Cho hàm số y=f(x) liên tục trên Rvà có đồ thị như...
Câu hỏi: Cho hàm số y=f(x) liên tục trên Rvà có đồ thị như hình vẽ bên. Hình phẳng được đánh dấu trong hình bên có diện tích là![](data:image/png;base64,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)
A. \(\int\limits_a^b {f\left( x \right)dx} - \int\limits_b^c {f\left( x \right)dx} \)
B. \(\int\limits_a^b {f\left( x \right)dx} + \int\limits_b^c {f\left( x \right)dx} \)
C. \( - \int\limits_a^b {f\left( x \right)dx} + \int\limits_b^c {f\left( x \right)dx} \)
D. \(\int\limits_a^b {f\left( x \right)dx} - \int\limits_c^b {f\left( x \right)dx} \)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPTQG năm 2018 môn Toán Chuyên ĐH Sư Phạm Hà Nội