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TỔNG HỢP CÁC LOẠI TƠ, POLIME THÔNG DỤNG TRONG ÔN THI ĐẠI HỌC VÀ PHÂN LOẠI

TỔNG HỢP CÁC LOẠI TƠ, POLIME THÔNG DỤNG TRONG ÔN THI ĐẠI HỌC VÀ PHÂN LOẠI

... ố a. polime thi n nhiên: Là nh ng polime có s n trong t nhiên nhữ ẵ ự ư poli saccarit :+)tinh b t(amiloz ,amilopectin) +)xenlulozo→ ộ ơ protein: +t t m +.lông c u(len)→ ơ ằ ừ cao su thi n nhiên ... trúc.ạ ấ a. polime không phân nhánh PE, cao su buna→ xenlulozo→ amiloz→ ơ h t→ ọ ơ b. polime phân nhánh. amilopectin→ glicozen(tinh b t ng v t)→ ộ độ ậ c. polime m ng không gian.ạ cao su ... i u hoà: các m t xích lk v i nhau theo m t tr t t nh t nh→ đ ề ắ ớ ộ ậ ự ấ đị polime không i u hoà: không theo tr t t x ch u- uôi ch uôi- u→ đ ề ậ ự đ ỗ đ ầ đ ỗ đ đầ . 4. phân lo i theo tính...

Ngày tải lên: 18/05/2014, 03:35

3 73,1K 3,7K
Tìm hiểu công nghệ SharePoint và xây dựng website khoa CNTT đại học SPKT Hồ Chí Minh

Tìm hiểu công nghệ SharePoint và xây dựng website khoa CNTT đại học SPKT Hồ Chí Minh

... 2007 CHƯƠNG 1: GIỚI THI U CÁC KHÁI NIỆM VỀ SHAREPOINT 1.1 Giới thi u chung về SharePoint Máy tính là công cụ không thể thi u trong kinh doanh, thông tin là phần không thể thi u được tạo ra và ... hành chính hàng năm; xây dựng hệ thống thông tin kinh doanh tiếp thị phục vụ việc thu thập, xử lý thông tin nội bộ, thông tin thị trường, đối thủ cạnh tranh, báo cáo thông kê, giúp lãnh đạo ... nó. SharePoint là công cụ giúp chúng ta xây dựng các ứng dụng trong kinh doanh để lưu trữ, chia sẻ quản lý và bảo vệ thông tin. SharePoint là công nghệ trong “gia đình” công nghệ của Microsoft....

Ngày tải lên: 17/06/2014, 17:59

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Bài 1: Nội dung chương trình ôn thi Đại học

Bài 1: Nội dung chương trình ôn thi Đại học

... vật chính - Nhân vật chính diện - Dòng văn học - Dòng ý thức B. Kiến thức văn học sử và các tác phẩm văn học I. Phần văn học tr ớc cách mạng 1. Văn học lÃng mạn a) Thơ lÃng mạn - Xuân Diệu ... bao gồm các mặt triết học, mĩ học, tâm lí xà hội, thị hiếu, phong cách, ngôn ngữ nghệ thuật ctst là biểu hiện rực rỡ của các phạm trù cái chủ quan, cái cá biệt, cái không lặp lại của tài năng ... với 2 nội dung cơ bản (dạng nghị luận xà hội và nghị luận văn học) - Dạng bài hành chính công vụ (đơn từ, biên bản) * Khi kiểm tra thi cử ngoài hình thức vấn đáp, phần lớn sử dụng hình thức viết...

Ngày tải lên: 05/07/2013, 01:26

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Bài tập vô cơ dùng ôn thi đại học

Bài tập vô cơ dùng ôn thi đại học

... chất vào ddA thu được kết tủa B và dd C . Tách kết tủa B khỏi dd C. Nung B ngoài không khí đén khối lượng không đổi. tính khối lượng chất rắn thu được: A 5,4 gam B 6,4 gam C 9,6 gam D kết quả ... nước cứng vĩnh cữu, nước cứng toàn phần( cả nước cứng vĩnh cửu và tạm thời). Những điều kiện cần thi t có đủ và dùng thêm những hóa chất nào sau đây: A dd xà phòng, Na 2 CO 3 B ddNa 2 CO 3 , BaCl 2 C ... (đktc) . Cho B tác dụng với 200 ml dd HCl được kết tủa D . Nung D ở nhiệt độ cao đến khối lượng không đổi thu được 3,57 gam rắn. Nồng độ của dd HCl trong dd thu được là: A 0,2M hoặc 0,5M B 0,5M...

