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Блок 1. Общие сведения о геодезии - 30 вопросов
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1
| Какое направление в любой точке Земли является объективно существующим и обнаруживается без специальных приборов?
| 1. Направление на географический полюс Земли 2. Направление на Москву
3. Направление силы тяжести
4. Направление на магнитный полюс Земли
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2
| Поверхность, во всех своих точках перпендикулярная направлению силы тяжести, называется
| 1. Архимедова поверхность
2. Астрономическая поверхность
3. Наклонная поверхность
4. Уровенная поверхность
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3
| Какие модели поверхности Земли не применяются в геодезии?
| 1. Модель поверхности сферы
2. Модель поверхности эллипсоида
3. Модель плоскости
4. Модель поверхности ленты Мёбиуса
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4
| Поверхностью какого тела является основная уровенная поверхность?
| 1. Геоида
2. Эллипсоида
3. Шара
4. Квазигеоида
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5
| Сколько уровенных поверхностей можно провести через одну точку ?
| 1. Одну
2. Две
3. Три
4. Сколько угодно
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6
| Выберите значение большой полуоси референц- эллипсоида Красовского
| 1. 6 000 000 м
2. 6 378 245 м
3. 6 356 863 м
4. 6 378 137 м
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7
| Назвать советского учёного, именем которого назван референц-эллипсоид, применяемый в России с 1946 года
| 1. Молоденский
2. Изотов
3. Юркина
4. Красовский
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8
| Угол между отвесной линией точки и плоскостью экватора, называется
| 1. Астрономическая широта точки
2. Астрономическая долгота точки
3. Астрономическая вертикаль точки
4. Геодезическая широта точки
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9
| Плоскость, проведённая через ось вращения Земли и точку местности, называется
| 1. Плоскостью параллели точки
2. Плоскостью горизонта точки
3. Плоскостью меридиана точки
4. Плоскостью вертикала точки
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10
| Укажите значение широты северного географического полюса Земли
| 1. 450 с.ш.
2. 600 с.ш.
3. 900 с.ш.
4. 00 с.ш.
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11
| Где проходит начальный меридиан для счёта долгот?
| 1. Через Москву
2. Через Пулково вблизи Санкт-Петербурга
3. Через Гринвич вблизи Лондона
4. Через Берингов пролив
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12
| Как называется линия пересечения плоскости горизонта и плоскости меридиана данной точки?
| 1. Линия параллели
2. Полуденная линия
3. Линия Коперника
4. Локсодромия
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13
| Угол между нормалью к поверхности эллипсоида и плоскостью экватора называется
| 1. Астрономическая широта точки
2. Геодезическая долгота точки
3. Геодезическая вертикаль точки
4. Геодезическая широта точки
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14
| Угол между отвесной линией и нормалью к поверхности эллипсоида в данной точке называется
| 1. Уклонение отвесной линии
2. Угол сближения меридианов
3. Угол прецессии
4. Угол сближения параллелей
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15
| При каких размерах участка поверхности эллипсоида его можно считать плоским с ошибкой расстояний не более 1:1 000 000?
| 1. 20 км на 20 км
2. 75 км на 75 км
3. 100 км на 100 км
4. 50 км на 50 км
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16
| Указать максимальную величину несовпадения по высоте геоида и квазигеоида
| 1. 2 м
2. 20 м
3. 10 м
4. 100 м
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17
| Линия перемены даты в большей своей части проходит по меридиану с долготой
| 00 2700 1800 900
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18
| Какова долгота меридиана, проходящего через центральные районы Санкт-Петербурга?
| 1. 40 градусов восточной долготы
2. 20 градусов восточной долготы
3. 30 градусов восточной долготы
4. 10 градусов восточной долготы
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19
| Какова широта параллели, проходящей через центральные районы Санкт-Петербурга?
| 1. 40 градусов северной широты
2. 60 градусов северной широты
3. 90 градусов северной широты
4. 70 градусов северной широты
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20
| На какой поверхности задаются астрономические координаты?
| 1. на плоскости
2. на поверхности сферы
3. на поверхности эллипсоида вращения
4. на поверхности геоида
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21
| На какой поверхности задаются геодезические координаты?
| 1. на плоскости
2. на поверхности сферы
3. на поверхности эллипсоида вращения
4. на поверхности геоида
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22
| На какой поверхности задаются прямоугольные координаты Гаусса?
| 1. на плоскости проекции Гаусса
2. на поверхности сферы
3. на поверхности эллипсоида вращения
4. на поверхности геоида
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23
| Как называется проекция, у которой линии проектирования перпендикулярны плоскости проекции?
| 1. ортогональная
2. центральная
3. горизонтальная
4. вертикальная
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24
| Проекция, у которой проектирование выполняется линиями, исходящими из одной точки, называется
| 1. ортогональная
2. центральная
3. горизонтальная
4. вертикальная
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25
| В левой прямоугольной системе координат движение от оси 0X к
оси 0Y происходит
| 1. против часовой стрелки
2. по часовой стрелке
3. параллельно оси 0X
4. параллельно оси 0Y
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26
| В правой прямоугольной системе координат движение от оси 0X к
оси 0Y происходит
| 1. против часовой стрелки
2. по часовой стрелке
3. параллельно оси 0X
4. параллельно оси 0Y
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27
| Какую размерность имеют координаты в полярной системе координат?
| 1. обе координаты угловые
2. обе координаты имеют линейную размерность
3. одна координата – угловая, другая - линейная
4. произвольную - по желанию исполнителя
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28
| Какую широту имеет точка пересечения земного экватора и Гринвичского меридиана?
| 1. 0 градусов
2. 60 градусов северной широты
3. 60 градусов южной широты
4. 10 градусов южной широты
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29
| Какую долготу имеет точка пересечения земного экватора и Гринвичского меридиана?
| 1. 10 градусов восточной долготы
2. 30 градусов восточной долготы
3. 30 градусов западной долготы
4. 0 градусов
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30
| Как называется проекция, в которой проектирование выполняют на модельную поверхность отвесными линиями?
| 1. ортогональная
2. центральная
3. горизонтальная
4. вертикальная
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Блок 2. Проекции и ориентирование линий - 30 вопросов
