Giả sử hàm số y= f(x) có đạo hàm là hàm số y= f'(x...
Câu hỏi: Giả sử hàm số y= f(x) có đạo hàm là hàm số y= f'(x) có đồ thị được cho như hình vẽ dưới đây và \(f\left( 0 \right) + f\left( 1 \right) - 2f\left( 2 \right) = f\left( 4 \right) - f\left( 3 \right).\) Tìm giá trị nhỏ nhất m của hàm số y = f(x) trên [0;4].![](data:image/png;base64,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)
A. m = f(4)
B. m = f(0)
C. m = f(2)
D. m = f(1)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 Trường THPT Trần Nguyên Hãn - Hải Phòng