f0xxRISIFx2ya7ez8MDEme+8znf9umfjxAMBlVVVREEgfF/A5N+937//u8+FvCh0PNhjnUlztOVOtaVuH4ze2FmL8zshQ9xrEAgoKYmcvxknv/vD/rzzFj/eWONX+yZsaY31pWwbjNjzYz1UY51JZ+/j3oscTwXHM8Bz+eQH+Tn/+5jfVA6PuyxxmNmrEv//GHtpyt1rCvxzFypY30Y63aljjUe/9PG0sBENQ9Aq9Wi0WgmDfBBfp4Z6y9zrPGH7L/zWFfCXM+MNTPWRznWlXz+PuyxIpEIsiynf6dJfUGa82k0tLS00NjYiEajYQYzmMEMZjCDvxTEYjHmz59PYWEhiqIk+Np4JicIAjqdjqNHj/L9738fnU6X5pAzmMEMZjCDGVzp8Pl8fPe736WiooJgMPieRnc+dDoder0eYIbRzWAGM5jBDP5iMBXP0ozX5s538F3oQzOYwQxmMIMZXIkQBAFRFCe65KaKWjmfuQmCQDgcTjv3rmTodDoAotHofzElF4YgCGn/ZzwenzJi6EqBJEloNBri8fgVvf6pOVUU5YqmExJ7VFXVK3qPQmLtJUlCluUrek5TezQWi6Eoyn81OReFVqsFEn6kKxkajQZRFInH41f8nEqShNFonHCPnq+0XVCjG49wJMIdH/sYeXl5xK/gDS8IAidOnEBRFBYuXPhfTc6UEASBWCxGa2sr8XicsrIyTCbTFcnsJEmir6+P1tZWKioqyM3NvSIvPEEQCAQCtLW1kZmZSXZ29hVtiTh+/Dg6nY5ly5ZdkesOoCgKvb299Pb2UlJcTH5BwRW59pJGQ0dbGy0tLcyprb1i9ygkztPx48fRSBLVNTVIkvRfTdKUUFWV5rNnGfP5qKqqwm63X7H7VKvVcu7cOTZt2pR2twETLJJpjQ4mM7fxkONxKioquH7durRK+FHhfO3yciCKIu3t7WRnZ3P33Xd/5HTCxeftQp8Lh8Ns27aNgYEBbr31Vlwu10cmNb1fOgH0ej179+7F4/Fw3XXXUVtb+5FJoh+ETlEUcbvdvPjii6xYsYIFCxYgiuKHTWIaH4RWgEAggGd0lIcffvgjv5Tfz3kSBIF4PM7evXvZsX07t9x6K4sXL74i116n07Fv3z5+/7vfce0113Dt6tVXrKas0+n4f9/9LoVFRdxzzz3o9forkoGoqsrmP/6RgwcPcuedd1JSUnJFanWpffPGG2/w6quvTmB05/M1zfgPXWjSBUEgGoshiSIarfYjWxxFUYhGImh1OjQazWV/jyiKxGIxJElC+xHSqSoKkeT3pMxQ04UgCMiynDYLaLVatFrtR7ORBIFoJIKqqhM2wXSRmkNFUdJ0flSIx+PEYzH0BsNla2OiKKLVaonFYul/f1SMTlVVwuEwGo3mfc+HJEnp/fNRSfWqqhKPx4HEOr6fORUliZgso09GX6fcAh82YrEYcjyOTq9/X+um0+mIKwok3/GjovPDQDQeR9Jo0Ol0H+l5+iBQVRWNVkskFkOXvIv/0iAIwoQ9n36D6VzWqqqm/0wHKe1vOs/LsswbGzeyf/9+1q9fz9qk9ng5GM/FL4fO6UqUKbPj4UOHeOONN6itreWTn/zkZTP/8bRdDq2pxZsOU9RoNLScO8fvfvc7AD7xyU9SXl5+2XSeT/OHvvaCwJjHw8bXXqP+9Gk+/elPUzt37rRpHE/bR0onoMgyu3fv5tVXXmHFihV84v7735dApaoqH7VhteH0aZ595hkcDgefevhhCgoKLn8QVQVV5aPUOfr6+nj6qadoamria1/7GgsXLbrsMdQknX8JEOAvgtbUHr0SNc7zMRWN55/pj0TsFQSBUCjEueZm+vv6pjVZJ+rqePLJJzl29CitbW3EYrGP3M+SMtF0d3fT09OTloAvBFVV6ers5LXXXmP7W29xpqGBUCj0kZrJxtM6NDhI45kzRCKRi86NKEl4vV5eeuklNr3+OqdOnGDE7Z4QTftRIhwO09rSgtvtvuhzgiCgKgr79+9n48aNHNi/n56env+UwyUIAtFolPb2dvr6+tK/uxiam5t5+qmnOH7sGPX19UTC4f80X2B/fz/nzp0jEolc8tnRkRFefvll/vCHP3D8+HE8o6P/CRQm4Bkd5cyZM/j9/ks+G4lE2LxpE6+98gq7d+2iq7v7L+JincFfHj50nTR18I8fPcrTTz9NfkEBd911FwsWLUK6gH8vGo3y3HPPMm/uXK5ds4bqmhr040yCKbNq6pDr9foP5MtLQRQEent6ePa55xjq7+fOu+/mmmuvndJ2nvKtnTp5kmg4zBe+9CUWLVyIyWJJa1gpjSsVoWowGD4Un2ZKcPjt88/TcKaBJYuXcN9f/RWujIwpx5ZEkcOHDtHa0sInH3iAhQsXUl5RMalUjiLLRKLRtBnuw7hkFEXh+LFjPP3005SXl3P3PfdQU1Mz5diCIDA6Osred/aydOlS5s2fz6JFiyYwjxTN4SRTMRgMwIcgaQoCZ5ua+P1vf0sgGOTOO+/k2jVrLjgPsWiU7W+9hdPl4hv33ktBYSEms3mCdp3S+GVZ/lDNp5FwmF8+8QSnTp3ilg0buOuuu3C5XBd8vqmpiZMnTvDoo49yzbXXUlxSMukZWZaJRCIYDQaED4nOWCzG5s2b+eOmTZSXl/OFL32JwsLCCz7fcPo0J+rquHXDBubMmcOyZcumFBxSwuT7Mb/PYAbwETC6FIaGh6k/dYrW1lYCfj+SJDF/wYIpUxkO7N/P2aazPP7Tn1JeUZH6DwRBYKCvj23btlF34kRaMs3Mzk47nh0Ox/u/9JLReq3NzbS0tNDV3Y1Wq+Xqa66Z8pIaHBigrq6OpcuX81ef+AS6cTZ2j8fD/nff5d19+xgYGCAej2OxWlmyeDE33Hgj+fn5H+hCUWSZc+fO0XSmkb7ePkKhEJ995BFs50VESZLE0NAQ77zzDtU1NXz2s5/FYrWmVXlFljl69Chv79xJW3s70UgEnU5HeUUFN9xwA4sWLUr7Ot4PVFVldGSE06dO0d7Whtfr5Qtf/CJlZWWTNGatVsuB/fsJ+Pw88Df3U1VTk553WZbp6eriz2+9xalTp/D7fYiCSF5eHmvWrGH5VVdhs9ne19oLgoAAeL1ezjU30zcwgHt4GEEQWH3ddUiSNGnc5uZm6k+d4v4HH+Tqa655bxxBwO12s3vXLg7s34/b7UZRFJxOJ8uWLeOmm28mIzPzAzHmuCzT1NTE8WPH6OrqAuATn/gEJpNp0rOe0VG2vPkmxSUl/N1XvoLZbE7/XyQcZt++ffx52zba2lqJhhP+8AWLF7NhwwbmzZ2L9AH8MYqi0NnRwckTJ2hqaqKnr5cf/OCH5OTkTHo2HA7z7rvvYrHZePChh6isqnrPhaAonDx1ii1btnDi2DHCkQgaSaKktJT1GzawZvXqK9oPN4MrDx86o0uZx9atW0dpSQnRWIy33nqLF//wB6xW63uMLAlFltny5ptcddVVaa0jpcG8tW0bTzzxBJFwGLvDgcViQVVVGurrOXTgAFu3bOHzf/u31M6d+76kZ0VRmFVZyd9/85totVq2bd3KD/71XzGbTCxasmSCdKkoCp2dnfT29vLxe+/FbDKlc+COHz/OU7/+Nafr67FYLNgdDkRRpKenm8aGBjZt2sQXvvQl1qxejeZ9OKBVVcVssfC/v/EN2tvbcToc/NsPf8hLL7/M/fffPyGHRBRFzjU3Mzw0xLXXXosrIyNt6uzt7eXnP/sZ+/ftQ6vV4nA60el0BIIBtv/5z7y1bRs3r1/PZz/3OZxO52XTCQlGe+2aNfy8sJBwMMgrr7zCL554gm984xs4nU7kcRqQqqrs3r2bsooKiktL0wwmFo3yx02beOqpp4hFo9gcDiwmExFZ5tixY+x75x2Wr1jBZx55hKpxF+TlzCfAkqVL+dZ3voPFYmHHjh08//zzmMxmli1fPkETV1WVo0eOYLXZmDdvXnqvxWIxDu7fz5NPPklbWxs2mw273Y4gCLS1tXH82DFeevFFvvb1r7Ny5cr3zUTMZjP/5//+X0ZGRzl79izPPfMMmRkZ3Hb77ZOCWVpaW9n19tt887HHJjC5jo4O/vVf/oW9b71FhUbDAqORDI2GvliMP585w+bXXuP+T32Khz79aWw22/uiU6/X89nPfY5rV68mJzeXr331K/zTP32H73/v+9gdjgnPptJWqqurKS4pSa/h6MgITz31FK++8AJiKMQavZ5crRavLHO0sZGvb93K1dddx7e/8x1yc3PfF50z+J+HCUWdU/+eLsZ/JvUn9TurzcbCxYuRJInMzEx+8Ytf8Nprr/Hphx8mKysLRVEQRZFT9fV0d3fz9b//+wmb/bVXX+WFF17A5XJRumhh+jJPMcJR9wjnzjbzHz/6EY8++igLFy++KLNLaZLjnZSiKKLT6ZgzZw6CIFBRUUEgEOA//uM/eOwf/oGa2bPTnw0EAhw6dIiSkhLKKyqQFQVFltm7dy+/+uUv8Xg8zF+0CIfTMaF2aCgYpKO9g3/+3vcI+HxsuO22ac1pqhhpik6A0tJSSktLkWWZzz7yCM8/+yw52dnccuut6W4TPp+P0/X1ZGdlUVVdjSzLCILAmTNn+MXPf07T2SYqKivJLchDFN6rHiDLMj3d3ezcuZNgMMhff/7zlJaWTovOVMBCam1sNhuLFi1CFEVcGRn84F/+hR/96Ef877//eyxJU69Wp+PA/v0MDQ5yz913p7WTsbExnnn6aV7fuJGCwkKKSorRGwwTcj3dw8McP36cn/zHj/m7L/8dc2prLzmnE/ZoYlIxGo3MT6YiZGVn400GxTgcDqqqq9Of7evro7GxkWXLlmG2WICEOW3H9u0898wzRKMxli1fjs1hT8+3IAj4fX5ampv55+9/ny9+6Utcv27dtDSR8XtUEEUEYFZlJQDLly8nEg7zo3//d3Jyc1mxYkV6LUKhELt27sTpcnHt6tXpsQ4ePMi/fPe7xM6c4YcFBVxns6EThERQhCDgj8f53cgIL/3sZ4SCQR794hcxTqEtXpTO5Dvn5OSkNbgf/+Rx/v7rX+enjz/OV7761fTcoarU19cTi0aZO3du2hzd29fH4z/+MUc3beIhi4VPlZZiGnemY8BOr5efbN/OFwYH+f4///P7EnRm8D8LqqomglHO94lMB6nL0ePx0NzUxJEjRzh08CB1dXV0d3cRDAbToenlFRXcdffdnGtuZvv27YRCofT31J04gdVqpaamJq3J7dixgzc3b6awuIjZ8xIHIRAMMjoygt/nIx6P43A5mTN/LiMjI2zcuJGB/v4LEZowUfr9dHR0cOzYMQ4ePMjRo0dpbm7G4/UiyzKqqiJJEl/68pcpLinh+eeemxCk4Pf5qD91itp587Db7aCqHD16lCd//WuCwSDzFyzA6XISCUcYcY/gGR0lFo1iMBqZVVVJbl4uP/3pTzl2/PiUc5wyp0UjEfr7+jh16hSHDh7k8KFDnGloYGhoiGg0mi5vs3TZMtauW8fWLVs4XV+PJElpn1d3dzd5+flkZ2UB0NPdze9//zs6OzuZU1tLfmEBiqzg9XrxjIwQDoeRJImi4mLKyss4cfIEW998c8I6nU9rPB7HMzpKU2NjYu0PHeLkyZP0dHcTDofTl2DN7Nl8+jOfob2tjVdffZVIJIIoimgkiV1vv43FbKa0vBxJkgiHw7z0wgu8vnEjlVVVVFRVotFq8fv9jLrd+MbGUFWVzKws5s6bx7nms7z04osMDQ1NGaafot3v99Pe1saxo0c5cOAAx48fp621lbGxMRRFQVEUbDYb99x7L6Io8uc//Qm3252+vHt7evB4PFTV1KRTQU7U1fHiCy8gSCJz5s/FYrUSDAYZHR3F6/EQjUYxW8zMXTAfm93GSy++SOOZMxcVJCORCF3d3Rw6fJjde/eyd98+Tp48ybDbjTzO7Hv//fdz3fVr+advf5uzZ8+mf+/xeDh8+BBLly3FYrUCUH/6NL/46U/JbG3lR2Vl3GS3E5JlTgSDHAwEGI3HsUgSn83M5NGMDN5+8UW2bt16UaExHo8zODhI3cmT7HnnHXbt2cORY8fo6ukhHA6nnysrK+PRL36RkydPsOXNN9M5g+FIhHPNzRiMxrQwFY1G+c3TT9O8ZQv/n8vF32RloREEzobDHPT7aY9EkFSVm+12flBSgra5mSd+8Qt8SbfIDGZwIUwq6nyxQ6ieF2YcDASoq6vj4IEDtLW14fF6UBUVnV5PZlYmVbMqWbFyJdXV1ej1epYvW0ZrayvbtmyhtKSElatW4ff7aWk5x9y5c9Plm9paW3nrz3/GYDJRWFSEIsuMuN30dHXj9/uxWCyUz6rAarNhMpkoKinh5KlTnDx5krz8/El0K7JMW2sre3bv5kxjI8NuN7FIBK1Gg8PhoKSsjKVLlzJ//nxsdjsWi4UHH3qIx3/8Y7a/9Rb33ncfer2etvZ2QqEQc5JaXl9fHxs3bmRwaJAFixZhMBnxejz0dPUwOjqClPQpZOfmIEkSxaWl+MZ8vPiHP1BeXj5JuFAUhf6+Pg4cOEDd8eP09vURDoUQRAGL2UJBQQHzFy7kqquuIisrC7PZzLp162hpaeHlV16hYtYs7HY7fb29RCMRCgoL0Wq1RKJR3n77bc6cbqCgsACb3Y4cl+lq72BoaAhZlsnJyaG4rBSNRoMzI4NAIMCRw0dYs3btpBwaQRDw+/0cPnyYwwcP0tXVxdjYGKqiYDAaycrKorqmhuUrVlBRUYFer2flypX09fby9q5dVFZWcvXVV+P1eGg4fZrFS5akTWWHDx9m69atlFdUkFdYgKIoDA8O0dvTQyAQSJi+Z83CZrdhtdsoKS9n9+49LF22jBVXXTWJKcdiMZoaG9m3b1/CnDs8TCyZG+RyOimrqGDpsmXMmzcPi8VCWVkZN61fz8svvcSRQ4e44aabEASB9rY27A4HOcmKKx6Phzdef52xsTFm185Bp9Ph9Xjo7uzC6/Wi1+kpLislIzMDURQpLinhbGMTe/bsYfacOZP3aNIsvnPHDk4eOoSnt5dYMIggSZgcDrLLyliyciVXr1pFVlYWBqORz3/+b2lsOMOvfvlLvv2P/4jdbqezowOPx8u6G24EYHR0lM2bN6M2NPB32dlUGo30RaO84vGw0+fDJ8vc73TyQEYGWkHgFoeDM+EwLzz7LNevWzelkOP1etmzdy8H9+yhv6WFsNeLoigYrFYyiouZvXAh165Zw6yKCkRRZNnSpTSuXsOftm1jTm0ttXMTwunQ4CD5+fk4kkE1W7dtY98bb/CQ0ci1djtR4A2Phzc8HkbicZaZzXw+M5MCvZ45RiOfczj4eV0dhw4fJjsz84L31gz+52I8P5twi11Mm0tpHKmL7s0332TLm28y5vXicDrTfqlYNEpXZxeNDWc4ePAgG267jRtuvBGHw8Htt9/O0cOHef2NN6isqsLv8zE4MMDqa1cjiiKhYJDdu3bR399PVU11Qpof89HR1o57eDhdxzCl2SiKgt1hR6vRcOjQIdZef/0EmmVZ5vDhwzz7m9/Q39+PyWzE4XBhs1pRFIVRr5f23bs4cvgwa6+7jtvvuIPsnBxmzZrFunXr2L59OwsXLaK6upoTx47hTF6OoWCQ/fv20XD6NBUVs7BYLISCIXq7e+jt6SYejyMIAsGAH1VNXI4ajYbi0hLa2to4c+bMBIlZEAQ62tt58YUXOHToEJJGwul04cpMRFWGAkGOHz9GXV0dB959lwcfeoiamhpy8/LYcOut/OTHP2bTG29w/wMP0NvbC4JAcXExBqORxro69u7Zg9FoxO50pjWU9mQKB4DJZEqbSiVJwuZw4B4c4lxzM67kJZL6v6GhIV596SV27NhBKBIhw+XC7nAgiAKRcITWtjZOn67n6OHDbPjYx1izZg0Wq5XVa9fSdPYse3btoqamhqHBQUZGRqipqcFisTAwMMDWLVvQaDTkFSZyvsbGxuhoa8Pj8STok2WikUgiGUmFrOwsOtpaOXrkCFXV1RPmVBRF3k1WzBgcHMRitWC3O5A0EvFYnIGhIc61tnLwwAFuuvlmbrv9djIzM7nqqqs4WVfHtm3bWLh4MVarlZaWFgoLCnA4ncTjcd7dt4+jR49SPbsGo9lMKBCgs62D3t4eACJ6PZFwKH3QDEYjTpeLxjNnJlVCURSFU/X1PPWrX9Hz7rssjMW4zW4nS6MhFo/T3tHBvtOneX7vXo6sXcsDDz5ITXU1ubm5fOWrX+Xb3/oWb+/YwYbbb6fh9GlMRiOLFy8G4FhdHQ179nCLRsM8iwVZUdjs9fKM281wLEZEVTlpMCCrKlpBwCSKfMzhYGd3N2/v2kXWeQxk2O3mN08/zbuvv06lz8cGo5ESgwEEgeHhYY62t7Pj4EHe3buXBz/zGdasXo3NbueGG2+k/vRpNm/eTO3cufT19jLsdnPVqlWYjEb6+/t55vnnmR8Osz4/H60osntsjCeGhmiLRBAAgygyIssUJA4M84xGZns8tHV1kTdFsMsMZjApYXy8/+OCWt04x/zuXbt48Q9/wGQ2Uz1nNnqDPhFIoCTGycrJIeDz09nZwXPPPovP5+POO+8kOzubTz7wAP/2gx9w+NAhXBkZaY0iEbzRw66dO8nMzMRkNgMqkUgYz8ho2qfncrkwm81ps1IqqKLh9Ok0g0nR2XjmDL/8+c9xj4xQVVONxWpFlMTkJIhkZmcRDofp6+3htY0bcXs8PPLII2RlZXH1Nddw5OhR9u7ZQ35+Ps3nzlGQn4/NZqOxoYG97+xFZ9CTmZOdTn0Y83oTzENVsdhsODMy0mYVVVWx2mzIyQi67OzsxAJoNIyMjPDSSy+xZ/duiktLyMzOQqvVpVYLVVXJyc9jZNjN8ePHGRgY4Atf+AJLli1j7rx5rFy1is2bNrF8xQr8fj9anS4tKe/Yvp3e3l4qa6rTFTKGBgfTZZJ0Oh0ZmRnpIq4AJpOR/niM3t5espJ0iqJIKBTijddfZ/PmzTgzMiirnJWomiGKSR8d5OTm4PP56Ors4pmnnyYUDHLb7beTl5vL1atW8ebmzZyurycQCKDV6cjNz0eSJI4eOcLZpibyiwrTQSnhUIgxny+99g6XE5vDTorT6fV6XBkZtLa0Mjo6mqZfkiTqT53iZ48/jgJUVFViNpvT4yb2aDahYJCe7h6ef+45Bvr7+fRnPkN+Xh4bNmzgO9/5Dnv27OG6NWsYHh6mrLwco9HI0NAQzz/7LHaHIyEEJFMfPJ7EHhVEEavVisVqQ9Jo0onhVruNns4u1POS/bu6unjyl79kZM8evuFysdRqncCwl9psfCwzk52jozz1xhv8aGCAL3/ta8yZPZvlK1awdu1aNm/ezLz58+np6SErOxuDwYB7ZIT9e/bg6O7mmpwcEATCikJdKMRALIasquRqtdzhcKBLmf5UlTK9njxFYc+ePfzVffel1z4ej/Pkb37Dtief5BG7nTsKCrBotWk/H6rK9Q4H9cEgz544wXe/9S383/gGG269lfKKClZfdx1vvPYap06exOf3EwmHyU0yqNffeIORxkbudjpxJC0Ix4JBuqJRZMAsiiw3mSgZl17g1GoplmViHg/8J+SxzuAvD+ODydI+uvGBHlNCEBBEkaHBQV595RV0ej0lZaUYDAbCoTBd7Z10tLczODBALBrDardRPXs2RpOJ1159lS1btjAyOsrq1auZU1vLO3v30tXejt5oSOTHqCo7d+zA5/eTkZ2VTCZW0RsMZOdm47DbKSwsorisFK1ej2/MRygYQlFVDEYDQ4ODE6TlaDTKG5s2MeR2MzdploxGowz0DdDe2kZvdxfBQACDwUBpWTmFRUW8+cc/8uwzzzA0NEROXh6rVq2iru4YPd3d9PX3UVRcTDgU4tSpU/R095CdlZXODdTpdDhdGTidTjKzs6msrsLucBAOhQgGAun51Wg0DA8MpC8zVVU5fOgQb+/cSX5hIbl5eQiCyNDgEO2tbXR3dOJNXuI5ebnMWzCfgYEBfv6zn3HyxAlMZjM33nwzqiCwZfNmItEoeoMeq8XC6fp6jhw+jNVqTUfgKapCVk42TqcTl8tFWXk5Obm5yPE4Y14v0WgUSUqUX/P7fOn9oNVqOX36NLt37cLudFJYUoxWq8Xn99PV0UlneztDA4MoqorNbmdWVSWyLPPcM8+wY/t2RFFkwaJFODMzOX36NGebmsjMzMRiseB2uzl48CBarRZLMmBBEARMJhOZmZk4nU4Ki4sor6xEI2kI+HyEwyEURcFsNuPxjBJKNlgUBIFwKMTjP/4xgVCIyuoqLBYL0WiU3u4e2lvb6OvtJRQKYTSbqaiaRWFRIX/aupXf//a39PX3MycpPGx89VV6k886HA7kJAPo7u6mqLg4XTlCbzCQmZWFw2EnNy+X0vIyrDYroUAAv9+PoijotNqE33rckVIUhbfffpuuvXv5ckYGy202IorCAZ+P54aGeM3tpjUcRiMIrM/I4B+ysxndtYsnfvIT2trbEUWRO+68E7fbzTvvvIPb7aYgmbd2tqWFlqNHWa7TUZhkEDpBYIXJxEqTiastFr6Zm8sqqxVvPE5LOExQUdAKAkWiSEtrK6Iopn3C7+zbx9aXXuI+s5n7c3IwSRL1gQAvuN38bniYw4EAcVVlocXCt3JyWDwywj9+85ts374drVbL6muuwWg0suXNN/H5fIiSREZGJgP9/ezYu5ebtVrmjAuAWWIysdJsZqnRyP0uF5/KyEALtEYiuGMxtIKAVVEwxGIfKB1mBv89MT4wMu2jm65Gp9Fo2LdvH0NDQ8yqqkw75nu6ujnb2APVmC4AACAASURBVJhM6DVSXFpCcWkJOp2OsvIyWs+1sHHjRswWCxs2bOCWW2/lN08/zfG6OjRiol6k2+3mz3/6E9k5OROq+ZvNZqrnzCEaiWA0mkCAvu5u+np7sdlsyctPmpCjJQgC8ViMhtOnKSgowGgyEo/HGR0ZpenMGfw+H1qtlpzcXCoqZ2G12cgrLEAURV577TU0ksQDDz3EwkWL2LF9Owf272fMO0ZmVhZut5vjx44hKzJ2pzM9Z3qjntLyMnLz8zCYjGi1GkaGR+jq6EBFpaq6Bp1elzDvJmmVJImBgQH27tmLJEnk5OUiiCJ+r5emhgZGR0eRJAmny0VF5SxcGRkYTSZm19ZytqmJp558kke/+EVKSkq4+eab2bF9O5VVlbicLjSSxI4dO+jt6WF2bW3aB4oKRSUlOJ1OJFHCaDYRDAToaGvHNzZGQVEReQX56UCi1CUiaTScbWwkHA4ntK6klN/Z1k5XRweKqmI0GikpK6W0vBy9Xk955SzOnW3mqV//Gp1Wy7Vr1jBv3jxOnTpFR1sbDrsdg8FA87lzNDU24nA6J/gEbXY7s+fMJhaPY05Ga3Z1djLY348rM5PS8jIkjYa4LKfTFkRJ4vDhwzQ1NVE7fx56vR5FURjqH+BMQ0PaR5dXUEBpeRlms5ni0lJEUWL79u2YLRbuve8+brvtNra8+SYHDhwgGAxhNpvxjo6ydfNmsnNzsTvtKHLiO43JgKNQOIzRaESj0TA0OEh3ZxeiIFAztxZBENMRqqk9Go5EOLRnD6sEgYVJQaQ1GuX/9Pbyjt+PXaPhGrOZx/LymGc0stBs5rHiYr6/axeP63R847HHKCoqYsnSpezfv58Rt5uqqioAThw7Rry1leU5OYhJjUsrCHzC5eJaiwWLJJGl1dIRifDE0BDd0Sh/m5XFUrMZPYmAEUhoc8NuN2+/8w41wSAfLywEQaA3EuHxwUH+6PUSUlVqDQa+kJ3NXXY7Lq2WbxUVoent5d+/9z00Oh1Xr1zJNatXs3PHDsKhEAa9HrPZxDv79xPu6OBmmw2LRpMuO7bOamWWTkdUVak0GPDIMs+43bzt87HOZuNvsrPRkojEnKmlMoPzMT5fW1VVxPM530U+iSRJ7N+/H4PBgCmZ05ZCqhJEOBxioK+PSDL6StJoKC4rRY7Hee3llzl06BBzZs/G6XBQX1+P3x9AURR27NyBx+cjK3eivT2lLVltNjRaDaFgiJ7uXjyjieAXIF10eDz1iqoS8PtxZDjT1StEMaFRpS79/v5+RkcTJidVUcjOy6GmpoatW7awadMmrFYr1TU1vPvuu0QjEUKhEO3t7bS1tWG3OyYWnlZBq9Nis9vQabXIcZnhoUGGhoaIRWMT3ieVSydJEn29vZw6eZLsnJwJBaI1Om06ZWDE7WbE7U5HhxpNRkrLSmlvb+cPv/89Y2NjrFy5kmAwyIkTJ5Ekibb2dk7U1WG2WjBbJ66VqihYbTaMloRvzjvqobe3N1F5RnhP8JEkKX0xi6LI4OAgkkaaUJ1ElCSk1NqHQrS1thGNxRLMX6+nYtYsorEYv3n6aU6ePElNdTXxaJS2tjaCoRChUIijhw8TjcWwWC2T9qDeaMRqs6XHH+jrw+P1oqqJNVVkBY1Gg5QyW4oi+w8cwGg04kgKIokXENJ7NB6PMzw4hM/rTaRGqCp5Bfk4nU7+vG0b27dvp6CwkHnz5/PO3r34/T5kWeZ4XR19/f2UlJak915qHrQ6HXa7HZ1ORyQcZqC/n5GREeKKjEBCk5Yk6T3tQ0iUIOurr2ep3Y4uSb8ImDUabBoNiqqyZWyMA4FA4jJXVRaZzXwpJ4ezW7fy05//nHAkwtKlS2lra6Ojo52YHKd/cJC6d95hniAkfGjjz6kgUGYwkJXcg+/4/Wz0eBiOx5GT3xEDjMk1liSJgcFBOhsbWWIykaXTQTJFwyJJmCQJsyhyLhLhjx4Po7KcMN2LIl/LyWGO281TTzyRTs+IRCJs37EDQRDo6e3lyLFjLI5EKJ0i7aLEYKDSaEQFWsJh/uj10hgOoyTfRwauvJr6M7hSMN5SOaGo86VSC0RRpL+vD51Ol5ASk4MVFBYQj8Xwej3IsoLD4Uibv1IXXkl5Gc1NZ/ntc8/xN5//PKIoMuJ2EwoFqa+v54+bNpGZkYnZbJ6kVY7P0dNoJHJzc8jKziIrJwutTkskHMHpck2qPCIrCpKUkBIFUcTucFBUXMTgwCCRSAS9Xo/J+J65REAgvyCfeCzG1jffJDsrC1GS6OnpIRaNcujgQUZHRxkdHaV81qwJUsN4OlPzYnc4KJMSgSUGowE1GUzjTF7AqcAe94ib/KICVBJM22q1UlxSgk6jJZgsf2Q2myf4bmw2G3kF+Rw/doyNr73GqlWr0j3E2traiG/fTn9/H9k5OVN2RxhftsxoNlFcUoLJZCI7J4d4PI4oipjGrYXARClfJeFfzC8oQFUUxsa8yHIiTD+1N9SkWbmispK2lhZefvFFrr/+ekLhMKFgkKamJo4ePcqxY0cxmYwYjMZJe27i2mvIzsslOzeHzKwstFotoVAQq8WSzrUTRZHe3l5MST9u6h0zs7KIhiPpyEur1YrBYEgzEFEUyS8spK21NVHCqqwMm81Kd083oiByoq6OwcEBdHoddufkajzj6RQliQxXBkajiczsLHR6PeFwOC0gpOZTlWUUt5usVIkuVaVUr+dTLhc2UaQ7GsUgCBOZgKpyjdXKo7m5/PDVV8nJzKS8vByfz8fw0DDHjhyluKiYgbo6PulyYRDFyUWEUz8LAhV6PX+dmclco5FFRiNxVWUQyM/PT/gchUQOqTwyQnZq/6kq+TodH3c4EIGGcBiVhLnROO4OcWm1fCYjg8fPnuW3v/0tN998M7IsJ6JY7Xa2bttGX309d2u1uFL+vqnoBDI0Gu5yONAJArfY7SDLBASBqEaDcJFo8Rn8z8T553PKxqsX+CQAsWTAh0DSnycImMxmKqoqE/4IWcZgNKI3GiaojmazmbKKchobGnjmmWcYHBhAVVXGPGPs3LmD7s4uFiy+eOXylD+koKgQSGkcif5ehYWFaKbKpYKEfxEwGAwUFhXhdLmIhCPo9LoJ1SPUJEPMLyygvbWNV19+Gb3BQDwWIx6Pc7qhgTGfD4PRiNFkvOh8CYJAZmYmroyMtDkuEo2iqiqFhYVpU5uSTDyXkonBKWaWk5eHzW4nFAwiiiKW8xidIIpkZGYSiUb585/+RHd3N9FoFEWWaW5upru7G0mjnajVXAA2uz3BSJOdmn1jYwmTqdOZlp4hoQm+F30LCCI2uw29YRbBQABZljGbzRPMj4kgHAtFJcW0trbi8XjweDwAeD0edu3cyeDAIAXFRRfN3UpoTfqED0pQkaSEVu7z+aiuTPjh0pJ+sgVOah0EQUiYVcvLcGVlJfIbDYYJJbRUVUWn11FUUkxL01mef+45vGNe5HicSCzOkcOHCQQDiaauCFyopr+qqmi1WrLzchPae1IrD4fD2Oy2ScKkLMtI47Q8oyCw3m5nrsFAdyyGVRSZZTBMsFYIwHqbDW88zlMvvkjF7NmEg0FkWeb06dNotVryYjEWXirpW1VZZjJRazBgEkUkQaAvGqVHVbm1tjbt85YVBUGWE0nmSToFYKXVSoVeT2s0iqyqVOj12MetvQDUGI3cL8s8tW8fvx8cZCRZ6Lu7u5sdu3czNxCgSq+/aDcHASjW67k/GUxlFEUCsRgjGg0mk2mG0c1gEs7na5ppMTkSdnBVVbGYzYz5fKioBINBOtvaicVi5OXnk5mdlRgn6ROY8HlVxW63M6uykpMnTiS0r6Sj+9TJk1gsFmznlQm6EMaX0YqEw3jHvFx//fWT2+WoKqiJBNf+3j7cbjcZmZnk5OZgTeZuTSWZa7RaCoqLONfYRCgcTms/Y14vvcnEakmjmRRBdz4kjQYp9R0quIfdGAwGampqOFVfDySiHvUGA9FYDEVRGOgfYKC/H6PRSHFJCRnJyD6mWCNRFMnNzSUajrBn1y70BkMiitPtRqvTUTFrFgaD4ZJtfQRBQJvUGhRZJuD3o9NoKSwsRBkX4CNJEoqSuOJDgSBtLa2oQH4y9D411uQ5BbvDQSQSobO9g1A4jCCKaDQaGs+cwZnhwjJO4LgwnaQT4wGCwSBej4fKqqqElpxMkbBZremakJFIhN7uHvw+H5lZWRQUFkwoQzaRThWTyURJRTkNpxuSDDuxR7u6uzGZTDhcrkueFSDN7FO+To/HQ3lpWdrEmnohwWgklKT7TY+H171eFplM3ONwcE0y6XuSpgNIgsA9Lhc9g4M8u39/Wkga9XppPn6cRxwObCmf10UgCQLW5HMqcCoYJKjVsmbNGtzDw6iQqOlqNOJPCigngkFeGR1FBD7lcnHVRdZOFASWWyz0ezw8fvQoo0nN3O/3I3R2MsvhIH8axZpFmFAlZSgWo1OSWOFwTBDGZjADmBhxKQgC4njOdymkqpzEolEURSEWjTI0OEhvdzdtra3vVdK4wMZLVbUoLC4iGg4nLlEB/D4/Vvt7Jq/pvESKZt/YGKIgUjt3Ltrzkpt1Wi2xWEKLGvN66enspKujgzGvd8JkTAWj0Uhh0qSUYhRyPI4cj2Mw6KfVU2q8KVNRFfp6e6moqKCoqChdkcPhcFBYUIB/bAySfsWhgQFaz51jcKAfRZbTQsZU0Gq1FBQV4srISMyFKCZSB5Im4+lGpKUKAsiKQjAQxOF0UlRUlJbqVTVRb1MQkg1yo1EGBwfp7uykt7s73VliKjpTa+XKyCAjOws1qcWmKuEYDIbLqm6R0rxTDH1ObS2WZCcBRVEonzUrYW6T5WT1nlF6knt0bFwk6YXGttlslJaVEQwE0ow+Eg5fVhPK8Xs0FokS9AeYVVmJOC7dRNJoMBcW0pfUiJoiEV4cHeU3w8Ps9PmIjQtemQp6QeCTTicrJYlgMuo0Fouh+nyUjzOTToNYAKKKwp5gkNySEubPm5fwCSsKDpsNXW4uHfE4qCo90Sg7x8b41fAwm8bGCF5CkNIJAjfabNyi1xMJBBJ0yjLaSITcpIZ2WVBVWiMRus1mSs8TxmYwA3gv3iTF38TxnO9SkGWZ5StWIMsyvjEfZouFispK8gsLcDgdaKao+n4+VFUlKztrQoV4QRDwerzTomHcmxCLxRgaGmLOnDkUFxVN8NEl8q5cjLpHEsygsICyigpcLte0u4Lb7LZJLXti0Wg60OZyMDw0RCgUYv2tt6bplGWZnNxc5i1YwMjIKLFYjJy8XErKysjJzcVgMl2SUamqisFgICc3Jx15KggCkUiEUCTEZcWkqSrBQJBoNEptbS1Z2dlpRqcoSqKIrpJ4xmq1MquqivyCAmw220RN5QJ06nQ67Db7exGgyd8HAkGUaQpbkFjbSDjMQF8fV624iurZNWmpXlEUli5dCorC6IgbvV5PYXExRSXFuFyuaTEqVVXJzMmepEUH/P4Jpbimg1Teot3hYP78+RMYuk6rpXTuXOr8fmTgToeDb+TksM5mo1inYzqsP1enY4XJlOiwTcLM51MUWt9H2H19MEhDLMZtd92V/p2iKGRlZVFVU8PpSITeSISrLBY+l5nJx51Oqg0GNNP4HrtGwwqjEWQZNSFh41VV+mIxopd57t2xGNtDIXJmz2bunDnpwgczmEEK5/O19KmfjvlSlmUWLlhAbm4unpERbMm8ocyszLQpajpQZGXSd/l8PsLJ8OzpYtQ9ghyTWbVyFRnJuo6pl9NoNFRVV3Pg3XfJKyzA5nBgslggKUlPB6oyMd1CVROJ4cFgENdlHM5wOExXRycrVqzgqhUriI9jHi6XiyVLlrB71y5GR0bJzs2htLws4bdL+ncuSaeqEpcn90ULjAWQYzKidOmeeKnapSPDbmw2G8tXrEh3i4BEq5iysjJMJhN+nw+rzUp+fh7Z2YmAneloZOmUhfN+Fwj4iUTC094/siIz0N+PTqdn7bp15OTkMjgwACTmdO7cuVTPmUNPTzcZmVlkZGTgsNuBhDl5OkLOVGbpUChEMBjEYLy4fzYFURQJ+AMMDAxw/bp1E6q3pBj/3MWL2bJ3Ly3hMHOMRr6SnU2chJluOhYOWVUnMApREPArCk2h0ET/3yUwKsts9fmwz5/PzTfdlF6nVB3QFYsXs8Nu522vl/uzs/lfLhd3qCpGQXjPd3cxqCpRSFt8RMAvyzRHIozG45j107OSyIrCrrExDhgMfPmGG7Db7ZOqzcxgBuffm2kxfFqHX1VxOJ2sWbuWMa+XgN+PKEno9Hq0l9t+5ryzoSoKfp9/Whd7Kim4r6+X2rm1LFm2dFJTRp1Ox3Vr1iAAvd3diUALrRatTjdtzSERazPxWUVR0o1VpzOOLMv0dHZhsVh4+OGH0U3hj6itrWX+ggX09fURjUTRarXo9PrLaj00FSnBYGBaHakhsbajIyOMjXm5+uqrmT1nzgSmJMfjVFZVMbu2ltHRUSLhcHrtp212FJi07gDxWJxwMDw9jV6AMY8X99AwK1etSvTPO+89tFotDz74IMFAEPfgEKIootXpLmvtp4KiqtPqnA3vCRvnzp4lMzOT9evXTxAcIMEIlyxbhqmqiq0jI6gkQvYdkjQ95kFCXz9/lyiqiluWGZblaWl1cVVlz9gYR/R67rzvPjLH9c9LmWCXL1tG7dVX88fhYToiEQyShFOSElGd05uQdD5f+v0Fgf54HHcyJWE6qA8G+YPPx5JrruHGG29M0ziDGYzHpHiGyzn4KU1p1apVlM2qoL+3l2gykvByNptWp0OjmcwYw6HQJT+bSgZvO9eCxWTmtttvJ7+gYDIHF0Vqa2tZc911dLR3MObxJGNkpk9nKgrxfHtvLBqblhSpqCoDvX2Mjo7ywIMPUlFZOUmjkWWZrOxs1qxenaz715fOl5s2naKITjvxEheSeVrjy6JdDGNjY7Q2n6Omuprb77gjnWidfpekZL9u3TpsVit9Pb3pfnzThYCARtKkK26kx5ZlYvFLm58SAk6Y7q5EZZJbbr01ERk6Rf3IJUuWcN1119Hb20vA77/8ParVTo7iVRNlyabDPGRZTtfpvP+BB6iqrp5yHUpLS7lm/Xre0WrZOzZ22eZGjSBg12gmmQ/9soxnmmbWY8EgT/t8XLVhA2vXrp0kYMmyjMFg4J677iI+axYbh4YIvA8tyi5J6Mb1+ROSdF7Kx5dCRyTCT4eGEGtr+cqXvzxl49kZzGA8UmdOvFxpSFEUiouL2XDLrYSDIYYGBi/r86qaSDI2mUyTDtSlohhT7WGaGpvwer08+KlPsXjJkglNMsd/jzXZeiU7J4fms2eJhiOXJdELgoDZYr4szWo8hvoHaG9v5+577mHt9ddPOU5KeFi2YgVLli7FPTScYMqX+V1avW5C3ltycKbjo/ON+Wg4VU9WdjZf+/rXcbpcU0ZqyrLM4iVLWLt2baIw7+DgZUvTWp0WvdE4eR2mYVqNRqK0t7Ri0Ov5+Mc/Tk1NzQUZmEar5ROf/CQWi4Wuzq5J3c2nA1uyUPkEMpVL06koSqIsWkcnf/eVr7DmAl3LIZGYfcvNN5O9dCk/d7vpi0Qui9mJQLZGQ55Wm15pBYhNc10aQyG+3dtL/sqVfOZzn7to09VVV13F+vvu40+yzC6v97KjHZ2SRJlOx3gWGVfVaY3TFY3yb/399OTk8J3vfIeCKTqVzGAG5yN15t53NdRr16zhY3fcQW9PD/19fZdlJxcFAafLNaHyBnDRppQq4Pf5aGw4QzgY5Ktf/SrXr1t3wQsEEky5sLCQbz72GHqtjnNnm5MS+bRJxeFwvmeWVdV0SsTFGGZcTrTB6ers5M677uLue+65qPQpyzIul4s77riD6upqOjs6GRsbmzaNajLC0jWeQSV9keJFzIqyLDM8NMTZxkYqKyv51x/+kKzs7AsKHKqqEo/Huf/BB1l3ww10tHcw2D8wbSaSyIPUY7VaJ/jKBEG8qN9UVVXGxsZoajyDRpJ46FOf4prVq6cUcMZ/pqi4mEc+9znkeJyujo7LClpQFIXc/NxJHeG1UyU2j0M4FKKtpYXhoSE+/+ijrF+//pLBTzk5OXz5C18gVF7OY52dtCUTsKcDAZil01FtMKQZhgAYRRH9RfZoUFHY5PHw1729FF1zDd/69rfThcYvhvvuvZdld9/NM4EAu32+aTNUVJV8rZYVZjPxlFmUhC/SkEw1mgoycCoU4nsDA7SVlvLt73433SprBjOYLt43o9PpdNxz773cdttt9HR109nRQSgUmpaELwgCTpcz0aFg3AY/v1TVeATGfJw728zgwAA33nQTS5YunVYADcDs2bP50le+gslkovVcC2OXEeFptdvSSdcqCSad7tZw3hgpjbO1uZmWc+coLS1l9erVE5LSLwRZlqmYNYsHHnqIkpIS2lpaGRqYHhNJBTZkZGWmo0RVNZEicaFLVlEUhgYGOdvYhE6n466778bhcFwy505VE1VEvvzVr3LjTTcx0N9PX0+ifNh0Im61Wh0OpwPTOK1O0kho9foLCg9jY2M0nm5g1D3C8hUrWLJkCeI01l4URa5auZKHHnqIeCxOe2sbAZ9/2v5olysj0WQ3iYSGb5ny+ZSpuL2tna7OLhYuXMiSxYvRnp/beQHMqa3lW//4jwRra/nu4CDv+nyEpmnSy9PpWG4yYZUkVBK5cRmSRMYFhIewovDS6Cj/r68P2W7n/gcfTOdBXgo2m43PPfww5bfcwq+CQV53u6dtIjVLEqstFop0urQml6XR4DhP4B2PM6EQ/9DTwxGNhvXr11NdXT3jk5vBZUN67LHHvjP+F1qtloaGBvbt2we8d3mvWLGCysrKCYEHer2e2bW1GI1GzjadZXhwEJLBAKIkXVTz0Wi1yLE4Xo8nfXmWlpdPGXmX0CRiCRFQgN6eHrq6ujAajWRmZqY1LkEQ2Lt3L3a7nQULFrz3kpJEXl4eeXl5dHcnmHI0EkWv1yW0nouYJkVRRKfTMTQwgKIk6ipmZmVNeTGk85hkBUmjwev10tnZiQCJdIFkblM8