Cho hàm số \(y = f\left( x \right)\) liên tục trên...
Câu hỏi: Cho hàm số \(y = f\left( x \right)\) liên tục trên đoạn \(\left[ { - 1;4} \right]\) và có đồ thị hàm số \(y = f'\left( x \right)\) như hình bên. Hỏi hàm số \(g\left( x \right) = f\left( {{x^2} + 1} \right)\) nghịch biến trên khoảng nào trong các khoảng sau?![Description: 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)
A. \(\left( { - 1;1} \right)\)
B. \(\left( { 0;1} \right)\)
C. \(\left( {1;4} \right)\)
D. \(\left( {\sqrt 3 ;4} \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Thái Bình lần 2