Cho hàm số \(f\left( x \right) = - {x^2} + 3\) và...
Câu hỏi: Cho hàm số \(f\left( x \right) = - {x^2} + 3\) và hàm số \(g\left( x \right) = {x^2} - 2x - 1\) có đồ thị như hình vẽ.![](data:image/png;base64,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)
A. \(I = \int\limits_{ - 1}^2 {\left[ {g\left( x \right) - f\left( x \right)} \right]dx} \)
B. \(I = \int\limits_{ - 1}^2 {\left[ {f\left( x \right) + g\left( x \right)} \right]} dx\)
C. \(I = \int\limits_{ - 1}^2 {\left[ {f\left( x \right) - g\left( x \right)} \right]} dx\)
D. \(I = \int\limits_{ - 1}^2 {\left[ {\left| {f\left( x \right)} \right| - \left| {g\left( x \right)} \right|} \right]} dx\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Quang Trung - Bình Phước lần 3