Physics-
General
Easy
Question
Fig shows a double slit experiment, P and Q are the two coherent sources The path lengths PY and QY are n
and (n + 1)
respectively where n is whole number and
is wavelength Taking the central bright fringe as zero, what is formed at Y?
![](data:image/png;base64,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)
- First Bright
- First Dark
- Fourth Bright
- Second Dark
The correct answer is: Fourth Bright
Related Questions to study
chemistry-
Two liquids
and
are made of same atoms, with following properties
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAdUAAACdCAYAAADixeJCAAAgAElEQVR4nOydeXhURfb3v72ksy+dfd9XErKxQwIEEER2cNgEBAUd1FFgREGfUYZx0EH5uTIiKjg6KAooi0a2EAiBACFkISE7CVlIOkt30lm6+3bfPu8fvPdOdxIgzqAs3s/z5EnSfe+tc6tO1ak6dapKREQEAQEBAQEBgf8Z8d0WQEBAQEBA4EFBMKoCAgICAgJ3CMGoCggICAgI3CEEoyogICAgIHCHEIyqgICAgIDAHUIwqgICAgICAncI6d0W4H+hra0NjY2NkMlk8PPzg1QqhUgkuttiCQg8sGg0GlRWVsJoNIKIIJFIIBaLwa3Ms7a2hqOjI5ycnCAWi4X6KPC74740qkQEg8GAH374AZs2bUJISAi+/vprODo6QiKR3G3xBAQeWOrr6/HUU0+huLgYMpkMkZGRkMvlICIolUrY29tj+PDhWLJkCfz8/IT6KPC74750/7Isi4qKCqSmpqKxsREsy0LYw0JA4NfHx8cHr7zyCtzc3BAbG4u33noLu3btwq5du/Duu+/C19cXn3zyCbZv346urq67La6AwG/OfWlUOzo6kJqaCoZh4OzsDIZhBKMqIPAbIJVKYWNjAwDw9vaGp6cnbG1tYWdnh7i4OKxYsQLd3d04d+4cFArFXZZWQOC3575y/xIRiAjl5eUoLS3F1KlT0dnZiaqqKhgMBsGwCgj8yjAMg5qaGrS2tsLLywvOzs5m3zs6OvJ/G43G31o8AYG7zn01UiUiqFQqnDp1CnK5HGPHjoW9vT3UajVYlr3b4gkIPPBotVpUVVXByckJQUFBsLKyAvCfDm9+fj6kUil8fHzg7u5+l6UVEPjtua+Mql6vx6VLl1BSUoJJkybBzc0NAIQRqoDAb0RXVxeuXLkCV1dXBAQE8JG/BoMBSqUSW7duhYuLCxYuXAg7O7u7La6AwG/OfWNUiQhtbW1IT09HaGgoRo0aBan0P97r69evC8ZVQOBXpru7G8XFxXB0dISHhweMRiPa2tpw9uxZPP7442hoaMCbb76JlJQUs/opIPB74b7QeiKCXq9Hfn4+rly5gjfffBMymQwGg4H/vqGhAfHx8XdZUgGBBxMigtFoRGNjI8rLy1FTU4Np06ZBJBLBaDRCo9EgPDwcqamp8Pb2hkwmE9aoCvwuuS9GqkajEUqlEt999x0iIyNBRKisrERVVRU/OhVGqQICvy56vR4VFRWwtLTEE088geLiYly5cgWZmZlYt24damtrsXbtWmEpjcDvmvtipGo0GvHjjz/i/Pnz8PHxQUFBAUQiEfR6Pa5duwYiAsMwd1tMAYEHFq6O5eXlwdXVFQMHDoStrS2ICH5+fnj22WeRm5uL48ePY8+ePXjqqafutsgCAneFe9qoEhFYlkVtbS327NmDdevWYcaMGbxbSa/XY/Pmzdi5c6cwpyog8CtCRNDpdMjJyYFcLkdwcDDE4huOLqPRCLFYDF9fXxgMBhQXF99laQUE7h73vPu3q6sL//znP2Fra4vJkyfDxsYGtra2sLW1hZWVFSwsLCASiaBSqe62qAICDyxEBIVCgerqari4uCA0NNTse61Wi9zcXIhEIvj5+d0lKQUE7j73rFHlAiMuXLiAffv2YcqUKbC1tTULfuCu4QIlhJGqgMCvg9FoRGFhIQwGA/z8/ODq6grgxpaher0eaWlpKC0thbe3N1JSUoQgJYHfLfe0+7epqQlbt26FUqmEr69vr825lUolSktLodVqUVhYeJekFBB48CEiHDt2DJaWloiIiOCjfhsbG3Hy5El8/PHHsLCwwJo1axAVFSUYVYHfLfesUS0pKcHWrVtx8eJFSCQSbN26FYGBgQgPDwcRoaWlBR9++CHOnTsHkUiEgoICbN26FS+88IJwMoaAwB2EZVls3rwZJ06cgE6nw9dff420tDSIxWJYWVnB0dERkyZNwsSJExEVFQUrKyvBqAr8bhHRPeoz7e7uRmtrK7RaLYgIMpkMbm5u/GbeBoMBzc3N6OjoAACIxWI4OjrCxcVFOMdRQOAOwQULtrS0oKOjo9d+vlKpFJaWlrC3t4e9vT1EIpFQ9wR+19yzRpU7BJkTj6usXMSh6Xwq9z1nTIVKLSBw5+DqIVcnTeHqm+mPgMDvmXvWqAoICAgICNxv3LPRvwICAgICAvcbglEVEBAQEBC4QwhGVUBAQEBA4A4hGFUBAQEBAYE7hGBUBQQEBAQE7hCCURUQEBAQELhDCEZVQEBAQEDgDiEYVQEBAQEBgTuEYFQFBAQEBATuEIJRFRAQEBAQuEP0OqWG2+OTZVl+n0+JRAKptO8DbUyvNRqNkEgkEIvFD+ym9tw+qAaDASKRCFKp9IF8T4HfHqPRiNLSUly7dg0GgwFeXl6Ii4vjT10y3e9aKpXy+2AL3DlYloXBYODbsV9jP2OWZdHQ0ICSkhJ0dXXBx8cHUVFRsLGxgUgkMmuDxWLxTdtegf8eo9HIt+FcWd8p+jSq1dXVyMjIgEajgVgsRkxMDJKSkvp8gE6nQ15eHgoKCsCyLCwsLDBhwgT4+/s/sEewKRQKHDx4EM7OzpgzZ45gVAXuCEajEUVFRdi+fTvOnTuHadOm4bPPPoNEIgERQaFQ4Pz58zAYDJgwYQKcnJzutsgPHLW1tcjMzISHhweGDh0KBweHO56GwWBAXV0dduzYgR9//BFTp07F3/72NwQGBkIsFkOv1yMnJwelpaVISEhAXFzcHZfh947RaMQXX3wBOzs7TJo0Cc7OznesHe9lVEUiERiGwblz5/Dtt9/CaDTi0UcfRWRkJJydnc0sOhGhubkZW7ZswbFjx2BjY4NJkyYhJSXlvjU0pqdxEBHEYrFZ54CIcO3aNaxfvx6RkZGYPXv2XZT2wYNlWbAsC4lE8rs7+UQsFmP69OnQaDTIzc01+47Tu61bt4JhGCQmJgpG9RfCed5Ylr3paL+0tBRvv/02EhMTERoayh9ndyexsLDA4MGDsXjxYhQUFPCjUw6DwYCffvoJ33zzDVavXi0Y1f+C2432jUYj1q9fDz8/P8TFxUEul9+xcu415hWJRAgNDcXEiRMBALa2tigrK0NxcbHZWYqc0OXl5Th79iwkEgl8fX2xaNEiBAcH37euKSKCVqvFRx99hO3bt4Nl2V7fS6VSBAcHw9fX9y5J+eCiUCjw3nvv4cCBA9Dr9XdbnN8UrgMXEBAACwuLXpVcJpPBx8cH3t7eD6wX6NdGpVLhs88+w9dff82fxWyKtbU1fH194e7u/qvlMdfIu7i4wMPDo9dABQCcnZ0REBDwq4yUH3S4M4Czs7OxadMmXLlypc9rgoOD4efnd8fd6zd9mlQqhVwux+jRo3H06FGcOXMGCQkJsLOz44XSaDQ4c+YM3N3d+YOKnZyc7luDCvznvQ4cOAAXFxc8+eSTZt+LxWKEh4dj27ZtsLKyuq/f9V6kqakJP/30E5KTkzFp0qQ+jcuDTl/z9GKxGGFhYXj55ZdhNBrh7u5+l6S7fzEajVAqlUhLS4OzszMefvhhODo6ml0zcOBAbNq0CXZ2dnB3d/9VdY+LPTFFJBLB0tISjz76KFJSUuDp6fmrpf8gYzAYcOXKFRw6dAhDhw5FbGys2fdSqRQff/wxZDIZfH1972g539SocoUbEhICe3t7FBQUoKGhAWFhYQBuKGhXVxeOHz+OpKQknD9/vpdg3GjW9H9TTJWKc7eaHkxu+rnpIeU9r+HcJ6af9XTbmsrDPc/0AHRODqPRiJqaGpSUlGDIkCHQ6/V8I8fdY2Njg7i4uD7f92bvwE2Ic+mZYnrY+s3eqWcF5O4xletmLuu+Dpc2fW/T+7mRec9y6Xk99w6mZXyz8jV1u3Hy9cwv7tqSkhIoFAro9Xro9XpYWFiYyWj6zn0F8HAy3g+Bcj31EfiP+7unPhARrK2t+frXVx6aXss907S8errETMvQVM966hMAPr/7Knfuf+53X9cCvfWwZx3uKU9fnwEwmxrgMK1DpnXb9D2NRiOqqqpQV1cHOzs76PV6PliFu8/e3h5RUVFmgUqm6Zumwf19O33recC7aVn0LDsOb29veHl59RrF9my/eraNv7Qum5YNh2ngzq30q6+y6Osw+77k7PnsvmTsK19v1YZzP0ajETqdDtnZ2dDpdH2WMwC+De+vrvbV/vUJ9QHDMHTgwAEKCwuj999/n5588kkaOHAgHT161OyanTt3UkJCAn333Xc0ePBgmjBhAmVnZxMRkdFoJL1eT21tbbRnzx5auXIlDR48mAIDA2n48OG0a9cuUqvV/PMMBgO1trbS3r17aebMmRQeHk5BQUHk4+NDnp6e5OfnRzExMfTXv/6V/vnPf9LAgQMpMDCQPvjgA6qoqKCtW7fSgAEDKCQkhJ555hmqrKwko9HIP59lWdLpdHT8+HFatGgRhYSE0MCBA2n58uV05swZ6urqIr1eT4cOHaIhQ4aQra0tOTg4kI+PDwUFBVFYWBilpaXRp59+SpGRkRQYGEgvvvgiGQwGs3fQarW0d+9emjFjBgUHB1NgYCBFR0fTa6+9RhUVFcSyrFleGwwGOnr0KA0ePJgCAgLohRdeoMuXL9PWrVtp+PDh5OfnR1OnTqX09HTS6/XEsiyVlpbSE088QUFBQRQUFET19fVUVlZGy5cvJ09PT5oyZQqdP3+e9Ho96fV6unDhAj377LMUHx9PoaGhlJycTJs3b6aKigpiGIYvq4ULF5Kvry/FxcXRvn376OLFi/T0009TZGQkxcfH01//+ldSqVRm78wwDFVUVNA777xDQ4YMoeDgYEpOTqaPPvqIGhsbiWVZYlmWdu/eTYmJieTj40MbNmwgpVJJ3333HSUmJpKHhwetWLGCvv/+exo5ciRZWVmRs7Mz+fn5UWBgIA0ZMoTWrl1LAQEB5OHhQb6+vpSSkkJXr14llmUpPT2dgoODeT1ZvHgxFRYW9qXa9xQajYays7PppZdeouHDh1NISAiNGTOG5s2bR46OjrRgwQLq7u4mo9FIhw8fpqFDh1JAQACtWrWKGhsbyWg0ksFgoI6ODjpz5gy98cYbNG7cOAoKCqLIyEh66aWX+PJiWZZycnIoOTmZvLy8aPny5VRWVkZ79uyhsWPHkq+vL02fPp3OnTtHnZ2dlJmZSYsXL6bQ0FAaPHgw7d27l9cVohvlfv36dfrpp5/o+eefp5iYGAoKCqK4uDj65z//SQzD8LrO1b29e/fS9OnT+Xrh7e1N3t7e5OvrS8HBwbRt2zb64IMP+Pq1evVqun79Om3fvp1GjRpFYWFh9PTTT1NtbS0ZDAZeFqPRSC0tLfTvf/+bpk6dShERERQTE0Nr1qyh8vJy0ul01NXVRampqTRx4kSyt7cnOzs78vHxoeDgYBowYADt3LmT9uzZQ4MGDSIPDw964403SKVSkdFo5PO5paWFdu7cSVOnTqWQkBDy9/enkSNH0ptvvkkdHR296jYnm8FgoIqKCnrllVcoOTmZQkJCKDExkWbNmkWhoaG0YMECKi8vJ4PBQHq9nqZNm0aBgYGUnJzMt7ksy/J17YsvvqCFCxdScHAwBQcH04wZM+j48eOk0+n4uvzYY4+Rn58fxcfH0/fff0/5+fn03HPPUUREBMXFxdG//vUvam9vJ5VKRW+88QYlJiZSREQEvfjii3T16lU+b1mWpa6uLrp06RK98847NHHiRAoODqaIiAj64x//SHV1dcSyLBmNRv7akydP0pIlSygmJoaCg4PJ19eXvLy8yNfXl4KCgmjZsmWUnZ1Nc+fOpYCAAHrooYeopKSEzpw5Q/PmzaPAwEAaO3Ys/fDDD73KmWEYys/Pp2eeeYYGDhxIERERNHPmTDp48CC1tbWRXq+n6upqWrNmDbm4uJC1tTW5ublRUFAQhYSE0Nq1a+nbb7+l4cOHk7e3N40bN86sPeN09eTJk/Tss8/yuhoREUFPPfUUZWVlkV6vv2W9vqVRDQ8Pp127dtGWLVvI0tKStmzZQt3d3cSyLGk0Gpo2bRq99NJLlJmZSUOHDu1lVCsqKig+Pp4GDBhAe/fupaamJtq/fz+NGDGC3N3dKS8vj8+w9vZ2+uijjygkJIRWr15N5eXllJ2dTSNGjCArKyt66qmn6MSJE1RWVkbt7e30zjvvkLe3N61bt47mz59PL774Ir355psUGxtL9vb29Mwzz1BnZydfKTQaDe3atYt8fHxo06ZNVF9fTzk5OfToo49SXFwcpaenk0ajocuXL9P+/fvJ1taWRowYQYcPH6YTJ05QRkYGKRQK6ujooG+++Ybs7e3p6aefNstghUJBzz77LAUGBtKHH35ISqWSjh49SgkJCTRu3Dg6e/asWQFy+dTZ2UlfffUVOTg40MyZM2nJkiW0evVqevvtt2nevHnk4OBAUVFRdPr0ab6xqqqqopSUFHJwcKCsrCwaN24c+fj4kIODA40ZM4bvKBw+fJiio6Np/PjxVFRURA0NDfThhx9SYGAg/eEPf6DCwkJiWZb0ej11dHTQsGHDyNfXl1avXk0LFiygv/3tb/Tqq69STEwMOTo60qpVq0ij0fDGsrCwkObOnUszZ86k06dPU2trK+3cuZNcXV3pscceI41GQ3q9nhiGoR07dlBQUBC98MIL9Pnnn5Ovry+5u7uTtbU1LV26lEpKSmjz5s0UGBhI8+fPp9TUVEpLS6PTp09TcXExvfPOO+Tg4MCXl1ar5Svy7t27SSaT0cMPP0y5ubnEMMwtFf9uwjUOmZmZlJCQQFOmTKGsrCxqa2ujY8eOUVRUFNnY2JgZVY1GQ/v27aPExERatmwZ1dfXk9FopK6uLlq/fj35+fnR2rVrqb6+nvLy8mj+/Pnk5uZGb7/9Nq8zDMPQ8ePHadCgQTR79mx6+eWXacmSJbR582ZKTk4me3t7Gjt2LH3xxRe0bt06+vvf/07z5s0jV1dX8vb2puLiYt5w5Obm0rRp0ygmJoa+++47am5upvT0dBo4cCCFhYXRjz/+yNcNjUZDH3zwAQUHB9Nzzz1HVVVVlJ2dTbNmzSJHR0datGgRpaamUkVFBbW1tdE333xDdnZ2NGfOHHrrrbfo8ccfpw0bNvCd3bVr1/JGjGVZam5upr///e+UkJBAn332GSkUCsrMzKTY2FiKjo6mK1eukFarpbKyMtq6dSvFxcXR5MmTae/evZSenk4ZGRlUWVlJGo2GvvrqK3J2dqb169dTa2srbxSbm5tpyZIlFB8fTzt27KBr167Rp59+SlFRUTR58mRSqVR9GlW9Xk+FhYWUlJREERERdOrUKVIqlZSVlUWzZ88mCwuLXka1qamJFi1aRNHR0XTw4EEiutH53rdvH0VFRdGQIUOouLiYGhoa6KOPPqKwsDCaPn065efn80a1s7OTli1bRv7+/vTaa6/RypUrae3atbRkyRLy9vYmR0dHOnToEK1du5ZeffVVWrduHQ0cOJAcHBzonXfeoY6ODv5Zb7zxBvn4+NCKFSuoqqqKSkpK6KmnniJXV1fasGEDdXV18Tp68OBBiouLo7lz51JOTg6Vl5fTvHnzyMbGhkaNGkVHjhyhgoIC6uzspIsXL9JDDz1E8fHx9N5779HEiRNpy5YttHTpUrKzs6PRo0fT6dOnecPKMAxlZWVRSEgILVmyhCoqKqi8vJxWrVpFISEhtGPHDlKr1dTc3EzHjh2jhQsXUmBgIG3atIlOnDhBJ0+epIKCAmpra6OioiKSyWSUkJBg1oZ3d3fT+++/T2FhYfT8889TdXU1Xbx4kebMmUPR0dH0zTff/G9GNSIigvbs2UNHjhyhQYMG0cKFC6msrIx0Oh3l5eVRQEAAnTx5ks6cOUPDhg0zM6osy1J2djZFRUXRCy+8QAzD8COnF198kRwcHOjLL7/ke1elpaUUGxtLjzzyCF2+fJl0Oh3pdDo6dOgQubm50ZAhQ0itVpNeryeNRkP/+te/KCwsjCIjI+nIkSOk1WpJp9NRRkYGOTg40PTp06miosKsl+7j40OTJ0+mzs5OYhiGNBoNffHFFxQZGUnPP/88NTY2EsMwVFtbS3K5nKZNm8anyT2HYRg+DVOjyrIs7dixg0JCQuivf/0rdXR0EMMwpFar6ZtvvqEVK1ZQXl5enxVPp9PRqVOn+N7+J598Qu3t7cQwDHV1ddHcuXNJLpfT0qVLSa1Wk9FopI6ODpo2bRrZ2dnRzJkz6fvvv6empiZ69913afny5ZSXl0dFRUU0duxYGjBgAF9uer2eWltbacOGDeTg4EBbtmyhzs5OvqP05z//meRyOc2aNYtycnJIr9eTVqulH3/8kYKCgsjGxoby8vKIYRhSKpW0YcMG8vf3p7179/Ll293dTePHj6fw8HD6+eef+RHOgQMHaMCAATRy5EiaP38+VVZWUl5eHs2aNYveeOMNYlmWDhw4QNHR0bR27VpSqVS8zAaDgXJzc2nKlCkUHh7OlzlX8bOysigwMJA+/vhjs97tvYjBYKCmpiaaM2cOJSYm0tGjR8lgMJDBYCCdTkcffPABubi40MKFC3mjyundmDFjeKPKsiy1tbXRY489RrNmzaLCwkLeW3L48GEKCwujhx9+mLRaLRHdMOYXLlyg8ePHk7e3N23evJlaWlpIq9Xy9c/BwYEWLVpEZWVlxDAMtba20rhx48jW1pY+//xzvizT0tJo9OjR9MYbb1BzczNf7u+//z7vjeDSzc3NpaSkJIqPj6eGhgbS6XSk0WgoLS2NwsPDaebMmXT58mUyGAzEMAydOnWKrK2tKSIignbt2sXrwA8//EAxMTGUnJxMzc3N/LseOnSIwsPD6eWXX+Zl0Wg09O6775JcLqeXX36Z79hlZGTQ6NGjaenSpVRTU8PrFle/Dx48SCEhIfTKK6/wRlWn09GHH35Ifn5+tHnzZtJoNGQwGKi7u5vWrVtHzz33HKnV6j7rtkqloqVLl5KPjw8dPXqUtFotbzy///57CggIoIULF/JGlWVZam9vp5deeoliYmJ4o8owDG3ZsoUGDRpEP/74I+l0OmIYhqqqqmjFihUUHh5OP/74I1/OWq2W/vKXv5CTkxNNmTKFr8vNzc20YsUKksvlFBQUREeOHCGGYai7u5u2bdtGjo6OtGzZMqqurubbu8cee4xSUlIoPz+fb8fT0tJo0KBBNGnSJGptbSWDwUB1dXW0aNEiGjp0KP3000+k0WiIYRgqLy/nR6uFhYV8O1FVVUUzZ84ke3t7WrVqFanVamIYhmpqamjp0qUUGhpKn3/+Oel0Or7zNGzYMAoLC6PKykpiGIZvO5OTk2n8+PFUWVlJBoOBz8Po6Gjav39/r3Lu6uoiKyurXkb15MmTNHjwYJozZw61trYSwzCk1WopMzOTFi5cSKmpqb0GRj25bdiTSCRCUFAQ4uLicPbsWVRUVMDDwwPff/89oqKiEB8f32d0lUgkgo+PDzZu3IgBAwaY+cPd3NxgbW2Njo4O3pff3d2NkpISfg5XKpWCiPjorKamJrP5Mu5n1KhRiImJgUwmAwB4eHggLCwMKpUKCoUCgYGBICIcOnQIXV1dmDBhAj+vxLIs/P394erqitzcXHR2dsLFxcUsnZ4bX9D/9//39PO3tbUhLS0NDQ0NGDVqFKysrCCRSGBra4vZs2djzpw5N513EYlEkMlksLW1RWRkJEaPHs2H8hMRlixZgsOHD6O6uhoNDQ0IDw/nnyUWi5GSkoLJkydDKpVi5cqV/DzBZ599hqqqKkycOBFubm6QSCSQSCSQy+WIioqCtbU1srOzMWPGDH6NnK2tLRwcHDBp0iQMGDCAX3aQlJQEX19fNDY2Ijs7GxEREaitrUVWVhZCQkLg7e3Nz+EYDAaMHDkSn332GfLy8vglVtxPR0cH/va3v8HPzw8ikQi7du0ym8MyzXfTZQ8BAQFITEzExYsXUVRUhGHDhsHCwgIMwyAnJwcREREYO3bsPR8ZS0SoqqpCeno6hg8fjpiYGDOZQ0JCegUrmc7nmH5maWmJJ554AmKxGCEhIfxckKurK8RiMVpbW/ucd/L390dycjIcHBwgFovh5uaGmJgYqFQqjBw5EiEhIRCJRHBwcEBiYiJycnLQ1dXFPys8PBxr1qxBVFQUHB0d+TlNHx8f6PV6tLe383W7rq4OarUanp6ekEql/ByWo6MjfH190d3dDZ1Ox+cB957u7u545JFHeB0ICQmBk5MTioqKoNfrQURQq9U4ffo0RCIRwsLCYGlpCYPBAJZlkZCQAI1Gg8zMTLM5Me75fW1q01ecBMMw2LZtG2xsbJCUlMS/g0wmw8aNG81k7klhYSGKiorg4+PDb+TBvaerqyu8vLz6DErr+TyxWIwJEyYgODgYycnJAG7M+1laWsLJyQkdHR3QarVm5SwWi2FtbY3BgwcjKioKUqkU9vb2iImJQWpqKgYNGoTk5GS+ngUFBcHPzw86nQ4Gg4Fv65YtWwa9Xo/IyEg+XblcDktLS7S1tcFgMAAANBoNysvLYWVlBQcHB77cPDw84OLigqamJqjVar4+c+9oYWGBP/zhD7C2toZEIoGdnR0iIiKwf/9+1NXV8TqdmZmJqqoqjBkzBs7OzryM3t7ecHZ2Rnp6Oh/R3dNO9CznngFinG06evQoKisrsWzZMl4eiUSCoUOHYujQof1a4tevWGIvLy8MGzYMp06dQk5ODjw8PHDo0CG8/PLLkMlkNzUUnp6emDVrFlQqFYqKiqBQKNDa2opLly5Bp9PxO8fIZDKIxWLY2dnBYDCYLaXQ6XQAACcnp17pSCQShIWFwdra2mwSuq/ghgsXLkCj0aCmpgbffPMNxGIxH5TU0tIChmH4tH4pRqMR9fX1aG5uhqurK994cPJYWFjwf98KLlDC9H3EYjHi4+MhkUig1WrR3t5udr1UKkVKSgrfQJgGQ1VXV0OpVCIoKMisnEQiEVxcXODl5YXa2lqoVCoEBASYydHvqs4AACAASURBVOvi4mLWyNna2iIqKgp5eXm4fv06DAYDmpqaUFpaCnd3d5w8eRJFRUUAbgTblJSUQKvVor6+3iwIQiQSYdSoUXBzc+ONZ3+NoJ2dHYYPH46ff/4ZmZmZmDNnDuzs7NDc3IwTJ05g/PjxCAoK6tez7iZGoxE5OTmQSCTw9/fvtd60vxH0IpEIVlZWGDt2LLRaLWpqatDY2IjGxkaUlpaivb0dNTU1fd4bEhLCG15Oj/z8/HhDx6XPGaueUdg+Pj7w8fGBUqlEcXExFAoFGhoacPHiRXR3d6OyspKve1zj1N3dbRb8wbIsdDodbG1t+U4xl6aFhQWioqJgZ2dnJkvPgJKuri4UFhaCZVlcuXIFX3/9Nb9ZRm1tLQwGA9RqNdrb23tF+vYHIsL169dRWVmJ0NBQBAUF8fraM5ipLyoqKtDa2ork5ORebaW1tTXs7Oz6FVAnkUgwcOBAREdHo6GhAaWlpVAoFKipqUFhYSEaGhrQ2tra6z5bW1vExMTw7ZFYLIa3tzesra0xYMAAsyAdZ2dneHp6mgUwSSQSjBs3DgzD8PqlUChQUlKClpYWKBQKMwNsa2sLrVZr1oZrNBoAN8rP1tbWTD6RSITg4GC4urqatZmmgUsceXl50Gq1MBgM2L17N18OarUadXV16O7uRmtr600DM2+HWq1GVVUVOjo6EBISwpeXaVBXf8qqX0aVK1B/f38cO3YMBoMBFhYWSElJuWnlJ7qxlV9mZiaOHTsGS0tLODg4gGVZdHR09HppZ2dnTJo0CVeuXEFGRgbs7e3BsiwOHToEg8GA+fPn97nUoD89BwBobGwE0Y3lMs3NzXwmWVtbY8GCBSAiyOXyPt+jP3R0dECj0cDNzY03oqYy9oee0Wk90ev16O7u7nWP6W4gpveqVCpotVregJni4OAAZ2dndHV19VqLezMZuM9UKhWfl21tbXBxcYFKpeKvIyLExMRg4MCBCA0N7dVLdHR0NGuM+hodmP7m4PQwLCwMp0+fRn19Pdzd3XH27Fk0NjZi9uzZ982WbgqFAlKpFG5ubn1+3x+d4erY1atXcfjwYSgUCri4uAC4UUa3alxuVo9ulm7Pzzs6OpCTk4PMzEwAgI2NDb9kpaeuhYeHIyYmBmfOnMGxY8cwceJEGI1GnD59Gq2trXjooYfg5eXV7zww7Szr9Xq0tLSAiNDV1YXm5ma+sZXJZHj11Vfh7OzcK5q6vxDd2OAGuLEMw9nZuV8ycqhUKmg0Gri7u/9PEeksy0KlUiE9PR1ZWVl8ZHB3d3evNqEnfZV1f2Tn0q2pqcHhw4dx7do1vrPd2trKR9RyZeHk5ISxY8di165dyMjIQHBwMBwcHPDzzz9DoVBg7Nix8Pf37xW1219ZFAoFr/PNzc18XSciTJ8+HVOnTu21M9IvMa6dnZ18B4BrM3t6hvpDv43qgAEDEB4ejj179qClpQWzZ8/u0whxGI1G5Ofn4/XXX4dcLseqVasQEREBFxcXiMViXLp0yex6FxcXLF68GP/4xz/w6aefIiMjAzKZDNevX8fy5cuxePHim46K+4OlpSXEYjH+8Ic/8C7CnpkvEonMQq9ZlgXDMHzv6lYFZGVlBZlMhpqaml9t0wJuLXB/sbGxgYWFBRobG3s1KhqNBp2dnZDL5bC2tu51760aYw8PD773JpPJMGDAAPzxj39EcHDwbWW6XePN0ZfXQCwWw8vLCwkJCUhPT8fp06cRFRWFr776CqNHj0ZgYOA97/rlsLS0hE6nQ319fZ/f96cxICJ0d3fj7bffRlFREVasWIHk5GR4eHjg2rVrSE1NhVqtvtOiA7gxati4cSN8fX3x2GOPYcCAAXB3d8eRI0fw008/mZWvp6cnFi1ahNzcXGzbtg1paWmQSqVoaWnBnDlzsGDBglu2JbdCLBbDwsICHh4emD9/Pu+e5TAdXXBuSgBgGOa2hpYrA25tvsFggEql+kVrhLklYaZuzP8GlmWxZ88ebNu2DVOmTMG4cePg6+sLqVSK7u5unDp16r96bn/Sfeutt3DhwgU8/fTTGD16NPz8/FBdXY2LFy+adabt7e0xZcoUXLp0CXv27EFFRQVsbGygUCjw6KOPYvny5WbTWr8UzqOZnJyM559/vpc94MqaW1oH3LBD/WmPiQiWlpb8gKilpQVGo/G/6gj1y6hycytDhgzBkSNHoFQq8eijj940c+j/r5H69ttvUVJSgv/7v//DqFGj+Aavvb0dOp3O7F6tVovq6mrExsZiwoQJvJ/f0dERQUFBfA/8vyU6OhqFhYXIyclBUlKS2RpHbl7A1MVMROjs7ERLSwvkcvktlUAkEsHNzQ0ODg5oamri5z25eWGNRoPu7m7Y29vD0tLytj1w07RMe8r29vbw8PDo9ztzrsWamhowDANLS0v+mSqVCk1NTRg4cCDvbjRdb2oqB/c3p2jcuzk7O8Pf3x/Xrl1DU1MTgoKCeJ3Q6/VQKpW8O7unO+dWRptzXXPzZqbXS6VSjBw5Env27MHBgwcRERGB6upqvPnmm/91h+u3hotT4EYBzc3N8Pf35/O5pKQEDMPctuExGo0oLCzE8ePHkZKSgunTp0Mul4NlWbO5rjsJVy+ysrJQVlaGxYsXY8yYMZDJZDAYDGhtbTU7jAP4j4vWdAtTiUQCR0dHBAQE8KO4/wYrKyuEhobizJkzqKysxIgRI3ijajQawTAMmpub+d3PuEa3rq6uVxt0M++Mv78/7OzsoNPpUFlZCRcXF0ilUn4eWaFQwN3dvU9PmqenJ+zt7ZGbmwutVgs7Ozu+nDn37c2MtKls169fR2pqKogIjz/+OB8D0dTU1OfOUDd7zi+B2zFv//79GDJkCObOnQsHBwdIJBJ0dnZCq9WaPVun0+Hq1avw9PTE3Llz4ejoyNsOf3//Xutuf6lskZGRkEqlOHv2LJ555hmzKQm9Xg+FQmHmKSQidHR0QKFQmKXVl2dMJBLBycmJd0OXl5cjKSkJVlZWfF50dnaCZdnbTs/0+Q1X6JzScIkOHToUAQEBSE5O5ofx3PWmC5m5/xsaGvhgAu6zsrIyXLp0iZ9f4RpyhUKB7du3QyaTYcyYMZgwYQLGjh2LhIQE3qiZNvpcehqNhq/EPQ2BqewpKSmwsrLCv//9b1RVVfGbC7S1teHrr7/G3r170dnZyVd4Nzc3qNVqfl5GoVCgs7OTzxOj0Wjmxvb09ERISAgsLCywe/dudHZ2Qq/XQ6fTITc3F59++inq6+tvqUREhKamJiiVSj6QimVZnDhxAnZ2dhg7dizvfjLNZy5/ezJixAj4+/vjzJkzaG5u5k/gaGtrw+XLl6HRaDBixAh4enqaKZpWq0VFRQWfPudi5CrM6NGjIZVK4eXlhdjYWOTn5yMzMxNqtZrP16tXr+If//gH8vPzzcqGc9PdrNfu4OAAS0tLXL16FS0tLTAYDNBoNGhoaOCviY6ORlRUFEpLS7FhwwaMGTMGoaGh95VRHTZsGNzd3VFTU4NTp05Br9eDZVnU19cjNTWVH0mZ1ivuf07nOXdrR0cH2tra+Ou6u7tx8OBBKJVKADB7BvCfXcNMOy2met2zvEzT5gyVWq2GUqnkXY9EhPb2dnz55Ze96mJxcTEOHjwIuVyOUaNGYfz48UhJSUFiYiJcXV37bDtM69etfuzt7TF48GAolUqkp6eb1W2VSoWPPvoI+/bt4/Pdzs4OVlZWfGeGu7a2ttZMJ7m5O5FIBBsbG4wbNw5tbW3Yt28f1Go1H/tx4MABfP3112AYps+yjo2NhZeXFxQKBVJTU/mNCFpaWpCVlcV7kUzT5v43GAy84e/q6kJHRweam5v56wwGA0pKSpCRkcGXQc+8ZFnWbC7b9JrblTU34ODc6qa6k5aWhtraWrP7lEoldu/eDbVajaSkJIwfPx7jx4/HkCFD4OHh0StN7u/u7m5+XrYvWTjZR44cCUtLS+Tk5CA9PZ0vu66uLvz888/Yvn07lEol70VzdnZGZ2cnqqur0dnZCYPBgOvXr0Or1fK2hGVZPgBPJpMhLi4OHh4e2L17NxobG83as88//xyFhYW37Qj0GqlyGapWq/nGjAsmioiIwJ49e/goMpFIBJZloVar0dTUxFcEbseWKVOm4ODBg/i///s/NDQ0QCwWQ6VSISoqCuXl5bzh4RSooaEBO3bswLffftsr8m3GjBl44YUXEBgYCJZl0dLSApVKhZKSEnR2dsLR0RFENyL1uJ4b13hLpVJMmzYN2dnZ2LlzJx599FHMmjULNjY2yM3NhYWFBdauXcu/k42NDR555BF8+umn2LhxIyZOnIj8/HzMnDkTkyZNwvXr18EwDK5cuYK2tjbI5XJIpVIsXLgQ586dw/79+1FTU4PJkydDoVAgMzMT8+bNQ0BAwC0bfqPRiHPnzmHXrl1wdHSEi4sLDh48iHfffRejRo3C448/DplMxo8a1Wo1GIZBbm4uH0Bh2oOKjY3FvHnz8MEHH+C5557Du+++C2dnZ+zfvx9ff/015s6di4kTJ/YKQlGr1fjhhx8QGRmJpKQkNDY24o033oBarcb7778PR0dHfq/nBQsW4MqVK3jnnXeQl5eHuLg4qFQqHD9+HLNmzUJiYiKvvEqlEl1dXbhw4QK6u7t7BS0AN3qjgYGBSEtLw8qVK/HII4+gpKQEgwYNwooVK/iI6kmTJuHUqVOoqKjAF198wY/C7we4iMhnnnkGr732Gt5++20UFBTA0dERJSUlGD16NE6dOoXq6mqoVCpYWlqCZVm0traivb0dra2tUKvVcHd3x6BBg+Dp6YmzZ89i1apVSExMxOXLl5GUlAQXFxfU1tZCqVTyo0HOAHMBJ5zLXqfToaysDEqlEpWVlfwol2VZ5OfnQ6fTobCwEAaDAY6OjoiOjoaDgwM++ugj1NXVQS6XIy0tDX/605/wxBNPQKvVoqOjAzY2NtBqteju7sb777+Pjz/+2Mz9b29vj5SUFKxcuRKRkZHQ6/W96peTkxMf6MRFpiqVSri5ufF1taCgAHv37kVdXR3Gjh0LS0tLpKenw97eHu+99x6f70FBQQgODsa5c+fw0ksvYcaMGSgqKkJISAhefPFFqNVqtLW14erVq2huboazszMkEgnWr1+PrKws7N69G7W1tRg8eDCKi4tRXl6O119//ab6FxAQgAULFuDq1atYt24dSkpK4OrqiqqqKtjb2yM+Ph719fVQKpUIDAwEcMM1XV9fj5aWFpSWlsJgMCAgIADh4eG4fPkylixZggULFkCpVKK5uRkTJ07E5cuX+TlBmUzGd9Da29uRl5eHOXPm8N6EyspKdHZ24uLFizAYDHyb0djYiJqaGuh0Oj54MT4+Hv7+/qioqMDy5csxcuRIlJeXIzg4GKGhocjPz+fLgrMFFy9exMmTJ3vFTQwaNAjr169HYmIiP0fc0dGByspKNDY2Ijg4GFKpFAaDgTeC3DtZWloiPDwcmzZtwqpVq/DCCy9g4sSJCA4ORklJCerq6vD888/z0wiWlpYYOnQopFIp9u3bh+7ublhaWqK7uxtr167lOyvcqpPExETIZDJMnz4dx44dw8mTJ7Fw4UJMnToVRITjx49j+PDhiIyMvK1XRbJhw4YNph8QEY4cOYK//OUv6O7uRnFxMaytrTFo0CC+QePceUSEc+fO4c9//jNUKhVUKhVqamqQmJgId3d3REREQCKRICcnB0VFRfD19cWTTz4JuVyOCxcu4OLFi2BZFqNHj4ZMJoOVlRXfA2EYho/I1Wg0uHTpEsrLy/Hoo48iLS0N7777Ljo6OnD16lXIZDKMGDECOp0Oy5Yt4yO4FAoFBgwYAC8vLz5K1snJCRUVFTh+/DjKy8sxdOhQrFmzBpGRkfw8K2cw6uvrcfHiRbS1tWHhwoWYNGkSsrOzsXbtWt5X39DQgOHDh8PW1hYuLi5ITk6GwWDAiRMncPbsWbAsi5UrV2LhwoU3nRPmRvU///wzbGxsoNfrsXXrVrz33nsoKSnBokWLsH79en7z7ZaWFmzatAlnzpyBVCrFhQsXEBoairCwMLPnSyQSDBo0COHh4cjJycGWLVvwxRdfoLm5GU888QRWrFhhtnE4y7I4ffo08vLyEBkZiZMnT2Lz5s3Yu3cvgoKC8Je//AWjR4/m54nEYjF8fX0RGxvLz+tkZGSAYRisXr0aixcv5t0np06dwnvvvccvrzh37hwee+