, у якого Знайдіть якщо см. 8
| Відомо, що і Знайдіть ![](data:image/png;base64,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)
| 9
| Дві однакові цистерни одночасно почали заповнювати водою. Відомо, що перша цистерна заповнюється в 4 рази швидше за другу. На скільки відсотків буде заповнена друга цистерна, коли перша заповниться повністю?
| 10
| На дошці записані натуральні числа від 1 до 11. Учень витирає будь-які два з цих чисел, а замість них записує їх суму, збільшену на 3. Цю процедуру учень повторює, аж поки на дошці не залишиться одне число. Яке це число?
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