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31
| Проекция линии местности на горизонтальную плоскость, проходящую через точку начала линии, называется
| 1. промежуточная проекция линии
2. приведённая длина линии
3. горизонтальное проложение линии
4. горизонтальная проекция линии
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32
| Выберите формулу для подсчёта относительного искажения длины линии D при замене участка сферы плоскостью
| 1.
2. 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BpDCzxV6Jfvnzp6+ur22CYqCao9fb2Hjt2rOhPCmKJ2zMAaiTPAwICaAaUlZVt2rTphx9+4HzVVSFFg5QO+jFWVlZt27blao0ODg7ky/7RRx8xFofHjx/HxMTQf2LKIPUGoLy8nFRz9uMjIyMl2ACIeIpcV40aNX766SdXV1dSFNg8Aj0uLo4M/vrrrwWITW9pKtpLLCwshg4dKlY8bCArQAGQxsAGryU6KyuLsvdvZ2c3fPjwMWPGdOvWjZNVCMPU1FR7Khuu+Pj4zJo1i/6eh23btgnZALCpG6Rn4/bAwQcffDB69GjNNfo00ABIQlJS0s2bN9mPv379+qlTp6T2zAUhT3WxNH78+Lp1644cOZLNHBoLFy785JNPpDwLpO6xn549e/L3iG9OICtAAZDGwIYwJdrKyqpv375kv79fv35yvEaxXbt2derU4fxtbW1tO3bsePbsWZoxd+/evXbtmmDnScQ6cBASEsKmAbh8+TLpKl1cXDgPQFKk3gAsXbq0ur8SEREhxwZAsINkGoMHDyaf1Zdffsk4sry8nAy7cuWKZEuq7taFbP5FiYQ9ZAUoANKYkxtzdY90yvp+X128lmjy6XXr1s3Hx8fLy0uat/ayxN80huSd6RsA4rfffhOsAeB1DlAaHTp0ePvtt9ms/fjx42wKCIW8qoGkG4CUlBSWd3Rp27NnT25ubsOGDfkIST/S3EYSEydOTEtLY3OPdXp6+ncqAkRVXaRZp5wmsrKyInsAIoXDFrICFABpDIz4LtEkwU6ePMnVu4mIjxsA1NhcWXTp0iVfX1+eAqAQ8cxh79692TQA586d06MBkBdJNwB6HP43Uc30vHHjRs1zmEVH4mGcgNbBwcHR0VGYeChCQ0NJp8vm+7Bs2bLAwMBGjRoJEFW16B5b+vzzz21tbUUJhiVkBSgA0hjYkGOJFgV/ZwBcXV0Zx9y+fZuntetinDrMhLcDByyv96vWxecyJd0GIDU19ciRI9pLzMzMWJ4HiY6ODgkJkcjjl2/cuMF4KaooR8jUzM3NN2zY4OnpyfjZvn79mmxQ6R8tLoqdO3dSlkj/+h9kBSgA0hjYkGOJFoww13qxmR79zp07vMehkp2d/fLlS/ox9evX5+nAQevWrdkMy8rK4mPtkiLdBkD38D9ZsnDhQjaP9b579+6vv/4qkWewSfYUuYaHh4evr29ERATjyKioqLlz50pqcv2zZ8+S/27tJbVq1Ro4cKBY8bCErAAFQBoDI5mWaIVhc2sE4045V8S6AUCtSZMmbIYJ9mmISKINQGZmZmJiovYSJyenadOmXb9+neWzfiMjIyXSAIib6yzNmzdvw4YNjAfzXr16tXnz5tmzZwsTFRu6J5f79eun3yM8hISsAAVAGgMjmZZohWHTABQWFgoQiYnYU4fVrl2bzTDBPg0RSbQBCA8Pp5wXCwoKsrS09PPzY9kAHDhwIDs729nZmZ8Aq0H6B8mIpk2bjhs3js1nGx8fL51tZEVFBaVRNJHJyWVkBSgA0hjoybdEK4yVlRXjmNLSUgEiMRG7bpibm7MZZmFhwVMA0iHFBiA3NzcmJkZ7ia2trfrm9HfffbdLly4XLlxgfBNSd9avXy+FiR0Yc93