16 phương pháp và kĩ thuật giải nhanh hóa

... Sách dành tặng học sinh phổ thông  16 Phương pháp và kĩ thuật giải nhanh hóa học  Các công thức giải nhanh trắc nghiệm hóa học 48 48 Giải : Các phản ứng có thể có 2Fe +O2 ... nO2-(oxit) = 0,3(mol)560,2 .162 056mmn0,2(mol)n21oxioxitFe(trongX)Cl=−=−=⇒=− 3 3 PHẦN I: 16 PHƯƠNG PHÁP VÀ KĨ THUẬT GIẢI NHANH BÀI TẬP TRẮC NGHIỆM HÓA HỌC ... toàn thì việc sử dụng phương pháp này càng giúp đơn giản hóa bài toán hơn. - Các bài toán giải bằng phương pháp tăng giảm khối lượng đều có thể giải được theo phương pháp bảo toàn khối lượng,...

... I: 16 PHƯƠNG PHÁP VÀ KĨ THUẬT GIẢI NHANH BÀI TẬP TRẮC NGHIỆM HểA HC 3 Phơng pháp 1: Phơng pháp bảo toàn khối lợng 4 Phơng pháp 2: Phơng pháp Bảo toàn nguyên tố 16 Phơng pháp 3: Phơng pháp ... thích hợp 160 Phơng pháp 16: Phơng pháp chọn đại lợng thích hợp 170 Phơng pháp 16+ : Phơng pháp sử dụng công thøc kinh nghiÖm 178 PHẦN II: CÁC CÔNG THỨC GIẢI NHANH TRẮC NGHIỆM HÓA HỌC 185 ... Phơng pháp 4: Phơng pháp Bảo toàn điện tích 40 Phơng pháp 5: Phơng pháp Bảo toàn electron 46 Phơng pháp 6: Phơng pháp trung bình 62 Phơng pháp 7: Phơng pháp quy đổi 77 Phơng pháp 8:...

...  16 Phương pháp và kĩ thuật giải nhanh hóa học  Các công thức giải nhanh trắc nghiệm hóa học 22 22 IV. BÀI TẬP TỰ LUYỆN Câu 1 : Hỗn hợp chất rắn X gồm 0,1 mol Fe2O3 và 0,1 ... nguyên tố - Viết phương trình hóa học ở dạng ion thu gọn 2 2 MỤC LỤC PHẦN I: 16 PHƯƠNG PHÁP VÀ KĨ THUẬT GIẢI NHANH BÀI TẬP TRẮC NGHIỆM HểA HC 3 Phơng pháp 1: Phơng pháp bảo toàn ... 46 Phơng pháp 6: Phơng pháp trung bình 62 Phơng pháp 7: Phơng pháp quy đổi 77 Phơng pháp 8: Phơng pháp đờng chéo 89 Phơng pháp 9: Phơng pháp hệ số 105 Phơng pháp 10: Phơng pháp sử dụng...

... 53,1 gam Giải: 5+N + 3e →2+N(NO) 0,9← 0,3(mol) 2 2 MỤC LỤC PHẦN I: 16 PHƯƠNG PHÁP VÀ KĨ THUẬT GIẢI NHANH BÀI TẬP TRẮC NGHIỆM HểA HC 3 Phơng pháp 1: Phơng pháp bảo toàn ... 46 Phơng pháp 6: Phơng pháp trung bình 62 Phơng pháp 7: Phơng pháp quy đổi 77 Phơng pháp 8: Phơng pháp đờng chéo 89 Phơng pháp 9: Phơng pháp hệ số 105 Phơng pháp 10: Phơng pháp sử dụng ... Phơng pháp mối quan hệ giữa các đại lợng 150 Phơng pháp 15: Phơng pháp chọn đại lợng thích hợp 160 Phơng pháp 16: Phơng pháp chọn đại lợng thích hợp 170 Phơng pháp 16+ : Phơng pháp sử...

