Здравствуйте, у 9-х классов по физике (2 волна) в задаче Ф 9.6 в условии две опечатки-у плотности меди и воды стоят индексы плотности пробки(пр).
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)
Здравствуйте, у 9-х классов по физике (2 волна) в задаче Ф 9.6 в условии две опечатки-у плотности меди и воды стоят индексы плотности пробки(пр).
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)