Nhỏ từ từ dung dịch Ba(OH)2 đến dư vào...
Câu hỏi: Nhỏ từ từ dung dịch Ba(OH)2 đến dư vào dung dịch chứa a mol Na2SO4 và b mol Al2(SO4)3. Lượng kết tủa tạo ra được biểu diễn bằng đồ thị bên. Giá trị của a là![](data:image/png;base64,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)
A 0,03.
B 0,06.
C 0,08.
D 0,30.
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT Quốc Gia môn Hóa trường THPT chuyên Phan Bội Châu - Nghệ An - Lần 1 - Năm 2018 (Có lời giải chi tiết)