Hqe5uZmxsTEWLFiAcVwUX25uLuXl5bjdbs6dbSYYCKDRaNFoJ/u2pqI1HAolKtSoCplZWYmI2Ck+oyoKsVgsEaofjSaqloyMkJWVhS15uWs0Gtra2mhra2Pu3LlkZ2enGaFWq2VObS2qqnKuuRn38DCCIKBLMqzzy7GNh16vJxgM4U+24DGZTOTl5aWT1ifQqarEIlEEUUQQRPr7+xP95SwWMpJtkFL5eHV1dZSUlJCXl5d+Z41GQ3FJCS6Xi5aWFro6O1FkGY1eh+YSe1QQBLTJNkqp4KOC4qIpI4NT50SOxxElkeHhYTo6OtDpdGQl65imcOLECfx+P+vXr58wRn5+PrVz51I/NMSOtjZGQiFckoQlGYF5oZWXBAGrJFEXCtETi6ERBBaZzdxks035mbCi4JNlTJKEPxymobUVXzBIbl4eFoslLUC2t7fT3NzMokWLyBnX883ucDC7poZBWWZrczOtHg9mUcQhSWiSFX4uMKFkaDR4ZZkjoRCyqrLQZOI6qxXbBSwPvbEYOkFAjEY509VFz/AwroyMCdpnT08Px48fZ/78+ZSkyqldodi1axcul4va2torujN6U1MT7e3trFy5coKwdyWioaGBt99+O33GotEoa9euZc6cOWlF4QMxOkjkAs2ZM4fi4mK8vjHaWtvwjnoSoc2axCU0FSMRRZFIJMJo8hIBsFqs2B32KTUlvV6PzWHH6XIhSgKNjY2caTiDw24nv6Ag3WttKkYH79VlrKyqQo7HaWtrY3BggGg0kjCdJS+9qSBpNOngCwEBo9GAzeGYsuSYRqvFYrfjcDgwGk309vZy/OhR4rLM7Dlz0Gg0F2V0ANnZ2cybNw+rzUZnRwf9vb3JhODEhSeOqw4yfo5EQcAf8OMd9aCSaJTqcDon5QJCooSYyWzG4XRis9rw+8Y4cvhIomhxUREZmZmJ4tAXYHSQYFg11dXkFxQwMDBAT1c3I2534rtFEUEUp5xTjU6Hb2wMz+goqqIgihI2hz1RzmmK99Ib9NgdDhzOhMZ5pqGBs8loxvxkP7tgMDglo0utfXl5OVVVVcRiMZqbmxkdGSEaiSKKif15obUXJYn+vj7iSbOn0WBMN8Q9H1qtFpvdjsPpRKfT0d7Wlmykm/j+1EG8EKMDyMrOZv7ChUSsVvb097N3YIDBSARtMoxfL4pTmmH0gsDBQIBzyUalLo2GBSYTzikER50oUm4wsMRkYrnRSHxggG1Hj9I1OkpVdTU2m+2ijA4Smt38+fNxlZSwp7ubvYODtCaDfnRJc+RUqQ06UWQoFmOn359osSWK/z977x0d13me+/72nl4xFTODMuiNYJNEgp2iKFESRVGyTRXTkuUTW25xclZuYt9kxScr5SRe997UEx/Hx46bIlukerNEWaJIsalQLGAnAIJE78AAmF723vePPTMCQJAEZclWHDxraUlLAGbe/e29v/d72/OwzGKh6AplC79Ox01mM4tNJtyxGPubmzl0/jxFJSWUZCWJ5h3dR4/fNUc37Z35sCkBQRRZ3tTEH/3R/8Uf/OEfEigK0HLuHKebTzI+FrrCH4HCB40EiqLQ19dLRpo9DZKL+kwmEz5/gAWLFjI5OcmTTz1Fy/nzc0q5aTQaqqqq+PJXv8r/+Iu/oKmpib6eXk4cO87gwMBV64wfzJNlCIXGiUdjs0cCioKQFwV1UVNXi9lq5amdO9m9e/ecHm5JknC53Xzq05/mL/7yL9m6dSuJWIyTx47R3nbhiunMHIOKgrpWobExxsevsP5ZaLVabAV2yioqqK6rpbn5OE8/9RQjIyNzstVkNrN6zRq+/e1v8+WvfAWHw8Hpk6c4d+YskcnwrH8j5K0FBIFkMkFoZBQ5c+X1F0VRjfyKi6iqqaanp4edO3fSvv21TAAAIABJREFU1dU1p/k7QRBoaGjga1//On/+7W/T2NhIT1cXp443MzoycoU/Us2c+oz29/dfsZNVURQQ1AOA2+vJywQ9+cQTvP3223MeSSkqKuIrX/wi//Pv/54FDzzA45LEly5d4qfXSBPmfiIBLYkEJ2Kxq36PRaOh1mTiS4WFfNVo5PgLL/DUzp15Ud5rwW63s2XzZr77/e+z7Zvf5LDXyzf7+/lOfz/9V6mHphWFjKKgE0VOx+OciMXyA++zQSOKlBuNbHO5+EuPB7G5mX/8p3/i0sWLc7JzHv81MW2UZ+oPfp0ZI0VRcDgcLF6yhIYFCzAYjTjdqiL07A5BdRpTHVQkHKa/p29WwlxZlolGo3lqJ6PBSGV1Fd3d3bz37rvErvFS52wEtXa1YMECmpqacLpcWO027AUFV9zYZVkhlUp9wLEYjTLQ3z/t/01FPBojPDlJOp1Gq9VSVlGOxWrhB9//PpHw7Jv/bNer0WgoLS1l+YoV+AJ+zFYrPr//ijOLiqIgZaQ867wkSfT39BKemJjVznQqpQrYJtSWeafLRXFJCcePH+fE8eNzHlYXBAGHy8XypiYWLlyIRtTgcruw2qyzNhnkmlpkWZV7kWWZkZERQmOhWWs1kiQRjUSJZiWd7I4CyqsqOXniBIffey9/vXNZU7PZTH1DAzcsXUpBQQF2h4OCgtmfUQEBWZamHSzisRiX2tqRlcs3ZkVRiMfU1HEmk0Gj0VDfuABBFHjtlVcIjY1d08YcNFotNTU13Lx+PS63mwqdjnVW66wRGqjOY1ySVIYZYDiT4c1wmM4rsPiMpNO0JxKMZVOdmwoKuM9q5ZWdO+np7Z1zp7EoirhdLtatW0d9YyNevZ5bbDb8V5mrjcoycUlCRHXKz4ZCnL7CaFFSUbiYSNCXSpFWFGrMZv5vn4/QmTO88PLLwK+3b83jdxdTnwsRpp9Yr3feaCqGh4bY8cQTvPzSi5SWBalpaLhiM0QmnSYWjk5zdOl0mt7ubkIjMzYEQZWzaT3fwqnjzQwNDOZVEtxuNxfa2vKs6NdCLmX60ssv893vfpd0OkPjwsarhueT46FpsjaZTIbB/gEG+/unbbI553Kx7QInjjfTcfFini6sJBgkPDnJkSNH5ryJCMDpkyf5t+99j56eXhY0NuIp9F7x95OJBNEslyCotcnxiQm6u7vzCtw5yLLM8PAwp5qbaTvXknfAVpsNvdFAa1urqjA+R1sH+vv5/ve+x7PPPENDYwMVVVVqx+IsaehEIkEsFkdRVGFXQRCIxWJ0d3WqZL8zNq7wZJjTJ09y+uRJhgYHkTISBdkmoVOnTjEwMDCnNRVEkUQiwWuvvsrjjz+OVqejvnEBpilCvzMxPj4+bU4vl3no7+2b9jeCIJBOqeMPJ48dp7erOz9jWlxSwvDICJc6Oq6ZechBlmV279nD//vXf01VTw//Wl7OCqt11rSlAnSkUoxkD14CqoPYH43yTCikRoFT1jQpy+wMhfhGdzd/299PVyqFANxss+GVJA4dOnRdzqO/r4//7+/+jo5XXuF/eL1sczpn7/gUBMbSac4mEvnP1wsCJ1MpfjA0xMVZnHJLIsE3urv5874+DmRTo1VGI/daLJxqaWF8fPwTnQKcx28PU/2aCNMJMHP/XBeyHWdHjhzhrb178fr8qpzKFTaP3MYWDoenPaRarTYvRjo+Hpr2cqqkGiozRSgUIp09MZvNJiYmJkhcB//kyRMneObppxFEgbqGOgzZ1uzZrjunfDBVJ0+r1aIz6BkcHKK/t296RKGohMPpdJrRkVHi2ZOqxWZDFEV653haFkWRUCjEs889R29vL5VVlVjstmlrOBU5yZp4LJaP+BRFwWQ0EovGGOjrJznLHGGOESWSJTvW6XRotTpCoXGS2XrPtZBKpXht1y4OHDzAwsWLCBQX52Py2dY0NBYinUpd1tiUkSQ6OzqJXZYWVqOUWDRKaHSMTDqDXqfHYjEzNDTEZJbM+prINs4888wzat2sumpaI9NM5NQkpjaSCIKAyWJheGiYwYGBfEQ79eeJeIKxsTFS2U5Ui9VKMplUa5JzPES2XbjAszt2UD0wwJ8VF1N8FZLmhCxzKBJhTKvN18W0okjGaOQNWeaFiQnCU5ydjDponlQUdofDXEgmUQCfTodNEOjq7JyTjbk1+uGPfsTFvXv5o8JC1thsH6zHLGvaHItxMJHAntUPVBQFp9nMewYDPwmFLhutyH3C+Xic5liMhCxj1GqpMBgYD4eZmJj40HOu8/jdxlS/9pFEdAIQCoU4cPAAsiJTVFykdsJFowwNDDA5MTHtJKsoCiMjo9itVjxe77SNojQYpLa2ls5LHYRGR7Pddmpbd3llJfWNC/AH/Hli4FQqhV6vnxN/pSiKTE5O8vbbhwhPTlJVXY3BaCSZSDIyNMLY6Og0OwVBYHJiglg8zg033ZT/WSaTobi4mGXLljHQ3093ZzdSRq2/aHU6KiorqWuop7yyAlO2wSKVTCLLMtZsof9a0Ol0NB8/zpnTp/H5/VhtNhRZZmxsjKHBwWksMrlh6snQuKqBl52ny9Ully1fjqjR0NXRQSKRyDdfeAsLqa2vp7qulgKHKiaqyDJSJoPBYECcY+2rp6uLgwcO4PP5KPT7yWQyWRWGIcJTUrVq1JNmdGSEQFERBVPGGTKZDCtXrsRZUMC5M2dUhYksBZu9oICa+jqq62rxFwXUhh5ZJplKYTKaMMyBpFsQVAHRPW++yfDwMBWVFej0ehLxOEMDg3kF96nPysjwMOlUiorKymkclWaTkZs33MxA3wD9ff2q7E+247S0LEh9YwMlwVK1AzWrJiFqxGnCq1dDKpXincOHybS0cL/NRrHBQEKSeD8a5UAkwuiMOl1vKsURSaKsoQF9dj5RymTweTxUrVrF60YjO4aHmcw6O5NGw30OB3/u8/HtQID6rN5dRJJISBJWm212w2ZB84kTvLZrF/fbbKyw20FRaI3HeW1iYnqEJghMShJ7JidRvF4qysry6x2Pxbj3nnvorKzkh0NDtMXjeWfXaDTy14EA38qSXesFdSB/JJ1Gr9XO6d7P478mpkV0U0+kM/99PR84MR6iraUFj8eL3mggEY/TcfESLefOM9A/kC/gi6JIPBYjPDHBilWrqK6uzm8isixT6PPx8COPUF/fwIXWNnq7u8mk0uj1+nwNye3xoNfriYTDjI6MUl5ZiXMOc0AajYbRkREutl/EZrdjtdlIJVP09/XReu4sXR3qUHHu+tOpFIP9A9TU1nLXli35geNUKoXNauVzn/scd27eTGh0lAttrcSyaUOr3UZRcTGBoiLMZjOZTJruzk4sFgtLFi+eU/pKq9VyvLmZdCaNw+lA1GgYGRmh5exZ2lvbGB8fz9upKAqhUAitVsu69esp9Pvzm0gqnWbd+vVs27YNUGhvbWU8FEIURQwGA15/IUXFxfnNbXRklFQySVVVFdZZ1N5nQhAELly8SCgUwu31IssyyWSSSxfaaTl/nuHBoWlRz/h4CFmSuOWWW/BPsTORSNC4cCFffPRRysrKOHP6NIP9aoOQXq/H7fFQUlqK2+tFq9MSGh1lPBSisXEBhT7fNdc0d8g5dPAQHq8Hi02Nsnq7ezh/9izdnZ2kktmINzsmcqn9Io0LF7Jq1aq8/er3CDz88OdZt34dQ4MDdF68SCqhklLb7HaKSkoo9PkwmUykkkm6u7pwuz2UBoNzij4i0Sjtra0Ux2LUZhUs9kxO8rf9/fyvoSEupVJ5R5CSZd6ORkmWlHD35s3oslyqqpyUkXu2bmXjI4/wgkbDP3R20hKPIwMevZ5NBQU86HJRbDCQURReGx9nzGBgRVPTNW3M4eChQ9hiMTbY7WgFgdPxOP84NMTfDg7yZjj8QVSnKBwLhzmh03Hvli00NDTk37Xx8XHWr1vHo//9v9NdU8M/9/ezf3ISGbXrtclmY5vLxRKzGVGj4Ug4zCuRCA1VVfgDgXlS53nMityYjCAIH6gXzEzBXC9SqTQTk2H8RUWIqKnJ/r4+AMxmc74zThAEOjo6cTgcbL7rLo6+/z7Hjh0jmq3NmIxGFi9ezFe++lWeeeopfvWrX9HX04s/4FcbRrQ6MukUE6Fx+vv6KQ2WsnHjxjm1wAqCQCweJxqJqLN+okgmk2F0ZIRwJILXV4hWq81vIqMjI8Tjce6//34aGhooDQYZ7O9XHbZGQ0lpKY984Qu43W5eeP55mo8fx1tYiMvlwmg0kk5niEYjDPYPkIjH+cYf/iGlpaVzSrOKosjoyAiiqLKGCMDw4CBjo2O43W41lZr9vXA4TE9XJ+vWr2fL1q2MjY1x5tQpdcRDFHE4HGzYsAGbzcrPH/85J44dx+vz4Xa7sxGnysw/PDjExMQE62++mVWrV6trMYfT8uTEBJIk5e9xPBZncGAArU6H2WLJp8OTySSD/f1UVdWwceNGRkdHaTl/nkx2ns9gMNC0YgWFPh87nniC/W+9RX9vH4U+Hza7Da1WSyKZJDQ6Sn9fH40LFnLrbbdhNpunRY5XQiqVYmBQPbgIgir1MzQ0RCwaI1BUlE9RioJAZ2cX8XiMz27fDoqCx+NhMKuQoNfrKQsG+fwjj+ByuXj5pZc4+v4RAkUBChwO9Ho9mYxEeHKS3p4edDodd2/dSnFx8TVtBPVwIo2P48pkMGbTuwciEQ7HYtxbUEBh9nlAEOhIpXg+kWDjbbdx2+238+qrr/L+4cN5Bh9/IMCtt92G2+nk8X//d7517hwbbDaaCgoo0euRFYWOVIp94+MckiQ2f+ELLF26dM7Oo7+vj4CiYMk68DPxOHvCYTwaDTeYzXk2ocFUiidHR/GvWcOjX/wiT+3cic1mI5VKodFq0ep0rFu3DpPRyE9++EO+c+AATWNjrCwooNpoxCgIDGUyHJ6c5JWxMWwrVvDQAw8AzLnuOY//utBO9XpTQ73rhajRYMi+4IqiYLFYqFvQgFarzeuA5WZzxsfGeOArX6GquhqtVssru17lQuskBqMRl9sNQE1NDV/7+tepb2hg31tv0d7ezuDAIKJGQyadxmQ0snrNau7eupVFM3S+roQcr6RWpyOdUNnydXodwbIy/EUBXG53frOenJigt6eXtevWsWz5cjQaDXfceSf//sMfYjQYcGTV0F0uF9u2baO8vJzdu3dzormZ9rYLaLVaJFlGI4pUVlRw66ZNbLn77jkfJhRF1ZlTpYLIK3lbbTbsdjs2mw0FSMQTtLddwG4v4DOf2UZlVRULFy/i3XffZXBgAKfTidFgwGg0suGWjfgDRby5ezeH332Pzo6O/LrJsoTL5ebOzZu54447pkVb14I+pwqQfW7MFjP1jQvQ6/Q43a5pHaA6rY5bbtmAPxDgrrvu4sD+/Vxsb8fhdObn6Orq6vjGN75BfV0dBw4c4NKlSwz09yGKGmRJwmKxcNum27n3U5+iqrp6znZqRBGL2Uw62z5vMBqpqKpEKpNwedz5gfWhwUG6urp48LPbWbJkCROTkyxcvJiB119HFEWKi1WV8kAgwGe3b6eyspI3d+/mzOnTDA8No8mm1TWCQGNjI3fddRdr16+fM0uKKAig05ESBJXWS1HY5nRyo9nMUpOJkmxdcTKT4XujoxgaGrj77rspKSnh7nvu4dDBg5hMJgoKCjAYDGi1Wj79qU9RWVnJcy++yN6DB9kzMIA9a8u4KGKqqeG+zZt5YNs2jEbjnNfUarUyDnlar5UWC39XVESJXs+ybDQakSSeGh6m0+vlmw89RGFhIUuWLqWiUu2cLfR6MWeH8JuWL8fv8/HL117jzddf553WVjzhMFpBIAxk3G6W3Xsv2x94gOra2jnZOI//mpjq17QznRx8uHZdm81GsKyMkZFh3B43RrOZ0rKyfPt4Kpmkr7eP/r4+7rrrLjbdfjsajYay8nI2bdpEX28fZrM5Lw8jSRIOp5NPffrTLG9qoru7m+GhIZKJBBarlcLCQsrKy3G73fm64rXslmUZp9NJUXExzc3NxGJxTCZVtFTJrkEmk2YiNEFXRwd19Q18etu2PBPGunXrOLB/v1rjqahAp9WSTqfRGwysXrOG+vp6unt66O/rY3JyEqPRiNfrpXjKcOtcDxGZTIaGhgaOHT1GODyJweDB5XbjcrvznZ+RcJjujk5MRiNf/NKXaFiwAAW44cYbWbJ0CW++PkR1dTVuj4dMVhFh4cKFlGfXvL+/n1BWHsbpchEIBCgrK8NiseRHI64FRVEIBoOYzGZCoRBFZjMmkyl77xUkSU1l9vf2MTkxwZYtW1i5ejWCIFBbV8ett97K8PAwxcXFebaLdDqN2+Nh2/33s3L1Knp7ehkaGiaVSmK32/H7/QTLylTlAvlybcMr2Wm12bjxxhs52txMcbAUo9FIoKgo//ynUilGhofp7e5h/fr1PPDgg+h0OlxOJxs2bODsmTOMjY2xIis+LEkSVquVjbfeyqLFi+nu6mJwcJBoNIrRaMTj8RAMBikqLkZRLtfiuxKsFgu+igpa9Ho64nEW2mwss1pZlqUfk2WZC4kE3x8YoCMY5I8efZSKigoANm7cyLr16zl18iRlZWX5gyPAksWLqaqspOMzn6Gzu5vh0VFEjQafx0NFWRkV5eXXLbd100038dLTT3M0GuVOvZ5yk4lyk0kVrZVl+pNJXhob4y2TiW2PPML6tWsBlfJs/fr1XLp4kYbGRtweT/4zg8EgX/niF7l940Y6e3roz1LhuZ1OSoqKqKyspOAq5NPzmEcO+dTlRxHRCYKAx+Nh/bp17Nixg0vtF/F6PSrNlyQRiUQYHRlBI4jcc++93HfffTiym5Qoity99R7SqTSyLLN4Sg0rN2BbUlJCaWkp6XQ6T8Ol0WqRs5vNXCHLMh6Ph7Vr13L61Clazp6lNNs0gKyQSCYYHR0lEomydMkS7n/wQaoqK/PXWFlVxZcefZQLFy6wctUqtNkTem69XG433sJCMosXk06n0Wg0+VN8TnpnroeIdDrNylWrePfdd2ltayWdTKn0TKLa0DExMcF4KIQ/EGBbVh0htxblwTLuv/8B3G4Py5ua8Hg8yNnvT6VSGI1GGhYsoD5bJ8mRQoPqYK+H/FhRFKqqq1mxYgW/eu01pEwmP5MoZyTCkTDDQ8Po9Hq23H03W7duxelw5G2959570Wq1OF0uSoPB/Prk7n15eQXl5RWk06o0kk6nUz87exjK3Zu52Gm329m8ZQvnzp2j9XwLRUUq7Vhu/m10ZIR0Os3q1at5cPt2XC5X/p41NTUxGQ7T1dXF+g0b8rN1OTu9Xi/+bCNOboZOp9Mhy/J1KyeYzWbWrFrF6Xfe4ScnT3K3JFGSvT9j6TQno1H2RyIoixbxjS9/mbXr1uX/tqSkhD/51rfY8+abrFm9Gs8URwdqBLawsZGFjY1IknRNWrlrYd3ataxcv54fvfYaUUmi0WJBJwjEZJmOWIx9kQjdRUXc9cADfGbbtvzhye1285lt29AbDNTV1qrq9VOg1Wqprq6muro6f0iYHyOYx/ViWkQHv554oaIomEwmbt6wgWQyyf59+2g5f55UKoVWp8ftdrN40WJWrlrF8uXLcc8QdnS5XDy4fbt66p4hTpkbLs4ht8nJc2RvmGmnKIosX76ceDzOr17/FRfb24nHYoiiiN1mp7SsjJtuuok1a9ZQUlqaJ2/OXeO69etpWrHiMtouIH/KFwQh/0Jfj9OY+VlFRUV87qGHePWVVzh58iQdly4hyxImk5miQIBNmzaxeu1aGrPUYvlZP1Fk8ZIlVFVXYzQaLyOglmU5/7u55ogPayeo0fynP/1pdFot77z7LufPnCUjZdDrDHi8Hpqamli5ahU33nQTTocjXwOVJAlfIMCDn/2smvqeIUqrKErertyaTv1/14PcvV9yww184fd+j9d/9SsuXbxELBZFFDU4HA4qKitZvnw5K1etomhKpAfqfOGdd95JMpmkoKDgsmd06r3PrfdcGUZmw6KFC/ncl7/My888ww/efhu5txdZFFFsNty1tdy0fDm33XknDfX10yJvjUbDsmXLaGhowGg0XrX55aNwHBaLhT/4gz/gSbebp/ftY0dPD5p0Gq3RiFBeTu0tt/DlW29lRVPTZVFYTW0tX/3a19Dr9Zfd+6nIrek85nG9yI+EzRbRfVh4Cwu599OfZtny5YyOjpJOp9HpdFhtNnzZ5ge9Xn9ZCkdRFGzZrr+5UHn9OpBlGUs23dTQ0MDAwEC+OcRiseD2eAj4/Ziysjozvy/3Ul5tDOMja3cWBBYtXow/EKCvt5dINIoiSeizkjw+v5+CggJEUbxsfEOr1eLIjQxcxZ6PytaS0lI+9/DDrF23jvGJCaR0Go1Oh6OgAJ/f/0GdduZ3ZlOKvwk71dEAE7dt2sSCxkZ1TCOZRMyOrxR6vXgLC/OHmJnOzGg0YjKZrvqMflTraTAYWLNmDRWVlfR1d6visah1Ra/PR0lR0RW147Ra7W+Un7Cmpoav//7vc3HLFsbHxlAkCa1OR4HLRUlxMZ4s+fZMaDSa/Hs/j3l8HLjuiC53or5WJ57L5cKZlbXJdVwBV9UOm4pfZ/gz97dTT/9XgsViobqmhsqqqryduU62j8LpXwm50+lU9pKp0dhMaLVaSkpKPujYy9k6ZbD/47I115kK6tpea03dbnc+3Tf13gsf85qKopjfSHPrebXnyGq1UltbS01NzQekBlmFALj2ev66A8pzTRXqdTrKg0HKg8Ff6/s+LHLP6VzsdXs80+psv0l8KJKL3yL+M9iae8b/M0TSV3sfc++yEIlElKkvttls5umnn+bv//7v1V/IzhStXrkSi80253rD1Jv5mxzojMfj+Vb1a2G2B+43YWsu/SbLMoar6LBNxWyMJh83cvc+nVbnGOf00AuXy8n8ptY0mUzma3hzwbRnVP2Qj8e4Gchp911NjHcqflvv0tR7P5fGJPjN25p7RpPJJAaDYc6drb8N5Bih5ro//TaRSqXIZGcxP6nMM7l3KDI5yd59+/LjQeFwmL/5m79h27ZtJLLd9dq5PBSCoFJ8FTscn9iLzqG7u5uSkpJP9Kkpx/c4NjZGIBD4xM4BiaLI2NgYsiznu1s/qRBFkZ6eHtxu96yyRJ8kyLJMb28vxdluzE8ickwyo6OjlJWVfWKfUVDvfV9fH0ajMc8K9EmEKIpcvHiRQCDwiXd0kiTR2dlJaWnpJ/YZBZWVa2x09Ir7fb5Gl/+Dq6SW0uk0y5qauOuuuz7WE1Ouu+rDdoKJosh3vvMddDodDz/88MduZ47p5XqQc3K7du0imUyydevWj/XlnEoFdr0wGAzs2bOHvXv3smXLFhobG3+tppWr4dexUxRFRkdHeeyxx7jhhhu48cYbP9YDmZTJXFFrby54/PHHMRgM/PEf//EnchPJja/s3buXXbt2ceutt7J48eJPrK2HDx/mxz/+Mffccw/r1q37RNoJqq1/9Vd/RTAY5P777//EHsgUReGll16ir6+Pbdu2UVZW9om0M+eznn76afa+9dZVR2OmMaNc60OvNxd+PTUkRVE40dzM4ffeY9XatSxetGjO3zPz+2b+90dt58WLFzmwbx9l5eVsvPXW66o/TV3DqWt6PenLudY6x8fH1ZZ/SWLTpk14vN7remCvZOtc/3YutuYc/ztvv01bayubt2zJzxz+puyc65ooikoK/eqrr7J48WI23nrrr70BfFIzDzPXdOq/P+n4z2Dnf5Y1/aTbOdd3fW6J9w+BHOGyJts2fq2IZWhoiP/nO99heGQESZKoq6nBOKOF/+NqvkhmOQ6vNSwrCAIjw8M8+8wzPPfss6xbv54bbrgBj9d7xZmuj9LWVCpFOp3OM4hc6bNzP3v+2Wf5yY9+RKHfT3lFBS63e1pT0MdVT8nVy+bSvCQIAqdPn+aHP/gBXV1d+AMBiouLL1vHj8PWnJ0aUVS7ga/xuWNjY/zrv/wLx44do6urixtuvPGyaPzjbhCaxzzmcf34WBydRqPhUns7L738MqWlKhel0+UCZt8AFEXhPx57jGg0Sk22E9KQZXqfunHknMnU1Oavs6HkalCv7dpFJp1m/c03Eywrm/V3c0Xvk6dOcerECUpLS2lYsCDP+p+jwMqlNRVFQZOz8yOwVVEUdu/ezckTJ9i8eTMNCxZcUetPp9Nx9OhR3j50CIfTSeOCBfh8vmldqTk7p6ZgP4o1VRSFzs5OXv3lL6moqmLtmjXTVAqmQhBUncHdr79OKpWirr6eqqqq6ac0RUEmO5idnYXLremve+97e3t5bdcuDAYDt952W35oebbPlWWZN994g57eXmpra6mrq8vP0818RnMze1MVD+Yxj3n89jDN0X0UL6QgqLyGx44f57Gf/hSP2013ZycPbN9OUVHRrL9/sb2dvXv28Kd/9mfcuXlzngVDlmUmssKho6OjxKJRUFSGC38gQFFREZYZA+bXa2tPdze/fOklWltbOXnyJI9+5SvUXoFDb3x8nJPNzSxrauIb3/gGNrtd7aCTZSLRKP39/QwPDjIxMUE6k8FqteYpwBxOZ759/cPYGYlEeP7ZZzlz+jTvv/ceX/7qV9lwyy2XFbVFUSQWi3HowH48Xg//8+/+jvLKShLxuBrBpFIMDgww0N/PxOQkiXgcvcGA2+kkUFSEz++fM5nzbHZKksTx48f58Y9/jN/no6+nh/sfeACny3UZi41Wq6W1pYXu7m7+5FvfYv369dOGr0NjY/T19WXZaiKIgoDD6cTv9xMIBDBbLB96PRVFoa2lhRdfeIG+vl5OnTzJlx59lOqamlmj5cHBQd555x0e/Oxn+b0vfhFJkvKsMpPhMH09PSo5eDSKlMlgsVjwFhZSWlKCPatgPu/w5jGP3xymvm/THN1HkYdVFFV4tGHBAh7KNoT09vXx4gsv8Jlt2/D5fNMMkGWZl158kfKKCtasXUukLkhaAAAgAElEQVQ8HkcQBOLxOOfOnGH//v2cOHGCgcFBpOzGotfrqSgvZ8WqVay/+WZKSks/VGOAoij4/X7u3LyZlatX09rSwuM/+xmP/Lf/Rs0MZyfLMp0dHXRcusRnP/c5TGYzqVQKWZbpuHSJgwcP8f77h+m4dIlkMgmoTsfv93PD0qXccuutNC5cOOc27Zl2mkwm7rjzTqqqq7GYTLz80kuIosjNGzZMK2qLokhrayttbRe4ZeNGSkpKiMdigEpW/N577/HO22/T0tKSZ/xXFAWHw0FDQwPr1q9neVNTnrT6eu0URZGGhga2P/QQsiRx4sQJtDod991/P3a7fZqzU4DXf/UrAkVF1NfX56WcEokEzcePs3//fk6fPsXQ0BCyJIOiYDAZqa6