Hình phẳng (H) được giới hạn bởi đồ thị (...
Câu hỏi: Hình phẳng (H) được giới hạn bởi đồ thị (C) của hàm số đa thức bậc ba và parabol (P) có trục đối xứng vuông góc với trục hoành. Phần tô đậm như hình vẽ có diện tích bằng![](data:image/jpeg;base64,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)
A \(\dfrac{{37}}{{12}}\)
B \(\dfrac{{7}}{{12}}\)
C \(\dfrac{{11}}{{12}}\)
D \(\dfrac{{5}}{{12}}\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 - Thầy Chí - Đề số 5