yxXgoqk8kQFBSEyspK5OfnQ6FQYNasWViyZInZtodyuRw//PADRowYgeXLl99XewRzOhYeHg43Nzfk5+cjOzsbbm5uePbZZ+Hm5obDhw+jtbUVRUVFGDFiBCoqKrBlyxa+M1pZWYlp06bxy7BKSkqQl5cHnU6Hxx57DJMmTcLBgwfR2dmJ8+fPY+TIkejo6MC7776Lixcv8t6IlJQUODo64vXXX8fhw4f5KE9PT0+Eh4fjgw8+wHfffQeWZflo8oceegju7u5wcHBAYWEhLl26BLlcjldeeQURERH48ssv0dbWBrVajYSEBPj5+aGlpQX5+fl8R5qr321tbcjJyYHBYEB8fDxycnKwceNGaLVaMAyDhoYGDBs2DPX19diyZQvy8vJgYWGB06dPY/To0XBzc4OTkxNiYmLg6OiIvLw8nDhxAjU1NZg+fTpeeeUVvt6IRDeWrnl7e6OxsREFBQWorq7GI488gj/+8Y/Iy8vD+vXr0d7ejsbGRhgMBgwZMgS2trZwdnbGxIkTUVdXh6ysLL68Xn31VQwfPvymdVssFiM2NhZyuRxXr17l68eKFSv49718+TIuXryI8ePHw8nJCa+//joOHTrEn7vq6emJqKgoREdHo62tDdnZ2SgpKUFCQgKee+45tLe34/Tp06iqqoKXlxeCg4Oxfft27Ny5EyKRCA0NDfzSmgMHDmD79u1oa2tDQ0MDqqurMWXKFFy5cgUbNmxAVVUV2traUFJSgpSUFMjlciQkJODq1avIyclBe3s7Zs6ciRkzZiArKwsNDQ3IyMhAcnIyvLy8YGtri8zMTHR0dJiVs1arRWlpKbKysjBt2jQolUps27YNZ86cAQBcunQJycnJcHR0xO7du7Ft2zYAQE1NDezt7TFgwABYW1vzXqqWlhYcOXIEBQUF8Pf3x6pVq/iRLNdOODg4wM7ODnl5eSgrK0NgYCD+9Kc/gWEYLF26lB8h19XVITY2Fu7u7rC2tsb48eNhYWGBCxcuICMjAw0NDZg/fz5WrlwJV1fX26/ioD7Gsj3dvj33nb3ZtUTUa99IzjVrGqDCXWs6mXzq1Cm8/vrrmD59OlauXMk3xkSEvLw8TJkyBZ6envj2228RGRlp5s4wTZNbg2oaCs01xJw8fSl+z30+uedwjWDPfTW5yXDTvS/7cpmb3n+zPOTOT1y9ejUiIiLw+uuvw8/Pz7ygRObrFDn3H9F/9s292XyFaRn0fG/TUQPDMNi0aRP+/e9/4+9//ztmzJhhFvRhWoamZdfT1d7XO3N5z+Wbad71lLkv/TNN12AwoKCgAM888ww2btyIlJSUXhHX9wOmOgbATI8AmJVtT9cZp/Omen2zsjHV0Z71g+tQmeY5t9SJk8FUf7jv+pLdFO45AHD48GG89tprWL58ORYtWsR3gAwGA9LT07Fx40ZIJBK8//77iI+P5+f3e+pIX7L3rHem9NQdjp57K5vmG5eGaZ36X+q2aR001X3TtoR7zq3Koq+6zKXNyWy6xKdnuXHfmbrxe+ZvX/XTNE3TdHu+n0gkQmlpKdatWwd/f38+6pqTpba2FgsWLIBKpcLmzZsxffp0Xh5TPTeVnaOnrvc1dWRaBj31pWc5m+qB6fNNy6Rnm3m7cjalz0Cl/t58u2s5QW4FN0f05Zdfwmg0IiUlxewMQ6PRiIEDByImJgZqtRo2Nja3TPNm6x5NlfB2cAr1SyNJ/9v7gP8o580WK/ekP+lwefhLlplwcnDPv929XH72R5b+yNFXHnLTEZybqbOzE//617+QkJCAIUOG/NdBLnebX1LPbqa7XBn3lf83++yXfH6zdPsjOzfP9s0330Cj0WDMmDH8mlXgRmRsZGQkwsLCoFAoIJPJbqnXt5Lxl9S7W117s7r3v7QJwC+rg32lwz3nZmXR1yYWv7Tcbibj7WQnIuh0OqSmpqK8vByLFi0y8w4YjUb4+vpi/Pjx2L9/P7/2+Jfq3C9pw4Hb6+j/aiduxj2xqI/oRjizWq1GeXk5wsPDYW9vD4lEAqVSicuXL6O5uRmTJk1CQEDAfduI3gqdTscH+vQ1mv4t4OZqjUYjvzvLvQA3r7d9+3akpKSgvr4eBQUFeOWVV2Bvb/9A6sODhLW1NTQaDcrKyuDu7g4XFxcYjUaoVCpcvnwZSqUSY8eOveNHcAn8tkilUjAMg6qqKjQ1NcHFxQUWFhZQq9W4evUqCgoKkJiYiLi4uAe6zt51oyoS3dgVZsmSJdBqtUhPT0dtbS2srKwglUr5nZdmz56NJ5988oGrdEQ3QuvPnj0LhUKBq1evIisrCy4uLnBwcPjN3tdoNOLSpUvIysqCVqtFRkYGBg4ciLi4uN8k/VshEomg0+mQmZmJvLw8eHt7Y968eRg8eHCfLmSBewdnZ2fMnj0bDMPgyJEjyM/P56P5NRoNlEolRowYgblz5/ZauC9w/2BhYYFJkyahrKwMxcXF+OSTT2BnZ8evx25vb0dQUBCWL19+0w1PHhT6nFO9GzAMg+rqapSXl+P69evo6uoCcGN/zMDAQD4Q4UGrdFyQ0tmzZ9HQ0ACRSITw8HAMGzbsN3tfbp4iJycH58+fh9FohI2NDYYNG9brcN+7AcuyqK2txZEjR2A0GhEWFobBgwc/kPrwIKLT6VBXV8dHaWo0Gj6QJDQ0FFFRUYJBfQAwGAz8Fpk1NTX8Uj9unSoXNPqgl/M9Y1RNAwFM16OaBgw8qC4Dbj0oN0nObUTdc2L914TLf9MNA/ozp/pb0FM3TAMLHvQK+iBgGvxhGuhjGvgE9H8bOIF7E9NAIm4Ki2vDewZ1PsjcM0ZVQEBAQEDgfufBHPoJCAgICAjcBQSjKiAgICAgcIcQjKqAgICAgMAdQjCqAgICAgICdwjBqAoICAgICNwhHnijajQaUVFRga+++oo/uk1AQEBAQODX4IE3qizLoqCgAG+99Rba29sFo4r/rCf7pff82mkI/D4QdEPgQabXyn5ukTZ3zilwY09HbkMC4MbuR9wmAaa790skEhgMBv47sVhsdkxYX7Asi46ODvzjH/+Am5sbnnrqKf74s5s9h0vDdCG5RCLhr7mTcCeiHDhwAImJiZgwYUKf54DeD3Cnguzfvx86nQ7Dhw/HrFmz4OLi0uf1RqMR2dnZ2LdvH5qbmxEREYHnnnuOP9SgL1iWxfvvv4+ioiJYWlpi/PjxvU67Efj9QURobGzEZ599hqqqKjg4OGDhwoX8kZICAg8KfRrVc+fO4cMPP0R7ezsAICoqCitWrEBkZCQAYPXq1bh69SqAGwbPz88PTzzxBKysrPDZZ5+hvLz8xsOlUqxYsQJTp069qQBGoxG5ubnYu3cvHn/8cYhEItTW1uKLL75AdnY2DAYDJBIJnnrqKf45165dw44dO5Cbm8sfeZSQkICNGzfy78D1hHseTWe6Y1N/dvfg9iM+cOAAfyzVL8G0R343dxLhOh8BAQGws7PjTwWaOHHiTY0qEcHf3x/Ozs749ttvUVdXhxUrVsDa2vqm1xMRRo8ejRMnTuDChQtwc3PDlClTBKMqAFtbW4wfPx7z58+HSCRCUlISEhISBKMq8EDRy0KIRCIMHDgQY8aMwfnz51FdXY3Y2FgEBwfzRmHFihVoaWnBhQsXIJFIMH/+fERHRyM8PBwJCQmorq7G+fPn8fDDDyMpKemWhshoNGL//v2wsLDAmDFjYGlpCS8vLyQnJ6O5uRnnzp2Ds7Oz2XO8vb2RlJQElUqFjIwMAMDSpUvNzkNkGAZdXV3QaDTQarXQ6XRgGAbd3d3o7u6GVqs125LvZjQ0NCAnJweBgYEICwvr97mdptv+MQxz106e4eA8Cn5+fhg6dGi/GjKxWAwPDw+MHj2aP8qpP2nExMQgNjZWaCwFeEQiEezs7BAfH4+QkJAHdstRAYE+jaqNjQ2Sk5NBRHBxccGgQYNgZWXFH+Jqa2sLhUKBiIgIfPTRR0hKSoKtrS2sra0RExMDJycnEBGmT59+y5NWuOOfDhw4gNDQUAwbNgwSiQQymQzR0dGQy+UwGo2YNWuW2RmrlpaWmDBhAqKjo6HX6zFnzhz4+vryzy0qKsKMGTMQHR2N6OhorFmzBi0tLRg2bBhiYmIQExODKVOmIDMz85aZQ0QoLy9Hbm4uRowY8YuPndNqtXjzzTcxZ84cfmR/N+Hc5DKZrN/nyorFYtjb2/Plfzs4F71MJvtd7PMp0H+4KSJONwQEHkT69MmJRCI4Ozv32sieO4z2448/hlwuxyeffAJvb29IpVK+klhbW/Nzm7c6louIYDAYkJaWBo1Gg9mzZ5tdzx0b1NdzuA2aud89N6CPjY1Famoqn8ahQ4fw2muv4ejRo3Bzc+PlvVXFNhqN6OzsRF5eHsRiMeLi4mBnZ9fvxsBoNEKv16OxsRFdXV3Q6/X9uu9eRGgABQQEBPrHbSe6TBvU7u5u/Pjjj8jOzsZbb72FqKgoM4PKXd+fRpg7T3Hnzp1wdnbGmDFj+nzOzZ7X8/Oef3OuRyLiTzURi8V80NXtMBqNuHbtGs6dO4fExESEhobyaXCHeLe2tqKjowMMw/AHrTs5OcHV1RVarRbl5eU4fvw47O3tUVxcDIZhIBaL4enpyR911dXVhfb2dnR1dUGr1fIdGnd3d75Hr1QqUV9fD51OB1dXV/j6+qK1tRWNjY1gWRaenp7w8vICAOj1enR0dKC1tRUajYZ/fxsbGwQFBfV6T4Zh0NDQRw2lzQAAIABJREFUAIVCAZZl4eTkBC8vL1hbW/fKdy6IrbW1Fc3NzdBqtbC2toarqyvkcvltXeMNDQ1oamoCy7Lw8PDgj4FSq9WoqqqCXq+Hs7MzfHx8YGlpyXtGDAYDVCoVlEoldDodP3p2c3Pj5XxQDT/DMLh+/TpUKhUkEgmfN01NTWhra4NYLIa7uzvvnufygatfzc3N6OzshF6vh1gshqOjI5ydnWFjY3Nb9zzLstBqtVCpVFCpVPx0iYWFBdzc3ODh4cHPo3d2dqKlpQVdXV1gWRZSqRRyuRxyuRxWVla39Yz8kucYjUZUVVWhra0NFhYW8PX1hZOTE8RiMWpqatDS0gIAvI4BQFtbG+rr66HVauHp6Ql3d3eoVCq+Drm4uCAgIOCB1SOB345+RY8QERiGQWZmJnbu3InFixcjJSXlfzogmohQUFCA4uJiLFy48J47Z0+v16OkpAQ1NTVYunQpPD09+e+MRiMOHz6M1NRUaDQadHd3o7W1FTqdDpMnT8bKlStRX1+PHTt2oL29Ha2trXj77bdhZ2cHqVSKZcuWYfLkySgrK8PZs2dx7do1aLVaVFdX49q1a4iNjcWaNWsQFxcHiUSCvLw8bNmyBWlpaVi0aBH+/Oc/Y+fOndi1axfUajVeeuklrFu3DkajEZcvX8ZPP/2E0tJSMAyDlpYW1NfXw9/fHz///LNZo8swDC5duoTi4mKkpqairKwMw4YNw/PPP4+HH364V3kYjUaUl5fjzJkzyMjIQGlpKWxsbDBz5kw8/vjjCA4OvmWeZmRk4K233kJVVRXWrFmDdevWQSKRoKysDH/6059QUFCAWbNmYePGjQgMDIRYLAbLsigtLcV3332HyspKaLVasCwLe3t7TJkyBTNmzOAN8IPI/2PvvMOrqrLG/d6W3OSm93rTeyMhNGGkSVFgALGgKI5+qIMNbDOOzoiOfvPTGUUdy9iQwQbioIhIb4YaSCUhhCSE9EB6vb38/vA750s3Oujn6Hmf5z4P3Jy79z57n7PXXmuvtXZ3dzebNm3igw8+wGq18oc//AEnJycOHDjA4cOHaW1t5YYbbuB3v/sdQUFB4kKkt7eXXbt2sWXLFmQyGQaDAb1ej7e3N7Nnz2bu3Ln4+fmNWHdbWxsHDhzg0KFDtLS0YLFYqKmpoaenhxUrVvDoo49it9tpbW1ly5Yt7N+/H5lMJgrjwMBAFi9ezJQpU3B3dx+xrtGW4+bmhtVq5cMPP+TVV1/Fzc2Nv/3tbyxcuBC5XM5nn33Gq6++SktLCw8//LD4XhQWFvLCCy9w8OBBHnjgAZYsWcKmTZv46KOP6O3t5dZbb+XVV1+V/AAk/m1GXD4KmklnZydZWVm8/fbbpKens2jRon9rIhNWpVu2bMFms3HDDTcMqT0Kzj5ms1mcFPp+RuNo1PfMxoFa9Uh0dHSwb98+fH19mTRpEmq1WmzTpUuX+NOf/kRlZSWPPfYY69evZ+3atSQkJIgH84aEhPCb3/yGqKgowsPDeeKJJ/j73//Oyy+/zLRp01AqlTz55JO88MILpKen8+yzz/LGG28wf/58jh49yq5du+jp6RG9JB966CGsVis1NTV89dVX6HQ6Jk+eLK7QhdX7X//6V7Kysli2bBlvv/02a9euJSoqiqKion73brfbOXfuHF9//TVhYWE8+uijLFq0iCNHjvDaa6/R29s7KJawqamJzz77DKVSycqVK3n44Yfx8vLirbfeYseOHfT09IwYfzh//nymTJmCSqXq54GdlJTEXXfdhbu7+yDP7cbGRl544QWOHz/OihUrWLduHU8//TSdnZ385S9/obi4+Gcde+zu7s4tt9zCjBkz6Ozs5NSpU1RVVTFnzhwee+wxQkJC2LZtGzt37hSd4cxmM7t27eKZZ55BLpfzxz/+kfXr17NmzRosFgvPP/88+/btEy0ZAxG03K+++or//u//Rq1W89xzz/HPf/6Thx56CJvNRm1tLfCN0P/www95+eWXiY2N5cUXX+Tdd99l5cqVVFZW8v/+3/8jNzcXi8Uy4rMx2nKsVityuZxHHnmEsLCwfp79ADfddBMzZ87s94w5ODgwZcoUli9fjru7O7W1tWzduhWdTsfMmTPRaDSSMJW4bIyoqdrtdurr63njjTeoq6ujsbGRxYsX4+Li8m9579ntdhobGzl69ChxcXGkpqYOa5K1Wq18+umn5OfnD6qzoKDgW+uSy+XEx8dzzz334OzsPGrT9MWLFzl06BAzZ84kKSlJfOlsNhtVVVXU1taSkpJCZGQkzs7OZGZmcu+999LV1YWLiwtOTk4oFArc3NzQ6/VERkaSlJQklmE0GvH19WXBggUsWLAANzc3XF1dmTFjBl9//TUXLlzAYDAgl8txdHTE29sbmUzGpUuX8PT05JZbbsFkMrFjxw4SEhKwWCzs3buXEydOsHLlSubMmYNKpcLT05NHHnmEwsJCFApFv8ODbTYbc+bMEa/NyMhg06ZNVFVVcenSJTQaTT/NtrW1lXHjxrFkyRKUSiUmkwkHBwf+8Ic/cOjQIWbNmkV0dPSw/apQKPD29u5nJpbL5Tg7O+Pn59evPmHsd+/ezf79+1m5ciVXXHEFjo6OODk5MWPGDF588UU+/fRT0tLSvnVM/1MRTPcuLi60tLSgUCi49dZb8ff3x2Kx0NHRwZ///GdycnK45ZZbUKlU1NbW8v7779Pd3c3DDz9MbGwsSqWScePGcd1113HixAl27NjBhAkTCA8PHyRQhAXa559/jlKp5I477hC9/6+55hqsViu+vr7AN+/gRx99REBAACtXriQwMBC5XM7MmTM5f/48f/rTn9i/fz9paWl4enoOe5/ftRylUomPjw/t7e39ynF3dycoKAgHBwfxO2HrR6PRoNFoKC0tZfLkydx3333IZDI2b97cb3tHQuLfYUShKngCR0ZGolAoxBdtypQp/9ZelpCEoL29nbvuumvEMhQKBUFBQcTExAwSvEePHv3WumQyGbGxscTExIj/HwlB4OXk5GC327niiiv6TfYymQx/f3+cnZ0pKCjg3XffZd68eWi1WtLS0sQXeKRVuUwmQ6VS8fvf/x61Wo1arcZsNmM2m0WNWthDHUh4eDjTp0/H19cXuVzOihUrRKeqvXv34u7uTlJSkii4ZDIZ06ZNY9q0aYOcvRITE0lOThYnoMDAQGJjY0XLwMA2C3UL4+7g4EBsbCxRUVFcuHCBtra2y6o12u12tm3bJnqDC2FQFouFoKAgFAoFJSUlv4jsPMJe+/jx4/H19RXHQKvVYrFYaGpqEvuhtLSUqqoqgoODCQ0NFcddoVAQEhJCWFgYubm54rbAUEK1qKiI8+fPk5mZKe7/wzdCa+nSpeICNz8/n8bGRpYsWSJ6+stkMtRqNVqtFk9PT06fPs2lS5fw8PAY9v4uVzmjISoqihkzZuDj44NCoeC3v/3tz3pfXuLH5VuFqo+PD4sXLwa+Mf/t37+frVu3ctddd406zGIg7e3t7Ny5EwcHB2bMmDGs1iuYbqdNm8bVV189yBEmKytLjFMd6R6+Sxvtdjs6nY7NmzcTHBxMZmbmIGEUFBTE448/zksvvcRLL73E7t27ufrqq1m0aBHBwcHivlbfMge2SaFQEB8fT3t7O4cPH+bs2bOUlZVx+vRpysvLxclyIL6+vuJEKPSPEAtbUFBAaGhov/AiQYAP1S8qlaqfSVxwoqqrqxvyemFPuO8CQ61Wo9FoqKyspLOz87IKOCERidFo5KWXXuK9994TTd0tLS10dnZy+vTpy1bfTxmZTIarqyvu7u79Fpd9LQkCNTU1dHR0MGXKlH4aG4C3tzfBwcGcOXOG7u7uIcfLarVy4cIFmpqaiIyMFLc+ADFcSkBYTMXFxfV7zmQyGX5+foSGhtLS0vKtWwOXq5zREBERgbe3t+jAOLCPJCT+HUblqKRSqYiLi+PWW2+lurqal19+meTkZKZOnfq9zMDnzp2joqKC+fPn4+fn95MKBLfZbJw9e5bz58+zfPlyQkNDB12jVqu57bbbmDhxIp988glffPEFRUVF7Nixg8cee4yJEyeO6GFst9sxm81kZ2fz9NNP4+3tzZIlS8jIyGDSpEm8/PLLw/5WSMc4FDqdTowD/LExGo0/SIKLnp4eAgICWL16NdHR0aIVQDBfCyFVEv+L4Mw11D6hg4MDjo6O4l7kcJhMJsxmsxjWNhzCuA9Vl6OjI46OjvT29n5rmy9XOaNBqVRKe6gSPxijmo2Efb2FCxeSnZ3Nxo0b+d3vfsdXX30lCsXR7lXa7XYOHDhAVVUVc+fOHTJ0Q7j2x0aYqD/++GOcnJyYPXs2jo6Og64RtIb09HTi4+NZtmwZL730Ert27eKf//wnMTEx+Pv7i7+xWCz9zKl2u526ujpWrFiBh4cHr7/+OqGhoaLAcHJyQq/XD9nG4fpZ0DJ7e3tpamrq97e+TkHfF2E8hnNsiY6OFs2Ew43dQEepb/s3gJubGyqVioCAAOLj40UB2tc5RTLb9cfLywsnJyfKy8sHWTu6urpobW0lKCho2MQsMpkMDw8PNBrNoG2IvosZuVwu1lVVVTVoUdXe3k5zczPR0dH9kreM1OZ/txzgWxcMEhI/JN9JRXR2dub3v/89KSkplJeX88c//hGdTjdoUhzugRacfIqLi0lPTyciIuJbE0T8mNjtdpqbm9m2bRvBwcGMGzdu0IrWbrdjMBjo6ekBvslnKmRtyszMpLS0FJ1OB/yv6bmrq4uGhgbx91arlf3799PR0cHVV19NSEiIKLybm5vFnMvDtXEoc7KjoyOJiYm0t7dz4cKFfl6RBoNB3CP+d+h7iIHQFiFkSDCpfZvVQfi74A0qTNI9PT2DNBGZTMb06dPp7e3lxIkTYgIN4TcVFRXU19dLE+gAtFotHh4e1NTUYDAY+o1XR0cHzc3NREZG4uPjM+R4Ceksvby8OHfuXD+Tq9VqpampiQsXLgAQGRmJl5cXtbW1Yry2MD7t7e20trYSGhqKp6fniMLw+5QjvJt9PYvNZnO/mNqhkE7JkfghGfRGCQ9yd3c3VqtV/NjtdlEbWrVqFRqNhm3btrFt2zZ0Op044XZ1dYnmJ6PR2G8Stlgs5OXlUVNTw6xZs4Z90ex2O+3t7eh0OqxW66DJXHAmEl4m4dScf+dFEZIM7Nu3D5PJxPXXXz9IAxdexg8++IAbbriBxsZG0UxmNBqx2+1ERESIe80qlYqoqCg6OjooLCyktraW0tJSzpw5Iy4mDh06RG1tLRcvXqS0tJQjR46IAenCx2KxiNpCb28vHR0d/RyC5HI5arWa2bNn09XVxdatWzl58iT19fVUVVWxefNmnnvuuX4hSkK5Qr8J+ZL1er04dgM1hry8PEpKSsTcyc3NzZw6dYqmpiamTp0q7icLOY+FMoW2yuVyEhIScHJyIisri6qqKhoaGjh9+jQnT54UT0cym83i87Zo0SLkcjmffvopx48fp66ujrq6Ok6ePMlzzz3HsWPHvveY/ycg9KWQ1KO7u1t8H/r2c9+xTEtLIzMzk/b2dr766ivxnWxqauLw4cPU19dz9dVXD5vsQC6Xk5SURHx8PMePH2fHjh1UVlZSX19PcXGxGEIFMHXqVFJSUjh69Cj5+fliEpPz58+TlZWFq6srV111lRgT27fNfU/C+i7lCIvVcePGodPpOHr0KDU1NdTW1nL48GFqamr6PcN93yMhRHC4cCIJiX8XxVNPPfVU3y+EcJJ//vOfHD58GEdHR5KTkwkLCxP36pRKJTt37qS+vp6ioiKCg4Px8fHBZDKxbds29u/fT29vL3FxcWi1WtF7tq2tjU8++YTa2lr+67/+S9RUB9bf09PDgQMH+PLLL2ltbSUyMpKEhATR9NPb20tBQQFbt27lwoUL+Pv7ExsbO+zKezTY7Xa6u7t59tlnMZlMrFmzBnd39yETIJw9e5bPP/+c6upqMTnBV199RVNTE0uXLiUtLU3MryuXy9mzZw8FBQWUlpaSnZ2NXC5n0qRJFBQUiAKlsrKS06dPExERgU6no6qqirS0NKKiosT8yPv37xe9sQMCAkTtVnB8CggIoKmpifz8fPbt20deXh579uyhpKSE1atXExISQlNTEzt37uTIkSNoNBqSk5MJDg7GaDRy+PBh3nzzTWw2GxEREYSFheHq6kpTUxO7du3C0dFRNM/V1NRw4MABTpw4weTJk1m6dKmYYaeyspLNmzdTVlaGp6cnGRkZoseqRqMhPz+f3Nxcjh49SkVFBaWlpaLp+tKlS4SEhIgOMhEREVgsFrKzs9m9ezcFBQVkZWWxa9cuMjMzufXWW1GpVD9bE7DJZOLMmTNs27aN/Px8QkJCSEpKQqPR0NzczPbt2zl69CguLi5kZGTg7++Pk5MTYWFhXLhwgZ07dwLQ0tLC3r17OXjwIPPnz+emm24a1rIgmHUVCgUNDQ3s3LmTU6dOcerUKXbv3o2TkxPLli3Dy8sLNzc33NzcqKysZNeuXajVampra9m+fTv5+fncfvvtXHPNNTg5OWG1WsnLy+ODDz6gu7ubsLAw4uPjcXd3H3U5QlicsE1y+PBhcnJyKCwspLi4mM7OTmJiYigoKMBqtRIXF4e/vz8dHR1s376d/fv3i9sVoaGhkpOSxGVnkFAFqKysJC8vj8TERCIjI3FzcyMyMlLMfVtaWorNZiMuLo6IiAjMZjPh4eHiBODn58eYMWOwWq1ERUWJMW3FxcW8//77pKSkMH/+fNzd3Yd8qdva2sjPz8fZ2VkMU4mKihKzLnV3d5Obm4vRaCQlJQVHR0f8/PyIiYn53pOrzWbjxIkTvPHGGyxcuFA8A3Rg+kO73Y6Li4sYc1deXk5DQwOBgYHcfPPN/OpXv0Kj0YgC1dfXl4CAAFxdXfH29hbjQv39/cnIyMDR0RE3NzfCw8NZsGAB48aNw2Kx4O7ujs1mY8KECbS2tnL48GESEhJE015ERES/c12F8KexY8eKAlepVJKSksKKFSvEY+tqa2spKCggPj6egIAA/P39xTHcuXMnwcHBxMXFoVQqiYiIwM/PT9SCbrzxRnx9fTl79izl5eXYbDauueYalixZQmhoqLhAysnJob6+nuTkZHx8fPD29hZDmtzc3IiLi8Pd3R1XV1fCwsK44YYbSE5Oxmaz4eTkhMViIT09HY1Gg0qlIjU1lbCwMHEP0N/fn8WLF3PttdeKC7afq1A1Go2cPXuWtrY2kpKScHNzIyIiAn9/f6qqqsjLyyMhIUE80i86Ohq1Wo2vr6/4LAghNiqVikWLFrF48WL8/f1HdNaRyWRER0eTkJCAp6en6Fcxe/Zsli1bRnBwsGjJiYqKIiUlBZVKRVlZGbW1tfj4+HDzzTczZ84c3NzcxPf8iy++QKPRiItkrVYrvtffpRz4xhM+NjYWjUaDh4eHGEMt5C0XzmUeP348Fy9e5NSpU0RGRhIUFISHhwfx8fH9PJslJC4HMvuPZAMxm81s2LCBZ599lieffFLUMH4qWK1WHnroIT755BO2bdsmHZ4sISEhIfGd+VFiWaxWKxcvXiQvL0/MLPRTCoOwWq1UVVVx6tQpxowZQ3x8/E8qzEdCQkJC4j+DH0VyCF6/2dnZotfvT8lcZ7PZyMrKoqmpiSVLlnzvpBYSEhISEr9sfhShajAYKCwsxNHRkUmTJv3bacYuNwaDgUOHDuHi4sLs2bMls6+EhISExPfiR9lTtVgsdHd3YzabcXFxGdX5ij8mZrNZDFMRzgWVNFUJCQkJie/KjyJU+2Zh6Zs39qfCwGDwn5LAl5CQkJD4z+FH8/6VkJCQkJD4uSOpZBISEhISEpcJSahKSEhISEhcJiShKiEhISEhcZmQhKqEhISEhMRl4qeT1oj+Z3b+nPO5/hQQPJ6/rzf2UP5tQhkj/U1CQkLi58xPRqj2PQrKZrPh6Oj4k8oN/HPCbreLR6wJh02rVKpRJ72w2WzieAmC2cHBAaVS2e+YLfgmPEmpVP6k0lJKSEhI/FAMaf4Vztw0mUz9zi0d7bV9zz4dLW1tbTz55JNMnDiRzMxMPv/88+9+NxKjQqfTsXHjRmbPns3EiRN55plnaGtrE/9us9nEM2oHjqXNZsNgMPDJJ5+wdOlSrrjiCpYuXUp2djZWq5WGhgbWrl3LnDlzuOKKK1ixYgWNjY3/F7cpISEh8aMzSKjabDa2b99OXFwcPj4++Pn58dhjjw1KkCDQ1tbGmjVr8PX1xdvbm+DgYA4ePNjvEO3R4OXlxQMPPMCUKVOorKykq6vr+9+VxIhoNBpuuukmbr/9dvR6Pc3NzaJmCVBVVcXMmTOZO3cu2dnZ4lgKGu6jjz7Ke++9xyuvvMLq1atpa2ujvb2dyspKbrvtNjo7O9m+fTs33ngjDQ0NdHd3/1/dqoSEhMSPypCa6uzZs3n66acxm80YjUZKSkrEM1T7YrPZaGxs5PPPP8dkMuHj48OLL77IpEmTvvMemkwmw8nJCTc3N9EMLPHDIZPJxHM5h7JEKBSKfufJ2u12rFYre/bs4V//+he33noroaGhjBs3jqlTp6JUKnnjjTe4cOEC9957L2q1Wjy3UzLjS0hI/FIYtNElHK7t5uYmHohcXV1NYWEhkZGR4r6b3W7HZDKRm5tLV1cXQUFBREREEBcXh5OT0/dyTJGck348ZDLZsPvWbm5uLF68GIVCgb+/vzgmVquVQ4cOoVQqiY2NRSaTkZiYyNNPP01NTQ1r164lLi4OtVqNQqEgLi6ODz/8UBpTCQmJXwxDeo8Iws3Dw4Pp06ezfv16jh07xowZM1Cr1cA3WqpOp+PAgQOMHTuW9vZ28XcDJ1HB+Uj4CIJb+Ah1joSQP1j42O125HI5CoUCuVyOTCYTr7FYLKIDTl+BAPS7fmDZVqsVu92OQqHoV57NZkOpVParR9DuZDIZCoVikJPPwPaKHa5UDrpWqFu4L6EPh7o34Vqh/X2vGakP+95f33L6tk34m4uLC7fffjsqlQoHBwfxb2azmbNnz4qOSEajUXRwamlpoaurCxcXF9EJym63i9quoOkK4zDc/fUdA7lc3m+8Be1ZaM/APuv7TAnbFcI49e0joR6hjoHPw1D9JfxWuB+hzX3bAYjPpLRAlJD4ZfKtLpmenp6kpKRQUlJCTU0N/v7+wDeTTmlpKcXFxdxyyy18/PHHosDti91up7Ozk9OnT1NZWUlnZyfu7u5ERkaSmpqKh4fHqASq1WqlsrKS8vJy6uvr0el0eHh4MGHCBKKiolCpVFitVk6fPs2JEyew2WxkZmaSnJxMeXk5p06dwmg0MmXKFFJTU/sJNpvNxrlz5zh27Bg6nY6YmBiuvPJKzp8/T15eHt3d3cTGxjJhwgRcXV2pra3l+PHjtLa24u3tzYQJE4iMjOzXZoPBQFVVFeXl5dTV1WE2m/Hy8mLSpElERESI9dtsNi5dukReXp54XyqVCh8fHyZMmIBWq0Umk2E2m6msrKSoqIiLFy9is9lwdnbG19eXOXPmDNn3ffuvq6uL3Nxcqqur6erqwtnZmZ6eHnp7e/td19jYyL59++jo6CAqKopp06ah0Wjo7e3l+PHjFBcXo9fr+eyzz8jNzSU6OpqUlBSysrJoaGjA2dmZ9evXo9FoSE5OZvr06QD09PRw5swZioqK0Ol0uLu7k5aWRnx8PGq1GpvNRklJCdnZ2fT29pKRkcG4ceOorq7m2LFjdHZ2kpKSwsyZMwEwmUycO3eOwsJC2tracHR0JDk5mcTERLy8vLDb7TQ0NPD111/T2tqKs7MzN998M83NzeTm5lJTU0NQUBBXXHEFgYGBgxY6bW1tFBQUUFlZiU6nQyaTERoaytixYwkNDUUmk2GxWGhsbKSgoIDa2lqsViuRkZFkZGQQGBg44jMtISHx82REoWq32/H29mb8+PGsW7eOc+fOMWbMGJRKJXa7nS1bthAVFUVycvKQJ7tYrVZaWlp45513KC4uJi4uDnd3d/Ly8vjiiy8YO3Ysd911Fz4+PsOeDGO322ltbWXdunWUl5cTHx+PRqPh/PnznDx5kl27dvHXv/6130SXl5fH1q1bWblyJY2NjWzcuJGsrCxMJhPPPvssKSkp/WI0hbrPnj3Lhx9+yPTp01EqlezZs4f6+noKCgpwdXXl/vvvJyIigqysLOrq6sjNzaW5uZlbbrmFe++9Fx8fH2QyGRUVFWzcuJGKigomTZqE1WqlsLCQgoICiouLueeeewgJCQGgtraWv//977S2thIfH49CoeDYsWOcP3+eJ598kqCgIACys7NZt24dGo2GqKgoOjs7+eqrr2hvb2fy5Mk4ODgMGRJjs9loaGjgzTffpLCwkAkTJuDi4kJ1dTUFBQXU19eTmpoKIGp7TU1NvPzyy/zqV79izJgxaDQaTCYTjY2NeHh40N3dTXNzM0qlEg8PDzo7O9Hr9SgUCsxmM3V1dbi4uIhtv3TpElu2bKG4uJiAgADc3d0pKCjgs88+Y9GiRSxfvlysOz8/n23btnHzzTejUCh4/fXXOXz4MG1tbfzmN79h5syZ9PT0sH37dnbt2kVYWBienp5UVVWxb98+pkyZwk033YSPjw8Ara2tPPfcc6hUKtLS0tixYweXLl3i1KlT6HQ6FixYwIMPPiguFs1mM2VlZWzatImGhgZxsbR9+3b0ej2PPfYYQUFBWCwWCgoK+PDDD1EoFISGhtLb28uGDRv46quvWL16NTExMdKJRxISvzBGfOOFvdWkpCRUKhX5+fm0tbVhs9lobW1l7969XHPNNbi4uAwrVD/66CM2btxIfHw8d955Jw888AD33HMPbm5ubNiwgZ07d44YgmO326muruall16ipqaGJUuWcMcdd/D73/+e6Ohotm/fTmFhIVarFblcTmpqKnPmzMFisXDs2DGys7O58soruemmm0TT38C6ZDIZcXF1w2MXAAAgAElEQVRxzJs3D4CysjJOnTrFrFmzuP/++7nuuuu4ePEiL7/8Mlu2bCE9PZ277rqLBx54AIBdu3ZRVFQkmipzcnJ45513kMvlLFy4kLvvvpv77rsPrVbLp59+SkVFhXjt3r172bZtGykpKdx5552sXr2a1atX4+7ujl6vx2azodfref/99ykoKGDevHnce++9rFq1ittvvx2dTvetIU9vvvkm77zzDlOnTuXOO+/kvvvu47e//a0oTPv2Q1BQEAsXLsTb27tfuS4uLlx11VXExMTg6OjILbfcwqOPPsq1115LdHQ0M2bMICAgAK1Wy6pVq3jooYeYPXs2JpOJ/fv388Ybb6DValm5ciX33nsvK1eupKysjLfffpuysjJkMhlJSUnMmDEDFxcXysvLeeedd8jIyOCOO+7Aw8NDNB2fOHGCf/zjHzg5OXHbbbdx7733smLFClxdXVm/fj2HDx/GZrMRFBTE0qVLUSgU9PT0sG3bNlJTU/nNb37D6tWrRa26qalJ7IOOjg4++ugj9u3bx/jx47n77rtZvXo19957LxcvXqS1tVUMHdqwYQNnzpxh7ty53HPPPdx///1MnjyZTZs28c4770jOdhISv0C+dRktl8uJjY0lNTWVEydOUFVVhdFo5NChQ9hsNq666qohf2ez2bh48SKvvfYaANdddx0BAQEolUoiIyNZtGgRNpuNV199VZwsh0Imk+Hq6ipqg1qtFpVKRVBQEElJSTg7O9Pe3i6WIZfLUavVogCdOnUqy5cv59FHH2Xr1q0sWrRI3PMaiHB4emtrK3PmzGHatGmkp6czc+ZMQkNDuXDhApMmTWLatGkkJiYyefJkMjMz6e7upqmpSdy7Cw4O5uabb2blypX4+vqiUqmIjo4mISGBjo4OdDqduB/X2NiIyWQCwMnJCaVSSUZGBq+88oqoMdtsNmpra0XnIoVCgZubG/PmzWPDhg14enoOu6gpKytj586duLi4cOutt+Lj44NCocDPz4+xY8eKGtrAMR9oTlapVHh6eop95O7ujo+PD+7u7mg0Gtzc3MQ9WG9vb3x8fNBoNDQ2NrJ//340Gg0TJ04U6w8LC2PWrFk0NjZy+PBhcfwEjfvMmTNce+213HHHHdx3331s3ryZVatWYTAY2LFjB4WFhcybN4+QkBAUCgVBQUFcddVVNDQ0kJ2dTWdnp9inwl5oQkICc+bMYcyYMSxYsIDExETa29spKyvDbDZjtVq5cOEC77//PiEhIcydOxcPDw+cnJxYsGABW7ZsYeHChdhsNk6fPs2OHTtISkoiPT0dR0dHXF1dufHGGzGZTBw6dIiLFy9+53htCQmJ/2xGleYmKiqK8ePH8/bbb1NSUkJkZCQfffQRixcvxtPTk7q6un7XCwKjvLycxsZGEhISiI6OFs2TKpWKqKgoHBwcKC0t5fz588THxw9bf3h4OI899hiOjo79JilBwFRUVGCxWPp5sgraZ1pamujJLJgjR0ImkzF27FhiY2NFM3doaCg+Pj6EhISQnJyMo6OjKOxTUlIoKioSnVoAMjMzSUxMRKPRiMJdoVCITj+VlZXo9XqcnZ1JSkqit7eXjz/+GI1Gw6JFi/Dx8SExMVF0uFEqlSQmJpKdnc2rr74KQEZGBq6urmRkZAxrYhQm/7a2NlJSUvDw8BDHQBCs7u7uI/ZF338P9xnu70LIleA5HhAQ0G/8tFotVquVS5cu9dPqZDIZaWlpTJo0CTc3NxQKBT4+PthsNqqrq6msrMTLywutVis6M8nlcjw9PXFwcKCjowO9Xt+vPEdHR2bNmiUuChwcHFCr1djtdnp6ekTHpKKiIlpbWwkICBAFNoC7uzuTJ08GoL29neLiYux2O9HR0Wg0GrH97u7uuLq6otfr6ezsJCgoSHJYkpD4BTEqoero6Cg6X2RlZeHg4MDp06dZu3Ztv1jGvthsNs6ePYtKpWLs2LH9rpPJZCQkJODk5ITNZqOjo2PY5BKCl6harebcuXMcOnSIvLw8ysrKqKioQK/XYzQahzTp+vv74+np+Z07xcnJSZxMBS1HEIoD70OlUg26f5VKhUajobCwkAMHDpCTk0NZWRl1dXXY