Cho đồ thị hàm số y=f(x). Diện tích S của hình phẳ...
Câu hỏi: Cho đồ thị hàm số y=f(x). Diện tích S của hình phẳng thuộc phần tô đậm trong hình vẽ bên là: ![](data:image/png;base64,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)
A. \(S = \int\limits_{ - 3}^0 {f(x)dx} - \int\limits_0^4 {f(x)dx} \)
B. \(S = \int\limits_{ - 3}^0 {f(x)dx} + \int\limits_0^4 {f(x)dx} \)
C. \(S = \int\limits_0^{ - 3} {f(x)dx} + \int\limits_0^4 {f(x)dx} \)
D. \(S = \int\limits_{ - 3}^4 {f(x)dx} \)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK2 môn Toán 12 Trường THPT An Phước - Ninh Thuận năm học 2017 - 2018