U1LRDhw7CBEMjMDCQzTbyr7/+SktLe+uttwQIidGpU6coT4m2sbHp16+fWPGwh6wABUAaAz35lmiFKS4uZhxTs2ZNASIxYXfmkL8zACwP7Qv2aYhIig3AypUrKcnq5+enmTHA39+fTQNAbNiwYeHCheK2cS9fvszOzqYf4+LiwvKcFK/c3d1dXV0Z5/Qgdu3aJZFtpO7J5YEDB7I51CEuZAUoANIYGMm0RCsPm4fiCbPLSyLJyMigH2NmZsbf17CgoIDNMFk/UIIlyTUA+fn569at015iaWk5ffp0zV+9vLxmzJjxzz//ML7V48ePk5KSRowYwX2UrIk415UevL29Fy1axDjs1KlTAgTDqKysbPfu3ZSFsji5jKwABUAaAz35lmjlIXtWjGOEmQY3PT2d8Vqjli1b8teNUG5Jr0qzZs14CkA6JNcAREVF5eXlaS8ZP3689mxQ1tbWEydOZDlfW2RkpLgNgCyukdXo06cPm23k+fPnyRe4Rg2Rk+fYsWNPnz7VXmJnZ9e7d2+x4mEPWQEKgDQGevIt0crz/PlzxjGNGzcWIBJx7wA2Uc0xw2ZY8+bN+YtBIqRV5kpKSigPbjQ1NQ0ODqYM8/X1ZdkApKSk3Lhxo127dpyFWE3y2kZ27NiRtN2ME62SAZcuXfL09BQmqqronlweMmSILG7cQVaAAiCNOSTMZPACk2+JVh42DUDLli0FiET0qcMuX77MZtg777zDXwz0BKsG0moAYmNjKTcMDR06tE2bNpRhrVu37tWrF+UxYVWJior6+eefOQuxmuS1jTQ3N+/cufPp06cZR169elXcXb03b94kJSVRFsrl5DKyAhQAaQw0ZF2ilefevXuMY3g97q4h+hkANkWAIOWCvxgkQkINAGl6wsLCKAtDQkIqHezv78+yAdi8efMPP/wg1g3djLluZWWl2+GIqFOnTmy+HixPovHn0KFDL1680F5Sv379Tz/9VKRwqgdZAQqANAYasi7RysPmKb8dO3bkPxCRDxw8fvw4NTWVcVjt2rW7dOnCUwzSIaEGICkpiXJv+CeffOLh4VHp4H79+jVt2vT+/fuMb0tq0M6dO8ePH89NlNXx4MEDSgXU5ebmxnJWWmG0aNGCzbDbt2/zHAiDHTt2UJYMGzZMUp9kVZAVoABIY6An3xKtSLdu3aIfYGNjU9XuFodI0SClg35MrVq1WrVqxVMA27ZtKysrYxzWq1cvY5irSkINwNKlSylLqjr8b6I6n+vr6/vNN9+weeeIiAhRGgDRT3XpgeWNL1lZWXxHQqOoqCg5OZmyUC4nl5EVoABIY6Ah6xKtSIyHvbt16yZAe8bmBoC33nrL1NSUj7VXVFRER0ezGent7c1HAFIjlQYgJSXl4sWL2kvc3d1JE0bzK5MmTVq8eDGbZ9dduHDhypUrwpze0iava2TVWB4kYzMNK39++eUXyrM8HB0du3fvLlY81YKsAAVAGgMNWZdo5Xnz5k16ejr9mKFDhwoQibgHDhISEm7cuME4zMnJaciQITzFIClSaQCqdfhfjRQUkrI7d+5k8/6RkZFRUVF6BqcvOW4j7ezs2Ax79eoVz4HQ0T25PGLECJ6OGXAOWQEKgDQGGrIu0cpz/vz5kpISmgEWFhbC7PKKWDfI93revHlsRgYFBRnJtWqSaABSU1Mpd/S2aNGCzfz9/v7+LBuA+Pj4sLAwzeOEhSHHbWStWrXYDGP5MG0+FBQUHDp0iLJQRieXkRWgAEhjqIrcS7TypKSk0A8ge/8s22MDiTgH6Ndff83mEWBNmjSZNm0aHwFIkCQaAN3D/8HBwWw6sG7durm5uTGe2zJRNX9xcXGkYdAzxOorKytjDKxevXpOTk7CxMOS9LeRSUlJr1+/1l7SrFmzDz74QKx4qgVZwbkZM2asXLlS+PXywd3d/cqVK2JHwQxpDDRkXaIV6eDBg/QDBNs1YvP4cD4uAdq+ffuqVavYjFyxYoW1tTXnAUiT+A1AZmZmYmKi9pIGDRpMmDCB5a+TxGXZrkVERAjZANy4cYP+pJuJ9I6QESznSxXxSZm6J5e9vLxEiUQPyApQAKQx0JB1iVaehw8fXrhwgWZAp06dunXrJkAkd+7cKSgooB/j6Ojo4ODA7XqPHTs