7XaxvQqFgtmzZ/PHP/6RF198kSeeeIK33nqLFStWsGTJEnx9fVEoFGg0GlavXk1LSwtffvklhw4dYvLkyaK5URDeQ3mwlpWVYTQaSUtLG3SfgvfrD4XdbheTQpSWlpKVldXPe9xkMmG32zl79uygtkdERODg4DDIS/vixYu0tbVRX18vCkmhPIvFgtVqpbW1lfb2doKDg4H/XRx8mzOXxWKhoqICd3d3wsPDh03baDAYqKyspK2tjaeffprnn39e9EoW7stms3H+/HkSEhK+Z+9JSEj8JzIqoapQKEhMTESr1bJv3z56enq44oorCA8PH3EVLmgrgimuL301k5EmdmFP8fnnn2fz5s0sWbKEe+65h4iICDZs2MArr7wybN1DhUp8GwO1LUFYD1XOUIJM8Dp9+umnOXLkCLfffjtPPPEE/v7+vP7667z++uv9fq/RaLj77ru58sorWbduHTt37mTNmjXs2bOHtWvXEhkZiVwuJygoiFdeeYUlS5bw5ptvkpuby0033cQjjzzCAw88IArWgfQN+xjqbz80Qh2LFy/miSeeEB20hL8JuYH7PgN9w2MGliWUl5iYyPr164mMjBykUQu5jPvyXZ4DIYzm2+7J39+fRx55hOuvv16sT/ibUqkULRMSEhK/HEalpsjlcjFUQK/Xs3fvXq699tpvFaiCea+8vFyMW4T/dT4yGo04ODgQFRU1pAAUtIfNmzfz1ltvccstt/DUU08xceJE/P39RfPoTwm73c6rr77K1q1bee6553j44YcZM2YM7u7ugwSFIADUajVjxowRHaGuvPJKvv76a3bu3NlPq3V3d2fevHls3ryZF154Aa1Wy9q1azl//vyQQkCINZbL5Rw5cmRQOw0Gg7if+0MgZMny8PBAp9OJYUB9P4IVYDTJ/GUyGS4uLqjVajo6OoYsT9iTHe3hAH0R9ma7urqorq7u56glJDuxWCwolUo8PT0xGo3odDocHBzE+jUajbiP+0NbAiQkJH56DPvGD2VOnTBhAmFhYWL8Yt8Jo+/1grBISEjAx8cHo9FIWVmZqC1ZLBZKS0sxm8386le/GnFfz263c/DgQex2O3FxcaIW0dHRQVVVVb+9s4G/E8yB3wVh8uyrFQ38d99rB35vt9v5+uuvMRgMxMXFiXt1Fy9epLa2tl9dNpuN7OxsKisrgW8m9dTUVHFftaWlRUyy8fXXX4sJNlxcXFi4cCHjx49HpVL1817ti1wuJzk5GWdnZ0pKSsSFjNlspru7m7y8vEFt6ouQrEG4z4Gfgf028G9yuZyAgACSk5MpKSmhpKQEo9Eoej63t7dz8ODBQQn3hbEbuFAQYkVDQkJoamri+PHjGAwGsbyenh5yc3MpKSkZVJ5w8MNwCGb+mJgYHBwcqKqqoqysTBSkvb297Nmzh+rqapydnUlOTsZoNJKTk0NDQ0O/hBqVlZXs3r172LokJCR+vgxr/hUEUl+hNWbMGJYvX46Xlxeurq6ik4jFYsFgMKBWq/sd+aXValm2bBkbN25k06ZN/Pa3vyU4OJjS0lI++eQTvLy8ePDBB/slQhB+31cghoWFYTQa+fLLLwkMDBSdoNra2lCr1f20YKvVKnrXtre3093djUajGVVn6PV67HY7NTU1GI1G0ZHFYDBgNBrFeEwhxtVqtYrfCXXCNw44JSUlfPDBB8yfP1+MUxXaK2hAFouFv/zlL/j7+/P4448TGhpKT08PjY2N2Gw2MRVge3s7d999N6tWreKGG27Aw8ODS5cu0d3dja+vL6GhoUPej0KhID09nTFjxrBjxw6ef/55li1bhqOjIxcuXKCqqgqVSkVXV1e/hPpCH/b09NDR0YFWqwW+SbjQ0tKC1WodJMh7enowGo10d3ej1+tFp6jg4GCmTZvGyZMnxZSFWq0WnU7HsWPHqK6uRqvVin0qnHRUU1PTz/lLeKY8PT2ZNm0ax44dY/369Tg4OJCeno7JZBLjgOfOnUtycjIKhULUkIV4XQ8Pj0HPl3DvSqWS+Ph4Jk+ezOnTp3n77bdZsGABLi4uFBYW8sUXX/DMM88QGhpKRkYGmZmZHDlyhPXr1zN37lw0Gg01NTXs2rWLwMBAfv3rX0tOShISvzAUTz311FN9v7Db7Zw7d44PPvhATKIfEhJCSEgIarWazMxMUlJSxD2kmpoaPvjgA06dOoXBYMDV1VVM0CCTyYiMjMRoNHLmzBlKS0vJy8sT4whvvfVWZs6ciUqlwmg0cuzYMbZt20ZjYyMuLi5ERUWJJ99UVFRw6tQpzp8/T0tLC35+foSFhVFWVkZHRwehoaFERkZSXl7O+vXrqaiowGq1EhAQQFhY2JAORX3vuaamhk2bNlFQUEBPTw9+fn7ExcWJiQb27dtHc3MzarWa5ORkHBwcOHDgABs3bqSxsRG73U5UVBR+fn54eXnR0NDAwYMHqa6upru7Gz8/P4KDgzl37hx6vZ7IyEiCg4MpLCwkPz+f8+fPc/r0aY4cOUJpaSnp6elcf/31eHp6YrVa2bdvHxUVFWIM7dGjR+np6WHx4sVMnTp1kFMPfKN9OTg4EBISQltbG9nZ2ZSUlFBfX4+bmxuRkZFcuHCB6upqHB0dSU9Px2Kx8O6775KVlSWOZ0xMDDKZjE8//ZQvvvgCg8GA2WwmJiYGPz8/6uvr2bRpE8ePH6e5uRknJyfi4+NxcXHB0dGRwMBAnJycKC4u5sSJE+Tk5FBcXIzNZuOmm24iPT0dmUzG+fPn2bx5s7gA0Wg0ZGZmDjKhBgcHo9FouHjxIrt37+bMmTPk5+fT3t7O9OnTueqqq3B0dKSzs5NPPvmEr7/+GqvVilqtFhNsHDlyhC+++IKmpiYcHR2Jjo4mICAAtVpNaGgo7e3tnDp1ilOnTlFcXExtbS2LFy9m5syZYvx2UFAQbW1tnDp1itzcXPLz8ykrKyM2NpY777wTFxcXSahKSPzCkNkH2PGEsIVjx46J2mdqaiopKSmDfiyETGRlZYmaWkBAABMnTsTLy0vUZJubmykqKqKhoQGTyYS3tzfR0dHExMSIHpl6vZ4zZ85w9uxZjEYjLi4upKeniyn9CgsLOXv2LDabjfDwcJKTk+ns7CQ3N5fu7m7i4+MZO3Ys9fX1ZGVlYTabkcvlxMfHk5qairOz87ATnJAq8MSJE7S1tYlJEH71q19hMpnIy8ujpqYGm82Gm5sbU6dOxd3dncLCQjG0wsHBgbFjxxITE4PFYuH06dOUlJSgUqmIjY0lKiqK9vZ28vLyMBgMZGRkEBsbS3l5OVVVVbS0tGCxWHBwcCAwMJCEhAT8/f1RKBSYTCZycnJobm6mtbUVu92Om5sbWq2W+Ph43N3dR5y8rVYrpaWllJSUoNPpCAgIIDU1FblczsmTJ2lqasLHx0eMOd65cyednZ3IZDICAwPJzMzE2dmZw4cPi6ZOQeBFRETQ2trKyZMnuXTpEjKZDDc3N2bMmIGXl5forNbW1saZM2fEvUovLy/S0tIICwsTn5P6+npycnJobW1FJpPh4+PDvHnzBh1wbrfb6e7upqysjLKyMgwGAy4uLsTHxxMdHY2zs7N4zdGjR8VFj7e3N5MnT8bJyYnS0lJKS0tFi4QwdnK5HLPZTFVVFUVFRXR2duLk5ERMTAxpaWn9vL/1ej01NTWcO3eO1tZWVCoVYWFhpKWl4erqKglUCYlfIIOE6sDE5sL+6MCJTaDvvhsMnVC8b3mCx+fAROZDJcvv69gzVNLyvvUK7RQ8XYXvBaeVkSa44RKjC3GqQ7W9b2J2AcGLVejDvmX1vU/B8WhgonyBgX04sG/63u9QXrJD3V/ftvb1jBbuuW8fCXUJ9Qt19N3nFPYg+z4HA8dHaFdf03zfJB1973GkMRjOq3lgQv2BhyUM3JsV6ux7j32f8YFj0vcdGOkghr79NdoxkZCQ+HkySKhKSEhISEhIfD+k5bSEhISEhMRlQhKqEhISEhISlwlJqEpISEhISFwmJKEqISEhISFxmZCEqoSEhISExGVCEqoSEhISEhKXCUmoSkhISEhIXCYkoSohISEhIXGZkISqhISEhITEZUISqhISEhISEpcJSahKSEhISEhcJiShKiEhISEhcZkY9pDynzPCAeZnzpwRj4jre0qL3W7H09MTX19fvL29hz2hZzT12Gw2jEYjLS0t6HQ6goKCcHNzG/F3wqkn3d3dNDc309nZiYODAwkJCTg4OHyvtlwurFYrRUVF6PV6oqKi8PHxkU5kkZCQkPgffpFCVTgzds2aNZw4cYKAgADS09NxdXUFoKGhAQcHB8aNG8fNN99MTEzM96rHbrfT2NjIsWPH2LNnDyaTidWrV5ORkTHi7wwGAyUlJRw5coSLFy/S3t5OaGgoWq12xMPWfwwsFgt/+MMfKC8v5/nnn2fhwoWSUJWQkJD4H/6jhardbqelpYXt27cTExPDpEmTxPMyR0Imk5GYmMgdd9zB2bNnmTBhAk8++SRarRaAs2fP8s477/DWW2+hUCh45JFHcHR0HLUws9lsdHZ2cvLkSQ4dOkRubi55eXmMHTuWkU7as1qt9PT0sGfPHrZu3UpwcDCzZs0iLi4Of3///3OBCt+cSRoUFITRaESj0YjtsVgsZGdnU1RUxLJly9BoNJKwlZCQ+MUxqllPOEB6tAjXf9ejWgf+Zqgy+n5ns9mora1l7dq17N27F4vFMqp65XI5jo6OyOVyDAYDWq0WX19fnJyccHZ2Jj09neuuu47m5mYKCwvp6OgY9b0IJt9Dhw6JWvCcOXPw9vbud8j4UPT09LB9+3befPNNQkNDuf/++7nqqqvQarVie0dT/3Dfj/S30ZYjl8u5/fbb+f3vf09ycnI/obp9+3b+8pe/0NXV1e+g+OHaIh3lKyEh8XNjWE1VEA5ms1n8t1KpRKFQ9Nt/HIjZbBZ/I5PJxOsVCgU2mw2r1Qog/g2+0dCEj7C/KewrymQy5HI5SqUSm82GxWIBQKFQYDabOXPmDN3d3VgsFgwGg1iGUqkcdi/Ubrej1+upra2lu7ub4OBg3N3d+92Tk5NTv9+MVkMU2puYmEhSUhL+/v4UFRXxySefDPsbQcAUFBTwj3/8g/DwcG699VYCAgJGVa/we4vFgsViEe9fLpcjk8kwm81ivymVSlQqlTimFosFm80masFCv9tsNhQKRT/t2Gq1YrFYSE1NRS6Xo1argW8WN+3t7ZSWltLd3Y3JZEKv16NSqfqNv8ViEce57/PRt60SEhIS/8kMKXWECfrcuXN8+umn5OfnY7VaSUlJ4dprryU1NXVYc+gXX3zBxo0baW9vRyaT4enpycaNG4FvNLENGzZw4MABHn/8cTIyMpDL5eTl5bFmzRpMJhNKpZJbbrkFu93OZ599hk6n46abbuLGG2/k4MGDbNiwgc7OThYsWIC/vz/r1q2jra2NjRs3cuzYMVQqFSEhIdx9991MmDBhyJu22+10dXXR0NBAYGAgoaGhqFQq4BsBYTKZKC4uxtnZGa1Wi5eX13fqVLlcTlxcHPDNIkMQGsNht9tpbW1l165dlJWVcdtttxEdHY1cLsdmswHfCOuRhI7JZOLNN9/kyy+/xM/PjzvuuIMZM2YA8Prrr7N7925sNhtz5szhwQcfxG63s2fPHtavX09bWxtLlixh+fLlZGVl8dFHH9He3s7EiRO5+eabiYiIQC6XU1dXx3PPPUd5eTlBQUE8/fTThIWFUVtbyzvvvENOTg5ms5lly5ahVqtRqVRkZmayZs0ajEYjOTk57N69m8LCQoxGI3K5nClTprBgwQJSU1MloSohIfEfz5AzvdVq5eTJk9x11120tbXx5z//maeeeoqGhgbuvPNOTpw4IZpaBzJz5kyio6MpKSmhq6uLF198UdRs6+vrycrK4vDhw+Tn56PX68X9zeuvv57i4mIiIyOZPn068+bNY/LkyZSVlVFVVcXnn3/OqlWr2L9/Pzk5OTQ2NhIcHMyUKVNwdXVlwoQJ3Hfffdx///0sW7aM0NDQYW/aZrPR2trKhQsX0Gq1+Pn5id9bLBZqamp47733SExM5Nprr/3B9zIFx6mjR4+Snp5Oamoqdrsdg8GATqfDYDCI2v9QyGQyHBwcmDVrFg4ODpw+fZrm5mZR0//1r3+Nv78/OTk5VFZWYrfbkcvlXHnllUybNo3q6moqKyv529/+xr/+9S/CwsLo6OjgzTff5I033uDSpUvIZDKCgoJ44oknqK+vp7CwEJ1OB4BarebKK68kJCQEhULBihUruP/++7nvvvv49a9/jdVq5bPPPuPRRx/FZrPx3HPP8cILLxAXF8dnn31GdXW1uHiQkJCQ+E9mkFAVtNS7774bvV7PI488QlJSEmPHjmX+/PkYjUY2bNiATqcbcpJ3dXVl7ty5uLq6IpPJ8Pf3RyaTYbfbaWhooL6+HrvdTlFREb29vcA3k3JQUBDh4eEsW7aMkJAQ3NzciIiIQKlUcuzYMT744AO++OIL3nvvPbRaLRqNhtTUVFJTU3FyciImJoZrrrmGa665hmnTphEYGDjsTQua4YULFwgICMDd3R2z2Uxrayv79+/n+uuvRy6X8+KLLzJu3LgfXIMym82Ul5dTVFREWFgYly5d4rHHHiMtLY3o6GhmzpzJxx9/jNlsHlb4yOVyPD09CQwMxGq19tu/DQkJISMjQzS/CqZXFxcXtFotarWaTZs2odVqefXVV3n88cd55pln8PT0pLi4mMbGRgAcHBzw9fVFq9X22zP19/dn8uTJ+Pr6olAomDVrljgW48aNo7m5maysLACuvvpqoqOjSUxM5E9/+hNpaWnS3ur/YLfbRRO7sI0yms9I+9cSEhI/Lv3Mv8JLvW/fPurq6li0aBFBQUEolUpRo/Tz8+PAgQPo9fohPTwVCgVjxozB3d2dM2fOcPHiRUJDQzEajZSWlhIbG4ubmxtHjx6lq6sLPz8/TCYTJSUlhIWFkZiYKJo6BWFcWVnJ0aNH8fHxIS4ujnnz5iGTycT9U+FauVwutmckQWg2m6murqa2tpbm5mZuuOEGVCoVJpOJrq4uoqKieOONN4iLixuVN/G/i8FgoLq6GovFwp49e3B3d2f58uX85S9/4cKFC/zud79jzZo1tLa2snLlSpydnUcsb+C9C30zXJ/IZDKio6NZuHChGAcbEhJCWloaOTk5XLx4cciyhX8P7P++n77fNzU1UV5eTkJCAl5eXnh6erJu3bpvNW3/UrBarTQ1NaHT6UTfg9Hg5ORESEiI1IcSEj8BBu2pWq1WsrOzAfDw8CA3N1cULHV1dZjNZnQ6Hb29vfj4+AwqUCaT4erqyvjx46moqODAgQPcfPPNXLp0iba2NmbNmkVBQQHr1q2jqamJ8PBwOjs7yc/PZ+HChWKsaN/yZs2ahZeXl7jvKSBoXMJ1o52c9Xo9lZWVODs78+CDD3LnnXeiUChobm7m888/58UXX+S5557j5Zdf/s77qd8Hs9lMc3MzANOnT+eee+5Bq9Uik8mIiYnhz3/+M/Pnz2fbtm3MmTOH5OTky96GiRMn4uDggEKhwG63iyb7oTyWhxOsA68RvvP09GTMmDFkZWWxdu1aamtrmTt3LuHh4WJyDUkgfPM8P/zwwxw4cOA7CdWkpCQOHjz4A7ZMQkJitAwSqjabjfPnz2O1Wjl+/DhNTU2i9me324mMjCQ2NpbOzs4RNZ/58+fz2WefsWvXLpYsWUJVVRVdXV1irKafnx/Hjx8nJSWF/Px8ampquPLKKwd57MrlctGEfLno7e2lqKiIwMBA4uPjcXZ2RqlUotFouOeee9i/fz9Hjx5l165d3HjjjT94vKXNZkOv1yOXywkLCyMgIEBcyMjlcrRaLdHR0bS3t1NVVfWDCNUfUlt0cnLixhtvRKFQsHXrVt5++23WrVvH0qVLWbhwIePHj/8/zxT1UyEjIwOVSiV6a4+GsLCwH7BFEhIS34VBQlUmk+Ho6IhSqWTp0qWsWLFikAm0r2lvKGQyGWPGjCEwMJD8/HzOnz/PuXPnkMlkaLVajEajKFSXL1/Orl27GD9+PEFBQaPSgvoihJMYjcZR3bDdbqe3t5fTp08TERFBWFgYCoWin9nYx8cHg8FATU3Nj7JXpVKp8PPzG1J4C8LO2dmZjo6OH6T+0fTzaBHGom+/yeVyPDw8WL58OVdccQV79uzhxIkTbNiwgfz8fP7617+Slpb2o5jaf8rI5XJWrVolhjSNlpFC3CQkJH5cBs3igsnRZrNRUVEhJkQQPk5OTvT29vYTREOV4eXlxfTp0+ns7GTv3r1cuHCBjIwMNBoNWq2W4OBgUeAeOnSIq6+++nvHKtrt9lELQJvNRkNDA3V1dfj5+REeHt5PE9fr9RQUFIihOT8GarWa8PBwZDIZer0ek8k06BqDwYBKpRoUPzuQ4fpvpEXH9104DJeco66ubsjrHR0dSUpKYtWqVTz77LPMmTOH0tJSvv766+9k7vy5olAocHBwQK1W93vnvu3zXbJ9SUhI/LAMkopKpZJp06Zht9s5duwYubm56PV6zGYzHR0d7Nixg48++miQNjJUOXPnzsVkMvHVV19RUVHBmDFjANBoNIwbNw6z2cxbb71FQECA+Le+CAkKhvM0lsvluLm5IZfLKSkpoaOjA4PBQEdHh7hHObA8k8lEeXk5Dg4OhIaGinu4VqsVg8HAli1bqKurIzw8fNRpD0dCuIe+HrkD78XR0ZGEhARiYmKoqKigvr5e1FasVitnz56lurqa4OBgoqKihq1LpVLh4+NDd3c3dXV19Pb2YjKZqKur4/jx4yNmdNLr9YO0o5EyIgkHBQjXCNoowJkzZzCZTAZ2YukAAATASURBVPT29tLQ0EBFRQVvv/02OTk5oqdqaGgo06ZN+1YnKgkJCYn/JPqZf4UJLjk5mZUrV/Luu+/yxBNPMHv2bIKDgyksLKSsrIz/+q//GlHYCJlyMjMz8fb25ty5cyQkJIian0KhYOzYsTg7O7Njxw6eeeYZMQRHwG6309HRgdVqpbCwUPxuoHk4ISEBb29vysrK+POf/0xmZibnz59n3LhxLFy4sF+7BNPkoUOH8PDwIDw8XBRy1dXVfPnll7z77rsEBwfz0EMPiabh74NQrk6nIy8vj9raWpydnTl79izJycmidiH0eWxsLEuXLuWdd95h06ZN3HPPPXh7e5Ofn8+aNWvw8vLi/vvvJyAgYNg6nZ2dSUpKwmq1snnzZux2O97e3hQWFjJx4kR2795Na2trP8He09Mjel/3jYW1Wq1iJqa+39vtdpqbmzEajVRVVZGWlgZ8I1QnT57MwYMHee2111Aqlej1eurr65k6dSo7duwgNzeXVatWER0dTU1NDTt37sTd3Z3MzExJqEpISPwsUDz11FNP9f1CJpOhVCpJTU3Fz8+PiooK9uzZQ2FhIb6+vtx2221MmTIFtVo9ogOPUE5VVRWNjY3cddddJCUlifs/fn5+/Otf/8JgMPDaa6/h7Ozcr7xdu3bxj3/8g4aGBlpaWqiurubqq68e5FDj7OyMr68vxcXF5Ofn09nZydSpU5k9e7aYRk/AZrPxyCOPsHfvXnQ6HQUFBXz88ce899577Nmzh97eXhYsWMCTTz5JWlra9zarCXG41157LevXr+fQoUP09PRgMBjIzc1l06ZNvP/++1x33XViHY6OjkRFRREaGkp2djZvv/027777LidOnCA+Pp7HH3+c8ePHj9gmhUKBv78/arWanJwcioqK8Pb25oYbbiAgIIAtW7bQ1tZGc3MziYmJlJWV8cYbb1BWVkZraysNDQ1cc801tLW18dprr7F79266u7upr68nLS0Nb29v7rzzTgoKCjCZTDQ2NhIdHS16KgcFBaHT6Th+/DgFBQUEBQVx3XXXERoaSktLCwUFBXz66aesX7+eHTt2EBgYyOrVq5k0aRIODg6SYJWQkPiPR2YfxsYnpOszGo2iJ6Kjo6PoxDSaCVAw3dpsNtRqdb90fTabjZ6eHmw2G66uroM0QoPBIJokhYxBarV6kFOGYNIV2qlQKHBy+v/t3cGOgyAUheEDAmJ8/0d1YYxhFs011MG2M7Lo4v82TZpSlDY50avXqdkacN93LcvS7E7kvVeMUTFGpZRuXfFbStG2bVqW5bJWGEI4rjqu18ROQ1td1Zr/2+0u79bdTstat6oQgsZxlPQ4KpUeTRxijPLeHzVc55xijJrn+TjCrvsC55zlnNO6rsf6DcOgnPNTD2D7vlKKUkqapun4jezI1zo6pZT+9H8CgG93GaqSftUA60YLn6jHtsZZ4LRqavXc9T2orbnPtcKrBhBWC3zV7s9Ox97137nO497te0v9MAJJT6Ft32mv57nOn63Xv97G+v16H1rbXo+5s18A8O1ehioAAPgcT5EGAKATQhUAgE4IVQAAOiFUAQDohFAFAKATQhUAgE4IVQAAOiFUAQDohFAFAKATQhUAgE5+AFyjBd0S2YKOAAAAAElFTkSuQmCC)
A and Bare respectively
Two liquids
and
are made of same atoms, with following properties
![](data:image/png;base64,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)
A and Bare respectively
chemistry-General
chemistry-
Product (C) is:
Product (C) is:
chemistry-General
physics-
A beam of light AO is incident on a glass slab (m = 1.5(D) in the direction shown The reflected ray OB is passed through a Nicol prism On viewing through a Nicol prism, we find on rotating the prism that
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJcAAABkCAYAAACLmaLOAAAdyUlEQVR4nO2dZ0BUR9uG72XpHXFBUESkiAXFgiigRiUWgmhii2I0WF8TNHa/2DExr5rXQjSWRKOIJrGiqBGMPQkqVgKIFQGp0jtsu78fqBGxwq6A2esXnJnzzHPOuXfKc2bmCEgSKlQoAbXadkDFu4tKXCqUhkpcKpSGSlwqlIZKXCqUhkpcKpSGSlwqlIZKXCqUhkpcKpSGSlwqlIZKXCqUhkpcKpSGSlwqlIZKXCqUhmLFRQnycrOQX1KuULMq6icKFVfK6c1waWoB56EBSC5VTRP7t6NAcZUg/PABFIhaQR4ZgqPRGYozraJeojBxladHYe+Bq/D6bB4GtcnHtq1hUDWO/24UJq67J3fiTGELjBr2PgZ6v4e7x35CRJqirKuojyhEXNKsOKzbEo5uY6fAo2kD9BoxBW6mCVi7YR9KpIooQUV9RF0RRq4d3oyfzyWgk8VlLJ59HXKhOigvxuG1K3BqTF942xkoohgV9Ywa11wUZ+DQ/oPQsHWFmTwNd+LvI/5uPHRsOqMxr2Lr7vNQjRv/nQhqurSs4M5+eLQZCddNf+JHP5d/EiSpWPCROzYndce5i0FoqV1TV1W8PZKx1n8WDkQlQyYjCAJq6mjQpA1GTJqC4T1bvlaTV+OaK/d+LB7IGqJ1c7PKCRrGsLOzQWnGLcSnqcaN9YtiRP91Bn+nCdHV0xOenp54z70z9B7+hQkfDcK64/GvZ4Y1QZrL5YPsqN1mBGOypFWS088G0kxNwMFfH6FYXqOSVLxVbnF8h6bsNDqQJU8fLrnGYS1M2dFvLfNfw0rNOvTifJh0HIYVIz+AnamwSrK522AsD0jBA3M1iOWARtUsKuowlMtRabCvbQBtbS3o6OridR5ljftcKt5FbmOSax8clbTF5E96QxdyyCXFuBlxFKcTRVi3eyf6Oxi+0sob11xisRhBQUFo27YtXF1dq+W6irqFWCxGcHAwWrVqha5duwIQQCgUIPfedYTsyYI65ZBLy5GRcAuw84a4OB/Aq8X1xh16NTU1XLx4ET4+PtiyZQtkMlk1LkfF26C0tBS3b9/Gd999h40bN0Iul1fJk5qaipEjR+LLL79ESUnJo6OERCyHXc/x2H3sNxw7dgxh4b/jzwunMUgvEp98Og/RWeJXO1Cd7p5YLOaKFSuoq6vL8ePHMzs7uzpmVCgBuVzOiIgILlu2jL1796aBgQFFIhE1NDSYmJhYKe/Jkyfp6OjIjh07MjIy8qmUig59R99VzH3G/t09Uwk05Y9R6a/0pVqhCA0NDcyZMwchISE4e/Ys+vfvj6tXr1bHlAoFkJubi0uXLmHevHno0KEDPvnkE+zcuRPOzs44fvw4Tpw4AVtbW4SGhgKoaAZXr16N4cOHw93dHcePH4eLi8szVgmBUB1alY7JERd7B9A1hZmuFl5JTX8piYmJ9Pb2pqmpKbdv315Tcypek5KSEu7cuZMzZ85k586daWBgwB49enDhwoU8e/YsJRJJpfx+fn709vbmgwcPOHToUBoZGXHz5s0vsH6L49pbUNTGi8sCAxkYGMi1a1Zx4ZRhbKKtTrdJG5hX9mofaywukiwtLeWyZctoamrKzz//nHl5eYowq+Il/PDDD9TQ0CAAtm3blocPH2Z5efkL8x8+fJiWlpa0t7dnhw4dGBER8RLrCfzqkz5s1bIlHR0d6ejoyJYtW7F9l96cuXInkwpeXM7TKERcjwkLC6OtrS27dOnCqKgoRZpW8Qx79uyhpaUlFyxYQFdXVzZt2pSLFy/mgwcPquSVyWRcuXIlAdDLy4sPHz58Kz4qVFwkef/+fXp7e9PCwoI7duygXK4KzSuDzMxM2tvbMzg4mDk5Ody0aRMdHR1pZWXFgIAAJicnkyQfPnxIX19fNmrUiE5OThw3btxb81Hh4iLJ8vJyLl68mDo6Opw6dSoLCgqUUcy/niFDhnDEiBFP/s/NzWVgYCBbtWpFOzs7zpkzh506dWKnTp14+fJl7tmzhyKRiLm5z44BlYNSxPWYI0eO0MbGhu7u7oyOjlZmUf9K9u7dy0aNGjE1NbXS8dTUVPbr148ACICzZ89mZmYmk5KSaGtrywMHDrzUbkFBATdu3Mh79+7VyD+liosk79y5wz59+tDCwoJ79+5lTk4Oly1bxn379im76HeepKQkNmzYkKGhoU+OZWZm0s/Pjw0bNuTy5csZGBhIe3t72tnZccWKFXRzc6Ofn98LbcbExPD999+npqYmf/vttxr5p3RxkRXD5oULF1IkErFnz54EQENDQ/7666+V8slksrfhzjuDWCzmkCFD6OvrS5KMiIhgu3bt2Lp1a545c+ZJvoyMDH777be0t7envr4+nZ2dmZGRUclWeXk5N2/eTGtrawJggwYNXjGifDVvRVyPOXToEJs2bfqkum7UqBHPnTvH4uJiTpgwgadPn36b7tRrpNKKKU6bN2+mg4MD16xZQ1NTUw4ePJgpKSnPPScjI4PLly+nUCisVCslJiZy3LhxT54LAJqZmfHKlSs18vGtioskb926xQEDBjy5CAcHB3bt2pUAOHfuXNXo8iUkJCQwKCiIjo6ODAwMJEmeP3+eDRo0oEgk4qpVqygWiyudI5VKeevWLQYHB9PHx4e2tra0s7PjqVOnSFY8DwsLi0rCAkBLS0vGxsbWyN+3Li6SLC4u5ty5c6murl7pgtq2bcuystcI/f7LiIyM5IwZM2hvb/+kSxEREcGrV6/SxcWFADhp0qRK59y8eZPffvstBwwYQJFIRAsLC44fP567du2qVLOlp6dz6tSpNDIyqvQsrKys6n6H/kVERkZWaiIBUF9fn7dv364tl+ocoaGh9PT0pImJSaX75OjoyHXr1tHMzIwjRozg/Pnz2bZtW545c4Zr166lq6srrays6OTkxDFjxjAsLIyZmZkvLevDDz+sVEbTpk1f2Ly+LrUirrS0NLZs2bJKVSwUCvn999/Xhkt1kunTp1e5RwCoqalJExMTfvPNN5TJZIyLi6O2tjY1NTXZunVrzp07l0ePHn3t13B//vknzczMCICffvopvby82LhxY2ZlZdXI/1oRV3l5OYOCgujl5UWRSFTpxvXs2ZP5+a8zQ/vdRyaTccKECVXE1apVK/7+++9P8onFYoaFhfHChQtvHLAuKipir169CIDOzs5MT09naWkpb9y4UePRe601i4+JiIjg0qVL6eDg8OTmeXp61ri9fxdITU1l586dKwlLXV29UpihpixbtowAqKWlVSU0VFNqXVyPycvL48GDBzlgwAC2a9eOzZo148GDB2vbrVojOzubnp6eT0RlYmJCAwMDtmvXjjk5OQopY9u2bdTT03vSHCqaOiOup8nLy6O/vz/19fW5ZMmSf90IsqysjKNHj64Urjlx4gSPHDmikMkAEomEa9eupaGhIQGwQ4cONe68P486Ka7H/Pzzz2zcuDG9vLwYHx9f2+68NbKysp6Eafr168c7d+4oxK5MJuPZs2fp5eX1RLjt27fnzZs3FWL/Weq0uEgyKiqK7u7utLW15dGjR2vbHaVTUFDAqVOnUkNDg/7+/gpZnyCRSBgWFsahQ4dSV1f3ibCGDBnC+/fvK8Dr51PnxUWShYWF9Pf3p4GBAZcuXcri4uLadkkpxMTE0MPDgzY2Ngr5IcnlcoaHh7Nr165PZq0+bga3bt1aZSq0oqkX4npMUFAQTU1N6ePjw6SkpNp2R6H8+uuvtLKyYv/+/RXWDGZmZtLJyYkAKBAI6OzszA0bNjA9/dUrdxRBvRIXSV67do1dunRhs2bNeOzYsdp2p8bk5uZy5syZNDIy4oIFC146D/5NkUqlXLFiBX18fLh3716WlJS8+iQFUu/ERVZ0eCdMmEBjY2MuXbq03o4m//77b3p4eLBx48YMCQmpbXcUTr3eKyIoKAi7d++GmZkZBg4ciD59+kBPT09h9ssLc5FfKoOBaUPoKHATlZiYGJw8eRJHjx5Fo0aNsGDBAjg4OCiugLpCbatbEfz8806ampqyf//+CglZpP59nPMmDKFHl87s0KEj3Xr05+zVvzBFAa3Kjh07aGlpyX79+vHu3bs1N1iHqd/iEucz5vJ53rj/kDG34ti9mwetrKx4+PDhahqU8sbR1XRqqMvmHfpw9tL/ccO61Zw5/iPamemyZd9pvJ5ZWi3L2dnZ9Pf3p5GREQMCAhQ2UpMWpvPqhfOMe6CYqL0iqb/iKk/hDwsmc/Ks+Zw2wY/rDkcxJyeHU/z9aWxszICAgDfuHBfGn2Y/Oz06fbiIN7Mqn3v75EY6GQjZc8ZOvmmXOzo6mm5ubrSxsWFYWNgbnv1iyh/G8iv/Tzlj3jyOHzOeP1+oumaxNqkb4pLk8eyBH/l/07/g/G/W81zcU0NlSQEvhP7EL2d8wS+/CuQfsRUrXXIitnLwuKXMksiYGbWfI0fN4P1H4a+dO3fS0tKS3t7eb/ACXM6TgaOoq9uSu+8+Tz5S/vJlH+qLXBmW/PqzBYKDgykSiejt7c2oqKgXToMpTI7mttVL+MUXs7h2xxEmF/xThrw4lUeD1nDWF9MYsPonXkussBF94CuOmrmFhVIpEw5+zcHTNrF69apyqP2vlsmLcGjlFIyeEYgsDSPkXNuHscNHIzSuAIAExwKnYtjnq5ApNELRjUMYNeRThMTlgZCDWnowUleDoYEh1FiGske7+vj6+uLYsWPIyclB//79ER4ejqKiIuTn5z93GyEAAMsQc/ES6NAdHs00n5NBCBf33jCS3saVq6mvvKzCwkLMnDkT/v7+mDhxInbv3o24uDiMGjUKOTk5lfJKsq5i+seD8e3BGBgaCXFk1TSMmbMOaeUAZJnYNNsP/1m2BxJ9Q9wNW49Ro6fi8kM5hBIp1HX0oC8UwthIDzJxOerUhla1rW5Z+lWOec+Js35+NF9bFs9J3WzpPS+UMlk8J7g7cUbwo+19ZNmc09Oc3eceIYvu8qv/jObsb9Zw0VQ/zlkXxmfj9mVlZRwwYAAFAgFtbW3p6en54gWh0jzO621KUd/FLHrBe+Hsv7ayuZkRZ/107aXXFBsby+7du9PGxoZHjhx5cjwhIYHm5uZct25dpfx39i9iu27DGZFSsegi98p3tDB15r7YAsriw9i/iwu/O/NotU7RefZ1tOGUn66wNO0ivxg1kgGrA/nFpyO56lDMS/162yjkIwc1wqQFAn7cD4MmdoBcisKkRDwsBUQiY0CtEeZvC4FBk6YAZShMi0dqvhoamekAeraYuXQh/rwQDbnHe3Dr4gzdp8wmJycjMDAQd+7cgb29PTIyMqCpqYm8vDwYGxtX9UNNCD09bYhzS/Cij36UlpVAJgN0XhLu2LNnD2bOnIk2bdrg+PHjsLOze5JmbW0NPz8/7NixAxMnToSmZkUNadljEvZ3FKCppRAycSkS7iRCYNwQhpoCwKIrvg/+FQ2bmYEyCbLuJaCAWmhgqAftRi2w6Ou5OH/9PnS79Yd7J/tqPAAlUtvqfkLpA66f8zHtzbRp2WUsowufSpPkc8vcwXRspEfzTmN47Tk7Rz/N/v372aRJE7q4uPCHH36gWCxmVFQUu3XrxhYtWjA8PPw5Z0l5KOADapt68NQL9uk4sXY0jY0c+PONqkHb7Oxszp49m8bGxpw/f/4LA7sXL16kiYkJL126VCWtMOYgh77Xnvqa+vRdcZSV1vHkRHOBX382NhCy7eAlTK0Hi6SES5YsWVLbAgcAiMtQJNGAjbUFEq//hRQ2Qy9Xe2gIAEolKCqRwdquGVKuncJdaTN84NHiuTsK5+bmws/PD7m5udiyZQs++ugjCIVCmJubw9raGps3b0ZUVBR8fHygr6//1JlqaGCghmPB3yNa7AAfzzaVNj4rSf4T/zflSxR1/Bzf+PeCrqByuQcOHMCsWbPQt29frF+/HlpaL94c7dChQ7CyskKnTp0qHZcUFUBmZIVmBoU4c/ZvNO3SE47mFT6yvBhFAkPYNzFA9PkIlDZwhkebxnX7U7+1re7ncWb5UJq0+oAX06qmnf5uLC0a9+DZ54R17t27R3d3dzo5OT23ZiArplW3b9+eTk5Oz1lRXMrwtRNooq7DvuMX89Dxc7x44U+G7gykt7OIBtY9GRJdeRVNaWkpAwICaGBgwOnTp7/WoohBgwZx1KhRL85QlsiJHY3oMXPPcxJlDJ7sSlG3z5lU9MqiapVaF1funVP87OMxDEv6Z/h/Z4c/G7bqzxMRJ/mZ70SG3fynEx6zdwFtmnRm2DMv9vPy8ujm5kZ3d/dXRulTUlLo6+tLc3NzbtiwofJCBGkhzwQvY682zWhh1Yx2ts3Z2LIpe42YwRM3Ki+BT0xM5MCBAykSibh9+/bXXtAwffp09urV69F/cp77cT4nzNvMf2ZuFXKJVxN2/uIXJkfu5bgx03j1qW7C6a+8adJ5HO/X8XUstS4uccZVDnduwC5jVjEmMZ3x149zlKs13ceuY1refY5tZ8oOvssYk5DG+zGnOdajGdsPX8mnKy6ZTEZ/f3/a2tpW2VT2ZaxevZpGRkYcM2YM09KeqSYlxbwXc5nnI68x6WHVFTVhYWFs3rw5O3fuzGvXXj56fJb169fTxcXlyVz42yHzadbAhgG7IpiWkcqzuxazecOmXB6eyOL74fSwNuHAL3fxbko64yJ+5fstLDho0f4qo+O6Rq2Li5TxwflfOLBLG7Z3dWNnZyf2Gvl/vJZeEQ5MvrSHgz3asb2rG107tGGPYbMZ+aBye3DgwAHq6+tX67XPmTNn6OjoyPbt2z+zo/HzKS8v54oVKygSiTh58uRqzRTdu3cvnZycmJCQUHFAWsD9/53Adq3b0M3djW2cXDhjQxgLxSQp4d+H1rBHO0e6dHVnxzZtOGjqGt7PV+5EP0VQB8RVgbw8j3HXLzPmXiqrjAXFBbx5/TKjb6fw2YanqKiITk5OnDx5crXLTklJ4QcffEB9fX0GBwe/MF9WVhaHDRtGHR0dbty4sdrlbdu2jR06dKgyaa8gI55XLl9jck7VOLuk6CGjr1zmrQc1W6j6Nqkz4qou+/bto4WFRY03l8vPz+fcuXNpamrK+fPnV5lY93hfBgcHh0oLUqvDqlWr2LVrVxYWFr46cz2m3ovr4sWL3LJli8LshYaG0sbGptJ04+3bt9Pc3JxDhw6t2jerBrNmzWLv3r1rbKeu88aTBaVSKS5cuICioiK84alKQSgUQigUQix+jc+FvAZaWlq4fv06/vvf/0JfXx+Ojo4IDw9Hnz59MHnyZOjo6NTokzQksWjRIhgaGmLevHmQSCQK8bumqKuro3nz5rC1tVWYzTcWV25uLlq2bAkdHR00aNDgxS+C3xICQUU0U1FCFwgEUFdXh0AgQF5eHrKzs2FtbQ0NDQ1IpVKFfetIXV0dUmnd+Lq8UChEbGwspkyZgpUrVyrMbrXeLcpkMixfvhyenp51ovZSFhKJBGVlZTAwUOwH4B/fs8c/jNpGIBBg0KBBCq9FqyUukjA1NYWpqalCnVFRe2hpaSm8oqj2qynVp/DeLZTRAtX+lJtqIi3MQFRUDNLyy2Fk3gzO7VrBQKMiTS4pRnJiBgytrGGsVVvfPpYhJy0ZRQJjNG1k9NKchZnJyBZroUljUf19IM+hTr9UfyFl2fgrfB82r1uDFStW4rtN2xB+/gbKHyVLijNxLuw47ueXv9SMcpHg7tWz+Ot64itzpsRcwJmLcSh7C169TeqZuOS4cSoYk8d+hl8upMKypQs8e/dE6ya6OL5pAcZN+y+iswBZ7i18v/Qb/JVaVIu+luD0L+uwaW/kK3NGHd6CtUHh75y46lUtLJfm4njQOoREWyH0+2XobPJP2p0jKzF+5R9IKwYcBGoQqqtD7dFgrCA9HrcS0iGRA4QQBg0t4GDXFNpqRG7qPdxOzICMgECoDcvmLWAt0oe8JAuxN+6hQCyDAGrQN22Mli2soPGMTxQX4FbsTWSXSAEIoNugEVo42EBXCKgJhRAKK36/8vJ83I67hexiKQQg1LUN0czeAWaGWhCqa0Agzkf09UhoFEmgrqUHa4eWsDB6jQ9m1mHqlbjyYvdjzb5sLDkVUklYAGDvPQdnvecAAPLvPRrqq2kAmVcwadAw3DDywPD3HJEZdwJBx3Ox+vBx+NqmYubHQ3Hf2gv924hwMXQronU+wrnwxYhY+Rm+PFSAESN6QnLnD2wNe4Cvdx/HeDfzSuWe+2E2xm+MxUcjfaCXfR0/7rqM/2w5ivkDzCEAAIEAgBwHv/HD5zsSMeyTwTBnOg78FAxj3w0IXzkCGtpC3PsjCHPm5cDL1RaXQ4KQ1nIiQn+YjyYGdSNcUR3qlbhKHyQiy9AczY0fz2GX4v71P3DhRjogEECooQ1nlx5ooq4GQACBmgBFGWmw9BiDBUsWobU+gNIPkODkjQs37sJbNwWXbxXDd9FkTO3lAMEYH+wNuwmW5+CPc1Gw6DwNn00eBzODz/HenhCo6T0bMBbjytkIaLcajEmfTUFzEx306x6MDLOnb6sAQAEyZdZY8uNyTPKsWLbfSngXE45FoAQjQGk5dJr3wOrNO9DNSh2Fw9uhx3tz8EvkSMzu3Vzp91VZ1CtxCfV0oVlehuInkW0Jbv55EOt3RkIgLEd05G3M/F8IFgzXBEDIpRLot/PGws/McWDrcgQnJONBQhwuphXjA4kUDWw8MNrHDl996I7d7Tuhi3tPDB75CSx0zTBy3HAcnT4HHc9tg6urK/r4DMPIthbPeKSJAePHYefYAHi4HEQnFxf09h6CUc42AHJAAKAcgDEmLVqAU4dCELBgK9JTknDt/BXITGxBAFKZBhzad0Nbq4rHYdC8O7o2K8GVmBSgHourXnXojRy7wkmYgN+vJjw6ooP3J67A8RO/4/jJHfBxagLyce0igFBDHZkXtsPbeyR2nIkDjK0xwG88ulgZQCoVQ6Brjsnf7sOFEzsxuqcD7p36Cb6DBuPX64XoNGwOTp8/jzUzhkI/PxbLPvsY/isPo6xSOIiw6TUJYefP44dFY9EYKVg/dzR8FwRDItes6POpCQFxKhb6foDJK35BWrEQrbsPgu9AF2jKZJA/skP5478BUAKxRAAt7doKoyiGeiUuHXM3jPV1wp6lC3EsLhsAoK6pDT19fTAzBQkZuZDjcR9FDRrqpfgjdA8SNVyxJSQIyxfPhk8rTdxPKYS6hgZSbx7G5/9ZilKHvpgWEIjwfethy9u4GnkR3305Bbui1TFkwmxsDzmBad1MEXnhCgoqeZSDLfOnYN2JTHiPnoqNv/yG/42wx4WIyyiREmpqgop+34PT2H4yDeOXbcOmNd/A388LkgfxKJRXNJoaQiniLp3B9aQSAMCDyP04mdwA3Z2bvcW7q3jqVbMINW2MWrgJ8Q8nYmI/Nzi59YCzbUNk3r2OPy/GQKNFH7z3fieIyy6htLgQpRIt9OzZF6a7V2Py8PFoJQKS4pNQoiXBg6QsmAy0g27uaXzcxxNuba2RG/83yuyGwvejLkj8cRemzfgQEXu6wEj6EFdu6sHv6yFoWKl/bYTWtnr4dulYXA7rAgvNIly7VoKJs4fBQBMoLS5GKUuBJt0xsIMBtiyciPu/tUDpw0TcuimGRmEKUsWEnAKIM/7Gkv+MxFZD4O8rsXCZuAQfdXq2Ga5fVGtWhL29PXbt2oW+ffsqy6+XI8nB2aOHcOKPy0jIKIChmTU6dO0BL6/esNBTgzg/CYf3n4aDz3A4NdRA3F/HcOrSLch1RHDp4QmTh+dxpcwWH/dxhjT7Hn777STiHxZB39wWPfv2hb1IG0Axrvx+DBdikyDRMIJT197o3eF5NYkEcX+F4eyVuyiBDlp26gFPt5bQQBmu/n4Yieqt8WHPVihKjcHR384gpRCwat0ZXRz1cf5UNDoPHwr59XDEFBnCXOMhLl5LhKiFKwb07wr9tzhQ7N27N5ycnLB27VqF2ay2uPbs2YNevXopzBEVtcv777+P1q1bK1Rc1WoW5XI5Tp06heLi4tqdzyUQPOphEe/wzB+lIxQKkZycjNatWyvU7huLSygUwsnJCSEhIQgNDX2n53P9WxAIBJDL5bCyslKs3TdtFuVyOdLS0iCRSFTCeocQCAQwNjZ+/iYt1bX5puJSoeJ1qVdxLhX1C5W4VCgNlbhUKA2VuFQoDZW4VCgNlbhUKA2VuFQojf8HXbQ6aG/IWUwAAAAASUVORK5CYII=)
A beam of light AO is incident on a glass slab (m = 1.5(D) in the direction shown The reflected ray OB is passed through a Nicol prism On viewing through a Nicol prism, we find on rotating the prism that
![](data:image/png;base64,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)
physics-General
chemistry-
Consider the following reaction and identify (b) ![](data:image/png;base64,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)
Consider the following reaction and identify (b) ![](data:image/png;base64,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)
chemistry-General
chemistry-
Give the decreasing order of the reaction rates of the following benzyl with HBr
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)
Give the decreasing order of the reaction rates of the following benzyl with HBr
![](data:image/png;base64,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)
chemistry-General
chemistry-
The product (x) and (y) are:
The product (x) and (y) are:
chemistry-General
physics-
Coherent light is incident on two fine parallel slits
and
as shown in fig If a dark fringe occurs at P, which of the following gives possible phase differences for the light waves arriving at P from
and
?
![](data:image/png;base64,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)
Coherent light is incident on two fine parallel slits
and
as shown in fig If a dark fringe occurs at P, which of the following gives possible phase differences for the light waves arriving at P from
and
?
![](data:image/png;base64,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)
physics-General
chemistry-
There are two paths (I and II) for the preparation of phenyl-2,4-dinitro phenyl ether
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9Qq9VuS5jiG3FkZISwsDBuv/12fHx8JLVYo9Hg4+PD4OCgNL1xOBz86U9/4o477iAsLMytAYODg3zwwQesWrWK0NBQt3OIiCsZJpOJRx99lI8//pi2tja33729vfn2t7/Nhg0b6OrqkqYrF/s4nU5aW1vZuXMnixYtYu3atTz00EMsWLCADRs2SKtA4vTkYsfo7e1l165dLF682G3KJQgCXV1dvP322zz00EMYjcYJV8PEMYuOjiYzM5OdO3e6CUKVSoXFYuHhhx/mtddeY2Rk5JJ9E43VFotFWooWY37sdjvDw8Ps3r0bs9nMAw88wCOPPMLdd9/NgQMHpGX0sZ8LBVdNTQ1xcXFXf6fJfK0Zd2crlUri4+Ox2+2XtDUYjUays7PRaDRuc2uFQoHZbKaqqkp6e+3Zs4fh4WGWLl06zlGtqamJkZERoqKiLjv/F1czjEYj586dcxNKSqWS6Oho5s+fzx/+8AfuueeeSx7Ly8sLh8NBQ0MDGRkZUszQwoUL+dvf/ibZD3p7eycswyAKmMOHDxMYGMiMGTPcfnc6nZw7dw6TyURQUNBlp0lqtZqIiAjy8vJobW0lPDzcLVBy7ty57N+/n9dee43s7OyLTnHUajUul4vg4GCys7NpamqipaUFp9Mp2XMqKyslZzm1Wk1SUhIWi4Wuri7sdjvV1dVs3ryZwMBAVq5cSWBgoNTnsrIyt4TWMjJwkaA9Ufu45I7/v6YyEf7+/lLQmiAIfPjhh3zrW98aF38jCAJ1dXUEBgZeUSY1UWBFR0dTVVXFTTfdNO635cuX88c//lGqYHex4/j7+/PYY49JxkZxW61WKwkNl8vF8ePHWb9+/UUFSW1tLb/73e/cXNnFKd2ZM2fIzMy8otUWUasyGo00NTWN09w0Gg3Z2dn88pe/5NChQxe9PuL0VK1WM2fOHD766CPOnj0rtV+caoovADh/vbVaraSBPP3003z/+9+npKSEjRs38oMf/EBaeWpoaBhn55GRmRTfa4vFIkUQKxQKnnvuOe6//35uueUWfHx8JsUPQVyt+NOf/sTLL7/M8uXLL3kel8tFdXU1ZrOZ5uZmgoODUavVlJaWEhAQIE3rbr75ZlasWDFOxReFRX5+Pm+//TazZs1yezi/7L4NDg7y/vvvs3HjRiIjIy8qnOx2OwcOHJASEd12220cPHhQuhYajYbg4GDq6+slP52Ojg7q6urw8fFBrVbzyiuvSFrIkSNHpPEqLS0lNjZWTp8pM45JcUwwmUxoNBq6u7txOByYzWYeeeQR/va3v7nN/8Wl0La2tnGrPBMhPrw1NTXExsa6/eZ0Ojl48CBqtZqlS5dKbveX+oSGhrJs2TLWrVvH8ePHyc3N5e9//ztr1qyRVm3EEpwX7qvRaKR4o+joaHbt2iX5zojaUXp6OidPnrwi931BEOjv78dqtUpL6eL3TqeT9evXM2fOHGJiYq6ob6KtKSkpScqJolKp0Ov13Hrrrezdu5c9e/ZQUFDAW2+9RVJSEnFxcVLt4paWFnp6erjrrruk8S0uLiYhIWHKBRLKXH8mRZBoNBqmTZtGa2srnZ2dqNVq1q5dS1lZmduqBJzPb6HT6a7IFVwQBKlubkJCwrjvt2zZwuOPP35FN7pSqcTLy4vbb7+d5cuX89Zbb7F+/Xruuece7r333ivyRVEoFHh4eLBs2TIKCwtpaGiQhIZKpSIhIYHu7m5aW1svKyQdDgf19fUYDAY3m4qoOR08eJAHHnjgsr4eSqUSf39/0tPT0el00qrPqlWrsFgsqNVqUlNT+dnPfkZeXh7PPfccHh4e/PCHPyQgIABBEKioqOCzzz4jNDRUsv2Mjo5SXFxMamqqLEhkxjFpJTv1ej25ubmEhYURGBiIWq3Gz8+P7du3M2PGDOmNr1KpMBqN7Nixg8TERLy8vIDxmddcLhc9PT289tprLFy4kJkzZ0pTl5GRETZu3EhAQACLFy++YtVboVCg1WpJSEjgtttu45ZbbiE1NVVq25Uew8PDg56eHioqKkhMTJTOr9frUalU7Nu3j4yMDMkVfiyizaKqqoo9e/awcuVKIiIipJiWvr4+XnrpJe6++27JY/Zy7RJTM4grb15eXixbtkzy/1Gr1QQFBbF48WLuuOMO5s2bh5+fHyqVisHBQX7xi1+g1WoJCwvD4XAQEBBATU0Nhw8f5pZbbsFsNsuCRMaNSdFIVCoVkZGRaDQaampqsNvtKJVKMjIysFgs7N27V0o/qNFoJJX9rbfe4tixY+NSE7pcLoqKili/fj1arZbbbrtNeiu6XC5KSkpobW1l/vz5V10PRnSi0+v1GAyGcXEvV7K/n58fmZmZNDU1UVRUJP2mUChYvXo1Go2GDRs2UF5ePm5/u93O/v372bx5M6mpqaSnp7tNa/bt24dSqWTJkiVXZINRKpXS1EcUhuJ3Y/umVqvR6XR4enqi1WoloTw8PIzRaMRgMFBUVERzczMAp06dIjo6+rqFIMhMbRTCJIVyCoLApk2bKC0t5cknn8RkMuFwODhz5gxbt25l7dq1JCUlSdtO5CJvNpvp7e2lrq4OtVpNfHz8OBf57u5u3nrrLWJiYlixYgUeHh7XJSZlYGCAbdu2YbVaueuuu6TCYJdzka+vr8fPz2+ci7yYQe6vf/0r999/PxkZGV9JsNzo6Cjd3d3SVExMF/HCCy8wc+ZMli1bJtf+lRnHpE1txByvmzZtYu7cufj6+qJSqfD09KSlpYXKykpSU1OlN6deryc2NhZ/f3/JUCsGCEZFRTF79mzmzZvn9kYUBIGDBw/S1NTEsmXLsFgs1+1tKZbfyM/PB86HG4gBjF5eXsTExGA0GnE6nbS1tdHU1IReryclJYUFCxYwY8YMKcwAzk/XPvzwQ0JCQpg3b95XtlKiUqkkL19vb280Gg1lZWVUVFQwa9YsgoKCpkTwoMzUYlJTbwUGBpKRkcGBAwcIDg5Gq9Xi6elJdnY2n376KQUFBW5xN0qlkoSEBGJiYi6aRkDE6XTS1NREeXk5qamphISETGZXLotSqSQkJIRp06Zx+vRpkpOTCQsLk6YXBoOBGTNmkJycfNk0AoIgcPbsWdrb27nvvvskW8f1wOl0curUKQICAggLC5OFiMyETOpdodFouO+++9iyZQs2m02KPk1KSiIsLIzjx49LTmvw79gSvV4veYT6+/u72S5EHA4H+fn5DA8PM3/+/OueAFps+8KFC+ns7KS8vBy73S4tByuVStRqNV5eXgQEBBAUFISfn59kkB27SjMwMMDhw4dJSkoiIiLiuhXsFgSBxsZGGhsbSUhIuOq0kTLfHCb1rlAqlVgsFhYuXMj69eulh0qlUjF//nz6+vooLCy86gxggiBQX19PUVEROTk5GI3GKWMA9PT05J577uGzzz6jubn5qlNAOhwOjh49iiAIZGVlSZHAXzWiO/2xY8fw8PAgKytLFiIyF2VSpzbim1gMiHvggQewWCwolUoCAwPJzMzk9OnTeHh4YDQar/i4TqeTwsJCdDodM2fOnFI3uFKpJDMzkz179vD555+TlZV1VUbSvr4+jh8/Tnp6upTs6Hog+q80NDQwZ84c2cAqc0kmPT25GMT37W9/m7y8PFatWiVNA5YuXUpFRQV//vOfrzoPaGxsLE888cR1e2NfDFF43nvvvfz5z39m586dV9U3MRdtZmbmdU1pODIyQnFxMQBZWVlTKpO9zNRj0pZ/xyLm/ujo6HCLExHVZ7Ga39UguqlPlTIUF+JwOKQI4qsZYjFzv+jmfr3o7+/nyJEjksF8Ko6xzNThKxEkMjceY6OEZWQuhyxIZGRkrpmpY6WUkZG5YZEFiYyMzDUjCxIZGZlrRhYkMjIy14wakEpJilXm9Xo9DoeD0dFRKb+py+WSSkyINWUAt0AzcTnX6XRO6MAk5hUZGRlBpVJ9obq/Y9uq0+kwGAzjqtqJ5xGzrY9t45Ug7t/X14fT6cTb23vCtoqZ1oeGhqT+2u12qRj4F10ydTqd2O32S+bF/aKMDUe4lm2+bK70nGKhejEtwpdxzCtpm9PppL+/X7q3xdAGmfOonn322WdHR0cpKiri/fffp6SkBE9PT/Ly8ti0aRN1dXVkZ2fT19fHpk2byMvLQ6lUUlhYyNDQEAEBAdLNLggCzc3NNDY2EhQU5HYi8WJUV1eTm5uLVqu96kJLYjrCffv2ceDAARoaGggPD3cTbN3d3Wi1Wtrb2zlw4AB9fX2EhoZetSCpqKhg7969HDp0SIpAnijZ0smTJ9m/fz+JiYk0NDRw7NgxtFotvr6+X8grVRAErFYrjY2NUp6UL+uBFttstVov6qkqjrHoNPhVIL4cXC7XZc/pcrkkRzkfH59LbiuO5bVGTosF2g4cOMDx48dpbGwkMjJSzl07BiUgZSnr7e2lsbERo9FIQEAAn3zyiVQLWKPRoNPp6O3tpaOjg1dffZXTp08zOjrqFitjMBikSncX1oRxOBxSXtS2traLOmtdqFWMLbRVUFDAgQMH8Pb2pry8nO7ubgBJ0/nrX//K8PAwFRUV/OUvf5EyqF9Yr/hidVvEcz733HNSZvXc3Fy338T9BEHgH//4B++++y7Dw8Pk5eXx7rvv0tTU5NYHcfux+48tmTn2b5fLhVarxWg0otFoJjyO2Oaxx7iwjxeOoyjIm5qa2LFjx0Vr4zidTrZt2ybFCV3s3BdeW/G3sZ+J6uNM9H1/fz/Hjx+nurr6oucbi8lkwtPTUxqDibYVBIGenh62b9+OzWYb1xex/s+F/Rf3HTueLpeL9957D39/fwIDA9m2bRsVFRVX8Zh9/VHDeS/RhIQEVq1aRWVlJQEBAcTFxTFnzhzpgmk0GilBcFxcHJs2bcJut1NbW4tSqWTatGlS7d+xN01TUxOdnZ1YLBYsFguxsbFYLBb6+/s5d+4cZrNZqmkrIggCvb29tLS0oNFoCA8PR6fTUVVVxfbt2zGZTGRkZHDzzTdLVd8EQeDEiRP84x//YP78+RiNRjIzMxkZGaG+vh61Wk1ISAharZaRkRGqqqoAiIuLc5u2DA0NUVxczP79+3nsscfIysqSBEpnZyetra0YjUYpbUFmZiZlZWUAhISEYLFYpBtQHB+bzUZ4eDgeHh40NTUxMDBAREQE7e3tDA4OEhoaiq+vL0VFRZhMJsLDwyXVWSzZERQURG1tLSaTCYvFAiAVd3c4HCgUCimtpTgew8PDtLW14efnh91uR6fTsW7dOsrLy8nKyiIyMpLW1lZ6enoIDg7GbDZTXV3Na6+9hlqtxtvbGy8vL1paWujv7ycqKgpvb29GR0dpb2/Hy8uL5uZmwsLCGB0dpbOzk9DQUCldppiUyt/fX0qp0N7ejk6no7W1Fb1eT1hYGGVlZbz++ussX76coKAgHA4Hg4ODUvpH8Xhw3vNXjAYXNWCn04nJZEKtVkualtPpZPfu3WzcuJGwsDAWLFiAzWbDarVKaRxsNhuxsbH09/fT3d1NbGws3t7e2Gw2amtr8fDwkBJxR0VFsWzZMlwul5QYW+bfuOmRYWFhVFVV0dLSgo+PDz4+Pnz00UesWbMGm81GS0sL2dnZ+Pv74+npSXFxMXq9nl27dvHzn/8ci8XC66+/TmhoKI8//jj5+flSJOuZM2f43e9+J+X7PH36NGfOnJGiZQMDA1EqlZLw2bJlCxqNhurqambNmsXSpUuprq6moKCAhIQEmpubmTFjhiSABgcHKSwsxOFwUFxczOLFi/H19aW8vByFQkF5eTmPP/44SUlJvP7668D5Gz0sLIwHH3xQsmkMDQ1x4sQJ6Thms5moqCgKCws5duwYCoWCoqIiVq9ezfz586Wqc2q1GrPZLAUf2u12NmzYgEKhwGq10tTUxH333Ud1dTWFhYXceeed1NfXs2HDBp5++mni4+PZsWMHqamp5Obm0tPTw5133sknn3zC3r17eeihh6itraW1tZUf/ehHNDU1ceDAATQaDUeOHCE6Opp7771XEiROp5PDh2w4K/UAACAASURBVA9TUlJCWFgYGo2G2NhYTp48SX9/PxUVFTQ0NHDkyBGpXvN3vvMdzpw5Q2VlJRUVFUybNo2Wlhby8/NxOByYTCaWLFnCG2+8gZeXF8nJyeTn5xMcHExaWhqffPIJ8+fP5+abb6a/v59XX30Vf39/+vv7uemmmxgcHOTDDz9k5syZkqb3u9/9jtLSUsrLy0lISKCxsZGCggIEQWB0dJTFixeTmJgoTSFOnTrFunXruO+++0hKSuLtt98mOjqawcFBli1bRkREhPQiKi4upqWlhbNnz+Ll5cVbb71FXFwcUVFR9Pb2snfvXn74wx8iCAIvvvgi/+///T+CgoLYtWsXLS0tdHd3S/feHXfcgVqtpqOjg8HBQeLj47+aJ/QGwW0SHxgYyPDwMA0NDfT19RETE0N+fj69vb3Y7XbpZhIfXrPZzIwZM4iJiaGsrIy+vj6pRm1fXx87d+4kKCiIJUuWMHv2bCmmRqvVEhUVRXZ2Nq2trXR3d0tv8ZGREYqKitBoNMyfP5958+axdetWampqSE5Oxmw2k5aWJhWeEm8wMTu6Wq1m8eLFUv0ci8XCnDlz6Orqorm5mbKyMrZs2cLQ0BBWq5XNmze7ZXn39PQkJSUFlUrFkiVLCAsLw2q1UlJSgtls5qabbmL27Nn87//+r2SMBtxifgRBoLS0lObmZubOnctNN92EwWDggw8+YNq0aWg0Gnp6ekhLS6Ozs5Oenh4EQSA0NJTY2FjKysooLy9ncHCQxsZG9u3bR0xMDDNnzqSjo4POzk6OHTtGc3Mzs2fPlto7toC5aI8S7TtGoxFfX18pqjgjIwMPDw8SExMJCgpix44ddHV1SVX8pk+fjsvlYt++fbS0tDAwMMDbb79NdXU1FRUV1NbWEh8fT0BAAGVlZcTHx+Pt7U1JSQk2m43t27dTVlbG0NAQhYWF7Nixg46ODk6cOIFOp2P27Nl0d3dLmkBSUhLTpk3DYDDQ1tZGcHCwlGVu7JSlvb2dQ4cOSQ96a2sriYmJhISESC8iOD/FTkxMJCIigoULF2K1WqWUCNnZ2SQlJdHT00NPTw8JCQm4XC56e3spLy/nvffeA6ChoYHPP/+c7u5ugoODUSgUnDx5khUrVriVDJG5QJDo9XqCgoJob28nLy+PnJwc7rjjDo4ePUpHR4dURArOPzgWi4Xw8HASEhJwOp34+vpKN+Lg4KBURjM+Pp4HHnhAKjyl0+kIDg4mPj4eT09Pt6nQyMgIra2tREZGEhsby/Lly1EoFNhsNkwmE97e3pjNZgICAtw6IhpvxXo1Wq0WjUaD2WwmLi4Ok8mEQqGgrq6O0dFR9Ho9kZGR3HbbbW45Q7RaLQEBAahUKkJCQvD09MRms9Hf309ERAQxMTHceuutdHR0XDIYr76+HpPJRFRUFAkJCVLCo4SEBJRKJfX19fT09HD77bdz6NAhBEEgICCA2NhY0tLS8Pf3B2Dp0qV4e3sTExMjCQSFQsG8efPw8PDg8OHDHDhwgGnTpkk1mOG83SsnJ4e2tjbeeustlEol3t7e+Pn54ePjQ2BgIL6+vhQXF5OXl0dHR4dU6lOlUmE2mxkdHaWlpUVS8VetWkVISAjLly/HYDAQExMjpZCMiIhw04ZOnTqFl5cXXl5ezJkzhxkzZpCSkkJUVBRBQUFER0cTGBiIQqHAZDLh4+OD2WwmPDyclJQUXn31VfLz88cZVGNiYoiNjUWlUhEaGkpqaio//vGPqampkabhYupOX19fjEYjYWFhZGRkSKVJg4ODCQoKwsvLS0re7e/vj9PppLGxkZ6eHnx8fMjKymL69OnS1FesOjB9+nQ5GvoC3ASJWFBpeHiYEydOYLFYWL16NW+//TYFBQWSHUR88MSQebF0glKplC6mSqWiqqqKzs5O4HwSYdGYJu4r7jf2gVQoFFL9WfGhCAgIGJcu4MK3wdi2wL8NjeJ34rmMRqOUI+XBBx/k1ltvHWefuRCVSoXVaqWlpUX6XZzzT2RkFAQBrVZLcXGxtL1OpyMwMBCNRkNmZqZki7njjjt45513KC0tJT09Ha1Wi4eHh2Qf8fT0HFcvWbwGiYmJeHp68p//+Z+SwB17Lf39/fmP//gPHn74Yak4uRhd3NXVxc6dOwkJCeGxxx6THuqxH51OJ+WMffDBB7nnnnvw9fWV6iSLn4kisAMDA4mJiWHt2rU88MADpKeno9fr3dJKXthehULByMgIaWlpvPLKK4SHh49Lw6DT6aR7wWazsWTJEjZs2ABAXl7euPtBPK5er5fcAMSPuHwraiOff/45er0ef39/br31Vh555BFmzZol1TgaHBwkNTV1wrIi33TcxKpSqSQiIoJ//etfUlW2efPm8eSTT7Jq1SpJezhy5AhVVVUMDg6SkJDAzp07GRwcxGQycerUKQYGBqipqSEnJ4d//OMflJeX4+3tTVhYGOXl5Rw6dIjIyEjOnTvHzp07MRgMREVF4eXlhaenJzNnzuT555+XCoxnZGQQGxvL4cOH+fzzz7Hb7URERDBv3jyp7WLmNb1ez3vvvYefnx/79+8nLi6OnTt3Ul5ezvDwMD/5yU+IiIjgpz/9KdOnT0ehULB27VpJKHR3d7N582YA3nzzTR588EECAgJITk5m48aNFBUV0dDQwCOPPIJarWb37t309vayZcsWPD09peXiRx99lJ07d/KjH/2I9PR0Kioq+MEPfoBCoSA5OZlTp07h7++Pv78/9957L9u2beP3v/893d3dlJWVkZeXh7+/P01NTTgcDnbt2kVXVxfbt2/HbDYTGRlJSUkJFouFuro6hoaGWLlypfSQCILAqVOnOHbsGKOjo9L1FZM5f/bZZ3R2dlJQUEBzczP9/f2UlJQQFxeHRqNh//793HLLLZLd69y5c7S0tLB8+XJ27dpFX18fR48e5dNPP6W5uZmPP/6Y3NxcGhsbmTVrFvfddx933XUXTqdTSp3p6elJU1MTJ0+exGq18vnnn+Pj48Ndd91Ff38/ubm5aDQaTp48icPh4Pjx46xZs8bthq2pqaGxsZFdu3bh6+vL559/TkhICHl5eSQnJ7vf3Go1ra2tvP/++wQGBnL48GGSk5Pp6+uTNKBPP/2Uc+fOSXWe7777bhISEvjFL35BVlaWtIIJ0NbWRm1tLcHBwV/+k3iDMy76VzSM6nQ6YmJiUKlUHDp0iJCQEOLj46U6MiUlJTidTuLj46WVm9DQUKqqqtBoNKSlpREVFUVRURH19fWSypqXl0d7e7s0Dens7MTX15cFCxZI/iAjIyPU1tZKhsKUlBT0ej15eXk0NjaiUqmIi4uTBIHYbpfLxd69e1GpVPj4+FBTUyPVs21vb0ej0bB48WJUKhW5ublSOkOxsp1CoaC7u5u8vDz6+vrQarUsWbIEo9HI6Ogo586do7KykuTkZKKiolCpVGzbtg273S4JhaqqKinBtV6v5/Dhw4yMjDBv3jxpZcFut3PixAnCw8MJCgqirKyMgYEBZs+ejdVqpbCwUFpt6evrY3R0lODgYCkDvb+/P0ajkfr6eqk4eFVVFbNnz2bZsmUolUpcLhcdHR10dHTQ3t5OcnIy/v7+WK1Wjhw5Qnp6OoIgUF1dTXx8PFVVVZIN6sSJEwwPDzNnzhyphEhHRwfJyck4nU5KS0tRKBSEhoZSXV2NUqkkODgYm81GT08PKSkppKSk0NTUJBljY2JiqK+vp6GhQcpO39XVhV6vZ8aMGbS0tOBwOIiPj8fpdFJXV8fw8DBz58510wBKSko4deoUGo2G6dOn4+npSUVFhZQtb6wjYH9/P4cPHyY4OFiyp/j7+5OTk4Ner6euro7a2lqSkpJobm6WbGw9PT3k5+ej0WhIT08nICAApVJJQ0ODZJeS7SPuTJhGQFTPxYfL5XKNMyZeLvvA2G0v/Fs89oXbX+z4Fx7rwu0vbPfl2nWp40x07rH7TNT2sX2cqL9j/77w/GOPOdFU70IE4XwNoD179qBQKMjIyEAQBDo6OtDr9ZIReuy5x7Z5oraO7etEbb7cmF6u7xNtc7FjjO2n+N3Frs9E7Z1o2wvPO9Yoe2E7L3XMC88r828mtBhNNH+91O+XYiKBcSX7TLTd5fa90nZdapvLnfty7bqS/l5qmyvpg7hcW1xcTHd3NwaDAYvFwty5cydsy8Xad7HzfJFrdqX7fdFjjf3+Sts3dtvLjfmVnF8WIBdHTmx0gyKuqHR1dWE0GomMjLxuZStkZGRBcgMj+t6MXWmRkbkeyIJERkbmmpEXw2VkZK4ZWZDIyMhcM7IgkZGRuWZkQSIjI3PNyIJERkbmmpEFiYyMzDUjCxIZGZlrRhYkMjIy14wsSGRkZK4ZWZDIyMhcMzdsvrgrDYGXmRwmSqcg883lhhUkYjU6heJ8IScxbd7Y7+QbfXIQk0iJqSzFNBNjv5PH/pvFDSdIxEpxRUVF1NXV4XK5iIuLIzU1FU9PT3bs2EFQUJCcxWoSEGv1tLa2Ultbi91ux9fXl7i4OHx8fKisrGRkZISEhIQvVI5V5sZF9eyzzz57vRtxNdjtdj766CPeeOMNoqOjAdi5cyceHh6EhYXx6quvolQq3WreyHw5iGU2nn/+eQ4ePEhfXx87duwAzmd337x5M2fOnCE9Pd2tjKrM158bSiMRBIGBgQE2b97Mf//3fzNnzhwEQZCS/l5YOlLmy0MQzpdMff3110lJSeGRRx5Bo9FQUVFBaWkpNpvNbcoj883ihhMkLS0tNDQ0kJKSglarRaFQkJOTA5y3m8jTmcmju7ubo0eP8uSTT+Lt7Y1arSYtLY2kpCTpWsh8M7mhBIlCocBgMEhvPjivhdjtdgYGBvDw8JDfhpOIqG2I4ywaVsW6L/LYf3O5oYwICoVCKnBeVFQkVZU/cuQIe/bsYWBg4Ho38WuLQqHA39+foKAgSktLJWHe1tbG9u3bpWJgN4pWMnYK7HK5LvuRheSluaE0Ejhfae3+++/nt7/9LQUFBej1egoLC7nnnnvw9vZGpVLJSZAnCY1GwxNPPMEvf/lLqYTp7t276evrY968eRetujcVEV9CoqC4HGJxMdHNQMadGy5nq8vlYnBwkKqqKvLz81Gr1WRkZJCYmIhOp+PTTz8lICCAmTNnyqs2XzKCIDA0NER+fj4bN26UymuuXr2a0NBQduzYQX9/P7fddtu4mr1Tje7ubl555RXOnDmDRqO55LYOhwOTycQLL7wglSuVceeGEyQXqqSiOi1qIeLbRXaKmhwmWhkT6+iKb/eprBGK7d61axe5ubnMmjULs9l8ye2dTifr1q1j7dq1LFq0yK2an8x5bripzdiKdDabjZaWFkwmE/7+/pJAkZk8xCp1drudxsZGTCYTRqNR+u1a3tYXVngUvxO5sOKh+N3VPNQul4umpiaKioqYO3cuy5YtQ62++GMgvrCCg4P52c9+RkZGBmazWRYkF3DD6mgul4uamhq2bt1KTU3NFc1zZb4cRCG+bt06Tp8+LdUfvlYcDgddXV309fVJms/o6Citra2S4HC5XPT19dHc3ExbWxt2u/2qzjE8PMyRI0fQ6XRudYUv9lGpVGg0GqKjo1m4cCHr1q370vr7deKGFSRj1esbbHZ2wyO+pe12+5c69n19fWzatIn333+fzs5OnE4njY2N/N///R+jo6PY7XbOnTvHpk2b2LFjB1u2bOGjjz7CarVe9kUitrmhoYGKigqys7Px8/OTNAuHw8HAwAD19fVUVVXR09MjCQyFQoFSqeSBBx6gvLycs2fP4nA4rrp/Yw28YzWrsdPFsdveSC/HG25qI/P1xWazkZubS3t7O/Hx8cyZM4eenh527tzJT3/6U6xWKzt37sRmszF37lxsNhsbNmxAEATuu+++y06rBgYGKCgowNfXl7S0NEmI2O12Dh8+TG5uriQ8dDod2dnZzJkzB4PBgEKhwGQy8dBDD7FhwwbCw8OvaorjcDhoamqiq6sLLy8vIiMj0Wq1CIJAe3s7NpuNkJAQ9Ho9AIWFhcTFxeHl5XVDTKNkQSIz5Zg5cyb79u1j2rRp0pva6XRy5swZ6uvrefzxx0lISABgZGSEl19+mfvuuw+Hw4HD4ZBsZWNtNk6nk+rqas6cOcMTTzwhOdX19fXx/vvv09/fT3x8PH5+fqjVajo7Ozl58iQdHR0sX74ck8mEQqFgxowZHDlyhAMHDrBmzRrg8ikrhoaG2LVrF8XFxfj7+9PW1obBYOB73/seer2eQ4cO8dFHH/G9732PBQsWoFKp+OUvf8kf/vAHEhMTJa1lbGnWqSZcbnhBIk9rrh+TMfYKhYKkpCRsNhtHjhwhODgYOK/qd3d3Y7fbsVgsaDQaBEFgwYIFPP3007hcLmpra3njjTcYGRnh/vvvZ+bMmdJbf3R0lC1btjBz5kwiIyMlo/H27dvp7+9n5cqVxMfHS4LH4XBQVVXFpk2bOHHiBIsWLUKv12MwGFi6dClbt24lKyuL8PDwy2pCp0+f5tChQyxcuJDk5GS6urp4/fXX2bFjB6tWraKxsZHq6