đặc trưng hình học của ván khuôn thép hòa phát

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... Đặc tr-ng hình học của mặt cắt ngang Trong ch-ơng kéo nén đúng tâm, ta đà biết khả năng chịu lực của mặt cắt ngang chỉ phụ thuộc vào diện tích của mặt cắt ngang mà không phụ thuộc vào hình ... công thức xác định mô men tĩnh của hình phẳng và đồng thời cũng là công thức xác định trong tâm của hình phẳng khi biết mmô men tĩnh và diện tích. Trong tr-ờng hợp hình phẳng bao gồm các hính ... trọng tâm của hình phẳng1-Mô men tĩnh Xét 1 hình phẳng có diện tích F trên hệ trục xoy. Tại điểm K(x,y) bất kỳ, lấy xung quanh K một phân tố diện tích dF. Khi đó mô men tĩnh của hình phẳng...

... đổi hình dáng) Hình 4.10 Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 27Chơng 4. đặc trng hình học của mặt cắt ngang - Các thuyết bền A. Đặc trng hình học của ... đại lợng khác đặc trng cho hình dạng MCN về mặt hình học, đó l mômen tĩnh v mômen quán tính. II. Mômen tĩnh của mặt cắt ngang Hình phẳng F nằm trong mặt phẳng toạ độ Oxy (hình 4.2). ... viết là: Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 30 =xyxy2JtgJJ (4.11) VI. Mômen quán tính của một số mặt cắt ngang 1. Hình chữ nhật (hình 4.6) Hệ trục đối...

... tính chính trung tâm của tiết diện ghép bằng nhau. No24aaN 20o Trần Minh Tú - Nguyễn Thị Hường Bộ môn SBVL - Đại học Xây dựng 8 Chương 4 Đặc trưng hình học của tiết diện 4.1. ... Đại học Xây dựng 1 - Nếu hình bị khoét thì diện tích bị khoét mang giá trị âm. 4.1.4. Công thức chuyển trục song song Mặt cắt ngang ngang A trong hệ trục ban đầu Oxy có các đặc trưng hình ... hình học mặt cắt ngang là Sx, Sy, Ix, Iy, Ixy. Hệ trục mới O'uv có O'u//Ox, O'v//Oy và: uxb=+ ; (4.9) vya=+vuxyabyvxudAOO Các đặc trưng hình học mặt...

... thanh phụthuộc vào diện tích, hình dáng,cách sắp xếp, của mt ctngangã Cỏc i lng m ln phthuc vo hình dạng, kích thước của mặt cắt ngang - đặc trưng hình học của mặt cắt ngangFyxzyxzF ... 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Chương 4. Đặc trưng hình học của mặt cắt ngang 4.1. Khái niệm chung4.2. Mômen tĩnh và các mô men quán tính4.3. Mô men quán tính một số hình đơn giản4.4. Công thức chuyển ... trưng hình học của mặt cắt ngangFyxzyxzF University of Architechture Chương 4ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG ...

...

... tính của 1 số hình đơn giản : a) Hình chữ nhật: (Hình 5.5a) ∫ ∫+−===F/h/hxbhbdyydFyJ2232212Tương tự : 12hbJ3y= b) Hình tam giác : (Hình 5.5b)123bhJx= c) Hình ... : 4R2JJJ4pyxπ=== Hình 5.5 x y bdy h/2 y h a)b) b ydy y h Hình 5.6b)D d y x dρ ρ y xRDa) - 50 -Chương 5ĐẶC TRƯNG HÌNH HỌC CỦA MẶT CẮT NGANG5.1. Khái ... trong những đặc trưng hình học của mặt cắt được nghiên cứu sau đây:.5.2. Momen tĩnh: 5.2.1. Momen tĩnh đối với 1 trục:Định nghĩa : ∫∫==FyFxxdFS;ydFSSx , Sy là moment tĩnh của diện...

... được hình thành từ những hình đơn giản,ta chia làm những hình đơn giản FFy , FFxn1iin1iiin1iin1iiiFSyFSxxCyC • Nếu 2= thì ta cónửa hình tròn:34rx ... Mụmen tnh i với trục này bằng không CÔNG THỨC XOAY TRỤC CỦA MOMEN QUÁN TÍNH Ví dụ 2: Tìm trọng tâm của hình phẳng bênBài giải TRỌNG TÂM CỦA MỘT VẬTdWzdWzdWydWydWxdWxxzydwGxyzxzyzxyWdVVVVVVVdVzdVzdVydVydVxdVx ... • Công thúc chuyển trục song song của momen quán tính ly tâm: Ví dụ 2: Tìm trọng tâm của hình phẳng bênBài giảiCách 1:ydxdAaaydxxydxx00thay33/1bak...

... CÂU HỎI TỰ HỌC: 4.1. Các đại lượng nào được gọi là các đặc trưng hình học của diện tích phẳng? 4.2. Cách xác định trọng tâm của một hình ghép từ các hình đơn giản ? 4.3. Trên một hình phẳng, ... = yC y Hình 4.14: Xác định mô men quá tính của hình trònD=2R ρ ρ+dρ x ϕ dϕ dF O y x Hình 4.15: Xác định mô men quán tính của hình vành khănd=2r D=2R O y Y Hình 4.16: ... trung tâm của một mặt cắt ngang ghép bởi các thép định hình ch s 22a v thộp gúc u cnh 100ì100ì10 nh trên hình 4.21a. Bài giải: Trước hết tra các số liệu cần thiết cho các thép định hình -...