qZtXq1axZt46ioqLrPkDkntHyigruvvtuUukUXZ1d7Nyxg89+7nNUV1dPc0yKovD+4cNIksTNGzbkCQZSqRTt7e0cOnCAI++/T3d3N6lss45OqyVQVMQNN9zAxttuo7a29j/FTNI85vG7gqn+TAvTWZ4/zKlTo9FMczSyLNO4YAHVVVXIisLRI0d4/rnn+NWuXWy77z5s2Q0vF1E1nzjBQw89lO/ojMdi7Nu3j2efeYa+PlWmpaGhQeUlRCGZSKi1sueepaOjg+2f+5w6+H0NTB0sztnpLSzkgQcfRKvV0tXVxf/+7nf5j8ce4ytf/Spl5eX51F4ikeDUyZNYbDbq6uvz63Tu7Fl2PPEEp0+fxmwxU1FZidFsQsyOZIyHxtn71lu0tLTw8Be+wJo1a+Zk59RUYq4T9VOf+QyxaBStRsOTTz3Fa6++is1mY9Xq1UC2sSOZ5OyZM1gsljzJM0BPTw/PP/ccb+3diyAK+Pw+KqurETUiUiZDJBLh9JnTtLW1MTgwwN333HMZ/+BMzBx+z6VD6+vrqaioQJZlDuzfz7PPPIMgCHx2+3ZMJlNe0udCWxutbW3cd999FGSjnng8zmuvvsoLL7zAWCiE1+tlQWMjeoPKqBOLxugfHGDnjp10dnby8Oc/T3AOA9WzrWmwvJyHH3kEk9FI24UL/OynP+WlF1/ks9u3U1xSkp+rGx8f5+SJEyxcuBBXNgWfSqdpbm7mmSefpKW1FXuBnZq6umzKXSGZTBEaC7Fr1y7a2tp4+JFHPvZu0HnMYx4fYOpBVQvTO2uuJ6rTarUIgsDQkKpjJmUymEwm3G439oICtFlS2xUrVzIyMsJru3YRDAZZv2FDfuM53tyMACzPij1KksT7R46w44kniCcSNC5aiNliQVYUkvE4Op0Oi9VKgcPByMgIR44cwWaz8YUvfAHXFZgZcg4uHA4zMjysNkrodDidTtwuFzq7nUw6TXVNDb//jW/wD//wDzz37LN88dFHsdvt6gYci3Hk6FFWrVqVZ9lvbW3lpz/5CS0t5wmWlatq6aIqnQMCdocDW0EBLreL9gvt/J9/+zd8Ph+lpaWz2ikIKqNLPB5nZGSEaCSicnDa7XiyUib67JrefffdhMbGeOH55yktLSVYXg6KwngoRHt7O4FsU4eiKExMTPDC88+zd88ePB43Xp8Po8lEPB4nk8lgtliw2e04XS76e3rZtWsXDqeTez/1qSs+DzqdDgU1SswpyBvNZrweDza7PZ/+vGXjRsbGxtj16qsE/H7uuPNOBEFAr9ez5803EQUhH+kqwBtvvMFPfvxjLDYrDQ0NmK0WMpkMyYQ6DO71+XC4nAz2D/DW3j04Cgr4/Be+cEUHkjuEjY+PMzqqisrmKNScTid6u51MJkNtbS333nsvO554grfeeot7770Xa1YtoL+vj/6BAW7btAljNnruuHSJJ37+czo7OymvrMTlVh1gLBZDo9HiMJspcBTgKXTT3nqBJ3fuxON2U55VGZjHPObx8WKqX8sPjF9PRJc7yXd1dnLw4EFVh2t4GEmSsJjNFJeWsnjJElatWoXH40EAbr/jDtrb23ly507Ky8upqqkhmUhw/tw56uvqPthU+vt56cUXCUfC1DU0YDSZiGRrIJMTk1htNkrLyrBYzHi9XtLJJPv27WPlqlWsyJ62p0Kn0xGNRtm/bx/Hjx2jt6eHWNZh+nw+GhobWblyJeXZ6K22ro6HH36YH/zwh9QdPJjfmHv7+hgeGmJhdlMeHR3l+eee4/jx4yxYtBCPx0MiHmegv5+xkVEEUaS0LIjT5cJqs1FTV8OJo8fZuWMHf/LNb15mp1arJZlMcuzoUd595x3aL1xgcnISjUaD2+2morqaFU1N3HjTTQB4vV623nMP//tf/5Vnnn6ab37rW8jA8NAQ0WiU+vp6lXUFeOfttzmwfz9OtwtfURE6nY6+nl6GBgdJp9MU+grxFxersjUlxXRcvMTePXtY3tR0Wbot56RaWlo4dPAg586eJTQ2hiRJmCwWysvKWLJ0KcubmnC5XJhMJu65915GRkZ4+eWXqaispGHBAhLxOMeOHqWyogKX04lGo+HM6dPseOIXmCxmqmtq0Gg0TIyP09fbRyQcVqWgysswWywUFxeTTCR48cUXWbxkCQ0LFsy6pqOjoxw6eJATx4/T19dHMpnEaDTiDwRYuGgRK1etoqSkBEmSuPGmm+jo6mLvnj3U19dz4403qk6to0Ndm0AAQRRJxOO8/OKLtLS0Ur+gHqfbRTwWp6+nl9DYGAaDnuLSUgocDuwFDiqqq2hraeHgwYOUXOGQM495zOOjxVR/pv0wRXJZljl65AhPPfkkR48exWQ2YbPZEEUNofEQZ8+d4609ezl65H3u/dSnaGhoxOlycf/99/Nnf/qnvPjSS3z1a1/LbmK9bNq0CVEUSSaTvPvOO5w/d47qmhqMRiOJeJzOS5fo6epWJX/CYdweDxaLGUEQ8foK6e/r49133807gRwEQaCrq4sdTzzBvr1vkUgmcLic6HQ6pIgqufL2oUO88/bbfOYzn2F5UxMmk4lVK1dy7NgxXn/9dRYuWoTf7+dEczM2m42amhpSqRTHjh3j0MGDFJeWqA43naanp4euSx35cQWL2YzD4UQRFMxmC2UVFRw/dowLbW3TIhBRFAmFQrzx+us8/9xzDA0OYrXbszp4CgPZ2tqhAwfYdPvt3L11Kw6Hg+rqau64804ee+wx9u/fz7qbb6anpwcBKCsrw2Aw0NfXxxuvv4GCQqHPh0arZXR4hNaWFmJZomAUBa/fh1ajQa/X43Q5GRgYoK2tDWO2+zVXf5Mkid27d/P0k0+qKVKbVZUPEkRGx8Y4e+YMe/fsYcPGjWzdupWq6mpcLhd3bdnCxfZ23ty9m7LycgaHhhjo7+eOO+/EYrUSiUZ5+aWXCE9OsnjpUjRaLdFIlEsX2hkYGECWZaKRCC63C7PViiCKFJeU0NXZxeH33qO4pGTammo1Gi5dvMgvfv5zDh06hCxJ2B1qlmEyEuHixYscOniQd955h/vuu4+bli3DZDJx2223ceLoUXa9+io1NTUY9HoutLdTXFyUV904d+YMb7zxBiWlpThcLpKJJF0dHVxqv0gmk8FgMGKz2bFlswE2ux2rzUbz8ePcn1XFnsc85vHxI+ffpgmvznVo+URzMz/8wQ8YGBigrqEel9uNwWgARXWC8ViMocEh9u8/QHdXNw89/DBNK1ZQW1fHffffz9NPPcXqNWsw6PXE43GKs80kw8PDvPH669gLCrA7CkAQiEWjDPapG50gilhtNnXzFUCRZTUN5fbQ3NxMOp2edg19fX38+w9+wP79+ykrL8fn92OymBAFdUNMJpOMjo5y8WI7/+f732d4aIjNW7ZgsVi4a/Nm/uWf/5m3Dx1i8+bNtJw/T6BI3ex6urvZt3cvCuRP6LFojNDoWF6axWAwYLXbETVifn3dhV6GBgc5dfp0PoLNdUm++sovefrJp9Dq9SxaukRVJdBoUIBMOk04HKa3q5vHfvYz+vr62L59O6XBIGvWruG9w+/xi1/8gtraOkKhMTQ6Ld7CQvQ6HfveeouLF9spLi3JK4F3dXYSj0ZBENBptWqqUaPN22O12hgdGaW7s5O6bKQkCAJSJsOBffv48Y9+RCQSpXHRIvXgoNerAruKQjQcZnhoiD173qSvp4ftDz3EjTfdREVlJWvWrs03woRCIRRFFW01GAwcef99mo8fp6ikBF1W4SISCTM6NpZ3shaLBbPFmv8uk8VCYWEh586dY/3o6DQC6v7+fr73ve9x8sQJSoJBvF4vJkuWW1JRSCQSjA6PcPrUKXq7u3lw+3Zuve02An4/W+65h+/+6//i+LFjLF68mIH+PhYuXITVamVycpLHf/5ztFot/oAfAdRndEAVB9WIImazEZPF/IE9goDL7aavr+8TS081j3n8LmGmX7sumR5BEJiYmOCZp59maGiI6toabHY76VSK/p4+FEXGYDRit9spLQtit9vp6e7m548/jiTLrF2zhi1btnDo0CEO7NtHfbbBxGI2oygK7737Lt3d3dQvaFA3CUWVm7HabegSOswWCyXBUswWM8l4ArKDvhaziUsXL03r6Eun0/xq1y4OHz5M/YIGPIWFSJLE2MioWu/R67DZ7fh8PmxWK12dXezYsYOUJPGpe+8lWFbG8hUrOPzeeyxdupTe3l5WrFyBJMucPXeO8+fP4/V6MRiNWTFYDRaLhUQ8jkajwVcUwO31IGUyyNnr0GRrhf19fdTW1QHqpnz2zBlefuFFDEYjFdVV6HQ6JsYniMWiaDQarFYrBXY75ro6hoeGOLB/P6lUkoc//wjl5eVs2XwX//hP/8TuN3eTTqYw6g1YbTY6u7o4sH8/Go0Gu8ORn/WzWq1EbDYEQcDhcBDIKiPEs6MGWp0qajs+MZHvaNRqtVy6dImXXnyRVDpNTUNd/npHh0dQUDAaTdgdBWpq2WblYkcHj/3sZwiCwIpVq7hp2TJOnjzJqZMnSSYSOF0u7AUFRCIR3n7nbVLpNCVZ5YvcAL/VZiWl12O2mCkNBjFbzCQSCQRBwCCKWKxWRkdGiEaj+fk6KZPhPx57jJPNzdTU1+VHG4YGBkin0xgNRqw2K4HiImwFdjouXuLx//gP0qkUd951F00rVtDQsIAXXngBn99PNBLNN6EcO3qUI++/z6JFi/KirVqtFqvViizLmIxGfEVFFDgcebo0nU6H3qAnHA7PjxjMYx6/Acz0a9q5OjlQN7tjR49y9uxZAsXFWG02ZFmmr6+P7ksdKIDRZCJQVERRUREFTgcarYburi52PvEEFrOZ1WvWcPvtt/PLl1/Od9/ps5HdL19+GUeBA9sUfTKz2UxNbS3JZAqzxYzJbGJkeJihwSEsZjOlZUF0egPx7JxY7iLT6TTvvPMOHq8Xb6FKfTU+NkbHpQ61c1Grxe3xECxTaz7lVZX0dHay4xc/B0XhvvvuY8XKlbz77rs0NzczNjaGr9DPxPg4zceOEU8kKC4tRckOhxuMRkqCQVxuD3q9HqvNQjKRVE/xkkR5ZSVanSofE4/F8kPaoVCIffv2EZoYZ9GSJRgMBiYmxtUa3cQEokZDQUEBwYoyCgoK8AX8aHRajh09hihqePTLX2bBwoU0NTWx7623qKqsxGgyYTIaeeWNN2i/cIFgeTn6KWroJcFSbAUFiKKA2WJR660dnUTCYbw+H95CLwhqJJkbdtfqdJw+dYqBgQF8AT9ms1lN13b3MNDfjyLLH9z70hJcTjdajY6uzk5+/KMfodXpWLxoEXW1tfT29DAwMIA9m57t7uri5ImT2Avs6LIM5AD2ggKqa2rIpDNYrBYMRiPDQ8MMDQ7icDgoLinGYNATGk2SyUbzGlHk3NmzvLl7N8XBUpxZ2aCRoaF8alGn11NYWEhxaQlWq5Xq2lq6Ojp47tln0en13LVlC/fccw/f/vM/50RzM/F4DKvVqkber76K1WLB5fXkozOjyURFdRXxWByj0YjFaiESDjPQP4CiKFTVVKPRaNSD2Lyfm8c8PnZM7bgUBAHxetKWGo2GQwcPqpGA05H7ROLRKOFIhHg8rg75ZkVCASxWK8UlpQwODvL444/T3t7OypUrMRiNHD16FDEblR05fJiuri4KAz7EKQ0QokZDgdOB1+fFXmAnHo/T2dFBT1cX4ckJ5FzBcYb9kiQxMjKC1+sFBBRZIZ1MEQ2HiUWj+QaXsVGVcsyg1xMsL8dqtfLUzp3sfuMNysrKqKqqYv/+/SSTSWwFdrq7umhta8NqtWA0GaY5V6vNitfnxel2Imo09Pb20t3ZyejoKBnpcnkjjUZDX18fR94/gsvtwWyxoCgKmbRENBIhFoupabH+fkYGh0mn1Tkzj8eDt9DL+4cP8+STT+aVzwcHBjhz9iy2bJTz/uHDiFoNDtf0mTiD0YjHq+qHmUwmRodH6Lx0SRUiTcSzkd8MW7NMIgiqSGnuIYpHY3lbQ2NjdF7qIBmPI4gC9gI7wbIgXZ1d/OiHP6Srs5MbbryRaDTKuXPnsJjNaDQamo8fJzw5mXW+H9TZNBoNTpcLT6EXq91OMpGg8+JF+nt7iUQi2XsPyhT2GY1Go9bkFCV771Ukk0mi2Wd0cmKC/v5+xkPjWakkPcHyMiRF5vlnn+X9995j8eLFVFZUsHfvXlLJFCaTidaWFlrOn6esonxak06uM7bQV4jD6UDKSPT19NLT1c34WCjrELPP5yeTMnAe8/idwtSOS0VREKd6vmtBFEUuXLiAwWDIv+iCKFISLMPhdOYZLSQpg0Yj5jcfe4Gd0mCQlvPn+dlPfkI6k6HQ52NwYICzZ87Q29vLjh07sFgseUqt2QzP0WoZjUb8/gCl5RXo9XpSqSQFdvtlLebpdAqdQY0QRI2Iw+XMjgCoTRXpTAaykVUuBVVZXY1Wq+XJHTs4d+4cZcEgF9vbiUWjvH3gAOfPn6enuxuXy52v9c1mJwIYDQacLheV1VXZxhK1hmnPUkeJokhobIyenu78HJksyxQ4HBQVF6PLphAzmcw0vyMIAp7CQhxOJ7tff53XX3uNYDCIyWTi3JkzdHd3s3//ftouXKDQ58NgME5b