mqOHj1KcnIyAQEBHDt2TLIVDQwMUFJSwtDQEFFRUYSHh0vexFOFG9ZGAv+2k8ieh189k2mj0uv1rF69ml27dkkPk2inANyud1tbGy6XC5vNRmFhIfPnzycrK4uzZ8/S09MjrTDl5uZis9lYsWIFSqUSl8vFuXPnKC0tZfny5cTExLg51Gk0GmJjY7nlllvYt28fLS0t0tJ2YmIi8fHx7NixA5vNxujo6IQfh8OBy+Xi4MGDeHl5MWvWLGJiYsjMzGTlypV89NFHkq1l9uzZtLS0UFlZyejoqNQ/m83GsWPHKCgo4NNPP+X555+nsbHxSx3vL4MbTiMRBYfT6aSjo4Pc3Fyio6PJyMiQVNmppvZ9XRg7zXA4HJw7d474+HhycnK+tLEXpyUWi4XbbruNX//615IQiYuL4+zZs5SVleHv7w/Apk2buOOOOzAYDKxcuRKFQkFBQQEVFRU4nU5p+vLHP/6RF198EU9PT+C8MCorK8NkMhEQEDCh74sYlPjyyy/T2tpKWFgYGo0GHx8f0tPTef755ykrKyM2NnbCvqjValJTU+nv70er1aLVaqUpV1ZWFn/9618lg6qnpyerVq1i9+7dREdHS2Ot1+uZN28e06ZNIy8vj3/+859YrdZrGuPJ4IYSJOLbpaOjg48//pj9+/eTmZnJtm3bqKysZO3atYSEhKDT6WRhMgmIb/6zZ8/y4osvolKp2LVrF/39/axZs4bAwMAvNPZjbQB6vV7Kbrd8+XK2b98ueZ9mZGRQX1/Pm2++SV5eHq2trZSXl/PGG2+gVqtxuVx0dnZSWVlJeHg4FosFAG9vb7RaLcPDw26rJV1dXXh7e1+0zaJQM5lMdHV1uWleoibh4eFx0X4plUp0Op00vRL3dzqdFBcXuzm2qVQqEhISOHXqFIWFhZLWZbPZePfdd/nDH/5AVFQUbW1tDA8PX9X4fhXcEILE6XTidDrp7u6mqKiIzZs3Ex0dzZ/+9Cf8/f0ZHBxk69at/P73v+fmm29mzpw5+Pv7X1VshCAIDA8PMzg46JaOQKvV4uHhIblRu1wuHA6H5H9wseOIb58vmkP2wuNcL8RlyP7+furr6/nkk0+oqKjgJz/5CSkpKfT09PDxxx/z4osvsnTpUqZPn05AQABqtfqyGoqY46Snp4fW1lZ8fHx48MEHiYiIkNJl/uxnP6OkpASNRoNGo2H16tWkpKRw7tw5srKyeOaZZzAajQiCQGNjI1u3biUsLIxZs2YB/166fe655/jLX/7C888/Ly37BgYGUlZW5iZgLuz7yMgIvb29BAYGSnYVq9XK2bNnWbBgAQ8//PBFHdpELW1kZIRt27ZRXFxMUlISAwMDbNu2jTVr1kjjJPqs3HvvvfzXf/2X9F1bWxsVFRX8/ve/R6/X88ILL0zJl+QNkSGto6ODkydPsn37ds6ePcvjjz/O7bffjo+PD2q1Gg8PDzIyMkhPT2fPnj2cOHECh8OBh4cH3t7eVzTwLpeL0tJStm3bxv79+6mtreXs2bOUlpYyMjJCUFAQKpWKgYEBGhoa8PLymjAvrMvloqSkBL1ej4eHB0NDQwiCcEnvSRGn08nIyIh0zOLiYgwGg7QkeD2w2WyUlZWxd+9e9uzZw/Tp03nqqacIDQ1Fo9Hg7e3NjBkzCAsLY//+/Zw+fRpBEPDy8pKWTS+GOL345JNPqKmpYcaMGSQmJmI0GiVbha+vL/Hx8dLUQ6lUYjabSUpKIiYmBk9PTxQKBTabjU2bNnHmzBni4uJwOBwYjUZ0Oh1KpRKj0UhlZSUtLS2kpaVJQXh5eXmEhoYSGBg4TmA7nU7y8/Npb29nwYIFGI1GnE4np06d4ujRozz22GMYjUYpZ/CFH1EYBAYGYrVaOXz4MHV1dXz22Wfo9Xpp9ai6ulrK6mc0GvHz86OoqIjVq1fj5+dHXV0dVVVVdHd309vby4oVKwgKCppSAmVKChJR1e3r6+PUqVMcPHiQkpISMjIy+O53v0tISIjbnFz8GI1GcnJyUKlUHDt2jLq6Omw2m6TawqU1A4fDwdmzZ2loaCAnJwcfHx8KCgr47LPPCAoKIjQ0VNpWvIHHqqzi36Ojo5Kg+fzzz1Gr1fj4+Ixz7x6r0rtcLrq6uigqKsLT0xOtVovdbsfHx8dNNR57vrHGZpFrvbnEY46MjFBTU8PBgwc5ceIEnp6e3H///WRnZ0uanjjuSqWSgIAAMjMzcblc5OXlUVtby/DwMH5+fpIKP3a8BgcHOXjwILm5uVgsFu6++258fX3dbBUTLXde+J34GR0dpbS0lO7ubhobG1GpVMTExEjCTPQD+eyzz4iIiMDPzw8/Pz+sVisnT57E19cXo9EoaZwjIyNUVlaye/ducnJySEpKQq1WMzAwwDvvvMP8+fNJT0+/aHvGtlmlUpGcnEx0dDReXl7MnDmTNWvW4O3tjVKpxM/Pj5iYGEmTCw0NJSkpibi4OEwmE3FxcQQHB7Nw4ULmzZtHWFjYZYX0V82UDNobHR2lsrKSQ4cO0draSnx8PIsWLZK0gsvhcrno6enh0KFDFBUVYTQamTNnDqmpqZec0wqCwI4dO2hsbOThhx9Gp9PR2dnJm2++SUNDAz/96U8ZHR1Fq9ViNBqpqakhICAAh8OB3W4nOjqanp4empqaiI6OxuFw8J3vfIe1a9cyd+5cBgYG8PT0RKPR4O/vT1dXF11dXQQHB+Pn58fRo0f54IMPuP/++wkNDWVgYIC4uDg8PT1xuVxUVVXhcDiIjIxEEASamprw8vJieHiYoaEhUlJSrjkyVRAEenp62L9/P0VFRfj5+ZGTk0NKSsolx27s/m1tbezdu5fq6mqMRiMLFiwgJSUFnU6HIAh0dHSwbds2WltbWbx4MXPmzJn06ZsovD755BPq6+t59NFH8fX1pb+/n61bt1JbW4tGoyE4OBiNRkNLSws2m434+HiWLVuGyWTC6XTyySefcPz4cZ5++mlJc5KZYhqJ0+mkvb2dbdu2kZeXh8ViYcmSJeTk5ODr63tVqwJ6vZ7o6GgiIiLo7+8nPz+fqqoqTCYTXl5eFz1WRUUFfX19TJ8+HY1Gg4eHB3a7nRMnThATE8PZs2epr6/HZDLx7rvvUlFRQVNTE3l5eRiNRgYHB3nzzTeJjo6mu7ubf/7znwQGBuLr68vu3bs5c+aMZEQ7evQoTU1NrFu3joyMDAoKCsjLyyMiIgKHw8GGDRtISEjA39+frVu3curUKYqKiigqKsJsNrNjxw4KCgro6elh3bp1JCYmYjabv5AwEdMzHDhwgI8++giXy0V2djbLli0jMjLyqiJeDQYDKSkphIaG0tPTw8mTJ6msrMRoNNLU1MTWrVulJd6UlJSvLFpYrVaj0Wg4c+YMOp2O8PBwNBoNCQkJ0jR0YGAAm82G0WgkKyuLnJwcKSixvb2dl156iR/84AcEBwfLAaJjcJu4T6ScXMkFvpxB8cLjTrSd+CZ85plnSEtLY8WKFSQkJODr6zvhthdr69iPXq8nLi6OoKAgampqOHbsGL/97W956qmnSE5OvmzfRLXdYDBIDlBGo5GWlhZ0Oh3e3t4IgkBmZiZ5eXmUlJRw00030dHRgdVqJTk5mcTERLKysoiOjqa0tJT+/n7S0tLo6+uTvDNffvllOjo6iI2NJTU1lbS0NEwmE62trfT392O1Wtm4cSNPPfUUvb297Nu3j/LycpRKpbTEWFlZyZkzZ0hKSrrqZVhBEOju7ubPf/4zGo2GnJwcpk2bRmho6LjjXDg9GztW4r+ijSAhIYGQkBDKy8spKCjg+eefR6vVctNNN7Fw4UK3WJfJRrwnwsLCSE5O5vTp0yQkJGCxWNDr9cyZM4fMzEz6+vpwOp0YjUY325TT6eStt95i9uzZxMXFXZHN65uEGtx9M8YGKolGpMsZzMaGf18opUW/A/G44s0/0TFFQ+avfvUrzGbzhBdLnMPabDbOnTtHXV0dPj4+ZGRkSPPxC9tgMBhITk4mMDCQo0eP0tbWRlJS0mVTA4qrCp2dnQwMDGA2m6UlRq1Wi8lkQq1WExsbS01NDf39/RgMBjw8PFAqlZhMJry9vSWNJCAgAL1eT3BwMCaTiX/+8590dnbi4eEhpTL08/OT/hVv5La2NsmPYmRkhKamJjfbT3h4OAkJCYyOjl60L5dCnG40NDTw85//nKioqAmTOYvj4XA46O3tpaamBoPBQGRkJAaDwa1Q2dixT09PJzw8nLq6OoKCgli4cOF1mxbo9Xrmzp1LTU0NR44c4ZZbbpHsZyqVSnpxKRQK6Z51Op2cPXuWc+fO8cILL8iayARIT2pjYyPvvPMOdXV1KJVKvLy8WL58OYsWLUKr1Y5Tl8cKkHXr1lFZWcmvf/3rCd+GeXl5fPDBBygUChYuXMjdd989ZnlX9gAAIABJREFUriGiMFOpVBiNxnGqtPi7w+Fg27ZtvPTSSwQEBBAdHY3VauWZZ55hyZIl/M///M+4qYv4f29vbzw8PCRHpQvPP9Z4KVbyE1MVJCUlERERQXt7+zgDq/iZKFrzwrgIsS2ffvopwcHB3HXXXVRVVU3o0CUaJzUaDYcOHWJ4eBi1Wi3VjBkaGnI7xxf1MhUFhF6vJyAgYMIlZ3EZOD8/n+eee46Wlhaio6Ox2Wx0d3dz66238uijjxIcHDxu7JVKJT4+Pvj4+ODr6ysJ2uuBuIqSkZHBnj17AAgKCrro9qLhef369dIqjWwXGY8kSMxmM5mZmdhsNrKzs3G5XPzkJz/hV7/6FStXrhx34cUVhpkzZ7JkyRJeeuklnnnmmQm1jcTERBYvXsyWLVvIysr6Qg0Vpz6/+c1v0Gq1bNy40U01drlcbNmyhe9973v84he/kObeV3P8oqIiDh06RFlZmaT1fPrpp0yfPp0nn3yS0dFRjh49yokTJzAYDLz99tsEBwcTHBzMRx99hJeXF2azmba2NnL/P/bePDyq8mz8/8ySmSSTfU/IvkMI2Uwgsu+boohKRVRq3alVX/ut2tpe2trlavu2r0tbdyxaxCogCgKyEyBAWJKQkIUkkI2E7MtkJpnt/P7gd44JhJBAMIvnc11zEeacOfM8Z865z/3c66FDxMXFodFo2LZtG7GxsWRkZBAVFSVFJh47dozz589TVVXFgQMHWLx4MQ0NDRw4cABXV1fq6urIyMjg0Ucf5eGHH+bZZ58lPj4ei8XC3Llz2bRpE3q9Hnd3d7Zv347ZbGb+/Pn4+/sP+sXe3t7O559/LgmS2NhY6Tva29vZtGkTf/zjH3nwwQdJSkoadrkg3VEoFEycOJFTp07x2WefXfM6sVqthIeHk5KSIreCvQpq+K7NQ2BgIH5+foSFhREREcHu3bvZtWsX8+fPp6mpic7OTpydndHpdOzfv5/CwkLGjBkjGQfb2tpoamrC1dW1R81ODw8PwsLC8PT0xNfXl66uLrq6uqRAr2v9MKIh8J133iE+Pp4HHnjgCjXaZrOxdOlSYmJi+N3vfsff/va3ARvERLU3MTFRChD6+9//LvXQ0ev1TJ48mcjISLy8vFi9ejUqlQpPT0/uuusuXF1dcXJy4pFHHsHZ2Rk7Ozt+/vOfU1JSItkb3N3dUSqVLFy4EC8vLyIiIiRVPzg4mFWrViEIl9o8PP7445J29vzzz3P48GHMZjOpqakYDAbuvfde2tvb8fb2ZtmyZQiCIC1JessYvR7EoKwvv/ySpqYmXn31VTw9PXsseV1dXVm5ciVRUVF88cUXuLu7ExERMeTpCn3V9LCzs+Opp57qV90P0VZmZ2c3rIoaDadi25JGIg6mra2NoqIiqQDMXXfdxcWLF/nvf/9LU1MT0dHRTJ06lb1795KTk4ObmxurVq3CZDKRlZVFRkYGiYmJLF++XLJxiD+E+B319fUUFRURGxvbIzbjalitVvbu3Ut7ezvPP/+8FA3YHfH448aN49577+X999/nf/7nf/odkKZUKomKiiIyMvKKbeKP5ezszLRp03pdPlyuaYnfqdPpCA8PByAuLq7Htrlz5yIIgtR6VKFQEB8fD1zSkOLi4nqMfdasWdJ+np6eBAYGXmHnEceq1+upr69Hp9NJqfHXc8FZrVZOnjxJTU0Nd9555xVCBL6rsD5p0iQqKyv58ssvWb16tWT7GSpqa2tpaGjoVVBczWjcF8PlpgV6OBOGWmDDZV4bhUJBW1sbOTk5tLe3k56ezm233UZLSws+Pj54enpKAmDKlCl4e3sza9Ys6cb28PAgOjqagoIC9Hq95Da7HG9vb1xcXPrdaNpsNrNp0yaeeOKJPkOvRWPvggUL+OKLL6iqqpLaefaX0ZJJXF9fz86dO6mrq8PLy4uAgACCgoIICAiQXOli9GVfmEwmMjMzCQoKIjQ09JrnfvHixaxatYp7772XoKCgmzW9a2Kz2di9ezcZGRkDLsc4EhBtN7/+9a97LDOHiisESUhICGlpaQQHB+Pp6SklHomVnBQKheSx8PX1lYLENBqN9MTt6Oigs7MTFxeXKyaoUCjQarX9DvsWBIGGhgY6OjoIDAy8pttNNO6FhoZSXFzcb0EixnacPHmSpqamfn1mOGMwGKiqquLIkSNUVlaiVqsJCgqStMCYmBiSkpKuqRG2tLSg1+vx9PS85m+mVCpxdnYmKCiI3NxcAgMDB3NKA0LU9C6P/B0t2Gw2Xn31VQ4dOkR0dPSQt8iQ3L+i5d5sNqPVaiUV1mq1kpWVRWNjo5QsJa4rRc+G2WyW3ILiS/SMiG40cR/RFSxOvD/qYkdHB1qttt++e3EZ0tbWNqCT0dTUxLfffktZWVmv2y/3inSPnRhuiB4ujUaDm5sblZWVlJWVceLECXQ6HRMmTOCxxx67piAxGAxA31mul+Pt7c3FixdvaPw3ikqlYtKkSVLy3mjQMrtjtVr585//PNTDkJDuzIsXL7Jt2zYyMjLo6urCx8cHX19fABoaGqSWmLW1tXh7e+Pr60t2djZubm4UFRXR2dnJhg0bqKqq4vDhw8TGxrJgwQLJG7Ju3TqOHTvGwYMHiY+Pp6ysjKioKOk7+sLT0xO9Xk9XV9c1Yz/gu7iI1NTUAZ0MT09Pli9fTnt7+xXHMxgM1NfXYzKZegg/T09P3NzcrkuYiOP09vYedGHU2dlJcXExW7dupbKyErPZTHx8PNOmTSM5ORlfX9+r1tHojli/w2Aw9PvcV1dXSzfwUDKag8bMZnOPh/FQI51pR0dHpkyZwrhx4/D09JRiFZRKJYsWLSI4OJiAgAApkczFxQUnJydCQ0Px9fXllltuwdfXl3HjxjFx4sQeEZbe3t4sWrSIWbNmERISgouLi5R4dC0UCoW0/9mzZ/Hz87uq4VBUY41GI+fOnZOWWv1B9FyNGzfuClVYEASKior45ptvJE+VTqejvLycFStWMGfOnOsOS9+4cSOpqamDfjGUlJRw7Ngx0tLSePDBBwkPD8fFxUXyLF2tDMLluLu74+DgQGNjo5RndLWx2mw2TCYT5eXl/Yoclhk9SO5fZ2dnJk2aJD11uruWvLy8mDZtmlSPQbxAbr31VhQKBf7+/tL74r/dXwEBAVLQj2jDELNn+3OxqdVqHn30Uf7yl7+QkpKCTqe7wnPQPZDsgw8+YPHixX12UOuN7uHd3REEgZiYGG6//Xb8/f2ZP3++lFRXUFBwhVeqLzVadO0qFAosFgtLliyR5tJ96STuc3nG7+XfdTUiIiJ48sknpfyS3jxd/UGtVjN16lT279/PuXPniIyM7PXcwyV1e9OmTcycOVMqlizzw0DSSHqLquz+t3hzdX+/t/d6+/zl3oGButHENOwZM2bwyiuv8NJLL+Hq6trj6Wi1WjEajezevZtTp06xdu3aQUsGUygUUgKfWGdEEARcXFyYOnUqhw4dwt3dncDAQM6dO4ebmxt2dnZUVVURERFBe3u7FN1ZXV2Nl5cX/v7+nDt3jpqaGtLT06murubixYv4+vrS0tKCt7c3/v7+0hP+4sWLWK1W3NzciI6OxsnJqc8xi8JDHP/1nge1Ws3EiRPJz89nx44dODs74+Pj00MrFEsn5Ofnc+jQIV544YVhl+Yuc3O5wmtzPfTnc/099uW5O+JnlUol999/P59++il//OMfWbx4sZS9abVaaWlpYdeuXTQ2NvLmm2/26tq8/Mk+0DkqFAouXrzIsWPHKC8vZ8GCBYSGhvKPf/wDe3t7fvWrX/HWW28xfvx4kpOTefnll3n00UfJy8sjNzeXhx9+mM2bNxMdHc2TTz5JQUEBL7zwAjk5OZw+fZo///nPLFq0iJMnT5KQkMDjjz9OXl4ev/3tb0lJSWHPnj0sXLiQZ5555pqC5HqEh6jVXW5QVqlULF++nH//+9+8+eab3HHHHVLekFh+MTc3l2PHjvHQQw/h5+c3qOdeZvgzrKxRCoWCzs5OqqurpareIkqlEo1Gw8qVKxk3bpzUjc3Z2Rmj0YhCoWDBggU8++yz2NvbX3GxinUyWlparjt8W3RF5+bmUlJSwvz583F0dGT16tV8+OGHxMTEMGvWLLq6uhg7diyTJ08mOjqaRYsW8Zvf/AYnJydefPFFTp48SVtbGzNmzJCe3JMmTZLS9mfPnk12djYtLS3k5+fzk5/8hJkzZ0rLT7Hw8WCj1+upq6vDw8Pjim3Ozs489dRTHDlyhA8++ECK6DWZTDQ3NxMWFsbq1asJDQ3tVVDo9XpaWloIDAyUBckoZNgIEoXiUlm9W2+9lS1btjBu3DgSEhLw8fHpkdCmUqlITk5mwoQJNDc3S53LvLy80Gg0PVRu0U3d2tpKbm4up0+fJiQk5LrCt8WnaVxcHAsWLECj0WBvby/F2Yj7aDQaLBaL9AQWt13eprG3l2jw7erqQqVSYbPZmDx5Ml9//TUmk4muri4pknEwUSqVeHp6EhcXx44dO6isrCQ1NVUKXBPPlVKpJC0tjZSUFCorK6murkar1RISEoKHh0cPA66o3XR1dVFaWsrx48fRaDRSCr4sTEYXw06QvPjiixw6dIhTp05RUFBASkoKycnJODs7S/up1WrUarWUMHc1urq6OHPmDJmZmTQ3NxMXF8d9992Hp6fngIVIV1cXra2t6PV6jEYj4eHhqNVqKXXfYDBQUlIiZU83NTXR0NBATU0N7u7udHR00NbWRnNzM3V1dbS0tKBWq7FYLFy8eJH29nbKysqk7GKxjWNlZSWurq50dHQwc+bMm5KQJxrMn332Wfbt28fx48fJz89n8uTJJCQkSN410VZkZ2dHVFQUUVFRfZ6zuro6du3axblz5/D392flypWEhYXJafijkGFVIQ0uGQlDQkIIDw+nq6uLnJwcqeRf97yZvlyQFouFmpoaNm3aRE5ODkFBQcyZM4dbbrlFOsZAb8bKykr279/P+fPnAYiOjpaMvVarlfLyckmoVFVV0dnZyfnz52ltbcXNzY3s7Gy0Wi0Wi4WCggJcXFyoq6ujqqoKV1dXKioqyM/Px8HBAYPBQFFREUFBQbS1tVFeXg5cyh0pKSkhLi5Oqmo/WIhCIjIyksjISKnhVH5+PjqdDldX1z6N6/CdFtLe3s7OnTv56quvcHR05NZbb2XmzJlSgWVZG7lxbDYbb7/9Nunp6SQlJQ15ZOuwrNkqYjQaqaio4OTJkxw+fJjU1FTuvvtuqTL45S5I8ULesmULO3fuJCkpSepudi3jZF+Ihairq6sxGo04OzsTEhIiLVtMJhM1NTVYrVa0Wi2NjY3Y2dlJAXReXl7U1dVhb2+PVqtFr9dLxaDb29txcnKSbsDu+/j4+HDw4EECAgLQaDSYTCbOnTsnVRG/mXR2dnL27FlOnTrF6dOnSUxMZNGiRbi4uPR57k+ePCllAKenpzNu3LibEnD3Q8dsNpOQkMBzzz3Hww8/PORa3rAWJOLFaTAYuHDhAtu2bePIkSM8/vjjpKen93D/mkwmTp8+zTvvvENISAhLliwhODhYKnJ0IxJbPEWinaO3uJHuXonLvR69hdV33+/y+BPx/w0NDTz55JMsX76ciIgI6uvr6ejo4LbbbrvpLSrEynYGg4HKykp27NjBuXPnWL58OcnJyWi1Wqlvj8VioaKiQsoQX7hwoRTY2J/EQJmBIwuS60R0M5aXl/PGG2/g5OTE6tWrCQoKorGxkTVr1lBQUMAjjzxCYmIiTk5OQ35ybwTxRs7MzGTLli00NzczY8YMFi5ciKur6/d6c3Z38f7zn/8kJCSE559/HhcXF0wmE7t37+aLL75g2rRpLFiwQGryLWshNw9ZkFwn3dXnrq4uduzYweeff467uztNTU3MmjWLe+65R7KBDIcaDTfK5XEd4rzEv79PRA+YzWZjw4YNvP/++8ycOZPa2lrUarXk+pX7L38/DDdBMmy8NtdCNJCKdTRuv/12xo0bx759+0hMTCQ5OVlyK46Wi7h7RPFQIwoIm83GsmXLSElJ4YknnmDu3Ln89Kc/HVDKg8zoY8QIku6ILuDo6GippYN8EX8/iILcw8OD1NRUJk6cKMXTyPxwGZGCBIZOcAiCQE5ODmfOnMFisRAeHk5ycjK5ubkUFhbi5uaG1WpFr9cTFBTE1KlTUalUNDY28u233+Lg4EBKSgpBQUHU19eTm5tLbW0t7u7ujB07lpCQkBGR/n55YqfMD5vhf8UOQxobG9m+fTt6vZ4VK1ZgNpspKSnhiy++ICEhAS8vL0pLS/noo4/461//yoQJEzAYDOTm5mKz2YiOjqahoYF3330Xi8UiaVjHjx/n7rvvZvz48UM9RRmZASELkutg8uTJUhe8RYsWodFomDhxIo2NjaSlpZGUlERxcTEffvghv/3tb3n33Xfx9/fnkUceoaqqipCQEN5//32ampp47LHHCA0NpaGhgQ8//JDPPvuM8PDwIS+cLCMzEOSF7XWgUql61PgQ1Xu1Wo1Go0Gr1aLValmyZAkBAQH885//7LG9sbGRgwcPkp6eTnh4uNSYKiUlhezsbCoqKiQPyQhxqsn8wJEFyXUiCAL/+Mc/mD17NjNnzmTlypXs27evh6vW2dmZl156icLCQvbs2YPJZJLydsxmM35+flK8hVjsyWg00tzcTH5+Pt988w2NjY3DUqBcK1VB5oeFvLS5TgRB4IEHHuDuu+9GqVRSXV3NwYMHr4j58PHx4YknnuC1117jhRdekIooK5VK2tvbsVgsUt6MIAioVCo6OztpbGzk66+/pqWlhWXLlt30SNb+IMa1iK1Vx4wZg7u7u7RNpLfYF1ngjG5kQXKdiK0XvLy8sLOzw2g0SjlAIuJyJjU1leXLl/Puu+/y6KOPEhAQgL+/P8ePHyc1NRUPDw+MRiNFRUX4+/tLrSHFEgrDJZZEEASOHz+Ok5MT0dHRPP744zQ0NFBUVERERAQajQaz2czFixc5f/681BzM2dlZTtYb5chLm+ugoaGB2tpa6urqqK+vRxAEWltbpbIBdXV1VFRUcP78eTo7O7G3t2fu3LnExsbS2NiIWq3mqaeeIj8/n+3bt1NQUMD+/fvJy8uT2n2KzcuNRuOwWdYIgsCzzz7Lc889R2trK1arlePHj/P666/T0tKC0Whk27ZtPPbYY2zZsoW//vWv/PrXv6agoGBYtbqUGXxkjeQ62LdvH8eOHZN6Ia9cuZITJ06Qk5NDS0sLbW1tHDp0iLq6OsaNG0d0dDRBQUE89NBDUmZwXFwcr732GmvWrOHrr78mLCyMhx9+mMTERBQKBTqdjrCwMHbt2kVsbCweHh7DQjOxWq34+fnx73//m5/85CeYzWaph9Hp06dZu3Ytr776KsnJyRiNRt555x3WrFnDK6+80qMftMzoQhYk18GyZcu48847gUtLHLVazY9//GMeeOABKZR86dKlAJIxVa1WEx4eTnBwsLRPeHg4r7zyitTsW9zXaDRitVqJjIzEarUOqwQ4hULB0qVL2b59O8XFxT2ynnNzc5kwYYJU9Emn0zFjxgxef/11GhoaUKlUnDt3jtbWVqkRu2w/GR3IgmSAKBSKXmu+im1L++LyVhdipbfuiK1Dz5w5Q3V1Nenp6VIey3BAqVTi4ODAihUr2Lp1a48qaSaTqUe+k0qlkozEXV1dZGZmcvr0aUwmE8ePH+fxxx/vs0+OzMhBtpEMQ5ydnUlISGDRokXExsYOuxqnSqWS+Ph4fHx82LNnDxaLBUBqpSG6tw0GA+Xl5XR2duLm5oazszOTJ09m6dKlbNmyRbabjCJkQTLMUCguNVkPDg4mODgYrVY7rIRI95iXqVOnUllZKRV7Sk1NxWKx8Omnn1JcXExGRgZr1qxhwYIFuLm5kZiYSEJCAh0dHUyZMmWopyIziMhLG5l+o1AoSEtLw8PDA7VaLRmIq6qqsLOzw8PDg5/97Gfs27ePjz76CJ1Ox6pVq5g6daoUK5OVlcXRo0d54IEHhp2QlLl+RkxhI5mhR2ymLob6i1G6gCQUBEGgs7MTk8kkterQaDTYbDaOHDlCVlYW8+bNk+JOZEFyfciFjWRGLGLfHfFv+E6AdA+Zt7e3l4ys4raOjg62bdsmdRW0s7Pj9ddfl4XJKEEWJDIDoq9i1iKXN5sH0Gg0PPLII7S1tSEIwnU3NZehR0KnWNu3exnOoUAWJDIDoqOjQypxILqqLRaLlHMDl9pzXt5EXOzId3mlfFkbGRiCIFBYWIifnx+CIGA2m6Umal5eXkM2LvmRINMvLBYL2dnZHDt2TIpk7ezs5MCBA2zcuJG2tjbpKZmbm8vJkyel/aBnzV25stqNsWbNGk6cOCH1W1q7di2FhYVDOiZZkMj0i5KSEjIzM3sY9dra2jh58iSlpaWUlpZKqrajoyNHjx6VLnaZwUMQBAICAli/fj1Wq5WGhgZOnDiBt7f3kI5LFiQyfSIIAkajkYyMDKKiokhNTZWEic1mIyAggKCgIE6dOiWt1cePH8+8efP46KOPhlXS4WghOTmZY8eOYTKZKCoqwt7enoCAgCEdkyxIZPpEEAQuXryI1WolICBAyvuxWCzU1tYybtw4AgICaG1tpaWlRcorCgsLw93dnaKiIlmQDDLjxo1DrVbT3t5OQUEBiYmJ10zPuNnIgkSmTwRBkDKWuxtZOzs7ycrKori4mPz8fEpLS6muru7x2cDAQCorK4do5KMThUKBk5MTycnJdHV1YbFYSEtLG/I4ElmQyFwT0c7RvUex2NBcLKVQUVFBUVHRFQZWOZ9m8FGr1cyePRtHR0ecnZ1JTk4ecle67P6V6ROFQoGbm5sUxSrGMJSUlDB37lymTZsm1Z9tbW2ltrYWX19f4JIbOC4ubohnMLoQs6pnzJgBQHR09PfeC7o3ZI1Epk8UCgXBwcE0NTVRVVWFxWKhsLCQP/7xj9TU1KBWqyUtZN++fWzduhW9Xk97ezvFxcXExMSMejevGBRmsVh6BImJmpz4nsViwWQyYbFYemhuA0WpVOLt7U1qaiozZswYciECoHrllVdeGepByAxfROOpnZ0dZ8+eRafTYW9vT1hYGL6+vgQHB0s3THh4uOQ9+Pbbb0lOTiY+Pn5UFy8SvVqnTp2iq6sLV1dXBEHgwoULnD9/Hj8/P+CSqzwvL4+8vDxqa2vRaDQ4OTld93lRKBTExMQwZcqUGzrOYCEn7cn0C4vFwpEjR2hubmbevHlSYJlKpZKqy8OlG2vv3r1UV1ezcuVKab/RiiAIVFRU8OijjxIeHs6f/vQnNBoNmzZtYufOnaxZs4bm5mY2btxIYWGh5CJ3cHDgscceIzAw8LoNpeI5Hw7nd+hHIDMiUKvVTJkyhfT0dOzs7LCzs5NuAHHdrlKpUKvVJCUl8eCDD/4g8mlEIWoymWhvb2f//v09ljAAhw8f5ujRo9xxxx386U9/4umnn6a+vp7PP/9c2ud6GE5CeniMQmbE4OnpeU01uj/7jCbE5d99993H5s2buXjxYg/7R15eHmPGjCEmJgY7OzvGjBnDihUrOHjwIGazmaamJk6cOEFubi4dHR0jMu5GFiQyA6I/OTI/xDwalUqFv78/s2fP5pNPPunRJKyrq0taBoram7u7O3q9npaWFrZv3862bdv4+9//LuUyjTRkQSIjM0goFAoWLFhAV1cXeXl5kkBwcXGRljs2mw2z2UxpaSl+fn6oVCpiYmK45557mD17NhUVFSMyrUAWJDIyg4Coaeh0OpYtW8bHH38sbZs/fz55eXns3r0bg8FAXl4er776Kj/60Y9wd3cnPj6ekJAQ2tvbiYyMRKvVDuFMrg9ZkMjI3ACiAHFxcUGr1aJWq4mNjeW5557D1dUVuBQ09vvf/559+/YxceJEXnzxRX7/+9+zYMECVCqV1KHQxcWF2NjYYdXHqL/I7l8ZmRugewCaIAhSdTir1YpSqZRq24ppBeL7KpUKOzs7Ojo62LBhA5WVlSxZsoSQkBCcnZ2HjTemv4ys0crIDDPEYk1iszNBEMjLywOQKueL+2i1WhwcHLC3t5e0jrq6Oi5cuIDNZuPgwYPk5ORgMplGnI1E1khkZAYJm81GV1cXK1eu5F//+hfe3t7XXKI0NzdTVFSE0WhEoVAQEBBAWFjYsGuKdi3kpD0ZmUFCzKdpaWnBbDb36zPu7u5MmjTpJo/s5iMvbWRkZG4YWZDIyMjcMLIgkZGRuWFkQSIjI3PDyIJERkbmhpEFiYyMzA0jCxIZGZkbRo4jkbnpCIJAaWkpWVlZmM3mAQda+fn5MWPGjBERpGW1WmlpaWHjxo24urr2e7yCIODn58fEiRNxcXEZ9vO8HFmQyNxUBEFAr9eze/dujhw5QlBQ0IBLC27bto3Q0FAiIyNv0igHj5ycHPz9/WlqaqKpqanfn7NYLOzbtw9nZ+dh0admoMgh8jI3FbPZTFZWFnv37uWOO+4gPDx8QE9bm83Gp59+SmtrK08//fSwzYwVG3o/++yz/OQnPyElJWVA47RarWzbto3y8nJWrVqFh4fHiErcGzkjlRlxCIJAU1MTx44dIyIigrFjx+Lo6IiDg0O/X/b29sycOZPm5mZycnKGZVNyMdt306ZNxMTEkJKSgr29/YDmqdPpmDt3Lm1tbSOySposSGRuCmLeSVlZGRUVFcyaNeu61HWlUklgYCAzZszgyy+/pK2t7SaM9sapqKhg7969PPTQQ2i12uvSmlxcXLjjjjv44osvpGZkIwVZkMjcFARBoLW1la+//prbb78dd3f3K7bbbDapsZTYNKp7rVO4lIKv1WqJjY3FxcWFgwcPXrHPUCJqI++99x533XUXXl5eUm3Wy/e51jwVCgXjxo0jKiqKzz777IaaaH3fyIJE5qZgs9nIzMykq6uLqVOnolb3tOuLjchbW1tpbGykvr6elpYWDAZDr2q9n58fycld5d27AAAgAElEQVTJ5OTkSPU7hgMWi4WMjAzs7e1JTU3tVevq6uqivb1dmmdTUxN6vV7qzCciCs0nnniCdevWUVlZOWIEiey1kRlURE2jubmZTz75hNdee63HE1qs2XHx4kV27NjB6dOnqaiowGw2ExISwvjx45kyZQqRkZE4OjpKBkelUklSUhJnz57lwIEDLF26FAcHh+saX/d/b6TivSAINDY2smfPHmbPno23t7c0XkEQMJvNNDQ0cPz4cQ4fPkxpaSmNjY0EBwcTHh7OlClTSEhIwM3NTepGqFQqcXFx4YknnuD999/n5Zdfxt7evt+G18sFj0KhuEJYifsNxjkQkVt2ygw6RqORf/7znyQmJjJ9+vQeLTs7OjrIzMxk3bp1uLu7s2jRIlatWsV9991HeHg4DQ0NZGZmotfrCQ4Olgohi93pTCYTp06dIiAgAC8vrwHfADabTdIODAYDGo3mCm2pP4iCYufOndhsNqZNmybFjYjbCgsL+fzzz7l48SLTpk3jgQce4PHHH2f8+PGo1WoyMjK4cOECnp6eVzQCj4yMZPv27Tg4OBAcHDwg+1JbWxvt7e2SrcZqtdLU1IRCocDOzk5qCF9XV0dLS4vU8OxGhIksSGQGFUEQOHHiBLt27eKZZ57BwcFBqmMqCAKZmZkcOHCAZcuWMX/+fAICAnB0dESr1eLj40N8fDxjxoxhz549CIJASEiIJIgUCgUeHh4UFRXR3NxMSEgIGo2mXzeAaPw9e/YsX331FaWlpZw+fZq6ujp8fX0HbCC12WycPXuWrKwsUlNTiY6Olm52q9VKeXk5X375JVFRUSxfvpyYmBhcXFyknjaRkZEkJiZSVlbGmTNnCA0NRafTSWNQKBT4+vqyceNGEhIScHZ27tf4rFYre/fuZePGjYSEhODm5kZbWxtffvklDg4O+Pj4UF9fz9dff01OTg4lJSUcO3YMT09P3N3dr1uYyDYSmUFDEATa2tr4/PPPuf/++3sUMRYEgaqqKjIzM5k2bRpxcXFS1XVRUKhUKjQaDbGxsdx333188803lJWV9bCHODo6MnfuXIqKiigpKem3m9Rms9HY2Mh//vMfLly4QHh4OJ6enmzYsIGDBw9iMpkGNNf29naOHj2Ku7s7EyZM6KHVdHZ2snPnTjw9Pbnttttwd3e/Yp52dnb4+Pgwb948LBYLmZmZUq1WsXNfZGQkYWFhbNu2rd82IavVSkFBAQcPHmTt2rVYrVYMBgPHjx+ntrYWs9nM5s2bOXjwIIGBgYwdO5bS0lL+7//+j7a2tuu2yciCRGbQMJvNbN++HT8/P9LS0nqo6larlczMTJydnRk7dqxUGLk3FAoFkZGRBAUFsW3btiu2hYeHExUVxb59+2htbaWzs7PPV1dXl9S0qqCggCeeeIKpU6eydOlSbr31Vql1pti8qqurq8/jGQwGioqKKC8vJy0trYe2IBqR9+7dy5w5c67Zo8bb25vo6GjOnz9PTU1ND4Gh0+mYPn06Fy5c4NSpUxgMhmvO1Ww2IwgC6enpNDQ0kJ+fLxl1bTYblZWVFBYWsnjxYubMmUN6ejrPPfcc9fX1FBYWYjabaW9vp7KykpaWln4LatnYKjNoZGdns2/fPp566ikcHR17qMlWq5WzZ89KmkBfxkNxGTNp0iT+93//l5/+9Kc9tqlUKubMmcPzzz/PuXPnrnAt93asqKgolEolNpuNgIAAabmVmppKfn4+NpsNi8XC1q1byc7O7mGMvByz2UxNTQ3JycmEhYVd4eqtqqqSNI5roVKpCAkJITc3l5qaGgIDA6VtSqWS8PBwQkND+cMf/kB0dHSfAhggKCiI+vp6vL29ue2223j99df5xS9+Ic2npaUFjUaDt7c3Go0GlUqFt7c36enpNDY2UldXx5YtWzh9+jQ6nY5nn32WgICAa85DFiQyg4a3tzc2m63XOA/xaers7Nxvw15ISAglJSW9blMqlXR2dpKQkICXlxfAVY+pUCgIDAykpKQEhUKBzWaT9m1oaJCWNSqViujoaEnI9IaocVgsFrq6unosacSbtaKigsDAwH4ZSEW7j8Vi6XVpYbVasVqt+Pr6kpKSck1B4unpSW1tLSqViqioKFJSUjhw4EAPD42onYjjNZvNVFZWEhsbS0tLC4GBgUyZMoU1a9ZQUVGBr6/vNeciCxKZQSMgIIC5c+eydetWoqOjsbe3l25Y0ehqNBqx2Ww9PDlXo6mpCW9v7x7viTfBl19+yezZs1m2bBk6na7P44jCw97eng0bNnDy5EkSExOlpVhMTAx2dnYolUpiYmKIiorq01YgCALR0dF8/fXXFBQUkJiY2GO7h4dHvxP2BEHAYDCgVCqxt7fvsc1ms1FeXk5hYSFPP/00oaGh17yhLRYLWVlZUhOuH/3oRyxdulTyKIWHh9PR0cGZM2cYP348Wq2WsrIyjh49yjPPPIO/vz8RERHYbDYcHBz6beSVBYnMoGFnZ8edd97J448/TlZWFlOmTJG2qVQqAgMDaWtro62trV8p9tnZ2aSmpvZ4z2q1UlpaSllZGQ888IDkCbkWgiAQHh7OPffcw69+9SvmzJlDcXExJpOJZ555RvLaqFSqfh0vJiaG3Nxcjhw5QlRUlBTzolQqiY6OprKyEqPReIVwuBybzUZ1dbW0FOq+5Ovo6ODAgQNERkYSExPTr3gP0cUrChJHR0d++ctf8vvf/x61Wo2rqyuPPfYYv/rVrygpKcHT05MPPviA1157jaCgIElD2bFjB+PHjycwMLBfMSyy+1dm0BAv9ICAAP71r38xe/Zs6QYV21nm5ubi6+uLl5fXVbUSq9VKa2srH330EStWrGDMmDHSxWwwGFi/fj2xsbGkpqai0Wh6uIf7eqnVaiIiIkhPT8dqtZKcnMyqVask1b0/xxBfSqUSR0dHzpw5g1KpJCAgQDqG6P612WySDaW3eYolFg4ePIijoyPp6emScdZqtVJcXMzWrVtZvXo1Tk5O/RoXgJOTEyEhIfj6+mJnZ4efnx9RUVHExMTg5uaGh4cH8+bNkwTNz3/+c1JTU1Gr1bS3t7Nu3TqampqYOXMm7u7uV4T894YsSGQGHR8fH0pKSjh//jzjx49HpVKhVCrx8/OjrKyM4uJigoKCrqo219fXs2HDBnx9fVm8eLFU0EgQBLKysjh79iwzZsyQjKb9RdQ4PD09GTt2LOHh4eh0un4ts3o7lru7O7W1tRQUFBAREYGzszNwyX7j7u7O7t278fLywt3d/QrbhmhryczMpLS0lDlz5hAQECDNU6/X8/bbb7N48WLGjh3b73kqFAp8fHzw8fGRzrtGoyEsLEzSAkUhGBUVRVxcnOSeVigUnDp1ioyMDDw9PWltbcXNzQ0XF5drfr8sSGQGHYVCQUxMDGvWrCEmJkYKHReNnmfOnKGwsFBKYoPvPCGFhYUcOnSI1tZW7r//filISxAE6urq2Lt3LyEhIaSlpV3T8Hi1sV3tST7Q4yiVStzc3MjKykKj0fTQSpydnREEgSNHjqDX67FardL31NXVcf78eY4ePcrZs2e55ZZbSEpKQqVSSTag7du3U1lZyapVqwZUGa63efX1/8u3dXR0oNfrsbOzk9IW+hOoJhc2krkpWCwWNm/eTHZ2Ni+99BKOjo4Akgtyx44dFBcX92rUDA8PZ/bs2T28BUajkd27d1NcXMyPfvQj/Pz8hkXhHzGYbM+ePTz00EM9KsB1dHRw4sQJsrKy0Ov1PT4nCpsZM2YwYcIE6TOizeT//b//x29+8xtiY2OHxTyvhSxIZG4KYiTpO++8Q3JyMnPnzpU0CDFmo6SkhAsXLtDc3IzVasXDwwN/f39CQ0Ml46WojVRUVPDpp5+SlJTEnDlzrms5cjMQkxDfeust/P39ueeeeyQ7hzjPuro6zp07R0NDAx0dHbi7u+Pl5UVYWBgeHh6SC1kQBEwmE3/5y18YM2YM999//7CtCHc5stdG5qYg2hBmz57Npk2bSExMlAKbxHX7uHHjGDduXJ/HEQQBo9HIqVOnUCqVV03VHypEt+3SpUv57W9/y6xZsyRtSZxnYGBgj0CzqyHmIjU2NrJ69eoRI0RADpGXuUmIhs3o6GhCQ0PZsWPHdRUkstlsXLx4kYyMDBYsWICLi8tNGvGNERwczJIlS3jjjTcwmUwDrpdis9kwGAx89dVXLFmypN/xG8MFWZDI3DQUCgUuLi4kJydTU1NDQUEBZrNZMrL252U2m9m6dSvh4eGMGzduWGkjImLsxm233cb58+c5fvz4gOYoznPbtm0EBQUxfvz4ESVEQLaRyNxkxKXJxx9/zP79+wdsPDQYDOTn5/Phhx/i4eExrG8wq9VKbm4uzz77LHPnzh3QZ/V6PaWlpbzwwgskJSUNGxtQf5FtJDI3FYXiUkGiGTNmoFKpMJvNA6r2ZbFYmDdv3rBd0nRHobhUc/XBBx+U3Nr9xcXFhSlTphAVFTUsta5rIWskMt8LfWXT9ofrjff4vvmhzPNyZEEiI3MTEQVLd+Nr9zB7cZ+RKDy6Iy9tZGRuEmJmb1VVFa2trcB3QsTX11dyCRsMBoBrZjEPZ2RBIiMzyIhaSE1NDVlZWbS1tZGRkSHFzmg0GgoLC0lKSuLOO++kqKiI4uJipk6dir+//4i0kcjuXxmZQUYQBJqbmzl48CAajYbU1FQ8PT3R6XSkp6czffp0Jk2axObNmykpKWHMmDF0dXWRlZVFR0fHUA//upAFiYzMIGO1WikqKiI3N5dp06YREhKCv78/Hh4e+Pn54e/vzy233EJXVxdGoxFvb2/mz5/PyZMnqaioGDFNsbojL21kZAYZk8lEUVERCQkJ6HQ6TCYTKpWKoqIiNm7ciIODA+vXrycxMVGqJevu7o6npydnz54lIiKiR3W5kYCskcjIDDImk4nMzMw+jadKpRKtVktzc7P0f39/f2pra+nq6hpxWoksSGRkbgLdg+7EJuIxMTHcdddd3Hvvvbz//vuUlZXx7bffApe8OW5ublInvJGGvLSRkRlkxGpwYuxIa2ur1LOmtrZWCodvbm7u0Q+npaVFqmo20pAFiYzMIKPRaIiLi6O6uhpBECgrK6OxsRGNRkNmZiYajYYzZ86QkpLC4sWLgUsG2rKyMlJSUkacfQRkQSIjM+io1WqioqIoKiqisrKSMWPG8OijjwLf9d6ZPHkyoaGhODg4oFAoKC0txc7OjsjIyGt25xuOyCHyMjKDjM1mo6Ojg6NHj1JZWcnUqVMJDQ2VtovCRGzEdebMGfbt20dCQgKpqanXbGExHJE1EhmZQUapVOLs7ExaWprUd6d7R77u2Gw27OzsSEtLIzY2Fo1G8z2PdnCQNRIZmZuE2JRcqVReteK92JBK7LsDV289OpyRBYmMzPeM6M0Zid6ZqzF6ZiIjMwIQq843NjaOyHiRqzGqBIkY+GM2m2lvb8dgMGC1WrHZbNhsNjo7OzGbzcPmBxTrVJjNZqmWqfi0stlsPcYu7i++JzMyEQSBAwcOsGLFCkwm07C5Fm+UUWVsFbuxZWdn09DQgIODAzExMURERGCxWNi3bx+pqalSO8OhRhAEGhsbyc/Px2g04u7uTkREBN7e3litVvLy8lAoFMTGxqLVajEYDOTk5DB+/PgRUXpQ5kqsVitffvkl586do7KykvDw8BFpE7mcUSNIbDYbRqORd999l7KyMpKSkjAajWRnZ3P77bfj7+/PBx98wJgxY/D29h7q4UpC7/3336e5uVnSMiIiIrj33ntxcnLijTfeoLy8nDfffJPY2Fjq6+t5+eWXefvtt3F2dsZqtWKxWKRqWwNp7Sjz/SM2wNqzZw8Gg4HDhw8TEhIyKmwlo0aQCIJATk4OWVlZvPHGG4SEhGAwGDh48CBGo1FaRlit1mGhTgqCwIYNGygrK+PVV1/F29ubrKws1q1bx4EDB5gzZw4mkwmdTscnn3zCq6++Ki2DLBYLnZ2dHD16lKysLEwmE1OnTmXy5MnDQtOS6R1BEKiurqa2thabzUZGRgb33HPPqHgAjHxR+P9js9nIzMxkypQp+Pv7o1Ao0Ol0TJ8+ndTU1KEeXq/s3buXuXPn4uPjg52dHRMmTGDChAnk5eVhs9lQKBQsXrwYs9nMyZMne9h3RE3E29ubpqYmNm3aJNtOhjFiRfxDhw5JjcbPnj1LW1vbUA9tUBhVgkRsn9i967q9vf2wjRQ0Go1otVppaaLVanFwcJA0KLhUx/PBBx/kzTffxGAwSO/b29vj4eGBRqOhrq6Obdu2yYJkmGO1Wtm9ezeJiYmSzaukpGSohzUojBpBolKpiI+PZ8+ePZhMJiwWC0ajkS+++IK33nprWNZ48PLyoq2tTfLGtLW10djYiIeHh9QgSalUEhYWxuzZs9m+fTtw6YLMz8/n008/pby8nAkTJtDe3j7Es5G5Fh0dHRQWFjJz5kycnJwYP348eXl5Qz2sQWFUCZIpU6ag0+n4xS9+wbFjx9i8eTM7duwgLi4OrVYrNXYeDigUCh577DFef/11yWuzc+dO9u/fz/Tp01Gr1dJ4VSoVd911F/v375cETFVVFTabjalTp6LX66Vjygxf8vLyiIuLw9/fHycnJ2bMmEFpaelQD2tQGB531SCgUCjQaDS8/fbbTJw4kXXr1lFYWMjPfvYzpk+fjqOjI9OnT8fT03PYCJO0tDTeeecdXnjhBdLS0vjmm2946aWXSE1Nxc7ODmdnZ7RaLSqVCp1Ox/PPP4+7uztarZbExERaW1t54IEH8Pb2xs/Pj87OzqGeksxVUCgUhISE8PLLL6PRaLC3t2f+/PmsWLFiVDwARl2IvOiZMZlMKBQKyQahUCiw2WwIgiAZu4YacUkjdq8XXbgajQar1YrVau1R6MZms2GxWCQtxWQyYTabUalUqFQq7Ozsho2QlLkSMa/mv//9L2+88QaHDh0aFR4bGEUaiYi4HOjq6uL06dPS/0V7w3ARInDpKaVSqdBqtZjNZqqrqyVBICZ6iWMXx6/RaKRlj1arRafTYW9vj0ajkYXIMKd7O07x7+FyLd4oo/LKEwSB2tpa3nrrrR7vD9cfTqFQcObMGdavXy95Xnq70C5/TxQuI61zvczoY9QKEpPJhNFoHOqh9AubzUZrayttbW1YrdahHo6MzIAZlYJERkbm+0UWJDIyMjeMLEhkZGRumFErSMSO8CPJuz2Sxioj051RKUjEBKnhlO3bF2I8yUgYq4xMb4waQSLejAaDgfLyco4cOYJKpSIjI4P6+nq6urqGXVKb1Wqls7OT6upqcnNzqa6upqSkhNbW1hErVEQh3tDQwNmzZ2loaMBsNg+7cy8zuIyaeiRms5nKykpOnDjB4cOHCQ4O5sc//jG7d+/mxIkTpKWlER8fj7u7+7CIubDZbFRWVpKXl8eBAwdQq9VMnDiRNWvWkJiYSFpaGmFhYVJk7khAEATa2tooLCzk0KFDZGdnc8sttzBx4kRiYmJwc3Mb6iHK3CRGdIi8qIXU1taSnZ1NUVERJpOJ2267jZiYGKmf6sGDBykuLsbb25uEhATi4+NRq9Xfe5SrWH+1sbGRnJwcCgoKaGlpYf78+SQkJCAIApWVlezatQu9Xk9UVBQpKSn4+fkN6/B3q9WK0Wjk7Nmz5OTkcO7cOWJiYpg4cSJHjhyhrKyM0NBQEhISiIiIwN7e/gcbRGc2m/nss8948803pRD50cCIFSSCINDR0UFWVhbHjx9HEASSkpKYOnXqFfVHbDYb5eXl7NmzhwsXLuDl5cWcOXOIiIj4Xm9Osebq0aNH0ev1JCYmMm3aNJydnXs0k+7s7OTEiRMcPXoUo9FIcnIy06dPR6fTfW9j7S9Wq5Xy8nL2798vndvZs2cTHh6OUqnEbDZTWlrKgQMHqKmpISIigunTpxMQEPCDrOYmC5JhgljOv7S0lN27d2MymYiNjSUlJQUvLy8pD6U7ovems7OToqIiTp06JRXeXbhwIW5ubjetxICYaCdqGs3NzURHR5OcnExAQICUtNX96SxqWg0NDeTm5pKfn097ezvz5s0jOTlZStIbKkQ7iF6vZ8+ePRQVFeHr68uECROIjY3F0dFR0jjEEpd6vZ7CwkJyc3Opra1lwoQJzJo1q8e+PwRkQTLEiMLAYDCwbt06ioqKuOWWW0hJSSE0NBQ7O7t+XYyCINDe3k5BQQFHjhzhwoULLF68mNTU1B6ZwoMxXlHobd68mSNHjvSwfTg6OvbrOFarlcrKSrKzs8nKysLNzY177rmH4ODg7z13SPwNbDYbJ0+eZMOGDXh6epKens64ceNwc3O7poCrq6vjzJkzHD16lKqqKlatWkVCQkKP5MTRjCxIhhDRNZqRkcG7777LzJkzmT17Nn5+ftf1RBNtFS0tLeTn57Njxw4cHBy49957iYiIuOEfV8z1OXbsGO+99x4TJkxgwYIFBAUF4eTkJCXb9fdYgiDQ1dVFTU0Nhw8f5siRI9x6660sXLgQV1fX7+UGFF3ptbW1vPvuuzQ3N3P33XczduxY3N3de9WsrnYci8VCc3MzxcXFfP755/j4+HD//fczZsyYfj8QRio/CEFyuUwZ7B+0L5nV13eZzWb++te/kp2dzW9+8xtCQ0Oxt7e/4uknPi17m8fV0rZNJhONjY18/fXXHD58mOeff574+PjrmF3PcbzwwgtUVVXx/PPPExUVhU6n63W84pgvp7elltVqpauri/Pnz/PBBx+g0Wh48sknCQwMvOm2nubmZr766is2btzI8uXLWbhwITqdrtcbv3sw4OXZyt33sVgsNDY2sn37dr799luWLl3KwoULpYfDaGS0ChJpFuJTuvtNONCiK+Jne/uMuO7vfnxxDQ30KODT22dVKhULFiwgIiKiVw+GeGG2tbVx8uRJioqKaGtrw8vLq8dy4vJmznZ2dvj4+JCcnExFRcWgCc+mpiYeffRR4uLi0Gg0vd5sZrOZjo4O2trayMnJobW1lZiYGEJDQ3FycsLBwaHH58Ti1pGRkSxZsoTMzEz0ev33Em/y8ccfc+rUKf72t78REhIiaVWXz0tczoltM1QqFRqNBo1G00OQik2zvb29WbFiBcnJybz99ttYLBbuvvvuUStIRitq+M5ukJOTw8WLF6Ungq+vLxERETg7O/d644rCR6FQ0NDQQF1dHWFhYZL6fvn+J0+elIr3+Pn5SXVD1Gq11AHvakIIkAoTXX4Bi27egoIC1q5dC1xqNOXu7k59fT1/+9vfiImJYcmSJURFRfWIzRCLC/XnwhUNtnZ2dtd8kojH702zsNlsUrzFJ598QnFxMWPHjsXFxYVt27YhCAJ33HEH06ZNw9vbWxJ+3QsciWP+vlamLi4ujB8/HldX1yvmLmofRqORiooKTpw4QVlZGdXV1fj4+BAdHU1iYiKhoaHodDrpfIjnXqFQSPt9n3OSGTykK8JgMLBz507++9//MmnSJLy8vNi3bx/3338/Tz/9dK+CpKGhgcbGRkJDQ/n444/ZuHEjn3zyCTqdrtcn1enTp3n77bdxdXXl/vvvp7m5mQ8//JDk5GTCw8Px8fEZ8AREN/DGjRvJy8vjscceIyEhocf3GwwGvv32W9atW8fSpUtJSkq6QjPpDzabjfz8fEJCQvrVre9q2k1bWxtbt27l9OnTPPjggyQnJ0vnVxAEqqqq2LBhAx999BErVqwgODh4yJ/QV9NA4NKY6+vrOXLkCAcOHCAgIICEhASWLFnChQsXKCwsZN26dSQlJTF9+vReHxg/BEPraEYSJL6+vtx11120traycOFCpkyZwltvvcWf/vQnVq9eLTXmttls6HQ6rFYr33zzDU1NTdxzzz14enpKT+yWlhY0Gg0ODg6SOqtQKLjjjjtobGxEoVCwbNkyGhsbOXDgAA8++CDh4eFSZKSDgwMajaZfEzCbzRw6dIiGhgaefvppgoKCrrjgHR0duf3223FxcWHLli0EBwdLF/O1Lt7uHfqsVivNzc14eXnh5ubWo0JZfxCXX8eOHaO6uppHHnmEkJCQHoFxgiAQFBTEI488wn/+8x927tzJvffe26tWeKPYbDYMBgNwaYnXXdsbyE3d3t7Ot99+S3V1NQ8//DDh4eHSsjguLo6ZM2dy/vx5tm7dyt69e5k3b57kcheRhcjIRg3fPQ3Em16v11NTU0NJSQlBQUGYzWZycnI4fPgwVquVuLg4vL29Wb9+PRqNBn9/f6ZMmcKbb77JsWPHaGxsJCQkhHnz5uHq6or4HWq1WjLO2dnZSa/uavquXbuYOnUq3t7e/bq4ampqyMzMZPr06QQHB/e65BBvjltvvZVDhw6xf/9+7rrrrmsuT0RvSV5eHmVlZVgsFvLz8zl79qwUs3L77bf3+8YTtY2cnBySk5MJCgq6QjMSj+Xs7MyyZcv4y1/+wunTp5k0adKgCxKTycTRo0c5efIkrq6uxMbGEhMTMyDN0Gq1kp2dTUVFBcuWLSM2NvaKfezs7IiJicHBwYH169eTk5NDenr6sG1cJjNwrriTRKFx7tw5FAoFL7/8MoIgUFJSgre3N+Xl5Rw+fJjFixcTFBSEVqslNDRUejq7urrS0dEhxXmIgqQ/iM2gHB0d+/2EKi8vR6VS4e/v36dgENtVzJkzh/fee48lS5b0O0TeYrFgMpkkrcRisWA2m7FarQO6ua1WK4WFhahUKiIjI68pyDw9PYmMjCQzM5OJEyf2OT5xbANJjjObzbi6uqLT6Thx4gSbN2/GyckJf39/YmJimDBhAtHR0Xh5efX6eZvNRlNTE2fOnCE0NJSQkJCrfpdCoSA4OJjw8HCOHTtGQkJCn4JE1N4GOqfhjtVqHZVJjFdcyRqNhujoaOLj41m6dCmBgYEoFAomTJjAkSNHpKAonU5HWFiYZISrq6vD3t6e8ePHExISwuHDhzGZTH1+eW9u2uTk5AFN4OLFi9TgmmcAABrjSURBVGi12n4lhKlUKsaOHUtBQUG/smtF4TNhwgTGjh2LxWKRbm6xv/BAYlhsNhsXLlyQvBV9CSFRM4mLi+O999676n7i0uuFF16gpqZmQBeoOP+Ojg6qqqqoqKjAaDSi0Wjw8vIiICCA+fPns3r16qt+vqGhgfb2duLj4/u0O4nzGTt2LLt27bpmPV1BEMjIyGDt2rW9/lZX8xD25TkcDthsNqqqqkaN21dEmk13v7+/vz/jx4+XlhstLS2sXbuWW2+9lTvuuIPc3FzJVXx5AaHua31xn+6h0qKXR9x2+XFE+nshdP++ayEIAkqlckAFlpVKJQ4ODjg4OGC1WnFycsLZ2RkXF5cBjVPEbDZLy7z+4OjoSEdHx1W3i8d65plnBtyWVNRiysrK2LZtGwaDgYaGBry8vJg4cSK33norU6ZMwd3dvdfPC4JAU1MTBoOBgICAfp2LoKAgamtrMZvNfe6nUCgICwsjOjq6R1iCeA2Jv6GYfCnORzy/l7fxGCzBIl6zAwkqvJyYmBgWLlw45Ab0wURy/xoMBsrKyigtLeXs2bNMnDgRZ2dnbDYbJpOJjIwMkpOTuXDhAnV1dVKv2fr6esrLyzl79ixdXV1UVFSg1+vJzc0lKiqKiIgIyXB6/vx5ioqKUCqVnDt3jvr6elpbWykqKiI+Ph4vLy8qKirw8fHBwcGhXxPw8vKisLCQ9vZ2/Pz8+rxgRM9R95Ds/tDdlRsfH9+rV6q/x/H09KS6upqWlpZ+2YFKS0uJjIzscx+lUklERMSAx9Pe3s5HH33E+vXrcXFx4cEHH2TGjBmMHTsWrVYr9cvpK+zd3t4eOzu7PoVdd/R6fb8DzoKCgnj22Wd7PGSsVisbN25k7969ODg48Nxzz+Hv749SqaS4uJi///3vKJVKZs+ezdy5c9m1axdpaWmMGTPmigC5/nD5w81oNPLhhx/yxBNPXFe+k/j9vcUWjWSkx2JDQwP5+fn4+fmRl5dHVVUVsbGxKJVK3N3defHFFyktLWXatGkEBQXh5eXF/Pnz+eKLL2hsbOTbb7/llltu4fDhw1IT7NraWjo6OiSVNyMjQ9Jytm3bJtkKsrOzSU9Px8PDg/Xr17Ny5UrGjBnTrwmEhoaye/du6urqpGzeq7kozWYzWVlZTJo06bpCsRUKBR4eHtd9AahUKoKDgzl//jw1NTV9tg8VA/hOnz5NUlLSTbnonJycWLFiBStXrsTJyUl6v/uTvC8UCgXu7u44ODhQXV1NbGzsNW+uiooK/Pz8rumVE43/Dg4OPW5mQRCYM2cOHh4e/O53v+MPf/gDr7/+Oo6OjoSFhTFp0iRqamqYNm0aHh4ezJo1C19fXwCqq6u5cOECkyZNutapAb7zauXm5hIXF4eLiwtarZYVK1b0GivVX3qL9B3pSIIkMDCQX/ziFz3aRIoXlFarZenSpZKKOWXKFGlbYmIiNpuN9PR04LtoVUEQeqidCoWCJ598ssdyR6lUSmt68cZ+/vnnB3SCx4wZQ1paGsePH8ff35/g4OArAszEtpgnTpzgwoULvPjii9f9NLkRRFtTXl4eJ06cYMyYMZLQvXyJZjKZOH78OCaTienTp9+Ui+5GBaMYWOjr60tJSQmTJk2Scn8ux2az0dnZycmTJ0lKSupXSYSrhdaPGTMGvV7P7bffzubNmyUNwdHRkbFjx+Lt7U1ISAhmsxmtVovJZMJgMLB27VoCAwOJiorC0dERo9Eo5f54eXlhNBppaWlBrVZLS9edO3dSUlKCTqdj7NixCIKAVquVruGuri6am5uxWCyS7VAMY1AoFJLB2NXVVWpkPxqR3L/izdfdYNZdpRftC93p71NL/PdaQWDXE5SkVquZM2cOlZWVbNmyhVmzZhEcHCxdCGLZv/z8fA4ePMjy5ctxdXUdkh9UDHGfN28e69evl1zd/v7+PQSbXq8nLy+PHTt2sGzZMry8vG7aeG9EQCkUChwcHEhNTWXjxo0cOnSIGTNm9Op16+joIDMzk46ODhYsWNDv7OerjVetVhMaGsqrr77KL3/5S8aPH8/kyZOla0ihUJCV9f+1d29BUd73H8ffy55AjuIuchIBOQ2Eg7BKUSpKNAQlVB2NUpI0MdM0aS5y1UkzmUzTTi86Tm170U6Scdqm1TTGA4yxQWLQKBgLqCConNwViRkRl3CWZXdZ9n+ReZ7/4iHhpGY3v9eMNy6HB5b97O/wfb6/s1RUVLBp0yZu3brF+++/T1pamry7eOnSJYKDg7FarWzbto2PPvqI7u5unE4nBoOBxMREDh06xJdffsmNGzf41a9+xalTp2hpaeHNN9+Ua4Jqa2vp7+9nyZIlPP3005jNZsrLywkLC2N8fJyrV69SXFxMVlbWlOuj3M2kFb9v+6O632PT+UOcysfe72OkUYU0YnINKG9vb0pLS6moqODo0aMEBQXh5+dHQEAA/f39DAwMYLFYKCgo4LHHHpv0onWde8/Vtty33YwnLWZv3LiRiooKysvLCQ4ORqfTodVq6e/vx2w209fXx5o1a0hJSblrm9p14fpRUygUxMbGkp2dzfnz5xkdHSUpKQmdTkdgYCAjIyPcunWL9vZ2TCYTeXl5ctGgqzsX27/re0pvYjk5OfziF7/gL3/5C4GBgZO+Rn19Pfv27SM/P5/ExEQyMjJYu3Yt6enp/Pvf/6atrY3XXnuNlJQUnE4nJpOJn//859TU1HDkyBGSk5N57LHHiIyMZMuWLTgcDvbv309/f79cg3PmzBnWrFnD+Pg4O3fuJCwsDJvNRnl5Odu2bSMvL4+GhgZqa2vl+648kdvsQanVas6dO0daWhoGg2HSYwqFgsDAQLZt20Z9fT1NTU0YjUZ5GBoTE0NOTg4RERH3nNL09/fT2NhIb2/vnE0hFAqFXC9x5/RBpVIRFxfHjh07OHbsGC0tLRiNRvnzdDodP/nJT0hISLjn9Q4PD9PW1kZfX99Dm2dLNxjeK7xUKhV5eXksWLCAzz//nNbW1rtCITg4mHXr1pGcnIxWq73ra0g3+42Pj0/5mqQR3rPPPsuFCxfYvXs3+fn58o7YT3/6U8rKyvDy8iIkJIT58+cTFhZGSkoKmZmZqNVq4uPjWbRoEU6nk9/97neMjY0BYLVa0Wg0LFiwAI1GQ3R0NEFBQbzwwgvs2rWLkZER6uvr8fb2ZuXKlUxMTHDp0iVOnjzJq6++SkJCAklJSRgMBioqKhgeHv7OnSp35hZBolKpKCwsJCwsjKqqKs6ePcuGDRuIjIyctB6iUCgwGAxkZmZit9sZGhoiICBA3nlwfdFJfUabmpr44osv0Gg0bNmyhcjIyFlfr0Kh4LnnnqOhoYFdu3axevVqVq5ciVarlf/IFQoFvr6+FBcXU1hYiNlsxmazMX/+fPz9/SetL0kjELvdTltbGydOnMBms5Gfny/XszxoERER1NXVceTIEYqLi+/qKufl5UVycjJhYWGYTCZ5R87f3x+9Xs+SJUvQ6XSTrlVan+jt7eXjjz/mxo0bZGdnT3sa5+vry2uvvcbOnTv55z//yZYtW4BvFpPvdQe7SqXC19dXfi4mJia4ffs2lZWVDAwM0NPTc9/vJW2FS9cuBaBKpSI0NBSTyYS/v/8PrmrXLYJEqVSSnJxMbGwsRqORuro63nnnHVasWMHjjz8ub8e61mdoNJq7FvRcpxu3bt3iX//6F4ODg/zoRz9i6dKl9x2xTJdCoWDlypUkJCTQ1NREbW0tp06doqSkhOTk5ElrT9K61P2qQqVrHh4eZt++fbS1tbFy5UoyMzOJiIh4aH+w2dnZLFiwgLq6Ot588002bdrE2rVr5Z9X+t3r9frvvKHRdep34sQJjh49Snx8PKWlpSQmJn5nkNxZv6RUKklMTKSkpITXX3/9riC4VzHbnTtB9fX1VFdX88orr9De3k57e/ukBfA7v4aPjw+RkZGcPn0ao9FIQkICJpMJg8Eg/z6mM11zd8q333777Ud9EVMhLQjr9Xri4+OJiIjgzJkzfPrppwQHB0/aSr3fO/T4+Dijo6Ps27ePv/71r+Tm5rJx40b5mIq57oM6b948oqKiSEhIQKvVcuDAAYxGI5GRkXKvkftdq/RCs9lsHDlyhD/84Q/Ex8dTUlJCenq63F7gYU1ttFotoaGhJCQkEBcXR1VVFZWVlURGRsqjk6lci3SLgdFo5De/+Q29vb2UlJSQm5tLdHT0lH4vnZ2dvPfee3z44YeoVCq5j+2CBQvkqcmqVavYvXs3x44dw2QykZ2dTVdXF+Xl5QwODlJTU0N7ezt6vZ7o6Gi6u7t55513GBsbY3BwkHPnzsm3B+zfvx+j0UhUVBS///3vMZlMeHt7U1RUxIULF9i7dy//+9//UCqVPPPMMxw6dIgPPvhArvotKyujtbWV5ORkeVfR07hFq8V7sdvtjIyMUFdXx969e8nKyuK5556Ttx9db8uXXpT19fX8+c9/Ji0tjRdffFGe/z7oHRxpWtLd3c3BgwdpaWmhtLSUnJycSX1i76z4bWtr409/+hM6nY5XXnmFkJCQGRfDzaXx8XH5xXjgwAFWrVo16Q7lO4PA9TkYHBzko48+4rPPPuPVV19l2bJl92w4dT9SpfWVK1cYGhoiJCSE5ORklEolDoeD7u5uxsfHiY6O5vLly/T09KBSqUhOTpY73uv1enp6erBYLERERLB48WIcDgctLS34+Pig0+kYGBiQf9+XL18mICCAgIAA2trasNvt6PV6UlJS6Ovrw2QyySMUPz8/2tvb5b4+AQEB9Pb24nA4SEpKumuHzlO4bZC4ltePjIywZ88eampq+NnPfsaKFSvkIx5sNhtdXV3s2bOH3t5efvnLX5KUlCR3m39YL0rX621paeFvf/sbgYGB7Nixg6ioKLy9veW6hBs3blBeXk5zczPPP/88OTk58vV+H+oQXH8Ws9nMnj176OjoYPv27WRmZhIQECBPMaWPHRoa4vTp0xw8eJC0tDR27Nhx3+CZzvd3/Xzp/6X/k+7RuV+BIvz/neH3mu5Ij7nWPkmPSW9WrtNl15/D4XDcNcWZagMtd+S2QeLK6fym2bLRaGT37t1oNBq2bt1KQEAAjY2NnDlzhmXLlrF+/XoCAwMf+sFYdxofH2dsbIxjx45RVlbGunXryM3NRalUcvHiRY4fP058fDwbN24kJCRk2i0vHxbpBWK1WmloaKCsrAy9Xs/69euJiorCx8dHvvWisrKS4eFhtm7dKpfge+I78w+VRwQJTB4+19TU8J///AeAuLg4tmzZQkxMzPemNFn6lUvD9Pfff58rV66g1WoJDAxk69at8u0JMynSe9ik3/3IyAhVVVWcPHmSlJQUFi9eTGdnJ1evXiU3N5fHH39cLlb7vv9MwvR4TJBIpD4WX3/9NR0dHRgMhu/1u5+0ftLa2orRaKSgoMBtD42S7srt7u7m8OHD7N69m5deekneqv++jqyE2fO4IBG+H+x2OxkZGdTW1k5q+Cx4JvHsCoIwayJIBEGYNREkgiDMmggSQRBmTQSJIAizJoJEEIRZE0EiCMKsiSARHgjpXhRRP/LDIJ5l4YFQKBRkZWW5ZYWuMH1u0dhIcA/SvU6jo6N0d3ezffv2u+6cFTyTCBJhzkxMTNDe3i73UDGbzbS1tVFaWvqtZ/gI7k/cayPMmWvXrvHGG29QVFRETk4OQ0ND7N27l0WLFvHyyy/fs+mz4BnEW4QwZ6qrq4mNjSU/P5/o6GhSUlLYsGEDp06dwmw2P+rLEx4gESTCnBkZGcHHx0fuJatSqVi4cCHh4eFyL1XBM4k1EmHOaLVa+YgG6V9/fz9ffvml3HpR8ExiRCLMmdTUVMxmMy0tLfT19dHV1cXJkyeJi4tDp9M96ssTHiDxNiHMGen83dOnT9PV1cXw8DBms5kdO3b84A6M+qERuzbCnLLZbHLbSF9fX1JTUwkPDxd1JB5OBIkwp6SiNIfDwY0bNwgLC0Oj0Ygg8XBijUSYU9KJiEqlkrfeeusHc2TlD50IEuGBcDqdXLhwQT6kSvBsIkiEB0Ka4kin0AmeTQSJIAizJoJEEIRZE0EiCMKsiSARBGHWRJAIgjBrIkiEOSUd4m6xWLDb7VgsFrlLmuC5RJAIc8J1u7e5uZm33noLnU7HH//4R5qamnA4HCJQPJgokRdmzbUk/oMPPqCnp4eNGzcSHh5OZ2cnVVVVhIeHs3nzZiIiIlCpVKJk3sOIIBFmxOl0Tmr2fPz4ccrKyli1ahVPPfUU8+fPR61WY7fbuXnzJv/973+pr6/n6aefZvXq1Wi1WrnDvAgV9yeCRJg2KURGR0e5fPkyH374IVqtlhdffJHY2Fj5TBuJNOUxGo28++67KJVKnn/+eWJiYvD19RVNoT2ACBJhypxOJw6Hg7GxMW7cuMGJEydobm6muLiYFStWMG/evPt2QnMNnxMnTnD48GEMBgNPPPEECxcuxMfHR5yB48ZEkAhTZrPZMJlMNDY2UldXR0pKClu2bCEoKEgOgO8KAmk6NDAwQFlZGU1NTeTm5pKZmUlUVJRogOSmRJAIU2IymTh//jydnZ14eXnx1FNPERsbi0qluufUxPXP6l7hIu3iXLlyhU8//RS73U5iYiIGg4GwsDAx3XEzotWiMCWnT5/m1KlTlJSUsHr16u/cebFarZjNZoKCgvD397/rcalnSXJyMlFRUZw8eZJjx46hUCgoLCwUQeJmRJAIU+JwOEhKSiIjI+OeIeJ0OrHb7TQ0NFBdXY3ZbMbb2xu73U5QUBB5eXmkp6ej1WpRKpWTPtfHx4elS5fS3t6OxWIRtSZuSASJMCVKpRK1Wn3PBdGJiQmGhoYoLy/n2rVrLFmyhNTUVPz9/RkdHaWnp4fKyko6OjooKioiODh40tdQKBSo1WpxZIUbE8+cMGtjY2McOHAAi8VCaWkpYWFhaLVaFAoFTqcTq9Uq15JUVVXx5JNP4u/vL6YvHkQ8k8KMSVu658+fp6enh7Vr1xIXF4efnx8ajQa1Wo1Go8Hf35+YmBg2b95MU1MTra2tOByOR335whwSQSLMmNPp5Ouvv6a5uZnFixcTFxd331oQpVJJZGQkWVlZfP755wwNDT2CKxYeFBEkwow5nU7MZjO3b98mOjr6W6cqUnf5+Ph4Ojs7sVqtD/FKhQdNBIkwY1Jh2djYGKGhoVOqSo2IiMBsNmOz2R7CFQoPiwgSYcYUCoVckGaz2aa0bWu1WuXdH8FziGdTmDGFQsGCBQvw8fHhq6++mlKQdHV1ER4ejkajeQhXKDwsIkiEGfPy8mLhwoWEhoZiNBoZGRm578dOTExgsVg4e/YsmZmZ+Pn5PcQrFR40ESTCjCkUCnx9fVm+fDl9fX00NjZit9vltgGuPUscDge1tbWMjY2xfPlycXOehxEFacKsLV68mPz8fA4dOkRPTw8FBQV4e3vj5eWF0+nk9u3bVFVV0dTUxKZNm4iJibmrTF5wbyJIhCmRdmSk0YZrZzO1Ws3y5ctZtGgR7777Ln//+9+JjY0lISGBrq4uTCYTaWlpvPDCC0RHR6PVauWv6zpicTqdoieJmxJBIkyJNDXJysoiLS0Nf39/eVQh7d5ERETw29/+lp6eHlpaWmhvb+eJJ54gNTWVyMjIuzqnSSEyPDxMQ0MDFy5cICoqSgSJGxL9SIQpsdlsnD9/nn/84x/ExsZSXFxMZGQkfn5+922t6HQ65cdcRzBSp7WRkRGuX7/OkSNHuHnzJs888wxLly5FqVSK7WE3I4JEmBJp4dRqtfLJJ5/w2WefkZOTg8FgkHuv3vnxEtcRhtPpZGxsjI6ODurr62lsbGTdunXyuopoBu2eRJAI0yKtZ9y6dYvDhw8zMDBAfHw8S5cuJTIyEo1Gc88wcDgc2Gw2rl+/TmNjI0ajkeDgYIqLi9Hr9ajVahEgbkwEiTBjFouFixcvUltby/DwMCkpKeTm5hIcHHzX1KS7u5uamhquXr2KRqNhzZo1pKWlicVVDyGCRJgxaS2kv7+f5uZmWltbGRwcZNWqVWRlZaFSqRgbG+PcuXOcPXsWf39/kpOTSU1NJTAwEKVSKULEQ4ggEeaEdNLexYsX+eKLL/Dy8mL9+vUcP36csbExcnNzSU9PR6fToVarH/XlCnNMBIkwZ6R1kN7eXhoaGti/fz9bt27FYDCg0+nuu34iuD8RJMKsSLs5UjEZfBMoVqsVi8WCt7f3PY/nFGHiWURBmjBjUkGZ2WxmcHCQ8PBwtFotN2/epK6ujoGBATIyMvD19eX27dvodDq0Wi16vV4cJO5hxIhEmLHx8XE6Ozs5ePAgUVFRFBYWUl9fz86dOzEYDGRlZTE0NMSFCxeYP38+ubm5NDU1UVRUREJCglgr8SBiRCLMWH9/P0ePHiU2NpbNmzfT3t7Orl27eOmll9i8eTMqlQq73U5SUhLXr1+noKAAtVpNRUUFISEh6PX6R/0jCHNE1CEL0+Z0OhkfH8doNNLZ2UlBQQEqlYrq6mrUajXZ2dlyFzS1Wk16ejpPPvkkCoWC7Oxs+vr66OjoYHx8XByG5SFEkAjT5nQ65QPF4+Pj8fHxQaFQ0NHRQWhoqFzqDt80PwoICCA4OBgArVZLVlYW1dXV2O12ESQeQgSJMCNWq5WOjg4WLVok79aMjo7KLQZcue7sKBQKYmNj6e7uZmJi4lFcuvAAiCARpk26e7evr2/SMZuJiYl89dVXcqBIuzoWiwWz2YzVapW7qrneCSy4PxEkwrQpFAo0Gg0JCQmTDv0uLCzE6XRy/PhxRkZGsNls8sjl4sWLaDQanE4nN2/exOFwiOI0DyJ2bYRpk4IkPDycS5cusWHDBgCWLFnCG2+8weuvv05lZSVFRUXcunWLkZERXn75Zby8vORF2mXLlol2ix5EjEiEaVMoFGi1WlJTU+np6aG3txen04larWb16tV88sknPPvss2g0Gn784x/z61//mrCwMACGh4epq6sjIyNDtA7wIKIgTZix27dvc+zYMa5du8b27dsJCQlBqVRO6iDv2j1tcHCQjz/+GLVaTVFREf7+/o/4JxDmihiRCDPm4+NDXl4eer2e6upqLBYL8M2Wr5eXl9wyUaFQyD1fR0dHycvLu6ujmuDexIhEmDHX9oujo6P4+flN6hDvSupbotFomDdvnmho5GFEkAiCMGtiaiMIwqyJIBEEYdb+DzNo2yvTlWVIAAAAAElFTkSuQmCC)
Which of the following statements is true?
