Cho đồ thị \(y=f(x)\) như hình vẽ sau đây. Biết rằ...
Câu hỏi: Cho đồ thị \(y=f(x)\) như hình vẽ sau đây. Biết rằng \(\int\limits_{ - 2}^1 {f\left( x \right)dx} = a\) và \(\int\limits_1^2 {f\left( x \right)dx} = b\). Tính diện tích S của phần hình phẳng được tô đậm.![](data:image/png;base64,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)
A. \(S=b-a\)
B. \(S=-a-b\)
C. \(S=a-b\)
D. \(S=a+b\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Bạc Liêu lần 2