36 вариантов ФИПИ Ященко 2019 ВАРИАНТ 12 Задание 13
№ задачи в базе 1371
а) Решите уравнение б) Найдите все корни этого уравнения, принадлежащие отрезку
Ответ: a) ; где ; , где ; б) ;
Ключевые слова:
Задания ЕГЭ части 2 Задачи 13 с уравнениями ЕГЭ 2019 36 вариантов ФИПИ егэ 2019 математика ященко Алгебра Уравнение Показательные уравнения Тригонометрия
ФИПИ 2024 🔥
ФИПИ 2024 🔥
Примечание:
36 вариантов ФИПИ Ященко 2019 ВАРИАНТ 12 Задание 13
Графическое Решение
![а) Решите уравнение `125*625^sin(x)-30*25^sin(x)+1=0` б) Найдите все корни этого уравнения, принадлежащие отрезку `[7/2pi ; 5pi].` 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)
🔥 Оценки экспертов решений задания 13 с уравнениями ЕГЭ по математике профильного уровня. Сканы реальных работ прошлых лет