Path I is feasible, whereas path II is not
Path II is feasible, whereas path I is not
iii. The Cl of (a) undergoes SN reaction because it is activated by the two EWG
groups
iv. The nitration of (c) does not give (b) but it gives because the first nitro group is deactivating, so the second nitro group enters the other ring
There are two paths (I and II) for the preparation of phenyl-2,4-dinitro phenyl ether
![](data:image/png;base64,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)
Which of the following statements is true?
Path I is feasible, whereas path II is not
Path II is feasible, whereas path I is not
iii. The Cl of (a) undergoes SN reaction because it is activated by the two EWG
groups
iv. The nitration of (c) does not give (b) but it gives because the first nitro group is deactivating, so the second nitro group enters the other ring
chemistry-General
physics-
In the set up shown, the two slits
are not equidistant from the slit S.
![](data:image/png;base64,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)
The central fringe at O is then
In the set up shown, the two slits
are not equidistant from the slit S.
![](data:image/png;base64,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)
The central fringe at O is then
physics-General
chemistry-
Homolytic bond fission of a covalent single bond gives rise to free radicals. Owing to the presence of an odd electron, free radicals are highly reactive. They have planar to pyramidal geometry depending upon the groups attached to the C-atom having odd electron. Alkyl free radicals are stabilised by hyperconjugation whereas allyl and benzyl free radicals are stabilised by resonance. They are formed as intermediates in the reaction mixture either in the gaseous phase or in non-polar solvents. Addition of HBr to alkenes in presence of peroxide, the substitution of allylic or benzylic hydrogen by ‘Cl’ at high temperature or by ‘Br’ in presence of NBS are examples of reactions involving free radical intermediates.
Arrange the following free radicals in the decreasing order of their stability. ![C H subscript 2 end subscript equals C H minus stack C with • on top H subscript 2 end subscript semicolon open parentheses C H subscript 3 end subscript close parentheses subscript 3 end subscript stack C with • on top semicolon C H subscript 2 end subscript equals stack C with • on top H semicolon stack C with • on top H subscript 3 end subscript](data:image/png;base64,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)
Homolytic bond fission of a covalent single bond gives rise to free radicals. Owing to the presence of an odd electron, free radicals are highly reactive. They have planar to pyramidal geometry depending upon the groups attached to the C-atom having odd electron. Alkyl free radicals are stabilised by hyperconjugation whereas allyl and benzyl free radicals are stabilised by resonance. They are formed as intermediates in the reaction mixture either in the gaseous phase or in non-polar solvents. Addition of HBr to alkenes in presence of peroxide, the substitution of allylic or benzylic hydrogen by ‘Cl’ at high temperature or by ‘Br’ in presence of NBS are examples of reactions involving free radical intermediates.
Arrange the following free radicals in the decreasing order of their stability. ![C H subscript 2 end subscript equals C H minus stack C with • on top H subscript 2 end subscript semicolon open parentheses C H subscript 3 end subscript close parentheses subscript 3 end subscript stack C with • on top semicolon C H subscript 2 end subscript equals stack C with • on top H semicolon stack C with • on top H subscript 3 end subscript](data:image/png;base64,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)
chemistry-General
chemistry-
Homolytic bond fission of a covalent single bond gives rise to free radicals. Owing to the presence of an odd electron, free radicals are highly reactive. They have planar to pyramidal geometry depending upon the groups attached to the C-atom having odd electron. Alkyl free radicals are stabilised by hyperconjugation whereas allyl and benzyl free radicals are stabilised by resonance. They are formed as intermediates in the reaction mixture either in the gaseous phase or in non-polar solvents. Addition of HBr to alkenes in presence of peroxide, the substitution of allylic or benzylic hydrogen by ‘Cl’ at high temperature or by ‘Br’ in presence of NBS are examples of reactions involving free radical intermediates.
3, 5–dimethylcyclopentene reacts with N–bromosuccinimide (NBS) in CCl4 in presence of light or peroxide. Identify the product.
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)
Homolytic bond fission of a covalent single bond gives rise to free radicals. Owing to the presence of an odd electron, free radicals are highly reactive. They have planar to pyramidal geometry depending upon the groups attached to the C-atom having odd electron. Alkyl free radicals are stabilised by hyperconjugation whereas allyl and benzyl free radicals are stabilised by resonance. They are formed as intermediates in the reaction mixture either in the gaseous phase or in non-polar solvents. Addition of HBr to alkenes in presence of peroxide, the substitution of allylic or benzylic hydrogen by ‘Cl’ at high temperature or by ‘Br’ in presence of NBS are examples of reactions involving free radical intermediates.
3, 5–dimethylcyclopentene reacts with N–bromosuccinimide (NBS) in CCl4 in presence of light or peroxide. Identify the product.
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s7W0RHR4vk5GSxatWqi9IuTTiPGDFC+Pj4iMcee0yUl5dfFopDIpE0PhqNN9JgMGC325k8eTKxsbG8//77zJs3j4qKinq9zpEjRxg0aBB79uxh2LBhPProo/rueReLFi1aMH/+fEwmEy+//DIbNmygurq6XpfnKC0t5fXXX2fOnDn069ePt95667RL5UskEsnpqBefR0OgKL/vPBgYGEhaWhpr1qzhxx9/JDo6mtjY2AsW8KqqcuzYMV5//XWWL1/OQw89xEsvvYTZbL6ovgBFUTCZTERERBAZGUlmZia//PILycnJREREXHB2vRCCsrIyZs6cyZQpU0hPT2fixIkEBgaedaixRCKRnEijUR4aivL7fiOxsbGsWbOGTZs2ER0dTVRUFBaL5bzLPXz4MJMmTWLZsmXceuutvPzyy3q0T0MIWG3JlrCwMJYuXUpOTg5JSUmEhoZekBO9qKiIzz//nBkzZtCyZUv+8Y9/EBkZedks+SKRSBonjVJ5mM1mIiIiCAsLY82aNWRnZxMXF0dUVNQ5j6ZVVeX48eN89tlnzJ49m86dOzNy5EjCw8MbdGSuKApWq5WYmBgMBgMrV67k8OHDJCUl6dFr59qusrIyli1bxpQpU4iPj+dvf/sbLVq0aJBQZ4lEcmXT6JSHhslkolmzZtjtdr7++mt27txJamrqOS0ZAlBSUsL8+fOZMWMGrVq1YujQoSQmJl4yk47NZiMhIQGPx8PixYspKSmhTZs2+Pv7n5P5zOFw6ItdRkVFMWTIENq3by8Vh0QiqRcarfKoOVIPDAwkMzOTzZs3k56eTmBg4BlH6qqq4nA4WLVqFe+88w7NmjVj8ODBtG7d+ryTAOsDRVHw9/cnPj6esrIyVq5cSWFhIR06dNCz0E9XN/HfrPh169aRkZGBn58fQ4cObfDsfIlEcmXTaJWHhs1mIzExEZPJxJw5c8jOzqZr164n7a9xIm63m6ysLMaOHUtgYOAFZ4/XN/7+/rRq1YpDhw4xZ84cvF4vXbp0OSuluGHDBkaOHInNZuPFF1+kS5cuMrJKIpHUK41eeSiKgsVioUWLFgQEBDB79my2b99Onz599PWnagpN8d+9K/bs2cPzzz+PEILhw4fTvXv3y0rAajOQtm3bsnPnThYtWoTRaOTaa689pUnN6XTy66+/MmjQIBwOB6NGjaJnz56XVbskEskVwiXNMqln3G63GDdunLDb7WLAgAHi+PHjJyX3eb1ecejQIXH99deLhIQE8cknnwiPx3OJanxmVFUVZWVl4sYbbxRWq1XMnDlTeDyeOpMWDx06JJKTk0VsbKyYM2eOcLlcl6DGEonkaqDRzzxOJD09HVVVWbRoEQUFBbRv3x6bzYbBYMDtdnP48GGeffZZ9u3bx5AhQxgwYMBFTwK8ELSZVY8ePdi0aRNfffUVkZGRJCQk6M5vl8vFr7/+ysCBA8nNzWXs2LHcf//9l3W7JBJJ4+aKUh5aGG+7du3Izc1lxYoVVFZWkpqaip+fH7m5uYwbN461a9fyyCOP8MILLzQKJ7KiKAQGBtKpUydWrVrFypUrSUhIoFmzZhgMBnJychgzZgw7d+5k8ODBPP74442iXRKJpPFyRSkPDbPZTJs2bcjPz2fFihU4nU78/Px4//33WbZsGQ8//DB/+9vf9L3TGwOKohASEkJqaiobNmwgKyuL8PBwXC4XEyZMYP369TzxxBM8++yzFz0rXiKRSBQh6nEBpcsI8d9tTd944w02btxIdHQ0+/bto1evXrz22ms0adLkUlfxnBH/XU7922+/5dVXX8VisRAZGcmePXu47bbbGDp0KGFhYZe6mhKJ5Crgih2eKorCNddcw9ChQ2nVqhUbNmygd+/ejBgxguDg4EtdvfNC26K3a9euPP3007jdbtatW8dtt93Gc889R1BQ0KWuokQiuUq4YpUH/J6F3rJlS9q2bYufnx99+/YlPj6+Ue+LrSgKfn5+9OrVi06dOhEeHk6PHj2IjIzEZDJd6upJJJKrhCte2hiNRkwmEyaTCX9//0atODQMBgOBgYHY7XZsNpvM45BIJA3OFT3zuJLRkh+l0pBIJJcCqTwkEolEcs5c8WYrieRyQfx3aZyKigosFgu+vr4ypFrSaJFPrkTSQAghOHDgABkZGXz99de4XK563WpYImlI5MxDImkghBAUFRVRVFSEEAIhBKqqntJvJX1akssZqTwkDU7N0faphOP5jMjPtM/J2Rx3MTEYDKSlpdGxY0fKy8uZO3cuPj4+9O7dm9WrV1NcXEzbtm0JCAhg69atpKWl6RuTXQrO9h5cyQpOVVVdwZ8qSOVM/XQx+0ern7atdEPeC6k8JA1GzdE2/P/I+kS7v/ZCnAtaOXW9PDXLq/mCXaqRvcPhYNeuXURFRfHTTz/RvHlzysvL+frrr0lJSQHgyJEjtGjRosHrVhNVVc9KMJ6q3xs7QghKS0vJysqitLSULl26EBMTU0uZa8/zqfrpYvaPqqr89ttvfPfdd8TExNCzZ88G3SlUKg9Jg1FRUcHSpUtZtWoVHo+HFi1a8NhjjxEeHq4/8NXV1Xz//fcsXrwYp9OJoihER0djtVrJycnB4/FgNBr1PU2EEAQEBJCSksLNN99MdHQ0ZrMZ+P3lKikpYeXKlaxbt46qqio6dOhAnz592LZtG926dcNutzd4P5hMJpKSkujduzf79+/H4XBwyy23sHXrVpxOJ0FBQVx//fWXdNbh9Xr58MMP+fnnn3G73QghMJvNen20gUBkZCQDBw4kMjLyslMgWh2FEOclwCsrK5kzZw7Tpk0jISGB5ORkoqOja5V/7NgxPvzwQ3777Te8Xi9CCH01a6vVSvv27enTpw8RERH1nsS7b98+Jk2aRGZmJg899BDdunWr15W0a5pV6wrskMpD0mD4+PjQpUsXzGYzH374IUuXLsVkMvH888/rG3dZLBbatWuHx+Nh+fLltG/fnvT0dKxWK9nZ2fz9738nISGBwYMHExAQQHl5Od999x3vvvsu06dPZ/LkybRp0wZFUSgtLWXatGlkZWVx33330aJFC3bt2sVTTz2F2Wzm2muvvSTKw2q10rRpU0JDQ/Hz88NoNGK322nTpg1z586lX79+xMXFYbVaG7xuGgaDgZtvvhm73c7bb79N8+bNefjhh/U14VRV5eDBg8ydO5dDhw4RHh5+WSXgarOGnTt3EhkZSWxs7DnXz2az0bFjR9atW0d5eflJ3yuKgt1u55577mHt2rV8/PHHtGvXjgceeACLxcLChQt5/fXXWbZsGa+++ipJSUn11TwAoqKi6NatGz/88MM5z9TPhurqan755RcsFgtt2rQ56XupPCSnRQiBx+MBuOBRjclkIjo6mttuuw0hBC+99BJvvfUWCQkJ3HnnnVgsFgwGA02aNKFt27bs27ePtLQ0kpKSMJvNmEwm7HY7AQEBtGzZkuDgYDweDy1btiQgIIAxY8aQkZHB+++/j4+PD/v27WPVqlV07tyZW265hYCAAJKTk3G73UybNq2+uuiccLvduN1uPB4PXq9XN6mZzWauu+46vvnmG3bv3k2nTp3OOYy3pnnuQm3giqIQFxeH0+kkLCyMwMBAUlJSiImJ0a+VnJwMnGyO1M7XvjvxM+1zbeaofVdXXbWyT3XMid9ruN1utm7dyurVq7nzzjtr+QVqnlNXuTXLCw8PJzQ0tE7lAb8PBBITEykqKsLf35/Q0FBSU1MJCQmhRYsWmM1m3nvvPWbMmMHLL7+sD5JO7Iea/XWiCayu+gkh8PHxISYmBqvVWuucU/VJXf1YV1/A7zPPo0ePMnfuXG666aZafh8NqTwkp+XYsWN8/vnnpKam0rNnzwseXRoMBmw2G3a7nTvuuIM5c+bw9NNPExUVRadOnWodZzQaa5kb6rIfm81mgoODufHGGwkLC2P37t1UVFRgNpspKioiPz+fiooKvF4vRqMRf39/brvtNnbs2NHgORZCCDZt2sRnn32Gv78/27ZtY8mSJeTl5dGhQweaNm3KE088gc1mw8/P75zLV1WV5cuXk5OTw6OPPoq/v/8FKXtFUfR7UNd3ZrOZO++8E0VR8Hg8VFdX68LQZDJhMBhwuVz68ZrgdLvdwO/3WFOgJpPpJHu9lhfj8XgQQmA0GrFarbUEn8fj0cszGo26yXL37t1MmjQJl8vFTTfdhMvlwmAwYDAYEELgcrl0ZacNTGoqFu17rewz9dOJz6nRaCQkJIRbb72VqVOnsmnTJvLz84mJiakliD0ej27iOrHNWjk1+0UIgdfrxe12o6oqXq+3Vl1qnm80GrFYLAB4PB59EFhzK4qa/WcwGLBYLPqsbfLkySxfvpxOnTrhdDr1ftKQykNyRuoaDV0I2kvRoUMHEhMTee2113j++ef56KOPSE1NPaNtWHtptJehsrKSvXv3UlZWRteuXfH398dkMhEWFobdbmfhwoUkJyfTp08fwsPDsdvtpKWl6S9WQ6EoCjfeeCNLly7V2zFkyBCsVis2mw0hBJ07dz5vpaYoCunp6SxYsICMjAwGDhxIREREvThsNaGl9Xl1dTWfffYZ999/P35+fqxatYo33niDvXv3IoTgueee48EHH9R37ezVqxeDBg0iJyeHmTNn0rJlS9LS0pg3bx6//PILd911F08++SQxMTGYTCY8Hg/Hjh1j4cKFLFiwgNLSUqKjoxk+fDht27bFZDKRk5PDF198wdq1aykuLiYtLY0XX3wRq9XKO++8w48//gjAs88+S/fu3Rk5ciSBgYHs37+fjz/+mHXr1mEwGOjTpw/9+/enadOmqKrKhg0beOuttygvL6dFixaUlpael1lIVVWqq6v1cysrK1m6dCmffPIJcXFxdOrUiQ8//BC73c5HH32EEIINGzawZMkSduzYQXV1NcnJyTz11FP681pcXMyXX37J/PnzsdlspKam4nA49PfT4XAwbtw4vvrqK9LS0hgzZgwtW7bkgw8+4KOPPuL48eN8+umndOnShaNHj/LNN9+wdOlSDh8+zDXXXMOgQYNITEzkjTfeYNGiRRw9epSXX36ZpUuXMmjQoFrmK5kkKLkkaKPTu+66i0GDBlFQUMBLL71ETk7Oac9TVZXjx4/z008/sX79etatW8fMmTPJyMggJSWFxx57DF9fXxRFISEhgb59++JyuRgyZAivvPIKGzduRFVVBgwYQGhoaAO19ne0Eaafnx9+fn4EBAQQFBSkL2ypzbbOV9AbDAZCQ0O57777WLFiBVOmTGH//v26wD9fVFXl6NGjbNq0ifXr15OVlcX8+fP59ttvcbvdmEwmevXqxSuvvELLli0JCQmhY8eOhIaG8oc//IGbbrqJ8ePH43K5mDNnDt999x0///wzERERTJ06leHDh/PFF1/wzjvvUFFRAcDBgwf55JNPiIqK4vPPP2f27NlUVFQwcuRIfv31Vw4cOMCkSZPwer1Mnz6dmTNnkp2dzahRowgLC2PcuHH84Q9/ID09nY8++og333yTkJAQNm3axJQpU+jfvz+LFi3iySefZNGiRcyePZuSkhJ++eUXRo8ezZ133sm8efPo27cvO3fuPGmEfzo0E15hYSFLlizB5XKRmJhIWVkZ8+fPZ/Xq1ezatYuIiAgef/xxgoKCqKysZPXq1bz11lukp6ezePFi3nnnHY4ePcrQoUPZs2cPVVVVrFixgmXLljF8+HA++OADfYatKQ9/f3+GDRtGr169cDqdeDwezGYzf/nLX+jbty9OpxO3282xY8eYPn06W7duJSMjg88++wyLxcLYsWMpKytjzJgxDB48mNjYWN58802mTp16kt9DzjwkOjWjU7TRkjYF1n60z09lzjhXzGYzTz31FMXFxcyaNYvJkyczbNgw3fxQVx3z8vJYtGgRNpsNj8fD0aNHcblc3HDDDZhMJt0sYLfb6d+/P76+vsyZM4cFCxawevVqHn/8cW699Vbdl3I2/aKFYzaGjPB27dpx7733MmPGDA4cOMDjj7BEY2YAAA+0SURBVD9Ohw4dztuMpaoqBw4cYPHixdjtdoQQFBYW1jLpmEwmOnbsyLPPPktGRgbz5s2jrKyMQ4cOMXz4cH0W+Mwzz5CXl8c111xDUlISNpuNu+66i2+++YZ169Zx8OBBAgICWLt2LdnZ2VgsFl042u12Nm7cyJo1a7DZbDidTm699VZCQkIIDQ3lhRdeYN++fadso8vlYtq0aaiqyqZNm9i4cSN5eXn6bKNnz5589tlnJCUl0a9fP91H1q5dO0pKSs7YT263m19//ZUlS5ZgNBrZtm2b7nN56qmnSElJ4a9//SslJSVYLBaioqK4/vrrufvuuykqKmLZsmU0bdqUG2+8EbPZTFpaGgMHDmTIkCFMnz6dRx55hIULF9KtWzeuu+46fH196dSpEwsWLDjJlBsaGsqhQ4f0zywWC02bNkVRFFRVZe/evWzatInHHnuM2NhYvF4vAwYMICsrC5vNdlbvtlQeklrk5OTwww8/UFVVBUB5eTk///wzOTk57NmzR/d59OjRg7S0tAs2h5hMJgIDAxk4cCAFBQWsWLGCsLAw7rnnnjoFtdFopF27drz22msEBwfjdrs5cOAAn376KZMmTWLfvn1MmTKF2NhY3fk+YMAA2rRpw4IFC5g3bx5jx45l27ZtjB8/nvj4+DPW0ev1kp2dzYYNG3Qb/uWMqqoUFxfjcrmYN28eBQUFDBs2jO7du2Oz2c65PJPJROfOnRk7diwxMTEIITh48CATJkzQhYzm0+jduzdHjhxh4sSJHDx4kPHjxxMdHY3BYMBsNmO1WvXZlTb7DAgIoEOHDqxdu5ajR4+SmJhIXl4eBw4cwNfXl4CAAADi4uJISUkhODiY7du34+vrS0REhD6Que+++/Q61yXsKyoq2L9/P0ajkezsbP3Z7d69O02bNqWwsJDNmzfTt29fffZqs9kICQmhrKzsjP3k9XopLi5m7969us9i4MCBdO/enebNm+v+C7PZTJMmTfDx8dF9DIWFhezbt4/OnTsTGBio+5RSU1MJDg5m7dq1JCUl8dtvv/Hwww/rAj44OPgkYV9XYEHNBEePx8P+/fupqKjQ81aMRiM9evSgR48e+o6lZ3wuzniE5KpBe2ADAgJ0f4CiKPj4+ODn54fdbteVR337CyIjI3nuuefIzc3lf//3f2tFxpwOs9lMQkICTzzxBJs3b2bdunW6OaKkpITCwkKaN2/OddddR3JyMl26dOHdd99l6dKlpKen88QTT5xx9qGZmwIDA8/KgXqp8Xq9VFRUYDKZMBqN+Pj41HI0XyiKohAVFaXP6mreIy23oWnTpuTk5JCXl0daWtoZ+zg4OFgXbl6vF4fDQWRkJIMGDeKaa66pdezRo0fJysqiuLiYyspKPZLqTLjdbkpLS7n55pt56aWXap2jBTPU9B+cK1arlXbt2vHMM8/oJlFNMJ+ufpqwrqioOClSKjAwkMjISHbv3k1RUdFZCfUzIYSgvLycsrKyU0aRnQ1SeUhqER8fX2s0XlBQgNfrJTU1lV69etV7LL/2olgsFlJSUnjiiSd47bXXmDlzpp5Idzo0X0FwcLDu8Dx48CBCCI4fP84vv/xCWFgYYWFhhISE0LdvXywWC08++SS//vorXq/3jILNaDSSmppKampqvbX7YlJcXMzHH3+M2WxmwIABPProo6SmptarwrdYLLRv3x6n08mOHTsICgoiOjqaoqIitm/fzp/+9Cdmz57NO++8Q1JSEomJiSeFk2q/tZF3SEiInjCqKAq//fYbx44dIzExEbPZjKqqHD58mOzsbAIDA8nKyiI7O5u4uLiThLMW9XXi9RRFYcuWLVRVVREUFITRaKSqqoqtW7dy/PhxAHJzc0/KGj+bVQ+0QBCr1YqPj89Z96WiKPj6+mKz2Th06BDl5eUEBgbq13W73SQmJhIYGIjL5aKgoKCWGbWuLPdTheJqfwcEBFBcXMyGDRvo2LGj7nc7F9OsdJhLLhknPqRWq5WbbrqJZ555BiEE+fn5dYYi1hXTrgktRVGIj4/HYDBQVVVFVlYW27dvr/VyxcbG4u/vT0hISINHXF1MtIioDRs2MG/ePO69915GjhxJ27Ztz3u3yVMJEq3fCwoKyMzMRFEUHA4Hq1atIjAwkNtuu42hQ4eyd+9eXn31VYqKimoJ35qCz+v1sn//flq1akV0dDQ2m43mzZtTVVVFRkYGmzZtorq6mvLycr7//nt8fHxISUmhvLycWbNmsXv3bqqrq3E6nWRlZbFt27Y6r6VF2W3dupXXXnuN3NxcXC4XO3bsYP/+/URHRxMTE8NPP/1EQUFBrToWFRVRXFx8SgVSl4A+2/40GAyEh4eTkpLCjh07yMnJ0RVCcXExxcXF9O3bl9atW2O1WtmyZUstM5oQv6/WXHMlgNDQUFwul97vNdty5MgR4uLi8PX1ZfHixXz//fc4HA5cLhc///wzWVlZtZTvqZZgkcpDckbqcw0oLXzx4MGD7Nmzh8rKSt0Rr03T77nnHh566CHsdrtuxnA6nZSVlVFZWUl1dTWlpaVUVlZSWVnJzz//zPjx49m9ezddu3blj3/8oz4S3bFjB1OmTCErK4vy8nIKCwt5//338ff354477rii9tMQQlBcXMzs2bO55ZZbeO655/TQ13O9f0IInE4nx48fp7i4WDetOBwOHA4HlZWV7Nq1i7Fjx1JVVYWvry8rVqxg48aNNG/enKCgIG644Qb69+9PZmYm//rXv8jPz9cF2JIlS/jxxx9xOBwsX76cH374gQceeAC73a6Hz954441s2bKF/v3707FjR3r06MHKlStp2bIl1113HW3btmXNmjXcd999dOzYkZtvvplZs2YRFxeHj48PERERVFRUkJ+fz5o1aygtLeXFF1+kSZMmzJo1i5tvvpnrrruOZ599FpfLRXJyMv369SMvL49x48Zx/Phxdu3axb59+9i7dy8ZGRls3rxZVyCa4quurqakpISqqirKyspwOBy6IK/Zn5pPpKSkBLfbreeSKIpCUFAQDzzwAEIIPvroI3bt2kVpaSmffvopaWlp9OvXT8+1WrVqFfPnzyc3N5dNmzZRUVFBZmYmw4YNo7q6GqvVSnR0NOXl5Wzbto2CggK+/vprsrKyUBSFt99+m3nz5tG7d2927drFM888Q3p6Oj169NBXEzAajTRp0gSj0UheXh5btmxh7969tQdz4iogIyNDxMfHi+++++5SV6VeUFVVlJeXi1deeUV07dpVrF69+qJdq6CgQEyZMkWsWrVKeL3eCy4vOztb3HvvvSIsLEyEhoaKmJgY8eWXXwq3260f4/V6RW5urpg8ebLYuHGjOH78uHjkkUdEeHi4CA4OFiEhISI0NFSEhYXpPz169BAzZswQRUVFwuv1ClVVxe7du8XXX38tfvzxRzFw4EARHx8vwsLCxEMPPSRycnKEx+O54PZcTrjdbrF06VIxZcoUUV5eft73S1VV4XK5xOOPPy5CQ0NFSEiICA4OPqnPw8LCRJs2bcS6devEmjVrxM033ywiIiLEk08+KQ4dOiQ+/vhj/fyIiAjxP//zP2LRokXipptuEg888IDo16+fiIuLE3369BGZmZn6fRPi/5+Bl19+WcTHx4vw8HAxevRovV1er1ccPHhQjBw5UiQkJIiIiAjx/PPPiz179ghVVYXH4xEbNmwQt99+u+jQoYP46quvRFVVlXC73WLz5s3ij3/8owgPDxfp6eniyy+/FNXV1cLr9QqXyyU+/fRTkZqaKhITE8VLL70kRo0aJR599FGxYcMG4XQ69X7yeDxiz5494pZbbtHbGRISIlq0aCHmzp0rqqur9WOdTqf45ptvxA033KA/v23bthXbt28XqqoKVVVFdXW1WL9+vbj77rtFWFiYSEhIEKNHjxa5ubnC4/EIr9crDh8+LEaMGCESEhJEnz59xH/+8x9x++23izfeeEMUFhbqfZOXlydGjRolYmJiRHp6uli4cKF47733RPfu3cW0adNEcXGxKCwsFJMmTRItW7YU4eHh4sEHHxQ//vijcLvdQlVVcfDgQfHwww+L1q1biwkTJoiioqJaz4kiRCOIPbxA/v3vfzNp0iSmT59O9+7dL3V1LhghBA6Hg7fffpsVK1bw+uuv07Vr14t2rfpangTQM5FrlmmxWHTHonbNmo+llgWrZSPXRV3l1Ky/y+XSz7darboD+XJbzO9C0JIntUzq822b1v9OpxOn03naYy0WCxaLpVYot2b310bl2r00m83s3LmTUaNGkZqaytChQwkLC9MjsU40IXq9Xlwul55hbjabsdlseru0a2oRcFoGtNls1k0tTqcTr9eL1WrVfVsejwen06m302az6dfWfAza8jE1VzrQfmuzVc0P4nK5akXhaVFV2nI7Ne+Ny+XSgy5MJhM2m02PPjuxPIPBgMlk0iPUtLprMxYhhF6fEx3z2v1zuVx64IQ2y9Gy/xVFqVV3g8GA1WrV33OtnzS/Ys2FMUE6zCVnQIvAqi9MJhP+/v5nvGZNwacJqPNBq399tuFypaZguxC0/vfx8Tlrx29dqwJogk9DE/aaErfZbHoYbl1okWKnu6YmgOtqg9FoxNfX96TvTvc8aAL0bBal1PrbZDLVeZ26jj3dc3g25WltPhNne/9sNtspw7fPdC2pPCQSyUVHVVVycnJYsmQJubm5CCHYtm0bwcHB9RpGLGk4pPKQSCQXHfHf3AKTyUS/fv0wGo368hmXcul5yfkjlYdEIrnoGI1G2rZtS1paGvD/ZqULWctLcmmRykMikTQIV4vv6Wrhyglyl0gkEkmDIZWHRCKRSM4ZqTwkEolEcs5I5SGRSCSSc0YqD4lEIpGcM1J5SCQSieSckaG6nLyW0tlwKWLTZTy8RCK5XLjqlYfD4WDnzp36BjBng7aznLa9ZkPQvHnz064DJJFIJA3JVa88SkpK+PLLL1m+fPlJGw+dDm3v7VMpj/perPg///kPrVq1qtcyJRKJ5Hy56pWH3W7ntttuIyUlpV5MV+K/G/Lk5+fXWqb5QvHz86u3siQSieRCueqVh5+fH+np6XTs2LFeZgvaPgKn23viXNH2OJZIJJLLhateeWibo9QnF2N/Leksl0gklxNXlfLwer36Ll6NGSEEbre7zk3pJRKJpCG4apSHx+Nhz549V4T5RwhBVVUVeXl5gJyVSCSShueqUB5paWlERUUxZcqUK8bx7PV6EULQtWtXIiIiLnV1JBLJVcZVoTx69epFZWUl2dnZ5xSOe7kTGRnJLbfcQnx8/KWuikQiucpQxFVgNPd6vXr005XUXKPRiMlkQlEUabqSSCQNylWhPCQSiURSv8iFESUSiURyzkjlIZFIJJJz5v8AiLjBUh4fezUAAAAASUVORK5CYII=)
