Biểu thức nào dưới đây không có nghĩa? (1 - căn bậc hai của 2
Câu hỏi:
Biểu thức nào dưới đây không có nghĩa?
A. (1−√2)−3
B. (2−√2)0
C. (3−2√2)3−2√2
D. (−32)π
Trả lời:
![](data:image/png;base64,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)
Xem thêm bài tập Toán có lời giải hay khác:
Câu 4:
Viết các số sau theo thứ tự tăng dần a=13.8;b=2−1;c=(12)−3
Xem lời giải »
Câu 5:
Tìm biểu thức không có nghĩa trong các biểu thức sau:
Xem lời giải »