... hiện thẩm mĩ của văn học đổi mới trong sự so sánh lịch sử. Tác giả đưa ra định đề “Cái hàibên cái bi và một giai đoạn mới của văn học để khái quát đặc trưng thẩm mĩnổi bật của văn học sau 1975 ... mạng của toàn dân tộc, trong tính bất thường của văn học thờichiến. Sự phong phú, đa dạng của văn học 1945 – 1975 có cơ sở từ sự thay đổilớn trong quan niệm văn học mang tính đặc thù. Sự phát ... là đòi hỏi tất yếu của lịch sử.Hệ giá trị thẩm mĩ của văn học cách mạng 1945 – 1975 mang tính cao cảthuần khiết, đơn trị. Đặc trưng này cũng xuất phát từ đòi hỏi tất yếu của lịchsử. Hệ giá...

... NHIỄUII.HẰNG SỐ ĐẶC TRƯNG ĐIỀU KIỆN CỦA CÂN BẰNG TRAO ĐỔI ĐIỆN TỬIII.HẰNG SỐ ĐẶC TRƯNG ĐIỀU KIỆN CỦA BÁN CÂN BẰNG TRAO ĐỔI TIỂU PHÂNIV.ỨNG DỤNG 27GV: Trần T Phương Thảo ĐHBK1.3. Ảnh hưởng củacânbằng ... SỐ ĐẶC TRƯNG ĐIỀU KIỆN CỦA BÁN CB TRAO ĐỔI TIỂU PHÂN 26GV: Trần T Phương Thảo ĐHBK1.2. Ảnh hưởng của cân bằng nhiễutạophức 33GV: Trần T Phương Thảo ĐHBK2. Hằng sốđặctrưng điềukiệncủa ... ĐHBK2. Hằng sốđặctrưng điềukiệncủa cânbằng trao đổi điệntửHằng sốđặctrưng của bán cân bằng thayđổi E0→ E0’ → làm hằng sốđặctrưng của cân bằng thay đổiK →K’Etđ→Etđ’ 29GV: Trần T Phương...

... hưởng củacânbằng nhiễutạotủa 33GV: Trần T Phương Thảo ĐHBK2. Hằng sốđặctrưng điềukiệncủa cânbằng trao đổi điệntửHằng sốđặctrưng của bán cân bằng thayđổi E0→ E0’ → làm hằng sốđặctrưng của cân ... CHÍNH(3LT+2BT)I. KHÁI NIỆM CÂN BẰNG NHIỄUII.HẰNG SỐ ĐẶC TRƯNG ĐIỀU KIỆN CỦA CÂN BẰNG TRAO ĐỔI ĐIỆN TỬIII.HẰNG SỐ ĐẶC TRƯNG ĐIỀU KIỆN CỦA BÁN CÂN BẰNG TRAO ĐỔI TIỂU PHÂNIV.ỨNG DỤNG ... Thảo ĐHBK 1HẰNG SỐ ĐẶC TRƯNG ĐIỀU KIỆNCỦA CÁC CÂN BẰNG HÓA HỌC TRONG NƯỚCCHƯƠNG 4 47GV: Trần T Phương Thảo ĐHBKSau khi tham gia cân bằng chính, tổngnồng độ của A, p, D ở tấtcả các...

... Trần T Phương Thảo ĐHBK2. Hằng sốđặctrưng điềukiệncủa cânbằng trao đổi điệntửHằng sốđặctrưng của bán cân bằng thayđổi E0→ E0’ → làm hằng sốđặctrưng của cân bằng thay đổiK →K’Etđ→Etđ’ ... T Phương Thảo ĐHBK1. Hằng sốđặctrưng điềukiệncủabáncân bằngKhi xuấthiệncânbằng nhiễu:Khả năng oxy hóa hay khử của2 dạng oxy hóa -khử thay đổi.Hằng sốđặctrưng điềukiệnlàthế oxy hóachuẩn ... +mH+↔ pKh1+ 1/2mH2O)thì :2. Hằng sốđặctrưng điềukiệncủa cânbằng trao đổi điệntử 42GV: Trần T Phương Thảo ĐHBK2. Hằng sốđặctrưng điềukiệncủa cânbằng trao đổi điệntử 35GV: Trần T...

... hình phẳng có hình dạng và kích thước như hình vẽ. Xácđịnh các mô men quántính chính trungtâm của hình phẳngGiải:Chọn hệ trục toạ độ ban đầu x0y0như hình vẽ. Chia hình phẳng làm hai hình ... thuc vào hình dạng, kích thướccủamặtcắt ngang- đặctrưng hình họccủamặtcắtngangFyxzyxzF (5)25July 2010Tran Minh Tu - University of Civil Engineering 4.1. Khái niệm chung Hình dạng ... cácđặctrưnghình học mặt cắt ngang làSx, Sy, Ix, Iy, Ixy. -HệtrụcmớiO'uvxoay góc q ngượcchiều kim đồng hồuxyv uxcos ysinvxsin ycosθθθθ=+=− +-Các đặc trưng hình học mặt...

... Đặc trưng mỹ học của thơ Đường Đặc trưng mỹ học của thơ Đường trước hết biểu hiện ở tính hàm súc, ít lời nhiều ý, ý ở ngoài ... càng cao, hài hòa càng lớn. Do đó câu số chữ của một bài thơ được hạn định, nên các nhà thơ phải tìm tòi những tinh hoa của dân gian, kết hợp với điển cố lịch sử và từ hoa lệ của văn học thành ... Đường luật hết sức chặt chẽ, mỗi bài thơ giống như một bài toán giải đáp một vấn đề xã hội bằng hình tượng nghệ thuật. Thơ Đường luật đúc kết những kinh nghiệm quá khứ nâng lên thành luật bằng...