Cho đồ thị hàm số y = f(x). Diện tích S của hình p...
Câu hỏi: Cho đồ thị hàm số y = f(x). Diện tích S của hình phẳng (phần tô đậm trong hình dưới) là:![](data:image/png;base64,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)
A. \(S = \int_0^{ - 2} {f\left( x \right)dx + \int_0^3 {f\left( x \right)dx} } \)
B. \(S = \int_{ - 2}^3 {f\left( x \right)dx} \)
C. \(S = \int_{ - 2}^0 {f\left( x \right)dx + \int_0^3 {f\left( x \right)dx} } \)
D. \(S = \int_{ - 2}^0 {f\left( x \right)dx + \int_3^0 {f\left( x \right)dx} } \)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK2 môn Toán 12 Trường THPT Trần Đại Nghĩa - ĐắkLắk năm học 2017 - 2018