Вариант 4 Задание 1.
Оценка воздействия предприятия на атмосферу (определить концентрации веществ, выбрасываемых из источников в атмосферный воздух; выявить превышение ПДК; разработать комплекс атмосферных мероприятий).
Выбросы в атмосферу
№ источника
| Координаты источника
| Параметры источника выброса
| Параметры ГВС
| Наименование вещества
| Фактический выброс М, г/с
| Фактический выброс М, т/год
| Факт.концент.Cмi, мг/м3
| ПДВi, т/год
| ПДКi, мг/м3
| х
| y
| Высота Н, м
| Диаметр устья D, м
| Скорость ω0, м/с
| Расход V1, м3/с
| Температура выбросов М, 0С
|
|
|
|
|
| Среднесут
| Макс разовые
| Рабочей зоны
| 1
| 535
| 530
| 25
| 1,2
| 5,0
| 5,61
| 110
| Зола
| 2,01
| 0,013
| 0,190
| 0,190
| 0,02
| 0,05
| 70
| 535
| 530
| 25
| 1,2
| 5,0
| 5,61
| 110
| Сернистый ангидрид
| 0,04
| 0,005
| 0,578
| 0,578
| 0,05
| 0,5
| 10
| 535
| 530
| 25
| 1,2
| 5,0
| 5,61
| 110
| Оксид углерода
| 0,009
| 0,001
| 0,130
| 0,130
| 3,0
| 5,0
| 20
| 535
| 530
| 25
| 1,2
| 5,0
| 5,61
| 110
| Оксиды азота
| 0,004
| 0,001
| 0,058
| 0,058
| 0,04
| 0,085
| 5
| 2
| 500
| 500
| 6,3
| 0,3
| 1,56
| 0,5
| 25
| Пыль неорганическая
| 1,4
| 0,0002
| 10,301
| 10,301
| 0,05
| 0,5
| 4
| 3
| 510
| 490
| 8
| 0,45
| 2,5
| 0,4
| 25
| Пыль неорганическая
| 0,95
| 0,0001
| 9,894
| 9,894
| 0,05
| 0,5
| 4
|
Определение расстояния между источниками
По теореме Пифагора рассчитать расстояние между источниками:
![](data:image/png;base64,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)
| Расстояние между источниками
| ∆x
| ∆y
| Расстояние между источниками
| Расчетная формула СMi
| №1 и №2
| 35
| 30
|
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![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAA/YAAAFYCAIAAAB28/C0AABeW0lEQVR4nO3deXxMV+M/8OyLRARBIoIkEpJ4xNKQahXVB7XrQm1VrbaK2iUIQW2JFLGr0paWKkUVLVpL1ZYQWyWSSCIhkYSQRFZZf+c79/fMc587M3fu3G0mM5/3H14zZ87cexI3cz/3zDnnWtXW1poBAAAAAICxsNJ3AwAAAAAAQEyI+AAAAAAARgURHwAAAADAqCDiAwAAAAAYFUR8AAAAAACjgogPAAAAAGBUEPEBAAAAAIwKIj4AAAAAgFFBxAcAAAAAMCqI+AAAAAAARgURHwAAAADAqCDiAwAAAAAYFUR8AAAAAACjgogPAAAAAGBUEPEBAAAAAIwKIj4AAAAAgFFBxAcAAAAAMCqI+AAAAAAARgURHwAAAADAqCDiAwAAAAAYFUR8AAAAAACjgogPAAAAAGBUEPEBAAAAAIwKIj4AAAAAgFFBxAcAAAAAMCqI+AAAAAAARgURHwAAAADAqCDiAwAAAAAYFUR8AAAAAACjgogPAAAAAGBUEPEBAAAAAIwKIj4AAAAAgFFBxAcAAAAAMCqI+AAAAAAARgURHwAAAADAqCDiAwAAAAAYFUR8ANBi9erV8+bNY6lw+/bt9u3by9YeAAAAYIeIDwBsCgsLIyMj2etcv369zkV8FxeXZ8+eqZY3btz4yZMn8rdHV8ePHx88eLCQLXh4eGRkZIjVHl3dvHnzpZdeqqmpEbKRL774YuHChWI1yXTU9YOfcvjw4bffflvfreCkSZMmubm5+m6FRsZxPIAqRHwAYBMVFZWfn89eJy4u7v3335enPWLx8fGJiYlRLW/Xrp38jeFBbeN18vDhw+fPnzs5OYnSHl1NnTpVYL4nyEWCKI0xNXX94KdcvXpV303gysB7QIzjeABViPgAoNGTJ0/Wr1+vtRqJ+DI0Rly+vr5qz2pt27aVvzE81NbWenp6PnjwoLq6mvdG7ty50717dxFbxdGePXsuXbokZAtubm7e3t5BQUFiNcmk1PWDn2JhYSH8T0AeAQEB+m4CG+M4HkAVIj4AaLR8+fKSkhKt1W7evFlTU0POuDI0SSzkrKa2vK50XC1TqKysTEtLS0lJuXfvnvJf7qHnn3/+kT/ikyMqNDSUY2Vra+vWrVuTNO/l5eX9H+Sxvb29pI00bnX94KcsVxD4JyAPw4/4asvr1vEAqhDxAUA9cpr86quvuNQsLS1NTEz09/eXukki0nRWq1sdVyQBt1WgF44cOfLAgQNc3n7nzh1p2sWGxLJHjx5xrLxnz5533nlH0vaYIOM4+CkC/wTkUUcjfl08HoAOER8A1FuyZElFRQXHynFxccYR8Y2g4+qff/4RvaZYUlNT161bx73+v/71L+kaY7KM+OCnaD2wz58//+qrr3LfYE1NTXV1dVVVVaXCC4WSkpIimry8vCdPnpDL18TERMbYxToa8Y3meDBZiPgAoEZSUtL3339PLzE3N6+trdVUn5zSxo0bJ327ROPj46NaaG1t7eXlJX9jRESSx7179zhWlr8Xf8aMGdyvG+3s7NT+N4FAxnrwU7j8Ceh66WihQH5FXEaInTt37vXXX1c+dXV1bdiwoU67k5lxHw+mDBEfANRYuHAhfTAryfdTp07duHGjpvqGMON2y5Yt/fv353haqlevXvPmzRkjRsh7LS0tOe6OJInY2NgePXro3FAp3b17l/so5GfPnmVnZ7u5uUnaJKUTJ04cP36ce30/P7+6NcFDj3DwK2n9E/Dw8GjQoIF0DWBcxOqlCx/HA5gh4gOAquvXrx88eJBe8u67777//vssEf/mzZu1tbXkSkD61qmXm5s7a9asOXPmLFiwIDQ01NraWutbfH19GWc17l9MHz16dMaMGYWFhQ8ePCAnSD4tloauY29IfXkifmVlJfmN6fQWjNLhCAc/ndY/AamPK5J36U/lj/g4HoCCiA8ATOTEQH9qYWGxZMmS1q1bW1paauoeKykpSUxM9PPzk6WBamzatInqPAsPD9+zZ8/WrVt79erF/hZyVjt37hy9hMv0svv370+bNk3ZG/3NN99MnTqVX5ulwCPi9+3bV6LG0K1bty45OVmntyDic4SDn07rn0CHDh0kbYDeIz6OB6Ag4gPA/zh//vypU6foJWPGjKF6dHx8fEiO1/TGuLg4fUX88vLybdu2KZ8mJSW9/vrr48aN+/LLL5s0aaLpXaqTzNg7rsiZOyIiIjIykuxOWRgdHT158mTDGU+iNt80bdr08ePHauvLMxw/Jydn+fLl9BLyG2vWrFl2djbLuxDxucDBz6D3XnzGQB2Z73uF4wGUEPEB4H8wuvCtrKwWL15MPe7QoQNLxL9+/frYsWOlbZwG33333dOnTxmF33///bFjx8h56OOPP1b7LtWzGkvH1fHjx6dPn56WlsYoJyWHDh0ynIUd1eabESNGbNq0iXt90YWEhBQXF9NLPvroo99//539XYj4XODgZ9B7xNdvLz6OB1BCxAeA/yKnAcZtRydMmKCcsxUYGLh//35N79XjjNvo6Gi15fn5+Z9++ik5523btk31vM6x4yo9PX3atGnkN6Np72vWrDGQsxr5eVWXnK9fv/6gQYM0RfyEhASpJ1Fcvnx5z5499JKGDRvOnTv366+/ZnlXo0aNZJsHXKfh4KdT+ydAZ21tLfVakPRefHd3dycnJ0l3x4DjAZQQ8QHgvxYuXEh/amtru2jRIuVTEvFZ3nvjxg29zLg9evQo+yBvEjG7dOkyffr0pUuX0meDUUtGKGcXuLi4MNa2e/HiRWRkZEREBP3LaFUxMTEXLlzQaZltiajtv2zfvj3L4GPyo6WkpEi3NiU5JEgmYCy3umzZspycHPY3ogufCxz8DFq78ElytbKSNvnQe/Fl7sLH8QB0iPgA8P/9+OOPt2/fppd8/PHHLVq0UD5ln6ZWXFxMzi7y3xBx7dq1WutUVVWtWbNm//79GzZsGDp0KFVIzvStW7dOTU2lnjJa/ttvv5FsqvpltFpRUVGGcFZTm29IVnZ1dW3cuLHq1/fKd0kX8Xfu3Mn4eodcKE6aNEnrjZMR8bnAwc+g91E6Zv/biy9zxMfxAHSI+ADwf6qrq8PDw+kl9vb2YWFh9BIS9xs2bJifn69pIyTMyR/xIyMjjxw58uuvv8bHx7PXfPjw4fDhwwcPHrxx48aWLVuaKb6eVp7VlF9MZ2RkTJ8+nWyQy96bNWs2YMCAIUOGCPgJRKMp4psposb58+c1veutt96Soj2FhYWMQ8hMsdyHhYWFIUQxI4CDn8EQjis99uLjeAA6RHwA+D87d+5Ufr5TpkyZQj6yGdU6dOjw119/adoIifijR4+WpH2adVVYsWLF/fv3qdPbhQsXqqqqNNU/evTo6dOnlyxZMnPmTHJWU076JBcnFRUV1JfRZWVlLHs0Nzfv1KnToEGDBg4cGBQUJPLPIwBLxCf/aor40i2qs3jx4idPntBLxo4d+8orr5gZRhQzAjj4GfS+YqaZXnvxcTwAHSI+APxft9OyZcvoJY6OjqGhoao1AwMD2SO++I3jzNPTc4ZCQUHB8ePHyentxIkTRUVFqjVLS0tDQkJ2797duXNnZWFGRgY5HzOuc+gcHBz69OkzSMHV1VWSn0EYtWGdysosK/dJtKhOfHz8li1b6CX169ePioqiHrNfV5DcIPNSg3UdDn6K1utVmXvx/f39pd6dWjgewAwRHwDMFGMnsrKy6CXTp09v3Lixak2tM25Fbhkvzs7OYxQqKyvPnj1LTm9Hjx59+PAho9odBeXTzZs3q91a69atBw4cSM5kvXv3trGxkbDdwpCzsuop3N3dnZo2x5JsUlJSSCixtbUVtz3kEGJ0Hy5evJj6Xoj8XxQWFrK8t1WrVuQiU9z2mAjTPPgpav8E6Mgvhz65SCIRClLvhSNTPh4AER/A1JGTIuOERM4Kc+bMUVuZ/Wtusqnk5GTV9df0xdrauq8CuYYhlx+/KnC5DrG0tAwODqb6qOS/OSU/LKN0zFh78WtqahISEjp16iRiYw4ePHjmzBl6iZ+f37Rp06jHGKUjA5M6+Ck4rliY4PEAiPgApm7NmjWMtVZmz57doEEDtZVJUqSvraYqLi7OcCI+XSeFxYsXkxwwefLkixcvaqo5atSo1atXu7u7y9k84dgjvpOTU4sWLTIzMzW9V8SIX15ernqJuGHDBuVihYhiMjP6g5+C44ojEzkeABEfwKTl5eUx1llzcXGZMWOGpvq2trYkwd+9e1dTBRLxyVlBxBaKJSUl5agC+/wzM8Xiob/88svrr78+YMCAgQMHUstNGD72iE89Zon4IrYkMjIyIyODXvL222/36dOH++4QxcRl9Ac/BccVRyZyPHBx+/btI0eO/Pnnnw8ePMjJyXF0dGzatGlQUBD5YYcNG2Ztba3rBl+8ePHHH3+QX9q1a9eysrKKi4vJKZX83t54440RI0bI/DUIIj6ASVu5ciX5DKKXhISEODg4sLylQ4cO7BFftMYJVlNTc/nyZWr4aWJiIvc3lpWVHVeYMmUK+VAeqNC9e3dLS0vpWiuQ1ojfvn175YoZDCIuqkPOlKtXr6aX1KtXj3EZiSgmA5M6+Ck4rlgYx/HQr18/EqA5Vt60adPkyZM1vUp+ohUrVly5coVeSAL606dPyQlu9+7dXl5e69atGzx4MMfdkTPp5s2b16xZk5eXRy/PUiC//OXLl48aNSo6OpqEfo7bFAgRH8B0ZWZmbt26lV7i6uo6depU9ncFBgb+9NNPml41hBm35KP25MmT5ExGPsQ13e+JCAoKIj/Ljh07qKfkw/fUqVOq9eMVSGx1dnYmJxhyeuvfv79sn9EcVVZWJiUlMQqtrKz8/PyUT+VZVGf27NmMVfbmz5/v4eGhfFpVVcWeMGxsbOS/u4LRMMGDn6L2T4DBBCO+kR0PWtf7pyMZXW05OU4++uijS5cusb89LS1t6NChJLLPnDlT674OHjxILicYawQz1NbW7t27NyYm5sSJE97e3lq3KRwiPoDpWrp0KX19N2LBggV2dnbs72Kfcfv8+fOUlJQ2bdqI0D4dPXjwgPr2+dy5c/SlqVU5OTmtWLGCfCLTP7vJSW7Tpk1hYWHbt2+vqalRfVdBQcFPChYWFl27dqV6szp27Cj6D8IDCc2qX7j7+PjQV71gyTePHj3Kz89n3LKeh7Nnz5JTHb2EnMnmzp1LLyHnV5LGWDbSrl07w+8wNjSmfPBT1P4J0LVq1ap+/fqytUe/jPJ4qK6u7tSpE9XRzqW+2ogfFRUVHh7OOPGxmD17NrmGGTdunKYK5CLqk08+2bdvH8cNpqamDho0KC4url69ehzfwhsiPoCJunfv3q5du+glHh4e5KNK6xvZ1800U4zVkTPiX716lZzJfv3119u3b3OpP2LEiOjoaGot5+TkZGU5iQgk427ZsoX8EqZOncrSx0POeVcUFi1a1Lx58wEDBpCPbP3e01HrKB0zxZo2LFOl79y506NHDyFtIFtWrpmjRH7VjMX1MJpCRDj4lXBcmRn78UA+vshPZ6Y4eZE9Xr58mfxL/t/VfqaRa4/WrVvTS0pKSt5///3Dhw/rut8ZM2b07dtX9UaQRHp6+uDBg3X6bsFM0c0xf/789evX69oSXSHiA5go8onM6PRauHAhl6WO3d3dGzVq9OzZM00VSMQfOXKkCE3kJiQkhOVuXHReXl6bN2/u16+fsoR+VlN+y9+xY8cLFy6Q65958+bl5uayb/PRo0c7duwg1Qw/4tva2pJLL02DGcgWBEZ88rtlnOqoKXpcmkpnClFMLDj4lQzhvrZ6ZyLHg48C1bNOPmROnDihWodcb9BPZ9nZ2eSH5TfpKD8/f+3atZGRkYzya9eukb0zRt5zRH5RS5YsEf7FKTtEfABTdOvWrQMHDtBLyCf+hx9+yPHt5GR57tw5Ta/KPON21qxZWs9q1tbWc+fOJdcw9GFIlZWV9IVfGAPEx48fP3z48MWLF5MTIfsAAIIxFkV+XCK+mWI4PkvEF9IAcp4jZyx6CbmiUNtNhYgvIhz8SnIeV5s2baK+sGrSpInW4CsnEzweNH1fQR+lk5mZ2bt3b5ab9Wq1e/fuFStWKJf9NVN8YdK3b1/2W/ixKCsr++GHHz7//HPeTeICER/AFC1YsKC2tpZeQj6+uQ+ADgwMZIn4169fF9I2XQ0ePNjX15feBcXQo0ePbdu20SeeUtLS0ujf8JJTNfm8pt8QwMnJad26dRMnTpw6dSrLibNr166vvvqqgJ9ABGrzjWq3JYn4jLHySgIX1SFHVEFBAb1k9uzZaqeUIeKLCAe/kpzH1d69e6kHLFPY9cLUjof8/PxHjx6pfUkZ8Um+79mz5/379+mvtmjR4qOPPhoyZAh1F5d79+7t2bNnw4YNmqYJkV/I5cuXld9zknMcI9+T9P/uu++OHj06KCjI2dmZXC/t27cvIiKCsfYA3YULFxDxAUBk5JOFsXhiu3btxowZw30L7F95kw++1NRUeVYMoMyYMUPt4miNGzdevXr1hAkT1L5L9USYlJRETlGMwoCAgLNnz5LP67lz52ZlZaluR9OdgGVDfuGqd6R3dHRkDEU1Y005QiI+OeF988039BIPD4+wsDDVmkVFRYwl8xnI2ZGcfXm3xASZ+MFPUfsnQCfiMk3p6enKlRYNLeKbmdjxwDLlwNPT00zxgTNw4EB6vie/h+XLl3/44Yf0Ne87KvTu3ZtcIzE6v5Ti4uKoiE+OtEGDBtHz/fDhw6OioujfG/j4+CxatKhbt25vvvmmpg1evXqV68/JFyI+gMlZsGABo2Tp0qUWFhbct8Blxq2cEX/8+PHk85SxzMIHH3xAPnbJB7qmd6me1RITE1XPapT33nuPfPovW7Zs3bp19J4e8rH+1ltvCWi7CNSmc7XhgyWRUCGJvrold9OmTWMsu7FmzRp7e3vVmlovJAwwMxk4Ez/4KVqPK2quuSj7Unbhmxnk4WpSxwNLxCeNqa6uHjFiBP3rndGjR2/cuFHTCPgBAwaMGTPmhx9+UPsqtR50