2adIkNiNHjRo1bNgwbtcuZeJXuvDwcMpjz7766iv20/aPHTs2JCSEzVWbaWlpZ86c+fDDD/WJsvrkeIrcRPUwZjbDWB5L49yLFy+OHj1KWSijk8vIClAApDFURe4lWnkSEhIqKipoBixcuFCYSES5AzgpKcnb27u4uJhxJClZ69ev53btEidyA5CbmxsTE6O9pHbt2tU6Tm9raztmzBiWUztFRESgAaBHOXVbFfLfxHckldq9e/ebN2+0l7Rs2VKA2Yu5gqwABUAaQ1XkXqKVh37vyNPTc8CAAcJEIvANAGVlZfPnzw8LC6Pvf9SaNm26f/9+Y/vui9wArFy5ktKZTZkyxd7evlpv4ufnx7IB2LVr14oVK+rXr1+t99ePHOfJNmG9jRTrIJnuyWV5HVtCVoACII2hKnIv0QqTkpJCM/Glqakp2SMSLBgh68bJkyenTZuWlpbGZrCzszP5oFg+J0RJxGwA8vPz161bp72kRo0aM2bMqO77uLu7v//++2fPnmUcWVJSEhMTM3v27OquQg+MuU6+ex06dBAgkmqR8kGyJ0+ekG81ZaG8ti7IClAApDFUSgElWmF+/PFHmp9OmDChS5cuggUjzJnDI0eOhIaGnjhxguV48gns3btXajMWCEPMBiAqKiovL097iY+PT9OmTfV4K39/fzYNgHqlwcHBfE9IXFBQwDjhVIsWLSS4pWE5B3bdunX5jkRXYmIi5SHerq6uEjzQWBVkBSgA0hiqIvcSrTDnzp07fvx4VT8lu7zLli0TLJiSkpKMjAz6MTVq1Gjfvr0eb15aWnrx4sX9+/fv2LGDzVyfGn5+fj///LOVlZUeK1UA0RoAkg3Lly+nLNT72Pzw4cODgoKePXvGODIzM/Po0aP0zxg23NWrVxkvO5PgNbLE48eP2QwT5WSZ3E8uIyv4sFxF+PUaLaQxVEXuJVphgoODaX4aHR0tZK977do1SnOoq02bNpaWljQDyI7+69evi4qKyHc5Jyfnzp07aWlpf//99/nz56s7e6+Li0tERATfu4ISJ1oDEBsb++jRI+0lAwYM0K/5I0gDN2nSpNDQUDaDBfhfl+lNcgTlP6UqLVq04DkQqgcPHpw5c4ayUF5bF2QFKADSGCqlgBKtJAkJCX/88UdVP502bVq/fv2EjIdN3UhPTzczM+M7Ejs7u5CQkBkzZtA3G8ZAnAagvLw8LCyMspD8lxjynr6+vixv905OTialqkmTJoasjp58t5EPHz5kM4x0z3xHQrFz507Kfy75AF1dXQUOwxDIClAApDFUSgElWjHy8vJobqfs1KmT7g4Y39jUDb6pn/Lr7+9fp04dsWORBHEagKSkJMrVYB9++KGBTwokVfvzzz/XfQK5LtJ+rF+//t///rchq6Mn322kZA+SKeDkMrICFABpDJVSQIlWDLL3n5OTU+mPGjZsuHfvXuEPfrOZA5Qn1tbWZOdwwoQJ/fr1E+AMg4yI0wAsXbqUssTAw/9qpLFj0wAQGzZsWLBgAX9PfGTcRlpZWbVt25antRsiOzubzbCWLVvyHYm2O3fuXLx4kbJw1KhRQsZgOGQFKADSGHQpo0Qrw65duzZv3lzpj8h3c/fu3fpNtWIg4c8AODk59ezZs2/fvmS/H4f8KyVCA5CSkkKpFO3bt+fkcrQ+ffo4OzuzqfIPHz5MTk4eMmSI4SvV9ejRo+fPn9OPcXNzMzc352PtBrp69SrjmIYNGwpcQXSPLXXq1Ele22lkBSgA0hgqpYASrQyZmZlTpkyp9EempqaxsbGCPQtVGykaLM+/caVLly7nzp0Tco1yJEIDoHv4f86cOZzMy2lmZjZ16tSvv/6azeCIiAieGgD5niIvLi6+efMm47D3339fgGC0KeDkMrICFABpDJVSQIlWgMLCwsGDB7948aLSn65YsWL48OHCRvR/hL/+58KFC2lpaW+99ZbA65UXoRuA1NTUI0eOaC9p2rSpt7c3V+8/adKkRYsWUR5FXqljx47dunWrdevWXK1aQ77byPT0dMaJuggD79aorhs3blDKB2kXZbd1QVaAAiCNQZcySrTcVVRUjBkzpqrTXN9///20adMEDkmDTd2YMmVKZGQkm3e7fft227ZtGWd8WbNmTUREBKv