Ngày tải lên: 06/07/2013, 01:27

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Tài liệu ÔN THI ĐẠI HỌC BÀI TÂY TIẾN - QUANG DŨNG (Phân tích bài thơ Tây Tiến) pot

Tài liệu ÔN THI ĐẠI HỌC BÀI TÂY TIẾN - QUANG DŨNG (Phân tích bài thơ Tây Tiến) pot

... Hữu khi nhớ về Việt Bắc cũng từng viết về đêm liên hoan: “Nhớ sao lớp học i tờ/ Đồng khuya đuốc sáng những ÔN THI ĐẠI HỌC BÀI TÂY TIẾN - QUANG DŨNG (Phân tích bài thơ Tây Tiến) Phân tích ... Quang Dũng một hình ảnh khó phai nhoà Thi n nhiên Tây Bắc vốn nổi tiếng với con sông Mã, một dòng sông đã chứa trong nó biết bao dữ dội. Nhưng ở đây, dòng sông Mã đã hiện lên với sự nhẹ nhàng ... Chính trang phục truyền thống đậm đà bản sắc văn hóa của các thi u nữ Tây Bắc càng tôn vinh lên vẻ đẹp của họ. Quang Dũng không khỏi không thán phục đến ngạc nhiên tr*ước vẻ đẹp ấy. Em trở thành...

Ngày tải lên: 24/02/2014, 12:20

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Tính đơn điệu của hàm số

Tính đơn điệu của hàm số

... kỳ, đồ thị (C m ) luôn luôn có điểm cực đại, điểm cực tiểu và khoảng cách giữa hai điểm đó bằng 20 Baøi 9: Cho haøm soá mx mxx y + ++ = 1 2 . Tìm m sao cho hàm số đạt cực đại tại x = -1 Bài ... mxmm=− + + − + − Vieát phöông trình đường thẳng đi qua hai điểm cực trị của đồ thò haøm soá . Baøi 16: Cho haøm soá 2 1 x mx y x + = − Tìm m để hàm số có cực đại ,cực tiểu . Với giá trị ... )1 2 (2)14 2 ( 2 )1(2 3 +−+−+−+= mxmmxmxy cực đại, cực tiểu tại hai điểm x 1 , x 2 thỏa mãn điều kiện ) 2 1 ( 2 1 2 1 1 1 xx xx +=+ Bài 3: Cho hàm số 1 2 2 − −+ = mx mxx y . Xác định m để hàm số có cực đại, cực tiểu ...

Ngày tải lên: 05/04/2014, 00:38

11 592 0
Khám phá ứng dụng của cực và đối cực ôn thi đại học môn Toán

Khám phá ứng dụng của cực và đối cực ôn thi đại học môn Toán

... ABC.Kẻ PH,PK lần lượt vuông góc với AB,AC ;kẻ QM,QN lần lượt vuông góc với AB,AC.Giả sử HK cắt MN ở S.Khi đó AS có vuông góc với PQ hay không? Thật tuyệt vời là chúng vẫn vuông góc với nhau!!! ... qua B,C tương ứng vuông góc với d1,d2 cắt nhau tại D. Đường thẳng qua B vuông góc với AB cắt d1 tại E.Đường thẳng qua C vuông góc với AC cắt d2 tại F. Chứng minh rằng AD vuông góc với EF (Bài ... M,N .Đường thẳng qua M vuông góc với BM cắt đường thẳng qua N vuông góc với CN tại S. Chứng minh rằng SO vuông góc với EF. Giải: IV/MỘT SỐ CÁCH XÁC ĐỊNH CỰC THÔNG DỤNG Điều này dành...

Ngày tải lên: 21/04/2014, 15:03

16 676 0
Ôn thi đại học môn hóa   kim loại tác dụng với dung dịch muối

Ôn thi đại học môn hóa kim loại tác dụng với dung dịch muối

... đề ôn thi đại học Truonghocso.com Page 1 DẠNG : KIM LOẠI TÁC DỤNG VỚI CÁC DUNG DỊCH MUỐI I. Phương pháp giải chung - Với loại bài toán này thì đều có thể vận dụng cả 2 phương pháp đại ... đề ôn thi đại học Truonghocso.com Page 3 Câu 5: Nhúng một lá sắt nặng 8gam vào 500 ml dung dịch CuSO 4 2M. Sau một thời gian lấy lá sắt ra cân lại nặng 8,8gam xem thể tích dung dịch không ... tủa. Biết B không tác dụng được HCl. Nồng đọ mol các chất trong dung dịch muối là? A. AgNO 3 =0,02M và Cu(NO 3 ) 2 =0,01M B. AgNO 3 =0,2M và Cu(NO 3 ) 2 =0,1M Chuyên đề ôn thi đại học Truonghocso.com...