cXExyfc5OTlUIdnU119/remn7tu377vvvrt//361ryo3Ih1EfADT8vvvv1+4cIFe0qFDB/IxpNNGAgICWNZmMVNEfPLZyrOJuiNpctKkSStWrKCektP51q1bX3vtNfZ3qT2rsdR3cHCIiIj48MMPSaI9deoUVThjxgydro6kwHEgPtGmTRs7O7vy8nK12yE5iUfEJ2dExoIbffr0eeedd7g3lQ6jdHRl4gc/Rc7j6scff1Q+NsCIb1LHA8v/O4n4CxcuPHnyJPWUfO5t27bt/fffZ9/g2LFjNUX8x48fk38//vhj5U4DAwN/+eWXVq1asWyQnAc1RXzyOfzixQtbW1v2JgmBiA9gWsinHqPkiy++0HUj5FPJ19fXoO5xO3Xq1KioKHKCCQsLCwkJ4XLj8Xv37jFKtN46hyA/+IkTJw4fPjxr1qyioiLuc5Slwz3ik98POeVruj0Z2c6bb76p065LSkpCQ0PpJVZWVhs2bNCpqXSI+DyY8sFPke24IjuiLxsVEBAgymbFZTrHA0svflpamvI2282aNfv111+DgoK0bpD9e87vvvtOedvH119/nfzgWu+0oDrtgY6kfER8ABDH/v37GfGOfOrxW+AsMDCQJeLLPOPWTPEhvnbt2v79+2u6o6EqXTuu6IYPH07ScGxsrAy3L9GKe8Q3U5zDWCK+rrtetmxZdnY2veTzzz9nOatpXa4bEZ8HUz74KbKtmEkfpdOiRQsnJydRNisu0zkeNC1Ib25uPmfOHGoQvIeHx5kzZzgOHHVwcND0UmpqqnJ2bPfu3Y8dO6b1NpHsGySNdHR05NIq3hDxAUxFTU1NeHg4o5BENH5bIxGf5X5+BQUFaWlp3E8wolA7yUyT0tJS1aUYyId4dXU1xzG75PNd69ff8lA7EFlTVhZxxu29e/eio6PpJa6uroylMxm0RjEDHPlQJ5jswU/ReuiKdelI/9Az5GPVFI4H0sKSkhK1L5FwTy1m2rx58/Pnz7OPpaFjud/LkydPqAd+fn5Hjx7lku/NFLd71/SSi4uL1LfxRsQHMBXffvsto6vm1Vdf7du3L7+tae0Vu379uswRXydq15WrqKi4f/++nLfmFS4zM5OxWiXh5ubWqFEjtfVZcsndu3e5n9SJmTNnkt8YvSQyMpLlm+usrCzVptJ5eHjQ1+kDiRjNwU9R+ydA17BhQxL1hO/o0qVL9PWgDDni66SOHg9avxJ0cnL67bffuOd7M3UDlhjc3d1PnjzJ/ZZVDx480PSSDOdHRHwAk0A+r1XH3PPuwjfjtqiOpjmXhkDTR3liYqIhn9VU6TRKh/0lcpCQkz374FGl48ePk9MnvaR79+7U/SY1wUB8A2E0Bz9F63GVn58vxTRQo4n4dfR40Pr/vnPnTl0HaLGMPiUsLS1/+uknnVb1TUtL0/QStaynpBDxAUzCli1bGOtG9+nTp2fPnrw32Lx588aNGzOWZqOTf8atTjTdHYac1QYNGiRzY4TQNeK7u7s7Oztr6vW8c+cOl4hfWVk5c+ZMegmJUJs2beLRVDpEfHkYzcFPEXhjZt6MJuLX0eOBvRd/4sSJb7/9tq7bTEhIYHl1zpw53bt312mDKSkpml4S60YNLBDxAYxfSUnJqlWrGIXLly8XuNkOHTqcPXtW06vyz7jViaazGpd1JAwKx/va0gUEBFy8eFHT1risoLp27VrGqevTTz/t2LEj+7sQ8Q2E0Rz8FL1EfHJN6+/vL/9+pVBHjweWiN+4cePIyEge22Q5ltzc3BYtWqTrBlm+FmjXrp2uW9MVIj6A8SOBTDlViDJgwIBu3boJ3GxgYCBLxH/27Fl6errqDVYNBEvHlcwtEUjXXnzqVZaIr3WP2dnZylW3KdQNI7W+ERHfQBjNwU/RS8T39PTkOOHS8NXF46GsrIxlDMz8+fO5D5en07REDxEWFsZjySCWiM9xSKQQiPgARo5E7TVr1tBLzM3NhYzCV9I6zDEuLs5gIz7L8FOZWyJEdXW1aoMtLS3ZTx4sAwy4LKoTEhJSXFxMLyGJX+sJlTSVfZyrlZWVDN1aYGYsBz9F7Z+ADIxmlI5Z3TweyCcV447aSo6OjhMnTuSxzfT09KKiIrUvOTk5jR8/XtcNFhQUZGZmqn2JfNwh4gOAUBEREYx1u4YPH96pUyfhW+Yy45bHaEh55OXl6bsJIkhKSmKsaUP4+Piw306FJZ2kpaWVlpaydFZdvnx5z5499JIuXbp8/PHHWpuanJys2lS6tm3bcrlHDwhnHAc/Re2fAF3Lli1JdBO+owMHDowcOVL51Jgifl08Hli+uunXrx+/+xXcunWLZZssK9zz2KCvr68MH3eI+ADG7NGjR4xJkBYWFjxuZ6tWQECAlZVVVVWVpgoGPuPWCPAYpcNeoba2Nj4+XtNtIMmrypu/UMzNzckBRv7l11SOrQLQRLabXpHPOvpTY4r4dRHLQPzevXuLvk1+S1OwbFCejztEfABjRtJ8eXk5vaSmpka2kxMivtT4RfyGDRu6ubkx7kqrdOfOHU0R/+uvv2bMoh4/fjzHSR2I+CAF2Y4rRp8rIr5+saRnrfP+NWHpdOe3TZYNIuIDgCCpqanffPONHhvw7NmzjIwMne48AjrhF/GpOpoivqbMVFBQsHDhQnpJgwYNuC9bgYgPUtBLLz6J+zKseAgsWP7feX+SiN7pjogPAFIJDw9nGUUjj7i4OER86fCO+O3btz916hT3bZopDifGmN2lS5c2adKEQzPZNquEiA886KUX38fHhzFuB+SUnZ2t6ZYs5HTDcoNtFqWlpZqW6OG3zZqaGpb1eRDxAYA/cubbt2+fvlvxf6vjv/XWW/puhXEqLi7OyMhgFDo4OHC5L7qui+qQc9XWrVsZW5gyZQq3lv7fnRnYpzySMyguBUFXav8E6GxsbMTqbqdneozS0S8puvBZlujht83k5GTGKFklR0dHedaaQ8QHME5hYWG1tbX6bgWG40uInJNU/4sDAgK4vJflpJWbm5uXl+fi4kIvnDZtWnV1Nb1k48aNlpaWQppKh8wEPGg9rvz8/Lgfpezovfg4XPWLZUQN73FZLINq+G2TZYOyHT+I+ABG6MqVK8eOHaOX2NnZpaamurm5ib6vJk2aaPrO1AwRX0q8R+kQ/v7+FhYWmnqtyJbpq1L8/PPPjHucjRw5UqclJjBKB6Qg53GFXnzDIcVKNcY3EN8MER/AKM2fP59R8tlnn0mR780UPRws97jNy8t7+PChh4eHFLs2cWrzDccOJ3t7ey8vr5SUFLWv3rlzRxnxy8vL58yZQ3/VwcGBcTM1fk2lQ8QHHmSba2uGXnxDwvL/zvt/XPRvBhDxAUB8p06d+uuvv+glJJOphn6xBAYGskR8M0VHPiK+FIT04pspYoqmiE/fckRExIMHD+ivLly4sHnz5pybydygWoj4wIOcx1WnTp00fesFcmK5T7aNjY2vry+/zWo6lnhvU++L4psh4gMYn7CwMEbJtGnTGEOrRaS1h4NE/GHDhkm0d1MmPOL/8ssv7FvOyMhYvXo1/SVytps1a5YOrfzfDWqCiA88yNmLDwYiMTFR0/2MeU+9ePjwYUFBgYjbfPbsWVZWlqZXEfEBgI+DBw8yhr83aNBg7ty50u0xMDCQvQKG40shOzubnEUYha6uro0bN+a4BZbTjHKtN5LmGYtCrF+/Xtf7rufk5LDM1iCaN2/esGFDnbYJoPZPgI78LUg0OhH0SIpROnLOtSXHZKNGjXhskwdEfADjUVNTEx4ezigkKc3Z2Vm6nQYEBFhZWbEswI+ILwWBXfhmrOOJi4uL09PTU1NTDx8+TC8fMmRIv379uO+Cgi58kAKOK9OEubbcIeIDGI/du3czBik2atRoxowZku6UGqqYkJCgqcKTJ08yMzNbtGghaTNMjfCIT/7XyP+dpq+8b9y4sWjRInqJnZ1ddHS0Lm38/xDFQAo4rkxTnZhrawgD8c0Q8QGMRmVl5dKlSxmFISEh/G71p5PAwECWiG+m6MhHxBeX8IhvaWnZrl07Taei0NBQxmRccizxu10LohhIAceVaUIvPneI+ABGYtu2bYwbPTZr1uzzzz+XYdck4v/4448sFUjEHzp0qAwtMR3CI76ZYqyOpnMbI9+TcD9v3jydNq6EKAZSwFxbE1RYWPjw4UO1L/GeelFeXn7v3j0Rt1ldXc3S54WIDwC6KS0tXbFiBaNw/vz59vb2Muydy6I6MjTDdNTU1KguG2dhYeHv76/TdrifbNauXWtnZ6fTximkqezf8FhaWvr5+fHYMpgytX8CdObm5li93viwXNfxjs7x8fGMW3cL3GZiYuKLFy/UvkQ+7nT9lBYCER/AGERHRz9+/Jhe0qJFi