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Консультация № 201773
25.11.2021, 20:38
0.00 руб.
0
2
1
Здравствуйте, уважаемые эксперты! Прошу вас ответить на следующий вопрос:
Известно, что (sin3x)/((2cos2x+1)sin2y)=1/5+cos^2(x-2y) и (cos3x)/((1-2cos2x)cos2y)=4/5+sin^2(x-2y). Найдите все возможные значения выражения cos(x-6y), если известно, что их не менее двух.
Известно, что (sin3x)/((2cos2x+1)sin2y)=1/5+cos^2(x-2y) и (cos3x)/((1-2cos2x)cos2y)=4/5+sin^2(x-2y). Найдите все возможные значения выражения cos(x-6y), если известно, что их не менее двух.
Обсуждение
29.11.2021, 19:53
общий
это ответ
Здравствуйте, Виталий Кочманюк!
Как условие, так и решение Вашей задачи приводятся здесь: Ссылка >>. Кроме того, я повторил решение в прикреплённых файлах.
Вряд ли кто-то экспертов взялся бы за столь трудоёмкое решение олимпиадной задачи. Имейте, пожалуйста, это в виду, задавая вопросы на нашем портале. Здесь теперь нет профессиональных математиков, увы и ах...
Как условие, так и решение Вашей задачи приводятся здесь: Ссылка >>. Кроме того, я повторил решение в прикреплённых файлах.
Вряд ли кто-то экспертов взялся бы за столь трудоёмкое решение олимпиадной задачи. Имейте, пожалуйста, это в виду, задавая вопросы на нашем портале. Здесь теперь нет профессиональных математиков, увы и ах...
Прикрепленные файлы:
5
Спасибо, я уже решил эту задачку)
Об авторе:
Facta loquuntur.
Facta loquuntur.
29.11.2021, 20:28
общий
Адресаты:
Виталий Кочманюк Спасибо, я уже решил эту задачку)
Я рад за Вас! Так поступайте и впредь. Если не можете удержаться от соблазна получить чужое решение задачи, то сообщайте, что решение уже не требуется, и просите модераторов удалять созданные Вами консультации, на вопросы которых Вы не получили откликов в мини-форумах...
Кстати, это не "задачка", а олимпиадная задача, которую могут решить немногие.
Об авторе:
Facta loquuntur.
Facta loquuntur.
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