4jJXQDYDu4f+ZM2daWFhw9f4NGjQgPe727dvZDI6KiuLjXnj5biNZXqUn8EEy3WNLnp6ezZo1EzIGwyErQAGQxqBLGSVa7qZPn75v375Kf/S1isDxaGPz7WP/wLhWrVr17t37119/pR8WFxe3ZMkSPNePhqANQGZmZmJiovYSe3v7yZMnc7sWf39/lg1ATEwMaYs5fwgcm7Nd0txG/v7774xjLC0tPTw8BAhGIyEhgbJEjseWkBWgAEhj0KWMEi1rZE93zZo1lf4oJCSE7OcIHA8F5wcOAgICGBuAwsLCTZs20UyHCoI2AOHh4eXl5dpLyP8i50+M//DDDzt06MDmfq/nz5+ThmTMmDEcrr2srCw9PZ1+DGl7GjduzOFKuULz2HCNnj17WltbCxCMGtnhuH79uvYSMzMzLy8vwQLgBLICFABpDLqUUaJlLTo6uqoD/GTv/6effhI4Hl1s9sfYnwEg+vbt6+LikpWVRT9s7dq1QUFBnNxiqkjCNQC5ubkxMTHaS0ip5emiNH8VNiMjIyO5bQBu3rxZXFxMP0aaR8ju3r2bmZnJOEzgu4h0Ty5/9NFHjo6OQsZgOGQFKADSGHQpo0TL17Zt26ra21mkInA8ushXr7CwkH5M06ZNq3WtDtmn9/PzmzNnDuOqDx48KPAzj2VEuAZg5cqVlI3HxIkTGzRowMe6yD49yYyCggLGkX/88cfff//N4UZLvtfIsjlCZmFhMXjwYP5j+f+UcXIZWQEKgDQGXcoo0TK1a9eu8ePHUy6sUAsNDQ0ODhY+JF3c3gCgoZ7xpaioiH7Y6tWr0QBURaAGID8/f926ddpLzMzMZs2axdPq6tSpM3bsWJY3gJNhlNgMwVOuCyA5OZlxTI8ePezs7PiP5f9cvHiRco7P3NxcjkfpkBWgAEhjoFBMiZajxMREHx8f3bmtyM5VVFQU2T8WJSpdPB04sLe3HzVqFOW6El1Hjx7NyMiQ5qMJRSdQA0DSMS8vT3uJl5eXi4sLf2v08/Nj2QDExcWRXpmrB8XJ9CDZP//8w+YhygI/2VH35DLZSNevX1/IGDiBrAAFQBoDhWJKtOyQT37s2LG6e/9WVlZkl2bYsGGiRFUpNjMH6HfgIDAwkLEBqKioWLt27cqVK/V4f8UTogEoKSlZvnw5ZSHjxVsG6tChQ9euXdnM/FBQUBAfH+/r68vJehm3kaampiQ2TtbFocTERPLfRD+mYcOGHD6xgY2dO3dSlsj05DKyAhQAaQwUiinR8rJ58+bJkyfr7v3XrVs3KSmpe/fuokRVFf4OHHTs2NHT05Pxib/k4/rhhx+4OsirJEI0ALGxsZSnQPfq1eudd97he73+/v5sGgAT1a3AnDQAhYWFjLelN2/eXIKJGBcXxziGfJ6WlpYCBKP222+/PXjwQHuJhYXF0KFDBQuAK8gKUACkMVAopkTLy9q1a7/66ivdx2A1btz40KFDUjsFV1xcfOvWLfoxJG1cXV31e//AwEDGBiA/P3/Lli0BAQH6rULBeG8AysvLdR+2FRISwvd6CVKJGjZsmJubyzjyP//5D8kh0koauMa0tDTGp9NJ7ftpopqi68yZM/RjrK2tWU6sxBXde8tI3yjHi3SRFaAASGOgUEyJlpElS5ZUOuMn2YH+9ddfnZ2dhQ+JHqkbjE/gJsHXqKHnvuiIESNmzpzJuJu3Zs0aNAC6eG8AkpKSMjIytJd4eHh88sknfK/XRPVUl0mTJrGcBDcyMtLwBkCm18iSj4hx0z5mzBghr+wkfeOuXbsoC2V6chlZAQqANAZtSirRchESEqJ7ONVE9fjq5OTkevXqCR8SI75nDrCwsJg8efIPP/xAP+zGjRtHjx797LPP9F6RIvHeACxdupSyRJjD/2pTpkwhHTPjBsBEdTDj559/NvArJMdtZFZWlu51nBTW1tbz588XJh61EydOUHp6EsOgQYOEjIEryApezZgxQzE3eLm7u1+5ckXsKCqHNAZtSirR0kfaLV9f340bN+r+aOjQoXFxcZJ9gJ0AdYN8MmQ3j/E8w+rVq9EAUPDbAKSkpFy8eFF7SevWrYcMGcLrSrU1b968X79+v/zyC+PI4uLizZs3z5w505DVyXEbyeabM2vWLPJJChOPmu7