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bài tập về dãy số thi học sinh giỏi

Bài tập vật lý ôn thi học sinh giỏi quốc gia và quốc tế

Bài tập vật lý ôn thi học sinh giỏi quốc gia và quốc tế

Vật lý

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o8fPxYXF+e8zdzcfOfOnQsXLly1alVdXR3iCd0JQ3MwDOs/ubu7c1qLqanprVu3ysrKIiMj257vT5gwARXaI1RXV1tYWBAEcfbsWd4u6adPn0xNTXV0dCoqKlDvGD3fLVpbW9evXy8tLR0ZGckP5a2pqeFMtXLixAnUPjfIysoi/jd6ns1mNzY2qqmp0Wi0rKwszivp6emck/ihQ4cQLoyex+h56Km2bNnCWePv2bNnjo6OCgoKlpaWGRkZFArFzMxs7969CBH3i4+Pd3Bw0NXVTUhImDt3Lm8XVlJSMjIy0t3dffDgwStWrPj48SMaAHSl3NzciRMnpqenP3r0iHNrgOeJiYmFhYU9ffr02rVrbUMdgEuUl5ePHj06Pz/f1dU1NDR0//798fHxbcPr24avAHAbZCnw31RUVO7evXvp0iXO3F+cfl8WFhZJSUkxMTE4wHG/a9eujRw5csaMGb6+vsOGDetx0wr9AiqVumrVqidPnkRGRjo7OzOZTDQD6Br79+8fNGiQvr7+7du3DQwM+Oh6gkw2NTUNDw+vrq4eN25cbW0tGgOXOHr0aEJCApvN9vf3X7t27dq1ayMiIlpbWxEZ4HIkdCHtnriTemTkWSxWVVXVhw8fZGRkZGVlv56bGLhQZWWlsbHxlClT9u7d+73+yjystrZ25MiRenp6586dExYWRnv4TWw2e8aMGVFRUcnJyXQ6nUwm02g0UVFRKpXKD9nvfwoKCnJ1dbWzs7t+/bqoqCh/BqG1tfWPP/6orKwMCQnR1NREq+gWdXV19+7d++OPPyQlJePj44uKij7/q66u7qdPn8zMzAiCuHDhwowZMxAxnrxsQ5YCaO7Aperr6/fv3+/v7+/t7c3PMxzk5eX9+eefmZmZZ8+etbS0RMNAltIZmpqajh07FhwcvGvXLisrKz6/ifPx48ddu3YFBQXt3bt39uzZ2HG4UHFxsYqKCpPJdHZ2DgoK+nz/5aydMmrUKBcXF87azYDLNmQpaO4AHcnT0zMoKOjmzZucRYj53K1btxYuXBgbG6uuro5oIEvpcCtXrgwICEhKSurfvz/aCUdRUdHw4cP/+uuvpUuXIhpcyMbG5uHDhyQS6cKFC25ubpwXKyoqlJWVm5qaJCQkSktL8Qgal23dCD12AHhTbGxsYGBgREQEUhQOR0fHiRMnWllZVVZWIhrQsaKjoy9cuPDo0SOkKJ9TUlLaunXrsmXLYmJiEA0utHHjRs7F98KFCxMTEzm3Ifbv39/U1EQQxIIFC5CiQPfC2vPwf9Dp9Pfv3+fl5VVXV5eWln769Kmpqamuro4z0yhBEIKCgiIiImJiYjIyMn369JGQkFBTU+vXr5+QkBCixyVqa2vXrVt348YNf3//tkU5gSAIHx8fKpXq5uZ2+fJldGOADlFVVbV27dqwsLDz588bGxsjIF+YN29er169vLy8fHx8rKysMHiJq1hYWKxZs2b//v2NjY1mZmZycnLNzc2c+zhWVlbbtm1DiABZCnDFifbZs2cXLly4c+dOfX29gICArKysnp6elpaWtLS0urq6uLg4hUJhsVgNDQ2fPn0qKipKSEh49epVeXl5a2srjUazs7Nzc3MzMzOTkZFBPLvXjh07wsLCYmJiMG71C+Li4r6+vh4eHiYmJpGRkX379kVM4DetWbMmJiYmLi5OVVUV0fgahUKZPn06hUKxtrb29vbetWsXYsJVfHx8hg4dun379rS0tPfv3xMEQaVSXVxcTp48KSIigvgAshToHnV1dU+ePHn8+HFiYiKLxVJRUTEwMJgxY0b//v1VVVWFhIT+c/Qni8VqaWkpKCjIzc1NS0sLCgry8fEhCMLY2FhPT8/KygqdH7oYg8HYu3dvUlJSUlKSvLw8AvK9LK66unro0KEhISHDhw9HQODXlJeX7969u7S09Pnz523rdsM3OTs7s9nsrVu3iouLr127FgHhKlOmTHFycsrLyysrKxMQEFBSUurTpw/CAtwAg4G6Ke7dOgwrLy9v/fr1t27dotFoS5cu9fDw6MBDUnl5+cmTJ69cufL27VtHR8d9+/YhV+kyZ8+eXbp0aWZmJgaI/6czZ84cP348OTkZE2r/FIye56iurtbT02tqasrIyJCTk0PDaI+GhgY9Pb29e/e6uLggGoDLNkCWgub+f9Dp9KCgoDVr1jQ0NEydOnXr1q39+vXrpN/y8/Nbs2aNkJDQvn37XF1dMQivs7FYLCMjIw8Pj/nz5yMa7WFmZmZjY7N582aEAlnKzzp06ND27dsfPnw4dOhQtIr2+/vvv729vbOyspSUlBCNrt95q6urX716lZeX9+nTp8rKyqamJhKJRKPRaDSaqqrqgAEDVFVVJSUlMXwIWQqyFDT3Lo18RkaGn5/fnTt3dHV1XV1dx48f3wVdTltaWsLCwq5cuZKWljZ27Nj58+fr6+uj9jvD27dvlyxZoqure+jQIZxg2ik1NXX8+PE7d+6cNWsWooEspf1u3bq1Y8eOS5cuDRgwAE3iZ08KmzZtysjICA4Oxpwrna2wsPD58+epqalpaWnl5eV0Op1Go/Xp00dKSkpERERUVJSzzi+dTmcwGDU1NRUVFVVVVfX19YKCghoaGrq6uqqqqsOGDVNTU0MwkaV02ykHul4XR54zXGTu3Ll0Or1bystgMBYuXEgQxI4dO1D7Ha6qqkpWVlZLS6upqQnR+Cl5eXnKyso1NTUIRTuxWKzp06crKiqWlZUVFRUVFxdXV1dz5gDkkwjEx8eTSKSwsDA0hl82ffr08ePHt7a2IhSdoba21tfXd9SoURQKRUpKysPDIzY2trq6uv3fUFdXFxwcPHnyZDk5OTKZPHTo0Lt37+KyDU2r6yE15OWkvLq6OiAgIDg4uG/fvitWrBgxYkQ3dsFnsVgJCQmHDx8uKChwcnKaP38+poLtKEuWLKmoqDh27BiGPP6CgwcPnj9//uzZs8OGDUM08Czlx+rr6x0cHKZOnbpo0SKMaPqde/y2trb9+vULCgqSlJREQDpESUlJSEjI8+fP09PTDQwM9PT0zM3N9fX1BQQEfvk7W1tb09PTY2JiIiIi8vPztbW1nZycxo8fLygoiMs26IqwI+i82txbWlqsra3z8vKOHz/u6OjIJRcQbDb77t27nPH6jx8/xkSHv+/Bgwfr169/8eIFOnr9GiaT+ccffyQlJeXl5cnKyiIgyFJ+cMU2btw4VVVVPz8/tITfVFVVNWzYsGnTpm3fvh3R+P2D2JkzZ7y9veXk5Dw9Pd3d3Tvj3FpfX3/t2jVvb28SibRy5UpPT0++ylWQpXQL3Ari2ROAhYVFVVVVamrqhAkTuOfqgUQijRs3LiUlpbm52dTUNCsrC5X1O5qamhYsWODq6ooU5ZdRKBR/f38qlRoSEoJowA/s3bv34cOHc+fORSh+n6SkZFBQ0JUrV1pbWxGN38FisTw8PJYsWTJz5sz09PSlS5d20u2/Xr16ubu7R0ZGqqqqrl271t3dHXUHyFLgp8XHxzs6Og4fPvz+/fvS0tJcuIXi4uJ37961tLT8448/Dh8+jPsTv+zgwYOqqqqcMT/wy9TV1R8/fuzn51daWopowDc9evRo//79Z86cwRo7HWXIkCGTJ092cHD48OEDovEL3r596+Hhoa2tTaFQ0tLS/v7779/p3NVOAwcOjI2NzcrKkpOTGzhw4KFDh+h0OuoCOgkeYHVT3Dvn0SGLxfL09PT19fXz81uwYAH3x6G6utrExMTMzMzPzw+dvH9WTU3NkCFDXr9+jVmeO8SmTZsePHjw9OnTLjjT91x82+Nr5MiRa9eunThxItpAB6qtrdXQ0FBQUHjx4gX2u5+SkJDg4OAwevTov//+W0FBoVu2obKy0tramjMC1tLSEpdt0OFwXchTrly54uvru3Dhwp7SJ0FCQuLQoUMBAQH//vsvqu8XrqrNzc2RonSUSZMmPX/+/OTJkwgFfCEmJoZOpyNF6XBiYmLHjx9PT0+Pjo5GNNrv2bNnFhYWDg4OV69e7a4UhSAIaWnpq1evslgsa2vrR48eoV6gw1ERAt7Q0tJy/vx5Pz+/yMhIc3PzHnRT087O7unTpytWrGhqapozZw7G07fTtm3b/v3336dPnyIUHcXQ0HDfvn0bN240Nzc3MDBAQIAjPz/f2dn5+PHjCEVncHFxqa2tPXjw4OjRo/FE/T9VVlb++++/ly5dOn36tKura7dvT//+/TMyMkJDQ729vRMSEjw9PXv16oVqgo6CB1jdFPcOfXTY2tpqa2sbGRkZFxfXQxdCfvny5fDhw4cPHx4REcGHUxz+rLS0NH19/VOnTi1atAjR6Fhr1qypqanBJE7fw4c9vlatWpWTkxMaGoo5KjqPvb39pEmT5s+fj1D8QGFh4dChQ+l0enx8vJaWFldt27t370aMGGFvb+/v74/LNugouG/BC1auXEkQRGxsbA9NUQiCMDQ0jI+PFxUV9fT0xIHgP504ccLLywtn9M6wffv2V69epaenIxRAEEROTk50dPT58+eRonT23QEvL6/MzEyE4ntev37t6uq6dOnSzMxMbktRCIJQU1PLyMioq6ubNGlSYmIi6guQpQBBEMTBgwefP3/+8OHDnr4m3ZAhQ+7fv//q1asdO3agWn/g06dP0dHRBw8epFAoiEaHExERmT59+uTJk1ksFqLB5+h0+pQpU5ydnbHyYGeztLScNGkSnmF+T2BgoKGhobOz85YtW+Tl5blzI6WkpC5cuFBbW2tiYvL8+XPUGiBL4XdZWVnr16/38PDgmft8y5cv37ZtG+5k/8CRI0dMTU1xZ7fzWFlZ5eTkoBFCQEDAq1evbG1tEYousGvXLozA/qbs7OzZs2fr6+svXryYyzdVSEjo1q1bVlZWe/fuRcUBshS+xmAwvLy8/vrrr2nTpvFMoZydnXfv3r169eqWlhZU8TdPVwcPHpw9ezZC0Xl0dHQWLVr0zz//IBTfxGQy+eE53rt379asWePt7a2np4dK7wJKSkrGxsY7d+5EKD5XWVm5cOHCbdu2RUdH94jZZWg0Wnh4OJVKnTNnDlaggt+EwUDdFPeOGIbl4eFRXl5+7do13ouPm5ubkJCQv78/nhh8Yfv27QkJCWFhYYhMZ98CGDx48KtXr6hUTIT4f7DZbBcXl6SkpISEBN4ePc+5tR8REYGJp7pMTEyMhYXF48ePeX7xjXZqamoaMmSInZ3doUOHetaWV1VV6ejoCAgIpKen9+7dG5dt8Gtw8O2RWltbPTw8rl69um3bNp4s4ObNm8PDwxcsWIBFbT/HYrHu3r3r6+uLFKWzCQgIWFpabt++HaHg2zT11q1bZ8+eRYrSlUxMTBwcHObPn19TU4NoEASxZcuWfv36bdy4scdtuaSkZEJCgpGRkbe3N+oRkKXwl3v37vn5+d28eVNbW5snC6ilpRUWFnbhwoXw8HBUd5vQ0FAFBQU1NTWEogs4Ozvv2rXr1atXCAUfOnPmjJaWloaGBkLRxXcH/v3336qqqrt37yIasbGxt2/fvnfvnrS0dE/cfiUlpeDg4NjY2Dt37qA2AVkKH7lx48aiRYtMTU15uIxDhw5dtmxZaGgoqrvNsWPHTExMEIeuYWRkJCwsjLX8+FBrayv2te4iISExd+7cuLg4Po9DXV3d3LlzXV1de/QYMBKJNH369EWLFjU0NKBtA7IUvvD8+fOMjIz9+/fzfEl379799u3b2NhYVDpBENevX4+Ojh4/fjxC0TXExMQ2b97877//FhcXIxp8ZevWre/fv58wYQJC0S02btz49OnTxsZGfk5RbGxsaDTasmXLenpZFixYoKqqeuTIETRsQJbC+5qbmx0dHd3d3XvEXB+/SUhIaN68eY6OjhUVFXxe70wmc9WqVZaWloMGDcJe0GVWr16toKDw4MEDhIJ/lJeX7927d82aNYqKiohGt5CQkBgyZMjJkyf5NgKXL1/Oy8vruX29PicuLn7nzp2AgIDm5ma0bUCWwuPi4+PLy8vHjh3LJ+W1sbGpqqry8fHh83rPy0pO9zAAACAASURBVMsrLCycO3cudoGuRKFQ5syZ8/LlS4SCf6SkpHDqHaHoRkZGRv/88w/fTql09+7dPXv2yMrK8kZxevfuPXz48KNHj6JhA7IUHvfPP//s2rVLRUWFT8qrqKh46NAhX1/fzMxMfq73yMhIIyOjKVOmYBfoYsuXL09MTMQElHx1gbhmzRplZWWEohuNHTs2Ozv7xYsXfFj2Bw8e1NTU8Fie7OHhsW3btuDgYLRtQJbCs+rr61+8eLF+/Xq+KrWnp6etrW1QUBA/V31UVNSGDRsEBQWxF3QxSUnJ3r1783mSzG/7Wk+c+JXHqKmpTZo0iQ9n+mpubnZzc3N3d+exKbBNTU0dHBzc3d3r6urQvAFZCg9is9menp729vZ8uFbG4cOH7927x2Kx+LPqWSxWVlaWvb099oJuYW5uvmfPHsSBH8THxysqKvLDqD/ut3nz5piYGH4r9Y0bN3r37u3o6Mh7RTt27JiSktLVq1fRtgFZCg+KiYkJCAjgzz4/qqqq8vLyDx8+5M+qf/HiRd++fYWEhLAXdIuRI0cGBgZiJk1+sGvXLgsLC8SBG2hra1dXV/PbTF9Xr149fPiwhIQE7xVNTk7u1KlTyFIAWQpvCggI6N27t46ODn8W38jIKCAggD/Lfv/+/f79+2MX6C4aGhoMBuPdu3cIBW9ramqKiIjg1aVye6L+/fvfv3+fr4qck5PDw4/NTU1Ni4uLmUwm2jYgS+EpJSUlV65c2bZtG992RbC1tQ0JCSksLOS3gjc3N/v7+w8dOhR7QXfp16+fgYFBYmIiQsHbnj9/zmazR4wYgVBwCXNz84MHD/LP3BXnzp0zMjKiUqk8e8VJJpuZmWHtFECWwmtiYmKkpKR4YIGnX2ZsbKygoMCH3ZQjIyPz8/OHDBmCvaC7cOalTU1NRSh4W2Ji4rhx4yQlJREKLjFs2LDY2Njk5GR+KCydTv/rr79sbW15u5i2trbbt2+n0+lo3oAshaeylLVr1woICPBtBEgk0oYNG/gwS7l27ZqcnJyqqir2gm40ceLEjIwMxIHns5TFixcjDtxDW1tbRkaGT5Z3PHv2bHl5ubm5OW8X09TUlMFgxMfHo3kDshTekZycvHDhQj4Pgru7e0pKCl8Vmclk3rhxw8HBAXMQdy8VFZWqqirEgbfl5eWNGTMGceAewsLC06ZNCwoK4vlb72w2+++//x49erSioiJvl1RWVnbixIlxcXFo3oAshUewWKyWlhYajcbncRASEmKxWK2trfxT5MrKyurqanSU5waioqI1NTWIA69qaWmhUqk8tkgFDzA1Na2vry8rK+PtYlZVVb19+9bGxoYf6tTGxiY3NxdtG5Cl8Ii4uDh1dXXEgSAIdXX1p0+f8k95OfNK4f4uN1BVVX327BniwKsiIiI0NDQQBy68opWQkEhPT+ftYqampnIeHPFDnU6ePPnNmzdo24AshUcEBQXx7QTEX9DW1uarRejz8vL69++PQSncQE1NLSIiAnHg4cOsrq4u4sBtJCQkbGxsXr9+zdvFTE9Pt7Cw4PnuXhxiYmKtra0YQA/IUnhEUlJSv379EAeCIPr16/fixQv+KW95ebmuri6JRELVdzs5OTmev6HLz5KTk/nkGrHHGTZsWGlpKW+Xsbi4mK969kpJSRUUFKBtA7KUHu/Tp0+pqalqamoIBUEQampqaWlpHz9+5JPy8tupi8sz5NTUVNz/40klJSWZmZk4zHInKysrnl9Tld9mblBTU4uMjETbBmQpPV5SUlJjYyP6/LQd2pqbmxMSEvikvB8+fBg8eDDqnRv06dOnvLy8uLgYoeA90dHRra2tyFK4k66u7ocPH3i7jKWlpXy1KJaKigpfDTEFZCk8KzU1VUBAQE5ODqEgCEJWVlZISIh/5iMuLy/X09NDvXNJlsJms1+9eoVQ8GSWIi0tjcMsdxIQEGCxWCwWi4fL2NraKiwszD91qqCgkJKSwmaz0bwBWUqPz1L69OnTq1cvhIIgCBqNpqio2ElXikwmMzAw8O3bt9xT3sbGRhkZGdQ7N+BURHZ2NkLBe5KTk3V1dfl52Vwu17t37+rq6p/6CIPBePjwYU8pIIVC4asKlZOTy83N7aQOtJxTOSY7RpYCXeHjx4+ysrIYP91GVla2k8alxMfHT5s2TU9P7/79+1xS2NbWVlw5cQlBQUEREZHKykqEgve8e/cOvWq5mbi4eH5+/k995OzZs3Z2dsuXL+f+9VhZLBa/neJFRUUbGhqam5s771Suq6vLPadyQJbCs96/f48Jvj6nrKz8/v37zvjmAQMGzJ07V0JCYuLEia6urvwz+gXag0KhyMnJdVLbg25UV1dXWVlpYGCAUHCtPn36/GxH37Fjx44ePdrX11dZWXn9+vXcPLLl48eP/NZdonfv3gRBdNLUbZ+fyqdNm3bp0qWmpibsRMhSoFOUl5fLyspy4YYxmcySkpK4uLhLly6dOnXq9OnTwcHBsbGxP/tc/mfJycl10rMUWVlZf3//wsJCOzu7oKCgUaNGbdq0qb6+vhsjjGdo3INEIikqKiJL4T2VlZVMJlNbWxuh4FpycnKZmZk/9RF1dfUHDx4EBAT06tXLx8dHRUUlNDSUO0tXX1/Pb8/MBQUFOQXv7FN5YGDgjBkzxo8f342ncvgdVISAyzU1NYmIiHDDlrDZ7A8fPqSkpDx58iQpKam+vr53794SEhJSUlJCQkJsNrupqam2trasrKypqalXr15GRkZWVlZmZmbi4uIduBnCwsKNjY3Hjx//doOmUslk8o+PjN8kICDQ9sEJEyZQqdTbt2/v3Lnz+PHjy5cv//PPP6Wlpbs+S6FSsYdykV69en369Alx4DE1NTUEQeCRNTfr3bv3vXv3vjjsUyiUL4ZzkMnkL46ZZDJ5+/bt/v7+CQkJU6dOdXBwGD9+/JQpU2g0GveUjsFg8Nu4FM7ZNiEh4Xt9Fr6uyi/O19+7hff1qfzBgwcRERHKysrddSoHZCm8jMFg/ODauiuvmNetW3f48GEqlbp06dJz584pKyt/7zDBYrGKi4uPHTvm5OQkJSV15MiRyZMnd9QFN5VKZTAYy5Yt65qCV1VVbd++/cCBAyEhIWPHju3imONZClfhZMiIw+d3LnigFLW1tRQKpW/fvqhQriUmJhYXFxcXF/c7X9LS0hIcHBwcHPzw4cOLFy9yT+mEhIRaW1v5qkKZTCZBENHR0VevXu3KU/nBgweDg4O7+FQOyFJ4maCgYLcvJPf27VtXV9ecnJxdu3ZNnz5dWVn5x+8nk8lKSkr79u3z9PT08vKaOnWqnp7etWvXtLS0OiRtI5PJ48aN++Zfm5qafnC4b2xs/N50lo2NjZzjZpuioiJOZ1YpKamAgAAbG5suDjuLxfrBcyHgz50ROlxjYyOVShUTE0MouJaoqCiNRhs9evTnL9Lp9JaWli+OmV/fR6DT6VVVVW19NVVVVb29vbntwMLb8yx/L0sZOHCgg4PD997wg1tCPziVf30NUFFRwXkGLiUlde7cua4/lQOyFF5Go9EaGhq669ffvHlz6dKl+/fvT5kypT35yRcUFRUDAwPXrVv35MmTmTNnWllZeXl5ycvL/84mNTQ0iImJ3b59u/NKHRYWdvjw4by8PG1tbXt7+yVLlnTXcm+YTp6rkEgk1AjvaW5ulpCQwB0BbiYsLCwpKfkLh/2cnJzw8PATJ04QBDF+/HgvLy9TU1Nu6J7wORkZmW48y3cLTnmXLl36m9cD7TmV5+fny8rKzpkzpxtP5YAshWd13sS7/+nu3bsODg6DBg16+PChgoLCr30JmUw2MjIyMjKaPXv2uHHjIiIiYmJifmf5qoqKis5bQiQnJ2flypVhYWEEQaxcufLgwYPdWPW4bOI2LS0tQkJCiAOPYTAYoqKiiAM3ExAQ+IXOlr6+vsuXL+ekAXfv3rW1teXO0gkJCfHbQ9ra2loajSYhIdFJ35+dnb1y5crw8HCCILS1tW/fvq2uro79qCfCZRC3k5KS6pYlGurr6z09PadNmxYXF/fLKcoX6VZ0dDSbzba1tf2decA+ffrUSaPfcnJyBg8eHBYWJiwsvH///n379nXzzkkm4849V6HT6dx2FxZ+H5PJRLVyOQqF8kXnrv/04MEDLy8vgiDExMSCg4O5NkXh4LceX7W1tXJycp00s1lOTo6BgUF4eDjnVJ6cnIwUBVkKdBYVFZXCwsKuPIS1trYeO3ZMX19//vz5Fy5c4Mxr3iFERERCQ0NlZWUHDx4cFRX1C9/AZrMLCwtVVFQ66TwxYsSIefPmxcfHr169utsnXaFQKF8MlYHu1djYiJvuPJml4BEZ72UpbDZ70qRJwcHBRUVF5ubmXF5Azqww/FOhHz580NfX76T+Al+cyrF392jo8cXt9PX1L1++3NDQ0IHZwo8FBgZ6eXmdO3du5syZHf7lioqK165du379+rx589LS0n52kuWmpqaioqI5c+Z0RsG1tLQiIiK46ryFLIWrlJeXd8gMEMBVyGQyX10g9kQsFutn77uPHTu2B03lJCkpmZubO3DgQD6p0MLCwmHDhnXSl3PbqRx+6/iMEHA5Q0NDJpPZZevmZmRkHD16NDIysjNSlDZTpkyZPXu2iYlJcnLyT32wrKyMTqcPGTIEDQO6GJPJLCsrU1JSQih4jKCgICaY5nJ0Op23H2Oqq6s/fPiQfyo0Ly/P2toaDRuQpfR4w4cPFxISKigo6ILfqqqqMjc3nzlzppmZWWf/1oYNG2g0mqWlZXl5efs/lZ+fT6VSR44cyS/7J5nMb/Pocy0Gg1FVVYW1/3iPgIAAZ85x4Fqtra28naVoaWndvHmTfyq0qKjI0NAQDRuQpfR4NBpNTU2trKysC37rzp07zc3Nrq6uXfBbFArlwoULFAqFM6FWO5WXlysrK/PPygZUKhULdHAJztSZcnJyCAXv7WX8Ng9sT7xH8LPdg3sWJSWlly9fNjc380NtcsbZdtRCz4AsBboTiUSyt7fPysrq7B9qbW318/O7deuWrKxs1xRNQ0MjPDw8ICCg/cMiMzMz7ezs+GeKXhkZmS6oemgPTq9LfX19hILHiImJNTU1VVRUIBRcq7a2lrcfY+rr69fU1Ny4cYMfajMiIgLrlgCyFN7h4uKSnp7e2b/yzz//9O3b18rKqiuLNnLkSA0NDc6SW+2RkZExZcoU/ql6eXn5V69eYRfgkixFVFS0f//+CAXvZSksFqukpASh4Fp1dXWKioo8XEAVFRVdXd2TJ0/yQ22eOnXK2NgYrRqQpfAIQ0PD9+/fd+rSGenp6evXr3dzc+v60s2YMWPr1q3tuURgs9nv3r0zMTHhn6pXUFBISkrCLsANSkpK+vfvLy4ujlDwGE6dFhYWIhRcq6amRllZmbfL6OXlFRsb2zVjULtRWVlZWFgY/wwuBWQpvE9AQKCze/5s3LiRQqHY2dl1fenGjBkjIyPTnulNCgoKxMXFf2fd+h5HRUUlMjISuwA3yM/P5/5VF+AXSEtLUyiUjIwMhIJrffz4cdCgQbxdxhkzZigpKUVHR/N2MWNiYmg0WudNQwzIUqAb9O/fPzw8vJO+vKGh4eHDhy4uLj9Yx5DFYnXSBpDJ5KlTp7anX9OdO3f4rb+NvLx8dnb2zy5nBp2hvLxcT08PceA9oqKioqKiPH8Pu0errq7upMV8uQeVSnV1dX358iVvFzMlJcXJyQlD5wFZCk8ZNWrU33//XV1d3RlfHhsbS6VS16xZ8703NDY2Tpky5ejRo5z/0ul0f3//by4eX1JS4u/vX1NT81Mb4OnpmZiY+OP30On0gwcP8tvNbHV1dTqdzvN313qEd+/ejR49GnHgPSQSSV9fPyUlBaHgWmVlZTo6OjxfzNWrVz99+pSHZ59nsViPHz/evHkzmjQgS+EpFhYW79+/9/Pz64wvT05OdnR0/EGv30uXLpHJ5LaZtRobG+fPn+/v7//1OzMzM+fPn/+za1DKy8uzWKwfTwb68uXLd+/eWVhY8FW9q6io9OrVKzQ0FLsAN1wnaWpqIg48ydDQMD09HWsTca36+noJCQmeL6a0tLSamlpQUBCvFvDRo0fS0tJYGxeQpfAaOTk5IyOjf/75hzPReMcqLCz88TKOd+7cOXLkSGcX8Mf9wlNSUrS1tfv27ctX9S4gIGBgYBAbG4tdoHvR6fQf9IfkN0wmk8eioaOjU1dX10kPq+E3cc56JBKJHwo7YsSIv//+uzNO9N2OzWYfOXKEr+a/AWQpfOTQoUO5ubkJCQkd/s0FBQV//PHHN//EYDA2bdo0cuTI37yPxWazf3zY1dDQiIiI+HGmdPjwYT6sd86gnY8fP2IX6EYPHjzAgxQezlLGjBlDEMS7d+9QuVwoNze3y1bx6naTJ0/Ozs7+8dmwh9q/f39UVJSLiwuaNCBL4UGjRo1yd3cPCQnp8G+ura1VVVX95p/Wr18fGBi4fPnyX/7yN2/eTJgwQUVFRUNDY/Xq1bW1td98m5KS0g+GppSVlRUXF1tbW/NhvXOO6V2wYA78wKVLl3R1dREHXtW/f39lZWVkKdwpMjLye2co3qOsrLx9+/aAgAAeK1dhYeH69evXrFmD2z3wUzDNQk+yY8cOW1vbxsZGUVHRDvxaFov1zQk38vLyfH19hwwZMmvWLCaTmZKS4uLicurUKc4AlZaWlk+fPn2d8Hz+37CwsIULFxoaGs6ePZvFYt28efPp06d3796VlJT84oOSkpLfm2OnpaVlwYIFEydO5M9Kl5OTmzx5cmJiIoZud5eampqwsLAFCxYgFF8gkUi80Q+HRCKNGzcuMzOzC36LxWJVVVUVFBSUl5c3NjYyGAyCIHr37i0rKystLa2oqCgkJISm1YbNZoeGhtrY2PBPkZcuXXrt2rXY2FheWlTk+PHjLi4u69evR5OGnz4EQNf75cjPnz9/y5YtHbsxZmZm33ydyWTW/09ZWZm1tXV9fT3nFPvjRpWZmclmsz9+/CggIODs7Nz2hQwGQ01Nbc6cOV//1tWrVzU0NL65Gfv27SORSLm5uXzbWp48eTJlyhTsNd0lKiqKTCZXV1cjFJyum46OjgMGDCgrKysqKiopKamurqbT6SwWq0eXKzIy0sXFpVN/orCwcOXKlXJycpwbPYKCgvLy8ioqKioqKm03nqSlpefNm5eSkoKWxlFVVSUgIPDo0SO+KvW5c+fExcULCgp4ozgVFRX9+/dnMBj8edkGvwM9vnoYc3Pzo0ePNjU1dcFvkclk2v+IiopSKBQajdb+W6dpaWkMBuPzWbmoVOrw4cNv3LjR/gVAOBMQW1hYqKmp8W2lDx8+HAtjd6Pc3FwdHR2sOs/bDAwMfnZywvZraWnx9vbW0NA4ffr0qFGjfHx8Xrx4UVtb+/79+7y8vLy8vMrKytevXwcHB9vb21++fNnExGThwoXPnj3jXBvxs8TERAaD0a9fP74qtYODQ3Nz859//skbDWD9+vVWVlZYIwV+5UIUIehZJkyY0K9fv3PnznXx7woKCs6YMePzV6ZPn970lbt377a9IS8vjyCI0NDQhZ95/fp1TU1NcnLy19kIjUb7+nfPnz8vJSV17tw5Ppng5ZtERETExMSysrLQ/rtFdHT02rVrEQfeJi4u3tLS0rE3gNhsdkhIiL29/eDBgxsbG0NDQ4uLi69fv7569eohQ4YICQlRqVTOJO/CwsLa2tqTJ08+f/58dXX1nTt3pKSktmzZYm1tfe7cubKyMr6tl8uXL/fp04ff7lLJyMiEh4cnJSVdvHixp5clJCQkNDR05cqVOMjAL0Bq28OIiYmFhoY6OjouWbKkoy7cOY/VfvxtgoKCbm5un79CoVCEhYW/flvbvznnexaLVVdX1/aijo6Ojo7O1x+sra39+m4Zm80+fvz4zZs3+Wfo5PeYmpoePHiwkxbMgR9LTU09e/Ys4sDzBgwY8ODBgwkTJnTIt3369Gn69OnJycl+fn6Ojo5t6039J0FBwdGjR3PGoUVEREyZMmXx4sWcbIffaqSlpeXKlStLliz5/MzCJ8aMGXP//n1HR0cXF5eeO1SJyWRu3LgxNDRUS0sLRxj4BXiW0vOoqamZmpouXry4ubm5Q76QRqOVlpZ2+HZy5o5cuHDhlc/s2rVr69atX68iXFJSYmBg8PkrdDrdy8vL2Nh4wIABqHQLC4vLly+/efMGoehiDx8+VFNTw2Ip/MDY2PjEiRO//z2tra137twZP378oEGDEhISJk6c2P4U5etL1YKCgosXL