02kHG0VBp1dHNkrLghQXF+cHt41GY36WLMfOIohivp6n1WrxFwewWCzIspxlC0mhmcKsUuBwUF5ZwYULF9i5c2d+ncOTkxx+/33aWls5dOhQNgU9uz6bIAgo2Rqt2WLBXxQgUBRAp9ORTCawWa0YsmlEQRRpa2vDYrWgzXKXCoKAN6twL2UyyNnnVOGDbIbBYKA0WEpofJwdO3YwPDxM48KFXGhtpaenh/PnzrFnzx4ymQzeGaQHU+1U3xO1M9XtcVNbX4vRaETKZD7x0izzmMfvCmb6teuu0SWTSUSNhqnymlablaU33sD4+DipZIoCRwEmsxklm9pRFAWHy0lZeRlv7d2Lx+ulva2NVCpFIpHg1VdeobWlhbr6+qsqkSuKgtFkoq6hQa3f6XQIokg8Fsfv918+SyWI067LaDZRU19Hod9HJBzBbLHk559y0Gg0VFRV0nLuPE89+SSgNhtkMhmam5uZmJxEp9djspqvmoUSBZHiYCmB4iLVzmw6VZZlAoFA3iZJkpAymWm0W6IoEKwox+l2MTExgVajxe1xT2NVEUURX8BPNBph586djIVCjI6OIkmS6ox7e1FQVLX3q99UXNm5R41Go45jRCJotNrLOCoVWVbPLsIHD5DL7WLpTTcxHhojk5Fwul2Xsb+4vR6SqRRHjxwlnkjQ1dWJLMuExsZ49ZVX6O7uxltYOC2SnwlFUTAajdTUq7XN3AxnJBKlOEsHpigKApBKJtFpPyDoFgQBs9nMgiWLKQqWEo/F1bqn0zHt801mC6XlZbSeO88zTz/NuXPnSCSTyJLEwUOHmJyYwOP1XPMZ1en0lFdWoiiy2qgjiiRTKSwWy0fCPjSPeczj6pgZ0WmvJ6LLbTaJZAIFBSkjMTE+jizJ2Ow2fH5/PlKZ7W99gQDxeJyXXnwRrUaDRqNBURSOHz+er5nNxdnq9XoU1CxQMpEgHA6zdOnSy7XyFAUFNbUZjUSIRWOYrRZcbjfu7HD5TAefc6ZllRWcOX16Gr1UKBRC6OjA7Xaj181OqDwVmhns/eOhcfR6PVVVVXR1d3/wOzpdPrUZj8WIhCPo9FqsNjv2goK8nTOh0+koKy/nQmsrT/z85/lml+HhYUKhEEXFxSoX6DU6/aYqHsuyTDweR6fR4vf7pzk6UdTknaYkSYRGxwCwFdgJZIfTZ9773LUX+gpJJRMcfu89MpkMokaDVqvl9OnT6HQ67AX2azqBXINK7vfiMTUNuXbNGgoKClQybdTUbCajrqcsSYQjEZLxJGarRY3Gsmw3s917p9NJsLyMXbt2qerKgoAiCHR2dKj0Zo0Lrv2uCKDT6/KfKUsSkfDk7IexecxjHh85Zvo1carnm8sfl5SWkk6l83RMrefOc/rkSdrbLqjt1dfg8wuWl1PgcBCLxfL0WiPDwzhdLjS6ufFAKoqST6nFYjFS6RSNixZdFklodVrkjJqm6unq5mRzM20trUTCYcRrsMDkiKMTyWR+s0+mUiSSSSw222U1wSsYOm3BB/r78QcCVFVX55UDbDYbXq+XWDSKLMsMDgxy9swZThw/oQ6ec/V7YzSZCFZUIIiiSnycbXaRsownc91Yc40q6rxaFKvNSjAYzHeyqnybRgRF/e9oNML5s2c5ffIkPZ1dqvO6wncpiiqoWuj3q0TYiQRylgIuNDaGyWTKpxnnaqsoikyMjyNlMqqKRDYdrMgywWCQaHY9k6kUXZc6OHXyBK3nz5NKJKbRls322YV+P26vh4nJify9D4fD6PV69HNMP+bWUxBUEdPJiUkqKivnHd085vEbwEy/dl01OkmSWLJkCel0mng8jslsotDvw2g05iOna0Gj0VASVIU1c5uILMsk4vHrvhhZlhkbHqEsWEZVZeVlDQJWq41wOKyyi3jcFDgc6gyWrFyz+U0U1WF0Y3Z8AABFQUqnkaTMdfcUhCcnmRwf55YNGzBldfZkWaawsJD6hgZCY2pk7HQ6cTqdaDXafIRyLdjtdopKivOD6oqikE6n81HN9SCRSJCIx6msqiIQCOQdnSzLeZabRCKB2WzB5/fnxyuude9VR2nC5XapB5DsIUeSJNKpVL6uORcIgkA6lWJocID6hgU0LFiQv25Zlllyww1k0mmikQg6nQ63x4PNZkMQ5vaci6KozkfKSv7eK7JMMpm8pmbdbLZOjI9j0OtZ0Ng4T+w8j3n8BnBZjS73g7nU6DKZDCtWruTJJ59kYiyENVhKWUUFgeJiNFlWjTltJIJ4WUQ0Pj5OKpVCP6W9/GoQBIFoOEIoFGLDLbfgDwSmXaRGo6G0pITW1lZ8Ph9urxdbNg041++YCUVRhTrjsRjKLHRjV4IkSXR1dFLo83H7HXfknYckSfh8PpYvW8Y7hw4RDk/icDkxmlXiY4PBMOeaztT7lyOhjkYil0njXOv6wuMTiKLIsmXLKHA6px1GSoNBEAQi4QiW7EhGcbAUnU73oVQZ8t8ZiZBJp6/rM8bHxwmHI3x2+0YqKioYGRkB1DVdtmwZDqeT/t4+6hc04A/4cXncANOUHq5mkyiKlx0yIuEwyXg8z3c5F8iS2oFZX1/PokWLrlqHnMc85vHRYOa+mc+jzLVGV1hYyJo1axgfHyeZSKDVajGbzdfVUSbLcj71mEOO3muukCSJnp5uysrKWLV6NeYZHXs6nY41a9eSSqks8hqNBqPRqNZdrjOdNxWZTIZYLJbvTJwLhgYGiUQifP33fz/fmp+DRqNh4aJF1NbVMTg4iCRJGI1GzNnW+7lCli+/f/FolHQqNWfGm3g8zuDgIIuXLOHGZcum3aNMJkNNbS2VlZVEwmHS6TR6vR6z2TytbnZNKMplowupVIp4LD6nGbOcnT3d3SxdupSVq1ZNaw5RFAWLxcKDDz6oOsNIBHHKvZ/rWsz2jCqKQnhy7s+okK3tybLMlq1b1aHz64wI5zGPeVw/Zu7b11UwyLVhb9y4EZPJxNDg0IeiNNLpdIiay786HovPuVbY19NLJp3h1k2bqKqqusx5abVaVqxcSVVlJW2trdflmHKYKesjoO7F6bTaoj4XO0NjYwz093Pbpk2sywqLTkUmk6GsvJw1a9cSC0cIZSmvrgeCKGIw6KddX06yJ5VKz+m6E7EY3Zc68Xg83L1lC64p0RyoB4uioiLWrl1LKpkkNDZ23fdeVWfQXXavZFkmlU5x7YQypFMpBnp7sVqs3HHnnRT//+2deZBbVX7vP1d7S91SS72qu9X7Yrdt2m4bb4wxNsbQtsE2hhiMwYBZkpAMmeVVav6bSk29qpchr+qlkkneTOplklTl1VSGlxeG1BsmYBszDNjYGLz2vqjV6l1qtfbl3vv+uJLcaqvdMmBjKvpUQVkt6eroSDrn/M75/b7f6uobolZRFHnswAEcDgejwyNK4fstoGROam9YaMiynPMWuyzLTE1O4Rp18dBDD7Fhw4b8tmWePF8Tt3wyLssyzS0tPNLVxbzPh3dm9pYGZlmWUWs0GAwFNwzA4jJnSqkzHbdrjOmpKXbs2MHOnTuzbkfJsozNZuOpI0cwGAwMDQyk1TNyRa1WU2C8rlmYPORR1FCWaacsy/jmvIyNumhfYEK7mNSgunXrVjrWrmVqcpJgIJhRvrEcAsriYXE/SKKILC8/GYVDIYaHh5GROXLkCGuS57CLEUWRrd/6Fpu3bkkXQ98qGq02rbmZQpakZTNDU+UZ4+PjRKMxHn7kEe7dtGnJLXeDwcCxF15AJQi43e5b2sIFZZFjzFIOIIrisolIkiQxMz2Ny+nkW/fdx+GkD9+tLmDy5Mnz1ZAx0eX6QzQajTy4axed69fjcrnwer0g56auAqSVVRavcNWam694I+EwbpeLOY+H3bt3c/jppyleVOu1EJVKxfr16zly5AihYIhR5yjxHCOcFJbi4utnR7KiwCIsMPDMRjr38WgAABoqSURBVCKRYGZ6mgn3BO0rV/L8iy9iX8bEtLaujocfeQSbrSRpJRTKuZ2yLKPT6ylO6kSmUKnVCFmK2tPPkyTmfT7GRl2YjCZefvllduzatWQSiyRJWCwWnnzy92hpbWV4eBivx5Pzdpwsy+gNekxFRenSEkj6IC6znRwOhXCPjRGLRNm9ezd79u6lKKkvudRrbdiwgYe7uvD75plMOiDcSp+WV1TccG6oVqtv+n7j8ThTE5PMTE2zadMmXvmDP6C8vDwv5pwnzx0mYyxceEeug0Cq6PnIM8+wevVq+rt7GHePk0iIOZ1/qVQqbDYb+gJDxt+NRtOSk20wGGSwf4ChgUE6Ozt5+siRjMLrbMiyjFano2vvXg4dOkTA72d4cIhwOJLzOZ2l2IKpqFA5r0NRotfpbtx+g+sK/6PDI/RcvUZRURGHnnyS9vb2mw7kKQfxDRs3cvDgQfRaLYNJrctUvdfNkGUZnU6HrbQkneyg1Dzq0em0S0aSszOz9Hb3EAgE2H/gAF179y4bR8bjcerr63ntj/6IlpYWRgaHmJqaSqfS59JOS3FxxpmuWqO5aeJNIBCgt7sH14iT1WvWsP/gQSoqKm46eaRqPvfv38+OHTuYnpzCNeIkHo9nOI0vheI+X4bRZEr/TRCEjNsLSUWco04n/b29OBwODj/1FLW1tflILk+er4GFv3EVZKZiZkvAyIYsyzQ2NPDaH/8x2+6/H5fTSW93N/55f1qw+Ga1SqaiIsrLyq9LiQkCJnPRko9PJBIIKgGNVktvXx+//vWvcTqdy04EkiRhNJnY//jjHH7qKUQxQc+1q8xMT0MyO/Nmz9dqtdQ4HBnt1Ov1GYXgC4nH44iShF6vx+PxcOrkSS5fvqwUuN/kdWRZxqDXs+uhh3jhxRexmC1cvXwZl3M0p8FZrVZjs9mw2WzpdH+DoSCtsJ+tX+LxOBqNmlhM8QE88d57hJMJRjcj5cj97W9/m3WdnbhGnAwNDBAKhVAlHb1v1lZbiQ2L1ZpOIlGr1egM2ZOZZFkmEYspjvRqNX29vZw6cRK3253ThFVSWsrTzzzDo0lH9suffY7X60WS5WTEu/TzNVotNY6ajP4wmrLLlIEigi2LEhqtlrGxMf7jnXfS3oN5RZQ8ee4sC+c1FWQW1+USQaSQZJmamhr+9Ac/4PBTT6HTaunr7WF0dBT//DxiYulzEa1Wi8ViSQ8isqx4mWVDEASsVisr2ttZvWYNwWCQn/7t3/KTv/orenp6lt0WkiUJi9nM44cO8erv/z72SjtDA4MMDQ7imfVcr+PK9toqFSWlpemSBFmWiUVjynnion5SZKSMtK5oY3XHPRQWFfH2r37Ff3/jDT768MNlFxCK3Y+Gh7u6+O5/+T4bN21ianKS/t4+pqemiEYiN71GQUEBZosZlaBK1ruFFY++LNGkWq2m2lHD6nvuwVFXx4ULF/jRn/0Zb/7Lv+D1eJZNnEgkEjQ2NfH6d77D3n37iIYj9Pf24na5CPqVsoalIkmj0Zg06lWlrxWLxLK+jiAI2EpLWd3RodQber387Gf/k//1d3+Hc2Qk/ZilkGWZ0tJSjh0/zvGXXqKkpIS+7m6cw8P4vF7isfiSfSrLMiVlZRmOCqFg9i1lWZYxmkw0t7WyZu09qDUa/vmf/zdv/PjHfHL2LGKyQD5Pnjx3hoXzWloCLHWon2tElyKR1Gk89uKL3LN2LSffO8FnFy7Q7b6GpbiYSnslhUVLRGoL/y3LjI26KLZasw4IivGqgK20hGJrMVOT5Zw/fx5BpeL4Sy9RW1t703aKoohWq+XBXbuob2jg9Pun+Pijjxno66OgoIAKux2L1YJatWiAT/XJgvfr9XioqKzAZDZnTYKRJInCoiKai4ooKy9joK+fv/nrv8ZoNN7ggp7tfYbDYdZ3rqfWUcv777/Phx98QE9PT3LgLaXSbs86Ecmp/wnK+dzM9AzllV5Fmi3La6XO9hxJY1LniJNf/OIXSJLEE088ga2k5KZtTSQSlJSUcPzll1nT0cGHH3zAp+fPM+Z0UVJWQnlF5U0jIEhmh4bDeGZnMZuLstaZpbZ2yyrKsdqsuMfGOH36NCqViheOH8e+oIYyG6IootVoePyJJ2hfvZp3/+M3nD93nr6eXoxGI/bqaizFliyNA1m6rsIjSRLjY2PYq+xZE1JS27dmSzFFRYqbwdXLV/ibn/yEb//Jn7Bm9ercFHXy5MnzpVk4l6m+ilVmqubo3o0bOfz0U7S2thDw+wmHQkD2FbcgCIhJGawUcx4PntnZrAoZsiQRCUUU6TAU3cyGxgYufv45Z8+cIRqN5tROURRZsWIFzzz7HNu2b0eSJPzz80iylD3TMfmnlHu5LMv4/X5mZmazZvIJgkA0oljCxONxzBYLbclI5Od///c5p6eHw2GKi4t5bP9+9uzbh8mkeJzdtKxBlhFFMZ10EYlEmJyYIBzOXraRSCQIBUNEIorhakNjA8XFFk6dPMnVK1dyaqcoiuh0Onbu3MnTR45QX1+Pb85LJBxZslxARkYUE+kvoSiKinlqIJj98ZJMKKhYFqESqHY4qKyyc/qD01z49NOc2pnaql2xYgXPHH2WjRs3IooiwWBQyUzN9h1FQJYlxAXfUZ/Px7h7PHtUhxLthwIBEmICq81Gx9q1jE9M8P/+/d+Zn5/PR3V58txBMiTAFjoYLLzzVpnzejl39iwDg4PU1tXR3NaKKWmiupiEKBIJhTImi1g8zuiIk6A/cEMbAoEAI8ND9PX04klOMrbSUvR6PZcvX1YyP3N849FolE/PneN3H36IqbCQ1hUrsNls2RNUZJStuGQmYirpwD02hmd2JqMeMCVNNTo8TF9PL+OuMSLRCAXGAurq67l48SLd3d05J8IoiirDfPjb3xKPx2lpbU2r0GQjFotnGNCqVCpmpmcYd43dUEcoSRKzMzP09fYyMjRMMFlYXVZeTiQS4cqVK2kn7+WQJAmPx8PJEycYHBqisaWZ+sZGTFkSNwRBIB6NEQ5H0hOyIAj45+dxOp3EFi9YZBn/vI+Bvj4G+vuZnVYUUCrtdiRZ5vy5c3hy2GpNEYlEuHzpEhcuXKC4uJiWtjYsxcVLZlIGA8GMshdRFBkZGlJ0SBfVLcaiMVyjo/T19DI9PkU0GqXQXITdbqenpwfn6Gg++zJPnjvA4nktw3j1VnQvFyOKIlcuXeLNN98kFo9RU+fAaDJmqP+nUKKeCD6f74a/RyIRhgYGiS4YZFNKFT7vHM7hYdyuMWLRGJqk6v3k5GTOqioajYb+vj7+6R//gVGnE0dtLdYS25IDpSRJTIyPZyQkqNVq4vE4g30DeGe9mUXlKhX+QICxsTFGRkYI+gPIsozFZkUA+np7c1bnSMTj/J833+TsmTOUlJVSUl62pAqJLMsEQyECgUBGe7QaDePucSbc4zek18djcaYmJxkeGsIzqwzceoMBnU7LxMQEoVDuJQ7vvfce//df/1XxtautpcB4Y51k6n3Nz88TWRRl6nQ6ZqenGRkaznyeICBJMrOzsziHRxh3u4lGo+gNBixmCyNOJ57Z2ZyzfSfGx/mHn/+ciYkJqmtrsBRblnyuIAhMTUxmRHsqlQq1RkNvbw/++fmM5wooMmGu0VFGR52EQ2EkSdEvDYfDTCezU/PkyXN7WTyvqRZPcqkH3epF5+bmOH36ND6fjxqHA53eACgF3pKYuYqVUaI/QRCSYrvXJ7RKux2z2UxPd08y01LJzCssKqKptYW2lSuosFeiSTodCCoBKZFYtuAYlEEqEAzywW9/i9M5Sl1DfdoeRkwksq62w8EgXq+X+sbG9P2iKFJdXU1NTQ2XPvuMOa83XRemVqtpbmtlZXs7jrpajEZT+rUlSSKRQ8ExKBPypUuXOHv2LMXWYmwlJaiTHmyLo55UlOmb86LX6ylMRtGyrJictrS2MDszw8T4eEa0V1ZRTvvqVTQ2NWFZVIMnSmJO9XFCsiD7xLvvojPocdTVpp0IEosSUlIF/7OzsxQWFmI0GjO2Lzs7O5mdnaX76rX040GxAVq1ehUtba1UVFQqXnTJ+6VEIieh5ZR02Kn336evrw9HXR2mwqLkgiKRdlNY+Hj//Dy+eR9l5eXp+1JlC6tXrebypUv45/3phYVWp6OusZGVq1ZRXVOjGNcCglpIu1XkyZPn9rMwaLsholv8oFu5qNfr5eLFi5SUlmI0mRATCZzDw5w7c4bhoSFiSc3FVKQyPTnFypUraW5pSb+2JEk4amo4cvQoeq2Wa5evKOcygpBWoW9oaqKsvBy1RkM0EsEz48FeVYW5uHiZVia38qamuHb1KqaiQqzJVPypiUk+//QC1y5fSbcz+caYnJjEarXy2P79abWQWCyGzWbjxZdeYvWaNVy9cpXJiQlkWUomI5ipra+jxuHAkKwVnBqfQKVW097entOkrNVqOfvJJ4RCIUpKS1Gr1YT8AT47/ykXP/uM2enpjM8sGAgQCYVZ19lJVVVVerstkUjwcFcXOx54gIkxN26XC3GBg7i9qoq6hgaKkglDwWCQcDhCVVV12sz0ZgiCQH9fH263G3tVFYJKRSwaZXhwkAuffMKo05kxEQX8fuZ9PjZv3oy9qiq9dR0Jh9m0eTPPv/ACntlZuq9cVc4zBQGNRkNpeTkNTY2UVZSj0WgIBBS5tIbGRkpLS5edRFQqFT6fj5MnTlBstWK1WRXB5bExzn9ylu6r126QoBvsH6CiooKtW7emIzdRFFGrVBx/+WUaGxrpuXaN2ZmZZLmCCkvys6+ssqPT60AQmJqYotBkwm6358/o8uS5AywMntIRHXyx7cqFREIhPB4PxkLFA80/P8/I4BDz835kWUKluv7CE243hoIC9j76KO2rVqU9vgRBwGQysWPnTl559VVKSkq4eukyruER/PPzik2KJBGLxfD7fAwPDqJSqdi6dasimLsMqqRn27zPh0FvQK1WE4tGcbvHmJ6eviG5xDfnw+fz8fjjj7Nx48a05xmyom7fcc89fPv119myeTMu5yiD/UPMeb3pLatEIkEwGMTldOIadfHggw/S3t6e08pepVLhdrkA0tuVYy5XMrkkgpCs9U+dObpdYzQ3N/PYY49RWVmZjoRlAaqrq3ju+efp2rOHOe8c3VevMTM9nXZOT9kkzUxPMzo8QmVlJZs2bsxZtmp2ZoZEIqF8jrJMOBxmdHiEwHwgvYgSBMWXbWpyEkeNg4e7umhpablejygIFBiN7D9wgO99//voDQa6r17DPTpK0B8gFoshSTKxWBTPrIfB/gEsZjPbH3gAm82Wk8RXJBLBOTyMxWJBpVYTDoUYd43h8XjTWb2pPp2amsLj8XDoiSdYt25dhhi3Rqulo6ODV199lTWrVzM8OMTwwCD+OeU7Kopi2iZoeGCAmelpNm/ZQn1DQ96PLk+eO8DieU2T7YzuiyColNqtlDGnVqejvLICtVpDpb0SjUbZzvLMzjLmGmPfvkdZt24dhYWFvPfuu7jHxlCr1ZjNZgoMBr51//2UV1Twm3fe4eLFi/Rc60addKWOxZSaK4fDwa6HHmLzli1oczDuXFi0ncoIVKnVWG02DHoDFfbKtEt5NBLBNTpKW1sbD+zcSaHJxP3bt/Ort95Cq9UqA58g0NLSwsuvvMKpU6f46KOPGBoYJCV+LYoiiUSCUpuNPXv38OThw2i0WuI5+sQpUmPXbxdazFTX1GC1WrHYipVSBlFiNKn4sfdRpU+7r13j3LlzzHm9WAqL0Ov0VFRUcOToUeobGvjg9Gn6+/sJhUKKPiYysVgMg95Ax9q17Nm7l5a2ttz1IRcN3lqtjvLKSnR6HRWVlYpLtywzOz1DNBJlS9d9tLS0sOuhh/jk7FkmJiYwmUzo9XoMBgMP7tqF3W7nnXfe4fKlS3RfvYpWp0OlUhGLxVCr1dTV1bFnzx7WrVuX85agkOzT1GIlVWRvLDRRaa9Kq7UEAn4G+/r51rZtPLBjB8FAgBUrVnDm44+VLd+yMlQqFWs6OjAXF3Pq5EnOfPwxvT09CIKATqcjISZIJBKUlZVz4MABHjtwIGOrNk+ePLePxRGd5quK6AwGA6VlZQQCfkrKSjEajTQ2NyMIQlp9xOvxcPXyFTo7O3l0/2OYTCba2tro7OxkYnycgoIC6urqEJOF0+2rVuGorWVgYIBRp5OZmRki4TCFhYWUlZfT2NREXW0teoNh+QailCgUFhZitVoZcTrTHmjVNTVKeJtUsIjH4wwNDGIqLOTgoUOUlZYiAzsffJCPP/qIcDhMld2ORq1GBqqqqzlw8CDrN2zAOTKCe3wc//w8Br2e0rIyamtraW5poWiJDNRsSJKEw+Hg4uefE41GlYVDeTklJSXKGVXyvGtsdJQ5r5cnn3ySLVu2YDAYWNvZyW8//JDzMzNUVVdjNptJiCJms5ndu3fT0dFBf38/E+PjeL1eZMBqtWK322ltaaGsoiLD+mY5ysvK0Ol0RCIRDAYDBcYCmlqVLemUr5tndha3y8XGTZvYvn07Op2ODffey/oNG3jn17+mtLQUq9UKKOeTq9esocbhYHBwUIlkJyeJxWKYzWbsdjsNjY04HA70en1OE50syxgKCmhsbGRqaopEIoHeYKCmvi59tioIAsFAkL6ePurr63nu2DGKi4sxGY1s3rKFK1euEI1EaF+1ClFU5O4aGhqoqKhgy9atDA0NMTU5SSgYpKCggJLSUurq6mhqblYWRvlJLk+eO8JtiegEQaC0rIx7772Xt99+G0txcYYYsiJ0O8HQwBCd6zt5+dVX0xqABQUFPHfsGFPT08TjMe7dtCmjVsxsNtPR0cGaNWuIRaMkknVbGo3mlm1PRFGk0m5nXec6Ll68iHvMTVVNdXo7SQa8Xg9D/YOYTCaeO3aMzs5OBJUKlSBwT0cHv3f4MOfOnWPd+vXokm4BqffR0tJCc3MzsVhMkddKmtEuJzWVjVgsxrZt2zh96hRul4v6piblWsm2BoNBXMNO/AE/h554giefegqtVosoirSvWsXBgweZ9/nYct99ypldsk/VGg32qioqKisRRTEdHet1OlQaTdYs2ZshSRLt7e3U1tXR3d1N++pV6PX69GcTj8dwj7lxOUfZuHEjTx85Qk1NTdpY9sjRo8z55qiyV1Hf0JCRLWW1Wuns7KSjo4NYLKbU7Gm16egOrh82L4csy1itVrr27OEv3niDyfFxKhYU3kuyxPTkFIMDA9TU1HD8+HGampoAZavywV27cI2NcfnSJbr27s0QvjYajbS1tdHS0kI8Hicej6NWq5V+UKmuR5F58uS5I9yWiE6WZcxmMw8/8giDAwN8+umnWG029Ho90eR5miTL7HvsUZ599lnKFqi5y7JMVXU1f/7jHwPcoCGZGshSljlfBllWLHEefqSLwcEh3v7Vr5hwuzEVKqLN8/PzhEMhmltb+c53v6uIMS/ItjObzTz3/PMcfe65DPX9FKmzqJTJ55dBFEVaWlt58vBhfvbTn/LpJ+eUsyWVilAoRMDvp6S0lD987TV2P/xwessVQKNW80hXFw/t3q1oRC4yJgXSf89ly3c5rDYbzx07xn/90Y8487vfYbOVoNVqicZi+ObmQJbZs28fL7/ySobbRCKRoLGxkf/25z9Of8aLEZLJKF/UwTxF6rO/f/t2uru7efvf/k1xbSgsRBRF5n0+orEYmzZv5oUXX6S1tTVj8VdSUsLrr7+ezmRdHEWm2p8y+F382nny5Llz3BDRpe74smd0AE3NzfzpD37AiRMnOHP2DPPeOcrLy2nbtYv7t2+nrbUVrU6Xdavpyw5kuSKKIhaLhe9+73ts3ryZ9957l8mJSTQaDevXr2fj5s1s3bIleXZ1I6kJ4naT+iy69uyhrq6O3/zmNwz09ZFIJGhqamL9+vXct20bFRUVWWXbUhPEnWLVqlX8j7/8S9566y0+v3iRUCBAlcXCqvZ2tj/wAK3JM79sE8SdaqckSRQXF/OHr73G2rVrOXXyBNPT02g1OjZu3MS2+7exdu1aDEsk4eSNU/Pk+WaweJcnPcLkMsktjg6yUVFZyTNHj3L02WczoqGUon62RnxVLJyAlmunXq9n565d7Nq9Oy38dUM7b0MbU+dW6dB6mYlTpVLRsXYt6zo7M/pz4X+3sz8z1AWWaWt5RQWvvPpqxmNS/Zk6A71t7UxeO9WfN3utoqIiuvbsYe++fdfbKScNdW/zd/SbRGqH4m7nm9LOFN+Etqals74BWcLZ2rh47M95KR2NRpmbm1vSnuZuIDUwJxIJJcniLmxnShUmFo0iyzK+uTlUSeWXu41UgkmqLMPr9WZ1Hv+6UalUyhYpEEoW+N/NP9CUk4HP57tl5/M7Qeo3FAgEAPD7/fj9/rvys9fpdAQCimRgKBQiGAzmpHv7dWAwGJBlmUgkgtfrRbeEhdbXjZwsERIEAa/XS+FNDI6/TlKL8GAwuOziQfD5fBk9bTQa+eUvf8kbb7yRvpgoiqxcuZKioqK78g0vJBGPI0sSWn12f7O7AVmWiSUnECmZDXg3fuEhKYQdj6PWaLI6C9wNCILigKBSqRATCfQF2eXH7hbi0SiqL5BMdSdJ1aumFrZfxVnu7SJlCbWct+TdQEpcXKfT3dVtjUajqNVqEonEl843uJ2o1Wq8Xi89PT3pIxC/388Pf/hDDh06RDgpop8R0S012KrVaq5du3bXDsYLWbi9dzfzZZRo7jRfxfnt7Sbfn3ny/OdkqXP+hb8xzeInLMXdvPrMkydPnjx5FrJwPtNApqVBKiEjtR9/N4fXefLkyZMnz0Li8XhGJrosy8pEt7i4rqioiObm5m/EnneePHny5MmTIhgMYjabMzKohbm5OTl1I5UCPj09jdvtTm9XZrPxyfX24jOzu+laX/S5+Wvlr/Wf8Vp382/5q7zW3dDX+Wt98duiKOJwOLAl3WkA/j+vWoz8TwEW9gAAAABJRU5ErkJggg==)
- 0
- 1
- 2
- 3
Hint:
Subtraction is a fundamental operation of mathematics.
The correct answer is: 2
Step 1 of 1:
We have given an equation ![12 minus 10 equals _ _ _ _ _](data:image/png;base64,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)
12 - 10 = 2
For subtraction of both quantities, both quantities should have the same unit.