... x=tant ta có J1= 4p thay vào thì J= ln 2ln32 4p+ + Nhn xét : Nhiu khi s thành tho ca đng nht thc giúp ta b qua nhanh bc phân tích bng Phng pháp h s bt đnh . chng ... bài toán đin hình minh ho tính u vit cho phng pháp s dng phng pháp bin đi vi phân đa v bng nguyên hàm -Mt trong nhng phng pháp c bn nht đ tính tích phân lng giác đó là ... Nhn xét chung: i bin s dng 1 là mt trong nhng phng pháp rt c bn, hc sinh thng gp trong Các k thi tt nghiêp và thi vào các trng i hc,bi nó có th phát huy ti đa t duy...

... đường quang . Phương pháp 4: thiết lập một hoặc nhiều hơn một đường quang không kết nối trực tiếp từ nguồn s và đích d và định tuyến lưu lượng vào những đường quang này và/ hoặc một vài đường quang ... các dịch vụ và các ứng dụng thời gian thực qua Internet, xác suất nghẽn mạng tăng lên đáng kể nên cần phát triển kĩ thuật thích hợp để hạn chế nghẽn. Kĩ thuật lưu lượng là một giải pháp hiệu ... từ nguồn s và đích d.Mỗi phương pháp có những điều kiện ban đầu cho các ứng dụng của nó. Thí dụ, nếu không có đường quang nào giữa nguồn và đích để hỗ trợ lưu lượng thì phương pháp 1 có thể...

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... anđêhit trong X là : A. HCHO và C2H5CHO B. HCHO và CH3CHOC. C2H3CHO và C3H5CHO D. CH3CHO và C2H5CHO ► Tỉ lệ mol anđêhit và Ag = 0,1 : 0,3 = 1:3 → HCHO và CH3CHOCâu 3. (ĐHKA ... CH3OH và C2H5OH B. CH3OH và C2H5CH2OHC. C2H5OH và C3H7CH2OH D. C2H5OH và C2H5CH2OH ► 32 < Mhh = 2.2/0,06 = 36,67 < M (loại C, D)4a + 2b = 0,22 và a + ... dung dịch NaOH 1M Công thức của hai axit là : A. HCOOH và C2H5COOH B. CH3COOH và C3H7COOHC. HCOOH và C3H7COOH D. CH3COOH và C2H5COOHChất Phản Ứng : CHCR:AnkinHCOOH:fomicAxitCHOR:hitđeAn≡−1−−▪...

... tìm phương pháp giải phù hợp. Các tài liệu tham khảo về phương pháp giải toán hóa học có nhiều, gây mất phương hướng cho học sinh trong việc vận dụng phương pháp để giải nhanh các bài toán hóa ... 08 phương pháp giải nhanh các bài toán hóa học. Nguyên tắc áp dụng để giải các bài toán, các ví dụ minh họa cho các phương pháp giải đó và các bài tập vận dụng làm thêm. Đồng thời còn dựa vào ... bài toán hóa học và các dạng bài tập hóa học. - Tuyển chọn một số phương pháp giải nhanh các bài toán hóa học và hệ thống bài toán về kim loại trong hóa học THPT, các đề thi cao đẳng và đại học...

... Các phương pháp giải phương trình nói chung, tìm ra nghiệm của phương trình Bước 3: Đối chiếu với điều kiện ban đầu để tìm ra nghiệm thỏa mãn và kết luận (xem mục kĩ năng 5 loại nghiệm và ... Vậy phương trình có ba họ nghiệm Chú ý: Ta có thể áp dụng phương pháp đối với phương trình hỗn hợp chứa các biểu thức đối xứng đối với sinx và cosx với bậc lớn hơn 2. Thí dụ 5: Giải phương ... 2008) Giải phương trình: xxxxxx cossin3cossincos3sin2233 Giải: Nhận xét 1: Đây là phương trình đẳng cấp bậc 3 nên ta giải như sau Cách 1: Thay cos 0 ,2x x k k     vào phương...

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...