đặc trưng hình học của thép hộp

... 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 phẳng 1-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) H ình 4.10 Chơng 4. Đặc trng hình học của mặt cắt ngang Các thuyết bền 27 Chơng 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 = xy xy 2J tg JJ (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. N o 24 a a N 20 o 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 S x , S y , I x , I y , I xy . Hệ trục mới O'uv có O'u//Ox, O'v//Oy và: uxb=+ ; (4.9) vya=+ v u x y a b y v x u dA O O Các đặc trưng hình học mặt...

... thanh phụ thuộc vào diện tích, hình dáng, cách sắp xếp, của mt ct ngang ã Cỏc i lng m ln ph thuc vo hình dạng, kích thước của mặt cắt ngang - đặc trưng hình học của mặt cắt ngang F y x z y x z F ... 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Chương 4. Đặc trưng hình học của mặt cắt ngang 4.1. Khái niệm chung 4.2. Mômen tĩnh và các mô men quán tính 4.3. Mô men quán tính một số hình đơn giản 4.4. Công thức chuyển ... trưng hình học của mặt cắt ngang F y x z y x z F University of Architechture Chương 4 ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG ...

... tính của 1 số hình đơn giản : a) Hình chữ nhật: (Hình 5.5a) ∫ ∫ + − === F /h /h x bh bdyydFyJ 2 2 3 22 12 Tương tự : 12 hb J 3 y = b) Hình tam giác : (Hình 5.5b) 12 3 bh J x = c) Hình ... : 4 R 2 J JJ 4 p yx π === Hình 5.5 x y b dy h/2 y h a) b) b y dy y h Hình 5.6 b) D d y x dρ ρ y x R D a) - 50 - Chương 5 ĐẶC TRƯNG HÌNH HỌC CỦA MẶT CẮT NGANG 5.1. 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 : ∫∫ == F y F x xdFS;ydFS S x , S y là moment tĩnh của diện...

... được hình thành từ những hình đơn giản,ta chia làm những hình đơn giản F Fy , F Fx n 1i i n 1i ii n 1i i n 1i ii          F S y F S x x C y C • Nếu 2= thì ta có nửa hình tròn:  3 4r x ... 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 bên Bài giải TRỌNG TÂM CỦA MỘT VẬT                       dW zdW z dW ydW y dW xdW x x z y dw G x y z x z y z x y W dV                           V V V V V V dV zdV z dV ydV y dV xdV x ... • Công thúc chuyển trục song song của momen quán tính ly tâm: Ví dụ 2: Tìm trọng tâm của hình phẳng bên Bài giải Cách 1: ydxdA     a a ydx xydx x 0 0 thay 3 3/1 b a k...

... 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, ... trung tâm của một mặt cắt ngang ghép bởi các thép định hình ch s 22a v thộp gúc u cnh 100 ì100ì10 nh trên hình 4.21a. Bài giải: Trước hết tra các số liệu cần thiết cho các thép định hình - ... = y C y Hình 4.14: Xác định mô men quá tính của hình tròn D=2R ρ ρ+dρ x ϕ dϕ dF O y x Hình 4.15: Xác định mô men quán tính của hình vành khăn d=2 r D=2R O y Y Hình 4.16:...

... hình phẳng có hình dạng và kích thước như hình vẽ. Xác định các mô men quántính chính trung tâm của hình phẳng Giải: Chọn hệ trục toạ độ ban đầu x 0 y 0 như hình vẽ. Chia hình phẳng làm hai hình ... thuc vào hình dạng, kích thướccủamặtcắt ngang - đặctrưng hình họccủamặtcắt ngang F y x z y x z F (5)25 Jul y 2010 Tran Minh Tu - University of Civil Engineering 4.1. Khái niệm chung Hình dạng ... cácđặctrưnghình học mặt cắt ngang là S x , S y , I x , I y , I xy . -HệtrụcmớiO'uvxoay góc q ngược chiều kim đồng hồ u x y v uxcos ysin vxsin ycos θ θ θ θ =+ =− + -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 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 văn. Sự quy định ... 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...

... các triệu chứng giọng nói, hình thái thanh quản trên soi hoạt nghiệm và đặc trưng âm thanh học của rối loạn giọng này. 4 Do đó, mục tiêu nghiên cứu của đề tài của chúng tôi là: 1. Phân tích ... là: 1. Phân tích các triệu chứng giọng nói của RLGCC. 2.Đánh giá các đặc trưng âm học của RLGCC. 3. Đánh giá hình thái thanh quản qua soi hoạt nghiệm của RLGCC. 10. Koufman JA (1991), Blalock ... 14 1.2.2.2. Theo bệnh học Cơ sở để phân vùng thanh quản dựa vào nguốc gốc cấu trúc bào thai học khác nhau của các thành phần thanh quản:  Tầng thượng thanh môn -Được tính từ bờ trên của sụn thanh...

... rất phát triển của mình cũng phát triển thêm một lĩnh vực rộng lớn: lĩnh vực hóa học lý thuyết – hóa học tính toán. Hóa học tính toán lý thuyết là một bộ phận của ngành hóa học trong đó các ... toán học được kết hợp với các định luật vật lý cơ bản để nghiên cứu các vấn đề của hóa học. Hiện nay nhóm nghiên cứu hóa học tính toán của chúng tôi tập trung vào giải quyết các vấn đề hóa học ... tài để nghiên cứu : “Nghiên cứu cấu trúc và một số đặc trưng động học của quá trình phân li của CLUSTER Bạc Ag n (n=2-8) bằng phương pháp hóa học tính toán”. 2. Mục đích nghiên cứu Sử dụng các...

... 4 cánh. 7. Các ký hiệu đặc trưng về đặc điểm hình học của chân vịt Hình 1.8 mô tả ký hiệu các đặc trưng về đặc điểm hình học cánh chân vịt: Hình 1.8: Các kích thước hình học chân vịt Các kí hiệu ... khi nghiên cứu đặc điểm hình học cánh chân vịt cần nghi ên cứu đặc điểm của đường xoắn ốc và mặt xoắn ốc. 1.Đường xoắn ốc và mặt xoắn ốc - Đường xoắn ốc: Đường xoắn ốc là quỹ tích của điểm A vừa ... sau: - Nếu vật liệu là thép hoặc đồng thì phải tiến hành phân tích đầy đủ thành phần hóa học, thử và xác định đặc tính cơ học và so sánh với số liệu trong các bảng đặc tính của vật liệu chế tạo. -...

... vào hình dáng, cách bố trí mặt cắt… nghĩa là phụ thuộc vào các yếu tố khác gọi chung là đặc trưng hình học của mặt cắt ngang. y P z y P z 4 CÁC ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG Mômen tĩnh của ... KTCT 1 1 BÀI GiẢNG MÔN HỌC SỨC BỀN VẬT LiỆU GV: TRẦN HỮU HUY Tp.HCM, tháng 10 năm 2009 (Lưu hành nội bộ) 2 ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG  ĐỊNH NGHĨA  CÁC ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG CHƯƠNG ... Mômen quán tính luôn mang giá trị dương. x y y x M dA A 10 CÁC ĐẶC TRƯNG HÌNH HỌC MẶT CẮT NGANG Bán kính quán tính Một đặc trưng hình học hay được dùng để tính toán kết cấu đó là bán kính quán...