J5T59+tjY2AgZA1eQFaAASGPQpqQSLXFk58Tb2zspKUn3R0FBQcuWLZPyk24FmDu4adOmAwcO3Lt3L/2wgwcPZmVl8Tr5pOzw2wDoHv6fPXu2mZkZryul8Pf3Z9MAmKjmKp0xY4Yh3yXGXLe0tGzXrp3e78+5K1eubNq0iX5M48aN582bJ0w8aqWlpXv27KEslO/JZWQFKADSGDQUVqKl7OXLl4MGDTp16hRlOdmPWr58+bRp00SJij02c4AafuAgMDCQsQEoLy9fu3ZteHi4getSEh4bgNTU1CNHjmgvadSo0bhx4/hbY6V69+5Nej7G+StMVA+6P3HixKeffqrfih4/fvz06VP6MW5ububm5vq9P+cqKir8/PwYj5AtWbKkVq1awoSkdvjw4X/++Ud7CQmgf//+QsbAFWQFKADSGLQpqURL2cOHD/v06aPbe5NPe9u2bQMHDhQlKvZI0SClg36Mvb19kyZNDFzRJ598QupPeno6/bBNmzZ9++23+Mpr8NgA6B7+DwoKsrKy4m+NlTI1NZ06dSrLGw8iIyP1bgBkd4o8Ojr6woUL9GM+++yzMWPGCBOPhu7J5QEDBsj0S4usAAVAGoM2JZVoybp+/frnn3+enZ1NWd6wYcPk5OTOnTuLElW1CFk3AgICAgMD6ce8ePEiLi5uypQpnKxRAfhqADIzMxMTE7WX2NjYkB1xnlZHb+LEid988w3js2BMVHMWPXr0yMnJSY+1CHOqiysZGRmMTVGjRo1iY2OFiUejuLh43759lIXyPbmMrAAFQBqDhsJKtDSdPXuW9FTPnz+nLG/Xrt3BgwflciE7f88A1jVu3Lh58+bl5+fTD1uzZg0aAA2+GoDw8PDy8nLtJX5+fnXr1uVpdfQcHBy8vLzYPA6mrKxs48aNCxYs0GMtMjpI9urVq2HDhr18+ZJmjKmp6ZYtWxo2bChYVGoHDhygfIdtbW379OkjcBhcQVaAAiCNQUNhJVqC9u/f7+3tXVRURFnetWtX0nrZ29uLEpUehKwbderUIT3A2rVr6YddvXr15MmTH3/8MScrlTteGoDc3NyYmBjtJZaWlkFBQXysiyV/f382DYCJ6twx6SP1uJhVRttI0gGnpaXRjwkODu7Vq5cw8WjTPbk8aNAg4a8c4wqygm/LVcSOQuGQxqChsBItNRs2bKj09hUvL6+tW7fK63nVAkwBpC0gIICxATBRzQeKBkCNlwZg5cqVxcXF2ktIZ+bo6MjHuljy9PR85513UlNTGUfev3//4MGDAwYMqNb7l5eXX7t2jX6MnZ2d4Te7GG7+/Pnbtm2jH0P++SwfoMatV69eHThwgLJQvieXkRWgAEhj0FBYiZaaH3/8sdILEEjLGhoaKnw8hqioqGBsxU1NTTt06MDVGl1dXXv06HHixAn6Yfv37793716zZs24Wq98cd8A5Ofnr1u3TnsJ+T8m6cv5iqqLdNW+vr5sRkZERFS3Abh169br16/px0jhCNmiRYsYN35du3ZNSEgQeLZWtX379pENjPYSe3t7+R6rQ1aAAiCNQUNhJVpSpk+fvnr1aspCkqurVq3y9/cXJSRD3L59m5IqulxcXGrXrs3hSgMCAhgbgLKyMrKPR3otDtcrU9w3AFFRUXl5edpLhgwZ0rZtW85XVF2jR4+ePXs2/bWhaocPH67uAyMEPtWln2+//fa7776jH0M25MnJyWI9VlD35PLQoUNr1OD9edU8QVaAAiCNQUNhJVoiSktLv/jiC92TV1ZWVvHx8eQTFiUqA4ly3eCgQYOaNWt27949+mEbNmxYtGgRrlvj+HtbUlKiez0uyyk4+UYazXHjxq1Zs4ZxZEVFRXR0dLVOE0v8Gtni4uIpU6YwznrRvn37X3/9Vax7tUlvRtZOWSjrk8vIClAApDGoKa9ES0FRUdHw4cMPHTpEWU5ydd++fd26dRMlKsOJcuDAzMzM19eXcR6Xp0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3. 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4. 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