Khi nhỏ từ từ đến dư dung dịch HCl vào dung dịch h...
Câu hỏi: Khi nhỏ từ từ đến dư dung dịch HCl vào dung dịch hỗn hợp gồm a mol Ba(OH)2 và b mol Ba(AlO2)2, kết quả thí nghiệm được biểu diễn trên đồ thị sau:![](data:image/png;base64,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)
A. 2 : 3.
B. 1 : 2.
C. 1 : 3.
D. 2 : 1.
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi tham khảo THPT QG 2018 môn Hóa Học lần 5