Ngày tải lên: 02/05/2014, 05:44

11 1,2K 1
Hướng dẫn học sinh giải toán phần kim loại tác dụng với nước và dung dịch bazơ trong ôn thi đại học

Hướng dẫn học sinh giải toán phần kim loại tác dụng với nước và dung dịch bazơ trong ôn thi đại học

... học sinh giải được Tỷ lệ học sinh lúng túng Tỷ lệ học sinh không giải được 60% 15% 20% C/ KẾT LUẬN: Thông qua việc giảng dạy ở lớp 12A 1 năm 2012 - 2013 và trong quá trình ôn luyện đại học ... TÀI HƯỚNG DẪN HỌC SINH GIẢI TOÁN PHẦN KIM LOẠI TÁC DỤNG VỚI NƯỚC VÀ DUNG DỊCH BAZƠ TRONG ÔN THI ĐẠI HỌC Người thực hiện: Lê Văn Hùng Chức vụ: TTCM SKKN thuộc lĩnh mực (môn): Hoá học THANH HOÁ ... KHẢO 1. HƯỚNG DẪN GIẢI NHANH BÀI TẬP HOÁ HỌC - TẬP III Cao Cự Giác Nhà xuất bản Đại học Quốc gia Hà nội 2. Tuyển tập bài giảng HOÁ HỌC VÔ CƠ Cao Cự Giác NXB ĐẠI HỌC SƯ PHẠM 3. Chuyên đề cơ bản HOÁ...

Ngày tải lên: 22/05/2014, 12:54

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tài liệu ôn thi đại học môn toán tham khảo bồi dưỡng thi Tích phân và ứng dụng tóm tắt sách giáo khoa

tài liệu ôn thi đại học môn toán tham khảo bồi dưỡng thi Tích phân và ứng dụng tóm tắt sách giáo khoa

... phân đơn giản có công thửực trong baỷng nguyeõn haứm cụ baỷn ã Caựch phaõn tích : Dùng biến đổi đại số như mũ, lũy thừa, các hằng đẳng thức và biến đổi lượng giác bằng các công thức lượng giác ... hiện: Bước 1: Đặt )( )(' )(' )( xvv dxxudu dxxvdv xuu = = ⇒ = = Bước 2: Thay vào công thức tích phân từng từng phần : [] ∫∫ −= b a b a b a vduvuudv . Bước 3: Tính [ và ] b a vu. ∫ b a vdu ... F(x) là một nguyên hàm của hàm số f(x) thì: [] () () () () b b a a f xdx Fx Fb Fa==− ∫ ( Công thức NewTon - Leiptnitz) 2. Các tính chất cuỷa tớch phaõn: ã Tớnh chaỏt 1: Neỏu haứm soỏ...

Ngày tải lên: 08/06/2014, 09:10

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ÔN THI ĐẠI HỌC TOÁN CHUYÊN ĐỀ 13 ỨNG DỤNG CỦA ĐẠO HÀM

ÔN THI ĐẠI HỌC TOÁN CHUYÊN ĐỀ 13 ỨNG DỤNG CỦA ĐẠO HÀM

... đ i ể m I thu ộ c (C) sao cho tam giác IAB vuông t ạ i I. Chuyên đề LTĐH Huỳnh Chí Hào – boxmath.vn 133 CÁC BÀI TOÁN THI ĐẠI HỌC Bài 1: (B-2013) Bài 2: (A-2012) ... ? →−∞ = và x lim y ? →+∞ = (Chỉ nêu kết quả không cần giải thích chi tit) ã d) Bng bin thi n: x - ? + ∞ y' ? y ? (Bảng biến thi n phải đầy đủ mọi chi tiết) 3) Đồ thị: ... – boxmath.vn 132 Chuyên đề LTĐH Huỳnh Chí Hào – boxmath.vn 162 LUYỆN GIẢI ĐỀ THI ĐẠI HỌC Bài 1: (A-2013) Bài 2: (B-2013) Bài 3: (D-2013) Bài 4: Bài 5: Bài 6: Bài...

Ngày tải lên: 08/06/2014, 20:24

38 688 3
Sử dụng máy tính casio hiệu quả ôn thi đại học (cho các bài Toán, Lý, Hóa THPT) doc

Sử dụng máy tính casio hiệu quả ôn thi đại học (cho các bài Toán, Lý, Hóa THPT) doc

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...

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