1 Вариант
| 2 Вариант
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1. По графику зав-ти скорости движения тела от времени построить графики зависимости ах(t),
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)
| 1. По графику зав-ти скорости движения тела от времени построить графики зависимости ах(t),
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)
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2. Автомобиль при разгоне за 10 секунд приобретает скорость 54 км/ч. Определить ускорение автомобиля.
| 2. Вагонетка движется из состояния покоя с ускорением 0,25 м/с2. Какую скорость будет иметь вагонетка через 2 минуты от начала движения?
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3. Пуля в стволе автомата движется с ускорением 616 м/с2. Какова скорость вылета пули, если длина ствола 41,5 см?
| 3. Шарик. скатываясь по наклонному желобу из состояния покоя, за 1 с прошел путь 10см. Какой путь он пройдет за 3с.
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4. Движение тела задано уравнением (м). Какой будет его скорость через промежуток времени 5 с после начала отсчета времени?
| 4. Движение тела задано уравнением (м). Определите путь, пройденный за промежуток времени 10 с.
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5. Уклон длиной 100 м лыжник прошел за 20с, двигаясь с ускорением 0,3 м/с2 . Какова скорость лыжника в начале и конце уклона?
| 5. Самолет при отрыве от земли имеет скорость 240 км/ч и пробегает по бетонированной дорожке расстояние 790 м. Сколько времени продолжался разбег и с каким ускорением?
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