+7Zs2fVqlXl5eV8VSPJycksFmv+/Pn82SB1dHRmzZplaWnZeX0RO1VWVtbYsWMdHR1HjBiBwwsgS+Eja9as8ff3//PPPzvk25SUlKKjozt8I42MjEgkUnh4+OcvzpgxY+TIkZxpbT6Xl5f3xRxW69atO3bs2Lp161DdBEGYmZmJiopu3LgRoehKbDZ71apV/DkFNh8aOnTogwcPKisrf+dLGAyGk5OTg4PDihUrDh8+/PtdlcTExJydnW/evPn48WN3d3e+GqmSmJhoYWHx9V0t/rFhwwaCILZs2dLjtrysrMzExOTDhw/btm3DsQWQpfAXDQ2NRYsWnT17tkPGKigqKnbGYpHq6uqjRo26fv36/fv3OVMDnTp1KiEhwdPT8+shKKWlpYMHD277b25u7tGjR93d3TG3OoeAgMDUqVPDw8Pr6+sRjS6TkJCQnp5uaGiIUPCDAQMGUCiU33xiee7cubCwsJ07d06ZMqUDt01GRiYqKiorK2vHjh38UyNv3rxxdHTk8yN/cHBwWFhYRkZGz9ry06dPCwoK3rhx4+sO3gDIUnjf4cOHvb29169fz2Qyf/OrDAwMAgMDq6ur29toyGR5eXkxMbGv/8SZW5PTPYZMJt+6dcvNzc3V1ZWzDsDmzZtXr1799QOBxsbGpqYmGRkZzn9ZLJa3t/eKFSt8fX1R0W02bNggIyPz+fwE0KkYDMbq1asHDx48ZMgQRIMfSEtLT506NTIy8tc+zmazr1+/7u/vn5CQsGHDhg6f8ENMTOz69esXLlywtbXlh/H0LBYrOTl5zpw5fN4s+/bte/jwYUtLyx07dnRUN+9O1djYePjw4fv37ycmJuI+I/wuTMbcoyfetre3X7du3W9+yYcPH8hkso+PTycVlslkfvz4saSk5HsrKpw8eXLevHlt/922bZu1tTUaydcCAgKmTZuGOHSN2NhYgiBiYmIQCn5YL4UjMzPzjz/++LXPcvrNch4dd57a2lojI6OlS5fyfEtLTU21s7PDHsfx4MEDUVHRbdu2cfl21tXVGRgYCAgIpKen47INsF4Kv5s3b97+/ftfvXr1O18iJydnYGBw+fLlznpgRybLyMgoKCh87+bixYsX9fX1Of/OyMjYvn373LlzUblfc3V1TUtLwxIKXSMuLm748OGmpqYIBf/Q0tIqLy9nsVi/8NkLFy44ODj88ccfnbqFvXv3vnXrVnh4eE1NDW/XxeXLl7W1tdEmOaytrcPDw48fP56WlsbN23nkyJE3b95cvnyZn0cTQUdeQCIEPdqECRMOHDiwfPnyjx8//vKXkEik/fv3Z2ZmxsXFdX0RXrx4kZiYaGNjQxBEZWWlh4fH7t27nZ2dUblfExERMTQ0PHXqFELR2dhsdmho6KlTp/h5oR7+NGTIkF+YeDo0NDQ7O/vKlSu/PJ1X+/Xt23fp0qWWlpZVVVW8WgsfP348efKkra0tGmQbS0vLEydO2Nrazps3r7i4mNs2r6ysbNmyZU+ePHn16lXHDsoCZCnQY+uPTPby8jIyMho6dOi7d+9++XusrKyWL1/eeY9TfuDKlSvu7u4DBw4sKioaNmyYvr7+2rVrMfHr90ybNs3T0/N3klJoj/v374uIiHwxOzbwAzs7uw0bNvzUNBVpaWlTp0719PTs1atX12zkn3/+WVlZeenSJV6thcePHwsLC1tYWKBBfs7JySkpKSk3N9fR0bGhoYF7NqylpcXJySk+Pj44OBiLBwCyFPg/tm7dOmbMGDMzswcPHvzyl2zatOn58+fZ2dldueUFBQUxMTG7d++OiIgYPny4mZkZZi38z3xy+PDhFy5cQCg6T2Vl5fz5893d3REK/tzFOBN4tLNrZW1trbOz8+jRo8eNG9dlGyksLBwWFhYYGNja2sqTtXD79m0fHx8BAQE0yC8oKChERERMnjxZR0fn7Nmzv9Y7sQOVlJSsXbtWW1vbysoqNjZWQkICdQQdCUNzeGYY1v379+Xl5bOzs3/5G/bt2zdw4MCWlpauCUJzc7OhoeHOnTvz8vL69Olz+/ZtNIz2eP/+vaGhIeLQeU6dOqWoqEin0xEKfhs9z3Hw4EHOPZT2vPnq1atiYmLl5eVdv50uLi7nz5/nvTZWX1+vq6uLfe3HcnNzVVVVzczMXr161V3b8PbtW01NTSMjo27cBoyex+h56BlsbGwmTpw4atSoX178xNHRMTs7+/79+12zwRs3bkxJSRk6dOioUaPGjRvn4OCASmwPRUVFUVHRbhlExCcePHiwceNG3MflW3PmzJGQkIiPj2/Pm+Pi4hYsWCArK9v122lqaurr68t702lcvnz58+Wz4JvU1dWDgoJevXplbGx848aNrt+A+/fv6+vrq6urx8bG6unpoUagMyBL4SkHDhxYuHChk5PToUOHfuHUpaWldePGjb17975//74LzkPnz59ftmzZtm3bZs2adeTIEVRf+3l4eLi6ur5+/Rqh6HARERGVlZWLFi1CKPiWlJTU8ePHr1692p43JyQkrF279nt/ZbPZt27dioqK6ozttLW1TU5ODgoK4qXgv379+q+//sIEKu0xbNiwoqKiK1eunDhxYuzYsUFBQS0tLZ39o4WFhQcPHrS3t9+zZ8/Zs2dv3LghKCiIuoDOgsdJvPfosKqqauDAgZMnT25sbPyFj2/eNY+kwAAAIABJREFUvLlPnz6/03PsP+Xn50tJSXEWyzt79izaw89qbW3V1tbu379/l3XP4xOFhYXi4uIXLlxAKPi5xxeHkZFRXl7ej9/z5s0bGxubH7yB80DG1dW1rS9TaWlpXV3d11H98OFDaWnpT/UzZLFY5ubmAwcO5JngM5lMIyMjZWVlBoOBfe2n3LhxQ0FBQVpaev369ZWVlZ3xEwUFBVu3bqXRaLq6uoGBgby3y6PHF3p8QVeQkJC4e/eumJjYuHHjIiIiGAzGT318zZo1kyZNsrS0vHnzZodvW0NDw5YtW4yNjRsaGrS1tR89eoSlUX4BhUK5efOmiIiIn58fotFRKioqbG1tjY2NJ02ahGjAzJkz3dzcfjzbr5+f37Bhw773VyaTefLkyT59+rS9cvz4cQUFhUOHDn3xzsbGRmVlZQUFhTdv3rR/C0kk0rJlyzIzMwsKCngj5vfv38/NzQ0KCqJSqWiBP2XixInp6emHDh2qq6uztrZ2dnbeunXr48ePOSnx75yyo6Kidu7cOWbMGGdn59LS0hs3brx69Wrq1KmYpR3wLAVJ+W/5559/SCSSrq5uYWHhz372xYsXMjIyQUFBHbtJ8+fP55xcT58+jWbwm96/f9+/f3/cdOwoe/fuHThwYENDA0KBZylsNruiokJISGju3Lk/CEW/fv1+cJDctm3bnj17dHR02p6l+Pj4EATx9Qri9fX1nG4zqampP7WRDQ0NYmJi4eHhvBHzKVOm4NTw++h0emho6PTp00VERAQFBR0dHQMDA7Ozs1tbW9vz8dbW1tzc3MOHDw8bNkxISEhYWHjy5MkvX77EZRuaVtfD7QpeNnv2bBEREU9Pz8mTJ9++ffvzW3r/aciQIZ6entOnT09ISPDx8fn9O1tMJnPbtm0BAQHy8vIHDhxwc3NDBf0mRUVFLS2to0ePrly5EtH4fTdu3PD19RUVFUUogCAIaWnpefPm+fn57dq165sHz48fP5aVlX3vuFpcXLx37960tLSLFy923kaKiopqamqWlZXxQMCbm5tTUlIwzfrvExAQcHR05EyHc+bMmatXr966dYtEIg0YMGDEiBEGBgbq6urS0tKSkpLCwsIEQTQ1NdXV1eXn52dkZLx79+758+c5OTkkEklPT2/x4sULFy7U1tZGVKFbIEvhcS4uLvb29qdPn7a0tLS0tJw/f76BgUE7Uw5vb28dHZ2LFy+OHTvW09PT2tpaRETkF7ahtrY2JibmwIEDOTk5Pj4+S5YsodFoqJoOsWnTJhsbG0NDw9GjRyMav6yhoWH16tWDBg0aM2YMogFt9u3b9/79+xMnTmzfvv3rv6akpDAYjH79+n3zsz4+PpcvX9bQ0Pi1n2YwGDExMQ8ePCgrKxMWFjYzM3N1df3mcrcmJiZcuBL5z6LT6a6urq6urpzrZugQAwYM2L9//549e4qKikpLS/Py8oqKit69e5ecnNzY2Njc3MxZb0dQUFBAQEBCQkJaWlpbW9vGxkZNTa1///7y8vKIIXQzPE7ik0eHTCZzxYoVBEEoKSk9fvz4pz579epVCoUybNiwzMzMn/3dixcvcm5Oe3h4MJlMVH2Hu3DhgpmZGeLwO12YnJycBAQEfqFjJHp88XCPL47GxkZNTc2mpqav/+Tr60sQRE1Nzdd/Ki0t7dOnz6RJkyZNmiQmJtavX7+DBw+2v8dXS0sLZ9l1VVXVWbNmmZmZkUgkBweHb/bY8fX19fLy6ulxDg8PJ5PJxcXF2MUAl23QBqPn+QWZTD506FBgYKCcnJy9vf2ff/6ZlpbGbt+gOmdn59evXzMYjEGDBo0cOTI6Oro9n3r27Nno0aNnzZo1YMCAS5cuHTt2jExGe+t4bm5utbW19+7dQyh+TWJiYnBw8Lp165SUlBAN+IKIiIiRkdHevXu//lN1dTVBEN+890+lUk1MTNoubr4+Nu7/v44cOcJkMtve8OjRo6ioKBkZmaioqPPnz8fExCxZsiQsLOzZs2dff5ukpGQXzD/b2W7evDlv3ry+ffuiyQHA/z+WIgT8g0QiTZ06derUqdHR0aGhocuXL6fT6WZmZubm5sOHD5eWlv5BFqGlpfXs2bO4uLiUlJT9+/evWLFCXl6e07dVQkJCUFCQzWY3NTXV19cXFRXl5OQUFRWJiora2dlt27bN3Nwcwe/Uaj1w4ICLi8umTZtWrFiBVPCnNDQ0rFu37tixY0uWLEE04JtWr15taWlpbW1tamr6+euc3jLf3ONkZGTaFtrT1dXV09P7fPAYp9//5+9nsVgsFqvtvyEhIaKioo8ePVJWVua8smHDhtOnT4eGhn59OCWTyZ9/tieKiop6/fr1o0eP0NgAAFkKvzM3N+ec6goLCw8cODBr1qzq6moNDQ1Ot+ABAwZ8c9VtERERKysrKysrzuk2IyMjMjLy3bt3qampycnJbQtBSkhITJ8+fc+ePaamprhi7hrW1tZHjhxxd3fX0tKyt7dHQNqJyWS6uLioq6svW7YM0YDvMTIy2rlz5549e8LCwj5/nfMUpbW19ccj/WxsbNqSDQ4vL6/Nmzd/kS1LSUnR6XTOf1+/ft27d++goKC2FRvZbLaoqGhmZubX39/c3PzN8So9RXZ29rhx4/z8/H5t3CMAIEsB3qSsrHz06NHdu3e/fPkyLy8vPT19zZo1FRUVZDK5V69e8vLyMjIyIiIiNBpNWFiYMzk6nU5vamqqqampqKgoKytrbGxkMpl6enqurq56enpqamoGBga9e/dGbLvY7NmzpaSktm7dqqmpOWDAAASkPXbu3FleXn7q1CmEAn5s+fLlDx8+PHDggJeXV1tKoKioSBBETU3Njwd8f706yn/iJB5v3779/EVbW1sdHZ2v3/z+/XsxMbEeGti8vLwxY8Y4Ojo6OTmhmQEAshT4Uq9evUaNGjVq1KjPz5FVVVWpqak5OTmfPn0qKSmpra1lsVgkEolGo0lKSg4YMMDBwUFfX19CQgJTsnCJ8ePHZ2VlDRs2LCsrC3Oz/Kd79+5dunQpLS1NSEgI0YAfI5PJ27ZtMzY2ZjAY3t7enBc5OUNZWVmH7269e/cmkUhXr15tz5tfvXo1cuTIHhrYffv2DR069PLly1giEACQpUC7CAsLKygoKCgo2NraIho9yNy5c/ft23fs2LGdO3ciGj8QHx8/derUTZs2IUWBdjIyMrK3t9++ffvMmTM5sw+rqakJCQl9/Pixw39LUVExJCQkNze3bSLj5uZmOzu7KVOmeHh4fPHm169fOzo69sSQVldX37t3LyEhASkKAHwThg0A8A4pKamXL19GRUXt27evsbERAfmm27dvOzo6enh4YDgK/JTAwMAFCxasWrWKM1pdQkLCzMzsm2NFfpOLiwudTh8/fnx0dHRjY2NFRcXWrVsjIyO/fnCdkZGRnZ2tqanZ44IZFxdnamrq6emJB78AgCwFgC8oKiqeOXNm06ZNFhYWSFS+lpubu2DBgtu3b+/evRudFeGn9OrV6+jRo9XV1bt27eK8MnPmzJSUlA7/oYkTJ548ebKgoMDCwoJGo8nKyu7bt2/58uXu7u5fvPPSpUsEQejq6vasSBYWFlpaWiopKXl6eqJdAcD3kNq5YgZ0cNxJiDx0ovT09D179jQ3N//zzz+YzKDNrVu3Fi5cePDgQTc3N0Tj17DZ7IkTJ2ZmZsbExNDpdAqFIioqKioqSqVS+aTfTmpqqp2d3d69e2fNmlVXV2dtbR0bG9vO+QwLCwvz8vJUVVVVVVU/f53JZD59+pTNZhsbG/fq1YvzYlVVVVRU1IcPHwQFBfX19Y2Njb/4trq6Ok1NTQeH/8fenQdYOTcKHH/OzDRStE+NaCNZK5XQJmrw1lCo0OSNVLZXyHJzLWWyhMK178S91ZWsryZqWlDSIikJSZumyaSkbcycmXP/eO47d+6UhNJMfT5/nXnOc86cec45c57v+T3L2c8991wZWvi5ubk9evQ4+uij77zzzooVK3pPYbUNleLlzn6nd+/ec+fOfeeddxo2bGhpzJo1q0uXLm+//fYpp5xiaaiUP2P58uVt2rSZOXNm3bp1u3btevPNN7dt2/avfxgTJ04855xzvv322zJ0QtLCwsLzzz//wAMPHDNmjHcTVtvYOVt8wT5ryJAhWVlZ7du3X7169X6+KN59990zzjijd+/eEoU/r379+l27dj3//PN/+umnpk2bPvnkk3vlYcydO/f0008vQ4kSltU777yz/TEAALbnGF+wzzriiCO+/PLLp5566sILL3zwwQdPOumk/fBYOgUFBffdd9+LL744ePDgcHf5hQsXzpw5s2iGHj16VK1aNbw8a9ast99+OzU1tcRZxqGE9PT0vn37Nm/ePD09/YEHHhg5cuSll176Vz6AaDQ6fvz4V155pQwttFmzZt1+++1vvvlmYmLis88+WzS9W7du1atXnz9/fmZmZl5eXr169c4777wKFSp4mYFKAfZZtWvXvuuuu5566qlWrVqNHTu2e/fu+9Wf/+OPP/79739fvXr1F198UXRm69GjR993331F87Ru3TqslA0bNqSkpGzevDkpKalNmzYbN278+OOPd3i3cXFxp59+emJiohfYfispKemdd9655557HnzwwZ49e/bv3/9vf/tbcnLyX/YAhg8fXr9+/aJDFZd+r7zySt++fZ999tmuXbv279//+eefL7qqZcuWWVlZzZs3L1++fCwWy83NHTp06B133JGTkzN37twgCBo0aHD00UcXzb9u3bo5c+YEQXDsscfWq1dv69atH3zwQRAEderUKXMHEgBUCuzXrrjiisWLFw8cOPDkk08uW9uH/Blr165t06bNypUrp02bVpQoQRBkZ2dXqVLltttuC/d4LlqzfOuttzZv3lw021dffdW5c+cd3nNiYuLq1atr1KjhpbWfu+222zIyMn744YcKFSpMmDBh+2Nw7SE//fTTsGHDnnrqqbKyoD7//PN+/fq1aNEiPHBFdnZ2w4YNr7rqqvDaQw89NCMjIxaLjRw5slWrVi1atPj000+DIJgzZ05qamoQBB07dszMzCy6t08//TR8bz766KMDBgxYvXp1+OPll1/+zDPPeFnCPsN+KbAfvM/j4h599NH09PTWrVv36tXrm2++2bf/3vz8/LFjx3bp0uWCCy5YvHhxiTNzL126tGHDhjVr1jz00EOvuOKKMDZ+/PHHhx566Iwzztj+3sqXL1/j/6tevfouHtOJfd7IkSM3bty4devW4cOH//DDD3/NLx02bFirVq3OO++8MrGI5s6d279//4ceemjq1KnhCOTSpUuPP/74KlWq1K9ff8CAATVr1gwPRVhYWLhp06aDDz64UqVKxe9h2rRpxbcQKyESiSQmJiYmJiYk+OIV9i0x9gZLnr1i48aNl1xySe3atRcuXLgP/5nXX399QkLCe++9t8Nra9euHZZbEARHHnnkli1b8vPzTzvttHPOOeeFF14IguChhx6KxWKffPJJ+E+yb9++XjlFCgsLu3Tp0qhRo7Vr165atSorK+unn37Ky8srLCzcn5fJ7bffHolEmjZtmpubu6d/3axZsxo1apSfn18mFs706dPj4+Offvrpoinbtm0LxzbD92D79u3z8vKi0Wjfvn2LvhdYvHhxLBYbP3588RQpeke/99574cRHH300XP5bt27dunVrXl6edyhW2/Ylvg6E/UilSpVGjhw5fPjwCy64YMCAAWvWrNmX/rr169cPHz78lFNO+eGHH7766quzzjprh9/L3HHHHTNmzNiwYcM999yzZMmS1157rVu3btOnT//HP/6xbdu2IAhyc3Pz8vJ28ZeOHz/+0ksvTU1NPe+88wYPHrx8+XIvs/1NJBK566677r///kWLFt1www177nCleXl5d999d2pq6ogRI0r/uEF+fv6rr7567bXXvvjii/369SuaXlBQMHz48M8///ynn3664YYbPvjgg7vuumvatGmvvvrq5ZdfPnTo0CpVqjz88MPbv3MvvvjiHb6/cnJyBg4cOHDgwLFjx3o1grEURDllW0FBQc+ePQ844IDrr79+69at+8BftGrVqqZNm9arV+/dd9/dxZuEW7pfcskl2/9jfO6553ZlLGXcuHHx8fHFb9isWbN9e1TBWMpOZGRklC9fvl+/fnvoS/1hw4YdcMABvzZIWKr8/PPPp556aiQSmTJlyk5mC8+akpqaeuONNwZBsHr16lgsdueddyYnJxcfSzn00EPDC4MGDdp+LKVoE9bLL7/cixCrbcZSgLItLi7umWeeOf/88x999NG+fftGo9Ey/edMmzbtuOOOO+igg+bPnx/ubvtrvvzyy+OOO27RokVBEPz4449BEFSvXr3Cv4QbzZfYwD0jI+P0Yop2BtiyZUu/fv0KCgrq1q377LPP3nfffZFIZP78+W+88YYX2P6pU6dOAwYMeP7553v27Lnrw3G76Ouvv3744YfHjRu3w0HC0mbo0KGzZs169tlnTz/99BJXvffee8cff/ymTZuCIFi3bl0QBIcffnh4kPTw8BVr164tsd9X0Zs6/A7CKw2MpSDK2fctX778+uuvb9iw4cUXX/zBBx+UrQefk5Pz1FNPde/evXXr1iNHjty8efNv3iQvL+/EE0887LDDevfufeSRRzZv3jw7Ozv6L88991wQBA8++GBhYWHRWEoJSUlJ4V29/fbbYeSsW7cunDJixIggCBo2bLht2zZjKfunX3755dlnnz3xxBP/9re/ffHFF7vlPvPy8u6///46deq8+uqrpX8JLF68uGvXrl26dFmxYsUOZ1i/fn2jRo2OPvroPn361KlT56yzzlqzZs3kyZPLly9/yimndO3aNTExMRwVKRpLefzxx++///74+PhIJDJw4MCMjAxjKVht2x84IAbs1+rVq/fwww+np6c/8sgjZ511VkpKyhNPPFG3bt1S/rALCwvHjx9/9dVXx2KxW2+99Yorriix5dWvKVeu3IQJE+6///4lS5ZcdtllgwYNKn6my5YtW95zzz1t27YtPrFdu3bFjzBbvnz58ELRutHQoUPDC+HgzLfffrtw4cKWLVvuq6+Z/Pz8cuXKee/sUGJiYv/+/fv169ejR4/jjz/+ySefLDre7h/7GnHSpEkDBgxITExctGhReCCs0mzhwoVnnnlmly5dnnjiiV/bc6Zq1aqZmZnDhg3Lysr693//93D5JCcnf/PNN3fffff69esfeOCBq6++uvhNIpHIv/3bv61du/ahhx56+OGHK1as6JUG+wOVAgSVKlW64447evToMWrUqG7dujVs2LBNmzapqakNGjQoVY8zNzd31qxZc+bMefPNN6tUqXL//ff36NHj964x16hRY/jw4Tu8qmnTpk2bNi0xsVGjRjs8D0a4SU9ubm7xM9mHcZKfn78Pv1pisVjximN7kUjk5Zdfbt++/X333Tdq1KjTTjutR48eTZo02cXlVlhYuGzZstmzZ48aNeqnn37q06dP3759S3mizJkzJz09/csvv3zwwQfT0tJ2PnOdOnWefPLJ7Sfu/Gwn995779SpUz/77LPiZ4QE9mH2SwH+19FHH33XXXd9/PHHp5566tNPP33MMcf06dNn5cqVpeGx5efnT5w4sWXLlh06dBg3btwTTzwxfvz4tLS0vfilfrVq1YIgqFu37ux/mTVrVnihxBla2A9VrFhxwIABEydOXLFixT333NOsWbNWrVq9++67O98HLD8/f8aMGeecc0540sM+ffpMnz79lltuSUpKKrV/aUFBwfPPP9+hQ4cTTzxx8eLFv5kof1h4tI8gCLKzs73AQKUA+51y5cpdddVV8+fPv+eee8aOHduiRYshQ4aEW9jvrXWgF1544cgjjzzrrLMqV678ySeffPzxxyeccMJeX1D16tULgmDZsmVZWVnhlCFDhpxxxhnDhg3Lzc31QiIIgqOOOmr+/PmXXXZZEASzZ8/u0qXLEUcc0b179yeffPKTTz5ZsmTJypUrV65cOXv27BdeeOHmm28+4YQT2rZtu3jx4hdeeGHZsmXdunUr5X/gunXrOnfu3L9//0GDBt15550HHHDAHv11nTp1KtrkEtjn2eIL2NG/hoSEG2+88Yorrpg8efKUKVOuv/76TZs2NW3a9Mgjjzz55JObNm1auXLlPfSrw336586du2TJktmzZ3/33XfNmjVLT08//vjjmzZtWnpOE3HqqaeeeuqpH374YcuWLVNTUyORyEsvvRSLxVJSUqxIUaR69eovvPDCeeedN2LEiNWrV7dr165BgwaLFi2aOnXq1q1bw6GVihUrJiUl1ahR4+abb27cuPFxxx1X+l9Ca9eufemll1577bUOHToMHjz4rxk/TEpKev3117t16+aLAFApwH7toIMO6tq1a9euXYMgWL9+/ejRozMyMm677bbCwsJ27dqlpaWdeOKJjRs33i3lsHnz5kWLFo0bN27MmDFZWVmVK1dOSUm54YYb2rVrVzr3gqhYseKUKVM6d+48ceLE8OBgQRAMHDhw0KBBXjmUcPbZZ5999tlPP/30VVddlZyc/Nprr7Vt27aM/i2xWOz999/v169f5cqV33nnnSOOOOKv/O2dO3fu0qWLEzjC/iDi0ON7Z7lHLHnKqq+//nr06NGvvvrq119/HQTBIYcc0rFjx3bt2rVo0eLwww+vUqXKLkZFLBb7+uuv582bt3Tp0kmTJs2cOTMajZYvX75Dhw69evXq3r17ePaSvWXDhg0ffvhhEAT16tXbyQZmmzdvHjNmzOLFi3/55ZfTTz/93HPPLf0nBf+Ta6idO3f+/vvvJ0+enJeXFx8fH55qJiEhwS71u2LSpEm33nrrkiVLHnzwwUsuuaTMvVpWrFjRu3fvjz76qHv37v/5n/+5RzfxWrt2bXhA8CZNmhQ/kse3334bnvKocePGhx9++JYtW8IztNavX3/7o1+A1TaVgpc7+5dYLLZmzZo1a9YsXbp06dKlq1atWrNmzYYNG7Zu3Rq+wsuXL5/wL+H84TlJtm7dGp5bIxKJJCUlHXLIIVWrVm3QoMERRxxRq1athg0bHnTQQRavStm3l2FGRsbzzz//5ZdfduzYsWfPnqecckopP7hzQUHB+++/Hwb5Oeec06FDhzZt2pQ49yJYbWP3ssUX8Af/ZdeuXbt27dotWrTY4XrYxo0b8/LycnNzf/nllyAI4uPjExMTK1SoUKVKFSs37OfvndTU1NTU1Gg0euutt7Zv375169aPPPJIs2bNSuFb4+eff3700UdfeumlH3/8cciQIc8///ye3kUe4H//W0pDUQ6wi4yl7HYrVqx48803//nPf2ZnZ7dr1y4lJaVdu3a1atXaiw+psLBw/vz5U6ZMWbBgwcKFC0866aQTTzwxNTW1du3ani+stqFSvNwBVMp+JC8v7+GHHx42bFh+fn6PHj3OPvvszp07V6hQ4a98DLm5uS+//PKIESOWLVvWvn37nj179urV68ADD/TsYLXNattfz3YXALD3JSYmDho0aNWqVTfeeOO4ceN69OjRtGnTBx544NNPPy0oKNjT8TllypQePXocdthhV199dc2aNSdMmDB58uR+/fpJFGCvxaE0FOUAu746ayzlL5CXl7dixYpPPvlk1qxZy5cvz8rKqlKlyrHHHtuwYcNatWodccQRderUqVGjxh/Y537Tpk1r1qzJyclZunTpd999l52dvXjx4k2bNjVo0KBFixbhCZHq1q3rKQCrbSrFyx1ApfAbVq5c+cYbb0ycOPHzzz/Pzs4uLCw88MADjzvuuMMOO6xu3bp16tSpXr16tWrVKlSoULFixXAv/M2bN2/evHndunWrVq1at27dd999t2DBgqysrCAI4uLiGjZs2LFjxyZNmnTp0sUOJ2C1TaXg5Q6oFP6UnJyc1atXh4cC//nnnzdu3Lhx48Zt27Zt27YtPz8/Pz8//Hw54IADypUrV6FChUqVKoWH16tVq9YhhxxSu3btatWqVa1a1ZIEq22lmSMRA0BZkpSUlJSUtJOTjQLsA+w9DwAAqBQAAACVAsDuFYvFbKgNgEoBAABUCgAAgEoBAABUCgAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKRYBAACgUgAAAFQKAACgUgAAAFQKAHtWNBpNSEiwHABQKQCUFoWFhZFIxHIAQKUAUOpE/sWiAEClAAAAKgUAAEClAAAAKgUAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAACVAgAAqBQAAACVAgAAlCkJFgFlwuLFiy+++OKiHyORSGJiYmJi4mGHHda8efO+fftWrlw5CIJt27a1a9cuFovt8E5OPvnkJ598srCwsG3btr/88ssO57nyyiv79+8fBEEsFps6dep77733wQcfLFu2LDc3t3Llyo0aNerWrVv//v3LlSsXzv/GG2/cc889JR5YfHx8rVq1Tj755PPPP/+II44IgmDhwoWXXnrpTv7Ajz/++IADDvBEA+xGCxYsuOyyy2KxWGpq6tChQ4tf9dBDD40aNWqHt6pSpcrjjz9e/EOnhLi4uIyMjKSkpN69ey9atGiH81StWnXSpEmRSOSxxx4bOXJk8asOOOCAChUqNGrUqFevXm3atPE0gUqhDNuyZcu8efN2eNWoUaPWrFkzfPjwIAgKCgrmzZv3a5VSrVq18MJnn32Wm5u7w3nWrFkTXhg7duxFF11U/KpNmzZ9//33U6ZM+e///u/x48cffPDBQRDk5OT82gN7/fXXhwwZsmzZslq1au3k8YcKCws9ywC71y233PLpp58GQfDDDz+UqJTvv//+1/4tV69efevWrTv5px3SPiPjAAAgAElEQVQXF5eXlxcEwVdfffVrsyUlJYUXVq9evcN5Jk+e/NRTTz355JNXXXWVZwpUCmXeRRdd1KBBg3C1fvbs2VOnTg2CYOLEiWGlFDnqqKPOOOOMErc96qijiv9YtWrVXr16lZjnpJNOCi88/fTT4YV69epdd911tWvXnjNnziOPPBKNRj/66KMrrrhi9OjRxW/Yrl27pk2bhg8sKysrIyMjLy9v27ZtU6dOLV47xxxzTMeOHXfwVkzwZgTYnVauXDl58uSiVFi4cGHjxo23n+2SSy4Jv3UqUrFixZo1a15zzTXhj4WFhc8880xBQUG9evXOOeecIAgikUjFihWL5m/WrNn2QyIHHXRQiSn9+vUrX758EAS5ubkZGRlZWVlBENxxxx39+/f3EQA7EGNvsOR/rzlz5oSv2Pfff79oYn5+fuvWrcMPg3DKpk2bIpFIEAS9evX6tbsqKCgIPyeOOuqoX5vnlVdeiY+PD4Lg1FNPXb16ddH0pUuXhh9ykUhk2rRpsVisKGb+4z/+o/g93HvvveH022+/PRaLzZw5M/yxT58+nk3KrsLCwg4dOjRr1mzt2rWrVq3KysrauHFjXl5eYWGhhUNpe61eeOGF4cBI+N1Wx44d8/LyimYYOHBg+G952bJlO7+r3NzccIvcTp06lbiqZcuWQRDceOONO7n5oEGDwl+0bt26oonbtm07/vjjw+lff/2158tqG9uz9zxlWHx8/NatW4MgqFmz5u5N9yFDhhQUFBx44IHjxo2rXbt20VWHH354nz59wnmKvqLboaKxfgD+eqtWrRo7dmz4ZdOtt94aBMHkyZNff/31UvLwypcvX7Vq1fBy+OUaUIIRRsqYFStWhLsqFhQUZGRkzJ8/P/wQ2v7z6a233ioxsVmzZvXq1SteI1u2bCnxsRGWz/Lly4MgaNGixfaxEe4NHwRBOFj/a6ZMmRJeqFu3bvHpK1eu3P6BNW/evMRsAPwZn332WfgVeJMmTc4777x//OMfeXl5L7zwQokdDoMg2LZtW/HPgvj4+HC8fdd9++232/9jb9OmzU6+rvrmm2/Cz69y5coV/y4MUCmUVZdffnmJKcnJyddee22JiR9++OGHH35YYuLzzz/ft2/foh+XLFkSHhmsyNtvv52amrphw4bws+2EE07Y/gEUjdusX7+++PRhw4Y988wzQRDk5uZu2rTpxx9/jI+PP/30088777zis02ePHn7QZiXXnpp50cAA+B3ee+998ILKSkp1atXb9u27ZQpU6ZMmfLll18ee+yxxecssbNKx44d33///d/1u95+++233367xMTJkyd36NCh+JTWrVuH2xJv2bIlKysrGo0ec8wxw4YNK76LC6BSKKuqVKmSmJiYn5+fm5ubn58fjUazs7P79Okzb968uLj/24KxatWq249OFB3jq8gOjwa2i4fbKjHb2rVr165dW/Tj2Weffd999x133HHbP4Y6der85gMD4M+YMGFCEARJSUmtWrUKguCMM86YMmVKYWFhRkZGiUr5tcNC7rqkpKTtx0O233v+m2++Kf5v/9Zbb73hhhts7gUqhX3Eq6++euaZZ4aX169f//TTT99xxx2ff/75bbfdNmzYsKLZOnfu/F//9V87v6uGDRsW7ZQfCr/QqlatWrly5fLz82fPnl1YWFg8foIgWL16ddHHUvHpt99+e1pa2sSJE2+66aZoNJqVlbXD2unateuLL77oeQTYc8aOHbty5crwv/rf//73IAi+//778Krx48ffdNNNxWeeP39+8W+1/sDhtnr37j1ixIjfnG3OnDnRaDQzM/Pee+/96aef1q1bJ1FgJ+w9TxlWrVq1gQMHhkeQfOedd373qz8urvL/F344HXTQQeGhw2bPnr39IP60adPCCyW+jatRo8Yxxxxz3XXX3XnnnUEQzJs3r3Xr1l9++aWnCeCvVFhYeNNNN4UjJMuXLx8zZsyYMWM++uij8NqPPvqoxF6FBx98cPEPgj23/VWDBg1OOeWU8CutwsLC+++/v8TZHgGVwr5jyZIlmzZtCnb3RlO9e/cOL9xwww0///xz0fTNmzcX7SIZnh1lezfffHN4bMrNmzdfeeWVf35bAgB23dKlS1etWhUEQZ06dY4vJjx6SkFBwcsvv7x3H2F4iORYLHbTTTcVjc8DJdjiizLmueeemzRpUnh548aNb775ZmFhYUJCws0331x8tnnz5pWYEgTBwQcfPHjw4F2slFGjRk2ZMmX58uUdOnQ499xzK1Wq9P33348aNSorKys+Pr5Pnz7t2rXb4W0TExP/+c9/tm7d+rvvvvvoo4/GjBmTlpZWdO2cOXO2f2BBEFx33XWHHXaY5xfgTwr3m69cufK8efNq1KhRNP3nn38++eSTv/rqq4ceeujKK6/cjb/xgw8+2OE/9kGDBhV/AEU6dux48803jxgx4scffzzrrLM+/PBDeyeCSqHMGzdu3PYTL7zwwi5duhSfsnjx4sWLF5eY7ZBDDtnFSklISBg5cuTJJ5+8Zs2aTz/99NNPPy26qnz58qNGjTr//PN3cvNatWrdcMMN4XmLhw8fXrxSvvjiiy+++GL7m1x00UUqBeDPC/ebb9WqVYlCqFSp0tChQy+44IJ169ZNnTp1N/7GuXPnzp07d/vpV1xxxQ4rJS4u7oEHHvjwww9nzZq1aNGil19+uegUk4BKoYw55JBDbrvtthITy5UrV7Vq1fr166ekpIRTEhMTw7N37VC4B0skEhk0aFA0Gt3hh0eROnXqLF26dMaMGVOmTFm2bNm2bdsqVarUqFGjrl27Fj9sZfPmzcMHdtJJJxW/ee/evXNycqLRaCQS+e677w499NDtH3+JP9CzDPAnxWKx9u3bN2/efIfD3eeee256enpeXt7BBx+ckpJSoUKFIAiqVKnyG6tKCQm33HJLNBpt1KhRiav69OlTdECX7YUjJB06dAh3ejzwwAOLXztixIhw2Cf8bAJKiNhofu8s94glD5TJVcCUlJQNGza89957eXl58fHxFStWPPDAAxMSEhytCLDaxm5k73kAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAACVAsAflp+fn5iYaDkAoFIAKC1isZiFAIBKAQAAVAoAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAWAfF4vFwkMSOzAxACoFAABQKQAAACoFAABQKQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKBSAAAAlQIAALArEiwCAHZd1apV8/PzI8VYJgDsdpFYLGYp7IXlHrHkgbInFotFo9G8vLytW7fm5+fHx8dXqFChfPnyCQkJcgWw2sZuZCwFgN/3aR0XF1euXLkgCOLi4uLj4/UJACoFgL2ZKJFIJD4+vly5cnFxcUWVIlQAUCkA7M1QiYuLS0hIiIuLC4tFogCgUgDYm8I4iYuLC7fSDn+0WABQKQDsTeEmXmGlSBQAVAoApahVLAQAVIoPeAAAUCnsSQ68DQBQ+vlmea+IswgAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAAD2UwkWwd4SiUQsBAAA2MGqciwWsxQAAIDSwxZfAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAgEoBAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABQKQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAACoFAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAABApQAAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKgUAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAlQIAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAKBSAAAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAVAoAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAIBKAQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAUCkAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAAAqBQAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAQKUAAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACoFAAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAJUCAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACgUgAAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFQKAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAACASgEAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAFApAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAKgUAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAEClAAAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgDAvuDxxx9//PHHLQe2F4nFYpYCAAB7YU00EgmCwOoo2zOWAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAqBQAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAACVAgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAoFIAAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABUCgAAgEoBAABQKQAA7G05OTlpaWk5OTkWBSoFAIC9acaMGeGF7OzsMWPGNGnSRKigUgAA2GtycnK6d+8eXm7cuPFjjz2WnZ2dlpYWjUYtHFQKAAB/tWg0mpaWlp2dXTTlmmuuSU9Pz8zM7NSpk1BBpQAA8FfbsGFDZmbmtddeW3zi4MGDe/bsmZmZeeONN1pERGKxmKUAAMBfafny5fXr149EIkEQFK2ORqPRTp06ZWZmpqenDx482FJSKQAA8Jevif7/SglDpU6dOtnZ2ePHj+/cubNFtN+yxRcAAKVFQkLCggULkpOTU1NTiw4Cxv5YsMZSAAD4C4QHGk5KSvq/NdHtxlKK5qxZs2YQBMuWLatfv75Ftx8ylgIAwB63cOHCmjVr3n333bsyc1JS0vTp04MgaNWqlZOo7J+MpQAAsGcV7W1SYmzk18ZSQhkZGampqcnJyatWrUpISLAY9yvGUgAA2LN69+6dnZ09atSo37X5VufOndPT07Ozs51EZT9kLAUAgD0oHBJJSUmZNGlSyTXRnY6lhIYOHTpkyJAd3px9mLEUAAD2oJYtW6anp7/11lt/7Oa33nprSkpKZmbm0KFDLcz9h7EUAAD20proLoylBMXO9vjYY49dc801lptKAQCAvVwpQRDk5OQ0adIkOzt7+vTpbdq0sej2ebb4AgCgtEtKSgrP9ti2bVtne1QpAADwu+Xk5Jxxxhm7NyeSkpImTpwYBEH37t2dREWlAADA7xCNRsP93StVqrR777lx48bTp0/Pzs5u0qSJUFEpAACwq2688cYFCxakp6c3btx4t995mzZtHnvssezs7LS0NCdR2YfZex4AgN2m6OwoEyZM+M0Txu/63vMlFJ1EZVd+C2WRsRQAAHab7777LgiC0aNH79F4GDx4cLhR2b333muZ75OMpQAAsNts2bKlYsWKu7om+kfHUoJiJ1FJT08fPHiwJa9SAABgd6yJ/olKCUOlTp062dnZ48eP79y5s+W5L7HFFwAAZVJCQkJ4EpXU1FQnUVEpAADwf6LRaEZGxl751UlJSTNnzgyCoG3bto5NrFIAAOB/derUKTU1dfny5Xvlt9evX3/69OlBEDiJikoBAIAgCILHH388MzOzZ8+e9evX31uPoU2bNuPHjw/P9ugkKvsGe88DAPAHLVy4sEmTJsnJyatWrfoDhx7+k3vPl+AkKvsSYykAAPxBF198cRAEM2fOLA1VMHjw4GuvvTYzMzMtLc1TU9YZSwEA4A+aMWNGpUqVGjdu/AfXRHfrWEoQBNFo9PDDD1+1apWTqKgUAAAoFZUS3me1atXWr1//2GOPXXPNNRZyGWWLLwAA9hHhrvOnnXZacnLygAEDnERFpQAAwF72/fffB0HQrVu38GyPbdu2XbhwocWiUgAA2MelpaUdcsghpfOxvfLKK0EQ1KtXLykpady4cUEQnHnmmU6iUhbZLwUAgF01evToXr16paSkTJo0aTesie7W/VK2bNly0EEHNWnS5PPPPw+nzJgxo23btsnJyQsWLEhKSvL0lSHGUgAA2CU5OTm9evVKTk5+6623SuHDe+mll4IgGDZsWNGUNm3aPPbYY9nZ2Wlpac72WLYYSwEA4LdFo9EWLVosWLBg+vTpbdq02T1rortvLGX58uUNGjTY4fklne2xLDKWAgDAb0tISFiwYEF6evruSpTdaMuWLa1atQqCYOLEidt3yODBg1NSUjIzM++9917PY5l5vVkEAADsitK5DU40Gj333HOzs7NHjRr1a+eXnDBhQqdOnYYMGRJGi6ey9DOWAgDAzuTk5Fx33XWlc7+OnJycFi1aZGZmXnvttWlpab82W0JCwoQJE5KTk4cMGZKRkeE5VSkAAJRtc+bMefTRR2fNmlXaHtjChQubNGkSbof2yCOP7HzmcIu15OTk1NRUZ3tUKQAAlGEZGRlbt24NgmDFihWl51FFo9GhQ4c2adIkOzt7/Pjxu7gRV1JS0syZM4MgaNu2rZOoqBQAAMqkGTNmpKamjh07NgiCUjKWEo1GR48eXadOnSFDhoQnQuncufOu37x+/frTp08PgqBJkyZCRaUAAFDG5OTkdO/ePQiCJ554IgiCaf/T3v3H1Fnm+f+/OmF2jKcdteNh7qYlLUocreWuLjqkgNsP8QZTSrZVG8w5zJIY7aYoHLaSzWxrAj24pTGmY+DQ0qS6TbpyWNm6I5mWrvQ42gwHQ2Y62vuMTLNL5DZg5pbbVDfTO5lM70y/f1xf7z0LtKXA+f18/EVvKOf0Pkdzvc77ut7vDz9M7fOxbTscDpeUlNTX1wsh+vr6pqamrndc/gbKy8vPnDljmqaqqgxRIaUAAAAgYziO4/f75X4qr9cbDAZ1XU/JcQ7btqPRaFVV1cqVK+vr6+UplImJCb/fv+jhJzU1NcFg0DTNbdu2EVTSE1MdAQAAMJsckhgIBOSpdNu2V65cqarqxYsXl3MlOmeqo+M409PTQojR0dGxsbGBgQHTNOW3NE3bu3dvdXX1ck1mbGlp6e7u9vl84XCYV5yUAgAAgHRn2/b58+fjI4Hf7+/v71/GwfNuSpmZmZHn4Of+gKIolZWVtbW1O3bs8Hg8y/tvdBxn27ZtkUgkGAwyRIWUAgAAgMxjWVZ+fr48sO71epc3pbS0tLgXa2trhRDr169/6KGHlj2ZXC+ohEKhpqYmXmVSCgAAADJMNBqtqKhQVfXChQvLsu1q7o6vlKQvWclZ3jIRlojT8wAAAPhfNzhNXl5eLo/Rb9u2zbbt7Pj3er1eOe2xoqIiFovxBiClAAAAII0YhrFixQo5HeV62traAoFAJBIpKirKmnkjXq/31KlTQojq6mqGqJBSAAAAkC4cx9myZYsQ4qYTSLq6ukKhkGma+fn5Q0ND2fHPLy8vHxkZkUNUCCqkFAAAAKSFhoYG0zRDodBC5iQ2NTXJCe7bt2+vqqoyDCM7gopMX36/nyEqpBQAAACk2NDQUH9/v6ZpC+9zVV5ePjMz4/P5IpFIYWGh3+/PghJEU1NTMBiMRCJMeySlAAAAIMW++eYbTdPefffdW/pbXq83HA5PTk6qqtrf35+fn19VVTU0NJTRB+vb2to0TYtEIp2dnbwxUohOxAAAAFiqaDR65MiR/v5++Uefz1dbW1tcXPzAAw/coGdxOnQinotpj6QUAAAAZA85sX7fvn26rrsXVVV98MEHvV5vaWmpvFJVVSXnQqZnSpFBpaCgwDTNM2fO1NTU8MqSUgAAAJANceWzzz6LxWKnT592CyzxueXixYvpnFIE0x5JKQAAAEjJKry3t7exsVGWNZKQW9zj9V6v1+PxpHlKEUIYhlFYWCiEmJmZSc5dAikFAAAgdzmOU1JSout6atffaZ5ShBDRaLSiokJRFF3XCSrJRI8vAACAnNPa2qrrejAYZOV9Y+Xl5X19faZpappGb+KkJlhqKQAAADlF1gdUVb1w4cINGnAlYyWa9rUUqaOjo729XdO0s2fPpvaO5Q5qKQAAALnlyJEjQohIJMKCe4Ha2toCgUAkEmloaOBuJCnBUksBAADIKbFYTFGUdNjrlSm1FMEQFVIKAAAAcmUlmjkpRcS1HOjr6/P7/bx8pBQAAACQUlKPIZJItQYAACAASURBVCpJw7kUAACAnGAYBjdhibxer67riqJUVFTEYjFuCCkFAAAAi1dVVSUHFGLpQeXUqVNCiOrqandOJUgpAAAAuDU9PT2RSMTn83ErlkV5efnIyIhpmqqq2rbNDUkEzqUAAABks1gspqqqoihTU1Pp1no4486lxGOICikFAAAAi7RmzRrTNCcnJzds2JB2K9FMTikElYRixxcAAEA2q6ysPHPmTBpGlCzQ1tamaVokEuns7ORuLHOCpZYCAACA1KxEM7yWIpj2SEoBAAAAKSUN2bZdVFTEEJXlxY4vAAAAYPE8Ho87RCUajXJDlifBUksBAADIMj09PUKIpqamdF+JZkUtRTIMQ06kmZmZ8Xq9vAmXiFoKAABAVhkaGmpubv7v//5vbkUybdiwYWRkRAihqirTHpchwVJLAQAAyBqWZeXn5yuKout6+n+in021FCkcDtfX16uqeuHCBXoTLwW1FAAAgCzhOI6maUKIU6dOsekoJfx+fzAY1HV927ZtjuNwQ0gpAAAAuW56elrX9WAwSKepFGprawsEApFIpKGhgbuxaOz4AgAAyBKO40xPT69bty5T9hpl344v94VgiAopBQAAAJm5Es3SlCKDSklJia7rfX19fr+f15qUAgAAAFJK6lmWpaoq0x4Xh3MpAAAAmc0wDNu2uQ/pxuv1utMeY7EYN4SUAgAAkCui0WhhYeHg4CC3Ij2DyqlTp4QQ1dXVDFG5Jez4AgAAyFS2bRcVFZmmmaHzzrN7x1d8kqyoqFAUZWJiwuPx8L5dCGopAAAAmWrnzp2maZ45c4bpKOmsvLw8GAyaprlz506GqJBSAAAAstnQ0FAkEvH5fDU1NdyNNNfW1hYMBiORCNMeSSkAAADZ7I477ggEAidPnuRWZEpQ0TQtEol0dnZyN26KcykAAABI0Uo0N86luJj2SEoBAAAAKSXtuA0PGKJyY+z4AgAAAJLE4/G4Q1Si0Sg3hJQCAACQ8QzD8Pv9hmFwKzKX1+v96KOPhBAVFRUMUbkednwBAABkBsdxCgoKMnc6yjwr0dzb8eVyh6jouk4j6bmopQAAAGSGhoYG0zRDoRCL2ixQXl7e19dnmqamafQmJqUAAABkpHA43N/fr2laU1MTdyM7+P3+YDCo6zpDVEgpAAAAGen06dOKorz77rvcimzS1tYWCAQikUhDQwN3Ix7nUgAAADKAbdsejyfbVqI5fC7FxRAVUgoAAABIKekYVEpKSnRd7+vr8/v9vDFIKQAAACClpJ5lWaqqMu2RlAIAAJDubNs+f/58TU0NKSVHgkp+fr4QYnJycsOGDbf0F03TjMVily9fHh0dnfsDtbW1QoiysjKPx5MpDeJIKQAAAOnIPa5w9erVvLw8UkouWPgQlVgsdv78+dHR0f7+/lt6CEVRKisra2trq6qq0jmxkFIAAADSUUdHR3t7eyAQ6OrqytZ/IynlBkFlYmJibr8EwzBOnjzZ29trmqa8oqrq008/XVRUVFxcvGrVqnXr1s3KtI7jTE9Pf/HFF59//vnY2NiHH36o63r8321sbEzDuEJKAQAASNOlqqqqFy5cyNZCCinlxgFV07SzZ8/KV99xnOHh4X379smAoShKY2Pjk08++cADDyzi7WHb9ieffDIwMNDd3S2vaJp24MCBtDoPQ0oBAABIO2vWrDFNc2ZmJrvHzJNSFhJUBgYGWltbZfEkEAg8//zzxcXFy5iHjxw5IreNqap69OjRNMkqpBQAAIC009PTs3Xr1mVcjJJSMot7Kik/P39mZkYIEQwGW1tbEzQzx7btw4cPt7e3CyE0TTt+/PgtHd8npQAAAICUkhMp5e/+7u/+7d/+TQhRWVn5i1/8IgkzPW3b3r17t6yrhEKhPXv2pHC3ISkFAABgSQu7wcHB06dPu1e6urrcbVpDQ0MFBQWrVq1K+SfTpJQMYhjGli1bTNOsrKyMxWJfffVVMoeoxGKx6upq0zQ1TQuHw6nac0hKAQAAWCjLsm6//fb4T7V7enqam5vjf8YddmEYRmFhoXvd5/N1dnYSV0gpNyYbJwghQqFQU1NTSqY9Oo7T2tra3d29kJ7IpBQAAICUhZO33377+PHjssPSn//85+9+97vudw3D8Hq9827IMQxjdHR0YmLiV7/6VSQSkevO6z2K3+8XQoTDYVJKjkcURVGGh4fdU0mxWExV1eQHhqGhoe3bt6cqqJBSAAAAbiQcDtfX18uvl7HDkuM4nZ2dRUVFdXV1eXl5sibj8/lIKUSUualg4dMek/aUSCkAAACpdObMmb6+vhdffLG0tHQZDxM7jlNQUGCapqIo//RP//QP//APiqJMTU1l8XQUUspS8oBMy8kfoZOqoEJKAQAASA3HcQYGBl566aUvv/xSCDE2NvbjH/84p+4AKeWWksDcaY9ZHFS+w/8gAAAAXD09PStWrBgZGUnCY+Xl5fn9/o8//lgI8aMf/Sj+qD1yh23bu3btEkLcNAO0tbX5fL5IJNLa2prMZ1heXj4yMmKapjw6RUoBAABI6mKxqqqqublZUZSHH344aY+7Zs2aa9euXbp0KbvHzON69u/fb5pmX1/fQt4AJ0+e1DStu7u7o6MjyUElEAhEIpGknZtixxcAAIBw+736fL6TJ0/m1OGQFGLHl+zfpWnauXPnFvhXHMcpKSnRdb2vry+ZxQ3btouKikzTnJmZSUKippYCAAAgzp07Jz/PDofDKY8ohmGsWLEiyR+WI/kcx6murha32H46Ly8vEokoilJfXx+NRpP2bD0ez5tvvim+bZlNSgEAAEg4v99/7dq1ZH4yPTQ0ZBjGvN/yer2KorS3txNUstuxY8dM0wyFQrdamvB6vXJ0T0VFxfXeRYlQU1MjD8YkIR2RUgAAAJJNzss7efLkvN/1eDy6rhNUst7BgwcVRdmzZ88i/q7X65U9HrZs2WJZVtKec1dXlxDiyJEjiX4gzqUAAAAklWVZ+fn5N+3r6h6VmZyc3LBhQ1beilw+lyJPpASDwba2tkX/ErdH8MTEhMfjSc4z37x5s67rV65cSegjUksBAAA5qqWlJRAIJPlBHcfRNE0IcerUqRvv85G7ehbY+gkZ54033hBCNDQ0LOWXlJeXB4NB0zR37tzpOE5ynvmhQ4eEEIODgwl9FFIKAADIReFwuLu7W36Wn0wDAwO6rgeDwfLy8pv+sNfr9fv9SfuMHMkMq93d3aqqLr1K1tbWFgwGI5HItm3bkvPkt27dKoR49dVXE/oo7PgCAAAZz7Zty7IWvuBz91wlc5+M+1QHBwfr6upodixyeMeX3Km1XK2EHcfZtm1bJBJZ4v6xhWtpaenu7k5oS2JqKQAAIOMNDg4WFhYu/KC5XBq++eabyS9TeDwev99PRMlxn3/+uRCirKxsWX5bXl7e2bNnNU1LWruF0tJSIYRpmol7CFIKAADIeFVVVQvviGXbdiQS8fl8NTU1GfRvbGlpSdrYbyTa2NiYEGIZCxF5eXnvvvuu/K8gCW2Ci4uLhRCxWIyUAgAAcF3yoPkCg4rH45mcnLxeF+C09eGHH9bX1yfthDQSSvYOXt5SntvAuqKiItFBZdWqVYm+RaQUAACQc0Flw4YNydxzFYvFVqxYscSF4+7du8W3n8Ej033wwQeKoiTiv4Lh4WEhxFNPPXXs2LFoNJqgWLtu3TohxOnTp0kpAAAAyxlUksa27erqaiHE2rVrl/J7nn32WSHEgQMHeKGzgGmalZWVifjN99xzT0lJyczMTGNjY0VFxdq1axNRV0lCyCelAAAAgkoC7dy50zTNvr6+Jfac9Xg8mqZFIhHbtnmhcT0nTpy4cOGC+8eZmZmnnnoqQRWVhM68J6UAAIAcCirhcDiZRzt6enrkSf1laTh7/PhxTdO+973v8SpngQQt8V955ZVZV2ZmZhK0UTCh80ZJKQAAIFeCimEY9fX1AwMDSXsmly9fVlV1uU7qb9iw4dy5c3QxzgI+ny8SiSTiN+fn5yfh+RuGIYS4//77SSkAAAC3FlQmJibcCRKyfjI6Oiq+baKaHG1tbRcvXiRXYF6JKOvt27dv7sX3338/Ec+/qKiIlAIAAHBrPB6PO+pu27Zt7oowCU1UgRurra0VQkxPTy/7b66rqwuFQu4fKysrN27c2N7evrzDdmTgX79+PSkFAADglrkzuSORyLZt237xi1+Ib5uoAil05513CiG++OKLRLznm5qarl69quv6zMzML3/5yw8//FBRlPr6+mVs9jUxMSGu37aupaVlxYoVS3yIFdeuXeONAgAAspjjOA0NDf39/YqimKaZ6MWPZVlvv/12U1NTgn55b2/v/v37s2MXmVzL5uBy1LKs/Px8TdPOnTuXtIcTQkxOTi6x15y0Zs0aIcQf/vCHud/q6Ohob29f+j+NWgoAAMhyeXl54XA4GAyapnn33XcntH2q4ziqqjY3NyfoUXp7e9vb27/++mte1ozm9XqT2Vfa6/WOjIwIIbZs2bL0d2Y0GjVNs7Gxcd5vtbe3K4py9uzZJT4KKQUAAOSEtra2YDD41VdfqaoqOxQlQkNDg2maoVAoQU1aL126JBLcARbJsXfvXiHEiRMnkvNw5eXlIyMjpmmqqrrEaCS75M1NKdFotKKiQlEUXdeXXutjxxcAAMghIyMjjz32mPyivLx8eX/50NDQ9u3bE7qNZ/PmzTMzM/PutMlEObvjSwjhOM53v/tdVVUvXryYtAd1t2OdPXt2cUHCtu2VK1fOfdqGYRQWForl21RGLQUAAOSQioqKkZERRVEqKip6enqW95c/99xziqIsbzOlWXRdr6ys5HXMAnl5eYFAQNf1WCyWtAeVFUXZTGJxv2FwcFAIcejQofiLlmVt2bJFhv9liSiCWgoAAMgptm17PB7LslRVNU0zGAwu40n0aDR63333JXQ71po1a+rq6rq6urLj5cjlWor4tv6gKMrU1FTS2iE4jrNt27ZIJBIMBtva2m7p78pT+LOesPtf0/LWJ6mlAACAXOE4zr333tvT0xM/8zF+lMoSlZeXJ/rEyMTERNZEFGzYsCEUCpmm2dramrQHddtzy4Gnt/R3/X6/EGJ4eHhuRAmFQsu7hZJaCgAAyCHxHVTjOxTrus6R9OTL8VqKfBOWlJTouq7renFxcdIe17btoqKiWyqAhMPh+vr6QCDg5mT3lyyiLHNT1FIAAEAOaWxsNE1TjreTHYrlh9n5+fmLnnmXnGayyEp5eXnypEd1dfVy1fQWwuPx6LouD2gt5J1vWVZ9fb2iKJ2dnW6+2rlzZ4IiCikFAADkXEoR37ZSlZqamuQoiUWcp3ccp6qqqqioiBuLRXP3fS3j5sOF8Hq9w8PDQohdu3bdeIiK3NYlhDh16pTH4xFLO9xCSgEAAJhnZaaqand3d/zF8vLymZkZRVGam5v9fv/CV4qdnZ2RSKSuri4JzzwajSazGRSSqampyW29lcygUlxc7A5RuV5QiW81IfeGWZaV6IgihBDXAAAAcsnMzEwoFJp7/erVq5qmCSEURZmZmbnp75EVGFVVr169mujnPDk5KYTw+XxZ9lqwHI0XDAaFEJqmJeEdFS8UCl3vcWV6F0IEg8HrXUnUe4M3BAAAwKwVmxDizJkzN/ixK1euyLXaQvLMEl29elXut9F1nZRCUEna46Ywoly7do0dXwAAAP9n740c+7h9+/aWlpbrbb/xeDybNm0aGRlJQmewY8eO6boeCASS2QMKKeFOXSwoKDAMI5mP+8wzz0QikUceeSQajTqOE41G8/Pz4w/Hx2/9SuBGr2/RiRgAAGA2y7L8fn8kElFVNRKJpLBJ8bxz9LIGnYjn1dPT09zcLITo6+urq6tLwutuWdamTZtmZmbiLyqKcurUKfcsiowofX19cmpKolFLAQAAuRtFWlpa5j007PV6z549GwwGdV3Pz88fGhpK1ZP0er2BQOCjjz7KvoiC62lqapJtguvr60tKSpLQNaGlpWVWRFm5cqWu6zKiuHWVkZGR5EQUQS0FAADkLMMwCgsLbzzSMRqN7tq1yzTNQCBw+PBhosIyr0SppVyf4zidnZ3t7e1CCJ/P19nZuWHDhkQ8kG3bK1eunHt9ZmbG6/VGo9GKigohxMLnPy4LaikAACBHbdiwIRgM3rgNa3l5ua7rmqZ1d3cXFBTs3bs3HA5z65AEeXl5bW1tk5OTPp+vv7+/sLCwqqpKHhpZ3ix0/vz5eeP37bff3tHRUVFRoSjK5ORkMiOKoJYCAAByXEdHR3t7u6IoExMTcmLdvCu5Y8eOyaMCW7du/fDDDxP6lBzHmZ6eXrduXdaXbqilLJBhGPv37+/v7xdCKIrS2Nj45JNPPvDAA4t+hziOMzY2NjAwMGt2kKu9vf3rr7/u7u6+cbGRlAIAAJAoPT09o6OjXV1dN1iKye1h3/nOd/7yl79omhYOhxO0bnOnek9OTiZohw8pJUPZtn3ixImDBw+apimv+Hy+srKyrVu3Kopy0zekYRhffPHFxx9/PDg4GIlE5EVVVX/605/u2LHjxIkTr7zyijyd8vLLL4+NjUUiEU3T3n333euld1IKAABAKjmOU1BQYJrmb3/729dee01+pJ2IZkeWZWmaJveYnT17lloK5hWLxc6fP3/8+HFd1+OvK4pSWVk59+flOzaepmnPPvtsVVXVrGxjGMb3vve9v/7rv075WSxSCgAAwE3IA8ShUKipqUkIMTQ09Nxzz5mm6fP5jh8/vlyfNMdiMTm9MRgM7t+/PxdO6pNSlp6fp6enR0dHJyYmLl269Omnn87KLZKqqg8++GBZWdnq1avLyspuUKNzz8q77/aUvTd4WwAAAMQ7ffr0888//6c//amkpKSjo6O0tFQIMT09Hb+2s2179+7d/f39iqK8+eabNTU1S3/cnp6egwcPuhMqcgEpJa3IM1oi6e28SCkAAAA3YVnW/ffff/nyZffKDSZtxxdVbnysBaSU5L+TF/6GtG17586d6TDG1EUnYgAAgP/V29sbH1GEEO3t7bZtz/vDNTU1ExMTslFsfn7+LTUpjkajLS0tSRjYh1wTjUY1TcvPz//hD3/Y0dFx087FhmEUFRVFIhGfz3fhwoU0CdvUUgAAAOLWRitWzL1404PyblFF07Tjx4/fYN+/YRgnT57s7e2VbZrSYWtNyu82y9HljSjyYInL5/PdID+Hw+H6+nqRBgdRSCkAAADX5W7Nj3flyhX3iHxLS8v4+Phjjz32+OOPr1271g0ktm3v379fTp+43vF3d8i3HHnR2NiY45vESCnLTlXVuQW6ebtau7u8FEUZHh4uLi5Or/cGbwsAAACXYRiPPvroV1995V4JBAJdXV3XizGqql64cMENJOfPn9+5c+c333xz22233X777ZcvX9Z1PX79F41Gv//976fbipCUkmW3dJYzZ87MavAQi8Wqq6vlkaqTJ0+mYUM5UgoAAMDsoPL66693d3dv2rRp3759dXV1c9dwhmGMj49/9tlnq1evjt8MNmu/zfr16//zP//z/vvv566SUpJj3mLg1atX3few4zitra2y6JeImT+kFAAAgLRgWVZvb+/Ro0c3bdr00ksvVVdX5+XlWZbV0tIip+nlzvwTUkrK2bb94x//eHx83L0SH0UMw9ixY4eu66qqDg4O3uAAFSkFAAAgsyPKgw8+aFmWe6WpqSkUCsmvo9Horl27TNNcxrEqpBTcmOM4w8PDb731VllZ2TPPPCPPPjmOc+zYsebmZiFEKBTas2dPmsdmUgoAAMDizbvBJv6wsuM4AwMDso2SqqpvvfUWh1JIKUnmllDS86D8vJiXAgAAsHhzI4oQYnR01P06Ly/P7/dfuXIlEAjInTZ+v98wDG4dbpVt20NDQ7c0Y8dxnI6OjsLCQl3Xg8Hg1NRUpoRkUgoAAMDiBYPBuRfLyspmXfF4PF1dXZOTk3IEZGFhYUdHx/WGRQJzw0ZLS8vKlSu3b9+uqmpxcfFCsko0Gi0oKGhvb1dVdXJysq2tLYMOR7HjCwAAYPFufC7lemvHF154Qdd1GXJaW1vdYSy5hh1fC+TOXnRt2rTpBkHFtu3du3fL5g0ZcQqFlAIAALD8QWVuj6+b/i13XL2iKIcPH5633zEpBZKiKF9++eWsiyMjI+Xl5bMuxp+D8vl8XV1dGTo5lJQCAACQGnJB2dramrNZhZSyvCklm3rKcS4FAAAgNeTB+qmpqb6+PiFEfX19QUFBOBx2HIebg3g/+9nPZl3ZtGlTfEQxDKOqqqqiosI0zVAoNDU1leltr0kpAAAA6ZhVOFsPV11dXSAQiI8o4XBYfm3btt/vLywsjEQiPp9vZmamqakpCypy7PgCAABIF/F7wEQOnK1nx9ctsW37/PnzBQUFspuwbduHDx+WvbDTf5Y8KQUAACDbskpDQ0M2LUBJKUuPK/H55OjRo3OP0ZNSAAAAkJCsMjY25vYs9vl8L774YpYtRkkpi8gnJ06caG5uFkJkd8cFUgoAAEBai0ajBw4ciEQiQghVVQ8dOrTAZseklCzLJ279JBc6wpFSAAAAMoBhGCdPnnQXqY2NjY2NjRk6CoOUQj4hpQAAAGTVgvXEiRMHDx6UR1YyfRsYKeWm0XT//v1yhHyWldFIKQAAAFkofhtY5pZWSCnzmnUkKVvPx5NSAAAAspNlWb29vb29vbK0omna3r17M+jjdlLKLHNrZZ2dnVnZ3o2UAgAAkOXkR+9HjhyRW4OEEIFA4Pnnn5dTNUgpGSEajbqvoCyOZfeoHFIKAABArpCfxB8/flzuFJKL3SeffDJt4wopxbKst99+2y2eyM1dpaWlOXL4hJQCAACQQ2RDMHcnWNrGlZxNKXKK/Ouvvx5/sihbZ3eSUgAAAPB/xGKxn//852kbV3Itpczdmye7tFE8IaUAAAAQV4SiKHV1dXV1dQ899FAKDz/kSEqxbfuTTz4ZGBjo7u6WV2Sfg61bt+byyRNSCgAAAP5PXHnnnXfk2RW5Yn722WerqqqS38g4u1OKZVm//vWv3W1dQghVVXfv3v3MM89k+jhOUgoAAAAStYY+d+7ciRMn3DW0LLA88cQTSfuMP/tSiuM4v//978+fP+/2MEhtDiSlAAAAIFMX1mNjY++//767H0wIoarq008//cgjjzz66KOJW1tnTUoxDGN0dPT06dPugRMhRCAQSGbkI6UAAAAgO8lNSu+9997AwICbWGSNpbS0tKysbHmbUGV0Spk3mWiatmPHjq1bt6b/sBpSCgAAQAJXil6vl8+qk5ZY5EL8sccee+SRRzZu3LjE0JJZKcWyrP/6r/96//33f/WrX7nb5MS3dafHH388ta0I0oRt25ZlLT3NklIAAEAG27x5s67rfX19fr+fu5HQpecnn3zy8ccfDw4Oxi/QZWjZuHGjrLTcamJM85RiGMb4+Phnn302OjoaXzAR39ZMHn74YZJJvKGhoeeee840zaW/pqQUAACQwWKxWHV1tWmaPp/v5MmTDJ1I5vL9N7/5zaVLl2Yt34UQPp/P6/WWlpauX79+7dq169atu97rkj4pRVYA3EzywQcfxJeP3DD2xBNPLL2ClJUcx2ltbZWtlkdGRsrLy0kpAAAgp9m2vXPnzkgkoijKRx99xAoy+SzLMk0zFouNjY2Nj4/PKra4q3yv11tWVrZ69WqZXoQQhYWFyUwpjuNMT08LIcbHx7/55puJiYlLly59+umnbjMul6IolZWVZWVl99xzD7FkIal1x44duq5rmhYOh5el3QIpBQAAZIOenp7m5mYhRCgU2rNnD0WVlEdHy7JGR0eFEKdPnxZCzC25zM0wQghZhIn/VnFx8apVqxbyoPLhXGNjY5Zlya9v/OgLL/5grnA4XF9fL4QIBoP79+9frltHSgEAAFnCMIwtW7aYprmMH+hi2V8j8W0p4/LlyzJXWJY1b/llGbkpqLa2Vghx5513bty40ePx8CZZYhZ1y5jDw8PL29aMlAIAALJH/OZ4jtRn6MLXLYBIsyokNzCr6kLzt4RyD8r7fL7jx48v+60mpQAAgGwTjUZ37dpFUQVIUJLcvXt3f3+/oihvvvlmTU1NIh7lO9xoAACQZcrLyycmJnw+XyQSyc/PD4fD3BNgWQwNDRUVFfX39/t8vomJiQRFFFIKAADITh6PJxwOnzlzRlGU+vr6qqoqeSICwOJYluX3+7dv3y6EOHPmTDgcTuiGOlIKAADIWjU1NRMTE4FAIBKJFBYW9vT0OI7DbQFuVTgczs/PT0IJxcW5FAAAkP3c4Y+qqr711lvL24wIyGLuLJSEnkKZi1oKAADIfsXFxVNTU6FQSNd1VVX9fr9t29wW4AZs225paSksLNR1PRAITE1NJS2iCGopAAAgpxiGsXv3bjmdo6+vr66ujvl9wFzhcLi1tVWWHwcHBzds2JDkJ0AtBQAA5JANGzacO3fOPVVfUlISjUa5LYArFott3rxZjpPv6+u7ePFi8iMKKQUAAOSimpqaqampYDCo63pFRYXf76cDGGDbtt/vV1VVbvGamJhI4VxUdnwBAIDcZVlWS0tLf3+/ECIYDLa2tjKtHDnIcZzOzs729nYhhKZpx48fT0n9hJQCAADwv6LR6AsvvKDruhAiFArt2bOHwyrInXwyMDAgj6AoinLq1Kny8vJ0eGLs+AIAALmuvLz84sWL8rBKc3NzQUFBOBxmsgqy3tDQUEFBgXsEZWpqKk0iCikFAADg/ycPq/T19Qkh6uvrCwoKhoaGuC3IStFodPPmzdu3bzdNMxgMTk1N+f3+tCohklIAAEAG8Pv9a9asSXQ/rry8PL/fPzExEQwGTdPcvn375s2baQKG7MsnFRUVuq4Hg8ErV660tbWl4RZHUgoAAMgAP/nJT0zTrKio6OjoSPReLI/H09bWduXKFbcJGFkF2ZpPEtouwnEcwzAW9x8sp+cBAEBmsCxL0zRd6bD1vQAADnhJREFU1zVNC4fDXq83CQ9q2/bhw4dl7yNVVX/6058yCBKZmE/c/hBJ62UXi8Wqq6tN05yZmVnEf63UUgAAQGbwer0XLlwIBAKRSCQ/Pz85h0Zm1VXkeRXO1iMjOI4TDofXrFmTzPqJ1NPTo6qqaZp9fX2L+0CBWgoAAMgwQ0NDzz33nGmaPp/v+PHjSZtwIusqvb29smdrY2Mj81WwvKFieHj4jjvuWHqjLdu2T5w4cfDgQdM0RXJnAdm2vXPnzkgkoijKRx99tOi5K6QUAACQeeJXQsPDw8XFxclcSrrzJYQQgUBg7969KR+BhywQDofr6+s1TTt37tyif4llWb29vXKPoqIoL7/88rPPPpu0LB3/CcLJkyeXsjeSHV8AACDzeDyec+fO9fX1maapqmpLS0vStmDJPmBTU1MjIyOqqnZ3dxcWFlZVVUWjUbaBYSnpt7W1VQjx2GOPLe43RKNRv9+fn5/f3t6uqqqcf9LU1JSciOI4TktLi2xtfObMmXA4vMTjW9RSAABABrMsy+/3p6SoIsVisUOHDvX394vl+Ojatm3LstatW8cB/VwjCylCiCtXrtzS+8e27cHBwVdffVUejtc07cCBA0kezugelF/GzhakFAAAkD0rvCSfVIlfKbpHVuTTePHFF92VYjQa/fzzz4UQY2NjlmXF/0UZb2bRNO3s2bMEldzhOE5BQYEcsNjW1rbwbPDGG290d3fLPwaDwcbGxuT0vot/5q2trfI5hEKhpqam5frNpBQAAJAN4osqb775Zk1NTUrWmsPDw/v27ZOfarulFcuyCgsLF/57bmmpimyK2QsppMwqnqSwQbZbQlFVdXBwcHlPZ5FSAABAVq325Ln2ZM5UmcswjJMnT8oTzEIITdPuuuuuf//3f3d/QAaY1atXFxcXr1q1yr3u8XhS9ZyRKvMWUoaGht56663a2lq/3+/+2NjY2JEjR9z6WzAYbGhoSEnnBtu29+/f75ZQ9uzZs/wZ6RoAAEAWuXLlis/nk+ucUCh09erVVD2Tq1evjoyMaJo27xpMVdWRkRFeL4RCIRlc5Xs1/g0cCASuXbsmR50oiuK+c86cOZPCN/aZM2fkk9E0bXJyMkGPQi0FAABkIXcviqIop06dSvJh4rkfPJ84ceJnP/vZ5OSkECIvL8/tBqaq6tGjR1P79JDa98bKlSuFEH19fX6/3y0GCiGeeuqp8vLy1157Tf5RjuhJ/smTeJZltbS0yGKOfMKJeyxSCgAAyE6O4xw7dqy5uVkI4fP5Ojs7Uz7VpKam5uzZs9/5znf+8pe/xF9XVfWtt95KfoMypFxHR0d7e7scgLh79+5IJCKE+P73v/+DH/xAZlohRDAYfPLJJ1P79pj1X1NXV1eiwxIpBQAAZLP4T3+TOYH7ek8mPz9fCPHCCy/88Ic/7OnpiW/5tW3btqNHjzIgMne4hRRVVeVR+HiBQKCurq60tDTl3d6i0eiuXbuSXJlkqiMAAMhmXq83HA7ruq6qant7e1FRUTgcTtX4Ra/X29fXJ4Q4evRoQ0PDzMyMrut79+697bbbhBBnz54tLCz80Y9+dOrUKQZE5oLXXntNfhEfUQKBwMjIyNWrV7u6usrLy1MbUQzD8Pv9FRUVpmmGQqGpqamk7U6klgIAAHKC4zgDAwNy038KD6s4jlNSUiJT08WLF93r//Ef//HCCy98+eWX7pXKysrnn3++qqqKrl9ZxrKsc+fOvfHGGx988IF7ceXKlc3NzYZhzPpJuQdMURRd15P5TpAjgGSfuuRs8SKlAACAnM4qnZ2dcu2VqpPrhmHI8Slzzx9Ho9G///u/Hx8fj7+oKEpdXd0TTzyxdevWFG5XwxIX/Z988sn777/vjv68VbquJ+doSnyeT+GJKVIKAADIxSWjO+1B07Tjx48n+TRIS0uLfPR5p/hFo9EXXnhhZmbm1VdfNQwjfl2rqurTTz/9+OOPP/TQQySWTEkm77zzjrunS2bOv/3bv9U0TVGUysrK+L9SVla2evXqWVdEEgfpxB9BOXz4cEqGRZJSAABATjMMY//+/fJgfZKbgLmD/Hw+XzgcvunPW5b161//+r333pPZxk0s/+///b8nnnji0UcfZVdYmpCv1G9+85v4ZCLfYLW1tem8f09mY/mcg8Hg/v37U3skhpQCAADIKinIKkNDQ9u3bxdCjIyM3NKuM8MwxsfH33vvvYGBgfi9Q3IdXFxcfM8991BmSRrbtj/77LNYLHb69Gl3Knz8K1JWVpbmfdsMw9ixY4ebT1LbB4+UAgAAcN2ssm/fviTsxff7/f39/beaUuJd75N7uZWotrZ2/fr19913H5WWZWRZlmmaMpZ88MEH8UEx46pbKSwnklIAAAAWs2hLztl6y7LuuuuuZdla4zjO9PT06Ojo2NjYrDKLXIPef//9RUVFZNGUYỄN VĂN TRUNG : 0915192169 BÀI TẬP ÔN THI HỌC SINH GIỎI QUỐC GIA VÀ QUỐC TẾ Bài 1: Sự phân hạch của các hạt nhân nặng Sự phân hạch là quá trình trong ... lượng liên kết, bao gồm số hạng chính (thể tích), số hạng bổ chính bề mặt và bổ chính tĩnh điện thu được. Bài 3: Năng lƣợng liên kết của các hạt nhân nguyên tử – các số hạng thể tích và diện ... thể tích của tất cả các nuclonNAV, trong đó334NNrV . Tỉ số VAVfN/được gọi là thừa số xếp và và cho ta tỉ số phần trăm của không gian bị chiếm bởi vật chất trong hạt nhân. ...
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KHÓA LUẬN TỐT NGHIỆP ĐẠI HỌC: MỘT SỐ BIỆN PHÁP TỔ CHỨC DẠY HỌC CÁC DẠNG BÀI TẬP VỀ TỪ LOẠI CHO HỌC SINH LỚP 4