chemistry-General
chemistry-
When isobutene is brominated, the percentage of
would be approximately
When isobutene is brominated, the percentage of
would be approximately
chemistry-General
chemistry-
What is (B) in the following sequence of reactions?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAcMAAABOCAYAAABc331sAAAgAElEQVR4nO29d3iVVbb4/zk1OTnJSU9IQgkhJCGBhE6CSm8DI0iVUUQdC+qjXK46OOLYG4PjXBuDV3nGQnUuqAg6CISOkCAgPcQkhPRASD+9vL8/+L3vTSc0uV+yP8/jI3Desutaa6+19n5VkiRJCAQCgUDQgVHf7AIIBAKBQHCzEcpQIBAIBB0eoQwFAoFA0OHR3uwC3GhcLhfV1dWcOHGCgoICJElCq9XStWtX4uPjCQ4ORq1Wo1KpbnZRBQKBQHCTUN3KCTRut5tjx47x/fffU1FRga+vL3q9HpvNRnV1NaGhodx111307t0bnU53s4srEAgEgpvELasMnU4nmZmZfPrpp/j6+jJ79mySk5PR6XSYzWYOHTrEypUrcTqdPP300/Tv3x+NRiNWiAKBQNABuWVjhnl5eSxfvpyCggKmTp3KwIEDMZlMGAwGgoODGT58OJMmTeLUqVN89dVXVFRUcIvaBQKBQCC4DLecMpQkCZfLRVZWFhkZGSQlJZGQkNDIDapSqfDy8iI5OZkePXqQmZlJfn4+LpfrJpZcIBAIBDeLW04ZApjNZk6fPk1FRQWRkZH4+fmhVjeuqkqlwmQyERkZSUlJCadPn8Zut9+kEgsEAoHgZnLLKUNJkrBarZSXl2O1Wtu8VqVSoVKpqK+vp6SkBKfT+RuVUiAQCAT/l7jllCGAWq1Gq9U2Ww22hkajQafTieQZgUAg6KDccspQpVLh4+NDly5dMBqN1NXV4XA4WkyOcbvd2O12/P396datG3q9/iaUWCAQCAQ3m1tSGRoMBhISEoiIiOD48eOUlpbidrsbXSdJEhcuXKCgoIBevXqRlJSEl5fXTSq1QCAQCG4mt5wyhEtuz4SEBIYNG0ZBQQGHDx/GZrMpv0uSRF1dHfv37+fChQtMnDiRmJgYNBrNTSy1QCAQCG4Wt+xxbJ06deKhhx7CbrezatUqXC4Xd955Jz4+PlRVVfHDDz+wd+9eZs+ezfjx4zEYDCJmKBAIBB2UW/YEGgCPx0N+fj7p6elkZmZSUFCAWq1Go9EQFxfH+PHjGTBgAIGBgWJVKBAIBB2YW1oZwqUkGavVSn19PTabDUmSUKvVGAwGTCYTer1e2WIhEAgEgo7JLa8MBQKBQCC4HLdkAo1AIBAIBFfCLa8MHQ4HRUVFWK1WJEnCbDZTWFjYbKuFQCAQCDout7wyrKmpYe3atZSUlODxeCgsLGT16tXiHFKBQCAQKNzyyhBQTp+RJKnRfwKBQCAQQAdRhgKBQCAQtIVQhgKBQCDo8AhlKBAIBIIOj1CGAoFAIOjwCGUoEAgEgg6PUIYCgUAg6PAIZSgQCASCDo9QhgKBQCDo8AhlKBAIBIIOj1CGAoFAIOjwCGUoEAgEgg6PUIYCgUAg6PAIZSgQCASCDs8trwxVKhVqtRqVStXszwKBQCAQQAdQhlqtltDQUPR6PSqVCm9vb0JDQ1Grb/mqCwQCgaCdqKRb/MN+brcbj8eDRqNBpVIpX7iX/y4QdGScTicnTpygsrISj8eDSqXCx8eHyMhILBYLERERBAQEtDpXXC4XOTk5lJaWKnNLp9PRvXt3oqKiFE/MjUT+Pum1enxkUXgz5YIkSdjtdnJzcykrKyMgIIDg4GCMRiOBgYFotVrlutraWk6fPk1tbS2dOnWiR48elJaWUlhYiMfjoVOnTiQkJKDRaNr1bo/HQ0FBAQUFBQAkJSURFBSktIfL5aKsrAyVSkV4eLhSlhtFQ9V0tX1yJWPjxtbm/wAajabRYLjRHSgQ/L+E3W5n586drF27lsjISEwmE9XV1YSHh1NZWcmCBQtITU1tdd44nU4OHTrExx9/jL+/P+Hh4VRXV5OYmMhjjz1GRETEDVUuTqeTqqoqdDodAQEBV/UMSZJwOBxUV1fj6+uLj4/PTVGIkiThcrnYvn07mzdvxmazERISgiRJDBw4kHHjxuHn5wdcUlwXL15k1apVHDp0iJkzZxISEsKxY8dYvnw5drudOXPm0LNnz3YrQ7fbzYkTJ1i2bBlBQUE899xzBAYGNlKGOTk5aDQagoKCbuiCQpIkrFYrdXV1+Pn5YTAYrupdFouF2tpaAgMD8fb2bvNaoRkEgg6Mt7c38+bNo6ioiIkTJ9K7d2++/fZb/vnPf6LVanG73TidTtxuN1qttplg1ev1TJ8+nRMnTjB48GCGDRvGoUOH+PLLLzl69Cjh4eE3LCRhtVo5c+YMVquVuLi4q36OSqVCkiTOnTuH2Wymb9++ba6GrwcejwdJkpT/q1QqPB4PRUVFrFmzhokTJzJp0iQuXrzIxo0bcblcje5Xq9V069aNadOmERYWxqRJkwgNDWXChAmcP38eu93OrFmz0Ol07S6TVqvl9ttv5+TJk6SkpBATE9Ps97S0NDQazQ0NM0mSRHV1NdnZ2Xh5eSkGwNXgdrvJyclBp9ORmJiIr69vq2VvUxleiQe16ZJWHkjyv7f2+2/F5epyPcvT3naTJ2HDe+RyNGy/q2279tS5Pe9v6/drLUNr1zat541sB/l5N6ovWrqv4W9X2qbXE41Gg5eXF15eXuj1eoxGI76+vnTv3l1xm/3www9ERkby0EMP4evr26guarUavV6PXq/Hy8sLg8GAyWRCo9Eogv5G4PF4yMnJYdeuXUyZMoXg4OA2r7+cy83b25vOnTuzfft2XC4XQ4cOvaErRIfDwc8//0xFRQVnzpxBq9Uye/Zs9uzZg1arZezYsfj6+uLn58ecOXMwm814eXk1qoNGo0Gr1SpGimyo6PV6JElCq9U2m8dN/94QSZLQaDRKfza8Hy6twg8cOIBGo2HgwIEYDIbr3i6SJGGz2Th8+DDl5eWMHTsWHx+fRmVuzZ3dkjvU19eXrl27kp6ejtPpZNCgQa2uEFtUhrLFYrPZOH78OD/++CM5OTk4nU6io6O56667MJlMZGVl0bdvXz7++GNyc3NxOBzodDpCQ0N5+umniY2NJSsri3fffZeqqirg0uRJSkri4YcfpkuXLjdcAHg8HtxuN6WlpXz//fccPHgQi8WCn58fI0aMICUlhdLSUnr37n1drFjZ5VJcXMzGjRs5cuQIVquV4OBgxo4dS1xcHDk5OQwbNgxvb2+WLFnCiRMncDgcqNVqAgMDmTNnDsOGDaO4uJjFixdTXl6uxD27du3KfffdR79+/VptO7nOFy9eJD09nb1791JVVYVWqyU1NZWRI0dSWVlJQEAAZ86c4fvvv6e6uhq32423tzf9+vXjySefxO12s27dOtLT0zGbzcrEmzhxIvfff/9l+87tdlNbW8uRI0fYtm0b586dw+VyER8fz913343T6aSoqIiIiAhWrFjBuXPngEsCOiIigpdffhl/f38OHjzIJ598Ql1dnbJCGTBgAI899hiBgYGXLYPL5SIvL4/vvvuOU6dOYbfb6dSpExMnTiQyMpJff/2V8ePHs2TJEk6ePInD4QAgODiY+++/n9tuu42ioiLefPNNLl68iMvlQqfTER0dzdy5c0lJSWn13RkZGaxatYqysjKcTidarVax1rVaLV27dmXkyJGkpaVhNBpvWmJXZWUlr7zyCv7+/mi1WkaMGMGJEyc4ePAgAwYMYMWKFUyYMIG4uDgcDgdut1sRwHIsfsmSJSxfvhy1Ws2QIUMYMmRIu110V4Lb7aauro7/+Z//YciQIURGRrZ6rcfjobi4mK+++orY2FgmTJjQqjAMDQ0lKSmJH374AV9fXwYOHHhFK6v24vF4OHLkCP/1X/+FXq9n1KhR7Nixg0GDBlFeXo7BYFAUsUqlIjAwUFmpyrJZzoyXJIkDBw6wb98+jEYjbrebsrIy7rnnHuV9TqcTl8uFWq1WYrgejwen09lMsTRdgTYkOzubzz//nAEDBpCSknJDlKHL5SIrK4uDBw8yevRoAgMDFQW5dOlSMjIycLvdiuLWaDRIkoS/vz99+vRhypQpREVFKeNSpVIRFRVFjx492Lp1K1FRUURHR7c4zzSvvPLKK03/UfZHv//++3z55ZckJyczZcoUhg0bRkREBKtXr2bZsmXo9XrGjBlD165dqamp4d///jeDBw9m7ty5xMTEKNZily5dyM/P5/Dhw4wbN44ZM2YQFRXVzPK43kiShMViYcOGDbz00kvodDpmzpzJqFGjSE5OJisriw8++IDs7GwGDx5McHDwNQkjj8eD1Wpl1apVLFq0iPDwcGbMmMHIkSNJSEjg559/5oMPPiA/P58RI0bg7+9PVFQUXl5ebNiwgeDgYB555BH69OmDr68vGo2G2NhYpW0HDRrEAw88QI8ePfDy8mqx7WRlvHv3bt544w1KS0u58847mTBhAqmpqdTW1vLee++xb98+kpKS6NevH9HR0WzZsoWff/6Zp59+mjFjxhAcHIxWqyU8PByDwcD333+PWq3m2WefZeDAgfj5+bXZdy6Xi3PnzvHOO++wefNmUlNTufPOOxk2bBhBQUEsXbqUL774ApPJxMiRI+natSt5eXns3buX3/3ud8yePVtJwPDz8yM8PJxTp05x5swZpk+fzqRJkwgJCWkzBixJEnV1dXzyySf89a9/JSYmhqlTpzJixAhiYmLYsmULH374IRaLhUmTJhEVFYVer+e7774jLCyMhx9+mKSkJIxGI1qtlp49e1JVVcUPP/xAamoqDzzwAN27d29ksTdEpVLh5+dH586dOXbsGJmZmcybN49p06aRmppKWFgYO3bs4F//+hdarZa4uDi8vb1vitdkx44djBkzhunTpzN27Fj69OlDXl4et912G4MGDWLPnj2kpaXh7+/PN998w8KFC8nOziY2NhZ/f3927NjB4MGDmT17NqNHj2bYsGGEhoZecV0arqJbu9ftdrN3716OHDnC3LlzMRqNrV7rcDgUxePxeBg0aBC+vr4tXqtWq/Hy8mLnzp1UVlaSlJR0QwQ+XKpbRUUFcXFxjB8/ntOnT9OtWzfKysqoqalh7NixzeSjrMROnTpFeno6ycnJ5OfnU1VVxfTp0xk/fjy33XYbHo8HHx8f+vXrh0aj4ejRo7z88sts3bqVnj174uPjw1tvvcWbb77JihUrWLlyJStXrmTfvn1ERkZSVlZGp06d6NKlSyNjRqPRUF1djZ+fHwkJCVc8VtuTEFNXV0d6ejoOh6OZ4RIZGUl4eDgbNmzAYDDw1FNPMWbMGPr27cvFixdZsWIFP/74I2lpaYosl40GnU7Hpk2b8Pb2VuKoTcvQTJJ4PB5cLheLFi3ip59+4uWXX+b3v/89Op1O6YzevXvz9NNPKyuJuLg44uPjCQkJITExkd69e2MwGBRBlpCQQHx8PEePHiUhIUER5jcS2YJat24dixcvZurUqSxcuBAfHx/FopI79NChQ9fFpeNwOPj444/55JNPuP/++3nyyScbdWZycjIqlYqTJ08qlk1MTAx1dXWEhoYSExPTKF5hNBqJj4+nb9+++Pj40KNHD3r16qVsE2mtznK/xcXF8dxzzzUa1AkJCQQFBbF27VokSSIsLEwR2IWFhQwaNIhu3bopSiYqKoqUlBQCAgKIiIhg4MCBl50EHo+HCxcu8Je//IXi4mL+/Oc/M2LECGVyezwe+vXrx2OPPYbb7cZkMhEfH09MTAzh4eH069ePuLg49Ho9AP7+/vTu3ZvY2FgKCwtJSEggJiamzVWHJEm43W7effddli5dyquvvsqDDz6ojGNJkkhMTMRqtSpWc0xMDLW1tYSFhREdHU1ycjJBQUGo1WqMRiO9evUiNzcXg8FAbGwsiYmJbSpjlUqFv78/SUlJxMTEcPDgQWJiYkhOTkaSJPr06UPPnj1ZvHgxn3/+OTExMYwdO/aGrEYuh5eXFzExMfTu3RutVktdXR1arZaQkBC8vb2VvtBqtYwaNYrbbruN7du3U1ZWRufOndFoNERHR9O7d290Ot1Vrwhl+SO7AFuirq6OpUuX0qdPn0YJHi1RU1PDpk2byMnJISgoiJKSEjp16tTitSqVShmLmzdvZsyYMYrL93oiG0ny3DMajej1ejQaDampqWRkZFBYWEiPHj1QqVQUFhZSWlpKr169qK+v54knnmDs2LGKW9Df35+4uDiio6Nxu9388ssvyqqvsrKSiooK5s+fz9GjRzl48CCRkZG88MILLFy4sJHhoVKpcLlcHDlyRCmrx+NR/mwwGAgJCVGyhq8EWTZ5PB7UanWLbSqv4jdv3szEiRPx9fVV+lar1dKlSxfUajXh4eEEBQWRkJBAeHg4Ho+H/v37Ex4ezuuvv87bb7/NBx980CjuGxISQlJSEhs2bCAtLU1ZPTak0TJIFiCbN2/mm2++YcSIEUycOBGDwYBer0en06HX6wkJCWHRokV4PB7FNarValGr1YobSNbK8qCWl7TyRLnRcUO3282pU6dYt24dwcHB3HPPPZhMpkb1MJlM3HnnnSQnJ2Oz2a5JGUqSxOHDh1m9ejWxsbE88MAD+Pj4KP53vV6Pv78/s2fPJjo6GrvdDtCoTeQ/y6tTuT0b/tbWalqSJIqLi/n666+xWCxMmzZNWbnodDp0Oh0+Pj6kpqbyu9/9DofDgSRJSnxAfp/8DpVKpby/pb5tDY/Hw4YNG9i9ezfjx4/njjvuUASqTqfDy8uLsLAwnnnmGcWlK9dRq9UqgqHhQQnyu+XrLhfEd7lc7N69m7Vr15KWlsbs2bMVoSP3f2BgII899hgmkwmr1arES5qOVbkvGo7zy/WFTNP75OfKXpPIyEji4+Opq6vjwoUL2O126urqKC8vp66uDrPZTEVFBbW1tY0E0/XC4/FQU1OD3W5vNCZdLhcOhwObzaa4ReW5HhQUhMPhICoqioiICMxmMzabDYvFgsfjaTSGr5T9+/fz+uuvc+HCBVwuV7M5KUkSubm5HD16lOHDh7c5FiVJ4sKFC1RWVvLggw9SV1dHdnY2dru91bmuVqtJSUnB4XCQlZWlzJHrjeymdDgc2O12pb379etH9+7d+eyzzygpKaGwsJCdO3cqBvy6deuYP38+3t7e2O12LBYLDocDp9OJSqXC6XRit9uxWq1Kv1itVkwmE2lpafj4+OByuZTYrr+/P/7+/phMJnx9fXG73VitVmpqaqioqKCsrIzly5dz/PhxJdtVLu+VtIusV5YvX66EZBreL+ueM2fOUFtbqywcZBrKgabySK/XYzAYGDBgAP7+/uTn52M2mxs9X6PRMHToUIqKijh16lSLc6mR6SVJEjU1NXz55ZcYjUamT5+urPAaFkqr1RITE8OQIUNuihXbHmw2G7t27SIvL4/77ruvZUtArSYsLIz+/ftfk4tU3huUnp5OUVERTzzxRKvP69SpE2lpadeUIdUaTqeTY8eOsX//ftLS0ujTp08zd4BsSaakpCgrouspZCVJor6+nrVr1xIUFMS4ceNaTERQqVTEx8dTWVmJRqO5KmuzLerr6/nXv/6F1Wpl3rx5Lba3VqslOjqa1NTUmxKrc7lcFBYWkpeXR1hYGJ06daKoqIi1a9eycuVK5s2bh7+/PytWrGDy5Mk88cQTGI3G61oGi8XCG2+8wS+//EJxcTG+vr6kpaVx5MgRsrKysFgsxMfHU1JSwpYtW0hJSSE7O5sPP/yQqqoqHn30UY4cOcIvv/xCZmYmBoOByZMnX3V5+vTpwxdffMFbb73FggUL6Nq1qyJj5NVFRkYGGo2G0NDQVp8jC9ecnBzi4uIYOHAg2dnZHDt2jDvuuKPNLR/+/v54e3vz888/M3r06Mum5F8N586d49ChQ+j1eqxWK7m5udhsNoYNG8af/vQnlixZwgMPPIDRaOShhx4iISGBrVu3KsZLeXk5u3fvZtWqVZw7dw5JknjooYfYvHkz3333HU6nE5vNxr333kthYSEVFRWEhYUpSrMlXC4XW7Zs4cCBA/z444/AJRnZr18/Zs+eTVlZGUePHqWiooLk5GQCAgLaPW80Gg1xcXGsW7eOuro67rvvPkJDQxvtm3Q4HBw6dAgfH58r2iYjy5yTJ09SXV3NiBEjmoVx5NirSqVi3759jBo1qtlzmvkhqqurKSwsxN/fv9GGy4bIG3NnzpwJ/O9SWt7Au2XLlkZK0mw2c+rUKZxOZ7sreK3YbDZlI3BrsSWVSoWXlxe33357o6y+q8FqtSobUtvag+Pt7c2ECRMUi1aOkbhcLvLz89m2bZuSPQWXLKpDhw4pSR1t4XK5OH/+PPX19QQHB7eqhHQ6HUlJSYrlJFt5FouFXbt2ER4e3uiewsJCKisr6dy582XLIEkSVVVVlJWVERwcjMlkatF6V6lUBAcHM2nSJDQaDWazWWnHn3/+GZvN1kgI1tfX8+uvv7ZbadbX11NYWIi3tzfh4eEtumVUKhUGg4EpU6Yo75Hb4+zZs2zbtq1ZfOnQoUNXPY5tNhsHDhygrq4OgNraWr777jtycnK45557SExMJDMzk4yMDM6ePUt5eTl33nmnEgO6ERgMBt58801lHMqx6JEjRzJ8+HDgUrvIafparZbY2Fjefvtt0tPT0el0PP744zz11FNIknTNxrGPjw8LFizgmWeeYfHixTz66KMkJiYq+8zkvW5GoxF/f/9Wn+PxeKivr2fnzp1MmjSJ7t27Exsby+7duxk9ejRhYWGtCnJ5tZGXl4fVar1m2dASSUlJfPDBB8pz7733XiUz19vbu1Gf6PV63G43FRUVSgaq0+nkjjvu4L//+7+VzFG1Ws3cuXOZM2eOEoYB6NmzJ1988QVVVVU8/PDDrY4lrVbLjBkzuOuuuxptVpe9NUajkddee01ZpV2JAalSqYiMjGTy5Ml8+umnWCwWxUsmZ7/abDby8/Px8/NrNa4Ll/q2tLSU7du3ExQUhMfj4fTp06xatYoBAwYwd+7cZrFeWe5pNBrOnDmDy+VSXP9K/Zu+SHbNeHt7txkbaujmlONtsjJ0Op2NhI/dbufMmTO/qTK02+3U1tYCKHHC1rhWl628QbS+vh61Wt3mBtHWBpHb7ebs2bNs2bKlUSfJ6e3tcde4XC5qamoUN8jl4llNtxNYLBZ27NiByWRqdG1lZSUXL15s1wpS3iNks9kU93BrtKSgrFYrmZmZFBUVNfrdZrPx66+/Xvb9Mmazmbq6OjQaTZurqZa2b8h9sXXr1max7by8vCt2EcnPttls7N+/X7Hk6+vryc3NJSAggKCgIHQ6HVOnTsXb25vNmzcTEBBAfHw88fHxzcp6vWi6d1B+hyygmlJTU8POnTspLi7GaDQSFRWFj4+P8oxrLaNWqyUhIYG5c+fy2muvUVJSwsMPP8zIkSMxmUyYzWZKSkrw8/NrU/F6PB4OHTqkZFDLmfBbtmzh+PHjDBo0qMX7ZQPJx8eH3NxcqquriYiIuKY6tYRsWLT0/qYxNVmQP/LIIzz44IMcPnyYzMxMxYiTr4HGh4pIkoTZbEalUjF06FACAwMZMmRImwlfchihpd/ksXK1fWwwGBg2bBinTp3iiy++oLCwkD/+8Y/0798fnU5HTU0N58+fp0ePHm3GaV0uFyUlJaSnp2M0GnE6nZSXl2Oz2YiLi0OSpGYyVs7B8Pb2pri4mPr6+mZyukVp2VRAtAd5EE2bNo0//OEPjRq8vr6e1atXs379+nY9qyHyoN62bVubwlitVjNu3Dj69++vCPq29tS0hcPhYM+ePWRmZrb5TpPJxLhx4+jZs+cVPb8l9Ho9qampPP/8841ceh6Ph/T0dBYtWnTZZzSsd9O9be25NygoiEWLFjVbAebk5FBQUNBuS7Cpe+JKMJlM/PGPf2TYsGGNVobV1dUsX76c3bt3t7sMDVff7UUWCKmpqTz33HPNDIN///vfLFq06IrrJbunn3zySQYPHqwowwMHDvDPf/6Tv/3tb3g8HmbNmqXcExIS0uJ7LBYL69evV47N+i2prq5m27ZtFBcXk5iYyOnTpy+bWXw1VFRU4Ha72b17NxUVFVitViZNmkR1dTVlZWUEBQW1KtRlw2P9+vXk5uby3nvvKSn71dXVHDp0iBkzZrRabp1Oh5+fn5J8ApeM1fz8fL7//ntlZX8z8Hg8lJWVUVJSohj7bVFXV8fevXvJz88nLS2N7OxsJYnsZiBJEjk5OdTX1/P1119TWlrK888/z6BBg6ioqODixYuKcmwNnU5HSkoKL730EqGhoYpy/Prrr/n000/Jysri73//O3FxcY3qqdPpMJlM5OTkUFVV1Wx+NVOGwcHBREVFkZ2dzfnz5y97skPTdFm9Xq8kjjTcu9JaUP1y6baSJOHr60uXLl3a3AMjrwDk5xkMBmX/kbzHqz3I9/v7+9O5c+c23XK+vr4YDAaljBEREYqVImdNtfaOpgpDtrwMBkMji8XtdreatNK07bRaLZ06dcJgMHD+/HksFku76izfL7tpmlpMclJJW/VpWI/Q0FDlOK/Kykq6du3aat/K98lotVrFKyELOzkm21YWbcN6wCWlGhUVRW5uLsXFxVd0Qomc+OXt7d3IpSS7AS9XhqZ1avhvchITgNFoZMKECdTX1/Piiy+yadMmRo8e3WbZZKs3PDz8usdZ20NUVBRJSUk3/D3e3t4YDAY8Hg9eXl6YTCZUKhUWi0VJ9GmL7Oxszp07x5QpU5T2DgwMpLS0lBMnTlBaWkpERESLKxCtVovRaMTlcinue7lMUVFRN1UZAnTp0uWKrk9ISLhBJbly5O1Oer0es9mMn58fPj4+inHYnnCQLOu8vLyUvvX19eWhhx7il19+IT09nc2bNzdbpGi1Wnx9fXE6nVgslmZztpEylAXZiBEjOHz4MAcOHCAtLa2ZIJbdonv27CElJeWqk0HkTEI5qKvX65u9S61WExcXR48ePdq08GUBJgtko9FIv3792LhxIxkZGcyaNQt/f/9mK0aPx0NWVhZGo5HOnTsr2ZR9+/ZVUuDbeqecUSi/LyAggP379zN16s5AjZEAAA6vSURBVFSMRmOzySbHADt37nxN7hd5M7ncF7JLMiEhgZ49e3Ly5EmKioqUidO0zsXFxZjNZrp3737VZQCULDg5a1IeQ0OHDuWbb77h2LFjSrp9U4+DxWLhyJEjpKSkXLWlKgfe5RiArLQDAwMZPnw4+/btY/Pmzdxxxx3NXLZyqndGRga9evVqMwbVFvIYbtgX7Y2d6XQ6QkJCMBqNVFVVXVYYyHHuUaNG3RRleKORt1Z89tlnmM1m5syZw7x585rtwWxtXsrx9x07djBt2jRmzZqluHzNZjNVVVWsXLmS48ePk5iY2OYpMw1lhVqtJiIigsmTJ9+QrN6OgHzQ9/HjxzEajTz66KPMmDGDbt26Kcb4teDr66tstTh//vxlr2/a782UoV6v59577+XHH39k7dq19O3bl5EjRzYqqCRJSmzLYDAoX4aQ4y0N02blf5MFT8NrPR4P69ev57333iMuLo7XX3+92ak0spK70r0+Wq2WIUOGMGbMGL788kvWrFnDU089pQhl2X2WlZXFuXPnGDBgQKMtDVfaMRqNhuHDhzNmzBjS09NZvXo1DzzwQLPVz5EjRygtLVWsloZtIv9ZXjm29Jvb7UatVmO321m2bBkbNmwgICCATz75hNDQUGJjY5k8eTLvvPMOa9asoVu3boSFhTWqc2lpKceOHSM+Ph6NRoPdbm/UJw1XtfK/NexbrVar/H379u0sXboUh8PB888/r2QYz5kzh8zMTNauXUtsbCyDBw9Wnim3xdatWwkMDESv1yvp7vI7Gu77bOnfZYFktVp5+umnOXnyJOPGjWP+/PmYTCZ0Oh1Tpkxhx44drF69moEDBzJr1izl3XL77tu3D6vViq+vryKIG9ZXbgu5XZq2hdx+H3zwAZs2bSIwMJBPP/2U8PBwpb2blruhh8Nms3H27FkqKytJSUlpFKuT+7ypgSgbYbfiofMul4szZ86wdu1apkyZwoIFCxSZ4Ha7CQgIwNfXl9LSUqxWa6N75bbOy8vjyJEjvPbaa41i5/IeyfT0dLZv387EiRPx9vZu1r5y+/v4+BAUFAT8r2IUn367elwuF5mZmRw7dox58+Yxe/Zs5WAGl8tFUFAQer1eOVu1IXLYp+kclOeSx+OhqqqKkydPotVq6datW6vlMBqNSr82pFnPyhbQhx9+iK+vLwsXLuSTTz6huLgYi8VCeXk5S5cu5dy5c4wYMQK1Wo3ZbKayshKbzUZlZaWSxCEn1VgsFi5cuIDFYqGyshKr1Yrb7SY3NxdJkti0aRMpKSls3rz5ulldKtWlDbSPP/44EydO5B//+AfPPvssWVlZmM1mqqurleV09+7dFYVxLYSEhPDiiy8ycOBAXnnlFV588UWys7OV9tmwYQN79+6lb9++mEwmJbZx8eJF6uvrqaur4+LFi8rqQN7TU1paisPhoLKykrq6OjweD0ePHmXIkCF8/fXXREdH8/LLL2M2m5XsyPvvv58tW7bwzDPPcODAAerr66mvr+fo0aOsWrUKPz8/YmJilGPbKisrlWPrbDabIuxtNhsVFRXYbDZl75G8obekpARJkli6dClTp07l/fff5+zZs6hUKpKSknjjjTeorKzkueee46uvvqK8vByz2UxxcTFvvfUWtbW1pKWlKVZ7dXU1FotFKUNDI6CmpkYZQ/J1DoeDTZs28eSTT7J8+XLy8vJYsWIFdrsdtVpNaGgoixcvpnfv3rzwwgu8/fbbnD17VhmPq1ev5tixYwwZMgStVovdbqeiokJpK3mlJq825LI5nU4qKyupra1VNjkPGzaMb7/9lqioKF5//XUlC1Eu+8WLF3E6ndTW1mI2mzGbzZSWlrJs2TI++ugjwsPDmTlzJiaTibNnzwIo6fG34gqwJWQX2muvvcaIESN48803iYqKamTA+Pn50aVLF+Xw8Ib3ejwe6urqeP/993E6nfj4+DRru+DgYAIDA9m4cSPr1q3Dbrc3u8Zut3P+/HlCQ0NbzagXtB+5bwoKCvj222/5wx/+wKOPPkpwcHCjtg0KCiIyMlIxSBveL3tfKisrqaqqwmq1KnNJjr0vWLCA48ePM2rUKGbMmNHMcLHZbJSVlREVFaW43RvS4vcM5clfU1PDxo0b+eabb8jPz0elUpGYmMh//Md/0LdvX3Q6HXl5ebzwwgucPHkSu92OTqcjMjKSv/3tbyQnJ3P48GH+8z//UwlEq9VqBg0axF/+8he6d++ubPLcsWMHPj4+jB49+rpavC6XS7FIVq5cyf79+xU32t1338306dMJCgq6bu+UM0v37NnD6tWrOXz4MCqVioiICO677z4mTZqkuGstFgvz588nIyMDh8OhuBifeeYZfv/733P27FmeeOIJiouLlRVZz549eeaZZ7jtttuU+p0+fZolS5bw97//nbCwMMUIOX36NGvWrGH79u04nU70ej0TJ07kkUceITw8HEmS+Pzzz/nyyy+pqKjA5XLh4+PD7bffzptvvonH42HZsmWsX79eOZFE9hz86U9/anRGYm5uLq+++irz589n4MCBwCX3YXFxMd999x0bN25Utp7079+fP//5z/To0QOAjIwMFi9erGSLymewfvbZZwQFBbF9+3Zee+01qqurlfjz8OHDefnll5VtLGazma+++orS0lLmz5+vuDzljc1bt25lzZo1nD59Wjnx/5FHHmHYsGH4+PjgcDh48sknyczMVIyRsLAwFi5cyIQJEzh79iyPPvoo5eXliks2Pj6eZ599lqFDhyorvuPHj/PRRx/x7rvvYjKZ2LZtG++//76SESzHOuSxYjQaGTVqFDNnzqRz5858/PHHrF+/Xvmc0MiRI3n11VcvewbrrYAkSfz000/s2rWLxx9/vFmdZaH40ksvsWrVKtavX6+MNbiULLJkyRI2bNiA0+kkIiKCZcuWKdm4BQUFLF68WDmMW6/XM3PmTF588UVl/ns8HioqKnjllVewWCz89a9/FR8Dv0bkftu6dSvnz59n2rRpzUJrbrcbs9nMggULuHDhAu+++64S55dDKi+88ALbtm1rdDap7KWSJImYmBhmz57N+PHjlZODGu54qKio4MEHHyQ8PJxly5Y1S8Bq9eO+8gta+rmlrMWGnyJpmsnX9Kizhr/V1dWRkZHBqVOnuPfeexXhdr1oWI+WElca1ud60drRbk2zXBteKyuWhu3XUtu2FL8tLi7mo48+avT9sfbWueHzW3pHwzK01Lfys0pLS/nwww+59957SUxMbPTsltqhtTLItBanbljGhs+wWq1s2bKF0tJS5syZo+xTaq3/W/p/Uxdsw7MN22qnhu7QoqIiPv30UxYuXKhkorY0P2SaJh/JdZXdsw3f0RFoONaaKiC57desWcPzzz/PV199RVpaWqNr5LYDWhzLbfWhfH9ubi4vv/wyycnJPP744y2uIgRXTlt96/F4sNvtfPTRR+zcuZN33nmHxMTERve2pJNamkstzRmPx0N2djbz5s1j6tSpPPHEE5ffZ9jwJe0ZAJfzpcsxv9aorq7m22+/paCggODgYO6+++7rqgxvhiC5EitSvra1TeGXi1NI0qXvsE2ePFk5i+9K6ny5/pGf01r5ZCVQWVnJ8OHDG8V8L/fs9pahtffLyBPJ19eX22+/vVEG6JW0xeX6oj3tlJ+fz6RJkxoJ0CuNNXXkVUhb7Sy354ABAwgICCAvL4/U1NRG/dtWvL8940ySLh1pKB+NdiNOn+moXK5vdTod/fv3Z/v27ZSWljZShtcqx+WtMd7e3kpSaFNu6qxTqVR07dqVd999l/vuu4/S0tJ2pU0L/pczZ85QVlZG//79b+iXp1tDjh2WlJQoX9v4rbHb7WRlZeHj40N8fPxNs+KzsrIoKyu7puxYQduoVJdOMhk/fjx79+5t85zRq0HOLo+MjKRnz56tbucRXF9kRRkTE0N0dDRHjx5t1zaL9uJ0Ojl69CgDBgwgJiamxT69acpQjmvJBwEHBwfTuXPnNk8sEfwvDoeDgwcPsmvXLuLi4qipqSE7O/s3S/uW48oFBQXs3LkTQDkW6bcqg9vtxm63s3v3bk6cOEFISAhFRUVKfPq3wul0kpGRwc6dO0lMTKS2tpacnByRgn+DMBgM3HPPPdTU1JCbm3vdEowkSVJOWxo6dKiSESz4bZBzJkaOHElFRQXl5eXXrW/Lysq4cOEC48aNw9/fv8WV4U3Nzf7pp59YtWoVLpeLlJQUpk2b9n/24O//a+zevZsPP/yQiooK9u/fT0BAQKOtHDca2T37j3/8g3379hEWFkZwcDCzZs2iV69ezWKVNwKPx8OKFSv4/PPPUavV7Nq1i759+3L33Xf/Ju+X2blzJ++//z6VlZUcPHiQoKAg5s6d+5v1RUdDq9XSq1cvJkyYwJ49e4iOjr4uCXByMlpAQAD9+/e/4Z+ZEzTHYDAwZMgQKisrOXHiBGFhYdcUNpON9sOHDxMTE0NiYmKrB2e0mkDzW3D+/HkKCgqQJInw8HA6d+7coZIFroXy8nIKCwuVfTbyN/ba2kR8PZG3Q5w7d045Fkqr1dKjR4/LfmPueuHxeMjPz+f8+fN4PB40Gg0hISF06dLlN/UwlJWVKX0hn03bo0eP36wvOhqyyJINwcDAQIYOHXrZT4td7plFRUUcPHiQ2NhY4uPjhYv0JiArr3PnzvHLL78o3/y8Wr0gf7nk+PHjpKSkEB0d3eqC66YqQ4FAILha3G43VVVV5ObmKh9kvlrlVVNTw6lTpwgLC/vNjSlBc5xOJ0VFRZSVlREfH3/VBnZpaSlnz56lW7duytdrWnuOUIYCgeD/SZqKrmtdxTXckiFWhDeX1rZC3cjnCGUoEAgEgg5Px93QJBAIBALB/49QhgKBQCDo8AhlKBAIBIIOj1CGAoFAIOjwCGUoEAgEgg6PUIYCgUAg6PAIZSgQCASCDo9QhgKBQCDo8AhlKBAIBIIOj1CGAoFAIOjwCGUoEAgEgg6PUIYCgUAg6PAIZSgQCASCDo9QhgKBQCDo8Px/4gIzb046CesAAAAASUVORK5CYII=)
What is (B) in the following sequence of reactions?
![](data:image/png;base64,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)
chemistry-General
chemistry-
The major product obtained in the acid catalysed dehydration of
would be
is
The major product obtained in the acid catalysed dehydration of
would be
is
chemistry-General
chemistry-
Identify (b) in the following sequence of reactions.![](data:image/png;base64,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)
Identify (b) in the following sequence of reactions.![](data:image/png;base64,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)
chemistry-General