, у якого Знайдіть якщо см. 8
| Відомо, що і Знайдіть 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)
| 9
| З пункту А у пункт В виїхав мотоцикліст, одночасно назустріч йому з пункту В вирушив велосипедист. Відомо, що мотоцикліст рухається у 4 рази швидше за велосипедиста. Скільки відсотків шляху від В до А залишиться здолати велосипедисту, коли мотоцикліст прибуде до пункту В?
| 10
| На дошці записані натуральні числа від 1 до 11. Учень витирає будь-які два з цих чисел, а замість них записує їх суму, зменшену на 2. Цю процедуру учень повторює, аж поки на дошці не залишиться одне число. Яке це число?
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