0mTJsmzd62L6ly/fl2elpiIe/fuMRa6Idq0aaNrCueYgfr27ct72dOUlBTVptL5+PjY2try27hwixYtUr02Zrd169ZPP/1UovYAR2r/BOi8vLzq1asnW3tAHnVilA7LBsmntJwfd4j4AHVeQUFBVFQUozAsLMzGxkaeBri5ubm4uOTl5WmqkJub++jRI13vlwSaCLmvLR2XiG9tbb1hwwZdt6xk4KN00tPTdX0LvwkJIC4DP65AInVirq2BDMQ3Q8QHMAKRkZGFhYX0Ek9Pz48++kjONpCPwjNnzrBUiIuLQ8QXiygD8YlWrVrVr1+/qKiIpc6MGTN43zDSzOCj2JYtWz755JOb/5GQkMD4ht3KysrHx4dcC5F2Uv96e3vrq7WghIH4pkmKXnzREzkiPgCIIzc3d+PGjYzC8PBwEk3kbEZgYKDWiD948GDZ2mPcxIr4ZorbGly5ckXTq+SqTPVOCzox8IhPrnB6KFBPFyxYEBERQa/wxRdf8J5nDNIx8OMKJHLnzh215UKmXmg6lnhvExEfAMSxbNmy0tJSeknbtm3HjRsnczNwj1s5iRjxybtYIn5UVJSDgwOPzSrVrSim2lp0BhumunVcgSjS09M1feXIe+rFo0ePNN17m9828/LycnJyNL2KiA8AXN2/f//rr79mFC5ZssTCwkLmlmBRHdmQK7q0tDRGITkVkRMSj62xdFO99tpro0aN4rFNpbKyMtWm0pHrB37NlojqMAAkRQOk9k+Azt7e3sfHR7b2gDzqxFxbli583p/SvCHiA9RhixcvrqyspJeQxDZixAj5W+Lv729lZVVVVaWpQk5OTnZ2Nr91i4EuPj6+traWURgQEGBubs5ja5oivqWl5aZNm3hskI40taamhqUCabbAXYhIdcltZ2dnDw8PfbUHNFH7J0BHPo74/TmAIRN9XqwU22SJ+Lw/pXlDxAeoqxISEvbu3cso/OKLL/RybrOxsWnXrp2mgZKUuLi4QYMGydYkYyXiKB2WN06ePFn4suJ1azSFamuxsLphwlxb0yTFovhGPNfWDBEfoO4KCwtjdJF26dKF9/rlwpHTKiK+DMSN+C4uLk2bNmXcVKFJkybkWpHfBunqesRHUjRMdeu4ArHUiV58KUYT8YaID1AnxcbGHjlyhFG4bNkyvTSGEhgYqPqtAh2G44tC3IhPvff06dP0klWrVjVo0ID3BpXqVhRTba1BNQ+U0Itvgl68eJGSkqL2JXt7+zZt2vDYZmVlZVJSkojbrKqqYrnpMiI+AHCyYMECRkn37t379++vl8ZQsKiOPESP+O3bt6dH/K5du3744Ye8t0anNYoZ1EgYzLWtK+rWpSOIIj4+vrq6Wu1LvKdeJCQkaJo/xm+bJN9XVFRoehURHwDUe/HiBYnIV/4jMzOTUeHq1asdO3bs0KFDoAJ50LRpU0mb9OTJkzs05COYvX52dra7u3vnzp27dOlC/UueStrCuo78hlNU5Ofnq9Zs165dGxpvb2/yL8cDgJ6zLSwseMyyrampefDgQVpaWmpqahqN2qbS+fn5+fr6+vj40P8VuEwnb6rDzJAU9a6yspIc80lJScnJyUn/oWmVQyVyFHkotGjRgvGA39KKoHdSjNJhGTcv+lxbgpygu/wHOQPKcC9IRHwAQ5eRkfHuu++Szw7G4jkM5NXbCj/88ANV0qxZs0GDBqmuqilQSUnJkCFDSB4iAVTX95KUf1yBetqkSZMxY8asXbtW3BbWdevWrSP/iSTZsN93lo6E6asK9EJHR0eS9T///HP2Xnl6kCU1X3rpJY47JQcA+e8jUZ7ke5bFlFg8e/aMumSlF7q5uZGIdvDgwcaNG/PYJj/kr+z58+f0EurWv7I1ABjIh97NmzfT09M19d2yIP+V8QqqLzVs2JDE/YCAAPZRhWBopJhrK/q4eZYNmilOf8cUqKfkBE2yPvmod3Z25rEvLhDxAQzd33//fe3aNR5vzM3NZdwVSxQkkJ09e1aUTZGMyL6oomnatWsX+6mCo+LiYnJlaGNjw16NWsqttraWpJ9Vq1Zx335MTMyff/4prI1qkBMhOW7lzPdmmGtrYDIzM8k1nhRbzldwcXGRYuMgnTox15a9F5+BnKDPnz8vyqwnTRDxAQwdo2tWJ9x7ZLm7ePGiiFt7+eWXRdyaESgvL9c65EknWn/DDg4OrVu3vn///rJly3QK1kKOTHadO3eWaMuaYK6tQZHu0KJI8cEIkqoTvfg6RXwzxQQ2SRe5RsQHMHTrFfTdiv8KV9B3K4yWnZ0d+4gsKaSmpvJ411IF0RujF5hra1CGDx+O7/eALicnx/C3KUUjhagDEb+wsJBcGN2/fz8jIyNdIS8vr/Q/SkpKamtrrf7DwcHBUaFhw4ZNFNzc3Fq1atW6dWtvb+9mzZrp+6cBAACDg4E6AGBkDDTiJyQknD9/PkYhKSmJ/VbVRIWCmWKSDUs1Z2dnf5qOHTtKveQIAAAYOHL6SE5OppfY2tr6+vrqqz0AAMIZUMQnOf7KlSuHFfh9a6xVQUHBJQVlibu7+0svvdSlS5egoKB+/fpJsVMAADBkd+/eZawI5OfnZ2lpqa/2AAAIZxARPzc396uvvtq+ffujR49k3nWWwpEjR0jWf/jwocx7BwAAvcNcWwAwPnqO+LGxsevXr//555+1Ti+zt7d/+eWX/f39/RRcXV3r16/v5OTk4OBA3ltWVlZUVJStkJSUFB8ff/PmTfIv9/k6+E4WAMA0Ya4tABgfvUX8xMTE0NDQo0ePsldr2bLl22+/3b9//9dee83W1lZtHVsFZ2dnDw8PenlhYeGFCxeOHTt25MgRrdOc27Ztq1P7AQDAOGCuLQAYHz1E/Nzc3MWLF+/cuZPllnUWFhYk1k+aNGngwIG8Fw1t0KDBQIWtW7eeOXNm27ZtJOtr+roAER8AwDShFx8AjI/cEX/fvn1TpkzJz89nqTNs2LBVq1aJm7lfV8jIyFi2bNnu3btV77WOiA8AYIKePXuWnZ1NL2ncuLGbm5u+2gMAIAr5Ij6J9ZMnT/7pp59Y6gQFBUVHR0t3t8tWrVrt2LFj+vTpEydOZNw8DxEfAMAEYa4tABglmSI+ydPDhw9nWTDHyspq0aJFYWFhFhYWUjeGfHxfuHCBPrLfxsamdevWUu8XAAAMDUbpAIBRkiPiHz58eOzYsWVlZZoqeHt7//jjjy+99JIMjaEwLiTatGnDe8Q/AADUXZhrCwBGSfKIv3bt2pCQEJbFK7t163b06FEXFxepW8ICo3QAAEwTevEBwChJG/GXKrBUGDZs2N69e+3s7CRthlaI+AAApik+Pp7+1NzcvH379vpqDACAWCSM+OvXr2fP90OHDv35559lGHyvFSI+AIAJSktLKykpoZd4eXnVq1dPX+0BABCLVBF/165ds2bNYqnQs2fPffv2GUK+N8OtbQEATBJG6QCAsZIk4p8/f37ixIm1tbWaKpDP0F9//VXT3Wrlh158AAAThLm2AGCsxI/4eXl5o0ePZrlzrYODw4EDB+rXry/6rvlp3Lhxo0aN9N0KAACQG3rxAcBYiR/xx40bx7L+PbFlyxaDGhiDLnwAANOEXnwAMFYiR/wvv/zy5MmTLBVGjx5NrgHE3alABnW9AQAA8igvL09JSaGX2Nvbt2nTRl/tAQAQkZgRPzMzc8mSJSwVGjRosHbtWhH3yJulpSXLUv0AAGD04uPjGScCf39/3AYRAIyDmBF/9uzZpaWlLBWWLl3atGlTEfcIAADAD0bpAIAREy3inz179sCBAywV2rdvP2XKFLF2BwAAIATm2gKAERMt4s+ePZu9Qnh4uKWlpVi7AwAAEAK9+ABgxMSJ+CdPnrx58yZLhbZt27799tui7AsAAEA41YiPXnwAMBriRPzIyEj2CqGhoZjDBAAA+lJVVXX37t1bt27dvn2b+vfx48eMOoGBgZ07d+7UqRP1b+vWrfXRUgAAEYgQ8ePi4s6dO8dSoWnTpmPHjhW+IwAAAH7ef//9ffv2sdfJycn5TYF6eu3aNZL1pW8aAID4RIj40dHR7BXGjBljZSX+PbYAAAA4un//vq5v8fLykqIlAAAyEJq8y8rKjhw5wl7ngw8+ELgXAAAAIS5fvqzvJgAAyEdoxD9+/HhxcTFLhY4dO2ICEwAAAACAbIRGfK1DG0eMGCFwFwAAAAAAwJ2giF9aWqqclqRJ//79hewCjFuPHj0uXryo71bo4N69e97e3vpuBQAAAAAbQRH/0qVL5eXlLBWaNWvWsWNHIbsAAAAAAACdCI347BX69u0rZPsAAAAAAKArQRFf6xCLnj17Ctk+AAAAAADoin/Er62tvXLlCnsdjNIBAAAAAJAZ/4iflJRUVFTEtmkrq/bt2/PePgAAAAAA8MA/4qekpLBX8PPzs7Gx4b19MAV///23vpsAAAAAYGz4R3ytNwPHHa8AAAAAAOTHP+KnpaWxV/Dw8OC9cQAAAAAA4EfCXvwWLVrw3jgAAAAAAPDDP+I/evSIvQIiPgAAAACA/PhH/OLiYvYK7u7uvDcOAAAAAAD88I/4JSUl7BUaNWrEe+MAAAAAAMAP/4hfWlrKXsHOzo73xgFMh7m5ub6bAAAAAIaotraW3xsl7MW3t7fnvXEAE4F8DwAAAJqQnMAv5fOP+BUVFewV0IsPwA75HgAAAKTAP+Lb2tqWlZWxVEDEBwAAAACQH/+IX69ePfaIX11dbWXFf/sAAAAAAMAD/wju6Oj49OlTlgovXrxAxAcAAAAAkBn/CO7u7p6RkcFSobi42MHBgff2AYwe72nyAAAAACz4R3xPT89Lly6xVMjJyWnWrBnv7QMAAAAAAA+CIj57hezs7MDAQN7bBwAAAAAAHvhH/E6dOrFXSElJ4b1xMBE9evS4ePGivluhg3v37nl7e+u7FQAAAABs+Ef84OBg9gp3797lvXHRVVZWurq65ufnk8fDhw8/ePCgvlsEAAAAACAJ/hHfzc2tVatWLDNub9y4wXvjovvtt9+ofE907txZv40BAAAAAJCOoEUtBw0atHnzZk2vXr9+vby83EBugLV3717lY0R8AAAAADBigiL+O++8wxLxKyoqLl682KdPHyG7EEVxcfHRo0eVTxHxAQAAAMCICYr4r732mpubW3Z2tqYKhw4dMoSIT5pRXl5OPSYNxlKeAAAAAGDEBEV8c3PzyZMnL1q0SFOFgwcPrl+/Xu/3uN2zZ4/ysQl24Z84cSIkJCQ5OdnPz2/16tX//ve/9d2i//r777/13QQAAAAAYyM0fH/22WcrV64sKytT++rjx49/+umnMWPGCNyLEKQNZ86cUT4VHvHXrVs3e/ZsrdX+9a9/3bp1S+C+iO3bt0+aNElrtaioKLWtIvl+wIAB1GPSnn79+pGSvn37Cm8YAAAAABgmoRG/UaNGkydPXrNmjaYKX375pX4j/r59+6qrq5VPu3TpInCDd+7c4VItKSmJ7NfS0lLIvoqLixcvXsylZrt27dSWh4SEMEpCQ0MR8QEAAACMmAhDaMLDw3/44Yfc3Fy1r966deu777774IMPhO+IH/paOmZi9OJHR0dPmDDh1n+QxK/2S4yKigqS8v39/YXsKyIiQu0v1sLCok2bNv9S6NChA/lX0/2YSBsYJQZ1vwIAAAAAEJ0IEb9+/fpRUVHvv/++pgrz588fPHhw48aNhe9LV2lpabGxscqnTZo0adGihcBtkp/3VQXq6dq1a+fMmaO25j///CMk4mdmZq5bt07tS2SPJP1z2Qi5EmBkel9fX95NAgAAAADDJ85E2LFjx/7222/79u1T+2pubi65ADh+/Lgo+9IJfaIt0alTJ9F3cfv2bU0vkYg/cuRI3ltesGCBpkkOHTp04LgRcvU1aNAgesnq1at5NwkAAAAADJ9oa91s3749Li7u3r17al/9/fffQ0NDIyMjxdodF3/99deWLVvoJVIsp8Me8Xlv9vr164zrEzruEX/AgAHHjh2bO3duSkpK27ZtSb7v378/71YBAAAAgOETLeI7OjqeOHHi1Vdf1bRMflRUFKnDssKmiIqKihYvXrx+/fra2lp6uegRv7q6WjkMxtXVleyOPnReSMSfNWsW1fiuXbvSxxoRNjY2mibXqjVAgXdLAAAADJm5ubm+m2BsGPEJ6iIxV6z39PT8448/evXqlZeXp7YCid3p6enbtm2ztrYWcb90VVVVO3bsIDt68uSJ6quiR/ykpKQXL15Qj//1r3/V1NTQI35GRkZJSYmDg4Oumz1y5Mj58+fJA1tb2w8++IAR8Um+1/utBgAAAAwB8r0UyG8VKb+uEzkp+vv7X7p0aeDAgZpG7Hz77bfXr1/fuXOn6Gm7qKho+/bt0dHRWVlZais0aNDAy8tL3J3SR+lQEf/06dPKEvLncefOnW7duum0TXKVolzpcsaMGarD8bmP0gEAADBiyPcAmojfGdymTZsrV66MHDnyzz//VFvh1q1bJPV+9NFHCxYsaNmypcDdkRh95syZXbt2HTp0qLS0lKWm1APxScSnL8BP+eeff3SN+Fu3bqUukFxdXcPCwqZNm8aogIgPAAAAACwkGe/RsGHDU6dObdy4cf78+WpjN4nC27dv//bbb4cPHz527Nj+/fvrOvIkKyvrr7/++u23306ePPn06VMub9FXxNdpg4WFhV988QX1eNWqVY6OjqrTecmOdG8pAAAAAJgKCYd0f/7554MGDQoJCTl48KDaCpWVlfsVSJDt1q3bK6+80q5dO09PzxYtWpCSevXqWVpakiuEkpKSoqKihw8f3lcgkffq1as5OTncW9KlS5cRI0aMGzdOpJ/sv5T5mzQ1ICCARHzG8DVdI/7y5cupK5agoKDx48fX1NQkJCQw6qAXHwAAAKN0AFhIO2uT5PUDBw5cv349PDz8999/1zR1o7i4+LSCiLu2t7fv3bv3QAXhw4HUKigoyMzMpB63adPG1tbWTPEjp6WlKevoFPHJBczGjRvNFB9bGzZsIA9SUlLKy8vpdVxcXNzc3IQ3HgAAwPhgkigARY6FWTp37nzs2DGSX7/66qtdu3bR15wRV7169YKCgnr16kXCfXBwsI2NjUQ7ojBG6Sgf0CP+06dPc3JyXF1duWxw3rx5FRUV5MGYMWOoEfyqVwjso3QeP37Msq/u3btfuHCBS0sAAADqHOR7ACX51l709PSMiIhYtWpVTEwMSfwnT54kEbmyslLINhs2bBgQENC+fftOnTp17dqVxF8LCwuxGqyV2ohPGnPkyBF6tTt37nCJ+FeuXDlw4AB54ODgoLxHmGrEZx+lQ65qNm/e/I8C2W9hYSH9VdI2rc0AAAAAgLpO7uXVzc3NgxWWL19eUVFBUvL169dTUlIePnyYmZmZnZ1dUlJSVlZWXl5eVVVFAqutgpOTUxOFpk2btmzZsnXr1uSCwdvbm2PvuEQ09eIzqpG0/cYbb2jd2qxZs6gH8+fPVw7F0TXiOzs7f/bZZ9Tjv//+u2fPnvRXMU8XAAAAwBTo8w5KJMG/pKDHNgjBPeJr3dT+/fuvXLlipviuY/bs2Szv5R7TVd+LXnwAADAOmGsLwA43SeWptrY2Pj6eeuzg4KC8qZavry+5dKGG1FO0RnxSed68edTjL7/8kpq2S5SWltKH9RMWFhbcY/qdO3cYJejFBwAAADAFiPg8paamlpSUUI8DAgKU3QmWlpbt2rWjd/AnJCSQ6wGW/oYNGzakp6eTB6+//vrw4cOV5eQSoqamhl6zTZs2dnZ2HFvIiPiurq6NGjXi+F4AAIC6BXNtAegQ8XlSO0qH0r59e/qrZWVlKSkpPj4+arfz9OnTFStWmCmuDaKjo+kv6ToQn4ER8TFKBwAAAMBEIOLzxBLx1Q7H1xTxly5dSq1788knnzBSuJCIn5WVVVBQwN4qAAAAADBKiPg80fO31oh/586dt956S3Uj9+7d++qrr8wUq38uW7aMZRcU7hFfdSA+evEBAMA4YK4tgFaI+DyxD9RhVNY04zYkJIS6M8DSpUtVB8oLWU4Hc20BwEA8ffo0TiEhISEjI+PBgwdFRUWlpaVVVVX169d3cnJq0KCBj49Phw4dOnbs+MYbb9SrV0/fTQYAqPMQ8fmgr3XTrFkzFxcX+qstW7YkJ63nz58rS9RG/PPnz1M3yQoICFAuZq/0+PHjJ0+e0EvIudDT05NjCxl7NDc3J3vh+F4AAFG88847JNmTWK+pQoGCmeIj69ChQ2aKBcqGDx/++eefBwUFydZOMAKYawvAgIjPBzkbKT9N1PaOt2/f/tKlS8qnKSkp5eXljMVwlOvfr1u3ztLSUnUXqtvk3kJGL76Xl5e9vT33twMACEeldp2UlJT88MMPe/bsmThxYmRkpLOzswTtAgAwfoj4fLCM0qEwIn5NTU1CQkLnzp2VJeQcFhcXRx4MGTJE7b1v6bugcB+ITy4/7t69y2gPx/cCAEikVatW5BMvODi4Y8eOTZs2JfG9uLj46dOnN27cOHPmzPfff0+eUjXJh9jXX3998eJFUk5q6rfZAAB1ESI+H/T8rTZ5q11URxnxy8vLFyxYYKa4v++aNWvU7kLIXNuUlJSysjJ6CSI+AOhR7969v/jii1deeYVR3kDBy8vr7bffXrly5cSJEw8ePKh8NSEhgbzx6tWrGJ0PAKArRHw+uPTiM0rokX3t2rWZmZnkwcyZM729vdXuQtzldDDXFgD0aOnSpar5noFk/QMHDowcOZL8qyy8e/cueW9kZKTEDYS6BMvpAHCBiM+HMn9bWFj4+/urVlC7bib14PHjx9TpytXVNSwsTO32a2trExIStG5TE6yYCQCGw9ra+qWXXuJY+euvvz558iR9uYLo6OjPP/+8RYsW0rQOAMA4IeLr7OHDh8q7SrVp04YxiZbSqFEjNze37OxsZYnyqiA8PLyoqIg8WLVqlaOjo9pdqI60oVbp4dhCRsS3sbFp27Ytx/cCAIgrMDBQ7eekWuSD7sMPP6Tf6ruysvLw4cMk5UvSODAKWE4HQBUivs60jtKhtG/fnh7xyeNnz57l5OTs3LmTPA0KCho/frym9woZpaP6dpLvVVfsAQCQR/fu3XWq/+9//5se8Ynjx48j4gMA6AQRX2ccIz556Y8//qCXkOQdGRlZXV1tbm6+fv16ll0IifgVFRUpKSmMlnB8LwCA6F5++WWd6qt+3N2/f1+85gAAmAREfJ1x78VnlKxdu/bEiRPkwZgxY4KDgznugsI94icmJlZVVbG3BABABjU1NTzepXqr75ycHDGaA8YAc20BOELE15nWFTMpqun/6NGjZop7N2pdHUJIL77Ae2YBAOiXtbU1o6SyslIvLQEAqLsQ8XVTUVGRnJxMPa5Xr56Xl5emmv7+/hYWFqqdWPPnz3dzc2PZRVlZWVpaGr3E1tbW19eXYwuxYiYA1GnUggR0qv36AEqYawugFiK+buLj46urq6nHAQEBLN8Y2tvbkwsAxrB4T0/P2bNna90F48KAulrg2EJGxK9fv36rVq04vhcAQO9UI36zZs300hIAgLoLEV83HAfiKyswIn5UVJStrS37uwQup8OI+OQ6hPt7AQD0Lj09nVESFBSkj4YAANRhiPi60Snit2/f/vDhw8qnvXv3fuutt7TuQkjELy4uzsjIYLSB43sBAAyB6o3/Xn31Vb20BAwN5toCcIeIrxtde/GVjy0tLdkXylQSEvExEB8A6robN27Qn9rZ2Q0aNEhfjQEAqKMQ8XVDz986RfxPPvmEY4e6uBEfvfgAULf89ttv9KfvvPOOs7OzntoChg5zbQE0QcRnU11dnZiYeIvm8ePHyldJ8g4MDFT+6+fnZ2X1P79PHx8fW1vbFy9eNGzYcNmyZWp3UVJSEh8fT2I9SefUv/RdUMj2O/1Hx44dvb29NTUYK2YCQJ129erVrKws5VMLC4u5c+fqsT0AAHUUIj6biRMn7tq1S9Orubm5pxSop4sWLVq6dCm9Ajk5kdx/8+bNJUuWaFr0zdPTMy8vj70ZOTk5vytQT8+ePduzZ0+1NVV78UkDfP6jXbt27777Lvu+AAD0iDGgccKECRhtCADAAyI+m/j4eO6V1faXk5NTRUXF5MmT1b7l6dOnWvO9KpLUNb2kGvGfPXsWo2CmWF0HER9AuB07dnzyySdSbDkiIiIkJIRj5W3btmn6bBFo06ZNEm2ZXUZGxv79+5VPXV1dV65cKX8zROfi4kI+ilXLGzdu/OTJE/nbo6qmpoacPm7evHn79u309PQHDx7k5uaWKJCX6tev7+TkRH4Kcprr0KFDz549O3XqJH8jOc61XbZs2eLFi0Xcryj/TR07dlS9b71OyGcO+ZMX2AwwKYj4bGJjYwVugeVLADPFBwe/G7xrQj6URdwaAKiluuSLWPz9/etcM0Q0ffr0qqoq6jHJc+Tzs0mTJnppibh8fHyofhYGlv4aOQ0ePPjChQuFhYWaKjxTINH/2rVrVImvr++ECRPI/5ednZ1czeTq6tWr4m6wS5cuArdQVFSk2gGnq5deekngFsDUIOIDAOjGwcHB09PzwYMHyhvhCdesWTNvb++OHTvq1IzWrVuTZojVU0BStaurq5eXl17Gxhw8ePDXX39VPl26dOm///1v+ZshBRKI1Ub8tm3byt8YVcePH9f1LcnJyfPnz9+2bdvWrVv79+8vRau4UDvX1tra2tHRsbi4WPj2qVtYvvPOOwK38/Dhw/bt25NfWnl5OY+329jYkKvuHj16CGwGmBpEfAAA3SxTqKysTEtLu/e/yLmcfYkPW1tbkstJbiCB3kuBekDChK7NWKVAmpGamspoRmZmJpdmULum/6uvTlnS5okTJyqfkscLFy7US0ukQCK+2nID6cVn6Ny586BBg7p27UpipYuLCzlU8vPzyaH+999/79ixg/xPKWtmZGQMGTJk9+7d7733nh4bzECuFcnBn5KScuPGjZs3b1L/av2Ku169euT49/HxaaNAPWjRooUoTSK/SdIG0qr09PTExMS7d+8q/3369Klq/aZNmwbS+Pn5WVpaitISMCmI+AAAfFhbW7dVoBf27NmTJCGWd/3xxx/i3siJNKOdAr3wlVdeuXz5spzNEKKwsHDYsGHKgSIjRozYunWrfpskLk0R30B68ZXGjh27aNEikm4Z5U0VgoOD58yZs3LlyvDwcOUFZFVV1bhx40g4JpcEsrdXI3Nzc2qRCXIsUSUeHh70lZpUbd++ffTo0VK3ylPhzTffpEr+/PPPvn37Mqr179+fsW4sAD+I+AAAolFduJZBnjEwWgf+Gs4yNSUlJSTx3L17l3o6atSo77//3sLCQr+tEldd6cVft25d48aNWSqQkBoWFlZZWfnFF18oC6urq6dOnRoTEyPprWcFbpxcnxw8eJClQmxsrNQRX1VoaCijxMrKau3atTI3A4wVIj4AgDiysrIKCgpYKri7uzdo0EDqZmRkZBQVFem9GVyUlpYOHjz4ypUr1NOJEydu27bNyPK9mWK6rWqhtbW1l5eX/I3RxNPTkz3fKy1atGjXrl3kMFOWXLt27dy5c71795asdUJpjfhqJ0tI6scff2TcyJmYNGmSoV34Qd2FiA8AIA4D6Ts3kGZoRa5DBgwYcPHiRerpwoUL6X3DBm7Lli39+/fnmNHr1avXvHnzR48e0QvJe7kPsH7x4kVsbKykEy67devGsSZp9gcffMC4D8yxY8dkjvg63deWRHz2Cjdv3qysrCTXXcIaxRXZF7lSYhQ2bNiQ8VsFEAIRHwBAHFpH6chzt2kDGSzELi8v780334yLizNTDE7YuHHjp59+qu9GcZWbmztr1qw5c+YsWLAgNDSUSy709fVlRHzunbVHjx6dMWNGYWHhgwcPyNUCnxZzoNNg+ldeeYVRcuHCBVGbI7IuXbqQ/yYSrDVVIBdRt27dkm1hym3btqWlpTEKFy9eTFK+PA0AU4CIDwAgDgPJ1lp78eW50mBBwk3//v1TUlLIYycnpwMHDtSt9TE3bdpUUVFBHoSHh+/Zs2fr1q29evVifwuJ+OfOnaOXcJlre//+/WnTpikXtfzmm2+mTp3Kr81a6RTxVe+ckJOTI2pzRGZnZ9ehQwfqklKT2NhYeSJ+cXHx8uXLGYXkeJgyZYoMewfTgYgPACAOA8nWBnKloQmJWQMHDnz8+DF53Lp162PHjunrTlv8lJeX028ympSU9Prrr48bN+7LL79kuVGX6oxb9l78Fy9eREREREZG0ldSj46Onjx5suhzFXjcV8HZ2ZlRIultekWZyBscHMwe8WNiYuS5qXNUVJTqr2vNmjVYGRPEhYgPACACkpOUy8KoRc7fMmTZ6upqEjrZm+Hn5yd1MzQ5cuTImDFjSktLyeMePXocOnSI4xRPw/Hdd9+prmX+/fffk2sVEso//vhjte9SjfgsvfjHjx+fPn266kAOUkJ+Y8LvxCScra0to8TKytDjBIn4mzdvZqkg/H72XOTm5qqumdO3b98BAwbIsHcwKYb+NwkAUCekpKSw37rS29tbNRiJjuR7agyJJm3atJGhGWpFR0fPmTOH6jP+8MMPt27dKtvsRhGRn0JteX5+/qeffkouALZt26b6PQnHXvz09PRp06aRqwVNe1+zZo0hRPznz58zSmS+VNNpri1F64zb5OTkwsJCqRebWrp0aUlJCb2EXHVjoUyQAiI+AIAIDGR4jGEup0NiPUmuW7ZsIY8tLCwiIyNnz54tfzOEO3r0KAmCLBUuX77cpUuX6dOnkyRHnxpLrZ9TXV1NPXVxcWFMrHzx4gX5tURERLBfKMbExFy4cEHvty1jTB020/foLy7INTb5tefl5WmqQC4brl69+sYbb0jXhpSUlB07djAKyZVh3RqrBnUFIj4AgAgMJOIbyKo+dCUlJSNHjqRu2Fm/fv29e/cOHDhQ5jaIhUtva1VV1Zo1a/bv379hw4ahQ4dShVZWVq1bt05NTaWeMkbpkF8OuQRSHZmjVlRUlN4j/vXr1xklr732ml5aopNu3bop5y6rRa6gJI34CxYsIIcHvcTZ2bkOrRULdQsiPgCACDDXVq3s7OwBAwbcunWLPPbw8CABS+/r+QgRGRl55MiRX3/9NT4+nr3mw4cPhw8fPnjw4I0bN7Zs2dJMMVZHGfGVo3QyMjKmT59ONshl782aNSO/zCFDhgj4CcRx+PBh+lNra+uxY8dKtC8Rb5obHBzMHvElHY5/7dq1n3/+mVEYHh7eqFEj6XYKpgwRHwBABAaSrQ3kSoOSkJDw5ptvkrBrpliY/OjRo66urrLtXQpdFVasWHH//n0q61+4cIHRL0tHfuTTp08vWbJk5syZJOL//vvvVHnbtm0rKiqokTllZWUseyQBt1OnToMGDRo4cGBQUJDIPw8viYmJjNkCEyZMqBP/s1qH40sa8UNDQxkl5JCQbhVUAER8AAChysvLlR20atnZ2bVp00bqZpSWlpLoyVLB3t5ehmZQ/vrrr+HDhxcUFJDHQ4YM2bt3r3S3bZKfp6fnDAXyAx4/fpxk/RMnThQVFanWJP8pISEhu3fv7ty5s7IwIyMjICCA5ZhxcHDo06fPIAWDSs/Pnz8fO3Ys/arG29v7yy+/lLMNPObaUsjlmYWFBcsiobm5uQ8ePKC+dREXOTzOnj3LKCS/N8NfiQjqLhxbAABCJSQksC8u7u/vL+J4A03i4+PZ0488zaD069dPubYPScCOjo4CN8hj+XYZODs7j1GorKwkGY78pEePHqW+uKC7o6B8qmn1xtatWw8cOJDE+t69e9vY2EjYbl4uXLjw2Wef0QcpkSvG06dPC//PlUf9+vX9/PzYB1nFxMSIHvHJX+W8efMYhW+88Qb5jxZ3RwB0iPgAAEIZyCRXA2kGhX3tTuNjbW3dV2HTpk03btz4VYE80PpGS0vL4OBgqsM+ICBAhqZqRf7vChUKFLKyspKTk0+cOMH4cT744IM1a9YwlgYycORXzR7xY2Nj3333XXF3+sMPP9y+fZteQv7T161bJ+5eABgQ8QEAhDKQpSoNpBnQSWHx4sXkomvy5MkXL17UVHPUqFGrV692d3eXs3la2dnZsbxav379kSNHfvbZZ+RnlK1JYiERf+fOnSwVYmJixN0juV4KDw9nFH788ccGcjkHRgwRHwBAKAPpPjeQKb+QkpJyVIF9Mi7x448//vLLL6+//vqAAQMGDhwoxShwETVq1GjMmDEk35Nwb29vL8MeRR9XpnXG7fXr16urqy0tLcXa4+bNmzMyMuglDRo0wEKZIANEfAAAoQwkWxvUcjqmpqam5vLly9RY/MTERO5vLCsrO64wZcqUgICAgQrdu3cXMWWK5dmzZxsVSL7v06fPW2+9NXr0aAOcM8DC39/fyclJ9e68SqWlpeTvKDAwUJTdkR2tXLmSUbhw4UIXFxdRtg/AAhEfAECQ/Pz87OxslgoNGzZs3ry51M3Iy8vLzc1lqdCoUSM3Nzepm6FkmLNjRVdcXHzy5EkS60lGf/r0qaZqQUFBJDUq72w6atSoU6dOqdaPV1i9erWzs3O/fv1I1u/fv7/8cbC8vJxk06KioucK5LjKzMy8fv36+fPnHzx4YKa4LDmmsGjRovDw8I8//li2tvFeTodibm5O/i9Onz7NUicmJkasiB8ZGcn4X27Tps20adNE2TgAO0R8AABB6sooHXThi4gkXWoozrlz59gnFjs5Oa1YsWLy5MkzZ85UFpKUuWnTprCwsO3bt6u9FiooKPhJwcLComvXrlTXfseOHUX/QdSysbFxUVB96ezZs6TZV65coZ5mZWV9+umnf/zxx7fffuvg4CBP8wQKDg5mj/ixsbGffPKJ8B2RK//169czCqOioqytrYVvHEArRHwAAEEMZJKrgTTDuF29epXE+l9//ZWxQIomI0aMiI6Opha2T05OVpYnJiY2bNhwy5YtJEpOnTr10qVLmrZALgCuKCxatKh58+YDBgwYNGiQHm9w27t374sXL5LG0Mef/Pzzz+Xl5UeOHJFtSVYhtA7HF2vG7eLFi0tLS+kl5Lc3dOhQUTYOoBUiPgCAIAbSfW4g8wGMW0hIyF9//cWlppeX1+bNm/v166csoUf8pKQk6kHHjh0vXLiwa9euefPmsY+zIh49erRjxw5STY8R30wx1mX58uVPnz796quvlIXHjh2Liooivx9xdyTi1pS0Rvy7d+8WFxcLXOyf/Bd/++239BILCwsslAlyQsQHABDEQLI15trKYNasWVojvrW19dy5cxcuXEhferKyspK+rApjPu748eOHDx++ePFiclXAvgIPQTaue8PFFxERcejQoSdPnihLIiMjP/vss/r16+uxVVw0btzY29ub5dbCNTU1165d69Wrl5C9zJ8/v7q6ml7y0UcfdejQQcg2AXSCiA8AIAj7nXTM5MrWBtIM4zZ48GBfX196fzxDjx49tm3b5ufnxyhPS0ujB77c3NzCwsIGDRooS5ycnNatWzdx4sSpU6eyXEV07dr11VdfFfATiIY0fvTo0fSx5vn5+fv37ydBVrqdCpxrqxQcHMwS8c0Uw/GFRPwrV6788ssv9BLy/7t8+XLeGwTgAREfAIC/hw8fkqzGUqFFixb0JCeRjIyMoqIilgoeHh4kZEjdDFMwY8aMyZMnq5Y3btx49erVEyZMUPsu1auCpKQkktcZhQEBAWfPnt23b9/cuXOzsrJUtzNnzhxerZbEwIEDGdNJT58+LWnEFwuJ+Hv27GGpIHA4fmhoKKMkLCysSZMmQrYJoCtEfAAA/gxkeIyBDBYyBePHj1+0aBFjJcQPPvggKiqKpHxN71KN+ImJiaoRn/Lee+8NHjx42bJl69atq6ysVJZ7eXm99dZbAtouMh8fH0bJjRs39NISXWkdjh8bG8t748eOHfv777/pJeQ/jlwZ8t4gAD+I+AAA/BlItsZyOrKxt7efNGnSihUrqKd+fn5bt2597bXX2N+lNuKz1HdwcIiIiPjwww+nTZt26tQpqpDERAsLC74NF59qtzR9aL5Aki7OExgYSP4fy8rKNFXIysp69OgRj9tZ1NTUzJ8/n1GIhTJBLxDxAQD4qyvL6WAgvoimTp1KQhtJ22FhYSEhIVzS27179xglykV1WPj6+p44ceLw4cOzZs0qKioiiZ9ni6Wh+oOzD1ozHFZWVp07d7548SJLndjY2GHDhum65V27djFmxfTq1Wv48OG6bgdAOER8AAD+tHafj1eQpzEs0IsvombNmq1du7Z///5eXl4c36JrLz4dCYhvvvkmSZz16tXToZXSU53+YW9vL93uxJprSwkODmaP+DExMbpG/BcvXixevJhegoUyQY8Q8QEAeKqurr57966+W6GdlZWV6hovIITaGbealJaWPnr0iFGYmppKjh9LS0suW7Czs9M6Fkh+qgv5u7u766UlPEgxHH/Dhg2ZmZn0kgkTJgQGBuq6HQBRIOIDAPCUnJxcUVGh71Zo5+Pjg6HAeqR2kU1y5Ny/f79Nmzbyt4fOxsamqqrq0qVLWiOvKtV1WuvQeDCtP++1a9dqa2u5TwkoKCiIiIigl9SvX185ZwNAfoj4AAA8aR2lYyAwSke/VAfiUxITE/Ue8evVq/f8+fMzZ87wiPiMdWOIPn36iNIqSefaUtwV1K5MSikqKkpISAgICOC4wVWrVuXn59NLFixY0LRpU0GtBBAAER8AgCetk1wNRB3qWzVKmm6VRSL+oEGDZG4MAxXxT58+TfKoTm+srq7++eef6SW2trbvvvuuqK2TFrmqOXjwIEuF2NhYjhE/MzNz48aN9BJPT8+ZM2cKah+AMIj4AAA8ae3FP3ToEI9FOXQ1dOjQo0ePslRAL75+aYr4XBbVkRo1hffSpUvl5eV2dnbc3/jll19mZ2fTS2bNmsVyZwCBxJ1rS9Ea8WNiYjTdy4whPDyc/ALpJatXr7axsRHUPgBhEPEBAHgykEXxDaQZoAlLL77MLVFFRfwXL15cvHiR+zCbU6dOLV26lF7SvHlzXb8H0DuxZtwmJCTs3r2bXtKjR4+3336bf8sAxICIDwDAR1lZWVpaGksFEp64L6rIW3FxcUZGht6bASxYxuLL3BJVyoU4161b5+Hh4evry16fHPbr169fvHgx/ba7DRo0OHr0qIODg4QNlUCXLl2sra3pPwjDnTt3yM+rdSXQefPm1dTUKJ+am5tHR0eL1UgA3hDxAQD4iI+PZx884O/vL8OsQa3N4D5fECSSl5en7yZopMzlvym0bdu2V69eQUFB7dq1a926tbOzMwm45eXlOTk55ILk7NmzP/zwA3lM30LDhg1Jvu/UqZNYTZLhr4ZiZ2fXoUOHuLg4TRWqqqquX7/+yiuvsGzkwoULx44do5eMHz9exN8GAG+I+AAAfBjI8Bjc1xaEYNxOK0nhq6++4vj2oUOHbtu2rVmzZhI0TQ7BwcEsEd9MMRyfPeKHhobSnzo6Oq5cuVKcxgEIg4gPAMCH1rm28mRrrc3AQHxgERQUFBsb++TJE53eZWNjM2zYsEmTJvXq1Uuadv0PKebaUkjE37x5M0sF9uH4v/zyy+XLl+kl8+bNc3V1FadxAMIg4gMA8FFXevER8YFFuEJGRsbt27eTkpKSk5OzsrJyc3MfP35cXFz8QsHW1tZZwd3d/aWXXiJXBa+99pp0i+fISeuM25iYGE0v1dTUMGYYt2rVavbs2eK0DEAwRHwAAD4MJFsbyJcJUKe1Uhg8eLC+GyI3b29vFxcXlskS5OLnyZMnTZo0UX1p586djAnTkZGR5HJI/FYC8IKIDwCgs6dPn+bm5rJUILlBhgHKjx8/Zh9iIU8zAMQi21xbpW7duh0/fpylQkxMjOodysrKyhjLhr7yyisjRowQv30AfCHiAwDozEAmuWIgPoBAwcHB7BE/NjZWNeJHR0c/evRI+RQLZYIBQsQHANCZgYzSMZArDQDpSDfXlsJjOP6zZ89Wr15NLxk3blyXLl1EbhmAMIj4AAA6M5AR8OjFBxCoa9euFhYW9HtXMVy9epVRsmLFisLCQuVTBweHVatWSdU+AL4Q8QEAdIZefADjUL9+fT8/v/j4eE0VCgoKkpOTlff9ffDgwZYtW+gVQkND3dzcpG0lgO4Q8QEAdMYSCMwUA3PlydYJCQmG0AwAUcg/15YSHBzM/hcdExOjjPgLFy588eKF8qWWLVvOmTNH2vYB8IKIDwCgm4yMjKKiIpYK5Kzv6OgodTPu379fXFzMUqFVq1YyNANMhzKCSz0+XmYk4u/cuZOlQmxs7Lhx48wU35vt3buX/lJERISdnZ207QPgBREfAEA3BjJKx0DmA4ApYPSvU09lCPryXEtwn3EbGhpKH7X/8ssvv/feexK2DEAARHwAAN0YSLY2kCsNMHr6Gj8jG39/fycnp+fPn2uqcPv27YqKisuXL584cUJZiIUywcAh4gMA6MZAsrWBXGmAEWMP9+RV4xixQ36QoKCg06dPa6pA8v2NGzdCQ0PphWPGjCHvkr51ADwh4gMA6MZAlqo0kCsNMFZcOu+NJuUHBwezRHxi3rx5sbGxyqf16tWLiIiQvl0A/CHiAwDooKqqKjExkaWCtbV127ZtZWhGcnIyezPatWsndTPAKOllZI5+hwNpHY7/119/0Z/OnTu3efPmUrYIQChEfAAAHSQlJVVWVrJU8PX1JfFa6maQywytzbCywic86EzXqG0cHflaIz5dixYtQkJCpGuMJuT3vH379rCwsGfPnrHcqwuAghMAAIAODGSUjoE0A4yJoU2rlfPKoXHjxt7e3qmpqVwqr1q1yt7eXuomMVy9enXKlCnXrl2Teb9QdyHiAwDowEBuKIuB+CAuIfneaDryuUT8bt26jRkzRob2KD179mz+/Pk7duwwgl8yyAkRHwBABwaSrbGcDojF0Drv9YVE/D179mittm7dOhkaQyGZniT7BQsWPH36VLadgtFAxAcA0IGBjJAxkCsNAIrAjnxDuMzgMhx/1KhROo3aFyIuLm7y5MlXr16VZ3dgfBDxAQC4KikpSU9PZ6ng6OjYunVrGZqRkZGh92aAEdCarangbggRXGqBgYH29vZlZWWaKpBXIyMjZWhJfn7+ggULvv76a+WcWgsLC8yvBV0h4gMAcBUfH8/eVRkQECBDM+7cuWMIzQCjpzzMyAOtKV/cEfnyjzu3srLq3LnzxYsXNVWYM2dOixYtpG7Gzp0758+fn5eXRz3t0KHDmDFjRo8e7eHhIfWuwcgg4gMAcGUgw2MMZLAQGDHTnNkZHBysKeK7u7sz7m4rBRLuqS8KSKAfNWrUuHHjcLkOvCHiAwBwVVeW08FcWxBCbb7n0pFf17GMs1+5cmW9evWkbgD5DX/00Udjx47t2bOn1PsCo4eIDwDAlYF0nxtIM8AIiNtbz2+sjuFcOWiK+EFBQePGjZOhAeRCQoa9gIlAxAcA4MpAus8NpBlgaoy+I99dISsri1EeHR2tj+YACIKIDwCgxuPHj1MUUlNTU/4jPz+f/V1+fn6+/8vHx0fIjTCzs7NTFaiWUA/kbwYAR6JMutXjTIDg4OCDBw/SS0aOHPnyyy/rqz0AvCHiAwD8V0RExE8//USSdHFxMY+3P3v27IqCsoQkHnd397Zt2544ccLS0pLjdubMmXPq1Km0tLTS0lIRm9GuXbvff/+dezMATA0j4tvZ2a1evVqP7QHgDREfAOC/9u3bd/v2bRE3WFtbm5mZaWFhoVOw3rVrl7j3s6SaYWtri3wPQsi/eqbMGMPxZ8+ejdUqoY5CxAcA+P9qamqSk5Ol2LJOg+MfP34s0f3qO3bsKMVmAXgztMH9Xbp0sba2rqysJI/d3Nzmz5+v7xYB8ISIDwDw/1lYWPAbGCOupk2b4k6WYLCMe9KtnZ1dhw4d4uLizORaKBNAIoj4AAAAICYhY3X0Psjn6tWr+m0AgCgQ8QEAAEAHxt2RD2AcEPEBAABAZHV60i2AEUDEBwAAAD3AVwEA0kHEBwAAAN0Y/eqZAHUdIj4AAAAYBFwSAIgFER8AAAB0ho58AEOGiA8AAAAAYFQQ8QEAAIAPIatnYq4tgKQQ8QEAAEAqGKsDoBeI+AAAAMCTiLfBwpUAgIgQ8QEAAEBC6MgHkB8iPgAAAACAUUHEBwAAAP54rJ6JubYAUkPEBwAAAAAwKoj4AAAAIIjwSbcYrA8gLkR8AAAAkBwm3QLICREfAAAAhBJx9UwAEA4RHwAAAOSAjnwA2SDiAwAAgHzQ2Q8gA0R8AAAAEAHH1TPlaQyAiUPEBwAAAH3C6B0A0SHiAwAAgDgw6RbAQCDiAwAAAAAYFUR8AAAAEA068nmrrq7OzMx88ODBw4cPH/wvRk1nZ+eW6ri7u1taWuql8WBoEPEBAAAA9G/w4MEnTpzgUvP58+d3FBjlw4YNO3TokARNg7oHER8AAADEpFNHPubaKgn/VeCXCUqI+AAAAAD69/vvv+u7CWA8EPEBAAAAAIwKIj4AAACIDJNuAfQLER8AAAAAwKgg4gMAAID4uHTkY3oogEQQ8QEAAAAAjAoiPgAAAEgCI/IB9AURHwAAAADAqCDiAwAAgFRYOvIxEB9AOoj4AAAAICG1KR/5HkBSiPgAAAAgLQR6AJkh4gMAAAAAGBVEfAAAAAAAo4KIDwAAAABgVBDxAQAAAACMCiI+AAAAAIBRQcQHAAAAADAqiPgAAAAAAEYFER8AAAAAwKgg4gMAAAAAGBVEfAAAAAAAo4KIDwAAAABgVBDxAQAAAACMCiI+AAAAAIBRQcQHAAAAADAqiPgAAAAAAEYFER8AAAAAwKgg4gMAAAAAGBVEfAAAAAAAo4KIDwAAAABgVP4fAGjH2QBkMEMAAAAASUVORK5CYII=)
| №1 и №3
| 25
| 40
| 47,2 > 10 м
| №2 и №3
| 10
| 10
| 14,1 > 10 м
| где А - коэффициент, зависящий от температурной стратификации атмосферы.
Для территории от 500 с.ш. до 520 с.ш.(Саратовская обл.)
|
|
|
| А=
| 180
| Мi - масса i-вещества, выбрасываемого в атмосферу в единицу времени, г/с
| F - коэффициент, учитывающий скорость оседания вредных веществ в атмосферном воздухе
|
| Fгаз.=
| 1
|
|
|
| FКПД>90%=
| 2
|
|
|
| FКПД>75%-90%=
| 2,5
|
|
|
| FКПД<75%=
| 3
|
|
| Н - высота источника над уровнем земли;
| V1 - расход газовоздушной смеси, м3/с
| ∆Т - разность между температурой выбрасываемой газовоздушной смеси и температурой окружающего атмосферного воздуха
|
|
| ∆Тср.=
| 20,6
| 0С
| η - коэффициент, учитывающий влияние рельефа местности;
|
|
| η<50 м/км=
| 1
|
| m,n - коэффициенты, учитывающие условия выхода газовоздушной смеси из устья источника выброса, определяются в зависимости от параметров f,vм:
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
| f1=
| 0,537
| 50> | |