KHÓA LUẬN TỐT NGHIỆP ĐẠI HỌC: MỘT SỐ BIỆN PHÁP TỔ CHỨC DẠY HỌC CÁC DẠNG BÀI TẬP VỀ TỪ LOẠI CHO HỌC SINH LỚP 4

Khoa học tự nhiên

... đối với các đối tượng học sinh yếu, học sinh còn hạn chế về tiếng Việt. a .Đối với đối tượng học sinh khá giỏi Nếu đối tượng học sinh của lớp chủ yếu là học sinh khá giỏi, các em thực hiện ... các chủ điểm được học ở bài tập đọc (dựa vào vốn sống của học sinh, bài tập đọc, gợi ý của giáo viên). Hình thức mở rộng vốn từ thông qua các bài tập. Hệ thống bài tập luyện tập mở rộng vốn ... Phần luyện tập: Gồm hệ thống bài tập nhằm củng cố và vận dụng các kiến thức đã học vào những tình huống mới. Có hai loại bài tập ở phần luyện tậpbài tập nhận diện và bài bài tập vận dụng....
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Bài tập về hàm số thi ôn Đại học

Bài tập về hàm số thi ôn Đại học

Toán học

... Bài tập về hàm số 1. Cho hàm số 122−−+=mxmxxy . Xác định m để hàm số có cực đại, cực tiểu với hoành độ thỏa mãn 21214 xxxx=+2. Cho hàm số 12224+−+−=mmxxy ... đại và điểm cực tiểu của đồ thị hàm sốvề hai phía đường thẳng 0179:)(=−−yxd 6. Cho hàm số : 22 (1 ) 1x m x myx m+ − + +=−. Định m để hàm số đồng biến trong khoảng (1;+∞)7. ... 12224+−+−=mmxxy . Xác định m sao cho đồ thị hàm số cắt trục hoành tại bốn điểm có các hoành độ lập thành một cấp số cộng.3. Cho hàm số : y = 3x - x3 có đồ thị là (C). Tìm trên đường thẳng...
  • 2
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  • 2
Tài liệu BAI TAP VE DAY SO

Tài liệu BAI TAP VE DAY SO

Toán học

... tiên b) sốsố hạng thứ mấy của dãy số c) sốsố hạng thứ mấy của dãy số 2.Cho dãy số (un) với un = 5.4n – 1 + 3Chứng minh rằng: un + 1 = 4un – 9 ∀ n ≥ 13.Tìm số hạng thứ ... mọi số nguyên dương k,tổng của k số hạng đầu tiên của dãy số (vn) bằng uk + 1 – u1 b)Chứng minh rằng: dãy số (vn) là là một cấp số cộng ,hãy xác định cấp số cộng đó23.Cho dãy số (un) ... + m) un = 5.Cho dãy số (un) xác định bởi un = a là một số thực.Hãy xác định a để: a) (un) là dãy số giảm b) (un) là dãy số tăng 5.Xét tính bị chặn của các dãy số sau: a) un =...
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MOT SO BAI TAP GHEP DIEN TRO ON HOC SINH GIOI LY 9

MOT SO BAI TAP GHEP DIEN TRO ON HOC SINH GIOI LY 9

Vật lý

... •NĐ1Đ2Đ3R1R2MAB Bồi dưỡng HSG Vật lí 9 Bồi dưỡng HSG Vật lí 9CHUYÊN ĐỀ I: ĐIỆN HỌCDẠNG TOÁN 4: MỘT SỐ BÀI TẬP VỀ MẠCH CẦU (ĐỀ 8)BT1( Sưu tầm). Cho mạch điện có dạng như hình vẽ:R1 = 2Ω, ... I3 < I1 → dòng điện qua am pe kế có chiều từ C → D. Số chỉ của am pe kế là:IA = I1 - I3 = 0,8 - 0,6 = 0,2A c/ Theo bài ra RV = ∞ nối vào C, D thay cho am pe kế khi đó:I1 ... 10Ω,R2=R5= 20Ω, R3=R4= 40Ω, vôn kế lý tưởng, điện trở các dây nối khôngđáng kể. a/ Hãy tính số chỉ của vôn kế. b/ Nếu thay vôn kế bằng một bóng đèn có dòng điệnđịnh mức là Iđ = 0,4A thì...
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Bài tập về dãy số

Bài tập về dãy số

Tư liệu khác

... c = 2 làđáp số duy nhất của bài toán.Qua các ví dụ trên, chúng ta thấy công cụ cơ bản để khảo sát các dãy số cho bởi dãy các phương trình là các định lý cơ bản của giải tích (về hàm liên tục, ... chínhlà xn+1. Như thế ta đã chứng minh được xn+1 < xn. Tức là dãy số {xn} giảm. Do dãy này bị chặn dưới bởi 0 nên dãy sốgiới hạn.Ta sẽ chứng minh giới hạn nói trên bằng 0. Để chứng ... + 1/((n+1)2x-1) cho thấy xn là dãy số tăng (ở đây2111 14111)(2−−++−+−=xnxxxfn). Đề bài cho sẵn giới hạn của xn là 4 đã làmcho bài toán trở nên dễ hơn nhiều. Tương...
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1.Tong hop Bai tap ve Ham So Thi Casio

1.Tong hop Bai tap ve Ham So Thi Casio

Tư liệu khác

... đoạn [0; 1]. Đáp số: Đồ thị hàm số f1(x) ở dới cùng, đồ thị hàm số f2(x) ở giữa, đồ thị hàm số f3(x) ở trên cùng Bài 10. Tính gần đúng toạ độ giao điểm của đồ thị hàm số 3 2123 2 3x ... 2.Đáp số: a - 0,04604; b 0,74360 Bài 14. Tính gần đúng khoảng cách giữa điểm cực đại và điểm cực tiểu của đồ thị hàm số 25 13 2x xyx+ +=.Đáp số: d 5,25404 Bài 15. Đồ thị hàm số sin ... đoạn [0; 2].Đáp số: x 2,49809 Bài 8. Tính gần đúng với 4 chữ số thập phân giá trị lớn nhất và nhỏ nhất của hàm số 23 1( )sin cos 2x xf xx x +=+ trên đoạn [1; 2].Đáp số: max f(x) 1,6645;...
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Tập hợp các đề thi học sinh giỏi toán 9

Tập hợp các đề thi học sinh giỏi toán 9

Toán học

... (O). Tìm tập hợp giao điểm N của OM và ACĐề vào chường chuyên Bài 1: Rút gọn:a/ b/ Đề Thi HSG Đà Lạt năm 2005-2006 Bài 1:1) cho số :a) Cm rằng A là hợp số (1.5đ)b) A có phải là số chính ... minh ba điểm Q,P,C thẳng hàngĐề thi học sinh giỏi quận Ba Đình năm học 2007-2008!! Bài 1(6 điểm ) Cho biểu thức: a/Rút gọn biểu thức Pb/tìm giá trị của x để Bài 2(3 điểm ) Tìm giá trị lớn nhất ... tất cả số nguyên tố p sao cho tổng tất cả các ước nguyên dương của là bình phương của một số nguyên.7) Giải hệ phương trình:8)Tìm tất cả các số thực: thoả mãn9)Trong tất cả các cặp số x,y...
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Bài tập chia hêt - Bồi dưỡng học sinh giỏi

Bài tập chia hêt - Bồi dưỡng học sinh giỏi

Toán học

... 29 Bài 3: Tìm tất cả các số có 2 chữ số sao cho mỗi số gấp 2 lần tích các chữ số của số đó. Bài 4: Viết liên tiếp tất cả các số có 2 chữ số từ 19 đến 80 ta đợc số A = 1920217980. Hỏi số A ... khảo1. Số học Nguyễn Vũ Thanh2. Toán chọn lọc cấp II Lê Hải Châu3. 400 bài toán chọn lọc Vũ Dơng Thuỵ Trơng Công Thành Nguyễn Ngọc Đạm4. Chuyên đề số học Võ Đại Mau5. Bài tập số học về đại số ... trên không có số nào có cùng số d khi chia cho 5 tồn tại 5 sốsố d khác nhau tổng các số d là: 0 + 1 + 2 + 3 + 4 = 10 10Vậy tổng của 5 số này chia hết cho 5. Bài 4: Xét dÃy số a1 = 1993,...
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Bài soạn ĐỀ VÀ ĐÁP THI HỌC SINH GIỎI MÁY TÍNH CASIO TỈNH NĂM 2010

Bài soạn ĐỀ VÀ ĐÁP THI HỌC SINH GIỎI MÁY TÍNH CASIO TỈNH NĂM 2010

Sinh học

... HO THI CHN HC SINH GII LP 12 THPT GII TON TRấN MY TNH CM TAY NM HC 2010 - 2011Môn: Sinh học Bài 1: ở gà bộ NST lỡng bội 2n = 78 NST. Có 2000 TB sinh dục khai nguyên phân liên tiếp một số ... bình thờng.a. Xác định số lần nguyên phân của các TB sinh dục khai ban đầu và số hợp tử đợc tạo thành.b. Tính số lợng TB sinh trứng cần thi t cho quá trình thụ tinh. Bài 2: Một vi khuẩn hình ... hỏi môi trờng nội bào cung cấp 39780000 NST đơn mới. 1/ 4số TB con sinh ra trở thành TB sinh tinh, giảm phân cho tinh trùng. 1/100 số tinh trùng tạo thành đợc tham gia vào quá trình thụ tinh....
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Bài giảng ĐỀ VÀ ĐÁP THI HỌC SINH GIỎI MÁY TÍNH CASIO TỈNH NĂM 2010

Bài giảng ĐỀ VÀ ĐÁP THI HỌC SINH GIỎI MÁY TÍNH CASIO TỈNH NĂM 2010

Sinh học

... HO THI CHN HC SINH GII LP 12 THPT GII TON TRấN MY TNH CM TAY NM HC 2010 - 2011Môn: Sinh học Bài 1: ở gà bộ NST lỡng bội 2n = 78 NST. Có 2000 TB sinh dục khai nguyên phân liên tiếp một số ... bình thờng.a. Xác định số lần nguyên phân của các TB sinh dục khai ban đầu và số hợp tử đợc tạo thành.b. Tính số lợng TB sinh trứng cần thi t cho quá trình thụ tinh. Bài 2: Một vi khuẩn hình ... hỏi môi trờng nội bào cung cấp 39780000 NST đơn mới. 1/ 4số TB con sinh ra trở thành TB sinh tinh, giảm phân cho tinh trùng. 1/100 số tinh trùng tạo thành đợc tham gia vào quá trình thụ tinh....
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Bài soạn ĐỀ ĐÁP ÁN  THI HỌC SINH GIỎI TỈNH MÔN ANH VĂN LỚP 9

Bài soạn ĐỀ ĐÁP ÁN THI HỌC SINH GIỎI TỈNH MÔN ANH VĂN LỚP 9

Tư liệu khác

... chính thứckỳ thi học sinh giỏi cấp tỉnh Năm học 2009 - 2010 Môn thi : Tiếng Anh Lớp : 9- THCSNgày thi : 24/ 03/ 2010 Thời gian: 150 phút (Không kể thời gian giao đề) ( Đề thi có 08 câu, ... writing. 5 This is the most romantic story I have ever read. -This is the first time I have read such a romantic story . So romantic a story. 6.Much as I admire his courage, I think he is ... player.6. That tie doesnt go that suit.7. Get .the bus at Third Street and get at Broadway. 8. He looked down his less fortunate neighbors.1 Số báo danhA: ®¸p ¸n : Question 1:(8 points)Part...
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Tài liệu bồi dưỡng ôn thi: tuyển tập chọn 30 đề thi học sinh giỏi Anh lớp 8 bồi dưỡng tham khảo

Tài liệu bồi dưỡng ôn thi: tuyển tập chọn 30 đề thi học sinh giỏi Anh lớp 8 bồi dưỡng tham khảo

Tiếng anh

... GIANGKÌ THI CHỌN HỌC SINH GIỎINĂM HỌC: 2008 – 2009Môn : TIẾNG ANH – LỚP 8Ngày thi: 17 – 3 – 2009Thời gian làm bài: 150 phútĐiểm bài thi Bằng chữ:Họ tên, chữ kí của giám khảo1) 2) Số pháchLưu ... chất lợng học sinh giỏi lớp 8Năm học 2008-2009Môn: Tiếng AnhThời gian làm bài 150 phút(Đề kiểm tra gồm 04 trang, thí sinh làm ngay vào bộ đề kiểm tra này)Điểm của bài thi Bằng số: Họ, tên ... Bằng chữ:Họ tên, chữ kí của giám khảo1) 2) Số pháchLưu ý: Đề thi này gồm 04 trang, học sinh làm bài trực tiếp vào đề Học sinh không được sử dụng bất kỳ loại tài liệu nào, kể cả từ điển.I/...
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